ScalingIntelligence/swe-bench-verified-codebase-content

hash stringlengths 64 64	content stringlengths 0 1.51M
e2c4f7c26adcc5f150c067fec7389dcaf3f38769b7f861cf168ebb5698cf70d2	from sympy import Set, symbols, exp, log, S, Wild, Dummy, oo from sympy.core import Expr, Add from sympy.core.function import Lambda, _coeff_isneg, FunctionClass from sympy.core.mod import Mod from sympy.logic.boolalg import true from sympy.multipledispatch import dispatch from sympy.sets import (imageset, Interval, FiniteSet, Union, ImageSet, EmptySet, Intersection, Range) from sympy.sets.fancysets import Integers, Naturals, Reals _x, _y = symbols("x y") FunctionUnion = (FunctionClass, Lambda) @dispatch(FunctionClass, Set) def _set_function(f, x): return None @dispatch(FunctionUnion, FiniteSet) def _set_function(f, x): return FiniteSet(map(f, x)) @dispatch(Lambda, Interval) def _set_function(f, x): from sympy.functions.elementary.miscellaneous import Min, Max from sympy.solvers.solveset import solveset from sympy.core.function import diff, Lambda from sympy.series import limit from sympy.calculus.singularities import singularities from sympy.sets import Complement # TODO: handle functions with infinitely many solutions (eg, sin, tan) # TODO: handle multivariate functions expr = f.expr if len(expr.free_symbols) > 1 or len(f.variables) != 1: return var = f.variables[0] if not var.is_real: if expr.subs(var, Dummy(real=True)).is_real is False: return if expr.is_Piecewise: result = S.EmptySet domain_set = x for (p_expr, p_cond) in expr.args: if p_cond is true: intrvl = domain_set else: intrvl = p_cond.as_set() intrvl = Intersection(domain_set, intrvl) if p_expr.is_Number: image = FiniteSet(p_expr) else: image = imageset(Lambda(var, p_expr), intrvl) result = Union(result, image) # remove the part which has been `imaged` domain_set = Complement(domain_set, intrvl) if domain_set is S.EmptySet: break return result if not x.start.is_comparable or not x.end.is_comparable: return try: sing = [i for i in singularities(expr, var) if i.is_real and i in x] except NotImplementedError: return if x.left_open: _start = limit(expr, var, x.start, dir="+") elif x.start not in sing: _start = f(x.start) if x.right_open: _end = limit(expr, var, x.end, dir="-") elif x.end not in sing: _end = f(x.end) if len(sing) == 0: solns = list(solveset(diff(expr, var), var)) extr = [_start, _end] + [f(i) for i in solns if i.is_real and i in x] start, end = Min(extr), Max(extr) left_open, right_open = False, False if _start <= _end: # the minimum or maximum value can occur simultaneously # on both the edge of the interval and in some interior # point if start == _start and start not in solns: left_open = x.left_open if end == _end and end not in solns: right_open = x.right_open else: if start == _end and start not in solns: left_open = x.right_open if end == _start and end not in solns: right_open = x.left_open return Interval(start, end, left_open, right_open) else: return imageset(f, Interval(x.start, sing[0], x.left_open, True)) + \ Union([imageset(f, Interval(sing[i], sing[i + 1], True, True)) for i in range(0, len(sing) - 1)]) + \ imageset(f, Interval(sing[-1], x.end, True, x.right_open)) @dispatch(FunctionClass, Interval) def _set_function(f, x): if f == exp: return Interval(exp(x.start), exp(x.end), x.left_open, x.right_open) elif f == log: return Interval(log(x.start), log(x.end), x.left_open, x.right_open) return ImageSet(Lambda(_x, f(_x)), x) @dispatch(FunctionUnion, Union) def _set_function(f, x): return Union((imageset(f, arg) for arg in x.args)) @dispatch(FunctionUnion, Intersection) def _set_function(f, x): from sympy.sets.sets import is_function_invertible_in_set # If the function is invertible, intersect the maps of the sets. if is_function_invertible_in_set(f, x): return Intersection((imageset(f, arg) for arg in x.args)) else: return ImageSet(Lambda(_x, f(_x)), x) @dispatch(FunctionUnion, EmptySet) def _set_function(f, x): return x @dispatch(FunctionUnion, Set) def _set_function(f, x): return ImageSet(Lambda(_x, f(_x)), x) @dispatch(FunctionUnion, Range) def _set_function(f, self): from sympy.core.function import expand_mul if not self: return S.EmptySet if not isinstance(f.expr, Expr): return if self.size == 1: return FiniteSet(f(self[0])) if f is S.IdentityFunction: return self x = f.variables[0] expr = f.expr # handle f that is linear in f's variable if x not in expr.free_symbols or x in expr.diff(x).free_symbols: return if self.start.is_finite: F = f(self.stepx + self.start) # for i in range(len(self)) else: F = f(-self.stepx + self[-1]) F = expand_mul(F) if F != expr: return imageset(x, F, Range(self.size)) @dispatch(FunctionUnion, Integers) def _set_function(f, self): expr = f.expr if not isinstance(expr, Expr): return n = f.variables[0] if expr == abs(n): return S.Naturals0 # f(x) + c and f(-x) + c cover the same integers # so choose the form that has the fewest negatives c = f(0) fx = f(n) - c f_x = f(-n) - c neg_count = lambda e: sum(_coeff_isneg(_) for _ in Add.make_args(e)) if neg_count(f_x) < neg_count(fx): expr = f_x + c a = Wild('a', exclude=[n]) b = Wild('b', exclude=[n]) match = expr.match(an + b) if match and match[a]: # canonical shift b = match[b] if abs(match[a]) == 1: nonint = [] for bi in Add.make_args(b): if not bi.is_integer: nonint.append(bi) b = Add(nonint) if b.is_number and match[a].is_real: mod = b % match[a] reps = dict([(m, m.args[0]) for m in mod.atoms(Mod) if not m.args[0].is_real]) mod = mod.xreplace(reps) expr = match[a]n + mod else: expr = match[a]n + b if expr != f.expr: return ImageSet(Lambda(n, expr), S.Integers) @dispatch(FunctionUnion, Naturals) def _set_function(f, self): expr = f.expr if not isinstance(expr, Expr): return x = f.variables[0] if not expr.free_symbols - {x}: if expr == abs(x): if self is S.Naturals: return self return S.Naturals0 step = expr.coeff(x) c = expr.subs(x, 0) if c.is_Integer and step.is_Integer and expr == step*x + c: if self is S.Naturals: c += step if step > 0: if step == 1: if c == 0: return S.Naturals0 elif c == 1: return S.Naturals return Range(c, oo, step) return Range(c, -oo, step) @dispatch(FunctionUnion, Reals) def _set_function(f, self): expr = f.expr if not isinstance(expr, Expr): return return _set_function(f, Interval(-oo, oo))
78ace0808eae9e13b87c73244ef9294eabec296ef8a256519f73da76b42eabd9	from sympy.sets import (ConditionSet, Intersection, FiniteSet, EmptySet, Union) from sympy import (Symbol, Eq, S, Abs, sin, pi, Interval, And, Mod, oo, Function) from sympy.utilities.pytest import raises w = Symbol('w') x = Symbol('x') y = Symbol('y') z = Symbol('z') L = Symbol('lambda') f = Function('f') def test_CondSet(): sin_sols_principal = ConditionSet(x, Eq(sin(x), 0), Interval(0, 2pi, False, True)) assert pi in sin_sols_principal assert pi/2 not in sin_sols_principal assert 3pi not in sin_sols_principal assert 5 in ConditionSet(x, x2 > 4, S.Reals) assert 1 not in ConditionSet(x, x2 > 4, S.Reals) # in this case, 0 is not part of the base set so # it can't be in any subset selected by the condition assert 0 not in ConditionSet(x, y > 5, Interval(1, 7)) # since 'in' requires a true/false, the following raises # an error because the given value provides no information # for the condition to evaluate (since the condition does # not depend on the dummy symbol): the result is `y > 5`. # In this case, ConditionSet is just acting like # Piecewise((Interval(1, 7), y > 5), (S.EmptySet, True)). raises(TypeError, lambda: 6 in ConditionSet(x, y > 5, Interval(1, 7))) assert isinstance(ConditionSet(x, x < 1, {x, y}).base_set, FiniteSet) raises(TypeError, lambda: ConditionSet(x, x + 1, {x, y})) raises(TypeError, lambda: ConditionSet(x, x, 1)) I = S.Integers C = ConditionSet assert C(x, x < 1, C(x, x < 2, I) ) == C(x, (x < 1) & (x < 2), I) assert C(y, y < 1, C(x, y < 2, I) ) == C(x, (x < 1) & (y < 2), I) assert C(y, y < 1, C(x, x < 2, I) ) == C(y, (y < 1) & (y < 2), I) assert C(y, y < 1, C(x, y < x, I) ) == C(x, (x < 1) & (y < x), I) assert C(y, x < 1, C(x, y < x, I) ) == C(L, (x < 1) & (y < L), I) c = C(y, x < 1, C(x, L < y, I)) assert c == C(c.sym, (L < y) & (x < 1), I) assert c.sym not in (x, y, L) c = C(y, x < 1, C(x, y < x, FiniteSet(L))) assert c == C(L, And(x < 1, y < L), FiniteSet(L)) def test_CondSet_intersect(): input_conditionset = ConditionSet(x, x2 > 4, Interval(1, 4, False, False)) other_domain = Interval(0, 3, False, False) output_conditionset = ConditionSet(x, x2 > 4, Interval(1, 3, False, False)) assert Intersection(input_conditionset, other_domain) == output_conditionset def test_issue_9849(): assert ConditionSet(x, Eq(x, x), S.Naturals) == S.Naturals assert ConditionSet(x, Eq(Abs(sin(x)), -1), S.Naturals) == S.EmptySet def test_simplified_FiniteSet_in_CondSet(): assert ConditionSet(x, And(x < 1, x > -3), FiniteSet(0, 1, 2)) == FiniteSet(0) assert ConditionSet(x, x < 0, FiniteSet(0, 1, 2)) == EmptySet() assert ConditionSet(x, And(x < -3), EmptySet()) == EmptySet() y = Symbol('y') assert (ConditionSet(x, And(x > 0), FiniteSet(-1, 0, 1, y)) == Union(FiniteSet(1), ConditionSet(x, And(x > 0), FiniteSet(y)))) assert (ConditionSet(x, Eq(Mod(x, 3), 1), FiniteSet(1, 4, 2, y)) == Union(FiniteSet(1, 4), ConditionSet(x, Eq(Mod(x, 3), 1), FiniteSet(y)))) def test_free_symbols(): assert ConditionSet(x, Eq(y, 0), FiniteSet(z) ).free_symbols == {y, z} assert ConditionSet(x, Eq(x, 0), FiniteSet(z) ).free_symbols == {z} assert ConditionSet(x, Eq(x, 0), FiniteSet(x, z) ).free_symbols == {x, z} def test_subs_CondSet(): s = FiniteSet(z, y) c = ConditionSet(x, x < 2, s) # you can only replace sym with a symbol that is not in # the free symbols assert c.subs(x, 1) == c assert c.subs(x, y) == ConditionSet(y, y < 2, s) # double subs needed to change dummy if the base set # also contains the dummy orig = ConditionSet(y, y < 2, s) base = orig.subs(y, w) and_dummy = base.subs(y, w) assert base == ConditionSet(y, y < 2, {w, z}) assert and_dummy == ConditionSet(w, w < 2, {w, z}) assert c.subs(x, w) == ConditionSet(w, w < 2, s) assert ConditionSet(x, x < y, s ).subs(y, w) == ConditionSet(x, x < w, s.subs(y, w)) # if the user uses assumptions that cause the condition # to evaluate, that can't be helped from SymPy's end n = Symbol('n', negative=True) assert ConditionSet(n, 0 < n, S.Integers) is S.EmptySet p = Symbol('p', positive=True) assert ConditionSet(n, n < y, S.Integers ).subs(n, x) == ConditionSet(x, x < y, S.Integers) nc = Symbol('nc', commutative=False) raises(ValueError, lambda: ConditionSet( x, x < p, S.Integers).subs(x, nc)) raises(ValueError, lambda: ConditionSet( x, x < p, S.Integers).subs(x, n)) raises(ValueError, lambda: ConditionSet( x + 1, x < 1, S.Integers)) raises(ValueError, lambda: ConditionSet( x + 1, x < 1, s)) assert ConditionSet( n, n < x, Interval(0, oo)).subs(x, p) == Interval(0, oo) assert ConditionSet( n, n < x, Interval(-oo, 0)).subs(x, p) == S.EmptySet assert ConditionSet(f(x), f(x) < 1, {w, z} ).subs(f(x), y) == ConditionSet(y, y < 1, {w, z}) def test_subs_CondSet_tebr(): # to eventually be removed c = ConditionSet((x, y), {x + 1, x + y}, S.Reals) assert c.subs(x, z) == c def test_dummy_eq(): C = ConditionSet I = S.Integers c = C(x, x < 1, I) assert c.dummy_eq(C(y, y < 1, I)) assert c.dummy_eq(1) == False assert c.dummy_eq(C(x, x < 1, S.Reals)) == False raises(ValueError, lambda: c.dummy_eq(C(x, x < 1, S.Reals), z)) # to eventually be removed c1 = ConditionSet((x, y), {x + 1, x + y}, S.Reals) c2 = ConditionSet((x, y), {x + 1, x + y}, S.Reals) c3 = ConditionSet((x, y), {x + 1, x + y}, S.Complexes) assert c1.dummy_eq(c2) assert c1.dummy_eq(c3) is False assert c.dummy_eq(c1) is False assert c1.dummy_eq(c) is False def test_contains(): assert 6 in ConditionSet(x, x > 5, Interval(1, 7)) assert (8 in ConditionSet(x, y > 5, Interval(1, 7))) is False # `in` should give True or False; in this case there is not # enough information for that result raises(TypeError, lambda: 6 in ConditionSet(x, y > 5, Interval(1, 7))) assert ConditionSet(x, y > 5, Interval(1, 7) ).contains(6) == (y > 5) assert ConditionSet(x, y > 5, Interval(1, 7) ).contains(8) is S.false assert ConditionSet(x, y > 5, Interval(1, 7) ).contains(w) == And(S(1) <= w, w <= 7, y > 5) assert 0 not in ConditionSet(x, 1/x >= 0, S.Reals)
ccc0985c7b854ad91574b4a8541cde759a3afb8ebd7104ccec168618add5dd22	from sympy import Symbol, Contains, S, Interval, FiniteSet, oo, Eq from sympy.core.expr import unchanged from sympy.utilities.pytest import raises def test_contains_basic(): raises(TypeError, lambda: Contains(S.Integers, 1)) assert Contains(2, S.Integers) is S.true assert Contains(-2, S.Naturals) is S.false i = Symbol('i', integer=True) assert Contains(i, S.Naturals) == Contains(i, S.Naturals, evaluate=False) def test_issue_6194(): x = Symbol('x') assert unchanged(Contains, x, Interval(0, 1)) assert Interval(0, 1).contains(x) == (S(0) <= x) & (x <= 1) assert Contains(x, FiniteSet(0)) != S.false assert Contains(x, Interval(1, 1)) != S.false assert Contains(x, S.Integers) != S.false def test_issue_10326(): assert Contains(oo, Interval(-oo, oo)) == False assert Contains(-oo, Interval(-oo, oo)) == False def test_binary_symbols(): x = Symbol('x') y = Symbol('y') z = Symbol('z') assert Contains(x, FiniteSet(y, Eq(z, True)) ).binary_symbols == set([y, z]) def test_as_set(): x = Symbol('x') y = Symbol('y') # Contains is a BooleanFunction whose value depends on an arg's # containment in a Set -- rewriting as a Set is not yet implemented raises(NotImplementedError, lambda: Contains(x, FiniteSet(y)).as_set())
bbc6a908137e077a5cd03907b1f6ee6a8f638dc42c7fb19547d3b85141d347d3	from sympy.core.compatibility import range, PY3 from sympy.sets.fancysets import (ImageSet, Range, normalize_theta_set, ComplexRegion) from sympy.sets.sets import (FiniteSet, Interval, imageset, Union, Intersection, ProductSet, Contains) from sympy.simplify.simplify import simplify from sympy import (S, Symbol, Lambda, symbols, cos, sin, pi, oo, Basic, Rational, sqrt, tan, log, exp, Abs, I, Tuple, eye, Dummy, floor, And, Eq) from sympy.utilities.iterables import cartes from sympy.utilities.pytest import XFAIL, raises from sympy.abc import x, y, t import itertools def test_naturals(): N = S.Naturals assert 5 in N assert -5 not in N assert 5.5 not in N ni = iter(N) a, b, c, d = next(ni), next(ni), next(ni), next(ni) assert (a, b, c, d) == (1, 2, 3, 4) assert isinstance(a, Basic) assert N.intersect(Interval(-5, 5)) == Range(1, 6) assert N.intersect(Interval(-5, 5, True, True)) == Range(1, 5) assert N.boundary == N assert N.inf == 1 assert N.sup == oo assert not N.contains(oo) for s in (S.Naturals0, S.Naturals): assert s.intersection(S.Reals) is s assert s.is_subset(S.Reals) assert N.as_relational(x) == And(Eq(floor(x), x), x >= S.One, x < oo) def test_naturals0(): N = S.Naturals0 assert 0 in N assert -1 not in N assert next(iter(N)) == 0 assert not N.contains(oo) assert N.contains(sin(x)) == Contains(sin(x), N) def test_integers(): Z = S.Integers assert 5 in Z assert -5 in Z assert 5.5 not in Z assert not Z.contains(oo) assert not Z.contains(-oo) zi = iter(Z) a, b, c, d = next(zi), next(zi), next(zi), next(zi) assert (a, b, c, d) == (0, 1, -1, 2) assert isinstance(a, Basic) assert Z.intersect(Interval(-5, 5)) == Range(-5, 6) assert Z.intersect(Interval(-5, 5, True, True)) == Range(-4, 5) assert Z.intersect(Interval(5, S.Infinity)) == Range(5, S.Infinity) assert Z.intersect(Interval.Lopen(5, S.Infinity)) == Range(6, S.Infinity) assert Z.inf == -oo assert Z.sup == oo assert Z.boundary == Z assert Z.as_relational(x) == And(Eq(floor(x), x), -oo < x, x < oo) def test_ImageSet(): raises(ValueError, lambda: ImageSet(x, S.Integers)) assert ImageSet(Lambda(x, 1), S.Integers) == FiniteSet(1) assert ImageSet(Lambda(x, y), S.Integers ) == {y} squares = ImageSet(Lambda(x, x*2), S.Naturals) assert 4 in squares assert 5 not in squares assert FiniteSet(range(10)).intersect(squares) == FiniteSet(1, 4, 9) assert 16 not in squares.intersect(Interval(0, 10)) si = iter(squares) a, b, c, d = next(si), next(si), next(si), next(si) assert (a, b, c, d) == (1, 4, 9, 16) harmonics = ImageSet(Lambda(x, 1/x), S.Naturals) assert Rational(1, 5) in harmonics assert Rational(.25) in harmonics assert 0.25 not in harmonics assert Rational(.3) not in harmonics assert (1, 2) not in harmonics assert harmonics.is_iterable assert imageset(x, -x, Interval(0, 1)) == Interval(-1, 0) assert ImageSet(Lambda(x, x*2), Interval(0, 2)).doit() == Interval(0, 4) c = ComplexRegion(Interval(1, 3)Interval(1, 3)) assert Tuple(2, 6) in ImageSet(Lambda((x, y), (x, 2y)), c) assert Tuple(2, S.Half) in ImageSet(Lambda((x, y), (x, 1/y)), c) assert Tuple(2, -2) not in ImageSet(Lambda((x, y), (x, y2)), c) assert Tuple(2, -2) in ImageSet(Lambda((x, y), (x, -2)), c) c3 = Interval(3, 7)Interval(8, 11)Interval(5, 9) assert Tuple(8, 3, 9) in ImageSet(Lambda((t, y, x), (y, t, x)), c3) assert Tuple(S(1)/8, 3, 9) in ImageSet(Lambda((t, y, x), (1/y, t, x)), c3) assert 2/pi not in ImageSet(Lambda((x, y), 2/x), c) assert 2/S(100) not in ImageSet(Lambda((x, y), 2/x), c) assert 2/S(3) in ImageSet(Lambda((x, y), 2/x), c) assert imageset(lambda x, y: x + y, S.Integers, S.Naturals ).base_set == ProductSet(S.Integers, S.Naturals) def test_image_is_ImageSet(): assert isinstance(imageset(x, sqrt(sin(x)), Range(5)), ImageSet) def test_halfcircle(): # This test sometimes works and sometimes doesn't. # It may be an issue with solve? Maybe with using Lambdas/dummys? # I believe the code within fancysets is correct r, th = symbols('r, theta', real=True) L = Lambda((r, th), (rcos(th), rsin(th))) halfcircle = ImageSet(L, Interval(0, 1)Interval(0, pi)) assert (r, 0) in halfcircle assert (1, 0) in halfcircle assert (0, -1) not in halfcircle assert (r, 2pi) not in halfcircle assert (0, 0) in halfcircle assert not halfcircle.is_iterable def test_ImageSet_iterator_not_injective(): L = Lambda(x, x - x % 2) # produces 0, 2, 2, 4, 4, 6, 6, ... evens = ImageSet(L, S.Naturals) i = iter(evens) # No repeats here assert (next(i), next(i), next(i), next(i)) == (0, 2, 4, 6) def test_inf_Range_len(): raises(ValueError, lambda: len(Range(0, oo, 2))) assert Range(0, oo, 2).size is S.Infinity assert Range(0, -oo, -2).size is S.Infinity assert Range(oo, 0, -2).size is S.Infinity assert Range(-oo, 0, 2).size is S.Infinity def test_Range_set(): empty = Range(0) assert Range(5) == Range(0, 5) == Range(0, 5, 1) r = Range(10, 20, 2) assert 12 in r assert 8 not in r assert 11 not in r assert 30 not in r assert list(Range(0, 5)) == list(range(5)) assert list(Range(5, 0, -1)) == list(range(5, 0, -1)) assert Range(5, 15).sup == 14 assert Range(5, 15).inf == 5 assert Range(15, 5, -1).sup == 15 assert Range(15, 5, -1).inf == 6 assert Range(10, 67, 10).sup == 60 assert Range(60, 7, -10).inf == 10 assert len(Range(10, 38, 10)) == 3 assert Range(0, 0, 5) == empty assert Range(oo, oo, 1) == empty assert Range(oo, 1, 1) == empty assert Range(-oo, 1, -1) == empty assert Range(1, oo, -1) == empty assert Range(1, -oo, 1) == empty raises(ValueError, lambda: Range(1, 4, oo)) raises(ValueError, lambda: Range(-oo, oo)) raises(ValueError, lambda: Range(oo, -oo, -1)) raises(ValueError, lambda: Range(-oo, oo, 2)) raises(ValueError, lambda: Range(0, pi, 1)) raises(ValueError, lambda: Range(1, 10, 0)) assert 5 in Range(0, oo, 5) assert -5 in Range(-oo, 0, 5) assert oo not in Range(0, oo) ni = symbols('ni', integer=False) assert ni not in Range(oo) u = symbols('u', integer=None) assert Range(oo).contains(u) is not False inf = symbols('inf', infinite=True) assert inf not in Range(oo) inf = symbols('inf', infinite=True) assert inf not in Range(oo) assert Range(0, oo, 2)[-1] == oo assert Range(-oo, 1, 1)[-1] is S.Zero assert Range(oo, 1, -1)[-1] == 2 assert Range(0, -oo, -2)[-1] == -oo assert Range(1, 10, 1)[-1] == 9 assert all(i.is_Integer for i in Range(0, -1, 1)) it = iter(Range(-oo, 0, 2)) raises(ValueError, lambda: next(it)) assert empty.intersect(S.Integers) == empty assert Range(-1, 10, 1).intersect(S.Integers) == Range(-1, 10, 1) assert Range(-1, 10, 1).intersect(S.Naturals) == Range(1, 10, 1) assert Range(-1, 10, 1).intersect(S.Naturals0) == Range(0, 10, 1) # test slicing assert Range(1, 10, 1)[5] == 6 assert Range(1, 12, 2)[5] == 11 assert Range(1, 10, 1)[-1] == 9 assert Range(1, 10, 3)[-1] == 7 raises(ValueError, lambda: Range(oo,0,-1)[1:3:0]) raises(ValueError, lambda: Range(oo,0,-1)[:1]) raises(ValueError, lambda: Range(1, oo)[-2]) raises(ValueError, lambda: Range(-oo, 1)[2]) raises(IndexError, lambda: Range(10)[-20]) raises(IndexError, lambda: Range(10)[20]) raises(ValueError, lambda: Range(2, -oo, -2)[2:2:0]) assert Range(2, -oo, -2)[2:2:2] == empty assert Range(2, -oo, -2)[:2:2] == Range(2, -2, -4) raises(ValueError, lambda: Range(-oo, 4, 2)[:2:2]) assert Range(-oo, 4, 2)[::-2] == Range(2, -oo, -4) raises(ValueError, lambda: Range(-oo, 4, 2)[::2]) assert Range(oo, 2, -2)[::] == Range(oo, 2, -2) assert Range(-oo, 4, 2)[:-2:-2] == Range(2, 0, -4) assert Range(-oo, 4, 2)[:-2:2] == Range(-oo, 0, 4) raises(ValueError, lambda: Range(-oo, 4, 2)[:0:-2]) raises(ValueError, lambda: Range(-oo, 4, 2)[:2:-2]) assert Range(-oo, 4, 2)[-2::-2] == Range(0, -oo, -4) raises(ValueError, lambda: Range(-oo, 4, 2)[-2:0:-2]) raises(ValueError, lambda: Range(-oo, 4, 2)[0::2]) assert Range(oo, 2, -2)[0::] == Range(oo, 2, -2) raises(ValueError, lambda: Range(-oo, 4, 2)[0:-2:2]) assert Range(oo, 2, -2)[0:-2:] == Range(oo, 6, -2) raises(ValueError, lambda: Range(oo, 2, -2)[0:2:]) raises(ValueError, lambda: Range(-oo, 4, 2)[2::-1]) assert Range(-oo, 4, 2)[-2::2] == Range(0, 4, 4) assert Range(oo, 0, -2)[-10:0:2] == empty raises(ValueError, lambda: Range(oo, 0, -2)[-10:10:2]) raises(ValueError, lambda: Range(oo, 0, -2)[0::-2]) assert Range(oo, 0, -2)[0:-4:-2] == empty assert Range(oo, 0, -2)[:0:2] == empty raises(ValueError, lambda: Range(oo, 0, -2)[:1:-1]) # test empty Range assert empty.reversed == empty assert 0 not in empty assert list(empty) == [] assert len(empty) == 0 assert empty.size is S.Zero assert empty.intersect(FiniteSet(0)) is S.EmptySet assert bool(empty) is False raises(IndexError, lambda: empty[0]) assert empty[:0] == empty raises(NotImplementedError, lambda: empty.inf) raises(NotImplementedError, lambda: empty.sup) AB = [None] + list(range(12)) for R in [ Range(1, 10), Range(1, 10, 2), ]: r = list(R) for a, b, c in cartes(AB, AB, [-3, -1, None, 1, 3]): for reverse in range(2): r = list(reversed(r)) R = R.reversed result = list(R[a:b:c]) ans = r[a:b:c] txt = ('\n%s[%s:%s:%s] = %s -> %s' % ( R, a, b, c, result, ans)) check = ans == result assert check, txt assert Range(1, 10, 1).boundary == Range(1, 10, 1) for r in (Range(1, 10, 2), Range(1, oo, 2)): rev = r.reversed assert r.inf == rev.inf and r.sup == rev.sup assert r.step == -rev.step # Make sure to use range in Python 3 and xrange in Python 2 (regardless of # compatibility imports above) if PY3: builtin_range = range else: builtin_range = xrange assert Range(builtin_range(10)) == Range(10) assert Range(builtin_range(1, 10)) == Range(1, 10) assert Range(builtin_range(1, 10, 2)) == Range(1, 10, 2) if PY3: assert Range(builtin_range(1000000000000)) == \ Range(1000000000000) def test_range_range_intersection(): for a, b, r in [ (Range(0), Range(1), S.EmptySet), (Range(3), Range(4, oo), S.EmptySet), (Range(3), Range(-3, -1), S.EmptySet), (Range(1, 3), Range(0, 3), Range(1, 3)), (Range(1, 3), Range(1, 4), Range(1, 3)), (Range(1, oo, 2), Range(2, oo, 2), S.EmptySet), (Range(0, oo, 2), Range(oo), Range(0, oo, 2)), (Range(0, oo, 2), Range(100), Range(0, 100, 2)), (Range(2, oo, 2), Range(oo), Range(2, oo, 2)), (Range(0, oo, 2), Range(5, 6), S.EmptySet), (Range(2, 80, 1), Range(55, 71, 4), Range(55, 71, 4)), (Range(0, 6, 3), Range(-oo, 5, 3), S.EmptySet), (Range(0, oo, 2), Range(5, oo, 3), Range(8, oo, 6)), (Range(4, 6, 2), Range(2, 16, 7), S.EmptySet),]: assert a.intersect(b) == r assert a.intersect(b.reversed) == r assert a.reversed.intersect(b) == r assert a.reversed.intersect(b.reversed) == r a, b = b, a assert a.intersect(b) == r assert a.intersect(b.reversed) == r assert a.reversed.intersect(b) == r assert a.reversed.intersect(b.reversed) == r def test_range_interval_intersection(): p = symbols('p', positive=True) assert isinstance(Range(3).intersect(Interval(p, p + 2)), Intersection) assert Range(4).intersect(Interval(0, 3)) == Range(4) assert Range(4).intersect(Interval(-oo, oo)) == Range(4) assert Range(4).intersect(Interval(1, oo)) == Range(1, 4) assert Range(4).intersect(Interval(1.1, oo)) == Range(2, 4) assert Range(4).intersect(Interval(0.1, 3)) == Range(1, 4) assert Range(4).intersect(Interval(0.1, 3.1)) == Range(1, 4) assert Range(4).intersect(Interval.open(0, 3)) == Range(1, 3) assert Range(4).intersect(Interval.open(0.1, 0.5)) is S.EmptySet # Null Range intersections assert Range(0).intersect(Interval(0.2, 0.8)) is S.EmptySet assert Range(0).intersect(Interval(-oo, oo)) is S.EmptySet def test_Integers_eval_imageset(): ans = ImageSet(Lambda(x, 2x + S(3)/7), S.Integers) im = imageset(Lambda(x, -2x + S(3)/7), S.Integers) assert im == ans im = imageset(Lambda(x, -2x - S(11)/7), S.Integers) assert im == ans y = Symbol('y') L = imageset(x, 2x + y, S.Integers) assert y + 4 in L _x = symbols('x', negative=True) eq = _x2 - _x + 1 assert imageset(_x, eq, S.Integers).lamda.expr == _x2 + _x + 1 eq = 3_x - 1 assert imageset(_x, eq, S.Integers).lamda.expr == 3_x + 2 assert imageset(x, (x, 1/x), S.Integers) == \ ImageSet(Lambda(x, (x, 1/x)), S.Integers) def test_Range_eval_imageset(): a, b, c = symbols('a b c') assert imageset(x, a(x + b) + c, Range(3)) == \ imageset(x, ax + ab + c, Range(3)) eq = (x + 1)*2 assert imageset(x, eq, Range(3)).lamda.expr == eq eq = a(x + b) + c r = Range(3, -3, -2) imset = imageset(x, eq, r) assert imset.lamda.expr != eq assert list(imset) == [eq.subs(x, i).expand() for i in list(r)] def test_fun(): assert (FiniteSet(ImageSet(Lambda(x, sin(pix/4)), Range(-10, 11))) == FiniteSet(-1, -sqrt(2)/2, 0, sqrt(2)/2, 1)) def test_Reals(): assert 5 in S.Reals assert S.Pi in S.Reals assert -sqrt(2) in S.Reals assert (2, 5) not in S.Reals assert sqrt(-1) not in S.Reals assert S.Reals == Interval(-oo, oo) assert S.Reals != Interval(0, oo) assert S.Reals.is_subset(Interval(-oo, oo)) def test_Complex(): assert 5 in S.Complexes assert 5 + 4I in S.Complexes assert S.Pi in S.Complexes assert -sqrt(2) in S.Complexes assert -I in S.Complexes assert sqrt(-1) in S.Complexes assert S.Complexes.intersect(S.Reals) == S.Reals assert S.Complexes.union(S.Reals) == S.Complexes assert S.Complexes == ComplexRegion(S.RealsS.Reals) assert (S.Complexes == ComplexRegion(Interval(1, 2)Interval(3, 4))) == False assert str(S.Complexes) == "S.Complexes" assert repr(S.Complexes) == "S.Complexes" def take(n, iterable): "Return first n items of the iterable as a list" return list(itertools.islice(iterable, n)) def test_intersections(): assert S.Integers.intersect(S.Reals) == S.Integers assert 5 in S.Integers.intersect(S.Reals) assert 5 in S.Integers.intersect(S.Reals) assert -5 not in S.Naturals.intersect(S.Reals) assert 5.5 not in S.Integers.intersect(S.Reals) assert 5 in S.Integers.intersect(Interval(3, oo)) assert -5 in S.Integers.intersect(Interval(-oo, 3)) assert all(x.is_Integer for x in take(10, S.Integers.intersect(Interval(3, oo)) )) def test_infinitely_indexed_set_1(): from sympy.abc import n, m, t assert imageset(Lambda(n, n), S.Integers) == imageset(Lambda(m, m), S.Integers) assert imageset(Lambda(n, 2n), S.Integers).intersect( imageset(Lambda(m, 2m + 1), S.Integers)) is S.EmptySet assert imageset(Lambda(n, 2n), S.Integers).intersect( imageset(Lambda(n, 2n + 1), S.Integers)) is S.EmptySet assert imageset(Lambda(m, 2m), S.Integers).intersect( imageset(Lambda(n, 3n), S.Integers)) == \ ImageSet(Lambda(t, 6t), S.Integers) assert imageset(x, x/2 + S(1)/3, S.Integers).intersect(S.Integers) is S.EmptySet assert imageset(x, x/2 + S.Half, S.Integers).intersect(S.Integers) is S.Integers def test_infinitely_indexed_set_2(): from sympy.abc import n a = Symbol('a', integer=True) assert imageset(Lambda(n, n), S.Integers) == \ imageset(Lambda(n, n + a), S.Integers) assert imageset(Lambda(n, n + pi), S.Integers) == \ imageset(Lambda(n, n + a + pi), S.Integers) assert imageset(Lambda(n, n), S.Integers) == \ imageset(Lambda(n, -n + a), S.Integers) assert imageset(Lambda(n, -6n), S.Integers) == \ ImageSet(Lambda(n, 6n), S.Integers) assert imageset(Lambda(n, 2n + pi), S.Integers) == \ ImageSet(Lambda(n, 2n + pi - 2), S.Integers) def test_imageset_intersect_real(): from sympy import I from sympy.abc import n assert imageset(Lambda(n, n + (n - 1)(n + 1)I), S.Integers).intersect(S.Reals) == \ FiniteSet(-1, 1) s = ImageSet( Lambda(n, -I(I(2pin - pi/4) + log(Abs(sqrt(-I))))), S.Integers) # s is unevaluated, but after intersection the result # should be canonical assert s.intersect(S.Reals) == imageset( Lambda(n, 2npi - pi/4), S.Integers) == ImageSet( Lambda(n, 2pin + 7pi/4), S.Integers) def test_imageset_intersect_interval(): from sympy.abc import n f1 = ImageSet(Lambda(n, npi), S.Integers) f2 = ImageSet(Lambda(n, 2n), Interval(0, pi)) f3 = ImageSet(Lambda(n, 2npi + pi/2), S.Integers) # complex expressions f4 = ImageSet(Lambda(n, nIpi), S.Integers) f5 = ImageSet(Lambda(n, 2Inpi + pi/2), S.Integers) # non-linear expressions f6 = ImageSet(Lambda(n, log(n)), S.Integers) f7 = ImageSet(Lambda(n, n*2), S.Integers) f8 = ImageSet(Lambda(n, Abs(n)), S.Integers) f9 = ImageSet(Lambda(n, exp(n)), S.Naturals0) assert f1.intersect(Interval(-1, 1)) == FiniteSet(0) assert f1.intersect(Interval(0, 2pi, False, True)) == FiniteSet(0, pi) assert f2.intersect(Interval(1, 2)) == Interval(1, 2) assert f3.intersect(Interval(-1, 1)) == S.EmptySet assert f3.intersect(Interval(-5, 5)) == FiniteSet(-3pi/2, pi/2) assert f4.intersect(Interval(-1, 1)) == FiniteSet(0) assert f4.intersect(Interval(1, 2)) == S.EmptySet assert f5.intersect(Interval(0, 1)) == S.EmptySet assert f6.intersect(Interval(0, 1)) == FiniteSet(S.Zero, log(2)) assert f7.intersect(Interval(0, 10)) == Intersection(f7, Interval(0, 10)) assert f8.intersect(Interval(0, 2)) == Intersection(f8, Interval(0, 2)) assert f9.intersect(Interval(1, 2)) == Intersection(f9, Interval(1, 2)) def test_infinitely_indexed_set_3(): from sympy.abc import n, m, t assert imageset(Lambda(m, 2pim), S.Integers).intersect( imageset(Lambda(n, 3pin), S.Integers)) == \ ImageSet(Lambda(t, 6pit), S.Integers) assert imageset(Lambda(n, 2n + 1), S.Integers) == \ imageset(Lambda(n, 2n - 1), S.Integers) assert imageset(Lambda(n, 3n + 2), S.Integers) == \ imageset(Lambda(n, 3n - 1), S.Integers) def test_ImageSet_simplification(): from sympy.abc import n, m assert imageset(Lambda(n, n), S.Integers) == S.Integers assert imageset(Lambda(n, sin(n)), imageset(Lambda(m, tan(m)), S.Integers)) == \ imageset(Lambda(m, sin(tan(m))), S.Integers) assert imageset(n, 1 + 2n, S.Naturals) == Range(3, oo, 2) assert imageset(n, 1 + 2n, S.Naturals0) == Range(1, oo, 2) assert imageset(n, 1 - 2n, S.Naturals) == Range(-1, -oo, -2) def test_ImageSet_contains(): from sympy.abc import x assert (2, S.Half) in imageset(x, (x, 1/x), S.Integers) assert imageset(x, x + I3, S.Integers).intersection(S.Reals) is S.EmptySet i = Dummy(integer=True) q = imageset(x, x + Iy, S.Integers).intersection(S.Reals) assert q.subs(y, Ii).intersection(S.Integers) is S.Integers q = imageset(x, x + Iy/x, S.Integers).intersection(S.Reals) assert q.subs(y, 0) is S.Integers assert q.subs(y, Iix).intersection(S.Integers) is S.Integers z = cos(1)2 + sin(1)2 - 1 q = imageset(x, x + Iz, S.Integers).intersection(S.Reals) assert q is not S.EmptySet def test_ComplexRegion_contains(): # contains in ComplexRegion a = Interval(2, 3) b = Interval(4, 6) c = Interval(7, 9) c1 = ComplexRegion(ab) c2 = ComplexRegion(Union(ab, ca)) assert 2.5 + 4.5I in c1 assert 2 + 4I in c1 assert 3 + 4I in c1 assert 8 + 2.5I in c2 assert 2.5 + 6.1I not in c1 assert 4.5 + 3.2I not in c1 r1 = Interval(0, 1) theta1 = Interval(0, 2S.Pi) c3 = ComplexRegion(r1theta1, polar=True) assert (0.5 + 6I/10) in c3 assert (S.Half + 6I/10) in c3 assert (S.Half + .6I) in c3 assert (0.5 + .6I) in c3 assert I in c3 assert 1 in c3 assert 0 in c3 assert 1 + I not in c3 assert 1 - I not in c3 raises(ValueError, lambda: ComplexRegion(r1theta1, polar=2)) def test_ComplexRegion_intersect(): # Polar form X_axis = ComplexRegion(Interval(0, oo)FiniteSet(0, S.Pi), polar=True) unit_disk = ComplexRegion(Interval(0, 1)Interval(0, 2S.Pi), polar=True) upper_half_unit_disk = ComplexRegion(Interval(0, 1)Interval(0, S.Pi), polar=True) upper_half_disk = ComplexRegion(Interval(0, oo)Interval(0, S.Pi), polar=True) lower_half_disk = ComplexRegion(Interval(0, oo)Interval(S.Pi, 2S.Pi), polar=True) right_half_disk = ComplexRegion(Interval(0, oo)Interval(-S.Pi/2, S.Pi/2), polar=True) first_quad_disk = ComplexRegion(Interval(0, oo)Interval(0, S.Pi/2), polar=True) assert upper_half_disk.intersect(unit_disk) == upper_half_unit_disk assert right_half_disk.intersect(first_quad_disk) == first_quad_disk assert upper_half_disk.intersect(right_half_disk) == first_quad_disk assert upper_half_disk.intersect(lower_half_disk) == X_axis c1 = ComplexRegion(Interval(0, 4)Interval(0, 2S.Pi), polar=True) assert c1.intersect(Interval(1, 5)) == Interval(1, 4) assert c1.intersect(Interval(4, 9)) == FiniteSet(4) assert c1.intersect(Interval(5, 12)) is S.EmptySet # Rectangular form X_axis = ComplexRegion(Interval(-oo, oo)FiniteSet(0)) unit_square = ComplexRegion(Interval(-1, 1)Interval(-1, 1)) upper_half_unit_square = ComplexRegion(Interval(-1, 1)Interval(0, 1)) upper_half_plane = ComplexRegion(Interval(-oo, oo)Interval(0, oo)) lower_half_plane = ComplexRegion(Interval(-oo, oo)Interval(-oo, 0)) right_half_plane = ComplexRegion(Interval(0, oo)Interval(-oo, oo)) first_quad_plane = ComplexRegion(Interval(0, oo)Interval(0, oo)) assert upper_half_plane.intersect(unit_square) == upper_half_unit_square assert right_half_plane.intersect(first_quad_plane) == first_quad_plane assert upper_half_plane.intersect(right_half_plane) == first_quad_plane assert upper_half_plane.intersect(lower_half_plane) == X_axis c1 = ComplexRegion(Interval(-5, 5)Interval(-10, 10)) assert c1.intersect(Interval(2, 7)) == Interval(2, 5) assert c1.intersect(Interval(5, 7)) == FiniteSet(5) assert c1.intersect(Interval(6, 9)) is S.EmptySet # unevaluated object C1 = ComplexRegion(Interval(0, 1)Interval(0, 2S.Pi), polar=True) C2 = ComplexRegion(Interval(-1, 1)Interval(-1, 1)) assert C1.intersect(C2) == Intersection(C1, C2, evaluate=False) def test_ComplexRegion_union(): # Polar form c1 = ComplexRegion(Interval(0, 1)Interval(0, 2S.Pi), polar=True) c2 = ComplexRegion(Interval(0, 1)Interval(0, S.Pi), polar=True) c3 = ComplexRegion(Interval(0, oo)Interval(0, S.Pi), polar=True) c4 = ComplexRegion(Interval(0, oo)Interval(S.Pi, 2S.Pi), polar=True) p1 = Union(Interval(0, 1)Interval(0, 2S.Pi), Interval(0, 1)Interval(0, S.Pi)) p2 = Union(Interval(0, oo)Interval(0, S.Pi), Interval(0, oo)Interval(S.Pi, 2S.Pi)) assert c1.union(c2) == ComplexRegion(p1, polar=True) assert c3.union(c4) == ComplexRegion(p2, polar=True) # Rectangular form c5 = ComplexRegion(Interval(2, 5)Interval(6, 9)) c6 = ComplexRegion(Interval(4, 6)Interval(10, 12)) c7 = ComplexRegion(Interval(0, 10)Interval(-10, 0)) c8 = ComplexRegion(Interval(12, 16)Interval(14, 20)) p3 = Union(Interval(2, 5)Interval(6, 9), Interval(4, 6)Interval(10, 12)) p4 = Union(Interval(0, 10)Interval(-10, 0), Interval(12, 16)Interval(14, 20)) assert c5.union(c6) == ComplexRegion(p3) assert c7.union(c8) == ComplexRegion(p4) assert c1.union(Interval(2, 4)) == Union(c1, Interval(2, 4), evaluate=False) assert c5.union(Interval(2, 4)) == Union(c5, ComplexRegion.from_real(Interval(2, 4))) def test_ComplexRegion_from_real(): c1 = ComplexRegion(Interval(0, 1) Interval(0, 2 * S.Pi), polar=True) raises(ValueError, lambda: c1.from_real(c1)) assert c1.from_real(Interval(-1, 1)) == ComplexRegion(Interval(-1, 1) * FiniteSet(0), False) def test_ComplexRegion_measure(): a, b = Interval(2, 5), Interval(4, 8) theta1, theta2 = Interval(0, 2S.Pi), Interval(0, S.Pi) c1 = ComplexRegion(ab) c2 = ComplexRegion(Union(atheta1, btheta2), polar=True) assert c1.measure == 12 assert c2.measure == 9pi def test_normalize_theta_set(): # Interval assert normalize_theta_set(Interval(pi, 2pi)) == \ Union(FiniteSet(0), Interval.Ropen(pi, 2pi)) assert normalize_theta_set(Interval(9pi/2, 5pi)) == Interval(pi/2, pi) assert normalize_theta_set(Interval(-3pi/2, pi/2)) == Interval.Ropen(0, 2pi) assert normalize_theta_set(Interval.open(-3pi/2, pi/2)) == \ Union(Interval.Ropen(0, pi/2), Interval.open(pi/2, 2pi)) assert normalize_theta_set(Interval.open(-7pi/2, -3pi/2)) == \ Union(Interval.Ropen(0, pi/2), Interval.open(pi/2, 2pi)) assert normalize_theta_set(Interval(-pi/2, pi/2)) == \ Union(Interval(0, pi/2), Interval.Ropen(3pi/2, 2pi)) assert normalize_theta_set(Interval.open(-pi/2, pi/2)) == \ Union(Interval.Ropen(0, pi/2), Interval.open(3pi/2, 2pi)) assert normalize_theta_set(Interval(-4pi, 3pi)) == Interval.Ropen(0, 2pi) assert normalize_theta_set(Interval(-3pi/2, -pi/2)) == Interval(pi/2, 3pi/2) assert normalize_theta_set(Interval.open(0, 2pi)) == Interval.open(0, 2pi) assert normalize_theta_set(Interval.Ropen(-pi/2, pi/2)) == \ Union(Interval.Ropen(0, pi/2), Interval.Ropen(3pi/2, 2pi)) assert normalize_theta_set(Interval.Lopen(-pi/2, pi/2)) == \ Union(Interval(0, pi/2), Interval.open(3pi/2, 2pi)) assert normalize_theta_set(Interval(-pi/2, pi/2)) == \ Union(Interval(0, pi/2), Interval.Ropen(3pi/2, 2pi)) assert normalize_theta_set(Interval.open(4pi, 9pi/2)) == Interval.open(0, pi/2) assert normalize_theta_set(Interval.Lopen(4pi, 9pi/2)) == Interval.Lopen(0, pi/2) assert normalize_theta_set(Interval.Ropen(4pi, 9pi/2)) == Interval.Ropen(0, pi/2) assert normalize_theta_set(Interval.open(3pi, 5pi)) == \ Union(Interval.Ropen(0, pi), Interval.open(pi, 2pi)) # FiniteSet assert normalize_theta_set(FiniteSet(0, pi, 3pi)) == FiniteSet(0, pi) assert normalize_theta_set(FiniteSet(0, pi/2, pi, 2pi)) == FiniteSet(0, pi/2, pi) assert normalize_theta_set(FiniteSet(0, -pi/2, -pi, -2pi)) == FiniteSet(0, pi, 3pi/2) assert normalize_theta_set(FiniteSet(-3pi/2, pi/2)) == \ FiniteSet(pi/2) assert normalize_theta_set(FiniteSet(2pi)) == FiniteSet(0) # Unions assert normalize_theta_set(Union(Interval(0, pi/3), Interval(pi/2, pi))) == \ Union(Interval(0, pi/3), Interval(pi/2, pi)) assert normalize_theta_set(Union(Interval(0, pi), Interval(2pi, 7pi/3))) == \ Interval(0, pi) # ValueError for non-real sets raises(ValueError, lambda: normalize_theta_set(S.Complexes)) # NotImplementedError for subset of reals raises(NotImplementedError, lambda: normalize_theta_set(Interval(0, 1))) # NotImplementedError without pi as coefficient raises(NotImplementedError, lambda: normalize_theta_set(Interval(1, 2pi))) raises(NotImplementedError, lambda: normalize_theta_set(Interval(2pi, 10))) raises(NotImplementedError, lambda: normalize_theta_set(FiniteSet(0, 3, 3pi))) def test_ComplexRegion_FiniteSet(): x, y, z, a, b, c = symbols('x y z a b c') # Issue #9669 assert ComplexRegion(FiniteSet(a, b, c)FiniteSet(x, y, z)) == \ FiniteSet(a + Ix, a + Iy, a + Iz, b + Ix, b + Iy, b + Iz, c + Ix, c + Iy, c + Iz) assert ComplexRegion(FiniteSet(2)FiniteSet(3)) == FiniteSet(2 + 3I) def test_union_RealSubSet(): assert (S.Complexes).union(Interval(1, 2)) == S.Complexes assert (S.Complexes).union(S.Integers) == S.Complexes def test_issue_9980(): c1 = ComplexRegion(Interval(1, 2)Interval(2, 3)) c2 = ComplexRegion(Interval(1, 5)Interval(1, 3)) R = Union(c1, c2) assert simplify(R) == ComplexRegion(Union(Interval(1, 2)Interval(2, 3), \ Interval(1, 5)Interval(1, 3)), False) assert c1.func(c1.args) == c1 assert R.func(R.args) == R def test_issue_11732(): interval12 = Interval(1, 2) finiteset1234 = FiniteSet(1, 2, 3, 4) pointComplex = Tuple(1, 5) assert (interval12 in S.Naturals) == False assert (interval12 in S.Naturals0) == False assert (interval12 in S.Integers) == False assert (interval12 in S.Complexes) == False assert (finiteset1234 in S.Naturals) == False assert (finiteset1234 in S.Naturals0) == False assert (finiteset1234 in S.Integers) == False assert (finiteset1234 in S.Complexes) == False assert (pointComplex in S.Naturals) == False assert (pointComplex in S.Naturals0) == False assert (pointComplex in S.Integers) == False assert (pointComplex in S.Complexes) == True def test_issue_11730(): unit = Interval(0, 1) square = ComplexRegion(unit * 2) assert Union(S.Complexes, FiniteSet(oo)) != S.Complexes assert Union(S.Complexes, FiniteSet(eye(4))) != S.Complexes assert Union(unit, square) == square assert Intersection(S.Reals, square) == unit def test_issue_11938(): unit = Interval(0, 1) ival = Interval(1, 2) cr1 = ComplexRegion(ival * unit) assert Intersection(cr1, S.Reals) == ival assert Intersection(cr1, unit) == FiniteSet(1) arg1 = Interval(0, S.Pi) arg2 = FiniteSet(S.Pi) arg3 = Interval(S.Pi / 4, 3 * S.Pi / 4) cp1 = ComplexRegion(unit * arg1, polar=True) cp2 = ComplexRegion(unit * arg2, polar=True) cp3 = ComplexRegion(unit * arg3, polar=True) assert Intersection(cp1, S.Reals) == Interval(-1, 1) assert Intersection(cp2, S.Reals) == Interval(-1, 0) assert Intersection(cp3, S.Reals) == FiniteSet(0) def test_issue_11914(): a, b = Interval(0, 1), Interval(0, pi) c, d = Interval(2, 3), Interval(pi, 3 * pi / 2) cp1 = ComplexRegion(a * b, polar=True) cp2 = ComplexRegion(c * d, polar=True) assert -3 in cp1.union(cp2) assert -3 in cp2.union(cp1) assert -5 not in cp1.union(cp2) def test_issue_9543(): assert ImageSet(Lambda(x, x*2), S.Naturals).is_subset(S.Reals) def test_issue_16871(): assert ImageSet(Lambda(x, x), FiniteSet(1)) == {1} assert ImageSet(Lambda(x, x - 3), S.Integers ).intersection(S.Integers) is S.Integers @XFAIL def test_issue_16871b(): assert ImageSet(Lambda(x, x - 3), S.Integers).is_subset(S.Integers) def test_no_mod_on_imaginary(): assert imageset(Lambda(x, 2x + 3I), S.Integers ) == ImageSet(Lambda(x, 2x + I), S.Integers) def test_Rationals(): assert S.Integers.is_subset(S.Rationals) assert S.Naturals.is_subset(S.Rationals) assert S.Naturals0.is_subset(S.Rationals) assert S.Rationals.is_subset(S.Reals) assert S.Rationals.inf == -oo assert S.Rationals.sup == oo it = iter(S.Rationals) assert [next(it) for i in range(12)] == [ 0, 1, -1, S(1)/2, 2, -S(1)/2, -2, S(1)/3, 3, -S(1)/3, -3, S(2)/3] assert Basic() not in S.Rationals assert S.Half in S.Rationals assert 1.0 not in S.Rationals assert 2 in S.Rationals r = symbols('r', rational=True) assert r in S.Rationals raises(TypeError, lambda: x in S.Rationals) assert S.Rationals.boundary == S.Rationals def test_imageset_intersection(): n = Dummy() s = ImageSet(Lambda(n, -I(I(2pin - pi/4) + log(Abs(sqrt(-I))))), S.Integers) assert s.intersect(S.Reals) == ImageSet( Lambda(n, 2pin + 7*pi/4), S.Integers)
2898ca6fca9cb0173636ff60887c10335c1920d0410ccf775ffc4e962f270f00	from sympy import (Symbol, Set, Union, Interval, oo, S, sympify, nan, GreaterThan, LessThan, Max, Min, And, Or, Eq, Ge, Le, Gt, Lt, Float, FiniteSet, Intersection, imageset, I, true, false, ProductSet, E, sqrt, Complement, EmptySet, sin, cos, Lambda, ImageSet, pi, Eq, Pow, Contains, Sum, rootof, SymmetricDifference, Piecewise, Matrix, signsimp, Range, Add, symbols, zoo) from mpmath import mpi from sympy.core.compatibility import range from sympy.utilities.pytest import raises, XFAIL from sympy.abc import x, y, z, m, n def test_imageset(): ints = S.Integers assert imageset(x, x - 1, S.Naturals) is S.Naturals0 assert imageset(x, x + 1, S.Naturals0) is S.Naturals assert imageset(x, abs(x), S.Naturals0) is S.Naturals0 assert imageset(x, abs(x), S.Naturals) is S.Naturals assert imageset(x, abs(x), S.Integers) is S.Naturals0 # issue 16878a r = symbols('r', real=True) assert (1, r) in imageset(x, (x, x), S.Reals) != False assert (r, r) in imageset(x, (x, x), S.Reals) assert 1 + I in imageset(x, x + I, S.Reals) assert {1} not in imageset(x, (x,), S.Reals) assert (1, 1) not in imageset(x, (x,) , S.Reals) raises(TypeError, lambda: imageset(x, ints)) raises(ValueError, lambda: imageset(x, y, z, ints)) raises(ValueError, lambda: imageset(Lambda(x, cos(x)), y)) raises(ValueError, lambda: imageset(Lambda(x, x), ints, ints)) assert imageset(cos, ints) == ImageSet(Lambda(x, cos(x)), ints) def f(x): return cos(x) assert imageset(f, ints) == imageset(x, cos(x), ints) f = lambda x: cos(x) assert imageset(f, ints) == ImageSet(Lambda(x, cos(x)), ints) assert imageset(x, 1, ints) == FiniteSet(1) assert imageset(x, y, ints) == {y} assert imageset((x, y), (1, z), intsS.Reals) == {(1, z)} clash = Symbol('x', integer=true) assert (str(imageset(lambda x: x + clash, Interval(-2, 1)).lamda.expr) in ('_x + x', 'x + _x')) x1, x2 = symbols("x1, x2") assert imageset(lambda x,y: Add(x,y), Interval(1,2), Interval(2, 3)) == \ ImageSet(Lambda((x1, x2), x1+x2), Interval(1,2), Interval(2,3)) def test_interval_arguments(): assert Interval(0, oo) == Interval(0, oo, False, True) assert Interval(0, oo).right_open is true assert Interval(-oo, 0) == Interval(-oo, 0, True, False) assert Interval(-oo, 0).left_open is true assert Interval(oo, -oo) == S.EmptySet assert Interval(oo, oo) == S.EmptySet assert Interval(-oo, -oo) == S.EmptySet assert isinstance(Interval(1, 1), FiniteSet) e = Sum(x, (x, 1, 3)) assert isinstance(Interval(e, e), FiniteSet) assert Interval(1, 0) == S.EmptySet assert Interval(1, 1).measure == 0 assert Interval(1, 1, False, True) == S.EmptySet assert Interval(1, 1, True, False) == S.EmptySet assert Interval(1, 1, True, True) == S.EmptySet assert isinstance(Interval(0, Symbol('a')), Interval) assert Interval(Symbol('a', real=True, positive=True), 0) == S.EmptySet raises(ValueError, lambda: Interval(0, S.ImaginaryUnit)) raises(ValueError, lambda: Interval(0, Symbol('z', extended_real=False))) raises(NotImplementedError, lambda: Interval(0, 1, And(x, y))) raises(NotImplementedError, lambda: Interval(0, 1, False, And(x, y))) raises(NotImplementedError, lambda: Interval(0, 1, z, And(x, y))) def test_interval_symbolic_end_points(): a = Symbol('a', real=True) assert Union(Interval(0, a), Interval(0, 3)).sup == Max(a, 3) assert Union(Interval(a, 0), Interval(-3, 0)).inf == Min(-3, a) assert Interval(0, a).contains(1) == LessThan(1, a) def test_union(): assert Union(Interval(1, 2), Interval(2, 3)) == Interval(1, 3) assert Union(Interval(1, 2), Interval(2, 3, True)) == Interval(1, 3) assert Union(Interval(1, 3), Interval(2, 4)) == Interval(1, 4) assert Union(Interval(1, 2), Interval(1, 3)) == Interval(1, 3) assert Union(Interval(1, 3), Interval(1, 2)) == Interval(1, 3) assert Union(Interval(1, 3, False, True), Interval(1, 2)) == \ Interval(1, 3, False, True) assert Union(Interval(1, 3), Interval(1, 2, False, True)) == Interval(1, 3) assert Union(Interval(1, 2, True), Interval(1, 3)) == Interval(1, 3) assert Union(Interval(1, 2, True), Interval(1, 3, True)) == \ Interval(1, 3, True) assert Union(Interval(1, 2, True), Interval(1, 3, True, True)) == \ Interval(1, 3, True, True) assert Union(Interval(1, 2, True, True), Interval(1, 3, True)) == \ Interval(1, 3, True) assert Union(Interval(1, 3), Interval(2, 3)) == Interval(1, 3) assert Union(Interval(1, 3, False, True), Interval(2, 3)) == \ Interval(1, 3) assert Union(Interval(1, 2, False, True), Interval(2, 3, True)) != \ Interval(1, 3) assert Union(Interval(1, 2), S.EmptySet) == Interval(1, 2) assert Union(S.EmptySet) == S.EmptySet assert Union(Interval(0, 1), [FiniteSet(1.0/n) for n in range(1, 10)]) == \ Interval(0, 1) assert Interval(1, 2).union(Interval(2, 3)) == \ Interval(1, 2) + Interval(2, 3) assert Interval(1, 2).union(Interval(2, 3)) == Interval(1, 3) assert Union(Set()) == Set() assert FiniteSet(1) + FiniteSet(2) + FiniteSet(3) == FiniteSet(1, 2, 3) assert FiniteSet('ham') + FiniteSet('eggs') == FiniteSet('ham', 'eggs') assert FiniteSet(1, 2, 3) + S.EmptySet == FiniteSet(1, 2, 3) assert FiniteSet(1, 2, 3) & FiniteSet(2, 3, 4) == FiniteSet(2, 3) assert FiniteSet(1, 2, 3) \| FiniteSet(2, 3, 4) == FiniteSet(1, 2, 3, 4) x = Symbol("x") y = Symbol("y") z = Symbol("z") assert S.EmptySet \| FiniteSet(x, FiniteSet(y, z)) == \ FiniteSet(x, FiniteSet(y, z)) # Test that Intervals and FiniteSets play nicely assert Interval(1, 3) + FiniteSet(2) == Interval(1, 3) assert Interval(1, 3, True, True) + FiniteSet(3) == \ Interval(1, 3, True, False) X = Interval(1, 3) + FiniteSet(5) Y = Interval(1, 2) + FiniteSet(3) XandY = X.intersect(Y) assert 2 in X and 3 in X and 3 in XandY assert XandY.is_subset(X) and XandY.is_subset(Y) raises(TypeError, lambda: Union(1, 2, 3)) assert X.is_iterable is False # issue 7843 assert Union(S.EmptySet, FiniteSet(-sqrt(-I), sqrt(-I))) == \ FiniteSet(-sqrt(-I), sqrt(-I)) assert Union(S.Reals, S.Integers) == S.Reals def test_union_iter(): # Use Range because it is ordered u = Union(Range(3), Range(5), Range(4), evaluate=False) # Round robin assert list(u) == [0, 0, 0, 1, 1, 1, 2, 2, 2, 3, 3, 4] def test_difference(): assert Interval(1, 3) - Interval(1, 2) == Interval(2, 3, True) assert Interval(1, 3) - Interval(2, 3) == Interval(1, 2, False, True) assert Interval(1, 3, True) - Interval(2, 3) == Interval(1, 2, True, True) assert Interval(1, 3, True) - Interval(2, 3, True) == \ Interval(1, 2, True, False) assert Interval(0, 2) - FiniteSet(1) == \ Union(Interval(0, 1, False, True), Interval(1, 2, True, False)) assert FiniteSet(1, 2, 3) - FiniteSet(2) == FiniteSet(1, 3) assert FiniteSet('ham', 'eggs') - FiniteSet('eggs') == FiniteSet('ham') assert FiniteSet(1, 2, 3, 4) - Interval(2, 10, True, False) == \ FiniteSet(1, 2) assert FiniteSet(1, 2, 3, 4) - S.EmptySet == FiniteSet(1, 2, 3, 4) assert Union(Interval(0, 2), FiniteSet(2, 3, 4)) - Interval(1, 3) == \ Union(Interval(0, 1, False, True), FiniteSet(4)) assert -1 in S.Reals - S.Naturals def test_Complement(): assert Complement(Interval(1, 3), Interval(1, 2)) == Interval(2, 3, True) assert Complement(FiniteSet(1, 3, 4), FiniteSet(3, 4)) == FiniteSet(1) assert Complement(Union(Interval(0, 2), FiniteSet(2, 3, 4)), Interval(1, 3)) == \ Union(Interval(0, 1, False, True), FiniteSet(4)) assert not 3 in Complement(Interval(0, 5), Interval(1, 4), evaluate=False) assert -1 in Complement(S.Reals, S.Naturals, evaluate=False) assert not 1 in Complement(S.Reals, S.Naturals, evaluate=False) assert Complement(S.Integers, S.UniversalSet) == EmptySet() assert S.UniversalSet.complement(S.Integers) == EmptySet() assert (not 0 in S.Reals.intersect(S.Integers - FiniteSet(0))) assert S.EmptySet - S.Integers == S.EmptySet assert (S.Integers - FiniteSet(0)) - FiniteSet(1) == S.Integers - FiniteSet(0, 1) assert S.Reals - Union(S.Naturals, FiniteSet(pi)) == \ Intersection(S.Reals - S.Naturals, S.Reals - FiniteSet(pi)) # issue 12712 assert Complement(FiniteSet(x, y, 2), Interval(-10, 10)) == \ Complement(FiniteSet(x, y), Interval(-10, 10)) def test_complement(): assert Interval(0, 1).complement(S.Reals) == \ Union(Interval(-oo, 0, True, True), Interval(1, oo, True, True)) assert Interval(0, 1, True, False).complement(S.Reals) == \ Union(Interval(-oo, 0, True, False), Interval(1, oo, True, True)) assert Interval(0, 1, False, True).complement(S.Reals) == \ Union(Interval(-oo, 0, True, True), Interval(1, oo, False, True)) assert Interval(0, 1, True, True).complement(S.Reals) == \ Union(Interval(-oo, 0, True, False), Interval(1, oo, False, True)) assert S.UniversalSet.complement(S.EmptySet) == S.EmptySet assert S.UniversalSet.complement(S.Reals) == S.EmptySet assert S.UniversalSet.complement(S.UniversalSet) == S.EmptySet assert S.EmptySet.complement(S.Reals) == S.Reals assert Union(Interval(0, 1), Interval(2, 3)).complement(S.Reals) == \ Union(Interval(-oo, 0, True, True), Interval(1, 2, True, True), Interval(3, oo, True, True)) assert FiniteSet(0).complement(S.Reals) == \ Union(Interval(-oo, 0, True, True), Interval(0, oo, True, True)) assert (FiniteSet(5) + Interval(S.NegativeInfinity, 0)).complement(S.Reals) == \ Interval(0, 5, True, True) + Interval(5, S.Infinity, True, True) assert FiniteSet(1, 2, 3).complement(S.Reals) == \ Interval(S.NegativeInfinity, 1, True, True) + \ Interval(1, 2, True, True) + Interval(2, 3, True, True) +\ Interval(3, S.Infinity, True, True) assert FiniteSet(x).complement(S.Reals) == Complement(S.Reals, FiniteSet(x)) assert FiniteSet(0, x).complement(S.Reals) == Complement(Interval(-oo, 0, True, True) + Interval(0, oo, True, True) ,FiniteSet(x), evaluate=False) square = Interval(0, 1) * Interval(0, 1) notsquare = square.complement(S.RealsS.Reals) assert all(pt in square for pt in [(0, 0), (.5, .5), (1, 0), (1, 1)]) assert not any( pt in notsquare for pt in [(0, 0), (.5, .5), (1, 0), (1, 1)]) assert not any(pt in square for pt in [(-1, 0), (1.5, .5), (10, 10)]) assert all(pt in notsquare for pt in [(-1, 0), (1.5, .5), (10, 10)]) def test_intersect1(): assert all(S.Integers.intersection(i) is i for i in (S.Naturals, S.Naturals0)) assert all(i.intersection(S.Integers) is i for i in (S.Naturals, S.Naturals0)) s = S.Naturals0 assert S.Naturals.intersection(s) is S.Naturals assert s.intersection(S.Naturals) is S.Naturals x = Symbol('x') assert Interval(0, 2).intersect(Interval(1, 2)) == Interval(1, 2) assert Interval(0, 2).intersect(Interval(1, 2, True)) == \ Interval(1, 2, True) assert Interval(0, 2, True).intersect(Interval(1, 2)) == \ Interval(1, 2, False, False) assert Interval(0, 2, True, True).intersect(Interval(1, 2)) == \ Interval(1, 2, False, True) assert Interval(0, 2).intersect(Union(Interval(0, 1), Interval(2, 3))) == \ Union(Interval(0, 1), Interval(2, 2)) assert FiniteSet(1, 2).intersect(FiniteSet(1, 2, 3)) == FiniteSet(1, 2) assert FiniteSet(1, 2, x).intersect(FiniteSet(x)) == FiniteSet(x) assert FiniteSet('ham', 'eggs').intersect(FiniteSet('ham')) == \ FiniteSet('ham') assert FiniteSet(1, 2, 3, 4, 5).intersect(S.EmptySet) == S.EmptySet assert Interval(0, 5).intersect(FiniteSet(1, 3)) == FiniteSet(1, 3) assert Interval(0, 1, True, True).intersect(FiniteSet(1)) == S.EmptySet assert Union(Interval(0, 1), Interval(2, 3)).intersect(Interval(1, 2)) == \ Union(Interval(1, 1), Interval(2, 2)) assert Union(Interval(0, 1), Interval(2, 3)).intersect(Interval(0, 2)) == \ Union(Interval(0, 1), Interval(2, 2)) assert Union(Interval(0, 1), Interval(2, 3)).intersect(Interval(1, 2, True, True)) == \ S.EmptySet assert Union(Interval(0, 1), Interval(2, 3)).intersect(S.EmptySet) == \ S.EmptySet assert Union(Interval(0, 5), FiniteSet('ham')).intersect(FiniteSet(2, 3, 4, 5, 6)) == \ Union(FiniteSet(2, 3, 4, 5), Intersection(FiniteSet(6), Union(Interval(0, 5), FiniteSet('ham')))) # issue 8217 assert Intersection(FiniteSet(x), FiniteSet(y)) == \ Intersection(FiniteSet(x), FiniteSet(y), evaluate=False) assert FiniteSet(x).intersect(S.Reals) == \ Intersection(S.Reals, FiniteSet(x), evaluate=False) # tests for the intersection alias assert Interval(0, 5).intersection(FiniteSet(1, 3)) == FiniteSet(1, 3) assert Interval(0, 1, True, True).intersection(FiniteSet(1)) == S.EmptySet assert Union(Interval(0, 1), Interval(2, 3)).intersection(Interval(1, 2)) == \ Union(Interval(1, 1), Interval(2, 2)) def test_intersection(): # iterable i = Intersection(FiniteSet(1, 2, 3), Interval(2, 5), evaluate=False) assert i.is_iterable assert set(i) == {S(2), S(3)} # challenging intervals x = Symbol('x', real=True) i = Intersection(Interval(0, 3), Interval(x, 6)) assert (5 in i) is False raises(TypeError, lambda: 2 in i) # Singleton special cases assert Intersection(Interval(0, 1), S.EmptySet) == S.EmptySet assert Intersection(Interval(-oo, oo), Interval(-oo, x)) == Interval(-oo, x) # Products line = Interval(0, 5) i = Intersection(line2, line3, evaluate=False) assert (2, 2) not in i assert (2, 2, 2) not in i raises(ValueError, lambda: list(i)) a = Intersection(Intersection(S.Integers, S.Naturals, evaluate=False), S.Reals, evaluate=False) assert a._argset == frozenset([Intersection(S.Naturals, S.Integers, evaluate=False), S.Reals]) assert Intersection(S.Complexes, FiniteSet(S.ComplexInfinity)) == S.EmptySet # issue 12178 assert Intersection() == S.UniversalSet # issue 16987 assert Intersection({1}, {1}, {x}) == Intersection({1}, {x}) def test_issue_9623(): n = Symbol('n') a = S.Reals b = Interval(0, oo) c = FiniteSet(n) assert Intersection(a, b, c) == Intersection(b, c) assert Intersection(Interval(1, 2), Interval(3, 4), FiniteSet(n)) == EmptySet() def test_is_disjoint(): assert Interval(0, 2).is_disjoint(Interval(1, 2)) == False assert Interval(0, 2).is_disjoint(Interval(3, 4)) == True def test_ProductSet_of_single_arg_is_arg(): assert ProductSet(Interval(0, 1)) == Interval(0, 1) def test_interval_subs(): a = Symbol('a', real=True) assert Interval(0, a).subs(a, 2) == Interval(0, 2) assert Interval(a, 0).subs(a, 2) == S.EmptySet def test_interval_to_mpi(): assert Interval(0, 1).to_mpi() == mpi(0, 1) assert Interval(0, 1, True, False).to_mpi() == mpi(0, 1) assert type(Interval(0, 1).to_mpi()) == type(mpi(0, 1)) def test_measure(): a = Symbol('a', real=True) assert Interval(1, 3).measure == 2 assert Interval(0, a).measure == a assert Interval(1, a).measure == a - 1 assert Union(Interval(1, 2), Interval(3, 4)).measure == 2 assert Union(Interval(1, 2), Interval(3, 4), FiniteSet(5, 6, 7)).measure \ == 2 assert FiniteSet(1, 2, oo, a, -oo, -5).measure == 0 assert S.EmptySet.measure == 0 square = Interval(0, 10) Interval(0, 10) offsetsquare = Interval(5, 15) * Interval(5, 15) band = Interval(-oo, oo) * Interval(2, 4) assert square.measure == offsetsquare.measure == 100 assert (square + offsetsquare).measure == 175 # there is some overlap assert (square - offsetsquare).measure == 75 assert (square * FiniteSet(1, 2, 3)).measure == 0 assert (square.intersect(band)).measure == 20 assert (square + band).measure == oo assert (band * FiniteSet(1, 2, 3)).measure == nan def test_is_subset(): assert Interval(0, 1).is_subset(Interval(0, 2)) is True assert Interval(0, 3).is_subset(Interval(0, 2)) is False assert FiniteSet(1, 2).is_subset(FiniteSet(1, 2, 3, 4)) assert FiniteSet(4, 5).is_subset(FiniteSet(1, 2, 3, 4)) is False assert FiniteSet(1).is_subset(Interval(0, 2)) assert FiniteSet(1, 2).is_subset(Interval(0, 2, True, True)) is False assert (Interval(1, 2) + FiniteSet(3)).is_subset( (Interval(0, 2, False, True) + FiniteSet(2, 3))) assert Interval(3, 4).is_subset(Union(Interval(0, 1), Interval(2, 5))) is True assert Interval(3, 6).is_subset(Union(Interval(0, 1), Interval(2, 5))) is False assert FiniteSet(1, 2, 3, 4).is_subset(Interval(0, 5)) is True assert S.EmptySet.is_subset(FiniteSet(1, 2, 3)) is True assert Interval(0, 1).is_subset(S.EmptySet) is False assert S.EmptySet.is_subset(S.EmptySet) is True raises(ValueError, lambda: S.EmptySet.is_subset(1)) # tests for the issubset alias assert FiniteSet(1, 2, 3, 4).issubset(Interval(0, 5)) is True assert S.EmptySet.issubset(FiniteSet(1, 2, 3)) is True assert S.Naturals.is_subset(S.Integers) assert S.Naturals0.is_subset(S.Integers) def test_is_proper_subset(): assert Interval(0, 1).is_proper_subset(Interval(0, 2)) is True assert Interval(0, 3).is_proper_subset(Interval(0, 2)) is False assert S.EmptySet.is_proper_subset(FiniteSet(1, 2, 3)) is True raises(ValueError, lambda: Interval(0, 1).is_proper_subset(0)) def test_is_superset(): assert Interval(0, 1).is_superset(Interval(0, 2)) == False assert Interval(0, 3).is_superset(Interval(0, 2)) assert FiniteSet(1, 2).is_superset(FiniteSet(1, 2, 3, 4)) == False assert FiniteSet(4, 5).is_superset(FiniteSet(1, 2, 3, 4)) == False assert FiniteSet(1).is_superset(Interval(0, 2)) == False assert FiniteSet(1, 2).is_superset(Interval(0, 2, True, True)) == False assert (Interval(1, 2) + FiniteSet(3)).is_superset( (Interval(0, 2, False, True) + FiniteSet(2, 3))) == False assert Interval(3, 4).is_superset(Union(Interval(0, 1), Interval(2, 5))) == False assert FiniteSet(1, 2, 3, 4).is_superset(Interval(0, 5)) == False assert S.EmptySet.is_superset(FiniteSet(1, 2, 3)) == False assert Interval(0, 1).is_superset(S.EmptySet) == True assert S.EmptySet.is_superset(S.EmptySet) == True raises(ValueError, lambda: S.EmptySet.is_superset(1)) # tests for the issuperset alias assert Interval(0, 1).issuperset(S.EmptySet) == True assert S.EmptySet.issuperset(S.EmptySet) == True def test_is_proper_superset(): assert Interval(0, 1).is_proper_superset(Interval(0, 2)) is False assert Interval(0, 3).is_proper_superset(Interval(0, 2)) is True assert FiniteSet(1, 2, 3).is_proper_superset(S.EmptySet) is True raises(ValueError, lambda: Interval(0, 1).is_proper_superset(0)) def test_contains(): assert Interval(0, 2).contains(1) is S.true assert Interval(0, 2).contains(3) is S.false assert Interval(0, 2, True, False).contains(0) is S.false assert Interval(0, 2, True, False).contains(2) is S.true assert Interval(0, 2, False, True).contains(0) is S.true assert Interval(0, 2, False, True).contains(2) is S.false assert Interval(0, 2, True, True).contains(0) is S.false assert Interval(0, 2, True, True).contains(2) is S.false assert (Interval(0, 2) in Interval(0, 2)) is False assert FiniteSet(1, 2, 3).contains(2) is S.true assert FiniteSet(1, 2, Symbol('x')).contains(Symbol('x')) is S.true # issue 8197 from sympy.abc import a, b assert isinstance(FiniteSet(b).contains(-a), Contains) assert isinstance(FiniteSet(b).contains(a), Contains) assert isinstance(FiniteSet(a).contains(1), Contains) raises(TypeError, lambda: 1 in FiniteSet(a)) # issue 8209 rad1 = Pow(Pow(2, S(1)/3) - 1, S(1)/3) rad2 = Pow(S(1)/9, S(1)/3) - Pow(S(2)/9, S(1)/3) + Pow(S(4)/9, S(1)/3) s1 = FiniteSet(rad1) s2 = FiniteSet(rad2) assert s1 - s2 == S.EmptySet items = [1, 2, S.Infinity, S('ham'), -1.1] fset = FiniteSet(items) assert all(item in fset for item in items) assert all(fset.contains(item) is S.true for item in items) assert Union(Interval(0, 1), Interval(2, 5)).contains(3) is S.true assert Union(Interval(0, 1), Interval(2, 5)).contains(6) is S.false assert Union(Interval(0, 1), FiniteSet(2, 5)).contains(3) is S.false assert S.EmptySet.contains(1) is S.false assert FiniteSet(rootof(x3 + x - 1, 0)).contains(S.Infinity) is S.false assert rootof(x5 + x3 + 1, 0) in S.Reals assert not rootof(x5 + x3 + 1, 1) in S.Reals # non-bool results assert Union(Interval(1, 2), Interval(3, 4)).contains(x) == \ Or(And(S(1) <= x, x <= 2), And(S(3) <= x, x <= 4)) assert Intersection(Interval(1, x), Interval(2, 3)).contains(y) == \ And(y <= 3, y <= x, S(1) <= y, S(2) <= y) assert (S.Complexes).contains(S.ComplexInfinity) == S.false def test_interval_symbolic(): x = Symbol('x') e = Interval(0, 1) assert e.contains(x) == And(S(0) <= x, x <= 1) raises(TypeError, lambda: x in e) e = Interval(0, 1, True, True) assert e.contains(x) == And(S(0) < x, x < 1) def test_union_contains(): x = Symbol('x') i1 = Interval(0, 1) i2 = Interval(2, 3) i3 = Union(i1, i2) assert i3.as_relational(x) == Or(And(S(0) <= x, x <= 1), And(S(2) <= x, x <= 3)) raises(TypeError, lambda: x in i3) e = i3.contains(x) assert e == i3.as_relational(x) assert e.subs(x, -0.5) is false assert e.subs(x, 0.5) is true assert e.subs(x, 1.5) is false assert e.subs(x, 2.5) is true assert e.subs(x, 3.5) is false U = Interval(0, 2, True, True) + Interval(10, oo) + FiniteSet(-1, 2, 5, 6) assert all(el not in U for el in [0, 4, -oo]) assert all(el in U for el in [2, 5, 10]) def test_is_number(): assert Interval(0, 1).is_number is False assert Set().is_number is False def test_Interval_is_left_unbounded(): assert Interval(3, 4).is_left_unbounded is False assert Interval(-oo, 3).is_left_unbounded is True assert Interval(Float("-inf"), 3).is_left_unbounded is True def test_Interval_is_right_unbounded(): assert Interval(3, 4).is_right_unbounded is False assert Interval(3, oo).is_right_unbounded is True assert Interval(3, Float("+inf")).is_right_unbounded is True def test_Interval_as_relational(): x = Symbol('x') assert Interval(-1, 2, False, False).as_relational(x) == \ And(Le(-1, x), Le(x, 2)) assert Interval(-1, 2, True, False).as_relational(x) == \ And(Lt(-1, x), Le(x, 2)) assert Interval(-1, 2, False, True).as_relational(x) == \ And(Le(-1, x), Lt(x, 2)) assert Interval(-1, 2, True, True).as_relational(x) == \ And(Lt(-1, x), Lt(x, 2)) assert Interval(-oo, 2, right_open=False).as_relational(x) == And(Lt(-oo, x), Le(x, 2)) assert Interval(-oo, 2, right_open=True).as_relational(x) == And(Lt(-oo, x), Lt(x, 2)) assert Interval(-2, oo, left_open=False).as_relational(x) == And(Le(-2, x), Lt(x, oo)) assert Interval(-2, oo, left_open=True).as_relational(x) == And(Lt(-2, x), Lt(x, oo)) assert Interval(-oo, oo).as_relational(x) == And(Lt(-oo, x), Lt(x, oo)) x = Symbol('x', real=True) y = Symbol('y', real=True) assert Interval(x, y).as_relational(x) == (x <= y) assert Interval(y, x).as_relational(x) == (y <= x) def test_Finite_as_relational(): x = Symbol('x') y = Symbol('y') assert FiniteSet(1, 2).as_relational(x) == Or(Eq(x, 1), Eq(x, 2)) assert FiniteSet(y, -5).as_relational(x) == Or(Eq(x, y), Eq(x, -5)) def test_Union_as_relational(): x = Symbol('x') assert (Interval(0, 1) + FiniteSet(2)).as_relational(x) == \ Or(And(Le(0, x), Le(x, 1)), Eq(x, 2)) assert (Interval(0, 1, True, True) + FiniteSet(1)).as_relational(x) == \ And(Lt(0, x), Le(x, 1)) def test_Intersection_as_relational(): x = Symbol('x') assert (Intersection(Interval(0, 1), FiniteSet(2), evaluate=False).as_relational(x) == And(And(Le(0, x), Le(x, 1)), Eq(x, 2))) def test_EmptySet(): assert S.EmptySet.as_relational(Symbol('x')) is S.false assert S.EmptySet.intersect(S.UniversalSet) == S.EmptySet assert S.EmptySet.boundary == S.EmptySet def test_finite_basic(): x = Symbol('x') A = FiniteSet(1, 2, 3) B = FiniteSet(3, 4, 5) AorB = Union(A, B) AandB = A.intersect(B) assert A.is_subset(AorB) and B.is_subset(AorB) assert AandB.is_subset(A) assert AandB == FiniteSet(3) assert A.inf == 1 and A.sup == 3 assert AorB.inf == 1 and AorB.sup == 5 assert FiniteSet(x, 1, 5).sup == Max(x, 5) assert FiniteSet(x, 1, 5).inf == Min(x, 1) # issue 7335 assert FiniteSet(S.EmptySet) != S.EmptySet assert FiniteSet(FiniteSet(1, 2, 3)) != FiniteSet(1, 2, 3) assert FiniteSet((1, 2, 3)) != FiniteSet(1, 2, 3) # Ensure a variety of types can exist in a FiniteSet s = FiniteSet((1, 2), Float, A, -5, x, 'eggs', x2, Interval) assert (A > B) is False assert (A >= B) is False assert (A < B) is False assert (A <= B) is False assert AorB > A and AorB > B assert AorB >= A and AorB >= B assert A >= A and A <= A assert A >= AandB and B >= AandB assert A > AandB and B > AandB assert FiniteSet(1.0) == FiniteSet(1) def test_powerset(): # EmptySet A = FiniteSet() pset = A.powerset() assert len(pset) == 1 assert pset == FiniteSet(S.EmptySet) # FiniteSets A = FiniteSet(1, 2) pset = A.powerset() assert len(pset) == 2len(A) assert pset == FiniteSet(FiniteSet(), FiniteSet(1), FiniteSet(2), A) # Not finite sets I = Interval(0, 1) raises(NotImplementedError, I.powerset) def test_product_basic(): H, T = 'H', 'T' unit_line = Interval(0, 1) d6 = FiniteSet(1, 2, 3, 4, 5, 6) d4 = FiniteSet(1, 2, 3, 4) coin = FiniteSet(H, T) square = unit_line unit_line assert (0, 0) in square assert 0 not in square assert (H, T) in coin ** 2 assert (.5, .5, .5) in square * unit_line assert (H, 3, 3) in coin * d6* d6 HH, TT = sympify(H), sympify(T) assert set(coin*2) == set(((HH, HH), (HH, TT), (TT, HH), (TT, TT))) assert (d4d4).is_subset(d6d6) assert square.complement(Interval(-oo, oo)Interval(-oo, oo)) == Union( (Interval(-oo, 0, True, True) + Interval(1, oo, True, True))Interval(-oo, oo), Interval(-oo, oo)(Interval(-oo, 0, True, True) + Interval(1, oo, True, True))) assert (Interval(-5, 5)3).is_subset(Interval(-10, 10)3) assert not (Interval(-10, 10)3).is_subset(Interval(-5, 5)3) assert not (Interval(-5, 5)2).is_subset(Interval(-10, 10)3) assert (Interval(.2, .5)FiniteSet(.5)).is_subset(square) # segment in square assert len(coincoincoin) == 8 assert len(S.EmptySetS.EmptySet) == 0 assert len(S.EmptySetcoin) == 0 raises(TypeError, lambda: len(coinInterval(0, 2))) def test_real(): x = Symbol('x', real=True, finite=True) I = Interval(0, 5) J = Interval(10, 20) A = FiniteSet(1, 2, 30, x, S.Pi) B = FiniteSet(-4, 0) C = FiniteSet(100) D = FiniteSet('Ham', 'Eggs') assert all(s.is_subset(S.Reals) for s in [I, J, A, B, C]) assert not D.is_subset(S.Reals) assert all((a + b).is_subset(S.Reals) for a in [I, J, A, B, C] for b in [I, J, A, B, C]) assert not any((a + D).is_subset(S.Reals) for a in [I, J, A, B, C, D]) assert not (I + A + D).is_subset(S.Reals) def test_supinf(): x = Symbol('x', real=True) y = Symbol('y', real=True) assert (Interval(0, 1) + FiniteSet(2)).sup == 2 assert (Interval(0, 1) + FiniteSet(2)).inf == 0 assert (Interval(0, 1) + FiniteSet(x)).sup == Max(1, x) assert (Interval(0, 1) + FiniteSet(x)).inf == Min(0, x) assert FiniteSet(5, 1, x).sup == Max(5, x) assert FiniteSet(5, 1, x).inf == Min(1, x) assert FiniteSet(5, 1, x, y).sup == Max(5, x, y) assert FiniteSet(5, 1, x, y).inf == Min(1, x, y) assert FiniteSet(5, 1, x, y, S.Infinity, S.NegativeInfinity).sup == \ S.Infinity assert FiniteSet(5, 1, x, y, S.Infinity, S.NegativeInfinity).inf == \ S.NegativeInfinity assert FiniteSet('Ham', 'Eggs').sup == Max('Ham', 'Eggs') def test_universalset(): U = S.UniversalSet x = Symbol('x') assert U.as_relational(x) is S.true assert U.union(Interval(2, 4)) == U assert U.intersect(Interval(2, 4)) == Interval(2, 4) assert U.measure == S.Infinity assert U.boundary == S.EmptySet assert U.contains(0) is S.true def test_Union_of_ProductSets_shares(): line = Interval(0, 2) points = FiniteSet(0, 1, 2) assert Union(line * line, line * points) == line * line def test_Interval_free_symbols(): # issue 6211 assert Interval(0, 1).free_symbols == set() x = Symbol('x', real=True) assert Interval(0, x).free_symbols == {x} def test_image_interval(): from sympy.core.numbers import Rational x = Symbol('x', real=True) a = Symbol('a', real=True) assert imageset(x, 2x, Interval(-2, 1)) == Interval(-4, 2) assert imageset(x, 2x, Interval(-2, 1, True, False)) == \ Interval(-4, 2, True, False) assert imageset(x, x2, Interval(-2, 1, True, False)) == \ Interval(0, 4, False, True) assert imageset(x, x2, Interval(-2, 1)) == Interval(0, 4) assert imageset(x, x2, Interval(-2, 1, True, False)) == \ Interval(0, 4, False, True) assert imageset(x, x2, Interval(-2, 1, True, True)) == \ Interval(0, 4, False, True) assert imageset(x, (x - 2)*2, Interval(1, 3)) == Interval(0, 1) assert imageset(x, 3x*4 - 26x*3 + 78x*2 - 90x, Interval(0, 4)) == \ Interval(-35, 0) # Multiple Maxima assert imageset(x, x + 1/x, Interval(-oo, oo)) == Interval(-oo, -2) \ + Interval(2, oo) # Single Infinite discontinuity assert imageset(x, 1/x + 1/(x-1)*2, Interval(0, 2, True, False)) == \ Interval(Rational(3, 2), oo, False) # Multiple Infinite discontinuities # Test for Python lambda assert imageset(lambda x: 2x, Interval(-2, 1)) == Interval(-4, 2) assert imageset(Lambda(x, ax), Interval(0, 1)) == \ ImageSet(Lambda(x, ax), Interval(0, 1)) assert imageset(Lambda(x, sin(cos(x))), Interval(0, 1)) == \ ImageSet(Lambda(x, sin(cos(x))), Interval(0, 1)) def test_image_piecewise(): f = Piecewise((x, x <= -1), (1/x2, x <= 5), (x3, True)) f1 = Piecewise((0, x <= 1), (1, x <= 2), (2, True)) assert imageset(x, f, Interval(-5, 5)) == Union(Interval(-5, -1), Interval(S(1)/25, oo)) assert imageset(x, f1, Interval(1, 2)) == FiniteSet(0, 1) @XFAIL # See: https://github.com/sympy/sympy/pull/2723#discussion_r8659826 def test_image_Intersection(): x = Symbol('x', real=True) y = Symbol('y', real=True) assert imageset(x, x2, Interval(-2, 0).intersect(Interval(x, y))) == \ Interval(0, 4).intersect(Interval(Min(x2, y2), Max(x2, y*2))) def test_image_FiniteSet(): x = Symbol('x', real=True) assert imageset(x, 2x, FiniteSet(1, 2, 3)) == FiniteSet(2, 4, 6) def test_image_Union(): x = Symbol('x', real=True) assert imageset(x, x*2, Interval(-2, 0) + FiniteSet(1, 2, 3)) == \ (Interval(0, 4) + FiniteSet(9)) def test_image_EmptySet(): x = Symbol('x', real=True) assert imageset(x, 2x, S.EmptySet) == S.EmptySet def test_issue_5724_7680(): assert I not in S.Reals # issue 7680 assert Interval(-oo, oo).contains(I) is S.false def test_boundary(): assert FiniteSet(1).boundary == FiniteSet(1) assert all(Interval(0, 1, left_open, right_open).boundary == FiniteSet(0, 1) for left_open in (true, false) for right_open in (true, false)) def test_boundary_Union(): assert (Interval(0, 1) + Interval(2, 3)).boundary == FiniteSet(0, 1, 2, 3) assert ((Interval(0, 1, False, True) + Interval(1, 2, True, False)).boundary == FiniteSet(0, 1, 2)) assert (Interval(0, 1) + FiniteSet(2)).boundary == FiniteSet(0, 1, 2) assert Union(Interval(0, 10), Interval(5, 15), evaluate=False).boundary \ == FiniteSet(0, 15) assert Union(Interval(0, 10), Interval(0, 1), evaluate=False).boundary \ == FiniteSet(0, 10) assert Union(Interval(0, 10, True, True), Interval(10, 15, True, True), evaluate=False).boundary \ == FiniteSet(0, 10, 15) @XFAIL def test_union_boundary_of_joining_sets(): """ Testing the boundary of unions is a hard problem """ assert Union(Interval(0, 10), Interval(10, 15), evaluate=False).boundary \ == FiniteSet(0, 15) def test_boundary_ProductSet(): open_square = Interval(0, 1, True, True) ** 2 assert open_square.boundary == (FiniteSet(0, 1) * Interval(0, 1) + Interval(0, 1) * FiniteSet(0, 1)) second_square = Interval(1, 2, True, True) * Interval(0, 1, True, True) assert (open_square + second_square).boundary == ( FiniteSet(0, 1) * Interval(0, 1) + FiniteSet(1, 2) * Interval(0, 1) + Interval(0, 1) * FiniteSet(0, 1) + Interval(1, 2) * FiniteSet(0, 1)) def test_boundary_ProductSet_line(): line_in_r2 = Interval(0, 1) * FiniteSet(0) assert line_in_r2.boundary == line_in_r2 def test_is_open(): assert not Interval(0, 1, False, False).is_open assert not Interval(0, 1, True, False).is_open assert Interval(0, 1, True, True).is_open assert not FiniteSet(1, 2, 3).is_open def test_is_closed(): assert Interval(0, 1, False, False).is_closed assert not Interval(0, 1, True, False).is_closed assert FiniteSet(1, 2, 3).is_closed def test_closure(): assert Interval(0, 1, False, True).closure == Interval(0, 1, False, False) def test_interior(): assert Interval(0, 1, False, True).interior == Interval(0, 1, True, True) def test_issue_7841(): raises(TypeError, lambda: x in S.Reals) def test_Eq(): assert Eq(Interval(0, 1), Interval(0, 1)) assert Eq(Interval(0, 1), Interval(0, 2)) == False s1 = FiniteSet(0, 1) s2 = FiniteSet(1, 2) assert Eq(s1, s1) assert Eq(s1, s2) == False assert Eq(s1s2, s1s2) assert Eq(s1s2, s2s1) == False def test_SymmetricDifference(): assert SymmetricDifference(FiniteSet(0, 1, 2, 3, 4, 5), \ FiniteSet(2, 4, 6, 8, 10)) == FiniteSet(0, 1, 3, 5, 6, 8, 10) assert SymmetricDifference(FiniteSet(2, 3, 4), FiniteSet(2, 3 ,4 ,5 )) \ == FiniteSet(5) assert FiniteSet(1, 2, 3, 4, 5) ^ FiniteSet(1, 2, 5, 6) == \ FiniteSet(3, 4, 6) assert Set(1, 2 ,3) ^ Set(2, 3, 4) == Union(Set(1, 2, 3) - Set(2, 3, 4), \ Set(2, 3, 4) - Set(1, 2, 3)) assert Interval(0, 4) ^ Interval(2, 5) == Union(Interval(0, 4) - \ Interval(2, 5), Interval(2, 5) - Interval(0, 4)) def test_issue_9536(): from sympy.functions.elementary.exponential import log a = Symbol('a', real=True) assert FiniteSet(log(a)).intersect(S.Reals) == Intersection(S.Reals, FiniteSet(log(a))) def test_issue_9637(): n = Symbol('n') a = FiniteSet(n) b = FiniteSet(2, n) assert Complement(S.Reals, a) == Complement(S.Reals, a, evaluate=False) assert Complement(Interval(1, 3), a) == Complement(Interval(1, 3), a, evaluate=False) assert Complement(Interval(1, 3), b) == \ Complement(Union(Interval(1, 2, False, True), Interval(2, 3, True, False)), a) assert Complement(a, S.Reals) == Complement(a, S.Reals, evaluate=False) assert Complement(a, Interval(1, 3)) == Complement(a, Interval(1, 3), evaluate=False) @XFAIL def test_issue_9808(): # See https://github.com/sympy/sympy/issues/16342 assert Complement(FiniteSet(y), FiniteSet(1)) == Complement(FiniteSet(y), FiniteSet(1), evaluate=False) assert Complement(FiniteSet(1, 2, x), FiniteSet(x, y, 2, 3)) == \ Complement(FiniteSet(1), FiniteSet(y), evaluate=False) def test_issue_9956(): assert Union(Interval(-oo, oo), FiniteSet(1)) == Interval(-oo, oo) assert Interval(-oo, oo).contains(1) is S.true def test_issue_Symbol_inter(): i = Interval(0, oo) r = S.Reals mat = Matrix([0, 0, 0]) assert Intersection(r, i, FiniteSet(m), FiniteSet(m, n)) == \ Intersection(i, FiniteSet(m)) assert Intersection(FiniteSet(1, m, n), FiniteSet(m, n, 2), i) == \ Intersection(i, FiniteSet(m, n)) assert Intersection(FiniteSet(m, n, x), FiniteSet(m, z), r) == \ Intersection(r, FiniteSet(m, z), FiniteSet(n, x)) assert Intersection(FiniteSet(m, n, 3), FiniteSet(m, n, x), r) == \ Intersection(r, FiniteSet(3, m, n), evaluate=False) assert Intersection(FiniteSet(m, n, 3), FiniteSet(m, n, 2, 3), r) == \ Union(FiniteSet(3), Intersection(r, FiniteSet(m, n))) assert Intersection(r, FiniteSet(mat, 2, n), FiniteSet(0, mat, n)) == \ Intersection(r, FiniteSet(n)) assert Intersection(FiniteSet(sin(x), cos(x)), FiniteSet(sin(x), cos(x), 1), r) == \ Intersection(r, FiniteSet(sin(x), cos(x))) assert Intersection(FiniteSet(x2, 1, sin(x)), FiniteSet(x2, 2, sin(x)), r) == \ Intersection(r, FiniteSet(x2, sin(x))) def test_issue_11827(): assert S.Naturals04 def test_issue_10113(): f = x2/(x2 - 4) assert imageset(x, f, S.Reals) == Union(Interval(-oo, 0), Interval(1, oo, True, True)) assert imageset(x, f, Interval(-2, 2)) == Interval(-oo, 0) assert imageset(x, f, Interval(-2, 3)) == Union(Interval(-oo, 0), Interval(S(9)/5, oo)) def test_issue_10248(): assert list(Intersection(S.Reals, FiniteSet(x))) == [ (-oo < x) & (x < oo)] def test_issue_9447(): a = Interval(0, 1) + Interval(2, 3) assert Complement(S.UniversalSet, a) == Complement( S.UniversalSet, Union(Interval(0, 1), Interval(2, 3)), evaluate=False) assert Complement(S.Naturals, a) == Complement( S.Naturals, Union(Interval(0, 1), Interval(2, 3)), evaluate=False) def test_issue_10337(): assert (FiniteSet(2) == 3) is False assert (FiniteSet(2) != 3) is True raises(TypeError, lambda: FiniteSet(2) < 3) raises(TypeError, lambda: FiniteSet(2) <= 3) raises(TypeError, lambda: FiniteSet(2) > 3) raises(TypeError, lambda: FiniteSet(2) >= 3) def test_issue_10326(): bad = [ EmptySet(), FiniteSet(1), Interval(1, 2), S.ComplexInfinity, S.ImaginaryUnit, S.Infinity, S.NaN, S.NegativeInfinity, ] interval = Interval(0, 5) for i in bad: assert i not in interval x = Symbol('x', real=True) nr = Symbol('nr', extended_real=False) assert x + 1 in Interval(x, x + 4) assert nr not in Interval(x, x + 4) assert Interval(1, 2) in FiniteSet(Interval(0, 5), Interval(1, 2)) assert Interval(-oo, oo).contains(oo) is S.false assert Interval(-oo, oo).contains(-oo) is S.false def test_issue_2799(): U = S.UniversalSet a = Symbol('a', real=True) inf_interval = Interval(a, oo) R = S.Reals assert U + inf_interval == inf_interval + U assert U + R == R + U assert R + inf_interval == inf_interval + R def test_issue_9706(): assert Interval(-oo, 0).closure == Interval(-oo, 0, True, False) assert Interval(0, oo).closure == Interval(0, oo, False, True) assert Interval(-oo, oo).closure == Interval(-oo, oo) def test_issue_8257(): reals_plus_infinity = Union(Interval(-oo, oo), FiniteSet(oo)) reals_plus_negativeinfinity = Union(Interval(-oo, oo), FiniteSet(-oo)) assert Interval(-oo, oo) + FiniteSet(oo) == reals_plus_infinity assert FiniteSet(oo) + Interval(-oo, oo) == reals_plus_infinity assert Interval(-oo, oo) + FiniteSet(-oo) == reals_plus_negativeinfinity assert FiniteSet(-oo) + Interval(-oo, oo) == reals_plus_negativeinfinity def test_issue_10931(): assert S.Integers - S.Integers == EmptySet() assert S.Integers - S.Reals == EmptySet() def test_issue_11174(): soln = Intersection(Interval(-oo, oo), FiniteSet(-x), evaluate=False) assert Intersection(FiniteSet(-x), S.Reals) == soln soln = Intersection(S.Reals, FiniteSet(x), evaluate=False) assert Intersection(FiniteSet(x), S.Reals) == soln def test_finite_set_intersection(): # The following should not produce recursion errors # Note: some of these are not completely correct. See # https://github.com/sympy/sympy/issues/16342. assert Intersection(FiniteSet(-oo, x), FiniteSet(x)) == FiniteSet(x) assert Intersection._handle_finite_sets([FiniteSet(-oo, x), FiniteSet(0, x)]) == FiniteSet(x) assert Intersection._handle_finite_sets([FiniteSet(-oo, x), FiniteSet(x)]) == FiniteSet(x) assert Intersection._handle_finite_sets([FiniteSet(2, 3, x, y), FiniteSet(1, 2, x)]) == \ Intersection._handle_finite_sets([FiniteSet(1, 2, x), FiniteSet(2, 3, x, y)]) == \ Intersection(FiniteSet(1, 2, x), FiniteSet(2, 3, x, y)) == \ FiniteSet(1, 2, x) def test_union_intersection_constructor(): # The actual exception does not matter here, so long as these fail sets = [FiniteSet(1), FiniteSet(2)] raises(Exception, lambda: Union(sets)) raises(Exception, lambda: Intersection(sets)) raises(Exception, lambda: Union(tuple(sets))) raises(Exception, lambda: Intersection(tuple(sets))) raises(Exception, lambda: Union(i for i in sets)) raises(Exception, lambda: Intersection(i for i in sets)) # Python sets are treated the same as FiniteSet # The union of a single set (of sets) is the set (of sets) itself assert Union(set(sets)) == FiniteSet(sets) assert Intersection(set(sets)) == FiniteSet(sets) assert Union({1}, {2}) == FiniteSet(1, 2) assert Intersection({1, 2}, {2, 3}) == FiniteSet(2) def test_Union_contains(): assert zoo not in Union( Interval.open(-oo, 0), Interval.open(0, oo)) @XFAIL def test_issue_16878b(): # in intersection_sets for (ImageSet, Set) there is no code # that handles the base_set of S.Reals like there is # for Integers assert imageset(x, (x, x), S.Reals).is_subset(S.Reals**2) is True
4896089e77597e6d2d6bb8867a57b2ad824d90ad7801b8910fbbb1d7a3877559	from __future__ import print_function, division from sympy.core.compatibility import clock import pyglet.gl as pgl from sympy.plotting.pygletplot.managed_window import ManagedWindow from sympy.plotting.pygletplot.plot_camera import PlotCamera from sympy.plotting.pygletplot.plot_controller import PlotController class PlotWindow(ManagedWindow): def __init__(self, plot, antialiasing=True, ortho=False, invert_mouse_zoom=False, linewidth=1.5, caption="SymPy Plot", kwargs): """ Named Arguments =============== antialiasing = True True OR False ortho = False True OR False invert_mouse_zoom = False True OR False """ self.plot = plot self.camera = None self._calculating = False self.antialiasing = antialiasing self.ortho = ortho self.invert_mouse_zoom = invert_mouse_zoom self.linewidth = linewidth self.title = caption self.last_caption_update = 0 self.caption_update_interval = 0.2 self.drawing_first_object = True super(PlotWindow, self).__init__(kwargs) def setup(self): self.camera = PlotCamera(self, ortho=self.ortho) self.controller = PlotController(self, invert_mouse_zoom=self.invert_mouse_zoom) self.push_handlers(self.controller) pgl.glClearColor(1.0, 1.0, 1.0, 0.0) pgl.glClearDepth(1.0) pgl.glDepthFunc(pgl.GL_LESS) pgl.glEnable(pgl.GL_DEPTH_TEST) pgl.glEnable(pgl.GL_LINE_SMOOTH) pgl.glShadeModel(pgl.GL_SMOOTH) pgl.glLineWidth(self.linewidth) pgl.glEnable(pgl.GL_BLEND) pgl.glBlendFunc(pgl.GL_SRC_ALPHA, pgl.GL_ONE_MINUS_SRC_ALPHA) if self.antialiasing: pgl.glHint(pgl.GL_LINE_SMOOTH_HINT, pgl.GL_NICEST) pgl.glHint(pgl.GL_POLYGON_SMOOTH_HINT, pgl.GL_NICEST) self.camera.setup_projection() def on_resize(self, w, h): super(PlotWindow, self).on_resize(w, h) if self.camera is not None: self.camera.setup_projection() def update(self, dt): self.controller.update(dt) def draw(self): self.plot._render_lock.acquire() self.camera.apply_transformation() calc_verts_pos, calc_verts_len = 0, 0 calc_cverts_pos, calc_cverts_len = 0, 0 should_update_caption = (clock() - self.last_caption_update > self.caption_update_interval) if len(self.plot._functions.values()) == 0: self.drawing_first_object = True try: dict.iteritems except AttributeError: # Python 3 iterfunctions = iter(self.plot._functions.values()) else: # Python 2 iterfunctions = self.plot._functions.itervalues() for r in iterfunctions: if self.drawing_first_object: self.camera.set_rot_preset(r.default_rot_preset) self.drawing_first_object = False pgl.glPushMatrix() r._draw() pgl.glPopMatrix() # might as well do this while we are # iterating and have the lock rather # than locking and iterating twice # per frame: if should_update_caption: try: if r.calculating_verts: calc_verts_pos += r.calculating_verts_pos calc_verts_len += r.calculating_verts_len if r.calculating_cverts: calc_cverts_pos += r.calculating_cverts_pos calc_cverts_len += r.calculating_cverts_len except ValueError: pass for r in self.plot._pobjects: pgl.glPushMatrix() r._draw() pgl.glPopMatrix() if should_update_caption: self.update_caption(calc_verts_pos, calc_verts_len, calc_cverts_pos, calc_cverts_len) self.last_caption_update = clock() if self.plot._screenshot: self.plot._screenshot._execute_saving() self.plot._render_lock.release() def update_caption(self, calc_verts_pos, calc_verts_len, calc_cverts_pos, calc_cverts_len): caption = self.title if calc_verts_len or calc_cverts_len: caption += " (calculating" if calc_verts_len > 0: p = (calc_verts_pos / calc_verts_len) * 100 caption += " vertices %i%%" % (p) if calc_cverts_len > 0: p = (calc_cverts_pos / calc_cverts_len) * 100 caption += " colors %i%%" % (p) caption += ")" if self.caption != caption: self.set_caption(caption)
99835a3f1b5fec644778225005b210dc27b2dbc343f917aec9da852f7f40e064	#!/usr/bin/env python """Distutils based setup script for SymPy. This uses Distutils (https://python.org/sigs/distutils-sig/) the standard python mechanism for installing packages. Optionally, you can use Setuptools (https://setuptools.readthedocs.io/en/latest/) to automatically handle dependencies. For the easiest installation just type the command (you'll probably need root privileges for that): python setup.py install This will install the library in the default location. For instructions on how to customize the install procedure read the output of: python setup.py --help install In addition, there are some other commands: python setup.py clean -> will clean all trash (.pyc and stuff) python setup.py test -> will run the complete test suite python setup.py bench -> will run the complete benchmark suite python setup.py audit -> will run pyflakes checker on source code To get a full list of available commands, read the output of: python setup.py --help-commands Or, if all else fails, feel free to write to the sympy list at [email protected] and ask for help. """ import sys import os import shutil import glob min_mpmath_version = '0.19' # This directory dir_setup = os.path.dirname(os.path.realpath(__file__)) extra_kwargs = {} try: from setuptools import setup, Command extra_kwargs['zip_safe'] = False extra_kwargs['entry_points'] = { 'console_scripts': [ 'isympy = isympy:main', ] } except ImportError: from distutils.core import setup, Command extra_kwargs['scripts'] = ['bin/isympy'] # handle mpmath deps in the hard way: from distutils.version import LooseVersion try: import mpmath if mpmath.__version__ < LooseVersion(min_mpmath_version): raise ImportError except ImportError: print("Please install the mpmath package with a version >= %s" % min_mpmath_version) sys.exit(-1) PY3 = sys.version_info[0] > 2 # Make sure I have the right Python version. if ((sys.version_info[0] == 2 and sys.version_info[1] < 7) or (sys.version_info[0] == 3 and sys.version_info[1] < 4)): print("SymPy requires Python 2.7 or 3.4 or newer. Python %d.%d detected" % sys.version_info[:2]) sys.exit(-1) # Check that this list is uptodate against the result of the command: # python bin/generate_module_list.py modules = [ 'sympy.algebras', 'sympy.assumptions', 'sympy.assumptions.handlers', 'sympy.benchmarks', 'sympy.calculus', 'sympy.categories', 'sympy.codegen', 'sympy.combinatorics', 'sympy.concrete', 'sympy.core', 'sympy.core.benchmarks', 'sympy.crypto', 'sympy.deprecated', 'sympy.diffgeom', 'sympy.discrete', 'sympy.external', 'sympy.functions', 'sympy.functions.combinatorial', 'sympy.functions.elementary', 'sympy.functions.elementary.benchmarks', 'sympy.functions.special', 'sympy.functions.special.benchmarks', 'sympy.geometry', 'sympy.holonomic', 'sympy.integrals', 'sympy.integrals.benchmarks', 'sympy.integrals.rubi', 'sympy.integrals.rubi.parsetools', 'sympy.integrals.rubi.rubi_tests', 'sympy.integrals.rubi.rules', 'sympy.interactive', 'sympy.liealgebras', 'sympy.logic', 'sympy.logic.algorithms', 'sympy.logic.utilities', 'sympy.matrices', 'sympy.matrices.benchmarks', 'sympy.matrices.expressions', 'sympy.multipledispatch', 'sympy.ntheory', 'sympy.parsing', 'sympy.parsing.autolev', 'sympy.parsing.autolev._antlr', 'sympy.parsing.autolev.test-examples', 'sympy.parsing.autolev.test-examples.pydy-example-repo', 'sympy.parsing.latex', 'sympy.parsing.latex._antlr', 'sympy.physics', 'sympy.physics.continuum_mechanics', 'sympy.physics.hep', 'sympy.physics.mechanics', 'sympy.physics.optics', 'sympy.physics.quantum', 'sympy.physics.units', 'sympy.physics.units.systems', 'sympy.physics.vector', 'sympy.plotting', 'sympy.plotting.intervalmath', 'sympy.plotting.pygletplot', 'sympy.polys', 'sympy.polys.agca', 'sympy.polys.benchmarks', 'sympy.polys.domains', 'sympy.printing', 'sympy.printing.pretty', 'sympy.sandbox', 'sympy.series', 'sympy.series.benchmarks', 'sympy.sets', 'sympy.sets.handlers', 'sympy.simplify', 'sympy.solvers', 'sympy.solvers.benchmarks', 'sympy.stats', 'sympy.strategies', 'sympy.strategies.branch', 'sympy.tensor', 'sympy.tensor.array', 'sympy.unify', 'sympy.utilities', 'sympy.utilities._compilation', 'sympy.utilities.mathml', 'sympy.vector', ] class audit(Command): """Audits SymPy's source code for following issues: - Names which are used but not defined or used before they are defined. - Names which are redefined without having been used. """ description = "Audit SymPy source with PyFlakes" user_options = [] def initialize_options(self): self.all = None def finalize_options(self): pass def run(self): import os try: import pyflakes.scripts.pyflakes as flakes except ImportError: print("In order to run the audit, you need to have PyFlakes installed.") sys.exit(-1) dirs = (os.path.join(d) for d in (m.split('.') for m in modules)) warns = 0 for dir in dirs: for filename in os.listdir(dir): if filename.endswith('.py') and filename != '__init__.py': warns += flakes.checkPath(os.path.join(dir, filename)) if warns > 0: print("Audit finished with total %d warnings" % warns) class clean(Command): """Cleans .pyc and debian trashs, so you should get the same copy as is in the VCS. """ description = "remove build files" user_options = [("all", "a", "the same")] def initialize_options(self): self.all = None def finalize_options(self): pass def run(self): curr_dir = os.getcwd() for root, dirs, files in os.walk(dir_setup): for file in files: if file.endswith('.pyc') and os.path.isfile: os.remove(os.path.join(root, file)) os.chdir(dir_setup) names = ["python-build-stamp-2.4", "MANIFEST", "build", "dist", "doc/_build", "sample.tex"] for f in names: if os.path.isfile(f): os.remove(f) elif os.path.isdir(f): shutil.rmtree(f) for name in glob.glob(os.path.join(dir_setup, "doc", "src", "modules", "physics", "vector", ".pdf")): if os.path.isfile(name): os.remove(name) os.chdir(curr_dir) class test_sympy(Command): """Runs all tests under the sympy/ folder """ description = "run all tests and doctests; also see bin/test and bin/doctest" user_options = [] # distutils complains if this is not here. def __init__(self, args): self.args = args[0] # so we can pass it to other classes Command.__init__(self, args) def initialize_options(self): # distutils wants this pass def finalize_options(self): # this too pass def run(self): from sympy.utilities import runtests runtests.run_all_tests() class run_benchmarks(Command): """Runs all SymPy benchmarks""" description = "run all benchmarks" user_options = [] # distutils complains if this is not here. def __init__(self, args): self.args = args[0] # so we can pass it to other classes Command.__init__(self, args) def initialize_options(self): # distutils wants this pass def finalize_options(self): # this too pass # we use py.test like architecture: # # o collector -- collects benchmarks # o runner -- executes benchmarks # o presenter -- displays benchmarks results # # this is done in sympy.utilities.benchmarking on top of py.test def run(self): from sympy.utilities import benchmarking benchmarking.main(['sympy']) class antlr(Command): """Generate code with antlr4""" description = "generate parser code from antlr grammars" user_options = [] # distutils complains if this is not here. def __init__(self, args): self.args = args[0] # so we can pass it to other classes Command.__init__(self, args) def initialize_options(self): # distutils wants this pass def finalize_options(self): # this too pass def run(self): from sympy.parsing.latex._build_latex_antlr import build_parser if not build_parser(): sys.exit(-1) # Check that this list is uptodate against the result of the command: # python bin/generate_test_list.py tests = [ 'sympy.algebras.tests', 'sympy.assumptions.tests', 'sympy.calculus.tests', 'sympy.categories.tests', 'sympy.codegen.tests', 'sympy.combinatorics.tests', 'sympy.concrete.tests', 'sympy.core.tests', 'sympy.crypto.tests', 'sympy.deprecated.tests', 'sympy.diffgeom.tests', 'sympy.discrete.tests', 'sympy.external.tests', 'sympy.functions.combinatorial.tests', 'sympy.functions.elementary.tests', 'sympy.functions.special.tests', 'sympy.geometry.tests', 'sympy.holonomic.tests', 'sympy.integrals.rubi.parsetools.tests', 'sympy.integrals.rubi.rubi_tests.tests', 'sympy.integrals.rubi.tests', 'sympy.integrals.tests', 'sympy.interactive.tests', 'sympy.liealgebras.tests', 'sympy.logic.tests', 'sympy.matrices.expressions.tests', 'sympy.matrices.tests', 'sympy.multipledispatch.tests', 'sympy.ntheory.tests', 'sympy.parsing.tests', 'sympy.physics.continuum_mechanics.tests', 'sympy.physics.hep.tests', 'sympy.physics.mechanics.tests', 'sympy.physics.optics.tests', 'sympy.physics.quantum.tests', 'sympy.physics.tests', 'sympy.physics.units.tests', 'sympy.physics.vector.tests', 'sympy.plotting.intervalmath.tests', 'sympy.plotting.pygletplot.tests', 'sympy.plotting.tests', 'sympy.polys.agca.tests', 'sympy.polys.domains.tests', 'sympy.polys.tests', 'sympy.printing.pretty.tests', 'sympy.printing.tests', 'sympy.sandbox.tests', 'sympy.series.tests', 'sympy.sets.tests', 'sympy.simplify.tests', 'sympy.solvers.tests', 'sympy.stats.tests', 'sympy.strategies.branch.tests', 'sympy.strategies.tests', 'sympy.tensor.array.tests', 'sympy.tensor.tests', 'sympy.unify.tests', 'sympy.utilities._compilation.tests', 'sympy.utilities.tests', 'sympy.vector.tests', ] long_description = '''SymPy is a Python library for symbolic mathematics. It aims to become a full-featured computer algebra system (CAS) while keeping the code as simple as possible in order to be comprehensible and easily extensible. SymPy is written entirely in Python.''' with open(os.path.join(dir_setup, 'sympy', 'release.py')) as f: # Defines __version__ exec(f.read()) with open(os.path.join(dir_setup, 'sympy', '__init__.py')) as f: long_description = f.read().split('"""')[1] if __name__ == '__main__': setup(name='sympy', version=__version__, description='Computer algebra system (CAS) in Python', long_description=long_description, author='SymPy development team', author_email='[email protected]', license='BSD', keywords="Math CAS", url='https://sympy.org', py_modules=['isympy'], packages=['sympy'] + modules + tests, ext_modules=[], package_data={ 'sympy.utilities.mathml': ['data/.xsl'], 'sympy.logic.benchmarks': ['input/.cnf'], 'sympy.parsing.autolev': ['.g4'], 'sympy.parsing.autolev.test-examples': ['.al'], 'sympy.parsing.autolev.test-examples.pydy-example-repo': ['.al'], 'sympy.parsing.latex': ['.txt', '.g4'], 'sympy.integrals.rubi.parsetools': ['header.py.txt'], }, data_files=[('share/man/man1', ['doc/man/isympy.1'])], cmdclass={'test': test_sympy, 'bench': run_benchmarks, 'clean': clean, 'audit': audit, 'antlr': antlr, }, classifiers=[ 'License :: OSI Approved :: BSD License', 'Operating System :: OS Independent', 'Programming Language :: Python', 'Topic :: Scientific/Engineering', 'Topic :: Scientific/Engineering :: Mathematics', 'Topic :: Scientific/Engineering :: Physics', 'Programming Language :: Python :: 2', 'Programming Language :: Python :: 2.7', 'Programming Language :: Python :: 3', 'Programming Language :: Python :: 3.4', 'Programming Language :: Python :: 3.5', 'Programming Language :: Python :: 3.6', 'Programming Language :: Python :: Implementation :: CPython', 'Programming Language :: Python :: Implementation :: PyPy', ], install_requires=[ 'mpmath>=%s' % min_mpmath_version, ], *extra_kwargs )
b6aa73551b6b0d9b93ffcce582094e1ba8a94a906ee0b9aa2a0a00a94811410d	""" SymPy is a Python library for symbolic mathematics. It aims to become a full-featured computer algebra system (CAS) while keeping the code as simple as possible in order to be comprehensible and easily extensible. SymPy is written entirely in Python. It depends on mpmath, and other external libraries may be optionally for things like plotting support. See the webpage for more information and documentation: https://sympy.org """ from __future__ import absolute_import, print_function del absolute_import, print_function try: import mpmath except ImportError: raise ImportError("SymPy now depends on mpmath as an external library. " "See https://docs.sympy.org/latest/install.html#mpmath for more information.") del mpmath from sympy.release import __version__ if 'dev' in __version__: def enable_warnings(): import warnings warnings.filterwarnings('default', '.', DeprecationWarning, module='sympy.') del warnings enable_warnings() del enable_warnings import sys if ((sys.version_info[0] == 2 and sys.version_info[1] < 7) or (sys.version_info[0] == 3 and sys.version_info[1] < 4)): raise ImportError("Python version 2.7 or 3.4 or above " "is required for SymPy.") del sys def __sympy_debug(): # helper function so we don't import os globally import os debug_str = os.getenv('SYMPY_DEBUG', 'False') if debug_str in ('True', 'False'): return eval(debug_str) else: raise RuntimeError("unrecognized value for SYMPY_DEBUG: %s" % debug_str) SYMPY_DEBUG = __sympy_debug() from .core import * from .logic import * from .assumptions import * from .polys import * from .series import * from .functions import * from .ntheory import * from .concrete import * from .discrete import * from .simplify import * from .sets import * from .solvers import * from .matrices import * from .geometry import * from .utilities import * from .integrals import * from .tensor import * from .parsing import * from .calculus import * from .algebras import * # This module causes conflicts with other modules: # from .stats import * # Adds about .04-.05 seconds of import time # from combinatorics import * # This module is slow to import: #from physics import units from .plotting import plot, textplot, plot_backends, plot_implicit, plot_parametric from .printing import * from .interactive import init_session, init_printing evalf._create_evalf_table() # This is slow to import: #import abc from .deprecated import *
4b621eb7d983746128f0d4fb214506e491cf6df1904d873e5a8826540936f5dc	""" Utility functions for plotting sympy functions. See examples\mplot2d.py and examples\mplot3d.py for usable 2d and 3d graphing functions using matplotlib. """ from sympy.core.sympify import sympify, SympifyError from sympy.external import import_module np = import_module('numpy') def sample2d(f, x_args): """ Samples a 2d function f over specified intervals and returns two arrays (X, Y) suitable for plotting with matlab (matplotlib) syntax. See examples\mplot2d.py. f is a function of one variable, such as x2. x_args is an interval given in the form (var, min, max, n) """ try: f = sympify(f) except SympifyError: raise ValueError("f could not be interpreted as a SymPy function") try: x, x_min, x_max, x_n = x_args except (TypeError, IndexError): raise ValueError("x_args must be a tuple of the form (var, min, max, n)") x_l = float(x_max - x_min) x_d = x_l/float(x_n) X = np.arange(float(x_min), float(x_max) + x_d, x_d) Y = np.empty(len(X)) for i in range(len(X)): try: Y[i] = float(f.subs(x, X[i])) except TypeError: Y[i] = None return X, Y def sample3d(f, x_args, y_args): """ Samples a 3d function f over specified intervals and returns three 2d arrays (X, Y, Z) suitable for plotting with matlab (matplotlib) syntax. See examples\mplot3d.py. f is a function of two variables, such as x2 + y*2. x_args and y_args are intervals given in the form (var, min, max, n) """ x, x_min, x_max, x_n = None, None, None, None y, y_min, y_max, y_n = None, None, None, None try: f = sympify(f) except SympifyError: raise ValueError("f could not be interpreted as a SymPy function") try: x, x_min, x_max, x_n = x_args y, y_min, y_max, y_n = y_args except (TypeError, IndexError): raise ValueError("x_args and y_args must be tuples of the form (var, min, max, intervals)") x_l = float(x_max - x_min) x_d = x_l/float(x_n) x_a = np.arange(float(x_min), float(x_max) + x_d, x_d) y_l = float(y_max - y_min) y_d = y_l/float(y_n) y_a = np.arange(float(y_min), float(y_max) + y_d, y_d) def meshgrid(x, y): """ Taken from matplotlib.mlab.meshgrid. """ x = np.array(x) y = np.array(y) numRows, numCols = len(y), len(x) x.shape = 1, numCols X = np.repeat(x, numRows, 0) y.shape = numRows, 1 Y = np.repeat(y, numCols, 1) return X, Y X, Y = np.meshgrid(x_a, y_a) Z = np.ndarray((len(X), len(X[0]))) for j in range(len(X)): for k in range(len(X[0])): try: Z[j][k] = float(f.subs(x, X[j][k]).subs(y, Y[j][k])) except (TypeError, NotImplementedError): Z[j][k] = 0 return X, Y, Z def sample(f, var_args): """ Samples a 2d or 3d function over specified intervals and returns a dataset suitable for plotting with matlab (matplotlib) syntax. Wrapper for sample2d and sample3d. f is a function of one or two variables, such as x**2. var_args are intervals for each variable given in the form (var, min, max, n) """ if len(var_args) == 1: return sample2d(f, var_args[0]) elif len(var_args) == 2: return sample3d(f, var_args[0], var_args[1]) else: raise ValueError("Only 2d and 3d sampling are supported at this time.")
7e2add5e64e9ca05a98e65e9a8df6709397e3128f59ae1294419b27be0d41599	""" Continuous Random Variables - Prebuilt variables Contains ======== Arcsin Benini Beta BetaNoncentral BetaPrime Cauchy Chi ChiNoncentral ChiSquared Dagum Erlang ExGaussian Exponential ExponentialPower FDistribution FisherZ Frechet Gamma GammaInverse Gumbel Gompertz Kumaraswamy Laplace Logistic LogLogistic LogNormal Maxwell Nakagami Normal Pareto QuadraticU RaisedCosine Rayleigh ShiftedGompertz StudentT Trapezoidal Triangular Uniform UniformSum VonMises Weibull WignerSemicircle """ from __future__ import print_function, division import random from sympy import beta as beta_fn from sympy import cos, sin, tan, atan, exp, besseli, besselj, besselk from sympy import (log, sqrt, pi, S, Dummy, Interval, sympify, gamma, sign, Piecewise, And, Eq, binomial, factorial, Sum, floor, Abs, Lambda, Basic, lowergamma, erf, erfc, erfi, erfinv, I, hyper, uppergamma, sinh, Ne, expint) from sympy.external import import_module from sympy.matrices import MatrixBase from sympy.stats.crv import (SingleContinuousPSpace, SingleContinuousDistribution, ContinuousDistributionHandmade) from sympy.stats.joint_rv import JointPSpace, CompoundDistribution from sympy.stats.joint_rv_types import multivariate_rv from sympy.stats.rv import _value_check, RandomSymbol oo = S.Infinity __all__ = ['ContinuousRV', 'Arcsin', 'Benini', 'Beta', 'BetaNoncentral', 'BetaPrime', 'Cauchy', 'Chi', 'ChiNoncentral', 'ChiSquared', 'Dagum', 'Erlang', 'ExGaussian', 'Exponential', 'ExponentialPower', 'FDistribution', 'FisherZ', 'Frechet', 'Gamma', 'GammaInverse', 'Gompertz', 'Gumbel', 'Kumaraswamy', 'Laplace', 'Logistic', 'LogLogistic', 'LogNormal', 'Maxwell', 'Nakagami', 'Normal', 'GaussianInverse', 'Pareto', 'QuadraticU', 'RaisedCosine', 'Rayleigh', 'StudentT', 'ShiftedGompertz', 'Trapezoidal', 'Triangular', 'Uniform', 'UniformSum', 'VonMises', 'Weibull', 'WignerSemicircle' ] def ContinuousRV(symbol, density, set=Interval(-oo, oo)): """ Create a Continuous Random Variable given the following: -- a symbol -- a probability density function -- set on which the pdf is valid (defaults to entire real line) Returns a RandomSymbol. Many common continuous random variable types are already implemented. This function should be necessary only very rarely. Examples ======== >>> from sympy import Symbol, sqrt, exp, pi >>> from sympy.stats import ContinuousRV, P, E >>> x = Symbol("x") >>> pdf = sqrt(2)exp(-x2/2)/(2sqrt(pi)) # Normal distribution >>> X = ContinuousRV(x, pdf) >>> E(X) 0 >>> P(X>0) 1/2 """ pdf = Piecewise((density, set.as_relational(symbol)), (0, True)) pdf = Lambda(symbol, pdf) dist = ContinuousDistributionHandmade(pdf, set) return SingleContinuousPSpace(symbol, dist).value def rv(symbol, cls, args): args = list(map(sympify, args)) dist = cls(args) dist.check(args) pspace = SingleContinuousPSpace(symbol, dist) if any(isinstance(arg, RandomSymbol) for arg in args): pspace = JointPSpace(symbol, CompoundDistribution(dist)) return pspace.value ######################################## # Continuous Probability Distributions # ######################################## #------------------------------------------------------------------------------- # Arcsin distribution ---------------------------------------------------------- class ArcsinDistribution(SingleContinuousDistribution): _argnames = ('a', 'b') def set(self): return Interval(self.a, self.b) def pdf(self, x): return 1/(pisqrt((x - self.a)(self.b - x))) def _cdf(self, x): from sympy import asin a, b = self.a, self.b return Piecewise( (S.Zero, x < a), (2asin(sqrt((x - a)/(b - a)))/pi, x <= b), (S.One, True)) def Arcsin(name, a=0, b=1): r""" Create a Continuous Random Variable with an arcsin distribution. The density of the arcsin distribution is given by .. math:: f(x) := \frac{1}{\pi\sqrt{(x-a)(b-x)}} with :math:`x \in (a,b)`. It must hold that :math:`-\infty < a < b < \infty`. Parameters ========== a : Real number, the left interval boundary b : Real number, the right interval boundary Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Arcsin, density, cdf >>> from sympy import Symbol, simplify >>> a = Symbol("a", real=True) >>> b = Symbol("b", real=True) >>> z = Symbol("z") >>> X = Arcsin("x", a, b) >>> density(X)(z) 1/(pisqrt((-a + z)(b - z))) >>> cdf(X)(z) Piecewise((0, a > z), (2asin(sqrt((-a + z)/(-a + b)))/pi, b >= z), (1, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Arcsine_distribution """ return rv(name, ArcsinDistribution, (a, b)) #------------------------------------------------------------------------------- # Benini distribution ---------------------------------------------------------- class BeniniDistribution(SingleContinuousDistribution): _argnames = ('alpha', 'beta', 'sigma') @staticmethod def check(alpha, beta, sigma): _value_check(alpha > 0, "Shape parameter Alpha must be positive.") _value_check(beta > 0, "Shape parameter Beta must be positive.") _value_check(sigma > 0, "Scale parameter Sigma must be positive.") @property def set(self): return Interval(self.sigma, oo) def pdf(self, x): alpha, beta, sigma = self.alpha, self.beta, self.sigma return (exp(-alphalog(x/sigma) - betalog(x/sigma)*2) (alpha/x + 2betalog(x/sigma)/x)) def _moment_generating_function(self, t): raise NotImplementedError('The moment generating function of the ' 'Benini distribution does not exist.') def Benini(name, alpha, beta, sigma): r""" Create a Continuous Random Variable with a Benini distribution. The density of the Benini distribution is given by .. math:: f(x) := e^{-\alpha\log{\frac{x}{\sigma}} -\beta\log^2\left[{\frac{x}{\sigma}}\right]} \left(\frac{\alpha}{x}+\frac{2\beta\log{\frac{x}{\sigma}}}{x}\right) This is a heavy-tailed distribution and is also known as the log-Rayleigh distribution. Parameters ========== alpha : Real number, `\alpha > 0`, a shape beta : Real number, `\beta > 0`, a shape sigma : Real number, `\sigma > 0`, a scale Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Benini, density, cdf >>> from sympy import Symbol, simplify, pprint >>> alpha = Symbol("alpha", positive=True) >>> beta = Symbol("beta", positive=True) >>> sigma = Symbol("sigma", positive=True) >>> z = Symbol("z") >>> X = Benini("x", alpha, beta, sigma) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) / / z \\ / z \ 2/ z \ \| 2betalog\|-----\|\| - alphalog\|-----\| - betalog \|-----\| \|alpha \sigma/\| \sigma/ \sigma/ \|----- + -----------------\|e \ z z / >>> cdf(X)(z) Piecewise((1 - exp(-alphalog(z/sigma) - betalog(z/sigma)2), sigma <= z), (0, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Benini_distribution .. [2] http://reference.wolfram.com/legacy/v8/ref/BeniniDistribution.html """ return rv(name, BeniniDistribution, (alpha, beta, sigma)) #------------------------------------------------------------------------------- # Beta distribution ------------------------------------------------------------ class BetaDistribution(SingleContinuousDistribution): _argnames = ('alpha', 'beta') set = Interval(0, 1) @staticmethod def check(alpha, beta): _value_check(alpha > 0, "Shape parameter Alpha must be positive.") _value_check(beta > 0, "Shape parameter Beta must be positive.") def pdf(self, x): alpha, beta = self.alpha, self.beta return x(alpha - 1) (1 - x)*(beta - 1) / beta_fn(alpha, beta) def sample(self): return random.betavariate(self.alpha, self.beta) def _characteristic_function(self, t): return hyper((self.alpha,), (self.alpha + self.beta,), It) def _moment_generating_function(self, t): return hyper((self.alpha,), (self.alpha + self.beta,), t) def Beta(name, alpha, beta): r""" Create a Continuous Random Variable with a Beta distribution. The density of the Beta distribution is given by .. math:: f(x) := \frac{x^{\alpha-1}(1-x)^{\beta-1}} {\mathrm{B}(\alpha,\beta)} with :math:`x \in [0,1]`. Parameters ========== alpha : Real number, `\alpha > 0`, a shape beta : Real number, `\beta > 0`, a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Beta, density, E, variance >>> from sympy import Symbol, simplify, pprint, factor >>> alpha = Symbol("alpha", positive=True) >>> beta = Symbol("beta", positive=True) >>> z = Symbol("z") >>> X = Beta("x", alpha, beta) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) alpha - 1 beta - 1 z (1 - z) -------------------------- B(alpha, beta) >>> simplify(E(X)) alpha/(alpha + beta) >>> factor(simplify(variance(X))) #doctest: +SKIP alphabeta/((alpha + beta)*2(alpha + beta + 1)) References ========== .. [1] https://en.wikipedia.org/wiki/Beta_distribution .. [2] http://mathworld.wolfram.com/BetaDistribution.html """ return rv(name, BetaDistribution, (alpha, beta)) #------------------------------------------------------------------------------- # Noncentral Beta distribution ------------------------------------------------------------ class BetaNoncentralDistribution(SingleContinuousDistribution): _argnames = ('alpha', 'beta', 'lamda') set = Interval(0, 1) @staticmethod def check(alpha, beta, lamda): _value_check(alpha > 0, "Shape parameter Alpha must be positive.") _value_check(beta > 0, "Shape parameter Beta must be positive.") _value_check(lamda >= 0, "Noncentrality parameter Lambda must be positive") def pdf(self, x): alpha, beta, lamda = self.alpha, self.beta, self.lamda k = Dummy("k") return Sum(exp(-lamda / 2) * (lamda / 2)*k x*(alpha + k - 1) ( 1 - x)*(beta - 1) / (factorial(k) beta_fn(alpha + k, beta)), (k, 0, oo)) def BetaNoncentral(name, alpha, beta, lamda): r""" Create a Continuous Random Variable with a Type I Noncentral Beta distribution. The density of the Noncentral Beta distribution is given by .. math:: f(x) := \sum_{k=0}^\infty e^{-\lambda/2}\frac{(\lambda/2)^k}{k!} \frac{x^{\alpha+k-1}(1-x)^{\beta-1}}{\mathrm{B}(\alpha+k,\beta)} with :math:`x \in [0,1]`. Parameters ========== alpha : Real number, `\alpha > 0`, a shape beta : Real number, `\beta > 0`, a shape lamda: Real number, `\lambda >= 0`, noncentrality parameter Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import BetaNoncentral, density, cdf >>> from sympy import Symbol, pprint >>> alpha = Symbol("alpha", positive=True) >>> beta = Symbol("beta", positive=True) >>> lamda = Symbol("lamda", nonnegative=True) >>> z = Symbol("z") >>> X = BetaNoncentral("x", alpha, beta, lamda) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) oo _____ \ ` \ -lamda \ k ------- \ k + alpha - 1 /lamda\ beta - 1 2 ) z \|-----\| (1 - z) e / \ 2 / / ------------------------------------------------ / B(k + alpha, beta)k! /____, k = 0 Compute cdf with specific 'x', 'alpha', 'beta' and 'lamda' values as follows : >>> cdf(BetaNoncentral("x", 1, 1, 1), evaluate=False)(2).doit() exp(-1/2)Integral(Sum(2(-_k)_x*_k/(beta(_k + 1, 1)factorial(_k)), (_k, 0, oo)), (_x, 0, 2)) The argument evaluate=False prevents an attempt at evaluation of the sum for general x, before the argument 2 is passed. References ========== .. [1] https://en.wikipedia.org/wiki/Noncentral_beta_distribution .. [2] https://reference.wolfram.com/language/ref/NoncentralBetaDistribution.html """ return rv(name, BetaNoncentralDistribution, (alpha, beta, lamda)) #------------------------------------------------------------------------------- # Beta prime distribution ------------------------------------------------------ class BetaPrimeDistribution(SingleContinuousDistribution): _argnames = ('alpha', 'beta') @staticmethod def check(alpha, beta): _value_check(alpha > 0, "Shape parameter Alpha must be positive.") _value_check(beta > 0, "Shape parameter Beta must be positive.") set = Interval(0, oo) def pdf(self, x): alpha, beta = self.alpha, self.beta return x*(alpha - 1)(1 + x)*(-alpha - beta)/beta_fn(alpha, beta) def BetaPrime(name, alpha, beta): r""" Create a continuous random variable with a Beta prime distribution. The density of the Beta prime distribution is given by .. math:: f(x) := \frac{x^{\alpha-1} (1+x)^{-\alpha -\beta}}{B(\alpha,\beta)} with :math:`x > 0`. Parameters ========== alpha : Real number, `\alpha > 0`, a shape beta : Real number, `\beta > 0`, a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import BetaPrime, density >>> from sympy import Symbol, pprint >>> alpha = Symbol("alpha", positive=True) >>> beta = Symbol("beta", positive=True) >>> z = Symbol("z") >>> X = BetaPrime("x", alpha, beta) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) alpha - 1 -alpha - beta z (z + 1) ------------------------------- B(alpha, beta) References ========== .. [1] https://en.wikipedia.org/wiki/Beta_prime_distribution .. [2] http://mathworld.wolfram.com/BetaPrimeDistribution.html """ return rv(name, BetaPrimeDistribution, (alpha, beta)) #------------------------------------------------------------------------------- # Cauchy distribution ---------------------------------------------------------- class CauchyDistribution(SingleContinuousDistribution): _argnames = ('x0', 'gamma') @staticmethod def check(x0, gamma): _value_check(gamma > 0, "Scale parameter Gamma must be positive.") def pdf(self, x): return 1/(piself.gamma(1 + ((x - self.x0)/self.gamma)*2)) def _cdf(self, x): x0, gamma = self.x0, self.gamma return (1/pi)atan((x - x0)/gamma) + S.Half def _characteristic_function(self, t): return exp(self.x0 * I * t - self.gamma * Abs(t)) def _moment_generating_function(self, t): raise NotImplementedError("The moment generating function for the " "Cauchy distribution does not exist.") def _quantile(self, p): return self.x0 + self.gammatan(pi(p - S.Half)) def Cauchy(name, x0, gamma): r""" Create a continuous random variable with a Cauchy distribution. The density of the Cauchy distribution is given by .. math:: f(x) := \frac{1}{\pi \gamma [1 + {(\frac{x-x_0}{\gamma})}^2]} Parameters ========== x0 : Real number, the location gamma : Real number, `\gamma > 0`, a scale Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Cauchy, density >>> from sympy import Symbol >>> x0 = Symbol("x0") >>> gamma = Symbol("gamma", positive=True) >>> z = Symbol("z") >>> X = Cauchy("x", x0, gamma) >>> density(X)(z) 1/(pigamma(1 + (-x0 + z)2/gamma2)) References ========== .. [1] https://en.wikipedia.org/wiki/Cauchy_distribution .. [2] http://mathworld.wolfram.com/CauchyDistribution.html """ return rv(name, CauchyDistribution, (x0, gamma)) #------------------------------------------------------------------------------- # Chi distribution ------------------------------------------------------------- class ChiDistribution(SingleContinuousDistribution): _argnames = ('k',) @staticmethod def check(k): _value_check(k > 0, "Number of degrees of freedom (k) must be positive.") _value_check(k.is_integer, "Number of degrees of freedom (k) must be an integer.") set = Interval(0, oo) def pdf(self, x): return 2*(1 - self.k/2)x*(self.k - 1)exp(-x2/2)/gamma(self.k/2) def _characteristic_function(self, t): k = self.k part_1 = hyper((k/2,), (S(1)/2,), -t2/2) part_2 = Itsqrt(2)gamma((k+1)/2)/gamma(k/2) part_3 = hyper(((k+1)/2,), (S(3)/2,), -t2/2) return part_1 + part_2part_3 def _moment_generating_function(self, t): k = self.k part_1 = hyper((k / 2,), (S(1) / 2,), t ** 2 / 2) part_2 = t * sqrt(2) * gamma((k + 1) / 2) / gamma(k / 2) part_3 = hyper(((k + 1) / 2,), (S(3) / 2,), t ** 2 / 2) return part_1 + part_2 * part_3 def Chi(name, k): r""" Create a continuous random variable with a Chi distribution. The density of the Chi distribution is given by .. math:: f(x) := \frac{2^{1-k/2}x^{k-1}e^{-x^2/2}}{\Gamma(k/2)} with :math:`x \geq 0`. Parameters ========== k : Positive integer, The number of degrees of freedom Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Chi, density, E >>> from sympy import Symbol, simplify >>> k = Symbol("k", integer=True) >>> z = Symbol("z") >>> X = Chi("x", k) >>> density(X)(z) 2*(1 - k/2)z*(k - 1)exp(-z*2/2)/gamma(k/2) >>> simplify(E(X)) sqrt(2)gamma(k/2 + 1/2)/gamma(k/2) References ========== .. [1] https://en.wikipedia.org/wiki/Chi_distribution .. [2] http://mathworld.wolfram.com/ChiDistribution.html """ return rv(name, ChiDistribution, (k,)) #------------------------------------------------------------------------------- # Non-central Chi distribution ------------------------------------------------- class ChiNoncentralDistribution(SingleContinuousDistribution): _argnames = ('k', 'l') @staticmethod def check(k, l): _value_check(k > 0, "Number of degrees of freedom (k) must be positive.") _value_check(k.is_integer, "Number of degrees of freedom (k) must be an integer.") _value_check(l > 0, "Shift parameter Lambda must be positive.") set = Interval(0, oo) def pdf(self, x): k, l = self.k, self.l return exp(-(x2+l2)/2)xkl / (lx)(k/2) besseli(k/2-1, lx) def ChiNoncentral(name, k, l): r""" Create a continuous random variable with a non-central Chi distribution. The density of the non-central Chi distribution is given by .. math:: f(x) := \frac{e^{-(x^2+\lambda^2)/2} x^k\lambda} {(\lambda x)^{k/2}} I_{k/2-1}(\lambda x) with `x \geq 0`. Here, `I_\nu (x)` is the :ref:`modified Bessel function of the first kind <besseli>`. Parameters ========== k : A positive Integer, `k > 0`, the number of degrees of freedom lambda : Real number, `\lambda > 0`, Shift parameter Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import ChiNoncentral, density >>> from sympy import Symbol >>> k = Symbol("k", integer=True) >>> l = Symbol("l") >>> z = Symbol("z") >>> X = ChiNoncentral("x", k, l) >>> density(X)(z) lz*k(lz)(-k/2)exp(-l2/2 - z2/2)besseli(k/2 - 1, lz) References ========== .. [1] https://en.wikipedia.org/wiki/Noncentral_chi_distribution """ return rv(name, ChiNoncentralDistribution, (k, l)) #------------------------------------------------------------------------------- # Chi squared distribution ----------------------------------------------------- class ChiSquaredDistribution(SingleContinuousDistribution): _argnames = ('k',) @staticmethod def check(k): _value_check(k > 0, "Number of degrees of freedom (k) must be positive.") _value_check(k.is_integer, "Number of degrees of freedom (k) must be an integer.") set = Interval(0, oo) def pdf(self, x): k = self.k return 1/(2*(k/2)gamma(k/2))x(k/2 - 1)exp(-x/2) def _cdf(self, x): k = self.k return Piecewise( (S.One/gamma(k/2)lowergamma(k/2, x/2), x >= 0), (0, True) ) def _characteristic_function(self, t): return (1 - 2It)(-self.k/2) def _moment_generating_function(self, t): return (1 - 2t)(-self.k/2) def ChiSquared(name, k): r""" Create a continuous random variable with a Chi-squared distribution. The density of the Chi-squared distribution is given by .. math:: f(x) := \frac{1}{2^{\frac{k}{2}}\Gamma\left(\frac{k}{2}\right)} x^{\frac{k}{2}-1} e^{-\frac{x}{2}} with :math:`x \geq 0`. Parameters ========== k : Positive integer, The number of degrees of freedom Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import ChiSquared, density, E, variance, moment >>> from sympy import Symbol >>> k = Symbol("k", integer=True, positive=True) >>> z = Symbol("z") >>> X = ChiSquared("x", k) >>> density(X)(z) 2(-k/2)z(k/2 - 1)exp(-z/2)/gamma(k/2) >>> E(X) k >>> variance(X) 2k >>> moment(X, 3) k3 + 6k*2 + 8k References ========== .. [1] https://en.wikipedia.org/wiki/Chi_squared_distribution .. [2] http://mathworld.wolfram.com/Chi-SquaredDistribution.html """ return rv(name, ChiSquaredDistribution, (k, )) #------------------------------------------------------------------------------- # Dagum distribution ----------------------------------------------------------- class DagumDistribution(SingleContinuousDistribution): _argnames = ('p', 'a', 'b') set = Interval(0, oo) @staticmethod def check(p, a, b): _value_check(p > 0, "Shape parameter p must be positive.") _value_check(a > 0, "Shape parameter a must be positive.") _value_check(b > 0, "Scale parameter b must be positive.") def pdf(self, x): p, a, b = self.p, self.a, self.b return ap/x((x/b)*(ap)/(((x/b)a + 1)(p + 1))) def _cdf(self, x): p, a, b = self.p, self.a, self.b return Piecewise(((S.One + (S(x)/b)-a)-p, x>=0), (S.Zero, True)) def Dagum(name, p, a, b): r""" Create a continuous random variable with a Dagum distribution. The density of the Dagum distribution is given by .. math:: f(x) := \frac{a p}{x} \left( \frac{\left(\tfrac{x}{b}\right)^{a p}} {\left(\left(\tfrac{x}{b}\right)^a + 1 \right)^{p+1}} \right) with :math:`x > 0`. Parameters ========== p : Real number, `p > 0`, a shape a : Real number, `a > 0`, a shape b : Real number, `b > 0`, a scale Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Dagum, density, cdf >>> from sympy import Symbol >>> p = Symbol("p", positive=True) >>> a = Symbol("a", positive=True) >>> b = Symbol("b", positive=True) >>> z = Symbol("z") >>> X = Dagum("x", p, a, b) >>> density(X)(z) ap(z/b)*(ap)((z/b)a + 1)(-p - 1)/z >>> cdf(X)(z) Piecewise(((1 + (z/b)(-a))(-p), z >= 0), (0, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Dagum_distribution """ return rv(name, DagumDistribution, (p, a, b)) #------------------------------------------------------------------------------- # Erlang distribution ---------------------------------------------------------- def Erlang(name, k, l): r""" Create a continuous random variable with an Erlang distribution. The density of the Erlang distribution is given by .. math:: f(x) := \frac{\lambda^k x^{k-1} e^{-\lambda x}}{(k-1)!} with :math:`x \in [0,\infty]`. Parameters ========== k : Positive integer l : Real number, `\lambda > 0`, the rate Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Erlang, density, cdf, E, variance >>> from sympy import Symbol, simplify, pprint >>> k = Symbol("k", integer=True, positive=True) >>> l = Symbol("l", positive=True) >>> z = Symbol("z") >>> X = Erlang("x", k, l) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) k k - 1 -lz l z e --------------- Gamma(k) >>> C = cdf(X)(z) >>> pprint(C, use_unicode=False) /lowergamma(k, lz) \|------------------ for z > 0 < Gamma(k) \| \ 0 otherwise >>> E(X) k/l >>> simplify(variance(X)) k/l2 References ========== .. [1] https://en.wikipedia.org/wiki/Erlang_distribution .. [2] http://mathworld.wolfram.com/ErlangDistribution.html """ return rv(name, GammaDistribution, (k, S.One/l)) # ------------------------------------------------------------------------------- # ExGaussian distribution ----------------------------------------------------- class ExGaussianDistribution(SingleContinuousDistribution): _argnames = ('mean', 'std', 'rate') set = Interval(-oo, oo) @staticmethod def check(mean, std, rate): _value_check( std > 0, "Standard deviation of ExGaussian must be positive.") _value_check(rate > 0, "Rate of ExGaussian must be positive.") def pdf(self, x): mean, std, rate = self.mean, self.std, self.rate term1 = rate/2 term2 = exp(rate (2 * mean + rate * std*2 - 2x)/2) term3 = erfc((mean + ratestd2 - x)/(sqrt(2)std)) return term1term2term3 def _cdf(self, x): from sympy.stats import cdf mean, std, rate = self.mean, self.std, self.rate u = rate(x - mean) v = ratestd GaussianCDF1 = cdf(Normal('x', 0, v))(u) GaussianCDF2 = cdf(Normal('x', v2, v))(u) return GaussianCDF1 - exp(-u + (v2/2) + log(GaussianCDF2)) def _characteristic_function(self, t): mean, std, rate = self.mean, self.std, self.rate term1 = (1 - It/rate)(-1) term2 = exp(Imeant - std2t*2/2) return term1 term2 def _moment_generating_function(self, t): mean, std, rate = self.mean, self.std, self.rate term1 = (1 - t/rate)*(-1) term2 = exp(meant + std*2t*2/2) return term1term2 def ExGaussian(name, mean, std, rate): r""" Create a continuous random variable with an Exponentially modified Gaussian (EMG) distribution. The density of the exponentially modified Gaussian distribution is given by .. math:: f(x) := \frac{\lambda}{2}e^{\frac{\lambda}{2}(2\mu+\lambda\sigma^2-2x)} \text{erfc}(\frac{\mu + \lambda\sigma^2 - x}{\sqrt{2}\sigma}) with `x > 0`. Note that the expected value is `1/\lambda`. Parameters ========== mu : A Real number, the mean of Gaussian component std: A positive Real number, :math: `\sigma^2 > 0` the variance of Gaussian component lambda: A positive Real number, :math: `\lambda > 0` the rate of Exponential component Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import ExGaussian, density, cdf, E >>> from sympy.stats import variance, skewness >>> from sympy import Symbol, pprint, simplify >>> mean = Symbol("mu") >>> std = Symbol("sigma", positive=True) >>> rate = Symbol("lamda", positive=True) >>> z = Symbol("z") >>> X = ExGaussian("x", mean, std, rate) >>> pprint(density(X)(z), use_unicode=False) / 2 \ lamda\lamdasigma + 2mu - 2z/ --------------------------------- / ___ / 2 \\ 2 \|\/ 2 \lamdasigma + mu - z/\| lamdae erfc\|-----------------------------\| \ 2sigma / ---------------------------------------------------------------------------- 2 >>> cdf(X)(z) -(erf(sqrt(2)(-lamda*2sigma*2 + lamda(-mu + z))/(2lamdasigma))/2 + 1/2)exp(lamda2sigma*2/2 - lamda(-mu + z)) + erf(sqrt(2)(-mu + z)/(2sigma))/2 + 1/2 >>> E(X) (lamdamu + 1)/lamda >>> simplify(variance(X)) sigma2 + lamda(-2) >>> simplify(skewness(X)) 2/(lamda2sigma2 + 1)(3/2) References ========== .. [1] https://en.wikipedia.org/wiki/Exponentially_modified_Gaussian_distribution """ return rv(name, ExGaussianDistribution, (mean, std, rate)) #------------------------------------------------------------------------------- # Exponential distribution ----------------------------------------------------- class ExponentialDistribution(SingleContinuousDistribution): _argnames = ('rate',) set = Interval(0, oo) @staticmethod def check(rate): _value_check(rate > 0, "Rate must be positive.") def pdf(self, x): return self.rate * exp(-self.ratex) def sample(self): return random.expovariate(self.rate) def _cdf(self, x): return Piecewise( (S.One - exp(-self.ratex), x >= 0), (0, True), ) def _characteristic_function(self, t): rate = self.rate return rate / (rate - It) def _moment_generating_function(self, t): rate = self.rate return rate / (rate - t) def _quantile(self, p): return -log(1-p)/self.rate def Exponential(name, rate): r""" Create a continuous random variable with an Exponential distribution. The density of the exponential distribution is given by .. math:: f(x) := \lambda \exp(-\lambda x) with `x > 0`. Note that the expected value is `1/\lambda`. Parameters ========== rate : A positive Real number, `\lambda > 0`, the rate (or inverse scale/inverse mean) Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Exponential, density, cdf, E >>> from sympy.stats import variance, std, skewness, quantile >>> from sympy import Symbol >>> l = Symbol("lambda", positive=True) >>> z = Symbol("z") >>> p = Symbol("p") >>> X = Exponential("x", l) >>> density(X)(z) lambdaexp(-lambdaz) >>> cdf(X)(z) Piecewise((1 - exp(-lambdaz), z >= 0), (0, True)) >>> quantile(X)(p) -log(1 - p)/lambda >>> E(X) 1/lambda >>> variance(X) lambda*(-2) >>> skewness(X) 2 >>> X = Exponential('x', 10) >>> density(X)(z) 10exp(-10z) >>> E(X) 1/10 >>> std(X) 1/10 References ========== .. [1] https://en.wikipedia.org/wiki/Exponential_distribution .. [2] http://mathworld.wolfram.com/ExponentialDistribution.html """ return rv(name, ExponentialDistribution, (rate, )) # ------------------------------------------------------------------------------- # Exponential Power distribution ----------------------------------------------------- class ExponentialPowerDistribution(SingleContinuousDistribution): _argnames = ('mu', 'alpha', 'beta') set = Interval(-oo, oo) @staticmethod def check(mu, alpha, beta): _value_check(alpha > 0, "Scale parameter alpha must be positive.") _value_check(beta > 0, "Shape parameter beta must be positive.") def pdf(self, x): mu, alpha, beta = self.mu, self.alpha, self.beta num = betaexp(-(Abs(x - mu)/alpha)*beta) den = 2alphagamma(1/beta) return num/den def _cdf(self, x): mu, alpha, beta = self.mu, self.alpha, self.beta num = lowergamma(1/beta, (Abs(x - mu) / alpha)beta) den = 2gamma(1/beta) return sign(x - mu)num/den + S.Half def ExponentialPower(name, mu, alpha, beta): r""" Create a Continuous Random Variable with Exponential Power distribution. This distribution is known also as Generalized Normal distribution version 1 The density of the Exponential Power distribution is given by .. math:: f(x) := \frac{\beta}{2\alpha\Gamma(\frac{1}{\beta})} e^{{-(\frac{\|x - \mu\|}{\alpha})^{\beta}}} with :math:`x \in [ - \infty, \infty ]`. Parameters ========== mu : Real number, 'mu' is a location alpha : Real number, 'alpha > 0' is a scale beta : Real number, 'beta > 0' is a shape Returns ======= A RandomSymbol Examples ======== >>> from sympy.stats import ExponentialPower, density, E, variance, cdf >>> from sympy import Symbol, simplify, pprint >>> z = Symbol("z") >>> mu = Symbol("mu") >>> alpha = Symbol("alpha", positive=True) >>> beta = Symbol("beta", positive=True) >>> X = ExponentialPower("x", mu, alpha, beta) >>> pprint(density(X)(z), use_unicode=False) beta /\|mu - z\|\ -\|--------\| \ alpha / betae --------------------- / 1 \ 2alphaGamma\|----\| \beta/ >>> cdf(X)(z) 1/2 + lowergamma(1/beta, (Abs(mu - z)/alpha)*beta)sign(-mu + z)/(2gamma(1/beta)) References ========== .. [1] https://reference.wolfram.com/language/ref/ExponentialPowerDistribution.html .. [2] https://en.wikipedia.org/wiki/Generalized_normal_distribution#Version_1 """ return rv(name, ExponentialPowerDistribution, (mu, alpha, beta)) #------------------------------------------------------------------------------- # F distribution --------------------------------------------------------------- class FDistributionDistribution(SingleContinuousDistribution): _argnames = ('d1', 'd2') set = Interval(0, oo) @staticmethod def check(d1, d2): _value_check((d1 > 0, d1.is_integer), "Degrees of freedom d1 must be positive integer.") _value_check((d2 > 0, d2.is_integer), "Degrees of freedom d2 must be positive integer.") def pdf(self, x): d1, d2 = self.d1, self.d2 return (sqrt((d1x)*d1d2*d2 / (d1x+d2)*(d1+d2)) / (x beta_fn(d1/2, d2/2))) def _moment_generating_function(self, t): raise NotImplementedError('The moment generating function for the ' 'F-distribution does not exist.') def FDistribution(name, d1, d2): r""" Create a continuous random variable with a F distribution. The density of the F distribution is given by .. math:: f(x) := \frac{\sqrt{\frac{(d_1 x)^{d_1} d_2^{d_2}} {(d_1 x + d_2)^{d_1 + d_2}}}} {x \mathrm{B} \left(\frac{d_1}{2}, \frac{d_2}{2}\right)} with :math:`x > 0`. Parameters ========== d1 : `d_1 > 0`, where d_1 is the degrees of freedom (n_1 - 1) d2 : `d_2 > 0`, where d_2 is the degrees of freedom (n_2 - 1) Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import FDistribution, density >>> from sympy import Symbol, simplify, pprint >>> d1 = Symbol("d1", positive=True) >>> d2 = Symbol("d2", positive=True) >>> z = Symbol("z") >>> X = FDistribution("x", d1, d2) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) d2 -- ______________________________ 2 / d1 -d1 - d2 d2 \/ (d1z) (d1z + d2) -------------------------------------- /d1 d2\ zB\|--, --\| \2 2 / References ========== .. [1] https://en.wikipedia.org/wiki/F-distribution .. [2] http://mathworld.wolfram.com/F-Distribution.html """ return rv(name, FDistributionDistribution, (d1, d2)) #------------------------------------------------------------------------------- # Fisher Z distribution -------------------------------------------------------- class FisherZDistribution(SingleContinuousDistribution): _argnames = ('d1', 'd2') set = Interval(-oo, oo) @staticmethod def check(d1, d2): _value_check(d1 > 0, "Degree of freedom d1 must be positive.") _value_check(d2 > 0, "Degree of freedom d2 must be positive.") def pdf(self, x): d1, d2 = self.d1, self.d2 return (2d1*(d1/2)d2*(d2/2) / beta_fn(d1/2, d2/2) exp(d1x) / (d1exp(2x)+d2)((d1+d2)/2)) def FisherZ(name, d1, d2): r""" Create a Continuous Random Variable with an Fisher's Z distribution. The density of the Fisher's Z distribution is given by .. math:: f(x) := \frac{2d_1^{d_1/2} d_2^{d_2/2}} {\mathrm{B}(d_1/2, d_2/2)} \frac{e^{d_1z}}{\left(d_1e^{2z}+d_2\right)^{\left(d_1+d_2\right)/2}} .. TODO - What is the difference between these degrees of freedom? Parameters ========== d1 : `d_1 > 0`, degree of freedom d2 : `d_2 > 0`, degree of freedom Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import FisherZ, density >>> from sympy import Symbol, simplify, pprint >>> d1 = Symbol("d1", positive=True) >>> d2 = Symbol("d2", positive=True) >>> z = Symbol("z") >>> X = FisherZ("x", d1, d2) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) d1 d2 d1 d2 - -- - -- -- -- 2 2 2 2 / 2z \ d1z 2d1 d2 \d1e + d2/ e ----------------------------------------- /d1 d2\ B\|--, --\| \2 2 / References ========== .. [1] https://en.wikipedia.org/wiki/Fisher%27s_z-distribution .. [2] http://mathworld.wolfram.com/Fishersz-Distribution.html """ return rv(name, FisherZDistribution, (d1, d2)) #------------------------------------------------------------------------------- # Frechet distribution --------------------------------------------------------- class FrechetDistribution(SingleContinuousDistribution): _argnames = ('a', 's', 'm') set = Interval(0, oo) @staticmethod def check(a, s, m): _value_check(a > 0, "Shape parameter alpha must be positive.") _value_check(s > 0, "Scale parameter s must be positive.") def __new__(cls, a, s=1, m=0): a, s, m = list(map(sympify, (a, s, m))) return Basic.__new__(cls, a, s, m) def pdf(self, x): a, s, m = self.a, self.s, self.m return a/s * ((x-m)/s)*(-1-a) exp(-((x-m)/s)(-a)) def _cdf(self, x): a, s, m = self.a, self.s, self.m return Piecewise((exp(-((x-m)/s)(-a)), x >= m), (S.Zero, True)) def Frechet(name, a, s=1, m=0): r""" Create a continuous random variable with a Frechet distribution. The density of the Frechet distribution is given by .. math:: f(x) := \frac{\alpha}{s} \left(\frac{x-m}{s}\right)^{-1-\alpha} e^{-(\frac{x-m}{s})^{-\alpha}} with :math:`x \geq m`. Parameters ========== a : Real number, :math:`a \in \left(0, \infty\right)` the shape s : Real number, :math:`s \in \left(0, \infty\right)` the scale m : Real number, :math:`m \in \left(-\infty, \infty\right)` the minimum Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Frechet, density, E, std, cdf >>> from sympy import Symbol, simplify >>> a = Symbol("a", positive=True) >>> s = Symbol("s", positive=True) >>> m = Symbol("m", real=True) >>> z = Symbol("z") >>> X = Frechet("x", a, s, m) >>> density(X)(z) a((-m + z)/s)(-a - 1)exp(-((-m + z)/s)(-a))/s >>> cdf(X)(z) Piecewise((exp(-((-m + z)/s)(-a)), m <= z), (0, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Fr%C3%A9chet_distribution """ return rv(name, FrechetDistribution, (a, s, m)) #------------------------------------------------------------------------------- # Gamma distribution ----------------------------------------------------------- class GammaDistribution(SingleContinuousDistribution): _argnames = ('k', 'theta') set = Interval(0, oo) @staticmethod def check(k, theta): _value_check(k > 0, "k must be positive") _value_check(theta > 0, "Theta must be positive") def pdf(self, x): k, theta = self.k, self.theta return x*(k - 1) exp(-x/theta) / (gamma(k)thetak) def sample(self): return random.gammavariate(self.k, self.theta) def _cdf(self, x): k, theta = self.k, self.theta return Piecewise( (lowergamma(k, S(x)/theta)/gamma(k), x > 0), (S.Zero, True)) def _characteristic_function(self, t): return (1 - self.thetaIt)(-self.k) def _moment_generating_function(self, t): return (1- self.thetat)*(-self.k) def Gamma(name, k, theta): r""" Create a continuous random variable with a Gamma distribution. The density of the Gamma distribution is given by .. math:: f(x) := \frac{1}{\Gamma(k) \theta^k} x^{k - 1} e^{-\frac{x}{\theta}} with :math:`x \in [0,1]`. Parameters ========== k : Real number, `k > 0`, a shape theta : Real number, `\theta > 0`, a scale Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Gamma, density, cdf, E, variance >>> from sympy import Symbol, pprint, simplify >>> k = Symbol("k", positive=True) >>> theta = Symbol("theta", positive=True) >>> z = Symbol("z") >>> X = Gamma("x", k, theta) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) -z ----- -k k - 1 theta theta z e --------------------- Gamma(k) >>> C = cdf(X, meijerg=True)(z) >>> pprint(C, use_unicode=False) / / z \ \|klowergamma\|k, -----\| \| \ theta/ <---------------------- for z >= 0 \| Gamma(k + 1) \| \ 0 otherwise >>> E(X) ktheta >>> V = simplify(variance(X)) >>> pprint(V, use_unicode=False) 2 ktheta References ========== .. [1] https://en.wikipedia.org/wiki/Gamma_distribution .. [2] http://mathworld.wolfram.com/GammaDistribution.html """ return rv(name, GammaDistribution, (k, theta)) #------------------------------------------------------------------------------- # Inverse Gamma distribution --------------------------------------------------- class GammaInverseDistribution(SingleContinuousDistribution): _argnames = ('a', 'b') set = Interval(0, oo) @staticmethod def check(a, b): _value_check(a > 0, "alpha must be positive") _value_check(b > 0, "beta must be positive") def pdf(self, x): a, b = self.a, self.b return b*a/gamma(a) x*(-a-1) exp(-b/x) def _cdf(self, x): a, b = self.a, self.b return Piecewise((uppergamma(a,b/x)/gamma(a), x > 0), (S.Zero, True)) def sample(self): scipy = import_module('scipy') if scipy: from scipy.stats import invgamma return invgamma.rvs(float(self.a), 0, float(self.b)) else: raise NotImplementedError('Sampling the Inverse Gamma Distribution requires Scipy.') def _characteristic_function(self, t): a, b = self.a, self.b return 2 * (-Ibt)*(a/2) besselk(sqrt(-4Ibt)) / gamma(a) def _moment_generating_function(self, t): raise NotImplementedError('The moment generating function for the ' 'gamma inverse distribution does not exist.') def GammaInverse(name, a, b): r""" Create a continuous random variable with an inverse Gamma distribution. The density of the inverse Gamma distribution is given by .. math:: f(x) := \frac{\beta^\alpha}{\Gamma(\alpha)} x^{-\alpha - 1} \exp\left(\frac{-\beta}{x}\right) with :math:`x > 0`. Parameters ========== a : Real number, `a > 0` a shape b : Real number, `b > 0` a scale Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import GammaInverse, density, cdf, E, variance >>> from sympy import Symbol, pprint >>> a = Symbol("a", positive=True) >>> b = Symbol("b", positive=True) >>> z = Symbol("z") >>> X = GammaInverse("x", a, b) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) -b --- a -a - 1 z b z e --------------- Gamma(a) >>> cdf(X)(z) Piecewise((uppergamma(a, b/z)/gamma(a), z > 0), (0, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Inverse-gamma_distribution """ return rv(name, GammaInverseDistribution, (a, b)) #------------------------------------------------------------------------------- # Gumbel distribution (Maximum and Minimum) -------------------------------------------------------- class GumbelDistribution(SingleContinuousDistribution): _argnames = ('beta', 'mu', 'minimum') set = Interval(-oo, oo) @staticmethod def check(beta, mu, minimum): _value_check(beta > 0, "Scale parameter beta must be positive.") def pdf(self, x): beta, mu = self.beta, self.mu z = (x - mu)/beta f_max = (1/beta)exp(-z - exp(-z)) f_min = (1/beta)exp(z - exp(z)) return Piecewise((f_min, self.minimum), (f_max, not self.minimum)) def _cdf(self, x): beta, mu = self.beta, self.mu z = (x - mu)/beta F_max = exp(-exp(-z)) F_min = 1 - exp(-exp(z)) return Piecewise((F_min, self.minimum), (F_max, not self.minimum)) def _characteristic_function(self, t): cf_max = gamma(1 - Iself.betat) exp(Iself.mut) cf_min = gamma(1 + Iself.betat) * exp(Iself.mut) return Piecewise((cf_min, self.minimum), (cf_max, not self.minimum)) def _moment_generating_function(self, t): mgf_max = gamma(1 - self.betat) exp(self.mut) mgf_min = gamma(1 + self.betat) * exp(self.mut) return Piecewise((mgf_min, self.minimum), (mgf_max, not self.minimum)) def Gumbel(name, beta, mu, minimum=False): r""" Create a Continuous Random Variable with Gumbel distribution. The density of the Gumbel distribution is given by For Maximum .. math:: f(x) := \dfrac{1}{\beta} \exp \left( -\dfrac{x-\mu}{\beta} - \exp \left( -\dfrac{x - \mu}{\beta} \right) \right) with :math:`x \in [ - \infty, \infty ]`. For Minimum .. math:: f(x) := \frac{e^{- e^{\frac{- \mu + x}{\beta}} + \frac{- \mu + x}{\beta}}}{\beta} with :math:`x \in [ - \infty, \infty ]`. Parameters ========== mu : Real number, 'mu' is a location beta : Real number, 'beta > 0' is a scale minimum : Boolean, by default, False, set to True for enabling minimum distribution Returns ======= A RandomSymbol Examples ======== >>> from sympy.stats import Gumbel, density, E, variance, cdf >>> from sympy import Symbol, simplify, pprint >>> x = Symbol("x") >>> mu = Symbol("mu") >>> beta = Symbol("beta", positive=True) >>> X = Gumbel("x", beta, mu) >>> density(X)(x) exp(-exp(-(-mu + x)/beta) - (-mu + x)/beta)/beta >>> cdf(X)(x) exp(-exp(-(-mu + x)/beta)) References ========== .. [1] http://mathworld.wolfram.com/GumbelDistribution.html .. [2] https://en.wikipedia.org/wiki/Gumbel_distribution .. [3] http://www.mathwave.com/help/easyfit/html/analyses/distributions/gumbel_max.html .. [4] http://www.mathwave.com/help/easyfit/html/analyses/distributions/gumbel_min.html """ return rv(name, GumbelDistribution, (beta, mu, minimum)) #------------------------------------------------------------------------------- # Gompertz distribution -------------------------------------------------------- class GompertzDistribution(SingleContinuousDistribution): _argnames = ('b', 'eta') set = Interval(0, oo) @staticmethod def check(b, eta): _value_check(b > 0, "b must be positive") _value_check(eta > 0, "eta must be positive") def pdf(self, x): eta, b = self.eta, self.b return betaexp(bx)exp(eta)exp(-etaexp(bx)) def _cdf(self, x): eta, b = self.eta, self.b return 1 - exp(eta)exp(-etaexp(bx)) def _moment_generating_function(self, t): eta, b = self.eta, self.b return eta exp(eta) * expint(t/b, eta) def Gompertz(name, b, eta): r""" Create a Continuous Random Variable with Gompertz distribution. The density of the Gompertz distribution is given by .. math:: f(x) := b \eta e^{b x} e^{\eta} \exp \left(-\eta e^{bx} \right) with :math: 'x \in [0, \inf)'. Parameters ========== b: Real number, 'b > 0' a scale eta: Real number, 'eta > 0' a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Gompertz, density, E, variance >>> from sympy import Symbol, simplify, pprint >>> b = Symbol("b", positive=True) >>> eta = Symbol("eta", positive=True) >>> z = Symbol("z") >>> X = Gompertz("x", b, eta) >>> density(X)(z) betaexp(eta)exp(bz)exp(-etaexp(bz)) References ========== .. [1] https://en.wikipedia.org/wiki/Gompertz_distribution """ return rv(name, GompertzDistribution, (b, eta)) #------------------------------------------------------------------------------- # Kumaraswamy distribution ----------------------------------------------------- class KumaraswamyDistribution(SingleContinuousDistribution): _argnames = ('a', 'b') set = Interval(0, oo) @staticmethod def check(a, b): _value_check(a > 0, "a must be positive") _value_check(b > 0, "b must be positive") def pdf(self, x): a, b = self.a, self.b return a b * x*(a-1) (1-xa)(b-1) def _cdf(self, x): a, b = self.a, self.b return Piecewise( (S.Zero, x < S.Zero), (1 - (1 - xa)b, x <= S.One), (S.One, True)) def Kumaraswamy(name, a, b): r""" Create a Continuous Random Variable with a Kumaraswamy distribution. The density of the Kumaraswamy distribution is given by .. math:: f(x) := a b x^{a-1} (1-x^a)^{b-1} with :math:`x \in [0,1]`. Parameters ========== a : Real number, `a > 0` a shape b : Real number, `b > 0` a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Kumaraswamy, density, E, variance, cdf >>> from sympy import Symbol, simplify, pprint >>> a = Symbol("a", positive=True) >>> b = Symbol("b", positive=True) >>> z = Symbol("z") >>> X = Kumaraswamy("x", a, b) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) b - 1 a - 1 / a\ abz \1 - z / >>> cdf(X)(z) Piecewise((0, z < 0), (1 - (1 - za)b, z <= 1), (1, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Kumaraswamy_distribution """ return rv(name, KumaraswamyDistribution, (a, b)) #------------------------------------------------------------------------------- # Laplace distribution --------------------------------------------------------- class LaplaceDistribution(SingleContinuousDistribution): _argnames = ('mu', 'b') set = Interval(-oo, oo) @staticmethod def check(mu, b): _value_check(b > 0, "Scale parameter b must be positive.") _value_check(mu.is_real, "Location parameter mu should be real") def pdf(self, x): mu, b = self.mu, self.b return 1/(2b)exp(-Abs(x - mu)/b) def _cdf(self, x): mu, b = self.mu, self.b return Piecewise( (S.Halfexp((x - mu)/b), x < mu), (S.One - S.Halfexp(-(x - mu)/b), x >= mu) ) def _characteristic_function(self, t): return exp(self.muIt) / (1 + self.b2t*2) def _moment_generating_function(self, t): return exp(self.mut) / (1 - self.b*2t*2) def Laplace(name, mu, b): r""" Create a continuous random variable with a Laplace distribution. The density of the Laplace distribution is given by .. math:: f(x) := \frac{1}{2 b} \exp \left(-\frac{\|x-\mu\|}b \right) Parameters ========== mu : Real number or a list/matrix, the location (mean) or the location vector b : Real number or a positive definite matrix, representing a scale or the covariance matrix. Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Laplace, density, cdf >>> from sympy import Symbol, pprint >>> mu = Symbol("mu") >>> b = Symbol("b", positive=True) >>> z = Symbol("z") >>> X = Laplace("x", mu, b) >>> density(X)(z) exp(-Abs(mu - z)/b)/(2b) >>> cdf(X)(z) Piecewise((exp((-mu + z)/b)/2, mu > z), (1 - exp((mu - z)/b)/2, True)) >>> L = Laplace('L', [1, 2], [[1, 0], [0, 1]]) >>> pprint(density(L)(1, 2), use_unicode=False) 5 / ____\ e besselk\0, \/ 35 / --------------------- pi References ========== .. [1] https://en.wikipedia.org/wiki/Laplace_distribution .. [2] http://mathworld.wolfram.com/LaplaceDistribution.html """ if isinstance(mu, (list, MatrixBase)) and\ isinstance(b, (list, MatrixBase)): from sympy.stats.joint_rv_types import MultivariateLaplaceDistribution return multivariate_rv( MultivariateLaplaceDistribution, name, mu, b) return rv(name, LaplaceDistribution, (mu, b)) #------------------------------------------------------------------------------- # Logistic distribution -------------------------------------------------------- class LogisticDistribution(SingleContinuousDistribution): _argnames = ('mu', 's') set = Interval(-oo, oo) @staticmethod def check(mu, s): _value_check(s > 0, "Scale parameter s must be positive.") def pdf(self, x): mu, s = self.mu, self.s return exp(-(x - mu)/s)/(s(1 + exp(-(x - mu)/s))*2) def _cdf(self, x): mu, s = self.mu, self.s return S.One/(1 + exp(-(x - mu)/s)) def _characteristic_function(self, t): return Piecewise((exp(Itself.mu) piself.st / sinh(piself.st), Ne(t, 0)), (S.One, True)) def _moment_generating_function(self, t): return exp(self.mut) beta_fn(1 - self.st, 1 + self.st) def _quantile(self, p): return self.mu - self.slog(-S.One + S.One/p) def Logistic(name, mu, s): r""" Create a continuous random variable with a logistic distribution. The density of the logistic distribution is given by .. math:: f(x) := \frac{e^{-(x-\mu)/s}} {s\left(1+e^{-(x-\mu)/s}\right)^2} Parameters ========== mu : Real number, the location (mean) s : Real number, `s > 0` a scale Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Logistic, density, cdf >>> from sympy import Symbol >>> mu = Symbol("mu", real=True) >>> s = Symbol("s", positive=True) >>> z = Symbol("z") >>> X = Logistic("x", mu, s) >>> density(X)(z) exp((mu - z)/s)/(s(exp((mu - z)/s) + 1)*2) >>> cdf(X)(z) 1/(exp((mu - z)/s) + 1) References ========== .. [1] https://en.wikipedia.org/wiki/Logistic_distribution .. [2] http://mathworld.wolfram.com/LogisticDistribution.html """ return rv(name, LogisticDistribution, (mu, s)) #------------------------------------------------------------------------------- # Log-logistic distribution -------------------------------------------------------- class LogLogisticDistribution(SingleContinuousDistribution): _argnames = ('alpha', 'beta') set = Interval(0, oo) @staticmethod def check(alpha, beta): _value_check(alpha > 0, "Scale parameter Alpha must be positive.") _value_check(beta > 0, "Shape parameter Beta must be positive.") def pdf(self, x): a, b = self.alpha, self.beta return ((b/a)(x/a)(b - 1))/(1 + (x/a)b)2 def _cdf(self, x): a, b = self.alpha, self.beta return 1/(1 + (x/a)(-b)) def _quantile(self, p): a, b = self.alpha, self.beta return a((p/(1 - p))(1/b)) def expectation(self, expr, var, kwargs): a, b = self.args return Piecewise((S.NaN, b <= 1), (pia/(bsin(pi/b)), True)) def LogLogistic(name, alpha, beta): r""" Create a continuous random variable with a log-logistic distribution. The distribution is unimodal when `beta > 1`. The density of the log-logistic distribution is given by .. math:: f(x) := \frac{(\frac{\beta}{\alpha})(\frac{x}{\alpha})^{\beta - 1}} {(1 + (\frac{x}{\alpha})^{\beta})^2} Parameters ========== alpha : Real number, `\alpha > 0`, scale parameter and median of distribution beta : Real number, `\beta > 0` a shape parameter Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import LogLogistic, density, cdf, quantile >>> from sympy import Symbol, pprint >>> alpha = Symbol("alpha", real=True, positive=True) >>> beta = Symbol("beta", real=True, positive=True) >>> p = Symbol("p") >>> z = Symbol("z", positive=True) >>> X = LogLogistic("x", alpha, beta) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) beta - 1 / z \ beta\|-----\| \alpha/ ------------------------ 2 / beta \ \|/ z \ \| alpha\|\|-----\| + 1\| \\alpha/ / >>> cdf(X)(z) 1/(1 + (z/alpha)(-beta)) >>> quantile(X)(p) alpha(p/(1 - p))(1/beta) References ========== .. [1] https://en.wikipedia.org/wiki/Log-logistic_distribution """ return rv(name, LogLogisticDistribution, (alpha, beta)) #------------------------------------------------------------------------------- # Log Normal distribution ------------------------------------------------------ class LogNormalDistribution(SingleContinuousDistribution): _argnames = ('mean', 'std') set = Interval(0, oo) @staticmethod def check(mean, std): _value_check(std > 0, "Parameter std must be positive.") def pdf(self, x): mean, std = self.mean, self.std return exp(-(log(x) - mean)2 / (2std2)) / (xsqrt(2pi)std) def sample(self): return random.lognormvariate(self.mean, self.std) def _cdf(self, x): mean, std = self.mean, self.std return Piecewise( (S.Half + S.Halferf((log(x) - mean)/sqrt(2)/std), x > 0), (S.Zero, True) ) def _moment_generating_function(self, t): raise NotImplementedError('Moment generating function of the log-normal distribution is not defined.') def LogNormal(name, mean, std): r""" Create a continuous random variable with a log-normal distribution. The density of the log-normal distribution is given by .. math:: f(x) := \frac{1}{x\sqrt{2\pi\sigma^2}} e^{-\frac{\left(\ln x-\mu\right)^2}{2\sigma^2}} with :math:`x \geq 0`. Parameters ========== mu : Real number, the log-scale sigma : Real number, :math:`\sigma^2 > 0` a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import LogNormal, density >>> from sympy import Symbol, simplify, pprint >>> mu = Symbol("mu", real=True) >>> sigma = Symbol("sigma", positive=True) >>> z = Symbol("z") >>> X = LogNormal("x", mu, sigma) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) 2 -(-mu + log(z)) ----------------- 2 ___ 2sigma \/ 2 e ------------------------ ____ 2\/ pi sigmaz >>> X = LogNormal('x', 0, 1) # Mean 0, standard deviation 1 >>> density(X)(z) sqrt(2)exp(-log(z)2/2)/(2sqrt(pi)z) References ========== .. [1] https://en.wikipedia.org/wiki/Lognormal .. [2] http://mathworld.wolfram.com/LogNormalDistribution.html """ return rv(name, LogNormalDistribution, (mean, std)) #------------------------------------------------------------------------------- # Maxwell distribution --------------------------------------------------------- class MaxwellDistribution(SingleContinuousDistribution): _argnames = ('a',) set = Interval(0, oo) @staticmethod def check(a): _value_check(a > 0, "Parameter a must be positive.") def pdf(self, x): a = self.a return sqrt(2/pi)x*2exp(-x*2/(2a2))/a3 def _cdf(self, x): a = self.a return erf(sqrt(2)x/(2a)) - sqrt(2)xexp(-x*2/(2a*2))/(sqrt(pi)a) def Maxwell(name, a): r""" Create a continuous random variable with a Maxwell distribution. The density of the Maxwell distribution is given by .. math:: f(x) := \sqrt{\frac{2}{\pi}} \frac{x^2 e^{-x^2/(2a^2)}}{a^3} with :math:`x \geq 0`. .. TODO - what does the parameter mean? Parameters ========== a : Real number, `a > 0` Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Maxwell, density, E, variance >>> from sympy import Symbol, simplify >>> a = Symbol("a", positive=True) >>> z = Symbol("z") >>> X = Maxwell("x", a) >>> density(X)(z) sqrt(2)z2exp(-z*2/(2a*2))/(sqrt(pi)a*3) >>> E(X) 2sqrt(2)a/sqrt(pi) >>> simplify(variance(X)) a2(-8 + 3pi)/pi References ========== .. [1] https://en.wikipedia.org/wiki/Maxwell_distribution .. [2] http://mathworld.wolfram.com/MaxwellDistribution.html """ return rv(name, MaxwellDistribution, (a, )) #------------------------------------------------------------------------------- # Nakagami distribution -------------------------------------------------------- class NakagamiDistribution(SingleContinuousDistribution): _argnames = ('mu', 'omega') set = Interval(0, oo) @staticmethod def check(mu, omega): _value_check(mu >= S.Half, "Shape parameter mu must be greater than equal to 1/2.") _value_check(omega > 0, "Spread parameter omega must be positive.") def pdf(self, x): mu, omega = self.mu, self.omega return 2mu*mu/(gamma(mu)omega*mu)x*(2mu - 1)exp(-mu/omegax*2) def _cdf(self, x): mu, omega = self.mu, self.omega return Piecewise( (lowergamma(mu, (mu/omega)x*2)/gamma(mu), x > 0), (S.Zero, True)) def Nakagami(name, mu, omega): r""" Create a continuous random variable with a Nakagami distribution. The density of the Nakagami distribution is given by .. math:: f(x) := \frac{2\mu^\mu}{\Gamma(\mu)\omega^\mu} x^{2\mu-1} \exp\left(-\frac{\mu}{\omega}x^2 \right) with :math:`x > 0`. Parameters ========== mu : Real number, `\mu \geq \frac{1}{2}` a shape omega : Real number, `\omega > 0`, the spread Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Nakagami, density, E, variance, cdf >>> from sympy import Symbol, simplify, pprint >>> mu = Symbol("mu", positive=True) >>> omega = Symbol("omega", positive=True) >>> z = Symbol("z") >>> X = Nakagami("x", mu, omega) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) 2 -muz ------- mu -mu 2mu - 1 omega 2mu omega z e ---------------------------------- Gamma(mu) >>> simplify(E(X)) sqrt(mu)sqrt(omega)gamma(mu + 1/2)/gamma(mu + 1) >>> V = simplify(variance(X)) >>> pprint(V, use_unicode=False) 2 omegaGamma (mu + 1/2) omega - ----------------------- Gamma(mu)Gamma(mu + 1) >>> cdf(X)(z) Piecewise((lowergamma(mu, muz2/omega)/gamma(mu), z > 0), (0, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Nakagami_distribution """ return rv(name, NakagamiDistribution, (mu, omega)) #------------------------------------------------------------------------------- # Normal distribution ---------------------------------------------------------- class NormalDistribution(SingleContinuousDistribution): _argnames = ('mean', 'std') @staticmethod def check(mean, std): _value_check(std > 0, "Standard deviation must be positive") def pdf(self, x): return exp(-(x - self.mean)2 / (2self.std2)) / (sqrt(2pi)self.std) def sample(self): return random.normalvariate(self.mean, self.std) def _cdf(self, x): mean, std = self.mean, self.std return erf(sqrt(2)(-mean + x)/(2std))/2 + S.Half def _characteristic_function(self, t): mean, std = self.mean, self.std return exp(Imeant - std2t*2/2) def _moment_generating_function(self, t): mean, std = self.mean, self.std return exp(meant + std*2t*2/2) def _quantile(self, p): mean, std = self.mean, self.std return mean + stdsqrt(2)erfinv(2p - 1) def Normal(name, mean, std): r""" Create a continuous random variable with a Normal distribution. The density of the Normal distribution is given by .. math:: f(x) := \frac{1}{\sigma\sqrt{2\pi}} e^{ -\frac{(x-\mu)^2}{2\sigma^2} } Parameters ========== mu : Real number or a list representing the mean or the mean vector sigma : Real number or a positive definite square matrix, :math:`\sigma^2 > 0` the variance Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Normal, density, E, std, cdf, skewness, quantile >>> from sympy import Symbol, simplify, pprint, factor, together, factor_terms >>> mu = Symbol("mu") >>> sigma = Symbol("sigma", positive=True) >>> z = Symbol("z") >>> y = Symbol("y") >>> p = Symbol("p") >>> X = Normal("x", mu, sigma) >>> density(X)(z) sqrt(2)exp(-(-mu + z)2/(2sigma*2))/(2sqrt(pi)sigma) >>> C = simplify(cdf(X))(z) # it needs a little more help... >>> pprint(C, use_unicode=False) / ___ \ \|\/ 2 (-mu + z)\| erf\|---------------\| \ 2sigma / 1 -------------------- + - 2 2 >>> quantile(X)(p) mu + sqrt(2)sigmaerfinv(2p - 1) >>> simplify(skewness(X)) 0 >>> X = Normal("x", 0, 1) # Mean 0, standard deviation 1 >>> density(X)(z) sqrt(2)exp(-z2/2)/(2sqrt(pi)) >>> E(2X + 1) 1 >>> simplify(std(2X + 1)) 2 >>> m = Normal('X', [1, 2], [[2, 1], [1, 2]]) >>> from sympy.stats.joint_rv import marginal_distribution >>> pprint(density(m)(y, z), use_unicode=False) /1 y\ /2y z\ / z\ / y 2z \ \|- - -\|\|--- - -\| + \|1 - -\|\|- - + --- - 1\| ___ \2 2/ \ 3 3/ \ 2/ \ 3 3 / \/ 3 e -------------------------------------------------- 6pi >>> marginal_distribution(m, m[0])(1) 1/(2sqrt(pi)) References ========== .. [1] https://en.wikipedia.org/wiki/Normal_distribution .. [2] http://mathworld.wolfram.com/NormalDistributionFunction.html """ if isinstance(mean, (list, MatrixBase)) and\ isinstance(std, (list, MatrixBase)): from sympy.stats.joint_rv_types import MultivariateNormalDistribution return multivariate_rv( MultivariateNormalDistribution, name, mean, std) return rv(name, NormalDistribution, (mean, std)) #------------------------------------------------------------------------------- # Inverse Gaussian distribution ---------------------------------------------------------- class GaussianInverseDistribution(SingleContinuousDistribution): _argnames = ('mean', 'shape') @property def set(self): return Interval(0, oo) @staticmethod def check(mean, shape): _value_check(shape > 0, "Shape parameter must be positive") _value_check(mean > 0, "Mean must be positive") def pdf(self, x): mu, s = self.mean, self.shape return exp(-s(x - mu)*2 / (2xmu2)) sqrt(s/((2pix*3))) def sample(self): scipy = import_module('scipy') if scipy: from scipy.stats import invgauss return invgauss.rvs(float(self.mean/self.shape), 0, float(self.shape)) else: raise NotImplementedError( 'Sampling the Inverse Gaussian Distribution requires Scipy.') def _cdf(self, x): from sympy.stats import cdf mu, s = self.mean, self.shape stdNormalcdf = cdf(Normal('x', 0, 1)) first_term = stdNormalcdf(sqrt(s/x) ((x/mu) - S.One)) second_term = exp(2s/mu) stdNormalcdf(-sqrt(s/x)(x/mu + S.One)) return first_term + second_term def _characteristic_function(self, t): mu, s = self.mean, self.shape return exp((s/mu)(1 - sqrt(1 - (2mu2It)/s))) def _moment_generating_function(self, t): mu, s = self.mean, self.shape return exp((s/mu)(1 - sqrt(1 - (2mu2t)/s))) def GaussianInverse(name, mean, shape): r""" Create a continuous random variable with an Inverse Gaussian distribution. Inverse Gaussian distribution is also known as Wald distribution. The density of the Inverse Gaussian distribution is given by .. math:: f(x) := \sqrt{\frac{\lambda}{2\pi x^3}} e^{-\frac{\lambda(x-\mu)^2}{2x\mu^2}} Parameters ========== mu : Positive number representing the mean lambda : Positive number representing the shape parameter Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import GaussianInverse, density, cdf, E, std, skewness >>> from sympy import Symbol, pprint >>> mu = Symbol("mu", positive=True) >>> lamda = Symbol("lambda", positive=True) >>> z = Symbol("z", positive=True) >>> X = GaussianInverse("x", mu, lamda) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) 2 -lambda(-mu + z) ------------------- 2 ___ ________ 2mu z \/ 2 \/ lambda e ------------------------------------- ____ 3/2 2\/ pi z >>> E(X) mu >>> std(X).expand() mu(3/2)/sqrt(lambda) >>> skewness(X).expand() 3sqrt(mu)/sqrt(lambda) References ========== .. [1] https://en.wikipedia.org/wiki/Inverse_Gaussian_distribution .. [2] http://mathworld.wolfram.com/InverseGaussianDistribution.html """ return rv(name, GaussianInverseDistribution, (mean, shape)) Wald = GaussianInverse #------------------------------------------------------------------------------- # Pareto distribution ---------------------------------------------------------- class ParetoDistribution(SingleContinuousDistribution): _argnames = ('xm', 'alpha') @property def set(self): return Interval(self.xm, oo) @staticmethod def check(xm, alpha): _value_check(xm > 0, "Xm must be positive") _value_check(alpha > 0, "Alpha must be positive") def pdf(self, x): xm, alpha = self.xm, self.alpha return alpha * xmalpha / x(alpha + 1) def sample(self): return random.paretovariate(self.alpha) def _cdf(self, x): xm, alpha = self.xm, self.alpha return Piecewise( (S.One - xmalpha/xalpha, x>=xm), (0, True), ) def _moment_generating_function(self, t): xm, alpha = self.xm, self.alpha return alpha * (-xmt)alpha uppergamma(-alpha, -xmt) def _characteristic_function(self, t): xm, alpha = self.xm, self.alpha return alpha (-I * xm * t) ** alpha * uppergamma(-alpha, -I * xm * t) def Pareto(name, xm, alpha): r""" Create a continuous random variable with the Pareto distribution. The density of the Pareto distribution is given by .. math:: f(x) := \frac{\alpha\,x_m^\alpha}{x^{\alpha+1}} with :math:`x \in [x_m,\infty]`. Parameters ========== xm : Real number, `x_m > 0`, a scale alpha : Real number, `\alpha > 0`, a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Pareto, density >>> from sympy import Symbol >>> xm = Symbol("xm", positive=True) >>> beta = Symbol("beta", positive=True) >>> z = Symbol("z") >>> X = Pareto("x", xm, beta) >>> density(X)(z) betaxmbetaz(-beta - 1) References ========== .. [1] https://en.wikipedia.org/wiki/Pareto_distribution .. [2] http://mathworld.wolfram.com/ParetoDistribution.html """ return rv(name, ParetoDistribution, (xm, alpha)) #------------------------------------------------------------------------------- # QuadraticU distribution ------------------------------------------------------ class QuadraticUDistribution(SingleContinuousDistribution): _argnames = ('a', 'b') @property def set(self): return Interval(self.a, self.b) @staticmethod def check(a, b): _value_check(b > a, "Parameter b must be in range (%s, oo)."%(a)) def pdf(self, x): a, b = self.a, self.b alpha = 12 / (b-a)3 beta = (a+b) / 2 return Piecewise( (alpha * (x-beta)*2, And(a<=x, x<=b)), (S.Zero, True)) def _moment_generating_function(self, t): a, b = self.a, self.b return -3 (exp(at) (4 + (a*2 + 2a(-2 + b) + b2) t) - exp(bt) (4 + (-4b + (a + b)2) t)) / ((a-b)*3 t*2) def _characteristic_function(self, t): def _moment_generating_function(self, t): a, b = self.a, self.b return -3I(exp(Iatexp(Ibt)) * (4I - (-4b + (a+b)*2)t)) / ((a-b)*3 t*2) def QuadraticU(name, a, b): r""" Create a Continuous Random Variable with a U-quadratic distribution. The density of the U-quadratic distribution is given by .. math:: f(x) := \alpha (x-\beta)^2 with :math:`x \in [a,b]`. Parameters ========== a : Real number b : Real number, :math:`a < b` Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import QuadraticU, density, E, variance >>> from sympy import Symbol, simplify, factor, pprint >>> a = Symbol("a", real=True) >>> b = Symbol("b", real=True) >>> z = Symbol("z") >>> X = QuadraticU("x", a, b) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) / 2 \| / a b \ \|12\|- - - - + z\| \| \ 2 2 / <----------------- for And(b >= z, a <= z) \| 3 \| (-a + b) \| \ 0 otherwise References ========== .. [1] https://en.wikipedia.org/wiki/U-quadratic_distribution """ return rv(name, QuadraticUDistribution, (a, b)) #------------------------------------------------------------------------------- # RaisedCosine distribution ---------------------------------------------------- class RaisedCosineDistribution(SingleContinuousDistribution): _argnames = ('mu', 's') @property def set(self): return Interval(self.mu - self.s, self.mu + self.s) @staticmethod def check(mu, s): _value_check(s > 0, "s must be positive") def pdf(self, x): mu, s = self.mu, self.s return Piecewise( ((1+cos(pi(x-mu)/s)) / (2s), And(mu-s<=x, x<=mu+s)), (S.Zero, True)) def _characteristic_function(self, t): mu, s = self.mu, self.s return Piecewise((exp(-Ipimu/s)/2, Eq(t, -pi/s)), (exp(Ipimu/s)/2, Eq(t, pi/s)), (pi*2sin(st)exp(Imut) / (st(pi2 - s2t2)), True)) def _moment_generating_function(self, t): mu, s = self.mu, self.s return pi2 sinh(st) exp(mut) / (st(pi2 + s2t*2)) def RaisedCosine(name, mu, s): r""" Create a Continuous Random Variable with a raised cosine distribution. The density of the raised cosine distribution is given by .. math:: f(x) := \frac{1}{2s}\left(1+\cos\left(\frac{x-\mu}{s}\pi\right)\right) with :math:`x \in [\mu-s,\mu+s]`. Parameters ========== mu : Real number s : Real number, `s > 0` Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import RaisedCosine, density, E, variance >>> from sympy import Symbol, simplify, pprint >>> mu = Symbol("mu", real=True) >>> s = Symbol("s", positive=True) >>> z = Symbol("z") >>> X = RaisedCosine("x", mu, s) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) / /pi(-mu + z)\ \|cos\|------------\| + 1 \| \ s / <--------------------- for And(z >= mu - s, z <= mu + s) \| 2s \| \ 0 otherwise References ========== .. [1] https://en.wikipedia.org/wiki/Raised_cosine_distribution """ return rv(name, RaisedCosineDistribution, (mu, s)) #------------------------------------------------------------------------------- # Rayleigh distribution -------------------------------------------------------- class RayleighDistribution(SingleContinuousDistribution): _argnames = ('sigma',) set = Interval(0, oo) @staticmethod def check(sigma): _value_check(sigma > 0, "Scale parameter sigma must be positive.") def pdf(self, x): sigma = self.sigma return x/sigma2exp(-x*2/(2sigma2)) def _cdf(self, x): sigma = self.sigma return 1 - exp(-(x2/(2sigma2))) def _characteristic_function(self, t): sigma = self.sigma return 1 - sigmatexp(-sigma2t*2/2) sqrt(pi/2) * (erfi(sigmat/sqrt(2)) - I) def _moment_generating_function(self, t): sigma = self.sigma return 1 + sigmatexp(sigma2t*2/2) sqrt(pi/2) * (erf(sigmat/sqrt(2)) + 1) def Rayleigh(name, sigma): r""" Create a continuous random variable with a Rayleigh distribution. The density of the Rayleigh distribution is given by .. math :: f(x) := \frac{x}{\sigma^2} e^{-x^2/2\sigma^2} with :math:`x > 0`. Parameters ========== sigma : Real number, `\sigma > 0` Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Rayleigh, density, E, variance >>> from sympy import Symbol, simplify >>> sigma = Symbol("sigma", positive=True) >>> z = Symbol("z") >>> X = Rayleigh("x", sigma) >>> density(X)(z) zexp(-z*2/(2sigma2))/sigma2 >>> E(X) sqrt(2)sqrt(pi)sigma/2 >>> variance(X) -pisigma2/2 + 2sigma*2 References ========== .. [1] https://en.wikipedia.org/wiki/Rayleigh_distribution .. [2] http://mathworld.wolfram.com/RayleighDistribution.html """ return rv(name, RayleighDistribution, (sigma, )) #------------------------------------------------------------------------------- # Shifted Gompertz distribution ------------------------------------------------ class ShiftedGompertzDistribution(SingleContinuousDistribution): _argnames = ('b', 'eta') set = Interval(0, oo) @staticmethod def check(b, eta): _value_check(b > 0, "b must be positive") _value_check(eta > 0, "eta must be positive") def pdf(self, x): b, eta = self.b, self.eta return bexp(-bx)exp(-etaexp(-bx))(1+eta(1-exp(-bx))) def ShiftedGompertz(name, b, eta): r""" Create a continuous random variable with a Shifted Gompertz distribution. The density of the Shifted Gompertz distribution is given by .. math:: f(x) := b e^{-b x} e^{-\eta \exp(-b x)} \left[1 + \eta(1 - e^(-bx)) \right] with :math: 'x \in [0, \inf)'. Parameters ========== b: Real number, 'b > 0' a scale eta: Real number, 'eta > 0' a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import ShiftedGompertz, density, E, variance >>> from sympy import Symbol >>> b = Symbol("b", positive=True) >>> eta = Symbol("eta", positive=True) >>> x = Symbol("x") >>> X = ShiftedGompertz("x", b, eta) >>> density(X)(x) b(eta(1 - exp(-bx)) + 1)exp(-bx)exp(-etaexp(-bx)) References ========== .. [1] https://en.wikipedia.org/wiki/Shifted_Gompertz_distribution """ return rv(name, ShiftedGompertzDistribution, (b, eta)) #------------------------------------------------------------------------------- # StudentT distribution -------------------------------------------------------- class StudentTDistribution(SingleContinuousDistribution): _argnames = ('nu',) set = Interval(-oo, oo) @staticmethod def check(nu): _value_check(nu > 0, "Degrees of freedom nu must be positive.") def pdf(self, x): nu = self.nu return 1/(sqrt(nu)beta_fn(S(1)/2, nu/2))(1 + x2/nu)(-(nu + 1)/2) def _cdf(self, x): nu = self.nu return S.Half + xgamma((nu+1)/2)hyper((S.Half, (nu+1)/2), (S(3)/2,), -x2/nu)/(sqrt(pinu)gamma(nu/2)) def _moment_generating_function(self, t): raise NotImplementedError('The moment generating function for the Student-T distribution is undefined.') def StudentT(name, nu): r""" Create a continuous random variable with a student's t distribution. The density of the student's t distribution is given by .. math:: f(x) := \frac{\Gamma \left(\frac{\nu+1}{2} \right)} {\sqrt{\nu\pi}\Gamma \left(\frac{\nu}{2} \right)} \left(1+\frac{x^2}{\nu} \right)^{-\frac{\nu+1}{2}} Parameters ========== nu : Real number, `\nu > 0`, the degrees of freedom Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import StudentT, density, E, variance, cdf >>> from sympy import Symbol, simplify, pprint >>> nu = Symbol("nu", positive=True) >>> z = Symbol("z") >>> X = StudentT("x", nu) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) nu 1 - -- - - 2 2 / 2\ \| z \| \|1 + --\| \ nu/ ----------------- ____ / nu\ \/ nu B\|1/2, --\| \ 2 / >>> cdf(X)(z) 1/2 + zgamma(nu/2 + 1/2)hyper((1/2, nu/2 + 1/2), (3/2,), -z*2/nu)/(sqrt(pi)sqrt(nu)gamma(nu/2)) References ========== .. [1] https://en.wikipedia.org/wiki/Student_t-distribution .. [2] http://mathworld.wolfram.com/Studentst-Distribution.html """ return rv(name, StudentTDistribution, (nu, )) #------------------------------------------------------------------------------- # Trapezoidal distribution ------------------------------------------------------ class TrapezoidalDistribution(SingleContinuousDistribution): _argnames = ('a', 'b', 'c', 'd') @property def set(self): return Interval(self.a, self.d) @staticmethod def check(a, b, c, d): _value_check(a < d, "Lower bound parameter a < %s. a = %s"%(d, a)) _value_check((a <= b, b < c), "Level start parameter b must be in range [%s, %s). b = %s"%(a, c, b)) _value_check((b < c, c <= d), "Level end parameter c must be in range (%s, %s]. c = %s"%(b, d, c)) _value_check(d >= c, "Upper bound parameter d > %s. d = %s"%(c, d)) def pdf(self, x): a, b, c, d = self.a, self.b, self.c, self.d return Piecewise( (2(x-a) / ((b-a)(d+c-a-b)), And(a <= x, x < b)), (2 / (d+c-a-b), And(b <= x, x < c)), (2(d-x) / ((d-c)(d+c-a-b)), And(c <= x, x <= d)), (S.Zero, True)) def Trapezoidal(name, a, b, c, d): r""" Create a continuous random variable with a trapezoidal distribution. The density of the trapezoidal distribution is given by .. math:: f(x) := \begin{cases} 0 & \mathrm{for\ } x < a, \\ \frac{2(x-a)}{(b-a)(d+c-a-b)} & \mathrm{for\ } a \le x < b, \\ \frac{2}{d+c-a-b} & \mathrm{for\ } b \le x < c, \\ \frac{2(d-x)}{(d-c)(d+c-a-b)} & \mathrm{for\ } c \le x < d, \\ 0 & \mathrm{for\ } d < x. \end{cases} Parameters ========== a : Real number, :math:`a < d` b : Real number, :math:`a <= b < c` c : Real number, :math:`b < c <= d` d : Real number Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Trapezoidal, density, E >>> from sympy import Symbol, pprint >>> a = Symbol("a") >>> b = Symbol("b") >>> c = Symbol("c") >>> d = Symbol("d") >>> z = Symbol("z") >>> X = Trapezoidal("x", a,b,c,d) >>> pprint(density(X)(z), use_unicode=False) / -2a + 2z \|------------------------- for And(a <= z, b > z) \|(-a + b)(-a - b + c + d) \| \| 2 \| -------------- for And(b <= z, c > z) < -a - b + c + d \| \| 2d - 2z \|------------------------- for And(d >= z, c <= z) \|(-c + d)(-a - b + c + d) \| \ 0 otherwise References ========== .. [1] https://en.wikipedia.org/wiki/Trapezoidal_distribution """ return rv(name, TrapezoidalDistribution, (a, b, c, d)) #------------------------------------------------------------------------------- # Triangular distribution ------------------------------------------------------ class TriangularDistribution(SingleContinuousDistribution): _argnames = ('a', 'b', 'c') @property def set(self): return Interval(self.a, self.b) @staticmethod def check(a, b, c): _value_check(b > a, "Parameter b > %s. b = %s"%(a, b)) _value_check((a <= c, c <= b), "Parameter c must be in range [%s, %s]. c = %s"%(a, b, c)) def pdf(self, x): a, b, c = self.a, self.b, self.c return Piecewise( (2(x - a)/((b - a)(c - a)), And(a <= x, x < c)), (2/(b - a), Eq(x, c)), (2(b - x)/((b - a)(b - c)), And(c < x, x <= b)), (S.Zero, True)) def _characteristic_function(self, t): a, b, c = self.a, self.b, self.c return -2 ((b-c) * exp(Iat) - (b-a) * exp(Ict) + (c-a) * exp(Ibt)) / ((b-a)(c-a)(b-c)t2) def _moment_generating_function(self, t): a, b, c = self.a, self.b, self.c return 2 ((b - c) * exp(a * t) - (b - a) * exp(c * t) + (c - a) * exp(b * t)) / ( (b - a) * (c - a) * (b - c) * t ** 2) def Triangular(name, a, b, c): r""" Create a continuous random variable with a triangular distribution. The density of the triangular distribution is given by .. math:: f(x) := \begin{cases} 0 & \mathrm{for\ } x < a, \\ \frac{2(x-a)}{(b-a)(c-a)} & \mathrm{for\ } a \le x < c, \\ \frac{2}{b-a} & \mathrm{for\ } x = c, \\ \frac{2(b-x)}{(b-a)(b-c)} & \mathrm{for\ } c < x \le b, \\ 0 & \mathrm{for\ } b < x. \end{cases} Parameters ========== a : Real number, :math:`a \in \left(-\infty, \infty\right)` b : Real number, :math:`a < b` c : Real number, :math:`a \leq c \leq b` Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Triangular, density, E >>> from sympy import Symbol, pprint >>> a = Symbol("a") >>> b = Symbol("b") >>> c = Symbol("c") >>> z = Symbol("z") >>> X = Triangular("x", a,b,c) >>> pprint(density(X)(z), use_unicode=False) / -2a + 2z \|----------------- for And(a <= z, c > z) \|(-a + b)(-a + c) \| \| 2 \| ------ for c = z < -a + b \| \| 2b - 2z \|---------------- for And(b >= z, c < z) \|(-a + b)(b - c) \| \ 0 otherwise References ========== .. [1] https://en.wikipedia.org/wiki/Triangular_distribution .. [2] http://mathworld.wolfram.com/TriangularDistribution.html """ return rv(name, TriangularDistribution, (a, b, c)) #------------------------------------------------------------------------------- # Uniform distribution --------------------------------------------------------- class UniformDistribution(SingleContinuousDistribution): _argnames = ('left', 'right') @property def set(self): return Interval(self.left, self.right) @staticmethod def check(left, right): _value_check(left < right, "Lower limit should be less than Upper limit.") def pdf(self, x): left, right = self.left, self.right return Piecewise( (S.One/(right - left), And(left <= x, x <= right)), (S.Zero, True) ) def _cdf(self, x): left, right = self.left, self.right return Piecewise( (S.Zero, x < left), ((x - left)/(right - left), x <= right), (S.One, True) ) def _characteristic_function(self, t): left, right = self.left, self.right return Piecewise(((exp(Itright) - exp(Itleft)) / (It(right - left)), Ne(t, 0)), (S.One, True)) def _moment_generating_function(self, t): left, right = self.left, self.right return Piecewise(((exp(tright) - exp(tleft)) / (t * (right - left)), Ne(t, 0)), (S.One, True)) def expectation(self, expr, var, kwargs): from sympy import Max, Min kwargs['evaluate'] = True result = SingleContinuousDistribution.expectation(self, expr, var, kwargs) result = result.subs({Max(self.left, self.right): self.right, Min(self.left, self.right): self.left}) return result def sample(self): return random.uniform(self.left, self.right) def Uniform(name, left, right): r""" Create a continuous random variable with a uniform distribution. The density of the uniform distribution is given by .. math:: f(x) := \begin{cases} \frac{1}{b - a} & \text{for } x \in [a,b] \\ 0 & \text{otherwise} \end{cases} with :math:`x \in [a,b]`. Parameters ========== a : Real number, :math:`-\infty < a` the left boundary b : Real number, :math:`a < b < \infty` the right boundary Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Uniform, density, cdf, E, variance, skewness >>> from sympy import Symbol, simplify >>> a = Symbol("a", negative=True) >>> b = Symbol("b", positive=True) >>> z = Symbol("z") >>> X = Uniform("x", a, b) >>> density(X)(z) Piecewise((1/(-a + b), (b >= z) & (a <= z)), (0, True)) >>> cdf(X)(z) # doctest: +SKIP -a/(-a + b) + z/(-a + b) >>> simplify(E(X)) a/2 + b/2 >>> simplify(variance(X)) a*2/12 - ab/6 + b*2/12 References ========== .. [1] https://en.wikipedia.org/wiki/Uniform_distribution_%28continuous%29 .. [2] http://mathworld.wolfram.com/UniformDistribution.html """ return rv(name, UniformDistribution, (left, right)) #------------------------------------------------------------------------------- # UniformSum distribution ------------------------------------------------------ class UniformSumDistribution(SingleContinuousDistribution): _argnames = ('n',) @property def set(self): return Interval(0, self.n) @staticmethod def check(n): _value_check((n > 0, n.is_integer), "Parameter n must be positive integer.") def pdf(self, x): n = self.n k = Dummy("k") return 1/factorial( n - 1)Sum((-1)*kbinomial(n, k)(x - k)(n - 1), (k, 0, floor(x))) def _cdf(self, x): n = self.n k = Dummy("k") return Piecewise((S.Zero, x < 0), (1/factorial(n)Sum((-1)*kbinomial(n, k)(x - k)(n), (k, 0, floor(x))), x <= n), (S.One, True)) def _characteristic_function(self, t): return ((exp(It) - 1) / (It))self.n def _moment_generating_function(self, t): return ((exp(t) - 1) / t)self.n def UniformSum(name, n): r""" Create a continuous random variable with an Irwin-Hall distribution. The probability distribution function depends on a single parameter `n` which is an integer. The density of the Irwin-Hall distribution is given by .. math :: f(x) := \frac{1}{(n-1)!}\sum_{k=0}^{\left\lfloor x\right\rfloor}(-1)^k \binom{n}{k}(x-k)^{n-1} Parameters ========== n : A positive Integer, `n > 0` Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import UniformSum, density, cdf >>> from sympy import Symbol, pprint >>> n = Symbol("n", integer=True) >>> z = Symbol("z") >>> X = UniformSum("x", n) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) floor(z) ___ \ ` \ k n - 1 /n\ ) (-1) (-k + z) \| \| / \k/ /__, k = 0 -------------------------------- (n - 1)! >>> cdf(X)(z) Piecewise((0, z < 0), (Sum((-1)_k(-_k + z)*nbinomial(n, _k), (_k, 0, floor(z)))/factorial(n), n >= z), (1, True)) Compute cdf with specific 'x' and 'n' values as follows : >>> cdf(UniformSum("x", 5), evaluate=False)(2).doit() 9/40 The argument evaluate=False prevents an attempt at evaluation of the sum for general n, before the argument 2 is passed. References ========== .. [1] https://en.wikipedia.org/wiki/Uniform_sum_distribution .. [2] http://mathworld.wolfram.com/UniformSumDistribution.html """ return rv(name, UniformSumDistribution, (n, )) #------------------------------------------------------------------------------- # VonMises distribution -------------------------------------------------------- class VonMisesDistribution(SingleContinuousDistribution): _argnames = ('mu', 'k') set = Interval(0, 2pi) @staticmethod def check(mu, k): _value_check(k > 0, "k must be positive") def pdf(self, x): mu, k = self.mu, self.k return exp(kcos(x-mu)) / (2pibesseli(0, k)) def VonMises(name, mu, k): r""" Create a Continuous Random Variable with a von Mises distribution. The density of the von Mises distribution is given by .. math:: f(x) := \frac{e^{\kappa\cos(x-\mu)}}{2\pi I_0(\kappa)} with :math:`x \in [0,2\pi]`. Parameters ========== mu : Real number, measure of location k : Real number, measure of concentration Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import VonMises, density, E, variance >>> from sympy import Symbol, simplify, pprint >>> mu = Symbol("mu") >>> k = Symbol("k", positive=True) >>> z = Symbol("z") >>> X = VonMises("x", mu, k) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) kcos(mu - z) e ------------------ 2pibesseli(0, k) References ========== .. [1] https://en.wikipedia.org/wiki/Von_Mises_distribution .. [2] http://mathworld.wolfram.com/vonMisesDistribution.html """ return rv(name, VonMisesDistribution, (mu, k)) #------------------------------------------------------------------------------- # Weibull distribution --------------------------------------------------------- class WeibullDistribution(SingleContinuousDistribution): _argnames = ('alpha', 'beta') set = Interval(0, oo) @staticmethod def check(alpha, beta): _value_check(alpha > 0, "Alpha must be positive") _value_check(beta > 0, "Beta must be positive") def pdf(self, x): alpha, beta = self.alpha, self.beta return beta (x/alpha)*(beta - 1) exp(-(x/alpha)*beta) / alpha def sample(self): return random.weibullvariate(self.alpha, self.beta) def Weibull(name, alpha, beta): r""" Create a continuous random variable with a Weibull distribution. The density of the Weibull distribution is given by .. math:: f(x) := \begin{cases} \frac{k}{\lambda}\left(\frac{x}{\lambda}\right)^{k-1} e^{-(x/\lambda)^{k}} & x\geq0\\ 0 & x<0 \end{cases} Parameters ========== lambda : Real number, :math:`\lambda > 0` a scale k : Real number, `k > 0` a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Weibull, density, E, variance >>> from sympy import Symbol, simplify >>> l = Symbol("lambda", positive=True) >>> k = Symbol("k", positive=True) >>> z = Symbol("z") >>> X = Weibull("x", l, k) >>> density(X)(z) k(z/lambda)*(k - 1)exp(-(z/lambda)*k)/lambda >>> simplify(E(X)) lambdagamma(1 + 1/k) >>> simplify(variance(X)) lambda*2(-gamma(1 + 1/k)*2 + gamma(1 + 2/k)) References ========== .. [1] https://en.wikipedia.org/wiki/Weibull_distribution .. [2] http://mathworld.wolfram.com/WeibullDistribution.html """ return rv(name, WeibullDistribution, (alpha, beta)) #------------------------------------------------------------------------------- # Wigner semicircle distribution ----------------------------------------------- class WignerSemicircleDistribution(SingleContinuousDistribution): _argnames = ('R',) @property def set(self): return Interval(-self.R, self.R) @staticmethod def check(R): _value_check(R > 0, "Radius R must be positive.") def pdf(self, x): R = self.R return 2/(piR*2)sqrt(R2 - x2) def _characteristic_function(self, t): return Piecewise((2 * besselj(1, self.Rt) / (self.Rt), Ne(t, 0)), (S.One, True)) def _moment_generating_function(self, t): return Piecewise((2 * besseli(1, self.Rt) / (self.Rt), Ne(t, 0)), (S.One, True)) def WignerSemicircle(name, R): r""" Create a continuous random variable with a Wigner semicircle distribution. The density of the Wigner semicircle distribution is given by .. math:: f(x) := \frac2{\pi R^2}\,\sqrt{R^2-x^2} with :math:`x \in [-R,R]`. Parameters ========== R : Real number, `R > 0`, the radius Returns ======= A `RandomSymbol`. Examples ======== >>> from sympy.stats import WignerSemicircle, density, E >>> from sympy import Symbol, simplify >>> R = Symbol("R", positive=True) >>> z = Symbol("z") >>> X = WignerSemicircle("x", R) >>> density(X)(z) 2sqrt(R2 - z2)/(piR**2) >>> E(X) 0 References ========== .. [1] https://en.wikipedia.org/wiki/Wigner_semicircle_distribution .. [2] http://mathworld.wolfram.com/WignersSemicircleLaw.html """ return rv(name, WignerSemicircleDistribution, (R,))
d9015895ff22f15160eb38950d5a1b18fe753304d4424f4c499e2f7a20f1a8b0	""" Finite Discrete Random Variables - Prebuilt variable types Contains ======== FiniteRV DiscreteUniform Die Bernoulli Coin Binomial BetaBinomial Hypergeometric Rademacher """ from __future__ import print_function, division from sympy import (S, sympify, Rational, binomial, cacheit, Integer, Dummy, Eq, Intersection, Interval, Symbol, Lambda, Piecewise, Or, Gt, Lt, Ge, Le, Contains) from sympy import beta as beta_fn from sympy.core.compatibility import range from sympy.stats.frv import (SingleFiniteDistribution, SingleFinitePSpace) from sympy.stats.rv import _value_check, Density, RandomSymbol __all__ = ['FiniteRV', 'DiscreteUniform', 'Die', 'Bernoulli', 'Coin', 'Binomial', 'BetaBinomial', 'Hypergeometric', 'Rademacher' ] def rv(name, cls, args): args = list(map(sympify, args)) dist = cls(args) dist.check(args) return SingleFinitePSpace(name, dist).value class FiniteDistributionHandmade(SingleFiniteDistribution): @property def dict(self): return self.args[0] def pmf(self, x): x = Symbol('x') return Lambda(x, Piecewise(( [(v, Eq(k, x)) for k, v in self.dict.items()] + [(0, True)]))) @property def set(self): return set(self.dict.keys()) @staticmethod def check(density): for p in density.values(): _value_check((p >= 0, p <= 1), "Probability at a point must be between 0 and 1.") _value_check(Eq(sum(density.values()), 1), "Total Probability must be 1.") def FiniteRV(name, density): """ Create a Finite Random Variable given a dict representing the density. Returns a RandomSymbol. >>> from sympy.stats import FiniteRV, P, E >>> density = {0: .1, 1: .2, 2: .3, 3: .4} >>> X = FiniteRV('X', density) >>> E(X) 2.00000000000000 >>> P(X >= 2) 0.700000000000000 """ return rv(name, FiniteDistributionHandmade, density) class DiscreteUniformDistribution(SingleFiniteDistribution): @property def p(self): return Rational(1, len(self.args)) @property @cacheit def dict(self): return dict((k, self.p) for k in self.set) @property def set(self): return set(self.args) def pmf(self, x): if x in self.args: return self.p else: return S.Zero def DiscreteUniform(name, items): """ Create a Finite Random Variable representing a uniform distribution over the input set. Returns a RandomSymbol. Examples ======== >>> from sympy.stats import DiscreteUniform, density >>> from sympy import symbols >>> X = DiscreteUniform('X', symbols('a b c')) # equally likely over a, b, c >>> density(X).dict {a: 1/3, b: 1/3, c: 1/3} >>> Y = DiscreteUniform('Y', list(range(5))) # distribution over a range >>> density(Y).dict {0: 1/5, 1: 1/5, 2: 1/5, 3: 1/5, 4: 1/5} References ========== .. [1] https://en.wikipedia.org/wiki/Discrete_uniform_distribution .. [2] http://mathworld.wolfram.com/DiscreteUniformDistribution.html """ return rv(name, DiscreteUniformDistribution, items) class DieDistribution(SingleFiniteDistribution): _argnames = ('sides',) @staticmethod def check(sides): _value_check((sides.is_positive, sides.is_integer), "number of sides must be a positive integer.") @property def is_symbolic(self): return not self.sides.is_number @property def high(self): return self.sides @property def low(self): return S(1) @property def set(self): if self.is_symbolic: return Intersection(S.Naturals0, Interval(0, self.sides)) return set(map(Integer, list(range(1, self.sides + 1)))) def pmf(self, x): x = sympify(x) if not (x.is_number or x.is_Symbol or isinstance(x, RandomSymbol)): raise ValueError("'x' expected as an argument of type 'number' or 'Symbol' or , " "'RandomSymbol' not %s" % (type(x))) cond = Ge(x, 1) & Le(x, self.sides) & Contains(x, S.Integers) return Piecewise((S(1)/self.sides, cond), (S.Zero, True)) def Die(name, sides=6): """ Create a Finite Random Variable representing a fair die. Returns a RandomSymbol. Examples ======== >>> from sympy.stats import Die, density >>> from sympy import Symbol >>> D6 = Die('D6', 6) # Six sided Die >>> density(D6).dict {1: 1/6, 2: 1/6, 3: 1/6, 4: 1/6, 5: 1/6, 6: 1/6} >>> D4 = Die('D4', 4) # Four sided Die >>> density(D4).dict {1: 1/4, 2: 1/4, 3: 1/4, 4: 1/4} >>> n = Symbol('n', positive=True, integer=True) >>> Dn = Die('Dn', n) # n sided Die >>> density(Dn).dict Density(DieDistribution(n)) >>> density(Dn).dict.subs(n, 4).doit() {1: 1/4, 2: 1/4, 3: 1/4, 4: 1/4} """ return rv(name, DieDistribution, sides) class BernoulliDistribution(SingleFiniteDistribution): _argnames = ('p', 'succ', 'fail') @staticmethod def check(p, succ, fail): _value_check((p >= 0, p <= 1), "p should be in range [0, 1].") @property def set(self): return set([self.succ, self.fail]) def pmf(self, x): return Piecewise((self.p, x == self.succ), (1 - self.p, x == self.fail), (0, True)) def Bernoulli(name, p, succ=1, fail=0): """ Create a Finite Random Variable representing a Bernoulli process. Returns a RandomSymbol Examples ======== >>> from sympy.stats import Bernoulli, density >>> from sympy import S >>> X = Bernoulli('X', S(3)/4) # 1-0 Bernoulli variable, probability = 3/4 >>> density(X).dict {0: 1/4, 1: 3/4} >>> X = Bernoulli('X', S.Half, 'Heads', 'Tails') # A fair coin toss >>> density(X).dict {Heads: 1/2, Tails: 1/2} References ========== .. [1] https://en.wikipedia.org/wiki/Bernoulli_distribution .. [2] http://mathworld.wolfram.com/BernoulliDistribution.html """ return rv(name, BernoulliDistribution, p, succ, fail) def Coin(name, p=S.Half): """ Create a Finite Random Variable representing a Coin toss. Probability p is the chance of gettings "Heads." Half by default Returns a RandomSymbol. Examples ======== >>> from sympy.stats import Coin, density >>> from sympy import Rational >>> C = Coin('C') # A fair coin toss >>> density(C).dict {H: 1/2, T: 1/2} >>> C2 = Coin('C2', Rational(3, 5)) # An unfair coin >>> density(C2).dict {H: 3/5, T: 2/5} See Also ======== sympy.stats.Binomial References ========== .. [1] https://en.wikipedia.org/wiki/Coin_flipping """ return rv(name, BernoulliDistribution, p, 'H', 'T') class BinomialDistribution(SingleFiniteDistribution): _argnames = ('n', 'p', 'succ', 'fail') @staticmethod def check(n, p, succ, fail): _value_check((n.is_integer, n.is_nonnegative), "'n' must be nonnegative integer.") _value_check((p <= 1, p >= 0), "p should be in range [0, 1].") @property def high(self): return self.n @property def low(self): return S(0) @property def is_symbolic(self): return not self.n.is_number @property def set(self): if self.is_symbolic: return Intersection(S.Naturals0, Interval(0, self.n)) return set(self.dict.keys()) def pmf(self, x): n, p = self.n, self.p x = sympify(x) if not (x.is_number or x.is_Symbol or isinstance(x, RandomSymbol)): raise ValueError("'x' expected as an argument of type 'number' or 'Symbol' or , " "'RandomSymbol' not %s" % (type(x))) cond = Ge(x, 0) & Le(x, n) & Contains(x, S.Integers) return Piecewise((binomial(n, x) p*x (1 - p)*(n - x), cond), (S.Zero, True)) @property @cacheit def dict(self): if self.is_symbolic: return Density(self) return dict((kself.succ + (self.n-k)self.fail, self.pmf(k)) for k in range(0, self.n + 1)) def Binomial(name, n, p, succ=1, fail=0): """ Create a Finite Random Variable representing a binomial distribution. Returns a RandomSymbol. Examples ======== >>> from sympy.stats import Binomial, density >>> from sympy import S, Symbol >>> X = Binomial('X', 4, S.Half) # Four "coin flips" >>> density(X).dict {0: 1/16, 1: 1/4, 2: 3/8, 3: 1/4, 4: 1/16} >>> n = Symbol('n', positive=True, integer=True) >>> p = Symbol('p', positive=True) >>> X = Binomial('X', n, S.Half) # n "coin flips" >>> density(X).dict Density(BinomialDistribution(n, 1/2, 1, 0)) >>> density(X).dict.subs(n, 4).doit() {0: 1/16, 1: 1/4, 2: 3/8, 3: 1/4, 4: 1/16} References ========== .. [1] https://en.wikipedia.org/wiki/Binomial_distribution .. [2] http://mathworld.wolfram.com/BinomialDistribution.html """ return rv(name, BinomialDistribution, n, p, succ, fail) #------------------------------------------------------------------------------- # Beta-binomial distribution ---------------------------------------------------------- class BetaBinomialDistribution(SingleFiniteDistribution): _argnames = ('n', 'alpha', 'beta') @staticmethod def check(n, alpha, beta): _value_check((n.is_integer, n.is_nonnegative), "'n' must be nonnegative integer. n = %s." % str(n)) _value_check((alpha > 0), "'alpha' must be: alpha > 0 . alpha = %s" % str(alpha)) _value_check((beta > 0), "'beta' must be: beta > 0 . beta = %s" % str(beta)) @property def high(self): return self.n @property def low(self): return S(0) @property def is_symbolic(self): return not self.n.is_number @property def set(self): if self.is_symbolic: return Intersection(S.Naturals0, Interval(0, self.n)) return set(map(Integer, list(range(0, self.n + 1)))) def pmf(self, k): n, a, b = self.n, self.alpha, self.beta return binomial(n, k) beta_fn(k + a, n - k + b) / beta_fn(a, b) def BetaBinomial(name, n, alpha, beta): """ Create a Finite Random Variable representing a Beta-binomial distribution. Returns a RandomSymbol. Examples ======== >>> from sympy.stats import BetaBinomial, density >>> from sympy import S >>> X = BetaBinomial('X', 2, 1, 1) >>> density(X).dict {0: beta(1, 3)/beta(1, 1), 1: 2beta(2, 2)/beta(1, 1), 2: beta(3, 1)/beta(1, 1)} References ========== .. [1] https://en.wikipedia.org/wiki/Beta-binomial_distribution .. [2] http://mathworld.wolfram.com/BetaBinomialDistribution.html """ return rv(name, BetaBinomialDistribution, n, alpha, beta) class HypergeometricDistribution(SingleFiniteDistribution): _argnames = ('N', 'm', 'n') @property def is_symbolic(self): return any(not x.is_number for x in (self.N, self.m, self.n)) @property def high(self): return Piecewise((self.n, Lt(self.n, self.m) != False), (self.m, True)) @property def low(self): return Piecewise((0, Gt(0, self.n + self.m - self.N) != False), (self.n + self.m - self.N, True)) @property def set(self): N, m, n = self.N, self.m, self.n if self.is_symbolic: return Intersection(S.Naturals0, Interval(self.low, self.high)) return set([i for i in range(max(0, n + m - N), min(n, m) + 1)]) def pmf(self, k): N, m, n = self.N, self.m, self.n return S(binomial(m, k) binomial(N - m, n - k))/binomial(N, n) def Hypergeometric(name, N, m, n): """ Create a Finite Random Variable representing a hypergeometric distribution. Returns a RandomSymbol. Examples ======== >>> from sympy.stats import Hypergeometric, density >>> from sympy import S >>> X = Hypergeometric('X', 10, 5, 3) # 10 marbles, 5 white (success), 3 draws >>> density(X).dict {0: 1/12, 1: 5/12, 2: 5/12, 3: 1/12} References ========== .. [1] https://en.wikipedia.org/wiki/Hypergeometric_distribution .. [2] http://mathworld.wolfram.com/HypergeometricDistribution.html """ return rv(name, HypergeometricDistribution, N, m, n) class RademacherDistribution(SingleFiniteDistribution): @property def set(self): return set([-1, 1]) @property def pmf(self): k = Dummy('k') return Lambda(k, Piecewise((S.Half, Or(Eq(k, -1), Eq(k, 1))), (0, True))) def Rademacher(name): """ Create a Finite Random Variable representing a Rademacher distribution. Return a RandomSymbol. Examples ======== >>> from sympy.stats import Rademacher, density >>> X = Rademacher('X') >>> density(X).dict {-1: 1/2, 1: 1/2} See Also ======== sympy.stats.Bernoulli References ========== .. [1] https://en.wikipedia.org/wiki/Rademacher_distribution """ return rv(name, RademacherDistribution)
a370abe68cecdea50d60d52e2929fb4350e5c0d6530e8a3cf65e592ceb3298cd	from __future__ import print_function, division from sympy import (Symbol, Matrix, MatrixSymbol, S, Indexed, Basic, Set, And, Tuple, Eq, FiniteSet, ImmutableMatrix, nsimplify, Lambda, Mul, Sum, Dummy, Lt, IndexedBase, linsolve, Piecewise, eye, Or, Ne, Not, Intersection, Union, Expr, Function, sympify, Le, exp, cacheit, Gt, Ge) from sympy.core.relational import Relational from sympy.logic.boolalg import Boolean from sympy.stats.joint_rv import JointDistributionHandmade, JointDistribution from sympy.stats.rv import (RandomIndexedSymbol, random_symbols, RandomSymbol, _symbol_converter) from sympy.stats.stochastic_process import StochasticPSpace from sympy.stats.symbolic_probability import Probability, Expectation __all__ = [ 'StochasticProcess', 'DiscreteTimeStochasticProcess', 'DiscreteMarkovChain', 'TransitionMatrixOf', 'StochasticStateSpaceOf', 'GeneratorMatrixOf', 'ContinuousMarkovChain' ] def _set_converter(itr): """ Helper function for converting list/tuple/set to Set. If parameter is not an instance of list/tuple/set then no operation is performed. Returns ======= Set The argument converted to Set. Raises ====== TypeError If the argument is not an instance of list/tuple/set. """ if isinstance(itr, (list, tuple, set)): itr = FiniteSet(itr) if not isinstance(itr, Set): raise TypeError("%s is not an instance of list/tuple/set."%(itr)) return itr def _matrix_checks(matrix): if not isinstance(matrix, (Matrix, MatrixSymbol, ImmutableMatrix)): raise TypeError("Transition probabilities either should " "be a Matrix or a MatrixSymbol.") if matrix.shape[0] != matrix.shape[1]: raise ValueError("%s is not a square matrix"%(matrix)) if isinstance(matrix, Matrix): matrix = ImmutableMatrix(matrix.tolist()) return matrix class StochasticProcess(Basic): """ Base class for all the stochastic processes whether discrete or continuous. Parameters ========== sym: Symbol or string_types state_space: Set The state space of the stochastic process, by default S.Reals. For discrete sets it is zero indexed. See Also ======== DiscreteTimeStochasticProcess """ index_set = S.Reals def __new__(cls, sym, state_space=S.Reals, kwargs): sym = _symbol_converter(sym) state_space = _set_converter(state_space) return Basic.__new__(cls, sym, state_space) @property def symbol(self): return self.args[0] @property def state_space(self): return self.args[1] def __call__(self, time): """ Overridden in ContinuousTimeStochasticProcess. """ raise NotImplementedError("Use [] for indexing discrete time stochastic process.") def __getitem__(self, time): """ Overridden in DiscreteTimeStochasticProcess. """ raise NotImplementedError("Use () for indexing continuous time stochastic process.") def probability(self, condition): raise NotImplementedError() def joint_distribution(self, args): """ Computes the joint distribution of the random indexed variables. Parameters ========== args: iterable The finite list of random indexed variables/the key of a stochastic process whose joint distribution has to be computed. Returns ======= JointDistribution The joint distribution of the list of random indexed variables. An unevaluated object is returned if it is not possible to compute the joint distribution. Raises ====== ValueError: When the arguments passed are not of type RandomIndexSymbol or Number. """ args = list(args) for i, arg in enumerate(args): if S(arg).is_Number: if self.index_set.is_subset(S.Integers): args[i] = self.__getitem__(arg) else: args[i] = self.__call__(arg) elif not isinstance(arg, RandomIndexedSymbol): raise ValueError("Expected a RandomIndexedSymbol or " "key not %s"%(type(arg))) if args[0].pspace.distribution == None: # checks if there is any distribution available return JointDistribution(args) # TODO: Add tests for the below part of the method, when implementation of Bernoulli Process # is completed pdf = Lambda([arg.name for arg in args], expr=Mul.fromiter(arg.pspace.distribution.pdf(arg) for arg in args)) return JointDistributionHandmade(pdf) def expectation(self, condition, given_condition): raise NotImplementedError("Abstract method for expectation queries.") class DiscreteTimeStochasticProcess(StochasticProcess): """ Base class for all discrete stochastic processes. """ def __getitem__(self, time): """ For indexing discrete time stochastic processes. Returns ======= RandomIndexedSymbol """ if time not in self.index_set: raise IndexError("%s is not in the index set of %s"%(time, self.symbol)) idx_obj = Indexed(self.symbol, time) pspace_obj = StochasticPSpace(self.symbol, self) return RandomIndexedSymbol(idx_obj, pspace_obj) class ContinuousTimeStochasticProcess(StochasticProcess): """ Base class for all continuous time stochastic process. """ def __call__(self, time): """ For indexing continuous time stochastic processes. Returns ======= RandomIndexedSymbol """ if time not in self.index_set: raise IndexError("%s is not in the index set of %s"%(time, self.symbol)) func_obj = Function(self.symbol)(time) pspace_obj = StochasticPSpace(self.symbol, self) return RandomIndexedSymbol(func_obj, pspace_obj) class TransitionMatrixOf(Boolean): """ Assumes that the matrix is the transition matrix of the process. """ def __new__(cls, process, matrix): if not isinstance(process, DiscreteMarkovChain): raise ValueError("Currently only DiscreteMarkovChain " "support TransitionMatrixOf.") matrix = _matrix_checks(matrix) return Basic.__new__(cls, process, matrix) process = property(lambda self: self.args[0]) matrix = property(lambda self: self.args[1]) class GeneratorMatrixOf(TransitionMatrixOf): """ Assumes that the matrix is the generator matrix of the process. """ def __new__(cls, process, matrix): if not isinstance(process, ContinuousMarkovChain): raise ValueError("Currently only ContinuousMarkovChain " "support GeneratorMatrixOf.") matrix = _matrix_checks(matrix) return Basic.__new__(cls, process, matrix) class StochasticStateSpaceOf(Boolean): def __new__(cls, process, state_space): if not isinstance(process, (DiscreteMarkovChain, ContinuousMarkovChain)): raise ValueError("Currently only DiscreteMarkovChain and ContinuousMarkovChain " "support StochasticStateSpaceOf.") state_space = _set_converter(state_space) return Basic.__new__(cls, process, state_space) process = property(lambda self: self.args[0]) state_space = property(lambda self: self.args[1]) class MarkovProcess(StochasticProcess): """ Contains methods that handle queries common to Markov processes. """ def _extract_information(self, given_condition): """ Helper function to extract information, like, transition matrix/generator matrix, state space, etc. """ if isinstance(self, DiscreteMarkovChain): trans_probs = self.transition_probabilities elif isinstance(self, ContinuousMarkovChain): trans_probs = self.generator_matrix state_space = self.state_space if isinstance(given_condition, And): gcs = given_condition.args given_condition = S.true for gc in gcs: if isinstance(gc, TransitionMatrixOf): trans_probs = gc.matrix if isinstance(gc, StochasticStateSpaceOf): state_space = gc.state_space if isinstance(gc, Relational): given_condition = given_condition & gc if isinstance(given_condition, TransitionMatrixOf): trans_probs = given_condition.matrix given_condition = S.true if isinstance(given_condition, StochasticStateSpaceOf): state_space = given_condition.state_space given_condition = S.true return trans_probs, state_space, given_condition def _check_trans_probs(self, trans_probs, row_sum=1): """ Helper function for checking the validity of transition probabilities. """ if not isinstance(trans_probs, MatrixSymbol): rows = trans_probs.tolist() for row in rows: if (sum(row) - row_sum) != 0: raise ValueError("Values in a row must sum to %s. " "If you are using Float or floats then please use Rational."%(row_sum)) def _work_out_state_space(self, state_space, given_condition, trans_probs): """ Helper function to extract state space if there is a random symbol in the given condition. """ # if given condition is None, then there is no need to work out # state_space from random variables if given_condition != None: rand_var = list(given_condition.atoms(RandomSymbol) - given_condition.atoms(RandomIndexedSymbol)) if len(rand_var) == 1: state_space = rand_var[0].pspace.set if not FiniteSet([i for i in range(trans_probs.shape[0])]).is_subset(state_space): raise ValueError("state space is not compatible with the transition probabilites.") state_space = FiniteSet([i for i in range(trans_probs.shape[0])]) return state_space @cacheit def _preprocess(self, given_condition, evaluate): """ Helper function for pre-processing the information. """ is_insufficient = False if not evaluate: # avoid pre-processing if the result is not to be evaluated return (True, None, None, None) # extracting transition matrix and state space trans_probs, state_space, given_condition = self._extract_information(given_condition) # given_condition does not have sufficient information # for computations if trans_probs == None or \ given_condition == None: is_insufficient = True else: # checking transition probabilities if isinstance(self, DiscreteMarkovChain): self._check_trans_probs(trans_probs, row_sum=1) elif isinstance(self, ContinuousMarkovChain): self._check_trans_probs(trans_probs, row_sum=0) # working out state space state_space = self._work_out_state_space(state_space, given_condition, trans_probs) return is_insufficient, trans_probs, state_space, given_condition def probability(self, condition, given_condition=None, evaluate=True, *kwargs): """ Handles probability queries for Markov process. Parameters ========== condition: Relational given_condition: Relational/And Returns ======= Probability If the information is not sufficient. Expr In all other cases. Note ==== Any information passed at the time of query overrides any information passed at the time of object creation like transition probabilities, state space. Pass the transition matrix using TransitionMatrixOf, generator matrix using GeneratorMatrixOf and state space using StochasticStateSpaceOf in given_condition using & or And. """ check, mat, state_space, new_given_condition = \ self._preprocess(given_condition, evaluate) if check: return Probability(condition, new_given_condition) if isinstance(self, ContinuousMarkovChain): trans_probs = self.transition_probabilities(mat) elif isinstance(self, DiscreteMarkovChain): trans_probs = mat if isinstance(condition, Relational): rv, states = (list(condition.atoms(RandomIndexedSymbol))[0], condition.as_set()) if isinstance(new_given_condition, And): gcs = new_given_condition.args else: gcs = (new_given_condition, ) grvs = new_given_condition.atoms(RandomIndexedSymbol) min_key_rv = None for grv in grvs: if grv.key <= rv.key: min_key_rv = grv if min_key_rv == None: return Probability(condition) prob, gstate = dict(), None for gc in gcs: if gc.has(min_key_rv): if gc.has(Probability): p, gp = (gc.rhs, gc.lhs) if isinstance(gc.lhs, Probability) \ else (gc.lhs, gc.rhs) gr = gp.args[0] gset = Intersection(gr.as_set(), state_space) gstate = list(gset)[0] prob[gset] = p else: _, gstate = (gc.lhs.key, gc.rhs) if isinstance(gc.lhs, RandomIndexedSymbol) \ else (gc.rhs.key, gc.lhs) if any((k not in self.index_set) for k in (rv.key, min_key_rv.key)): raise IndexError("The timestamps of the process are not in it's index set.") states = Intersection(states, state_space) for state in Union(states, FiniteSet(gstate)): if Ge(state, mat.shape[0]) == True: raise IndexError("No information is available for (%s, %s) in " "transition probabilities of shape, (%s, %s). " "State space is zero indexed." %(gstate, state, mat.shape[0], mat.shape[1])) if prob: gstates = Union(prob.keys()) if len(gstates) == 1: gstate = list(gstates)[0] gprob = list(prob.values())[0] prob[gstates] = gprob elif len(gstates) == len(state_space) - 1: gstate = list(state_space - gstates)[0] gprob = S(1) - sum(prob.values()) prob[state_space - gstates] = gprob else: raise ValueError("Conflicting information.") else: gprob = S(1) if min_key_rv == rv: return sum([prob[FiniteSet(state)] for state in states]) if isinstance(self, ContinuousMarkovChain): return gprob * sum([trans_probs(rv.key - min_key_rv.key).__getitem__((gstate, state)) for state in states]) if isinstance(self, DiscreteMarkovChain): return gprob * sum([(trans_probs(rv.key - min_key_rv.key)).__getitem__((gstate, state)) for state in states]) if isinstance(condition, Not): expr = condition.args[0] return S(1) - self.probability(expr, given_condition, evaluate, kwargs) if isinstance(condition, And): compute_later, state2cond, conds = [], dict(), condition.args for expr in conds: if isinstance(expr, Relational): ris = list(expr.atoms(RandomIndexedSymbol))[0] if state2cond.get(ris, None) is None: state2cond[ris] = S.true state2cond[ris] &= expr else: compute_later.append(expr) ris = [] for ri in state2cond: ris.append(ri) cset = Intersection(state2cond[ri].as_set(), state_space) if len(cset) == 0: return S.Zero state2cond[ri] = cset.as_relational(ri) sorted_ris = sorted(ris, key=lambda ri: ri.key) prod = self.probability(state2cond[sorted_ris[0]], given_condition, evaluate, *kwargs) for i in range(1, len(sorted_ris)): ri, prev_ri = sorted_ris[i], sorted_ris[i-1] if not isinstance(state2cond[ri], Eq): raise ValueError("The process is in multiple states at %s, unable to determine the probability."%(ri)) mat_of = TransitionMatrixOf(self, mat) if isinstance(self, DiscreteMarkovChain) else GeneratorMatrixOf(self, mat) prod = self.probability(state2cond[ri], state2cond[prev_ri] & mat_of & StochasticStateSpaceOf(self, state_space), evaluate, *kwargs) for expr in compute_later: prod = self.probability(expr, given_condition, evaluate, kwargs) return prod if isinstance(condition, Or): return sum([self.probability(expr, given_condition, evaluate, kwargs) for expr in condition.args]) raise NotImplementedError("Mechanism for handling (%s, %s) queries hasn't been " "implemented yet."%(expr, condition)) def expectation(self, expr, condition=None, evaluate=True, *kwargs): """ Handles expectation queries for markov process. Parameters ========== expr: RandomIndexedSymbol, Relational, Logic Condition for which expectation has to be computed. Must contain a RandomIndexedSymbol of the process. condition: Relational, Logic The given conditions under which computations should be done. Returns ======= Expectation Unevaluated object if computations cannot be done due to insufficient information. Expr In all other cases when the computations are successful. Note ==== Any information passed at the time of query overrides any information passed at the time of object creation like transition probabilities, state space. Pass the transition matrix using TransitionMatrixOf, generator matrix using GeneratorMatrixOf and state space using StochasticStateSpaceOf in given_condition using & or And. """ check, mat, state_space, condition = \ self._preprocess(condition, evaluate) if check: return Expectation(expr, condition) if isinstance(self, ContinuousMarkovChain): trans_probs = self.transition_probabilities(mat) elif isinstance(self, DiscreteMarkovChain): trans_probs = mat rvs = random_symbols(expr) if isinstance(expr, Expr) and isinstance(condition, Eq) \ and len(rvs) == 1: # handle queries similar to E(f(X[i]), Eq(X[i-m], <some-state>)) rv = list(rvs)[0] lhsg, rhsg = condition.lhs, condition.rhs if not isinstance(lhsg, RandomIndexedSymbol): lhsg, rhsg = (rhsg, lhsg) if rhsg not in self.state_space: raise ValueError("%s state is not in the state space."%(rhsg)) if rv.key < lhsg.key: raise ValueError("Incorrect given condition is given, expectation " "time %s < time %s"%(rv.key, rv.key)) mat_of = TransitionMatrixOf(self, mat) if isinstance(self, DiscreteMarkovChain) else GeneratorMatrixOf(self, mat) cond = condition & mat_of & \ StochasticStateSpaceOf(self, state_space) s = Dummy('s') func = lambda s: self.probability(Eq(rv, s), cond)expr.subs(rv, s) return sum([func(s) for s in state_space]) raise NotImplementedError("Mechanism for handling (%s, %s) queries hasn't been " "implemented yet."%(expr, condition)) class DiscreteMarkovChain(DiscreteTimeStochasticProcess, MarkovProcess): """ Represents discrete time Markov chain. Parameters ========== sym: Symbol/string_types state_space: Set Optional, by default, S.Reals trans_probs: Matrix/ImmutableMatrix/MatrixSymbol Optional, by default, None Examples ======== >>> from sympy.stats import DiscreteMarkovChain, TransitionMatrixOf >>> from sympy import Matrix, MatrixSymbol, Eq >>> from sympy.stats import P >>> T = Matrix([[0.5, 0.2, 0.3],[0.2, 0.5, 0.3],[0.2, 0.3, 0.5]]) >>> Y = DiscreteMarkovChain("Y", [0, 1, 2], T) >>> YS = DiscreteMarkovChain("Y") >>> Y.state_space {0, 1, 2} >>> Y.transition_probabilities Matrix([ [0.5, 0.2, 0.3], [0.2, 0.5, 0.3], [0.2, 0.3, 0.5]]) >>> TS = MatrixSymbol('T', 3, 3) >>> P(Eq(YS[3], 2), Eq(YS[1], 1) & TransitionMatrixOf(YS, TS)) T[0, 2]T[1, 0] + T[1, 1]T[1, 2] + T[1, 2]T[2, 2] >>> P(Eq(Y[3], 2), Eq(Y[1], 1)).round(2) 0.36 References ========== .. [1] https://en.wikipedia.org/wiki/Markov_chain#Discrete-time_Markov_chain .. [2] https://www.dartmouth.edu/~chance/teaching_aids/books_articles/probability_book/Chapter11.pdf """ index_set = S.Naturals0 def __new__(cls, sym, state_space=S.Reals, trans_probs=None): sym = _symbol_converter(sym) state_space = _set_converter(state_space) if trans_probs != None: trans_probs = _matrix_checks(trans_probs) return Basic.__new__(cls, sym, state_space, trans_probs) @property def transition_probabilities(self): """ Transition probabilities of discrete Markov chain, either an instance of Matrix or MatrixSymbol. """ return self.args[2] def _transient2transient(self): """ Computes the one step probabilities of transient states to transient states. Used in finding fundamental matrix, absorbing probabilties. """ trans_probs = self.transition_probabilities if not isinstance(trans_probs, ImmutableMatrix): return None m = trans_probs.shape[0] trans_states = [i for i in range(m) if trans_probs[i, i] != 1] t2t = [[trans_probs[si, sj] for sj in trans_states] for si in trans_states] return ImmutableMatrix(t2t) def _transient2absorbing(self): """ Computes the one step probabilities of transient states to absorbing states. Used in finding fundamental matrix, absorbing probabilties. """ trans_probs = self.transition_probabilities if not isinstance(trans_probs, ImmutableMatrix): return None m, trans_states, absorb_states = \ trans_probs.shape[0], [], [] for i in range(m): if trans_probs[i, i] == 1: absorb_states.append(i) else: trans_states.append(i) if not absorb_states or not trans_states: return None t2a = [[trans_probs[si, sj] for sj in absorb_states] for si in trans_states] return ImmutableMatrix(t2a) def fundamental_matrix(self): Q = self._transient2transient() if Q == None: return None I = eye(Q.shape[0]) if (I - Q).det() == 0: raise ValueError("Fundamental matrix doesn't exists.") return ImmutableMatrix((I - Q).inv().tolist()) def absorbing_probabilites(self): """ Computes the absorbing probabilities, i.e., the ij-th entry of the matrix denotes the probability of Markov chain being absorbed in state j starting from state i. """ R = self._transient2absorbing() N = self.fundamental_matrix() if R == None or N == None: return None return NR def is_regular(self): w = self.fixed_row_vector() if w is None or isinstance(w, (Lambda)): return None return all((wi > 0) == True for wi in w.row(0)) def is_absorbing_state(self, state): trans_probs = self.transition_probabilities if isinstance(trans_probs, ImmutableMatrix) and \ state < trans_probs.shape[0]: return S(trans_probs[state, state]) == S.One def is_absorbing_chain(self): trans_probs = self.transition_probabilities return any(self.is_absorbing_state(state) == True for state in range(trans_probs.shape[0])) def fixed_row_vector(self): trans_probs = self.transition_probabilities if trans_probs == None: return None if isinstance(trans_probs, MatrixSymbol): wm = MatrixSymbol('wm', 1, trans_probs.shape[0]) return Lambda((wm, trans_probs), Eq(wmtrans_probs, wm)) w = IndexedBase('w') wi = [w[i] for i in range(trans_probs.shape[0])] wm = Matrix([wi]) eqs = (wmtrans_probs - wm).tolist()[0] eqs.append(sum(wi) - 1) soln = list(linsolve(eqs, wi))[0] return ImmutableMatrix([[sol for sol in soln]]) @property def limiting_distribution(self): """ The fixed row vector is the limiting distribution of a discrete Markov chain. """ return self.fixed_row_vector() class ContinuousMarkovChain(ContinuousTimeStochasticProcess, MarkovProcess): """ Represents continuous time Markov chain. Parameters ========== sym: Symbol/string_types state_space: Set Optional, by default, S.Reals gen_mat: Matrix/ImmutableMatrix/MatrixSymbol Optional, by default, None Examples ======== >>> from sympy.stats import ContinuousMarkovChain >>> from sympy import Matrix, S, MatrixSymbol >>> G = Matrix([[-S(1), S(1)], [S(1), -S(1)]]) >>> C = ContinuousMarkovChain('C', state_space=[0, 1], gen_mat=G) >>> C.limiting_distribution() Matrix([[1/2, 1/2]]) References ========== .. [1] https://en.wikipedia.org/wiki/Markov_chain#Continuous-time_Markov_chain .. [2] http://u.math.biu.ac.il/~amirgi/CTMCnotes.pdf """ index_set = S.Reals def __new__(cls, sym, state_space=S.Reals, gen_mat=None): sym = _symbol_converter(sym) state_space = _set_converter(state_space) if gen_mat != None: gen_mat = _matrix_checks(gen_mat) return Basic.__new__(cls, sym, state_space, gen_mat) @property def generator_matrix(self): return self.args[2] @cacheit def transition_probabilities(self, gen_mat=None): t = Dummy('t') if isinstance(gen_mat, (Matrix, ImmutableMatrix)) and \ gen_mat.is_diagonalizable(): # for faster computation use diagonalized generator matrix Q, D = gen_mat.diagonalize() return Lambda(t, Qexp(tD)Q.inv()) if gen_mat != None: return Lambda(t, exp(tgen_mat)) def limiting_distribution(self): gen_mat = self.generator_matrix if gen_mat == None: return None if isinstance(gen_mat, MatrixSymbol): wm = MatrixSymbol('wm', 1, gen_mat.shape[0]) return Lambda((wm, gen_mat), Eq(wmgen_mat, wm)) w = IndexedBase('w') wi = [w[i] for i in range(gen_mat.shape[0])] wm = Matrix([wi]) eqs = (wmgen_mat).tolist()[0] eqs.append(sum(wi) - 1) soln = list(linsolve(eqs, wi))[0] return ImmutableMatrix([[sol for sol in soln]])
96e0131cbdaeafcee4329622c73637fd1e2b702e53d0f8088adfa68b5483ebba	""" SymPy statistics module Introduces a random variable type into the SymPy language. Random variables may be declared using prebuilt functions such as Normal, Exponential, Coin, Die, etc... or built with functions like FiniteRV. Queries on random expressions can be made using the functions ========================= ============================= Expression Meaning ------------------------- ----------------------------- ``P(condition)`` Probability ``E(expression)`` Expected value ``H(expression)`` Entropy ``variance(expression)`` Variance ``density(expression)`` Probability Density Function ``sample(expression)`` Produce a realization ``where(condition)`` Where the condition is true ========================= ============================= Examples ======== >>> from sympy.stats import P, E, variance, Die, Normal >>> from sympy import Eq, simplify >>> X, Y = Die('X', 6), Die('Y', 6) # Define two six sided dice >>> Z = Normal('Z', 0, 1) # Declare a Normal random variable with mean 0, std 1 >>> P(X>3) # Probability X is greater than 3 1/2 >>> E(X+Y) # Expectation of the sum of two dice 7 >>> variance(X+Y) # Variance of the sum of two dice 35/6 >>> simplify(P(Z>1)) # Probability of Z being greater than 1 1/2 - erf(sqrt(2)/2)/2 """ __all__ = [] from . import rv_interface from .rv_interface import ( cdf, characteristic_function, covariance, density, dependent, E, given, independent, P, pspace, random_symbols, sample, sample_iter, skewness, kurtosis, std, variance, where, factorial_moment, correlation, moment, cmoment, smoment, sampling_density, moment_generating_function, entropy, H, quantile ) __all__.extend(rv_interface.__all__) from . import frv_types from .frv_types import ( Bernoulli, Binomial, BetaBinomial, Coin, Die, DiscreteUniform, FiniteRV, Hypergeometric, Rademacher, ) __all__.extend(frv_types.__all__) from . import crv_types from .crv_types import ( ContinuousRV, Arcsin, Benini, Beta, BetaNoncentral, BetaPrime, Cauchy, Chi, ChiNoncentral, ChiSquared, Dagum, Erlang, ExGaussian, Exponential, ExponentialPower, FDistribution, FisherZ, Frechet, Gamma, GammaInverse, Gumbel, Gompertz, Kumaraswamy, Laplace, Logistic, LogLogistic, LogNormal, Maxwell, Nakagami, Normal, GaussianInverse, Pareto, QuadraticU, RaisedCosine, Rayleigh, ShiftedGompertz, StudentT, Trapezoidal, Triangular, Uniform, UniformSum, VonMises, Weibull, WignerSemicircle, Wald ) __all__.extend(crv_types.__all__) from . import drv_types from .drv_types import (Geometric, Logarithmic, NegativeBinomial, Poisson, Skellam, YuleSimon, Zeta) __all__.extend(drv_types.__all__) from . import joint_rv_types from .joint_rv_types import ( JointRV, Dirichlet, GeneralizedMultivariateLogGamma, GeneralizedMultivariateLogGammaOmega, Multinomial, MultivariateBeta, MultivariateEwens, MultivariateT, NegativeMultinomial, NormalGamma ) __all__.extend(joint_rv_types.__all__) from . import stochastic_process_types from .stochastic_process_types import ( StochasticProcess, ContinuousTimeStochasticProcess, DiscreteTimeStochasticProcess, DiscreteMarkovChain, TransitionMatrixOf, StochasticStateSpaceOf, ContinuousMarkovChain, GeneratorMatrixOf ) __all__.extend(stochastic_process_types.__all__) from . import random_matrix_models from .random_matrix_models import ( GaussianEnsemble, GaussianUnitaryEnsemble, GaussianOrthogonalEnsemble, GaussianSymplecticEnsemble, joint_eigen_distribution, level_spacing_distribution ) __all__.extend(random_matrix_models.__all__) from . import symbolic_probability from .symbolic_probability import Probability, Expectation, Variance, Covariance __all__.extend(symbolic_probability.__all__)
00dc485626ad27568e0a08907be2a691189c999e0551c18692d1784dae2dde90	from sympy import (sympify, S, pi, sqrt, exp, Lambda, Indexed, besselk, gamma, Interval, Range, factorial, Mul, Integer, Add, rf, Eq, Piecewise, ones, Symbol, Pow, Rational, Sum, Intersection, Matrix, symbols, Product, IndexedBase) from sympy.matrices import ImmutableMatrix from sympy.matrices.expressions.determinant import det from sympy.stats.joint_rv import (JointDistribution, JointPSpace, JointDistributionHandmade, MarginalDistribution) from sympy.stats.rv import _value_check, random_symbols __all__ = ['JointRV', 'Dirichlet', 'GeneralizedMultivariateLogGamma', 'GeneralizedMultivariateLogGammaOmega', 'Multinomial', 'MultivariateBeta', 'MultivariateEwens', 'MultivariateT', 'NegativeMultinomial', 'NormalGamma' ] def multivariate_rv(cls, sym, args): args = list(map(sympify, args)) dist = cls(args) args = dist.args dist.check(args) return JointPSpace(sym, dist).value def JointRV(symbol, pdf, _set=None): """ Create a Joint Random Variable where each of its component is conitinuous, given the following: -- a symbol -- a PDF in terms of indexed symbols of the symbol given as the first argument NOTE: As of now, the set for each component for a `JointRV` is equal to the set of all integers, which can not be changed. Returns a RandomSymbol. Examples ======== >>> from sympy import symbols, exp, pi, Indexed, S >>> from sympy.stats import density >>> from sympy.stats.joint_rv_types import JointRV >>> x1, x2 = (Indexed('x', i) for i in (1, 2)) >>> pdf = exp(-x12/2 + x1 - x22/2 - S(1)/2)/(2pi) >>> N1 = JointRV('x', pdf) #Multivariate Normal distribution >>> density(N1)(1, 2) exp(-2)/(2pi) """ #TODO: Add support for sets provided by the user symbol = sympify(symbol) syms = list(i for i in pdf.free_symbols if isinstance(i, Indexed) and i.base == IndexedBase(symbol)) syms.sort(key = lambda index: index.args[1]) _set = S.Realslen(syms) pdf = Lambda(syms, pdf) dist = JointDistributionHandmade(pdf, _set) jrv = JointPSpace(symbol, dist).value rvs = random_symbols(pdf) if len(rvs) != 0: dist = MarginalDistribution(dist, (jrv,)) return JointPSpace(symbol, dist).value return jrv #------------------------------------------------------------------------------- # Multivariate Normal distribution --------------------------------------------------------- class MultivariateNormalDistribution(JointDistribution): _argnames = ['mu', 'sigma'] is_Continuous=True @property def set(self): k = len(self.mu) return S.Realsk @staticmethod def check(mu, sigma): _value_check(len(mu) == len(sigma.col(0)), "Size of the mean vector and covariance matrix are incorrect.") #check if covariance matrix is positive definite or not. _value_check((i > 0 for i in sigma.eigenvals().keys()), "The covariance matrix must be positive definite. ") def pdf(self, args): mu, sigma = self.mu, self.sigma k = len(mu) args = ImmutableMatrix(args) x = args - mu return S(1)/sqrt((2pi)(k)det(sigma))exp( -S(1)/2x.transpose()(sigma.inv()\ x))[0] def marginal_distribution(self, indices, sym): sym = ImmutableMatrix([Indexed(sym, i) for i in indices]) _mu, _sigma = self.mu, self.sigma k = len(self.mu) for i in range(k): if i not in indices: _mu = _mu.row_del(i) _sigma = _sigma.col_del(i) _sigma = _sigma.row_del(i) return Lambda(sym, S(1)/sqrt((2pi)(len(_mu))det(_sigma))exp( -S(1)/2(_mu - sym).transpose()(_sigma.inv()\ (_mu - sym)))[0]) #------------------------------------------------------------------------------- # Multivariate Laplace distribution --------------------------------------------------------- class MultivariateLaplaceDistribution(JointDistribution): _argnames = ['mu', 'sigma'] is_Continuous=True @property def set(self): k = len(self.mu) return S.Reals*k @staticmethod def check(mu, sigma): _value_check(len(mu) == len(sigma.col(0)), "Size of the mean vector and covariance matrix are incorrect.") #check if covariance matrix is positive definite or not. _value_check((i > 0 for i in sigma.eigenvals().keys()), "The covariance matrix must be positive definite. ") def pdf(self, args): mu, sigma = self.mu, self.sigma mu_T = mu.transpose() k = S(len(mu)) sigma_inv = sigma.inv() args = ImmutableMatrix(args) args_T = args.transpose() x = (mu_Tsigma_invmu)[0] y = (args_Tsigma_invargs)[0] v = 1 - k/2 return S(2)/((2pi)(S(k)/2)sqrt(det(sigma)))\ (y/(2 + x))(S(v)/2)besselk(v, sqrt((2 + x)(y)))\ exp((args_Tsigma_invmu)[0]) #------------------------------------------------------------------------------- # Multivariate StudentT distribution --------------------------------------------------------- class MultivariateTDistribution(JointDistribution): _argnames = ['mu', 'shape_mat', 'dof'] is_Continuous=True @property def set(self): k = len(self.mu) return S.Reals*k @staticmethod def check(mu, sigma, v): _value_check(len(mu) == len(sigma.col(0)), "Size of the location vector and shape matrix are incorrect.") #check if covariance matrix is positive definite or not. _value_check((i > 0 for i in sigma.eigenvals().keys()), "The shape matrix must be positive definite. ") def pdf(self, args): mu, sigma = self.mu, self.shape_mat v = S(self.dof) k = S(len(mu)) sigma_inv = sigma.inv() args = ImmutableMatrix(args) x = args - mu return gamma((k + v)/2)/(gamma(v/2)(vpi)*(k/2)sqrt(det(sigma)))\ (1 + 1/v(x.transpose()sigma_invx)[0])*((-v - k)/2) def MultivariateT(syms, mu, sigma, v): """ Creates a joint random variable with multivariate T-distribution. Parameters ========== syms: list/tuple/set of symbols for identifying each component mu: A list/tuple/set consisting of k means,represents a k dimensional location vector sigma: The shape matrix for the distribution Returns ======= A random symbol """ return multivariate_rv(MultivariateTDistribution, syms, mu, sigma, v) #------------------------------------------------------------------------------- # Multivariate Normal Gamma distribution --------------------------------------------------------- class NormalGammaDistribution(JointDistribution): _argnames = ['mu', 'lamda', 'alpha', 'beta'] is_Continuous=True @staticmethod def check(mu, lamda, alpha, beta): _value_check(mu.is_real, "Location must be real.") _value_check(lamda > 0, "Lambda must be positive") _value_check(alpha > 0, "alpha must be positive") _value_check(beta > 0, "beta must be positive") @property def set(self): return S.RealsInterval(0, S.Infinity) def pdf(self, x, tau): beta, alpha, lamda = self.beta, self.alpha, self.lamda mu = self.mu return beta*alphasqrt(lamda)/(gamma(alpha)sqrt(2pi))\ tau(alpha - S(1)/2)exp(-1betatau)\ exp(-1(lamdatau(x - mu)*2)/S(2)) def marginal_distribution(self, indices, sym): if len(indices) == 2: return self.pdf(sym) if indices[0] == 0: #For marginal over `x`, return non-standardized Student-T's #distribution x = sym[0] v, mu, sigma = self.alpha - S(1)/2, self.mu, \ S(self.beta)/(self.lamda self.alpha) return Lambda(sym, gamma((v + 1)/2)/(gamma(v/2)sqrt(piv)sigma)\ (1 + 1/v((x - mu)/sigma)2)((-v -1)/2)) #For marginal over `tau`, return Gamma distribution as per construction from sympy.stats.crv_types import GammaDistribution return Lambda(sym, GammaDistribution(self.alpha, self.beta)(sym[0])) def NormalGamma(syms, mu, lamda, alpha, beta): """ Creates a bivariate joint random variable with multivariate Normal gamma distribution. Parameters ========== syms: list/tuple/set of two symbols for identifying each component mu: A real number, as the mean of the normal distribution alpha: a positive integer beta: a positive integer lamda: a positive integer Returns ======= A random symbol """ return multivariate_rv(NormalGammaDistribution, syms, mu, lamda, alpha, beta) #------------------------------------------------------------------------------- # Multivariate Beta/Dirichlet distribution --------------------------------------------------------- class MultivariateBetaDistribution(JointDistribution): _argnames = ['alpha'] is_Continuous = True @staticmethod def check(alpha): _value_check(len(alpha) >= 2, "At least two categories should be passed.") for a_k in alpha: _value_check((a_k > 0) != False, "Each concentration parameter" " should be positive.") @property def set(self): k = len(self.alpha) return Interval(0, 1)k def pdf(self, syms): alpha = self.alpha B = Mul.fromiter(map(gamma, alpha))/gamma(Add(alpha)) return Mul.fromiter([sym(a_k - 1) for a_k, sym in zip(alpha, syms)])/B def MultivariateBeta(syms, alpha): """ Creates a continuous random variable with Dirichlet/Multivariate Beta Distribution. The density of the dirichlet distribution can be found at [1]. Parameters ========== alpha: positive real numbers signifying concentration numbers. Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import density >>> from sympy.stats.joint_rv import marginal_distribution >>> from sympy.stats.joint_rv_types import MultivariateBeta >>> from sympy import Symbol >>> a1 = Symbol('a1', positive=True) >>> a2 = Symbol('a2', positive=True) >>> B = MultivariateBeta('B', [a1, a2]) >>> C = MultivariateBeta('C', a1, a2) >>> x = Symbol('x') >>> y = Symbol('y') >>> density(B)(x, y) x*(a1 - 1)y*(a2 - 1)gamma(a1 + a2)/(gamma(a1)gamma(a2)) >>> marginal_distribution(C, C[0])(x) x(a1 - 1)gamma(a1 + a2)/(a2gamma(a1)gamma(a2)) References ========== .. [1] https://en.wikipedia.org/wiki/Dirichlet_distribution .. [2] http://mathworld.wolfram.com/DirichletDistribution.html """ if not isinstance(alpha[0], list): alpha = (list(alpha),) return multivariate_rv(MultivariateBetaDistribution, syms, alpha[0]) Dirichlet = MultivariateBeta #------------------------------------------------------------------------------- # Multivariate Ewens distribution --------------------------------------------------------- class MultivariateEwensDistribution(JointDistribution): _argnames = ['n', 'theta'] is_Discrete = True is_Continuous = False @staticmethod def check(n, theta): _value_check((n > 0), "sample size should be positive integer.") _value_check(theta.is_positive, "mutation rate should be positive.") @property def set(self): if not isinstance(self.n, Integer): i = Symbol('i', integer=True, positive=True) return Product(Intersection(S.Naturals0, Interval(0, self.n//i)), (i, 1, self.n)) prod_set = Range(0, self.n + 1) for i in range(2, self.n + 1): prod_set = Range(0, self.n//i + 1) return prod_set def pdf(self, syms): n, theta = self.n, self.theta condi = isinstance(self.n, Integer) if not (isinstance(syms[0], IndexedBase) or condi): raise ValueError("Please use IndexedBase object for syms as " "the dimension is symbolic") term_1 = factorial(n)/rf(theta, n) if condi: term_2 = Mul.fromiter([thetasyms[j]/((j+1)syms[j]factorial(syms[j])) for j in range(n)]) cond = Eq(sum([(k + 1)syms[k] for k in range(n)]), n) return Piecewise((term_1 * term_2, cond), (0, True)) syms = syms[0] j, k = symbols('j, k', positive=True, integer=True) term_2 = Product(thetasyms[j]/((j+1)syms[j]factorial(syms[j])), (j, 0, n - 1)) cond = Eq(Sum((k + 1)syms[k], (k, 0, n - 1)), n) return Piecewise((term_1 * term_2, cond), (0, True)) def MultivariateEwens(syms, n, theta): """ Creates a discrete random variable with Multivariate Ewens Distribution. The density of the said distribution can be found at [1]. Parameters ========== n: positive integer of class Integer, size of the sample or the integer whose partitions are considered theta: mutation rate, must be positive real number. Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import density >>> from sympy.stats.joint_rv import marginal_distribution >>> from sympy.stats.joint_rv_types import MultivariateEwens >>> from sympy import Symbol >>> a1 = Symbol('a1', positive=True) >>> a2 = Symbol('a2', positive=True) >>> ed = MultivariateEwens('E', 2, 1) >>> density(ed)(a1, a2) Piecewise((2*(-a2)/(factorial(a1)factorial(a2)), Eq(a1 + 2a2, 2)), (0, True)) >>> marginal_distribution(ed, ed[0])(a1) Piecewise((1/factorial(a1), Eq(a1, 2)), (0, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Ewens%27s_sampling_formula .. [2] http://www.stat.rutgers.edu/home/hcrane/Papers/STS529.pdf """ return multivariate_rv(MultivariateEwensDistribution, syms, n, theta) #------------------------------------------------------------------------------- # Generalized Multivariate Log Gamma distribution --------------------------------------------------------- class GeneralizedMultivariateLogGammaDistribution(JointDistribution): _argnames = ['delta', 'v', 'lamda', 'mu'] is_Continuous=True def check(self, delta, v, l, mu): _value_check((delta >= 0, delta <= 1), "delta must be in range [0, 1].") _value_check((v > 0), "v must be positive") for lk in l: _value_check((lk > 0), "lamda must be a positive vector.") for muk in mu: _value_check((muk > 0), "mu must be a positive vector.") _value_check(len(l) > 1,"the distribution should have at least" " two random variables.") @property def set(self): return S.Realslen(self.lamda) def pdf(self, y): from sympy.functions.special.gamma_functions import gamma d, v, l, mu = self.delta, self.v, self.lamda, self.mu n = Symbol('n', negative=False, integer=True) k = len(l) sterm1 = Pow((1 - d), n)/\ ((gamma(v + n)*(k - 1))gamma(v)gamma(n + 1)) sterm2 = Mul.fromiter([muili*(-v - n) for mui, li in zip(mu, l)]) term1 = sterm1 sterm2 sterm3 = (v + n) * sum([mui * yi for mui, yi in zip(mu, y)]) sterm4 = sum([exp(mui * yi)/li for (mui, yi, li) in zip(mu, y, l)]) term2 = exp(sterm3 - sterm4) return Pow(d, v) * Sum(term1 * term2, (n, 0, S.Infinity)) def GeneralizedMultivariateLogGamma(syms, delta, v, lamda, mu): """ Creates a joint random variable with generalized multivariate log gamma distribution. The joint pdf can be found at [1]. Parameters ========== syms: list/tuple/set of symbols for identifying each component delta: A constant in range [0, 1] v: positive real lamda: a list of positive reals mu: a list of positive reals Returns ======= A Random Symbol Examples ======== >>> from sympy.stats import density >>> from sympy.stats.joint_rv import marginal_distribution >>> from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGamma >>> from sympy import symbols, S >>> v = 1 >>> l, mu = [1, 1, 1], [1, 1, 1] >>> d = S.Half >>> y = symbols('y_1:4', positive=True) >>> Gd = GeneralizedMultivariateLogGamma('G', d, v, l, mu) >>> density(Gd)(y[0], y[1], y[2]) Sum(2*(-n)exp((n + 1)(y_1 + y_2 + y_3) - exp(y_1) - exp(y_2) - exp(y_3))/gamma(n + 1)3, (n, 0, oo))/2 References ========== .. [1] https://en.wikipedia.org/wiki/Generalized_multivariate_log-gamma_distribution .. [2] https://www.researchgate.net/publication/234137346_On_a_multivariate_log-gamma_distribution_and_the_use_of_the_distribution_in_the_Bayesian_analysis Note ==== If the GeneralizedMultivariateLogGamma is too long to type use, `from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGamma as GMVLG` If you want to pass the matrix omega instead of the constant delta, then use, GeneralizedMultivariateLogGammaOmega. """ return multivariate_rv(GeneralizedMultivariateLogGammaDistribution, syms, delta, v, lamda, mu) def GeneralizedMultivariateLogGammaOmega(syms, omega, v, lamda, mu): """ Extends GeneralizedMultivariateLogGamma. Parameters ========== syms: list/tuple/set of symbols for identifying each component omega: A square matrix Every element of square matrix must be absolute value of square root of correlation coefficient v: positive real lamda: a list of positive reals mu: a list of positive reals Returns ======= A Random Symbol Examples ======== >>> from sympy.stats import density >>> from sympy.stats.joint_rv import marginal_distribution >>> from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGammaOmega >>> from sympy import Matrix, symbols, S >>> omega = Matrix([[1, S.Half, S.Half], [S.Half, 1, S.Half], [S.Half, S.Half, 1]]) >>> v = 1 >>> l, mu = [1, 1, 1], [1, 1, 1] >>> G = GeneralizedMultivariateLogGammaOmega('G', omega, v, l, mu) >>> y = symbols('y_1:4', positive=True) >>> density(G)(y[0], y[1], y[2]) sqrt(2)Sum((1 - sqrt(2)/2)*nexp((n + 1)(y_1 + y_2 + y_3) - exp(y_1) - exp(y_2) - exp(y_3))/gamma(n + 1)3, (n, 0, oo))/2 References ========== See references of GeneralizedMultivariateLogGamma. Notes ===== If the GeneralizedMultivariateLogGammaOmega is too long to type use, `from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGammaOmega as GMVLGO` """ _value_check((omega.is_square, isinstance(omega, Matrix)), "omega must be a" " square matrix") for val in omega.values(): _value_check((val >= 0, val <= 1), "all values in matrix must be between 0 and 1(both inclusive).") _value_check(omega.diagonal().equals(ones(1, omega.shape[0])), "all the elements of diagonal should be 1.") _value_check((omega.shape[0] == len(lamda), len(lamda) == len(mu)), "lamda, mu should be of same length and omega should " " be of shape (length of lamda, length of mu)") _value_check(len(lamda) > 1,"the distribution should have at least" " two random variables.") delta = Pow(Rational(omega.det()), Rational(1, len(lamda) - 1)) return GeneralizedMultivariateLogGamma(syms, delta, v, lamda, mu) #------------------------------------------------------------------------------- # Multinomial distribution --------------------------------------------------------- class MultinomialDistribution(JointDistribution): _argnames = ['n', 'p'] is_Continuous=False is_Discrete = True @staticmethod def check(n, p): _value_check(n > 0, "number of trials must be a positive integer") for p_k in p: _value_check((p_k >= 0, p_k <= 1), "probability must be in range [0, 1]") _value_check(Eq(sum(p), 1), "probabilities must sum to 1") @property def set(self): return Intersection(S.Naturals0, Interval(0, self.n))len(self.p) def pdf(self, x): n, p = self.n, self.p term_1 = factorial(n)/Mul.fromiter([factorial(x_k) for x_k in x]) term_2 = Mul.fromiter([p_k*x_k for p_k, x_k in zip(p, x)]) return Piecewise((term_1 term_2, Eq(sum(x), n)), (0, True)) def Multinomial(syms, n, p): """ Creates a discrete random variable with Multinomial Distribution. The density of the said distribution can be found at [1]. Parameters ========== n: positive integer of class Integer, number of trials p: event probabilites, >= 0 and <= 1 Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import density >>> from sympy.stats.joint_rv import marginal_distribution >>> from sympy.stats.joint_rv_types import Multinomial >>> from sympy import symbols >>> x1, x2, x3 = symbols('x1, x2, x3', nonnegative=True, integer=True) >>> p1, p2, p3 = symbols('p1, p2, p3', positive=True) >>> M = Multinomial('M', 3, p1, p2, p3) >>> density(M)(x1, x2, x3) Piecewise((6p1*x1p2*x2p3*x3/(factorial(x1)factorial(x2)factorial(x3)), Eq(x1 + x2 + x3, 3)), (0, True)) >>> marginal_distribution(M, M[0])(x1).subs(x1, 1) 3p1p22 + 6p1p2p3 + 3p1p32 References ========== .. [1] https://en.wikipedia.org/wiki/Multinomial_distribution .. [2] http://mathworld.wolfram.com/MultinomialDistribution.html """ if not isinstance(p[0], list): p = (list(p), ) return multivariate_rv(MultinomialDistribution, syms, n, p[0]) #------------------------------------------------------------------------------- # Negative Multinomial Distribution --------------------------------------------------------- class NegativeMultinomialDistribution(JointDistribution): _argnames = ['k0', 'p'] is_Continuous=False is_Discrete = True @staticmethod def check(k0, p): _value_check(k0 > 0, "number of failures must be a positive integer") for p_k in p: _value_check((p_k >= 0, p_k <= 1), "probability must be in range [0, 1].") _value_check(sum(p) <= 1, "success probabilities must not be greater than 1.") @property def set(self): return Range(0, S.Infinity)len(self.p) def pdf(self, k): k0, p = self.k0, self.p term_1 = (gamma(k0 + sum(k))(1 - sum(p))k0)/gamma(k0) term_2 = Mul.fromiter([piki/factorial(ki) for pi, ki in zip(p, k)]) return term_1 * term_2 def NegativeMultinomial(syms, k0, p): """ Creates a discrete random variable with Negative Multinomial Distribution. The density of the said distribution can be found at [1]. Parameters ========== k0: positive integer of class Integer, number of failures before the experiment is stopped p: event probabilites, >= 0 and <= 1 Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import density >>> from sympy.stats.joint_rv import marginal_distribution >>> from sympy.stats.joint_rv_types import NegativeMultinomial >>> from sympy import symbols >>> x1, x2, x3 = symbols('x1, x2, x3', nonnegative=True, integer=True) >>> p1, p2, p3 = symbols('p1, p2, p3', positive=True) >>> N = NegativeMultinomial('M', 3, p1, p2, p3) >>> N_c = NegativeMultinomial('M', 3, 0.1, 0.1, 0.1) >>> density(N)(x1, x2, x3) p1x1p2*x2p3*x3(-p1 - p2 - p3 + 1)*3gamma(x1 + x2 + x3 + 3)/(2factorial(x1)factorial(x2)*factorial(x3)) >>> marginal_distribution(N_c, N_c[0])(1).evalf().round(2) 0.25 References ========== .. [1] https://en.wikipedia.org/wiki/Negative_multinomial_distribution .. [2] http://mathworld.wolfram.com/NegativeBinomialDistribution.html """ if not isinstance(p[0], list): p = (list(p), ) return multivariate_rv(NegativeMultinomialDistribution, syms, k0, p[0])
f10d7b70679a460e9dc4cea47b2c3ed4b368a8b274870730876d499591a284d7	from __future__ import print_function, division from sympy import Basic, MatrixSymbol from sympy.stats.rv import PSpace, _symbol_converter, RandomMatrixSymbol class RandomMatrixPSpace(PSpace): """ Represents probability space for random matrices. It contains the mechanics for handling the API calls for random matrices. """ def __new__(cls, sym, model=None): sym = _symbol_converter(sym) return Basic.__new__(cls, sym, model) model = property(lambda self: self.args[1]) def compute_density(self, expr, *args): rms = expr.atoms(RandomMatrixSymbol) if len(rms) > 2 or (not isinstance(expr, RandomMatrixSymbol)): raise NotImplementedError("Currently, no algorithm has been " "implemented to handle general expressions containing " "multiple random matrices.") return self.model.density(expr)
27b8cfa173c13dc13acb014aa340f4e764cf003f8baa9cbc6495fb65c32990dc	"""Tools for arithmetic error propagation.""" from __future__ import print_function, division from itertools import repeat, combinations from sympy import S, Symbol, Add, Mul, simplify, Pow, exp from sympy.stats.symbolic_probability import RandomSymbol, Variance, Covariance _arg0_or_var = lambda var: var.args[0] if len(var.args) > 0 else var def variance_prop(expr, consts=(), include_covar=False): r"""Symbolically propagates variance (`\sigma^2`) for expressions. This is computed as as seen in [1]_. Parameters ========== expr : Expr A sympy expression to compute the variance for. consts : sequence of Symbols, optional Represents symbols that are known constants in the expr, and thus have zero variance. All symbols not in consts are assumed to be variant. include_covar : bool, optional Flag for whether or not to include covariances, default=False. Returns ======= var_expr : Expr An expression for the total variance of the expr. The variance for the original symbols (e.g. x) are represented via instance of the Variance symbol (e.g. Variance(x)). Examples ======== >>> from sympy import symbols, exp >>> from sympy.stats.error_prop import variance_prop >>> x, y = symbols('x y') >>> variance_prop(x + y) Variance(x) + Variance(y) >>> variance_prop(x * y) x*2Variance(y) + y*2Variance(x) >>> variance_prop(exp(2x)) 4exp(4x)Variance(x) References ========== .. [1] https://en.wikipedia.org/wiki/Propagation_of_uncertainty """ args = expr.args if len(args) == 0: if expr in consts: return S(0) elif isinstance(expr, RandomSymbol): return Variance(expr).doit() elif isinstance(expr, Symbol): return Variance(RandomSymbol(expr)).doit() else: return S(0) nargs = len(args) var_args = list(map(variance_prop, args, repeat(consts, nargs), repeat(include_covar, nargs))) if isinstance(expr, Add): var_expr = Add(var_args) if include_covar: terms = [2 Covariance(_arg0_or_var(x), _arg0_or_var(y)).doit() \ for x, y in combinations(var_args, 2)] var_expr += Add(terms) elif isinstance(expr, Mul): terms = [v/a2 for a, v in zip(args, var_args)] var_expr = simplify(expr2 Add(terms)) if include_covar: terms = [2Covariance(_arg0_or_var(x), _arg0_or_var(y)).doit()/(ab) \ for (a, b), (x, y) in zip(combinations(args, 2), combinations(var_args, 2))] var_expr += Add(terms) elif isinstance(expr, Pow): b = args[1] v = var_args[0] * (expr * b / args[0])*2 var_expr = simplify(v) elif isinstance(expr, exp): var_expr = simplify(var_args[0] expr**2) else: # unknown how to proceed, return variance of whole expr. var_expr = Variance(expr) return var_expr
e786a7f6ad602c4ae9d6cbfc556657ef57df1532792105c5edf7df0da74539c0	""" Contains ======== Geometric Logarithmic NegativeBinomial Poisson Skellam YuleSimon Zeta """ from __future__ import print_function, division import random from sympy import (factorial, exp, S, sympify, I, zeta, polylog, log, beta, hyper, binomial, Piecewise, floor, besseli, sqrt) from sympy.stats import density from sympy.stats.drv import SingleDiscreteDistribution, SingleDiscretePSpace from sympy.stats.joint_rv import JointPSpace, CompoundDistribution from sympy.stats.rv import _value_check, RandomSymbol __all__ = ['Geometric', 'Logarithmic', 'NegativeBinomial', 'Poisson', 'Skellam', 'YuleSimon', 'Zeta' ] def rv(symbol, cls, args): args = list(map(sympify, args)) dist = cls(args) dist.check(args) pspace = SingleDiscretePSpace(symbol, dist) if any(isinstance(arg, RandomSymbol) for arg in args): pspace = JointPSpace(symbol, CompoundDistribution(dist)) return pspace.value #------------------------------------------------------------------------------- # Geometric distribution ------------------------------------------------------------ class GeometricDistribution(SingleDiscreteDistribution): _argnames = ('p',) set = S.Naturals @staticmethod def check(p): _value_check((0 < p, p <= 1), "p must be between 0 and 1") def pdf(self, k): return (1 - self.p)(k - 1) self.p def _characteristic_function(self, t): p = self.p return p * exp(It) / (1 - (1 - p)exp(It)) def _moment_generating_function(self, t): p = self.p return p exp(t) / (1 - (1 - p) * exp(t)) def Geometric(name, p): r""" Create a discrete random variable with a Geometric distribution. The density of the Geometric distribution is given by .. math:: f(k) := p (1 - p)^{k - 1} Parameters ========== p: A probability between 0 and 1 Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Geometric, density, E, variance >>> from sympy import Symbol, S >>> p = S.One / 5 >>> z = Symbol("z") >>> X = Geometric("x", p) >>> density(X)(z) (4/5)*(z - 1)/5 >>> E(X) 5 >>> variance(X) 20 References ========== .. [1] https://en.wikipedia.org/wiki/Geometric_distribution .. [2] http://mathworld.wolfram.com/GeometricDistribution.html """ return rv(name, GeometricDistribution, p) #------------------------------------------------------------------------------- # Logarithmic distribution ------------------------------------------------------------ class LogarithmicDistribution(SingleDiscreteDistribution): _argnames = ('p',) set = S.Naturals @staticmethod def check(p): _value_check((p > 0, p < 1), "p should be between 0 and 1") def pdf(self, k): p = self.p return (-1) p*k / (k log(1 - p)) def _characteristic_function(self, t): p = self.p return log(1 - p * exp(It)) / log(1 - p) def _moment_generating_function(self, t): p = self.p return log(1 - p exp(t)) / log(1 - p) def sample(self): ### TODO raise NotImplementedError("Sampling of %s is not implemented" % density(self)) def Logarithmic(name, p): r""" Create a discrete random variable with a Logarithmic distribution. The density of the Logarithmic distribution is given by .. math:: f(k) := \frac{-p^k}{k \ln{(1 - p)}} Parameters ========== p: A value between 0 and 1 Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Logarithmic, density, E, variance >>> from sympy import Symbol, S >>> p = S.One / 5 >>> z = Symbol("z") >>> X = Logarithmic("x", p) >>> density(X)(z) -5*(-z)/(zlog(4/5)) >>> E(X) -1/(-4log(5) + 8log(2)) >>> variance(X) -1/((-4log(5) + 8log(2))(-2log(5) + 4log(2))) + 1/(-64log(2)log(5) + 64log(2)*2 + 16log(5)*2) - 10/(-32log(5) + 64log(2)) References ========== .. [1] https://en.wikipedia.org/wiki/Logarithmic_distribution .. [2] http://mathworld.wolfram.com/LogarithmicDistribution.html """ return rv(name, LogarithmicDistribution, p) #------------------------------------------------------------------------------- # Negative binomial distribution ------------------------------------------------------------ class NegativeBinomialDistribution(SingleDiscreteDistribution): _argnames = ('r', 'p') set = S.Naturals0 @staticmethod def check(r, p): _value_check(r > 0, 'r should be positive') _value_check((p > 0, p < 1), 'p should be between 0 and 1') def pdf(self, k): r = self.r p = self.p return binomial(k + r - 1, k) (1 - p)*r p*k def _characteristic_function(self, t): r = self.r p = self.p return ((1 - p) / (1 - p exp(It)))r def _moment_generating_function(self, t): r = self.r p = self.p return ((1 - p) / (1 - p exp(t)))*r def sample(self): ### TODO raise NotImplementedError("Sampling of %s is not implemented" % density(self)) def NegativeBinomial(name, r, p): r""" Create a discrete random variable with a Negative Binomial distribution. The density of the Negative Binomial distribution is given by .. math:: f(k) := \binom{k + r - 1}{k} (1 - p)^r p^k Parameters ========== r: A positive value p: A value between 0 and 1 Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import NegativeBinomial, density, E, variance >>> from sympy import Symbol, S >>> r = 5 >>> p = S.One / 5 >>> z = Symbol("z") >>> X = NegativeBinomial("x", r, p) >>> density(X)(z) 10245*(-z)binomial(z + 4, z)/3125 >>> E(X) 5/4 >>> variance(X) 25/16 References ========== .. [1] https://en.wikipedia.org/wiki/Negative_binomial_distribution .. [2] http://mathworld.wolfram.com/NegativeBinomialDistribution.html """ return rv(name, NegativeBinomialDistribution, r, p) #------------------------------------------------------------------------------- # Poisson distribution ------------------------------------------------------------ class PoissonDistribution(SingleDiscreteDistribution): _argnames = ('lamda',) set = S.Naturals0 @staticmethod def check(lamda): _value_check(lamda > 0, "Lambda must be positive") def pdf(self, k): return self.lamda*k / factorial(k) exp(-self.lamda) def sample(self): def search(x, y, u): while x < y: mid = (x + y)//2 if u <= self.cdf(mid): y = mid else: x = mid + 1 return x u = random.uniform(0, 1) if u <= self.cdf(S.Zero): return S.Zero n = S.One while True: if u > self.cdf(2n): n = 2 else: return search(n, 2n, u) def _characteristic_function(self, t): return exp(self.lamda (exp(It) - 1)) def _moment_generating_function(self, t): return exp(self.lamda (exp(t) - 1)) def Poisson(name, lamda): r""" Create a discrete random variable with a Poisson distribution. The density of the Poisson distribution is given by .. math:: f(k) := \frac{\lambda^{k} e^{- \lambda}}{k!} Parameters ========== lamda: Positive number, a rate Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Poisson, density, E, variance >>> from sympy import Symbol, simplify >>> rate = Symbol("lambda", positive=True) >>> z = Symbol("z") >>> X = Poisson("x", rate) >>> density(X)(z) lambda*zexp(-lambda)/factorial(z) >>> E(X) lambda >>> simplify(variance(X)) lambda References ========== .. [1] https://en.wikipedia.org/wiki/Poisson_distribution .. [2] http://mathworld.wolfram.com/PoissonDistribution.html """ return rv(name, PoissonDistribution, lamda) # ----------------------------------------------------------------------------- # Skellam distribution -------------------------------------------------------- class SkellamDistribution(SingleDiscreteDistribution): _argnames = ('mu1', 'mu2') set = S.Integers @staticmethod def check(mu1, mu2): _value_check(mu1 >= 0, 'Parameter mu1 must be >= 0') _value_check(mu2 >= 0, 'Parameter mu2 must be >= 0') def pdf(self, k): (mu1, mu2) = (self.mu1, self.mu2) term1 = exp(-(mu1 + mu2)) * (mu1 / mu2) ** (k / 2) term2 = besseli(k, 2 * sqrt(mu1 * mu2)) return term1 * term2 def _cdf(self, x): raise NotImplementedError( "Skellam doesn't have closed form for the CDF.") def _characteristic_function(self, t): (mu1, mu2) = (self.mu1, self.mu2) return exp(-(mu1 + mu2) + mu1 * exp(I * t) + mu2 * exp(-I * t)) def _moment_generating_function(self, t): (mu1, mu2) = (self.mu1, self.mu2) return exp(-(mu1 + mu2) + mu1 * exp(t) + mu2 * exp(-t)) def Skellam(name, mu1, mu2): r""" Create a discrete random variable with a Skellam distribution. The Skellam is the distribution of the difference N1 - N2 of two statistically independent random variables N1 and N2 each Poisson-distributed with respective expected values mu1 and mu2. The density of the Skellam distribution is given by .. math:: f(k) := e^{-(\mu_1+\mu_2)}(\frac{\mu_1}{\mu_2})^{k/2}I_k(2\sqrt{\mu_1\mu_2}) Parameters ========== mu1: A non-negative value mu2: A non-negative value Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Skellam, density, E, variance >>> from sympy import Symbol, simplify, pprint >>> z = Symbol("z", integer=True) >>> mu1 = Symbol("mu1", positive=True) >>> mu2 = Symbol("mu2", positive=True) >>> X = Skellam("x", mu1, mu2) >>> pprint(density(X)(z), use_unicode=False) z - 2 /mu1\ -mu1 - mu2 / _____ _____\ \|---\| e besseli\z, 2\/ mu1 \/ mu2 / \mu2/ >>> E(X) mu1 - mu2 >>> variance(X).expand() mu1 + mu2 References ========== .. [1] https://en.wikipedia.org/wiki/Skellam_distribution """ return rv(name, SkellamDistribution, mu1, mu2) #------------------------------------------------------------------------------- # Yule-Simon distribution ------------------------------------------------------------ class YuleSimonDistribution(SingleDiscreteDistribution): _argnames = ('rho',) set = S.Naturals @staticmethod def check(rho): _value_check(rho > 0, 'rho should be positive') def pdf(self, k): rho = self.rho return rho * beta(k, rho + 1) def _cdf(self, x): return Piecewise((1 - floor(x) * beta(floor(x), self.rho + 1), x >= 1), (0, True)) def _characteristic_function(self, t): rho = self.rho return rho * hyper((1, 1), (rho + 2,), exp(It)) exp(It) / (rho + 1) def _moment_generating_function(self, t): rho = self.rho return rho hyper((1, 1), (rho + 2,), exp(t)) * exp(t) / (rho + 1) def sample(self): ### TODO raise NotImplementedError("Sampling of %s is not implemented" % density(self)) def YuleSimon(name, rho): r""" Create a discrete random variable with a Yule-Simon distribution. The density of the Yule-Simon distribution is given by .. math:: f(k) := \rho B(k, \rho + 1) Parameters ========== rho: A positive value Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import YuleSimon, density, E, variance >>> from sympy import Symbol, simplify >>> p = 5 >>> z = Symbol("z") >>> X = YuleSimon("x", p) >>> density(X)(z) 5beta(z, 6) >>> simplify(E(X)) 5/4 >>> simplify(variance(X)) 25/48 References ========== .. [1] https://en.wikipedia.org/wiki/Yule%E2%80%93Simon_distribution """ return rv(name, YuleSimonDistribution, rho) #------------------------------------------------------------------------------- # Zeta distribution ------------------------------------------------------------ class ZetaDistribution(SingleDiscreteDistribution): _argnames = ('s',) set = S.Naturals @staticmethod def check(s): _value_check(s > 1, 's should be greater than 1') def pdf(self, k): s = self.s return 1 / (ks zeta(s)) def _characteristic_function(self, t): return polylog(self.s, exp(It)) / zeta(self.s) def _moment_generating_function(self, t): return polylog(self.s, exp(t)) / zeta(self.s) def sample(self): ### TODO raise NotImplementedError("Sampling of %s is not implemented" % density(self)) def Zeta(name, s): r""" Create a discrete random variable with a Zeta distribution. The density of the Zeta distribution is given by .. math:: f(k) := \frac{1}{k^s \zeta{(s)}} Parameters ========== s: A value greater than 1 Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Zeta, density, E, variance >>> from sympy import Symbol >>> s = 5 >>> z = Symbol("z") >>> X = Zeta("x", s) >>> density(X)(z) 1/(z5zeta(5)) >>> E(X) pi*4/(90zeta(5)) >>> variance(X) -pi*8/(8100zeta(5)**2) + zeta(3)/zeta(5) References ========== .. [1] https://en.wikipedia.org/wiki/Zeta_distribution """ return rv(name, ZetaDistribution, s)
45d742abe6ac894c4aaf3f2e6c5eb0f98c9aff973b5ef6cbb246a0bba3b2abae	from __future__ import print_function, division from sympy import sqrt, Symbol, log, exp, FallingFactorial from .rv import (probability, expectation, density, where, given, pspace, cdf, characteristic_function, sample, sample_iter, random_symbols, independent, dependent, sampling_density, moment_generating_function, quantile) __all__ = ['P', 'E', 'H', 'density', 'where', 'given', 'sample', 'cdf', 'characteristic_function', 'pspace', 'sample_iter', 'variance', 'std', 'skewness', 'kurtosis', 'covariance', 'dependent', 'independent', 'random_symbols', 'correlation', 'factorial_moment', 'moment', 'cmoment', 'sampling_density', 'moment_generating_function', 'quantile'] def moment(X, n, c=0, condition=None, kwargs): """ Return the nth moment of a random expression about c i.e. E((X-c)n) Default value of c is 0. Examples ======== >>> from sympy.stats import Die, moment, E >>> X = Die('X', 6) >>> moment(X, 1, 6) -5/2 >>> moment(X, 2) 91/6 >>> moment(X, 1) == E(X) True """ return expectation((X - c)n, condition, kwargs) def variance(X, condition=None, kwargs): """ Variance of a random expression Expectation of (X-E(X))2 Examples ======== >>> from sympy.stats import Die, E, Bernoulli, variance >>> from sympy import simplify, Symbol >>> X = Die('X', 6) >>> p = Symbol('p') >>> B = Bernoulli('B', p, 1, 0) >>> variance(2X) 35/3 >>> simplify(variance(B)) p(1 - p) """ return cmoment(X, 2, condition, kwargs) def standard_deviation(X, condition=None, kwargs): """ Standard Deviation of a random expression Square root of the Expectation of (X-E(X))*2 Examples ======== >>> from sympy.stats import Bernoulli, std >>> from sympy import Symbol, simplify >>> p = Symbol('p') >>> B = Bernoulli('B', p, 1, 0) >>> simplify(std(B)) sqrt(p(1 - p)) """ return sqrt(variance(X, condition, kwargs)) std = standard_deviation def entropy(expr, condition=None, kwargs): """ Calculuates entropy of a probability distribution Parameters ========== expression : the random expression whose entropy is to be calculated condition : optional, to specify conditions on random expression b: base of the logarithm, optional By default, it is taken as Euler's number Returns ======= result : Entropy of the expression, a constant Examples ======== >>> from sympy.stats import Normal, Die, entropy >>> X = Normal('X', 0, 1) >>> entropy(X) log(2)/2 + 1/2 + log(pi)/2 >>> D = Die('D', 4) >>> entropy(D) log(4) References ========== .. [1] https://en.wikipedia.org/wiki/Entropy_(information_theory) .. [2] https://www.crmarsh.com/static/pdf/Charles_Marsh_Continuous_Entropy.pdf .. [3] http://www.math.uconn.edu/~kconrad/blurbs/analysis/entropypost.pdf """ pdf = density(expr, condition, *kwargs) base = kwargs.get('b', exp(1)) if hasattr(pdf, 'dict'): return sum([-problog(prob, base) for prob in pdf.dict.values()]) return expectation(-log(pdf(expr), base)) def covariance(X, Y, condition=None, *kwargs): """ Covariance of two random expressions The expectation that the two variables will rise and fall together Covariance(X,Y) = E( (X-E(X)) (Y-E(Y)) ) Examples ======== >>> from sympy.stats import Exponential, covariance >>> from sympy import Symbol >>> rate = Symbol('lambda', positive=True, real=True, finite=True) >>> X = Exponential('X', rate) >>> Y = Exponential('Y', rate) >>> covariance(X, X) lambda*(-2) >>> covariance(X, Y) 0 >>> covariance(X, Y + rateX) 1/lambda """ return expectation( (X - expectation(X, condition, *kwargs)) (Y - expectation(Y, condition, kwargs)), condition, kwargs) def correlation(X, Y, condition=None, *kwargs): """ Correlation of two random expressions, also known as correlation coefficient or Pearson's correlation The normalized expectation that the two variables will rise and fall together Correlation(X,Y) = E( (X-E(X)) (Y-E(Y)) / (sigma(X) * sigma(Y)) ) Examples ======== >>> from sympy.stats import Exponential, correlation >>> from sympy import Symbol >>> rate = Symbol('lambda', positive=True, real=True, finite=True) >>> X = Exponential('X', rate) >>> Y = Exponential('Y', rate) >>> correlation(X, X) 1 >>> correlation(X, Y) 0 >>> correlation(X, Y + rateX) 1/sqrt(1 + lambda(-2)) """ return covariance(X, Y, condition, kwargs)/(std(X, condition, kwargs) std(Y, condition, kwargs)) def cmoment(X, n, condition=None, kwargs): """ Return the nth central moment of a random expression about its mean i.e. E((X - E(X))n) Examples ======== >>> from sympy.stats import Die, cmoment, variance >>> X = Die('X', 6) >>> cmoment(X, 3) 0 >>> cmoment(X, 2) 35/12 >>> cmoment(X, 2) == variance(X) True """ mu = expectation(X, condition, kwargs) return moment(X, n, mu, condition, kwargs) def smoment(X, n, condition=None, kwargs): """ Return the nth Standardized moment of a random expression i.e. E(((X - mu)/sigma(X))*n) Examples ======== >>> from sympy.stats import skewness, Exponential, smoment >>> from sympy import Symbol >>> rate = Symbol('lambda', positive=True, real=True, finite=True) >>> Y = Exponential('Y', rate) >>> smoment(Y, 4) 9 >>> smoment(Y, 4) == smoment(3Y, 4) True >>> smoment(Y, 3) == skewness(Y) True """ sigma = std(X, condition, kwargs) return (1/sigma)ncmoment(X, n, condition, kwargs) def skewness(X, condition=None, kwargs): """ Measure of the asymmetry of the probability distribution. Positive skew indicates that most of the values lie to the right of the mean. skewness(X) = E(((X - E(X))/sigma)3) Parameters ========== condition : Expr containing RandomSymbols A conditional expression. skewness(X, X>0) is skewness of X given X > 0 Examples ======== >>> from sympy.stats import skewness, Exponential, Normal >>> from sympy import Symbol >>> X = Normal('X', 0, 1) >>> skewness(X) 0 >>> skewness(X, X > 0) # find skewness given X > 0 (-sqrt(2)/sqrt(pi) + 4sqrt(2)/pi(3/2))/(1 - 2/pi)(3/2) >>> rate = Symbol('lambda', positive=True, real=True, finite=True) >>> Y = Exponential('Y', rate) >>> skewness(Y) 2 """ return smoment(X, 3, condition=condition, kwargs) def kurtosis(X, condition=None, kwargs): """ Characterizes the tails/outliers of a probability distribution. Kurtosis of any univariate normal distribution is 3. Kurtosis less than 3 means that the distribution produces fewer and less extreme outliers than the normal distribution. kurtosis(X) = E(((X - E(X))/sigma)4) Parameters ========== condition : Expr containing RandomSymbols A conditional expression. kurtosis(X, X>0) is kurtosis of X given X > 0 Examples ======== >>> from sympy.stats import kurtosis, Exponential, Normal >>> from sympy import Symbol >>> X = Normal('X', 0, 1) >>> kurtosis(X) 3 >>> kurtosis(X, X > 0) # find kurtosis given X > 0 (-4/pi - 12/pi2 + 3)/(1 - 2/pi)2 >>> rate = Symbol('lamda', positive=True, real=True, finite=True) >>> Y = Exponential('Y', rate) >>> kurtosis(Y) 9 References ========== .. [1] https://en.wikipedia.org/wiki/Kurtosis .. [2] http://mathworld.wolfram.com/Kurtosis.html """ return smoment(X, 4, condition=condition, kwargs) def factorial_moment(X, n, condition=None, *kwargs): """ The factorial moment is a mathematical quantity defined as the expectation or average of the falling factorial of a random variable. factorial_moment(X, n) = E(X(X - 1)(X - 2)...(X - n + 1)) Parameters ========== n: A natural number, n-th factorial moment. condition : Expr containing RandomSymbols A conditional expression. Examples ======== >>> from sympy.stats import factorial_moment, Poisson, Binomial >>> from sympy import Symbol, S >>> lamda = Symbol('lamda') >>> X = Poisson('X', lamda) >>> factorial_moment(X, 2) lamda2 >>> Y = Binomial('Y', 2, S.Half) >>> factorial_moment(Y, 2) 1/2 >>> factorial_moment(Y, 2, Y > 1) # find factorial moment for Y > 1 2 References ========== .. [1] https://en.wikipedia.org/wiki/Factorial_moment .. [2] http://mathworld.wolfram.com/FactorialMoment.html """ return expectation(FallingFactorial(X, n), condition=condition, *kwargs) P = probability E = expectation H = entropy
ab88753cc6e15fbed250cbd8a3b213aaa6582bfa914412b0beb1cb67b3bf2397	""" Main Random Variables Module Defines abstract random variable type. Contains interfaces for probability space object (PSpace) as well as standard operators, P, E, sample, density, where, quantile See Also ======== sympy.stats.crv sympy.stats.frv sympy.stats.rv_interface """ from __future__ import print_function, division from sympy import (Basic, S, Expr, Symbol, Tuple, And, Add, Eq, lambdify, Equality, Lambda, sympify, Dummy, Ne, KroneckerDelta, DiracDelta, Mul, Indexed, MatrixSymbol, Function) from sympy.core.compatibility import string_types from sympy.core.relational import Relational from sympy.core.sympify import _sympify from sympy.logic.boolalg import Boolean from sympy.sets.sets import FiniteSet, ProductSet, Intersection from sympy.solvers.solveset import solveset x = Symbol('x') class RandomDomain(Basic): """ Represents a set of variables and the values which they can take See Also ======== sympy.stats.crv.ContinuousDomain sympy.stats.frv.FiniteDomain """ is_ProductDomain = False is_Finite = False is_Continuous = False is_Discrete = False def __new__(cls, symbols, args): symbols = FiniteSet(symbols) return Basic.__new__(cls, symbols, args) @property def symbols(self): return self.args[0] @property def set(self): return self.args[1] def __contains__(self, other): raise NotImplementedError() def compute_expectation(self, expr): raise NotImplementedError() class SingleDomain(RandomDomain): """ A single variable and its domain See Also ======== sympy.stats.crv.SingleContinuousDomain sympy.stats.frv.SingleFiniteDomain """ def __new__(cls, symbol, set): assert symbol.is_Symbol return Basic.__new__(cls, symbol, set) @property def symbol(self): return self.args[0] @property def symbols(self): return FiniteSet(self.symbol) def __contains__(self, other): if len(other) != 1: return False sym, val = tuple(other)[0] return self.symbol == sym and val in self.set class ConditionalDomain(RandomDomain): """ A RandomDomain with an attached condition See Also ======== sympy.stats.crv.ConditionalContinuousDomain sympy.stats.frv.ConditionalFiniteDomain """ def __new__(cls, fulldomain, condition): condition = condition.xreplace(dict((rs, rs.symbol) for rs in random_symbols(condition))) return Basic.__new__(cls, fulldomain, condition) @property def symbols(self): return self.fulldomain.symbols @property def fulldomain(self): return self.args[0] @property def condition(self): return self.args[1] @property def set(self): raise NotImplementedError("Set of Conditional Domain not Implemented") def as_boolean(self): return And(self.fulldomain.as_boolean(), self.condition) class PSpace(Basic): """ A Probability Space Probability Spaces encode processes that equal different values probabilistically. These underly Random Symbols which occur in SymPy expressions and contain the mechanics to evaluate statistical statements. See Also ======== sympy.stats.crv.ContinuousPSpace sympy.stats.frv.FinitePSpace """ is_Finite = None is_Continuous = None is_Discrete = None is_real = None @property def domain(self): return self.args[0] @property def density(self): return self.args[1] @property def values(self): return frozenset(RandomSymbol(sym, self) for sym in self.symbols) @property def symbols(self): return self.domain.symbols def where(self, condition): raise NotImplementedError() def compute_density(self, expr): raise NotImplementedError() def sample(self): raise NotImplementedError() def probability(self, condition): raise NotImplementedError() def compute_expectation(self, expr): raise NotImplementedError() class SinglePSpace(PSpace): """ Represents the probabilities of a set of random events that can be attributed to a single variable/symbol. """ def __new__(cls, s, distribution): if isinstance(s, string_types): s = Symbol(s) if not isinstance(s, Symbol): raise TypeError("s should have been string or Symbol") return Basic.__new__(cls, s, distribution) @property def value(self): return RandomSymbol(self.symbol, self) @property def symbol(self): return self.args[0] @property def distribution(self): return self.args[1] @property def pdf(self): return self.distribution.pdf(self.symbol) class RandomSymbol(Expr): """ Random Symbols represent ProbabilitySpaces in SymPy Expressions In principle they can take on any value that their symbol can take on within the associated PSpace with probability determined by the PSpace Density. Random Symbols contain pspace and symbol properties. The pspace property points to the represented Probability Space The symbol is a standard SymPy Symbol that is used in that probability space for example in defining a density. You can form normal SymPy expressions using RandomSymbols and operate on those expressions with the Functions E - Expectation of a random expression P - Probability of a condition density - Probability Density of an expression given - A new random expression (with new random symbols) given a condition An object of the RandomSymbol type should almost never be created by the user. They tend to be created instead by the PSpace class's value method. Traditionally a user doesn't even do this but instead calls one of the convenience functions Normal, Exponential, Coin, Die, FiniteRV, etc.... """ def __new__(cls, symbol, pspace=None): from sympy.stats.joint_rv import JointRandomSymbol if pspace is None: # Allow single arg, representing pspace == PSpace() pspace = PSpace() if not isinstance(symbol, Symbol): raise TypeError("symbol should be of type Symbol") if not isinstance(pspace, PSpace): raise TypeError("pspace variable should be of type PSpace") if cls == JointRandomSymbol and isinstance(pspace, SinglePSpace): cls = RandomSymbol return Basic.__new__(cls, symbol, pspace) is_finite = True is_symbol = True is_Atom = True _diff_wrt = True pspace = property(lambda self: self.args[1]) symbol = property(lambda self: self.args[0]) name = property(lambda self: self.symbol.name) def _eval_is_positive(self): return self.symbol.is_positive def _eval_is_integer(self): return self.symbol.is_integer def _eval_is_real(self): return self.symbol.is_real or self.pspace.is_real @property def is_commutative(self): return self.symbol.is_commutative @property def free_symbols(self): return {self} class RandomIndexedSymbol(RandomSymbol): def __new__(cls, idx_obj, pspace=None): if not isinstance(idx_obj, (Indexed, Function)): raise TypeError("An Function or Indexed object is expected not %s"%(idx_obj)) return Basic.__new__(cls, idx_obj, pspace) symbol = property(lambda self: self.args[0]) name = property(lambda self: str(self.args[0])) @property def key(self): if isinstance(self.symbol, Indexed): return self.symbol.args[1] elif isinstance(self.symbol, Function): return self.symbol.args[0] class RandomMatrixSymbol(MatrixSymbol): def __new__(cls, symbol, n, m, pspace=None): from sympy.stats.random_matrix import RandomMatrixPSpace n, m = _sympify(n), _sympify(m) symbol = _symbol_converter(symbol) return Basic.__new__(cls, symbol, n, m, pspace) symbol = property(lambda self: self.args[0]) pspace = property(lambda self: self.args[3]) class ProductPSpace(PSpace): """ Abstract class for representing probability spaces with multiple random variables. See Also ======== sympy.stats.rv.IndependentProductPSpace sympy.stats.joint_rv.JointPSpace """ pass class IndependentProductPSpace(ProductPSpace): """ A probability space resulting from the merger of two independent probability spaces. Often created using the function, pspace """ def __new__(cls, spaces): rs_space_dict = {} for space in spaces: for value in space.values: rs_space_dict[value] = space symbols = FiniteSet([val.symbol for val in rs_space_dict.keys()]) # Overlapping symbols from sympy.stats.joint_rv import MarginalDistribution, CompoundDistribution if len(symbols) < sum(len(space.symbols) for space in spaces if not isinstance(space.distribution, ( CompoundDistribution, MarginalDistribution))): raise ValueError("Overlapping Random Variables") if all(space.is_Finite for space in spaces): from sympy.stats.frv import ProductFinitePSpace cls = ProductFinitePSpace obj = Basic.__new__(cls, FiniteSet(spaces)) return obj @property def pdf(self): p = Mul([space.pdf for space in self.spaces]) return p.subs(dict((rv, rv.symbol) for rv in self.values)) @property def rs_space_dict(self): d = {} for space in self.spaces: for value in space.values: d[value] = space return d @property def symbols(self): return FiniteSet([val.symbol for val in self.rs_space_dict.keys()]) @property def spaces(self): return FiniteSet(self.args) @property def values(self): return sumsets(space.values for space in self.spaces) def compute_expectation(self, expr, rvs=None, evaluate=False, kwargs): rvs = rvs or self.values rvs = frozenset(rvs) for space in self.spaces: expr = space.compute_expectation(expr, rvs & space.values, evaluate=False, kwargs) if evaluate and hasattr(expr, 'doit'): return expr.doit(*kwargs) return expr @property def domain(self): return ProductDomain([space.domain for space in self.spaces]) @property def density(self): raise NotImplementedError("Density not available for ProductSpaces") def sample(self): return {k: v for space in self.spaces for k, v in space.sample().items()} def probability(self, condition, kwargs): cond_inv = False if isinstance(condition, Ne): condition = Eq(condition.args[0], condition.args[1]) cond_inv = True expr = condition.lhs - condition.rhs rvs = random_symbols(expr) z = Dummy('z', real=True, Finite=True) dens = self.compute_density(expr) if any([pspace(rv).is_Continuous for rv in rvs]): from sympy.stats.crv import (ContinuousDistributionHandmade, SingleContinuousPSpace) if expr in self.values: # Marginalize all other random symbols out of the density randomsymbols = tuple(set(self.values) - frozenset([expr])) symbols = tuple(rs.symbol for rs in randomsymbols) pdf = self.domain.integrate(self.pdf, symbols, kwargs) return Lambda(expr.symbol, pdf) dens = ContinuousDistributionHandmade(dens) space = SingleContinuousPSpace(z, dens) result = space.probability(condition.__class__(space.value, 0)) else: from sympy.stats.drv import (DiscreteDistributionHandmade, SingleDiscretePSpace) dens = DiscreteDistributionHandmade(dens) space = SingleDiscretePSpace(z, dens) result = space.probability(condition.__class__(space.value, 0)) return result if not cond_inv else S.One - result def compute_density(self, expr, kwargs): z = Dummy('z', real=True, finite=True) rvs = random_symbols(expr) if any(pspace(rv).is_Continuous for rv in rvs): expr = self.compute_expectation(DiracDelta(expr - z), kwargs) else: expr = self.compute_expectation(KroneckerDelta(expr, z), kwargs) return Lambda(z, expr) def compute_cdf(self, expr, kwargs): raise ValueError("CDF not well defined on multivariate expressions") def conditional_space(self, condition, normalize=True, kwargs): rvs = random_symbols(condition) condition = condition.xreplace(dict((rv, rv.symbol) for rv in self.values)) if any([pspace(rv).is_Continuous for rv in rvs]): from sympy.stats.crv import (ConditionalContinuousDomain, ContinuousPSpace) space = ContinuousPSpace domain = ConditionalContinuousDomain(self.domain, condition) elif any([pspace(rv).is_Discrete for rv in rvs]): from sympy.stats.drv import (ConditionalDiscreteDomain, DiscretePSpace) space = DiscretePSpace domain = ConditionalDiscreteDomain(self.domain, condition) elif all([pspace(rv).is_Finite for rv in rvs]): from sympy.stats.frv import FinitePSpace return FinitePSpace.conditional_space(self, condition) if normalize: replacement = {rv: Dummy(str(rv)) for rv in self.symbols} norm = domain.compute_expectation(self.pdf, kwargs) pdf = self.pdf / norm.xreplace(replacement) density = Lambda(domain.symbols, pdf) return space(domain, density) class ProductDomain(RandomDomain): """ A domain resulting from the merger of two independent domains See Also ======== sympy.stats.crv.ProductContinuousDomain sympy.stats.frv.ProductFiniteDomain """ is_ProductDomain = True def __new__(cls, domains): # Flatten any product of products domains2 = [] for domain in domains: if not domain.is_ProductDomain: domains2.append(domain) else: domains2.extend(domain.domains) domains2 = FiniteSet(domains2) if all(domain.is_Finite for domain in domains2): from sympy.stats.frv import ProductFiniteDomain cls = ProductFiniteDomain if all(domain.is_Continuous for domain in domains2): from sympy.stats.crv import ProductContinuousDomain cls = ProductContinuousDomain if all(domain.is_Discrete for domain in domains2): from sympy.stats.drv import ProductDiscreteDomain cls = ProductDiscreteDomain return Basic.__new__(cls, domains2) @property def sym_domain_dict(self): return dict((symbol, domain) for domain in self.domains for symbol in domain.symbols) @property def symbols(self): return FiniteSet([sym for domain in self.domains for sym in domain.symbols]) @property def domains(self): return self.args @property def set(self): return ProductSet(domain.set for domain in self.domains) def __contains__(self, other): # Split event into each subdomain for domain in self.domains: # Collect the parts of this event which associate to this domain elem = frozenset([item for item in other if sympify(domain.symbols.contains(item[0])) is S.true]) # Test this sub-event if elem not in domain: return False # All subevents passed return True def as_boolean(self): return And([domain.as_boolean() for domain in self.domains]) def random_symbols(expr): """ Returns all RandomSymbols within a SymPy Expression. """ atoms = getattr(expr, 'atoms', None) if atoms is not None: comp = lambda rv: rv.symbol.name l = list(atoms(RandomSymbol)) return sorted(l, key=comp) else: return [] def pspace(expr): """ Returns the underlying Probability Space of a random expression. For internal use. Examples ======== >>> from sympy.stats import pspace, Normal >>> from sympy.stats.rv import IndependentProductPSpace >>> X = Normal('X', 0, 1) >>> pspace(2X + 1) == X.pspace True """ expr = sympify(expr) if isinstance(expr, RandomSymbol) and expr.pspace is not None: return expr.pspace if expr.has(RandomMatrixSymbol): rm = list(expr.atoms(RandomMatrixSymbol))[0] return rm.pspace rvs = random_symbols(expr) if not rvs: raise ValueError("Expression containing Random Variable expected, not %s" % (expr)) # If only one space present if all(rv.pspace == rvs[0].pspace for rv in rvs): return rvs[0].pspace # Otherwise make a product space return IndependentProductPSpace([rv.pspace for rv in rvs]) def sumsets(sets): """ Union of sets """ return frozenset().union(sets) def rs_swap(a, b): """ Build a dictionary to swap RandomSymbols based on their underlying symbol. i.e. if ``X = ('x', pspace1)`` and ``Y = ('x', pspace2)`` then ``X`` and ``Y`` match and the key, value pair ``{X:Y}`` will appear in the result Inputs: collections a and b of random variables which share common symbols Output: dict mapping RVs in a to RVs in b """ d = {} for rsa in a: d[rsa] = [rsb for rsb in b if rsa.symbol == rsb.symbol][0] return d def given(expr, condition=None, *kwargs): r""" Conditional Random Expression From a random expression and a condition on that expression creates a new probability space from the condition and returns the same expression on that conditional probability space. Examples ======== >>> from sympy.stats import given, density, Die >>> X = Die('X', 6) >>> Y = given(X, X > 3) >>> density(Y).dict {4: 1/3, 5: 1/3, 6: 1/3} Following convention, if the condition is a random symbol then that symbol is considered fixed. >>> from sympy.stats import Normal >>> from sympy import pprint >>> from sympy.abc import z >>> X = Normal('X', 0, 1) >>> Y = Normal('Y', 0, 1) >>> pprint(density(X + Y, Y)(z), use_unicode=False) 2 -(-Y + z) ----------- ___ 2 \/ 2 e ------------------ ____ 2\/ pi """ if not random_symbols(condition) or pspace_independent(expr, condition): return expr if isinstance(condition, RandomSymbol): condition = Eq(condition, condition.symbol) condsymbols = random_symbols(condition) if (isinstance(condition, Equality) and len(condsymbols) == 1 and not isinstance(pspace(expr).domain, ConditionalDomain)): rv = tuple(condsymbols)[0] results = solveset(condition, rv) if isinstance(results, Intersection) and S.Reals in results.args: results = list(results.args[1]) sums = 0 for res in results: temp = expr.subs(rv, res) if temp == True: return True if temp != False: sums += expr.subs(rv, res) if sums == 0: return False return sums # Get full probability space of both the expression and the condition fullspace = pspace(Tuple(expr, condition)) # Build new space given the condition space = fullspace.conditional_space(condition, kwargs) # Dictionary to swap out RandomSymbols in expr with new RandomSymbols # That point to the new conditional space swapdict = rs_swap(fullspace.values, space.values) # Swap random variables in the expression expr = expr.xreplace(swapdict) return expr def expectation(expr, condition=None, numsamples=None, evaluate=True, kwargs): """ Returns the expected value of a random expression Parameters ========== expr : Expr containing RandomSymbols The expression of which you want to compute the expectation value given : Expr containing RandomSymbols A conditional expression. E(X, X>0) is expectation of X given X > 0 numsamples : int Enables sampling and approximates the expectation with this many samples evalf : Bool (defaults to True) If sampling return a number rather than a complex expression evaluate : Bool (defaults to True) In case of continuous systems return unevaluated integral Examples ======== >>> from sympy.stats import E, Die >>> X = Die('X', 6) >>> E(X) 7/2 >>> E(2X + 1) 8 >>> E(X, X > 3) # Expectation of X given that it is above 3 5 """ if not random_symbols(expr): # expr isn't random? return expr if numsamples: # Computing by monte carlo sampling? return sampling_E(expr, condition, numsamples=numsamples) if expr.has(RandomIndexedSymbol): return pspace(expr).compute_expectation(expr, condition, evaluate, *kwargs) # Create new expr and recompute E if condition is not None: # If there is a condition return expectation(given(expr, condition), evaluate=evaluate) # A few known statements for efficiency if expr.is_Add: # We know that E is Linear return Add([expectation(arg, evaluate=evaluate) for arg in expr.args]) # Otherwise case is simple, pass work off to the ProbabilitySpace result = pspace(expr).compute_expectation(expr, evaluate=evaluate, kwargs) if evaluate and hasattr(result, 'doit'): return result.doit(kwargs) else: return result def probability(condition, given_condition=None, numsamples=None, evaluate=True, kwargs): """ Probability that a condition is true, optionally given a second condition Parameters ========== condition : Combination of Relationals containing RandomSymbols The condition of which you want to compute the probability given_condition : Combination of Relationals containing RandomSymbols A conditional expression. P(X > 1, X > 0) is expectation of X > 1 given X > 0 numsamples : int Enables sampling and approximates the probability with this many samples evaluate : Bool (defaults to True) In case of continuous systems return unevaluated integral Examples ======== >>> from sympy.stats import P, Die >>> from sympy import Eq >>> X, Y = Die('X', 6), Die('Y', 6) >>> P(X > 3) 1/2 >>> P(Eq(X, 5), X > 2) # Probability that X == 5 given that X > 2 1/4 >>> P(X > Y) 5/12 """ condition = sympify(condition) given_condition = sympify(given_condition) if condition.has(RandomIndexedSymbol): return pspace(condition).probability(condition, given_condition, evaluate, kwargs) if isinstance(given_condition, RandomSymbol): condrv = random_symbols(condition) if len(condrv) == 1 and condrv[0] == given_condition: from sympy.stats.frv_types import BernoulliDistribution return BernoulliDistribution(probability(condition), 0, 1) if any([dependent(rv, given_condition) for rv in condrv]): from sympy.stats.symbolic_probability import Probability return Probability(condition, given_condition) else: return probability(condition) if given_condition is not None and \ not isinstance(given_condition, (Relational, Boolean)): raise ValueError("%s is not a relational or combination of relationals" % (given_condition)) if given_condition == False: return S.Zero if not isinstance(condition, (Relational, Boolean)): raise ValueError("%s is not a relational or combination of relationals" % (condition)) if condition is S.true: return S.One if condition is S.false: return S.Zero if numsamples: return sampling_P(condition, given_condition, numsamples=numsamples, kwargs) if given_condition is not None: # If there is a condition # Recompute on new conditional expr return probability(given(condition, given_condition, kwargs), kwargs) # Otherwise pass work off to the ProbabilitySpace result = pspace(condition).probability(condition, kwargs) if evaluate and hasattr(result, 'doit'): return result.doit() else: return result class Density(Basic): expr = property(lambda self: self.args[0]) @property def condition(self): if len(self.args) > 1: return self.args[1] else: return None def doit(self, evaluate=True, kwargs): from sympy.stats.joint_rv import JointPSpace from sympy.stats.frv import SingleFiniteDistribution from sympy.stats.random_matrix_models import RandomMatrixPSpace expr, condition = self.expr, self.condition if _sympify(expr).has(RandomMatrixSymbol): return pspace(expr).compute_density(expr) if isinstance(expr, SingleFiniteDistribution): return expr.dict if condition is not None: # Recompute on new conditional expr expr = given(expr, condition, kwargs) if isinstance(expr, RandomSymbol) and \ isinstance(expr.pspace, JointPSpace): return expr.pspace.distribution if not random_symbols(expr): return Lambda(x, DiracDelta(x - expr)) if (isinstance(expr, RandomSymbol) and hasattr(expr.pspace, 'distribution') and isinstance(pspace(expr), (SinglePSpace))): return expr.pspace.distribution result = pspace(expr).compute_density(expr, kwargs) if evaluate and hasattr(result, 'doit'): return result.doit() else: return result def density(expr, condition=None, evaluate=True, numsamples=None, kwargs): """ Probability density of a random expression, optionally given a second condition. This density will take on different forms for different types of probability spaces. Discrete variables produce Dicts. Continuous variables produce Lambdas. Parameters ========== expr : Expr containing RandomSymbols The expression of which you want to compute the density value condition : Relational containing RandomSymbols A conditional expression. density(X > 1, X > 0) is density of X > 1 given X > 0 numsamples : int Enables sampling and approximates the density with this many samples Examples ======== >>> from sympy.stats import density, Die, Normal >>> from sympy import Symbol >>> x = Symbol('x') >>> D = Die('D', 6) >>> X = Normal(x, 0, 1) >>> density(D).dict {1: 1/6, 2: 1/6, 3: 1/6, 4: 1/6, 5: 1/6, 6: 1/6} >>> density(2D).dict {2: 1/6, 4: 1/6, 6: 1/6, 8: 1/6, 10: 1/6, 12: 1/6} >>> density(X)(x) sqrt(2)exp(-x*2/2)/(2sqrt(pi)) """ if numsamples: return sampling_density(expr, condition, numsamples=numsamples, kwargs) return Density(expr, condition).doit(evaluate=evaluate, kwargs) def cdf(expr, condition=None, evaluate=True, *kwargs): """ Cumulative Distribution Function of a random expression. optionally given a second condition This density will take on different forms for different types of probability spaces. Discrete variables produce Dicts. Continuous variables produce Lambdas. Examples ======== >>> from sympy.stats import density, Die, Normal, cdf >>> D = Die('D', 6) >>> X = Normal('X', 0, 1) >>> density(D).dict {1: 1/6, 2: 1/6, 3: 1/6, 4: 1/6, 5: 1/6, 6: 1/6} >>> cdf(D) {1: 1/6, 2: 1/3, 3: 1/2, 4: 2/3, 5: 5/6, 6: 1} >>> cdf(3D, D > 2) {9: 1/4, 12: 1/2, 15: 3/4, 18: 1} >>> cdf(X) Lambda(_z, erf(sqrt(2)_z/2)/2 + 1/2) """ if condition is not None: # If there is a condition # Recompute on new conditional expr return cdf(given(expr, condition, kwargs), kwargs) # Otherwise pass work off to the ProbabilitySpace result = pspace(expr).compute_cdf(expr, kwargs) if evaluate and hasattr(result, 'doit'): return result.doit() else: return result def characteristic_function(expr, condition=None, evaluate=True, kwargs): """ Characteristic function of a random expression, optionally given a second condition Returns a Lambda Examples ======== >>> from sympy.stats import Normal, DiscreteUniform, Poisson, characteristic_function >>> X = Normal('X', 0, 1) >>> characteristic_function(X) Lambda(_t, exp(-_t2/2)) >>> Y = DiscreteUniform('Y', [1, 2, 7]) >>> characteristic_function(Y) Lambda(_t, exp(7_tI)/3 + exp(2_tI)/3 + exp(_tI)/3) >>> Z = Poisson('Z', 2) >>> characteristic_function(Z) Lambda(_t, exp(2exp(_tI) - 2)) """ if condition is not None: return characteristic_function(given(expr, condition, kwargs), kwargs) result = pspace(expr).compute_characteristic_function(expr, kwargs) if evaluate and hasattr(result, 'doit'): return result.doit() else: return result def moment_generating_function(expr, condition=None, evaluate=True, kwargs): if condition is not None: return moment_generating_function(given(expr, condition, kwargs), kwargs) result = pspace(expr).compute_moment_generating_function(expr, kwargs) if evaluate and hasattr(result, 'doit'): return result.doit() else: return result def where(condition, given_condition=None, kwargs): """ Returns the domain where a condition is True. Examples ======== >>> from sympy.stats import where, Die, Normal >>> from sympy import symbols, And >>> D1, D2 = Die('a', 6), Die('b', 6) >>> a, b = D1.symbol, D2.symbol >>> X = Normal('x', 0, 1) >>> where(X2<1) Domain: (-1 < x) & (x < 1) >>> where(X2<1).set Interval.open(-1, 1) >>> where(And(D1<=D2 , D2<3)) Domain: (Eq(a, 1) & Eq(b, 1)) \| (Eq(a, 1) & Eq(b, 2)) \| (Eq(a, 2) & Eq(b, 2)) """ if given_condition is not None: # If there is a condition # Recompute on new conditional expr return where(given(condition, given_condition, kwargs), kwargs) # Otherwise pass work off to the ProbabilitySpace return pspace(condition).where(condition, kwargs) def sample(expr, condition=None, kwargs): """ A realization of the random expression Examples ======== >>> from sympy.stats import Die, sample >>> X, Y, Z = Die('X', 6), Die('Y', 6), Die('Z', 6) >>> die_roll = sample(X + Y + Z) # A random realization of three dice """ return next(sample_iter(expr, condition, numsamples=1)) def sample_iter(expr, condition=None, numsamples=S.Infinity, *kwargs): """ Returns an iterator of realizations from the expression given a condition Parameters ========== expr: Expr Random expression to be realized condition: Expr, optional A conditional expression numsamples: integer, optional Length of the iterator (defaults to infinity) Examples ======== >>> from sympy.stats import Normal, sample_iter >>> X = Normal('X', 0, 1) >>> expr = XX + 3 >>> iterator = sample_iter(expr, numsamples=3) >>> list(iterator) # doctest: +SKIP [12, 4, 7] See Also ======== sample sampling_P sampling_E sample_iter_lambdify sample_iter_subs """ # lambdify is much faster but not as robust try: return sample_iter_lambdify(expr, condition, numsamples, kwargs) # use subs when lambdify fails except TypeError: return sample_iter_subs(expr, condition, numsamples, kwargs) def quantile(expr, evaluate=True, kwargs): r""" Return the :math:`p^{th}` order quantile of a probability distribution. Quantile is defined as the value at which the probability of the random variable is less than or equal to the given probability. ..math:: Q(p) = inf{x \in (-\infty, \infty) such that p <= F(x)} Examples ======== >>> from sympy.stats import quantile, Die, Exponential >>> from sympy import Symbol, pprint >>> p = Symbol("p") >>> l = Symbol("lambda", positive=True) >>> X = Exponential("x", l) >>> quantile(X)(p) -log(1 - p)/lambda >>> D = Die("d", 6) >>> pprint(quantile(D)(p), use_unicode=False) /nan for Or(p > 1, p < 0) \| \| 1 for p <= 1/6 \| \| 2 for p <= 1/3 \| < 3 for p <= 1/2 \| \| 4 for p <= 2/3 \| \| 5 for p <= 5/6 \| \ 6 for p <= 1 """ result = pspace(expr).compute_quantile(expr, kwargs) if evaluate and hasattr(result, 'doit'): return result.doit() else: return result def sample_iter_lambdify(expr, condition=None, numsamples=S.Infinity, kwargs): """ See sample_iter Uses lambdify for computation. This is fast but does not always work. """ if condition: ps = pspace(Tuple(expr, condition)) else: ps = pspace(expr) rvs = list(ps.values) fn = lambdify(rvs, expr, kwargs) if condition: given_fn = lambdify(rvs, condition, *kwargs) # Check that lambdify can handle the expression # Some operations like Sum can prove difficult try: d = ps.sample() # a dictionary that maps RVs to values args = [d[rv] for rv in rvs] fn(args) if condition: given_fn(args) except Exception: raise TypeError("Expr/condition too complex for lambdify") def return_generator(): count = 0 while count < numsamples: d = ps.sample() # a dictionary that maps RVs to values args = [d[rv] for rv in rvs] if condition: # Check that these values satisfy the condition gd = given_fn(args) if gd != True and gd != False: raise ValueError( "Conditions must not contain free symbols") if not gd: # If the values don't satisfy then try again continue yield fn(args) count += 1 return return_generator() def sample_iter_subs(expr, condition=None, numsamples=S.Infinity, kwargs): """ See sample_iter Uses subs for computation. This is slow but almost always works. """ if condition is not None: ps = pspace(Tuple(expr, condition)) else: ps = pspace(expr) count = 0 while count < numsamples: d = ps.sample() # a dictionary that maps RVs to values if condition is not None: # Check that these values satisfy the condition gd = condition.xreplace(d) if gd != True and gd != False: raise ValueError("Conditions must not contain free symbols") if not gd: # If the values don't satisfy then try again continue yield expr.xreplace(d) count += 1 def sampling_P(condition, given_condition=None, numsamples=1, evalf=True, kwargs): """ Sampling version of P See Also ======== P sampling_E sampling_density """ count_true = 0 count_false = 0 samples = sample_iter(condition, given_condition, numsamples=numsamples, kwargs) for sample in samples: if sample != True and sample != False: raise ValueError("Conditions must not contain free symbols") if sample: count_true += 1 else: count_false += 1 result = S(count_true) / numsamples if evalf: return result.evalf() else: return result def sampling_E(expr, given_condition=None, numsamples=1, evalf=True, kwargs): """ Sampling version of E See Also ======== P sampling_P sampling_density """ samples = sample_iter(expr, given_condition, numsamples=numsamples, kwargs) result = Add(list(samples)) / numsamples if evalf: return result.evalf() else: return result def sampling_density(expr, given_condition=None, numsamples=1, kwargs): """ Sampling version of density See Also ======== density sampling_P sampling_E """ results = {} for result in sample_iter(expr, given_condition, numsamples=numsamples, kwargs): results[result] = results.get(result, 0) + 1 return results def dependent(a, b): """ Dependence of two random expressions Two expressions are independent if knowledge of one does not change computations on the other. Examples ======== >>> from sympy.stats import Normal, dependent, given >>> from sympy import Tuple, Eq >>> X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) >>> dependent(X, Y) False >>> dependent(2X + Y, -Y) True >>> X, Y = given(Tuple(X, Y), Eq(X + Y, 3)) >>> dependent(X, Y) True See Also ======== independent """ if pspace_independent(a, b): return False z = Symbol('z', real=True) # Dependent if density is unchanged when one is given information about # the other return (density(a, Eq(b, z)) != density(a) or density(b, Eq(a, z)) != density(b)) def independent(a, b): """ Independence of two random expressions Two expressions are independent if knowledge of one does not change computations on the other. Examples ======== >>> from sympy.stats import Normal, independent, given >>> from sympy import Tuple, Eq >>> X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) >>> independent(X, Y) True >>> independent(2X + Y, -Y) False >>> X, Y = given(Tuple(X, Y), Eq(X + Y, 3)) >>> independent(X, Y) False See Also ======== dependent """ return not dependent(a, b) def pspace_independent(a, b): """ Tests for independence between a and b by checking if their PSpaces have overlapping symbols. This is a sufficient but not necessary condition for independence and is intended to be used internally. Notes ===== pspace_independent(a, b) implies independent(a, b) independent(a, b) does not imply pspace_independent(a, b) """ a_symbols = set(pspace(b).symbols) b_symbols = set(pspace(a).symbols) if len(set(random_symbols(a)).intersection(random_symbols(b))) != 0: return False if len(a_symbols.intersection(b_symbols)) == 0: return True return None def rv_subs(expr, symbols=None): """ Given a random expression replace all random variables with their symbols. If symbols keyword is given restrict the swap to only the symbols listed. """ if symbols is None: symbols = random_symbols(expr) if not symbols: return expr swapdict = {rv: rv.symbol for rv in symbols} return expr.subs(swapdict) class NamedArgsMixin(object): _argnames = () def __getattr__(self, attr): try: return self.args[self._argnames.index(attr)] except ValueError: raise AttributeError("'%s' object has no attribute '%s'" % ( type(self).__name__, attr)) def _value_check(condition, message): """ Raise a ValueError with message if condition is False, else return True if all conditions were True, else False. Examples ======== >>> from sympy.stats.rv import _value_check >>> from sympy.abc import a, b, c >>> from sympy import And, Dummy >>> _value_check(2 < 3, '') True Here, the condition is not False, but it doesn't evaluate to True so False is returned (but no error is raised). So checking if the return value is True or False will tell you if all conditions were evaluated. >>> _value_check(a < b, '') False In this case the condition is False so an error is raised: >>> r = Dummy(real=True) >>> _value_check(r < r - 1, 'condition is not true') Traceback (most recent call last): ... ValueError: condition is not true If no condition of many conditions must be False, they can be checked by passing them as an iterable: >>> _value_check((a < 0, b < 0, c < 0), '') False The iterable can be a generator, too: >>> _value_check((i < 0 for i in (a, b, c)), '') False The following are equivalent to the above but do not pass an iterable: >>> all(_value_check(i < 0, '') for i in (a, b, c)) False >>> _value_check(And(a < 0, b < 0, c < 0), '') False """ from sympy.core.compatibility import iterable from sympy.core.logic import fuzzy_and if not iterable(condition): condition = [condition] truth = fuzzy_and(condition) if truth == False: raise ValueError(message) return truth == True def _symbol_converter(sym): """ Casts the parameter to Symbol if it is of string_types otherwise no operation is performed on it. Parameters ========== sym The parameter to be converted. Returns ======= Symbol the parameter converted to Symbol. Raises ====== TypeError If the parameter is not an instance of both string_types and Symbol. Examples ======== >>> from sympy import Symbol >>> from sympy.stats.rv import _symbol_converter >>> s = _symbol_converter('s') >>> isinstance(s, Symbol) True >>> _symbol_converter(1) Traceback (most recent call last): ... TypeError: 1 is neither a Symbol nor a string >>> r = Symbol('r') >>> isinstance(r, Symbol) True """ if isinstance(sym, string_types): sym = Symbol(sym) if not isinstance(sym, Symbol): raise TypeError("%s is neither a Symbol nor a string"%(sym)) return sym
5d7ff17e79635ce3b34a7a32511b83299f6d04561bcd673c674aafeb4477a63d	""" Joint Random Variables Module See Also ======== sympy.stats.rv sympy.stats.frv sympy.stats.crv sympy.stats.drv """ from __future__ import print_function, division from sympy import (Basic, Lambda, sympify, Indexed, Symbol, ProductSet, S, Dummy) from sympy.concrete.products import Product from sympy.concrete.summations import Sum, summation from sympy.core.compatibility import string_types, iterable from sympy.core.containers import Tuple from sympy.integrals.integrals import Integral, integrate from sympy.matrices import ImmutableMatrix from sympy.stats.crv import (ContinuousDistribution, SingleContinuousDistribution, SingleContinuousPSpace) from sympy.stats.drv import (DiscreteDistribution, SingleDiscreteDistribution, SingleDiscretePSpace) from sympy.stats.rv import (ProductPSpace, NamedArgsMixin, ProductDomain, RandomSymbol, random_symbols, SingleDomain) from sympy.utilities.misc import filldedent # __all__ = ['marginal_distribution'] class JointPSpace(ProductPSpace): """ Represents a joint probability space. Represented using symbols for each component and a distribution. """ def __new__(cls, sym, dist): if isinstance(dist, SingleContinuousDistribution): return SingleContinuousPSpace(sym, dist) if isinstance(dist, SingleDiscreteDistribution): return SingleDiscretePSpace(sym, dist) if isinstance(sym, string_types): sym = Symbol(sym) if not isinstance(sym, Symbol): raise TypeError("s should have been string or Symbol") return Basic.__new__(cls, sym, dist) @property def set(self): return self.domain.set @property def symbol(self): return self.args[0] @property def distribution(self): return self.args[1] @property def value(self): return JointRandomSymbol(self.symbol, self) @property def component_count(self): _set = self.distribution.set if isinstance(_set, ProductSet): return S(len(_set.args)) elif isinstance(_set, Product): return _set.limits[0][-1] return S(1) @property def pdf(self): sym = [Indexed(self.symbol, i) for i in range(self.component_count)] return self.distribution(sym) @property def domain(self): rvs = random_symbols(self.distribution) if not rvs: return SingleDomain(self.symbol, self.distribution.set) return ProductDomain([rv.pspace.domain for rv in rvs]) def component_domain(self, index): return self.set.args[index] def marginal_distribution(self, indices): count = self.component_count if count.atoms(Symbol): raise ValueError("Marginal distributions cannot be computed " "for symbolic dimensions. It is a work under progress.") orig = [Indexed(self.symbol, i) for i in range(count)] all_syms = [Symbol(str(i)) for i in orig] replace_dict = dict(zip(all_syms, orig)) sym = [Symbol(str(Indexed(self.symbol, i))) for i in indices] limits = list([i,] for i in all_syms if i not in sym) index = 0 for i in range(count): if i not in indices: limits[index].append(self.distribution.set.args[i]) limits[index] = tuple(limits[index]) index += 1 if self.distribution.is_Continuous: f = Lambda(sym, integrate(self.distribution(all_syms), limits)) elif self.distribution.is_Discrete: f = Lambda(sym, summation(self.distribution(all_syms), limits)) return f.xreplace(replace_dict) def compute_expectation(self, expr, rvs=None, evaluate=False, kwargs): syms = tuple(self.value[i] for i in range(self.component_count)) rvs = rvs or syms if not any([i in rvs for i in syms]): return expr expr = exprself.pdf for rv in rvs: if isinstance(rv, Indexed): expr = expr.xreplace({rv: Indexed(str(rv.base), rv.args[1])}) elif isinstance(rv, RandomSymbol): expr = expr.xreplace({rv: rv.symbol}) if self.value in random_symbols(expr): raise NotImplementedError(filldedent(''' Expectations of expression with unindexed joint random symbols cannot be calculated yet.''')) limits = tuple((Indexed(str(rv.base),rv.args[1]), self.distribution.set.args[rv.args[1]]) for rv in syms) return Integral(expr, limits) def where(self, condition): raise NotImplementedError() def compute_density(self, expr): raise NotImplementedError() def sample(self): raise NotImplementedError() def probability(self, condition): raise NotImplementedError() class JointDistribution(Basic, NamedArgsMixin): """ Represented by the random variables part of the joint distribution. Contains methods for PDF, CDF, sampling, marginal densities, etc. """ _argnames = ('pdf', ) def __new__(cls, args): args = list(map(sympify, args)) for i in range(len(args)): if isinstance(args[i], list): args[i] = ImmutableMatrix(args[i]) return Basic.__new__(cls, args) @property def domain(self): return ProductDomain(self.symbols) @property def pdf(self, args): return self.density.args[1] def cdf(self, other): if not isinstance(other, dict): raise ValueError("%s should be of type dict, got %s"%(other, type(other))) rvs = other.keys() _set = self.domain.set.sets expr = self.pdf(tuple(i.args[0] for i in self.symbols)) for i in range(len(other)): if rvs[i].is_Continuous: density = Integral(expr, (rvs[i], _set[i].inf, other[rvs[i]])) elif rvs[i].is_Discrete: density = Sum(expr, (rvs[i], _set[i].inf, other[rvs[i]])) return density def __call__(self, args): return self.pdf(args) class JointRandomSymbol(RandomSymbol): """ Representation of random symbols with joint probability distributions to allow indexing." """ def __getitem__(self, key): if isinstance(self.pspace, JointPSpace): if (self.pspace.component_count <= key) == True: raise ValueError("Index keys for %s can only up to %s." % (self.name, self.pspace.component_count - 1)) return Indexed(self, key) class JointDistributionHandmade(JointDistribution, NamedArgsMixin): _argnames = ('pdf',) is_Continuous = True @property def set(self): return self.args[1] def marginal_distribution(rv, indices): """ Marginal distribution function of a joint random variable. Parameters ========== rv: A random variable with a joint probability distribution. indices: component indices or the indexed random symbol for whom the joint distribution is to be calculated Returns ======= A Lambda expression n `sym`. Examples ======== >>> from sympy.stats.crv_types import Normal >>> from sympy.stats.joint_rv import marginal_distribution >>> m = Normal('X', [1, 2], [[2, 1], [1, 2]]) >>> marginal_distribution(m, m[0])(1) 1/(2sqrt(pi)) """ indices = list(indices) for i in range(len(indices)): if isinstance(indices[i], Indexed): indices[i] = indices[i].args[1] prob_space = rv.pspace if not indices: raise ValueError( "At least one component for marginal density is needed.") if hasattr(prob_space.distribution, 'marginal_distribution'): return prob_space.distribution.marginal_distribution(indices, rv.symbol) return prob_space.marginal_distribution(indices) class CompoundDistribution(Basic, NamedArgsMixin): """ Represents a compound probability distribution. Constructed using a single probability distribution with a parameter distributed according to some given distribution. """ def __new__(cls, dist): if not isinstance(dist, (ContinuousDistribution, DiscreteDistribution)): raise ValueError(filldedent('''CompoundDistribution can only be initialized from ContinuousDistribution or DiscreteDistribution ''')) _args = dist.args if not any([isinstance(i, RandomSymbol) for i in _args]): return dist return Basic.__new__(cls, dist) @property def latent_distributions(self): return random_symbols(self.args[0]) def pdf(self, x): dist = self.args[0] z = Dummy('z') if isinstance(dist, ContinuousDistribution): rv = SingleContinuousPSpace(z, dist).value elif isinstance(dist, DiscreteDistribution): rv = SingleDiscretePSpace(z, dist).value return MarginalDistribution(self, (rv,)).pdf(x) def set(self): return self.args[0].set def __call__(self, args): return self.pdf(args) class MarginalDistribution(Basic): """ Represents the marginal distribution of a joint probability space. Initialised using a probability distribution and random variables(or their indexed components) which should be a part of the resultant distribution. """ def __new__(cls, dist, rvs): if len(rvs) == 1 and iterable(rvs[0]): rvs = tuple(rvs[0]) if not all([isinstance(rv, (Indexed, RandomSymbol))] for rv in rvs): raise ValueError(filldedent('''Marginal distribution can be intitialised only in terms of random variables or indexed random variables''')) rvs = Tuple.fromiter(rv for rv in rvs) if not isinstance(dist, JointDistribution) and len(random_symbols(dist)) == 0: return dist return Basic.__new__(cls, dist, rvs) def check(self): pass @property def set(self): rvs = [i for i in self.args[1] if isinstance(i, RandomSymbol)] return ProductSet([rv.pspace.set for rv in rvs]) @property def symbols(self): rvs = self.args[1] return set([rv.pspace.symbol for rv in rvs]) def pdf(self, x): expr, rvs = self.args[0], self.args[1] marginalise_out = [i for i in random_symbols(expr) if i not in rvs] if isinstance(expr, CompoundDistribution): syms = Dummy('x', real=True) expr = expr.args[0].pdf(syms) elif isinstance(expr, JointDistribution): count = len(expr.domain.args) x = Dummy('x', real=True, finite=True) syms = [Indexed(x, i) for i in count] expr = expr.pdf(syms) else: syms = [rv.pspace.symbol if isinstance(rv, RandomSymbol) else rv.args[0] for rv in rvs] return Lambda(syms, self.compute_pdf(expr, marginalise_out))(x) def compute_pdf(self, expr, rvs): for rv in rvs: lpdf = 1 if isinstance(rv, RandomSymbol): lpdf = rv.pspace.pdf expr = self.marginalise_out(exprlpdf, rv) return expr def marginalise_out(self, expr, rv): from sympy.concrete.summations import Sum if isinstance(rv, RandomSymbol): dom = rv.pspace.set elif isinstance(rv, Indexed): dom = rv.base.component_domain( rv.pspace.component_domain(rv.args[1])) expr = expr.xreplace({rv: rv.pspace.symbol}) if rv.pspace.is_Continuous: #TODO: Modify to support integration #for all kinds of sets. expr = Integral(expr, (rv.pspace.symbol, dom)) elif rv.pspace.is_Discrete: #incorporate this into `Sum`/`summation` if dom in (S.Integers, S.Naturals, S.Naturals0): dom = (dom.inf, dom.sup) expr = Sum(expr, (rv.pspace.symbol, dom)) return expr def __call__(self, args): return self.pdf(args)
a1ca9d968f7023d18f5bb6dcb08a3662daec70e4e693e82be0d0d9c11cce9942	from __future__ import print_function, division from sympy import (Basic, sympify, symbols, Dummy, Lambda, summation, Piecewise, S, cacheit, Sum, exp, I, Ne, Eq, poly, series, factorial, And) from sympy.polys.polyerrors import PolynomialError from sympy.solvers.solveset import solveset from sympy.stats.crv import reduce_rational_inequalities_wrap from sympy.stats.rv import (NamedArgsMixin, SinglePSpace, SingleDomain, random_symbols, PSpace, ConditionalDomain, RandomDomain, ProductDomain) from sympy.stats.symbolic_probability import Probability from sympy.functions.elementary.integers import floor from sympy.sets.fancysets import Range, FiniteSet from sympy.sets.sets import Union from sympy.sets.contains import Contains from sympy.utilities import filldedent import random class DiscreteDistribution(Basic): def __call__(self, args): return self.pdf(args) class SingleDiscreteDistribution(DiscreteDistribution, NamedArgsMixin): """ Discrete distribution of a single variable Serves as superclass for PoissonDistribution etc.... Provides methods for pdf, cdf, and sampling See Also: sympy.stats.crv_types.* """ set = S.Integers def __new__(cls, args): args = list(map(sympify, args)) return Basic.__new__(cls, args) @staticmethod def check(args): pass def sample(self): """ A random realization from the distribution """ icdf = self._inverse_cdf_expression() while True: sample_ = floor(list(icdf(random.uniform(0, 1)))[0]) if sample_ >= self.set.inf: return sample_ @cacheit def _inverse_cdf_expression(self): """ Inverse of the CDF Used by sample """ x = symbols('x', positive=True, integer=True, cls=Dummy) z = symbols('z', positive=True, cls=Dummy) cdf_temp = self.cdf(x) # Invert CDF try: inverse_cdf = solveset(cdf_temp - z, x, domain=S.Reals) except NotImplementedError: inverse_cdf = None if not inverse_cdf or len(inverse_cdf.free_symbols) != 1: raise NotImplementedError("Could not invert CDF") return Lambda(z, inverse_cdf) @cacheit def compute_cdf(self, kwargs): """ Compute the CDF from the PDF Returns a Lambda """ x, z = symbols('x, z', integer=True, finite=True, cls=Dummy) left_bound = self.set.inf # CDF is integral of PDF from left bound to z pdf = self.pdf(x) cdf = summation(pdf, (x, left_bound, z), kwargs) # CDF Ensure that CDF left of left_bound is zero cdf = Piecewise((cdf, z >= left_bound), (0, True)) return Lambda(z, cdf) def _cdf(self, x): return None def cdf(self, x, kwargs): """ Cumulative density function """ if not kwargs: cdf = self._cdf(x) if cdf is not None: return cdf return self.compute_cdf(kwargs)(x) @cacheit def compute_characteristic_function(self, kwargs): """ Compute the characteristic function from the PDF Returns a Lambda """ x, t = symbols('x, t', real=True, finite=True, cls=Dummy) pdf = self.pdf(x) cf = summation(exp(Itx)pdf, (x, self.set.inf, self.set.sup)) return Lambda(t, cf) def _characteristic_function(self, t): return None def characteristic_function(self, t, kwargs): """ Characteristic function """ if not kwargs: cf = self._characteristic_function(t) if cf is not None: return cf return self.compute_characteristic_function(kwargs)(t) @cacheit def compute_moment_generating_function(self, *kwargs): x, t = symbols('x, t', real=True, finite=True, cls=Dummy) pdf = self.pdf(x) mgf = summation(exp(tx)pdf, (x, self.set.inf, self.set.sup)) return Lambda(t, mgf) def _moment_generating_function(self, t): return None def moment_generating_function(self, t, kwargs): if not kwargs: mgf = self._moment_generating_function(t) if mgf is not None: return mgf return self.compute_moment_generating_function(kwargs)(t) @cacheit def compute_quantile(self, kwargs): """ Compute the Quantile from the PDF Returns a Lambda """ x = symbols('x', integer=True, finite=True, cls=Dummy) p = symbols('p', real=True, finite=True, cls=Dummy) left_bound = self.set.inf pdf = self.pdf(x) cdf = summation(pdf, (x, left_bound, x), kwargs) set = ((x, p <= cdf), ) return Lambda(p, Piecewise(set)) def _quantile(self, x): return None def quantile(self, x, kwargs): """ Cumulative density function """ if not kwargs: quantile = self._quantile(x) if quantile is not None: return quantile return self.compute_quantile(kwargs)(x) def expectation(self, expr, var, evaluate=True, kwargs): """ Expectation of expression over distribution """ # TODO: support discrete sets with non integer stepsizes if evaluate: try: p = poly(expr, var) t = Dummy('t', real=True) mgf = self.moment_generating_function(t) deg = p.degree() taylor = poly(series(mgf, t, 0, deg + 1).removeO(), t) result = 0 for k in range(deg+1): result += p.coeff_monomial(var k) * taylor.coeff_monomial(t ** k) * factorial(k) return result except PolynomialError: return summation(expr * self.pdf(var), (var, self.set.inf, self.set.sup), *kwargs) else: return Sum(expr self.pdf(var), (var, self.set.inf, self.set.sup), *kwargs) def __call__(self, args): return self.pdf(args) class DiscreteDistributionHandmade(SingleDiscreteDistribution): _argnames = ('pdf',) @property def set(self): return self.args[1] def __new__(cls, pdf, set=S.Integers): return Basic.__new__(cls, pdf, set) class DiscreteDomain(RandomDomain): """ A domain with discrete support with step size one. Represented using symbols and Range. """ is_Discrete = True class SingleDiscreteDomain(DiscreteDomain, SingleDomain): def as_boolean(self): return Contains(self.symbol, self.set) class ConditionalDiscreteDomain(DiscreteDomain, ConditionalDomain): """ Domain with discrete support of step size one, that is restricted by some condition. """ @property def set(self): rv = self.symbols if len(self.symbols) > 1: raise NotImplementedError(filldedent(''' Multivariate conditional domains are not yet implemented.''')) rv = list(rv)[0] return reduce_rational_inequalities_wrap(self.condition, rv).intersect(self.fulldomain.set) class DiscretePSpace(PSpace): is_real = True is_Discrete = True @property def pdf(self): return self.density(self.symbols) def where(self, condition): rvs = random_symbols(condition) assert all(r.symbol in self.symbols for r in rvs) if len(rvs) > 1: raise NotImplementedError(filldedent('''Multivariate discrete random variables are not yet supported.''')) conditional_domain = reduce_rational_inequalities_wrap(condition, rvs[0]) conditional_domain = conditional_domain.intersect(self.domain.set) return SingleDiscreteDomain(rvs[0].symbol, conditional_domain) def probability(self, condition): complement = isinstance(condition, Ne) if complement: condition = Eq(condition.args[0], condition.args[1]) try: _domain = self.where(condition).set if condition == False or _domain is S.EmptySet: return S.Zero if condition == True or _domain == self.domain.set: return S.One prob = self.eval_prob(_domain) except NotImplementedError: from sympy.stats.rv import density expr = condition.lhs - condition.rhs dens = density(expr) if not isinstance(dens, DiscreteDistribution): dens = DiscreteDistributionHandmade(dens) z = Dummy('z', real = True) space = SingleDiscretePSpace(z, dens) prob = space.probability(condition.__class__(space.value, 0)) if prob is None: prob = Probability(condition) return prob if not complement else S.One - prob def eval_prob(self, _domain): sym = list(self.symbols)[0] if isinstance(_domain, Range): n = symbols('n', integer=True, finite=True) inf, sup, step = (r for r in _domain.args) summand = ((self.pdf).replace( sym, nstep)) rv = summation(summand, (n, inf/step, (sup)/step - 1)).doit() return rv elif isinstance(_domain, FiniteSet): pdf = Lambda(sym, self.pdf) rv = sum(pdf(x) for x in _domain) return rv elif isinstance(_domain, Union): rv = sum(self.eval_prob(x) for x in _domain.args) return rv def conditional_space(self, condition): density = Lambda(self.symbols, self.pdf/self.probability(condition)) condition = condition.xreplace(dict((rv, rv.symbol) for rv in self.values)) domain = ConditionalDiscreteDomain(self.domain, condition) return DiscretePSpace(domain, density) class ProductDiscreteDomain(ProductDomain, DiscreteDomain): def as_boolean(self): return And([domain.as_boolean for domain in self.domains]) class SingleDiscretePSpace(DiscretePSpace, SinglePSpace): """ Discrete probability space over a single univariate variable """ is_real = True @property def set(self): return self.distribution.set @property def domain(self): return SingleDiscreteDomain(self.symbol, self.set) def sample(self): """ Internal sample method Returns dictionary mapping RandomSymbol to realization value. """ return {self.value: self.distribution.sample()} def compute_expectation(self, expr, rvs=None, evaluate=True, kwargs): rvs = rvs or (self.value,) if self.value not in rvs: return expr expr = expr.xreplace(dict((rv, rv.symbol) for rv in rvs)) x = self.value.symbol try: return self.distribution.expectation(expr, x, evaluate=evaluate, kwargs) except NotImplementedError: return Sum(expr * self.pdf, (x, self.set.inf, self.set.sup), kwargs) def compute_cdf(self, expr, kwargs): if expr == self.value: x = symbols("x", real=True, cls=Dummy) return Lambda(x, self.distribution.cdf(x, kwargs)) else: raise NotImplementedError() def compute_density(self, expr, kwargs): if expr == self.value: return self.distribution raise NotImplementedError() def compute_characteristic_function(self, expr, kwargs): if expr == self.value: t = symbols("t", real=True, cls=Dummy) return Lambda(t, self.distribution.characteristic_function(t, kwargs)) else: raise NotImplementedError() def compute_moment_generating_function(self, expr, kwargs): if expr == self.value: t = symbols("t", real=True, cls=Dummy) return Lambda(t, self.distribution.moment_generating_function(t, kwargs)) else: raise NotImplementedError() def compute_quantile(self, expr, kwargs): if expr == self.value: p = symbols("p", real=True, finite=True, cls=Dummy) return Lambda(p, self.distribution.quantile(p, kwargs)) else: raise NotImplementedError()
1e47cdf1829c7cac6c3cf62230fa76c0cfef96ad718b7ba4e6bbd9faba0d75c5	from __future__ import print_function, division from sympy import (Basic, exp, pi, Lambda, Trace, S, MatrixSymbol, Integral, gamma, Product, Dummy, Sum, Abs, IndexedBase) from sympy.core.sympify import _sympify from sympy.multipledispatch import dispatch from sympy.stats.rv import _symbol_converter, Density, RandomMatrixSymbol from sympy.stats.random_matrix import RandomMatrixPSpace from sympy.tensor.array import ArrayComprehension __all__ = [ 'GaussianEnsemble', 'GaussianUnitaryEnsemble', 'GaussianOrthogonalEnsemble', 'GaussianSymplecticEnsemble', 'joint_eigen_distribution', 'level_spacing_distribution' ] class RandomMatrixEnsemble(Basic): """ Abstract class for random matrix ensembles. It acts as an umbrella for all the ensembles defined in sympy.stats.random_matrix_models. """ pass class GaussianEnsemble(RandomMatrixEnsemble): """ Abstract class for Gaussian ensembles. Contains the properties common to all the gaussian ensembles. References ========== .. [1] https://en.wikipedia.org/wiki/Random_matrix#Gaussian_ensembles .. [2] https://arxiv.org/pdf/1712.07903.pdf """ def __new__(cls, sym, dim=None): sym, dim = _symbol_converter(sym), _sympify(dim) if dim.is_integer == False: raise ValueError("Dimension of the random matrices must be " "integers, received %s instead."%(dim)) self = Basic.__new__(cls, sym, dim) rmp = RandomMatrixPSpace(sym, model=self) return RandomMatrixSymbol(sym, dim, dim, pspace=rmp) symbol = property(lambda self: self.args[0]) dimension = property(lambda self: self.args[1]) def density(self, expr): return Density(expr) def _compute_normalization_constant(self, beta, n): """ Helper function for computing normalization constant for joint probability density of eigen values of Gaussian ensembles. References ========== .. [1] https://en.wikipedia.org/wiki/Selberg_integral#Mehta's_integral """ n = S(n) prod_term = lambda j: gamma(1 + betaS(j)/2)/gamma(S(1) + beta/S(2)) j = Dummy('j', integer=True, positive=True) term1 = Product(prod_term(j), (j, 1, n)).doit() term2 = (2/(betan))*(betan(n - 1)/4 + n/2) term3 = (2pi)*(n/2) return term1 term2 * term3 def _compute_joint_eigen_dsitribution(self, beta): """ Helper function for computing the joint probability distribution of eigen values of the random matrix. """ n = self.dimension Zbn = self._compute_normalization_constant(beta, n) l = IndexedBase('l') i = Dummy('i', integer=True, positive=True) j = Dummy('j', integer=True, positive=True) k = Dummy('k', integer=True, positive=True) term1 = exp((-S(n)/2) * Sum(l[k]2, (k, 1, n)).doit()) sub_term = Lambda(i, Product(Abs(l[j] - l[i])beta, (j, i + 1, n))) term2 = Product(sub_term(i).doit(), (i, 1, n - 1)).doit() syms = ArrayComprehension(l[k], (k, 1, n)).doit() return Lambda(syms, (term1 * term2)/Zbn) class GaussianUnitaryEnsemble(GaussianEnsemble): """ Represents Gaussian Unitary Ensembles. Examples ======== >>> from sympy.stats import GaussianUnitaryEnsemble as GUE, density >>> G = GUE('U', 2) >>> density(G) Lambda(H, exp(-Trace(H*2))/(2pi2)) """ @property def normalization_constant(self): n = self.dimension return 2(S(n)/2) * pi(S(n2)/2) def density(self, expr): n, ZGUE = self.dimension, self.normalization_constant h_pspace = RandomMatrixPSpace('P', model=self) H = RandomMatrixSymbol('H', n, n, pspace=h_pspace) return Lambda(H, exp(-S(n)/2 * Trace(H2))/ZGUE) def joint_eigen_distribution(self): return self._compute_joint_eigen_dsitribution(2) def level_spacing_distribution(self): s = Dummy('s') f = (32/pi2)(s2)exp((-4/pi)s2) return Lambda(s, f) class GaussianOrthogonalEnsemble(GaussianEnsemble): """ Represents Gaussian Orthogonal Ensembles. Examples ======== >>> from sympy.stats import GaussianOrthogonalEnsemble as GOE, density >>> G = GOE('U', 2) >>> density(G) Lambda(H, exp(-Trace(H2)/2)/Integral(exp(-Trace(_H2)/2), _H)) """ @property def normalization_constant(self): n = self.dimension _H = MatrixSymbol('_H', n, n) return Integral(exp(-S(n)/4 Trace(_H*2))) def density(self, expr): n, ZGOE = self.dimension, self.normalization_constant h_pspace = RandomMatrixPSpace('P', model=self) H = RandomMatrixSymbol('H', n, n, pspace=h_pspace) return Lambda(H, exp(-S(n)/4 Trace(H*2))/ZGOE) def joint_eigen_distribution(self): return self._compute_joint_eigen_dsitribution(1) def level_spacing_distribution(self): s = Dummy('s') f = (pi/2)sexp((-pi/4)s*2) return Lambda(s, f) class GaussianSymplecticEnsemble(GaussianEnsemble): """ Represents Gaussian Symplectic Ensembles. Examples ======== >>> from sympy.stats import GaussianSymplecticEnsemble as GSE, density >>> G = GSE('U', 2) >>> density(G) Lambda(H, exp(-2Trace(H*2))/Integral(exp(-2Trace(_H*2)), _H)) """ @property def normalization_constant(self): n = self.dimension _H = MatrixSymbol('_H', n, n) return Integral(exp(-S(n) Trace(_H*2))) def density(self, expr): n, ZGSE = self.dimension, self.normalization_constant h_pspace = RandomMatrixPSpace('P', model=self) H = RandomMatrixSymbol('H', n, n, pspace=h_pspace) return Lambda(H, exp(-S(n) Trace(H2))/ZGSE) def joint_eigen_distribution(self): return self._compute_joint_eigen_dsitribution(4) def level_spacing_distribution(self): s = Dummy('s') f = ((S(2)18)/((S(3)*6)(pi*3)))(s*4)exp((-64/(9pi))s2) return Lambda(s, f) @dispatch(RandomMatrixSymbol) def joint_eigen_distribution(mat): """ For obtaining joint probability distribution of eigen values of random matrix. Parameters ========== mat: RandomMatrixSymbol The matrix symbol whose eigen values are to be considered. Returns ======= Lambda Examples ======== >>> from sympy.stats import GaussianUnitaryEnsemble as GUE >>> from sympy.stats import joint_eigen_distribution >>> U = GUE('U', 2) >>> joint_eigen_dsitribution(U) Lambda((l[1], l[2]), exp(-l[1]2 - l[2]*2)Product(Abs(l[_i] - l[_j])*2, (_j, _i + 1, 2), (_i, 1, 1))/pi) """ return mat.pspace.model.joint_eigen_distribution() def level_spacing_distribution(mat): """ For obtaining distribution of level spacings. Parameters ========== mat: RandomMatrixSymbol The random matrix symbol whose eigen values are to be considered for finding the level spacings. Returns ======= Lambda Examples ======== >>> from sympy.stats import GaussianUnitaryEnsemble as GUE >>> from sympy.stats import level_spacing_distribution >>> U = GUE('U', 2) >>> level_spacing_distribution(U) Lambda(_s, 32_s*2exp(-4_s2/pi)/pi*2) References ========== .. [1] https://en.wikipedia.org/wiki/Random_matrix#Distribution_of_level_spacings """ return mat.pspace.model.level_spacing_distribution()
dc835f8774a0bc8aeec5e2564f779310c6be5f9bca262796204867df64aeba28	""" Finite Discrete Random Variables Module See Also ======== sympy.stats.frv_types sympy.stats.rv sympy.stats.crv """ from __future__ import print_function, division import random from itertools import product from sympy import (Basic, Symbol, symbols, cacheit, sympify, Mul, And, Or, Tuple, Piecewise, Eq, Lambda, exp, I, Dummy, nan, Sum, Intersection) from sympy.core.containers import Dict from sympy.core.logic import Logic from sympy.core.relational import Relational from sympy.sets.sets import FiniteSet from sympy.stats.rv import (RandomDomain, ProductDomain, ConditionalDomain, PSpace, IndependentProductPSpace, SinglePSpace, random_symbols, sumsets, rv_subs, NamedArgsMixin, Density) class FiniteDensity(dict): """ A domain with Finite Density. """ def __call__(self, item): """ Make instance of a class callable. If item belongs to current instance of a class, return it. Otherwise, return 0. """ item = sympify(item) if item in self: return self[item] else: return 0 @property def dict(self): """ Return item as dictionary. """ return dict(self) class FiniteDomain(RandomDomain): """ A domain with discrete finite support Represented using a FiniteSet. """ is_Finite = True @property def symbols(self): return FiniteSet(sym for sym, val in self.elements) @property def elements(self): return self.args[0] @property def dict(self): return FiniteSet([Dict(dict(el)) for el in self.elements]) def __contains__(self, other): return other in self.elements def __iter__(self): return self.elements.__iter__() def as_boolean(self): return Or([And([Eq(sym, val) for sym, val in item]) for item in self]) class SingleFiniteDomain(FiniteDomain): """ A FiniteDomain over a single symbol/set Example: The possibilities of a single* die roll. """ def __new__(cls, symbol, set): if not isinstance(set, FiniteSet) and \ not isinstance(set, Intersection): set = FiniteSet(set) return Basic.__new__(cls, symbol, set) @property def symbol(self): return self.args[0] @property def symbols(self): return FiniteSet(self.symbol) @property def set(self): return self.args[1] @property def elements(self): return FiniteSet([frozenset(((self.symbol, elem), )) for elem in self.set]) def __iter__(self): return (frozenset(((self.symbol, elem),)) for elem in self.set) def __contains__(self, other): sym, val = tuple(other)[0] return sym == self.symbol and val in self.set class ProductFiniteDomain(ProductDomain, FiniteDomain): """ A Finite domain consisting of several other FiniteDomains Example: The possibilities of the rolls of three independent dice """ def __iter__(self): proditer = product(self.domains) return (sumsets(items) for items in proditer) @property def elements(self): return FiniteSet(self) class ConditionalFiniteDomain(ConditionalDomain, ProductFiniteDomain): """ A FiniteDomain that has been restricted by a condition Example: The possibilities of a die roll under the condition that the roll is even. """ def __new__(cls, domain, condition): """ Create a new instance of ConditionalFiniteDomain class """ if condition is True: return domain cond = rv_subs(condition) return Basic.__new__(cls, domain, cond) def _test(self, elem): """ Test the value. If value is boolean, return it. If value is equality relational (two objects are equal), return it with left-hand side being equal to right-hand side. Otherwise, raise ValueError exception. """ val = self.condition.xreplace(dict(elem)) if val in [True, False]: return val elif val.is_Equality: return val.lhs == val.rhs raise ValueError("Undecidable if %s" % str(val)) def __contains__(self, other): return other in self.fulldomain and self._test(other) def __iter__(self): return (elem for elem in self.fulldomain if self._test(elem)) @property def set(self): if isinstance(self.fulldomain, SingleFiniteDomain): return FiniteSet([elem for elem in self.fulldomain.set if frozenset(((self.fulldomain.symbol, elem),)) in self]) else: raise NotImplementedError( "Not implemented on multi-dimensional conditional domain") def as_boolean(self): return FiniteDomain.as_boolean(self) class SingleFiniteDistribution(Basic, NamedArgsMixin): def __new__(cls, args): args = list(map(sympify, args)) return Basic.__new__(cls, args) @staticmethod def check(args): pass @property @cacheit def dict(self): if self.is_symbolic: return Density(self) return dict((k, self.pmf(k)) for k in self.set) def pmf(self, args): # to be overridden by specific distribution raise NotImplementedError() @property def set(self): # to be overridden by specific distribution raise NotImplementedError() values = property(lambda self: self.dict.values) items = property(lambda self: self.dict.items) is_symbolic = property(lambda self: False) __iter__ = property(lambda self: self.dict.__iter__) __getitem__ = property(lambda self: self.dict.__getitem__) def __call__(self, args): return self.pmf(args) def __contains__(self, other): return other in self.set #============================================= #========= Probability Space =============== #============================================= class FinitePSpace(PSpace): """ A Finite Probability Space Represents the probabilities of a finite number of events. """ is_Finite = True def __new__(cls, domain, density): density = dict((sympify(key), sympify(val)) for key, val in density.items()) public_density = Dict(density) obj = PSpace.__new__(cls, domain, public_density) obj._density = density return obj def prob_of(self, elem): elem = sympify(elem) density = self._density if isinstance(list(density.keys())[0], FiniteSet): return density.get(elem, 0) return density.get(tuple(elem)[0][1], 0) def where(self, condition): assert all(r.symbol in self.symbols for r in random_symbols(condition)) return ConditionalFiniteDomain(self.domain, condition) def compute_density(self, expr): expr = rv_subs(expr, self.values) d = FiniteDensity() for elem in self.domain: val = expr.xreplace(dict(elem)) prob = self.prob_of(elem) d[val] = d.get(val, 0) + prob return d @cacheit def compute_cdf(self, expr): d = self.compute_density(expr) cum_prob = 0 cdf = [] for key in sorted(d): prob = d[key] cum_prob += prob cdf.append((key, cum_prob)) return dict(cdf) @cacheit def sorted_cdf(self, expr, python_float=False): cdf = self.compute_cdf(expr) items = list(cdf.items()) sorted_items = sorted(items, key=lambda val_cumprob: val_cumprob[1]) if python_float: sorted_items = [(v, float(cum_prob)) for v, cum_prob in sorted_items] return sorted_items @cacheit def compute_characteristic_function(self, expr): d = self.compute_density(expr) t = Dummy('t', real=True) return Lambda(t, sum(exp(Ikt)v for k,v in d.items())) @cacheit def compute_moment_generating_function(self, expr): d = self.compute_density(expr) t = Dummy('t', real=True) return Lambda(t, sum(exp(kt)v for k,v in d.items())) def compute_expectation(self, expr, rvs=None, *kwargs): rvs = rvs or self.values expr = rv_subs(expr, rvs) probs = [self.prob_of(elem) for elem in self.domain] if isinstance(expr, (Logic, Relational)): parse_domain = [tuple(elem)[0][1] for elem in self.domain] bools = [expr.xreplace(dict(elem)) for elem in self.domain] else: parse_domain = [expr.xreplace(dict(elem)) for elem in self.domain] bools = [True for elem in self.domain] return sum([Piecewise((prob elem, blv), (0, True)) for prob, elem, blv in zip(probs, parse_domain, bools)]) def compute_quantile(self, expr): cdf = self.compute_cdf(expr) p = symbols('p', real=True, finite=True, cls=Dummy) set = ((nan, (p < 0) \| (p > 1)),) for key, value in cdf.items(): set = set + ((key, p <= value), ) return Lambda(p, Piecewise(set)) def probability(self, condition): cond_symbols = frozenset(rs.symbol for rs in random_symbols(condition)) cond = rv_subs(condition) if not cond_symbols.issubset(self.symbols): raise ValueError("Cannot compare foreign random symbols, %s" %(str(cond_symbols - self.symbols))) if isinstance(condition, Relational) and \ (not cond.free_symbols.issubset(self.domain.free_symbols)): rv = condition.lhs if isinstance(condition.rhs, Symbol) else condition.rhs return sum(Piecewise( (self.prob_of(elem), condition.subs(rv, list(elem)[0][1])), (0, True)) for elem in self.domain) return sum(self.prob_of(elem) for elem in self.where(condition)) def conditional_space(self, condition): domain = self.where(condition) prob = self.probability(condition) density = dict((key, val / prob) for key, val in self._density.items() if domain._test(key)) return FinitePSpace(domain, density) def sample(self): """ Internal sample method Returns dictionary mapping RandomSymbol to realization value. """ expr = Tuple(self.values) cdf = self.sorted_cdf(expr, python_float=True) x = random.uniform(0, 1) # Find first occurrence with cumulative probability less than x # This should be replaced with binary search for value, cum_prob in cdf: if x < cum_prob: # return dictionary mapping RandomSymbols to values return dict(list(zip(expr, value))) assert False, "We should never have gotten to this point" class SingleFinitePSpace(SinglePSpace, FinitePSpace): """ A single finite probability space Represents the probabilities of a set of random events that can be attributed to a single variable/symbol. This class is implemented by many of the standard FiniteRV types such as Die, Bernoulli, Coin, etc.... """ @property def domain(self): return SingleFiniteDomain(self.symbol, self.distribution.set) @property def _is_symbolic(self): """ Helper property to check if the distribution of the random variable is having symbolic dimension. """ return self.distribution.is_symbolic @property def distribution(self): return self.args[1] def pmf(self, expr): return self.distribution.pmf(expr) @property @cacheit def _density(self): return dict((FiniteSet((self.symbol, val)), prob) for val, prob in self.distribution.dict.items()) @cacheit def compute_characteristic_function(self, expr): if self._is_symbolic: d = self.compute_density(expr) t = Dummy('t', real=True) ki = Dummy('ki') return Lambda(t, Sum(d(ki)exp(Ikit), (ki, self.args[1].low, self.args[1].high))) expr = rv_subs(expr, self.values) return FinitePSpace(self.domain, self.distribution).compute_characteristic_function(expr) @cacheit def compute_moment_generating_function(self, expr): if self._is_symbolic: d = self.compute_density(expr) t = Dummy('t', real=True) ki = Dummy('ki') return Lambda(t, Sum(d(ki)exp(kit), (ki, self.args[1].low, self.args[1].high))) expr = rv_subs(expr, self.values) return FinitePSpace(self.domain, self.distribution).compute_moment_generating_function(expr) def compute_quantile(self, expr): if self._is_symbolic: raise NotImplementedError("Computing quantile for random variables " "with symbolic dimension because the bounds of searching the required " "value is undetermined.") expr = rv_subs(expr, self.values) return FinitePSpace(self.domain, self.distribution).compute_quantile(expr) def compute_density(self, expr): if self._is_symbolic: rv = list(random_symbols(expr))[0] k = Dummy('k', integer=True) cond = True if not isinstance(expr, (Relational, Logic)) \ else expr.subs(rv, k) return Lambda(k, Piecewise((self.pmf(k), And(k >= self.args[1].low, k <= self.args[1].high, cond)), (0, True))) expr = rv_subs(expr, self.values) return FinitePSpace(self.domain, self.distribution).compute_density(expr) def compute_cdf(self, expr): if self._is_symbolic: d = self.compute_density(expr) k = Dummy('k') ki = Dummy('ki') return Lambda(k, Sum(d(ki), (ki, self.args[1].low, k))) expr = rv_subs(expr, self.values) return FinitePSpace(self.domain, self.distribution).compute_cdf(expr) def compute_expectation(self, expr, rvs=None, kwargs): if self._is_symbolic: rv = random_symbols(expr)[0] k = Dummy('k', integer=True) expr = expr.subs(rv, k) cond = True if not isinstance(expr, (Relational, Logic)) \ else expr func = self.pmf(k) k if cond != True else self.pmf(k) * expr return Sum(Piecewise((func, cond), (0, True)), (k, self.distribution.low, self.distribution.high)).doit() expr = rv_subs(expr, rvs) return FinitePSpace(self.domain, self.distribution).compute_expectation(expr, rvs, *kwargs) def probability(self, condition): if self._is_symbolic: #TODO: Implement the mechanism for handling queries for symbolic sized distributions. raise NotImplementedError("Currently, probability queries are not " "supported for random variables with symbolic sized distributions.") condition = rv_subs(condition) return FinitePSpace(self.domain, self.distribution).probability(condition) def conditional_space(self, condition): """ This method is used for transferring the computation to probability method because conditional space of random variables with symbolic dimensions is currently not possible. """ if self._is_symbolic: self domain = self.where(condition) prob = self.probability(condition) density = dict((key, val / prob) for key, val in self._density.items() if domain._test(key)) return FinitePSpace(domain, density) class ProductFinitePSpace(IndependentProductPSpace, FinitePSpace): """ A collection of several independent finite probability spaces """ @property def domain(self): return ProductFiniteDomain([space.domain for space in self.spaces]) @property @cacheit def _density(self): proditer = product([iter(space._density.items()) for space in self.spaces]) d = {} for items in proditer: elems, probs = list(zip(items)) elem = sumsets(elems) prob = Mul(*probs) d[elem] = d.get(elem, 0) + prob return Dict(d) @property @cacheit def density(self): return Dict(self._density) def probability(self, condition): return FinitePSpace.probability(self, condition) def compute_density(self, expr): return FinitePSpace.compute_density(self, expr)
a3b38e1965a0e7594b3ac8ace573e9890d432dde0fb7c75910648c622f12619b	from __future__ import print_function, division from sympy import Basic from sympy.stats.joint_rv import ProductPSpace from sympy.stats.rv import ProductDomain, _symbol_converter class StochasticPSpace(ProductPSpace): """ Represents probability space of stochastic processes and their random variables. Contains mechanics to do computations for queries of stochastic processes. Initialized by symbol, the specific process and distribution(optional) if the random indexed symbols of the process follows any specific distribution, like, in Bernoulli Process, each random indexed symbol follows Bernoulli distribution. For processes with memory, this parameter should not be passed. """ def __new__(cls, sym, process, distribution=None): sym = _symbol_converter(sym) from sympy.stats.stochastic_process_types import StochasticProcess if not isinstance(process, StochasticProcess): raise TypeError("`process` must be an instance of StochasticProcess.") return Basic.__new__(cls, sym, process, distribution) @property def process(self): """ The associated stochastic process. """ return self.args[1] @property def domain(self): return ProductDomain(self.process.index_set, self.process.state_space) @property def symbol(self): return self.args[0] @property def distribution(self): return self.args[2] def probability(self, condition, given_condition=None, evaluate=True, kwargs): """ Transfers the task of handling queries to the specific stochastic process because every process has their own logic of handling such queries. """ return self.process.probability(condition, given_condition, evaluate, kwargs) def compute_expectation(self, expr, condition=None, evaluate=True, kwargs): """ Transfers the task of handling queries to the specific stochastic process because every process has their own logic of handling such queries. """ return self.process.expectation(expr, condition, evaluate, kwargs)
f5edf66de76370b893600cadf60bf00a5447488ea8caeaed9ab426a6f0d0da1c	from __future__ import print_function, division from random import randrange, choice from math import log from sympy.ntheory import primefactors from sympy import multiplicity, factorint from sympy.combinatorics import Permutation from sympy.combinatorics.permutations import (_af_commutes_with, _af_invert, _af_rmul, _af_rmuln, _af_pow, Cycle) from sympy.combinatorics.util import (_check_cycles_alt_sym, _distribute_gens_by_base, _orbits_transversals_from_bsgs, _handle_precomputed_bsgs, _base_ordering, _strong_gens_from_distr, _strip, _strip_af) from sympy.core import Basic from sympy.core.compatibility import range from sympy.functions.combinatorial.factorials import factorial from sympy.ntheory import sieve from sympy.utilities.iterables import has_variety, is_sequence, uniq from sympy.utilities.randtest import _randrange from itertools import islice rmul = Permutation.rmul_with_af _af_new = Permutation._af_new class PermutationGroup(Basic): """The class defining a Permutation group. PermutationGroup([p1, p2, ..., pn]) returns the permutation group generated by the list of permutations. This group can be supplied to Polyhedron if one desires to decorate the elements to which the indices of the permutation refer. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.permutations import Cycle >>> from sympy.combinatorics.polyhedron import Polyhedron >>> from sympy.combinatorics.perm_groups import PermutationGroup The permutations corresponding to motion of the front, right and bottom face of a 2x2 Rubik's cube are defined: >>> F = Permutation(2, 19, 21, 8)(3, 17, 20, 10)(4, 6, 7, 5) >>> R = Permutation(1, 5, 21, 14)(3, 7, 23, 12)(8, 10, 11, 9) >>> D = Permutation(6, 18, 14, 10)(7, 19, 15, 11)(20, 22, 23, 21) These are passed as permutations to PermutationGroup: >>> G = PermutationGroup(F, R, D) >>> G.order() 3674160 The group can be supplied to a Polyhedron in order to track the objects being moved. An example involving the 2x2 Rubik's cube is given there, but here is a simple demonstration: >>> a = Permutation(2, 1) >>> b = Permutation(1, 0) >>> G = PermutationGroup(a, b) >>> P = Polyhedron(list('ABC'), pgroup=G) >>> P.corners (A, B, C) >>> P.rotate(0) # apply permutation 0 >>> P.corners (A, C, B) >>> P.reset() >>> P.corners (A, B, C) Or one can make a permutation as a product of selected permutations and apply them to an iterable directly: >>> P10 = G.make_perm([0, 1]) >>> P10('ABC') ['C', 'A', 'B'] See Also ======== sympy.combinatorics.polyhedron.Polyhedron, sympy.combinatorics.permutations.Permutation References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of Computational Group Theory" .. [2] Seress, A. "Permutation Group Algorithms" .. [3] https://en.wikipedia.org/wiki/Schreier_vector .. [4] https://en.wikipedia.org/wiki/Nielsen_transformation#Product_replacement_algorithm .. [5] Frank Celler, Charles R.Leedham-Green, Scott H.Murray, Alice C.Niemeyer, and E.A.O'Brien. "Generating Random Elements of a Finite Group" .. [6] https://en.wikipedia.org/wiki/Block_%28permutation_group_theory%29 .. [7] http://www.algorithmist.com/index.php/Union_Find .. [8] https://en.wikipedia.org/wiki/Multiply_transitive_group#Multiply_transitive_groups .. [9] https://en.wikipedia.org/wiki/Center_%28group_theory%29 .. [10] https://en.wikipedia.org/wiki/Centralizer_and_normalizer .. [11] http://groupprops.subwiki.org/wiki/Derived_subgroup .. [12] https://en.wikipedia.org/wiki/Nilpotent_group .. [13] http://www.math.colostate.edu/~hulpke/CGT/cgtnotes.pdf .. [14] https://www.gap-system.org/Manuals/doc/ref/manual.pdf """ is_group = True def __new__(cls, args, kwargs): """The default constructor. Accepts Cycle and Permutation forms. Removes duplicates unless ``dups`` keyword is ``False``. """ if not args: args = [Permutation()] else: args = list(args[0] if is_sequence(args[0]) else args) if not args: args = [Permutation()] if any(isinstance(a, Cycle) for a in args): args = [Permutation(a) for a in args] if has_variety(a.size for a in args): degree = kwargs.pop('degree', None) if degree is None: degree = max(a.size for a in args) for i in range(len(args)): if args[i].size != degree: args[i] = Permutation(args[i], size=degree) if kwargs.pop('dups', True): args = list(uniq([_af_new(list(a)) for a in args])) if len(args) > 1: args = [g for g in args if not g.is_identity] obj = Basic.__new__(cls, args, kwargs) obj._generators = args obj._order = None obj._center = [] obj._is_abelian = None obj._is_transitive = None obj._is_sym = None obj._is_alt = None obj._is_primitive = None obj._is_nilpotent = None obj._is_solvable = None obj._is_trivial = None obj._transitivity_degree = None obj._max_div = None obj._is_perfect = None obj._is_cyclic = None obj._r = len(obj._generators) obj._degree = obj._generators[0].size # these attributes are assigned after running schreier_sims obj._base = [] obj._strong_gens = [] obj._strong_gens_slp = [] obj._basic_orbits = [] obj._transversals = [] obj._transversal_slp = [] # these attributes are assigned after running _random_pr_init obj._random_gens = [] # finite presentation of the group as an instance of `FpGroup` obj._fp_presentation = None return obj def __getitem__(self, i): return self._generators[i] def __contains__(self, i): """Return ``True`` if `i` is contained in PermutationGroup. Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> p = Permutation(1, 2, 3) >>> Permutation(3) in PermutationGroup(p) True """ if not isinstance(i, Permutation): raise TypeError("A PermutationGroup contains only Permutations as " "elements, not elements of type %s" % type(i)) return self.contains(i) def __len__(self): return len(self._generators) def __eq__(self, other): """Return ``True`` if PermutationGroup generated by elements in the group are same i.e they represent the same PermutationGroup. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> p = Permutation(0, 1, 2, 3, 4, 5) >>> G = PermutationGroup([p, p2]) >>> H = PermutationGroup([p*2, p]) >>> G.generators == H.generators False >>> G == H True """ if not isinstance(other, PermutationGroup): return False set_self_gens = set(self.generators) set_other_gens = set(other.generators) # before reaching the general case there are also certain # optimisation and obvious cases requiring less or no actual # computation. if set_self_gens == set_other_gens: return True # in the most general case it will check that each generator of # one group belongs to the other PermutationGroup and vice-versa for gen1 in set_self_gens: if not other.contains(gen1): return False for gen2 in set_other_gens: if not self.contains(gen2): return False return True def __hash__(self): return super(PermutationGroup, self).__hash__() def __mul__(self, other): """Return the direct product of two permutation groups as a permutation group. This implementation realizes the direct product by shifting the index set for the generators of the second group: so if we have `G` acting on `n1` points and `H` acting on `n2` points, `GH` acts on `n1 + n2` points. Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import CyclicGroup >>> G = CyclicGroup(5) >>> H = GG >>> H PermutationGroup([ (9)(0 1 2 3 4), (5 6 7 8 9)]) >>> H.order() 25 """ gens1 = [perm._array_form for perm in self.generators] gens2 = [perm._array_form for perm in other.generators] n1 = self._degree n2 = other._degree start = list(range(n1)) end = list(range(n1, n1 + n2)) for i in range(len(gens2)): gens2[i] = [x + n1 for x in gens2[i]] gens2 = [start + gen for gen in gens2] gens1 = [gen + end for gen in gens1] together = gens1 + gens2 gens = [_af_new(x) for x in together] return PermutationGroup(gens) def _random_pr_init(self, r, n, _random_prec_n=None): r"""Initialize random generators for the product replacement algorithm. The implementation uses a modification of the original product replacement algorithm due to Leedham-Green, as described in [1], pp. 69-71; also, see [2], pp. 27-29 for a detailed theoretical analysis of the original product replacement algorithm, and [4]. The product replacement algorithm is used for producing random, uniformly distributed elements of a group `G` with a set of generators `S`. For the initialization ``_random_pr_init``, a list ``R`` of `\max\{r, \|S\|\}` group generators is created as the attribute ``G._random_gens``, repeating elements of `S` if necessary, and the identity element of `G` is appended to ``R`` - we shall refer to this last element as the accumulator. Then the function ``random_pr()`` is called ``n`` times, randomizing the list ``R`` while preserving the generation of `G` by ``R``. The function ``random_pr()`` itself takes two random elements ``g, h`` among all elements of ``R`` but the accumulator and replaces ``g`` with a randomly chosen element from `\{gh, g(~h), hg, (~h)g\}`. Then the accumulator is multiplied by whatever ``g`` was replaced by. The new value of the accumulator is then returned by ``random_pr()``. The elements returned will eventually (for ``n`` large enough) become uniformly distributed across `G` ([5]). For practical purposes however, the values ``n = 50, r = 11`` are suggested in [1]. Notes ===== THIS FUNCTION HAS SIDE EFFECTS: it changes the attribute self._random_gens See Also ======== random_pr """ deg = self.degree random_gens = [x._array_form for x in self.generators] k = len(random_gens) if k < r: for i in range(k, r): random_gens.append(random_gens[i - k]) acc = list(range(deg)) random_gens.append(acc) self._random_gens = random_gens # handle randomized input for testing purposes if _random_prec_n is None: for i in range(n): self.random_pr() else: for i in range(n): self.random_pr(_random_prec=_random_prec_n[i]) def _union_find_merge(self, first, second, ranks, parents, not_rep): """Merges two classes in a union-find data structure. Used in the implementation of Atkinson's algorithm as suggested in [1], pp. 83-87. The class merging process uses union by rank as an optimization. ([7]) Notes ===== THIS FUNCTION HAS SIDE EFFECTS: the list of class representatives, ``parents``, the list of class sizes, ``ranks``, and the list of elements that are not representatives, ``not_rep``, are changed due to class merging. See Also ======== minimal_block, _union_find_rep References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of computational group theory" .. [7] http://www.algorithmist.com/index.php/Union_Find """ rep_first = self._union_find_rep(first, parents) rep_second = self._union_find_rep(second, parents) if rep_first != rep_second: # union by rank if ranks[rep_first] >= ranks[rep_second]: new_1, new_2 = rep_first, rep_second else: new_1, new_2 = rep_second, rep_first total_rank = ranks[new_1] + ranks[new_2] if total_rank > self.max_div: return -1 parents[new_2] = new_1 ranks[new_1] = total_rank not_rep.append(new_2) return 1 return 0 def _union_find_rep(self, num, parents): """Find representative of a class in a union-find data structure. Used in the implementation of Atkinson's algorithm as suggested in [1], pp. 83-87. After the representative of the class to which ``num`` belongs is found, path compression is performed as an optimization ([7]). Notes ===== THIS FUNCTION HAS SIDE EFFECTS: the list of class representatives, ``parents``, is altered due to path compression. See Also ======== minimal_block, _union_find_merge References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of computational group theory" .. [7] http://www.algorithmist.com/index.php/Union_Find """ rep, parent = num, parents[num] while parent != rep: rep = parent parent = parents[rep] # path compression temp, parent = num, parents[num] while parent != rep: parents[temp] = rep temp = parent parent = parents[temp] return rep @property def base(self): """Return a base from the Schreier-Sims algorithm. For a permutation group `G`, a base is a sequence of points `B = (b_1, b_2, ..., b_k)` such that no element of `G` apart from the identity fixes all the points in `B`. The concepts of a base and strong generating set and their applications are discussed in depth in [1], pp. 87-89 and [2], pp. 55-57. An alternative way to think of `B` is that it gives the indices of the stabilizer cosets that contain more than the identity permutation. Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> G = PermutationGroup([Permutation(0, 1, 3)(2, 4)]) >>> G.base [0, 2] See Also ======== strong_gens, basic_transversals, basic_orbits, basic_stabilizers """ if self._base == []: self.schreier_sims() return self._base def baseswap(self, base, strong_gens, pos, randomized=False, transversals=None, basic_orbits=None, strong_gens_distr=None): r"""Swap two consecutive base points in base and strong generating set. If a base for a group `G` is given by `(b_1, b_2, ..., b_k)`, this function returns a base `(b_1, b_2, ..., b_{i+1}, b_i, ..., b_k)`, where `i` is given by ``pos``, and a strong generating set relative to that base. The original base and strong generating set are not modified. The randomized version (default) is of Las Vegas type. Parameters ========== base, strong_gens The base and strong generating set. pos The position at which swapping is performed. randomized A switch between randomized and deterministic version. transversals The transversals for the basic orbits, if known. basic_orbits The basic orbits, if known. strong_gens_distr The strong generators distributed by basic stabilizers, if known. Returns ======= (base, strong_gens) ``base`` is the new base, and ``strong_gens`` is a generating set relative to it. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.testutil import _verify_bsgs >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> S = SymmetricGroup(4) >>> S.schreier_sims() >>> S.base [0, 1, 2] >>> base, gens = S.baseswap(S.base, S.strong_gens, 1, randomized=False) >>> base, gens ([0, 2, 1], [(0 1 2 3), (3)(0 1), (1 3 2), (2 3), (1 3)]) check that base, gens is a BSGS >>> S1 = PermutationGroup(gens) >>> _verify_bsgs(S1, base, gens) True See Also ======== schreier_sims Notes ===== The deterministic version of the algorithm is discussed in [1], pp. 102-103; the randomized version is discussed in [1], p.103, and [2], p.98. It is of Las Vegas type. Notice that [1] contains a mistake in the pseudocode and discussion of BASESWAP: on line 3 of the pseudocode, `\|\beta_{i+1}^{\left\langle T\right\rangle}\|` should be replaced by `\|\beta_{i}^{\left\langle T\right\rangle}\|`, and the same for the discussion of the algorithm. """ # construct the basic orbits, generators for the stabilizer chain # and transversal elements from whatever was provided transversals, basic_orbits, strong_gens_distr = \ _handle_precomputed_bsgs(base, strong_gens, transversals, basic_orbits, strong_gens_distr) base_len = len(base) degree = self.degree # size of orbit of base[pos] under the stabilizer we seek to insert # in the stabilizer chain at position pos + 1 size = len(basic_orbits[pos])len(basic_orbits[pos + 1]) \ //len(_orbit(degree, strong_gens_distr[pos], base[pos + 1])) # initialize the wanted stabilizer by a subgroup if pos + 2 > base_len - 1: T = [] else: T = strong_gens_distr[pos + 2][:] # randomized version if randomized is True: stab_pos = PermutationGroup(strong_gens_distr[pos]) schreier_vector = stab_pos.schreier_vector(base[pos + 1]) # add random elements of the stabilizer until they generate it while len(_orbit(degree, T, base[pos])) != size: new = stab_pos.random_stab(base[pos + 1], schreier_vector=schreier_vector) T.append(new) # deterministic version else: Gamma = set(basic_orbits[pos]) Gamma.remove(base[pos]) if base[pos + 1] in Gamma: Gamma.remove(base[pos + 1]) # add elements of the stabilizer until they generate it by # ruling out member of the basic orbit of base[pos] along the way while len(_orbit(degree, T, base[pos])) != size: gamma = next(iter(Gamma)) x = transversals[pos][gamma] temp = x._array_form.index(base[pos + 1]) # (~x)(base[pos + 1]) if temp not in basic_orbits[pos + 1]: Gamma = Gamma - _orbit(degree, T, gamma) else: y = transversals[pos + 1][temp] el = rmul(x, y) if el(base[pos]) not in _orbit(degree, T, base[pos]): T.append(el) Gamma = Gamma - _orbit(degree, T, base[pos]) # build the new base and strong generating set strong_gens_new_distr = strong_gens_distr[:] strong_gens_new_distr[pos + 1] = T base_new = base[:] base_new[pos], base_new[pos + 1] = base_new[pos + 1], base_new[pos] strong_gens_new = _strong_gens_from_distr(strong_gens_new_distr) for gen in T: if gen not in strong_gens_new: strong_gens_new.append(gen) return base_new, strong_gens_new @property def basic_orbits(self): """ Return the basic orbits relative to a base and strong generating set. If `(b_1, b_2, ..., b_k)` is a base for a group `G`, and `G^{(i)} = G_{b_1, b_2, ..., b_{i-1}}` is the ``i``-th basic stabilizer (so that `G^{(1)} = G`), the ``i``-th basic orbit relative to this base is the orbit of `b_i` under `G^{(i)}`. See [1], pp. 87-89 for more information. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> S = SymmetricGroup(4) >>> S.basic_orbits [[0, 1, 2, 3], [1, 2, 3], [2, 3]] See Also ======== base, strong_gens, basic_transversals, basic_stabilizers """ if self._basic_orbits == []: self.schreier_sims() return self._basic_orbits @property def basic_stabilizers(self): """ Return a chain of stabilizers relative to a base and strong generating set. The ``i``-th basic stabilizer `G^{(i)}` relative to a base `(b_1, b_2, ..., b_k)` is `G_{b_1, b_2, ..., b_{i-1}}`. For more information, see [1], pp. 87-89. Examples ======== >>> from sympy.combinatorics.named_groups import AlternatingGroup >>> A = AlternatingGroup(4) >>> A.schreier_sims() >>> A.base [0, 1] >>> for g in A.basic_stabilizers: ... print(g) ... PermutationGroup([ (3)(0 1 2), (1 2 3)]) PermutationGroup([ (1 2 3)]) See Also ======== base, strong_gens, basic_orbits, basic_transversals """ if self._transversals == []: self.schreier_sims() strong_gens = self._strong_gens base = self._base if not base: # e.g. if self is trivial return [] strong_gens_distr = _distribute_gens_by_base(base, strong_gens) basic_stabilizers = [] for gens in strong_gens_distr: basic_stabilizers.append(PermutationGroup(gens)) return basic_stabilizers @property def basic_transversals(self): """ Return basic transversals relative to a base and strong generating set. The basic transversals are transversals of the basic orbits. They are provided as a list of dictionaries, each dictionary having keys - the elements of one of the basic orbits, and values - the corresponding transversal elements. See [1], pp. 87-89 for more information. Examples ======== >>> from sympy.combinatorics.named_groups import AlternatingGroup >>> A = AlternatingGroup(4) >>> A.basic_transversals [{0: (3), 1: (3)(0 1 2), 2: (3)(0 2 1), 3: (0 3 1)}, {1: (3), 2: (1 2 3), 3: (1 3 2)}] See Also ======== strong_gens, base, basic_orbits, basic_stabilizers """ if self._transversals == []: self.schreier_sims() return self._transversals def composition_series(self): r""" Return the composition series for a group as a list of permutation groups. The composition series for a group `G` is defined as a subnormal series `G = H_0 > H_1 > H_2 \ldots` A composition series is a subnormal series such that each factor group `H(i+1) / H(i)` is simple. A subnormal series is a composition series only if it is of maximum length. The algorithm works as follows: Starting with the derived series the idea is to fill the gap between `G = der[i]` and `H = der[i+1]` for each `i` independently. Since, all subgroups of the abelian group `G/H` are normal so, first step is to take the generators `g` of `G` and add them to generators of `H` one by one. The factor groups formed are not simple in general. Each group is obtained from the previous one by adding one generator `g`, if the previous group is denoted by `H` then the next group `K` is generated by `g` and `H`. The factor group `K/H` is cyclic and it's order is `K.order()//G.order()`. The series is then extended between `K` and `H` by groups generated by powers of `g` and `H`. The series formed is then prepended to the already existing series. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.named_groups import CyclicGroup >>> S = SymmetricGroup(12) >>> G = S.sylow_subgroup(2) >>> C = G.composition_series() >>> [H.order() for H in C] [1024, 512, 256, 128, 64, 32, 16, 8, 4, 2, 1] >>> G = S.sylow_subgroup(3) >>> C = G.composition_series() >>> [H.order() for H in C] [243, 81, 27, 9, 3, 1] >>> G = CyclicGroup(12) >>> C = G.composition_series() >>> [H.order() for H in C] [12, 6, 3, 1] """ der = self.derived_series() if not (all(g.is_identity for g in der[-1].generators)): raise NotImplementedError('Group should be solvable') series = [] for i in range(len(der)-1): H = der[i+1] up_seg = [] for g in der[i].generators: K = PermutationGroup([g] + H.generators) order = K.order() // H.order() down_seg = [] for p, e in factorint(order).items(): for j in range(e): down_seg.append(PermutationGroup([g] + H.generators)) g = g*p up_seg = down_seg + up_seg H = K up_seg[0] = der[i] series.extend(up_seg) series.append(der[-1]) return series def coset_transversal(self, H): """Return a transversal of the right cosets of self by its subgroup H using the second method described in [1], Subsection 4.6.7 """ if not H.is_subgroup(self): raise ValueError("The argument must be a subgroup") if H.order() == 1: return self._elements self._schreier_sims(base=H.base) # make G.base an extension of H.base base = self.base base_ordering = _base_ordering(base, self.degree) identity = Permutation(self.degree - 1) transversals = self.basic_transversals[:] # transversals is a list of dictionaries. Get rid of the keys # so that it is a list of lists and sort each list in # the increasing order of base[l]^x for l, t in enumerate(transversals): transversals[l] = sorted(t.values(), key = lambda x: base_ordering[base[l]^x]) orbits = H.basic_orbits h_stabs = H.basic_stabilizers g_stabs = self.basic_stabilizers indices = [x.order()//y.order() for x, y in zip(g_stabs, h_stabs)] # T^(l) should be a right transversal of H^(l) in G^(l) for # 1<=l<=len(base). While H^(l) is the trivial group, T^(l) # contains all the elements of G^(l) so we might just as well # start with l = len(h_stabs)-1 if len(g_stabs) > len(h_stabs): T = g_stabs[len(h_stabs)]._elements else: T = [identity] l = len(h_stabs)-1 t_len = len(T) while l > -1: T_next = [] for u in transversals[l]: if u == identity: continue b = base_ordering[base[l]^u] for t in T: p = tu if all([base_ordering[h^p] >= b for h in orbits[l]]): T_next.append(p) if t_len + len(T_next) == indices[l]: break if t_len + len(T_next) == indices[l]: break T += T_next t_len += len(T_next) l -= 1 T.remove(identity) T = [identity] + T return T def _coset_representative(self, g, H): """Return the representative of Hg from the transversal that would be computed by `self.coset_transversal(H)`. """ if H.order() == 1: return g # The base of self must be an extension of H.base. if not(self.base[:len(H.base)] == H.base): self._schreier_sims(base=H.base) orbits = H.basic_orbits[:] h_transversals = [list(_.values()) for _ in H.basic_transversals] transversals = [list(_.values()) for _ in self.basic_transversals] base = self.base base_ordering = _base_ordering(base, self.degree) def step(l, x): gamma = sorted(orbits[l], key = lambda y: base_ordering[y^x])[0] i = [base[l]^h for h in h_transversals[l]].index(gamma) x = h_transversals[l][i]x if l < len(orbits)-1: for u in transversals[l]: if base[l]^u == base[l]^x: break x = step(l+1, xu*-1)u return x return step(0, g) def coset_table(self, H): """Return the standardised (right) coset table of self in H as a list of lists. """ # Maybe this should be made to return an instance of CosetTable # from fp_groups.py but the class would need to be changed first # to be compatible with PermutationGroups from itertools import chain, product if not H.is_subgroup(self): raise ValueError("The argument must be a subgroup") T = self.coset_transversal(H) n = len(T) A = list(chain.from_iterable((gen, gen*-1) for gen in self.generators)) table = [] for i in range(n): row = [self._coset_representative(T[i]x, H) for x in A] row = [T.index(r) for r in row] table.append(row) # standardize (this is the same as the algorithm used in coset_table) # If CosetTable is made compatible with PermutationGroups, this # should be replaced by table.standardize() A = range(len(A)) gamma = 1 for alpha, a in product(range(n), A): beta = table[alpha][a] if beta >= gamma: if beta > gamma: for x in A: z = table[gamma][x] table[gamma][x] = table[beta][x] table[beta][x] = z for i in range(n): if table[i][x] == beta: table[i][x] = gamma elif table[i][x] == gamma: table[i][x] = beta gamma += 1 if gamma >= n-1: return table def center(self): r""" Return the center of a permutation group. The center for a group `G` is defined as `Z(G) = \{z\in G \| \forall g\in G, zg = gz \}`, the set of elements of `G` that commute with all elements of `G`. It is equal to the centralizer of `G` inside `G`, and is naturally a subgroup of `G` ([9]). Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> D = DihedralGroup(4) >>> G = D.center() >>> G.order() 2 See Also ======== centralizer Notes ===== This is a naive implementation that is a straightforward application of ``.centralizer()`` """ return self.centralizer(self) def centralizer(self, other): r""" Return the centralizer of a group/set/element. The centralizer of a set of permutations ``S`` inside a group ``G`` is the set of elements of ``G`` that commute with all elements of ``S``:: `C_G(S) = \{ g \in G \| gs = sg \forall s \in S\}` ([10]) Usually, ``S`` is a subset of ``G``, but if ``G`` is a proper subgroup of the full symmetric group, we allow for ``S`` to have elements outside ``G``. It is naturally a subgroup of ``G``; the centralizer of a permutation group is equal to the centralizer of any set of generators for that group, since any element commuting with the generators commutes with any product of the generators. Parameters ========== other a permutation group/list of permutations/single permutation Examples ======== >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... CyclicGroup) >>> S = SymmetricGroup(6) >>> C = CyclicGroup(6) >>> H = S.centralizer(C) >>> H.is_subgroup(C) True See Also ======== subgroup_search Notes ===== The implementation is an application of ``.subgroup_search()`` with tests using a specific base for the group ``G``. """ if hasattr(other, 'generators'): if other.is_trivial or self.is_trivial: return self degree = self.degree identity = _af_new(list(range(degree))) orbits = other.orbits() num_orbits = len(orbits) orbits.sort(key=lambda x: -len(x)) long_base = [] orbit_reps = [None]num_orbits orbit_reps_indices = [None]num_orbits orbit_descr = [None]degree for i in range(num_orbits): orbit = list(orbits[i]) orbit_reps[i] = orbit[0] orbit_reps_indices[i] = len(long_base) for point in orbit: orbit_descr[point] = i long_base = long_base + orbit base, strong_gens = self.schreier_sims_incremental(base=long_base) strong_gens_distr = _distribute_gens_by_base(base, strong_gens) i = 0 for i in range(len(base)): if strong_gens_distr[i] == [identity]: break base = base[:i] base_len = i for j in range(num_orbits): if base[base_len - 1] in orbits[j]: break rel_orbits = orbits[: j + 1] num_rel_orbits = len(rel_orbits) transversals = [None]num_rel_orbits for j in range(num_rel_orbits): rep = orbit_reps[j] transversals[j] = dict( other.orbit_transversal(rep, pairs=True)) trivial_test = lambda x: True tests = [None]base_len for l in range(base_len): if base[l] in orbit_reps: tests[l] = trivial_test else: def test(computed_words, l=l): g = computed_words[l] rep_orb_index = orbit_descr[base[l]] rep = orbit_reps[rep_orb_index] im = g._array_form[base[l]] im_rep = g._array_form[rep] tr_el = transversals[rep_orb_index][base[l]] # using the definition of transversal, # base[l]^g = rep^(tr_elg); # if g belongs to the centralizer, then # base[l]^g = (rep^g)^tr_el return im == tr_el._array_form[im_rep] tests[l] = test def prop(g): return [rmul(g, gen) for gen in other.generators] == \ [rmul(gen, g) for gen in other.generators] return self.subgroup_search(prop, base=base, strong_gens=strong_gens, tests=tests) elif hasattr(other, '__getitem__'): gens = list(other) return self.centralizer(PermutationGroup(gens)) elif hasattr(other, 'array_form'): return self.centralizer(PermutationGroup([other])) def commutator(self, G, H): """ Return the commutator of two subgroups. For a permutation group ``K`` and subgroups ``G``, ``H``, the commutator of ``G`` and ``H`` is defined as the group generated by all the commutators `[g, h] = hgh^{-1}g^{-1}` for ``g`` in ``G`` and ``h`` in ``H``. It is naturally a subgroup of ``K`` ([1], p.27). Examples ======== >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... AlternatingGroup) >>> S = SymmetricGroup(5) >>> A = AlternatingGroup(5) >>> G = S.commutator(S, A) >>> G.is_subgroup(A) True See Also ======== derived_subgroup Notes ===== The commutator of two subgroups `H, G` is equal to the normal closure of the commutators of all the generators, i.e. `hgh^{-1}g^{-1}` for `h` a generator of `H` and `g` a generator of `G` ([1], p.28) """ ggens = G.generators hgens = H.generators commutators = [] for ggen in ggens: for hgen in hgens: commutator = rmul(hgen, ggen, ~hgen, ~ggen) if commutator not in commutators: commutators.append(commutator) res = self.normal_closure(commutators) return res def coset_factor(self, g, factor_index=False): """Return ``G``'s (self's) coset factorization of ``g`` If ``g`` is an element of ``G`` then it can be written as the product of permutations drawn from the Schreier-Sims coset decomposition, The permutations returned in ``f`` are those for which the product gives ``g``: ``g = f[n]...f[1]f[0]`` where ``n = len(B)`` and ``B = G.base``. f[i] is one of the permutations in ``self._basic_orbits[i]``. If factor_index==True, returns a tuple ``[b[0],..,b[n]]``, where ``b[i]`` belongs to ``self._basic_orbits[i]`` Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> Permutation.print_cyclic = True >>> a = Permutation(0, 1, 3, 7, 6, 4)(2, 5) >>> b = Permutation(0, 1, 3, 2)(4, 5, 7, 6) >>> G = PermutationGroup([a, b]) Define g: >>> g = Permutation(7)(1, 2, 4)(3, 6, 5) Confirm that it is an element of G: >>> G.contains(g) True Thus, it can be written as a product of factors (up to 3) drawn from u. See below that a factor from u1 and u2 and the Identity permutation have been used: >>> f = G.coset_factor(g) >>> f[2]f[1]f[0] == g True >>> f1 = G.coset_factor(g, True); f1 [0, 4, 4] >>> tr = G.basic_transversals >>> f[0] == tr[0][f1[0]] True If g is not an element of G then [] is returned: >>> c = Permutation(5, 6, 7) >>> G.coset_factor(c) [] See Also ======== util._strip """ if isinstance(g, (Cycle, Permutation)): g = g.list() if len(g) != self._degree: # this could either adjust the size or return [] immediately # but we don't choose between the two and just signal a possible # error raise ValueError('g should be the same size as permutations of G') I = list(range(self._degree)) basic_orbits = self.basic_orbits transversals = self._transversals factors = [] base = self.base h = g for i in range(len(base)): beta = h[base[i]] if beta == base[i]: factors.append(beta) continue if beta not in basic_orbits[i]: return [] u = transversals[i][beta]._array_form h = _af_rmul(_af_invert(u), h) factors.append(beta) if h != I: return [] if factor_index: return factors tr = self.basic_transversals factors = [tr[i][factors[i]] for i in range(len(base))] return factors def generator_product(self, g, original=False): ''' Return a list of strong generators `[s1, ..., sn]` s.t `g = sn...s1`. If `original=True`, make the list contain only the original group generators ''' product = [] if g.is_identity: return [] if g in self.strong_gens: if not original or g in self.generators: return [g] else: slp = self._strong_gens_slp[g] for s in slp: product.extend(self.generator_product(s, original=True)) return product elif g-1 in self.strong_gens: g = g-1 if not original or g in self.generators: return [g-1] else: slp = self._strong_gens_slp[g] for s in slp: product.extend(self.generator_product(s, original=True)) l = len(product) product = [product[l-i-1]-1 for i in range(l)] return product f = self.coset_factor(g, True) for i, j in enumerate(f): slp = self._transversal_slp[i][j] for s in slp: if not original: product.append(self.strong_gens[s]) else: s = self.strong_gens[s] product.extend(self.generator_product(s, original=True)) return product def coset_rank(self, g): """rank using Schreier-Sims representation The coset rank of ``g`` is the ordering number in which it appears in the lexicographic listing according to the coset decomposition The ordering is the same as in G.generate(method='coset'). If ``g`` does not belong to the group it returns None. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation(0, 1, 3, 7, 6, 4)(2, 5) >>> b = Permutation(0, 1, 3, 2)(4, 5, 7, 6) >>> G = PermutationGroup([a, b]) >>> c = Permutation(7)(2, 4)(3, 5) >>> G.coset_rank(c) 16 >>> G.coset_unrank(16) (7)(2 4)(3 5) See Also ======== coset_factor """ factors = self.coset_factor(g, True) if not factors: return None rank = 0 b = 1 transversals = self._transversals base = self._base basic_orbits = self._basic_orbits for i in range(len(base)): k = factors[i] j = basic_orbits[i].index(k) rank += bj b = blen(transversals[i]) return rank def coset_unrank(self, rank, af=False): """unrank using Schreier-Sims representation coset_unrank is the inverse operation of coset_rank if 0 <= rank < order; otherwise it returns None. """ if rank < 0 or rank >= self.order(): return None base = self.base transversals = self.basic_transversals basic_orbits = self.basic_orbits m = len(base) v = [0]m for i in range(m): rank, c = divmod(rank, len(transversals[i])) v[i] = basic_orbits[i][c] a = [transversals[i][v[i]]._array_form for i in range(m)] h = _af_rmuln(a) if af: return h else: return _af_new(h) @property def degree(self): """Returns the size of the permutations in the group. The number of permutations comprising the group is given by ``len(group)``; the number of permutations that can be generated by the group is given by ``group.order()``. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([1, 0, 2]) >>> G = PermutationGroup([a]) >>> G.degree 3 >>> len(G) 1 >>> G.order() 2 >>> list(G.generate()) [(2), (2)(0 1)] See Also ======== order """ return self._degree @property def identity(self): ''' Return the identity element of the permutation group. ''' return _af_new(list(range(self.degree))) @property def elements(self): """Returns all the elements of the permutation group as a set Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> p = PermutationGroup(Permutation(1, 3), Permutation(1, 2)) >>> p.elements {(3), (2 3), (3)(1 2), (1 2 3), (1 3 2), (1 3)} """ return set(self._elements) @property def _elements(self): """Returns all the elements of the permutation group as a list Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> p = PermutationGroup(Permutation(1, 3), Permutation(1, 2)) >>> p._elements [(3), (3)(1 2), (1 3), (2 3), (1 2 3), (1 3 2)] """ return list(islice(self.generate(), None)) def derived_series(self): r"""Return the derived series for the group. The derived series for a group `G` is defined as `G = G_0 > G_1 > G_2 > \ldots` where `G_i = [G_{i-1}, G_{i-1}]`, i.e. `G_i` is the derived subgroup of `G_{i-1}`, for `i\in\mathbb{N}`. When we have `G_k = G_{k-1}` for some `k\in\mathbb{N}`, the series terminates. Returns ======= A list of permutation groups containing the members of the derived series in the order `G = G_0, G_1, G_2, \ldots`. Examples ======== >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... AlternatingGroup, DihedralGroup) >>> A = AlternatingGroup(5) >>> len(A.derived_series()) 1 >>> S = SymmetricGroup(4) >>> len(S.derived_series()) 4 >>> S.derived_series()[1].is_subgroup(AlternatingGroup(4)) True >>> S.derived_series()[2].is_subgroup(DihedralGroup(2)) True See Also ======== derived_subgroup """ res = [self] current = self next = self.derived_subgroup() while not current.is_subgroup(next): res.append(next) current = next next = next.derived_subgroup() return res def derived_subgroup(self): r"""Compute the derived subgroup. The derived subgroup, or commutator subgroup is the subgroup generated by all commutators `[g, h] = hgh^{-1}g^{-1}` for `g, h\in G` ; it is equal to the normal closure of the set of commutators of the generators ([1], p.28, [11]). Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([1, 0, 2, 4, 3]) >>> b = Permutation([0, 1, 3, 2, 4]) >>> G = PermutationGroup([a, b]) >>> C = G.derived_subgroup() >>> list(C.generate(af=True)) [[0, 1, 2, 3, 4], [0, 1, 3, 4, 2], [0, 1, 4, 2, 3]] See Also ======== derived_series """ r = self._r gens = [p._array_form for p in self.generators] set_commutators = set() degree = self._degree rng = list(range(degree)) for i in range(r): for j in range(r): p1 = gens[i] p2 = gens[j] c = list(range(degree)) for k in rng: c[p2[p1[k]]] = p1[p2[k]] ct = tuple(c) if not ct in set_commutators: set_commutators.add(ct) cms = [_af_new(p) for p in set_commutators] G2 = self.normal_closure(cms) return G2 def generate(self, method="coset", af=False): """Return iterator to generate the elements of the group Iteration is done with one of these methods:: method='coset' using the Schreier-Sims coset representation method='dimino' using the Dimino method If af = True it yields the array form of the permutations Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics import PermutationGroup >>> from sympy.combinatorics.polyhedron import tetrahedron The permutation group given in the tetrahedron object is also true groups: >>> G = tetrahedron.pgroup >>> G.is_group True Also the group generated by the permutations in the tetrahedron pgroup -- even the first two -- is a proper group: >>> H = PermutationGroup(G[0], G[1]) >>> J = PermutationGroup(list(H.generate())); J PermutationGroup([ (0 1)(2 3), (1 2 3), (1 3 2), (0 3 1), (0 2 3), (0 3)(1 2), (0 1 3), (3)(0 2 1), (0 3 2), (3)(0 1 2), (0 2)(1 3)]) >>> _.is_group True """ if method == "coset": return self.generate_schreier_sims(af) elif method == "dimino": return self.generate_dimino(af) else: raise NotImplementedError('No generation defined for %s' % method) def generate_dimino(self, af=False): """Yield group elements using Dimino's algorithm If af == True it yields the array form of the permutations Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1, 3]) >>> b = Permutation([0, 2, 3, 1]) >>> g = PermutationGroup([a, b]) >>> list(g.generate_dimino(af=True)) [[0, 1, 2, 3], [0, 2, 1, 3], [0, 2, 3, 1], [0, 1, 3, 2], [0, 3, 2, 1], [0, 3, 1, 2]] References ========== .. [1] The Implementation of Various Algorithms for Permutation Groups in the Computer Algebra System: AXIOM, N.J. Doye, M.Sc. Thesis """ idn = list(range(self.degree)) order = 0 element_list = [idn] set_element_list = {tuple(idn)} if af: yield idn else: yield _af_new(idn) gens = [p._array_form for p in self.generators] for i in range(len(gens)): # D elements of the subgroup G_i generated by gens[:i] D = element_list[:] N = [idn] while N: A = N N = [] for a in A: for g in gens[:i + 1]: ag = _af_rmul(a, g) if tuple(ag) not in set_element_list: # produce G_ig for d in D: order += 1 ap = _af_rmul(d, ag) if af: yield ap else: p = _af_new(ap) yield p element_list.append(ap) set_element_list.add(tuple(ap)) N.append(ap) self._order = len(element_list) def generate_schreier_sims(self, af=False): """Yield group elements using the Schreier-Sims representation in coset_rank order If ``af = True`` it yields the array form of the permutations Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1, 3]) >>> b = Permutation([0, 2, 3, 1]) >>> g = PermutationGroup([a, b]) >>> list(g.generate_schreier_sims(af=True)) [[0, 1, 2, 3], [0, 2, 1, 3], [0, 3, 2, 1], [0, 1, 3, 2], [0, 2, 3, 1], [0, 3, 1, 2]] """ n = self._degree u = self.basic_transversals basic_orbits = self._basic_orbits if len(u) == 0: for x in self.generators: if af: yield x._array_form else: yield x return if len(u) == 1: for i in basic_orbits[0]: if af: yield u[0][i]._array_form else: yield u[0][i] return u = list(reversed(u)) basic_orbits = basic_orbits[::-1] # stg stack of group elements stg = [list(range(n))] posmax = [len(x) for x in u] n1 = len(posmax) - 1 pos = [0]n1 h = 0 while 1: # backtrack when finished iterating over coset if pos[h] >= posmax[h]: if h == 0: return pos[h] = 0 h -= 1 stg.pop() continue p = _af_rmul(u[h][basic_orbits[h][pos[h]]]._array_form, stg[-1]) pos[h] += 1 stg.append(p) h += 1 if h == n1: if af: for i in basic_orbits[-1]: p = _af_rmul(u[-1][i]._array_form, stg[-1]) yield p else: for i in basic_orbits[-1]: p = _af_rmul(u[-1][i]._array_form, stg[-1]) p1 = _af_new(p) yield p1 stg.pop() h -= 1 @property def generators(self): """Returns the generators of the group. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G.generators [(1 2), (2)(0 1)] """ return self._generators def contains(self, g, strict=True): """Test if permutation ``g`` belong to self, ``G``. If ``g`` is an element of ``G`` it can be written as a product of factors drawn from the cosets of ``G``'s stabilizers. To see if ``g`` is one of the actual generators defining the group use ``G.has(g)``. If ``strict`` is not ``True``, ``g`` will be resized, if necessary, to match the size of permutations in ``self``. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation(1, 2) >>> b = Permutation(2, 3, 1) >>> G = PermutationGroup(a, b, degree=5) >>> G.contains(G[0]) # trivial check True >>> elem = Permutation([[2, 3]], size=5) >>> G.contains(elem) True >>> G.contains(Permutation(4)(0, 1, 2, 3)) False If strict is False, a permutation will be resized, if necessary: >>> H = PermutationGroup(Permutation(5)) >>> H.contains(Permutation(3)) False >>> H.contains(Permutation(3), strict=False) True To test if a given permutation is present in the group: >>> elem in G.generators False >>> G.has(elem) False See Also ======== coset_factor, has, in """ if not isinstance(g, Permutation): return False if g.size != self.degree: if strict: return False g = Permutation(g, size=self.degree) if g in self.generators: return True return bool(self.coset_factor(g.array_form, True)) @property def is_perfect(self): """Return ``True`` if the group is perfect. A group is perfect if it equals to its derived subgroup. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation(1,2,3)(4,5) >>> b = Permutation(1,2,3,4,5) >>> G = PermutationGroup([a, b]) >>> G.is_perfect False """ if self._is_perfect is None: self._is_perfect = self == self.derived_subgroup() return self._is_perfect @property def is_abelian(self): """Test if the group is Abelian. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G.is_abelian False >>> a = Permutation([0, 2, 1]) >>> G = PermutationGroup([a]) >>> G.is_abelian True """ if self._is_abelian is not None: return self._is_abelian self._is_abelian = True gens = [p._array_form for p in self.generators] for x in gens: for y in gens: if y <= x: continue if not _af_commutes_with(x, y): self._is_abelian = False return False return True def abelian_invariants(self): """ Returns the abelian invariants for the given group. Let ``G`` be a nontrivial finite abelian group. Then G is isomorphic to the direct product of finitely many nontrivial cyclic groups of prime-power order. The prime-powers that occur as the orders of the factors are uniquely determined by G. More precisely, the primes that occur in the orders of the factors in any such decomposition of ``G`` are exactly the primes that divide ``\|G\|`` and for any such prime ``p``, if the orders of the factors that are p-groups in one such decomposition of ``G`` are ``p^{t_1} >= p^{t_2} >= ... p^{t_r}``, then the orders of the factors that are p-groups in any such decomposition of ``G`` are ``p^{t_1} >= p^{t_2} >= ... p^{t_r}``. The uniquely determined integers ``p^{t_1} >= p^{t_2} >= ... p^{t_r}``, taken for all primes that divide ``\|G\|`` are called the invariants of the nontrivial group ``G`` as suggested in ([14], p. 542). Notes ===== We adopt the convention that the invariants of a trivial group are []. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G.abelian_invariants() [2] >>> from sympy.combinatorics.named_groups import CyclicGroup >>> G = CyclicGroup(7) >>> G.abelian_invariants() [7] """ if self.is_trivial: return [] gns = self.generators inv = [] G = self H = G.derived_subgroup() Hgens = H.generators for p in primefactors(G.order()): ranks = [] while True: pows = [] for g in gns: elm = g*p if not H.contains(elm): pows.append(elm) K = PermutationGroup(Hgens + pows) if pows else H r = G.order()//K.order() G = K gns = pows if r == 1: break; ranks.append(multiplicity(p, r)) if ranks: pows = [1]ranks[0] for i in ranks: for j in range(0, i): pows[j] = pows[j]p inv.extend(pows) inv.sort() return inv def is_elementary(self, p): """Return ``True`` if the group is elementary abelian. An elementary abelian group is a finite abelian group, where every nontrivial element has order `p`, where `p` is a prime. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1]) >>> G = PermutationGroup([a]) >>> G.is_elementary(2) True >>> a = Permutation([0, 2, 1, 3]) >>> b = Permutation([3, 1, 2, 0]) >>> G = PermutationGroup([a, b]) >>> G.is_elementary(2) True >>> G.is_elementary(3) False """ return self.is_abelian and all(g.order() == p for g in self.generators) def is_alt_sym(self, eps=0.05, _random_prec=None): r"""Monte Carlo test for the symmetric/alternating group for degrees >= 8. More specifically, it is one-sided Monte Carlo with the answer True (i.e., G is symmetric/alternating) guaranteed to be correct, and the answer False being incorrect with probability eps. For degree < 8, the order of the group is checked so the test is deterministic. Notes ===== The algorithm itself uses some nontrivial results from group theory and number theory: 1) If a transitive group ``G`` of degree ``n`` contains an element with a cycle of length ``n/2 < p < n-2`` for ``p`` a prime, ``G`` is the symmetric or alternating group ([1], pp. 81-82) 2) The proportion of elements in the symmetric/alternating group having the property described in 1) is approximately `\log(2)/\log(n)` ([1], p.82; [2], pp. 226-227). The helper function ``_check_cycles_alt_sym`` is used to go over the cycles in a permutation and look for ones satisfying 1). Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> D = DihedralGroup(10) >>> D.is_alt_sym() False See Also ======== _check_cycles_alt_sym """ if _random_prec is None: if self._is_sym or self._is_alt: return True n = self.degree if n < 8: sym_order = 1 for i in range(2, n+1): sym_order = i order = self.order() if order == sym_order: self._is_sym = True return True elif 2order == sym_order: self._is_alt = True return True return False if not self.is_transitive(): return False if n < 17: c_n = 0.34 else: c_n = 0.57 d_n = (c_nlog(2))/log(n) N_eps = int(-log(eps)/d_n) for i in range(N_eps): perm = self.random_pr() if _check_cycles_alt_sym(perm): return True return False else: for i in range(_random_prec['N_eps']): perm = _random_prec[i] if _check_cycles_alt_sym(perm): return True return False @property def is_nilpotent(self): """Test if the group is nilpotent. A group `G` is nilpotent if it has a central series of finite length. Alternatively, `G` is nilpotent if its lower central series terminates with the trivial group. Every nilpotent group is also solvable ([1], p.29, [12]). Examples ======== >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... CyclicGroup) >>> C = CyclicGroup(6) >>> C.is_nilpotent True >>> S = SymmetricGroup(5) >>> S.is_nilpotent False See Also ======== lower_central_series, is_solvable """ if self._is_nilpotent is None: lcs = self.lower_central_series() terminator = lcs[len(lcs) - 1] gens = terminator.generators degree = self.degree identity = _af_new(list(range(degree))) if all(g == identity for g in gens): self._is_solvable = True self._is_nilpotent = True return True else: self._is_nilpotent = False return False else: return self._is_nilpotent def is_normal(self, gr, strict=True): """Test if ``G=self`` is a normal subgroup of ``gr``. G is normal in gr if for each g2 in G, g1 in gr, ``g = g1g2g1*-1`` belongs to G It is sufficient to check this for each g1 in gr.generators and g2 in G.generators. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([1, 2, 0]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G1 = PermutationGroup([a, Permutation([2, 0, 1])]) >>> G1.is_normal(G) True """ if not self.is_subgroup(gr, strict=strict): return False d_self = self.degree d_gr = gr.degree if self.is_trivial and (d_self == d_gr or not strict): return True if self._is_abelian: return True new_self = self.copy() if not strict and d_self != d_gr: if d_self < d_gr: new_self = PermGroup(new_self.generators + [Permutation(d_gr - 1)]) else: gr = PermGroup(gr.generators + [Permutation(d_self - 1)]) gens2 = [p._array_form for p in new_self.generators] gens1 = [p._array_form for p in gr.generators] for g1 in gens1: for g2 in gens2: p = _af_rmuln(g1, g2, _af_invert(g1)) if not new_self.coset_factor(p, True): return False return True def is_primitive(self, randomized=True): r"""Test if a group is primitive. A permutation group ``G`` acting on a set ``S`` is called primitive if ``S`` contains no nontrivial block under the action of ``G`` (a block is nontrivial if its cardinality is more than ``1``). Notes ===== The algorithm is described in [1], p.83, and uses the function minimal_block to search for blocks of the form `\{0, k\}` for ``k`` ranging over representatives for the orbits of `G_0`, the stabilizer of ``0``. This algorithm has complexity `O(n^2)` where ``n`` is the degree of the group, and will perform badly if `G_0` is small. There are two implementations offered: one finds `G_0` deterministically using the function ``stabilizer``, and the other (default) produces random elements of `G_0` using ``random_stab``, hoping that they generate a subgroup of `G_0` with not too many more orbits than `G_0` (this is suggested in [1], p.83). Behavior is changed by the ``randomized`` flag. Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> D = DihedralGroup(10) >>> D.is_primitive() False See Also ======== minimal_block, random_stab """ if self._is_primitive is not None: return self._is_primitive if randomized: random_stab_gens = [] v = self.schreier_vector(0) for i in range(len(self)): random_stab_gens.append(self.random_stab(0, v)) stab = PermutationGroup(random_stab_gens) else: stab = self.stabilizer(0) orbits = stab.orbits() for orb in orbits: x = orb.pop() if x != 0 and any(e != 0 for e in self.minimal_block([0, x])): self._is_primitive = False return False self._is_primitive = True return True def minimal_blocks(self, randomized=True): ''' For a transitive group, return the list of all minimal block systems. If a group is intransitive, return `False`. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> DihedralGroup(6).minimal_blocks() [[0, 1, 0, 1, 0, 1], [0, 1, 2, 0, 1, 2]] >>> G = PermutationGroup(Permutation(1,2,5)) >>> G.minimal_blocks() False See Also ======== minimal_block, is_transitive, is_primitive ''' def _number_blocks(blocks): # number the blocks of a block system # in order and return the number of # blocks and the tuple with the # reordering n = len(blocks) appeared = {} m = 0 b = [None]n for i in range(n): if blocks[i] not in appeared: appeared[blocks[i]] = m b[i] = m m += 1 else: b[i] = appeared[blocks[i]] return tuple(b), m if not self.is_transitive(): return False blocks = [] num_blocks = [] rep_blocks = [] if randomized: random_stab_gens = [] v = self.schreier_vector(0) for i in range(len(self)): random_stab_gens.append(self.random_stab(0, v)) stab = PermutationGroup(random_stab_gens) else: stab = self.stabilizer(0) orbits = stab.orbits() for orb in orbits: x = orb.pop() if x != 0: block = self.minimal_block([0, x]) num_block, m = _number_blocks(block) # a representative block (containing 0) rep = set(j for j in range(self.degree) if num_block[j] == 0) # check if the system is minimal with # respect to the already discovere ones minimal = True to_remove = [] for i, r in enumerate(rep_blocks): if len(r) > len(rep) and rep.issubset(r): # i-th block system is not minimal del num_blocks[i], blocks[i] to_remove.append(rep_blocks[i]) elif len(r) < len(rep) and r.issubset(rep): # the system being checked is not minimal minimal = False break # remove non-minimal representative blocks rep_blocks = [r for r in rep_blocks if r not in to_remove] if minimal and num_block not in num_blocks: blocks.append(block) num_blocks.append(num_block) rep_blocks.append(rep) return blocks @property def is_solvable(self): """Test if the group is solvable. ``G`` is solvable if its derived series terminates with the trivial group ([1], p.29). Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> S = SymmetricGroup(3) >>> S.is_solvable True See Also ======== is_nilpotent, derived_series """ if self._is_solvable is None: if self.order() % 2 != 0: return True ds = self.derived_series() terminator = ds[len(ds) - 1] gens = terminator.generators degree = self.degree identity = _af_new(list(range(degree))) if all(g == identity for g in gens): self._is_solvable = True return True else: self._is_solvable = False return False else: return self._is_solvable def is_subgroup(self, G, strict=True): """Return ``True`` if all elements of ``self`` belong to ``G``. If ``strict`` is ``False`` then if ``self``'s degree is smaller than ``G``'s, the elements will be resized to have the same degree. Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... CyclicGroup) Testing is strict by default: the degree of each group must be the same: >>> p = Permutation(0, 1, 2, 3, 4, 5) >>> G1 = PermutationGroup([Permutation(0, 1, 2), Permutation(0, 1)]) >>> G2 = PermutationGroup([Permutation(0, 2), Permutation(0, 1, 2)]) >>> G3 = PermutationGroup([p, p*2]) >>> assert G1.order() == G2.order() == G3.order() == 6 >>> G1.is_subgroup(G2) True >>> G1.is_subgroup(G3) False >>> G3.is_subgroup(PermutationGroup(G3[1])) False >>> G3.is_subgroup(PermutationGroup(G3[0])) True To ignore the size, set ``strict`` to ``False``: >>> S3 = SymmetricGroup(3) >>> S5 = SymmetricGroup(5) >>> S3.is_subgroup(S5, strict=False) True >>> C7 = CyclicGroup(7) >>> G = S5C7 >>> S5.is_subgroup(G, False) True >>> C7.is_subgroup(G, 0) False """ if not isinstance(G, PermutationGroup): return False if self == G or self.generators[0]==Permutation(): return True if G.order() % self.order() != 0: return False if self.degree == G.degree or \ (self.degree < G.degree and not strict): gens = self.generators else: return False return all(G.contains(g, strict=strict) for g in gens) @property def is_polycyclic(self): """Return ``True`` if a group is polycyclic. A group is polycyclic if it has a subnormal series with cyclic factors. For finite groups, this is the same as if the group is solvable. Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> a = Permutation([0, 2, 1, 3]) >>> b = Permutation([2, 0, 1, 3]) >>> G = PermutationGroup([a, b]) >>> G.is_polycyclic True """ return self.is_solvable def is_transitive(self, strict=True): """Test if the group is transitive. A group is transitive if it has a single orbit. If ``strict`` is ``False`` the group is transitive if it has a single orbit of length different from 1. Examples ======== >>> from sympy.combinatorics.permutations import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1, 3]) >>> b = Permutation([2, 0, 1, 3]) >>> G1 = PermutationGroup([a, b]) >>> G1.is_transitive() False >>> G1.is_transitive(strict=False) True >>> c = Permutation([2, 3, 0, 1]) >>> G2 = PermutationGroup([a, c]) >>> G2.is_transitive() True >>> d = Permutation([1, 0, 2, 3]) >>> e = Permutation([0, 1, 3, 2]) >>> G3 = PermutationGroup([d, e]) >>> G3.is_transitive() or G3.is_transitive(strict=False) False """ if self._is_transitive: # strict or not, if True then True return self._is_transitive if strict: if self._is_transitive is not None: # we only store strict=True return self._is_transitive ans = len(self.orbit(0)) == self.degree self._is_transitive = ans return ans got_orb = False for x in self.orbits(): if len(x) > 1: if got_orb: return False got_orb = True return got_orb @property def is_trivial(self): """Test if the group is the trivial group. This is true if the group contains only the identity permutation. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> G = PermutationGroup([Permutation([0, 1, 2])]) >>> G.is_trivial True """ if self._is_trivial is None: self._is_trivial = len(self) == 1 and self[0].is_Identity return self._is_trivial def lower_central_series(self): r"""Return the lower central series for the group. The lower central series for a group `G` is the series `G = G_0 > G_1 > G_2 > \ldots` where `G_k = [G, G_{k-1}]`, i.e. every term after the first is equal to the commutator of `G` and the previous term in `G1` ([1], p.29). Returns ======= A list of permutation groups in the order `G = G_0, G_1, G_2, \ldots` Examples ======== >>> from sympy.combinatorics.named_groups import (AlternatingGroup, ... DihedralGroup) >>> A = AlternatingGroup(4) >>> len(A.lower_central_series()) 2 >>> A.lower_central_series()[1].is_subgroup(DihedralGroup(2)) True See Also ======== commutator, derived_series """ res = [self] current = self next = self.commutator(self, current) while not current.is_subgroup(next): res.append(next) current = next next = self.commutator(self, current) return res @property def max_div(self): """Maximum proper divisor of the degree of a permutation group. Notes ===== Obviously, this is the degree divided by its minimal proper divisor (larger than ``1``, if one exists). As it is guaranteed to be prime, the ``sieve`` from ``sympy.ntheory`` is used. This function is also used as an optimization tool for the functions ``minimal_block`` and ``_union_find_merge``. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> G = PermutationGroup([Permutation([0, 2, 1, 3])]) >>> G.max_div 2 See Also ======== minimal_block, _union_find_merge """ if self._max_div is not None: return self._max_div n = self.degree if n == 1: return 1 for x in sieve: if n % x == 0: d = n//x self._max_div = d return d def minimal_block(self, points): r"""For a transitive group, finds the block system generated by ``points``. If a group ``G`` acts on a set ``S``, a nonempty subset ``B`` of ``S`` is called a block under the action of ``G`` if for all ``g`` in ``G`` we have ``gB = B`` (``g`` fixes ``B``) or ``gB`` and ``B`` have no common points (``g`` moves ``B`` entirely). ([1], p.23; [6]). The distinct translates ``gB`` of a block ``B`` for ``g`` in ``G`` partition the set ``S`` and this set of translates is known as a block system. Moreover, we obviously have that all blocks in the partition have the same size, hence the block size divides ``\|S\|`` ([1], p.23). A ``G``-congruence is an equivalence relation ``~`` on the set ``S`` such that ``a ~ b`` implies ``g(a) ~ g(b)`` for all ``g`` in ``G``. For a transitive group, the equivalence classes of a ``G``-congruence and the blocks of a block system are the same thing ([1], p.23). The algorithm below checks the group for transitivity, and then finds the ``G``-congruence generated by the pairs ``(p_0, p_1), (p_0, p_2), ..., (p_0,p_{k-1})`` which is the same as finding the maximal block system (i.e., the one with minimum block size) such that ``p_0, ..., p_{k-1}`` are in the same block ([1], p.83). It is an implementation of Atkinson's algorithm, as suggested in [1], and manipulates an equivalence relation on the set ``S`` using a union-find data structure. The running time is just above `O(\|points\|\|S\|)`. ([1], pp. 83-87; [7]). Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> D = DihedralGroup(10) >>> D.minimal_block([0, 5]) [0, 1, 2, 3, 4, 0, 1, 2, 3, 4] >>> D.minimal_block([0, 1]) [0, 0, 0, 0, 0, 0, 0, 0, 0, 0] See Also ======== _union_find_rep, _union_find_merge, is_transitive, is_primitive """ if not self.is_transitive(): return False n = self.degree gens = self.generators # initialize the list of equivalence class representatives parents = list(range(n)) ranks = [1]n not_rep = [] k = len(points) # the block size must divide the degree of the group if k > self.max_div: return [0]n for i in range(k - 1): parents[points[i + 1]] = points[0] not_rep.append(points[i + 1]) ranks[points[0]] = k i = 0 len_not_rep = k - 1 while i < len_not_rep: gamma = not_rep[i] i += 1 for gen in gens: # find has side effects: performs path compression on the list # of representatives delta = self._union_find_rep(gamma, parents) # union has side effects: performs union by rank on the list # of representatives temp = self._union_find_merge(gen(gamma), gen(delta), ranks, parents, not_rep) if temp == -1: return [0]n len_not_rep += temp for i in range(n): # force path compression to get the final state of the equivalence # relation self._union_find_rep(i, parents) # rewrite result so that block representatives are minimal new_reps = {} return [new_reps.setdefault(r, i) for i, r in enumerate(parents)] def normal_closure(self, other, k=10): r"""Return the normal closure of a subgroup/set of permutations. If ``S`` is a subset of a group ``G``, the normal closure of ``A`` in ``G`` is defined as the intersection of all normal subgroups of ``G`` that contain ``A`` ([1], p.14). Alternatively, it is the group generated by the conjugates ``x^{-1}yx`` for ``x`` a generator of ``G`` and ``y`` a generator of the subgroup ``\left\langle S\right\rangle`` generated by ``S`` (for some chosen generating set for ``\left\langle S\right\rangle``) ([1], p.73). Parameters ========== other a subgroup/list of permutations/single permutation k an implementation-specific parameter that determines the number of conjugates that are adjoined to ``other`` at once Examples ======== >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... CyclicGroup, AlternatingGroup) >>> S = SymmetricGroup(5) >>> C = CyclicGroup(5) >>> G = S.normal_closure(C) >>> G.order() 60 >>> G.is_subgroup(AlternatingGroup(5)) True See Also ======== commutator, derived_subgroup, random_pr Notes ===== The algorithm is described in [1], pp. 73-74; it makes use of the generation of random elements for permutation groups by the product replacement algorithm. """ if hasattr(other, 'generators'): degree = self.degree identity = _af_new(list(range(degree))) if all(g == identity for g in other.generators): return other Z = PermutationGroup(other.generators[:]) base, strong_gens = Z.schreier_sims_incremental() strong_gens_distr = _distribute_gens_by_base(base, strong_gens) basic_orbits, basic_transversals = \ _orbits_transversals_from_bsgs(base, strong_gens_distr) self._random_pr_init(r=10, n=20) _loop = True while _loop: Z._random_pr_init(r=10, n=10) for i in range(k): g = self.random_pr() h = Z.random_pr() conj = h^g res = _strip(conj, base, basic_orbits, basic_transversals) if res[0] != identity or res[1] != len(base) + 1: gens = Z.generators gens.append(conj) Z = PermutationGroup(gens) strong_gens.append(conj) temp_base, temp_strong_gens = \ Z.schreier_sims_incremental(base, strong_gens) base, strong_gens = temp_base, temp_strong_gens strong_gens_distr = \ _distribute_gens_by_base(base, strong_gens) basic_orbits, basic_transversals = \ _orbits_transversals_from_bsgs(base, strong_gens_distr) _loop = False for g in self.generators: for h in Z.generators: conj = h^g res = _strip(conj, base, basic_orbits, basic_transversals) if res[0] != identity or res[1] != len(base) + 1: _loop = True break if _loop: break return Z elif hasattr(other, '__getitem__'): return self.normal_closure(PermutationGroup(other)) elif hasattr(other, 'array_form'): return self.normal_closure(PermutationGroup([other])) def orbit(self, alpha, action='tuples'): r"""Compute the orbit of alpha `\{g(\alpha) \| g \in G\}` as a set. The time complexity of the algorithm used here is `O(\|Orb\|r)` where `\|Orb\|` is the size of the orbit and ``r`` is the number of generators of the group. For a more detailed analysis, see [1], p.78, [2], pp. 19-21. Here alpha can be a single point, or a list of points. If alpha is a single point, the ordinary orbit is computed. if alpha is a list of points, there are three available options: 'union' - computes the union of the orbits of the points in the list 'tuples' - computes the orbit of the list interpreted as an ordered tuple under the group action ( i.e., g((1,2,3)) = (g(1), g(2), g(3)) ) 'sets' - computes the orbit of the list interpreted as a sets Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([1, 2, 0, 4, 5, 6, 3]) >>> G = PermutationGroup([a]) >>> G.orbit(0) {0, 1, 2} >>> G.orbit([0, 4], 'union') {0, 1, 2, 3, 4, 5, 6} See Also ======== orbit_transversal """ return _orbit(self.degree, self.generators, alpha, action) def orbit_rep(self, alpha, beta, schreier_vector=None): """Return a group element which sends ``alpha`` to ``beta``. If ``beta`` is not in the orbit of ``alpha``, the function returns ``False``. This implementation makes use of the schreier vector. For a proof of correctness, see [1], p.80 Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import AlternatingGroup >>> G = AlternatingGroup(5) >>> G.orbit_rep(0, 4) (0 4 1 2 3) See Also ======== schreier_vector """ if schreier_vector is None: schreier_vector = self.schreier_vector(alpha) if schreier_vector[beta] is None: return False k = schreier_vector[beta] gens = [x._array_form for x in self.generators] a = [] while k != -1: a.append(gens[k]) beta = gens[k].index(beta) # beta = (~gens[k])(beta) k = schreier_vector[beta] if a: return _af_new(_af_rmuln(a)) else: return _af_new(list(range(self._degree))) def orbit_transversal(self, alpha, pairs=False): r"""Computes a transversal for the orbit of ``alpha`` as a set. For a permutation group `G`, a transversal for the orbit `Orb = \{g(\alpha) \| g \in G\}` is a set `\{g_\beta \| g_\beta(\alpha) = \beta\}` for `\beta \in Orb`. Note that there may be more than one possible transversal. If ``pairs`` is set to ``True``, it returns the list of pairs `(\beta, g_\beta)`. For a proof of correctness, see [1], p.79 Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> G = DihedralGroup(6) >>> G.orbit_transversal(0) [(5), (0 1 2 3 4 5), (0 5)(1 4)(2 3), (0 2 4)(1 3 5), (5)(0 4)(1 3), (0 3)(1 4)(2 5)] See Also ======== orbit """ return _orbit_transversal(self._degree, self.generators, alpha, pairs) def orbits(self, rep=False): """Return the orbits of ``self``, ordered according to lowest element in each orbit. Examples ======== >>> from sympy.combinatorics.permutations import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation(1, 5)(2, 3)(4, 0, 6) >>> b = Permutation(1, 5)(3, 4)(2, 6, 0) >>> G = PermutationGroup([a, b]) >>> G.orbits() [{0, 2, 3, 4, 6}, {1, 5}] """ return _orbits(self._degree, self._generators) def order(self): """Return the order of the group: the number of permutations that can be generated from elements of the group. The number of permutations comprising the group is given by ``len(group)``; the length of each permutation in the group is given by ``group.size``. Examples ======== >>> from sympy.combinatorics.permutations import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([1, 0, 2]) >>> G = PermutationGroup([a]) >>> G.degree 3 >>> len(G) 1 >>> G.order() 2 >>> list(G.generate()) [(2), (2)(0 1)] >>> a = Permutation([0, 2, 1]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G.order() 6 See Also ======== degree """ if self._order is not None: return self._order if self._is_sym: n = self._degree self._order = factorial(n) return self._order if self._is_alt: n = self._degree self._order = factorial(n)/2 return self._order basic_transversals = self.basic_transversals m = 1 for x in basic_transversals: m = len(x) self._order = m return m def index(self, H): """ Returns the index of a permutation group. Examples ======== >>> from sympy.combinatorics.permutations import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation(1,2,3) >>> b =Permutation(3) >>> G = PermutationGroup([a]) >>> H = PermutationGroup([b]) >>> G.index(H) 3 """ if H.is_subgroup(self): return self.order()//H.order() @property def is_cyclic(self): """ Return ``True`` if the group is Cyclic. Examples ======== >>> from sympy.combinatorics.named_groups import AbelianGroup >>> G = AbelianGroup(3, 4) >>> G.is_cyclic True >>> G = AbelianGroup(4, 4) >>> G.is_cyclic False """ if self._is_cyclic is not None: return self._is_cyclic self._is_cyclic = True if len(self.generators) == 1: return True if not self._is_abelian: self._is_cyclic = False return False for p in primefactors(self.order()): pgens = [] for g in self.generators: pgens.append(g*p) if self.index(self.subgroup(pgens)) != p: self._is_cyclic = False return False else: continue return True def pointwise_stabilizer(self, points, incremental=True): r"""Return the pointwise stabilizer for a set of points. For a permutation group `G` and a set of points `\{p_1, p_2,\ldots, p_k\}`, the pointwise stabilizer of `p_1, p_2, \ldots, p_k` is defined as `G_{p_1,\ldots, p_k} = \{g\in G \| g(p_i) = p_i \forall i\in\{1, 2,\ldots,k\}\}` ([1],p20). It is a subgroup of `G`. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> S = SymmetricGroup(7) >>> Stab = S.pointwise_stabilizer([2, 3, 5]) >>> Stab.is_subgroup(S.stabilizer(2).stabilizer(3).stabilizer(5)) True See Also ======== stabilizer, schreier_sims_incremental Notes ===== When incremental == True, rather than the obvious implementation using successive calls to ``.stabilizer()``, this uses the incremental Schreier-Sims algorithm to obtain a base with starting segment - the given points. """ if incremental: base, strong_gens = self.schreier_sims_incremental(base=points) stab_gens = [] degree = self.degree for gen in strong_gens: if [gen(point) for point in points] == points: stab_gens.append(gen) if not stab_gens: stab_gens = _af_new(list(range(degree))) return PermutationGroup(stab_gens) else: gens = self._generators degree = self.degree for x in points: gens = _stabilizer(degree, gens, x) return PermutationGroup(gens) def make_perm(self, n, seed=None): """ Multiply ``n`` randomly selected permutations from pgroup together, starting with the identity permutation. If ``n`` is a list of integers, those integers will be used to select the permutations and they will be applied in L to R order: make_perm((A, B, C)) will give CBA(I) where I is the identity permutation. ``seed`` is used to set the seed for the random selection of permutations from pgroup. If this is a list of integers, the corresponding permutations from pgroup will be selected in the order give. This is mainly used for testing purposes. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a, b = [Permutation([1, 0, 3, 2]), Permutation([1, 3, 0, 2])] >>> G = PermutationGroup([a, b]) >>> G.make_perm(1, [0]) (0 1)(2 3) >>> G.make_perm(3, [0, 1, 0]) (0 2 3 1) >>> G.make_perm([0, 1, 0]) (0 2 3 1) See Also ======== random """ if is_sequence(n): if seed is not None: raise ValueError('If n is a sequence, seed should be None') n, seed = len(n), n else: try: n = int(n) except TypeError: raise ValueError('n must be an integer or a sequence.') randrange = _randrange(seed) # start with the identity permutation result = Permutation(list(range(self.degree))) m = len(self) for i in range(n): p = self[randrange(m)] result = rmul(result, p) return result def random(self, af=False): """Return a random group element """ rank = randrange(self.order()) return self.coset_unrank(rank, af) def random_pr(self, gen_count=11, iterations=50, _random_prec=None): """Return a random group element using product replacement. For the details of the product replacement algorithm, see ``_random_pr_init`` In ``random_pr`` the actual 'product replacement' is performed. Notice that if the attribute ``_random_gens`` is empty, it needs to be initialized by ``_random_pr_init``. See Also ======== _random_pr_init """ if self._random_gens == []: self._random_pr_init(gen_count, iterations) random_gens = self._random_gens r = len(random_gens) - 1 # handle randomized input for testing purposes if _random_prec is None: s = randrange(r) t = randrange(r - 1) if t == s: t = r - 1 x = choice([1, 2]) e = choice([-1, 1]) else: s = _random_prec['s'] t = _random_prec['t'] if t == s: t = r - 1 x = _random_prec['x'] e = _random_prec['e'] if x == 1: random_gens[s] = _af_rmul(random_gens[s], _af_pow(random_gens[t], e)) random_gens[r] = _af_rmul(random_gens[r], random_gens[s]) else: random_gens[s] = _af_rmul(_af_pow(random_gens[t], e), random_gens[s]) random_gens[r] = _af_rmul(random_gens[s], random_gens[r]) return _af_new(random_gens[r]) def random_stab(self, alpha, schreier_vector=None, _random_prec=None): """Random element from the stabilizer of ``alpha``. The schreier vector for ``alpha`` is an optional argument used for speeding up repeated calls. The algorithm is described in [1], p.81 See Also ======== random_pr, orbit_rep """ if schreier_vector is None: schreier_vector = self.schreier_vector(alpha) if _random_prec is None: rand = self.random_pr() else: rand = _random_prec['rand'] beta = rand(alpha) h = self.orbit_rep(alpha, beta, schreier_vector) return rmul(~h, rand) def schreier_sims(self): """Schreier-Sims algorithm. It computes the generators of the chain of stabilizers `G > G_{b_1} > .. > G_{b1,..,b_r} > 1` in which `G_{b_1,..,b_i}` stabilizes `b_1,..,b_i`, and the corresponding ``s`` cosets. An element of the group can be written as the product `h_1..h_s`. We use the incremental Schreier-Sims algorithm. Examples ======== >>> from sympy.combinatorics.permutations import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G.schreier_sims() >>> G.basic_transversals [{0: (2)(0 1), 1: (2), 2: (1 2)}, {0: (2), 2: (0 2)}] """ if self._transversals: return self._schreier_sims() return def _schreier_sims(self, base=None): schreier = self.schreier_sims_incremental(base=base, slp_dict=True) base, strong_gens = schreier[:2] self._base = base self._strong_gens = strong_gens self._strong_gens_slp = schreier[2] if not base: self._transversals = [] self._basic_orbits = [] return strong_gens_distr = _distribute_gens_by_base(base, strong_gens) basic_orbits, transversals, slps = _orbits_transversals_from_bsgs(base,\ strong_gens_distr, slp=True) # rewrite the indices stored in slps in terms of strong_gens for i, slp in enumerate(slps): gens = strong_gens_distr[i] for k in slp: slp[k] = [strong_gens.index(gens[s]) for s in slp[k]] self._transversals = transversals self._basic_orbits = [sorted(x) for x in basic_orbits] self._transversal_slp = slps def schreier_sims_incremental(self, base=None, gens=None, slp_dict=False): """Extend a sequence of points and generating set to a base and strong generating set. Parameters ========== base The sequence of points to be extended to a base. Optional parameter with default value ``[]``. gens The generating set to be extended to a strong generating set relative to the base obtained. Optional parameter with default value ``self.generators``. slp_dict If `True`, return a dictionary `{g: gens}` for each strong generator `g` where `gens` is a list of strong generators coming before `g` in `strong_gens`, such that the product of the elements of `gens` is equal to `g`. Returns ======= (base, strong_gens) ``base`` is the base obtained, and ``strong_gens`` is the strong generating set relative to it. The original parameters ``base``, ``gens`` remain unchanged. Examples ======== >>> from sympy.combinatorics.named_groups import AlternatingGroup >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.testutil import _verify_bsgs >>> A = AlternatingGroup(7) >>> base = [2, 3] >>> seq = [2, 3] >>> base, strong_gens = A.schreier_sims_incremental(base=seq) >>> _verify_bsgs(A, base, strong_gens) True >>> base[:2] [2, 3] Notes ===== This version of the Schreier-Sims algorithm runs in polynomial time. There are certain assumptions in the implementation - if the trivial group is provided, ``base`` and ``gens`` are returned immediately, as any sequence of points is a base for the trivial group. If the identity is present in the generators ``gens``, it is removed as it is a redundant generator. The implementation is described in [1], pp. 90-93. See Also ======== schreier_sims, schreier_sims_random """ if base is None: base = [] if gens is None: gens = self.generators[:] degree = self.degree id_af = list(range(degree)) # handle the trivial group if len(gens) == 1 and gens[0].is_Identity: if slp_dict: return base, gens, {gens[0]: [gens[0]]} return base, gens # prevent side effects _base, _gens = base[:], gens[:] # remove the identity as a generator _gens = [x for x in _gens if not x.is_Identity] # make sure no generator fixes all base points for gen in _gens: if all(x == gen._array_form[x] for x in _base): for new in id_af: if gen._array_form[new] != new: break else: assert None # can this ever happen? _base.append(new) # distribute generators according to basic stabilizers strong_gens_distr = _distribute_gens_by_base(_base, _gens) strong_gens_slp = [] # initialize the basic stabilizers, basic orbits and basic transversals orbs = {} transversals = {} slps = {} base_len = len(_base) for i in range(base_len): transversals[i], slps[i] = _orbit_transversal(degree, strong_gens_distr[i], _base[i], pairs=True, af=True, slp=True) transversals[i] = dict(transversals[i]) orbs[i] = list(transversals[i].keys()) # main loop: amend the stabilizer chain until we have generators # for all stabilizers i = base_len - 1 while i >= 0: # this flag is used to continue with the main loop from inside # a nested loop continue_i = False # test the generators for being a strong generating set db = {} for beta, u_beta in list(transversals[i].items()): for j, gen in enumerate(strong_gens_distr[i]): gb = gen._array_form[beta] u1 = transversals[i][gb] g1 = _af_rmul(gen._array_form, u_beta) slp = [(i, g) for g in slps[i][beta]] slp = [(i, j)] + slp if g1 != u1: # test if the schreier generator is in the i+1-th # would-be basic stabilizer y = True try: u1_inv = db[gb] except KeyError: u1_inv = db[gb] = _af_invert(u1) schreier_gen = _af_rmul(u1_inv, g1) u1_inv_slp = slps[i][gb][:] u1_inv_slp.reverse() u1_inv_slp = [(i, (g,)) for g in u1_inv_slp] slp = u1_inv_slp + slp h, j, slp = _strip_af(schreier_gen, _base, orbs, transversals, i, slp=slp, slps=slps) if j <= base_len: # new strong generator h at level j y = False elif h: # h fixes all base points y = False moved = 0 while h[moved] == moved: moved += 1 _base.append(moved) base_len += 1 strong_gens_distr.append([]) if y is False: # if a new strong generator is found, update the # data structures and start over h = _af_new(h) strong_gens_slp.append((h, slp)) for l in range(i + 1, j): strong_gens_distr[l].append(h) transversals[l], slps[l] =\ _orbit_transversal(degree, strong_gens_distr[l], _base[l], pairs=True, af=True, slp=True) transversals[l] = dict(transversals[l]) orbs[l] = list(transversals[l].keys()) i = j - 1 # continue main loop using the flag continue_i = True if continue_i is True: break if continue_i is True: break if continue_i is True: continue i -= 1 strong_gens = _gens[:] if slp_dict: # create the list of the strong generators strong_gens and # rewrite the indices of strong_gens_slp in terms of the # elements of strong_gens for k, slp in strong_gens_slp: strong_gens.append(k) for i in range(len(slp)): s = slp[i] if isinstance(s[1], tuple): slp[i] = strong_gens_distr[s[0]][s[1][0]]-1 else: slp[i] = strong_gens_distr[s[0]][s[1]] strong_gens_slp = dict(strong_gens_slp) # add the original generators for g in _gens: strong_gens_slp[g] = [g] return (_base, strong_gens, strong_gens_slp) strong_gens.extend([k for k, _ in strong_gens_slp]) return _base, strong_gens def schreier_sims_random(self, base=None, gens=None, consec_succ=10, _random_prec=None): r"""Randomized Schreier-Sims algorithm. The randomized Schreier-Sims algorithm takes the sequence ``base`` and the generating set ``gens``, and extends ``base`` to a base, and ``gens`` to a strong generating set relative to that base with probability of a wrong answer at most `2^{-consec\_succ}`, provided the random generators are sufficiently random. Parameters ========== base The sequence to be extended to a base. gens The generating set to be extended to a strong generating set. consec_succ The parameter defining the probability of a wrong answer. _random_prec An internal parameter used for testing purposes. Returns ======= (base, strong_gens) ``base`` is the base and ``strong_gens`` is the strong generating set relative to it. Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.testutil import _verify_bsgs >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> S = SymmetricGroup(5) >>> base, strong_gens = S.schreier_sims_random(consec_succ=5) >>> _verify_bsgs(S, base, strong_gens) #doctest: +SKIP True Notes ===== The algorithm is described in detail in [1], pp. 97-98. It extends the orbits ``orbs`` and the permutation groups ``stabs`` to basic orbits and basic stabilizers for the base and strong generating set produced in the end. The idea of the extension process is to "sift" random group elements through the stabilizer chain and amend the stabilizers/orbits along the way when a sift is not successful. The helper function ``_strip`` is used to attempt to decompose a random group element according to the current state of the stabilizer chain and report whether the element was fully decomposed (successful sift) or not (unsuccessful sift). In the latter case, the level at which the sift failed is reported and used to amend ``stabs``, ``base``, ``gens`` and ``orbs`` accordingly. The halting condition is for ``consec_succ`` consecutive successful sifts to pass. This makes sure that the current ``base`` and ``gens`` form a BSGS with probability at least `1 - 1/\text{consec\_succ}`. See Also ======== schreier_sims """ if base is None: base = [] if gens is None: gens = self.generators base_len = len(base) n = self.degree # make sure no generator fixes all base points for gen in gens: if all(gen(x) == x for x in base): new = 0 while gen._array_form[new] == new: new += 1 base.append(new) base_len += 1 # distribute generators according to basic stabilizers strong_gens_distr = _distribute_gens_by_base(base, gens) # initialize the basic stabilizers, basic transversals and basic orbits transversals = {} orbs = {} for i in range(base_len): transversals[i] = dict(_orbit_transversal(n, strong_gens_distr[i], base[i], pairs=True)) orbs[i] = list(transversals[i].keys()) # initialize the number of consecutive elements sifted c = 0 # start sifting random elements while the number of consecutive sifts # is less than consec_succ while c < consec_succ: if _random_prec is None: g = self.random_pr() else: g = _random_prec['g'].pop() h, j = _strip(g, base, orbs, transversals) y = True # determine whether a new base point is needed if j <= base_len: y = False elif not h.is_Identity: y = False moved = 0 while h(moved) == moved: moved += 1 base.append(moved) base_len += 1 strong_gens_distr.append([]) # if the element doesn't sift, amend the strong generators and # associated stabilizers and orbits if y is False: for l in range(1, j): strong_gens_distr[l].append(h) transversals[l] = dict(_orbit_transversal(n, strong_gens_distr[l], base[l], pairs=True)) orbs[l] = list(transversals[l].keys()) c = 0 else: c += 1 # build the strong generating set strong_gens = strong_gens_distr[0][:] for gen in strong_gens_distr[1]: if gen not in strong_gens: strong_gens.append(gen) return base, strong_gens def schreier_vector(self, alpha): """Computes the schreier vector for ``alpha``. The Schreier vector efficiently stores information about the orbit of ``alpha``. It can later be used to quickly obtain elements of the group that send ``alpha`` to a particular element in the orbit. Notice that the Schreier vector depends on the order in which the group generators are listed. For a definition, see [3]. Since list indices start from zero, we adopt the convention to use "None" instead of 0 to signify that an element doesn't belong to the orbit. For the algorithm and its correctness, see [2], pp.78-80. Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.permutations import Permutation >>> a = Permutation([2, 4, 6, 3, 1, 5, 0]) >>> b = Permutation([0, 1, 3, 5, 4, 6, 2]) >>> G = PermutationGroup([a, b]) >>> G.schreier_vector(0) [-1, None, 0, 1, None, 1, 0] See Also ======== orbit """ n = self.degree v = [None]n v[alpha] = -1 orb = [alpha] used = [False]n used[alpha] = True gens = self.generators r = len(gens) for b in orb: for i in range(r): temp = gens[i]._array_form[b] if used[temp] is False: orb.append(temp) used[temp] = True v[temp] = i return v def stabilizer(self, alpha): r"""Return the stabilizer subgroup of ``alpha``. The stabilizer of `\alpha` is the group `G_\alpha = \{g \in G \| g(\alpha) = \alpha\}`. For a proof of correctness, see [1], p.79. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> G = DihedralGroup(6) >>> G.stabilizer(5) PermutationGroup([ (5)(0 4)(1 3)]) See Also ======== orbit """ return PermGroup(_stabilizer(self._degree, self._generators, alpha)) @property def strong_gens(self): r"""Return a strong generating set from the Schreier-Sims algorithm. A generating set `S = \{g_1, g_2, ..., g_t\}` for a permutation group `G` is a strong generating set relative to the sequence of points (referred to as a "base") `(b_1, b_2, ..., b_k)` if, for `1 \leq i \leq k` we have that the intersection of the pointwise stabilizer `G^{(i+1)} := G_{b_1, b_2, ..., b_i}` with `S` generates the pointwise stabilizer `G^{(i+1)}`. The concepts of a base and strong generating set and their applications are discussed in depth in [1], pp. 87-89 and [2], pp. 55-57. Examples ======== >>> from sympy.combinatorics.named_groups import DihedralGroup >>> D = DihedralGroup(4) >>> D.strong_gens [(0 1 2 3), (0 3)(1 2), (1 3)] >>> D.base [0, 1] See Also ======== base, basic_transversals, basic_orbits, basic_stabilizers """ if self._strong_gens == []: self.schreier_sims() return self._strong_gens def subgroup(self, gens): """ Return the subgroup generated by `gens` which is a list of elements of the group """ if not all([g in self for g in gens]): raise ValueError("The group doesn't contain the supplied generators") G = PermutationGroup(gens) return G def subgroup_search(self, prop, base=None, strong_gens=None, tests=None, init_subgroup=None): """Find the subgroup of all elements satisfying the property ``prop``. This is done by a depth-first search with respect to base images that uses several tests to prune the search tree. Parameters ========== prop The property to be used. Has to be callable on group elements and always return ``True`` or ``False``. It is assumed that all group elements satisfying ``prop`` indeed form a subgroup. base A base for the supergroup. strong_gens A strong generating set for the supergroup. tests A list of callables of length equal to the length of ``base``. These are used to rule out group elements by partial base images, so that ``tests[l](g)`` returns False if the element ``g`` is known not to satisfy prop base on where g sends the first ``l + 1`` base points. init_subgroup if a subgroup of the sought group is known in advance, it can be passed to the function as this parameter. Returns ======= res The subgroup of all elements satisfying ``prop``. The generating set for this group is guaranteed to be a strong generating set relative to the base ``base``. Examples ======== >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... AlternatingGroup) >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.testutil import _verify_bsgs >>> S = SymmetricGroup(7) >>> prop_even = lambda x: x.is_even >>> base, strong_gens = S.schreier_sims_incremental() >>> G = S.subgroup_search(prop_even, base=base, strong_gens=strong_gens) >>> G.is_subgroup(AlternatingGroup(7)) True >>> _verify_bsgs(G, base, G.generators) True Notes ===== This function is extremely lengthy and complicated and will require some careful attention. The implementation is described in [1], pp. 114-117, and the comments for the code here follow the lines of the pseudocode in the book for clarity. The complexity is exponential in general, since the search process by itself visits all members of the supergroup. However, there are a lot of tests which are used to prune the search tree, and users can define their own tests via the ``tests`` parameter, so in practice, and for some computations, it's not terrible. A crucial part in the procedure is the frequent base change performed (this is line 11 in the pseudocode) in order to obtain a new basic stabilizer. The book mentiones that this can be done by using ``.baseswap(...)``, however the current implementation uses a more straightforward way to find the next basic stabilizer - calling the function ``.stabilizer(...)`` on the previous basic stabilizer. """ # initialize BSGS and basic group properties def get_reps(orbits): # get the minimal element in the base ordering return [min(orbit, key = lambda x: base_ordering[x]) \ for orbit in orbits] def update_nu(l): temp_index = len(basic_orbits[l]) + 1 -\ len(res_basic_orbits_init_base[l]) # this corresponds to the element larger than all points if temp_index >= len(sorted_orbits[l]): nu[l] = base_ordering[degree] else: nu[l] = sorted_orbits[l][temp_index] if base is None: base, strong_gens = self.schreier_sims_incremental() base_len = len(base) degree = self.degree identity = _af_new(list(range(degree))) base_ordering = _base_ordering(base, degree) # add an element larger than all points base_ordering.append(degree) # add an element smaller than all points base_ordering.append(-1) # compute BSGS-related structures strong_gens_distr = _distribute_gens_by_base(base, strong_gens) basic_orbits, transversals = _orbits_transversals_from_bsgs(base, strong_gens_distr) # handle subgroup initialization and tests if init_subgroup is None: init_subgroup = PermutationGroup([identity]) if tests is None: trivial_test = lambda x: True tests = [] for i in range(base_len): tests.append(trivial_test) # line 1: more initializations. res = init_subgroup f = base_len - 1 l = base_len - 1 # line 2: set the base for K to the base for G res_base = base[:] # line 3: compute BSGS and related structures for K res_base, res_strong_gens = res.schreier_sims_incremental( base=res_base) res_strong_gens_distr = _distribute_gens_by_base(res_base, res_strong_gens) res_generators = res.generators res_basic_orbits_init_base = \ [_orbit(degree, res_strong_gens_distr[i], res_base[i])\ for i in range(base_len)] # initialize orbit representatives orbit_reps = [None]base_len # line 4: orbit representatives for f-th basic stabilizer of K orbits = _orbits(degree, res_strong_gens_distr[f]) orbit_reps[f] = get_reps(orbits) # line 5: remove the base point from the representatives to avoid # getting the identity element as a generator for K orbit_reps[f].remove(base[f]) # line 6: more initializations c = [0]base_len u = [identity]base_len sorted_orbits = [None]base_len for i in range(base_len): sorted_orbits[i] = basic_orbits[i][:] sorted_orbits[i].sort(key=lambda point: base_ordering[point]) # line 7: initializations mu = [None]base_len nu = [None]base_len # this corresponds to the element smaller than all points mu[l] = degree + 1 update_nu(l) # initialize computed words computed_words = [identity]base_len # line 8: main loop while True: # apply all the tests while l < base_len - 1 and \ computed_words[l](base[l]) in orbit_reps[l] and \ base_ordering[mu[l]] < \ base_ordering[computed_words[l](base[l])] < \ base_ordering[nu[l]] and \ tests[l](computed_words): # line 11: change the (partial) base of K new_point = computed_words[l](base[l]) res_base[l] = new_point new_stab_gens = _stabilizer(degree, res_strong_gens_distr[l], new_point) res_strong_gens_distr[l + 1] = new_stab_gens # line 12: calculate minimal orbit representatives for the # l+1-th basic stabilizer orbits = _orbits(degree, new_stab_gens) orbit_reps[l + 1] = get_reps(orbits) # line 13: amend sorted orbits l += 1 temp_orbit = [computed_words[l - 1](point) for point in basic_orbits[l]] temp_orbit.sort(key=lambda point: base_ordering[point]) sorted_orbits[l] = temp_orbit # lines 14 and 15: update variables used minimality tests new_mu = degree + 1 for i in range(l): if base[l] in res_basic_orbits_init_base[i]: candidate = computed_words[i](base[i]) if base_ordering[candidate] > base_ordering[new_mu]: new_mu = candidate mu[l] = new_mu update_nu(l) # line 16: determine the new transversal element c[l] = 0 temp_point = sorted_orbits[l][c[l]] gamma = computed_words[l - 1]._array_form.index(temp_point) u[l] = transversals[l][gamma] # update computed words computed_words[l] = rmul(computed_words[l - 1], u[l]) # lines 17 & 18: apply the tests to the group element found g = computed_words[l] temp_point = g(base[l]) if l == base_len - 1 and \ base_ordering[mu[l]] < \ base_ordering[temp_point] < base_ordering[nu[l]] and \ temp_point in orbit_reps[l] and \ tests[l](computed_words) and \ prop(g): # line 19: reset the base of K res_generators.append(g) res_base = base[:] # line 20: recalculate basic orbits (and transversals) res_strong_gens.append(g) res_strong_gens_distr = _distribute_gens_by_base(res_base, res_strong_gens) res_basic_orbits_init_base = \ [_orbit(degree, res_strong_gens_distr[i], res_base[i]) \ for i in range(base_len)] # line 21: recalculate orbit representatives # line 22: reset the search depth orbit_reps[f] = get_reps(orbits) l = f # line 23: go up the tree until in the first branch not fully # searched while l >= 0 and c[l] == len(basic_orbits[l]) - 1: l = l - 1 # line 24: if the entire tree is traversed, return K if l == -1: return PermutationGroup(res_generators) # lines 25-27: update orbit representatives if l < f: # line 26 f = l c[l] = 0 # line 27 temp_orbits = _orbits(degree, res_strong_gens_distr[f]) orbit_reps[f] = get_reps(temp_orbits) # line 28: update variables used for minimality testing mu[l] = degree + 1 temp_index = len(basic_orbits[l]) + 1 - \ len(res_basic_orbits_init_base[l]) if temp_index >= len(sorted_orbits[l]): nu[l] = base_ordering[degree] else: nu[l] = sorted_orbits[l][temp_index] # line 29: set the next element from the current branch and update # accordingly c[l] += 1 if l == 0: gamma = sorted_orbits[l][c[l]] else: gamma = computed_words[l - 1]._array_form.index(sorted_orbits[l][c[l]]) u[l] = transversals[l][gamma] if l == 0: computed_words[l] = u[l] else: computed_words[l] = rmul(computed_words[l - 1], u[l]) @property def transitivity_degree(self): r"""Compute the degree of transitivity of the group. A permutation group `G` acting on `\Omega = \{0, 1, ..., n-1\}` is ``k``-fold transitive, if, for any k points `(a_1, a_2, ..., a_k)\in\Omega` and any k points `(b_1, b_2, ..., b_k)\in\Omega` there exists `g\in G` such that `g(a_1)=b_1, g(a_2)=b_2, ..., g(a_k)=b_k` The degree of transitivity of `G` is the maximum ``k`` such that `G` is ``k``-fold transitive. ([8]) Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.permutations import Permutation >>> a = Permutation([1, 2, 0]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G.transitivity_degree 3 See Also ======== is_transitive, orbit """ if self._transitivity_degree is None: n = self.degree G = self # if G is k-transitive, a tuple (a_0,..,a_k) # can be brought to (b_0,...,b_(k-1), b_k) # where b_0,...,b_(k-1) are fixed points; # consider the group G_k which stabilizes b_0,...,b_(k-1) # if G_k is transitive on the subset excluding b_0,...,b_(k-1) # then G is (k+1)-transitive for i in range(n): orb = G.orbit((i)) if len(orb) != n - i: self._transitivity_degree = i return i G = G.stabilizer(i) self._transitivity_degree = n return n else: return self._transitivity_degree def _p_elements_group(G, p): ''' For an abelian p-group G return the subgroup consisting of all elements of order p (and the identity) ''' gens = G.generators[:] gens = sorted(gens, key=lambda x: x.order(), reverse=True) gens_p = [g(g.order()/p) for g in gens] gens_r = [] for i in range(len(gens)): x = gens[i] x_order = x.order() # x_p has order p x_p = x(x_order/p) if i > 0: P = PermutationGroup(gens_p[:i]) else: P = PermutationGroup(G.identity) if x(x_order/p) not in P: gens_r.append(x(x_order/p)) else: # replace x by an element of order (x.order()/p) # so that gens still generates G g = P.generator_product(x_p, original=True) for s in g: x = xs-1 x_order = x_order/p # insert x to gens so that the sorting is preserved del gens[i] del gens_p[i] j = i - 1 while j < len(gens) and gens[j].order() >= x_order: j += 1 gens = gens[:j] + [x] + gens[j:] gens_p = gens_p[:j] + [x] + gens_p[j:] return PermutationGroup(gens_r) def _sylow_alt_sym(self, p): ''' Return a p-Sylow subgroup of a symmetric or an alternating group. The algorithm for this is hinted at in [1], Chapter 4, Exercise 4. For Sym(n) with n = p^i, the idea is as follows. Partition the interval [0..n-1] into p equal parts, each of length p^(i-1): [0..p^(i-1)-1], [p^(i-1)..2p^(i-1)-1]...[(p-1)p^(i-1)..p^i-1]. Find a p-Sylow subgroup of Sym(p^(i-1)) (treated as a subgroup of `self`) acting on each of the parts. Call the subgroups P_1, P_2...P_p. The generators for the subgroups P_2...P_p can be obtained from those of P_1 by applying a "shifting" permutation to them, that is, a permutation mapping [0..p^(i-1)-1] to the second part (the other parts are obtained by using the shift multiple times). The union of this permutation and the generators of P_1 is a p-Sylow subgroup of `self`. For n not equal to a power of p, partition [0..n-1] in accordance with how n would be written in base p. E.g. for p=2 and n=11, 11 = 2^3 + 2^2 + 1 so the partition is [[0..7], [8..9], {10}]. To generate a p-Sylow subgroup, take the union of the generators for each of the parts. For the above example, {(0 1), (0 2)(1 3), (0 4), (1 5)(2 7)} from the first part, {(8 9)} from the second part and nothing from the third. This gives 4 generators in total, and the subgroup they generate is p-Sylow. Alternating groups are treated the same except when p=2. In this case, (0 1)(s s+1) should be added for an appropriate s (the start of a part) for each part in the partitions. See Also ======== sylow_subgroup, is_alt_sym ''' n = self.degree gens = [] identity = Permutation(n-1) # the case of 2-sylow subgroups of alternating groups # needs special treatment alt = p == 2 and all(g.is_even for g in self.generators) # find the presentation of n in base p coeffs = [] m = n while m > 0: coeffs.append(m % p) m = m // p power = len(coeffs)-1 # for a symmetric group, gens[:i] is the generating # set for a p-Sylow subgroup on [0..p(i-1)-1]. For # alternating groups, the same is given by gens[:2(i-1)] for i in range(1, power+1): if i == 1 and alt: # (0 1) shouldn't be added for alternating groups continue gen = Permutation([(j + p(i-1)) % pi for j in range(p*i)]) gens.append(identitygen) if alt: gen = Permutation(0, 1)genPermutation(0, 1)gen gens.append(gen) # the first point in the current part (see the algorithm # description in the docstring) start = 0 while power > 0: a = coeffs[power] # make the permutation shifting the start of the first # part ([0..p^i-1] for some i) to the current one for s in range(a): shift = Permutation() if start > 0: for i in range(ppower): shift = shift(i, start + i) if alt: gen = Permutation(0, 1)shiftPermutation(0, 1)shift gens.append(gen) j = 2(power - 1) else: j = power for i, gen in enumerate(gens[:j]): if alt and i % 2 == 1: continue # shift the generator to the start of the # partition part gen = shiftgenshift gens.append(gen) start += ppower power = power-1 return gens def sylow_subgroup(self, p): ''' Return a p-Sylow subgroup of the group. The algorithm is described in [1], Chapter 4, Section 7 Examples ======== >>> from sympy.combinatorics.named_groups import DihedralGroup >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.named_groups import AlternatingGroup >>> D = DihedralGroup(6) >>> S = D.sylow_subgroup(2) >>> S.order() 4 >>> G = SymmetricGroup(6) >>> S = G.sylow_subgroup(5) >>> S.order() 5 >>> G1 = AlternatingGroup(3) >>> G2 = AlternatingGroup(5) >>> G3 = AlternatingGroup(9) >>> S1 = G1.sylow_subgroup(3) >>> S2 = G2.sylow_subgroup(3) >>> S3 = G3.sylow_subgroup(3) >>> len1 = len(S1.lower_central_series()) >>> len2 = len(S2.lower_central_series()) >>> len3 = len(S3.lower_central_series()) >>> len1 == len2 True >>> len1 < len3 True ''' from sympy.combinatorics.homomorphisms import ( orbit_homomorphism, block_homomorphism) from sympy.ntheory.primetest import isprime if not isprime(p): raise ValueError("p must be a prime") def is_p_group(G): # check if the order of G is a power of p # and return the power m = G.order() n = 0 while m % p == 0: m = m/p n += 1 if m == 1: return True, n return False, n def _sylow_reduce(mu, nu): # reduction based on two homomorphisms # mu and nu with trivially intersecting # kernels Q = mu.image().sylow_subgroup(p) Q = mu.invert_subgroup(Q) nu = nu.restrict_to(Q) R = nu.image().sylow_subgroup(p) return nu.invert_subgroup(R) order = self.order() if order % p != 0: return PermutationGroup([self.identity]) p_group, n = is_p_group(self) if p_group: return self if self.is_alt_sym(): return PermutationGroup(self._sylow_alt_sym(p)) # if there is a non-trivial orbit with size not divisible # by p, the sylow subgroup is contained in its stabilizer # (by orbit-stabilizer theorem) orbits = self.orbits() non_p_orbits = [o for o in orbits if len(o) % p != 0 and len(o) != 1] if non_p_orbits: G = self.stabilizer(list(non_p_orbits[0]).pop()) return G.sylow_subgroup(p) if not self.is_transitive(): # apply _sylow_reduce to orbit actions orbits = sorted(orbits, key = lambda x: len(x)) omega1 = orbits.pop() omega2 = orbits[0].union(orbits) mu = orbit_homomorphism(self, omega1) nu = orbit_homomorphism(self, omega2) return _sylow_reduce(mu, nu) blocks = self.minimal_blocks() if len(blocks) > 1: # apply _sylow_reduce to block system actions mu = block_homomorphism(self, blocks[0]) nu = block_homomorphism(self, blocks[1]) return _sylow_reduce(mu, nu) elif len(blocks) == 1: block = list(blocks)[0] if any(e != 0 for e in block): # self is imprimitive mu = block_homomorphism(self, block) if not is_p_group(mu.image())[0]: S = mu.image().sylow_subgroup(p) return mu.invert_subgroup(S).sylow_subgroup(p) # find an element of order p g = self.random() g_order = g.order() while g_order % p != 0 or g_order == 0: g = self.random() g_order = g.order() g = g(g_order // p) if order % p2 != 0: return PermutationGroup(g) C = self.centralizer(g) while C.order() % p*n != 0: S = C.sylow_subgroup(p) s_order = S.order() Z = S.center() P = Z._p_elements_group(p) h = P.random() C_h = self.centralizer(h) while C_h.order() % ps_order != 0: h = P.random() C_h = self.centralizer(h) C = C_h return C.sylow_subgroup(p) def _block_verify(H, L, alpha): delta = sorted(list(H.orbit(alpha))) H_gens = H.generators # p[i] will be the number of the block # delta[i] belongs to p = [-1]len(delta) blocks = [-1]len(delta) B = [[]] # future list of blocks u = [0]len(delta) # u[i] in L s.t. alpha^u[i] = B[0][i] t = L.orbit_transversal(alpha, pairs=True) for a, beta in t: B[0].append(a) i_a = delta.index(a) p[i_a] = 0 blocks[i_a] = alpha u[i_a] = beta rho = 0 m = 0 # number of blocks - 1 while rho <= m: beta = B[rho][0] for g in H_gens: d = beta^g i_d = delta.index(d) sigma = p[i_d] if sigma < 0: # define a new block m += 1 sigma = m u[i_d] = u[delta.index(beta)]g p[i_d] = sigma rep = d blocks[i_d] = rep newb = [rep] for gamma in B[rho][1:]: i_gamma = delta.index(gamma) d = gamma^g i_d = delta.index(d) if p[i_d] < 0: u[i_d] = u[i_gamma]g p[i_d] = sigma blocks[i_d] = rep newb.append(d) else: # B[rho] is not a block s = u[i_gamma]gu[i_d](-1) return False, s B.append(newb) else: for h in B[rho][1:]: if not h^g in B[sigma]: # B[rho] is not a block s = u[delta.index(beta)]gu[i_d](-1) return False, s rho += 1 return True, blocks def _verify(H, K, phi, z, alpha): ''' Return a list of relators `rels` in generators `gens_h` that are mapped to `H.generators` by `phi` so that given a finite presentation <gens_k \| rels_k> of `K` on a subset of `gens_h` <gens_h \| rels_k + rels> is a finite presentation of `H`. `H` should be generated by the union of `K.generators` and `z` (a single generator), and `H.stabilizer(alpha) == K`; `phi` is a canonical injection from a free group into a permutation group containing `H`. The algorithm is described in [1], Chapter 6. Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.homomorphisms import homomorphism >>> from sympy.combinatorics.free_groups import free_group >>> from sympy.combinatorics.fp_groups import FpGroup >>> H = PermutationGroup(Permutation(0, 2), Permutation (1, 5)) >>> K = PermutationGroup(Permutation(5)(0, 2)) >>> F = free_group("x_0 x_1")[0] >>> gens = F.generators >>> phi = homomorphism(F, H, F.generators, H.generators) >>> rels_k = [gens[0]2] # relators for presentation of K >>> z= Permutation(1, 5) >>> check, rels_h = H._verify(K, phi, z, 1) >>> check True >>> rels = rels_k + rels_h >>> G = FpGroup(F, rels) # presentation of H >>> G.order() == H.order() True See also ======== strong_presentation, presentation, stabilizer ''' orbit = H.orbit(alpha) beta = alpha^(z-1) K_beta = K.stabilizer(beta) # orbit representatives of K_beta gammas = [alpha, beta] orbits = list(set(tuple(K_beta.orbit(o)) for o in orbit)) orbit_reps = [orb[0] for orb in orbits] for rep in orbit_reps: if rep not in gammas: gammas.append(rep) # orbit transversal of K betas = [alpha, beta] transversal = {alpha: phi.invert(H.identity), beta: phi.invert(z-1)} for s, g in K.orbit_transversal(beta, pairs=True): if not s in transversal: transversal[s] = transversal[beta]phi.invert(g) union = K.orbit(alpha).union(K.orbit(beta)) while (len(union) < len(orbit)): for gamma in gammas: if gamma in union: r = gamma^z if r not in union: betas.append(r) transversal[r] = transversal[gamma]phi.invert(z) for s, g in K.orbit_transversal(r, pairs=True): if not s in transversal: transversal[s] = transversal[r]phi.invert(g) union = union.union(K.orbit(r)) break # compute relators rels = [] for b in betas: k_gens = K.stabilizer(b).generators for y in k_gens: new_rel = transversal[b] gens = K.generator_product(y, original=True) for g in gens[::-1]: new_rel = new_relphi.invert(g) new_rel = new_reltransversal[b]*-1 perm = phi(new_rel) try: gens = K.generator_product(perm, original=True) except ValueError: return False, perm for g in gens: new_rel = new_relphi.invert(g)*-1 if new_rel not in rels: rels.append(new_rel) for gamma in gammas: new_rel = transversal[gamma]phi.invert(z)transversal[gamma^z]-1 perm = phi(new_rel) try: gens = K.generator_product(perm, original=True) except ValueError: return False, perm for g in gens: new_rel = new_relphi.invert(g)-1 if new_rel not in rels: rels.append(new_rel) return True, rels def strong_presentation(G): ''' Return a strong finite presentation of `G`. The generators of the returned group are in the same order as the strong generators of `G`. The algorithm is based on Sims' Verify algorithm described in [1], Chapter 6. Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> P = DihedralGroup(4) >>> G = P.strong_presentation() >>> P.order() == G.order() True See Also ======== presentation, _verify ''' from sympy.combinatorics.fp_groups import (FpGroup, simplify_presentation) from sympy.combinatorics.free_groups import free_group from sympy.combinatorics.homomorphisms import (block_homomorphism, homomorphism, GroupHomomorphism) strong_gens = G.strong_gens[:] stabs = G.basic_stabilizers[:] base = G.base[:] # injection from a free group on len(strong_gens) # generators into G gen_syms = [('x_%d'%i) for i in range(len(strong_gens))] F = free_group(', '.join(gen_syms))[0] phi = homomorphism(F, G, F.generators, strong_gens) H = PermutationGroup(G.identity) while stabs: alpha = base.pop() K = H H = stabs.pop() new_gens = [g for g in H.generators if g not in K] if K.order() == 1: z = new_gens.pop() rels = [F.generators[-1]z.order()] intermediate_gens = [z] K = PermutationGroup(intermediate_gens) # add generators one at a time building up from K to H while new_gens: z = new_gens.pop() intermediate_gens = [z] + intermediate_gens K_s = PermutationGroup(intermediate_gens) orbit = K_s.orbit(alpha) orbit_k = K.orbit(alpha) # split into cases based on the orbit of K_s if orbit_k == orbit: if z in K: rel = phi.invert(z) perm = z else: t = K.orbit_rep(alpha, alpha^z) rel = phi.invert(z)phi.invert(t)-1 perm = zt*-1 for g in K.generator_product(perm, original=True): rel = relphi.invert(g)*-1 new_rels = [rel] elif len(orbit_k) == 1: # `success` is always true because `strong_gens` # and `base` are already a verified BSGS. Later # this could be changed to start with a randomly # generated (potential) BSGS, and then new elements # would have to be appended to it when `success` # is false. success, new_rels = K_s._verify(K, phi, z, alpha) else: # K.orbit(alpha) should be a block # under the action of K_s on K_s.orbit(alpha) check, block = K_s._block_verify(K, alpha) if check: # apply _verify to the action of K_s # on the block system; for convenience, # add the blocks as additional points # that K_s should act on t = block_homomorphism(K_s, block) m = t.codomain.degree # number of blocks d = K_s.degree # conjugating with p will shift # permutations in t.image() to # higher numbers, e.g. # p(0 1)p = (m m+1) p = Permutation() for i in range(m): p = Permutation(i, i+d) t_img = t.images # combine generators of K_s with their # action on the block system images = {g: gpt_img[g]p for g in t_img} for g in G.strong_gens[:-len(K_s.generators)]: images[g] = g K_s_act = PermutationGroup(list(images.values())) f = GroupHomomorphism(G, K_s_act, images) K_act = PermutationGroup([f(g) for g in K.generators]) success, new_rels = K_s_act._verify(K_act, f.compose(phi), f(z), d) for n in new_rels: if not n in rels: rels.append(n) K = K_s group = FpGroup(F, rels) return simplify_presentation(group) def presentation(G, eliminate_gens=True): ''' Return an `FpGroup` presentation of the group. The algorithm is described in [1], Chapter 6.1. ''' from sympy.combinatorics.fp_groups import (FpGroup, simplify_presentation) from sympy.combinatorics.coset_table import CosetTable from sympy.combinatorics.free_groups import free_group from sympy.combinatorics.homomorphisms import homomorphism from itertools import product if G._fp_presentation: return G._fp_presentation if G._fp_presentation: return G._fp_presentation def _factor_group_by_rels(G, rels): if isinstance(G, FpGroup): rels.extend(G.relators) return FpGroup(G.free_group, list(set(rels))) return FpGroup(G, rels) gens = G.generators len_g = len(gens) if len_g == 1: order = gens[0].order() # handle the trivial group if order == 1: return free_group([])[0] F, x = free_group('x') return FpGroup(F, [xorder]) if G.order() > 20: half_gens = G.generators[0:(len_g+1)//2] else: half_gens = [] H = PermutationGroup(half_gens) H_p = H.presentation() len_h = len(H_p.generators) C = G.coset_table(H) n = len(C) # subgroup index gen_syms = [('x_%d'%i) for i in range(len(gens))] F = free_group(', '.join(gen_syms))[0] # mapping generators of H_p to those of F images = [F.generators[i] for i in range(len_h)] R = homomorphism(H_p, F, H_p.generators, images, check=False) # rewrite relators rels = R(H_p.relators) G_p = FpGroup(F, rels) # injective homomorphism from G_p into G T = homomorphism(G_p, G, G_p.generators, gens) C_p = CosetTable(G_p, []) C_p.table = [[None](2len_g) for i in range(n)] # initiate the coset transversal transversal = [None]n transversal[0] = G_p.identity # fill in the coset table as much as possible for i in range(2len_h): C_p.table[0][i] = 0 gamma = 1 for alpha, x in product(range(0, n), range(2len_g)): beta = C[alpha][x] if beta == gamma: gen = G_p.generators[x//2]((-1)(x % 2)) transversal[beta] = transversal[alpha]gen C_p.table[alpha][x] = beta C_p.table[beta][x + (-1)(x % 2)] = alpha gamma += 1 if gamma == n: break C_p.p = list(range(n)) beta = x = 0 while not C_p.is_complete(): # find the first undefined entry while C_p.table[beta][x] == C[beta][x]: x = (x + 1) % (2len_g) if x == 0: beta = (beta + 1) % n # define a new relator gen = G_p.generators[x//2]((-1)(x % 2)) new_rel = transversal[beta]gentransversal[C[beta][x]]*-1 perm = T(new_rel) next = G_p.identity for s in H.generator_product(perm, original=True): next = nextT.invert(s)*-1 new_rel = new_relnext # continue coset enumeration G_p = _factor_group_by_rels(G_p, [new_rel]) C_p.scan_and_fill(0, new_rel) C_p = G_p.coset_enumeration([], strategy="coset_table", draft=C_p, max_cosets=n, incomplete=True) G._fp_presentation = simplify_presentation(G_p) return G._fp_presentation def polycyclic_group(self): from sympy.combinatorics.pc_groups import PolycyclicGroup if not self.is_polycyclic: raise ValueError("The group must be solvable") der = self.derived_series() pc_series = [] pc_sequence = [] relative_order = [] pc_series.append(der[-1]) der.reverse() for i in range(len(der)-1): H = der[i] for g in der[i+1].generators: if g not in H: H = PermutationGroup([g] + H.generators) pc_series.insert(0, H) pc_sequence.insert(0, g) G1 = pc_series[0].order() G2 = pc_series[1].order() relative_order.insert(0, G1 // G2) return PolycyclicGroup(pc_sequence, pc_series, relative_order, collector=None) def _orbit(degree, generators, alpha, action='tuples'): r"""Compute the orbit of alpha `\{g(\alpha) \| g \in G\}` as a set. The time complexity of the algorithm used here is `O(\|Orb\|r)` where `\|Orb\|` is the size of the orbit and ``r`` is the number of generators of the group. For a more detailed analysis, see [1], p.78, [2], pp. 19-21. Here alpha can be a single point, or a list of points. If alpha is a single point, the ordinary orbit is computed. if alpha is a list of points, there are three available options: 'union' - computes the union of the orbits of the points in the list 'tuples' - computes the orbit of the list interpreted as an ordered tuple under the group action ( i.e., g((1, 2, 3)) = (g(1), g(2), g(3)) ) 'sets' - computes the orbit of the list interpreted as a sets Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup, _orbit >>> a = Permutation([1, 2, 0, 4, 5, 6, 3]) >>> G = PermutationGroup([a]) >>> _orbit(G.degree, G.generators, 0) {0, 1, 2} >>> _orbit(G.degree, G.generators, [0, 4], 'union') {0, 1, 2, 3, 4, 5, 6} See Also ======== orbit, orbit_transversal """ if not hasattr(alpha, '__getitem__'): alpha = [alpha] gens = [x._array_form for x in generators] if len(alpha) == 1 or action == 'union': orb = alpha used = [False]degree for el in alpha: used[el] = True for b in orb: for gen in gens: temp = gen[b] if used[temp] == False: orb.append(temp) used[temp] = True return set(orb) elif action == 'tuples': alpha = tuple(alpha) orb = [alpha] used = {alpha} for b in orb: for gen in gens: temp = tuple([gen[x] for x in b]) if temp not in used: orb.append(temp) used.add(temp) return set(orb) elif action == 'sets': alpha = frozenset(alpha) orb = [alpha] used = {alpha} for b in orb: for gen in gens: temp = frozenset([gen[x] for x in b]) if temp not in used: orb.append(temp) used.add(temp) return {tuple(x) for x in orb} def _orbits(degree, generators): """Compute the orbits of G. If ``rep=False`` it returns a list of sets else it returns a list of representatives of the orbits Examples ======== >>> from sympy.combinatorics.permutations import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup, _orbits >>> a = Permutation([0, 2, 1]) >>> b = Permutation([1, 0, 2]) >>> _orbits(a.size, [a, b]) [{0, 1, 2}] """ orbs = [] sorted_I = list(range(degree)) I = set(sorted_I) while I: i = sorted_I[0] orb = _orbit(degree, generators, i) orbs.append(orb) # remove all indices that are in this orbit I -= orb sorted_I = [i for i in sorted_I if i not in orb] return orbs def _orbit_transversal(degree, generators, alpha, pairs, af=False, slp=False): r"""Computes a transversal for the orbit of ``alpha`` as a set. generators generators of the group ``G`` For a permutation group ``G``, a transversal for the orbit `Orb = \{g(\alpha) \| g \in G\}` is a set `\{g_\beta \| g_\beta(\alpha) = \beta\}` for `\beta \in Orb`. Note that there may be more than one possible transversal. If ``pairs`` is set to ``True``, it returns the list of pairs `(\beta, g_\beta)`. For a proof of correctness, see [1], p.79 if ``af`` is ``True``, the transversal elements are given in array form. If `slp` is `True`, a dictionary `{beta: slp_beta}` is returned for `\beta \in Orb` where `slp_beta` is a list of indices of the generators in `generators` s.t. if `slp_beta = [i_1 ... i_n]` `g_\beta = generators[i_n]...generators[i_1]`. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.named_groups import DihedralGroup >>> from sympy.combinatorics.perm_groups import _orbit_transversal >>> G = DihedralGroup(6) >>> _orbit_transversal(G.degree, G.generators, 0, False) [(5), (0 1 2 3 4 5), (0 5)(1 4)(2 3), (0 2 4)(1 3 5), (5)(0 4)(1 3), (0 3)(1 4)(2 5)] """ tr = [(alpha, list(range(degree)))] slp_dict = {alpha: []} used = [False]degree used[alpha] = True gens = [x._array_form for x in generators] for x, px in tr: px_slp = slp_dict[x] for gen in gens: temp = gen[x] if used[temp] == False: slp_dict[temp] = [gens.index(gen)] + px_slp tr.append((temp, _af_rmul(gen, px))) used[temp] = True if pairs: if not af: tr = [(x, _af_new(y)) for x, y in tr] if not slp: return tr return tr, slp_dict if af: tr = [y for _, y in tr] if not slp: return tr return tr, slp_dict tr = [_af_new(y) for _, y in tr] if not slp: return tr return tr, slp_dict def _stabilizer(degree, generators, alpha): r"""Return the stabilizer subgroup of ``alpha``. The stabilizer of `\alpha` is the group `G_\alpha = \{g \in G \| g(\alpha) = \alpha\}`. For a proof of correctness, see [1], p.79. degree : degree of G generators : generators of G Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import _stabilizer >>> from sympy.combinatorics.named_groups import DihedralGroup >>> G = DihedralGroup(6) >>> _stabilizer(G.degree, G.generators, 5) [(5)(0 4)(1 3), (5)] See Also ======== orbit """ orb = [alpha] table = {alpha: list(range(degree))} table_inv = {alpha: list(range(degree))} used = [False]degree used[alpha] = True gens = [x._array_form for x in generators] stab_gens = [] for b in orb: for gen in gens: temp = gen[b] if used[temp] is False: gen_temp = _af_rmul(gen, table[b]) orb.append(temp) table[temp] = gen_temp table_inv[temp] = _af_invert(gen_temp) used[temp] = True else: schreier_gen = _af_rmuln(table_inv[temp], gen, table[b]) if schreier_gen not in stab_gens: stab_gens.append(schreier_gen) return [_af_new(x) for x in stab_gens] PermGroup = PermutationGroup
47fa13e84993d6aceb187e80d41c34a220727b68605650eb5b15b34b98d4fe22	from __future__ import print_function, division from sympy.combinatorics.rewritingsystem_fsm import StateMachine class RewritingSystem(object): ''' A class implementing rewriting systems for `FpGroup`s. References ========== .. [1] Epstein, D., Holt, D. and Rees, S. (1991). The use of Knuth-Bendix methods to solve the word problem in automatic groups. Journal of Symbolic Computation, 12(4-5), pp.397-414. .. [2] GAP's Manual on its KBMAG package https://www.gap-system.org/Manuals/pkg/kbmag-1.5.3/doc/manual.pdf ''' def __init__(self, group): from collections import deque self.group = group self.alphabet = group.generators self._is_confluent = None # these values are taken from [2] self.maxeqns = 32767 # max rules self.tidyint = 100 # rules before tidying # _max_exceeded is True if maxeqns is exceeded # at any point self._max_exceeded = False # Reduction automaton self.reduction_automaton = None self._new_rules = {} # dictionary of reductions self.rules = {} self.rules_cache = deque([], 50) self._init_rules() # All the transition symbols in the automaton generators = list(self.alphabet) generators += [gen*-1 for gen in generators] # Create a finite state machine as an instance of the StateMachine object self.reduction_automaton = StateMachine('Reduction automaton for '+ repr(self.group), generators) self.construct_automaton() def set_max(self, n): ''' Set the maximum number of rules that can be defined ''' if n > self.maxeqns: self._max_exceeded = False self.maxeqns = n return @property def is_confluent(self): ''' Return `True` if the system is confluent ''' if self._is_confluent is None: self._is_confluent = self._check_confluence() return self._is_confluent def _init_rules(self): identity = self.group.free_group.identity for r in self.group.relators: self.add_rule(r, identity) self._remove_redundancies() return def _add_rule(self, r1, r2): ''' Add the rule r1 -> r2 with no checking or further deductions ''' if len(self.rules) + 1 > self.maxeqns: self._is_confluent = self._check_confluence() self._max_exceeded = True raise RuntimeError("Too many rules were defined.") self.rules[r1] = r2 # Add the newly added rule to the `new_rules` dictionary. if self.reduction_automaton: self._new_rules[r1] = r2 def add_rule(self, w1, w2, check=False): new_keys = set() if w1 == w2: return new_keys if w1 < w2: w1, w2 = w2, w1 if (w1, w2) in self.rules_cache: return new_keys self.rules_cache.append((w1, w2)) s1, s2 = w1, w2 # The following is the equivalent of checking # s1 for overlaps with the implicit reductions # {gg-1 -> <identity>} and {g-1g -> <identity>} # for any generator g without installing the # redundant rules that would result from processing # the overlaps. See [1], Section 3 for details. if len(s1) - len(s2) < 3: if s1 not in self.rules: new_keys.add(s1) if not check: self._add_rule(s1, s2) if s2-1 > s1-1 and s2-1 not in self.rules: new_keys.add(s2-1) if not check: self._add_rule(s2-1, s1-1) # overlaps on the right while len(s1) - len(s2) > -1: g = s1[len(s1)-1] s1 = s1.subword(0, len(s1)-1) s2 = s2g-1 if len(s1) - len(s2) < 0: if s2 not in self.rules: if not check: self._add_rule(s2, s1) new_keys.add(s2) elif len(s1) - len(s2) < 3: new = self.add_rule(s1, s2, check) new_keys.update(new) # overlaps on the left while len(w1) - len(w2) > -1: g = w1[0] w1 = w1.subword(1, len(w1)) w2 = g-1w2 if len(w1) - len(w2) < 0: if w2 not in self.rules: if not check: self._add_rule(w2, w1) new_keys.add(w2) elif len(w1) - len(w2) < 3: new = self.add_rule(w1, w2, check) new_keys.update(new) return new_keys def _remove_redundancies(self, changes=False): ''' Reduce left- and right-hand sides of reduction rules and remove redundant equations (i.e. those for which lhs == rhs). If `changes` is `True`, return a set containing the removed keys and a set containing the added keys ''' removed = set() added = set() rules = self.rules.copy() for r in rules: v = self.reduce(r, exclude=r) w = self.reduce(rules[r]) if v != r: del self.rules[r] removed.add(r) if v > w: added.add(v) self.rules[v] = w elif v < w: added.add(w) self.rules[w] = v else: self.rules[v] = w if changes: return removed, added return def make_confluent(self, check=False): ''' Try to make the system confluent using the Knuth-Bendix completion algorithm ''' if self._max_exceeded: return self._is_confluent lhs = list(self.rules.keys()) def _overlaps(r1, r2): len1 = len(r1) len2 = len(r2) result = [] for j in range(1, len1 + len2): if (r1.subword(len1 - j, len1 + len2 - j, strict=False) == r2.subword(j - len1, j, strict=False)): a = r1.subword(0, len1-j, strict=False) a = ar2.subword(0, j-len1, strict=False) b = r2.subword(j-len1, j, strict=False) c = r2.subword(j, len2, strict=False) c = cr1.subword(len1 + len2 - j, len1, strict=False) result.append(abc) return result def _process_overlap(w, r1, r2, check): s = w.eliminate_word(r1, self.rules[r1]) s = self.reduce(s) t = w.eliminate_word(r2, self.rules[r2]) t = self.reduce(t) if s != t: if check: # system not confluent return [0] try: new_keys = self.add_rule(t, s, check) return new_keys except RuntimeError: return False return added = 0 i = 0 while i < len(lhs): r1 = lhs[i] i += 1 # j could be i+1 to not # check each pair twice but lhs # is extended in the loop and the new # elements have to be checked with the # preceding ones. there is probably a better way # to handle this j = 0 while j < len(lhs): r2 = lhs[j] j += 1 if r1 == r2: continue overlaps = _overlaps(r1, r2) overlaps.extend(_overlaps(r1-1, r2)) if not overlaps: continue for w in overlaps: new_keys = _process_overlap(w, r1, r2, check) if new_keys: if check: return False lhs.extend(new_keys) added += len(new_keys) elif new_keys == False: # too many rules were added so the process # couldn't complete return self._is_confluent if added > self.tidyint and not check: # tidy up r, a = self._remove_redundancies(changes=True) added = 0 if r: # reset i since some elements were removed i = min([lhs.index(s) for s in r]) lhs = [l for l in lhs if l not in r] lhs.extend(a) if r1 in r: # r1 was removed as redundant break self._is_confluent = True if not check: self._remove_redundancies() return True def _check_confluence(self): return self.make_confluent(check=True) def reduce(self, word, exclude=None): ''' Apply reduction rules to `word` excluding the reduction rule for the lhs equal to `exclude` ''' rules = {r: self.rules[r] for r in self.rules if r != exclude} # the following is essentially `eliminate_words()` code from the # `FreeGroupElement` class, the only difference being the first # "if" statement again = True new = word while again: again = False for r in rules: prev = new if rules[r]-1 > r-1: new = new.eliminate_word(r, rules[r], _all=True, inverse=False) else: new = new.eliminate_word(r, rules[r], _all=True) if new != prev: again = True return new def _compute_inverse_rules(self, rules): ''' Compute the inverse rules for a given set of rules. The inverse rules are used in the automaton for word reduction. Arguments: rules (dictionary): Rules for which the inverse rules are to computed. Returns: Dictionary of inverse_rules. ''' inverse_rules = {} for r in rules: rule_key_inverse = r-1 rule_value_inverse = (rules[r])-1 if (rule_value_inverse < rule_key_inverse): inverse_rules[rule_key_inverse] = rule_value_inverse else: inverse_rules[rule_value_inverse] = rule_key_inverse return inverse_rules def construct_automaton(self): ''' Construct the automaton based on the set of reduction rules of the system. Automata Design: The accept states of the automaton are the proper prefixes of the left hand side of the rules. The complete left hand side of the rules are the dead states of the automaton. ''' self._add_to_automaton(self.rules) def _add_to_automaton(self, rules): ''' Add new states and transitions to the automaton. Summary: States corresponding to the new rules added to the system are computed and added to the automaton. Transitions in the previously added states are also modified if necessary. Arguments: rules (dictionary) -- Dictionary of the newly added rules. ''' # Automaton variables automaton_alphabet = [] proper_prefixes = {} # compute the inverses of all the new rules added all_rules = rules inverse_rules = self._compute_inverse_rules(all_rules) all_rules.update(inverse_rules) # Keep track of the accept_states. accept_states = [] for rule in all_rules: # The symbols present in the new rules are the symbols to be verified at each state. # computes the automaton_alphabet, as the transitions solely depend upon the new states. automaton_alphabet += rule.letter_form_elm # Compute the proper prefixes for every rule. proper_prefixes[rule] = [] letter_word_array = [s for s in rule.letter_form_elm] len_letter_word_array = len(letter_word_array) for i in range (1, len_letter_word_array): letter_word_array[i] = letter_word_array[i-1]letter_word_array[i] # Add accept states. elem = letter_word_array[i-1] if not elem in self.reduction_automaton.states: self.reduction_automaton.add_state(elem, state_type='a') accept_states.append(elem) proper_prefixes[rule] = letter_word_array # Check for overlaps between dead and accept states. if rule in accept_states: self.reduction_automaton.states[rule].state_type = 'd' self.reduction_automaton.states[rule].rh_rule = all_rules[rule] accept_states.remove(rule) # Add dead states if not rule in self.reduction_automaton.states: self.reduction_automaton.add_state(rule, state_type='d', rh_rule=all_rules[rule]) automaton_alphabet = set(automaton_alphabet) # Add new transitions for every state. for state in self.reduction_automaton.states: current_state_name = state current_state_type = self.reduction_automaton.states[state].state_type # Transitions will be modified only when suffixes of the current_state # belongs to the proper_prefixes of the new rules. # The rest are ignored if they cannot lead to a dead state after a finite number of transisitons. if current_state_type == 's': for letter in automaton_alphabet: if letter in self.reduction_automaton.states: self.reduction_automaton.states[state].add_transition(letter, letter) else: self.reduction_automaton.states[state].add_transition(letter, current_state_name) elif current_state_type == 'a': # Check if the transition to any new state in possible. for letter in automaton_alphabet: _next = current_state_nameletter while len(_next) and _next not in self.reduction_automaton.states: _next = _next.subword(1, len(_next)) if not len(_next): _next = 'start' self.reduction_automaton.states[state].add_transition(letter, _next) # Add transitions for new states. All symbols used in the automaton are considered here. # Ignore this if `reduction_automaton.automaton_alphabet` = `automaton_alphabet`. if len(self.reduction_automaton.automaton_alphabet) != len(automaton_alphabet): for state in accept_states: current_state_name = state for letter in self.reduction_automaton.automaton_alphabet: _next = current_state_nameletter while len(_next) and _next not in self.reduction_automaton.states: _next = _next.subword(1, len(_next)) if not len(_next): _next = 'start' self.reduction_automaton.states[state].add_transition(letter, _next) def reduce_using_automaton(self, word): ''' Reduce a word using an automaton. Summary: All the symbols of the word are stored in an array and are given as the input to the automaton. If the automaton reaches a dead state that subword is replaced and the automaton is run from the beginning. The complete word has to be replaced when the word is read and the automaton reaches a dead state. So, this process is repeated until the word is read completely and the automaton reaches the accept state. Arguments: word (instance of FreeGroupElement) -- Word that needs to be reduced. ''' # Modify the automaton if new rules are found. if self._new_rules: self._add_to_automaton(self._new_rules) self._new_rules = {} flag = 1 while flag: flag = 0 current_state = self.reduction_automaton.states['start'] word_array = [s for s in word.letter_form_elm] for i in range (0, len(word_array)): next_state_name = current_state.transitions[word_array[i]] next_state = self.reduction_automaton.states[next_state_name] if next_state.state_type == 'd': subst = next_state.rh_rule word = word.substituted_word(i - len(next_state_name) + 1, i+1, subst) flag = 1 break current_state = next_state return word
14e8bbed9a2f72b7ad8958b4c2b70821f0c474fc764afa478d7ea0c879addd58	from sympy.combinatorics.permutations import Permutation, Cycle from sympy.combinatorics.prufer import Prufer from sympy.combinatorics.generators import cyclic, alternating, symmetric, dihedral from sympy.combinatorics.subsets import Subset from sympy.combinatorics.partitions import (Partition, IntegerPartition, RGS_rank, RGS_unrank, RGS_enum) from sympy.combinatorics.polyhedron import (Polyhedron, tetrahedron, cube, octahedron, dodecahedron, icosahedron) from sympy.combinatorics.perm_groups import PermutationGroup from sympy.combinatorics.group_constructs import DirectProduct from sympy.combinatorics.graycode import GrayCode from sympy.combinatorics.named_groups import (SymmetricGroup, DihedralGroup, CyclicGroup, AlternatingGroup, AbelianGroup, RubikGroup) from sympy.combinatorics.pc_groups import PolycyclicGroup, Collector
c891b895de3bbfb52ef2048401a91cf7c09f2eb67b77f8c49fb2ad2a7f98e682	from sympy.core import Basic from sympy import isprime, symbols from sympy.combinatorics.perm_groups import PermutationGroup from sympy.printing.defaults import DefaultPrinting from sympy.combinatorics.free_groups import free_group class PolycyclicGroup(DefaultPrinting): is_group = True is_solvable = True def __init__(self, pc_sequence, pc_series, relative_order, collector=None): self.pcgs = pc_sequence self.pc_series = pc_series self.relative_order = relative_order self.collector = Collector(self.pcgs, pc_series, relative_order) if not collector else collector def is_prime_order(self): return all(isprime(order) for order in self.relative_order) def length(self): return len(self.pcgs) class Collector(DefaultPrinting): """ References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of Computational Group Theory" Section 8.1.3 """ def __init__(self, pcgs, pc_series, relative_order, group=None, pc_presentation=None): self.pcgs = pcgs self.pc_series = pc_series self.relative_order = relative_order self.free_group = free_group('x:{0}'.format(len(pcgs)))[0] if not group else group self.index = {s: i for i, s in enumerate(self.free_group.symbols)} self.pc_presentation = self.pc_relators() def minimal_uncollected_subword(self, word): """ Returns the minimal uncollected subwords. A word `v` defined on generators in `X` is a minimal uncollected subword of the word `w` if `v` is a subword of `w` and it has one of the following form i) `v = x[i+1]*a_jx[i]` ii) `v = x[i+1]*a_jx[i]-1` iii) `v = x[i]a_j` for relative_order of `x[i] != infinity` and `a_j` is not in `{1, ..., s-1}`. Where, s is the power exponent of the corresponding generator. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.free_groups import free_group >>> G = SymmetricGroup(4) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> F, x1, x2 = free_group("x1, x2") >>> word = x2*2x17 >>> collector.minimal_uncollected_subword(word) ((x2, 2),) """ # To handle the case word = <identity> if not word: return None array = word.array_form re = self.relative_order index = self.index for i in range(len(array)): s1, e1 = array[i] if re[index[s1]] and (e1 < 0 or e1 > re[index[s1]]-1): return ((s1, e1), ) for i in range(len(array)-1): s1, e1 = array[i] s2, e2 = array[i+1] if index[s1] > index[s2]: e = 1 if e2 > 0 else -1 return ((s1, e1), (s2, e)) return None def relations(self): """ Separates the given relators of pc presentation in power and conjugate relations. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> G = SymmetricGroup(3) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> power_rel, conj_rel = collector.relations() >>> power_rel {x02: (), x13: ()} >>> conj_rel {x0-1x1x0: x12} """ power_relators = {} conjugate_relators = {} for key, value in self.pc_presentation.items(): if len(key.array_form) == 1: power_relators[key] = value else: conjugate_relators[key] = value return power_relators, conjugate_relators def subword_index(self, word, w): """ Returns the start and ending index of a given subword in a word. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.free_groups import free_group >>> G = SymmetricGroup(4) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> F, x1, x2 = free_group("x1, x2") >>> word = x22x17 >>> w = x22x1 >>> collector.subword_index(word, w) (0, 3) >>> w = x1*7 >>> collector.subword_index(word, w) (2, 9) """ low = -1 high = -1 for i in range(len(word)-len(w)+1): if word.subword(i, i+len(w)) == w: low = i high = i+len(w) break if low == high == -1: return -1, -1 return low, high def map_relation(self, w): """ Return a conjugate relation. Given a word formed by two free group elements, the corresponding conjugate relation with those free group elements is formed and mapped with the collected word in the polycyclic presentation. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.free_groups import free_group >>> G = SymmetricGroup(3) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> F, x0, x1 = free_group("x0, x1") >>> w = x1x0 >>> collector.map_relation(w) x12 """ array = w.array_form s1 = array[0][0] s2 = array[1][0] key = ((s2, -1), (s1, 1), (s2, 1)) key = self.free_group.dtype(key) return self.pc_presentation[key] def collected_word(self, word): """ Return the collected form of a word. A word `w` is called collected, if `w = x{i_1}a_1...x{i_r}*a_r` with `i_1 < i_2< ... < i_r` and `a_j` is in `{1, ..., s_j-1}` if `s_j != infinity`. Otherwise w is uncollected. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.free_groups import free_group >>> G = SymmetricGroup(4) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> F, x0, x1, x2, x3 = free_group("x0, x1, x2, x3") >>> word = x3x2x1x0 >>> collected_word = collector.collected_word(word) >>> free_to_perm = {} >>> free_group = collector.free_group >>> for sym, gen in zip(free_group.symbols, collector.pcgs): ... free_to_perm[sym] = gen >>> G1 = PermutationGroup() >>> for w in word: ... sym = w[0] ... perm = free_to_perm[sym] ... G1 = PermutationGroup([perm] + G1.generators) >>> G2 = PermutationGroup() >>> for w in collected_word: ... sym = w[0] ... perm = free_to_perm[sym] ... G2 = PermutationGroup([perm] + G2.generators) >>> G1 == G2 True """ free_group = self.free_group while True: w = self.minimal_uncollected_subword(word) if not w: break low, high = self.subword_index(word, free_group.dtype(w)) if low == -1: continue s1, e1 = w[0] if len(w) == 1: re = self.relative_order[self.index[s1]] q = e1 // re r = e1-qre key = ((w[0][0], re), ) key = free_group.dtype(key) if self.pc_presentation[key]: word_ = ((w[0][0], r), (self.pc_presentation[key], q)) word_ = free_group.dtype(word_) else: if r != 0: word_ = ((w[0][0], r), ) word_ = free_group.dtype(word_) else: word_ = None word = word.eliminate_word(free_group.dtype(w), word_) if len(w) == 2 and w[1][1] > 0: s2, e2 = w[1] s2 = ((s2, 1), ) s2 = free_group.dtype(s2) word_ = self.map_relation(free_group.dtype(w)) word_ = s2word_e1 word_ = free_group.dtype(word_) word = word.substituted_word(low, high, word_) elif len(w) == 2 and w[1][1] < 0: s2, e2 = w[1] s2 = ((s2, 1), ) s2 = free_group.dtype(s2) word_ = self.map_relation(free_group.dtype(w)) word_ = s2-1word_e1 word_ = free_group.dtype(word_) word = word.substituted_word(low, high, word_) return word def pc_relators(self): """ Return the polycyclic presentation. There are two types of relations used in polycyclic presentation. i) Power relations of the form `x{i}^re{i} = R{i}{i}`, `for 0 <= i < length(pcgs)` where `x` represents polycyclic generator and `re` is the corresponding relative order. ii) Conjugate relations of the form `x{j}^-1x{i}x{j}`, `for 0 <= j < i <= length(pcgs)`. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.permutations import Permutation >>> S = SymmetricGroup(49).sylow_subgroup(7) >>> der = S.derived_series() >>> G = der[len(der)-2] >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> pcgs = PcGroup.pcgs >>> len(pcgs) 6 >>> free_group = collector.free_group >>> pc_resentation = collector.pc_presentation >>> free_to_perm = {} >>> for s, g in zip(free_group.symbols, pcgs): ... free_to_perm[s] = g >>> for k, v in pc_resentation.items(): ... k_array = k.array_form ... if v != (): ... v_array = v.array_form ... lhs = Permutation() ... for gen in k_array: ... s = gen[0] ... e = gen[1] ... lhs = lhsfree_to_perm[s]*e ... if v == (): ... assert lhs.is_identity ... continue ... rhs = Permutation() ... for gen in v_array: ... s = gen[0] ... e = gen[1] ... rhs = rhsfree_to_perm[s]e ... assert lhs == rhs """ free_group = self.free_group rel_order = self.relative_order pc_relators = {} perm_to_free = {} pcgs = self.pcgs for gen, s in zip(pcgs, free_group.generators): perm_to_free[gen-1] = s-1 perm_to_free[gen] = s pcgs = pcgs[::-1] series = self.pc_series[::-1] rel_order = rel_order[::-1] collected_gens = [] for i, gen in enumerate(pcgs): re = rel_order[i] relation = perm_to_free[gen]re G = series[i] l = G.generator_product(gen*re, original = True) l.reverse() word = free_group.identity for g in l: word = wordperm_to_free[g] word = self.collected_word(word) pc_relators[relation] = word if word else () self.pc_presentation = pc_relators collected_gens.append(gen) if len(collected_gens) > 1: conj = collected_gens[len(collected_gens)-1] conjugator = perm_to_free[conj] for j in range(len(collected_gens)-1): conjugated = perm_to_free[collected_gens[j]] relation = conjugator*-1conjugatedconjugator gens = conj-1collected_gens[j]conj l = G.generator_product(gens, original = True) l.reverse() word = free_group.identity for g in l: word = wordperm_to_free[g] word = self.collected_word(word) pc_relators[relation] = word if word else () self.pc_presentation = pc_relators return pc_relators def exponent_vector(self, element): """ Return the exponent vector of length equal to the length of polycyclic generating sequence. For a given generator/element `g` of the polycyclic group, it can be represented as `g = x{1}e{1}....x{n}e{n}`, where `x{i}` represents polycyclic generators and `n` is the number of generators in the free_group equal to the length of pcgs. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.permutations import Permutation >>> G = SymmetricGroup(4) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> pcgs = PcGroup.pcgs >>> collector.exponent_vector(G[0]) [1, 0, 0, 0] >>> exp = collector.exponent_vector(G[1]) >>> g = Permutation() >>> for i in range(len(exp)): ... g = gpcgs[i]exp[i] if exp[i] else g >>> assert g == G[1] References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of Computational Group Theory" Section 8.1.1, Definition 8.4 """ free_group = self.free_group G = PermutationGroup() for g in self.pcgs: G = PermutationGroup([g] + G.generators) gens = G.generator_product(element, original = True) gens.reverse() perm_to_free = {} for sym, g in zip(free_group.generators, self.pcgs): perm_to_free[g-1] = sym-1 perm_to_free[g] = sym w = free_group.identity for g in gens: w = wperm_to_free[g] pc_presentation = self.pc_presentation word = self.collected_word(w) index = self.index exp_vector = [0]*len(free_group) word = word.array_form for t in word: exp_vector[index[t[0]]] = t[1] return exp_vector def depth(self, element): """ Return the depth of a given element. The depth of a given element `g` is defined by `dep{g} = i if e{1} = e{2} = ... = e{i-1} = 0` and `e{i} != 0`, where `e` represents the exponent-vector. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> G = SymmetricGroup(3) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> collector.depth(G[0]) 2 >>> collector.depth(G[1]) 1 References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of Computational Group Theory" Section 8.1.1, Definition 8.5 """ exp_vector = self.exponent_vector(element) return next((i+1 for i, x in enumerate(exp_vector) if x), len(self.pcgs)+1) def leading_exponent(self, element): """ Return the leading non-zero exponent. The leading exponent for a given element `g` is defined by `leading_exponent{g} = e{i}`, if `depth{g} = i`. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> G = SymmetricGroup(3) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> collector.leading_exponent(G[1]) 1 """ exp_vector = self.exponent_vector(element) depth = self.depth(element) if depth != len(self.pcgs)+1: return exp_vector[depth-1] return None
31cf4f67f4550f64f6f51aa4f6a1862819dc2d6c4f08af8883c6b8090e8c7d1b	from __future__ import print_function, division from sympy.combinatorics.free_groups import free_group from sympy.printing.defaults import DefaultPrinting from itertools import chain, product from bisect import bisect_left ############################################################################### # COSET TABLE # ############################################################################### class CosetTable(DefaultPrinting): # coset_table: Mathematically a coset table # represented using a list of lists # alpha: Mathematically a coset (precisely, a live coset) # represented by an integer between i with 1 <= i <= n # alpha in c # x: Mathematically an element of "A" (set of generators and # their inverses), represented using "FpGroupElement" # fp_grp: Finitely Presented Group with < X\|R > as presentation. # H: subgroup of fp_grp. # NOTE: We start with H as being only a list of words in generators # of "fp_grp". Since `.subgroup` method has not been implemented. r""" Properties ========== [1] `0 \in \Omega` and `\tau(1) = \epsilon` [2] `\alpha^x = \beta \Leftrightarrow \beta^{x^{-1}} = \alpha` [3] If `\alpha^x = \beta`, then `H \tau(\alpha)x = H \tau(\beta)` [4] `\forall \alpha \in \Omega, 1^{\tau(\alpha)} = \alpha` References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of Computational Group Theory" .. [2] John J. Cannon; Lucien A. Dimino; George Havas; Jane M. Watson Mathematics of Computation, Vol. 27, No. 123. (Jul., 1973), pp. 463-490. "Implementation and Analysis of the Todd-Coxeter Algorithm" """ # default limit for the number of cosets allowed in a # coset enumeration. coset_table_max_limit = 4096000 # limit for the current instance coset_table_limit = None # maximum size of deduction stack above or equal to # which it is emptied max_stack_size = 100 def __init__(self, fp_grp, subgroup, max_cosets=None): if not max_cosets: max_cosets = CosetTable.coset_table_max_limit self.fp_group = fp_grp self.subgroup = subgroup self.coset_table_limit = max_cosets # "p" is setup independent of Omega and n self.p = [0] # a list of the form `[gen_1, gen_1^{-1}, ... , gen_k, gen_k^{-1}]` self.A = list(chain.from_iterable((gen, gen*-1) \ for gen in self.fp_group.generators)) #P[alpha, x] Only defined when alpha^x is defined. self.P = [[None]len(self.A)] # the mathematical coset table which is a list of lists self.table = [[None]len(self.A)] self.A_dict = {x: self.A.index(x) for x in self.A} self.A_dict_inv = {} for x, index in self.A_dict.items(): if index % 2 == 0: self.A_dict_inv[x] = self.A_dict[x] + 1 else: self.A_dict_inv[x] = self.A_dict[x] - 1 # used in the coset-table based method of coset enumeration. Each of # the element is called a "deduction" which is the form (alpha, x) whenever # a value is assigned to alpha^x during a definition or "deduction process" self.deduction_stack = [] # Attributes for modified methods. H = self.subgroup self._grp = free_group(', ' .join(["a_%d" % i for i in range(len(H))]))[0] self.P = [[None]len(self.A)] self.p_p = {} @property def omega(self): """Set of live cosets. """ return [coset for coset in range(len(self.p)) if self.p[coset] == coset] def copy(self): """ Return a shallow copy of Coset Table instance ``self``. """ self_copy = self.__class__(self.fp_group, self.subgroup) self_copy.table = [list(perm_rep) for perm_rep in self.table] self_copy.p = list(self.p) self_copy.deduction_stack = list(self.deduction_stack) return self_copy def __str__(self): return "Coset Table on %s with %s as subgroup generators" \ % (self.fp_group, self.subgroup) __repr__ = __str__ @property def n(self): """The number `n` represents the length of the sublist containing the live cosets. """ if not self.table: return 0 return max(self.omega) + 1 # Pg. 152 [1] def is_complete(self): r""" The coset table is called complete if it has no undefined entries on the live cosets; that is, `\alpha^x` is defined for all `\alpha \in \Omega` and `x \in A`. """ return not any(None in self.table[coset] for coset in self.omega) # Pg. 153 [1] def define(self, alpha, x, modified=False): r""" This routine is used in the relator-based strategy of Todd-Coxeter algorithm if some `\alpha^x` is undefined. We check whether there is space available for defining a new coset. If there is enough space then we remedy this by adjoining a new coset `\beta` to `\Omega` (i.e to set of live cosets) and put that equal to `\alpha^x`, then make an assignment satisfying Property[1]. If there is not enough space then we halt the Coset Table creation. The maximum amount of space that can be used by Coset Table can be manipulated using the class variable ``CosetTable.coset_table_max_limit``. See Also ======== define_c """ A = self.A table = self.table len_table = len(table) if len_table >= self.coset_table_limit: # abort the further generation of cosets raise ValueError("the coset enumeration has defined more than " "%s cosets. Try with a greater value max number of cosets " % self.coset_table_limit) table.append([None]len(A)) self.P.append([None]len(self.A)) # beta is the new coset generated beta = len_table self.p.append(beta) table[alpha][self.A_dict[x]] = beta table[beta][self.A_dict_inv[x]] = alpha # P[alpha][x] = epsilon, P[beta][x*-1] = epsilon if modified: self.P[alpha][self.A_dict[x]] = self._grp.identity self.P[beta][self.A_dict_inv[x]] = self._grp.identity self.p_p[beta] = self._grp.identity def define_c(self, alpha, x): r""" A variation of ``define`` routine, described on Pg. 165 [1], used in the coset table-based strategy of Todd-Coxeter algorithm. It differs from ``define`` routine in that for each definition it also adds the tuple `(\alpha, x)` to the deduction stack. See Also ======== define """ A = self.A table = self.table len_table = len(table) if len_table >= self.coset_table_limit: # abort the further generation of cosets raise ValueError("the coset enumeration has defined more than " "%s cosets. Try with a greater value max number of cosets " % self.coset_table_limit) table.append([None]len(A)) # beta is the new coset generated beta = len_table self.p.append(beta) table[alpha][self.A_dict[x]] = beta table[beta][self.A_dict_inv[x]] = alpha # append to deduction stack self.deduction_stack.append((alpha, x)) def scan_c(self, alpha, word): """ A variation of ``scan`` routine, described on pg. 165 of [1], which puts at tuple, whenever a deduction occurs, to deduction stack. See Also ======== scan, scan_check, scan_and_fill, scan_and_fill_c """ # alpha is an integer representing a "coset" # since scanning can be in two cases # 1. for alpha=0 and w in Y (i.e generating set of H) # 2. alpha in Omega (set of live cosets), w in R (relators) A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table f = alpha i = 0 r = len(word) b = alpha j = r - 1 # list of union of generators and their inverses while i <= j and table[f][A_dict[word[i]]] is not None: f = table[f][A_dict[word[i]]] i += 1 if i > j: if f != b: self.coincidence_c(f, b) return while j >= i and table[b][A_dict_inv[word[j]]] is not None: b = table[b][A_dict_inv[word[j]]] j -= 1 if j < i: # we have an incorrect completed scan with coincidence f ~ b # run the "coincidence" routine self.coincidence_c(f, b) elif j == i: # deduction process table[f][A_dict[word[i]]] = b table[b][A_dict_inv[word[i]]] = f self.deduction_stack.append((f, word[i])) # otherwise scan is incomplete and yields no information # alpha, beta coincide, i.e. alpha, beta represent the pair of cosets where # coincidence occurs def coincidence_c(self, alpha, beta): """ A variation of ``coincidence`` routine used in the coset-table based method of coset enumeration. The only difference being on addition of a new coset in coset table(i.e new coset introduction), then it is appended to ``deduction_stack``. See Also ======== coincidence """ A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table # behaves as a queue q = [] self.merge(alpha, beta, q) while len(q) > 0: gamma = q.pop(0) for x in A_dict: delta = table[gamma][A_dict[x]] if delta is not None: table[delta][A_dict_inv[x]] = None # only line of difference from ``coincidence`` routine self.deduction_stack.append((delta, x*-1)) mu = self.rep(gamma) nu = self.rep(delta) if table[mu][A_dict[x]] is not None: self.merge(nu, table[mu][A_dict[x]], q) elif table[nu][A_dict_inv[x]] is not None: self.merge(mu, table[nu][A_dict_inv[x]], q) else: table[mu][A_dict[x]] = nu table[nu][A_dict_inv[x]] = mu def scan(self, alpha, word, y=None, fill=False, modified=False): r""" ``scan`` performs a scanning process on the input ``word``. It first locates the largest prefix ``s`` of ``word`` for which `\alpha^s` is defined (i.e is not ``None``), ``s`` may be empty. Let ``word=sv``, let ``t`` be the longest suffix of ``v`` for which `\alpha^{t^{-1}}` is defined, and let ``v=ut``. Then three possibilities are there: 1. If ``t=v``, then we say that the scan completes, and if, in addition `\alpha^s = \alpha^{t^{-1}}`, then we say that the scan completes correctly. 2. It can also happen that scan does not complete, but `\|u\|=1`; that is, the word ``u`` consists of a single generator `x \in A`. In that case, if `\alpha^s = \beta` and `\alpha^{t^{-1}} = \gamma`, then we can set `\beta^x = \gamma` and `\gamma^{x^{-1}} = \beta`. These assignments are known as deductions and enable the scan to complete correctly. 3. See ``coicidence`` routine for explanation of third condition. Notes ===== The code for the procedure of scanning `\alpha \in \Omega` under `w \in A` is defined on pg. 155 [1] See Also ======== scan_c, scan_check, scan_and_fill, scan_and_fill_c Scan and Fill ============= Performed when the default argument fill=True. Modified Scan ============= Performed when the default argument modified=True """ # alpha is an integer representing a "coset" # since scanning can be in two cases # 1. for alpha=0 and w in Y (i.e generating set of H) # 2. alpha in Omega (set of live cosets), w in R (relators) A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table f = alpha i = 0 r = len(word) b = alpha j = r - 1 b_p = y if modified: f_p = self._grp.identity flag = 0 while fill or flag == 0: flag = 1 while i <= j and table[f][A_dict[word[i]]] is not None: if modified: f_p = f_pself.P[f][A_dict[word[i]]] f = table[f][A_dict[word[i]]] i += 1 if i > j: if f != b: if modified: self.modified_coincidence(f, b, f_p-1y) else: self.coincidence(f, b) return while j >= i and table[b][A_dict_inv[word[j]]] is not None: if modified: b_p = b_pself.P[b][self.A_dict_inv[word[j]]] b = table[b][A_dict_inv[word[j]]] j -= 1 if j < i: # we have an incorrect completed scan with coincidence f ~ b # run the "coincidence" routine if modified: self.modified_coincidence(f, b, f_p-1b_p) else: self.coincidence(f, b) elif j == i: # deduction process table[f][A_dict[word[i]]] = b table[b][A_dict_inv[word[i]]] = f if modified: self.P[f][self.A_dict[word[i]]] = f_p*-1b_p self.P[b][self.A_dict_inv[word[i]]] = b_p*-1f_p return elif fill: self.define(f, word[i], modified=modified) # otherwise scan is incomplete and yields no information # used in the low-index subgroups algorithm def scan_check(self, alpha, word): r""" Another version of ``scan`` routine, described on, it checks whether `\alpha` scans correctly under `word`, it is a straightforward modification of ``scan``. ``scan_check`` returns ``False`` (rather than calling ``coincidence``) if the scan completes incorrectly; otherwise it returns ``True``. See Also ======== scan, scan_c, scan_and_fill, scan_and_fill_c """ # alpha is an integer representing a "coset" # since scanning can be in two cases # 1. for alpha=0 and w in Y (i.e generating set of H) # 2. alpha in Omega (set of live cosets), w in R (relators) A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table f = alpha i = 0 r = len(word) b = alpha j = r - 1 while i <= j and table[f][A_dict[word[i]]] is not None: f = table[f][A_dict[word[i]]] i += 1 if i > j: return f == b while j >= i and table[b][A_dict_inv[word[j]]] is not None: b = table[b][A_dict_inv[word[j]]] j -= 1 if j < i: # we have an incorrect completed scan with coincidence f ~ b # return False, instead of calling coincidence routine return False elif j == i: # deduction process table[f][A_dict[word[i]]] = b table[b][A_dict_inv[word[i]]] = f return True def merge(self, k, lamda, q, w=None, modified=False): """ Merge two classes with representatives ``k`` and ``lamda``, described on Pg. 157 [1] (for pseudocode), start by putting ``p[k] = lamda``. It is more efficient to choose the new representative from the larger of the two classes being merged, i.e larger among ``k`` and ``lamda``. procedure ``merge`` performs the merging operation, adds the deleted class representative to the queue ``q``. Parameters ========== 'k', 'lamda' being the two class representatives to be merged. Notes ===== Pg. 86-87 [1] contains a description of this method. See Also ======== coincidence, rep """ p = self.p rep = self.rep phi = rep(k, modified=modified) psi = rep(lamda, modified=modified) if phi != psi: mu = min(phi, psi) v = max(phi, psi) p[v] = mu if modified: if v == phi: self.p_p[phi] = self.p_p[k]*-1wself.p_p[lamda] else: self.p_p[psi] = self.p_p[lamda]-1w*-1self.p_p[k] q.append(v) def rep(self, k, modified=False): r""" Parameters ========== `k \in [0 \ldots n-1]`, as for ``self`` only array ``p`` is used Returns ======= Representative of the class containing ``k``. Returns the representative of `\sim` class containing ``k``, it also makes some modification to array ``p`` of ``self`` to ease further computations, described on Pg. 157 [1]. The information on classes under `\sim` is stored in array `p` of ``self`` argument, which will always satisfy the property: `p[\alpha] \sim \alpha` and `p[\alpha]=\alpha \iff \alpha=rep(\alpha)` `\forall \in [0 \ldots n-1]`. So, for `\alpha \in [0 \ldots n-1]`, we find `rep(self, \alpha)` by continually replacing `\alpha` by `p[\alpha]` until it becomes constant (i.e satisfies `p[\alpha] = \alpha`):w To increase the efficiency of later ``rep`` calculations, whenever we find `rep(self, \alpha)=\beta`, we set `p[\gamma] = \beta \forall \gamma \in p-chain` from `\alpha` to `\beta` Notes ===== ``rep`` routine is also described on Pg. 85-87 [1] in Atkinson's algorithm, this results from the fact that ``coincidence`` routine introduces functionality similar to that introduced by the ``minimal_block`` routine on Pg. 85-87 [1]. See Also ======== coincidence, merge """ p = self.p lamda = k rho = p[lamda] if modified: s = p[:] while rho != lamda: if modified: s[rho] = lamda lamda = rho rho = p[lamda] if modified: rho = s[lamda] while rho != k: mu = rho rho = s[mu] p[rho] = lamda self.p_p[rho] = self.p_p[rho]self.p_p[mu] else: mu = k rho = p[mu] while rho != lamda: p[mu] = lamda mu = rho rho = p[mu] return lamda # alpha, beta coincide, i.e. alpha, beta represent the pair of cosets # where coincidence occurs def coincidence(self, alpha, beta, w=None, modified=False): r""" The third situation described in ``scan`` routine is handled by this routine, described on Pg. 156-161 [1]. The unfortunate situation when the scan completes but not correctly, then ``coincidence`` routine is run. i.e when for some `i` with `1 \le i \le r+1`, we have `w=st` with `s=x_1x_2 ... x_{i-1}`, `t=x_ix_{i+1} ... x_r`, and `\beta = \alpha^s` and `\gamma = \alph^{t-1}` are defined but unequal. This means that `\beta` and `\gamma` represent the same coset of `H` in `G`. Described on Pg. 156 [1]. ``rep`` See Also ======== scan """ A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table # behaves as a queue q = [] if modified: self.modified_merge(alpha, beta, w, q) else: self.merge(alpha, beta, q) while len(q) > 0: gamma = q.pop(0) for x in A_dict: delta = table[gamma][A_dict[x]] if delta is not None: table[delta][A_dict_inv[x]] = None mu = self.rep(gamma, modified=modified) nu = self.rep(delta, modified=modified) if table[mu][A_dict[x]] is not None: if modified: v = self.p_p[delta]-1self.P[gamma][self.A_dict[x]]*-1 v = vself.p_p[gamma]self.P[mu][self.A_dict[x]] self.modified_merge(nu, table[mu][self.A_dict[x]], v, q) else: self.merge(nu, table[mu][A_dict[x]], q) elif table[nu][A_dict_inv[x]] is not None: if modified: v = self.p_p[gamma]-1self.P[gamma][self.A_dict[x]] v = vself.p_p[delta]self.P[mu][self.A_dict_inv[x]] self.modified_merge(mu, table[nu][self.A_dict_inv[x]], v, q) else: self.merge(mu, table[nu][A_dict_inv[x]], q) else: table[mu][A_dict[x]] = nu table[nu][A_dict_inv[x]] = mu if modified: v = self.p_p[gamma]*-1self.P[gamma][self.A_dict[x]]self.p_p[delta] self.P[mu][self.A_dict[x]] = v self.P[nu][self.A_dict_inv[x]] = v-1 # method used in the HLT strategy def scan_and_fill(self, alpha, word): """ A modified version of ``scan`` routine used in the relator-based method of coset enumeration, described on pg. 162-163 [1], which follows the idea that whenever the procedure is called and the scan is incomplete then it makes new definitions to enable the scan to complete; i.e it fills in the gaps in the scan of the relator or subgroup generator. """ self.scan(alpha, word, fill=True) def scan_and_fill_c(self, alpha, word): """ A modified version of ``scan`` routine, described on Pg. 165 second para. [1], with modification similar to that of ``scan_anf_fill`` the only difference being it calls the coincidence procedure used in the coset-table based method i.e. the routine ``coincidence_c`` is used. See Also ======== scan, scan_and_fill """ A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table r = len(word) f = alpha i = 0 b = alpha j = r - 1 # loop until it has filled the alpha row in the table. while True: # do the forward scanning while i <= j and table[f][A_dict[word[i]]] is not None: f = table[f][A_dict[word[i]]] i += 1 if i > j: if f != b: self.coincidence_c(f, b) return # forward scan was incomplete, scan backwards while j >= i and table[b][A_dict_inv[word[j]]] is not None: b = table[b][A_dict_inv[word[j]]] j -= 1 if j < i: self.coincidence_c(f, b) elif j == i: table[f][A_dict[word[i]]] = b table[b][A_dict_inv[word[i]]] = f self.deduction_stack.append((f, word[i])) else: self.define_c(f, word[i]) # method used in the HLT strategy def look_ahead(self): """ When combined with the HLT method this is known as HLT+Lookahead method of coset enumeration, described on pg. 164 [1]. Whenever ``define`` aborts due to lack of space available this procedure is executed. This routine helps in recovering space resulting from "coincidence" of cosets. """ R = self.fp_group.relators p = self.p # complete scan all relators under all cosets(obviously live) # without making new definitions for beta in self.omega: for w in R: self.scan(beta, w) if p[beta] < beta: break # Pg. 166 def process_deductions(self, R_c_x, R_c_x_inv): """ Processes the deductions that have been pushed onto ``deduction_stack``, described on Pg. 166 [1] and is used in coset-table based enumeration. See Also ======== deduction_stack """ p = self.p table = self.table while len(self.deduction_stack) > 0: if len(self.deduction_stack) >= CosetTable.max_stack_size: self.look_ahead() del self.deduction_stack[:] continue else: alpha, x = self.deduction_stack.pop() if p[alpha] == alpha: for w in R_c_x: self.scan_c(alpha, w) if p[alpha] < alpha: break beta = table[alpha][self.A_dict[x]] if beta is not None and p[beta] == beta: for w in R_c_x_inv: self.scan_c(beta, w) if p[beta] < beta: break def process_deductions_check(self, R_c_x, R_c_x_inv): """ A variation of ``process_deductions``, this calls ``scan_check`` wherever ``process_deductions`` calls ``scan``, described on Pg. [1]. See Also ======== process_deductions """ table = self.table while len(self.deduction_stack) > 0: alpha, x = self.deduction_stack.pop() for w in R_c_x: if not self.scan_check(alpha, w): return False beta = table[alpha][self.A_dict[x]] if beta is not None: for w in R_c_x_inv: if not self.scan_check(beta, w): return False return True def switch(self, beta, gamma): r"""Switch the elements `\beta, \gamma \in \Omega` of ``self``, used by the ``standardize`` procedure, described on Pg. 167 [1]. See Also ======== standardize """ A = self.A A_dict = self.A_dict table = self.table for x in A: z = table[gamma][A_dict[x]] table[gamma][A_dict[x]] = table[beta][A_dict[x]] table[beta][A_dict[x]] = z for alpha in range(len(self.p)): if self.p[alpha] == alpha: if table[alpha][A_dict[x]] == beta: table[alpha][A_dict[x]] = gamma elif table[alpha][A_dict[x]] == gamma: table[alpha][A_dict[x]] = beta def standardize(self): r""" A coset table is standardized if when running through the cosets and within each coset through the generator images (ignoring generator inverses), the cosets appear in order of the integers `0, 1, , \ldots, n`. "Standardize" reorders the elements of `\Omega` such that, if we scan the coset table first by elements of `\Omega` and then by elements of A, then the cosets occur in ascending order. ``standardize()`` is used at the end of an enumeration to permute the cosets so that they occur in some sort of standard order. Notes ===== procedure is described on pg. 167-168 [1], it also makes use of the ``switch`` routine to replace by smaller integer value. Examples ======== >>> from sympy.combinatorics.free_groups import free_group >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_r >>> F, x, y = free_group("x, y") # Example 5.3 from [1] >>> f = FpGroup(F, [x2y2, x3y5]) >>> C = coset_enumeration_r(f, []) >>> C.compress() >>> C.table [[1, 3, 1, 3], [2, 0, 2, 0], [3, 1, 3, 1], [0, 2, 0, 2]] >>> C.standardize() >>> C.table [[1, 2, 1, 2], [3, 0, 3, 0], [0, 3, 0, 3], [2, 1, 2, 1]] """ A = self.A A_dict = self.A_dict gamma = 1 for alpha, x in product(range(self.n), A): beta = self.table[alpha][A_dict[x]] if beta >= gamma: if beta > gamma: self.switch(gamma, beta) gamma += 1 if gamma == self.n: return # Compression of a Coset Table def compress(self): """Removes the non-live cosets from the coset table, described on pg. 167 [1]. """ gamma = -1 A = self.A A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table chi = tuple([i for i in range(len(self.p)) if self.p[i] != i]) for alpha in self.omega: gamma += 1 if gamma != alpha: # replace alpha by gamma in coset table for x in A: beta = table[alpha][A_dict[x]] table[gamma][A_dict[x]] = beta table[beta][A_dict_inv[x]] == gamma # all the cosets in the table are live cosets self.p = list(range(gamma + 1)) # delete the useless columns del table[len(self.p):] # re-define values for row in table: for j in range(len(self.A)): row[j] -= bisect_left(chi, row[j]) def conjugates(self, R): R_c = list(chain.from_iterable((rel.cyclic_conjugates(), \ (rel-1).cyclic_conjugates()) for rel in R)) R_set = set() for conjugate in R_c: R_set = R_set.union(conjugate) R_c_list = [] for x in self.A: r = set([word for word in R_set if word[0] == x]) R_c_list.append(r) R_set.difference_update(r) return R_c_list def coset_representative(self, coset): ''' Compute the coset representative of a given coset. Examples ======== >>> from sympy.combinatorics.free_groups import free_group >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_r >>> F, x, y = free_group("x, y") >>> f = FpGroup(F, [x3, y3, x-1y*-1xy]) >>> C = coset_enumeration_r(f, [x]) >>> C.compress() >>> C.table [[0, 0, 1, 2], [1, 1, 2, 0], [2, 2, 0, 1]] >>> C.coset_representative(0) <identity> >>> C.coset_representative(1) y >>> C.coset_representative(2) y-1 ''' for x in self.A: gamma = self.table[coset][self.A_dict[x]] if coset == 0: return self.fp_group.identity if gamma < coset: return self.coset_representative(gamma)x*-1 ############################## # Modified Methods # ############################## def modified_define(self, alpha, x): r""" Define a function p_p from from [1..n] to A as an additional component of the modified coset table. Parameters ========== \alpha \in \Omega x \in A* See Also ======== define """ self.define(alpha, x, modified=True) def modified_scan(self, alpha, w, y, fill=False): r""" Parameters ========== \alpha \in \Omega w \in A* y \in (YUY^-1) fill -- `modified_scan_and_fill` when set to True. See Also ======== scan """ self.scan(alpha, w, y=y, fill=fill, modified=True) def modified_scan_and_fill(self, alpha, w, y): self.modified_scan(alpha, w, y, fill=True) def modified_merge(self, k, lamda, w, q): r""" Parameters ========== 'k', 'lamda' -- the two class representatives to be merged. q -- queue of length l of elements to be deleted from `\Omega` . w -- Word in (YUY^-1) See Also ======== merge """ self.merge(k, lamda, q, w=w, modified=True) def modified_rep(self, k): r""" Parameters ========== `k \in [0 \ldots n-1]` See Also ======== rep """ self.rep(k, modified=True) def modified_coincidence(self, alpha, beta, w): r""" Parameters ========== A coincident pair `\alpha, \beta \in \Omega, w \in Y \cup Y^{-1}` See Also ======== coincidence """ self.coincidence(alpha, beta, w=w, modified=True) ############################################################################### # COSET ENUMERATION # ############################################################################### # relator-based method def coset_enumeration_r(fp_grp, Y, max_cosets=None, draft=None, incomplete=False, modified=False): """ This is easier of the two implemented methods of coset enumeration. and is often called the HLT method, after Hazelgrove, Leech, Trotter The idea is that we make use of ``scan_and_fill`` makes new definitions whenever the scan is incomplete to enable the scan to complete; this way we fill in the gaps in the scan of the relator or subgroup generator, that's why the name relator-based method. An instance of `CosetTable` for `fp_grp` can be passed as the keyword argument `draft` in which case the coset enumeration will start with that instance and attempt to complete it. When `incomplete` is `True` and the function is unable to complete for some reason, the partially complete table will be returned. # TODO: complete the docstring See Also ======== scan_and_fill, Examples ======== >>> from sympy.combinatorics.free_groups import free_group >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_r >>> F, x, y = free_group("x, y") # Example 5.1 from [1] >>> f = FpGroup(F, [x3, y3, x-1y*-1xy]) >>> C = coset_enumeration_r(f, [x]) >>> for i in range(len(C.p)): ... if C.p[i] == i: ... print(C.table[i]) [0, 0, 1, 2] [1, 1, 2, 0] [2, 2, 0, 1] >>> C.p [0, 1, 2, 1, 1] # Example from exercises Q2 [1] >>> f = FpGroup(F, [x2y2, y-1xyx-3]) >>> C = coset_enumeration_r(f, []) >>> C.compress(); C.standardize() >>> C.table [[1, 2, 3, 4], [5, 0, 6, 7], [0, 5, 7, 6], [7, 6, 5, 0], [6, 7, 0, 5], [2, 1, 4, 3], [3, 4, 2, 1], [4, 3, 1, 2]] # Example 5.2 >>> f = FpGroup(F, [x2, y3, (xy)*3]) >>> Y = [xy] >>> C = coset_enumeration_r(f, Y) >>> for i in range(len(C.p)): ... if C.p[i] == i: ... print(C.table[i]) [1, 1, 2, 1] [0, 0, 0, 2] [3, 3, 1, 0] [2, 2, 3, 3] # Example 5.3 >>> f = FpGroup(F, [x*2y2, x3y5]) >>> Y = [] >>> C = coset_enumeration_r(f, Y) >>> for i in range(len(C.p)): ... if C.p[i] == i: ... print(C.table[i]) [1, 3, 1, 3] [2, 0, 2, 0] [3, 1, 3, 1] [0, 2, 0, 2] # Example 5.4 >>> F, a, b, c, d, e = free_group("a, b, c, d, e") >>> f = FpGroup(F, [abc-1, bcd-1, cde-1, dea-1, eab-1]) >>> Y = [a] >>> C = coset_enumeration_r(f, Y) >>> for i in range(len(C.p)): ... if C.p[i] == i: ... print(C.table[i]) [0, 0, 0, 0, 0, 0, 0, 0, 0, 0] # example of "compress" method >>> C.compress() >>> C.table [[0, 0, 0, 0, 0, 0, 0, 0, 0, 0]] # Exercises Pg. 161, Q2. >>> F, x, y = free_group("x, y") >>> f = FpGroup(F, [x2y2, y-1xyx-3]) >>> Y = [] >>> C = coset_enumeration_r(f, Y) >>> C.compress() >>> C.standardize() >>> C.table [[1, 2, 3, 4], [5, 0, 6, 7], [0, 5, 7, 6], [7, 6, 5, 0], [6, 7, 0, 5], [2, 1, 4, 3], [3, 4, 2, 1], [4, 3, 1, 2]] # John J. Cannon; Lucien A. Dimino; George Havas; Jane M. Watson # Mathematics of Computation, Vol. 27, No. 123. (Jul., 1973), pp. 463-490 # from 1973chwd.pdf # Table 1. Ex. 1 >>> F, r, s, t = free_group("r, s, t") >>> E1 = FpGroup(F, [t-1rtr-2, r-1srs-2, s-1tst-2]) >>> C = coset_enumeration_r(E1, [r]) >>> for i in range(len(C.p)): ... if C.p[i] == i: ... print(C.table[i]) [0, 0, 0, 0, 0, 0] Ex. 2 >>> F, a, b = free_group("a, b") >>> Cox = FpGroup(F, [a6, b*6, (ab)2, (a2b2)2, (a3b3)5]) >>> C = coset_enumeration_r(Cox, [a]) >>> index = 0 >>> for i in range(len(C.p)): ... if C.p[i] == i: ... index += 1 >>> index 500 # Ex. 3 >>> F, a, b = free_group("a, b") >>> B_2_4 = FpGroup(F, [a4, b4, (ab)4, (a-1b)4, (a2b)4, \ (ab2)4, (a*2b2)4, (a*-1bab)*4, (ab*-1ab)4]) >>> C = coset_enumeration_r(B_2_4, [a]) >>> index = 0 >>> for i in range(len(C.p)): ... if C.p[i] == i: ... index += 1 >>> index 1024 References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of computational group theory" """ # 1. Initialize a coset table C for < X\|R > C = CosetTable(fp_grp, Y, max_cosets=max_cosets) # Define coset table methods. if modified: _scan_and_fill = C.modified_scan_and_fill _define = C.modified_define else: _scan_and_fill = C.scan_and_fill _define = C.define if draft: C.table = draft.table[:] C.p = draft.p[:] R = fp_grp.relators A_dict = C.A_dict p = C.p for i in range(0, len(Y)): if modified: _scan_and_fill(0, Y[i], C._grp.generators[i]) else: _scan_and_fill(0, Y[i]) alpha = 0 while alpha < C.n: if p[alpha] == alpha: try: for w in R: if modified: _scan_and_fill(alpha, w, C._grp.identity) else: _scan_and_fill(alpha, w) # if alpha was eliminated during the scan then break if p[alpha] < alpha: break if p[alpha] == alpha: for x in A_dict: if C.table[alpha][A_dict[x]] is None: _define(alpha, x) except ValueError as e: if incomplete: return C raise e alpha += 1 return C def modified_coset_enumeration_r(fp_grp, Y, max_cosets=None, draft=None, incomplete=False): r""" Introduce a new set of symbols y \in Y that correspond to the generators of the subgroup. Store the elements of Y as a word P[\alpha, x] and compute the coset table similar to that of the regular coset enumeration methods. Examples ======== >>> from sympy.combinatorics.free_groups import free_group >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_r >>> from sympy.combinatorics.coset_table import modified_coset_enumeration_r >>> F, x, y = free_group("x, y") >>> f = FpGroup(F, [x3, y3, x-1y*-1xy]) >>> C = modified_coset_enumeration_r(f, [x]) >>> C.table [[0, 0, 1, 2], [1, 1, 2, 0], [2, 2, 0, 1], [None, 1, None, None], [1, 3, None, None]] See Also ======== coset_enumertation_r References ========== .. [1] Holt, D., Eick, B., O'Brien, E., "Handbook of Computational Group Theory", Section 5.3.2 """ return coset_enumeration_r(fp_grp, Y, max_cosets=max_cosets, draft=draft, incomplete=incomplete, modified=True) # Pg. 166 # coset-table based method def coset_enumeration_c(fp_grp, Y, max_cosets=None, draft=None, incomplete=False): """ >>> from sympy.combinatorics.free_groups import free_group >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_c >>> F, x, y = free_group("x, y") >>> f = FpGroup(F, [x3, y3, x-1y*-1xy]) >>> C = coset_enumeration_c(f, [x]) >>> C.table [[0, 0, 1, 2], [1, 1, 2, 0], [2, 2, 0, 1]] """ # Initialize a coset table C for < X\|R > X = fp_grp.generators R = fp_grp.relators C = CosetTable(fp_grp, Y, max_cosets=max_cosets) if draft: C.table = draft.table[:] C.p = draft.p[:] C.deduction_stack = draft.deduction_stack for alpha, x in product(range(len(C.table)), X): if not C.table[alpha][C.A_dict[x]] is None: C.deduction_stack.append((alpha, x)) A = C.A # replace all the elements by cyclic reductions R_cyc_red = [rel.identity_cyclic_reduction() for rel in R] R_c = list(chain.from_iterable((rel.cyclic_conjugates(), (rel*-1).cyclic_conjugates()) \ for rel in R_cyc_red)) R_set = set() for conjugate in R_c: R_set = R_set.union(conjugate) # a list of subsets of R_c whose words start with "x". R_c_list = [] for x in C.A: r = set([word for word in R_set if word[0] == x]) R_c_list.append(r) R_set.difference_update(r) for w in Y: C.scan_and_fill_c(0, w) for x in A: C.process_deductions(R_c_list[C.A_dict[x]], R_c_list[C.A_dict_inv[x]]) alpha = 0 while alpha < len(C.table): if C.p[alpha] == alpha: try: for x in C.A: if C.p[alpha] != alpha: break if C.table[alpha][C.A_dict[x]] is None: C.define_c(alpha, x) C.process_deductions(R_c_list[C.A_dict[x]], R_c_list[C.A_dict_inv[x]]) except ValueError as e: if incomplete: return C raise e alpha += 1 return C
416e7d3793dd26703b499abaeac945ebb356d5188b73672bbf488e88c2edb30c	from __future__ import print_function, division from sympy.core.compatibility import range from sympy.core.mul import Mul from sympy.core.singleton import S from sympy.concrete.expr_with_intlimits import ExprWithIntLimits from sympy.core.exprtools import factor_terms from sympy.functions.elementary.exponential import exp, log from sympy.polys import quo, roots from sympy.simplify import powsimp class Product(ExprWithIntLimits): r"""Represents unevaluated products. ``Product`` represents a finite or infinite product, with the first argument being the general form of terms in the series, and the second argument being ``(dummy_variable, start, end)``, with ``dummy_variable`` taking all integer values from ``start`` through ``end``. In accordance with long-standing mathematical convention, the end term is included in the product. Finite products =============== For finite products (and products with symbolic limits assumed to be finite) we follow the analogue of the summation convention described by Karr [1], especially definition 3 of section 1.4. The product: .. math:: \prod_{m \leq i < n} f(i) has the obvious meaning for `m < n`, namely: .. math:: \prod_{m \leq i < n} f(i) = f(m) f(m+1) \cdot \ldots \cdot f(n-2) f(n-1) with the upper limit value `f(n)` excluded. The product over an empty set is one if and only if `m = n`: .. math:: \prod_{m \leq i < n} f(i) = 1 \quad \mathrm{for} \quad m = n Finally, for all other products over empty sets we assume the following definition: .. math:: \prod_{m \leq i < n} f(i) = \frac{1}{\prod_{n \leq i < m} f(i)} \quad \mathrm{for} \quad m > n It is important to note that above we define all products with the upper limit being exclusive. This is in contrast to the usual mathematical notation, but does not affect the product convention. Indeed we have: .. math:: \prod_{m \leq i < n} f(i) = \prod_{i = m}^{n - 1} f(i) where the difference in notation is intentional to emphasize the meaning, with limits typeset on the top being inclusive. Examples ======== >>> from sympy.abc import a, b, i, k, m, n, x >>> from sympy import Product, factorial, oo >>> Product(k, (k, 1, m)) Product(k, (k, 1, m)) >>> Product(k, (k, 1, m)).doit() factorial(m) >>> Product(k2,(k, 1, m)) Product(k2, (k, 1, m)) >>> Product(k2,(k, 1, m)).doit() factorial(m)2 Wallis' product for pi: >>> W = Product(2i/(2i-1) * 2i/(2i+1), (i, 1, oo)) >>> W Product(4i2/((2i - 1)(2i + 1)), (i, 1, oo)) Direct computation currently fails: >>> W.doit() Product(4i2/((2i - 1)(2i + 1)), (i, 1, oo)) But we can approach the infinite product by a limit of finite products: >>> from sympy import limit >>> W2 = Product(2i/(2i-1)2i/(2i+1), (i, 1, n)) >>> W2 Product(4i*2/((2i - 1)(2i + 1)), (i, 1, n)) >>> W2e = W2.doit() >>> W2e 2*(-2n)4nfactorial(n)*2/(RisingFactorial(1/2, n)RisingFactorial(3/2, n)) >>> limit(W2e, n, oo) pi/2 By the same formula we can compute sin(pi/2): >>> from sympy import pi, gamma, simplify >>> P = pi * x * Product(1 - x2/k2, (k, 1, n)) >>> P = P.subs(x, pi/2) >>> P pi*2Product(1 - pi*2/(4k2), (k, 1, n))/2 >>> Pe = P.doit() >>> Pe pi2RisingFactorial(1 - pi/2, n)RisingFactorial(1 + pi/2, n)/(2factorial(n)2) >>> Pe = Pe.rewrite(gamma) >>> Pe pi2gamma(n + 1 + pi/2)gamma(n - pi/2 + 1)/(2gamma(1 - pi/2)gamma(1 + pi/2)gamma(n + 1)2) >>> Pe = simplify(Pe) >>> Pe sin(pi2/2)gamma(n + 1 + pi/2)gamma(n - pi/2 + 1)/gamma(n + 1)2 >>> limit(Pe, n, oo) sin(pi2/2) Products with the lower limit being larger than the upper one: >>> Product(1/i, (i, 6, 1)).doit() 120 >>> Product(i, (i, 2, 5)).doit() 120 The empty product: >>> Product(i, (i, n, n-1)).doit() 1 An example showing that the symbolic result of a product is still valid for seemingly nonsensical values of the limits. Then the Karr convention allows us to give a perfectly valid interpretation to those products by interchanging the limits according to the above rules: >>> P = Product(2, (i, 10, n)).doit() >>> P 2(n - 9) >>> P.subs(n, 5) 1/16 >>> Product(2, (i, 10, 5)).doit() 1/16 >>> 1/Product(2, (i, 6, 9)).doit() 1/16 An explicit example of the Karr summation convention applied to products: >>> P1 = Product(x, (i, a, b)).doit() >>> P1 x(-a + b + 1) >>> P2 = Product(x, (i, b+1, a-1)).doit() >>> P2 x*(a - b - 1) >>> simplify(P1 P2) 1 And another one: >>> P1 = Product(i, (i, b, a)).doit() >>> P1 RisingFactorial(b, a - b + 1) >>> P2 = Product(i, (i, a+1, b-1)).doit() >>> P2 RisingFactorial(a + 1, -a + b - 1) >>> P1 * P2 RisingFactorial(b, a - b + 1)RisingFactorial(a + 1, -a + b - 1) >>> simplify(P1 P2) 1 See Also ======== Sum, summation product References ========== .. [1] Michael Karr, "Summation in Finite Terms", Journal of the ACM, Volume 28 Issue 2, April 1981, Pages 305-350 http://dl.acm.org/citation.cfm?doid=322248.322255 .. [2] https://en.wikipedia.org/wiki/Multiplication#Capital_Pi_notation .. [3] https://en.wikipedia.org/wiki/Empty_product """ __slots__ = ['is_commutative'] def __new__(cls, function, symbols, assumptions): obj = ExprWithIntLimits.__new__(cls, function, symbols, *assumptions) return obj def _eval_rewrite_as_Sum(self, args, *kwargs): from sympy.concrete.summations import Sum return exp(Sum(log(self.function), self.limits)) @property def term(self): return self._args[0] function = term def _eval_is_zero(self): # a Product is zero only if its term is zero. return self.term.is_zero def doit(self, *hints): f = self.function for index, limit in enumerate(self.limits): i, a, b = limit dif = b - a if dif.is_Integer and dif < 0: a, b = b + 1, a - 1 f = 1 / f g = self._eval_product(f, (i, a, b)) if g in (None, S.NaN): return self.func(powsimp(f), self.limits[index:]) else: f = g if hints.get('deep', True): return f.doit(*hints) else: return powsimp(f) def _eval_adjoint(self): if self.is_commutative: return self.func(self.function.adjoint(), self.limits) return None def _eval_conjugate(self): return self.func(self.function.conjugate(), self.limits) def _eval_product(self, term, limits): from sympy.concrete.delta import deltaproduct, _has_simple_delta from sympy.concrete.summations import summation from sympy.functions import KroneckerDelta, RisingFactorial (k, a, n) = limits if k not in term.free_symbols: if (term - 1).is_zero: return S.One return term(n - a + 1) if a == n: return term.subs(k, a) if term.has(KroneckerDelta) and _has_simple_delta(term, limits[0]): return deltaproduct(term, limits) dif = n - a if dif.is_Integer: return Mul([term.subs(k, a + i) for i in range(dif + 1)]) elif term.is_polynomial(k): poly = term.as_poly(k) A = B = Q = S.One all_roots = roots(poly) M = 0 for r, m in all_roots.items(): M += m A = RisingFactorial(a - r, n - a + 1)m Q = (n - r)m if M < poly.degree(): arg = quo(poly, Q.as_poly(k)) B = self.func(arg, (k, a, n)).doit() return poly.LC()(n - a + 1) * A * B elif term.is_Add: factored = factor_terms(term, fraction=True) if factored.is_Mul: return self._eval_product(factored, (k, a, n)) elif term.is_Mul: exclude, include = [], [] for t in term.args: p = self._eval_product(t, (k, a, n)) if p is not None: exclude.append(p) else: include.append(t) if not exclude: return None else: arg = term._new_rawargs(include) A = Mul(exclude) B = self.func(arg, (k, a, n)).doit() return A * B elif term.is_Pow: if not term.base.has(k): s = summation(term.exp, (k, a, n)) return term.bases elif not term.exp.has(k): p = self._eval_product(term.base, (k, a, n)) if p is not None: return pterm.exp elif isinstance(term, Product): evaluated = term.doit() f = self._eval_product(evaluated, limits) if f is None: return self.func(evaluated, limits) else: return f def _eval_simplify(self, *kwargs): from sympy.simplify.simplify import product_simplify rv = product_simplify(self) return rv.doit() if kwargs['doit'] else rv def _eval_transpose(self): if self.is_commutative: return self.func(self.function.transpose(), self.limits) return None def is_convergent(self): r""" See docs of Sum.is_convergent() for explanation of convergence in SymPy. The infinite product: .. math:: \prod_{1 \leq i < \infty} f(i) is defined by the sequence of partial products: .. math:: \prod_{i=1}^{n} f(i) = f(1) f(2) \cdots f(n) as n increases without bound. The product converges to a non-zero value if and only if the sum: .. math:: \sum_{1 \leq i < \infty} \log{f(n)} converges. Examples ======== >>> from sympy import Interval, S, Product, Symbol, cos, pi, exp, oo >>> n = Symbol('n', integer=True) >>> Product(n/(n + 1), (n, 1, oo)).is_convergent() False >>> Product(1/n2, (n, 1, oo)).is_convergent() False >>> Product(cos(pi/n), (n, 1, oo)).is_convergent() True >>> Product(exp(-n2), (n, 1, oo)).is_convergent() False References ========== .. [1] https://en.wikipedia.org/wiki/Infinite_product """ from sympy.concrete.summations import Sum sequence_term = self.function log_sum = log(sequence_term) lim = self.limits try: is_conv = Sum(log_sum, lim).is_convergent() except NotImplementedError: if Sum(sequence_term - 1, lim).is_absolutely_convergent() is S.true: return S.true raise NotImplementedError("The algorithm to find the product convergence of %s " "is not yet implemented" % (sequence_term)) return is_conv def reverse_order(expr, indices): """ Reverse the order of a limit in a Product. Usage ===== ``reverse_order(expr, indices)`` reverses some limits in the expression ``expr`` which can be either a ``Sum`` or a ``Product``. The selectors in the argument ``indices`` specify some indices whose limits get reversed. These selectors are either variable names or numerical indices counted starting from the inner-most limit tuple. Examples ======== >>> from sympy import Product, simplify, RisingFactorial, gamma, Sum >>> from sympy.abc import x, y, a, b, c, d >>> P = Product(x, (x, a, b)) >>> Pr = P.reverse_order(x) >>> Pr Product(1/x, (x, b + 1, a - 1)) >>> Pr = Pr.doit() >>> Pr 1/RisingFactorial(b + 1, a - b - 1) >>> simplify(Pr) gamma(b + 1)/gamma(a) >>> P = P.doit() >>> P RisingFactorial(a, -a + b + 1) >>> simplify(P) gamma(b + 1)/gamma(a) While one should prefer variable names when specifying which limits to reverse, the index counting notation comes in handy in case there are several symbols with the same name. >>> S = Sum(xy, (x, a, b), (y, c, d)) >>> S Sum(xy, (x, a, b), (y, c, d)) >>> S0 = S.reverse_order(0) >>> S0 Sum(-xy, (x, b + 1, a - 1), (y, c, d)) >>> S1 = S0.reverse_order(1) >>> S1 Sum(xy, (x, b + 1, a - 1), (y, d + 1, c - 1)) Of course we can mix both notations: >>> Sum(xy, (x, a, b), (y, 2, 5)).reverse_order(x, 1) Sum(xy, (x, b + 1, a - 1), (y, 6, 1)) >>> Sum(xy, (x, a, b), (y, 2, 5)).reverse_order(y, x) Sum(xy, (x, b + 1, a - 1), (y, 6, 1)) See Also ======== index, reorder_limit, reorder References ========== .. [1] Michael Karr, "Summation in Finite Terms", Journal of the ACM, Volume 28 Issue 2, April 1981, Pages 305-350 http://dl.acm.org/citation.cfm?doid=322248.322255 """ l_indices = list(indices) for i, indx in enumerate(l_indices): if not isinstance(indx, int): l_indices[i] = expr.index(indx) e = 1 limits = [] for i, limit in enumerate(expr.limits): l = limit if i in l_indices: e = -e l = (limit[0], limit[2] + 1, limit[1] - 1) limits.append(l) return Product(expr.function ** e, limits) def product(args, kwargs): r""" Compute the product. The notation for symbols is similar to the notation used in Sum or Integral. product(f, (i, a, b)) computes the product of f with respect to i from a to b, i.e., :: b _____ product(f(n), (i, a, b)) = \| \| f(n) \| \| i = a If it cannot compute the product, it returns an unevaluated Product object. Repeated products can be computed by introducing additional symbols tuples:: >>> from sympy import product, symbols >>> i, n, m, k = symbols('i n m k', integer=True) >>> product(i, (i, 1, k)) factorial(k) >>> product(m, (i, 1, k)) mk >>> product(i, (i, 1, k), (k, 1, n)) Product(factorial(k), (k, 1, n)) """ prod = Product(args, *kwargs) if isinstance(prod, Product): return prod.doit(deep=False) else: return prod
58a007652606de30a9a8fffcb417ddc7f7f13f62837cc5cd9a0610b6d4e93cfc	from __future__ import print_function, division from sympy.core.add import Add from sympy.core.compatibility import is_sequence from sympy.core.containers import Tuple from sympy.core.expr import Expr from sympy.core.mul import Mul from sympy.core.relational import Equality, Relational from sympy.core.singleton import S from sympy.core.symbol import Symbol, Dummy from sympy.core.sympify import sympify from sympy.functions.elementary.piecewise import (piecewise_fold, Piecewise) from sympy.logic.boolalg import BooleanFunction from sympy.matrices import Matrix from sympy.tensor.indexed import Idx from sympy.sets.sets import Interval from sympy.sets.fancysets import Range from sympy.utilities import flatten from sympy.utilities.iterables import sift def _common_new(cls, function, symbols, assumptions): """Return either a special return value or the tuple, (function, limits, orientation). This code is common to both ExprWithLimits and AddWithLimits.""" function = sympify(function) if hasattr(function, 'func') and isinstance(function, Equality): lhs = function.lhs rhs = function.rhs return Equality(cls(lhs, symbols, *assumptions), \ cls(rhs, symbols, *assumptions)) if function is S.NaN: return S.NaN if symbols: limits, orientation = _process_limits(symbols) for i, li in enumerate(limits): if len(li) == 4: function = function.subs(li[0], li[-1]) limits[i] = tuple(li[:-1]) else: # symbol not provided -- we can still try to compute a general form free = function.free_symbols if len(free) != 1: raise ValueError( "specify dummy variables for %s" % function) limits, orientation = [Tuple(s) for s in free], 1 # denest any nested calls while cls == type(function): limits = list(function.limits) + limits function = function.function # Any embedded piecewise functions need to be brought out to the # top level. We only fold Piecewise that contain the integration # variable. reps = {} symbols_of_integration = set([i[0] for i in limits]) for p in function.atoms(Piecewise): if not p.has(symbols_of_integration): reps[p] = Dummy() # mask off those that don't function = function.xreplace(reps) # do the fold function = piecewise_fold(function) # remove the masking function = function.xreplace({v: k for k, v in reps.items()}) return function, limits, orientation def _process_limits(symbols): """Process the list of symbols and convert them to canonical limits, storing them as Tuple(symbol, lower, upper). The orientation of the function is also returned when the upper limit is missing so (x, 1, None) becomes (x, None, 1) and the orientation is changed. """ limits = [] orientation = 1 for V in symbols: if isinstance(V, (Relational, BooleanFunction)): variable = V.atoms(Symbol).pop() V = (variable, V.as_set()) if isinstance(V, Symbol) or getattr(V, '_diff_wrt', False): if isinstance(V, Idx): if V.lower is None or V.upper is None: limits.append(Tuple(V)) else: limits.append(Tuple(V, V.lower, V.upper)) else: limits.append(Tuple(V)) continue elif is_sequence(V, Tuple): if len(V) == 2 and isinstance(V[1], Range): lo = V[1].inf hi = V[1].sup dx = abs(V[1].step) V = [V[0]] + [0, (hi - lo)//dx, dxV[0] + lo] V = sympify(flatten(V)) # a list of sympified elements if isinstance(V[0], (Symbol, Idx)) or getattr(V[0], '_diff_wrt', False): newsymbol = V[0] if len(V) == 2 and isinstance(V[1], Interval): # 2 -> 3 # Interval V[1:] = [V[1].start, V[1].end] elif len(V) == 3: # general case if V[2] is None and not V[1] is None: orientation = -1 V = [newsymbol] + [i for i in V[1:] if i is not None] if not isinstance(newsymbol, Idx) or len(V) == 3: if len(V) == 4: limits.append(Tuple(V)) continue if len(V) == 3: if isinstance(newsymbol, Idx): # Idx represents an integer which may have # specified values it can take on; if it is # given such a value, an error is raised here # if the summation would try to give it a larger # or smaller value than permitted. None and Symbolic # values will not raise an error. lo, hi = newsymbol.lower, newsymbol.upper try: if lo is not None and not bool(V[1] >= lo): raise ValueError("Summation will set Idx value too low.") except TypeError: pass try: if hi is not None and not bool(V[2] <= hi): raise ValueError("Summation will set Idx value too high.") except TypeError: pass limits.append(Tuple(V)) continue if len(V) == 1 or (len(V) == 2 and V[1] is None): limits.append(Tuple(newsymbol)) continue elif len(V) == 2: limits.append(Tuple(newsymbol, V[1])) continue raise ValueError('Invalid limits given: %s' % str(symbols)) return limits, orientation class ExprWithLimits(Expr): __slots__ = ['is_commutative'] def __new__(cls, function, symbols, assumptions): pre = _common_new(cls, function, symbols, assumptions) if type(pre) is tuple: function, limits, _ = pre else: return pre # limits must have upper and lower bounds; the indefinite form # is not supported. This restriction does not apply to AddWithLimits if any(len(l) != 3 or None in l for l in limits): raise ValueError('ExprWithLimits requires values for lower and upper bounds.') obj = Expr.__new__(cls, assumptions) arglist = [function] arglist.extend(limits) obj._args = tuple(arglist) obj.is_commutative = function.is_commutative # limits already checked return obj @property def function(self): """Return the function applied across limits. Examples ======== >>> from sympy import Integral >>> from sympy.abc import x >>> Integral(x2, (x,)).function x2 See Also ======== limits, variables, free_symbols """ return self._args[0] @property def limits(self): """Return the limits of expression. Examples ======== >>> from sympy import Integral >>> from sympy.abc import x, i >>> Integral(xi, (i, 1, 3)).limits ((i, 1, 3),) See Also ======== function, variables, free_symbols """ return self._args[1:] @property def variables(self): """Return a list of the limit variables. >>> from sympy import Sum >>> from sympy.abc import x, i >>> Sum(xi, (i, 1, 3)).variables [i] See Also ======== function, limits, free_symbols as_dummy : Rename dummy variables transform : Perform mapping on the dummy variable """ return [l[0] for l in self.limits] @property def bound_symbols(self): """Return only variables that are dummy variables. Examples ======== >>> from sympy import Integral >>> from sympy.abc import x, i, j, k >>> Integral(x*i, (i, 1, 3), (j, 2), k).bound_symbols [i, j] See Also ======== function, limits, free_symbols as_dummy : Rename dummy variables transform : Perform mapping on the dummy variable """ return [l[0] for l in self.limits if len(l) != 1] @property def free_symbols(self): """ This method returns the symbols in the object, excluding those that take on a specific value (i.e. the dummy symbols). Examples ======== >>> from sympy import Sum >>> from sympy.abc import x, y >>> Sum(x, (x, y, 1)).free_symbols {y} """ # don't test for any special values -- nominal free symbols # should be returned, e.g. don't return set() if the # function is zero -- treat it like an unevaluated expression. function, limits = self.function, self.limits isyms = function.free_symbols for xab in limits: if len(xab) == 1: isyms.add(xab[0]) continue # take out the target symbol if xab[0] in isyms: isyms.remove(xab[0]) # add in the new symbols for i in xab[1:]: isyms.update(i.free_symbols) return isyms @property def is_number(self): """Return True if the Sum has no free symbols, else False.""" return not self.free_symbols def _eval_interval(self, x, a, b): limits = [(i if i[0] != x else (x, a, b)) for i in self.limits] integrand = self.function return self.func(integrand, limits) def _eval_subs(self, old, new): """ Perform substitutions over non-dummy variables of an expression with limits. Also, can be used to specify point-evaluation of an abstract antiderivative. Examples ======== >>> from sympy import Sum, oo >>> from sympy.abc import s, n >>> Sum(1/ns, (n, 1, oo)).subs(s, 2) Sum(n(-2), (n, 1, oo)) >>> from sympy import Integral >>> from sympy.abc import x, a >>> Integral(ax2, x).subs(x, 4) Integral(ax*2, (x, 4)) See Also ======== variables : Lists the integration variables transform : Perform mapping on the dummy variable for integrals change_index : Perform mapping on the sum and product dummy variables """ from sympy.core.function import AppliedUndef, UndefinedFunction func, limits = self.function, list(self.limits) # If one of the expressions we are replacing is used as a func index # one of two things happens. # - the old variable first appears as a free variable # so we perform all free substitutions before it becomes # a func index. # - the old variable first appears as a func index, in # which case we ignore. See change_index. # Reorder limits to match standard mathematical practice for scoping limits.reverse() if not isinstance(old, Symbol) or \ old.free_symbols.intersection(self.free_symbols): sub_into_func = True for i, xab in enumerate(limits): if 1 == len(xab) and old == xab[0]: if new._diff_wrt: xab = (new,) else: xab = (old, old) limits[i] = Tuple(xab[0], [l._subs(old, new) for l in xab[1:]]) if len(xab[0].free_symbols.intersection(old.free_symbols)) != 0: sub_into_func = False break if isinstance(old, AppliedUndef) or isinstance(old, UndefinedFunction): sy2 = set(self.variables).intersection(set(new.atoms(Symbol))) sy1 = set(self.variables).intersection(set(old.args)) if not sy2.issubset(sy1): raise ValueError( "substitution can not create dummy dependencies") sub_into_func = True if sub_into_func: func = func.subs(old, new) else: # old is a Symbol and a dummy variable of some limit for i, xab in enumerate(limits): if len(xab) == 3: limits[i] = Tuple(xab[0], [l._subs(old, new) for l in xab[1:]]) if old == xab[0]: break # simplify redundant limits (x, x) to (x, ) for i, xab in enumerate(limits): if len(xab) == 2 and (xab[0] - xab[1]).is_zero: limits[i] = Tuple(xab[0], ) # Reorder limits back to representation-form limits.reverse() return self.func(func, limits) class AddWithLimits(ExprWithLimits): r"""Represents unevaluated oriented additions. Parent class for Integral and Sum. """ def __new__(cls, function, symbols, assumptions): pre = _common_new(cls, function, symbols, assumptions) if type(pre) is tuple: function, limits, orientation = pre else: return pre obj = Expr.__new__(cls, assumptions) arglist = [orientationfunction] # orientation not used in ExprWithLimits arglist.extend(limits) obj._args = tuple(arglist) obj.is_commutative = function.is_commutative # limits already checked return obj def _eval_adjoint(self): if all([x.is_real for x in flatten(self.limits)]): return self.func(self.function.adjoint(), self.limits) return None def _eval_conjugate(self): if all([x.is_real for x in flatten(self.limits)]): return self.func(self.function.conjugate(), self.limits) return None def _eval_transpose(self): if all([x.is_real for x in flatten(self.limits)]): return self.func(self.function.transpose(), self.limits) return None def _eval_factor(self, hints): if 1 == len(self.limits): summand = self.function.factor(hints) if summand.is_Mul: out = sift(summand.args, lambda w: w.is_commutative \ and not set(self.variables) & w.free_symbols) return Mul(out[True])self.func(Mul(out[False]), \ self.limits) else: summand = self.func(self.function, self.limits[0:-1]).factor() if not summand.has(self.variables[-1]): return self.func(1, [self.limits[-1]]).doit()summand elif isinstance(summand, Mul): return self.func(summand, self.limits[-1]).factor() return self def _eval_expand_basic(self, hints): from sympy.matrices.matrices import MatrixBase summand = self.function.expand(hints) if summand.is_Add and summand.is_commutative: return Add([self.func(i, self.limits) for i in summand.args]) elif isinstance(summand, MatrixBase): return summand.applyfunc(lambda x: self.func(x, self.limits)) elif summand != self.function: return self.func(summand, self.limits) return self
6da50dccc16ff8447129b1e91a1933ffc4110096e71c5d024d81e5907dea1d11	from __future__ import print_function, division from sympy.calculus.singularities import is_decreasing from sympy.calculus.util import AccumulationBounds from sympy.concrete.expr_with_limits import AddWithLimits from sympy.concrete.expr_with_intlimits import ExprWithIntLimits from sympy.concrete.gosper import gosper_sum from sympy.core.add import Add from sympy.core.compatibility import range from sympy.core.function import Derivative from sympy.core.mul import Mul from sympy.core.relational import Eq from sympy.core.singleton import S from sympy.core.symbol import Dummy, Wild, Symbol from sympy.functions.special.zeta_functions import zeta from sympy.functions.elementary.piecewise import Piecewise from sympy.logic.boolalg import And from sympy.polys import apart, PolynomialError, together from sympy.series.limitseq import limit_seq from sympy.series.order import O from sympy.sets.sets import FiniteSet from sympy.simplify import denom from sympy.simplify.combsimp import combsimp from sympy.simplify.powsimp import powsimp from sympy.solvers import solve from sympy.solvers.solveset import solveset import itertools class Sum(AddWithLimits, ExprWithIntLimits): r"""Represents unevaluated summation. ``Sum`` represents a finite or infinite series, with the first argument being the general form of terms in the series, and the second argument being ``(dummy_variable, start, end)``, with ``dummy_variable`` taking all integer values from ``start`` through ``end``. In accordance with long-standing mathematical convention, the end term is included in the summation. Finite sums =========== For finite sums (and sums with symbolic limits assumed to be finite) we follow the summation convention described by Karr [1], especially definition 3 of section 1.4. The sum: .. math:: \sum_{m \leq i < n} f(i) has the obvious meaning for `m < n`, namely: .. math:: \sum_{m \leq i < n} f(i) = f(m) + f(m+1) + \ldots + f(n-2) + f(n-1) with the upper limit value `f(n)` excluded. The sum over an empty set is zero if and only if `m = n`: .. math:: \sum_{m \leq i < n} f(i) = 0 \quad \mathrm{for} \quad m = n Finally, for all other sums over empty sets we assume the following definition: .. math:: \sum_{m \leq i < n} f(i) = - \sum_{n \leq i < m} f(i) \quad \mathrm{for} \quad m > n It is important to note that Karr defines all sums with the upper limit being exclusive. This is in contrast to the usual mathematical notation, but does not affect the summation convention. Indeed we have: .. math:: \sum_{m \leq i < n} f(i) = \sum_{i = m}^{n - 1} f(i) where the difference in notation is intentional to emphasize the meaning, with limits typeset on the top being inclusive. Examples ======== >>> from sympy.abc import i, k, m, n, x >>> from sympy import Sum, factorial, oo, IndexedBase, Function >>> Sum(k, (k, 1, m)) Sum(k, (k, 1, m)) >>> Sum(k, (k, 1, m)).doit() m2/2 + m/2 >>> Sum(k2, (k, 1, m)) Sum(k2, (k, 1, m)) >>> Sum(k2, (k, 1, m)).doit() m3/3 + m2/2 + m/6 >>> Sum(xk, (k, 0, oo)) Sum(xk, (k, 0, oo)) >>> Sum(xk, (k, 0, oo)).doit() Piecewise((1/(1 - x), Abs(x) < 1), (Sum(xk, (k, 0, oo)), True)) >>> Sum(xk/factorial(k), (k, 0, oo)).doit() exp(x) Here are examples to do summation with symbolic indices. You can use either Function of IndexedBase classes: >>> f = Function('f') >>> Sum(f(n), (n, 0, 3)).doit() f(0) + f(1) + f(2) + f(3) >>> Sum(f(n), (n, 0, oo)).doit() Sum(f(n), (n, 0, oo)) >>> f = IndexedBase('f') >>> Sum(f[n]2, (n, 0, 3)).doit() f[0]2 + f[1]2 + f[2]2 + f[3]2 An example showing that the symbolic result of a summation is still valid for seemingly nonsensical values of the limits. Then the Karr convention allows us to give a perfectly valid interpretation to those sums by interchanging the limits according to the above rules: >>> S = Sum(i, (i, 1, n)).doit() >>> S n2/2 + n/2 >>> S.subs(n, -4) 6 >>> Sum(i, (i, 1, -4)).doit() 6 >>> Sum(-i, (i, -3, 0)).doit() 6 An explicit example of the Karr summation convention: >>> S1 = Sum(i2, (i, m, m+n-1)).doit() >>> S1 m*2n + mn2 - mn + n3/3 - n2/2 + n/6 >>> S2 = Sum(i2, (i, m+n, m-1)).doit() >>> S2 -m2n - mn*2 + mn - n3/3 + n2/2 - n/6 >>> S1 + S2 0 >>> S3 = Sum(i, (i, m, m-1)).doit() >>> S3 0 See Also ======== summation Product, product References ========== .. [1] Michael Karr, "Summation in Finite Terms", Journal of the ACM, Volume 28 Issue 2, April 1981, Pages 305-350 http://dl.acm.org/citation.cfm?doid=322248.322255 .. [2] https://en.wikipedia.org/wiki/Summation#Capital-sigma_notation .. [3] https://en.wikipedia.org/wiki/Empty_sum """ __slots__ = ['is_commutative'] def __new__(cls, function, symbols, assumptions): obj = AddWithLimits.__new__(cls, function, symbols, assumptions) if not hasattr(obj, 'limits'): return obj if any(len(l) != 3 or None in l for l in obj.limits): raise ValueError('Sum requires values for lower and upper bounds.') return obj def _eval_is_zero(self): # a Sum is only zero if its function is zero or if all terms # cancel out. This only answers whether the summand is zero; if # not then None is returned since we don't analyze whether all # terms cancel out. if self.function.is_zero: return True def doit(self, hints): if hints.get('deep', True): f = self.function.doit(*hints) else: f = self.function if self.function.is_Matrix: expanded = self.expand() if self != expanded: return expanded.doit() return self for n, limit in enumerate(self.limits): i, a, b = limit dif = b - a if dif.is_integer and (dif < 0) == True: a, b = b + 1, a - 1 f = -f newf = eval_sum(f, (i, a, b)) if newf is None: if f == self.function: zeta_function = self.eval_zeta_function(f, (i, a, b)) if zeta_function is not None: return zeta_function return self else: return self.func(f, self.limits[n:]) f = newf if hints.get('deep', True): # eval_sum could return partially unevaluated # result with Piecewise. In this case we won't # doit() recursively. if not isinstance(f, Piecewise): return f.doit(*hints) return f def eval_zeta_function(self, f, limits): """ Check whether the function matches with the zeta function. If it matches, then return a `Piecewise` expression because zeta function does not converge unless `s > 1` and `q > 0` """ i, a, b = limits w, y, z = Wild('w', exclude=[i]), Wild('y', exclude=[i]), Wild('z', exclude=[i]) result = f.match((w i + y) (-z)) if result is not None and b == S.Infinity: coeff = 1 / result[w] result[z] s = result[z] q = result[y] / result[w] + a return Piecewise((coeff * zeta(s, q), And(q > 0, s > 1)), (self, True)) def _eval_derivative(self, x): """ Differentiate wrt x as long as x is not in the free symbols of any of the upper or lower limits. Sum(abx, (x, 1, a)) can be differentiated wrt x or b but not `a` since the value of the sum is discontinuous in `a`. In a case involving a limit variable, the unevaluated derivative is returned. """ # diff already confirmed that x is in the free symbols of self, but we # don't want to differentiate wrt any free symbol in the upper or lower # limits # XXX remove this test for free_symbols when the default _eval_derivative is in if isinstance(x, Symbol) and x not in self.free_symbols: return S.Zero # get limits and the function f, limits = self.function, list(self.limits) limit = limits.pop(-1) if limits: # f is the argument to a Sum f = self.func(f, limits) if len(limit) == 3: _, a, b = limit if x in a.free_symbols or x in b.free_symbols: return None df = Derivative(f, x, evaluate=True) rv = self.func(df, limit) return rv else: return NotImplementedError('Lower and upper bound expected.') def _eval_difference_delta(self, n, step): k, _, upper = self.args[-1] new_upper = upper.subs(n, n + step) if len(self.args) == 2: f = self.args[0] else: f = self.func(self.args[:-1]) return Sum(f, (k, upper + 1, new_upper)).doit() def _eval_simplify(self, *kwargs): from sympy.simplify.simplify import factor_sum, sum_combine from sympy.core.function import expand from sympy.core.mul import Mul # split the function into adds terms = Add.make_args(expand(self.function)) s_t = [] # Sum Terms o_t = [] # Other Terms for term in terms: if term.has(Sum): # if there is an embedded sum here # it is of the form x (Sum(whatever)) # hence we make a Mul out of it, and simplify all interior sum terms subterms = Mul.make_args(expand(term)) out_terms = [] for subterm in subterms: # go through each term if isinstance(subterm, Sum): # if it's a sum, simplify it out_terms.append(subterm._eval_simplify()) else: # otherwise, add it as is out_terms.append(subterm) # turn it back into a Mul s_t.append(Mul(out_terms)) else: o_t.append(term) # next try to combine any interior sums for further simplification result = Add(sum_combine(s_t), o_t) return factor_sum(result, limits=self.limits) def _eval_summation(self, f, x): return None def is_convergent(self): r"""Checks for the convergence of a Sum. We divide the study of convergence of infinite sums and products in two parts. First Part: One part is the question whether all the terms are well defined, i.e., they are finite in a sum and also non-zero in a product. Zero is the analogy of (minus) infinity in products as :math:`e^{-\infty} = 0`. Second Part: The second part is the question of convergence after infinities, and zeros in products, have been omitted assuming that their number is finite. This means that we only consider the tail of the sum or product, starting from some point after which all terms are well defined. For example, in a sum of the form: .. math:: \sum_{1 \leq i < \infty} \frac{1}{n^2 + an + b} where a and b are numbers. The routine will return true, even if there are infinities in the term sequence (at most two). An analogous product would be: .. math:: \prod_{1 \leq i < \infty} e^{\frac{1}{n^2 + an + b}} This is how convergence is interpreted. It is concerned with what happens at the limit. Finding the bad terms is another independent matter. Note: It is responsibility of user to see that the sum or product is well defined. There are various tests employed to check the convergence like divergence test, root test, integral test, alternating series test, comparison tests, Dirichlet tests. It returns true if Sum is convergent and false if divergent and NotImplementedError if it can not be checked. References ========== .. [1] https://en.wikipedia.org/wiki/Convergence_tests Examples ======== >>> from sympy import factorial, S, Sum, Symbol, oo >>> n = Symbol('n', integer=True) >>> Sum(n/(n - 1), (n, 4, 7)).is_convergent() True >>> Sum(n/(2n + 1), (n, 1, oo)).is_convergent() False >>> Sum(factorial(n)/5n, (n, 1, oo)).is_convergent() False >>> Sum(1/n(S(6)/5), (n, 1, oo)).is_convergent() True See Also ======== Sum.is_absolutely_convergent() Product.is_convergent() """ from sympy import Interval, Integral, log, symbols, simplify p, q, r = symbols('p q r', cls=Wild) sym = self.limits[0][0] lower_limit = self.limits[0][1] upper_limit = self.limits[0][2] sequence_term = self.function if len(sequence_term.free_symbols) > 1: raise NotImplementedError("convergence checking for more than one symbol " "containing series is not handled") if lower_limit.is_finite and upper_limit.is_finite: return S.true # transform sym -> -sym and swap the upper_limit = S.Infinity # and lower_limit = - upper_limit if lower_limit is S.NegativeInfinity: if upper_limit is S.Infinity: return Sum(sequence_term, (sym, 0, S.Infinity)).is_convergent() and \ Sum(sequence_term, (sym, S.NegativeInfinity, 0)).is_convergent() sequence_term = simplify(sequence_term.xreplace({sym: -sym})) lower_limit = -upper_limit upper_limit = S.Infinity sym_ = Dummy(sym.name, integer=True, positive=True) sequence_term = sequence_term.xreplace({sym: sym_}) sym = sym_ interval = Interval(lower_limit, upper_limit) # Piecewise function handle if sequence_term.is_Piecewise: for func, cond in sequence_term.args: # see if it represents something going to oo if cond == True or cond.as_set().sup is S.Infinity: s = Sum(func, (sym, lower_limit, upper_limit)) return s.is_convergent() return S.true ### -------- Divergence test ----------- ### try: lim_val = limit_seq(sequence_term, sym) if lim_val is not None and lim_val.is_zero is False: return S.false except NotImplementedError: pass try: lim_val_abs = limit_seq(abs(sequence_term), sym) if lim_val_abs is not None and lim_val_abs.is_zero is False: return S.false except NotImplementedError: pass order = O(sequence_term, (sym, S.Infinity)) ### --------- p-series test (1/np) ---------- ### p1_series_test = order.expr.match(symp) if p1_series_test is not None: if p1_series_test[p] < -1: return S.true if p1_series_test[p] >= -1: return S.false p2_series_test = order.expr.match((1/sym)p) if p2_series_test is not None: if p2_series_test[p] > 1: return S.true if p2_series_test[p] <= 1: return S.false ### ------------- comparison test ------------- ### # 1/(nplog(n)*qlog(log(n))r) comparison n_log_test = order.expr.match(1/(symplog(sym)qlog(log(sym))*r)) if n_log_test is not None: if (n_log_test[p] > 1 or (n_log_test[p] == 1 and n_log_test[q] > 1) or (n_log_test[p] == n_log_test[q] == 1 and n_log_test[r] > 1)): return S.true return S.false ### ------------- Limit comparison test -----------### # (1/n) comparison try: lim_comp = limit_seq(symsequence_term, sym) if lim_comp is not None and lim_comp.is_number and lim_comp > 0: return S.false except NotImplementedError: pass ### ----------- ratio test ---------------- ### next_sequence_term = sequence_term.xreplace({sym: sym + 1}) ratio = combsimp(powsimp(next_sequence_term/sequence_term)) try: lim_ratio = limit_seq(ratio, sym) if lim_ratio is not None and lim_ratio.is_number: if abs(lim_ratio) > 1: return S.false if abs(lim_ratio) < 1: return S.true except NotImplementedError: pass ### ----------- root test ---------------- ### # lim = Limit(abs(sequence_term)(1/sym), sym, S.Infinity) try: lim_evaluated = limit_seq(abs(sequence_term)(1/sym), sym) if lim_evaluated is not None and lim_evaluated.is_number: if lim_evaluated < 1: return S.true if lim_evaluated > 1: return S.false except NotImplementedError: pass ### ------------- alternating series test ----------- ### dict_val = sequence_term.match((-1)*(sym + p)q) if not dict_val[p].has(sym) and is_decreasing(dict_val[q], interval): return S.true ### ------------- integral test -------------- ### check_interval = None maxima = solveset(sequence_term.diff(sym), sym, interval) if not maxima: check_interval = interval elif isinstance(maxima, FiniteSet) and maxima.sup.is_number: check_interval = Interval(maxima.sup, interval.sup) if (check_interval is not None and (is_decreasing(sequence_term, check_interval) or is_decreasing(-sequence_term, check_interval))): integral_val = Integral( sequence_term, (sym, lower_limit, upper_limit)) try: integral_val_evaluated = integral_val.doit() if integral_val_evaluated.is_number: return S(integral_val_evaluated.is_finite) except NotImplementedError: pass ### ----- Dirichlet and bounded times convergent tests ----- ### # TODO # # Dirichlet_test # https://en.wikipedia.org/wiki/Dirichlet%27s_test # # Bounded times convergent test # It is based on comparison theorems for series. # In particular, if the general term of a series can # be written as a product of two terms a_n and b_n # and if a_n is bounded and if Sum(b_n) is absolutely # convergent, then the original series Sum(a_n * b_n) # is absolutely convergent and so convergent. # # The following code can grows like 2*n where n is the # number of args in order.expr # Possibly combined with the potentially slow checks # inside the loop, could make this test extremely slow # for larger summation expressions. if order.expr.is_Mul: args = order.expr.args argset = set(args) ### -------------- Dirichlet tests -------------- ### m = Dummy('m', integer=True) def _dirichlet_test(g_n): try: ing_val = limit_seq(Sum(g_n, (sym, interval.inf, m)).doit(), m) if ing_val is not None and ing_val.is_finite: return S.true except NotImplementedError: pass ### -------- bounded times convergent test ---------### def _bounded_convergent_test(g1_n, g2_n): try: lim_val = limit_seq(g1_n, sym) if lim_val is not None and (lim_val.is_finite or ( isinstance(lim_val, AccumulationBounds) and (lim_val.max - lim_val.min).is_finite)): if Sum(g2_n, (sym, lower_limit, upper_limit)).is_absolutely_convergent(): return S.true except NotImplementedError: pass for n in range(1, len(argset)): for a_tuple in itertools.combinations(args, n): b_set = argset - set(a_tuple) a_n = Mul(a_tuple) b_n = Mul(b_set) if is_decreasing(a_n, interval): dirich = _dirichlet_test(b_n) if dirich is not None: return dirich bc_test = _bounded_convergent_test(a_n, b_n) if bc_test is not None: return bc_test _sym = self.limits[0][0] sequence_term = sequence_term.xreplace({sym: _sym}) raise NotImplementedError("The algorithm to find the Sum convergence of %s " "is not yet implemented" % (sequence_term)) def is_absolutely_convergent(self): """ Checks for the absolute convergence of an infinite series. Same as checking convergence of absolute value of sequence_term of an infinite series. References ========== .. [1] https://en.wikipedia.org/wiki/Absolute_convergence Examples ======== >>> from sympy import Sum, Symbol, sin, oo >>> n = Symbol('n', integer=True) >>> Sum((-1)n, (n, 1, oo)).is_absolutely_convergent() False >>> Sum((-1)n/n2, (n, 1, oo)).is_absolutely_convergent() True See Also ======== Sum.is_convergent() """ return Sum(abs(self.function), self.limits).is_convergent() def euler_maclaurin(self, m=0, n=0, eps=0, eval_integral=True): """ Return an Euler-Maclaurin approximation of self, where m is the number of leading terms to sum directly and n is the number of terms in the tail. With m = n = 0, this is simply the corresponding integral plus a first-order endpoint correction. Returns (s, e) where s is the Euler-Maclaurin approximation and e is the estimated error (taken to be the magnitude of the first omitted term in the tail): >>> from sympy.abc import k, a, b >>> from sympy import Sum >>> Sum(1/k, (k, 2, 5)).doit().evalf() 1.28333333333333 >>> s, e = Sum(1/k, (k, 2, 5)).euler_maclaurin() >>> s -log(2) + 7/20 + log(5) >>> from sympy import sstr >>> print(sstr((s.evalf(), e.evalf()), full_prec=True)) (1.26629073187415, 0.0175000000000000) The endpoints may be symbolic: >>> s, e = Sum(1/k, (k, a, b)).euler_maclaurin() >>> s -log(a) + log(b) + 1/(2b) + 1/(2a) >>> e Abs(1/(12b*2) - 1/(12a2)) If the function is a polynomial of degree at most 2n+1, the Euler-Maclaurin formula becomes exact (and e = 0 is returned): >>> Sum(k, (k, 2, b)).euler_maclaurin() (b2/2 + b/2 - 1, 0) >>> Sum(k, (k, 2, b)).doit() b*2/2 + b/2 - 1 With a nonzero eps specified, the summation is ended as soon as the remainder term is less than the epsilon. """ from sympy.functions import bernoulli, factorial from sympy.integrals import Integral m = int(m) n = int(n) f = self.function if len(self.limits) != 1: raise ValueError("More than 1 limit") i, a, b = self.limits[0] if (a > b) == True: if a - b == 1: return S.Zero, S.Zero a, b = b + 1, a - 1 f = -f s = S.Zero if m: if b.is_Integer and a.is_Integer: m = min(m, b - a + 1) if not eps or f.is_polynomial(i): for k in range(m): s += f.subs(i, a + k) else: term = f.subs(i, a) if term: test = abs(term.evalf(3)) < eps if test == True: return s, abs(term) elif not (test == False): # a symbolic Relational class, can't go further return term, S.Zero s += term for k in range(1, m): term = f.subs(i, a + k) if abs(term.evalf(3)) < eps and term != 0: return s, abs(term) s += term if b - a + 1 == m: return s, S.Zero a += m x = Dummy('x') I = Integral(f.subs(i, x), (x, a, b)) if eval_integral: I = I.doit() s += I def fpoint(expr): if b is S.Infinity: return expr.subs(i, a), 0 return expr.subs(i, a), expr.subs(i, b) fa, fb = fpoint(f) iterm = (fa + fb)/2 g = f.diff(i) for k in range(1, n + 2): ga, gb = fpoint(g) term = bernoulli(2k)/factorial(2k)(gb - ga) if (eps and term and abs(term.evalf(3)) < eps) or (k > n): break s += term g = g.diff(i, 2, simplify=False) return s + iterm, abs(term) def reverse_order(self, indices): """ Reverse the order of a limit in a Sum. Usage ===== ``reverse_order(self, indices)`` reverses some limits in the expression ``self`` which can be either a ``Sum`` or a ``Product``. The selectors in the argument ``indices`` specify some indices whose limits get reversed. These selectors are either variable names or numerical indices counted starting from the inner-most limit tuple. Examples ======== >>> from sympy import Sum >>> from sympy.abc import x, y, a, b, c, d >>> Sum(x, (x, 0, 3)).reverse_order(x) Sum(-x, (x, 4, -1)) >>> Sum(xy, (x, 1, 5), (y, 0, 6)).reverse_order(x, y) Sum(xy, (x, 6, 0), (y, 7, -1)) >>> Sum(x, (x, a, b)).reverse_order(x) Sum(-x, (x, b + 1, a - 1)) >>> Sum(x, (x, a, b)).reverse_order(0) Sum(-x, (x, b + 1, a - 1)) While one should prefer variable names when specifying which limits to reverse, the index counting notation comes in handy in case there are several symbols with the same name. >>> S = Sum(x2, (x, a, b), (x, c, d)) >>> S Sum(x2, (x, a, b), (x, c, d)) >>> S0 = S.reverse_order(0) >>> S0 Sum(-x2, (x, b + 1, a - 1), (x, c, d)) >>> S1 = S0.reverse_order(1) >>> S1 Sum(x2, (x, b + 1, a - 1), (x, d + 1, c - 1)) Of course we can mix both notations: >>> Sum(xy, (x, a, b), (y, 2, 5)).reverse_order(x, 1) Sum(xy, (x, b + 1, a - 1), (y, 6, 1)) >>> Sum(xy, (x, a, b), (y, 2, 5)).reverse_order(y, x) Sum(xy, (x, b + 1, a - 1), (y, 6, 1)) See Also ======== index, reorder_limit, reorder References ========== .. [1] Michael Karr, "Summation in Finite Terms", Journal of the ACM, Volume 28 Issue 2, April 1981, Pages 305-350 http://dl.acm.org/citation.cfm?doid=322248.322255 """ l_indices = list(indices) for i, indx in enumerate(l_indices): if not isinstance(indx, int): l_indices[i] = self.index(indx) e = 1 limits = [] for i, limit in enumerate(self.limits): l = limit if i in l_indices: e = -e l = (limit[0], limit[2] + 1, limit[1] - 1) limits.append(l) return Sum(e * self.function, limits) def summation(f, symbols, *kwargs): r""" Compute the summation of f with respect to symbols. The notation for symbols is similar to the notation used in Integral. summation(f, (i, a, b)) computes the sum of f with respect to i from a to b, i.e., :: b ____ \ ` summation(f, (i, a, b)) = ) f /___, i = a If it cannot compute the sum, it returns an unevaluated Sum object. Repeated sums can be computed by introducing additional symbols tuples:: >>> from sympy import summation, oo, symbols, log >>> i, n, m = symbols('i n m', integer=True) >>> summation(2i - 1, (i, 1, n)) n2 >>> summation(1/2i, (i, 0, oo)) 2 >>> summation(1/log(n)n, (n, 2, oo)) Sum(log(n)(-n), (n, 2, oo)) >>> summation(i, (i, 0, n), (n, 0, m)) m3/6 + m2/2 + m/3 >>> from sympy.abc import x >>> from sympy import factorial >>> summation(x*n/factorial(n), (n, 0, oo)) exp(x) See Also ======== Sum Product, product """ return Sum(f, symbols, *kwargs).doit(deep=False) def telescopic_direct(L, R, n, limits): """Returns the direct summation of the terms of a telescopic sum L is the term with lower index R is the term with higher index n difference between the indexes of L and R For example: >>> from sympy.concrete.summations import telescopic_direct >>> from sympy.abc import k, a, b >>> telescopic_direct(1/k, -1/(k+2), 2, (k, a, b)) -1/(b + 2) - 1/(b + 1) + 1/(a + 1) + 1/a """ (i, a, b) = limits s = 0 for m in range(n): s += L.subs(i, a + m) + R.subs(i, b - m) return s def telescopic(L, R, limits): '''Tries to perform the summation using the telescopic property return None if not possible ''' (i, a, b) = limits if L.is_Add or R.is_Add: return None # We want to solve(L.subs(i, i + m) + R, m) # First we try a simple match since this does things that # solve doesn't do, e.g. solve(f(k+m)-f(k), m) fails k = Wild("k") sol = (-R).match(L.subs(i, i + k)) s = None if sol and k in sol: s = sol[k] if not (s.is_Integer and L.subs(i, i + s) == -R): # sometimes match fail(f(x+2).match(-f(x+k))->{k: -2 - 2x})) s = None # But there are things that match doesn't do that solve # can do, e.g. determine that 1/(x + m) = 1/(1 - x) when m = 1 if s is None: m = Dummy('m') try: sol = solve(L.subs(i, i + m) + R, m) or [] except NotImplementedError: return None sol = [si for si in sol if si.is_Integer and (L.subs(i, i + si) + R).expand().is_zero] if len(sol) != 1: return None s = sol[0] if s < 0: return telescopic_direct(R, L, abs(s), (i, a, b)) elif s > 0: return telescopic_direct(L, R, s, (i, a, b)) def eval_sum(f, limits): from sympy.concrete.delta import deltasummation, _has_simple_delta from sympy.functions import KroneckerDelta (i, a, b) = limits if f is S.Zero: return S.Zero if i not in f.free_symbols: return f(b - a + 1) if a == b: return f.subs(i, a) if isinstance(f, Piecewise): if not any(i in arg.args[1].free_symbols for arg in f.args): # Piecewise conditions do not depend on the dummy summation variable, # therefore we can fold: Sum(Piecewise((e, c), ...), limits) # --> Piecewise((Sum(e, limits), c), ...) newargs = [] for arg in f.args: newexpr = eval_sum(arg.expr, limits) if newexpr is None: return None newargs.append((newexpr, arg.cond)) return f.func(newargs) if f.has(KroneckerDelta) and _has_simple_delta(f, limits[0]): return deltasummation(f, limits) dif = b - a definite = dif.is_Integer # Doing it directly may be faster if there are very few terms. if definite and (dif < 100): return eval_sum_direct(f, (i, a, b)) if isinstance(f, Piecewise): return None # Try to do it symbolically. Even when the number of terms is known, # this can save time when b-a is big. # We should try to transform to partial fractions value = eval_sum_symbolic(f.expand(), (i, a, b)) if value is not None: return value # Do it directly if definite: return eval_sum_direct(f, (i, a, b)) def eval_sum_direct(expr, limits): from sympy.core import Add (i, a, b) = limits dif = b - a return Add([expr.subs(i, a + j) for j in range(dif + 1)]) def eval_sum_symbolic(f, limits): from sympy.functions import harmonic, bernoulli f_orig = f (i, a, b) = limits if not f.has(i): return f(b - a + 1) # Linearity if f.is_Mul: L, R = f.as_two_terms() if not L.has(i): sR = eval_sum_symbolic(R, (i, a, b)) if sR: return LsR if not R.has(i): sL = eval_sum_symbolic(L, (i, a, b)) if sL: return RsL try: f = apart(f, i) # see if it becomes an Add except PolynomialError: pass if f.is_Add: L, R = f.as_two_terms() lrsum = telescopic(L, R, (i, a, b)) if lrsum: return lrsum lsum = eval_sum_symbolic(L, (i, a, b)) rsum = eval_sum_symbolic(R, (i, a, b)) if None not in (lsum, rsum): r = lsum + rsum if not r is S.NaN: return r # Polynomial terms with Faulhaber's formula n = Wild('n') result = f.match(in) if result is not None: n = result[n] if n.is_Integer: if n >= 0: if (b is S.Infinity and not a is S.NegativeInfinity) or \ (a is S.NegativeInfinity and not b is S.Infinity): return S.Infinity return ((bernoulli(n + 1, b + 1) - bernoulli(n + 1, a))/(n + 1)).expand() elif a.is_Integer and a >= 1: if n == -1: return harmonic(b) - harmonic(a - 1) else: return harmonic(b, abs(n)) - harmonic(a - 1, abs(n)) if not (a.has(S.Infinity, S.NegativeInfinity) or b.has(S.Infinity, S.NegativeInfinity)): # Geometric terms c1 = Wild('c1', exclude=[i]) c2 = Wild('c2', exclude=[i]) c3 = Wild('c3', exclude=[i]) wexp = Wild('wexp') # Here we first attempt powsimp on f for easier matching with the # exponential pattern, and attempt expansion on the exponent for easier # matching with the linear pattern. e = f.powsimp().match(c1 * wexp) if e is not None: e_exp = e.pop(wexp).expand().match(c2i + c3) if e_exp is not None: e.update(e_exp) if e is not None: p = (c1c3).subs(e) q = (c1c2).subs(e) r = p(qa - q(b + 1))/(1 - q) l = p(b - a + 1) return Piecewise((l, Eq(q, S.One)), (r, True)) r = gosper_sum(f, (i, a, b)) if isinstance(r, (Mul,Add)): from sympy import ordered, Tuple non_limit = r.free_symbols - Tuple(limits[1:]).free_symbols den = denom(together(r)) den_sym = non_limit & den.free_symbols args = [] for v in ordered(den_sym): try: s = solve(den, v) m = Eq(v, s[0]) if s else S.false if m != False: args.append((Sum(f_orig.subs(m.args), limits).doit(), m)) break except NotImplementedError: continue args.append((r, True)) return Piecewise(args) if not r in (None, S.NaN): return r h = eval_sum_hyper(f_orig, (i, a, b)) if h is not None: return h factored = f_orig.factor() if factored != f_orig: return eval_sum_symbolic(factored, (i, a, b)) def _eval_sum_hyper(f, i, a): """ Returns (res, cond). Sums from a to oo. """ from sympy.functions import hyper from sympy.simplify import hyperexpand, hypersimp, fraction, simplify from sympy.polys.polytools import Poly, factor from sympy.core.numbers import Float if a != 0: return _eval_sum_hyper(f.subs(i, i + a), i, 0) if f.subs(i, 0) == 0: if simplify(f.subs(i, Dummy('i', integer=True, positive=True))) == 0: return S(0), True return _eval_sum_hyper(f.subs(i, i + 1), i, 0) hs = hypersimp(f, i) if hs is None: return None if isinstance(hs, Float): from sympy.simplify.simplify import nsimplify hs = nsimplify(hs) numer, denom = fraction(factor(hs)) top, topl = numer.as_coeff_mul(i) bot, botl = denom.as_coeff_mul(i) ab = [top, bot] factors = [topl, botl] params = [[], []] for k in range(2): for fac in factors[k]: mul = 1 if fac.is_Pow: mul = fac.exp fac = fac.base if not mul.is_Integer: return None p = Poly(fac, i) if p.degree() != 1: return None m, n = p.all_coeffs() ab[k] = mmul params[k] += [n/m]mul # Add "1" to numerator parameters, to account for implicit n! in # hypergeometric series. ap = params[0] + [1] bq = params[1] x = ab[0]/ab[1] h = hyper(ap, bq, x) f = combsimp(f) return f.subs(i, 0)*hyperexpand(h), h.convergence_statement def eval_sum_hyper(f, i_a_b): from sympy.logic.boolalg import And i, a, b = i_a_b if (b - a).is_Integer: # We are never going to do better than doing the sum in the obvious way return None old_sum = Sum(f, (i, a, b)) if b != S.Infinity: if a == S.NegativeInfinity: res = _eval_sum_hyper(f.subs(i, -i), i, -b) if res is not None: return Piecewise(res, (old_sum, True)) else: res1 = _eval_sum_hyper(f, i, a) res2 = _eval_sum_hyper(f, i, b + 1) if res1 is None or res2 is None: return None (res1, cond1), (res2, cond2) = res1, res2 cond = And(cond1, cond2) if cond == False: return None return Piecewise((res1 - res2, cond), (old_sum, True)) if a == S.NegativeInfinity: res1 = _eval_sum_hyper(f.subs(i, -i), i, 1) res2 = _eval_sum_hyper(f, i, 0) if res1 is None or res2 is None: return None res1, cond1 = res1 res2, cond2 = res2 cond = And(cond1, cond2) if cond == False or cond.as_set() == S.EmptySet: return None return Piecewise((res1 + res2, cond), (old_sum, True)) # Now b == oo, a != -oo res = _eval_sum_hyper(f, i, a) if res is not None: r, c = res if c == False: if r.is_number: f = f.subs(i, Dummy('i', integer=True, positive=True) + a) if f.is_positive or f.is_zero: return S.Infinity elif f.is_negative: return S.NegativeInfinity return None return Piecewise(res, (old_sum, True))
0478c1a7845d00b2f2a19eda6967aa99bd1a4b4883bba5901d3dd6134ca50677	"""Formal Power Series""" from __future__ import print_function, division from collections import defaultdict from sympy import oo, zoo, nan from sympy.core.add import Add from sympy.core.compatibility import iterable from sympy.core.expr import Expr from sympy.core.function import Derivative, Function, expand from sympy.core.mul import Mul from sympy.core.numbers import Rational from sympy.core.relational import Eq from sympy.sets.sets import Interval from sympy.core.singleton import S from sympy.core.symbol import Wild, Dummy, symbols, Symbol from sympy.core.sympify import sympify from sympy.discrete.convolutions import convolution from sympy.functions.combinatorial.factorials import binomial, factorial, rf from sympy.functions.combinatorial.numbers import bell from sympy.functions.elementary.integers import floor, frac, ceiling from sympy.functions.elementary.miscellaneous import Min, Max from sympy.functions.elementary.piecewise import Piecewise from sympy.series.limits import Limit from sympy.series.order import Order from sympy.simplify.powsimp import powsimp from sympy.series.sequences import sequence, SeqMul from sympy.series.series_class import SeriesBase def rational_algorithm(f, x, k, order=4, full=False): """Rational algorithm for computing formula of coefficients of Formal Power Series of a function. Applicable when f(x) or some derivative of f(x) is a rational function in x. :func:`rational_algorithm` uses :func:`apart` function for partial fraction decomposition. :func:`apart` by default uses 'undetermined coefficients method'. By setting ``full=True``, 'Bronstein's algorithm' can be used instead. Looks for derivative of a function up to 4'th order (by default). This can be overridden using order option. Returns ======= formula : Expr ind : Expr Independent terms. order : int Examples ======== >>> from sympy import log, atan, I >>> from sympy.series.formal import rational_algorithm as ra >>> from sympy.abc import x, k >>> ra(1 / (1 - x), x, k) (1, 0, 0) >>> ra(log(1 + x), x, k) (-(-1)*(-k)/k, 0, 1) >>> ra(atan(x), x, k, full=True) ((-I(-I)*(-k)/2 + II*(-k)/2)/k, 0, 1) Notes ===== By setting ``full=True``, range of admissible functions to be solved using ``rational_algorithm`` can be increased. This option should be used carefully as it can significantly slow down the computation as ``doit`` is performed on the :class:`RootSum` object returned by the ``apart`` function. Use ``full=False`` whenever possible. See Also ======== sympy.polys.partfrac.apart References ========== .. [1] Formal Power Series - Dominik Gruntz, Wolfram Koepf .. [2] Power Series in Computer Algebra - Wolfram Koepf """ from sympy.polys import RootSum, apart from sympy.integrals import integrate diff = f ds = [] # list of diff for i in range(order + 1): if i: diff = diff.diff(x) if diff.is_rational_function(x): coeff, sep = S.Zero, S.Zero terms = apart(diff, x, full=full) if terms.has(RootSum): terms = terms.doit() for t in Add.make_args(terms): num, den = t.as_numer_denom() if not den.has(x): sep += t else: if isinstance(den, Mul): # m(nx - a)j -> (nx - a)*j ind = den.as_independent(x) den = ind[1] num /= ind[0] # (nx - a)j -> (x - b) den, j = den.as_base_exp() a, xterm = den.as_coeff_add(x) # term -> m/xn if not a: sep += t continue xc = xterm[0].coeff(x) a /= -xc num /= xcj ak = ((-1)j * num * binomial(j + k - 1, k).rewrite(factorial) / a(j + k)) coeff += ak # Hacky, better way? if coeff is S.Zero: return None if (coeff.has(x) or coeff.has(zoo) or coeff.has(oo) or coeff.has(nan)): return None for j in range(i): coeff = (coeff / (k + j + 1)) sep = integrate(sep, x) sep += (ds.pop() - sep).limit(x, 0) # constant of integration return (coeff.subs(k, k - i), sep, i) else: ds.append(diff) return None def rational_independent(terms, x): """Returns a list of all the rationally independent terms. Examples ======== >>> from sympy import sin, cos >>> from sympy.series.formal import rational_independent >>> from sympy.abc import x >>> rational_independent([cos(x), sin(x)], x) [cos(x), sin(x)] >>> rational_independent([x2, sin(x), xsin(x), x3], x) [x3 + x2, xsin(x) + sin(x)] """ if not terms: return [] ind = terms[0:1] for t in terms[1:]: n = t.as_independent(x)[1] for i, term in enumerate(ind): d = term.as_independent(x)[1] q = (n / d).cancel() if q.is_rational_function(x): ind[i] += t break else: ind.append(t) return ind def simpleDE(f, x, g, order=4): r"""Generates simple DE. DE is of the form .. math:: f^k(x) + \sum\limits_{j=0}^{k-1} A_j f^j(x) = 0 where :math:`A_j` should be rational function in x. Generates DE's upto order 4 (default). DE's can also have free parameters. By increasing order, higher order DE's can be found. Yields a tuple of (DE, order). """ from sympy.solvers.solveset import linsolve a = symbols('a:%d' % (order)) def _makeDE(k): eq = f.diff(x, k) + Add([a[i]f.diff(x, i) for i in range(0, k)]) DE = g(x).diff(x, k) + Add([a[i]g(x).diff(x, i) for i in range(0, k)]) return eq, DE found = False for k in range(1, order + 1): eq, DE = _makeDE(k) eq = eq.expand() terms = eq.as_ordered_terms() ind = rational_independent(terms, x) if found or len(ind) == k: sol = dict(zip(a, (i for s in linsolve(ind, a[:k]) for i in s))) if sol: found = True DE = DE.subs(sol) DE = DE.as_numer_denom()[0] DE = DE.factor().as_coeff_mul(Derivative)[1][0] yield DE.collect(Derivative(g(x))), k def exp_re(DE, r, k): """Converts a DE with constant coefficients (explike) into a RE. Performs the substitution: .. math:: f^j(x) \\to r(k + j) Normalises the terms so that lowest order of a term is always r(k). Examples ======== >>> from sympy import Function, Derivative >>> from sympy.series.formal import exp_re >>> from sympy.abc import x, k >>> f, r = Function('f'), Function('r') >>> exp_re(-f(x) + Derivative(f(x)), r, k) -r(k) + r(k + 1) >>> exp_re(Derivative(f(x), x) + Derivative(f(x), (x, 2)), r, k) r(k) + r(k + 1) See Also ======== sympy.series.formal.hyper_re """ RE = S.Zero g = DE.atoms(Function).pop() mini = None for t in Add.make_args(DE): coeff, d = t.as_independent(g) if isinstance(d, Derivative): j = d.derivative_count else: j = 0 if mini is None or j < mini: mini = j RE += coeff * r(k + j) if mini: RE = RE.subs(k, k - mini) return RE def hyper_re(DE, r, k): """Converts a DE into a RE. Performs the substitution: .. math:: x^l f^j(x) \\to (k + 1 - l)_j . a_{k + j - l} Normalises the terms so that lowest order of a term is always r(k). Examples ======== >>> from sympy import Function, Derivative >>> from sympy.series.formal import hyper_re >>> from sympy.abc import x, k >>> f, r = Function('f'), Function('r') >>> hyper_re(-f(x) + Derivative(f(x)), r, k) (k + 1)r(k + 1) - r(k) >>> hyper_re(-xf(x) + Derivative(f(x), (x, 2)), r, k) (k + 2)(k + 3)r(k + 3) - r(k) See Also ======== sympy.series.formal.exp_re """ RE = S.Zero g = DE.atoms(Function).pop() x = g.atoms(Symbol).pop() mini = None for t in Add.make_args(DE.expand()): coeff, d = t.as_independent(g) c, v = coeff.as_independent(x) l = v.as_coeff_exponent(x)[1] if isinstance(d, Derivative): j = d.derivative_count else: j = 0 RE += c * rf(k + 1 - l, j) * r(k + j - l) if mini is None or j - l < mini: mini = j - l RE = RE.subs(k, k - mini) m = Wild('m') return RE.collect(r(k + m)) def _transformation_a(f, x, P, Q, k, m, shift): f = x(-shift) P = P.subs(k, k + shift) Q = Q.subs(k, k + shift) return f, P, Q, m def _transformation_c(f, x, P, Q, k, m, scale): f = f.subs(x, xscale) P = P.subs(k, k / scale) Q = Q.subs(k, k / scale) m = scale return f, P, Q, m def _transformation_e(f, x, P, Q, k, m): f = f.diff(x) P = P.subs(k, k + 1) * (k + m + 1) Q = Q.subs(k, k + 1) * (k + 1) return f, P, Q, m def _apply_shift(sol, shift): return [(res, cond + shift) for res, cond in sol] def _apply_scale(sol, scale): return [(res, cond / scale) for res, cond in sol] def _apply_integrate(sol, x, k): return [(res / ((cond + 1)(cond.as_coeff_Add()[1].coeff(k))), cond + 1) for res, cond in sol] def _compute_formula(f, x, P, Q, k, m, k_max): """Computes the formula for f.""" from sympy.polys import roots sol = [] for i in range(k_max + 1, k_max + m + 1): if (i < 0) == True: continue r = f.diff(x, i).limit(x, 0) / factorial(i) if r is S.Zero: continue kterm = mk + i res = r p = P.subs(k, kterm) q = Q.subs(k, kterm) c1 = p.subs(k, 1/k).leadterm(k)[0] c2 = q.subs(k, 1/k).leadterm(k)[0] res = (-c1 / c2)k for r, mul in roots(p, k).items(): res = rf(-r, k)mul for r, mul in roots(q, k).items(): res /= rf(-r, k)mul sol.append((res, kterm)) return sol def _rsolve_hypergeometric(f, x, P, Q, k, m): """Recursive wrapper to rsolve_hypergeometric. Returns a Tuple of (formula, series independent terms, maximum power of x in independent terms) if successful otherwise ``None``. See :func:`rsolve_hypergeometric` for details. """ from sympy.polys import lcm, roots from sympy.integrals import integrate # transformation - c proots, qroots = roots(P, k), roots(Q, k) all_roots = dict(proots) all_roots.update(qroots) scale = lcm([r.as_numer_denom()[1] for r, t in all_roots.items() if r.is_rational]) f, P, Q, m = _transformation_c(f, x, P, Q, k, m, scale) # transformation - a qroots = roots(Q, k) if qroots: k_min = Min(qroots.keys()) else: k_min = S.Zero shift = k_min + m f, P, Q, m = _transformation_a(f, x, P, Q, k, m, shift) l = (xf).limit(x, 0) if not isinstance(l, Limit) and l != 0: # Ideally should only be l != 0 return None qroots = roots(Q, k) if qroots: k_max = Max(qroots.keys()) else: k_max = S.Zero ind, mp = S.Zero, -oo for i in range(k_max + m + 1): r = f.diff(x, i).limit(x, 0) / factorial(i) if r.is_finite is False: old_f = f f, P, Q, m = _transformation_a(f, x, P, Q, k, m, i) f, P, Q, m = _transformation_e(f, x, P, Q, k, m) sol, ind, mp = _rsolve_hypergeometric(f, x, P, Q, k, m) sol = _apply_integrate(sol, x, k) sol = _apply_shift(sol, i) ind = integrate(ind, x) ind += (old_f - ind).limit(x, 0) # constant of integration mp += 1 return sol, ind, mp elif r: ind += rx(i + shift) pow_x = Rational((i + shift), scale) if pow_x > mp: mp = pow_x # maximum power of x ind = ind.subs(x, x(1/scale)) sol = _compute_formula(f, x, P, Q, k, m, k_max) sol = _apply_shift(sol, shift) sol = _apply_scale(sol, scale) return sol, ind, mp def rsolve_hypergeometric(f, x, P, Q, k, m): """Solves RE of hypergeometric type. Attempts to solve RE of the form Q(k)a(k + m) - P(k)a(k) Transformations that preserve Hypergeometric type: a. x*nf(x): b(k + m) = R(k - n)b(k) b. f(Ax): b(k + m) = A*mR(k)b(k) c. f(xn): b(k + nm) = R(k/n)b(k) d. f(x(1/m)): b(k + 1) = R(km)b(k) e. f'(x): b(k + m) = ((k + m + 1)/(k + 1))R(k + 1)b(k) Some of these transformations have been used to solve the RE. Returns ======= formula : Expr ind : Expr Independent terms. order : int Examples ======== >>> from sympy import exp, ln, S >>> from sympy.series.formal import rsolve_hypergeometric as rh >>> from sympy.abc import x, k >>> rh(exp(x), x, -S.One, (k + 1), k, 1) (Piecewise((1/factorial(k), Eq(Mod(k, 1), 0)), (0, True)), 1, 1) >>> rh(ln(1 + x), x, k2, k(k + 1), k, 1) (Piecewise(((-1)*(k - 1)factorial(k - 1)/RisingFactorial(2, k - 1), Eq(Mod(k, 1), 0)), (0, True)), x, 2) References ========== .. [1] Formal Power Series - Dominik Gruntz, Wolfram Koepf .. [2] Power Series in Computer Algebra - Wolfram Koepf """ result = _rsolve_hypergeometric(f, x, P, Q, k, m) if result is None: return None sol_list, ind, mp = result sol_dict = defaultdict(lambda: S.Zero) for res, cond in sol_list: j, mk = cond.as_coeff_Add() c = mk.coeff(k) if j.is_integer is False: res = xfrac(j) j = floor(j) res = res.subs(k, (k - j) / c) cond = Eq(k % c, j % c) sol_dict[cond] += res # Group together formula for same conditions sol = [] for cond, res in sol_dict.items(): sol.append((res, cond)) sol.append((S.Zero, True)) sol = Piecewise(sol) if mp is -oo: s = S.Zero elif mp.is_integer is False: s = ceiling(mp) else: s = mp + 1 # save all the terms of # form 1/x*k in ind if s < 0: ind += sum(sequence(sol x*k, (k, s, -1))) s = S.Zero return (sol, ind, s) def _solve_hyper_RE(f, x, RE, g, k): """See docstring of :func:`rsolve_hypergeometric` for details.""" terms = Add.make_args(RE) if len(terms) == 2: gs = list(RE.atoms(Function)) P, Q = map(RE.coeff, gs) m = gs[1].args[0] - gs[0].args[0] if m < 0: P, Q = Q, P m = abs(m) return rsolve_hypergeometric(f, x, P, Q, k, m) def _solve_explike_DE(f, x, DE, g, k): """Solves DE with constant coefficients.""" from sympy.solvers import rsolve for t in Add.make_args(DE): coeff, d = t.as_independent(g) if coeff.free_symbols: return RE = exp_re(DE, g, k) init = {} for i in range(len(Add.make_args(RE))): if i: f = f.diff(x) init[g(k).subs(k, i)] = f.limit(x, 0) sol = rsolve(RE, g(k), init) if sol: return (sol / factorial(k), S.Zero, S.Zero) def _solve_simple(f, x, DE, g, k): """Converts DE into RE and solves using :func:`rsolve`.""" from sympy.solvers import rsolve RE = hyper_re(DE, g, k) init = {} for i in range(len(Add.make_args(RE))): if i: f = f.diff(x) init[g(k).subs(k, i)] = f.limit(x, 0) / factorial(i) sol = rsolve(RE, g(k), init) if sol: return (sol, S.Zero, S.Zero) def _transform_explike_DE(DE, g, x, order, syms): """Converts DE with free parameters into DE with constant coefficients.""" from sympy.solvers.solveset import linsolve eq = [] highest_coeff = DE.coeff(Derivative(g(x), x, order)) for i in range(order): coeff = DE.coeff(Derivative(g(x), x, i)) coeff = (coeff / highest_coeff).expand().collect(x) for t in Add.make_args(coeff): eq.append(t) temp = [] for e in eq: if e.has(x): break elif e.has(Symbol): temp.append(e) else: eq = temp if eq: sol = dict(zip(syms, (i for s in linsolve(eq, list(syms)) for i in s))) if sol: DE = DE.subs(sol) DE = DE.factor().as_coeff_mul(Derivative)[1][0] DE = DE.collect(Derivative(g(x))) return DE def _transform_DE_RE(DE, g, k, order, syms): """Converts DE with free parameters into RE of hypergeometric type.""" from sympy.solvers.solveset import linsolve RE = hyper_re(DE, g, k) eq = [] for i in range(1, order): coeff = RE.coeff(g(k + i)) eq.append(coeff) sol = dict(zip(syms, (i for s in linsolve(eq, list(syms)) for i in s))) if sol: m = Wild('m') RE = RE.subs(sol) RE = RE.factor().as_numer_denom()[0].collect(g(k + m)) RE = RE.as_coeff_mul(g)[1][0] for i in range(order): # smallest order should be g(k) if RE.coeff(g(k + i)) and i: RE = RE.subs(k, k - i) break return RE def solve_de(f, x, DE, order, g, k): """Solves the DE. Tries to solve DE by either converting into a RE containing two terms or converting into a DE having constant coefficients. Returns ======= formula : Expr ind : Expr Independent terms. order : int Examples ======== >>> from sympy import Derivative as D, Function >>> from sympy import exp, ln >>> from sympy.series.formal import solve_de >>> from sympy.abc import x, k >>> f = Function('f') >>> solve_de(exp(x), x, D(f(x), x) - f(x), 1, f, k) (Piecewise((1/factorial(k), Eq(Mod(k, 1), 0)), (0, True)), 1, 1) >>> solve_de(ln(1 + x), x, (x + 1)D(f(x), x, 2) + D(f(x)), 2, f, k) (Piecewise(((-1)*(k - 1)factorial(k - 1)/RisingFactorial(2, k - 1), Eq(Mod(k, 1), 0)), (0, True)), x, 2) """ sol = None syms = DE.free_symbols.difference({g, x}) if syms: RE = _transform_DE_RE(DE, g, k, order, syms) else: RE = hyper_re(DE, g, k) if not RE.free_symbols.difference({k}): sol = _solve_hyper_RE(f, x, RE, g, k) if sol: return sol if syms: DE = _transform_explike_DE(DE, g, x, order, syms) if not DE.free_symbols.difference({x}): sol = _solve_explike_DE(f, x, DE, g, k) if sol: return sol def hyper_algorithm(f, x, k, order=4): """Hypergeometric algorithm for computing Formal Power Series. Steps: * Generates DE * Convert the DE into RE * Solves the RE Examples ======== >>> from sympy import exp, ln >>> from sympy.series.formal import hyper_algorithm >>> from sympy.abc import x, k >>> hyper_algorithm(exp(x), x, k) (Piecewise((1/factorial(k), Eq(Mod(k, 1), 0)), (0, True)), 1, 1) >>> hyper_algorithm(ln(1 + x), x, k) (Piecewise(((-1)*(k - 1)factorial(k - 1)/RisingFactorial(2, k - 1), Eq(Mod(k, 1), 0)), (0, True)), x, 2) See Also ======== sympy.series.formal.simpleDE sympy.series.formal.solve_de """ g = Function('g') des = [] # list of DE's sol = None for DE, i in simpleDE(f, x, g, order): if DE is not None: sol = solve_de(f, x, DE, i, g, k) if sol: return sol if not DE.free_symbols.difference({x}): des.append(DE) # If nothing works # Try plain rsolve for DE in des: sol = _solve_simple(f, x, DE, g, k) if sol: return sol def _compute_fps(f, x, x0, dir, hyper, order, rational, full): """Recursive wrapper to compute fps. See :func:`compute_fps` for details. """ if x0 in [S.Infinity, -S.Infinity]: dir = S.One if x0 is S.Infinity else -S.One temp = f.subs(x, 1/x) result = _compute_fps(temp, x, 0, dir, hyper, order, rational, full) if result is None: return None return (result[0], result[1].subs(x, 1/x), result[2].subs(x, 1/x)) elif x0 or dir == -S.One: if dir == -S.One: rep = -x + x0 rep2 = -x rep2b = x0 else: rep = x + x0 rep2 = x rep2b = -x0 temp = f.subs(x, rep) result = _compute_fps(temp, x, 0, S.One, hyper, order, rational, full) if result is None: return None return (result[0], result[1].subs(x, rep2 + rep2b), result[2].subs(x, rep2 + rep2b)) if f.is_polynomial(x): k = Dummy('k') ak = sequence(Coeff(f, x, k), (k, 1, oo)) xk = sequence(x*k, (k, 0, oo)) ind = f.coeff(x, 0) return ak, xk, ind # Break instances of Add # this allows application of different # algorithms on different terms increasing the # range of admissible functions. if isinstance(f, Add): result = False ak = sequence(S.Zero, (0, oo)) ind, xk = S.Zero, None for t in Add.make_args(f): res = _compute_fps(t, x, 0, S.One, hyper, order, rational, full) if res: if not result: result = True xk = res[1] if res[0].start > ak.start: seq = ak s, f = ak.start, res[0].start else: seq = res[0] s, f = res[0].start, ak.start save = Add([z[0]z[1] for z in zip(seq[0:(f - s)], xk[s:f])]) ak += res[0] ind += res[2] + save else: ind += t if result: return ak, xk, ind return None # The symbolic term - symb, if present, is being separated from the function # Otherwise symb is being set to S.One syms = f.free_symbols.difference({x}) (f, symb) = expand(f).as_independent(syms) if symb is S.Zero: symb = S.One symb = powsimp(symb) result = None # from here on it's x0=0 and dir=1 handling k = Dummy('k') if rational: result = rational_algorithm(f, x, k, order, full) if result is None and hyper: result = hyper_algorithm(f, x, k, order) if result is None: return None ak = sequence(result[0], (k, result[2], oo)) xk_formula = powsimp(x*k symb) xk = sequence(xk_formula, (k, 0, oo)) ind = powsimp(result[1] * symb) return ak, xk, ind def compute_fps(f, x, x0=0, dir=1, hyper=True, order=4, rational=True, full=False): """Computes the formula for Formal Power Series of a function. Tries to compute the formula by applying the following techniques (in order): * rational_algorithm * Hypergeometric algorithm Parameters ========== x : Symbol x0 : number, optional Point to perform series expansion about. Default is 0. dir : {1, -1, '+', '-'}, optional If dir is 1 or '+' the series is calculated from the right and for -1 or '-' the series is calculated from the left. For smooth functions this flag will not alter the results. Default is 1. hyper : {True, False}, optional Set hyper to False to skip the hypergeometric algorithm. By default it is set to False. order : int, optional Order of the derivative of ``f``, Default is 4. rational : {True, False}, optional Set rational to False to skip rational algorithm. By default it is set to True. full : {True, False}, optional Set full to True to increase the range of rational algorithm. See :func:`rational_algorithm` for details. By default it is set to False. Returns ======= ak : sequence Sequence of coefficients. xk : sequence Sequence of powers of x. ind : Expr Independent terms. mul : Pow Common terms. See Also ======== sympy.series.formal.rational_algorithm sympy.series.formal.hyper_algorithm """ f = sympify(f) x = sympify(x) if not f.has(x): return None x0 = sympify(x0) if dir == '+': dir = S.One elif dir == '-': dir = -S.One elif dir not in [S.One, -S.One]: raise ValueError("Dir must be '+' or '-'") else: dir = sympify(dir) return _compute_fps(f, x, x0, dir, hyper, order, rational, full) class Coeff(Function): """ Coeff(p, x, n) represents the nth coefficient of the polynomial p in x """ @classmethod def eval(cls, p, x, n): if p.is_polynomial(x) and n.is_integer: return p.coeff(x, n) class FormalPowerSeries(SeriesBase): """Represents Formal Power Series of a function. No computation is performed. This class should only to be used to represent a series. No checks are performed. For computing a series use :func:`fps`. See Also ======== sympy.series.formal.fps """ def __new__(cls, args): args = map(sympify, args) return Expr.__new__(cls, args) def __init__(self, args): ak = args[4][0] k = ak.variables[0] self.ak_seq = sequence(ak.formula, (k, 1, oo)) self.fact_seq = sequence(factorial(k), (k, 1, oo)) self.bell_coeff_seq = self.ak_seq self.fact_seq self.sign_seq = sequence((-1, 1), (k, 1, oo)) @property def function(self): return self.args[0] @property def x(self): return self.args[1] @property def x0(self): return self.args[2] @property def dir(self): return self.args[3] @property def ak(self): return self.args[4][0] @property def xk(self): return self.args[4][1] @property def ind(self): return self.args[4][2] @property def interval(self): return Interval(0, oo) @property def start(self): return self.interval.inf @property def stop(self): return self.interval.sup @property def length(self): return oo @property def infinite(self): """Returns an infinite representation of the series""" from sympy.concrete import Sum ak, xk = self.ak, self.xk k = ak.variables[0] inf_sum = Sum(ak.formula * xk.formula, (k, ak.start, ak.stop)) return self.ind + inf_sum def _get_pow_x(self, term): """Returns the power of x in a term.""" xterm, pow_x = term.as_independent(self.x)[1].as_base_exp() if not xterm.has(self.x): return S.Zero return pow_x def polynomial(self, n=6): """Truncated series as polynomial. Returns series expansion of ``f`` upto order ``O(x*n)`` as a polynomial(without ``O`` term). """ terms = [] sym = self.free_symbols for i, t in enumerate(self): xp = self._get_pow_x(t) if xp.has(sym): xp = xp.as_coeff_add(sym)[0] if xp >= n: break elif xp.is_integer is True and i == n + 1: break elif t is not S.Zero: terms.append(t) return Add(terms) def truncate(self, n=6): """Truncated series. Returns truncated series expansion of f upto order ``O(x*n)``. If n is ``None``, returns an infinite iterator. """ if n is None: return iter(self) x, x0 = self.x, self.x0 pt_xk = self.xk.coeff(n) if x0 is S.NegativeInfinity: x0 = S.Infinity return self.polynomial(n) + Order(pt_xk, (x, x0)) def _eval_term(self, pt): try: pt_xk = self.xk.coeff(pt) pt_ak = self.ak.coeff(pt).simplify() # Simplify the coefficients except IndexError: term = S.Zero else: term = (pt_ak pt_xk) if self.ind: ind = S.Zero sym = self.free_symbols for t in Add.make_args(self.ind): pow_x = self._get_pow_x(t) if pow_x.has(sym): pow_x = pow_x.as_coeff_add(sym)[0] if pt == 0 and pow_x < 1: ind += t elif pow_x >= pt and pow_x < pt + 1: ind += t term += ind return term.collect(self.x) def _eval_subs(self, old, new): x = self.x if old.has(x): return self def _eval_as_leading_term(self, x): for t in self: if t is not S.Zero: return t def _eval_derivative(self, x): f = self.function.diff(x) ind = self.ind.diff(x) pow_xk = self._get_pow_x(self.xk.formula) ak = self.ak k = ak.variables[0] if ak.formula.has(x): form = [] for e, c in ak.formula.args: temp = S.Zero for t in Add.make_args(e): pow_x = self._get_pow_x(t) temp += t * (pow_xk + pow_x) form.append((temp, c)) form = Piecewise(form) ak = sequence(form.subs(k, k + 1), (k, ak.start - 1, ak.stop)) else: ak = sequence((ak.formula pow_xk).subs(k, k + 1), (k, ak.start - 1, ak.stop)) return self.func(f, self.x, self.x0, self.dir, (ak, self.xk, ind)) def integrate(self, x=None, kwargs): """Integrate Formal Power Series. Examples ======== >>> from sympy import fps, sin, integrate >>> from sympy.abc import x >>> f = fps(sin(x)) >>> f.integrate(x).truncate() -1 + x2/2 - x4/24 + O(x6) >>> integrate(f, (x, 0, 1)) 1 - cos(1) """ from sympy.integrals import integrate if x is None: x = self.x elif iterable(x): return integrate(self.function, x) f = integrate(self.function, x) ind = integrate(self.ind, x) ind += (f - ind).limit(x, 0) # constant of integration pow_xk = self._get_pow_x(self.xk.formula) ak = self.ak k = ak.variables[0] if ak.formula.has(x): form = [] for e, c in ak.formula.args: temp = S.Zero for t in Add.make_args(e): pow_x = self._get_pow_x(t) temp += t / (pow_xk + pow_x + 1) form.append((temp, c)) form = Piecewise(form) ak = sequence(form.subs(k, k - 1), (k, ak.start + 1, ak.stop)) else: ak = sequence((ak.formula / (pow_xk + 1)).subs(k, k - 1), (k, ak.start + 1, ak.stop)) return self.func(f, self.x, self.x0, self.dir, (ak, self.xk, ind)) def product(self, other, x=None, n=6): """Multiplies two Formal Power Series, using discrete convolution and return the truncated terms upto specified order. Parameters ========== n : Number, optional Specifies the order of the term up to which the polynomial should be truncated. Examples ======== >>> from sympy import fps, sin, exp, convolution >>> from sympy.abc import x >>> f1 = fps(sin(x)) >>> f2 = fps(exp(x)) >>> f1.product(f2, x, 4) x + x2 + x3/3 + O(x4) See Also ======== sympy.discrete.convolutions """ if x is None: x = self.x if n is None: return iter(self) other = sympify(other) if not isinstance(other, FormalPowerSeries): raise ValueError("Both series should be an instance of FormalPowerSeries" " class.") if self.dir != other.dir: raise ValueError("Both series should be calculated from the" " same direction.") elif self.x0 != other.x0: raise ValueError("Both series should be calculated about the" " same point.") elif self.x != other.x: raise ValueError("Both series should have the same symbol.") k = self.ak.variables[0] coeff1 = sequence(self.ak.formula, (k, 0, oo)) k = other.ak.variables[0] coeff2 = sequence(other.ak.formula, (k, 0, oo)) conv_coeff = convolution(coeff1[:n], coeff2[:n]) conv_seq = sequence(tuple(conv_coeff), (k, 0, oo)) k = self.xk.variables[0] xk_seq = sequence(self.xk.formula, (k, 0, oo)) terms_seq = xk_seq conv_seq return Add((terms_seq[:n])) + Order(self.xk.coeff(n), (self.x, self.x0)) def coeff_bell(self, n): r""" self.coeff_bell(n) returns a sequence of Bell polynomials of the second kind. Note that ``n`` should be a integer. The second kind of Bell polynomials (are sometimes called "partial" Bell polynomials or incomplete Bell polynomials) are defined as .. math:: B_{n,k}(x_1, x_2,\dotsc x_{n-k+1}) = \sum_{j_1+j_2+j_2+\dotsb=k \atop j_1+2j_2+3j_2+\dotsb=n} \frac{n!}{j_1!j_2!\dotsb j_{n-k+1}!} \left(\frac{x_1}{1!} \right)^{j_1} \left(\frac{x_2}{2!} \right)^{j_2} \dotsb \left(\frac{x_{n-k+1}}{(n-k+1)!} \right) ^{j_{n-k+1}}. ``bell(n, k, (x1, x2, ...))`` gives Bell polynomials of the second kind, `B_{n,k}(x_1, x_2, \dotsc, x_{n-k+1})`. See Also ======== sympy.functions.combinatorial.numbers.bell """ inner_coeffs = [bell(n, j, tuple(self.bell_coeff_seq[:n-j+1])) for j in range(1, n+1)] k = Dummy('k') return sequence(tuple(inner_coeffs), (k, 1, oo)) def compose(self, other, x=None, n=6): r""" Returns the truncated terms of the formal power series of the composed function, up to specified `n`. If `f` and `g` are two formal power series of two different functions, then the coefficient sequence ``ak`` of the composed formal power series `fp` will be as follows. .. math:: \sum\limits_{k=0}^{n} b_k B_{n,k}(x_1, x_2, \dotsc, x_{n-k+1}) Parameters ========== n : Number, optional Specifies the order of the term up to which the polynomial should be truncated. Examples ======== >>> from sympy import fps, sin, exp, bell >>> from sympy.abc import x >>> f1 = fps(exp(x)) >>> f2 = fps(sin(x)) >>> f1.compose(f2, x) 1 + x + x2/2 - x4/8 - x5/15 + O(x6) >>> f1.compose(f2, x, n=8) 1 + x + x2/2 - x4/8 - x5/15 - x6/240 + x7/90 + O(x8) See Also ======== sympy.functions.combinatorial.numbers.bell References ========== .. [1] Comtet, Louis: Advanced combinatorics; the art of finite and infinite expansions. Reidel, 1974. """ if x is None: x = self.x if n is None: return iter(self) other = sympify(other) if not isinstance(other, FormalPowerSeries): raise ValueError("Both series should be an instance of FormalPowerSeries" " class.") if self.dir != other.dir: raise ValueError("Both series should be calculated from the" " same direction.") elif self.x0 != other.x0: raise ValueError("Both series should be calculated about the" " same point.") elif self.x != other.x: raise ValueError("Both series should have the same symbol.") f, g = self.function, other.function if other._eval_term(0).as_coeff_mul(other.x)[0] is not S.Zero: raise ValueError("The formal power series of the inner function should not have any " "constant coefficient term.") terms = [] for i in range(1, n): bell_seq = other.coeff_bell(i) seq = (self.bell_coeff_seq * bell_seq) terms.append(Add((seq[:i])) self.xk.coeff(i) / self.fact_seq[i-1]) return self._eval_term(0) + Add(terms) + Order(self.xk.coeff(n), (self.x, self.x0)) def inverse(self, x=None, n=6): r""" Returns the truncated terms of the inverse of the formal power series, up to specified `n`. If `f` and `g` are two formal power series of two different functions, then the coefficient sequence ``ak`` of the composed formal power series `fp` will be as follows. .. math:: \sum\limits_{k=0}^{n} (-1)^{k} x_0^{-k-1} B_{n,k}(x_1, x_2, \dotsc, x_{n-k+1}) Parameters ========== n : Number, optional Specifies the order of the term up to which the polynomial should be truncated. Examples ======== >>> from sympy import fps, exp, cos, bell >>> from sympy.abc import x >>> f1 = fps(exp(x)) >>> f2 = fps(cos(x)) >>> f1.inverse(x) 1 - x + x2/2 - x3/6 + x4/24 - x5/120 + O(x6) >>> f2.inverse(x, n=8) 1 + x2/2 + 5x*4/24 + 61x6/720 + O(x8) See Also ======== sympy.functions.combinatorial.numbers.bell References ========== .. [1] Comtet, Louis: Advanced combinatorics; the art of finite and infinite expansions. Reidel, 1974. """ if x is None: x = self.x if n is None: return iter(self) f = self.function if self._eval_term(0) is S.Zero: raise ValueError("Constant coefficient should exist for an inverse of a formal" " power series to exist.") inv = self._eval_term(0) k = Dummy('k') terms = [] inv_seq = sequence(inv ** (-(k + 1)), (k, 1, oo)) aux_seq = self.sign_seq * self.fact_seq * inv_seq for i in range(1, n): bell_seq = self.coeff_bell(i) seq = (aux_seq * bell_seq) terms.append(Add((seq[:i])) self.xk.coeff(i) / self.fact_seq[i-1]) return self._eval_term(0) + Add(terms) + Order(self.xk.coeff(n), (self.x, self.x0)) def __add__(self, other): other = sympify(other) if isinstance(other, FormalPowerSeries): if self.dir != other.dir: raise ValueError("Both series should be calculated from the" " same direction.") elif self.x0 != other.x0: raise ValueError("Both series should be calculated about the" " same point.") x, y = self.x, other.x f = self.function + other.function.subs(y, x) if self.x not in f.free_symbols: return f ak = self.ak + other.ak if self.ak.start > other.ak.start: seq = other.ak s, e = other.ak.start, self.ak.start else: seq = self.ak s, e = self.ak.start, other.ak.start save = Add([z[0]z[1] for z in zip(seq[0:(e - s)], self.xk[s:e])]) ind = self.ind + other.ind + save return self.func(f, x, self.x0, self.dir, (ak, self.xk, ind)) elif not other.has(self.x): f = self.function + other ind = self.ind + other return self.func(f, self.x, self.x0, self.dir, (self.ak, self.xk, ind)) return Add(self, other) def __radd__(self, other): return self.__add__(other) def __neg__(self): return self.func(-self.function, self.x, self.x0, self.dir, (-self.ak, self.xk, -self.ind)) def __sub__(self, other): return self.__add__(-other) def __rsub__(self, other): return (-self).__add__(other) def __mul__(self, other): other = sympify(other) if other.has(self.x): return Mul(self, other) f = self.function other ak = self.ak.coeff_mul(other) ind = self.ind * other return self.func(f, self.x, self.x0, self.dir, (ak, self.xk, ind)) def __rmul__(self, other): return self.__mul__(other) def fps(f, x=None, x0=0, dir=1, hyper=True, order=4, rational=True, full=False): """Generates Formal Power Series of f. Returns the formal series expansion of ``f`` around ``x = x0`` with respect to ``x`` in the form of a ``FormalPowerSeries`` object. Formal Power Series is represented using an explicit formula computed using different algorithms. See :func:`compute_fps` for the more details regarding the computation of formula. Parameters ========== x : Symbol, optional If x is None and ``f`` is univariate, the univariate symbols will be supplied, otherwise an error will be raised. x0 : number, optional Point to perform series expansion about. Default is 0. dir : {1, -1, '+', '-'}, optional If dir is 1 or '+' the series is calculated from the right and for -1 or '-' the series is calculated from the left. For smooth functions this flag will not alter the results. Default is 1. hyper : {True, False}, optional Set hyper to False to skip the hypergeometric algorithm. By default it is set to False. order : int, optional Order of the derivative of ``f``, Default is 4. rational : {True, False}, optional Set rational to False to skip rational algorithm. By default it is set to True. full : {True, False}, optional Set full to True to increase the range of rational algorithm. See :func:`rational_algorithm` for details. By default it is set to False. Examples ======== >>> from sympy import fps, O, ln, atan, sin >>> from sympy.abc import x, n Rational Functions >>> fps(ln(1 + x)).truncate() x - x2/2 + x3/3 - x4/4 + x5/5 + O(x6) >>> fps(atan(x), full=True).truncate() x - x3/3 + x5/5 + O(x6) Symbolic Functions >>> fps(x*nsin(x2), x).truncate(8) -x(n + 6)/6 + x(n + 2) + O(x(n + 8)) See Also ======== sympy.series.formal.FormalPowerSeries sympy.series.formal.compute_fps """ f = sympify(f) if x is None: free = f.free_symbols if len(free) == 1: x = free.pop() elif not free: return f else: raise NotImplementedError("multivariate formal power series") result = compute_fps(f, x, x0, dir, hyper, order, rational, full) if result is None: return f return FormalPowerSeries(f, x, x0, dir, result)
218425c4712f934cc59bde52a2599fea53f92c2479dfe2eda47c083079feacc5	from __future__ import print_function, division from sympy.core import S, sympify, Expr, Rational, Dummy from sympy.core import Add, Mul, expand_power_base, expand_log from sympy.core.cache import cacheit from sympy.core.compatibility import default_sort_key, is_sequence from sympy.core.containers import Tuple from sympy.sets.sets import Complement from sympy.utilities.iterables import uniq class Order(Expr): r""" Represents the limiting behavior of some function The order of a function characterizes the function based on the limiting behavior of the function as it goes to some limit. Only taking the limit point to be a number is currently supported. This is expressed in big O notation [1]_. The formal definition for the order of a function `g(x)` about a point `a` is such that `g(x) = O(f(x))` as `x \rightarrow a` if and only if for any `\delta > 0` there exists a `M > 0` such that `\|g(x)\| \leq M\|f(x)\|` for `\|x-a\| < \delta`. This is equivalent to `\lim_{x \rightarrow a} \sup \|g(x)/f(x)\| < \infty`. Let's illustrate it on the following example by taking the expansion of `\sin(x)` about 0: .. math :: \sin(x) = x - x^3/3! + O(x^5) where in this case `O(x^5) = x^5/5! - x^7/7! + \cdots`. By the definition of `O`, for any `\delta > 0` there is an `M` such that: .. math :: \|x^5/5! - x^7/7! + ....\| <= M\|x^5\| \text{ for } \|x\| < \delta or by the alternate definition: .. math :: \lim_{x \rightarrow 0} \| (x^5/5! - x^7/7! + ....) / x^5\| < \infty which surely is true, because .. math :: \lim_{x \rightarrow 0} \| (x^5/5! - x^7/7! + ....) / x^5\| = 1/5! As it is usually used, the order of a function can be intuitively thought of representing all terms of powers greater than the one specified. For example, `O(x^3)` corresponds to any terms proportional to `x^3, x^4,\ldots` and any higher power. For a polynomial, this leaves terms proportional to `x^2`, `x` and constants. Examples ======== >>> from sympy import O, oo, cos, pi >>> from sympy.abc import x, y >>> O(x + x2) O(x) >>> O(x + x2, (x, 0)) O(x) >>> O(x + x2, (x, oo)) O(x2, (x, oo)) >>> O(1 + xy) O(1, x, y) >>> O(1 + xy, (x, 0), (y, 0)) O(1, x, y) >>> O(1 + xy, (x, oo), (y, oo)) O(xy, (x, oo), (y, oo)) >>> O(1) in O(1, x) True >>> O(1, x) in O(1) False >>> O(x) in O(1, x) True >>> O(x*2) in O(x) True >>> O(x)x O(x*2) >>> O(x) - O(x) O(x) >>> O(cos(x)) O(1) >>> O(cos(x), (x, pi/2)) O(x - pi/2, (x, pi/2)) References ========== .. [1] `Big O notation <https://en.wikipedia.org/wiki/Big_O_notation>`_ Notes ===== In ``O(f(x), x)`` the expression ``f(x)`` is assumed to have a leading term. ``O(f(x), x)`` is automatically transformed to ``O(f(x).as_leading_term(x),x)``. ``O(exprf(x), x)`` is ``O(f(x), x)`` ``O(expr, x)`` is ``O(1)`` ``O(0, x)`` is 0. Multivariate O is also supported: ``O(f(x, y), x, y)`` is transformed to ``O(f(x, y).as_leading_term(x,y).as_leading_term(y), x, y)`` In the multivariate case, it is assumed the limits w.r.t. the various symbols commute. If no symbols are passed then all symbols in the expression are used and the limit point is assumed to be zero. """ is_Order = True __slots__ = [] @cacheit def __new__(cls, expr, args, kwargs): expr = sympify(expr) if not args: if expr.is_Order: variables = expr.variables point = expr.point else: variables = list(expr.free_symbols) point = [S.Zero]len(variables) else: args = list(args if is_sequence(args) else [args]) variables, point = [], [] if is_sequence(args[0]): for a in args: v, p = list(map(sympify, a)) variables.append(v) point.append(p) else: variables = list(map(sympify, args)) point = [S.Zero]len(variables) if not all(v.is_symbol for v in variables): raise TypeError('Variables are not symbols, got %s' % variables) if len(list(uniq(variables))) != len(variables): raise ValueError('Variables are supposed to be unique symbols, got %s' % variables) if expr.is_Order: expr_vp = dict(expr.args[1:]) new_vp = dict(expr_vp) vp = dict(zip(variables, point)) for v, p in vp.items(): if v in new_vp.keys(): if p != new_vp[v]: raise NotImplementedError( "Mixing Order at different points is not supported.") else: new_vp[v] = p if set(expr_vp.keys()) == set(new_vp.keys()): return expr else: variables = list(new_vp.keys()) point = [new_vp[v] for v in variables] if expr is S.NaN: return S.NaN if any(x in p.free_symbols for x in variables for p in point): raise ValueError('Got %s as a point.' % point) if variables: if any(p != point[0] for p in point): raise NotImplementedError( "Multivariable orders at different points are not supported.") if point[0] is S.Infinity: s = {k: 1/Dummy() for k in variables} rs = {1/v: 1/k for k, v in s.items()} elif point[0] is S.NegativeInfinity: s = {k: -1/Dummy() for k in variables} rs = {-1/v: -1/k for k, v in s.items()} elif point[0] is not S.Zero: s = dict((k, Dummy() + point[0]) for k in variables) rs = dict((v - point[0], k - point[0]) for k, v in s.items()) else: s = () rs = () expr = expr.subs(s) if expr.is_Add: from sympy import expand_multinomial expr = expand_multinomial(expr) if s: args = tuple([r[0] for r in rs.items()]) else: args = tuple(variables) if len(variables) > 1: # XXX: better way? We need this expand() to # workaround e.g: expr = x(x + y). # (x(x + y)).as_leading_term(x, y) currently returns # xy (wrong order term!). That's why we want to deal with # expand()'ed expr (handled in "if expr.is_Add" branch below). expr = expr.expand() if expr.is_Add: lst = expr.extract_leading_order(args) expr = Add([f.expr for (e, f) in lst]) elif expr: expr = expr.as_leading_term(args) expr = expr.as_independent(args, as_Add=False)[1] expr = expand_power_base(expr) expr = expand_log(expr) if len(args) == 1: # The definition of O(f(x)) symbol explicitly stated that # the argument of f(x) is irrelevant. That's why we can # combine some power exponents (only "on top" of the # expression tree for f(x)), e.g.: # xp (-x)q -> x(p+q) for real p, q. x = args[0] margs = list(Mul.make_args( expr.as_independent(x, as_Add=False)[1])) for i, t in enumerate(margs): if t.is_Pow: b, q = t.args if b in (x, -x) and q.is_real and not q.has(x): margs[i] = xq elif b.is_Pow and not b.exp.has(x): b, r = b.args if b in (x, -x) and r.is_real: margs[i] = x(rq) elif b.is_Mul and b.args[0] is S.NegativeOne: b = -b if b.is_Pow and not b.exp.has(x): b, r = b.args if b in (x, -x) and r.is_real: margs[i] = x(rq) expr = Mul(margs) expr = expr.subs(rs) if expr is S.Zero: return expr if expr.is_Order: expr = expr.expr if not expr.has(variables): expr = S.One # create Order instance: vp = dict(zip(variables, point)) variables.sort(key=default_sort_key) point = [vp[v] for v in variables] args = (expr,) + Tuple(zip(variables, point)) obj = Expr.__new__(cls, args) return obj def _eval_nseries(self, x, n, logx): return self @property def expr(self): return self.args[0] @property def variables(self): if self.args[1:]: return tuple(x[0] for x in self.args[1:]) else: return () @property def point(self): if self.args[1:]: return tuple(x[1] for x in self.args[1:]) else: return () @property def free_symbols(self): return self.expr.free_symbols \| set(self.variables) def _eval_power(b, e): if e.is_Number and e.is_nonnegative: return b.func(b.expr ** e, b.args[1:]) if e == O(1): return b return def as_expr_variables(self, order_symbols): if order_symbols is None: order_symbols = self.args[1:] else: if (not all(o[1] == order_symbols[0][1] for o in order_symbols) and not all(p == self.point[0] for p in self.point)): # pragma: no cover raise NotImplementedError('Order at points other than 0 ' 'or oo not supported, got %s as a point.' % self.point) if order_symbols and order_symbols[0][1] != self.point[0]: raise NotImplementedError( "Multiplying Order at different points is not supported.") order_symbols = dict(order_symbols) for s, p in dict(self.args[1:]).items(): if s not in order_symbols.keys(): order_symbols[s] = p order_symbols = sorted(order_symbols.items(), key=lambda x: default_sort_key(x[0])) return self.expr, tuple(order_symbols) def removeO(self): return S.Zero def getO(self): return self @cacheit def contains(self, expr): r""" Return True if expr belongs to Order(self.expr, \self.variables). Return False if self belongs to expr. Return None if the inclusion relation cannot be determined (e.g. when self and expr have different symbols). """ from sympy import powsimp if expr is S.Zero: return True if expr is S.NaN: return False point = self.point[0] if self.point else S.Zero if expr.is_Order: if (any(p != point for p in expr.point) or any(p != point for p in self.point)): return None if expr.expr == self.expr: # O(1) + O(1), O(1) + O(1, x), etc. return all([x in self.args[1:] for x in expr.args[1:]]) if expr.expr.is_Add: return all([self.contains(x) for x in expr.expr.args]) if self.expr.is_Add and point == S.Zero: return any([self.func(x, self.args[1:]).contains(expr) for x in self.expr.args]) if self.variables and expr.variables: common_symbols = tuple( [s for s in self.variables if s in expr.variables]) elif self.variables: common_symbols = self.variables else: common_symbols = expr.variables if not common_symbols: return None if (self.expr.is_Pow and len(self.variables) == 1 and self.variables == expr.variables): symbol = self.variables[0] other = expr.expr.as_independent(symbol, as_Add=False)[1] if (other.is_Pow and other.base == symbol and self.expr.base == symbol): if point == S.Zero: rv = (self.expr.exp - other.exp).is_nonpositive if point.is_infinite: rv = (self.expr.exp - other.exp).is_nonnegative if rv is not None: return rv r = None ratio = self.expr/expr.expr ratio = powsimp(ratio, deep=True, combine='exp') for s in common_symbols: from sympy.series.limits import Limit l = Limit(ratio, s, point).doit(heuristics=False) if not isinstance(l, Limit): l = l != 0 else: l = None if r is None: r = l else: if r != l: return return r if self.expr.is_Pow and len(self.variables) == 1: symbol = self.variables[0] other = expr.as_independent(symbol, as_Add=False)[1] if (other.is_Pow and other.base == symbol and self.expr.base == symbol): if point == S.Zero: rv = (self.expr.exp - other.exp).is_nonpositive if point.is_infinite: rv = (self.expr.exp - other.exp).is_nonnegative if rv is not None: return rv obj = self.func(expr, self.args[1:]) return self.contains(obj) def __contains__(self, other): result = self.contains(other) if result is None: raise TypeError('contains did not evaluate to a bool') return result def _eval_subs(self, old, new): if old in self.variables: newexpr = self.expr.subs(old, new) i = self.variables.index(old) newvars = list(self.variables) newpt = list(self.point) if new.is_symbol: newvars[i] = new else: syms = new.free_symbols if len(syms) == 1 or old in syms: if old in syms: var = self.variables[i] else: var = syms.pop() # First, try to substitute self.point in the "new" # expr to see if this is a fixed point. # E.g. O(y).subs(y, sin(x)) point = new.subs(var, self.point[i]) if point != self.point[i]: from sympy.solvers.solveset import solveset d = Dummy() sol = solveset(old - new.subs(var, d), d) if isinstance(sol, Complement): e1 = sol.args[0] e2 = sol.args[1] sol = set(e1) - set(e2) res = [dict(zip((d, ), sol))] point = d.subs(res[0]).limit(old, self.point[i]) newvars[i] = var newpt[i] = point elif old not in syms: del newvars[i], newpt[i] if not syms and new == self.point[i]: newvars.extend(syms) newpt.extend([S.Zero]len(syms)) else: return return Order(newexpr, zip(newvars, newpt)) def _eval_conjugate(self): expr = self.expr._eval_conjugate() if expr is not None: return self.func(expr, self.args[1:]) def _eval_derivative(self, x): return self.func(self.expr.diff(x), self.args[1:]) or self def _eval_transpose(self): expr = self.expr._eval_transpose() if expr is not None: return self.func(expr, *self.args[1:]) def _sage_(self): #XXX: SAGE doesn't have Order yet. Let's return 0 instead. return Rational(0)._sage_() def __neg__(self): return self O = Order
f95364feefb86b9007cc679bfaa745ebc78531ff7b83f9d78c5cb8d38ed1ea13	from __future__ import print_function, division from collections import defaultdict from sympy.core import (Basic, S, Add, Mul, Pow, Symbol, sympify, expand_mul, expand_func, Function, Dummy, Expr, factor_terms, expand_power_exp, Eq) from sympy.core.compatibility import iterable, ordered, range, as_int from sympy.core.evaluate import global_evaluate from sympy.core.function import expand_log, count_ops, _mexpand, _coeff_isneg, nfloat from sympy.core.numbers import Float, I, pi, Rational, Integer from sympy.core.rules import Transform from sympy.core.sympify import _sympify from sympy.functions import gamma, exp, sqrt, log, exp_polar, piecewise_fold from sympy.functions.combinatorial.factorials import CombinatorialFunction from sympy.functions.elementary.complexes import unpolarify from sympy.functions.elementary.exponential import ExpBase from sympy.functions.elementary.hyperbolic import HyperbolicFunction from sympy.functions.elementary.integers import ceiling from sympy.functions.elementary.piecewise import Piecewise from sympy.functions.elementary.trigonometric import TrigonometricFunction from sympy.functions.special.bessel import besselj, besseli, besselk, jn, bessely from sympy.functions.special.tensor_functions import KroneckerDelta from sympy.polys import together, cancel, factor from sympy.simplify.combsimp import combsimp from sympy.simplify.cse_opts import sub_pre, sub_post from sympy.simplify.powsimp import powsimp from sympy.simplify.radsimp import radsimp, fraction from sympy.simplify.sqrtdenest import sqrtdenest from sympy.simplify.trigsimp import trigsimp, exptrigsimp from sympy.utilities.iterables import has_variety, sift import mpmath def separatevars(expr, symbols=[], dict=False, force=False): """ Separates variables in an expression, if possible. By default, it separates with respect to all symbols in an expression and collects constant coefficients that are independent of symbols. If dict=True then the separated terms will be returned in a dictionary keyed to their corresponding symbols. By default, all symbols in the expression will appear as keys; if symbols are provided, then all those symbols will be used as keys, and any terms in the expression containing other symbols or non-symbols will be returned keyed to the string 'coeff'. (Passing None for symbols will return the expression in a dictionary keyed to 'coeff'.) If force=True, then bases of powers will be separated regardless of assumptions on the symbols involved. Notes ===== The order of the factors is determined by Mul, so that the separated expressions may not necessarily be grouped together. Although factoring is necessary to separate variables in some expressions, it is not necessary in all cases, so one should not count on the returned factors being factored. Examples ======== >>> from sympy.abc import x, y, z, alpha >>> from sympy import separatevars, sin >>> separatevars((xy)y) (xy)*y >>> separatevars((xy)y, force=True) xyyy >>> e = 2x*2zsin(y)+2zx2 >>> separatevars(e) 2x*2z(sin(y) + 1) >>> separatevars(e, symbols=(x, y), dict=True) {'coeff': 2z, x: x*2, y: sin(y) + 1} >>> separatevars(e, [x, y, alpha], dict=True) {'coeff': 2z, alpha: 1, x: x*2, y: sin(y) + 1} If the expression is not really separable, or is only partially separable, separatevars will do the best it can to separate it by using factoring. >>> separatevars(x + xy - 3x2) -x(3x - y - 1) If the expression is not separable then expr is returned unchanged or (if dict=True) then None is returned. >>> eq = 2x + ysin(x) >>> separatevars(eq) == eq True >>> separatevars(2x + ysin(x), symbols=(x, y), dict=True) == None True """ expr = sympify(expr) if dict: return _separatevars_dict(_separatevars(expr, force), symbols) else: return _separatevars(expr, force) def _separatevars(expr, force): if len(expr.free_symbols) == 1: return expr # don't destroy a Mul since much of the work may already be done if expr.is_Mul: args = list(expr.args) changed = False for i, a in enumerate(args): args[i] = separatevars(a, force) changed = changed or args[i] != a if changed: expr = expr.func(args) return expr # get a Pow ready for expansion if expr.is_Pow: expr = Pow(separatevars(expr.base, force=force), expr.exp) # First try other expansion methods expr = expr.expand(mul=False, multinomial=False, force=force) _expr, reps = posify(expr) if force else (expr, {}) expr = factor(_expr).subs(reps) if not expr.is_Add: return expr # Find any common coefficients to pull out args = list(expr.args) commonc = args[0].args_cnc(cset=True, warn=False)[0] for i in args[1:]: commonc &= i.args_cnc(cset=True, warn=False)[0] commonc = Mul(commonc) commonc = commonc.as_coeff_Mul()[1] # ignore constants commonc_set = commonc.args_cnc(cset=True, warn=False)[0] # remove them for i, a in enumerate(args): c, nc = a.args_cnc(cset=True, warn=False) c = c - commonc_set args[i] = Mul(c)Mul(nc) nonsepar = Add(args) if len(nonsepar.free_symbols) > 1: _expr = nonsepar _expr, reps = posify(_expr) if force else (_expr, {}) _expr = (factor(_expr)).subs(reps) if not _expr.is_Add: nonsepar = _expr return commoncnonsepar def _separatevars_dict(expr, symbols): if symbols: if not all((t.is_Atom for t in symbols)): raise ValueError("symbols must be Atoms.") symbols = list(symbols) elif symbols is None: return {'coeff': expr} else: symbols = list(expr.free_symbols) if not symbols: return None ret = dict(((i, []) for i in symbols + ['coeff'])) for i in Mul.make_args(expr): expsym = i.free_symbols intersection = set(symbols).intersection(expsym) if len(intersection) > 1: return None if len(intersection) == 0: # There are no symbols, so it is part of the coefficient ret['coeff'].append(i) else: ret[intersection.pop()].append(i) # rebuild for k, v in ret.items(): ret[k] = Mul(v) return ret def _is_sum_surds(p): args = p.args if p.is_Add else [p] for y in args: if not ((y2).is_Rational and y.is_extended_real): return False return True def posify(eq): """Return eq (with generic symbols made positive) and a dictionary containing the mapping between the old and new symbols. Any symbol that has positive=None will be replaced with a positive dummy symbol having the same name. This replacement will allow more symbolic processing of expressions, especially those involving powers and logarithms. A dictionary that can be sent to subs to restore eq to its original symbols is also returned. >>> from sympy import posify, Symbol, log, solve >>> from sympy.abc import x >>> posify(x + Symbol('p', positive=True) + Symbol('n', negative=True)) (_x + n + p, {_x: x}) >>> eq = 1/x >>> log(eq).expand() log(1/x) >>> log(posify(eq)[0]).expand() -log(_x) >>> p, rep = posify(eq) >>> log(p).expand().subs(rep) -log(x) It is possible to apply the same transformations to an iterable of expressions: >>> eq = x2 - 4 >>> solve(eq, x) [-2, 2] >>> eq_x, reps = posify([eq, x]); eq_x [_x2 - 4, _x] >>> solve(eq_x) [2] """ eq = sympify(eq) if iterable(eq): f = type(eq) eq = list(eq) syms = set() for e in eq: syms = syms.union(e.atoms(Symbol)) reps = {} for s in syms: reps.update(dict((v, k) for k, v in posify(s)[1].items())) for i, e in enumerate(eq): eq[i] = e.subs(reps) return f(eq), {r: s for s, r in reps.items()} reps = {s: Dummy(s.name, positive=True, s.assumptions0) for s in eq.free_symbols if s.is_positive is None} eq = eq.subs(reps) return eq, {r: s for s, r in reps.items()} def hypersimp(f, k): """Given combinatorial term f(k) simplify its consecutive term ratio i.e. f(k+1)/f(k). The input term can be composed of functions and integer sequences which have equivalent representation in terms of gamma special function. The algorithm performs three basic steps: 1. Rewrite all functions in terms of gamma, if possible. 2. Rewrite all occurrences of gamma in terms of products of gamma and rising factorial with integer, absolute constant exponent. 3. Perform simplification of nested fractions, powers and if the resulting expression is a quotient of polynomials, reduce their total degree. If f(k) is hypergeometric then as result we arrive with a quotient of polynomials of minimal degree. Otherwise None is returned. For more information on the implemented algorithm refer to: 1. W. Koepf, Algorithms for m-fold Hypergeometric Summation, Journal of Symbolic Computation (1995) 20, 399-417 """ f = sympify(f) g = f.subs(k, k + 1) / f g = g.rewrite(gamma) g = expand_func(g) g = powsimp(g, deep=True, combine='exp') if g.is_rational_function(k): return simplify(g, ratio=S.Infinity) else: return None def hypersimilar(f, g, k): """Returns True if 'f' and 'g' are hyper-similar. Similarity in hypergeometric sense means that a quotient of f(k) and g(k) is a rational function in k. This procedure is useful in solving recurrence relations. For more information see hypersimp(). """ f, g = list(map(sympify, (f, g))) h = (f/g).rewrite(gamma) h = h.expand(func=True, basic=False) return h.is_rational_function(k) def signsimp(expr, evaluate=None): """Make all Add sub-expressions canonical wrt sign. If an Add subexpression, ``a``, can have a sign extracted, as determined by could_extract_minus_sign, it is replaced with Mul(-1, a, evaluate=False). This allows signs to be extracted from powers and products. Examples ======== >>> from sympy import signsimp, exp, symbols >>> from sympy.abc import x, y >>> i = symbols('i', odd=True) >>> n = -1 + 1/x >>> n/x/(-n)2 - 1/n/x (-1 + 1/x)/(x(1 - 1/x)2) - 1/(x(-1 + 1/x)) >>> signsimp(_) 0 >>> xn + x-n x(-1 + 1/x) + x(1 - 1/x) >>> signsimp(_) 0 Since powers automatically handle leading signs >>> (-2)i -2i signsimp can be used to put the base of a power with an integer exponent into canonical form: >>> ni (-1 + 1/x)i By default, signsimp doesn't leave behind any hollow simplification: if making an Add canonical wrt sign didn't change the expression, the original Add is restored. If this is not desired then the keyword ``evaluate`` can be set to False: >>> e = exp(y - x) >>> signsimp(e) == e True >>> signsimp(e, evaluate=False) exp(-(x - y)) """ if evaluate is None: evaluate = global_evaluate[0] expr = sympify(expr) if not isinstance(expr, Expr) or expr.is_Atom: return expr e = sub_post(sub_pre(expr)) if not isinstance(e, Expr) or e.is_Atom: return e if e.is_Add: return e.func([signsimp(a, evaluate) for a in e.args]) if evaluate: e = e.xreplace({m: -(-m) for m in e.atoms(Mul) if -(-m) != m}) return e def simplify(expr, ratio=1.7, measure=count_ops, rational=False, inverse=False, doit=True, kwargs): """Simplifies the given expression. Simplification is not a well defined term and the exact strategies this function tries can change in the future versions of SymPy. If your algorithm relies on "simplification" (whatever it is), try to determine what you need exactly - is it powsimp()?, radsimp()?, together()?, logcombine()?, or something else? And use this particular function directly, because those are well defined and thus your algorithm will be robust. Nonetheless, especially for interactive use, or when you don't know anything about the structure of the expression, simplify() tries to apply intelligent heuristics to make the input expression "simpler". For example: >>> from sympy import simplify, cos, sin >>> from sympy.abc import x, y >>> a = (x + x2)/(xsin(y)*2 + xcos(y)2) >>> a (x2 + x)/(xsin(y)2 + xcos(y)2) >>> simplify(a) x + 1 Note that we could have obtained the same result by using specific simplification functions: >>> from sympy import trigsimp, cancel >>> trigsimp(a) (x2 + x)/x >>> cancel(_) x + 1 In some cases, applying :func:`simplify` may actually result in some more complicated expression. The default ``ratio=1.7`` prevents more extreme cases: if (result length)/(input length) > ratio, then input is returned unmodified. The ``measure`` parameter lets you specify the function used to determine how complex an expression is. The function should take a single argument as an expression and return a number such that if expression ``a`` is more complex than expression ``b``, then ``measure(a) > measure(b)``. The default measure function is :func:`count_ops`, which returns the total number of operations in the expression. For example, if ``ratio=1``, ``simplify`` output can't be longer than input. :: >>> from sympy import sqrt, simplify, count_ops, oo >>> root = 1/(sqrt(2)+3) Since ``simplify(root)`` would result in a slightly longer expression, root is returned unchanged instead:: >>> simplify(root, ratio=1) == root True If ``ratio=oo``, simplify will be applied anyway:: >>> count_ops(simplify(root, ratio=oo)) > count_ops(root) True Note that the shortest expression is not necessary the simplest, so setting ``ratio`` to 1 may not be a good idea. Heuristically, the default value ``ratio=1.7`` seems like a reasonable choice. You can easily define your own measure function based on what you feel should represent the "size" or "complexity" of the input expression. Note that some choices, such as ``lambda expr: len(str(expr))`` may appear to be good metrics, but have other problems (in this case, the measure function may slow down simplify too much for very large expressions). If you don't know what a good metric would be, the default, ``count_ops``, is a good one. For example: >>> from sympy import symbols, log >>> a, b = symbols('a b', positive=True) >>> g = log(a) + log(b) + log(a)log(1/b) >>> h = simplify(g) >>> h log(ab(1 - log(a))) >>> count_ops(g) 8 >>> count_ops(h) 5 So you can see that ``h`` is simpler than ``g`` using the count_ops metric. However, we may not like how ``simplify`` (in this case, using ``logcombine``) has created the ``b(log(1/a) + 1)`` term. A simple way to reduce this would be to give more weight to powers as operations in ``count_ops``. We can do this by using the ``visual=True`` option: >>> print(count_ops(g, visual=True)) 2ADD + DIV + 4LOG + MUL >>> print(count_ops(h, visual=True)) 2LOG + MUL + POW + SUB >>> from sympy import Symbol, S >>> def my_measure(expr): ... POW = Symbol('POW') ... # Discourage powers by giving POW a weight of 10 ... count = count_ops(expr, visual=True).subs(POW, 10) ... # Every other operation gets a weight of 1 (the default) ... count = count.replace(Symbol, type(S.One)) ... return count >>> my_measure(g) 8 >>> my_measure(h) 14 >>> 15./8 > 1.7 # 1.7 is the default ratio True >>> simplify(g, measure=my_measure) -log(a)log(b) + log(a) + log(b) Note that because ``simplify()`` internally tries many different simplification strategies and then compares them using the measure function, we get a completely different result that is still different from the input expression by doing this. If rational=True, Floats will be recast as Rationals before simplification. If rational=None, Floats will be recast as Rationals but the result will be recast as Floats. If rational=False(default) then nothing will be done to the Floats. If inverse=True, it will be assumed that a composition of inverse functions, such as sin and asin, can be cancelled in any order. For example, ``asin(sin(x))`` will yield ``x`` without checking whether x belongs to the set where this relation is true. The default is False. Note that ``simplify()`` automatically calls ``doit()`` on the final expression. You can avoid this behavior by passing ``doit=False`` as an argument. """ def done(e): return e.doit() if doit else e expr = sympify(expr) kwargs = dict( ratio=kwargs.get('ratio', ratio), measure=kwargs.get('measure', measure), rational=kwargs.get('rational', rational), inverse=kwargs.get('inverse', inverse), doit=kwargs.get('doit', doit)) # no routine for Expr needs to check for is_zero if isinstance(expr, Expr) and expr.is_zero and expr0 is S.Zero: return S.Zero _eval_simplify = getattr(expr, '_eval_simplify', None) if _eval_simplify is not None: return _eval_simplify(kwargs) original_expr = expr = signsimp(expr) from sympy.simplify.hyperexpand import hyperexpand from sympy.functions.special.bessel import BesselBase from sympy import Sum, Product, Integral if not isinstance(expr, Basic) or not expr.args: # XXX: temporary hack return expr if inverse and expr.has(Function): expr = inversecombine(expr) if not expr.args: # simplified to atomic return expr if not isinstance(expr, (Add, Mul, Pow, ExpBase)): return done( expr.func([simplify(x, *kwargs) for x in expr.args])) if not expr.is_commutative: expr = nc_simplify(expr) # TODO: Apply different strategies, considering expression pattern: # is it a purely rational function? Is there any trigonometric function?... # See also https://github.com/sympy/sympy/pull/185. def shorter(choices): '''Return the choice that has the fewest ops. In case of a tie, the expression listed first is selected.''' if not has_variety(choices): return choices[0] return min(choices, key=measure) # rationalize Floats floats = False if rational is not False and expr.has(Float): floats = True expr = nsimplify(expr, rational=True) expr = bottom_up(expr, lambda w: getattr(w, 'normal', lambda: w)()) expr = Mul(powsimp(expr).as_content_primitive()) _e = cancel(expr) expr1 = shorter(_e, _mexpand(_e).cancel()) # issue 6829 expr2 = shorter(together(expr, deep=True), together(expr1, deep=True)) if ratio is S.Infinity: expr = expr2 else: expr = shorter(expr2, expr1, expr) if not isinstance(expr, Basic): # XXX: temporary hack return expr expr = factor_terms(expr, sign=False) # hyperexpand automatically only works on hypergeometric terms expr = hyperexpand(expr) expr = piecewise_fold(expr) if expr.has(KroneckerDelta): expr = kroneckersimp(expr) if expr.has(BesselBase): expr = besselsimp(expr) if expr.has(TrigonometricFunction, HyperbolicFunction): expr = trigsimp(expr, deep=True) if expr.has(log): expr = shorter(expand_log(expr, deep=True), logcombine(expr)) if expr.has(CombinatorialFunction, gamma): # expression with gamma functions or non-integer arguments is # automatically passed to gammasimp expr = combsimp(expr) if expr.has(Sum): expr = sum_simplify(expr, kwargs) if expr.has(Integral): expr = expr.xreplace(dict([ (i, factor_terms(i)) for i in expr.atoms(Integral)])) if expr.has(Product): expr = product_simplify(expr) from sympy.physics.units import Quantity from sympy.physics.units.util import quantity_simplify if expr.has(Quantity): expr = quantity_simplify(expr) short = shorter(powsimp(expr, combine='exp', deep=True), powsimp(expr), expr) short = shorter(short, cancel(short)) short = shorter(short, factor_terms(short), expand_power_exp(expand_mul(short))) if short.has(TrigonometricFunction, HyperbolicFunction, ExpBase): short = exptrigsimp(short) # get rid of hollow 2-arg Mul factorization hollow_mul = Transform( lambda x: Mul(x.args), lambda x: x.is_Mul and len(x.args) == 2 and x.args[0].is_Number and x.args[1].is_Add and x.is_commutative) expr = short.xreplace(hollow_mul) numer, denom = expr.as_numer_denom() if denom.is_Add: n, d = fraction(radsimp(1/denom, symbolic=False, max_terms=1)) if n is not S.One: expr = (numern).expand()/d if expr.could_extract_minus_sign(): n, d = fraction(expr) if d != 0: expr = signsimp(-n/(-d)) if measure(expr) > ratiomeasure(original_expr): expr = original_expr # restore floats if floats and rational is None: expr = nfloat(expr, exponent=False) return done(expr) def sum_simplify(s, kwargs): """Main function for Sum simplification""" from sympy.concrete.summations import Sum from sympy.core.function import expand if not isinstance(s, Add): s = s.xreplace(dict([(a, sum_simplify(a, kwargs)) for a in s.atoms(Add) if a.has(Sum)])) s = expand(s) if not isinstance(s, Add): return s terms = s.args s_t = [] # Sum Terms o_t = [] # Other Terms for term in terms: sum_terms, other = sift(Mul.make_args(term), lambda i: isinstance(i, Sum), binary=True) if not sum_terms: o_t.append(term) continue other = [Mul(other)] s_t.append(Mul((other + [s._eval_simplify(*kwargs) for s in sum_terms]))) result = Add(sum_combine(s_t), o_t) return result def sum_combine(s_t): """Helper function for Sum simplification Attempts to simplify a list of sums, by combining limits / sum function's returns the simplified sum """ from sympy.concrete.summations import Sum used = [False] * len(s_t) for method in range(2): for i, s_term1 in enumerate(s_t): if not used[i]: for j, s_term2 in enumerate(s_t): if not used[j] and i != j: temp = sum_add(s_term1, s_term2, method) if isinstance(temp, Sum) or isinstance(temp, Mul): s_t[i] = temp s_term1 = s_t[i] used[j] = True result = S.Zero for i, s_term in enumerate(s_t): if not used[i]: result = Add(result, s_term) return result def factor_sum(self, limits=None, radical=False, clear=False, fraction=False, sign=True): """Return Sum with constant factors extracted. If ``limits`` is specified then ``self`` is the summand; the other keywords are passed to ``factor_terms``. Examples ======== >>> from sympy import Sum, Integral >>> from sympy.abc import x, y >>> from sympy.simplify.simplify import factor_sum >>> s = Sum(xy, (x, 1, 3)) >>> factor_sum(s) ySum(x, (x, 1, 3)) >>> factor_sum(s.function, s.limits) ySum(x, (x, 1, 3)) """ # XXX deprecate in favor of direct call to factor_terms from sympy.concrete.summations import Sum kwargs = dict(radical=radical, clear=clear, fraction=fraction, sign=sign) expr = Sum(self, limits) if limits else self return factor_terms(expr, *kwargs) def sum_add(self, other, method=0): """Helper function for Sum simplification""" from sympy.concrete.summations import Sum from sympy import Mul #we know this is something in terms of a constant a sum #so we temporarily put the constants inside for simplification #then simplify the result def __refactor(val): args = Mul.make_args(val) sumv = next(x for x in args if isinstance(x, Sum)) constant = Mul([x for x in args if x != sumv]) return Sum(constant sumv.function, sumv.limits) if isinstance(self, Mul): rself = __refactor(self) else: rself = self if isinstance(other, Mul): rother = __refactor(other) else: rother = other if type(rself) == type(rother): if method == 0: if rself.limits == rother.limits: return factor_sum(Sum(rself.function + rother.function, rself.limits)) elif method == 1: if simplify(rself.function - rother.function) == 0: if len(rself.limits) == len(rother.limits) == 1: i = rself.limits[0][0] x1 = rself.limits[0][1] y1 = rself.limits[0][2] j = rother.limits[0][0] x2 = rother.limits[0][1] y2 = rother.limits[0][2] if i == j: if x2 == y1 + 1: return factor_sum(Sum(rself.function, (i, x1, y2))) elif x1 == y2 + 1: return factor_sum(Sum(rself.function, (i, x2, y1))) return Add(self, other) def product_simplify(s): """Main function for Product simplification""" from sympy.concrete.products import Product terms = Mul.make_args(s) p_t = [] # Product Terms o_t = [] # Other Terms for term in terms: if isinstance(term, Product): p_t.append(term) else: o_t.append(term) used = [False] * len(p_t) for method in range(2): for i, p_term1 in enumerate(p_t): if not used[i]: for j, p_term2 in enumerate(p_t): if not used[j] and i != j: if isinstance(product_mul(p_term1, p_term2, method), Product): p_t[i] = product_mul(p_term1, p_term2, method) used[j] = True result = Mul(o_t) for i, p_term in enumerate(p_t): if not used[i]: result = Mul(result, p_term) return result def product_mul(self, other, method=0): """Helper function for Product simplification""" from sympy.concrete.products import Product if type(self) == type(other): if method == 0: if self.limits == other.limits: return Product(self.function other.function, self.limits) elif method == 1: if simplify(self.function - other.function) == 0: if len(self.limits) == len(other.limits) == 1: i = self.limits[0][0] x1 = self.limits[0][1] y1 = self.limits[0][2] j = other.limits[0][0] x2 = other.limits[0][1] y2 = other.limits[0][2] if i == j: if x2 == y1 + 1: return Product(self.function, (i, x1, y2)) elif x1 == y2 + 1: return Product(self.function, (i, x2, y1)) return Mul(self, other) def _nthroot_solve(p, n, prec): """ helper function for ``nthroot`` It denests ``pRational(1, n)`` using its minimal polynomial """ from sympy.polys.numberfields import _minimal_polynomial_sq from sympy.solvers import solve while n % 2 == 0: p = sqrtdenest(sqrt(p)) n = n // 2 if n == 1: return p pn = pRational(1, n) x = Symbol('x') f = _minimal_polynomial_sq(p, n, x) if f is None: return None sols = solve(f, x) for sol in sols: if abs(sol - pn).n() < 1./10prec: sol = sqrtdenest(sol) if _mexpand(soln) == p: return sol def logcombine(expr, force=False): """ Takes logarithms and combines them using the following rules: - log(x) + log(y) == log(xy) if both are positive - alog(x) == log(xa) if x is positive and a is real If ``force`` is True then the assumptions above will be assumed to hold if there is no assumption already in place on a quantity. For example, if ``a`` is imaginary or the argument negative, force will not perform a combination but if ``a`` is a symbol with no assumptions the change will take place. Examples ======== >>> from sympy import Symbol, symbols, log, logcombine, I >>> from sympy.abc import a, x, y, z >>> logcombine(alog(x) + log(y) - log(z)) alog(x) + log(y) - log(z) >>> logcombine(alog(x) + log(y) - log(z), force=True) log(x*ay/z) >>> x,y,z = symbols('x,y,z', positive=True) >>> a = Symbol('a', real=True) >>> logcombine(alog(x) + log(y) - log(z)) log(xay/z) The transformation is limited to factors and/or terms that contain logs, so the result depends on the initial state of expansion: >>> eq = (2 + 3I)log(x) >>> logcombine(eq, force=True) == eq True >>> logcombine(eq.expand(), force=True) log(x*2) + Ilog(x*3) See Also ======== posify: replace all symbols with symbols having positive assumptions sympy.core.function.expand_log: expand the logarithms of products and powers; the opposite of logcombine """ def f(rv): if not (rv.is_Add or rv.is_Mul): return rv def gooda(a): # bool to tell whether the leading ``a`` in ``alog(x)`` # could appear as log(x*a) return (a is not S.NegativeOne and # -1 could* go, but we disallow (a.is_extended_real or force and a.is_extended_real is not False)) def goodlog(l): # bool to tell whether log ``l``'s argument can combine with others a = l.args[0] return a.is_positive or force and a.is_nonpositive is not False other = [] logs = [] log1 = defaultdict(list) for a in Add.make_args(rv): if isinstance(a, log) and goodlog(a): log1[()].append(([], a)) elif not a.is_Mul: other.append(a) else: ot = [] co = [] lo = [] for ai in a.args: if ai.is_Rational and ai < 0: ot.append(S.NegativeOne) co.append(-ai) elif isinstance(ai, log) and goodlog(ai): lo.append(ai) elif gooda(ai): co.append(ai) else: ot.append(ai) if len(lo) > 1: logs.append((ot, co, lo)) elif lo: log1[tuple(ot)].append((co, lo[0])) else: other.append(a) # if there is only one log in other, put it with the # good logs if len(other) == 1 and isinstance(other[0], log): log1[()].append(([], other.pop())) # if there is only one log at each coefficient and none have # an exponent to place inside the log then there is nothing to do if not logs and all(len(log1[k]) == 1 and log1[k][0] == [] for k in log1): return rv # collapse multi-logs as far as possible in a canonical way # TODO: see if xlog(a)+xlog(a)log(b) -> xlog(a)(1+log(b))? # -- in this case, it's unambiguous, but if it were were a log(c) in # each term then it's arbitrary whether they are grouped by log(a) or # by log(c). So for now, just leave this alone; it's probably better to # let the user decide for o, e, l in logs: l = list(ordered(l)) e = log(l.pop(0).args[0]Mul(e)) while l: li = l.pop(0) e = log(li.args[0]*e) c, l = Mul(o), e if isinstance(l, log): # it should be, but check to be sure log1[(c,)].append(([], l)) else: other.append(cl) # logs that have the same coefficient can multiply for k in list(log1.keys()): log1[Mul(k)] = log(logcombine(Mul([ l.args[0]Mul(c) for c, l in log1.pop(k)]), force=force), evaluate=False) # logs that have oppositely signed coefficients can divide for k in ordered(list(log1.keys())): if not k in log1: # already popped as -k continue if -k in log1: # figure out which has the minus sign; the one with # more op counts should be the one num, den = k, -k if num.count_ops() > den.count_ops(): num, den = den, num other.append( numlog(log1.pop(num).args[0]/log1.pop(den).args[0], evaluate=False)) else: other.append(klog1.pop(k)) return Add(other) return bottom_up(expr, f) def inversecombine(expr): """Simplify the composition of a function and its inverse. No attention is paid to whether the inverse is a left inverse or a right inverse; thus, the result will in general not be equivalent to the original expression. Examples ======== >>> from sympy.simplify.simplify import inversecombine >>> from sympy import asin, sin, log, exp >>> from sympy.abc import x >>> inversecombine(asin(sin(x))) x >>> inversecombine(2log(exp(3x))) 6x """ def f(rv): if rv.is_Function and hasattr(rv, "inverse"): if (len(rv.args) == 1 and len(rv.args[0].args) == 1 and isinstance(rv.args[0], rv.inverse(argindex=1))): rv = rv.args[0].args[0] return rv return bottom_up(expr, f) def walk(e, target): """iterate through the args that are the given types (target) and return a list of the args that were traversed; arguments that are not of the specified types are not traversed. Examples ======== >>> from sympy.simplify.simplify import walk >>> from sympy import Min, Max >>> from sympy.abc import x, y, z >>> list(walk(Min(x, Max(y, Min(1, z))), Min)) [Min(x, Max(y, Min(1, z)))] >>> list(walk(Min(x, Max(y, Min(1, z))), Min, Max)) [Min(x, Max(y, Min(1, z))), Max(y, Min(1, z)), Min(1, z)] See Also ======== bottom_up """ if isinstance(e, target): yield e for i in e.args: for w in walk(i, target): yield w def bottom_up(rv, F, atoms=False, nonbasic=False): """Apply ``F`` to all expressions in an expression tree from the bottom up. If ``atoms`` is True, apply ``F`` even if there are no args; if ``nonbasic`` is True, try to apply ``F`` to non-Basic objects. """ args = getattr(rv, 'args', None) if args is not None: if args: args = tuple([bottom_up(a, F, atoms, nonbasic) for a in args]) if args != rv.args: rv = rv.func(args) rv = F(rv) elif atoms: rv = F(rv) else: if nonbasic: try: rv = F(rv) except TypeError: pass return rv def kroneckersimp(expr): """ Simplify expressions with KroneckerDelta. The only simplification currently attempted is to identify multiplicative cancellation: >>> from sympy import KroneckerDelta, kroneckersimp >>> from sympy.abc import i, j >>> kroneckersimp(1 + KroneckerDelta(0, j) KroneckerDelta(1, j)) 1 """ def args_cancel(args1, args2): for i1 in range(2): for i2 in range(2): a1 = args1[i1] a2 = args2[i2] a3 = args1[(i1 + 1) % 2] a4 = args2[(i2 + 1) % 2] if Eq(a1, a2) is S.true and Eq(a3, a4) is S.false: return True return False def cancel_kronecker_mul(m): from sympy.utilities.iterables import subsets args = m.args deltas = [a for a in args if isinstance(a, KroneckerDelta)] for delta1, delta2 in subsets(deltas, 2): args1 = delta1.args args2 = delta2.args if args_cancel(args1, args2): return 0m return m if not expr.has(KroneckerDelta): return expr if expr.has(Piecewise): expr = expr.rewrite(KroneckerDelta) newexpr = expr expr = None while newexpr != expr: expr = newexpr newexpr = expr.replace(lambda e: isinstance(e, Mul), cancel_kronecker_mul) return expr def besselsimp(expr): """ Simplify bessel-type functions. This routine tries to simplify bessel-type functions. Currently it only works on the Bessel J and I functions, however. It works by looking at all such functions in turn, and eliminating factors of "I" and "-1" (actually their polar equivalents) in front of the argument. Then, functions of half-integer order are rewritten using strigonometric functions and functions of integer order (> 1) are rewritten using functions of low order. Finally, if the expression was changed, compute factorization of the result with factor(). >>> from sympy import besselj, besseli, besselsimp, polar_lift, I, S >>> from sympy.abc import z, nu >>> besselsimp(besselj(nu, zpolar_lift(-1))) exp(Ipinu)besselj(nu, z) >>> besselsimp(besseli(nu, zpolar_lift(-I))) exp(-Ipinu/2)besselj(nu, z) >>> besselsimp(besseli(S(-1)/2, z)) sqrt(2)cosh(z)/(sqrt(pi)sqrt(z)) >>> besselsimp(zbesseli(0, z) + z(besseli(2, z))/2 + besseli(1, z)) 3zbesseli(0, z)/2 """ # TODO # - better algorithm? # - simplify (cos(pib)besselj(b,z) - besselj(-b,z))/sin(pib) ... # - use contiguity relations? def replacer(fro, to, factors): factors = set(factors) def repl(nu, z): if factors.intersection(Mul.make_args(z)): return to(nu, z) return fro(nu, z) return repl def torewrite(fro, to): def tofunc(nu, z): return fro(nu, z).rewrite(to) return tofunc def tominus(fro): def tofunc(nu, z): return exp(Ipinu)fro(nu, exp_polar(-Ipi)z) return tofunc orig_expr = expr ifactors = [I, exp_polar(Ipi/2), exp_polar(-Ipi/2)] expr = expr.replace( besselj, replacer(besselj, torewrite(besselj, besseli), ifactors)) expr = expr.replace( besseli, replacer(besseli, torewrite(besseli, besselj), ifactors)) minusfactors = [-1, exp_polar(Ipi)] expr = expr.replace( besselj, replacer(besselj, tominus(besselj), minusfactors)) expr = expr.replace( besseli, replacer(besseli, tominus(besseli), minusfactors)) z0 = Dummy('z') def expander(fro): def repl(nu, z): if (nu % 1) == S(1)/2: return simplify(trigsimp(unpolarify( fro(nu, z0).rewrite(besselj).rewrite(jn).expand( func=True)).subs(z0, z))) elif nu.is_Integer and nu > 1: return fro(nu, z).expand(func=True) return fro(nu, z) return repl expr = expr.replace(besselj, expander(besselj)) expr = expr.replace(bessely, expander(bessely)) expr = expr.replace(besseli, expander(besseli)) expr = expr.replace(besselk, expander(besselk)) if expr != orig_expr: expr = expr.factor() return expr def nthroot(expr, n, max_len=4, prec=15): """ compute a real nth-root of a sum of surds Parameters ========== expr : sum of surds n : integer max_len : maximum number of surds passed as constants to ``nsimplify`` Algorithm ========= First ``nsimplify`` is used to get a candidate root; if it is not a root the minimal polynomial is computed; the answer is one of its roots. Examples ======== >>> from sympy.simplify.simplify import nthroot >>> from sympy import Rational, sqrt >>> nthroot(90 + 34sqrt(7), 3) sqrt(7) + 3 """ expr = sympify(expr) n = sympify(n) p = exprRational(1, n) if not n.is_integer: return p if not _is_sum_surds(expr): return p surds = [] coeff_muls = [x.as_coeff_Mul() for x in expr.args] for x, y in coeff_muls: if not x.is_rational: return p if y is S.One: continue if not (y.is_Pow and y.exp == S.Half and y.base.is_integer): return p surds.append(y) surds.sort() surds = surds[:max_len] if expr < 0 and n % 2 == 1: p = (-expr)Rational(1, n) a = nsimplify(p, constants=surds) res = a if _mexpand(an) == _mexpand(-expr) else p return -res a = nsimplify(p, constants=surds) if _mexpand(a) is not _mexpand(p) and _mexpand(an) == _mexpand(expr): return _mexpand(a) expr = _nthroot_solve(expr, n, prec) if expr is None: return p return expr def nsimplify(expr, constants=(), tolerance=None, full=False, rational=None, rational_conversion='base10'): """ Find a simple representation for a number or, if there are free symbols or if rational=True, then replace Floats with their Rational equivalents. If no change is made and rational is not False then Floats will at least be converted to Rationals. For numerical expressions, a simple formula that numerically matches the given numerical expression is sought (and the input should be possible to evalf to a precision of at least 30 digits). Optionally, a list of (rationally independent) constants to include in the formula may be given. A lower tolerance may be set to find less exact matches. If no tolerance is given then the least precise value will set the tolerance (e.g. Floats default to 15 digits of precision, so would be tolerance=10-15). With full=True, a more extensive search is performed (this is useful to find simpler numbers when the tolerance is set low). When converting to rational, if rational_conversion='base10' (the default), then convert floats to rationals using their base-10 (string) representation. When rational_conversion='exact' it uses the exact, base-2 representation. Examples ======== >>> from sympy import nsimplify, sqrt, GoldenRatio, exp, I, exp, pi >>> nsimplify(4/(1+sqrt(5)), [GoldenRatio]) -2 + 2GoldenRatio >>> nsimplify((1/(exp(3piI/5)+1))) 1/2 - Isqrt(sqrt(5)/10 + 1/4) >>> nsimplify(II, [pi]) exp(-pi/2) >>> nsimplify(pi, tolerance=0.01) 22/7 >>> nsimplify(0.333333333333333, rational=True, rational_conversion='exact') 6004799503160655/18014398509481984 >>> nsimplify(0.333333333333333, rational=True) 1/3 See Also ======== sympy.core.function.nfloat """ try: return sympify(as_int(expr)) except (TypeError, ValueError): pass expr = sympify(expr).xreplace({ Float('inf'): S.Infinity, Float('-inf'): S.NegativeInfinity, }) if expr is S.Infinity or expr is S.NegativeInfinity: return expr if rational or expr.free_symbols: return _real_to_rational(expr, tolerance, rational_conversion) # SymPy's default tolerance for Rationals is 15; other numbers may have # lower tolerances set, so use them to pick the largest tolerance if None # was given if tolerance is None: tolerance = 10-min([15] + [mpmath.libmp.libmpf.prec_to_dps(n._prec) for n in expr.atoms(Float)]) # XXX should prec be set independent of tolerance or should it be computed # from tolerance? prec = 30 bprec = int(prec3.33) constants_dict = {} for constant in constants: constant = sympify(constant) v = constant.evalf(prec) if not v.is_Float: raise ValueError("constants must be real-valued") constants_dict[str(constant)] = v._to_mpmath(bprec) exprval = expr.evalf(prec, chop=True) re, im = exprval.as_real_imag() # safety check to make sure that this evaluated to a number if not (re.is_Number and im.is_Number): return expr def nsimplify_real(x): orig = mpmath.mp.dps xv = x._to_mpmath(bprec) try: # We'll be happy with low precision if a simple fraction if not (tolerance or full): mpmath.mp.dps = 15 rat = mpmath.pslq([xv, 1]) if rat is not None: return Rational(-int(rat[1]), int(rat[0])) mpmath.mp.dps = prec newexpr = mpmath.identify(xv, constants=constants_dict, tol=tolerance, full=full) if not newexpr: raise ValueError if full: newexpr = newexpr[0] expr = sympify(newexpr) if x and not expr: # don't let x become 0 raise ValueError if expr.is_finite is False and not xv in [mpmath.inf, mpmath.ninf]: raise ValueError return expr finally: # even though there are returns above, this is executed # before leaving mpmath.mp.dps = orig try: if re: re = nsimplify_real(re) if im: im = nsimplify_real(im) except ValueError: if rational is None: return _real_to_rational(expr, rational_conversion=rational_conversion) return expr rv = re + imS.ImaginaryUnit # if there was a change or rational is explicitly not wanted # return the value, else return the Rational representation if rv != expr or rational is False: return rv return _real_to_rational(expr, rational_conversion=rational_conversion) def _real_to_rational(expr, tolerance=None, rational_conversion='base10'): """ Replace all reals in expr with rationals. Examples ======== >>> from sympy import Rational >>> from sympy.simplify.simplify import _real_to_rational >>> from sympy.abc import x >>> _real_to_rational(.76 + .1x*.5) sqrt(x)/10 + 19/25 If rational_conversion='base10', this uses the base-10 string. If rational_conversion='exact', the exact, base-2 representation is used. >>> _real_to_rational(0.333333333333333, rational_conversion='exact') 6004799503160655/18014398509481984 >>> _real_to_rational(0.333333333333333) 1/3 """ expr = _sympify(expr) inf = Float('inf') p = expr reps = {} reduce_num = None if tolerance is not None and tolerance < 1: reduce_num = ceiling(1/tolerance) for fl in p.atoms(Float): key = fl if reduce_num is not None: r = Rational(fl).limit_denominator(reduce_num) elif (tolerance is not None and tolerance >= 1 and fl.is_Integer is False): r = Rational(toleranceround(fl/tolerance) ).limit_denominator(int(tolerance)) else: if rational_conversion == 'exact': r = Rational(fl) reps[key] = r continue elif rational_conversion != 'base10': raise ValueError("rational_conversion must be 'base10' or 'exact'") r = nsimplify(fl, rational=False) # e.g. log(3).n() -> log(3) instead of a Rational if fl and not r: r = Rational(fl) elif not r.is_Rational: if fl == inf or fl == -inf: r = S.ComplexInfinity elif fl < 0: fl = -fl d = Pow(10, int((mpmath.log(fl)/mpmath.log(10)))) r = -Rational(str(fl/d))d elif fl > 0: d = Pow(10, int((mpmath.log(fl)/mpmath.log(10)))) r = Rational(str(fl/d))d else: r = Integer(0) reps[key] = r return p.subs(reps, simultaneous=True) def clear_coefficients(expr, rhs=S.Zero): """Return `p, r` where `p` is the expression obtained when Rational additive and multiplicative coefficients of `expr` have been stripped away in a naive fashion (i.e. without simplification). The operations needed to remove the coefficients will be applied to `rhs` and returned as `r`. Examples ======== >>> from sympy.simplify.simplify import clear_coefficients >>> from sympy.abc import x, y >>> from sympy import Dummy >>> expr = 4y(6x + 3) >>> clear_coefficients(expr - 2) (y(2x + 1), 1/6) When solving 2 or more expressions like `expr = a`, `expr = b`, etc..., it is advantageous to provide a Dummy symbol for `rhs` and simply replace it with `a`, `b`, etc... in `r`. >>> rhs = Dummy('rhs') >>> clear_coefficients(expr, rhs) (y(2x + 1), _rhs/12) >>> _[1].subs(rhs, 2) 1/6 """ was = None free = expr.free_symbols if expr.is_Rational: return (S.Zero, rhs - expr) while expr and was != expr: was = expr m, expr = ( expr.as_content_primitive() if free else factor_terms(expr).as_coeff_Mul(rational=True)) rhs /= m c, expr = expr.as_coeff_Add(rational=True) rhs -= c expr = signsimp(expr, evaluate = False) if _coeff_isneg(expr): expr = -expr rhs = -rhs return expr, rhs def nc_simplify(expr, deep=True): ''' Simplify a non-commutative expression composed of multiplication and raising to a power by grouping repeated subterms into one power. Priority is given to simplifications that give the fewest number of arguments in the end (for example, in ababcabc simplifying to (ab)2cabc gives 5 arguments while ab(abc)2 has 3). If `expr` is a sum of such terms, the sum of the simplified terms is returned. Keyword argument `deep` controls whether or not subexpressions nested deeper inside the main expression are simplified. See examples below. Setting `deep` to `False` can save time on nested expressions that don't need simplifying on all levels. Examples ======== >>> from sympy import symbols >>> from sympy.simplify.simplify import nc_simplify >>> a, b, c = symbols("a b c", commutative=False) >>> nc_simplify(ababcabc) ab(abc)2 >>> expr = a2ba*4ba4 >>> nc_simplify(expr) a2(ba4)2 >>> nc_simplify(ababc2(ab)2c*2) ((ab)*2c2)2 >>> nc_simplify(abab + 2aca*2ca2ca) (ab)*2 + 2(aca)3 >>> nc_simplify(b-1a-1(ab)2) ab >>> nc_simplify(a*-1b*-1ca) (ba)*(-1)ca >>> expr = (abab)*2acac >>> nc_simplify(expr) (ab)*4(ac)2 >>> nc_simplify(expr, deep=False) (abab)*2(ac)2 ''' from sympy.matrices.expressions import (MatrixExpr, MatAdd, MatMul, MatPow, MatrixSymbol) from sympy.core.exprtools import factor_nc if isinstance(expr, MatrixExpr): expr = expr.doit(inv_expand=False) _Add, _Mul, _Pow, _Symbol = MatAdd, MatMul, MatPow, MatrixSymbol else: _Add, _Mul, _Pow, _Symbol = Add, Mul, Pow, Symbol # =========== Auxiliary functions ======================== def _overlaps(args): # Calculate a list of lists m such that m[i][j] contains the lengths # of all possible overlaps between args[:i+1] and args[i+1+j:]. # An overlap is a suffix of the prefix that matches a prefix # of the suffix. # For example, let expr=cabababab. Then m[3][0] contains # the lengths of overlaps of cabab with abab. The overlaps # are abab, ab and the empty word so that m[3][0]=[4,2,0]. # All overlaps rather than only the longest one are recorded # because this information helps calculate other overlap lengths. m = [[([1, 0] if a == args[0] else [0]) for a in args[1:]]] for i in range(1, len(args)): overlaps = [] j = 0 for j in range(len(args) - i - 1): overlap = [] for v in m[i-1][j+1]: if j + i + 1 + v < len(args) and args[i] == args[j+i+1+v]: overlap.append(v + 1) overlap += [0] overlaps.append(overlap) m.append(overlaps) return m def _reduce_inverses(_args): # replace consecutive negative powers by an inverse # of a product of positive powers, e.g. a*-1b*-1c # will simplify to (ab)-1c; # return that new args list and the number of negative # powers in it (inv_tot) inv_tot = 0 # total number of inverses inverses = [] args = [] for arg in _args: if isinstance(arg, _Pow) and arg.args[1] < 0: inverses = [arg-1] + inverses inv_tot += 1 else: if len(inverses) == 1: args.append(inverses[0]-1) elif len(inverses) > 1: args.append(_Pow(_Mul(inverses), -1)) inv_tot -= len(inverses) - 1 inverses = [] args.append(arg) if inverses: args.append(_Pow(_Mul(inverses), -1)) inv_tot -= len(inverses) - 1 return inv_tot, tuple(args) def get_score(s): # compute the number of arguments of s # (including in nested expressions) overall # but ignore exponents if isinstance(s, _Pow): return get_score(s.args[0]) elif isinstance(s, (_Add, _Mul)): return sum([get_score(a) for a in s.args]) return 1 def compare(s, alt_s): # compare two possible simplifications and return a # "better" one if s != alt_s and get_score(alt_s) < get_score(s): return alt_s return s # ======================================================== if not isinstance(expr, (_Add, _Mul, _Pow)) or expr.is_commutative: return expr args = expr.args[:] if isinstance(expr, _Pow): if deep: return _Pow(nc_simplify(args[0]), args[1]).doit() else: return expr elif isinstance(expr, _Add): return _Add([nc_simplify(a, deep=deep) for a in args]).doit() else: # get the non-commutative part c_args, args = expr.args_cnc() com_coeff = Mul(c_args) if com_coeff != 1: return com_coeffnc_simplify(expr/com_coeff, deep=deep) inv_tot, args = _reduce_inverses(args) # if most arguments are negative, work with the inverse # of the expression, e.g. a-1ba-1c*-1 will become # (cab-1a)*-1 at the end so can work with cab-1a invert = False if inv_tot > len(args)/2: invert = True args = [a*-1 for a in args[::-1]] if deep: args = tuple(nc_simplify(a) for a in args) m = _overlaps(args) # simps will be {subterm: end} where `end` is the ending # index of a sequence of repetitions of subterm; # this is for not wasting time with subterms that are part # of longer, already considered sequences simps = {} post = 1 pre = 1 # the simplification coefficient is the number of # arguments by which contracting a given sequence # would reduce the word; e.g. in ababcabc, # contracting abab to (ab)*2 removes 3 arguments # while abcabc to (abc)*2 removes 6. It's # better to contract the latter so simplification # with a maximum simplification coefficient will be chosen max_simp_coeff = 0 simp = None # information about future simplification for i in range(1, len(args)): simp_coeff = 0 l = 0 # length of a subterm p = 0 # the power of a subterm if i < len(args) - 1: rep = m[i][0] start = i # starting index of the repeated sequence end = i+1 # ending index of the repeated sequence if i == len(args)-1 or rep == [0]: # no subterm is repeated at this stage, at least as # far as the arguments are concerned - there may be # a repetition if powers are taken into account if (isinstance(args[i], _Pow) and not isinstance(args[i].args[0], _Symbol)): subterm = args[i].args[0].args l = len(subterm) if args[i-l:i] == subterm: # e.g. ab in ab(ab)2 is not repeated # in args (= [a, b, (ab)*2]) but it # can be matched here p += 1 start -= l if args[i+1:i+1+l] == subterm: # e.g. ab in (ab)2ab p += 1 end += l if p: p += args[i].args[1] else: continue else: l = rep[0] # length of the longest repeated subterm at this point start -= l - 1 subterm = args[start:end] p = 2 end += l if subterm in simps and simps[subterm] >= start: # the subterm is part of a sequence that # has already been considered continue # count how many times it's repeated while end < len(args): if l in m[end-1][0]: p += 1 end += l elif isinstance(args[end], _Pow) and args[end].args[0].args == subterm: # for cases like abab(ab)*2ab p += args[end].args[1] end += 1 else: break # see if another match can be made, e.g. # for ba*2 in ba*2ba3 or ab in # a*2bab pre_exp = 0 pre_arg = 1 if start - l >= 0 and args[start-l+1:start] == subterm[1:]: if isinstance(subterm[0], _Pow): pre_arg = subterm[0].args[0] exp = subterm[0].args[1] else: pre_arg = subterm[0] exp = 1 if isinstance(args[start-l], _Pow) and args[start-l].args[0] == pre_arg: pre_exp = args[start-l].args[1] - exp start -= l p += 1 elif args[start-l] == pre_arg: pre_exp = 1 - exp start -= l p += 1 post_exp = 0 post_arg = 1 if end + l - 1 < len(args) and args[end:end+l-1] == subterm[:-1]: if isinstance(subterm[-1], _Pow): post_arg = subterm[-1].args[0] exp = subterm[-1].args[1] else: post_arg = subterm[-1] exp = 1 if isinstance(args[end+l-1], _Pow) and args[end+l-1].args[0] == post_arg: post_exp = args[end+l-1].args[1] - exp end += l p += 1 elif args[end+l-1] == post_arg: post_exp = 1 - exp end += l p += 1 # Consider aba*2ba2ba: # ba*2 is explicitly repeated, but note # that in this case aba is also repeated # so there are two possible simplifications: # a(ba2)3a*-1 or (aba)3 # The latter is obviously simpler. # But in aba2b*2a*2 the simplifications are # a(ba2)2 and (aba)3a in which case # it's better to stick with the shorter subterm if post_exp and exp % 2 == 0 and start > 0: exp = exp/2 _pre_exp = 1 _post_exp = 1 if isinstance(args[start-1], _Pow) and args[start-1].args[0] == post_arg: _post_exp = post_exp + exp _pre_exp = args[start-1].args[1] - exp elif args[start-1] == post_arg: _post_exp = post_exp + exp _pre_exp = 1 - exp if _pre_exp == 0 or _post_exp == 0: if not pre_exp: start -= 1 post_exp = _post_exp pre_exp = _pre_exp pre_arg = post_arg subterm = (post_argexp,) + subterm[:-1] + (post_argexp,) simp_coeff += end-start if post_exp: simp_coeff -= 1 if pre_exp: simp_coeff -= 1 simps[subterm] = end if simp_coeff > max_simp_coeff: max_simp_coeff = simp_coeff simp = (start, _Mul(subterm), p, end, l) pre = pre_argpre_exp post = post_argpost_exp if simp: subterm = _Pow(nc_simplify(simp[1], deep=deep), simp[2]) pre = nc_simplify(_Mul(args[:simp[0]])pre, deep=deep) post = postnc_simplify(_Mul(args[simp[3]:]), deep=deep) simp = presubtermpost if pre != 1 or post != 1: # new simplifications may be possible but no need # to recurse over arguments simp = nc_simplify(simp, deep=False) else: simp = _Mul(args) if invert: simp = _Pow(simp, -1) # see if factor_nc(expr) is simplified better if not isinstance(expr, MatrixExpr): f_expr = factor_nc(expr) if f_expr != expr: alt_simp = nc_simplify(f_expr, deep=deep) simp = compare(simp, alt_simp) else: simp = simp.doit(inv_expand=False) return simp
c7a44562ad8ffb348d977d5170cfc5ead565c329373c56767c60f065ce2117eb	"""The module helps converting SymPy expressions into shorter forms of them. for example: the expression E*(piI) will be converted into -1 the expression (x+x)*2 will be converted into 4x**2 """ from .simplify import (simplify, hypersimp, hypersimilar, logcombine, separatevars, posify, besselsimp, kroneckersimp, signsimp, bottom_up, nsimplify) from .fu import FU, fu from .sqrtdenest import sqrtdenest from .cse_main import cse from .traversaltools import use from .epathtools import epath, EPath from .hyperexpand import hyperexpand from .radsimp import collect, rcollect, radsimp, collect_const, fraction, numer, denom from .trigsimp import trigsimp, exptrigsimp from .powsimp import powsimp, powdenest from .combsimp import combsimp from .gammasimp import gammasimp from .ratsimp import ratsimp, ratsimpmodprime
9db141fe13acb3512c00d0896fb8f2d7551e688bcc09608ef2418021c41704a3	""" Implementation of the trigsimp algorithm by Fu et al. The idea behind the ``fu`` algorithm is to use a sequence of rules, applied in what is heuristically known to be a smart order, to select a simpler expression that is equivalent to the input. There are transform rules in which a single rule is applied to the expression tree. The following are just mnemonic in nature; see the docstrings for examples. TR0 - simplify expression TR1 - sec-csc to cos-sin TR2 - tan-cot to sin-cos ratio TR2i - sin-cos ratio to tan TR3 - angle canonicalization TR4 - functions at special angles TR5 - powers of sin to powers of cos TR6 - powers of cos to powers of sin TR7 - reduce cos power (increase angle) TR8 - expand products of sin-cos to sums TR9 - contract sums of sin-cos to products TR10 - separate sin-cos arguments TR10i - collect sin-cos arguments TR11 - reduce double angles TR12 - separate tan arguments TR12i - collect tan arguments TR13 - expand product of tan-cot TRmorrie - prod(cos(x2i), (i, 0, k - 1)) -> sin(2kx)/(2*ksin(x)) TR14 - factored powers of sin or cos to cos or sin power TR15 - negative powers of sin to cot power TR16 - negative powers of cos to tan power TR22 - tan-cot powers to negative powers of sec-csc functions TR111 - negative sin-cos-tan powers to csc-sec-cot There are 4 combination transforms (CTR1 - CTR4) in which a sequence of transformations are applied and the simplest expression is selected from a few options. Finally, there are the 2 rule lists (RL1 and RL2), which apply a sequence of transformations and combined transformations, and the ``fu`` algorithm itself, which applies rules and rule lists and selects the best expressions. There is also a function ``L`` which counts the number of trigonometric functions that appear in the expression. Other than TR0, re-writing of expressions is not done by the transformations. e.g. TR10i finds pairs of terms in a sum that are in the form like ``cos(x)cos(y) + sin(x)sin(y)``. Such expression are targeted in a bottom-up traversal of the expression, but no manipulation to make them appear is attempted. For example, Set-up for examples below: >>> from sympy.simplify.fu import fu, L, TR9, TR10i, TR11 >>> from sympy import factor, sin, cos, powsimp >>> from sympy.abc import x, y, z, a >>> from time import time >>> eq = cos(x + y)/cos(x) >>> TR10i(eq.expand(trig=True)) -sin(x)sin(y)/cos(x) + cos(y) If the expression is put in "normal" form (with a common denominator) then the transformation is successful: >>> TR10i(_.normal()) cos(x + y)/cos(x) TR11's behavior is similar. It rewrites double angles as smaller angles but doesn't do any simplification of the result. >>> TR11(sin(2)acos(1)*(-a), 1) (2sin(1)cos(1))acos(1)*(-a) >>> powsimp(_) (2sin(1))*a The temptation is to try make these TR rules "smarter" but that should really be done at a higher level; the TR rules should try maintain the "do one thing well" principle. There is one exception, however. In TR10i and TR9 terms are recognized even when they are each multiplied by a common factor: >>> fu(acos(x)cos(y) + asin(x)sin(y)) acos(x - y) Factoring with ``factor_terms`` is used but it it "JIT"-like, being delayed until it is deemed necessary. Furthermore, if the factoring does not help with the simplification, it is not retained, so ``acos(x)cos(y) + asin(x)sin(z)`` does not become the factored (but unsimplified in the trigonometric sense) expression: >>> fu(acos(x)cos(y) + asin(x)sin(z)) asin(x)sin(z) + acos(x)cos(y) In some cases factoring might be a good idea, but the user is left to make that decision. For example: >>> expr=((15sin(2x) + 19sin(x + y) + 17sin(x + z) + 19cos(x - z) + ... 25)(20sin(2x) + 15sin(x + y) + sin(y + z) + 14cos(x - z) + ... 14cos(y - z))(9sin(2y) + 12sin(y + z) + 10cos(x - y) + 2cos(y - ... z) + 18)).expand(trig=True).expand() In the expanded state, there are nearly 1000 trig functions: >>> L(expr) 932 If the expression where factored first, this would take time but the resulting expression would be transformed very quickly: >>> def clock(f, n=2): ... t=time(); f(); return round(time()-t, n) ... >>> clock(lambda: factor(expr)) # doctest: +SKIP 0.86 >>> clock(lambda: TR10i(expr), 3) # doctest: +SKIP 0.016 If the unexpanded expression is used, the transformation takes longer but not as long as it took to factor it and then transform it: >>> clock(lambda: TR10i(expr), 2) # doctest: +SKIP 0.28 So neither expansion nor factoring is used in ``TR10i``: if the expression is already factored (or partially factored) then expansion with ``trig=True`` would destroy what is already known and take longer; if the expression is expanded, factoring may take longer than simply applying the transformation itself. Although the algorithms should be canonical, always giving the same result, they may not yield the best result. This, in general, is the nature of simplification where searching all possible transformation paths is very expensive. Here is a simple example. There are 6 terms in the following sum: >>> expr = (sin(x)2cos(y)cos(z) + sin(x)sin(y)cos(x)cos(z) + ... sin(x)sin(z)cos(x)cos(y) + sin(y)sin(z)cos(x)2 + sin(y)sin(z) + ... cos(y)cos(z)) >>> args = expr.args Serendipitously, fu gives the best result: >>> fu(expr) 3cos(y - z)/2 - cos(2x + y + z)/2 But if different terms were combined, a less-optimal result might be obtained, requiring some additional work to get better simplification, but still less than optimal. The following shows an alternative form of ``expr`` that resists optimal simplification once a given step is taken since it leads to a dead end: >>> TR9(-cos(x)2cos(y + z) + 3cos(y - z)/2 + ... cos(y + z)/2 + cos(-2x + y + z)/4 - cos(2x + y + z)/4) sin(2x)sin(y + z)/2 - cos(x)2cos(y + z) + 3cos(y - z)/2 + cos(y + z)/2 Here is a smaller expression that exhibits the same behavior: >>> a = sin(x)sin(z)cos(x)cos(y) + sin(x)sin(y)cos(x)cos(z) >>> TR10i(a) sin(x)sin(y + z)cos(x) >>> newa = _ >>> TR10i(expr - a) # this combines two more of the remaining terms sin(x)2cos(y)cos(z) + sin(y)sin(z)cos(x)2 + cos(y - z) >>> TR10i(_ + newa) == _ + newa # but now there is no more simplification True Without getting lucky or trying all possible pairings of arguments, the final result may be less than optimal and impossible to find without better heuristics or brute force trial of all possibilities. Notes ===== This work was started by Dimitar Vlahovski at the Technological School "Electronic systems" (30.11.2011). References ========== Fu, Hongguang, Xiuqin Zhong, and Zhenbing Zeng. "Automated and readable simplification of trigonometric expressions." Mathematical and computer modelling 44.11 (2006): 1169-1177. http://rfdz.ph-noe.ac.at/fileadmin/Mathematik_Uploads/ACDCA/DESTIME2006/DES_contribs/Fu/simplification.pdf http://www.sosmath.com/trig/Trig5/trig5/pdf/pdf.html gives a formula sheet. """ from __future__ import print_function, division from collections import defaultdict from sympy.core.add import Add from sympy.core.basic import S from sympy.core.compatibility import ordered, range from sympy.core.expr import Expr from sympy.core.exprtools import Factors, gcd_terms, factor_terms from sympy.core.function import expand_mul from sympy.core.mul import Mul from sympy.core.numbers import pi, I from sympy.core.power import Pow from sympy.core.symbol import Dummy from sympy.core.sympify import sympify from sympy.functions.combinatorial.factorials import binomial from sympy.functions.elementary.hyperbolic import ( cosh, sinh, tanh, coth, sech, csch, HyperbolicFunction) from sympy.functions.elementary.trigonometric import ( cos, sin, tan, cot, sec, csc, sqrt, TrigonometricFunction) from sympy.ntheory.factor_ import perfect_power from sympy.polys.polytools import factor from sympy.simplify.simplify import bottom_up from sympy.strategies.tree import greedy from sympy.strategies.core import identity, debug from sympy import SYMPY_DEBUG # ================== Fu-like tools =========================== def TR0(rv): """Simplification of rational polynomials, trying to simplify the expression, e.g. combine things like 3x + 2x, etc.... """ # although it would be nice to use cancel, it doesn't work # with noncommutatives return rv.normal().factor().expand() def TR1(rv): """Replace sec, csc with 1/cos, 1/sin Examples ======== >>> from sympy.simplify.fu import TR1, sec, csc >>> from sympy.abc import x >>> TR1(2csc(x) + sec(x)) 1/cos(x) + 2/sin(x) """ def f(rv): if isinstance(rv, sec): a = rv.args[0] return S.One/cos(a) elif isinstance(rv, csc): a = rv.args[0] return S.One/sin(a) return rv return bottom_up(rv, f) def TR2(rv): """Replace tan and cot with sin/cos and cos/sin Examples ======== >>> from sympy.simplify.fu import TR2 >>> from sympy.abc import x >>> from sympy import tan, cot, sin, cos >>> TR2(tan(x)) sin(x)/cos(x) >>> TR2(cot(x)) cos(x)/sin(x) >>> TR2(tan(tan(x) - sin(x)/cos(x))) 0 """ def f(rv): if isinstance(rv, tan): a = rv.args[0] return sin(a)/cos(a) elif isinstance(rv, cot): a = rv.args[0] return cos(a)/sin(a) return rv return bottom_up(rv, f) def TR2i(rv, half=False): """Converts ratios involving sin and cos as follows:: sin(x)/cos(x) -> tan(x) sin(x)/(cos(x) + 1) -> tan(x/2) if half=True Examples ======== >>> from sympy.simplify.fu import TR2i >>> from sympy.abc import x, a >>> from sympy import sin, cos >>> TR2i(sin(x)/cos(x)) tan(x) Powers of the numerator and denominator are also recognized >>> TR2i(sin(x)2/(cos(x) + 1)2, half=True) tan(x/2)2 The transformation does not take place unless assumptions allow (i.e. the base must be positive or the exponent must be an integer for both numerator and denominator) >>> TR2i(sin(x)a/(cos(x) + 1)a) (cos(x) + 1)(-a)sin(x)a """ def f(rv): if not rv.is_Mul: return rv n, d = rv.as_numer_denom() if n.is_Atom or d.is_Atom: return rv def ok(k, e): # initial filtering of factors return ( (e.is_integer or k.is_positive) and ( k.func in (sin, cos) or (half and k.is_Add and len(k.args) >= 2 and any(any(isinstance(ai, cos) or ai.is_Pow and ai.base is cos for ai in Mul.make_args(a)) for a in k.args)))) n = n.as_powers_dict() ndone = [(k, n.pop(k)) for k in list(n.keys()) if not ok(k, n[k])] if not n: return rv d = d.as_powers_dict() ddone = [(k, d.pop(k)) for k in list(d.keys()) if not ok(k, d[k])] if not d: return rv # factoring if necessary def factorize(d, ddone): newk = [] for k in d: if k.is_Add and len(k.args) > 1: knew = factor(k) if half else factor_terms(k) if knew != k: newk.append((k, knew)) if newk: for i, (k, knew) in enumerate(newk): del d[k] newk[i] = knew newk = Mul(newk).as_powers_dict() for k in newk: v = d[k] + newk[k] if ok(k, v): d[k] = v else: ddone.append((k, v)) del newk factorize(n, ndone) factorize(d, ddone) # joining t = [] for k in n: if isinstance(k, sin): a = cos(k.args[0], evaluate=False) if a in d and d[a] == n[k]: t.append(tan(k.args[0])n[k]) n[k] = d[a] = None elif half: a1 = 1 + a if a1 in d and d[a1] == n[k]: t.append((tan(k.args[0]/2))n[k]) n[k] = d[a1] = None elif isinstance(k, cos): a = sin(k.args[0], evaluate=False) if a in d and d[a] == n[k]: t.append(tan(k.args[0])-n[k]) n[k] = d[a] = None elif half and k.is_Add and k.args[0] is S.One and \ isinstance(k.args[1], cos): a = sin(k.args[1].args[0], evaluate=False) if a in d and d[a] == n[k] and (d[a].is_integer or \ a.is_positive): t.append(tan(a.args[0]/2)-n[k]) n[k] = d[a] = None if t: rv = Mul((t + [be for b, e in n.items() if e]))/\ Mul([b*e for b, e in d.items() if e]) rv = Mul([be for b, e in ndone])/Mul([b*e for b, e in ddone]) return rv return bottom_up(rv, f) def TR3(rv): """Induced formula: example sin(-a) = -sin(a) Examples ======== >>> from sympy.simplify.fu import TR3 >>> from sympy.abc import x, y >>> from sympy import pi >>> from sympy import cos >>> TR3(cos(y - x(y - x))) cos(x(x - y) + y) >>> cos(pi/2 + x) -sin(x) >>> cos(30pi/2 + x) -cos(x) """ from sympy.simplify.simplify import signsimp # Negative argument (already automatic for funcs like sin(-x) -> -sin(x) # but more complicated expressions can use it, too). Also, trig angles # between pi/4 and pi/2 are not reduced to an angle between 0 and pi/4. # The following are automatically handled: # Argument of type: pi/2 +/- angle # Argument of type: pi +/- angle # Argument of type : 2kpi +/- angle def f(rv): if not isinstance(rv, TrigonometricFunction): return rv rv = rv.func(signsimp(rv.args[0])) if not isinstance(rv, TrigonometricFunction): return rv if (rv.args[0] - S.Pi/4).is_positive is (S.Pi/2 - rv.args[0]).is_positive is True: fmap = {cos: sin, sin: cos, tan: cot, cot: tan, sec: csc, csc: sec} rv = fmap[rv.func](S.Pi/2 - rv.args[0]) return rv return bottom_up(rv, f) def TR4(rv): """Identify values of special angles. a= 0 pi/6 pi/4 pi/3 pi/2 ---------------------------------------------------- cos(a) 0 1/2 sqrt(2)/2 sqrt(3)/2 1 sin(a) 1 sqrt(3)/2 sqrt(2)/2 1/2 0 tan(a) 0 sqt(3)/3 1 sqrt(3) -- Examples ======== >>> from sympy.simplify.fu import TR4 >>> from sympy import pi >>> from sympy import cos, sin, tan, cot >>> for s in (0, pi/6, pi/4, pi/3, pi/2): ... print('%s %s %s %s' % (cos(s), sin(s), tan(s), cot(s))) ... 1 0 0 zoo sqrt(3)/2 1/2 sqrt(3)/3 sqrt(3) sqrt(2)/2 sqrt(2)/2 1 1 1/2 sqrt(3)/2 sqrt(3) sqrt(3)/3 0 1 zoo 0 """ # special values at 0, pi/6, pi/4, pi/3, pi/2 already handled return rv def _TR56(rv, f, g, h, max, pow): """Helper for TR5 and TR6 to replace f2 with h(g2) Options ======= max : controls size of exponent that can appear on f e.g. if max=4 then f4 will be changed to h(g2)2. pow : controls whether the exponent must be a perfect power of 2 e.g. if pow=True (and max >= 6) then f6 will not be changed but f8 will be changed to h(g2)4 >>> from sympy.simplify.fu import _TR56 as T >>> from sympy.abc import x >>> from sympy import sin, cos >>> h = lambda x: 1 - x >>> T(sin(x)3, sin, cos, h, 4, False) sin(x)3 >>> T(sin(x)6, sin, cos, h, 6, False) (1 - cos(x)2)3 >>> T(sin(x)6, sin, cos, h, 6, True) sin(x)6 >>> T(sin(x)8, sin, cos, h, 10, True) (1 - cos(x)2)4 """ def _f(rv): # I'm not sure if this transformation should target all even powers # or only those expressible as powers of 2. Also, should it only # make the changes in powers that appear in sums -- making an isolated # change is not going to allow a simplification as far as I can tell. if not (rv.is_Pow and rv.base.func == f): return rv if not rv.exp.is_real: return rv if (rv.exp < 0) == True: return rv if (rv.exp > max) == True: return rv if rv.exp == 2: return h(g(rv.base.args[0])2) else: if rv.exp == 4: e = 2 elif not pow: if rv.exp % 2: return rv e = rv.exp//2 else: p = perfect_power(rv.exp) if not p: return rv e = rv.exp//2 return h(g(rv.base.args[0])2)e return bottom_up(rv, _f) def TR5(rv, max=4, pow=False): """Replacement of sin2 with 1 - cos(x)2. See _TR56 docstring for advanced use of ``max`` and ``pow``. Examples ======== >>> from sympy.simplify.fu import TR5 >>> from sympy.abc import x >>> from sympy import sin >>> TR5(sin(x)2) 1 - cos(x)2 >>> TR5(sin(x)-2) # unchanged sin(x)(-2) >>> TR5(sin(x)4) (1 - cos(x)2)2 """ return _TR56(rv, sin, cos, lambda x: 1 - x, max=max, pow=pow) def TR6(rv, max=4, pow=False): """Replacement of cos2 with 1 - sin(x)2. See _TR56 docstring for advanced use of ``max`` and ``pow``. Examples ======== >>> from sympy.simplify.fu import TR6 >>> from sympy.abc import x >>> from sympy import cos >>> TR6(cos(x)2) 1 - sin(x)2 >>> TR6(cos(x)-2) #unchanged cos(x)(-2) >>> TR6(cos(x)4) (1 - sin(x)2)2 """ return _TR56(rv, cos, sin, lambda x: 1 - x, max=max, pow=pow) def TR7(rv): """Lowering the degree of cos(x)2 Examples ======== >>> from sympy.simplify.fu import TR7 >>> from sympy.abc import x >>> from sympy import cos >>> TR7(cos(x)2) cos(2x)/2 + 1/2 >>> TR7(cos(x)*2 + 1) cos(2x)/2 + 3/2 """ def f(rv): if not (rv.is_Pow and rv.base.func == cos and rv.exp == 2): return rv return (1 + cos(2rv.base.args[0]))/2 return bottom_up(rv, f) def TR8(rv, first=True): """Converting products of ``cos`` and/or ``sin`` to a sum or difference of ``cos`` and or ``sin`` terms. Examples ======== >>> from sympy.simplify.fu import TR8, TR7 >>> from sympy import cos, sin >>> TR8(cos(2)cos(3)) cos(5)/2 + cos(1)/2 >>> TR8(cos(2)sin(3)) sin(5)/2 + sin(1)/2 >>> TR8(sin(2)sin(3)) -cos(5)/2 + cos(1)/2 """ def f(rv): if not ( rv.is_Mul or rv.is_Pow and rv.base.func in (cos, sin) and (rv.exp.is_integer or rv.base.is_positive)): return rv if first: n, d = [expand_mul(i) for i in rv.as_numer_denom()] newn = TR8(n, first=False) newd = TR8(d, first=False) if newn != n or newd != d: rv = gcd_terms(newn/newd) if rv.is_Mul and rv.args[0].is_Rational and \ len(rv.args) == 2 and rv.args[1].is_Add: rv = Mul(rv.as_coeff_Mul()) return rv args = {cos: [], sin: [], None: []} for a in ordered(Mul.make_args(rv)): if a.func in (cos, sin): args[a.func].append(a.args[0]) elif (a.is_Pow and a.exp.is_Integer and a.exp > 0 and \ a.base.func in (cos, sin)): # XXX this is ok but pathological expression could be handled # more efficiently as in TRmorrie args[a.base.func].extend([a.base.args[0]]a.exp) else: args[None].append(a) c = args[cos] s = args[sin] if not (c and s or len(c) > 1 or len(s) > 1): return rv args = args[None] n = min(len(c), len(s)) for i in range(n): a1 = s.pop() a2 = c.pop() args.append((sin(a1 + a2) + sin(a1 - a2))/2) while len(c) > 1: a1 = c.pop() a2 = c.pop() args.append((cos(a1 + a2) + cos(a1 - a2))/2) if c: args.append(cos(c.pop())) while len(s) > 1: a1 = s.pop() a2 = s.pop() args.append((-cos(a1 + a2) + cos(a1 - a2))/2) if s: args.append(sin(s.pop())) return TR8(expand_mul(Mul(args))) return bottom_up(rv, f) def TR9(rv): """Sum of ``cos`` or ``sin`` terms as a product of ``cos`` or ``sin``. Examples ======== >>> from sympy.simplify.fu import TR9 >>> from sympy import cos, sin >>> TR9(cos(1) + cos(2)) 2cos(1/2)cos(3/2) >>> TR9(cos(1) + 2sin(1) + 2sin(2)) cos(1) + 4sin(3/2)cos(1/2) If no change is made by TR9, no re-arrangement of the expression will be made. For example, though factoring of common term is attempted, if the factored expression wasn't changed, the original expression will be returned: >>> TR9(cos(3) + cos(3)cos(2)) cos(3) + cos(2)cos(3) """ def f(rv): if not rv.is_Add: return rv def do(rv, first=True): # cos(a)+/-cos(b) can be combined into a product of cosines and # sin(a)+/-sin(b) can be combined into a product of cosine and # sine. # # If there are more than two args, the pairs which "work" will # have a gcd extractable and the remaining two terms will have # the above structure -- all pairs must be checked to find the # ones that work. args that don't have a common set of symbols # are skipped since this doesn't lead to a simpler formula and # also has the arbitrariness of combining, for example, the x # and y term instead of the y and z term in something like # cos(x) + cos(y) + cos(z). if not rv.is_Add: return rv args = list(ordered(rv.args)) if len(args) != 2: hit = False for i in range(len(args)): ai = args[i] if ai is None: continue for j in range(i + 1, len(args)): aj = args[j] if aj is None: continue was = ai + aj new = do(was) if new != was: args[i] = new # update in place args[j] = None hit = True break # go to next i if hit: rv = Add([_f for _f in args if _f]) if rv.is_Add: rv = do(rv) return rv # two-arg Add split = trig_split(args) if not split: return rv gcd, n1, n2, a, b, iscos = split # application of rule if possible if iscos: if n1 == n2: return gcdn12cos((a + b)/2)cos((a - b)/2) if n1 < 0: a, b = b, a return -2gcdsin((a + b)/2)sin((a - b)/2) else: if n1 == n2: return gcdn12sin((a + b)/2)cos((a - b)/2) if n1 < 0: a, b = b, a return 2gcdcos((a + b)/2)sin((a - b)/2) return process_common_addends(rv, do) # DON'T sift by free symbols return bottom_up(rv, f) def TR10(rv, first=True): """Separate sums in ``cos`` and ``sin``. Examples ======== >>> from sympy.simplify.fu import TR10 >>> from sympy.abc import a, b, c >>> from sympy import cos, sin >>> TR10(cos(a + b)) -sin(a)sin(b) + cos(a)cos(b) >>> TR10(sin(a + b)) sin(a)cos(b) + sin(b)cos(a) >>> TR10(sin(a + b + c)) (-sin(a)sin(b) + cos(a)cos(b))sin(c) + \ (sin(a)cos(b) + sin(b)cos(a))cos(c) """ def f(rv): if not rv.func in (cos, sin): return rv f = rv.func arg = rv.args[0] if arg.is_Add: if first: args = list(ordered(arg.args)) else: args = list(arg.args) a = args.pop() b = Add._from_args(args) if b.is_Add: if f == sin: return sin(a)TR10(cos(b), first=False) + \ cos(a)TR10(sin(b), first=False) else: return cos(a)TR10(cos(b), first=False) - \ sin(a)TR10(sin(b), first=False) else: if f == sin: return sin(a)cos(b) + cos(a)sin(b) else: return cos(a)cos(b) - sin(a)sin(b) return rv return bottom_up(rv, f) def TR10i(rv): """Sum of products to function of sum. Examples ======== >>> from sympy.simplify.fu import TR10i >>> from sympy import cos, sin, pi, Add, Mul, sqrt, Symbol >>> from sympy.abc import x, y >>> TR10i(cos(1)cos(3) + sin(1)sin(3)) cos(2) >>> TR10i(cos(1)sin(3) + sin(1)cos(3) + cos(3)) cos(3) + sin(4) >>> TR10i(sqrt(2)cos(x)x + sqrt(6)sin(x)x) 2sqrt(2)xsin(x + pi/6) """ global _ROOT2, _ROOT3, _invROOT3 if _ROOT2 is None: _roots() def f(rv): if not rv.is_Add: return rv def do(rv, first=True): # args which can be expressed as A(cos(a)cos(b)+/-sin(a)sin(b)) # or B(cos(a)sin(b)+/-cos(b)sin(a)) can be combined into # Af(a+/-b) where f is either sin or cos. # # If there are more than two args, the pairs which "work" will have # a gcd extractable and the remaining two terms will have the above # structure -- all pairs must be checked to find the ones that # work. if not rv.is_Add: return rv args = list(ordered(rv.args)) if len(args) != 2: hit = False for i in range(len(args)): ai = args[i] if ai is None: continue for j in range(i + 1, len(args)): aj = args[j] if aj is None: continue was = ai + aj new = do(was) if new != was: args[i] = new # update in place args[j] = None hit = True break # go to next i if hit: rv = Add([_f for _f in args if _f]) if rv.is_Add: rv = do(rv) return rv # two-arg Add split = trig_split(args, two=True) if not split: return rv gcd, n1, n2, a, b, same = split # identify and get c1 to be cos then apply rule if possible if same: # coscos, sinsin gcd = n1gcd if n1 == n2: return gcdcos(a - b) return gcdcos(a + b) else: #cossin, cossin gcd = n1gcd if n1 == n2: return gcdsin(a + b) return gcdsin(b - a) rv = process_common_addends( rv, do, lambda x: tuple(ordered(x.free_symbols))) # need to check for inducible pairs in ratio of sqrt(3):1 that # appeared in different lists when sorting by coefficient while rv.is_Add: byrad = defaultdict(list) for a in rv.args: hit = 0 if a.is_Mul: for ai in a.args: if ai.is_Pow and ai.exp is S.Half and \ ai.base.is_Integer: byrad[ai].append(a) hit = 1 break if not hit: byrad[S.One].append(a) # no need to check all pairs -- just check for the onees # that have the right ratio args = [] for a in byrad: for b in [_ROOT3a, _invROOT3]: if b in byrad: for i in range(len(byrad[a])): if byrad[a][i] is None: continue for j in range(len(byrad[b])): if byrad[b][j] is None: continue was = Add(byrad[a][i] + byrad[b][j]) new = do(was) if new != was: args.append(new) byrad[a][i] = None byrad[b][j] = None break if args: rv = Add((args + [Add([_f for _f in v if _f]) for v in byrad.values()])) else: rv = do(rv) # final pass to resolve any new inducible pairs break return rv return bottom_up(rv, f) def TR11(rv, base=None): """Function of double angle to product. The ``base`` argument can be used to indicate what is the un-doubled argument, e.g. if 3pi/7 is the base then cosine and sine functions with argument 6pi/7 will be replaced. Examples ======== >>> from sympy.simplify.fu import TR11 >>> from sympy import cos, sin, pi >>> from sympy.abc import x >>> TR11(sin(2x)) 2sin(x)cos(x) >>> TR11(cos(2x)) -sin(x)2 + cos(x)2 >>> TR11(sin(4x)) 4(-sin(x)2 + cos(x)2)sin(x)cos(x) >>> TR11(sin(4x/3)) 4(-sin(x/3)2 + cos(x/3)2)sin(x/3)cos(x/3) If the arguments are simply integers, no change is made unless a base is provided: >>> TR11(cos(2)) cos(2) >>> TR11(cos(4), 2) -sin(2)2 + cos(2)2 There is a subtle issue here in that autosimplification will convert some higher angles to lower angles >>> cos(6pi/7) + cos(3pi/7) -cos(pi/7) + cos(3pi/7) The 6pi/7 angle is now pi/7 but can be targeted with TR11 by supplying the 3pi/7 base: >>> TR11(_, 3pi/7) -sin(3pi/7)2 + cos(3pi/7)*2 + cos(3pi/7) """ def f(rv): if not rv.func in (cos, sin): return rv if base: f = rv.func t = f(base2) co = S.One if t.is_Mul: co, t = t.as_coeff_Mul() if not t.func in (cos, sin): return rv if rv.args[0] == t.args[0]: c = cos(base) s = sin(base) if f is cos: return (c2 - s2)/co else: return 2cs/co return rv elif not rv.args[0].is_Number: # make a change if the leading coefficient's numerator is # divisible by 2 c, m = rv.args[0].as_coeff_Mul(rational=True) if c.p % 2 == 0: arg = c.p//2m/c.q c = TR11(cos(arg)) s = TR11(sin(arg)) if rv.func == sin: rv = 2sc else: rv = c2 - s2 return rv return bottom_up(rv, f) def TR12(rv, first=True): """Separate sums in ``tan``. Examples ======== >>> from sympy.simplify.fu import TR12 >>> from sympy.abc import x, y >>> from sympy import tan >>> from sympy.simplify.fu import TR12 >>> TR12(tan(x + y)) (tan(x) + tan(y))/(-tan(x)tan(y) + 1) """ def f(rv): if not rv.func == tan: return rv arg = rv.args[0] if arg.is_Add: if first: args = list(ordered(arg.args)) else: args = list(arg.args) a = args.pop() b = Add._from_args(args) if b.is_Add: tb = TR12(tan(b), first=False) else: tb = tan(b) return (tan(a) + tb)/(1 - tan(a)tb) return rv return bottom_up(rv, f) def TR12i(rv): """Combine tan arguments as (tan(y) + tan(x))/(tan(x)tan(y) - 1) -> -tan(x + y) Examples ======== >>> from sympy.simplify.fu import TR12i >>> from sympy import tan >>> from sympy.abc import a, b, c >>> ta, tb, tc = [tan(i) for i in (a, b, c)] >>> TR12i((ta + tb)/(-tatb + 1)) tan(a + b) >>> TR12i((ta + tb)/(tatb - 1)) -tan(a + b) >>> TR12i((-ta - tb)/(tatb - 1)) tan(a + b) >>> eq = (ta + tb)/(-tatb + 1)2(-3ta - 3tc)/(2(tatc - 1)) >>> TR12i(eq.expand()) -3tan(a + b)tan(a + c)/(2(tan(a) + tan(b) - 1)) """ from sympy import factor def f(rv): if not (rv.is_Add or rv.is_Mul or rv.is_Pow): return rv n, d = rv.as_numer_denom() if not d.args or not n.args: return rv dok = {} def ok(di): m = as_f_sign_1(di) if m: g, f, s = m if s is S.NegativeOne and f.is_Mul and len(f.args) == 2 and \ all(isinstance(fi, tan) for fi in f.args): return g, f d_args = list(Mul.make_args(d)) for i, di in enumerate(d_args): m = ok(di) if m: g, t = m s = Add([_.args[0] for _ in t.args]) dok[s] = S.One d_args[i] = g continue if di.is_Add: di = factor(di) if di.is_Mul: d_args.extend(di.args) d_args[i] = S.One elif di.is_Pow and (di.exp.is_integer or di.base.is_positive): m = ok(di.base) if m: g, t = m s = Add([_.args[0] for _ in t.args]) dok[s] = di.exp d_args[i] = gdi.exp else: di = factor(di) if di.is_Mul: d_args.extend(di.args) d_args[i] = S.One if not dok: return rv def ok(ni): if ni.is_Add and len(ni.args) == 2: a, b = ni.args if isinstance(a, tan) and isinstance(b, tan): return a, b n_args = list(Mul.make_args(factor_terms(n))) hit = False for i, ni in enumerate(n_args): m = ok(ni) if not m: m = ok(-ni) if m: n_args[i] = S.NegativeOne else: if ni.is_Add: ni = factor(ni) if ni.is_Mul: n_args.extend(ni.args) n_args[i] = S.One continue elif ni.is_Pow and ( ni.exp.is_integer or ni.base.is_positive): m = ok(ni.base) if m: n_args[i] = S.One else: ni = factor(ni) if ni.is_Mul: n_args.extend(ni.args) n_args[i] = S.One continue else: continue else: n_args[i] = S.One hit = True s = Add([_.args[0] for _ in m]) ed = dok[s] newed = ed.extract_additively(S.One) if newed is not None: if newed: dok[s] = newed else: dok.pop(s) n_args[i] = -tan(s) if hit: rv = Mul(n_args)/Mul(d_args)/Mul([(Add([ tan(a) for a in i.args]) - 1)e for i, e in dok.items()]) return rv return bottom_up(rv, f) def TR13(rv): """Change products of ``tan`` or ``cot``. Examples ======== >>> from sympy.simplify.fu import TR13 >>> from sympy import tan, cot, cos >>> TR13(tan(3)tan(2)) -tan(2)/tan(5) - tan(3)/tan(5) + 1 >>> TR13(cot(3)cot(2)) cot(2)cot(5) + 1 + cot(3)cot(5) """ def f(rv): if not rv.is_Mul: return rv # XXX handle products of powers? or let power-reducing handle it? args = {tan: [], cot: [], None: []} for a in ordered(Mul.make_args(rv)): if a.func in (tan, cot): args[a.func].append(a.args[0]) else: args[None].append(a) t = args[tan] c = args[cot] if len(t) < 2 and len(c) < 2: return rv args = args[None] while len(t) > 1: t1 = t.pop() t2 = t.pop() args.append(1 - (tan(t1)/tan(t1 + t2) + tan(t2)/tan(t1 + t2))) if t: args.append(tan(t.pop())) while len(c) > 1: t1 = c.pop() t2 = c.pop() args.append(1 + cot(t1)cot(t1 + t2) + cot(t2)cot(t1 + t2)) if c: args.append(cot(c.pop())) return Mul(args) return bottom_up(rv, f) def TRmorrie(rv): """Returns cos(x)cos(2x)...cos(2*(k-1)x) -> sin(2*kx)/(2*ksin(x)) Examples ======== >>> from sympy.simplify.fu import TRmorrie, TR8, TR3 >>> from sympy.abc import x >>> from sympy import Mul, cos, pi >>> TRmorrie(cos(x)cos(2x)) sin(4x)/(4sin(x)) >>> TRmorrie(7Mul([cos(x) for x in range(10)])) 7sin(12)sin(16)cos(5)cos(7)cos(9)/(64sin(1)sin(3)) Sometimes autosimplification will cause a power to be not recognized. e.g. in the following, cos(4pi/7) automatically simplifies to -cos(3pi/7) so only 2 of the 3 terms are recognized: >>> TRmorrie(cos(pi/7)cos(2pi/7)cos(4pi/7)) -sin(3pi/7)cos(3pi/7)/(4sin(pi/7)) A touch by TR8 resolves the expression to a Rational >>> TR8(_) -1/8 In this case, if eq is unsimplified, the answer is obtained directly: >>> eq = cos(pi/9)cos(2pi/9)cos(3pi/9)cos(4pi/9) >>> TRmorrie(eq) 1/16 But if angles are made canonical with TR3 then the answer is not simplified without further work: >>> TR3(eq) sin(pi/18)cos(pi/9)cos(2pi/9)/2 >>> TRmorrie(_) sin(pi/18)sin(4pi/9)/(8sin(pi/9)) >>> TR8(_) cos(7pi/18)/(16sin(pi/9)) >>> TR3(_) 1/16 The original expression would have resolve to 1/16 directly with TR8, however: >>> TR8(eq) 1/16 References ========== https://en.wikipedia.org/wiki/Morrie%27s_law """ def f(rv, first=True): if not rv.is_Mul: return rv if first: n, d = rv.as_numer_denom() return f(n, 0)/f(d, 0) args = defaultdict(list) coss = {} other = [] for c in rv.args: b, e = c.as_base_exp() if e.is_Integer and isinstance(b, cos): co, a = b.args[0].as_coeff_Mul() args[a].append(co) coss[b] = e else: other.append(c) new = [] for a in args: c = args[a] c.sort() no = [] while c: k = 0 cc = ci = c[0] while cc in c: k += 1 cc = 2 if k > 1: newarg = sin(2*kcia)/2k/sin(cia) # see how many times this can be taken take = None ccs = [] for i in range(k): cc /= 2 key = cos(acc, evaluate=False) ccs.append(cc) take = min(coss[key], take or coss[key]) # update exponent counts for i in range(k): cc = ccs.pop() key = cos(acc, evaluate=False) coss[key] -= take if not coss[key]: c.remove(cc) new.append(newarg*take) else: no.append(c.pop(0)) c[:] = no if new: rv = Mul((new + other + [ cos(ka, evaluate=False) for a in args for k in args[a]])) return rv return bottom_up(rv, f) def TR14(rv, first=True): """Convert factored powers of sin and cos identities into simpler expressions. Examples ======== >>> from sympy.simplify.fu import TR14 >>> from sympy.abc import x, y >>> from sympy import cos, sin >>> TR14((cos(x) - 1)(cos(x) + 1)) -sin(x)*2 >>> TR14((sin(x) - 1)(sin(x) + 1)) -cos(x)*2 >>> p1 = (cos(x) + 1)(cos(x) - 1) >>> p2 = (cos(y) - 1)2(cos(y) + 1) >>> p3 = (3(cos(y) - 1))(3(cos(y) + 1)) >>> TR14(p1p2p3(x - 1)) -18(x - 1)sin(x)*2sin(y)4 """ def f(rv): if not rv.is_Mul: return rv if first: # sort them by location in numerator and denominator # so the code below can just deal with positive exponents n, d = rv.as_numer_denom() if d is not S.One: newn = TR14(n, first=False) newd = TR14(d, first=False) if newn != n or newd != d: rv = newn/newd return rv other = [] process = [] for a in rv.args: if a.is_Pow: b, e = a.as_base_exp() if not (e.is_integer or b.is_positive): other.append(a) continue a = b else: e = S.One m = as_f_sign_1(a) if not m or m[1].func not in (cos, sin): if e is S.One: other.append(a) else: other.append(ae) continue g, f, si = m process.append((g, e.is_Number, e, f, si, a)) # sort them to get like terms next to each other process = list(ordered(process)) # keep track of whether there was any change nother = len(other) # access keys keys = (g, t, e, f, si, a) = list(range(6)) while process: A = process.pop(0) if process: B = process[0] if A[e].is_Number and B[e].is_Number: # both exponents are numbers if A[f] == B[f]: if A[si] != B[si]: B = process.pop(0) take = min(A[e], B[e]) # reinsert any remainder # the B will likely sort after A so check it first if B[e] != take: rem = [B[i] for i in keys] rem[e] -= take process.insert(0, rem) elif A[e] != take: rem = [A[i] for i in keys] rem[e] -= take process.insert(0, rem) if isinstance(A[f], cos): t = sin else: t = cos other.append((-A[g]B[g]t(A[f].args[0])2)take) continue elif A[e] == B[e]: # both exponents are equal symbols if A[f] == B[f]: if A[si] != B[si]: B = process.pop(0) take = A[e] if isinstance(A[f], cos): t = sin else: t = cos other.append((-A[g]B[g]t(A[f].args[0])2)take) continue # either we are done or neither condition above applied other.append(A[a]*A[e]) if len(other) != nother: rv = Mul(other) return rv return bottom_up(rv, f) def TR15(rv, max=4, pow=False): """Convert sin(x)-2 to 1 + cot(x)2. See _TR56 docstring for advanced use of ``max`` and ``pow``. Examples ======== >>> from sympy.simplify.fu import TR15 >>> from sympy.abc import x >>> from sympy import cos, sin >>> TR15(1 - 1/sin(x)2) -cot(x)2 """ def f(rv): if not (isinstance(rv, Pow) and isinstance(rv.base, sin)): return rv ia = 1/rv a = _TR56(ia, sin, cot, lambda x: 1 + x, max=max, pow=pow) if a != ia: rv = a return rv return bottom_up(rv, f) def TR16(rv, max=4, pow=False): """Convert cos(x)-2 to 1 + tan(x)2. See _TR56 docstring for advanced use of ``max`` and ``pow``. Examples ======== >>> from sympy.simplify.fu import TR16 >>> from sympy.abc import x >>> from sympy import cos, sin >>> TR16(1 - 1/cos(x)2) -tan(x)2 """ def f(rv): if not (isinstance(rv, Pow) and isinstance(rv.base, cos)): return rv ia = 1/rv a = _TR56(ia, cos, tan, lambda x: 1 + x, max=max, pow=pow) if a != ia: rv = a return rv return bottom_up(rv, f) def TR111(rv): """Convert f(x)-i to g(x)i where either ``i`` is an integer or the base is positive and f, g are: tan, cot; sin, csc; or cos, sec. Examples ======== >>> from sympy.simplify.fu import TR111 >>> from sympy.abc import x >>> from sympy import tan >>> TR111(1 - 1/tan(x)2) 1 - cot(x)2 """ def f(rv): if not ( isinstance(rv, Pow) and (rv.base.is_positive or rv.exp.is_integer and rv.exp.is_negative)): return rv if isinstance(rv.base, tan): return cot(rv.base.args[0])-rv.exp elif isinstance(rv.base, sin): return csc(rv.base.args[0])-rv.exp elif isinstance(rv.base, cos): return sec(rv.base.args[0])-rv.exp return rv return bottom_up(rv, f) def TR22(rv, max=4, pow=False): """Convert tan(x)2 to sec(x)2 - 1 and cot(x)2 to csc(x)2 - 1. See _TR56 docstring for advanced use of ``max`` and ``pow``. Examples ======== >>> from sympy.simplify.fu import TR22 >>> from sympy.abc import x >>> from sympy import tan, cot >>> TR22(1 + tan(x)2) sec(x)2 >>> TR22(1 + cot(x)2) csc(x)2 """ def f(rv): if not (isinstance(rv, Pow) and rv.base.func in (cot, tan)): return rv rv = _TR56(rv, tan, sec, lambda x: x - 1, max=max, pow=pow) rv = _TR56(rv, cot, csc, lambda x: x - 1, max=max, pow=pow) return rv return bottom_up(rv, f) def TRpower(rv): """Convert sin(x)n and cos(x)n with positive n to sums. Examples ======== >>> from sympy.simplify.fu import TRpower >>> from sympy.abc import x >>> from sympy import cos, sin >>> TRpower(sin(x)*6) -15cos(2x)/32 + 3cos(4x)/16 - cos(6x)/32 + 5/16 >>> TRpower(sin(x)*3cos(2x)4) (3sin(x)/4 - sin(3x)/4)(cos(4x)/2 + cos(8x)/8 + 3/8) References ========== https://en.wikipedia.org/wiki/List_of_trigonometric_identities#Power-reduction_formulae """ def f(rv): if not (isinstance(rv, Pow) and isinstance(rv.base, (sin, cos))): return rv b, n = rv.as_base_exp() x = b.args[0] if n.is_Integer and n.is_positive: if n.is_odd and isinstance(b, cos): rv = 2*(1-n)Add([binomial(n, k)cos((n - 2k)x) for k in range((n + 1)/2)]) elif n.is_odd and isinstance(b, sin): rv = 2*(1-n)(-1)*((n-1)/2)Add([binomial(n, k) (-1)*ksin((n - 2k)x) for k in range((n + 1)/2)]) elif n.is_even and isinstance(b, cos): rv = 2*(1-n)Add([binomial(n, k)cos((n - 2k)x) for k in range(n/2)]) elif n.is_even and isinstance(b, sin): rv = 2*(1-n)(-1)*(n/2)Add([binomial(n, k) (-1)*kcos((n - 2k)x) for k in range(n/2)]) if n.is_even: rv += 2*(-n)binomial(n, n/2) return rv return bottom_up(rv, f) def L(rv): """Return count of trigonometric functions in expression. Examples ======== >>> from sympy.simplify.fu import L >>> from sympy.abc import x >>> from sympy import cos, sin >>> L(cos(x)+sin(x)) 2 """ return S(rv.count(TrigonometricFunction)) # ============== end of basic Fu-like tools ===================== if SYMPY_DEBUG: (TR0, TR1, TR2, TR3, TR4, TR5, TR6, TR7, TR8, TR9, TR10, TR11, TR12, TR13, TR2i, TRmorrie, TR14, TR15, TR16, TR12i, TR111, TR22 )= list(map(debug, (TR0, TR1, TR2, TR3, TR4, TR5, TR6, TR7, TR8, TR9, TR10, TR11, TR12, TR13, TR2i, TRmorrie, TR14, TR15, TR16, TR12i, TR111, TR22))) # tuples are chains -- (f, g) -> lambda x: g(f(x)) # lists are choices -- [f, g] -> lambda x: min(f(x), g(x), key=objective) CTR1 = [(TR5, TR0), (TR6, TR0), identity] CTR2 = (TR11, [(TR5, TR0), (TR6, TR0), TR0]) CTR3 = [(TRmorrie, TR8, TR0), (TRmorrie, TR8, TR10i, TR0), identity] CTR4 = [(TR4, TR10i), identity] RL1 = (TR4, TR3, TR4, TR12, TR4, TR13, TR4, TR0) # XXX it's a little unclear how this one is to be implemented # see Fu paper of reference, page 7. What is the Union symbol referring to? # The diagram shows all these as one chain of transformations, but the # text refers to them being applied independently. Also, a break # if L starts to increase has not been implemented. RL2 = [ (TR4, TR3, TR10, TR4, TR3, TR11), (TR5, TR7, TR11, TR4), (CTR3, CTR1, TR9, CTR2, TR4, TR9, TR9, CTR4), identity, ] def fu(rv, measure=lambda x: (L(x), x.count_ops())): """Attempt to simplify expression by using transformation rules given in the algorithm by Fu et al. :func:`fu` will try to minimize the objective function ``measure``. By default this first minimizes the number of trig terms and then minimizes the number of total operations. Examples ======== >>> from sympy.simplify.fu import fu >>> from sympy import cos, sin, tan, pi, S, sqrt >>> from sympy.abc import x, y, a, b >>> fu(sin(50)2 + cos(50)2 + sin(pi/6)) 3/2 >>> fu(sqrt(6)cos(x) + sqrt(2)sin(x)) 2sqrt(2)sin(x + pi/3) CTR1 example >>> eq = sin(x)4 - cos(y)2 + sin(y)*2 + 2cos(x)2 >>> fu(eq) cos(x)4 - 2cos(y)2 + 2 CTR2 example >>> fu(S.Half - cos(2x)/2) sin(x)*2 CTR3 example >>> fu(sin(a)(cos(b) - sin(b)) + cos(a)(sin(b) + cos(b))) sqrt(2)sin(a + b + pi/4) CTR4 example >>> fu(sqrt(3)cos(x)/2 + sin(x)/2) sin(x + pi/3) Example 1 >>> fu(1-sin(2x)2/4-sin(y)2-cos(x)4) -cos(x)2 + cos(y)*2 Example 2 >>> fu(cos(4pi/9)) sin(pi/18) >>> fu(cos(pi/9)cos(2pi/9)cos(3pi/9)cos(4pi/9)) 1/16 Example 3 >>> fu(tan(7pi/18)+tan(5pi/18)-sqrt(3)tan(5pi/18)tan(7pi/18)) -sqrt(3) Objective function example >>> fu(sin(x)/cos(x)) # default objective function tan(x) >>> fu(sin(x)/cos(x), measure=lambda x: -x.count_ops()) # maximize op count sin(x)/cos(x) References ========== http://rfdz.ph-noe.ac.at/fileadmin/Mathematik_Uploads/ACDCA/ DESTIME2006/DES_contribs/Fu/simplification.pdf """ fRL1 = greedy(RL1, measure) fRL2 = greedy(RL2, measure) was = rv rv = sympify(rv) if not isinstance(rv, Expr): return rv.func([fu(a, measure=measure) for a in rv.args]) rv = TR1(rv) if rv.has(tan, cot): rv1 = fRL1(rv) if (measure(rv1) < measure(rv)): rv = rv1 if rv.has(tan, cot): rv = TR2(rv) if rv.has(sin, cos): rv1 = fRL2(rv) rv2 = TR8(TRmorrie(rv1)) rv = min([was, rv, rv1, rv2], key=measure) return min(TR2i(rv), rv, key=measure) def process_common_addends(rv, do, key2=None, key1=True): """Apply ``do`` to addends of ``rv`` that (if key1=True) share at least a common absolute value of their coefficient and the value of ``key2`` when applied to the argument. If ``key1`` is False ``key2`` must be supplied and will be the only key applied. """ # collect by absolute value of coefficient and key2 absc = defaultdict(list) if key1: for a in rv.args: c, a = a.as_coeff_Mul() if c < 0: c = -c a = -a # put the sign on `a` absc[(c, key2(a) if key2 else 1)].append(a) elif key2: for a in rv.args: absc[(S.One, key2(a))].append(a) else: raise ValueError('must have at least one key') args = [] hit = False for k in absc: v = absc[k] c, _ = k if len(v) > 1: e = Add(v, evaluate=False) new = do(e) if new != e: e = new hit = True args.append(ce) else: args.append(cv[0]) if hit: rv = Add(args) return rv fufuncs = ''' TR0 TR1 TR2 TR3 TR4 TR5 TR6 TR7 TR8 TR9 TR10 TR10i TR11 TR12 TR13 L TR2i TRmorrie TR12i TR14 TR15 TR16 TR111 TR22'''.split() FU = dict(list(zip(fufuncs, list(map(locals().get, fufuncs))))) def _roots(): global _ROOT2, _ROOT3, _invROOT3 _ROOT2, _ROOT3 = sqrt(2), sqrt(3) _invROOT3 = 1/_ROOT3 _ROOT2 = None def trig_split(a, b, two=False): """Return the gcd, s1, s2, a1, a2, bool where If two is False (default) then:: a + b = gcd(s1f(a1) + s2f(a2)) where f = cos if bool else sin else: if bool, a + b was +/- cos(a1)cos(a2) +/- sin(a1)sin(a2) and equals n1gcdcos(a - b) if n1 == n2 else n1gcdcos(a + b) else a + b was +/- cos(a1)sin(a2) +/- sin(a1)cos(a2) and equals n1gcdsin(a + b) if n1 = n2 else n1gcdsin(b - a) Examples ======== >>> from sympy.simplify.fu import trig_split >>> from sympy.abc import x, y, z >>> from sympy import cos, sin, sqrt >>> trig_split(cos(x), cos(y)) (1, 1, 1, x, y, True) >>> trig_split(2cos(x), -2cos(y)) (2, 1, -1, x, y, True) >>> trig_split(cos(x)sin(y), cos(y)sin(y)) (sin(y), 1, 1, x, y, True) >>> trig_split(cos(x), -sqrt(3)sin(x), two=True) (2, 1, -1, x, pi/6, False) >>> trig_split(cos(x), sin(x), two=True) (sqrt(2), 1, 1, x, pi/4, False) >>> trig_split(cos(x), -sin(x), two=True) (sqrt(2), 1, -1, x, pi/4, False) >>> trig_split(sqrt(2)cos(x), -sqrt(6)sin(x), two=True) (2sqrt(2), 1, -1, x, pi/6, False) >>> trig_split(-sqrt(6)cos(x), -sqrt(2)sin(x), two=True) (-2sqrt(2), 1, 1, x, pi/3, False) >>> trig_split(cos(x)/sqrt(6), sin(x)/sqrt(2), two=True) (sqrt(6)/3, 1, 1, x, pi/6, False) >>> trig_split(-sqrt(6)cos(x)sin(y), -sqrt(2)sin(x)sin(y), two=True) (-2sqrt(2)sin(y), 1, 1, x, pi/3, False) >>> trig_split(cos(x), sin(x)) >>> trig_split(cos(x), sin(z)) >>> trig_split(2cos(x), -sin(x)) >>> trig_split(cos(x), -sqrt(3)sin(x)) >>> trig_split(cos(x)cos(y), sin(x)sin(z)) >>> trig_split(cos(x)cos(y), sin(x)sin(y)) >>> trig_split(-sqrt(6)cos(x), sqrt(2)sin(x)sin(y), two=True) """ global _ROOT2, _ROOT3, _invROOT3 if _ROOT2 is None: _roots() a, b = [Factors(i) for i in (a, b)] ua, ub = a.normal(b) gcd = a.gcd(b).as_expr() n1 = n2 = 1 if S.NegativeOne in ua.factors: ua = ua.quo(S.NegativeOne) n1 = -n1 elif S.NegativeOne in ub.factors: ub = ub.quo(S.NegativeOne) n2 = -n2 a, b = [i.as_expr() for i in (ua, ub)] def pow_cos_sin(a, two): """Return ``a`` as a tuple (r, c, s) such that ``a = (r or 1)(c or 1)(s or 1)``. Three arguments are returned (radical, c-factor, s-factor) as long as the conditions set by ``two`` are met; otherwise None is returned. If ``two`` is True there will be one or two non-None values in the tuple: c and s or c and r or s and r or s or c with c being a cosine function (if possible) else a sine, and s being a sine function (if possible) else oosine. If ``two`` is False then there will only be a c or s term in the tuple. ``two`` also require that either two cos and/or sin be present (with the condition that if the functions are the same the arguments are different or vice versa) or that a single cosine or a single sine be present with an optional radical. If the above conditions dictated by ``two`` are not met then None is returned. """ c = s = None co = S.One if a.is_Mul: co, a = a.as_coeff_Mul() if len(a.args) > 2 or not two: return None if a.is_Mul: args = list(a.args) else: args = [a] a = args.pop(0) if isinstance(a, cos): c = a elif isinstance(a, sin): s = a elif a.is_Pow and a.exp is S.Half: # autoeval doesn't allow -1/2 co = a else: return None if args: b = args[0] if isinstance(b, cos): if c: s = b else: c = b elif isinstance(b, sin): if s: c = b else: s = b elif b.is_Pow and b.exp is S.Half: co = b else: return None return co if co is not S.One else None, c, s elif isinstance(a, cos): c = a elif isinstance(a, sin): s = a if c is None and s is None: return co = co if co is not S.One else None return co, c, s # get the parts m = pow_cos_sin(a, two) if m is None: return coa, ca, sa = m m = pow_cos_sin(b, two) if m is None: return cob, cb, sb = m # check them if (not ca) and cb or ca and isinstance(ca, sin): coa, ca, sa, cob, cb, sb = cob, cb, sb, coa, ca, sa n1, n2 = n2, n1 if not two: # need cos(x) and cos(y) or sin(x) and sin(y) c = ca or sa s = cb or sb if not isinstance(c, s.func): return None return gcd, n1, n2, c.args[0], s.args[0], isinstance(c, cos) else: if not coa and not cob: if (ca and cb and sa and sb): if isinstance(ca, sa.func) is not isinstance(cb, sb.func): return args = {j.args for j in (ca, sa)} if not all(i.args in args for i in (cb, sb)): return return gcd, n1, n2, ca.args[0], sa.args[0], isinstance(ca, sa.func) if ca and sa or cb and sb or \ two and (ca is None and sa is None or cb is None and sb is None): return c = ca or sa s = cb or sb if c.args != s.args: return if not coa: coa = S.One if not cob: cob = S.One if coa is cob: gcd = _ROOT2 return gcd, n1, n2, c.args[0], pi/4, False elif coa/cob == _ROOT3: gcd = 2cob return gcd, n1, n2, c.args[0], pi/3, False elif coa/cob == _invROOT3: gcd = 2coa return gcd, n1, n2, c.args[0], pi/6, False def as_f_sign_1(e): """If ``e`` is a sum that can be written as ``g(a + s)`` where ``s`` is ``+/-1``, return ``g``, ``a``, and ``s`` where ``a`` does not have a leading negative coefficient. Examples ======== >>> from sympy.simplify.fu import as_f_sign_1 >>> from sympy.abc import x >>> as_f_sign_1(x + 1) (1, x, 1) >>> as_f_sign_1(x - 1) (1, x, -1) >>> as_f_sign_1(-x + 1) (-1, x, -1) >>> as_f_sign_1(-x - 1) (-1, x, 1) >>> as_f_sign_1(2x + 2) (2, x, 1) """ if not e.is_Add or len(e.args) != 2: return # exact match a, b = e.args if a in (S.NegativeOne, S.One): g = S.One if b.is_Mul and b.args[0].is_Number and b.args[0] < 0: a, b = -a, -b g = -g return g, b, a # gcd match a, b = [Factors(i) for i in e.args] ua, ub = a.normal(b) gcd = a.gcd(b).as_expr() if S.NegativeOne in ua.factors: ua = ua.quo(S.NegativeOne) n1 = -1 n2 = 1 elif S.NegativeOne in ub.factors: ub = ub.quo(S.NegativeOne) n1 = 1 n2 = -1 else: n1 = n2 = 1 a, b = [i.as_expr() for i in (ua, ub)] if a is S.One: a, b = b, a n1, n2 = n2, n1 if n1 == -1: gcd = -gcd n2 = -n2 if b is S.One: return gcd, a, n2 def _osborne(e, d): """Replace all hyperbolic functions with trig functions using the Osborne rule. Notes ===== ``d`` is a dummy variable to prevent automatic evaluation of trigonometric/hyperbolic functions. References ========== https://en.wikipedia.org/wiki/Hyperbolic_function """ def f(rv): if not isinstance(rv, HyperbolicFunction): return rv a = rv.args[0] a = ad if not a.is_Add else Add._from_args([id for i in a.args]) if isinstance(rv, sinh): return Isin(a) elif isinstance(rv, cosh): return cos(a) elif isinstance(rv, tanh): return Itan(a) elif isinstance(rv, coth): return cot(a)/I elif isinstance(rv, sech): return sec(a) elif isinstance(rv, csch): return csc(a)/I else: raise NotImplementedError('unhandled %s' % rv.func) return bottom_up(e, f) def _osbornei(e, d): """Replace all trig functions with hyperbolic functions using the Osborne rule. Notes ===== ``d`` is a dummy variable to prevent automatic evaluation of trigonometric/hyperbolic functions. References ========== https://en.wikipedia.org/wiki/Hyperbolic_function """ def f(rv): if not isinstance(rv, TrigonometricFunction): return rv const, x = rv.args[0].as_independent(d, as_Add=True) a = x.xreplace({d: S.One}) + constI if isinstance(rv, sin): return sinh(a)/I elif isinstance(rv, cos): return cosh(a) elif isinstance(rv, tan): return tanh(a)/I elif isinstance(rv, cot): return coth(a)I elif isinstance(rv, sec): return sech(a) elif isinstance(rv, csc): return csch(a)I else: raise NotImplementedError('unhandled %s' % rv.func) return bottom_up(e, f) def hyper_as_trig(rv): """Return an expression containing hyperbolic functions in terms of trigonometric functions. Any trigonometric functions initially present are replaced with Dummy symbols and the function to undo the masking and the conversion back to hyperbolics is also returned. It should always be true that:: t, f = hyper_as_trig(expr) expr == f(t) Examples ======== >>> from sympy.simplify.fu import hyper_as_trig, fu >>> from sympy.abc import x >>> from sympy import cosh, sinh >>> eq = sinh(x)2 + cosh(x)2 >>> t, f = hyper_as_trig(eq) >>> f(fu(t)) cosh(2x) References ========== https://en.wikipedia.org/wiki/Hyperbolic_function """ from sympy.simplify.simplify import signsimp from sympy.simplify.radsimp import collect # mask off trig functions trigs = rv.atoms(TrigonometricFunction) reps = [(t, Dummy()) for t in trigs] masked = rv.xreplace(dict(reps)) # get inversion substitutions in place reps = [(v, k) for k, v in reps] d = Dummy() return _osborne(masked, d), lambda x: collect(signsimp( _osbornei(x, d).xreplace(dict(reps))), S.ImaginaryUnit) def sincos_to_sum(expr): """Convert products and powers of sin and cos to sums. Applied power reduction TRpower first, then expands products, and converts products to sums with TR8. Examples ======== >>> from sympy.simplify.fu import sincos_to_sum >>> from sympy.abc import x >>> from sympy import cos, sin >>> sincos_to_sum(16sin(x)*3cos(2x)2) 7sin(x) - 5sin(3x) + 3sin(5x) - sin(7*x) """ if not expr.has(cos, sin): return expr else: return TR8(expand_mul(TRpower(expr)))
4773bb35b18c11fb73372b8046006c29c59b7a38ce6ac4658088d77613c5e110	import bisect import itertools from functools import reduce from collections import defaultdict from sympy import Indexed, IndexedBase, Tuple, Sum, Add, S, Integer, diagonalize_vector, DiagonalizeVector from sympy.combinatorics import Permutation from sympy.core.basic import Basic from sympy.core.compatibility import accumulate, default_sort_key from sympy.core.mul import Mul from sympy.core.sympify import _sympify from sympy.functions.special.tensor_functions import KroneckerDelta from sympy.matrices.expressions import (MatAdd, MatMul, Trace, Transpose, MatrixSymbol) from sympy.matrices.expressions.matexpr import MatrixExpr, MatrixElement from sympy.tensor.array import NDimArray class _CodegenArrayAbstract(Basic): @property def subranks(self): """ Returns the ranks of the objects in the uppermost tensor product inside the current object. In case no tensor products are contained, return the atomic ranks. Examples ======== >>> from sympy.codegen.array_utils import CodegenArrayTensorProduct, CodegenArrayContraction >>> from sympy import MatrixSymbol >>> M = MatrixSymbol("M", 3, 3) >>> N = MatrixSymbol("N", 3, 3) >>> P = MatrixSymbol("P", 3, 3) Important: do not confuse the rank of the matrix with the rank of an array. >>> tp = CodegenArrayTensorProduct(M, N, P) >>> tp.subranks [2, 2, 2] >>> co = CodegenArrayContraction(tp, (1, 2), (3, 4)) >>> co.subranks [2, 2, 2] """ return self._subranks[:] def subrank(self): """ The sum of ``subranks``. """ return sum(self.subranks) @property def shape(self): return self._shape class CodegenArrayContraction(_CodegenArrayAbstract): r""" This class is meant to represent contractions of arrays in a form easily processable by the code printers. """ def __new__(cls, expr, contraction_indices, kwargs): contraction_indices = _sort_contraction_indices(contraction_indices) expr = _sympify(expr) if len(contraction_indices) == 0: return expr if isinstance(expr, CodegenArrayContraction): return cls._flatten(expr, contraction_indices) obj = Basic.__new__(cls, expr, contraction_indices) obj._subranks = _get_subranks(expr) obj._mapping = _get_mapping_from_subranks(obj._subranks) free_indices_to_position = {i: i for i in range(sum(obj._subranks)) if all([i not in cind for cind in contraction_indices])} obj._free_indices_to_position = free_indices_to_position shape = expr.shape cls._validate(expr, contraction_indices) if shape: shape = tuple(shp for i, shp in enumerate(shape) if not any(i in j for j in contraction_indices)) obj._shape = shape return obj @staticmethod def _validate(expr, contraction_indices): shape = expr.shape if shape is None: return # Check that no contraction happens when the shape is mismatched: for i in contraction_indices: if len(set(shape[j] for j in i if shape[j] != -1)) != 1: raise ValueError("contracting indices of different dimensions") @classmethod def _push_indices_down(cls, contraction_indices, indices): flattened_contraction_indices = [j for i in contraction_indices for j in i] flattened_contraction_indices.sort() transform = _build_push_indices_down_func_transformation(flattened_contraction_indices) return _apply_recursively_over_nested_lists(transform, indices) @classmethod def _push_indices_up(cls, contraction_indices, indices): flattened_contraction_indices = [j for i in contraction_indices for j in i] flattened_contraction_indices.sort() transform = _build_push_indices_up_func_transformation(flattened_contraction_indices) return _apply_recursively_over_nested_lists(transform, indices) def split_multiple_contractions(self): """ Recognize multiple contractions and attempt at rewriting them as paired-contractions. """ from sympy import ask, Q contraction_indices = self.contraction_indices if isinstance(self.expr, CodegenArrayTensorProduct): args = list(self.expr.args) else: args = [self.expr] # TODO: unify API, best location in CodegenArrayTensorProduct subranks = [get_rank(i) for i in args] # TODO: unify API mapping = _get_mapping_from_subranks(subranks) reverse_mapping = {v:k for k, v in mapping.items()} new_contraction_indices = [] for indl, links in enumerate(contraction_indices): if len(links) <= 2: new_contraction_indices.append(links) continue # Check multiple contractions: # # Examples: # # `A_ij b_j0 C_jk` ===> `ADiagonalizeVector(b)C` # # Care for: # - matrix being diagonalized (i.e. `A_ii`) # - vectors being diagonalized (i.e. `a_i0`) # Also consider the case of diagonal matrices being contracted: current_dimension = self.expr.shape[links[0]] tuple_links = [mapping[i] for i in links] arg_indices, arg_positions = zip(tuple_links) args_updates = {} if len(arg_indices) != len(set(arg_indices)): # Maybe trace should be supported? raise NotImplementedError not_vectors = [] vectors = [] for arg_ind, arg_pos in tuple_links: mat = args[arg_ind] other_arg_pos = 1-arg_pos other_arg_abs = reverse_mapping[arg_ind, other_arg_pos] if (((1 not in mat.shape) and (not ask(Q.diagonal(mat)))) or ((current_dimension == 1) is True and mat.shape != (1, 1)) or any([other_arg_abs in l for li, l in enumerate(contraction_indices) if li != indl]) ): not_vectors.append((arg_ind, arg_pos)) continue args_updates[arg_ind] = diagonalize_vector(mat) vectors.append((arg_ind, arg_pos)) vectors.append((arg_ind, 1-arg_pos)) if len(not_vectors) > 2: new_contraction_indices.append(links) continue if len(not_vectors) == 0: new_sequence = vectors[:1] + vectors[2:] elif len(not_vectors) == 1: new_sequence = not_vectors[:1] + vectors[:-1] else: new_sequence = not_vectors[:1] + vectors + not_vectors[1:] for i in range(0, len(new_sequence) - 1, 2): arg1, pos1 = new_sequence[i] arg2, pos2 = new_sequence[i+1] if arg1 == arg2: raise NotImplementedError continue abspos1 = reverse_mapping[arg1, pos1] abspos2 = reverse_mapping[arg2, pos2] new_contraction_indices.append((abspos1, abspos2)) for ind, newarg in args_updates.items(): args[ind] = newarg return CodegenArrayContraction( CodegenArrayTensorProduct(args), new_contraction_indices ) def flatten_contraction_of_diagonal(self): if not isinstance(self.expr, CodegenArrayDiagonal): return self contraction_down = self.expr._push_indices_down(self.expr.diagonal_indices, self.contraction_indices) new_contraction_indices = [] diagonal_indices = self.expr.diagonal_indices[:] for i in contraction_down: contraction_group = list(i) for j in i: diagonal_with = [k for k in diagonal_indices if j in k] contraction_group.extend([l for k in diagonal_with for l in k]) diagonal_indices = [k for k in diagonal_indices if k not in diagonal_with] new_contraction_indices.append(sorted(set(contraction_group))) new_contraction_indices = CodegenArrayDiagonal._push_indices_up(diagonal_indices, new_contraction_indices) return CodegenArrayContraction( CodegenArrayDiagonal( self.expr.expr, diagonal_indices ), new_contraction_indices ) @staticmethod def _get_free_indices_to_position_map(free_indices, contraction_indices): free_indices_to_position = {} flattened_contraction_indices = [j for i in contraction_indices for j in i] counter = 0 for ind in free_indices: while counter in flattened_contraction_indices: counter += 1 free_indices_to_position[ind] = counter counter += 1 return free_indices_to_position @staticmethod def _get_index_shifts(expr): """ Get the mapping of indices at the positions before the contraction occurs. Examples ======== >>> from sympy.codegen.array_utils import CodegenArrayContraction, CodegenArrayTensorProduct >>> from sympy import MatrixSymbol >>> M = MatrixSymbol("M", 3, 3) >>> N = MatrixSymbol("N", 3, 3) >>> cg = CodegenArrayContraction(CodegenArrayTensorProduct(M, N), [1, 2]) >>> cg._get_index_shifts(cg) [0, 2] Indeed, ``cg`` after the contraction has two dimensions, 0 and 1. They need to be shifted by 0 and 2 to get the corresponding positions before the contraction (that is, 0 and 3). """ inner_contraction_indices = expr.contraction_indices all_inner = [j for i in inner_contraction_indices for j in i] all_inner.sort() # TODO: add API for total rank and cumulative rank: total_rank = get_rank(expr) inner_rank = len(all_inner) outer_rank = total_rank - inner_rank shifts = [0 for i in range(outer_rank)] counter = 0 pointer = 0 for i in range(outer_rank): while pointer < inner_rank and counter >= all_inner[pointer]: counter += 1 pointer += 1 shifts[i] += pointer counter += 1 return shifts @staticmethod def _convert_outer_indices_to_inner_indices(expr, outer_contraction_indices): shifts = CodegenArrayContraction._get_index_shifts(expr) outer_contraction_indices = tuple(tuple(shifts[j] + j for j in i) for i in outer_contraction_indices) return outer_contraction_indices @staticmethod def _flatten(expr, outer_contraction_indices): inner_contraction_indices = expr.contraction_indices outer_contraction_indices = CodegenArrayContraction._convert_outer_indices_to_inner_indices(expr, outer_contraction_indices) contraction_indices = inner_contraction_indices + outer_contraction_indices return CodegenArrayContraction(expr.expr, contraction_indices) def _get_contraction_tuples(self): r""" Return tuples containing the argument index and position within the argument of the index position. Examples ======== >>> from sympy import MatrixSymbol, MatrixExpr, Sum, Symbol >>> from sympy.abc import i, j, k, l, N >>> from sympy.codegen.array_utils import CodegenArrayContraction, CodegenArrayTensorProduct >>> A = MatrixSymbol("A", N, N) >>> B = MatrixSymbol("B", N, N) >>> cg = CodegenArrayContraction(CodegenArrayTensorProduct(A, B), (1, 2)) >>> cg._get_contraction_tuples() [[(0, 1), (1, 0)]] Here the contraction pair `(1, 2)` meaning that the 2nd and 3rd indices of the tensor product `A\otimes B` are contracted, has been transformed into `(0, 1)` and `(1, 0)`, identifying the same indices in a different notation. `(0, 1)` is the second index (1) of the first argument (i.e. 0 or `A`). `(1, 0)` is the first index (i.e. 0) of the second argument (i.e. 1 or `B`). """ mapping = self._mapping return [[mapping[j] for j in i] for i in self.contraction_indices] @staticmethod def _contraction_tuples_to_contraction_indices(expr, contraction_tuples): # TODO: check that `expr` has `.subranks`: ranks = expr.subranks cumulative_ranks = [0] + list(accumulate(ranks)) return [tuple(cumulative_ranks[j]+k for j, k in i) for i in contraction_tuples] @property def free_indices(self): return self._free_indices[:] @property def free_indices_to_position(self): return dict(self._free_indices_to_position) @property def expr(self): return self.args[0] @property def contraction_indices(self): return self.args[1:] def _contraction_indices_to_components(self): expr = self.expr if not isinstance(expr, CodegenArrayTensorProduct): raise NotImplementedError("only for contractions of tensor products") ranks = expr.subranks mapping = {} counter = 0 for i, rank in enumerate(ranks): for j in range(rank): mapping[counter] = (i, j) counter += 1 return mapping def sort_args_by_name(self): """ Sort arguments in the tensor product so that their order is lexicographical. Examples ======== >>> from sympy import MatrixSymbol, MatrixExpr, Sum, Symbol >>> from sympy.abc import i, j, k, l, N >>> from sympy.codegen.array_utils import CodegenArrayContraction >>> A = MatrixSymbol("A", N, N) >>> B = MatrixSymbol("B", N, N) >>> C = MatrixSymbol("C", N, N) >>> D = MatrixSymbol("D", N, N) >>> cg = CodegenArrayContraction.from_MatMul(CDAB) >>> cg CodegenArrayContraction(CodegenArrayTensorProduct(C, D, A, B), (1, 2), (3, 4), (5, 6)) >>> cg.sort_args_by_name() CodegenArrayContraction(CodegenArrayTensorProduct(A, B, C, D), (0, 7), (1, 2), (5, 6)) """ expr = self.expr if not isinstance(expr, CodegenArrayTensorProduct): return self args = expr.args sorted_data = sorted(enumerate(args), key=lambda x: default_sort_key(x[1])) pos_sorted, args_sorted = zip(sorted_data) reordering_map = {i: pos_sorted.index(i) for i, arg in enumerate(args)} contraction_tuples = self._get_contraction_tuples() contraction_tuples = [[(reordering_map[j], k) for j, k in i] for i in contraction_tuples] c_tp = CodegenArrayTensorProduct(args_sorted) new_contr_indices = self._contraction_tuples_to_contraction_indices( c_tp, contraction_tuples ) return CodegenArrayContraction(c_tp, new_contr_indices) def _get_contraction_links(self): r""" Returns a dictionary of links between arguments in the tensor product being contracted. See the example for an explanation of the values. Examples ======== >>> from sympy import MatrixSymbol, MatrixExpr, Sum, Symbol >>> from sympy.abc import i, j, k, l, N >>> from sympy.codegen.array_utils import CodegenArrayContraction >>> A = MatrixSymbol("A", N, N) >>> B = MatrixSymbol("B", N, N) >>> C = MatrixSymbol("C", N, N) >>> D = MatrixSymbol("D", N, N) Matrix multiplications are pairwise contractions between neighboring matrices: `A_{ij} B_{jk} C_{kl} D_{lm}` >>> cg = CodegenArrayContraction.from_MatMul(ABCD) >>> cg CodegenArrayContraction(CodegenArrayTensorProduct(A, B, C, D), (1, 2), (3, 4), (5, 6)) >>> cg._get_contraction_links() {0: {1: (1, 0)}, 1: {0: (0, 1), 1: (2, 0)}, 2: {0: (1, 1), 1: (3, 0)}, 3: {0: (2, 1)}} This dictionary is interpreted as follows: argument in position 0 (i.e. matrix `A`) has its second index (i.e. 1) contracted to `(1, 0)`, that is argument in position 1 (matrix `B`) on the first index slot of `B`, this is the contraction provided by the index `j` from `A`. The argument in position 1 (that is, matrix `B`) has two contractions, the ones provided by the indices `j` and `k`, respectively the first and second indices (0 and 1 in the sub-dict). The link `(0, 1)` and `(2, 0)` respectively. `(0, 1)` is the index slot 1 (the 2nd) of argument in position 0 (that is, `A_{\ldot j}`), and so on. """ args, dlinks = _get_contraction_links([self], self.subranks, self.contraction_indices) return dlinks @staticmethod def from_MatMul(expr): args_nonmat = [] args = [] contractions = [] for arg in expr.args: if isinstance(arg, MatrixExpr): args.append(arg) else: args_nonmat.append(arg) contractions = [(2i+1, 2i+2) for i in range(len(args)-1)] return Mul.fromiter(args_nonmat)CodegenArrayContraction( CodegenArrayTensorProduct(args), contractions ) def get_shape(expr): if hasattr(expr, "shape"): return expr.shape return () class CodegenArrayTensorProduct(_CodegenArrayAbstract): r""" Class to represent the tensor product of array-like objects. """ def __new__(cls, args): args = [_sympify(arg) for arg in args] args = cls._flatten(args) ranks = [get_rank(arg) for arg in args] if len(args) == 1: return args[0] # If there are contraction objects inside, transform the whole # expression into `CodegenArrayContraction`: contractions = {i: arg for i, arg in enumerate(args) if isinstance(arg, CodegenArrayContraction)} if contractions: cumulative_ranks = list(accumulate([0] + ranks))[:-1] tp = cls([arg.expr if isinstance(arg, CodegenArrayContraction) else arg for arg in args]) contraction_indices = [tuple(cumulative_ranks[i] + k for k in j) for i, arg in contractions.items() for j in arg.contraction_indices] return CodegenArrayContraction(tp, contraction_indices) #newargs = [i for i in args if hasattr(i, "shape")] #coeff = reduce(lambda x, y: xy, [i for i in args if not hasattr(i, "shape")], S.One) #newargs[0] = coeff obj = Basic.__new__(cls, args) obj._subranks = ranks shapes = [get_shape(i) for i in args] if any(i is None for i in shapes): obj._shape = None else: obj._shape = tuple(j for i in shapes for j in i) return obj @classmethod def _flatten(cls, args): args = [i for arg in args for i in (arg.args if isinstance(arg, cls) else [arg])] return args class CodegenArrayElementwiseAdd(_CodegenArrayAbstract): r""" Class for elementwise array additions. """ def __new__(cls, args): args = [_sympify(arg) for arg in args] obj = Basic.__new__(cls, args) ranks = [get_rank(arg) for arg in args] ranks = list(set(ranks)) if len(ranks) != 1: raise ValueError("summing arrays of different ranks") obj._subranks = ranks shapes = [arg.shape for arg in args] if len(set([i for i in shapes if i is not None])) > 1: raise ValueError("mismatching shapes in addition") if any(i is None for i in shapes): obj._shape = None else: obj._shape = shapes[0] return obj class CodegenArrayPermuteDims(_CodegenArrayAbstract): r""" Class to represent permutation of axes of arrays. Examples ======== >>> from sympy.codegen.array_utils import CodegenArrayPermuteDims >>> from sympy import MatrixSymbol >>> M = MatrixSymbol("M", 3, 3) >>> cg = CodegenArrayPermuteDims(M, [1, 0]) The object ``cg`` represents the transposition of ``M``, as the permutation ``[1, 0]`` will act on its indices by switching them: `M_{ij} \Rightarrow M_{ji}` This is evident when transforming back to matrix form: >>> from sympy.codegen.array_utils import recognize_matrix_expression >>> recognize_matrix_expression(cg) M.T >>> N = MatrixSymbol("N", 3, 2) >>> cg = CodegenArrayPermuteDims(N, [1, 0]) >>> cg.shape (2, 3) """ def __new__(cls, expr, permutation): from sympy.combinatorics import Permutation expr = _sympify(expr) permutation = Permutation(permutation) plist = permutation.args[0] if plist == sorted(plist): return expr obj = Basic.__new__(cls, expr, permutation) obj._subranks = [get_rank(expr)] shape = expr.shape if shape is None: obj._shape = None else: obj._shape = tuple(shape[permutation(i)] for i in range(len(shape))) return obj @property def expr(self): return self.args[0] @property def permutation(self): return self.args[1] def nest_permutation(self): r""" Nest the permutation down the expression tree. Examples ======== >>> from sympy.codegen.array_utils import (CodegenArrayPermuteDims, CodegenArrayTensorProduct, nest_permutation) >>> from sympy import MatrixSymbol >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> M = MatrixSymbol("M", 3, 3) >>> N = MatrixSymbol("N", 3, 3) >>> cg = CodegenArrayPermuteDims(CodegenArrayTensorProduct(M, N), [1, 0, 3, 2]) >>> cg CodegenArrayPermuteDims(CodegenArrayTensorProduct(M, N), (0 1)(2 3)) >>> nest_permutation(cg) CodegenArrayTensorProduct(CodegenArrayPermuteDims(M, (0 1)), CodegenArrayPermuteDims(N, (0 1))) In ``cg`` both ``M`` and ``N`` are transposed. The cyclic representation of the permutation after the tensor product is `(0 1)(2 3)`. After nesting it down the expression tree, the usual transposition permutation `(0 1)` appears. """ expr = self.expr if isinstance(expr, CodegenArrayTensorProduct): # Check if the permutation keeps the subranks separated: subranks = expr.subranks subrank = expr.subrank() l = list(range(subrank)) p = [self.permutation(i) for i in l] dargs = {} counter = 0 for i, arg in zip(subranks, expr.args): p0 = p[counter:counter+i] counter += i s0 = sorted(p0) if not all([s0[j+1]-s0[j] == 1 for j in range(len(s0)-1)]): # Cross-argument permutations, impossible to nest the object: return self subpermutation = [p0.index(j) for j in s0] dargs[s0[0]] = CodegenArrayPermuteDims(arg, subpermutation) # Read the arguments sorting the according to the keys of the dict: args = [dargs[i] for i in sorted(dargs)] return CodegenArrayTensorProduct(args) elif isinstance(expr, CodegenArrayContraction): # Invert tree hierarchy: put the contraction above. cycles = self.permutation.cyclic_form newcycles = CodegenArrayContraction._convert_outer_indices_to_inner_indices(expr, cycles) newpermutation = Permutation(newcycles) new_contr_indices = [tuple(newpermutation(j) for j in i) for i in expr.contraction_indices] return CodegenArrayContraction(CodegenArrayPermuteDims(expr.expr, newpermutation), new_contr_indices) elif isinstance(expr, CodegenArrayElementwiseAdd): return CodegenArrayElementwiseAdd([CodegenArrayPermuteDims(arg, self.permutation) for arg in expr.args]) return self def nest_permutation(expr): if isinstance(expr, CodegenArrayPermuteDims): return expr.nest_permutation() else: return expr class CodegenArrayDiagonal(_CodegenArrayAbstract): r""" Class to represent the diagonal operator. In a 2-dimensional array it returns the diagonal, this looks like the operation: `A_{ij} \rightarrow A_{ii}` The diagonal over axes 1 and 2 (the second and third) of the tensor product of two 2-dimensional arrays `A \otimes B` is `\Big[ A_{ab} B_{cd} \Big]_{abcd} \rightarrow \Big[ A_{ai} B_{id} \Big]_{adi}` In this last example the array expression has been reduced from 4-dimensional to 3-dimensional. Notice that no contraction has occurred, rather there is a new index `i` for the diagonal, contraction would have reduced the array to 2 dimensions. Notice that the diagonalized out dimensions are added as new dimensions at the end of the indices. """ def __new__(cls, expr, diagonal_indices): expr = _sympify(expr) diagonal_indices = [Tuple(sorted(i)) for i in diagonal_indices] if isinstance(expr, CodegenArrayDiagonal): return cls._flatten(expr, diagonal_indices) shape = expr.shape if shape is not None: diagonal_indices = [i for i in diagonal_indices if len(i) > 1] cls._validate(expr, diagonal_indices) #diagonal_indices = cls._remove_trivial_dimensions(shape, diagonal_indices) # Get new shape: shp1 = tuple(shp for i,shp in enumerate(shape) if not any(i in j for j in diagonal_indices)) shp2 = tuple(shape[i[0]] for i in diagonal_indices) shape = shp1 + shp2 if len(diagonal_indices) == 0: return expr obj = Basic.__new__(cls, expr, diagonal_indices) obj._subranks = _get_subranks(expr) obj._shape = shape return obj @staticmethod def _validate(expr, diagonal_indices): # Check that no diagonalization happens on indices with mismatched # dimensions: shape = expr.shape for i in diagonal_indices: if len(set(shape[j] for j in i)) != 1: raise ValueError("diagonalizing indices of different dimensions") @staticmethod def _remove_trivial_dimensions(shape, diagonal_indices): return [tuple(j for j in i) for i in diagonal_indices if shape[i[0]] != 1] @property def expr(self): return self.args[0] @property def diagonal_indices(self): return self.args[1:] @staticmethod def _flatten(expr, outer_diagonal_indices): inner_diagonal_indices = expr.diagonal_indices all_inner = [j for i in inner_diagonal_indices for j in i] all_inner.sort() # TODO: add API for total rank and cumulative rank: total_rank = get_rank(expr) inner_rank = len(all_inner) outer_rank = total_rank - inner_rank shifts = [0 for i in range(outer_rank)] counter = 0 pointer = 0 for i in range(outer_rank): while pointer < inner_rank and counter >= all_inner[pointer]: counter += 1 pointer += 1 shifts[i] += pointer counter += 1 outer_diagonal_indices = tuple(tuple(shifts[j] + j for j in i) for i in outer_diagonal_indices) diagonal_indices = inner_diagonal_indices + outer_diagonal_indices return CodegenArrayDiagonal(expr.expr, diagonal_indices) @classmethod def _push_indices_down(cls, diagonal_indices, indices): flattened_contraction_indices = [j for i in diagonal_indices for j in i[1:]] flattened_contraction_indices.sort() transform = _build_push_indices_down_func_transformation(flattened_contraction_indices) return _apply_recursively_over_nested_lists(transform, indices) @classmethod def _push_indices_up(cls, diagonal_indices, indices): flattened_contraction_indices = [j for i in diagonal_indices for j in i[1:]] flattened_contraction_indices.sort() transform = _build_push_indices_up_func_transformation(flattened_contraction_indices) return _apply_recursively_over_nested_lists(transform, indices) def transform_to_product(self): from sympy import ask, Q diagonal_indices = self.diagonal_indices if isinstance(self.expr, CodegenArrayContraction): # invert Diagonal and Contraction: diagonal_down = CodegenArrayContraction._push_indices_down( self.expr.contraction_indices, diagonal_indices ) newexpr = CodegenArrayDiagonal( self.expr.expr, diagonal_down ).transform_to_product() contraction_up = newexpr._push_indices_up( diagonal_down, self.expr.contraction_indices ) return CodegenArrayContraction( newexpr, contraction_up ) if not isinstance(self.expr, CodegenArrayTensorProduct): return self args = list(self.expr.args) # TODO: unify API subranks = [get_rank(i) for i in args] # TODO: unify API mapping = _get_mapping_from_subranks(subranks) new_contraction_indices = [] drop_diagonal_indices = [] for indl, links in enumerate(diagonal_indices): if len(links) > 2: continue # Also consider the case of diagonal matrices being contracted: current_dimension = self.expr.shape[links[0]] if current_dimension == 1: drop_diagonal_indices.append(indl) continue tuple_links = [mapping[i] for i in links] arg_indices, arg_positions = zip(tuple_links) if len(arg_indices) != len(set(arg_indices)): # Maybe trace should be supported? raise NotImplementedError args_updates = {} count_nondiagonal = 0 last = None expression_is_square = False # Check that all args are vectors: for arg_ind, arg_pos in tuple_links: mat = args[arg_ind] if 1 in mat.shape and mat.shape != (1, 1): args_updates[arg_ind] = DiagonalizeVector(mat) last = arg_ind else: expression_is_square = True if not ask(Q.diagonal(mat)): count_nondiagonal += 1 if count_nondiagonal > 1: break if count_nondiagonal > 1: continue # TODO: if count_nondiagonal == 0 then the sub-expression can be recognized as HadamardProduct. for arg_ind, newmat in args_updates.items(): if not expression_is_square and arg_ind == last: continue #pass args[arg_ind] = newmat drop_diagonal_indices.append(indl) new_contraction_indices.append(links) new_diagonal_indices = CodegenArrayContraction._push_indices_up( new_contraction_indices, [e for i, e in enumerate(diagonal_indices) if i not in drop_diagonal_indices] ) return CodegenArrayDiagonal( CodegenArrayContraction( CodegenArrayTensorProduct(args), new_contraction_indices ), new_diagonal_indices ) def get_rank(expr): if isinstance(expr, (MatrixExpr, MatrixElement)): return 2 if isinstance(expr, _CodegenArrayAbstract): return expr.subrank() if isinstance(expr, NDimArray): return expr.rank() if isinstance(expr, Indexed): return expr.rank if isinstance(expr, IndexedBase): shape = expr.shape if shape is None: return -1 else: return len(shape) if isinstance(expr, _RecognizeMatOp): return expr.rank() if isinstance(expr, _RecognizeMatMulLines): return expr.rank() return 0 def _get_subranks(expr): if isinstance(expr, _CodegenArrayAbstract): return expr.subranks else: return [get_rank(expr)] def _get_mapping_from_subranks(subranks): mapping = {} counter = 0 for i, rank in enumerate(subranks): for j in range(rank): mapping[counter] = (i, j) counter += 1 return mapping def _get_contraction_links(args, subranks, contraction_indices): mapping = _get_mapping_from_subranks(subranks) contraction_tuples = [[mapping[j] for j in i] for i in contraction_indices] dlinks = defaultdict(dict) for links in contraction_tuples: if len(links) == 2: (arg1, pos1), (arg2, pos2) = links dlinks[arg1][pos1] = (arg2, pos2) dlinks[arg2][pos2] = (arg1, pos1) continue return args, dict(dlinks) def _sort_contraction_indices(pairing_indices): pairing_indices = [Tuple(sorted(i)) for i in pairing_indices] pairing_indices.sort(key=lambda x: min(x)) return pairing_indices def _get_diagonal_indices(flattened_indices): axes_contraction = defaultdict(list) for i, ind in enumerate(flattened_indices): if isinstance(ind, (int, Integer)): # If the indices is a number, there can be no diagonal operation: continue axes_contraction[ind].append(i) axes_contraction = {k: v for k, v in axes_contraction.items() if len(v) > 1} # Put the diagonalized indices at the end: ret_indices = [i for i in flattened_indices if i not in axes_contraction] diag_indices = list(axes_contraction) diag_indices.sort(key=lambda x: flattened_indices.index(x)) diagonal_indices = [tuple(axes_contraction[i]) for i in diag_indices] ret_indices += diag_indices ret_indices = tuple(ret_indices) return diagonal_indices, ret_indices def _get_argindex(subindices, ind): for i, sind in enumerate(subindices): if ind == sind: return i if isinstance(sind, (set, frozenset)) and ind in sind: return i raise IndexError("%s not found in %s" % (ind, subindices)) def _codegen_array_parse(expr): if isinstance(expr, Sum): function = expr.function summation_indices = expr.variables subexpr, subindices = _codegen_array_parse(function) # Check dimensional consistency: shape = subexpr.shape if shape: for ind, istart, iend in expr.limits: i = _get_argindex(subindices, ind) if istart != 0 or iend+1 != shape[i]: raise ValueError("summation index and array dimension mismatch: %s" % ind) contraction_indices = [] subindices = list(subindices) if isinstance(subexpr, CodegenArrayDiagonal): diagonal_indices = list(subexpr.diagonal_indices) dindices = subindices[-len(diagonal_indices):] subindices = subindices[:-len(diagonal_indices)] for index in summation_indices: if index in dindices: position = dindices.index(index) contraction_indices.append(diagonal_indices[position]) diagonal_indices[position] = None diagonal_indices = [i for i in diagonal_indices if i is not None] for i, ind in enumerate(subindices): if ind in summation_indices: pass if diagonal_indices: subexpr = CodegenArrayDiagonal(subexpr.expr, diagonal_indices) else: subexpr = subexpr.expr axes_contraction = defaultdict(list) for i, ind in enumerate(subindices): if ind in summation_indices: axes_contraction[ind].append(i) subindices[i] = None for k, v in axes_contraction.items(): contraction_indices.append(tuple(v)) free_indices = [i for i in subindices if i is not None] indices_ret = list(free_indices) indices_ret.sort(key=lambda x: free_indices.index(x)) return CodegenArrayContraction( subexpr, contraction_indices, free_indices=free_indices ), tuple(indices_ret) if isinstance(expr, Mul): args, indices = zip([_codegen_array_parse(arg) for arg in expr.args]) # Check if there are KroneckerDelta objects: kronecker_delta_repl = {} for arg in args: if not isinstance(arg, KroneckerDelta): continue # Diagonalize two indices: i, j = arg.indices kindices = set(arg.indices) if i in kronecker_delta_repl: kindices.update(kronecker_delta_repl[i]) if j in kronecker_delta_repl: kindices.update(kronecker_delta_repl[j]) kindices = frozenset(kindices) for index in kindices: kronecker_delta_repl[index] = kindices # Remove KroneckerDelta objects, their relations should be handled by # CodegenArrayDiagonal: newargs = [] newindices = [] for arg, loc_indices in zip(args, indices): if isinstance(arg, KroneckerDelta): continue newargs.append(arg) newindices.append(loc_indices) flattened_indices = [kronecker_delta_repl.get(j, j) for i in newindices for j in i] diagonal_indices, ret_indices = _get_diagonal_indices(flattened_indices) tp = CodegenArrayTensorProduct(newargs) if diagonal_indices: return (CodegenArrayDiagonal(tp, diagonal_indices), ret_indices) else: return tp, ret_indices if isinstance(expr, MatrixElement): indices = expr.args[1:] diagonal_indices, ret_indices = _get_diagonal_indices(indices) if diagonal_indices: return (CodegenArrayDiagonal(expr.args[0], diagonal_indices), ret_indices) else: return expr.args[0], ret_indices if isinstance(expr, Indexed): indices = expr.indices diagonal_indices, ret_indices = _get_diagonal_indices(indices) if diagonal_indices: return (CodegenArrayDiagonal(expr.base, diagonal_indices), ret_indices) else: return expr.args[0], ret_indices if isinstance(expr, IndexedBase): raise NotImplementedError if isinstance(expr, KroneckerDelta): return expr, expr.indices if isinstance(expr, Add): args, indices = zip([_codegen_array_parse(arg) for arg in expr.args]) args = list(args) # Check if all indices are compatible. Otherwise expand the dimensions: index0set = set(indices[0]) index0 = indices[0] for i in range(1, len(args)): if set(indices[i]) != index0set: raise NotImplementedError("indices must be the same") permutation = Permutation([index0.index(j) for j in indices[i]]) # Perform index permutations: args[i] = CodegenArrayPermuteDims(args[i], permutation) return CodegenArrayElementwiseAdd(args), index0 return expr, () raise NotImplementedError("could not recognize expression %s" % expr) def _parse_matrix_expression(expr): if isinstance(expr, MatMul): args_nonmat = [] args = [] contractions = [] for arg in expr.args: if isinstance(arg, MatrixExpr): args.append(arg) else: args_nonmat.append(arg) contractions = [(2i+1, 2i+2) for i in range(len(args)-1)] return Mul.fromiter(args_nonmat)CodegenArrayContraction( CodegenArrayTensorProduct([_parse_matrix_expression(arg) for arg in args]), contractions ) elif isinstance(expr, MatAdd): return CodegenArrayElementwiseAdd( [_parse_matrix_expression(arg) for arg in expr.args] ) elif isinstance(expr, Transpose): return CodegenArrayPermuteDims( _parse_matrix_expression(expr.args[0]), [1, 0] ) else: return expr def parse_indexed_expression(expr, first_indices=None): r""" Parse indexed expression into a form useful for code generation. Examples ======== >>> from sympy.codegen.array_utils import parse_indexed_expression >>> from sympy import MatrixSymbol, Sum, symbols >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> i, j, k, d = symbols("i j k d") >>> M = MatrixSymbol("M", d, d) >>> N = MatrixSymbol("N", d, d) Recognize the trace in summation form: >>> expr = Sum(M[i, i], (i, 0, d-1)) >>> parse_indexed_expression(expr) CodegenArrayContraction(M, (0, 1)) Recognize the extraction of the diagonal by using the same index `i` on both axes of the matrix: >>> expr = M[i, i] >>> parse_indexed_expression(expr) CodegenArrayDiagonal(M, (0, 1)) This function can help perform the transformation expressed in two different mathematical notations as: `\sum_{j=0}^{N-1} A_{i,j} B_{j,k} \Longrightarrow \mathbf{A}\cdot \mathbf{B}` Recognize the matrix multiplication in summation form: >>> expr = Sum(M[i, j]N[j, k], (j, 0, d-1)) >>> parse_indexed_expression(expr) CodegenArrayContraction(CodegenArrayTensorProduct(M, N), (1, 2)) Specify that ``k`` has to be the starting index: >>> parse_indexed_expression(expr, first_indices=[k]) CodegenArrayPermuteDims(CodegenArrayContraction(CodegenArrayTensorProduct(M, N), (1, 2)), (0 1)) """ result, indices = _codegen_array_parse(expr) if not first_indices: return result for i in first_indices: if i not in indices: first_indices.remove(i) #raise ValueError("index %s not found or not a free index" % i) first_indices.extend([i for i in indices if i not in first_indices]) permutation = [first_indices.index(i) for i in indices] return CodegenArrayPermuteDims(result, permutation) def _has_multiple_lines(expr): if isinstance(expr, _RecognizeMatMulLines): return True if isinstance(expr, _RecognizeMatOp): return expr.multiple_lines return False class _RecognizeMatOp(object): """ Class to help parsing matrix multiplication lines. """ def __init__(self, operator, args): self.operator = operator self.args = args if any(_has_multiple_lines(arg) for arg in args): multiple_lines = True else: multiple_lines = False self.multiple_lines = multiple_lines def rank(self): if self.operator == Trace: return 0 # TODO: check return 2 def __repr__(self): op = self.operator if op == MatMul: s = "" elif op == MatAdd: s = "+" else: s = op.__name__ return "_RecognizeMatOp(%s, %s)" % (s, repr(self.args)) return "_RecognizeMatOp(%s)" % (s.join(repr(i) for i in self.args)) def __eq__(self, other): if not isinstance(other, type(self)): return False if self.operator != other.operator: return False if self.args != other.args: return False return True def __iter__(self): return iter(self.args) class _RecognizeMatMulLines(list): """ This class handles multiple parsed multiplication lines. """ def __new__(cls, args): if len(args) == 1: return args[0] return list.__new__(cls, args) def rank(self): return reduce(lambda x, y: xy, [get_rank(i) for i in self], S.One) def __repr__(self): return "_RecognizeMatMulLines(%s)" % super(_RecognizeMatMulLines, self).__repr__() def _support_function_tp1_recognize(contraction_indices, args): if not isinstance(args, list): args = [args] subranks = [get_rank(i) for i in args] coeff = reduce(lambda x, y: xy, [arg for arg, srank in zip(args, subranks) if srank == 0], S.One) mapping = _get_mapping_from_subranks(subranks) reverse_mapping = {v:k for k, v in mapping.items()} args, dlinks = _get_contraction_links(args, subranks, contraction_indices) flatten_contractions = [j for i in contraction_indices for j in i] total_rank = sum(subranks) # TODO: turn `free_indices` into a list? free_indices = {i: i for i in range(total_rank) if i not in flatten_contractions} return_list = [] while dlinks: if free_indices: first_index, starting_argind = min(free_indices.items(), key=lambda x: x[1]) free_indices.pop(first_index) starting_argind, starting_pos = mapping[starting_argind] else: # Maybe a Trace first_index = None starting_argind = min(dlinks) starting_pos = 0 current_argind, current_pos = starting_argind, starting_pos matmul_args = [] last_index = None while True: elem = args[current_argind] if current_pos == 1: elem = _RecognizeMatOp(Transpose, [elem]) matmul_args.append(elem) other_pos = 1 - current_pos if current_argind not in dlinks: other_absolute = reverse_mapping[current_argind, other_pos] free_indices.pop(other_absolute, None) break link_dict = dlinks.pop(current_argind) if other_pos not in link_dict: if free_indices: last_index = [i for i, j in free_indices.items() if mapping[j] == (current_argind, other_pos)][0] else: last_index = None break if len(link_dict) > 2: raise NotImplementedError("not a matrix multiplication line") # Get the last element of `link_dict` as the next link. The last # element is the correct start for trace expressions: current_argind, current_pos = link_dict[other_pos] if current_argind == starting_argind: # This is a trace: if len(matmul_args) > 1: matmul_args = [_RecognizeMatOp(Trace, [_RecognizeMatOp(MatMul, matmul_args)])] elif args[current_argind].shape != (1, 1): matmul_args = [_RecognizeMatOp(Trace, matmul_args)] break dlinks.pop(starting_argind, None) free_indices.pop(last_index, None) return_list.append(_RecognizeMatOp(MatMul, matmul_args)) if coeff != 1: # Let's inject the coefficient: return_list[0].args.insert(0, coeff) return _RecognizeMatMulLines(return_list) def recognize_matrix_expression(expr): r""" Recognize matrix expressions in codegen objects. If more than one matrix multiplication line have been detected, return a list with the matrix expressions. Examples ======== >>> from sympy import MatrixSymbol, MatrixExpr, Sum, Symbol >>> from sympy.abc import i, j, k, l, N >>> from sympy.codegen.array_utils import CodegenArrayContraction, CodegenArrayTensorProduct >>> from sympy.codegen.array_utils import recognize_matrix_expression, parse_indexed_expression >>> A = MatrixSymbol("A", N, N) >>> B = MatrixSymbol("B", N, N) >>> C = MatrixSymbol("C", N, N) >>> D = MatrixSymbol("D", N, N) >>> expr = Sum(A[i, j]B[j, k], (j, 0, N-1)) >>> cg = parse_indexed_expression(expr) >>> recognize_matrix_expression(cg) AB >>> cg = parse_indexed_expression(expr, first_indices=[k]) >>> recognize_matrix_expression(cg) (AB).T Transposition is detected: >>> expr = Sum(A[j, i]B[j, k], (j, 0, N-1)) >>> cg = parse_indexed_expression(expr) >>> recognize_matrix_expression(cg) A.TB >>> cg = parse_indexed_expression(expr, first_indices=[k]) >>> recognize_matrix_expression(cg) (A.TB).T Detect the trace: >>> expr = Sum(A[i, i], (i, 0, N-1)) >>> cg = parse_indexed_expression(expr) >>> recognize_matrix_expression(cg) Trace(A) Recognize some more complex traces: >>> expr = Sum(A[i, j]B[j, i], (i, 0, N-1), (j, 0, N-1)) >>> cg = parse_indexed_expression(expr) >>> recognize_matrix_expression(cg) Trace(AB) More complicated expressions: >>> expr = Sum(A[i, j]B[k, j]A[l, k], (j, 0, N-1), (k, 0, N-1)) >>> cg = parse_indexed_expression(expr) >>> recognize_matrix_expression(cg) AB.TA.T Expressions constructed from matrix expressions do not contain literal indices, the positions of free indices are returned instead: >>> expr = AB >>> cg = CodegenArrayContraction.from_MatMul(expr) >>> recognize_matrix_expression(cg) AB If more than one line of matrix multiplications is detected, return separate matrix multiplication factors: >>> cg = CodegenArrayContraction(CodegenArrayTensorProduct(A, B, C, D), (1, 2), (5, 6)) >>> recognize_matrix_expression(cg) [AB, CD] The two lines have free indices at axes 0, 3 and 4, 7, respectively. """ # TODO: expr has to be a CodegenArray... type rec = _recognize_matrix_expression(expr) return _unfold_recognized_expr(rec) def _recognize_matrix_expression(expr): if isinstance(expr, CodegenArrayContraction): # Apply some transformations: expr = expr.flatten_contraction_of_diagonal() expr = expr.split_multiple_contractions() args = _recognize_matrix_expression(expr.expr) contraction_indices = expr.contraction_indices if isinstance(args, _RecognizeMatOp) and args.operator == MatAdd: addends = [] for arg in args.args: addends.append(_support_function_tp1_recognize(contraction_indices, arg)) return _RecognizeMatOp(MatAdd, addends) elif isinstance(args, _RecognizeMatMulLines): return _support_function_tp1_recognize(contraction_indices, args) return _support_function_tp1_recognize(contraction_indices, [args]) elif isinstance(expr, CodegenArrayElementwiseAdd): add_args = [] for arg in expr.args: add_args.append(_recognize_matrix_expression(arg)) return _RecognizeMatOp(MatAdd, add_args) elif isinstance(expr, (MatrixSymbol, IndexedBase)): return expr elif isinstance(expr, CodegenArrayPermuteDims): if expr.permutation.args[0] == [1, 0]: return _RecognizeMatOp(Transpose, [_recognize_matrix_expression(expr.expr)]) elif isinstance(expr.expr, CodegenArrayTensorProduct): ranks = expr.expr.subranks newrange = [expr.permutation(i) for i in range(sum(ranks))] newpos = [] counter = 0 for rank in ranks: newpos.append(newrange[counter:counter+rank]) counter += rank newargs = [] for pos, arg in zip(newpos, expr.expr.args): if pos == sorted(pos): newargs.append((_recognize_matrix_expression(arg), pos[0])) elif len(pos) == 2: newargs.append((_RecognizeMatOp(Transpose, [_recognize_matrix_expression(arg)]), pos[0])) else: raise NotImplementedError newargs.sort(key=lambda x: x[1]) newargs = [i[0] for i in newargs] return _RecognizeMatMulLines(newargs) else: raise NotImplementedError elif isinstance(expr, CodegenArrayTensorProduct): args = [_recognize_matrix_expression(arg) for arg in expr.args] multiple_lines = [_has_multiple_lines(arg) for arg in args] if any(multiple_lines): if any(a.operator != MatAdd for i, a in enumerate(args) if multiple_lines[i] and isinstance(a, _RecognizeMatOp)): raise NotImplementedError getargs = lambda x: x.args if isinstance(x, _RecognizeMatOp) else list(x) expand_args = [getargs(arg) if multiple_lines[i] else [arg] for i, arg in enumerate(args)] it = itertools.product(expand_args) ret = _RecognizeMatOp(MatAdd, [_RecognizeMatMulLines([k for j in i for k in (j if isinstance(j, _RecognizeMatMulLines) else [j])]) for i in it]) return ret return _RecognizeMatMulLines(args) elif isinstance(expr, CodegenArrayDiagonal): pexpr = expr.transform_to_product() if expr == pexpr: return expr return _recognize_matrix_expression(pexpr) elif isinstance(expr, Transpose): return expr elif isinstance(expr, MatrixExpr): return expr return expr def _suppress_trivial_dims_in_tensor_product(mat_list): # Recognize expressions like [x, y] with shape (k, 1, k, 1) as `xy.T`. # The matrix expression has to be equivalent to the tensor product of the matrices, with trivial dimensions (i.e. dim=1) dropped. # That is, add contractions over trivial dimensions: mat_11 = [] mat_k1 = [] last_dim = mat_list[0].shape[0] for mat in mat_list: if mat.shape == (1, 1): mat_11.append(mat) elif 1 in mat.shape: if mat.shape[0] == 1: mat_k1.append(mat.T) else: mat_k1.append(mat) else: return mat_list if len(mat_k1) > 2: return mat_list a = MatMul.fromiter(mat_k1[:1]) b = MatMul.fromiter(mat_k1[1:]) x = MatMul.fromiter(mat_11) return axb.T def _unfold_recognized_expr(expr): if isinstance(expr, _RecognizeMatOp): return expr.operator([_unfold_recognized_expr(i) for i in expr.args]) elif isinstance(expr, _RecognizeMatMulLines): unfolded = [_unfold_recognized_expr(i) for i in expr] mat_list = [i for i in unfolded if isinstance(i, MatrixExpr)] scalar_list = [i for i in unfolded if i not in mat_list] scalar = Mul.fromiter(scalar_list) mat_list = [i.doit() for i in mat_list] mat_list = [i for i in mat_list if not (i.shape == (1, 1) and i.is_Identity)] if mat_list: mat_list[0] = scalar if len(mat_list) == 1: return mat_list[0].doit() else: return _suppress_trivial_dims_in_tensor_product(mat_list) else: return scalar else: return expr def _apply_recursively_over_nested_lists(func, arr): if isinstance(arr, (tuple, list, Tuple)): return tuple(_apply_recursively_over_nested_lists(func, i) for i in arr) elif isinstance(arr, Tuple): return Tuple.fromiter(_apply_recursively_over_nested_lists(func, i) for i in arr) else: return func(arr) def _build_push_indices_up_func_transformation(flattened_contraction_indices): shifts = {0: 0} i = 0 cumulative = 0 while i < len(flattened_contraction_indices): j = 1 while i+j < len(flattened_contraction_indices): if flattened_contraction_indices[i] + j != flattened_contraction_indices[i+j]: break j += 1 cumulative += j shifts[flattened_contraction_indices[i]] = cumulative i += j shift_keys = sorted(shifts.keys()) def func(idx): return shifts[shift_keys[bisect.bisect_right(shift_keys, idx)-1]] def transform(j): if j in flattened_contraction_indices: return None else: return j - func(j) return transform def _build_push_indices_down_func_transformation(flattened_contraction_indices): N = flattened_contraction_indices[-1]+2 shifts = [i for i in range(N) if i not in flattened_contraction_indices] def transform(j): if j < len(shifts): return shifts[j] else: return j + shifts[-1] - len(shifts) + 1 return transform
ee5cce7bfe2ce65d3f7286e538f32f9dec16f588bd5507e2d99ef13e742cee4c	""" Types used to represent a full function/module as an Abstract Syntax Tree. Most types are small, and are merely used as tokens in the AST. A tree diagram has been included below to illustrate the relationships between the AST types. AST Type Tree ------------- :: Basic \|--->AssignmentBase \| \|--->Assignment \| \|--->AugmentedAssignment \| \|--->AddAugmentedAssignment \| \|--->SubAugmentedAssignment \| \|--->MulAugmentedAssignment \| \|--->DivAugmentedAssignment \| \|--->ModAugmentedAssignment \| \|--->CodeBlock \| \| \|--->Token \| \|--->Attribute \| \|--->For \| \|--->String \| \| \|--->QuotedString \| \| \|--->Comment \| \|--->Type \| \| \|--->IntBaseType \| \| \| \|--->_SizedIntType \| \| \| \|--->SignedIntType \| \| \| \|--->UnsignedIntType \| \| \|--->FloatBaseType \| \| \|--->FloatType \| \| \|--->ComplexBaseType \| \| \|--->ComplexType \| \|--->Node \| \| \|--->Variable \| \| \| \|---> Pointer \| \| \|--->FunctionPrototype \| \| \|--->FunctionDefinition \| \|--->Element \| \|--->Declaration \| \|--->While \| \|--->Scope \| \|--->Stream \| \|--->Print \| \|--->FunctionCall \| \|--->BreakToken \| \|--->ContinueToken \| \|--->NoneToken \| \|--->Statement \|--->Return Predefined types ---------------- A number of ``Type`` instances are provided in the ``sympy.codegen.ast`` module for convenience. Perhaps the two most common ones for code-generation (of numeric codes) are ``float32`` and ``float64`` (known as single and double precision respectively). There are also precision generic versions of Types (for which the codeprinters selects the underlying data type at time of printing): ``real``, ``integer``, ``complex_``, ``bool_``. The other ``Type`` instances defined are: - ``intc``: Integer type used by C's "int". - ``intp``: Integer type used by C's "unsigned". - ``int8``, ``int16``, ``int32``, ``int64``: n-bit integers. - ``uint8``, ``uint16``, ``uint32``, ``uint64``: n-bit unsigned integers. - ``float80``: known as "extended precision" on modern x86/amd64 hardware. - ``complex64``: Complex number represented by two ``float32`` numbers - ``complex128``: Complex number represented by two ``float64`` numbers Using the nodes --------------- It is possible to construct simple algorithms using the AST nodes. Let's construct a loop applying Newton's method:: >>> from sympy import symbols, cos >>> from sympy.codegen.ast import While, Assignment, aug_assign, Print >>> t, dx, x = symbols('tol delta val') >>> expr = cos(x) - x3 >>> whl = While(abs(dx) > t, [ ... Assignment(dx, -expr/expr.diff(x)), ... aug_assign(x, '+', dx), ... Print([x]) ... ]) >>> from sympy.printing import pycode >>> py_str = pycode(whl) >>> print(py_str) while (abs(delta) > tol): delta = (val3 - math.cos(val))/(-3val2 - math.sin(val)) val += delta print(val) >>> import math >>> tol, val, delta = 1e-5, 0.5, float('inf') >>> exec(py_str) 1.1121416371 0.909672693737 0.867263818209 0.865477135298 0.865474033111 >>> print('%3.1g' % (math.cos(val) - val3)) -3e-11 If we want to generate Fortran code for the same while loop we simple call ``fcode``:: >>> from sympy.printing.fcode import fcode >>> print(fcode(whl, standard=2003, source_format='free')) do while (abs(delta) > tol) delta = (val3 - cos(val))/(-3val*2 - sin(val)) val = val + delta print , val end do There is a function constructing a loop (or a complete function) like this in :mod:`sympy.codegen.algorithms`. """ from __future__ import print_function, division from itertools import chain from collections import defaultdict from sympy.core import Symbol, Tuple, Dummy from sympy.core.basic import Basic from sympy.core.compatibility import string_types from sympy.core.expr import Expr from sympy.core.numbers import Float, Integer, oo from sympy.core.relational import Lt, Le, Ge, Gt from sympy.core.sympify import _sympify, sympify, SympifyError from sympy.utilities.iterables import iterable def _mk_Tuple(args): """ Create a Sympy Tuple object from an iterable, converting Python strings to AST strings. Parameters ========== args: iterable Arguments to :class:`sympy.Tuple`. Returns ======= sympy.Tuple """ args = [String(arg) if isinstance(arg, string_types) else arg for arg in args] return Tuple(args) class Token(Basic): """ Base class for the AST types. Defining fields are set in ``__slots__``. Attributes (defined in __slots__) are only allowed to contain instances of Basic (unless atomic, see ``String``). The arguments to ``__new__()`` correspond to the attributes in the order defined in ``__slots__`. The ``defaults`` class attribute is a dictionary mapping attribute names to their default values. Subclasses should not need to override the ``__new__()`` method. They may define a class or static method named ``_construct_<attr>`` for each attribute to process the value passed to ``__new__()``. Attributes listed in the class attribute ``not_in_args`` are not passed to :class:`sympy.Basic`. """ __slots__ = [] defaults = {} not_in_args = [] indented_args = ['body'] @property def is_Atom(self): return len(self.__slots__) == 0 @classmethod def _get_constructor(cls, attr): """ Get the constructor function for an attribute by name. """ return getattr(cls, '_construct_%s' % attr, lambda x: x) @classmethod def _construct(cls, attr, arg): """ Construct an attribute value from argument passed to ``__new__()``. """ if arg == None: # Must be "== None", cannot be "is None" return cls.defaults.get(attr, none) else: if isinstance(arg, Dummy): # sympy's replace uses Dummy instances return arg else: return cls._get_constructor(attr)(arg) def __new__(cls, args, *kwargs): # Pass through existing instances when given as sole argument if len(args) == 1 and not kwargs and isinstance(args[0], cls): return args[0] if len(args) > len(cls.__slots__): raise ValueError("Too many arguments (%d), expected at most %d" % (len(args), len(cls.__slots__))) attrvals = [] # Process positional arguments for attrname, argval in zip(cls.__slots__, args): if attrname in kwargs: raise TypeError('Got multiple values for attribute %r' % attrname) attrvals.append(cls._construct(attrname, argval)) # Process keyword arguments for attrname in cls.__slots__[len(args):]: if attrname in kwargs: argval = kwargs.pop(attrname) elif attrname in cls.defaults: argval = cls.defaults[attrname] else: raise TypeError('No value for %r given and attribute has no default' % attrname) attrvals.append(cls._construct(attrname, argval)) if kwargs: raise ValueError("Unknown keyword arguments: %s" % ' '.join(kwargs)) # Parent constructor basic_args = [ val for attr, val in zip(cls.__slots__, attrvals) if attr not in cls.not_in_args ] obj = Basic.__new__(cls, basic_args) # Set attributes for attr, arg in zip(cls.__slots__, attrvals): setattr(obj, attr, arg) return obj def __eq__(self, other): if not isinstance(other, self.__class__): return False for attr in self.__slots__: if getattr(self, attr) != getattr(other, attr): return False return True def _hashable_content(self): return tuple([getattr(self, attr) for attr in self.__slots__]) def __hash__(self): return super(Token, self).__hash__() def _joiner(self, k, indent_level): return (',\n' + ' 'indent_level) if k in self.indented_args else ', ' def _indented(self, printer, k, v, args, *kwargs): il = printer._context['indent_level'] def _print(arg): if isinstance(arg, Token): return printer._print(arg, args, joiner=self._joiner(k, il), *kwargs) else: return printer._print(v, args, *kwargs) if isinstance(v, Tuple): joined = self._joiner(k, il).join([_print(arg) for arg in v.args]) if k in self.indented_args: return '(\n' + ' 'il + joined + ',\n' + ' '(il - 4) + ')' else: return ('({0},)' if len(v.args) == 1 else '({0})').format(joined) else: return _print(v) def _sympyrepr(self, printer, args, *kwargs): from sympy.printing.printer import printer_context exclude = kwargs.get('exclude', ()) values = [getattr(self, k) for k in self.__slots__] indent_level = printer._context.get('indent_level', 0) joiner = kwargs.pop('joiner', ', ') arg_reprs = [] for i, (attr, value) in enumerate(zip(self.__slots__, values)): if attr in exclude: continue # Skip attributes which have the default value if attr in self.defaults and value == self.defaults[attr]: continue ilvl = indent_level + 4 if attr in self.indented_args else 0 with printer_context(printer, indent_level=ilvl): indented = self._indented(printer, attr, value, args, *kwargs) arg_reprs.append(('{1}' if i == 0 else '{0}={1}').format(attr, indented.lstrip())) return "{0}({1})".format(self.__class__.__name__, joiner.join(arg_reprs)) _sympystr = _sympyrepr def __repr__(self): # sympy.core.Basic.__repr__ uses sstr from sympy.printing import srepr return srepr(self) def kwargs(self, exclude=(), apply=None): """ Get instance's attributes as dict of keyword arguments. Parameters ========== exclude : collection of str Collection of keywords to exclude. apply : callable, optional Function to apply to all values. """ kwargs = {k: getattr(self, k) for k in self.__slots__ if k not in exclude} if apply is not None: return {k: apply(v) for k, v in kwargs.items()} else: return kwargs class BreakToken(Token): """ Represents 'break' in C/Python ('exit' in Fortran). Use the premade instance ``break_`` or instantiate manually. Examples ======== >>> from sympy.printing import ccode, fcode >>> from sympy.codegen.ast import break_ >>> ccode(break_) 'break' >>> fcode(break_, source_format='free') 'exit' """ break_ = BreakToken() class ContinueToken(Token): """ Represents 'continue' in C/Python ('cycle' in Fortran) Use the premade instance ``continue_`` or instantiate manually. Examples ======== >>> from sympy.printing import ccode, fcode >>> from sympy.codegen.ast import continue_ >>> ccode(continue_) 'continue' >>> fcode(continue_, source_format='free') 'cycle' """ continue_ = ContinueToken() class NoneToken(Token): """ The AST equivalence of Python's NoneType The corresponding instance of Python's ``None`` is ``none``. Examples ======== >>> from sympy.codegen.ast import none, Variable >>> from sympy.printing.pycode import pycode >>> print(pycode(Variable('x').as_Declaration(value=none))) x = None """ def __eq__(self, other): return other is None or isinstance(other, NoneToken) def _hashable_content(self): return () def __hash__(self): return super(NoneToken, self).__hash__() none = NoneToken() class AssignmentBase(Basic): """ Abstract base class for Assignment and AugmentedAssignment. Attributes: =========== op : str Symbol for assignment operator, e.g. "=", "+=", etc. """ def __new__(cls, lhs, rhs): lhs = _sympify(lhs) rhs = _sympify(rhs) cls._check_args(lhs, rhs) return super(AssignmentBase, cls).__new__(cls, lhs, rhs) @property def lhs(self): return self.args[0] @property def rhs(self): return self.args[1] @classmethod def _check_args(cls, lhs, rhs): """ Check arguments to __new__ and raise exception if any problems found. Derived classes may wish to override this. """ from sympy.matrices.expressions.matexpr import ( MatrixElement, MatrixSymbol) from sympy.tensor.indexed import Indexed # Tuple of things that can be on the lhs of an assignment assignable = (Symbol, MatrixSymbol, MatrixElement, Indexed, Element, Variable) if not isinstance(lhs, assignable): raise TypeError("Cannot assign to lhs of type %s." % type(lhs)) # Indexed types implement shape, but don't define it until later. This # causes issues in assignment validation. For now, matrices are defined # as anything with a shape that is not an Indexed lhs_is_mat = hasattr(lhs, 'shape') and not isinstance(lhs, Indexed) rhs_is_mat = hasattr(rhs, 'shape') and not isinstance(rhs, Indexed) # If lhs and rhs have same structure, then this assignment is ok if lhs_is_mat: if not rhs_is_mat: raise ValueError("Cannot assign a scalar to a matrix.") elif lhs.shape != rhs.shape: raise ValueError("Dimensions of lhs and rhs don't align.") elif rhs_is_mat and not lhs_is_mat: raise ValueError("Cannot assign a matrix to a scalar.") class Assignment(AssignmentBase): """ Represents variable assignment for code generation. Parameters ========== lhs : Expr Sympy object representing the lhs of the expression. These should be singular objects, such as one would use in writing code. Notable types include Symbol, MatrixSymbol, MatrixElement, and Indexed. Types that subclass these types are also supported. rhs : Expr Sympy object representing the rhs of the expression. This can be any type, provided its shape corresponds to that of the lhs. For example, a Matrix type can be assigned to MatrixSymbol, but not to Symbol, as the dimensions will not align. Examples ======== >>> from sympy import symbols, MatrixSymbol, Matrix >>> from sympy.codegen.ast import Assignment >>> x, y, z = symbols('x, y, z') >>> Assignment(x, y) Assignment(x, y) >>> Assignment(x, 0) Assignment(x, 0) >>> A = MatrixSymbol('A', 1, 3) >>> mat = Matrix([x, y, z]).T >>> Assignment(A, mat) Assignment(A, Matrix([[x, y, z]])) >>> Assignment(A[0, 1], x) Assignment(A[0, 1], x) """ op = ':=' class AugmentedAssignment(AssignmentBase): """ Base class for augmented assignments. Attributes: =========== binop : str Symbol for binary operation being applied in the assignment, such as "+", "", etc. """ @property def op(self): return self.binop + '=' class AddAugmentedAssignment(AugmentedAssignment): binop = '+' class SubAugmentedAssignment(AugmentedAssignment): binop = '-' class MulAugmentedAssignment(AugmentedAssignment): binop = '' class DivAugmentedAssignment(AugmentedAssignment): binop = '/' class ModAugmentedAssignment(AugmentedAssignment): binop = '%' # Mapping from binary op strings to AugmentedAssignment subclasses augassign_classes = { cls.binop: cls for cls in [ AddAugmentedAssignment, SubAugmentedAssignment, MulAugmentedAssignment, DivAugmentedAssignment, ModAugmentedAssignment ] } def aug_assign(lhs, op, rhs): """ Create 'lhs op= rhs'. Represents augmented variable assignment for code generation. This is a convenience function. You can also use the AugmentedAssignment classes directly, like AddAugmentedAssignment(x, y). Parameters ========== lhs : Expr Sympy object representing the lhs of the expression. These should be singular objects, such as one would use in writing code. Notable types include Symbol, MatrixSymbol, MatrixElement, and Indexed. Types that subclass these types are also supported. op : str Operator (+, -, /, \\, %). rhs : Expr Sympy object representing the rhs of the expression. This can be any type, provided its shape corresponds to that of the lhs. For example, a Matrix type can be assigned to MatrixSymbol, but not to Symbol, as the dimensions will not align. Examples ======== >>> from sympy import symbols >>> from sympy.codegen.ast import aug_assign >>> x, y = symbols('x, y') >>> aug_assign(x, '+', y) AddAugmentedAssignment(x, y) """ if op not in augassign_classes: raise ValueError("Unrecognized operator %s" % op) return augassign_classes[op](lhs, rhs) class CodeBlock(Basic): """ Represents a block of code For now only assignments are supported. This restriction will be lifted in the future. Useful attributes on this object are: ``left_hand_sides``: Tuple of left-hand sides of assignments, in order. ``left_hand_sides``: Tuple of right-hand sides of assignments, in order. ``free_symbols``: Free symbols of the expressions in the right-hand sides which do not appear in the left-hand side of an assignment. Useful methods on this object are: ``topological_sort``: Class method. Return a CodeBlock with assignments sorted so that variables are assigned before they are used. ``cse``: Return a new CodeBlock with common subexpressions eliminated and pulled out as assignments. Examples ======== >>> from sympy import symbols, ccode >>> from sympy.codegen.ast import CodeBlock, Assignment >>> x, y = symbols('x y') >>> c = CodeBlock(Assignment(x, 1), Assignment(y, x + 1)) >>> print(ccode(c)) x = 1; y = x + 1; """ def __new__(cls, args): left_hand_sides = [] right_hand_sides = [] for i in args: if isinstance(i, Assignment): lhs, rhs = i.args left_hand_sides.append(lhs) right_hand_sides.append(rhs) obj = Basic.__new__(cls, args) obj.left_hand_sides = Tuple(left_hand_sides) obj.right_hand_sides = Tuple(right_hand_sides) return obj def __iter__(self): return iter(self.args) def _sympyrepr(self, printer, args, kwargs): il = printer._context.get('indent_level', 0) joiner = ',\n' + ' 'il joined = joiner.join(map(printer._print, self.args)) return ('{0}(\n'.format(' '(il-4) + self.__class__.__name__,) + ' 'il + joined + '\n' + ' '(il - 4) + ')') _sympystr = _sympyrepr @property def free_symbols(self): return super(CodeBlock, self).free_symbols - set(self.left_hand_sides) @classmethod def topological_sort(cls, assignments): """ Return a CodeBlock with topologically sorted assignments so that variables are assigned before they are used. The existing order of assignments is preserved as much as possible. This function assumes that variables are assigned to only once. This is a class constructor so that the default constructor for CodeBlock can error when variables are used before they are assigned. Examples ======== >>> from sympy import symbols >>> from sympy.codegen.ast import CodeBlock, Assignment >>> x, y, z = symbols('x y z') >>> assignments = [ ... Assignment(x, y + z), ... Assignment(y, z + 1), ... Assignment(z, 2), ... ] >>> CodeBlock.topological_sort(assignments) CodeBlock( Assignment(z, 2), Assignment(y, z + 1), Assignment(x, y + z) ) """ from sympy.utilities.iterables import topological_sort if not all(isinstance(i, Assignment) for i in assignments): # Will support more things later raise NotImplementedError("CodeBlock.topological_sort only supports Assignments") if any(isinstance(i, AugmentedAssignment) for i in assignments): raise NotImplementedError("CodeBlock.topological_sort doesn't yet work with AugmentedAssignments") # Create a graph where the nodes are assignments and there is a directed edge # between nodes that use a variable and nodes that assign that # variable, like # [(x := 1, y := x + 1), (x := 1, z := y + z), (y := x + 1, z := y + z)] # If we then topologically sort these nodes, they will be in # assignment order, like # x := 1 # y := x + 1 # z := y + z # A = The nodes # # enumerate keeps nodes in the same order they are already in if # possible. It will also allow us to handle duplicate assignments to # the same variable when those are implemented. A = list(enumerate(assignments)) # var_map = {variable: [nodes for which this variable is assigned to]} # like {x: [(1, x := y + z), (4, x := 2 w)], ...} var_map = defaultdict(list) for node in A: i, a = node var_map[a.lhs].append(node) # E = Edges in the graph E = [] for dst_node in A: i, a = dst_node for s in a.rhs.free_symbols: for src_node in var_map[s]: E.append((src_node, dst_node)) ordered_assignments = topological_sort([A, E]) # De-enumerate the result return cls([a for i, a in ordered_assignments]) def cse(self, symbols=None, optimizations=None, postprocess=None, order='canonical'): """ Return a new code block with common subexpressions eliminated See the docstring of :func:`sympy.simplify.cse_main.cse` for more information. Examples ======== >>> from sympy import symbols, sin >>> from sympy.codegen.ast import CodeBlock, Assignment >>> x, y, z = symbols('x y z') >>> c = CodeBlock( ... Assignment(x, 1), ... Assignment(y, sin(x) + 1), ... Assignment(z, sin(x) - 1), ... ) ... >>> c.cse() CodeBlock( Assignment(x, 1), Assignment(x0, sin(x)), Assignment(y, x0 + 1), Assignment(z, x0 - 1) ) """ from sympy.simplify.cse_main import cse from sympy.utilities.iterables import numbered_symbols, filter_symbols # Check that the CodeBlock only contains assignments to unique variables if not all(isinstance(i, Assignment) for i in self.args): # Will support more things later raise NotImplementedError("CodeBlock.cse only supports Assignments") if any(isinstance(i, AugmentedAssignment) for i in self.args): raise NotImplementedError("CodeBlock.cse doesn't yet work with AugmentedAssignments") for i, lhs in enumerate(self.left_hand_sides): if lhs in self.left_hand_sides[:i]: raise NotImplementedError("Duplicate assignments to the same " "variable are not yet supported (%s)" % lhs) # Ensure new symbols for subexpressions do not conflict with existing existing_symbols = self.atoms(Symbol) if symbols is None: symbols = numbered_symbols() symbols = filter_symbols(symbols, existing_symbols) replacements, reduced_exprs = cse(list(self.right_hand_sides), symbols=symbols, optimizations=optimizations, postprocess=postprocess, order=order) new_block = [Assignment(var, expr) for var, expr in zip(self.left_hand_sides, reduced_exprs)] new_assignments = [Assignment(var, expr) for var, expr in replacements] return self.topological_sort(new_assignments + new_block) class For(Token): """Represents a 'for-loop' in the code. Expressions are of the form: "for target in iter: body..." Parameters ========== target : symbol iter : iterable body : CodeBlock or iterable ! When passed an iterable it is used to instantiate a CodeBlock. Examples ======== >>> from sympy import symbols, Range >>> from sympy.codegen.ast import aug_assign, For >>> x, i, j, k = symbols('x i j k') >>> for_i = For(i, Range(10), [aug_assign(x, '+', ijk)]) >>> for_i # doctest: -NORMALIZE_WHITESPACE For(i, iterable=Range(0, 10, 1), body=CodeBlock( AddAugmentedAssignment(x, ijk) )) >>> for_ji = For(j, Range(7), [for_i]) >>> for_ji # doctest: -NORMALIZE_WHITESPACE For(j, iterable=Range(0, 7, 1), body=CodeBlock( For(i, iterable=Range(0, 10, 1), body=CodeBlock( AddAugmentedAssignment(x, ijk) )) )) >>> for_kji =For(k, Range(5), [for_ji]) >>> for_kji # doctest: -NORMALIZE_WHITESPACE For(k, iterable=Range(0, 5, 1), body=CodeBlock( For(j, iterable=Range(0, 7, 1), body=CodeBlock( For(i, iterable=Range(0, 10, 1), body=CodeBlock( AddAugmentedAssignment(x, ijk) )) )) )) """ __slots__ = ['target', 'iterable', 'body'] _construct_target = staticmethod(_sympify) @classmethod def _construct_body(cls, itr): if isinstance(itr, CodeBlock): return itr else: return CodeBlock(itr) @classmethod def _construct_iterable(cls, itr): if not iterable(itr): raise TypeError("iterable must be an iterable") if isinstance(itr, list): # _sympify errors on lists because they are mutable itr = tuple(itr) return _sympify(itr) class String(Token): """ SymPy object representing a string. Atomic object which is not an expression (as opposed to Symbol). Parameters ========== text : str Examples ======== >>> from sympy.codegen.ast import String >>> f = String('foo') >>> f foo >>> str(f) 'foo' >>> f.text 'foo' >>> print(repr(f)) String('foo') """ __slots__ = ['text'] not_in_args = ['text'] is_Atom = True @classmethod def _construct_text(cls, text): if not isinstance(text, string_types): raise TypeError("Argument text is not a string type.") return text def _sympystr(self, printer, args, kwargs): return self.text class QuotedString(String): """ Represents a string which should be printed with quotes. """ class Comment(String): """ Represents a comment. """ class Node(Token): """ Subclass of Token, carrying the attribute 'attrs' (Tuple) Examples ======== >>> from sympy.codegen.ast import Node, value_const, pointer_const >>> n1 = Node([value_const]) >>> n1.attr_params('value_const') # get the parameters of attribute (by name) () >>> from sympy.codegen.fnodes import dimension >>> n2 = Node([value_const, dimension(5, 3)]) >>> n2.attr_params(value_const) # get the parameters of attribute (by Attribute instance) () >>> n2.attr_params('dimension') # get the parameters of attribute (by name) (5, 3) >>> n2.attr_params(pointer_const) is None True """ __slots__ = ['attrs'] defaults = {'attrs': Tuple()} _construct_attrs = staticmethod(_mk_Tuple) def attr_params(self, looking_for): """ Returns the parameters of the Attribute with name ``looking_for`` in self.attrs """ for attr in self.attrs: if str(attr.name) == str(looking_for): return attr.parameters class Type(Token): """ Represents a type. The naming is a super-set of NumPy naming. Type has a classmethod ``from_expr`` which offer type deduction. It also has a method ``cast_check`` which casts the argument to its type, possibly raising an exception if rounding error is not within tolerances, or if the value is not representable by the underlying data type (e.g. unsigned integers). Parameters ========== name : str Name of the type, e.g. ``object``, ``int16``, ``float16`` (where the latter two would use the ``Type`` sub-classes ``IntType`` and ``FloatType`` respectively). If a ``Type`` instance is given, the said instance is returned. Examples ======== >>> from sympy.codegen.ast import Type >>> t = Type.from_expr(42) >>> t integer >>> print(repr(t)) IntBaseType(String('integer')) >>> from sympy.codegen.ast import uint8 >>> uint8.cast_check(-1) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Minimum value for data type bigger than new value. >>> from sympy.codegen.ast import float32 >>> v6 = 0.123456 >>> float32.cast_check(v6) 0.123456 >>> v10 = 12345.67894 >>> float32.cast_check(v10) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Casting gives a significantly different value. >>> boost_mp50 = Type('boost::multiprecision::cpp_dec_float_50') >>> from sympy import Symbol >>> from sympy.printing.cxxcode import cxxcode >>> from sympy.codegen.ast import Declaration, Variable >>> cxxcode(Declaration(Variable('x', type=boost_mp50))) 'boost::multiprecision::cpp_dec_float_50 x' References ========== .. [1] https://docs.scipy.org/doc/numpy/user/basics.types.html """ __slots__ = ['name'] _construct_name = String def _sympystr(self, printer, args, *kwargs): return str(self.name) @classmethod def from_expr(cls, expr): """ Deduces type from an expression or a ``Symbol``. Parameters ========== expr : number or SymPy object The type will be deduced from type or properties. Examples ======== >>> from sympy.codegen.ast import Type, integer, complex_ >>> Type.from_expr(2) == integer True >>> from sympy import Symbol >>> Type.from_expr(Symbol('z', complex=True)) == complex_ True >>> Type.from_expr(sum) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Could not deduce type from expr. Raises ====== ValueError when type deduction fails. """ if isinstance(expr, (float, Float)): return real if isinstance(expr, (int, Integer)) or getattr(expr, 'is_integer', False): return integer if getattr(expr, 'is_real', False): return real if isinstance(expr, complex) or getattr(expr, 'is_complex', False): return complex_ if isinstance(expr, bool) or getattr(expr, 'is_Relational', False): return bool_ else: raise ValueError("Could not deduce type from expr.") def _check(self, value): pass def cast_check(self, value, rtol=None, atol=0, limits=None, precision_targets=None): """ Casts a value to the data type of the instance. Parameters ========== value : number rtol : floating point number Relative tolerance. (will be deduced if not given). atol : floating point number Absolute tolerance (in addition to ``rtol``). limits : dict Values given by ``limits.h``, x86/IEEE754 defaults if not given. Default: :attr:`default_limits`. type_aliases : dict Maps substitutions for Type, e.g. {integer: int64, real: float32} Examples ======== >>> from sympy.codegen.ast import Type, integer, float32, int8 >>> integer.cast_check(3.0) == 3 True >>> float32.cast_check(1e-40) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Minimum value for data type bigger than new value. >>> int8.cast_check(256) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Maximum value for data type smaller than new value. >>> v10 = 12345.67894 >>> float32.cast_check(v10) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Casting gives a significantly different value. >>> from sympy.codegen.ast import float64 >>> float64.cast_check(v10) 12345.67894 >>> from sympy import Float >>> v18 = Float('0.123456789012345646') >>> float64.cast_check(v18) Traceback (most recent call last): ... ValueError: Casting gives a significantly different value. >>> from sympy.codegen.ast import float80 >>> float80.cast_check(v18) 0.123456789012345649 """ val = sympify(value) ten = Integer(10) exp10 = getattr(self, 'decimal_dig', None) if rtol is None: rtol = 1e-15 if exp10 is None else 2.0ten*(-exp10) def tol(num): return atol + rtolabs(num) new_val = self.cast_nocheck(value) self._check(new_val) delta = new_val - val if abs(delta) > tol(val): # rounding, e.g. int(3.5) != 3.5 raise ValueError("Casting gives a significantly different value.") return new_val class IntBaseType(Type): """ Integer base type, contains no size information. """ __slots__ = ['name'] cast_nocheck = lambda self, i: Integer(int(i)) class _SizedIntType(IntBaseType): __slots__ = ['name', 'nbits'] _construct_nbits = Integer def _check(self, value): if value < self.min: raise ValueError("Value is too small: %d < %d" % (value, self.min)) if value > self.max: raise ValueError("Value is too big: %d > %d" % (value, self.max)) class SignedIntType(_SizedIntType): """ Represents a signed integer type. """ @property def min(self): return -2(self.nbits-1) @property def max(self): return 2(self.nbits-1) - 1 class UnsignedIntType(_SizedIntType): """ Represents an unsigned integer type. """ @property def min(self): return 0 @property def max(self): return 2self.nbits - 1 two = Integer(2) class FloatBaseType(Type): """ Represents a floating point number type. """ cast_nocheck = Float class FloatType(FloatBaseType): """ Represents a floating point type with fixed bit width. Base 2 & one sign bit is assumed. Parameters ========== name : str Name of the type. nbits : integer Number of bits used (storage). nmant : integer Number of bits used to represent the mantissa. nexp : integer Number of bits used to represent the mantissa. Examples ======== >>> from sympy import S, Float >>> from sympy.codegen.ast import FloatType >>> half_precision = FloatType('f16', nbits=16, nmant=10, nexp=5) >>> half_precision.max 65504 >>> half_precision.tiny == S(2)-14 True >>> half_precision.eps == S(2)-10 True >>> half_precision.dig == 3 True >>> half_precision.decimal_dig == 5 True >>> half_precision.cast_check(1.0) 1.0 >>> half_precision.cast_check(1e5) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Maximum value for data type smaller than new value. """ __slots__ = ['name', 'nbits', 'nmant', 'nexp'] _construct_nbits = _construct_nmant = _construct_nexp = Integer @property def max_exponent(self): """ The largest positive number n, such that 2(n - 1) is a representable finite value. """ # cf. C++'s ``std::numeric_limits::max_exponent`` return two(self.nexp - 1) @property def min_exponent(self): """ The lowest negative number n, such that 2(n - 1) is a valid normalized number. """ # cf. C++'s ``std::numeric_limits::min_exponent`` return 3 - self.max_exponent @property def max(self): """ Maximum value representable. """ return (1 - two*-(self.nmant+1))twoself.max_exponent @property def tiny(self): """ The minimum positive normalized value. """ # See C macros: FLT_MIN, DBL_MIN, LDBL_MIN # or C++'s ``std::numeric_limits::min`` # or numpy.finfo(dtype).tiny return two(self.min_exponent - 1) @property def eps(self): """ Difference between 1.0 and the next representable value. """ return two*(-self.nmant) @property def dig(self): """ Number of decimal digits that are guaranteed to be preserved in text. When converting text -> float -> text, you are guaranteed that at least ``dig`` number of digits are preserved with respect to rounding or overflow. """ from sympy.functions import floor, log return floor(self.nmant log(2)/log(10)) @property def decimal_dig(self): """ Number of digits needed to store & load without loss. Number of decimal digits needed to guarantee that two consecutive conversions (float -> text -> float) to be idempotent. This is useful when one do not want to loose precision due to rounding errors when storing a floating point value as text. """ from sympy.functions import ceiling, log return ceiling((self.nmant + 1) * log(2)/log(10) + 1) def cast_nocheck(self, value): """ Casts without checking if out of bounds or subnormal. """ if value == oo: # float(oo) or oo return float(oo) elif value == -oo: # float(-oo) or -oo return float(-oo) return Float(str(sympify(value).evalf(self.decimal_dig)), self.decimal_dig) def _check(self, value): if value < -self.max: raise ValueError("Value is too small: %d < %d" % (value, -self.max)) if value > self.max: raise ValueError("Value is too big: %d > %d" % (value, self.max)) if abs(value) < self.tiny: raise ValueError("Smallest (absolute) value for data type bigger than new value.") class ComplexBaseType(FloatBaseType): def cast_nocheck(self, value): """ Casts without checking if out of bounds or subnormal. """ from sympy.functions import re, im return ( super(ComplexBaseType, self).cast_nocheck(re(value)) + super(ComplexBaseType, self).cast_nocheck(im(value))1j ) def _check(self, value): from sympy.functions import re, im super(ComplexBaseType, self)._check(re(value)) super(ComplexBaseType, self)._check(im(value)) class ComplexType(ComplexBaseType, FloatType): """ Represents a complex floating point number. """ # NumPy types: intc = IntBaseType('intc') intp = IntBaseType('intp') int8 = SignedIntType('int8', 8) int16 = SignedIntType('int16', 16) int32 = SignedIntType('int32', 32) int64 = SignedIntType('int64', 64) uint8 = UnsignedIntType('uint8', 8) uint16 = UnsignedIntType('uint16', 16) uint32 = UnsignedIntType('uint32', 32) uint64 = UnsignedIntType('uint64', 64) float16 = FloatType('float16', 16, nexp=5, nmant=10) # IEEE 754 binary16, Half precision float32 = FloatType('float32', 32, nexp=8, nmant=23) # IEEE 754 binary32, Single precision float64 = FloatType('float64', 64, nexp=11, nmant=52) # IEEE 754 binary64, Double precision float80 = FloatType('float80', 80, nexp=15, nmant=63) # x86 extended precision (1 integer part bit), "long double" float128 = FloatType('float128', 128, nexp=15, nmant=112) # IEEE 754 binary128, Quadruple precision float256 = FloatType('float256', 256, nexp=19, nmant=236) # IEEE 754 binary256, Octuple precision complex64 = ComplexType('complex64', nbits=64, float32.kwargs(exclude=('name', 'nbits'))) complex128 = ComplexType('complex128', nbits=128, float64.kwargs(exclude=('name', 'nbits'))) # Generic types (precision may be chosen by code printers): untyped = Type('untyped') real = FloatBaseType('real') integer = IntBaseType('integer') complex_ = ComplexBaseType('complex') bool_ = Type('bool') class Attribute(Token): """ Attribute (possibly parametrized) For use with :class:`sympy.codegen.ast.Node` (which takes instances of ``Attribute`` as ``attrs``). Parameters ========== name : str parameters : Tuple Examples ======== >>> from sympy.codegen.ast import Attribute >>> volatile = Attribute('volatile') >>> volatile volatile >>> print(repr(volatile)) Attribute(String('volatile')) >>> a = Attribute('foo', [1, 2, 3]) >>> a foo(1, 2, 3) >>> a.parameters == (1, 2, 3) True """ __slots__ = ['name', 'parameters'] defaults = {'parameters': Tuple()} _construct_name = String _construct_parameters = staticmethod(_mk_Tuple) def _sympystr(self, printer, args, *kwargs): result = str(self.name) if self.parameters: result += '(%s)' % ', '.join(map(lambda arg: printer._print( arg, args, kwargs), self.parameters)) return result value_const = Attribute('value_const') pointer_const = Attribute('pointer_const') class Variable(Node): """ Represents a variable Parameters ========== symbol : Symbol type : Type (optional) Type of the variable. attrs : iterable of Attribute instances Will be stored as a Tuple. Examples ======== >>> from sympy import Symbol >>> from sympy.codegen.ast import Variable, float32, integer >>> x = Symbol('x') >>> v = Variable(x, type=float32) >>> v.attrs () >>> v == Variable('x') False >>> v == Variable('x', type=float32) True >>> v Variable(x, type=float32) One may also construct a ``Variable`` instance with the type deduced from assumptions about the symbol using the ``deduced`` classmethod: >>> i = Symbol('i', integer=True) >>> v = Variable.deduced(i) >>> v.type == integer True >>> v == Variable('i') False >>> from sympy.codegen.ast import value_const >>> value_const in v.attrs False >>> w = Variable('w', attrs=[value_const]) >>> w Variable(w, attrs=(value_const,)) >>> value_const in w.attrs True >>> w.as_Declaration(value=42) Declaration(Variable(w, value=42, attrs=(value_const,))) """ __slots__ = ['symbol', 'type', 'value'] + Node.__slots__ defaults = dict(chain(Node.defaults.items(), { 'type': untyped, 'value': none }.items())) _construct_symbol = staticmethod(sympify) _construct_value = staticmethod(sympify) @classmethod def deduced(cls, symbol, value=None, attrs=Tuple(), cast_check=True): """ Alt. constructor with type deduction from ``Type.from_expr``. Deduces type primarily from ``symbol``, secondarily from ``value``. Parameters ========== symbol : Symbol value : expr (optional) value of the variable. attrs : iterable of Attribute instances cast_check : bool Whether to apply ``Type.cast_check`` on ``value``. Examples ======== >>> from sympy import Symbol >>> from sympy.codegen.ast import Variable, complex_ >>> n = Symbol('n', integer=True) >>> str(Variable.deduced(n).type) 'integer' >>> x = Symbol('x', real=True) >>> v = Variable.deduced(x) >>> v.type real >>> z = Symbol('z', complex=True) >>> Variable.deduced(z).type == complex_ True """ if isinstance(symbol, Variable): return symbol try: type_ = Type.from_expr(symbol) except ValueError: type_ = Type.from_expr(value) if value is not None and cast_check: value = type_.cast_check(value) return cls(symbol, type=type_, value=value, attrs=attrs) def as_Declaration(self, kwargs): """ Convenience method for creating a Declaration instance. If the variable of the Declaration need to wrap a modified variable keyword arguments may be passed (overriding e.g. the ``value`` of the Variable instance). Examples ======== >>> from sympy.codegen.ast import Variable >>> x = Variable('x') >>> decl1 = x.as_Declaration() >>> decl1.variable.value == None True >>> decl2 = x.as_Declaration(value=42.0) >>> decl2.variable.value == 42 True """ kw = self.kwargs() kw.update(kwargs) return Declaration(self.func(*kw)) def _relation(self, rhs, op): try: rhs = _sympify(rhs) except SympifyError: raise TypeError("Invalid comparison %s < %s" % (self, rhs)) return op(self, rhs, evaluate=False) __lt__ = lambda self, other: self._relation(other, Lt) __le__ = lambda self, other: self._relation(other, Le) __ge__ = lambda self, other: self._relation(other, Ge) __gt__ = lambda self, other: self._relation(other, Gt) class Pointer(Variable): """ Represents a pointer. See ``Variable``. Examples ======== Can create instances of ``Element``: >>> from sympy import Symbol >>> from sympy.codegen.ast import Pointer >>> i = Symbol('i', integer=True) >>> p = Pointer('x') >>> p[i+1] Element(x, indices=((i + 1,),)) """ def __getitem__(self, key): try: return Element(self.symbol, key) except TypeError: return Element(self.symbol, (key,)) class Element(Token): """ Element in (a possibly N-dimensional) array. Examples ======== >>> from sympy.codegen.ast import Element >>> elem = Element('x', 'ijk') >>> elem.symbol.name == 'x' True >>> elem.indices (i, j, k) >>> from sympy import ccode >>> ccode(elem) 'x[i][j][k]' >>> ccode(Element('x', 'ijk', strides='lmn', offset='o')) 'x[il + jm + kn + o]' """ __slots__ = ['symbol', 'indices', 'strides', 'offset'] defaults = {'strides': none, 'offset': none} _construct_symbol = staticmethod(sympify) _construct_indices = staticmethod(lambda arg: Tuple(arg)) _construct_strides = staticmethod(lambda arg: Tuple(arg)) _construct_offset = staticmethod(sympify) class Declaration(Token): """ Represents a variable declaration Parameters ========== variable : Variable Examples ======== >>> from sympy import Symbol >>> from sympy.codegen.ast import Declaration, Type, Variable, integer, untyped >>> z = Declaration('z') >>> z.variable.type == untyped True >>> z.variable.value == None True """ __slots__ = ['variable'] _construct_variable = Variable class While(Token): """ Represents a 'for-loop' in the code. Expressions are of the form: "while condition: body..." Parameters ========== condition : expression convertible to Boolean body : CodeBlock or iterable When passed an iterable it is used to instantiate a CodeBlock. Examples ======== >>> from sympy import symbols, Gt, Abs >>> from sympy.codegen import aug_assign, Assignment, While >>> x, dx = symbols('x dx') >>> expr = 1 - x*2 >>> whl = While(Gt(Abs(dx), 1e-9), [ ... Assignment(dx, -expr/expr.diff(x)), ... aug_assign(x, '+', dx) ... ]) """ __slots__ = ['condition', 'body'] _construct_condition = staticmethod(lambda cond: _sympify(cond)) @classmethod def _construct_body(cls, itr): if isinstance(itr, CodeBlock): return itr else: return CodeBlock(itr) class Scope(Token): """ Represents a scope in the code. Parameters ========== body : CodeBlock or iterable When passed an iterable it is used to instantiate a CodeBlock. """ __slots__ = ['body'] @classmethod def _construct_body(cls, itr): if isinstance(itr, CodeBlock): return itr else: return CodeBlock(itr) class Stream(Token): """ Represents a stream. There are two predefined Stream instances ``stdout`` & ``stderr``. Parameters ========== name : str Examples ======== >>> from sympy import Symbol >>> from sympy.printing.pycode import pycode >>> from sympy.codegen.ast import Print, stderr, QuotedString >>> print(pycode(Print(['x'], file=stderr))) print(x, file=sys.stderr) >>> x = Symbol('x') >>> print(pycode(Print([QuotedString('x')], file=stderr))) # print literally "x" print("x", file=sys.stderr) """ __slots__ = ['name'] _construct_name = String stdout = Stream('stdout') stderr = Stream('stderr') class Print(Token): """ Represents print command in the code. Parameters ========== formatstring : str args : Basic instances (or convertible to such through sympify) Examples ======== >>> from sympy.codegen.ast import Print >>> from sympy.printing.pycode import pycode >>> print(pycode(Print('x y'.split(), "coordinate: %12.5g %12.5g"))) print("coordinate: %12.5g %12.5g" % (x, y)) """ __slots__ = ['print_args', 'format_string', 'file'] defaults = {'format_string': none, 'file': none} _construct_print_args = staticmethod(_mk_Tuple) _construct_format_string = QuotedString _construct_file = Stream class FunctionPrototype(Node): """ Represents a function prototype Allows the user to generate forward declaration in e.g. C/C++. Parameters ========== return_type : Type name : str parameters: iterable of Variable instances attrs : iterable of Attribute instances Examples ======== >>> from sympy import symbols >>> from sympy.codegen.ast import real, FunctionPrototype >>> from sympy.printing.ccode import ccode >>> x, y = symbols('x y', real=True) >>> fp = FunctionPrototype(real, 'foo', [x, y]) >>> ccode(fp) 'double foo(double x, double y)' """ __slots__ = ['return_type', 'name', 'parameters', 'attrs'] _construct_return_type = Type _construct_name = String @staticmethod def _construct_parameters(args): def _var(arg): if isinstance(arg, Declaration): return arg.variable elif isinstance(arg, Variable): return arg else: return Variable.deduced(arg) return Tuple(map(_var, args)) @classmethod def from_FunctionDefinition(cls, func_def): if not isinstance(func_def, FunctionDefinition): raise TypeError("func_def is not an instance of FunctionDefiniton") return cls(func_def.kwargs(exclude=('body',))) class FunctionDefinition(FunctionPrototype): """ Represents a function definition in the code. Parameters ========== return_type : Type name : str parameters: iterable of Variable instances body : CodeBlock or iterable attrs : iterable of Attribute instances Examples ======== >>> from sympy import symbols >>> from sympy.codegen.ast import real, FunctionPrototype >>> from sympy.printing.ccode import ccode >>> x, y = symbols('x y', real=True) >>> fp = FunctionPrototype(real, 'foo', [x, y]) >>> ccode(fp) 'double foo(double x, double y)' >>> from sympy.codegen.ast import FunctionDefinition, Return >>> body = [Return(xy)] >>> fd = FunctionDefinition.from_FunctionPrototype(fp, body) >>> print(ccode(fd)) double foo(double x, double y){ return xy; } """ __slots__ = FunctionPrototype.__slots__[:-1] + ['body', 'attrs'] @classmethod def _construct_body(cls, itr): if isinstance(itr, CodeBlock): return itr else: return CodeBlock(itr) @classmethod def from_FunctionPrototype(cls, func_proto, body): if not isinstance(func_proto, FunctionPrototype): raise TypeError("func_proto is not an instance of FunctionPrototype") return cls(body=body, *func_proto.kwargs()) class Return(Basic): """ Represents a return command in the code. """ class FunctionCall(Token, Expr): """ Represents a call to a function in the code. Parameters ========== name : str function_args : Tuple Examples ======== >>> from sympy.codegen.ast import FunctionCall >>> from sympy.printing.pycode import pycode >>> fcall = FunctionCall('foo', 'bar baz'.split()) >>> print(pycode(fcall)) foo(bar, baz) """ __slots__ = ['name', 'function_args'] _construct_name = String _construct_function_args = staticmethod(lambda args: Tuple(args))
440a0b0a05afada7e935996cfefa821cc3c7097dbeca048a97952499ac06097c	# -- coding: utf-8 -- """ This file contains some classical ciphers and routines implementing a linear-feedback shift register (LFSR) and the Diffie-Hellman key exchange. .. warning:: This module is intended for educational purposes only. Do not use the functions in this module for real cryptographic applications. If you wish to encrypt real data, we recommend using something like the `cryptography <https://cryptography.io/en/latest/>`_ module. """ from __future__ import print_function from string import whitespace, ascii_uppercase as uppercase, printable from sympy import nextprime from sympy.core import Rational, Symbol from sympy.core.numbers import igcdex, mod_inverse from sympy.core.compatibility import range from sympy.matrices import Matrix from sympy.ntheory import isprime, primitive_root from sympy.polys.domains import FF from sympy.polys.polytools import gcd, Poly from sympy.utilities.misc import filldedent, translate from sympy.utilities.iterables import uniq from sympy.utilities.randtest import _randrange, _randint from sympy.utilities.exceptions import SymPyDeprecationWarning def AZ(s=None): """Return the letters of ``s`` in uppercase. In case more than one string is passed, each of them will be processed and a list of upper case strings will be returned. Examples ======== >>> from sympy.crypto.crypto import AZ >>> AZ('Hello, world!') 'HELLOWORLD' >>> AZ('Hello, world!'.split()) ['HELLO', 'WORLD'] See Also ======== check_and_join """ if not s: return uppercase t = type(s) is str if t: s = [s] rv = [check_and_join(i.upper().split(), uppercase, filter=True) for i in s] if t: return rv[0] return rv bifid5 = AZ().replace('J', '') bifid6 = AZ() + '0123456789' bifid10 = printable def padded_key(key, symbols, filter=True): """Return a string of the distinct characters of ``symbols`` with those of ``key`` appearing first, omitting characters in ``key`` that are not in ``symbols``. A ValueError is raised if a) there are duplicate characters in ``symbols`` or b) there are characters in ``key`` that are not in ``symbols``. Examples ======== >>> from sympy.crypto.crypto import padded_key >>> padded_key('PUPPY', 'OPQRSTUVWXY') 'PUYOQRSTVWX' >>> padded_key('RSA', 'ARTIST') Traceback (most recent call last): ... ValueError: duplicate characters in symbols: T """ syms = list(uniq(symbols)) if len(syms) != len(symbols): extra = ''.join(sorted(set( [i for i in symbols if symbols.count(i) > 1]))) raise ValueError('duplicate characters in symbols: %s' % extra) extra = set(key) - set(syms) if extra: raise ValueError( 'characters in key but not symbols: %s' % ''.join( sorted(extra))) key0 = ''.join(list(uniq(key))) return key0 + ''.join([i for i in syms if i not in key0]) def check_and_join(phrase, symbols=None, filter=None): """ Joins characters of `phrase` and if ``symbols`` is given, raises an error if any character in ``phrase`` is not in ``symbols``. Parameters ========== phrase : string or list of strings to be returned as a string symbols : iterable of characters allowed in ``phrase``; if ``symbols`` is None, no checking is performed Examples ======== >>> from sympy.crypto.crypto import check_and_join >>> check_and_join('a phrase') 'a phrase' >>> check_and_join('a phrase'.upper().split()) 'APHRASE' >>> check_and_join('a phrase!'.upper().split(), 'ARE', filter=True) 'ARAE' >>> check_and_join('a phrase!'.upper().split(), 'ARE') Traceback (most recent call last): ... ValueError: characters in phrase but not symbols: "!HPS" """ rv = ''.join(''.join(phrase)) if symbols is not None: symbols = check_and_join(symbols) missing = ''.join(list(sorted(set(rv) - set(symbols)))) if missing: if not filter: raise ValueError( 'characters in phrase but not symbols: "%s"' % missing) rv = translate(rv, None, missing) return rv def _prep(msg, key, alp, default=None): if not alp: if not default: alp = AZ() msg = AZ(msg) key = AZ(key) else: alp = default else: alp = ''.join(alp) key = check_and_join(key, alp, filter=True) msg = check_and_join(msg, alp, filter=True) return msg, key, alp def cycle_list(k, n): """ Returns the elements of the list ``range(n)`` shifted to the left by ``k`` (so the list starts with ``k`` (mod ``n``)). Examples ======== >>> from sympy.crypto.crypto import cycle_list >>> cycle_list(3, 10) [3, 4, 5, 6, 7, 8, 9, 0, 1, 2] """ k = k % n return list(range(k, n)) + list(range(k)) ######## shift cipher examples ############ def encipher_shift(msg, key, symbols=None): """ Performs shift cipher encryption on plaintext msg, and returns the ciphertext. Parameters ========== key : an integer (the secret key) msg : plaintext of upper-case letters Returns ======= ct : ciphertext of upper-case letters ALGORITHM: STEPS: 0. Number the letters of the alphabet from 0, ..., N 1. Compute from the string ``msg`` a list ``L1`` of corresponding integers. 2. Compute from the list ``L1`` a new list ``L2``, given by adding ``(k mod 26)`` to each element in ``L1``. 3. Compute from the list ``L2`` a string ``ct`` of corresponding letters. Examples ======== >>> from sympy.crypto.crypto import encipher_shift, decipher_shift >>> msg = "GONAVYBEATARMY" >>> ct = encipher_shift(msg, 1); ct 'HPOBWZCFBUBSNZ' To decipher the shifted text, change the sign of the key: >>> encipher_shift(ct, -1) 'GONAVYBEATARMY' There is also a convenience function that does this with the original key: >>> decipher_shift(ct, 1) 'GONAVYBEATARMY' Notes ===== The shift cipher is also called the Caesar cipher, after Julius Caesar, who, according to Suetonius, used it with a shift of three to protect messages of military significance. Caesar's nephew Augustus reportedly used a similar cipher, but with a right shift of 1. References ========== .. [1] https://en.wikipedia.org/wiki/Caesar_cipher .. [2] http://mathworld.wolfram.com/CaesarsMethod.html See Also ======== decipher_shift """ msg, _, A = _prep(msg, '', symbols) shift = len(A) - key % len(A) key = A[shift:] + A[:shift] return translate(msg, key, A) def decipher_shift(msg, key, symbols=None): """ Return the text by shifting the characters of ``msg`` to the left by the amount given by ``key``. Examples ======== >>> from sympy.crypto.crypto import encipher_shift, decipher_shift >>> msg = "GONAVYBEATARMY" >>> ct = encipher_shift(msg, 1); ct 'HPOBWZCFBUBSNZ' To decipher the shifted text, change the sign of the key: >>> encipher_shift(ct, -1) 'GONAVYBEATARMY' Or use this function with the original key: >>> decipher_shift(ct, 1) 'GONAVYBEATARMY' """ return encipher_shift(msg, -key, symbols) def encipher_rot13(msg, symbols=None): """ Performs the ROT13 encryption on a given plaintext ``msg``. Notes ===== ROT13 is a substitution cipher which substitutes each letter in the plaintext message for the letter furthest away from it in the English alphabet. Equivalently, it is just a Caeser (shift) cipher with a shift key of 13 (midway point of the alphabet). References ========== .. [1] https://en.wikipedia.org/wiki/ROT13 See Also ======== decipher_rot13 encipher_shift """ return encipher_shift(msg, 13, symbols) def decipher_rot13(msg, symbols=None): """ Performs the ROT13 decryption on a given plaintext ``msg``. Notes ===== ``decipher_rot13`` is equivalent to ``encipher_rot13`` as both ``decipher_shift`` with a key of 13 and ``encipher_shift`` key with a key of 13 will return the same results. Nonetheless, ``decipher_rot13`` has nonetheless been explicitly defined here for consistency. Examples ======== >>> from sympy.crypto.crypto import encipher_rot13, decipher_rot13 >>> msg = 'GONAVYBEATARMY' >>> ciphertext = encipher_rot13(msg);ciphertext 'TBANILORNGNEZL' >>> decipher_rot13(ciphertext) 'GONAVYBEATARMY' >>> encipher_rot13(msg) == decipher_rot13(msg) True >>> msg == decipher_rot13(ciphertext) True """ return decipher_shift(msg, 13, symbols) ######## affine cipher examples ############ def encipher_affine(msg, key, symbols=None, _inverse=False): r""" Performs the affine cipher encryption on plaintext ``msg``, and returns the ciphertext. Encryption is based on the map `x \rightarrow ax+b` (mod `N`) where ``N`` is the number of characters in the alphabet. Decryption is based on the map `x \rightarrow cx+d` (mod `N`), where `c = a^{-1}` (mod `N`) and `d = -a^{-1}b` (mod `N`). In particular, for the map to be invertible, we need `\mathrm{gcd}(a, N) = 1` and an error will be raised if this is not true. Parameters ========== msg : string of characters that appear in ``symbols`` a, b : a pair integers, with ``gcd(a, N) = 1`` (the secret key) symbols : string of characters (default = uppercase letters). When no symbols are given, ``msg`` is converted to upper case letters and all other characters are ignored. Returns ======= ct : string of characters (the ciphertext message) ALGORITHM: STEPS: 0. Number the letters of the alphabet from 0, ..., N 1. Compute from the string ``msg`` a list ``L1`` of corresponding integers. 2. Compute from the list ``L1`` a new list ``L2``, given by replacing ``x`` by ``ax + b (mod N)``, for each element ``x`` in ``L1``. 3. Compute from the list ``L2`` a string ``ct`` of corresponding letters. Notes ===== This is a straightforward generalization of the shift cipher with the added complexity of requiring 2 characters to be deciphered in order to recover the key. References ========== .. [1] https://en.wikipedia.org/wiki/Affine_cipher See Also ======== decipher_affine """ msg, _, A = _prep(msg, '', symbols) N = len(A) a, b = key assert gcd(a, N) == 1 if _inverse: c = mod_inverse(a, N) d = -bc a, b = c, d B = ''.join([A[(ai + b) % N] for i in range(N)]) return translate(msg, A, B) def decipher_affine(msg, key, symbols=None): r""" Return the deciphered text that was made from the mapping, `x \rightarrow ax+b` (mod `N`), where ``N`` is the number of characters in the alphabet. Deciphering is done by reciphering with a new key: `x \rightarrow cx+d` (mod `N`), where `c = a^{-1}` (mod `N`) and `d = -a^{-1}b` (mod `N`). Examples ======== >>> from sympy.crypto.crypto import encipher_affine, decipher_affine >>> msg = "GO NAVY BEAT ARMY" >>> key = (3, 1) >>> encipher_affine(msg, key) 'TROBMVENBGBALV' >>> decipher_affine(_, key) 'GONAVYBEATARMY' See Also ======== encipher_affine """ return encipher_affine(msg, key, symbols, _inverse=True) def encipher_atbash(msg, symbols=None): r""" Enciphers a given ``msg`` into its Atbash ciphertext and returns it. Notes ===== Atbash is a substitution cipher originally used to encrypt the Hebrew alphabet. Atbash works on the principle of mapping each alphabet to its reverse / counterpart (i.e. a would map to z, b to y etc.) Atbash is functionally equivalent to the affine cipher with ``a = 25`` and ``b = 25`` See Also ======== decipher_atbash """ return encipher_affine(msg, (25,25), symbols) def decipher_atbash(msg, symbols=None): r""" Deciphers a given ``msg`` using Atbash cipher and returns it. Notes ===== ``decipher_atbash`` is functionally equivalent to ``encipher_atbash``. However, it has still been added as a separate function to maintain consistency. Examples ======== >>> from sympy.crypto.crypto import encipher_atbash, decipher_atbash >>> msg = 'GONAVYBEATARMY' >>> encipher_atbash(msg) 'TLMZEBYVZGZINB' >>> decipher_atbash(msg) 'TLMZEBYVZGZINB' >>> encipher_atbash(msg) == decipher_atbash(msg) True >>> msg == encipher_atbash(encipher_atbash(msg)) True References ========== .. [1] https://en.wikipedia.org/wiki/Atbash See Also ======== encipher_atbash """ return decipher_affine(msg, (25,25), symbols) #################### substitution cipher ########################### def encipher_substitution(msg, old, new=None): r""" Returns the ciphertext obtained by replacing each character that appears in ``old`` with the corresponding character in ``new``. If ``old`` is a mapping, then new is ignored and the replacements defined by ``old`` are used. Notes ===== This is a more general than the affine cipher in that the key can only be recovered by determining the mapping for each symbol. Though in practice, once a few symbols are recognized the mappings for other characters can be quickly guessed. Examples ======== >>> from sympy.crypto.crypto import encipher_substitution, AZ >>> old = 'OEYAG' >>> new = '034^6' >>> msg = AZ("go navy! beat army!") >>> ct = encipher_substitution(msg, old, new); ct '60N^V4B3^T^RM4' To decrypt a substitution, reverse the last two arguments: >>> encipher_substitution(ct, new, old) 'GONAVYBEATARMY' In the special case where ``old`` and ``new`` are a permutation of order 2 (representing a transposition of characters) their order is immaterial: >>> old = 'NAVY' >>> new = 'ANYV' >>> encipher = lambda x: encipher_substitution(x, old, new) >>> encipher('NAVY') 'ANYV' >>> encipher(_) 'NAVY' The substitution cipher, in general, is a method whereby "units" (not necessarily single characters) of plaintext are replaced with ciphertext according to a regular system. >>> ords = dict(zip('abc', ['\\%i' % ord(i) for i in 'abc'])) >>> print(encipher_substitution('abc', ords)) \97\98\99 References ========== .. [1] https://en.wikipedia.org/wiki/Substitution_cipher """ return translate(msg, old, new) ###################################################################### #################### Vigenère cipher examples ######################## ###################################################################### def encipher_vigenere(msg, key, symbols=None): """ Performs the Vigenère cipher encryption on plaintext ``msg``, and returns the ciphertext. Examples ======== >>> from sympy.crypto.crypto import encipher_vigenere, AZ >>> key = "encrypt" >>> msg = "meet me on monday" >>> encipher_vigenere(msg, key) 'QRGKKTHRZQEBPR' Section 1 of the Kryptos sculpture at the CIA headquarters uses this cipher and also changes the order of the the alphabet [2]_. Here is the first line of that section of the sculpture: >>> from sympy.crypto.crypto import decipher_vigenere, padded_key >>> alp = padded_key('KRYPTOS', AZ()) >>> key = 'PALIMPSEST' >>> msg = 'EMUFPHZLRFAXYUSDJKZLDKRNSHGNFIVJ' >>> decipher_vigenere(msg, key, alp) 'BETWEENSUBTLESHADINGANDTHEABSENC' Notes ===== The Vigenère cipher is named after Blaise de Vigenère, a sixteenth century diplomat and cryptographer, by a historical accident. Vigenère actually invented a different and more complicated cipher. The so-called Vigenère cipher* was actually invented by Giovan Batista Belaso in 1553. This cipher was used in the 1800's, for example, during the American Civil War. The Confederacy used a brass cipher disk to implement the Vigenère cipher (now on display in the NSA Museum in Fort Meade) [1]_. The Vigenère cipher is a generalization of the shift cipher. Whereas the shift cipher shifts each letter by the same amount (that amount being the key of the shift cipher) the Vigenère cipher shifts a letter by an amount determined by the key (which is a word or phrase known only to the sender and receiver). For example, if the key was a single letter, such as "C", then the so-called Vigenere cipher is actually a shift cipher with a shift of `2` (since "C" is the 2nd letter of the alphabet, if you start counting at `0`). If the key was a word with two letters, such as "CA", then the so-called Vigenère cipher will shift letters in even positions by `2` and letters in odd positions are left alone (shifted by `0`, since "A" is the 0th letter, if you start counting at `0`). ALGORITHM: INPUT: ``msg``: string of characters that appear in ``symbols`` (the plaintext) ``key``: a string of characters that appear in ``symbols`` (the secret key) ``symbols``: a string of letters defining the alphabet OUTPUT: ``ct``: string of characters (the ciphertext message) STEPS: 0. Number the letters of the alphabet from 0, ..., N 1. Compute from the string ``key`` a list ``L1`` of corresponding integers. Let ``n1 = len(L1)``. 2. Compute from the string ``msg`` a list ``L2`` of corresponding integers. Let ``n2 = len(L2)``. 3. Break ``L2`` up sequentially into sublists of size ``n1``; the last sublist may be smaller than ``n1`` 4. For each of these sublists ``L`` of ``L2``, compute a new list ``C`` given by ``C[i] = L[i] + L1[i] (mod N)`` to the ``i``-th element in the sublist, for each ``i``. 5. Assemble these lists ``C`` by concatenation into a new list of length ``n2``. 6. Compute from the new list a string ``ct`` of corresponding letters. Once it is known that the key is, say, `n` characters long, frequency analysis can be applied to every `n`-th letter of the ciphertext to determine the plaintext. This method is called Kasiski examination (although it was first discovered by Babbage). If they key is as long as the message and is comprised of randomly selected characters -- a one-time pad -- the message is theoretically unbreakable. The cipher Vigenère actually discovered is an "auto-key" cipher described as follows. ALGORITHM: INPUT: ``key``: a string of letters (the secret key) ``msg``: string of letters (the plaintext message) OUTPUT: ``ct``: string of upper-case letters (the ciphertext message) STEPS: 0. Number the letters of the alphabet from 0, ..., N 1. Compute from the string ``msg`` a list ``L2`` of corresponding integers. Let ``n2 = len(L2)``. 2. Let ``n1`` be the length of the key. Append to the string ``key`` the first ``n2 - n1`` characters of the plaintext message. Compute from this string (also of length ``n2``) a list ``L1`` of integers corresponding to the letter numbers in the first step. 3. Compute a new list ``C`` given by ``C[i] = L1[i] + L2[i] (mod N)``. 4. Compute from the new list a string ``ct`` of letters corresponding to the new integers. To decipher the auto-key ciphertext, the key is used to decipher the first ``n1`` characters and then those characters become the key to decipher the next ``n1`` characters, etc...: >>> m = AZ('go navy, beat army! yes you can'); m 'GONAVYBEATARMYYESYOUCAN' >>> key = AZ('gold bug'); n1 = len(key); n2 = len(m) >>> auto_key = key + m[:n2 - n1]; auto_key 'GOLDBUGGONAVYBEATARMYYE' >>> ct = encipher_vigenere(m, auto_key); ct 'MCYDWSHKOGAMKZCELYFGAYR' >>> n1 = len(key) >>> pt = [] >>> while ct: ... part, ct = ct[:n1], ct[n1:] ... pt.append(decipher_vigenere(part, key)) ... key = pt[-1] ... >>> ''.join(pt) == m True References ========== .. [1] https://en.wikipedia.org/wiki/Vigenere_cipher .. [2] http://web.archive.org/web/20071116100808/ .. [3] http://filebox.vt.edu/users/batman/kryptos.html (short URL: https://goo.gl/ijr22d) """ msg, key, A = _prep(msg, key, symbols) map = {c: i for i, c in enumerate(A)} key = [map[c] for c in key] N = len(map) k = len(key) rv = [] for i, m in enumerate(msg): rv.append(A[(map[m] + key[i % k]) % N]) rv = ''.join(rv) return rv def decipher_vigenere(msg, key, symbols=None): """ Decode using the Vigenère cipher. Examples ======== >>> from sympy.crypto.crypto import decipher_vigenere >>> key = "encrypt" >>> ct = "QRGK kt HRZQE BPR" >>> decipher_vigenere(ct, key) 'MEETMEONMONDAY' """ msg, key, A = _prep(msg, key, symbols) map = {c: i for i, c in enumerate(A)} N = len(A) # normally, 26 K = [map[c] for c in key] n = len(K) C = [map[c] for c in msg] rv = ''.join([A[(-K[i % n] + c) % N] for i, c in enumerate(C)]) return rv #################### Hill cipher ######################## def encipher_hill(msg, key, symbols=None, pad="Q"): r""" Return the Hill cipher encryption of ``msg``. Notes ===== The Hill cipher [1]_, invented by Lester S. Hill in the 1920's [2]_, was the first polygraphic cipher in which it was practical (though barely) to operate on more than three symbols at once. The following discussion assumes an elementary knowledge of matrices. First, each letter is first encoded as a number starting with 0. Suppose your message `msg` consists of `n` capital letters, with no spaces. This may be regarded an `n`-tuple M of elements of `Z_{26}` (if the letters are those of the English alphabet). A key in the Hill cipher is a `k x k` matrix `K`, all of whose entries are in `Z_{26}`, such that the matrix `K` is invertible (i.e., the linear transformation `K: Z_{N}^k \rightarrow Z_{N}^k` is one-to-one). Parameters ========== msg : plaintext message of `n` upper-case letters key : a `k x k` invertible matrix `K`, all of whose entries are in `Z_{26}` (or whatever number of symbols are being used). pad : character (default "Q") to use to make length of text be a multiple of ``k`` Returns ======= ct : ciphertext of upper-case letters ALGORITHM: STEPS: 0. Number the letters of the alphabet from 0, ..., N 1. Compute from the string ``msg`` a list ``L`` of corresponding integers. Let ``n = len(L)``. 2. Break the list ``L`` up into ``t = ceiling(n/k)`` sublists ``L_1``, ..., ``L_t`` of size ``k`` (with the last list "padded" to ensure its size is ``k``). 3. Compute new list ``C_1``, ..., ``C_t`` given by ``C[i] = KL_i`` (arithmetic is done mod N), for each ``i``. 4. Concatenate these into a list ``C = C_1 + ... + C_t``. 5. Compute from ``C`` a string ``ct`` of corresponding letters. This has length ``kt``. References ========== .. [1] https://en.wikipedia.org/wiki/Hill_cipher .. [2] Lester S. Hill, Cryptography in an Algebraic Alphabet, The American Mathematical Monthly Vol.36, June-July 1929, pp.306-312. See Also ======== decipher_hill """ assert key.is_square assert len(pad) == 1 msg, pad, A = _prep(msg, pad, symbols) map = {c: i for i, c in enumerate(A)} P = [map[c] for c in msg] N = len(A) k = key.cols n = len(P) m, r = divmod(n, k) if r: P = P + [map[pad]](k - r) m += 1 rv = ''.join([A[c % N] for j in range(m) for c in list(keyMatrix(k, 1, [P[i] for i in range(kj, k(j + 1))]))]) return rv def decipher_hill(msg, key, symbols=None): """ Deciphering is the same as enciphering but using the inverse of the key matrix. Examples ======== >>> from sympy.crypto.crypto import encipher_hill, decipher_hill >>> from sympy import Matrix >>> key = Matrix([[1, 2], [3, 5]]) >>> encipher_hill("meet me on monday", key) 'UEQDUEODOCTCWQ' >>> decipher_hill(_, key) 'MEETMEONMONDAY' When the length of the plaintext (stripped of invalid characters) is not a multiple of the key dimension, extra characters will appear at the end of the enciphered and deciphered text. In order to decipher the text, those characters must be included in the text to be deciphered. In the following, the key has a dimension of 4 but the text is 2 short of being a multiple of 4 so two characters will be added. >>> key = Matrix([[1, 1, 1, 2], [0, 1, 1, 0], ... [2, 2, 3, 4], [1, 1, 0, 1]]) >>> msg = "ST" >>> encipher_hill(msg, key) 'HJEB' >>> decipher_hill(_, key) 'STQQ' >>> encipher_hill(msg, key, pad="Z") 'ISPK' >>> decipher_hill(_, key) 'STZZ' If the last two characters of the ciphertext were ignored in either case, the wrong plaintext would be recovered: >>> decipher_hill("HD", key) 'ORMV' >>> decipher_hill("IS", key) 'UIKY' See Also ======== encipher_hill """ assert key.is_square msg, _, A = _prep(msg, '', symbols) map = {c: i for i, c in enumerate(A)} C = [map[c] for c in msg] N = len(A) k = key.cols n = len(C) m, r = divmod(n, k) if r: C = C + [0](k - r) m += 1 key_inv = key.inv_mod(N) rv = ''.join([A[p % N] for j in range(m) for p in list(key_invMatrix( k, 1, [C[i] for i in range(kj, k(j + 1))]))]) return rv #################### Bifid cipher ######################## def encipher_bifid(msg, key, symbols=None): r""" Performs the Bifid cipher encryption on plaintext ``msg``, and returns the ciphertext. This is the version of the Bifid cipher that uses an `n \times n` Polybius square. Parameters ========== msg : plaintext string key : short string for key; duplicate characters are ignored and then it is padded with the characters in ``symbols`` that were not in the short key symbols : `n \times n` characters defining the alphabet (default is string.printable) Returns ======= ciphertext (using Bifid5 cipher without spaces) See Also ======== decipher_bifid, encipher_bifid5, encipher_bifid6 References ========== .. [1] https://en.wikipedia.org/wiki/Bifid_cipher """ msg, key, A = _prep(msg, key, symbols, bifid10) long_key = ''.join(uniq(key)) or A n = len(A).5 if n != int(n): raise ValueError( 'Length of alphabet (%s) is not a square number.' % len(A)) N = int(n) if len(long_key) < N2: long_key = list(long_key) + [x for x in A if x not in long_key] # the fractionalization row_col = {ch: divmod(i, N) for i, ch in enumerate(long_key)} r, c = zip([row_col[x] for x in msg]) rc = r + c ch = {i: ch for ch, i in row_col.items()} rv = ''.join((ch[i] for i in zip(rc[::2], rc[1::2]))) return rv def decipher_bifid(msg, key, symbols=None): r""" Performs the Bifid cipher decryption on ciphertext ``msg``, and returns the plaintext. This is the version of the Bifid cipher that uses the `n \times n` Polybius square. Parameters ========== msg : ciphertext string key : short string for key; duplicate characters are ignored and then it is padded with the characters in symbols that were not in the short key symbols : `n \times n` characters defining the alphabet (default=string.printable, a `10 \times 10` matrix) Returns ======= deciphered text Examples ======== >>> from sympy.crypto.crypto import ( ... encipher_bifid, decipher_bifid, AZ) Do an encryption using the bifid5 alphabet: >>> alp = AZ().replace('J', '') >>> ct = AZ("meet me on monday!") >>> key = AZ("gold bug") >>> encipher_bifid(ct, key, alp) 'IEILHHFSTSFQYE' When entering the text or ciphertext, spaces are ignored so it can be formatted as desired. Re-entering the ciphertext from the preceding, putting 4 characters per line and padding with an extra J, does not cause problems for the deciphering: >>> decipher_bifid(''' ... IEILH ... HFSTS ... FQYEJ''', key, alp) 'MEETMEONMONDAY' When no alphabet is given, all 100 printable characters will be used: >>> key = '' >>> encipher_bifid('hello world!', key) 'bmtwmg-bIow' >>> decipher_bifid(_, key) 'hello world!' If the key is changed, a different encryption is obtained: >>> key = 'gold bug' >>> encipher_bifid('hello world!', 'gold_bug') 'hg2sfuei7t}w' And if the key used to decrypt the message is not exact, the original text will not be perfectly obtained: >>> decipher_bifid(_, 'gold pug') 'heldo~wor6d!' """ msg, _, A = _prep(msg, '', symbols, bifid10) long_key = ''.join(uniq(key)) or A n = len(A).5 if n != int(n): raise ValueError( 'Length of alphabet (%s) is not a square number.' % len(A)) N = int(n) if len(long_key) < N2: long_key = list(long_key) + [x for x in A if x not in long_key] # the reverse fractionalization row_col = dict( [(ch, divmod(i, N)) for i, ch in enumerate(long_key)]) rc = [i for c in msg for i in row_col[c]] n = len(msg) rc = zip((rc[:n], rc[n:])) ch = {i: ch for ch, i in row_col.items()} rv = ''.join((ch[i] for i in rc)) return rv def bifid_square(key): """Return characters of ``key`` arranged in a square. Examples ======== >>> from sympy.crypto.crypto import ( ... bifid_square, AZ, padded_key, bifid5) >>> bifid_square(AZ().replace('J', '')) Matrix([ [A, B, C, D, E], [F, G, H, I, K], [L, M, N, O, P], [Q, R, S, T, U], [V, W, X, Y, Z]]) >>> bifid_square(padded_key(AZ('gold bug!'), bifid5)) Matrix([ [G, O, L, D, B], [U, A, C, E, F], [H, I, K, M, N], [P, Q, R, S, T], [V, W, X, Y, Z]]) See Also ======== padded_key """ A = ''.join(uniq(''.join(key))) n = len(A).5 if n != int(n): raise ValueError( 'Length of alphabet (%s) is not a square number.' % len(A)) n = int(n) f = lambda i, j: Symbol(A[ni + j]) rv = Matrix(n, n, f) return rv def encipher_bifid5(msg, key): r""" Performs the Bifid cipher encryption on plaintext ``msg``, and returns the ciphertext. This is the version of the Bifid cipher that uses the `5 \times 5` Polybius square. The letter "J" is ignored so it must be replaced with something else (traditionally an "I") before encryption. ALGORITHM: (5x5 case) STEPS: 0. Create the `5 \times 5` Polybius square ``S`` associated to ``key`` as follows: a) moving from left-to-right, top-to-bottom, place the letters of the key into a `5 \times 5` matrix, b) if the key has less than 25 letters, add the letters of the alphabet not in the key until the `5 \times 5` square is filled. 1. Create a list ``P`` of pairs of numbers which are the coordinates in the Polybius square of the letters in ``msg``. 2. Let ``L1`` be the list of all first coordinates of ``P`` (length of ``L1 = n``), let ``L2`` be the list of all second coordinates of ``P`` (so the length of ``L2`` is also ``n``). 3. Let ``L`` be the concatenation of ``L1`` and ``L2`` (length ``L = 2n``), except that consecutive numbers are paired ``(L[2i], L[2i + 1])``. You can regard ``L`` as a list of pairs of length ``n``. 4. Let ``C`` be the list of all letters which are of the form ``S[i, j]``, for all ``(i, j)`` in ``L``. As a string, this is the ciphertext of ``msg``. Parameters ========== msg : plaintext string; converted to upper case and filtered of anything but all letters except J. key : short string for key; non-alphabetic letters, J and duplicated characters are ignored and then, if the length is less than 25 characters, it is padded with other letters of the alphabet (in alphabetical order). Returns ======= ct : ciphertext (all caps, no spaces) Examples ======== >>> from sympy.crypto.crypto import ( ... encipher_bifid5, decipher_bifid5) "J" will be omitted unless it is replaced with something else: >>> round_trip = lambda m, k: \ ... decipher_bifid5(encipher_bifid5(m, k), k) >>> key = 'a' >>> msg = "JOSIE" >>> round_trip(msg, key) 'OSIE' >>> round_trip(msg.replace("J", "I"), key) 'IOSIE' >>> j = "QIQ" >>> round_trip(msg.replace("J", j), key).replace(j, "J") 'JOSIE' Notes ===== The Bifid cipher was invented around 1901 by Felix Delastelle. It is a fractional substitution* cipher, where letters are replaced by pairs of symbols from a smaller alphabet. The cipher uses a `5 \times 5` square filled with some ordering of the alphabet, except that "J" is replaced with "I" (this is a so-called Polybius square; there is a `6 \times 6` analog if you add back in "J" and also append onto the usual 26 letter alphabet, the digits 0, 1, ..., 9). According to Helen Gaines' book Cryptanalysis, this type of cipher was used in the field by the German Army during World War I. See Also ======== decipher_bifid5, encipher_bifid """ msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid5) key = padded_key(key, bifid5) return encipher_bifid(msg, '', key) def decipher_bifid5(msg, key): r""" Return the Bifid cipher decryption of ``msg``. This is the version of the Bifid cipher that uses the `5 \times 5` Polybius square; the letter "J" is ignored unless a ``key`` of length 25 is used. Parameters ========== msg : ciphertext string key : short string for key; duplicated characters are ignored and if the length is less then 25 characters, it will be padded with other letters from the alphabet omitting "J". Non-alphabetic characters are ignored. Returns ======= plaintext from Bifid5 cipher (all caps, no spaces) Examples ======== >>> from sympy.crypto.crypto import encipher_bifid5, decipher_bifid5 >>> key = "gold bug" >>> encipher_bifid5('meet me on friday', key) 'IEILEHFSTSFXEE' >>> encipher_bifid5('meet me on monday', key) 'IEILHHFSTSFQYE' >>> decipher_bifid5(_, key) 'MEETMEONMONDAY' """ msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid5) key = padded_key(key, bifid5) return decipher_bifid(msg, '', key) def bifid5_square(key=None): r""" 5x5 Polybius square. Produce the Polybius square for the `5 \times 5` Bifid cipher. Examples ======== >>> from sympy.crypto.crypto import bifid5_square >>> bifid5_square("gold bug") Matrix([ [G, O, L, D, B], [U, A, C, E, F], [H, I, K, M, N], [P, Q, R, S, T], [V, W, X, Y, Z]]) """ if not key: key = bifid5 else: _, key, _ = _prep('', key.upper(), None, bifid5) key = padded_key(key, bifid5) return bifid_square(key) def encipher_bifid6(msg, key): r""" Performs the Bifid cipher encryption on plaintext ``msg``, and returns the ciphertext. This is the version of the Bifid cipher that uses the `6 \times 6` Polybius square. Parameters ========== msg : plaintext string (digits okay) key : short string for key (digits okay). If ``key`` is less than 36 characters long, the square will be filled with letters A through Z and digits 0 through 9. Returns ======= ciphertext from Bifid cipher (all caps, no spaces) See Also ======== decipher_bifid6, encipher_bifid """ msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid6) key = padded_key(key, bifid6) return encipher_bifid(msg, '', key) def decipher_bifid6(msg, key): r""" Performs the Bifid cipher decryption on ciphertext ``msg``, and returns the plaintext. This is the version of the Bifid cipher that uses the `6 \times 6` Polybius square. Parameters ========== msg : ciphertext string (digits okay); converted to upper case key : short string for key (digits okay). If ``key`` is less than 36 characters long, the square will be filled with letters A through Z and digits 0 through 9. All letters are converted to uppercase. Returns ======= plaintext from Bifid cipher (all caps, no spaces) Examples ======== >>> from sympy.crypto.crypto import encipher_bifid6, decipher_bifid6 >>> key = "gold bug" >>> encipher_bifid6('meet me on monday at 8am', key) 'KFKLJJHF5MMMKTFRGPL' >>> decipher_bifid6(_, key) 'MEETMEONMONDAYAT8AM' """ msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid6) key = padded_key(key, bifid6) return decipher_bifid(msg, '', key) def bifid6_square(key=None): r""" 6x6 Polybius square. Produces the Polybius square for the `6 \times 6` Bifid cipher. Assumes alphabet of symbols is "A", ..., "Z", "0", ..., "9". Examples ======== >>> from sympy.crypto.crypto import bifid6_square >>> key = "gold bug" >>> bifid6_square(key) Matrix([ [G, O, L, D, B, U], [A, C, E, F, H, I], [J, K, M, N, P, Q], [R, S, T, V, W, X], [Y, Z, 0, 1, 2, 3], [4, 5, 6, 7, 8, 9]]) """ if not key: key = bifid6 else: _, key, _ = _prep('', key.upper(), None, bifid6) key = padded_key(key, bifid6) return bifid_square(key) #################### RSA ############################# def rsa_public_key(p, q, e): r""" Return the RSA public key pair, `(n, e)`, where `n` is a product of two primes and `e` is relatively prime (coprime) to the Euler totient `\phi(n)`. False is returned if any assumption is violated. Examples ======== >>> from sympy.crypto.crypto import rsa_public_key >>> p, q, e = 3, 5, 7 >>> rsa_public_key(p, q, e) (15, 7) >>> rsa_public_key(p, q, 30) False See Also ======== rsa_private_key encipher_rsa decipher_rsa References ========== .. [1] https://en.wikipedia.org/wiki/RSA_%28cryptosystem%29 """ n = pq if isprime(p) and isprime(q): if p == q: SymPyDeprecationWarning( feature="Using non-distinct primes for rsa_public_key", useinstead="distinct primes", issue=16162, deprecated_since_version="1.4").warn() phi = p (p - 1) else: phi = (p - 1) * (q - 1) if gcd(e, phi) == 1: return n, e return False def rsa_private_key(p, q, e): r""" Return the RSA private key, `(n,d)`, where `n` is a product of two primes and `d` is the inverse of `e` (mod `\phi(n)`). False is returned if any assumption is violated. Examples ======== >>> from sympy.crypto.crypto import rsa_private_key >>> p, q, e = 3, 5, 7 >>> rsa_private_key(p, q, e) (15, 7) >>> rsa_private_key(p, q, 30) False """ n = pq if isprime(p) and isprime(q): if p == q: SymPyDeprecationWarning( feature="Using non-distinct primes for rsa_public_key", useinstead="distinct primes", issue=16162, deprecated_since_version="1.4").warn() phi = p (p - 1) else: phi = (p - 1) * (q - 1) if gcd(e, phi) == 1: d = mod_inverse(e, phi) return n, d return False def encipher_rsa(i, key): """ Return encryption of ``i`` by computing `i^e` (mod `n`), where ``key`` is the public key `(n, e)`. Examples ======== >>> from sympy.crypto.crypto import encipher_rsa, rsa_public_key >>> p, q, e = 3, 5, 7 >>> puk = rsa_public_key(p, q, e) >>> msg = 12 >>> encipher_rsa(msg, puk) 3 """ n, e = key return pow(i, e, n) def decipher_rsa(i, key): """ Return decyption of ``i`` by computing `i^d` (mod `n`), where ``key`` is the private key `(n, d)`. Examples ======== >>> from sympy.crypto.crypto import decipher_rsa, rsa_private_key >>> p, q, e = 3, 5, 7 >>> prk = rsa_private_key(p, q, e) >>> msg = 3 >>> decipher_rsa(msg, prk) 12 """ n, d = key return pow(i, d, n) #################### kid krypto (kid RSA) ############################# def kid_rsa_public_key(a, b, A, B): r""" Kid RSA is a version of RSA useful to teach grade school children since it does not involve exponentiation. Alice wants to talk to Bob. Bob generates keys as follows. Key generation: * Select positive integers `a, b, A, B` at random. * Compute `M = a b - 1`, `e = A M + a`, `d = B M + b`, `n = (e d - 1)//M`. * The public key is `(n, e)`. Bob sends these to Alice. * The private key is `(n, d)`, which Bob keeps secret. Encryption: If `p` is the plaintext message then the ciphertext is `c = p e \pmod n`. Decryption: If `c` is the ciphertext message then the plaintext is `p = c d \pmod n`. Examples ======== >>> from sympy.crypto.crypto import kid_rsa_public_key >>> a, b, A, B = 3, 4, 5, 6 >>> kid_rsa_public_key(a, b, A, B) (369, 58) """ M = ab - 1 e = AM + a d = BM + b n = (ed - 1)//M return n, e def kid_rsa_private_key(a, b, A, B): """ Compute `M = a b - 1`, `e = A M + a`, `d = B M + b`, `n = (e d - 1) / M`. The private key is `d`, which Bob keeps secret. Examples ======== >>> from sympy.crypto.crypto import kid_rsa_private_key >>> a, b, A, B = 3, 4, 5, 6 >>> kid_rsa_private_key(a, b, A, B) (369, 70) """ M = ab - 1 e = AM + a d = BM + b n = (ed - 1)//M return n, d def encipher_kid_rsa(msg, key): """ Here ``msg`` is the plaintext and ``key`` is the public key. Examples ======== >>> from sympy.crypto.crypto import ( ... encipher_kid_rsa, kid_rsa_public_key) >>> msg = 200 >>> a, b, A, B = 3, 4, 5, 6 >>> key = kid_rsa_public_key(a, b, A, B) >>> encipher_kid_rsa(msg, key) 161 """ n, e = key return (msge) % n def decipher_kid_rsa(msg, key): """ Here ``msg`` is the plaintext and ``key`` is the private key. Examples ======== >>> from sympy.crypto.crypto import ( ... kid_rsa_public_key, kid_rsa_private_key, ... decipher_kid_rsa, encipher_kid_rsa) >>> a, b, A, B = 3, 4, 5, 6 >>> d = kid_rsa_private_key(a, b, A, B) >>> msg = 200 >>> pub = kid_rsa_public_key(a, b, A, B) >>> pri = kid_rsa_private_key(a, b, A, B) >>> ct = encipher_kid_rsa(msg, pub) >>> decipher_kid_rsa(ct, pri) 200 """ n, d = key return (msgd) % n #################### Morse Code ###################################### morse_char = { ".-": "A", "-...": "B", "-.-.": "C", "-..": "D", ".": "E", "..-.": "F", "--.": "G", "....": "H", "..": "I", ".---": "J", "-.-": "K", ".-..": "L", "--": "M", "-.": "N", "---": "O", ".--.": "P", "--.-": "Q", ".-.": "R", "...": "S", "-": "T", "..-": "U", "...-": "V", ".--": "W", "-..-": "X", "-.--": "Y", "--..": "Z", "-----": "0", ".----": "1", "..---": "2", "...--": "3", "....-": "4", ".....": "5", "-....": "6", "--...": "7", "---..": "8", "----.": "9", ".-.-.-": ".", "--..--": ",", "---...": ":", "-.-.-.": ";", "..--..": "?", "-....-": "-", "..--.-": "_", "-.--.": "(", "-.--.-": ")", ".----.": "'", "-...-": "=", ".-.-.": "+", "-..-.": "/", ".--.-.": "@", "...-..-": "$", "-.-.--": "!"} char_morse = {v: k for k, v in morse_char.items()} def encode_morse(msg, sep='\|', mapping=None): """ Encodes a plaintext into popular Morse Code with letters separated by `sep` and words by a double `sep`. Examples ======== >>> from sympy.crypto.crypto import encode_morse >>> msg = 'ATTACK RIGHT FLANK' >>> encode_morse(msg) '.-\|-\|-\|.-\|-.-.\|-.-\|\|.-.\|..\|--.\|....\|-\|\|..-.\|.-..\|.-\|-.\|-.-' References ========== .. [1] https://en.wikipedia.org/wiki/Morse_code """ mapping = mapping or char_morse assert sep not in mapping word_sep = 2sep mapping[" "] = word_sep suffix = msg and msg[-1] in whitespace # normalize whitespace msg = (' ' if word_sep else '').join(msg.split()) # omit unmapped chars chars = set(''.join(msg.split())) ok = set(mapping.keys()) msg = translate(msg, None, ''.join(chars - ok)) morsestring = [] words = msg.split() for word in words: morseword = [] for letter in word: morseletter = mapping[letter] morseword.append(morseletter) word = sep.join(morseword) morsestring.append(word) return word_sep.join(morsestring) + (word_sep if suffix else '') def decode_morse(msg, sep='\|', mapping=None): """ Decodes a Morse Code with letters separated by `sep` (default is '\|') and words by `word_sep` (default is '\|\|) into plaintext. Examples ======== >>> from sympy.crypto.crypto import decode_morse >>> mc = '--\|---\|...-\|.\|\|.\|.-\|...\|-' >>> decode_morse(mc) 'MOVE EAST' References ========== .. [1] https://en.wikipedia.org/wiki/Morse_code """ mapping = mapping or morse_char word_sep = 2sep characterstring = [] words = msg.strip(word_sep).split(word_sep) for word in words: letters = word.split(sep) chars = [mapping[c] for c in letters] word = ''.join(chars) characterstring.append(word) rv = " ".join(characterstring) return rv #################### LFSRs ########################################## def lfsr_sequence(key, fill, n): r""" This function creates an LFSR sequence. Parameters ========== key : a list of finite field elements, `[c_0, c_1, \ldots, c_k].` fill : the list of the initial terms of the LFSR sequence, `[x_0, x_1, \ldots, x_k].` n : number of terms of the sequence that the function returns. Returns ======= The LFSR sequence defined by `x_{n+1} = c_k x_n + \ldots + c_0 x_{n-k}`, for `n \leq k`. Notes ===== S. Golomb [G]_ gives a list of three statistical properties a sequence of numbers `a = \{a_n\}_{n=1}^\infty`, `a_n \in \{0,1\}`, should display to be considered "random". Define the autocorrelation of `a` to be .. math:: C(k) = C(k,a) = \lim_{N\rightarrow \infty} {1\over N}\sum_{n=1}^N (-1)^{a_n + a_{n+k}}. In the case where `a` is periodic with period `P` then this reduces to .. math:: C(k) = {1\over P}\sum_{n=1}^P (-1)^{a_n + a_{n+k}}. Assume `a` is periodic with period `P`. - balance: .. math:: \left\|\sum_{n=1}^P(-1)^{a_n}\right\| \leq 1. - low autocorrelation: .. math:: C(k) = \left\{ \begin{array}{cc} 1,& k = 0,\\ \epsilon, & k \ne 0. \end{array} \right. (For sequences satisfying these first two properties, it is known that `\epsilon = -1/P` must hold.) - proportional runs property: In each period, half the runs have length `1`, one-fourth have length `2`, etc. Moreover, there are as many runs of `1`'s as there are of `0`'s. Examples ======== >>> from sympy.crypto.crypto import lfsr_sequence >>> from sympy.polys.domains import FF >>> F = FF(2) >>> fill = [F(1), F(1), F(0), F(1)] >>> key = [F(1), F(0), F(0), F(1)] >>> lfsr_sequence(key, fill, 10) [1 mod 2, 1 mod 2, 0 mod 2, 1 mod 2, 0 mod 2, 1 mod 2, 1 mod 2, 0 mod 2, 0 mod 2, 1 mod 2] References ========== .. [G] Solomon Golomb, Shift register sequences, Aegean Park Press, Laguna Hills, Ca, 1967 """ if not isinstance(key, list): raise TypeError("key must be a list") if not isinstance(fill, list): raise TypeError("fill must be a list") p = key[0].mod F = FF(p) s = fill k = len(fill) L = [] for i in range(n): s0 = s[:] L.append(s[0]) s = s[1:k] x = sum([int(key[i]s0[i]) for i in range(k)]) s.append(F(x)) return L # use [x.to_int() for x in L] for int version def lfsr_autocorrelation(L, P, k): """ This function computes the LFSR autocorrelation function. Parameters ========== L : is a periodic sequence of elements of `GF(2)`. L must have length larger than P. P : the period of L k : an integer (`0 < k < P`) Returns ======= The k-th value of the autocorrelation of the LFSR L Examples ======== >>> from sympy.crypto.crypto import ( ... lfsr_sequence, lfsr_autocorrelation) >>> from sympy.polys.domains import FF >>> F = FF(2) >>> fill = [F(1), F(1), F(0), F(1)] >>> key = [F(1), F(0), F(0), F(1)] >>> s = lfsr_sequence(key, fill, 20) >>> lfsr_autocorrelation(s, 15, 7) -1/15 >>> lfsr_autocorrelation(s, 15, 0) 1 """ if not isinstance(L, list): raise TypeError("L (=%s) must be a list" % L) P = int(P) k = int(k) L0 = L[:P] # slices makes a copy L1 = L0 + L0[:k] L2 = [(-1)(L1[i].to_int() + L1[i + k].to_int()) for i in range(P)] tot = sum(L2) return Rational(tot, P) def lfsr_connection_polynomial(s): """ This function computes the LFSR connection polynomial. Parameters ========== s : a sequence of elements of even length, with entries in a finite field Returns ======= C(x) : the connection polynomial of a minimal LFSR yielding s. This implements the algorithm in section 3 of J. L. Massey's article [M]_. Examples ======== >>> from sympy.crypto.crypto import ( ... lfsr_sequence, lfsr_connection_polynomial) >>> from sympy.polys.domains import FF >>> F = FF(2) >>> fill = [F(1), F(1), F(0), F(1)] >>> key = [F(1), F(0), F(0), F(1)] >>> s = lfsr_sequence(key, fill, 20) >>> lfsr_connection_polynomial(s) x4 + x + 1 >>> fill = [F(1), F(0), F(0), F(1)] >>> key = [F(1), F(1), F(0), F(1)] >>> s = lfsr_sequence(key, fill, 20) >>> lfsr_connection_polynomial(s) x3 + 1 >>> fill = [F(1), F(0), F(1)] >>> key = [F(1), F(1), F(0)] >>> s = lfsr_sequence(key, fill, 20) >>> lfsr_connection_polynomial(s) x3 + x2 + 1 >>> fill = [F(1), F(0), F(1)] >>> key = [F(1), F(0), F(1)] >>> s = lfsr_sequence(key, fill, 20) >>> lfsr_connection_polynomial(s) x3 + x + 1 References ========== .. [M] James L. Massey, "Shift-Register Synthesis and BCH Decoding." IEEE Trans. on Information Theory, vol. 15(1), pp. 122-127, Jan 1969. """ # Initialization: p = s[0].mod x = Symbol("x") C = 1x*0 B = 1x*0 m = 1 b = 1x0 L = 0 N = 0 while N < len(s): if L > 0: dC = Poly(C).degree() r = min(L + 1, dC + 1) coeffsC = [C.subs(x, 0)] + [C.coeff(xi) for i in range(1, dC + 1)] d = (s[N].to_int() + sum([coeffsC[i]s[N - i].to_int() for i in range(1, r)])) % p if L == 0: d = s[N].to_int()x*0 if d == 0: m += 1 N += 1 if d > 0: if 2L > N: C = (C - d((b(p - 2)) % p)x*mB).expand() m += 1 N += 1 else: T = C C = (C - d((b(p - 2)) % p)x*mB).expand() L = N + 1 - L m = 1 b = d B = T N += 1 dC = Poly(C).degree() coeffsC = [C.subs(x, 0)] + [C.coeff(x*i) for i in range(1, dC + 1)] return sum([coeffsC[i] % pxi for i in range(dC + 1) if coeffsC[i] is not None]) #################### ElGamal ############################# def elgamal_private_key(digit=10, seed=None): r""" Return three number tuple as private key. Elgamal encryption is based on the mathmatical problem called the Discrete Logarithm Problem (DLP). For example, `a^{b} \equiv c \pmod p` In general, if ``a`` and ``b`` are known, ``ct`` is easily calculated. If ``b`` is unknown, it is hard to use ``a`` and ``ct`` to get ``b``. Parameters ========== digit : minimum number of binary digits for key Returns ======= (p, r, d) : p = prime number, r = primitive root, d = random number Notes ===== For testing purposes, the ``seed`` parameter may be set to control the output of this routine. See sympy.utilities.randtest._randrange. Examples ======== >>> from sympy.crypto.crypto import elgamal_private_key >>> from sympy.ntheory import is_primitive_root, isprime >>> a, b, _ = elgamal_private_key() >>> isprime(a) True >>> is_primitive_root(b, a) True """ randrange = _randrange(seed) p = nextprime(2digit) return p, primitive_root(p), randrange(2, p) def elgamal_public_key(key): """ Return three number tuple as public key. Parameters ========== key : Tuple (p, r, e) generated by ``elgamal_private_key`` Returns ======= (p, r, e = r*d mod p) : d is a random number in private key. Examples ======== >>> from sympy.crypto.crypto import elgamal_public_key >>> elgamal_public_key((1031, 14, 636)) (1031, 14, 212) """ p, r, e = key return p, r, pow(r, e, p) def encipher_elgamal(i, key, seed=None): r""" Encrypt message with public key ``i`` is a plaintext message expressed as an integer. ``key`` is public key (p, r, e). In order to encrypt a message, a random number ``a`` in ``range(2, p)`` is generated and the encryped message is returned as `c_{1}` and `c_{2}` where: `c_{1} \equiv r^{a} \pmod p` `c_{2} \equiv m e^{a} \pmod p` Parameters ========== msg : int of encoded message key : public key Returns ======= (c1, c2) : Encipher into two number Notes ===== For testing purposes, the ``seed`` parameter may be set to control the output of this routine. See sympy.utilities.randtest._randrange. Examples ======== >>> from sympy.crypto.crypto import encipher_elgamal, elgamal_private_key, elgamal_public_key >>> pri = elgamal_private_key(5, seed=[3]); pri (37, 2, 3) >>> pub = elgamal_public_key(pri); pub (37, 2, 8) >>> msg = 36 >>> encipher_elgamal(msg, pub, seed=[3]) (8, 6) """ p, r, e = key if i < 0 or i >= p: raise ValueError( 'Message (%s) should be in range(%s)' % (i, p)) randrange = _randrange(seed) a = randrange(2, p) return pow(r, a, p), ipow(e, a, p) % p def decipher_elgamal(msg, key): r""" Decrypt message with private key `msg = (c_{1}, c_{2})` `key = (p, r, d)` According to extended Eucliden theorem, `u c_{1}^{d} + p n = 1` `u \equiv 1/{{c_{1}}^d} \pmod p` `u c_{2} \equiv \frac{1}{c_{1}^d} c_{2} \equiv \frac{1}{r^{ad}} c_{2} \pmod p` `\frac{1}{r^{ad}} m e^a \equiv \frac{1}{r^{ad}} m {r^{d a}} \equiv m \pmod p` Examples ======== >>> from sympy.crypto.crypto import decipher_elgamal >>> from sympy.crypto.crypto import encipher_elgamal >>> from sympy.crypto.crypto import elgamal_private_key >>> from sympy.crypto.crypto import elgamal_public_key >>> pri = elgamal_private_key(5, seed=[3]) >>> pub = elgamal_public_key(pri); pub (37, 2, 8) >>> msg = 17 >>> decipher_elgamal(encipher_elgamal(msg, pub), pri) == msg True """ p, r, d = key c1, c2 = msg u = igcdex(c1*d, p)[0] return u c2 % p ################ Diffie-Hellman Key Exchange ######################### def dh_private_key(digit=10, seed=None): r""" Return three integer tuple as private key. Diffie-Hellman key exchange is based on the mathematical problem called the Discrete Logarithm Problem (see ElGamal). Diffie-Hellman key exchange is divided into the following steps: * Alice and Bob agree on a base that consist of a prime ``p`` and a primitive root of ``p`` called ``g`` * Alice choses a number ``a`` and Bob choses a number ``b`` where ``a`` and ``b`` are random numbers in range `[2, p)`. These are their private keys. * Alice then publicly sends Bob `g^{a} \pmod p` while Bob sends Alice `g^{b} \pmod p` * They both raise the received value to their secretly chosen number (``a`` or ``b``) and now have both as their shared key `g^{ab} \pmod p` Parameters ========== digit: minimum number of binary digits required in key Returns ======= (p, g, a) : p = prime number, g = primitive root of p, a = random number from 2 through p - 1 Notes ===== For testing purposes, the ``seed`` parameter may be set to control the output of this routine. See sympy.utilities.randtest._randrange. Examples ======== >>> from sympy.crypto.crypto import dh_private_key >>> from sympy.ntheory import isprime, is_primitive_root >>> p, g, _ = dh_private_key() >>> isprime(p) True >>> is_primitive_root(g, p) True >>> p, g, _ = dh_private_key(5) >>> isprime(p) True >>> is_primitive_root(g, p) True """ p = nextprime(2*digit) g = primitive_root(p) randrange = _randrange(seed) a = randrange(2, p) return p, g, a def dh_public_key(key): """ Return three number tuple as public key. This is the tuple that Alice sends to Bob. Parameters ========== key : Tuple (p, g, a) generated by ``dh_private_key`` Returns ======= (p, g, g^a mod p) : p, g and a as in Parameters Examples ======== >>> from sympy.crypto.crypto import dh_private_key, dh_public_key >>> p, g, a = dh_private_key(); >>> _p, _g, x = dh_public_key((p, g, a)) >>> p == _p and g == _g True >>> x == pow(g, a, p) True """ p, g, a = key return p, g, pow(g, a, p) def dh_shared_key(key, b): """ Return an integer that is the shared key. This is what Bob and Alice can both calculate using the public keys they received from each other and their private keys. Parameters ========== key : Tuple (p, g, x) generated by ``dh_public_key`` b : Random number in the range of 2 to p - 1 (Chosen by second key exchange member (Bob)) Returns ======= shared key (int) Examples ======== >>> from sympy.crypto.crypto import ( ... dh_private_key, dh_public_key, dh_shared_key) >>> prk = dh_private_key(); >>> p, g, x = dh_public_key(prk); >>> sk = dh_shared_key((p, g, x), 1000) >>> sk == pow(x, 1000, p) True """ p, _, x = key if 1 >= b or b >= p: raise ValueError(filldedent(''' Value of b should be greater 1 and less than prime %s.''' % p)) return pow(x, b, p) ################ Goldwasser-Micali Encryption ######################### def _legendre(a, p): """ Returns the legendre symbol of a and p assuming that p is a prime i.e. 1 if a is a quadratic residue mod p -1 if a is not a quadratic residue mod p 0 if a is divisible by p Parameters ========== a : int the number to test p : the prime to test a against Returns ======= legendre symbol (a / p) (int) """ sig = pow(a, (p - 1)//2, p) if sig == 1: return 1 elif sig == 0: return 0 else: return -1 def _random_coprime_stream(n, seed=None): randrange = _randrange(seed) while True: y = randrange(n) if gcd(y, n) == 1: yield y def gm_private_key(p, q, a=None): """ Check if p and q can be used as private keys for the Goldwasser-Micali encryption. The method works roughly as follows. Pick two large primes p ands q. Call their product N. Given a message as an integer i, write i in its bit representation b_0,...,b_n. For each k, if b_k = 0: let a_k be a random square (quadratic residue) modulo p q such that jacobi_symbol(a, p * q) = 1 if b_k = 1: let a_k be a random non-square (non-quadratic residue) modulo p * q such that jacobi_symbol(a, p * q) = 1 return [a_1, a_2,...] b_k can be recovered by checking whether or not a_k is a residue. And from the b_k's, the message can be reconstructed. The idea is that, while jacobi_symbol(a, p * q) can be easily computed (and when it is equal to -1 will tell you that a is not a square mod p * q), quadratic residuosity modulo a composite number is hard to compute without knowing its factorization. Moreover, approximately half the numbers coprime to p * q have jacobi_symbol equal to 1. And among those, approximately half are residues and approximately half are not. This maximizes the entropy of the code. Parameters ========== p, q, a : initialization variables Returns ======= p, q : the input value p and q Raises ====== ValueError : if p and q are not distinct odd primes """ if p == q: raise ValueError("expected distinct primes, " "got two copies of %i" % p) elif not isprime(p) or not isprime(q): raise ValueError("first two arguments must be prime, " "got %i of %i" % (p, q)) elif p == 2 or q == 2: raise ValueError("first two arguments must not be even, " "got %i of %i" % (p, q)) return p, q def gm_public_key(p, q, a=None, seed=None): """ Compute public keys for p and q. Note that in Goldwasser-Micali Encryption, public keys are randomly selected. Parameters ========== p, q, a : (int) initialization variables Returns ======= (a, N) : tuple[int] a is the input a if it is not None otherwise some random integer coprime to p and q. N is the product of p and q """ p, q = gm_private_key(p, q) N = p * q if a is None: randrange = _randrange(seed) while True: a = randrange(N) if _legendre(a, p) == _legendre(a, q) == -1: break else: if _legendre(a, p) != -1 or _legendre(a, q) != -1: return False return (a, N) def encipher_gm(i, key, seed=None): """ Encrypt integer 'i' using public_key 'key' Note that gm uses random encryption. Parameters ========== i : (int) the message to encrypt key : Tuple (a, N) the public key Returns ======= List[int] : the randomized encrypted message. """ if i < 0: raise ValueError( "message must be a non-negative " "integer: got %d instead" % i) a, N = key bits = [] while i > 0: bits.append(i % 2) i //= 2 gen = _random_coprime_stream(N, seed) rev = reversed(bits) encode = lambda b: next(gen)*2pow(a, b) % N return [ encode(b) for b in rev ] def decipher_gm(message, key): """ Decrypt message 'message' using public_key 'key'. Parameters ========== List[int] : the randomized encrypted message. key : Tuple (p, q) the private key Returns ======= i : (int) the encrypted message """ p, q = key res = lambda m, p: _legendre(m, p) > 0 bits = [res(m, p) * res(m, q) for m in message] m = 0 for b in bits: m <<= 1 m += not b return m ################ Blum–Goldwasser cryptosystem ######################### def bg_private_key(p, q): """ Check if p and q can be used as private keys for the Blum–Goldwasser cryptosystem. The three necessary checks for p and q to pass so that they can be used as private keys: 1. p and q must both be prime 2. p and q must be distinct 3. p and q must be congruent to 3 mod 4 Parameters ========== p, q : the keys to be checked Returns ======= p, q : input values Raises ====== ValueError : if p and q do not pass the above conditions """ if not isprime(p) or not isprime(q): raise ValueError("the two arguments must be prime, " "got %i and %i" %(p, q)) elif p == q: raise ValueError("the two arguments must be distinct, " "got two copies of %i. " %p) elif (p - 3) % 4 != 0 or (q - 3) % 4 != 0: raise ValueError("the two arguments must be congruent to 3 mod 4, " "got %i and %i" %(p, q)) return p, q def bg_public_key(p, q): """ Calculates public keys from private keys. The function first checks the validity of private keys passed as arguments and then returns their product. Parameters ========== p, q : the private keys Returns ======= N : the public key """ p, q = bg_private_key(p, q) N = p * q return N def encipher_bg(i, key, seed=None): """ Encrypts the message using public key and seed. ALGORITHM: 1. Encodes i as a string of L bits, m. 2. Select a random element r, where 1 < r < key, and computes x = r^2 mod key. 3. Use BBS pseudo-random number generator to generate L random bits, b, using the initial seed as x. 4. Encrypted message, c_i = m_i XOR b_i, 1 <= i <= L. 5. x_L = x^(2^L) mod key. 6. Return (c, x_L) Parameters ========== i : message, a non-negative integer key : the public key Returns ======= (encrypted_message, x_L) : Tuple Raises ====== ValueError : if i is negative """ if i < 0: raise ValueError( "message must be a non-negative " "integer: got %d instead" % i) enc_msg = [] while i > 0: enc_msg.append(i % 2) i //= 2 enc_msg.reverse() L = len(enc_msg) r = _randint(seed)(2, key - 1) x = r2 % key x_L = pow(int(x), int(2L), int(key)) rand_bits = [] for k in range(L): rand_bits.append(x % 2) x = x*2 % key encrypt_msg = [m ^ b for (m, b) in zip(enc_msg, rand_bits)] return (encrypt_msg, x_L) def decipher_bg(message, key): """ Decrypts the message using private keys. ALGORITHM: 1. Let, c be the encrypted message, y the second number received, and p and q be the private keys. 2. Compute, r_p = y^((p+1)/4 ^ L) mod p and r_q = y^((q+1)/4 ^ L) mod q. 3. Compute x_0 = (q(q^-1 mod p)r_p + p(p^-1 mod q)r_q) mod N. 4. From, recompute the bits using the BBS generator, as in the encryption algorithm. 5. Compute original message by XORing c and b. Parameters ========== message : Tuple of encrypted message and a non-negative integer. key : Tuple of private keys Returns ======= orig_msg : The original message """ p, q = key encrypt_msg, y = message public_key = p q L = len(encrypt_msg) p_t = ((p + 1)/4)L q_t = ((q + 1)/4)L r_p = pow(int(y), int(p_t), int(p)) r_q = pow(int(y), int(q_t), int(q)) x = (q * mod_inverse(q, p) * r_p + p * mod_inverse(p, q) * r_q) % public_key orig_bits = [] for k in range(L): orig_bits.append(x % 2) x = x*2 % public_key orig_msg = 0 for (m, b) in zip(encrypt_msg, orig_bits): orig_msg = orig_msg 2 orig_msg += (m ^ b) return orig_msg
e35fba9435c7026463c4c773429eb8a994374598a6cbce98545c640227315944	"""A functions module, includes all the standard functions. Combinatorial - factorial, fibonacci, harmonic, bernoulli... Elementary - hyperbolic, trigonometric, exponential, floor and ceiling, sqrt... Special - gamma, zeta,spherical harmonics... """ from sympy.functions.combinatorial.factorials import (factorial, factorial2, rf, ff, binomial, RisingFactorial, FallingFactorial, subfactorial) from sympy.functions.combinatorial.numbers import (carmichael, fibonacci, lucas, tribonacci, harmonic, bernoulli, bell, euler, catalan, genocchi, partition) from sympy.functions.elementary.miscellaneous import (sqrt, root, Min, Max, Id, real_root, cbrt) from sympy.functions.elementary.complexes import (re, im, sign, Abs, conjugate, arg, polar_lift, periodic_argument, unbranched_argument, principal_branch, transpose, adjoint, polarify, unpolarify) from sympy.functions.elementary.trigonometric import (sin, cos, tan, sec, csc, cot, sinc, asin, acos, atan, asec, acsc, acot, atan2) from sympy.functions.elementary.exponential import (exp_polar, exp, log, LambertW) from sympy.functions.elementary.hyperbolic import (sinh, cosh, tanh, coth, sech, csch, asinh, acosh, atanh, acoth, asech, acsch) from sympy.functions.elementary.integers import floor, ceiling, frac from sympy.functions.elementary.piecewise import Piecewise, piecewise_fold from sympy.functions.special.error_functions import (erf, erfc, erfi, erf2, erfinv, erfcinv, erf2inv, Ei, expint, E1, li, Li, Si, Ci, Shi, Chi, fresnels, fresnelc) from sympy.functions.special.gamma_functions import (gamma, lowergamma, uppergamma, polygamma, loggamma, digamma, trigamma, multigamma) from sympy.functions.special.zeta_functions import (dirichlet_eta, zeta, lerchphi, polylog, stieltjes) from sympy.functions.special.tensor_functions import (Eijk, LeviCivita, KroneckerDelta) from sympy.functions.special.singularity_functions import SingularityFunction from sympy.functions.special.delta_functions import DiracDelta, Heaviside from sympy.functions.special.bsplines import bspline_basis, bspline_basis_set, interpolating_spline from sympy.functions.special.bessel import (besselj, bessely, besseli, besselk, hankel1, hankel2, jn, yn, jn_zeros, hn1, hn2, airyai, airybi, airyaiprime, airybiprime) from sympy.functions.special.hyper import hyper, meijerg, appellf1 from sympy.functions.special.polynomials import (legendre, assoc_legendre, hermite, chebyshevt, chebyshevu, chebyshevu_root, chebyshevt_root, laguerre, assoc_laguerre, gegenbauer, jacobi, jacobi_normalized) from sympy.functions.special.spherical_harmonics import Ynm, Ynm_c, Znm from sympy.functions.special.elliptic_integrals import (elliptic_k, elliptic_f, elliptic_e, elliptic_pi) from sympy.functions.special.beta_functions import beta from sympy.functions.special.mathieu_functions import (mathieus, mathieuc, mathieusprime, mathieucprime) ln = log
b0fd38bf5dd35f0e61f8d0a0168ca11ec1c8c76b001509695420c5c26b64c4fc	from __future__ import print_function, division from sympy.core.add import Add from sympy.core.compatibility import ordered, range from sympy.core.function import expand_log from sympy.core.power import Pow from sympy.core.singleton import S from sympy.core.symbol import Dummy from sympy.functions.elementary.exponential import (LambertW, exp, log) from sympy.functions.elementary.miscellaneous import root from sympy.polys.polyroots import roots from sympy.polys.polytools import Poly, factor from sympy.core.function import _mexpand from sympy.simplify.simplify import separatevars from sympy.simplify.radsimp import collect from sympy.simplify.simplify import powsimp from sympy.solvers.solvers import solve, _invert from sympy.utilities.iterables import uniq def _filtered_gens(poly, symbol): """process the generators of ``poly``, returning the set of generators that have ``symbol``. If there are two generators that are inverses of each other, prefer the one that has no denominator. Examples ======== >>> from sympy.solvers.bivariate import _filtered_gens >>> from sympy import Poly, exp >>> from sympy.abc import x >>> _filtered_gens(Poly(x + 1/x + exp(x)), x) {x, exp(x)} """ gens = {g for g in poly.gens if symbol in g.free_symbols} for g in list(gens): ag = 1/g if g in gens and ag in gens: if ag.as_numer_denom()[1] is not S.One: g = ag gens.remove(g) return gens def _mostfunc(lhs, func, X=None): """Returns the term in lhs which contains the most of the func-type things e.g. log(log(x)) wins over log(x) if both terms appear. ``func`` can be a function (exp, log, etc...) or any other SymPy object, like Pow. If ``X`` is not ``None``, then the function returns the term composed with the most ``func`` having the specified variable. Examples ======== >>> from sympy.solvers.bivariate import _mostfunc >>> from sympy.functions.elementary.exponential import exp >>> from sympy.utilities.pytest import raises >>> from sympy.abc import x, y >>> _mostfunc(exp(x) + exp(exp(x) + 2), exp) exp(exp(x) + 2) >>> _mostfunc(exp(x) + exp(exp(y) + 2), exp) exp(exp(y) + 2) >>> _mostfunc(exp(x) + exp(exp(y) + 2), exp, x) exp(x) >>> _mostfunc(x, exp, x) is None True >>> _mostfunc(exp(x) + exp(xy), exp, x) exp(x) """ fterms = [tmp for tmp in lhs.atoms(func) if (not X or X.is_Symbol and X in tmp.free_symbols or not X.is_Symbol and tmp.has(X))] if len(fterms) == 1: return fterms[0] elif fterms: return max(list(ordered(fterms)), key=lambda x: x.count(func)) return None def _linab(arg, symbol): """Return ``a, b, X`` assuming ``arg`` can be written as ``aX + b`` where ``X`` is a symbol-dependent factor and ``a`` and ``b`` are independent of ``symbol``. Examples ======== >>> from sympy.functions.elementary.exponential import exp >>> from sympy.solvers.bivariate import _linab >>> from sympy.abc import x, y >>> from sympy import S >>> _linab(S(2), x) (2, 0, 1) >>> _linab(2x, x) (2, 0, x) >>> _linab(y + yx + 2x, x) (y + 2, y, x) >>> _linab(3 + 2exp(x), x) (2, 3, exp(x)) """ from sympy.core.exprtools import factor_terms arg = factor_terms(arg.expand()) ind, dep = arg.as_independent(symbol) if arg.is_Mul and dep.is_Add: a, b, x = _linab(dep, symbol) return inda, indb, x if not arg.is_Add: b = 0 a, x = ind, dep else: b = ind a, x = separatevars(dep).as_independent(symbol, as_Add=False) if x.could_extract_minus_sign(): a = -a x = -x return a, b, x def _lambert(eq, x): """ Given an expression assumed to be in the form ``F(X, a..f) = alog(bX + c) + dX + f = 0`` where X = g(x) and x = g^-1(X), return the Lambert solution, ``x = g^-1(-c/b + (a/d)W(d/(ab)exp(cd/a/b)exp(-f/a)))``. """ eq = _mexpand(expand_log(eq)) mainlog = _mostfunc(eq, log, x) if not mainlog: return [] # violated assumptions other = eq.subs(mainlog, 0) if isinstance(-other, log): eq = (eq - other).subs(mainlog, mainlog.args[0]) mainlog = mainlog.args[0] if not isinstance(mainlog, log): return [] # violated assumptions other = -(-other).args[0] eq += other if not x in other.free_symbols: return [] # violated assumptions d, f, X2 = _linab(other, x) logterm = collect(eq - other, mainlog) a = logterm.as_coefficient(mainlog) if a is None or x in a.free_symbols: return [] # violated assumptions logarg = mainlog.args[0] b, c, X1 = _linab(logarg, x) if X1 != X2: return [] # violated assumptions # invert the generator X1 so we have x(u) u = Dummy('rhs') xusolns = solve(X1 - u, x) # There are infinitely many branches for LambertW # but only branches for k = -1 and 0 might be real. The k = 0 # branch is real and the k = -1 branch is real if the LambertW argumen # in in range [-1/e, 0]. Since `solve` does not return infinite # solutions we will only include the -1 branch if it tests as real. # Otherwise, inclusion of any LambertW in the solution indicates to # the user that there are imaginary solutions corresponding to # different k values. lambert_real_branches = [-1, 0] sol = [] # solution of the given Lambert equation is like # sol = -c/b + (a/d)LambertW(arg, k), # where arg = d/(ab)exp((cd-bf)/a/b) and k in lambert_real_branches. # Instead of considering the single arg, `d/(ab)exp((cd-bf)/a/b)`, # the individual `p` roots obtained when writing `exp((cd-bf)/a/b)` # as `exp(A/p) = exp(A)(1/p)`, where `p` is an Integer, are used. # calculating args for LambertW num, den = ((cd-bf)/a/b).as_numer_denom() p, den = den.as_coeff_Mul() e = exp(num/den) t = Dummy('t') args = [d/(ab)t for t in roots(tp - e, t).keys()] # calculating solutions from args for arg in args: for k in lambert_real_branches: w = LambertW(arg, k) if k and not w.is_real: continue rhs = -c/b + (a/d)w for xu in xusolns: sol.append(xu.subs(u, rhs)) return sol def _solve_lambert(f, symbol, gens): """Return solution to ``f`` if it is a Lambert-type expression else raise NotImplementedError. For ``f(X, a..f) = alog(bX + c) + dX - f = 0`` the solution for ``X`` is ``X = -c/b + (a/d)W(d/(ab)exp(cd/a/b)exp(f/a))``. There are a variety of forms for `f(X, a..f)` as enumerated below: 1a1) if B*B = R for R not in [0, 1] (since those cases would already be solved before getting here) then log of both sides gives log(B) + log(log(B)) = log(log(R)) and X = log(B), a = 1, b = 1, c = 0, d = 1, f = log(log(R)) 1a2) if B(blog(B) + c)a = R then log of both sides gives log(B) + alog(blog(B) + c) = log(R) and X = log(B), d=1, f=log(R) 1b) if alog(bB + c) + dB = R and X = B, f = R 2a) if (bB + c)exp(dB + g) = R then log of both sides gives log(bB + c) + dB + g = log(R) and X = B, a = 1, f = log(R) - g 2b) if gexp(dB + h) - bB = c then the log form is log(g) + dB + h - log(bB + c) = 0 and X = B, a = -1, f = -h - log(g) 3) if dp(aB + g) - bB = c then the log form is log(d) + (aB + g)log(p) - log(bB + c) = 0 and X = B, a = -1, d = alog(p), f = -log(d) - glog(p) """ def _solve_even_degree_expr(expr, t, symbol): """Return the unique solutions of equations derived from ``expr`` by replacing ``t`` with ``+/- symbol``. Parameters ========== expr : Expr The expression which includes a dummy variable t to be replaced with +symbol and -symbol. symbol : Symbol The symbol for which a solution is being sought. Returns ======= List of unique solution of the two equations generated by replacing ``t`` with positive and negative ``symbol``. Notes ===== If ``expr = 2log(t) + x/2` then solutions for ``2log(x) + x/2 = 0`` and ``2log(-x) + x/2 = 0`` are returned by this function. Though this may seem counter-intuitive, one must note that the ``expr`` being solved here has been derived from a different expression. For an expression like ``eq = x2g(x) = 1``, if we take the log of both sides we obtain ``log(x*2) + log(g(x)) = 0``. If x is positive then this simplifies to ``2log(x) + log(g(x)) = 0``; the Lambert-solving routines will return solutions for this, but we must also consider the solutions for ``2log(-x) + log(g(x))`` since those must also be a solution of ``eq`` which has the same value when the ``x`` in ``x2`` is negated. If `g(x)` does not have even powers of symbol then we don't want to replace the ``x`` there with ``-x``. So the role of the ``t`` in the expression received by this function is to mark where ``+/-x`` should be inserted before obtaining the Lambert solutions. """ nlhs, plhs = [ expr.xreplace({t: sgnsymbol}) for sgn in (-1, 1)] sols = _solve_lambert(nlhs, symbol, gens) if plhs != nlhs: sols.extend(_solve_lambert(plhs, symbol, gens)) # uniq is needed for a case like # 2log(t) - log(-z2) + log(z + log(x) + log(z)) # where subtituting t with +/-x gives all the same solution; # uniq, rather than list(set()), is used to maintain canonical # order return list(uniq(sols)) nrhs, lhs = f.as_independent(symbol, as_Add=True) rhs = -nrhs lamcheck = [tmp for tmp in gens if (tmp.func in [exp, log] or (tmp.is_Pow and symbol in tmp.exp.free_symbols))] if not lamcheck: raise NotImplementedError() if lhs.is_Add or lhs.is_Mul: # replacing all even_degrees of symbol with dummy variable t # since these will need special handling; non-Add/Mul do not # need this handling t = Dummy('t', symbol.assumptions0) lhs = lhs.replace( lambda i: # find symboleven i.is_Pow and i.base == symbol and i.exp.is_even, lambda i: # replace teven ti.exp) if lhs.is_Add and lhs.has(t): t_indep = lhs.subs(t, 0) t_term = lhs - t_indep _rhs = rhs - t_indep if not t_term.is_Add and _rhs and not ( t_term.has(S.ComplexInfinity, S.NaN)): eq = expand_log(log(t_term) - log(_rhs)) return _solve_even_degree_expr(eq, t, symbol) elif lhs.is_Mul and rhs: # this needs to happen whether t is present or not lhs = expand_log(log(lhs), force=True) rhs = log(rhs) if lhs.has(t) and lhs.is_Add: # it expanded from Mul to Add eq = lhs - rhs return _solve_even_degree_expr(eq, t, symbol) # restore symbol in lhs lhs = lhs.xreplace({t: symbol}) lhs = powsimp(factor(lhs, deep=True)) # make sure we have inverted as completely as possible r = Dummy() i, lhs = _invert(lhs - r, symbol) rhs = i.xreplace({r: rhs}) # For the first forms: # # 1a1) BB = R will arrive here as Blog(B) = log(R) # lhs is Mul so take log of both sides: # log(B) + log(log(B)) = log(log(R)) # 1a2) B(blog(B) + c)*a = R will arrive unchanged so # lhs is Mul, so take log of both sides: # log(B) + alog(blog(B) + c) = log(R) # 1b) dlog(aB + b) + cB = R will arrive unchanged so # lhs is Add, so isolate cB and expand log of both sides: # log(c) + log(B) = log(R - dlog(aB + b)) soln = [] if not soln: mainlog = _mostfunc(lhs, log, symbol) if mainlog: if lhs.is_Mul and rhs != 0: soln = _lambert(log(lhs) - log(rhs), symbol) elif lhs.is_Add: other = lhs.subs(mainlog, 0) if other and not other.is_Add and [ tmp for tmp in other.atoms(Pow) if symbol in tmp.free_symbols]: if not rhs: diff = log(other) - log(other - lhs) else: diff = log(lhs - other) - log(rhs - other) soln = _lambert(expand_log(diff), symbol) else: #it's ready to go soln = _lambert(lhs - rhs, symbol) # For the next forms, # # collect on main exp # 2a) (bB + c)exp(dB + g) = R # lhs is mul, so take log of both sides: # log(bB + c) + dB = log(R) - g # 2b) gexp(dB + h) - bB = R # lhs is add, so add bB to both sides, # take the log of both sides and rearrange to give # log(R + bB) - dB = log(g) + h if not soln: mainexp = _mostfunc(lhs, exp, symbol) if mainexp: lhs = collect(lhs, mainexp) if lhs.is_Mul and rhs != 0: soln = _lambert(expand_log(log(lhs) - log(rhs)), symbol) elif lhs.is_Add: # move all but mainexp-containing term to rhs other = lhs.subs(mainexp, 0) mainterm = lhs - other rhs = rhs - other if (mainterm.could_extract_minus_sign() and rhs.could_extract_minus_sign()): mainterm = -1 rhs = -1 diff = log(mainterm) - log(rhs) soln = _lambert(expand_log(diff), symbol) # For the last form: # # 3) dp(aB + g) - bB = c # collect on main pow, add bB to both sides, # take log of both sides and rearrange to give # aBlog(p) - log(bB + c) = -log(d) - glog(p) if not soln: mainpow = _mostfunc(lhs, Pow, symbol) if mainpow and symbol in mainpow.exp.free_symbols: lhs = collect(lhs, mainpow) if lhs.is_Mul and rhs != 0: # bB = 0 soln = _lambert(expand_log(log(lhs) - log(rhs)), symbol) elif lhs.is_Add: # move all but mainpow-containing term to rhs other = lhs.subs(mainpow, 0) mainterm = lhs - other rhs = rhs - other diff = log(mainterm) - log(rhs) soln = _lambert(expand_log(diff), symbol) if not soln: raise NotImplementedError('%s does not appear to have a solution in ' 'terms of LambertW' % f) return list(ordered(soln)) def bivariate_type(f, x, y, kwargs): """Given an expression, f, 3 tests will be done to see what type of composite bivariate it might be, options for u(x, y) are:: xy x+y xy+x xy+y If it matches one of these types, ``u(x, y)``, ``P(u)`` and dummy variable ``u`` will be returned. Solving ``P(u)`` for ``u`` and equating the solutions to ``u(x, y)`` and then solving for ``x`` or ``y`` is equivalent to solving the original expression for ``x`` or ``y``. If ``x`` and ``y`` represent two functions in the same variable, e.g. ``x = g(t)`` and ``y = h(t)``, then if ``u(x, y) - p`` can be solved for ``t`` then these represent the solutions to ``P(u) = 0`` when ``p`` are the solutions of ``P(u) = 0``. Only positive values of ``u`` are considered. Examples ======== >>> from sympy.solvers.solvers import solve >>> from sympy.solvers.bivariate import bivariate_type >>> from sympy.abc import x, y >>> eq = (x2 - 3).subs(x, x + y) >>> bivariate_type(eq, x, y) (x + y, _u2 - 3, _u) >>> uxy, pu, u = _ >>> usol = solve(pu, u); usol [sqrt(3)] >>> [solve(uxy - s) for s in solve(pu, u)] [[{x: -y + sqrt(3)}]] >>> all(eq.subs(s).equals(0) for sol in _ for s in sol) True """ u = Dummy('u', positive=True) if kwargs.pop('first', True): p = Poly(f, x, y) f = p.as_expr() _x = Dummy() _y = Dummy() rv = bivariate_type(Poly(f.subs({x: _x, y: _y}), _x, _y), _x, _y, first=False) if rv: reps = {_x: x, _y: y} return rv[0].xreplace(reps), rv[1].xreplace(reps), rv[2] return p = f f = p.as_expr() # f(xy) args = Add.make_args(p.as_expr()) new = [] for a in args: a = _mexpand(a.subs(x, u/y)) free = a.free_symbols if x in free or y in free: break new.append(a) else: return xy, Add(new), u def ok(f, v, c): new = _mexpand(f.subs(v, c)) free = new.free_symbols return None if (x in free or y in free) else new # f(ax + by) new = [] d = p.degree(x) if p.degree(y) == d: a = root(p.coeff_monomial(xd), d) b = root(p.coeff_monomial(yd), d) new = ok(f, x, (u - by)/a) if new is not None: return ax + by, new, u # f(axy + by) new = [] d = p.degree(x) if p.degree(y) == d: for itry in range(2): a = root(p.coeff_monomial(xdyd), d) b = root(p.coeff_monomial(yd), d) new = ok(f, x, (u - by)/a/y) if new is not None: return axy + by, new, u x, y = y, x
3f48c72c1b29df48db19a2b984988b62f0f272dfdcd306248dc749238dd055dd	r""" This module contains :py:meth:`~sympy.solvers.ode.dsolve` and different helper functions that it uses. :py:meth:`~sympy.solvers.ode.dsolve` solves ordinary differential equations. See the docstring on the various functions for their uses. Note that partial differential equations support is in ``pde.py``. Note that hint functions have docstrings describing their various methods, but they are intended for internal use. Use ``dsolve(ode, func, hint=hint)`` to solve an ODE using a specific hint. See also the docstring on :py:meth:`~sympy.solvers.ode.dsolve`. Functions in this module These are the user functions in this module: - :py:meth:`~sympy.solvers.ode.dsolve` - Solves ODEs. - :py:meth:`~sympy.solvers.ode.classify_ode` - Classifies ODEs into possible hints for :py:meth:`~sympy.solvers.ode.dsolve`. - :py:meth:`~sympy.solvers.ode.checkodesol` - Checks if an equation is the solution to an ODE. - :py:meth:`~sympy.solvers.ode.homogeneous_order` - Returns the homogeneous order of an expression. - :py:meth:`~sympy.solvers.ode.infinitesimals` - Returns the infinitesimals of the Lie group of point transformations of an ODE, such that it is invariant. - :py:meth:`~sympy.solvers.ode_checkinfsol` - Checks if the given infinitesimals are the actual infinitesimals of a first order ODE. These are the non-solver helper functions that are for internal use. The user should use the various options to :py:meth:`~sympy.solvers.ode.dsolve` to obtain the functionality provided by these functions: - :py:meth:`~sympy.solvers.ode.odesimp` - Does all forms of ODE simplification. - :py:meth:`~sympy.solvers.ode.ode_sol_simplicity` - A key function for comparing solutions by simplicity. - :py:meth:`~sympy.solvers.ode.constantsimp` - Simplifies arbitrary constants. - :py:meth:`~sympy.solvers.ode.constant_renumber` - Renumber arbitrary constants. - :py:meth:`~sympy.solvers.ode._handle_Integral` - Evaluate unevaluated Integrals. See also the docstrings of these functions. Currently implemented solver methods The following methods are implemented for solving ordinary differential equations. See the docstrings of the various hint functions for more information on each (run ``help(ode)``): - 1st order separable differential equations. - 1st order differential equations whose coefficients or `dx` and `dy` are functions homogeneous of the same order. - 1st order exact differential equations. - 1st order linear differential equations. - 1st order Bernoulli differential equations. - Power series solutions for first order differential equations. - Lie Group method of solving first order differential equations. - 2nd order Liouville differential equations. - Power series solutions for second order differential equations at ordinary and regular singular points. - `n`\th order differential equation that can be solved with algebraic rearrangement and integration. - `n`\th order linear homogeneous differential equation with constant coefficients. - `n`\th order linear inhomogeneous differential equation with constant coefficients using the method of undetermined coefficients. - `n`\th order linear inhomogeneous differential equation with constant coefficients using the method of variation of parameters. Philosophy behind this module This module is designed to make it easy to add new ODE solving methods without having to mess with the solving code for other methods. The idea is that there is a :py:meth:`~sympy.solvers.ode.classify_ode` function, which takes in an ODE and tells you what hints, if any, will solve the ODE. It does this without attempting to solve the ODE, so it is fast. Each solving method is a hint, and it has its own function, named ``ode_<hint>``. That function takes in the ODE and any match expression gathered by :py:meth:`~sympy.solvers.ode.classify_ode` and returns a solved result. If this result has any integrals in it, the hint function will return an unevaluated :py:class:`~sympy.integrals.Integral` class. :py:meth:`~sympy.solvers.ode.dsolve`, which is the user wrapper function around all of this, will then call :py:meth:`~sympy.solvers.ode.odesimp` on the result, which, among other things, will attempt to solve the equation for the dependent variable (the function we are solving for), simplify the arbitrary constants in the expression, and evaluate any integrals, if the hint allows it. How to add new solution methods If you have an ODE that you want :py:meth:`~sympy.solvers.ode.dsolve` to be able to solve, try to avoid adding special case code here. Instead, try finding a general method that will solve your ODE, as well as others. This way, the :py:mod:`~sympy.solvers.ode` module will become more robust, and unhindered by special case hacks. WolphramAlpha and Maple's DETools[odeadvisor] function are two resources you can use to classify a specific ODE. It is also better for a method to work with an `n`\th order ODE instead of only with specific orders, if possible. To add a new method, there are a few things that you need to do. First, you need a hint name for your method. Try to name your hint so that it is unambiguous with all other methods, including ones that may not be implemented yet. If your method uses integrals, also include a ``hint_Integral`` hint. If there is more than one way to solve ODEs with your method, include a hint for each one, as well as a ``<hint>_best`` hint. Your ``ode_<hint>_best()`` function should choose the best using min with ``ode_sol_simplicity`` as the key argument. See :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_best`, for example. The function that uses your method will be called ``ode_<hint>()``, so the hint must only use characters that are allowed in a Python function name (alphanumeric characters and the underscore '``_``' character). Include a function for every hint, except for ``_Integral`` hints (:py:meth:`~sympy.solvers.ode.dsolve` takes care of those automatically). Hint names should be all lowercase, unless a word is commonly capitalized (such as Integral or Bernoulli). If you have a hint that you do not want to run with ``all_Integral`` that doesn't have an ``_Integral`` counterpart (such as a best hint that would defeat the purpose of ``all_Integral``), you will need to remove it manually in the :py:meth:`~sympy.solvers.ode.dsolve` code. See also the :py:meth:`~sympy.solvers.ode.classify_ode` docstring for guidelines on writing a hint name. Determine in general how the solutions returned by your method compare with other methods that can potentially solve the same ODEs. Then, put your hints in the :py:data:`~sympy.solvers.ode.allhints` tuple in the order that they should be called. The ordering of this tuple determines which hints are default. Note that exceptions are ok, because it is easy for the user to choose individual hints with :py:meth:`~sympy.solvers.ode.dsolve`. In general, ``_Integral`` variants should go at the end of the list, and ``_best`` variants should go before the various hints they apply to. For example, the ``undetermined_coefficients`` hint comes before the ``variation_of_parameters`` hint because, even though variation of parameters is more general than undetermined coefficients, undetermined coefficients generally returns cleaner results for the ODEs that it can solve than variation of parameters does, and it does not require integration, so it is much faster. Next, you need to have a match expression or a function that matches the type of the ODE, which you should put in :py:meth:`~sympy.solvers.ode.classify_ode` (if the match function is more than just a few lines, like :py:meth:`~sympy.solvers.ode._undetermined_coefficients_match`, it should go outside of :py:meth:`~sympy.solvers.ode.classify_ode`). It should match the ODE without solving for it as much as possible, so that :py:meth:`~sympy.solvers.ode.classify_ode` remains fast and is not hindered by bugs in solving code. Be sure to consider corner cases. For example, if your solution method involves dividing by something, make sure you exclude the case where that division will be 0. In most cases, the matching of the ODE will also give you the various parts that you need to solve it. You should put that in a dictionary (``.match()`` will do this for you), and add that as ``matching_hints['hint'] = matchdict`` in the relevant part of :py:meth:`~sympy.solvers.ode.classify_ode`. :py:meth:`~sympy.solvers.ode.classify_ode` will then send this to :py:meth:`~sympy.solvers.ode.dsolve`, which will send it to your function as the ``match`` argument. Your function should be named ``ode_<hint>(eq, func, order, match)`. If you need to send more information, put it in the ``match`` dictionary. For example, if you had to substitute in a dummy variable in :py:meth:`~sympy.solvers.ode.classify_ode` to match the ODE, you will need to pass it to your function using the `match` dict to access it. You can access the independent variable using ``func.args[0]``, and the dependent variable (the function you are trying to solve for) as ``func.func``. If, while trying to solve the ODE, you find that you cannot, raise ``NotImplementedError``. :py:meth:`~sympy.solvers.ode.dsolve` will catch this error with the ``all`` meta-hint, rather than causing the whole routine to fail. Add a docstring to your function that describes the method employed. Like with anything else in SymPy, you will need to add a doctest to the docstring, in addition to real tests in ``test_ode.py``. Try to maintain consistency with the other hint functions' docstrings. Add your method to the list at the top of this docstring. Also, add your method to ``ode.rst`` in the ``docs/src`` directory, so that the Sphinx docs will pull its docstring into the main SymPy documentation. Be sure to make the Sphinx documentation by running ``make html`` from within the doc directory to verify that the docstring formats correctly. If your solution method involves integrating, use :py:meth:`Integral() <sympy.integrals.integrals.Integral>` instead of :py:meth:`~sympy.core.expr.Expr.integrate`. This allows the user to bypass hard/slow integration by using the ``_Integral`` variant of your hint. In most cases, calling :py:meth:`sympy.core.basic.Basic.doit` will integrate your solution. If this is not the case, you will need to write special code in :py:meth:`~sympy.solvers.ode._handle_Integral`. Arbitrary constants should be symbols named ``C1``, ``C2``, and so on. All solution methods should return an equality instance. If you need an arbitrary number of arbitrary constants, you can use ``constants = numbered_symbols(prefix='C', cls=Symbol, start=1)``. If it is possible to solve for the dependent function in a general way, do so. Otherwise, do as best as you can, but do not call solve in your ``ode_<hint>()`` function. :py:meth:`~sympy.solvers.ode.odesimp` will attempt to solve the solution for you, so you do not need to do that. Lastly, if your ODE has a common simplification that can be applied to your solutions, you can add a special case in :py:meth:`~sympy.solvers.ode.odesimp` for it. For example, solutions returned from the ``1st_homogeneous_coeff`` hints often have many :py:meth:`~sympy.functions.log` terms, so :py:meth:`~sympy.solvers.ode.odesimp` calls :py:meth:`~sympy.simplify.simplify.logcombine` on them (it also helps to write the arbitrary constant as ``log(C1)`` instead of ``C1`` in this case). Also consider common ways that you can rearrange your solution to have :py:meth:`~sympy.solvers.ode.constantsimp` take better advantage of it. It is better to put simplification in :py:meth:`~sympy.solvers.ode.odesimp` than in your method, because it can then be turned off with the simplify flag in :py:meth:`~sympy.solvers.ode.dsolve`. If you have any extraneous simplification in your function, be sure to only run it using ``if match.get('simplify', True):``, especially if it can be slow or if it can reduce the domain of the solution. Finally, as with every contribution to SymPy, your method will need to be tested. Add a test for each method in ``test_ode.py``. Follow the conventions there, i.e., test the solver using ``dsolve(eq, f(x), hint=your_hint)``, and also test the solution using :py:meth:`~sympy.solvers.ode.checkodesol` (you can put these in a separate tests and skip/XFAIL if it runs too slow/doesn't work). Be sure to call your hint specifically in :py:meth:`~sympy.solvers.ode.dsolve`, that way the test won't be broken simply by the introduction of another matching hint. If your method works for higher order (>1) ODEs, you will need to run ``sol = constant_renumber(sol, 'C', 1, order)`` for each solution, where ``order`` is the order of the ODE. This is because ``constant_renumber`` renumbers the arbitrary constants by printing order, which is platform dependent. Try to test every corner case of your solver, including a range of orders if it is a `n`\th order solver, but if your solver is slow, such as if it involves hard integration, try to keep the test run time down. Feel free to refactor existing hints to avoid duplicating code or creating inconsistencies. If you can show that your method exactly duplicates an existing method, including in the simplicity and speed of obtaining the solutions, then you can remove the old, less general method. The existing code is tested extensively in ``test_ode.py``, so if anything is broken, one of those tests will surely fail. """ from __future__ import print_function, division from collections import defaultdict from itertools import islice from sympy.core import Add, S, Mul, Pow, oo from sympy.core.compatibility import ordered, iterable, is_sequence, range, string_types from sympy.core.containers import Tuple from sympy.core.exprtools import factor_terms from sympy.core.expr import AtomicExpr, Expr from sympy.core.function import (Function, Derivative, AppliedUndef, diff, expand, expand_mul, Subs, _mexpand) from sympy.core.multidimensional import vectorize from sympy.core.numbers import NaN, zoo, I, Number from sympy.core.relational import Equality, Eq from sympy.core.symbol import Symbol, Wild, Dummy, symbols from sympy.core.sympify import sympify from sympy.logic.boolalg import (BooleanAtom, And, Not, BooleanTrue, BooleanFalse) from sympy.functions import cos, exp, im, log, re, sin, tan, sqrt, \ atan2, conjugate, Piecewise from sympy.functions.combinatorial.factorials import factorial from sympy.integrals.integrals import Integral, integrate from sympy.matrices import wronskian, Matrix, eye, zeros from sympy.polys import (Poly, RootOf, rootof, terms_gcd, PolynomialError, lcm, roots) from sympy.polys.polyroots import roots_quartic from sympy.polys.polytools import cancel, degree, div from sympy.series import Order from sympy.series.series import series from sympy.simplify import collect, logcombine, powsimp, separatevars, \ simplify, trigsimp, posify, cse from sympy.simplify.powsimp import powdenest from sympy.simplify.radsimp import collect_const from sympy.solvers import solve from sympy.solvers.pde import pdsolve from sympy.utilities import numbered_symbols, default_sort_key, sift from sympy.solvers.deutils import _preprocess, ode_order, _desolve #: This is a list of hints in the order that they should be preferred by #: :py:meth:`~sympy.solvers.ode.classify_ode`. In general, hints earlier in the #: list should produce simpler solutions than those later in the list (for #: ODEs that fit both). For now, the order of this list is based on empirical #: observations by the developers of SymPy. #: #: The hint used by :py:meth:`~sympy.solvers.ode.dsolve` for a specific ODE #: can be overridden (see the docstring). #: #: In general, ``_Integral`` hints are grouped at the end of the list, unless #: there is a method that returns an unevaluable integral most of the time #: (which go near the end of the list anyway). ``default``, ``all``, #: ``best``, and ``all_Integral`` meta-hints should not be included in this #: list, but ``_best`` and ``_Integral`` hints should be included. allhints = ( "nth_algebraic", "separable", "1st_exact", "1st_linear", "Bernoulli", "Riccati_special_minus2", "1st_homogeneous_coeff_best", "1st_homogeneous_coeff_subs_indep_div_dep", "1st_homogeneous_coeff_subs_dep_div_indep", "almost_linear", "linear_coefficients", "separable_reduced", "1st_power_series", "lie_group", "nth_linear_constant_coeff_homogeneous", "nth_linear_euler_eq_homogeneous", "nth_linear_constant_coeff_undetermined_coefficients", "nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients", "nth_linear_constant_coeff_variation_of_parameters", "nth_linear_euler_eq_nonhomogeneous_variation_of_parameters", "Liouville", "nth_order_reducible", "2nd_power_series_ordinary", "2nd_power_series_regular", "nth_algebraic_Integral", "separable_Integral", "1st_exact_Integral", "1st_linear_Integral", "Bernoulli_Integral", "1st_homogeneous_coeff_subs_indep_div_dep_Integral", "1st_homogeneous_coeff_subs_dep_div_indep_Integral", "almost_linear_Integral", "linear_coefficients_Integral", "separable_reduced_Integral", "nth_linear_constant_coeff_variation_of_parameters_Integral", "nth_linear_euler_eq_nonhomogeneous_variation_of_parameters_Integral", "Liouville_Integral", ) lie_heuristics = ( "abaco1_simple", "abaco1_product", "abaco2_similar", "abaco2_unique_unknown", "abaco2_unique_general", "linear", "function_sum", "bivariate", "chi" ) def sub_func_doit(eq, func, new): r""" When replacing the func with something else, we usually want the derivative evaluated, so this function helps in making that happen. Examples ======== >>> from sympy import Derivative, symbols, Function >>> from sympy.solvers.ode import sub_func_doit >>> x, z = symbols('x, z') >>> y = Function('y') >>> sub_func_doit(3Derivative(y(x), x) - 1, y(x), x) 2 >>> sub_func_doit(xDerivative(y(x), x) - y(x)*2 + y(x), y(x), ... 1/(x(z + 1/x))) x(-1/(x2(z + 1/x)) + 1/(x*3(z + 1/x)*2)) + 1/(x(z + 1/x)) ...- 1/(x*2(z + 1/x)*2) """ reps= {func: new} for d in eq.atoms(Derivative): if d.expr == func: reps[d] = new.diff(d.variable_count) else: reps[d] = d.xreplace({func: new}).doit(deep=False) return eq.xreplace(reps) def get_numbered_constants(eq, num=1, start=1, prefix='C'): """ Returns a list of constants that do not occur in eq already. """ ncs = iter_numbered_constants(eq, start, prefix) Cs = [next(ncs) for i in range(num)] return (Cs[0] if num == 1 else tuple(Cs)) def iter_numbered_constants(eq, start=1, prefix='C'): """ Returns an iterator of constants that do not occur in eq already. """ if isinstance(eq, Expr): eq = [eq] elif not iterable(eq): raise ValueError("Expected Expr or iterable but got %s" % eq) atom_set = set().union([i.free_symbols for i in eq]) func_set = set().union([i.atoms(Function) for i in eq]) if func_set: atom_set \|= {Symbol(str(f.func)) for f in func_set} return numbered_symbols(start=start, prefix=prefix, exclude=atom_set) def dsolve(eq, func=None, hint="default", simplify=True, ics= None, xi=None, eta=None, x0=0, n=6, kwargs): r""" Solves any (supported) kind of ordinary differential equation and system of ordinary differential equations. For single ordinary differential equation ========================================= It is classified under this when number of equation in ``eq`` is one. Usage ``dsolve(eq, f(x), hint)`` -> Solve ordinary differential equation ``eq`` for function ``f(x)``, using method ``hint``. Details ``eq`` can be any supported ordinary differential equation (see the :py:mod:`~sympy.solvers.ode` docstring for supported methods). This can either be an :py:class:`~sympy.core.relational.Equality`, or an expression, which is assumed to be equal to ``0``. ``f(x)`` is a function of one variable whose derivatives in that variable make up the ordinary differential equation ``eq``. In many cases it is not necessary to provide this; it will be autodetected (and an error raised if it couldn't be detected). ``hint`` is the solving method that you want dsolve to use. Use ``classify_ode(eq, f(x))`` to get all of the possible hints for an ODE. The default hint, ``default``, will use whatever hint is returned first by :py:meth:`~sympy.solvers.ode.classify_ode`. See Hints below for more options that you can use for hint. ``simplify`` enables simplification by :py:meth:`~sympy.solvers.ode.odesimp`. See its docstring for more information. Turn this off, for example, to disable solving of solutions for ``func`` or simplification of arbitrary constants. It will still integrate with this hint. Note that the solution may contain more arbitrary constants than the order of the ODE with this option enabled. ``xi`` and ``eta`` are the infinitesimal functions of an ordinary differential equation. They are the infinitesimals of the Lie group of point transformations for which the differential equation is invariant. The user can specify values for the infinitesimals. If nothing is specified, ``xi`` and ``eta`` are calculated using :py:meth:`~sympy.solvers.ode.infinitesimals` with the help of various heuristics. ``ics`` is the set of initial/boundary conditions for the differential equation. It should be given in the form of ``{f(x0): x1, f(x).diff(x).subs(x, x2): x3}`` and so on. For power series solutions, if no initial conditions are specified ``f(0)`` is assumed to be ``C0`` and the power series solution is calculated about 0. ``x0`` is the point about which the power series solution of a differential equation is to be evaluated. ``n`` gives the exponent of the dependent variable up to which the power series solution of a differential equation is to be evaluated. Hints Aside from the various solving methods, there are also some meta-hints that you can pass to :py:meth:`~sympy.solvers.ode.dsolve`: ``default``: This uses whatever hint is returned first by :py:meth:`~sympy.solvers.ode.classify_ode`. This is the default argument to :py:meth:`~sympy.solvers.ode.dsolve`. ``all``: To make :py:meth:`~sympy.solvers.ode.dsolve` apply all relevant classification hints, use ``dsolve(ODE, func, hint="all")``. This will return a dictionary of ``hint:solution`` terms. If a hint causes dsolve to raise the ``NotImplementedError``, value of that hint's key will be the exception object raised. The dictionary will also include some special keys: - ``order``: The order of the ODE. See also :py:meth:`~sympy.solvers.deutils.ode_order` in ``deutils.py``. - ``best``: The simplest hint; what would be returned by ``best`` below. - ``best_hint``: The hint that would produce the solution given by ``best``. If more than one hint produces the best solution, the first one in the tuple returned by :py:meth:`~sympy.solvers.ode.classify_ode` is chosen. - ``default``: The solution that would be returned by default. This is the one produced by the hint that appears first in the tuple returned by :py:meth:`~sympy.solvers.ode.classify_ode`. ``all_Integral``: This is the same as ``all``, except if a hint also has a corresponding ``_Integral`` hint, it only returns the ``_Integral`` hint. This is useful if ``all`` causes :py:meth:`~sympy.solvers.ode.dsolve` to hang because of a difficult or impossible integral. This meta-hint will also be much faster than ``all``, because :py:meth:`~sympy.core.expr.Expr.integrate` is an expensive routine. ``best``: To have :py:meth:`~sympy.solvers.ode.dsolve` try all methods and return the simplest one. This takes into account whether the solution is solvable in the function, whether it contains any Integral classes (i.e. unevaluatable integrals), and which one is the shortest in size. See also the :py:meth:`~sympy.solvers.ode.classify_ode` docstring for more info on hints, and the :py:mod:`~sympy.solvers.ode` docstring for a list of all supported hints. Tips - You can declare the derivative of an unknown function this way: >>> from sympy import Function, Derivative >>> from sympy.abc import x # x is the independent variable >>> f = Function("f")(x) # f is a function of x >>> # f_ will be the derivative of f with respect to x >>> f_ = Derivative(f, x) - See ``test_ode.py`` for many tests, which serves also as a set of examples for how to use :py:meth:`~sympy.solvers.ode.dsolve`. - :py:meth:`~sympy.solvers.ode.dsolve` always returns an :py:class:`~sympy.core.relational.Equality` class (except for the case when the hint is ``all`` or ``all_Integral``). If possible, it solves the solution explicitly for the function being solved for. Otherwise, it returns an implicit solution. - Arbitrary constants are symbols named ``C1``, ``C2``, and so on. - Because all solutions should be mathematically equivalent, some hints may return the exact same result for an ODE. Often, though, two different hints will return the same solution formatted differently. The two should be equivalent. Also note that sometimes the values of the arbitrary constants in two different solutions may not be the same, because one constant may have "absorbed" other constants into it. - Do ``help(ode.ode_<hintname>)`` to get help more information on a specific hint, where ``<hintname>`` is the name of a hint without ``_Integral``. For system of ordinary differential equations ============================================= Usage ``dsolve(eq, func)`` -> Solve a system of ordinary differential equations ``eq`` for ``func`` being list of functions including `x(t)`, `y(t)`, `z(t)` where number of functions in the list depends upon the number of equations provided in ``eq``. Details ``eq`` can be any supported system of ordinary differential equations This can either be an :py:class:`~sympy.core.relational.Equality`, or an expression, which is assumed to be equal to ``0``. ``func`` holds ``x(t)`` and ``y(t)`` being functions of one variable which together with some of their derivatives make up the system of ordinary differential equation ``eq``. It is not necessary to provide this; it will be autodetected (and an error raised if it couldn't be detected). Hints** The hints are formed by parameters returned by classify_sysode, combining them give hints name used later for forming method name. Examples ======== >>> from sympy import Function, dsolve, Eq, Derivative, sin, cos, symbols >>> from sympy.abc import x >>> f = Function('f') >>> dsolve(Derivative(f(x), x, x) + 9f(x), f(x)) Eq(f(x), C1sin(3x) + C2cos(3x)) >>> eq = sin(x)cos(f(x)) + cos(x)sin(f(x))f(x).diff(x) >>> dsolve(eq, hint='1st_exact') [Eq(f(x), -acos(C1/cos(x)) + 2pi), Eq(f(x), acos(C1/cos(x)))] >>> dsolve(eq, hint='almost_linear') [Eq(f(x), -acos(C1/cos(x)) + 2pi), Eq(f(x), acos(C1/cos(x)))] >>> t = symbols('t') >>> x, y = symbols('x, y', cls=Function) >>> eq = (Eq(Derivative(x(t),t), 12tx(t) + 8y(t)), Eq(Derivative(y(t),t), 21x(t) + 7ty(t))) >>> dsolve(eq) [Eq(x(t), C1x0(t) + C2x0(t)Integral(8exp(Integral(7t, t))exp(Integral(12t, t))/x0(t)2, t)), Eq(y(t), C1y0(t) + C2(y0(t)Integral(8exp(Integral(7t, t))exp(Integral(12t, t))/x0(t)*2, t) + exp(Integral(7t, t))exp(Integral(12t, t))/x0(t)))] >>> eq = (Eq(Derivative(x(t),t),x(t)y(t)sin(t)), Eq(Derivative(y(t),t),y(t)*2sin(t))) >>> dsolve(eq) {Eq(x(t), -exp(C1)/(C2exp(C1) - cos(t))), Eq(y(t), -1/(C1 - cos(t)))} """ if iterable(eq): match = classify_sysode(eq, func) eq = match['eq'] order = match['order'] func = match['func'] t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] # keep highest order term coefficient positive for i in range(len(eq)): for func_ in func: if isinstance(func_, list): pass else: if eq[i].coeff(diff(func[i],t,ode_order(eq[i], func[i]))).is_negative: eq[i] = -eq[i] match['eq'] = eq if len(set(order.values()))!=1: raise ValueError("It solves only those systems of equations whose orders are equal") match['order'] = list(order.values())[0] def recur_len(l): return sum(recur_len(item) if isinstance(item,list) else 1 for item in l) if recur_len(func) != len(eq): raise ValueError("dsolve() and classify_sysode() work with " "number of functions being equal to number of equations") if match['type_of_equation'] is None: raise NotImplementedError else: if match['is_linear'] == True: if match['no_of_equation'] > 3: solvefunc = globals()['sysode_linear_neq_order%(order)s' % match] else: solvefunc = globals()['sysode_linear_%(no_of_equation)seq_order%(order)s' % match] else: solvefunc = globals()['sysode_nonlinear_%(no_of_equation)seq_order%(order)s' % match] sols = solvefunc(match) if ics: constants = Tuple(sols).free_symbols - Tuple(eq).free_symbols solved_constants = solve_ics(sols, func, constants, ics) return [sol.subs(solved_constants) for sol in sols] return sols else: given_hint = hint # hint given by the user # See the docstring of _desolve for more details. hints = _desolve(eq, func=func, hint=hint, simplify=True, xi=xi, eta=eta, type='ode', ics=ics, x0=x0, n=n, kwargs) eq = hints.pop('eq', eq) all_ = hints.pop('all', False) if all_: retdict = {} failed_hints = {} gethints = classify_ode(eq, dict=True) orderedhints = gethints['ordered_hints'] for hint in hints: try: rv = _helper_simplify(eq, hint, hints[hint], simplify) except NotImplementedError as detail: failed_hints[hint] = detail else: retdict[hint] = rv func = hints[hint]['func'] retdict['best'] = min(list(retdict.values()), key=lambda x: ode_sol_simplicity(x, func, trysolving=not simplify)) if given_hint == 'best': return retdict['best'] for i in orderedhints: if retdict['best'] == retdict.get(i, None): retdict['best_hint'] = i break retdict['default'] = gethints['default'] retdict['order'] = gethints['order'] retdict.update(failed_hints) return retdict else: # The key 'hint' stores the hint needed to be solved for. hint = hints['hint'] return _helper_simplify(eq, hint, hints, simplify, ics=ics) def _helper_simplify(eq, hint, match, simplify=True, ics=None, kwargs): r""" Helper function of dsolve that calls the respective :py:mod:`~sympy.solvers.ode` functions to solve for the ordinary differential equations. This minimizes the computation in calling :py:meth:`~sympy.solvers.deutils._desolve` multiple times. """ r = match if hint.endswith('_Integral'): solvefunc = globals()['ode_' + hint[:-len('_Integral')]] else: solvefunc = globals()['ode_' + hint] func = r['func'] order = r['order'] match = r[hint] free = eq.free_symbols cons = lambda s: s.free_symbols.difference(free) if simplify: # odesimp() will attempt to integrate, if necessary, apply constantsimp(), # attempt to solve for func, and apply any other hint specific # simplifications sols = solvefunc(eq, func, order, match) if isinstance(sols, Expr): rv = odesimp(eq, sols, func, hint) else: rv = [odesimp(eq, s, func, hint) for s in sols] else: # We still want to integrate (you can disable it separately with the hint) match['simplify'] = False # Some hints can take advantage of this option rv = _handle_Integral(solvefunc(eq, func, order, match), func, hint) if ics and not 'power_series' in hint: if isinstance(rv, Expr): solved_constants = solve_ics([rv], [r['func']], cons(rv), ics) rv = rv.subs(solved_constants) else: rv1 = [] for s in rv: try: solved_constants = solve_ics([s], [r['func']], cons(s), ics) except ValueError: continue rv1.append(s.subs(solved_constants)) if len(rv1) == 1: return rv1[0] rv = rv1 return rv def solve_ics(sols, funcs, constants, ics): """ Solve for the constants given initial conditions ``sols`` is a list of solutions. ``funcs`` is a list of functions. ``constants`` is a list of constants. ``ics`` is the set of initial/boundary conditions for the differential equation. It should be given in the form of ``{f(x0): x1, f(x).diff(x).subs(x, x2): x3}`` and so on. Returns a dictionary mapping constants to values. ``solution.subs(constants)`` will replace the constants in ``solution``. Example ======= >>> # From dsolve(f(x).diff(x) - f(x), f(x)) >>> from sympy import symbols, Eq, exp, Function >>> from sympy.solvers.ode import solve_ics >>> f = Function('f') >>> x, C1 = symbols('x C1') >>> sols = [Eq(f(x), C1exp(x))] >>> funcs = [f(x)] >>> constants = [C1] >>> ics = {f(0): 2} >>> solved_constants = solve_ics(sols, funcs, constants, ics) >>> solved_constants {C1: 2} >>> sols[0].subs(solved_constants) Eq(f(x), 2exp(x)) """ # Assume ics are of the form f(x0): value or Subs(diff(f(x), x, n), (x, # x0)): value (currently checked by classify_ode). To solve, replace x # with x0, f(x0) with value, then solve for constants. For f^(n)(x0), # differentiate the solution n times, so that f^(n)(x) appears. x = funcs[0].args[0] diff_sols = [] subs_sols = [] diff_variables = set() for funcarg, value in ics.items(): if isinstance(funcarg, AppliedUndef): x0 = funcarg.args[0] matching_func = [f for f in funcs if f.func == funcarg.func][0] S = sols elif isinstance(funcarg, (Subs, Derivative)): if isinstance(funcarg, Subs): # Make sure it stays a subs. Otherwise subs below will produce # a different looking term. funcarg = funcarg.doit() if isinstance(funcarg, Subs): deriv = funcarg.expr x0 = funcarg.point[0] variables = funcarg.expr.variables matching_func = deriv elif isinstance(funcarg, Derivative): deriv = funcarg x0 = funcarg.variables[0] variables = (x,)len(funcarg.variables) matching_func = deriv.subs(x0, x) if variables not in diff_variables: for sol in sols: if sol.has(deriv.expr.func): diff_sols.append(Eq(sol.lhs.diff(variables), sol.rhs.diff(variables))) diff_variables.add(variables) S = diff_sols else: raise NotImplementedError("Unrecognized initial condition") for sol in S: if sol.has(matching_func): sol2 = sol sol2 = sol2.subs(x, x0) sol2 = sol2.subs(funcarg, value) # This check is necessary because of issue #15724 if not isinstance(sol2, BooleanAtom) or not subs_sols: subs_sols = [s for s in subs_sols if not isinstance(s, BooleanAtom)] subs_sols.append(sol2) # TODO: Use solveset here try: solved_constants = solve(subs_sols, constants, dict=True) except NotImplementedError: solved_constants = [] # XXX: We can't differentiate between the solution not existing because of # invalid initial conditions, and not existing because solve is not smart # enough. If we could use solveset, this might be improvable, but for now, # we use NotImplementedError in this case. if not solved_constants: raise ValueError("Couldn't solve for initial conditions") if solved_constants == True: raise ValueError("Initial conditions did not produce any solutions for constants. Perhaps they are degenerate.") if len(solved_constants) > 1: raise NotImplementedError("Initial conditions produced too many solutions for constants") return solved_constants[0] def classify_ode(eq, func=None, dict=False, ics=None, *kwargs): r""" Returns a tuple of possible :py:meth:`~sympy.solvers.ode.dsolve` classifications for an ODE. The tuple is ordered so that first item is the classification that :py:meth:`~sympy.solvers.ode.dsolve` uses to solve the ODE by default. In general, classifications at the near the beginning of the list will produce better solutions faster than those near the end, thought there are always exceptions. To make :py:meth:`~sympy.solvers.ode.dsolve` use a different classification, use ``dsolve(ODE, func, hint=<classification>)``. See also the :py:meth:`~sympy.solvers.ode.dsolve` docstring for different meta-hints you can use. If ``dict`` is true, :py:meth:`~sympy.solvers.ode.classify_ode` will return a dictionary of ``hint:match`` expression terms. This is intended for internal use by :py:meth:`~sympy.solvers.ode.dsolve`. Note that because dictionaries are ordered arbitrarily, this will most likely not be in the same order as the tuple. You can get help on different hints by executing ``help(ode.ode_hintname)``, where ``hintname`` is the name of the hint without ``_Integral``. See :py:data:`~sympy.solvers.ode.allhints` or the :py:mod:`~sympy.solvers.ode` docstring for a list of all supported hints that can be returned from :py:meth:`~sympy.solvers.ode.classify_ode`. Notes ===== These are remarks on hint names. ``_Integral`` If a classification has ``_Integral`` at the end, it will return the expression with an unevaluated :py:class:`~sympy.integrals.Integral` class in it. Note that a hint may do this anyway if :py:meth:`~sympy.core.expr.Expr.integrate` cannot do the integral, though just using an ``_Integral`` will do so much faster. Indeed, an ``_Integral`` hint will always be faster than its corresponding hint without ``_Integral`` because :py:meth:`~sympy.core.expr.Expr.integrate` is an expensive routine. If :py:meth:`~sympy.solvers.ode.dsolve` hangs, it is probably because :py:meth:`~sympy.core.expr.Expr.integrate` is hanging on a tough or impossible integral. Try using an ``_Integral`` hint or ``all_Integral`` to get it return something. Note that some hints do not have ``_Integral`` counterparts. This is because :py:meth:`~sympy.solvers.ode.integrate` is not used in solving the ODE for those method. For example, `n`\th order linear homogeneous ODEs with constant coefficients do not require integration to solve, so there is no ``nth_linear_homogeneous_constant_coeff_Integrate`` hint. You can easily evaluate any unevaluated :py:class:`~sympy.integrals.Integral`\s in an expression by doing ``expr.doit()``. Ordinals Some hints contain an ordinal such as ``1st_linear``. This is to help differentiate them from other hints, as well as from other methods that may not be implemented yet. If a hint has ``nth`` in it, such as the ``nth_linear`` hints, this means that the method used to applies to ODEs of any order. ``indep`` and ``dep`` Some hints contain the words ``indep`` or ``dep``. These reference the independent variable and the dependent function, respectively. For example, if an ODE is in terms of `f(x)`, then ``indep`` will refer to `x` and ``dep`` will refer to `f`. ``subs`` If a hints has the word ``subs`` in it, it means the the ODE is solved by substituting the expression given after the word ``subs`` for a single dummy variable. This is usually in terms of ``indep`` and ``dep`` as above. The substituted expression will be written only in characters allowed for names of Python objects, meaning operators will be spelled out. For example, ``indep``/``dep`` will be written as ``indep_div_dep``. ``coeff`` The word ``coeff`` in a hint refers to the coefficients of something in the ODE, usually of the derivative terms. See the docstring for the individual methods for more info (``help(ode)``). This is contrast to ``coefficients``, as in ``undetermined_coefficients``, which refers to the common name of a method. ``_best`` Methods that have more than one fundamental way to solve will have a hint for each sub-method and a ``_best`` meta-classification. This will evaluate all hints and return the best, using the same considerations as the normal ``best`` meta-hint. Examples ======== >>> from sympy import Function, classify_ode, Eq >>> from sympy.abc import x >>> f = Function('f') >>> classify_ode(Eq(f(x).diff(x), 0), f(x)) ('nth_algebraic', 'separable', '1st_linear', '1st_homogeneous_coeff_best', '1st_homogeneous_coeff_subs_indep_div_dep', '1st_homogeneous_coeff_subs_dep_div_indep', '1st_power_series', 'lie_group', 'nth_linear_constant_coeff_homogeneous', 'nth_linear_euler_eq_homogeneous', 'nth_algebraic_Integral', 'separable_Integral', '1st_linear_Integral', '1st_homogeneous_coeff_subs_indep_div_dep_Integral', '1st_homogeneous_coeff_subs_dep_div_indep_Integral') >>> classify_ode(f(x).diff(x, 2) + 3f(x).diff(x) + 2f(x) - 4) ('nth_linear_constant_coeff_undetermined_coefficients', 'nth_linear_constant_coeff_variation_of_parameters', 'nth_linear_constant_coeff_variation_of_parameters_Integral') """ ics = sympify(ics) prep = kwargs.pop('prep', True) if func and len(func.args) != 1: raise ValueError("dsolve() and classify_ode() only " "work with functions of one variable, not %s" % func) if prep or func is None: eq, func_ = _preprocess(eq, func) if func is None: func = func_ x = func.args[0] f = func.func y = Dummy('y') xi = kwargs.get('xi') eta = kwargs.get('eta') terms = kwargs.get('n') if isinstance(eq, Equality): if eq.rhs != 0: return classify_ode(eq.lhs - eq.rhs, func, dict=dict, ics=ics, xi=xi, n=terms, eta=eta, prep=False) eq = eq.lhs order = ode_order(eq, f(x)) # hint:matchdict or hint:(tuple of matchdicts) # Also will contain "default":<default hint> and "order":order items. matching_hints = {"order": order} if not order: if dict: matching_hints["default"] = None return matching_hints else: return () df = f(x).diff(x) a = Wild('a', exclude=[f(x)]) b = Wild('b', exclude=[f(x)]) c = Wild('c', exclude=[f(x)]) d = Wild('d', exclude=[df, f(x).diff(x, 2)]) e = Wild('e', exclude=[df]) k = Wild('k', exclude=[df]) n = Wild('n', exclude=[x, f(x), df]) c1 = Wild('c1', exclude=[x]) a2 = Wild('a2', exclude=[x, f(x), df]) b2 = Wild('b2', exclude=[x, f(x), df]) c2 = Wild('c2', exclude=[x, f(x), df]) d2 = Wild('d2', exclude=[x, f(x), df]) a3 = Wild('a3', exclude=[f(x), df, f(x).diff(x, 2)]) b3 = Wild('b3', exclude=[f(x), df, f(x).diff(x, 2)]) c3 = Wild('c3', exclude=[f(x), df, f(x).diff(x, 2)]) r3 = {'xi': xi, 'eta': eta} # Used for the lie_group hint boundary = {} # Used to extract initial conditions C1 = Symbol("C1") eq = expand(eq) # Preprocessing to get the initial conditions out if ics is not None: for funcarg in ics: # Separating derivatives if isinstance(funcarg, (Subs, Derivative)): # f(x).diff(x).subs(x, 0) is a Subs, but f(x).diff(x).subs(x, # y) is a Derivative if isinstance(funcarg, Subs): deriv = funcarg.expr old = funcarg.variables[0] new = funcarg.point[0] elif isinstance(funcarg, Derivative): deriv = funcarg # No information on this. Just assume it was x old = x new = funcarg.variables[0] if (isinstance(deriv, Derivative) and isinstance(deriv.args[0], AppliedUndef) and deriv.args[0].func == f and len(deriv.args[0].args) == 1 and old == x and not new.has(x) and all(i == deriv.variables[0] for i in deriv.variables) and not ics[funcarg].has(f)): dorder = ode_order(deriv, x) temp = 'f' + str(dorder) boundary.update({temp: new, temp + 'val': ics[funcarg]}) else: raise ValueError("Enter valid boundary conditions for Derivatives") # Separating functions elif isinstance(funcarg, AppliedUndef): if (funcarg.func == f and len(funcarg.args) == 1 and not funcarg.args[0].has(x) and not ics[funcarg].has(f)): boundary.update({'f0': funcarg.args[0], 'f0val': ics[funcarg]}) else: raise ValueError("Enter valid boundary conditions for Function") else: raise ValueError("Enter boundary conditions of the form ics={f(point}: value, f(x).diff(x, order).subs(x, point): value}") # Precondition to try remove f(x) from highest order derivative reduced_eq = None if eq.is_Add: deriv_coef = eq.coeff(f(x).diff(x, order)) if deriv_coef not in (1, 0): r = deriv_coef.match(af(x)c1) if r and r[c1]: den = f(x)r[c1] reduced_eq = Add([arg/den for arg in eq.args]) if not reduced_eq: reduced_eq = eq if order == 1: ## Linear case: a(x)y'+b(x)y+c(x) == 0 if eq.is_Add: ind, dep = reduced_eq.as_independent(f) else: u = Dummy('u') ind, dep = (reduced_eq + u).as_independent(f) ind, dep = [tmp.subs(u, 0) for tmp in [ind, dep]] r = {a: dep.coeff(df), b: dep.coeff(f(x)), c: ind} # double check f[a] since the preconditioning may have failed if not r[a].has(f) and not r[b].has(f) and ( r[a]df + r[b]f(x) + r[c]).expand() - reduced_eq == 0: r['a'] = a r['b'] = b r['c'] = c matching_hints["1st_linear"] = r matching_hints["1st_linear_Integral"] = r ## Bernoulli case: a(x)y'+b(x)y+c(x)y*n == 0 r = collect( reduced_eq, f(x), exact=True).match(adf + bf(x) + cf(x)*n) if r and r[c] != 0 and r[n] != 1: # See issue 4676 r['a'] = a r['b'] = b r['c'] = c r['n'] = n matching_hints["Bernoulli"] = r matching_hints["Bernoulli_Integral"] = r ## Riccati special n == -2 case: a2y'+b2y2+c2y/x+d2/x*2 == 0 r = collect(reduced_eq, f(x), exact=True).match(a2df + b2f(x)2 + c2f(x)/x + d2/x*2) if r and r[b2] != 0 and (r[c2] != 0 or r[d2] != 0): r['a2'] = a2 r['b2'] = b2 r['c2'] = c2 r['d2'] = d2 matching_hints["Riccati_special_minus2"] = r # NON-REDUCED FORM OF EQUATION matches r = collect(eq, df, exact=True).match(d + e df) if r: r['d'] = d r['e'] = e r['y'] = y r[d] = r[d].subs(f(x), y) r[e] = r[e].subs(f(x), y) # FIRST ORDER POWER SERIES WHICH NEEDS INITIAL CONDITIONS # TODO: Hint first order series should match only if d/e is analytic. # For now, only d/e and (d/e).diff(arg) is checked for existence at # at a given point. # This is currently done internally in ode_1st_power_series. point = boundary.get('f0', 0) value = boundary.get('f0val', C1) check = cancel(r[d]/r[e]) check1 = check.subs({x: point, y: value}) if not check1.has(oo) and not check1.has(zoo) and \ not check1.has(NaN) and not check1.has(-oo): check2 = (check1.diff(x)).subs({x: point, y: value}) if not check2.has(oo) and not check2.has(zoo) and \ not check2.has(NaN) and not check2.has(-oo): rseries = r.copy() rseries.update({'terms': terms, 'f0': point, 'f0val': value}) matching_hints["1st_power_series"] = rseries r3.update(r) ## Exact Differential Equation: P(x, y) + Q(x, y)y' = 0 where # dP/dy == dQ/dx try: if r[d] != 0: numerator = simplify(r[d].diff(y) - r[e].diff(x)) # The following few conditions try to convert a non-exact # differential equation into an exact one. # References : Differential equations with applications # and historical notes - George E. Simmons if numerator: # If (dP/dy - dQ/dx) / Q = f(x) # then exp(integral(f(x))equation becomes exact factor = simplify(numerator/r[e]) variables = factor.free_symbols if len(variables) == 1 and x == variables.pop(): factor = exp(Integral(factor).doit()) r[d] = factor r[e] = factor matching_hints["1st_exact"] = r matching_hints["1st_exact_Integral"] = r else: # If (dP/dy - dQ/dx) / -P = f(y) # then exp(integral(f(y))equation becomes exact factor = simplify(-numerator/r[d]) variables = factor.free_symbols if len(variables) == 1 and y == variables.pop(): factor = exp(Integral(factor).doit()) r[d] = factor r[e] = factor matching_hints["1st_exact"] = r matching_hints["1st_exact_Integral"] = r else: matching_hints["1st_exact"] = r matching_hints["1st_exact_Integral"] = r except NotImplementedError: # Differentiating the coefficients might fail because of things # like f(2x).diff(x). See issue 4624 and issue 4719. pass # Any first order ODE can be ideally solved by the Lie Group # method matching_hints["lie_group"] = r3 # This match is used for several cases below; we now collect on # f(x) so the matching works. r = collect(reduced_eq, df, exact=True).match(d + edf) if r: # Using r[d] and r[e] without any modification for hints # linear-coefficients and separable-reduced. num, den = r[d], r[e] # ODE = d/e + df r['d'] = d r['e'] = e r['y'] = y r[d] = num.subs(f(x), y) r[e] = den.subs(f(x), y) ## Separable Case: y' == P(y)Q(x) r[d] = separatevars(r[d]) r[e] = separatevars(r[e]) # m1[coeff]m1[x]m1[y] + m2[coeff]m2[x]m2[y]y' m1 = separatevars(r[d], dict=True, symbols=(x, y)) m2 = separatevars(r[e], dict=True, symbols=(x, y)) if m1 and m2: r1 = {'m1': m1, 'm2': m2, 'y': y} matching_hints["separable"] = r1 matching_hints["separable_Integral"] = r1 ## First order equation with homogeneous coefficients: # dy/dx == F(y/x) or dy/dx == F(x/y) ordera = homogeneous_order(r[d], x, y) if ordera is not None: orderb = homogeneous_order(r[e], x, y) if ordera == orderb: # u1=y/x and u2=x/y u1 = Dummy('u1') u2 = Dummy('u2') s = "1st_homogeneous_coeff_subs" s1 = s + "_dep_div_indep" s2 = s + "_indep_div_dep" if simplify((r[d] + u1r[e]).subs({x: 1, y: u1})) != 0: matching_hints[s1] = r matching_hints[s1 + "_Integral"] = r if simplify((r[e] + u2r[d]).subs({x: u2, y: 1})) != 0: matching_hints[s2] = r matching_hints[s2 + "_Integral"] = r if s1 in matching_hints and s2 in matching_hints: matching_hints["1st_homogeneous_coeff_best"] = r ## Linear coefficients of the form # y'+ F((ax + by + c)/(a'x + b'y + c')) = 0 # that can be reduced to homogeneous form. F = num/den params = _linear_coeff_match(F, func) if params: xarg, yarg = params u = Dummy('u') t = Dummy('t') # Dummy substitution for df and f(x). dummy_eq = reduced_eq.subs(((df, t), (f(x), u))) reps = ((x, x + xarg), (u, u + yarg), (t, df), (u, f(x))) dummy_eq = simplify(dummy_eq.subs(reps)) # get the re-cast values for e and d r2 = collect(expand(dummy_eq), [df, f(x)]).match(edf + d) if r2: orderd = homogeneous_order(r2[d], x, f(x)) if orderd is not None: ordere = homogeneous_order(r2[e], x, f(x)) if orderd == ordere: # Match arguments are passed in such a way that it # is coherent with the already existing homogeneous # functions. r2[d] = r2[d].subs(f(x), y) r2[e] = r2[e].subs(f(x), y) r2.update({'xarg': xarg, 'yarg': yarg, 'd': d, 'e': e, 'y': y}) matching_hints["linear_coefficients"] = r2 matching_hints["linear_coefficients_Integral"] = r2 ## Equation of the form y' + (y/x)H(x^ny) = 0 # that can be reduced to separable form factor = simplify(x/f(x)num/den) # Try representing factor in terms of x^ny # where n is lowest power of x in factor; # first remove terms like sqrt(2)3 from factor.atoms(Mul) u = None for mul in ordered(factor.atoms(Mul)): if mul.has(x): _, u = mul.as_independent(x, f(x)) break if u and u.has(f(x)): h = x*(degree(Poly(u.subs(f(x), y), gen=x)))f(x) p = Wild('p') if (u/h == 1) or ((u/h).simplify().match(x*p)): t = Dummy('t') r2 = {'t': t} xpart, ypart = u.as_independent(f(x)) test = factor.subs(((u, t), (1/u, 1/t))) free = test.free_symbols if len(free) == 1 and free.pop() == t: r2.update({'power': xpart.as_base_exp()[1], 'u': test}) matching_hints["separable_reduced"] = r2 matching_hints["separable_reduced_Integral"] = r2 ## Almost-linear equation of the form f(x)g(y)y' + k(x)l(y) + m(x) = 0 r = collect(eq, [df, f(x)]).match(edf + d) if r: r2 = r.copy() r2[c] = S.Zero if r2[d].is_Add: # Separate the terms having f(x) to r[d] and # remaining to r[c] no_f, r2[d] = r2[d].as_independent(f(x)) r2[c] += no_f factor = simplify(r2[d].diff(f(x))/r[e]) if factor and not factor.has(f(x)): r2[d] = factor_terms(r2[d]) u = r2[d].as_independent(f(x), as_Add=False)[1] r2.update({'a': e, 'b': d, 'c': c, 'u': u}) r2[d] /= u r2[e] /= u.diff(f(x)) matching_hints["almost_linear"] = r2 matching_hints["almost_linear_Integral"] = r2 elif order == 2: # Liouville ODE in the form # f(x).diff(x, 2) + g(f(x))(f(x).diff(x))*2 + h(x)f(x).diff(x) # See Goldstein and Braun, "Advanced Methods for the Solution of # Differential Equations", pg. 98 s = df(x).diff(x, 2) + edf*2 + kdf r = reduced_eq.match(s) if r and r[d] != 0: y = Dummy('y') g = simplify(r[e]/r[d]).subs(f(x), y) h = simplify(r[k]/r[d]).subs(f(x), y) if y in h.free_symbols or x in g.free_symbols: pass else: r = {'g': g, 'h': h, 'y': y} matching_hints["Liouville"] = r matching_hints["Liouville_Integral"] = r # Homogeneous second order differential equation of the form # a3f(x).diff(x, 2) + b3f(x).diff(x) + c3, where # for simplicity, a3, b3 and c3 are assumed to be polynomials. # It has a definite power series solution at point x0 if, b3/a3 and c3/a3 # are analytic at x0. deq = a3(f(x).diff(x, 2)) + b3df + c3f(x) r = collect(reduced_eq, [f(x).diff(x, 2), f(x).diff(x), f(x)]).match(deq) ordinary = False if r and r[a3] != 0: if all([r[key].is_polynomial() for key in r]): p = cancel(r[b3]/r[a3]) # Used below q = cancel(r[c3]/r[a3]) # Used below point = kwargs.get('x0', 0) check = p.subs(x, point) if not check.has(oo) and not check.has(NaN) and \ not check.has(zoo) and not check.has(-oo): check = q.subs(x, point) if not check.has(oo) and not check.has(NaN) and \ not check.has(zoo) and not check.has(-oo): ordinary = True r.update({'a3': a3, 'b3': b3, 'c3': c3, 'x0': point, 'terms': terms}) matching_hints["2nd_power_series_ordinary"] = r # Checking if the differential equation has a regular singular point # at x0. It has a regular singular point at x0, if (b3/a3)(x - x0) # and (c3/a3)((x - x0)2) are analytic at x0. if not ordinary: p = cancel((x - point)p) check = p.subs(x, point) if not check.has(oo) and not check.has(NaN) and \ not check.has(zoo) and not check.has(-oo): q = cancel(((x - point)*2)q) check = q.subs(x, point) if not check.has(oo) and not check.has(NaN) and \ not check.has(zoo) and not check.has(-oo): coeff_dict = {'p': p, 'q': q, 'x0': point, 'terms': terms} matching_hints["2nd_power_series_regular"] = coeff_dict if order > 0: # Any ODE that can be solved with a substitution and # repeated integration e.g.: # `d^2/dx^2(y) + xd/dx(y) = constant #f'(x) must be finite for this to work r = _nth_order_reducible_match(reduced_eq, func) if r: matching_hints['nth_order_reducible'] = r # Any ODE that can be solved with a combination of algebra and # integrals e.g.: # d^3/dx^3(x y) = F(x) r = _nth_algebraic_match(reduced_eq, func) if r['solutions']: matching_hints['nth_algebraic'] = r matching_hints['nth_algebraic_Integral'] = r # nth order linear ODE # a_n(x)y^(n) + ... + a_1(x)y' + a_0(x)y = F(x) = b r = _nth_linear_match(reduced_eq, func, order) # Constant coefficient case (a_i is constant for all i) if r and not any(r[i].has(x) for i in r if i >= 0): # Inhomogeneous case: F(x) is not identically 0 if r[-1]: undetcoeff = _undetermined_coefficients_match(r[-1], x) s = "nth_linear_constant_coeff_variation_of_parameters" matching_hints[s] = r matching_hints[s + "_Integral"] = r if undetcoeff['test']: r['trialset'] = undetcoeff['trialset'] matching_hints[ "nth_linear_constant_coeff_undetermined_coefficients" ] = r # Homogeneous case: F(x) is identically 0 else: matching_hints["nth_linear_constant_coeff_homogeneous"] = r # nth order Euler equation a_nx*ny^(n) + ... + a_1xy' + a_0y = F(x) #In case of Homogeneous euler equation F(x) = 0 def _test_term(coeff, order): r""" Linear Euler ODEs have the form Kx*orderdiff(y(x),x,order) = F(x), where K is independent of x and y(x), order>= 0. So we need to check that for each term, coeff == Kxorder from some K. We have a few cases, since coeff may have several different types. """ if order < 0: raise ValueError("order should be greater than 0") if coeff == 0: return True if order == 0: if x in coeff.free_symbols: return False return True if coeff.is_Mul: if coeff.has(f(x)): return False return xorder in coeff.args elif coeff.is_Pow: return coeff.as_base_exp() == (x, order) elif order == 1: return x == coeff return False # Find coefficient for highest derivative, multiply coefficients to # bring the equation into Euler form if possible r_rescaled = None if r is not None: coeff = r[order] factor = xorder / coeff r_rescaled = {i: factorr[i] for i in r} if r_rescaled and not any(not _test_term(r_rescaled[i], i) for i in r_rescaled if i != 'trialset' and i >= 0): if not r_rescaled[-1]: matching_hints["nth_linear_euler_eq_homogeneous"] = r_rescaled else: matching_hints["nth_linear_euler_eq_nonhomogeneous_variation_of_parameters"] = r_rescaled matching_hints["nth_linear_euler_eq_nonhomogeneous_variation_of_parameters_Integral"] = r_rescaled e, re = posify(r_rescaled[-1].subs(x, exp(x))) undetcoeff = _undetermined_coefficients_match(e.subs(re), x) if undetcoeff['test']: r_rescaled['trialset'] = undetcoeff['trialset'] matching_hints["nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients"] = r_rescaled # Order keys based on allhints. retlist = [i for i in allhints if i in matching_hints] if dict: # Dictionaries are ordered arbitrarily, so make note of which # hint would come first for dsolve(). Use an ordered dict in Py 3. matching_hints["default"] = retlist[0] if retlist else None matching_hints["ordered_hints"] = tuple(retlist) return matching_hints else: return tuple(retlist) def classify_sysode(eq, funcs=None, *kwargs): r""" Returns a dictionary of parameter names and values that define the system of ordinary differential equations in ``eq``. The parameters are further used in :py:meth:`~sympy.solvers.ode.dsolve` for solving that system. The parameter names and values are: 'is_linear' (boolean), which tells whether the given system is linear. Note that "linear" here refers to the operator: terms such as ``xdiff(x,t)`` are nonlinear, whereas terms like ``sin(t)diff(x,t)`` are still linear operators. 'func' (list) contains the :py:class:`~sympy.core.function.Function`s that appear with a derivative in the ODE, i.e. those that we are trying to solve the ODE for. 'order' (dict) with the maximum derivative for each element of the 'func' parameter. 'func_coeff' (dict) with the coefficient for each triple ``(equation number, function, order)```. The coefficients are those subexpressions that do not appear in 'func', and hence can be considered constant for purposes of ODE solving. 'eq' (list) with the equations from ``eq``, sympified and transformed into expressions (we are solving for these expressions to be zero). 'no_of_equations' (int) is the number of equations (same as ``len(eq)``). 'type_of_equation' (string) is an internal classification of the type of ODE. References ========== -http://eqworld.ipmnet.ru/en/solutions/sysode/sode-toc1.htm -A. D. Polyanin and A. V. Manzhirov, Handbook of Mathematics for Engineers and Scientists Examples ======== >>> from sympy import Function, Eq, symbols, diff >>> from sympy.solvers.ode import classify_sysode >>> from sympy.abc import t >>> f, x, y = symbols('f, x, y', cls=Function) >>> k, l, m, n = symbols('k, l, m, n', Integer=True) >>> x1 = diff(x(t), t) ; y1 = diff(y(t), t) >>> x2 = diff(x(t), t, t) ; y2 = diff(y(t), t, t) >>> eq = (Eq(5x1, 12x(t) - 6y(t)), Eq(2y1, 11x(t) + 3y(t))) >>> classify_sysode(eq) {'eq': [-12x(t) + 6y(t) + 5Derivative(x(t), t), -11x(t) - 3y(t) + 2Derivative(y(t), t)], 'func': [x(t), y(t)], 'func_coeff': {(0, x(t), 0): -12, (0, x(t), 1): 5, (0, y(t), 0): 6, (0, y(t), 1): 0, (1, x(t), 0): -11, (1, x(t), 1): 0, (1, y(t), 0): -3, (1, y(t), 1): 2}, 'is_linear': True, 'no_of_equation': 2, 'order': {x(t): 1, y(t): 1}, 'type_of_equation': 'type1'} >>> eq = (Eq(diff(x(t),t), 5tx(t) + t2y(t)), Eq(diff(y(t),t), -t*2x(t) + 5ty(t))) >>> classify_sysode(eq) {'eq': [-t*2y(t) - 5tx(t) + Derivative(x(t), t), t*2x(t) - 5ty(t) + Derivative(y(t), t)], 'func': [x(t), y(t)], 'func_coeff': {(0, x(t), 0): -5t, (0, x(t), 1): 1, (0, y(t), 0): -t2, (0, y(t), 1): 0, (1, x(t), 0): t2, (1, x(t), 1): 0, (1, y(t), 0): -5t, (1, y(t), 1): 1}, 'is_linear': True, 'no_of_equation': 2, 'order': {x(t): 1, y(t): 1}, 'type_of_equation': 'type4'} """ # Sympify equations and convert iterables of equations into # a list of equations def _sympify(eq): return list(map(sympify, eq if iterable(eq) else [eq])) eq, funcs = (_sympify(w) for w in [eq, funcs]) for i, fi in enumerate(eq): if isinstance(fi, Equality): eq[i] = fi.lhs - fi.rhs matching_hints = {"no_of_equation":i+1} matching_hints['eq'] = eq if i==0: raise ValueError("classify_sysode() works for systems of ODEs. " "For scalar ODEs, classify_ode should be used") t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] # find all the functions if not given order = dict() if funcs==[None]: funcs = [] for eqs in eq: derivs = eqs.atoms(Derivative) func = set().union([d.atoms(AppliedUndef) for d in derivs]) for func_ in func: funcs.append(func_) funcs = list(set(funcs)) if len(funcs) != len(eq): raise ValueError("Number of functions given is not equal to the number of equations %s" % funcs) func_dict = dict() for func in funcs: if not order.get(func, False): max_order = 0 for i, eqs_ in enumerate(eq): order_ = ode_order(eqs_,func) if max_order < order_: max_order = order_ eq_no = i if eq_no in func_dict: list_func = [] list_func.append(func_dict[eq_no]) list_func.append(func) func_dict[eq_no] = list_func else: func_dict[eq_no] = func order[func] = max_order funcs = [func_dict[i] for i in range(len(func_dict))] matching_hints['func'] = funcs for func in funcs: if isinstance(func, list): for func_elem in func: if len(func_elem.args) != 1: raise ValueError("dsolve() and classify_sysode() work with " "functions of one variable only, not %s" % func) else: if func and len(func.args) != 1: raise ValueError("dsolve() and classify_sysode() work with " "functions of one variable only, not %s" % func) # find the order of all equation in system of odes matching_hints["order"] = order # find coefficients of terms f(t), diff(f(t),t) and higher derivatives # and similarly for other functions g(t), diff(g(t),t) in all equations. # Here j denotes the equation number, funcs[l] denotes the function about # which we are talking about and k denotes the order of function funcs[l] # whose coefficient we are calculating. def linearity_check(eqs, j, func, is_linear_): for k in range(order[func] + 1): func_coef[j, func, k] = collect(eqs.expand(), [diff(func, t, k)]).coeff(diff(func, t, k)) if is_linear_ == True: if func_coef[j, func, k] == 0: if k == 0: coef = eqs.as_independent(func, as_Add=True)[1] for xr in range(1, ode_order(eqs,func) + 1): coef -= eqs.as_independent(diff(func, t, xr), as_Add=True)[1] if coef != 0: is_linear_ = False else: if eqs.as_independent(diff(func, t, k), as_Add=True)[1]: is_linear_ = False else: for func_ in funcs: if isinstance(func_, list): for elem_func_ in func_: dep = func_coef[j, func, k].as_independent(elem_func_, as_Add=True)[1] if dep != 0: is_linear_ = False else: dep = func_coef[j, func, k].as_independent(func_, as_Add=True)[1] if dep != 0: is_linear_ = False return is_linear_ func_coef = {} is_linear = True for j, eqs in enumerate(eq): for func in funcs: if isinstance(func, list): for func_elem in func: is_linear = linearity_check(eqs, j, func_elem, is_linear) else: is_linear = linearity_check(eqs, j, func, is_linear) matching_hints['func_coeff'] = func_coef matching_hints['is_linear'] = is_linear if len(set(order.values())) == 1: order_eq = list(matching_hints['order'].values())[0] if matching_hints['is_linear'] == True: if matching_hints['no_of_equation'] == 2: if order_eq == 1: type_of_equation = check_linear_2eq_order1(eq, funcs, func_coef) elif order_eq == 2: type_of_equation = check_linear_2eq_order2(eq, funcs, func_coef) else: type_of_equation = None elif matching_hints['no_of_equation'] == 3: if order_eq == 1: type_of_equation = check_linear_3eq_order1(eq, funcs, func_coef) if type_of_equation is None: type_of_equation = check_linear_neq_order1(eq, funcs, func_coef) else: type_of_equation = None else: if order_eq == 1: type_of_equation = check_linear_neq_order1(eq, funcs, func_coef) else: type_of_equation = None else: if matching_hints['no_of_equation'] == 2: if order_eq == 1: type_of_equation = check_nonlinear_2eq_order1(eq, funcs, func_coef) else: type_of_equation = None elif matching_hints['no_of_equation'] == 3: if order_eq == 1: type_of_equation = check_nonlinear_3eq_order1(eq, funcs, func_coef) else: type_of_equation = None else: type_of_equation = None else: type_of_equation = None matching_hints['type_of_equation'] = type_of_equation return matching_hints def check_linear_2eq_order1(eq, func, func_coef): x = func[0].func y = func[1].func fc = func_coef t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] r = dict() # for equations Eq(a1diff(x(t),t), b1x(t) + c1y(t) + d1) # and Eq(a2diff(y(t),t), b2x(t) + c2y(t) + d2) r['a1'] = fc[0,x(t),1] ; r['a2'] = fc[1,y(t),1] r['b1'] = -fc[0,x(t),0]/fc[0,x(t),1] ; r['b2'] = -fc[1,x(t),0]/fc[1,y(t),1] r['c1'] = -fc[0,y(t),0]/fc[0,x(t),1] ; r['c2'] = -fc[1,y(t),0]/fc[1,y(t),1] forcing = [S(0),S(0)] for i in range(2): for j in Add.make_args(eq[i]): if not j.has(x(t), y(t)): forcing[i] += j if not (forcing[0].has(t) or forcing[1].has(t)): # We can handle homogeneous case and simple constant forcings r['d1'] = forcing[0] r['d2'] = forcing[1] else: # Issue #9244: nonhomogeneous linear systems are not supported return None # Conditions to check for type 6 whose equations are Eq(diff(x(t),t), f(t)x(t) + g(t)y(t)) and # Eq(diff(y(t),t), a[f(t) + ah(t)]x(t) + a[g(t) - h(t)]y(t)) p = 0 q = 0 p1 = cancel(r['b2']/(cancel(r['b2']/r['c2']).as_numer_denom()[0])) p2 = cancel(r['b1']/(cancel(r['b1']/r['c1']).as_numer_denom()[0])) for n, i in enumerate([p1, p2]): for j in Mul.make_args(collect_const(i)): if not j.has(t): q = j if q and n==0: if ((r['b2']/j - r['b1'])/(r['c1'] - r['c2']/j)) == j: p = 1 elif q and n==1: if ((r['b1']/j - r['b2'])/(r['c2'] - r['c1']/j)) == j: p = 2 # End of condition for type 6 if r['d1']!=0 or r['d2']!=0: if not r['d1'].has(t) and not r['d2'].has(t): if all(not r[k].has(t) for k in 'a1 a2 b1 b2 c1 c2'.split()): # Equations for type 2 are Eq(a1diff(x(t),t),b1x(t)+c1y(t)+d1) and Eq(a2diff(y(t),t),b2x(t)+c2y(t)+d2) return "type2" else: return None else: if all(not r[k].has(t) for k in 'a1 a2 b1 b2 c1 c2'.split()): # Equations for type 1 are Eq(a1diff(x(t),t),b1x(t)+c1y(t)) and Eq(a2diff(y(t),t),b2x(t)+c2y(t)) return "type1" else: r['b1'] = r['b1']/r['a1'] ; r['b2'] = r['b2']/r['a2'] r['c1'] = r['c1']/r['a1'] ; r['c2'] = r['c2']/r['a2'] if (r['b1'] == r['c2']) and (r['c1'] == r['b2']): # Equation for type 3 are Eq(diff(x(t),t), f(t)x(t) + g(t)y(t)) and Eq(diff(y(t),t), g(t)x(t) + f(t)y(t)) return "type3" elif (r['b1'] == r['c2']) and (r['c1'] == -r['b2']) or (r['b1'] == -r['c2']) and (r['c1'] == r['b2']): # Equation for type 4 are Eq(diff(x(t),t), f(t)x(t) + g(t)y(t)) and Eq(diff(y(t),t), -g(t)x(t) + f(t)y(t)) return "type4" elif (not cancel(r['b2']/r['c1']).has(t) and not cancel((r['c2']-r['b1'])/r['c1']).has(t)) \ or (not cancel(r['b1']/r['c2']).has(t) and not cancel((r['c1']-r['b2'])/r['c2']).has(t)): # Equations for type 5 are Eq(diff(x(t),t), f(t)x(t) + g(t)y(t)) and Eq(diff(y(t),t), ag(t)x(t) + [f(t) + bg(t)]y(t) return "type5" elif p: return "type6" else: # Equations for type 7 are Eq(diff(x(t),t), f(t)x(t) + g(t)y(t)) and Eq(diff(y(t),t), h(t)x(t) + p(t)y(t)) return "type7" def check_linear_2eq_order2(eq, func, func_coef): x = func[0].func y = func[1].func fc = func_coef t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] r = dict() a = Wild('a', exclude=[1/t]) b = Wild('b', exclude=[1/t2]) u = Wild('u', exclude=[t, t2]) v = Wild('v', exclude=[t, t2]) w = Wild('w', exclude=[t, t2]) p = Wild('p', exclude=[t, t2]) r['a1'] = fc[0,x(t),2] ; r['a2'] = fc[1,y(t),2] r['b1'] = fc[0,x(t),1] ; r['b2'] = fc[1,x(t),1] r['c1'] = fc[0,y(t),1] ; r['c2'] = fc[1,y(t),1] r['d1'] = fc[0,x(t),0] ; r['d2'] = fc[1,x(t),0] r['e1'] = fc[0,y(t),0] ; r['e2'] = fc[1,y(t),0] const = [S(0), S(0)] for i in range(2): for j in Add.make_args(eq[i]): if not (j.has(x(t)) or j.has(y(t))): const[i] += j r['f1'] = const[0] r['f2'] = const[1] if r['f1']!=0 or r['f2']!=0: if all(not r[k].has(t) for k in 'a1 a2 d1 d2 e1 e2 f1 f2'.split()) \ and r['b1']==r['c1']==r['b2']==r['c2']==0: return "type2" elif all(not r[k].has(t) for k in 'a1 a2 b1 b2 c1 c2 d1 d2 e1 e1'.split()): p = [S(0), S(0)] ; q = [S(0), S(0)] for n, e in enumerate([r['f1'], r['f2']]): if e.has(t): tpart = e.as_independent(t, Mul)[1] for i in Mul.make_args(tpart): if i.has(exp): b, e = i.as_base_exp() co = e.coeff(t) if co and not co.has(t) and co.has(I): p[n] = 1 else: q[n] = 1 else: q[n] = 1 else: q[n] = 1 if p[0]==1 and p[1]==1 and q[0]==0 and q[1]==0: return "type4" else: return None else: return None else: if r['b1']==r['b2']==r['c1']==r['c2']==0 and all(not r[k].has(t) \ for k in 'a1 a2 d1 d2 e1 e2'.split()): return "type1" elif r['b1']==r['e1']==r['c2']==r['d2']==0 and all(not r[k].has(t) \ for k in 'a1 a2 b2 c1 d1 e2'.split()) and r['c1'] == -r['b2'] and \ r['d1'] == r['e2']: return "type3" elif cancel(-r['b2']/r['d2'])==t and cancel(-r['c1']/r['e1'])==t and not \ (r['d2']/r['a2']).has(t) and not (r['e1']/r['a1']).has(t) and \ r['b1']==r['d1']==r['c2']==r['e2']==0: return "type5" elif ((r['a1']/r['d1']).expand()).match((p(ut2+vt+w)*2).expand()) and not \ (cancel(r['a1']r['d2']/(r['a2']r['d1']))).has(t) and not (r['d1']/r['e1']).has(t) and not \ (r['d2']/r['e2']).has(t) and r['b1'] == r['b2'] == r['c1'] == r['c2'] == 0: return "type10" elif not cancel(r['d1']/r['e1']).has(t) and not cancel(r['d2']/r['e2']).has(t) and not \ cancel(r['d1']r['a2']/(r['d2']r['a1'])).has(t) and r['b1']==r['b2']==r['c1']==r['c2']==0: return "type6" elif not cancel(r['b1']/r['c1']).has(t) and not cancel(r['b2']/r['c2']).has(t) and not \ cancel(r['b1']r['a2']/(r['b2']r['a1'])).has(t) and r['d1']==r['d2']==r['e1']==r['e2']==0: return "type7" elif cancel(-r['b2']/r['d2'])==t and cancel(-r['c1']/r['e1'])==t and not \ cancel(r['e1']r['a2']/(r['d2']r['a1'])).has(t) and r['e1'].has(t) \ and r['b1']==r['d1']==r['c2']==r['e2']==0: return "type8" elif (r['b1']/r['a1']).match(a/t) and (r['b2']/r['a2']).match(a/t) and not \ (r['b1']/r['c1']).has(t) and not (r['b2']/r['c2']).has(t) and \ (r['d1']/r['a1']).match(b/t2) and (r['d2']/r['a2']).match(b/t2) \ and not (r['d1']/r['e1']).has(t) and not (r['d2']/r['e2']).has(t): return "type9" elif -r['b1']/r['d1']==-r['c1']/r['e1']==-r['b2']/r['d2']==-r['c2']/r['e2']==t: return "type11" else: return None def check_linear_3eq_order1(eq, func, func_coef): x = func[0].func y = func[1].func z = func[2].func fc = func_coef t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] r = dict() r['a1'] = fc[0,x(t),1]; r['a2'] = fc[1,y(t),1]; r['a3'] = fc[2,z(t),1] r['b1'] = fc[0,x(t),0]; r['b2'] = fc[1,x(t),0]; r['b3'] = fc[2,x(t),0] r['c1'] = fc[0,y(t),0]; r['c2'] = fc[1,y(t),0]; r['c3'] = fc[2,y(t),0] r['d1'] = fc[0,z(t),0]; r['d2'] = fc[1,z(t),0]; r['d3'] = fc[2,z(t),0] forcing = [S(0), S(0), S(0)] for i in range(3): for j in Add.make_args(eq[i]): if not j.has(x(t), y(t), z(t)): forcing[i] += j if forcing[0].has(t) or forcing[1].has(t) or forcing[2].has(t): # We can handle homogeneous case and simple constant forcings. # Issue #9244: nonhomogeneous linear systems are not supported return None if all(not r[k].has(t) for k in 'a1 a2 a3 b1 b2 b3 c1 c2 c3 d1 d2 d3'.split()): if r['c1']==r['d1']==r['d2']==0: return 'type1' elif r['c1'] == -r['b2'] and r['d1'] == -r['b3'] and r['d2'] == -r['c3'] \ and r['b1'] == r['c2'] == r['d3'] == 0: return 'type2' elif r['b1'] == r['c2'] == r['d3'] == 0 and r['c1']/r['a1'] == -r['d1']/r['a1'] \ and r['d2']/r['a2'] == -r['b2']/r['a2'] and r['b3']/r['a3'] == -r['c3']/r['a3']: return 'type3' else: return None else: for k1 in 'c1 d1 b2 d2 b3 c3'.split(): if r[k1] == 0: continue else: if all(not cancel(r[k1]/r[k]).has(t) for k in 'd1 b2 d2 b3 c3'.split() if r[k]!=0) \ and all(not cancel(r[k1]/(r['b1'] - r[k])).has(t) for k in 'b1 c2 d3'.split() if r['b1']!=r[k]): return 'type4' else: break return None def check_linear_neq_order1(eq, func, func_coef): fc = func_coef t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] n = len(eq) for i in range(n): for j in range(n): if (fc[i, func[j], 0]/fc[i, func[i], 1]).has(t): return None if len(eq) == 3: return 'type6' return 'type1' def check_nonlinear_2eq_order1(eq, func, func_coef): t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] f = Wild('f') g = Wild('g') u, v = symbols('u, v', cls=Dummy) def check_type(x, y): r1 = eq[0].match(tdiff(x(t),t) - x(t) + f) r2 = eq[1].match(tdiff(y(t),t) - y(t) + g) if not (r1 and r2): r1 = eq[0].match(diff(x(t),t) - x(t)/t + f/t) r2 = eq[1].match(diff(y(t),t) - y(t)/t + g/t) if not (r1 and r2): r1 = (-eq[0]).match(tdiff(x(t),t) - x(t) + f) r2 = (-eq[1]).match(tdiff(y(t),t) - y(t) + g) if not (r1 and r2): r1 = (-eq[0]).match(diff(x(t),t) - x(t)/t + f/t) r2 = (-eq[1]).match(diff(y(t),t) - y(t)/t + g/t) if r1 and r2 and not (r1[f].subs(diff(x(t),t),u).subs(diff(y(t),t),v).has(t) \ or r2[g].subs(diff(x(t),t),u).subs(diff(y(t),t),v).has(t)): return 'type5' else: return None for func_ in func: if isinstance(func_, list): x = func[0][0].func y = func[0][1].func eq_type = check_type(x, y) if not eq_type: eq_type = check_type(y, x) return eq_type x = func[0].func y = func[1].func fc = func_coef n = Wild('n', exclude=[x(t),y(t)]) f1 = Wild('f1', exclude=[v,t]) f2 = Wild('f2', exclude=[v,t]) g1 = Wild('g1', exclude=[u,t]) g2 = Wild('g2', exclude=[u,t]) for i in range(2): eqs = 0 for terms in Add.make_args(eq[i]): eqs += terms/fc[i,func[i],1] eq[i] = eqs r = eq[0].match(diff(x(t),t) - x(t)nf) if r: g = (diff(y(t),t) - eq[1])/r[f] if r and not (g.has(x(t)) or g.subs(y(t),v).has(t) or r[f].subs(x(t),u).subs(y(t),v).has(t)): return 'type1' r = eq[0].match(diff(x(t),t) - exp(nx(t))f) if r: g = (diff(y(t),t) - eq[1])/r[f] if r and not (g.has(x(t)) or g.subs(y(t),v).has(t) or r[f].subs(x(t),u).subs(y(t),v).has(t)): return 'type2' g = Wild('g') r1 = eq[0].match(diff(x(t),t) - f) r2 = eq[1].match(diff(y(t),t) - g) if r1 and r2 and not (r1[f].subs(x(t),u).subs(y(t),v).has(t) or \ r2[g].subs(x(t),u).subs(y(t),v).has(t)): return 'type3' r1 = eq[0].match(diff(x(t),t) - f) r2 = eq[1].match(diff(y(t),t) - g) num, den = ( (r1[f].subs(x(t),u).subs(y(t),v))/ (r2[g].subs(x(t),u).subs(y(t),v))).as_numer_denom() R1 = num.match(f1g1) R2 = den.match(f2g2) # phi = (r1[f].subs(x(t),u).subs(y(t),v))/num if R1 and R2: return 'type4' return None def check_nonlinear_2eq_order2(eq, func, func_coef): return None def check_nonlinear_3eq_order1(eq, func, func_coef): x = func[0].func y = func[1].func z = func[2].func fc = func_coef t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] u, v, w = symbols('u, v, w', cls=Dummy) a = Wild('a', exclude=[x(t), y(t), z(t), t]) b = Wild('b', exclude=[x(t), y(t), z(t), t]) c = Wild('c', exclude=[x(t), y(t), z(t), t]) f = Wild('f') F1 = Wild('F1') F2 = Wild('F2') F3 = Wild('F3') for i in range(3): eqs = 0 for terms in Add.make_args(eq[i]): eqs += terms/fc[i,func[i],1] eq[i] = eqs r1 = eq[0].match(diff(x(t),t) - ay(t)z(t)) r2 = eq[1].match(diff(y(t),t) - bz(t)x(t)) r3 = eq[2].match(diff(z(t),t) - cx(t)y(t)) if r1 and r2 and r3: num1, den1 = r1[a].as_numer_denom() num2, den2 = r2[b].as_numer_denom() num3, den3 = r3[c].as_numer_denom() if solve([num1u-den1(v-w), num2v-den2(w-u), num3w-den3(u-v)],[u, v]): return 'type1' r = eq[0].match(diff(x(t),t) - y(t)z(t)f) if r: r1 = collect_const(r[f]).match(af) r2 = ((diff(y(t),t) - eq[1])/r1[f]).match(bz(t)x(t)) r3 = ((diff(z(t),t) - eq[2])/r1[f]).match(cx(t)y(t)) if r1 and r2 and r3: num1, den1 = r1[a].as_numer_denom() num2, den2 = r2[b].as_numer_denom() num3, den3 = r3[c].as_numer_denom() if solve([num1u-den1(v-w), num2v-den2(w-u), num3w-den3(u-v)],[u, v]): return 'type2' r = eq[0].match(diff(x(t),t) - (F2-F3)) if r: r1 = collect_const(r[F2]).match(cF2) r1.update(collect_const(r[F3]).match(bF3)) if r1: if eq[1].has(r1[F2]) and not eq[1].has(r1[F3]): r1[F2], r1[F3] = r1[F3], r1[F2] r1[c], r1[b] = -r1[b], -r1[c] r2 = eq[1].match(diff(y(t),t) - ar1[F3] + r1[c]F1) if r2: r3 = (eq[2] == diff(z(t),t) - r1[b]r2[F1] + r2[a]r1[F2]) if r1 and r2 and r3: return 'type3' r = eq[0].match(diff(x(t),t) - z(t)F2 + y(t)F3) if r: r1 = collect_const(r[F2]).match(cF2) r1.update(collect_const(r[F3]).match(bF3)) if r1: if eq[1].has(r1[F2]) and not eq[1].has(r1[F3]): r1[F2], r1[F3] = r1[F3], r1[F2] r1[c], r1[b] = -r1[b], -r1[c] r2 = (diff(y(t),t) - eq[1]).match(ax(t)r1[F3] - r1[c]z(t)F1) if r2: r3 = (diff(z(t),t) - eq[2] == r1[b]y(t)r2[F1] - r2[a]x(t)r1[F2]) if r1 and r2 and r3: return 'type4' r = (diff(x(t),t) - eq[0]).match(x(t)(F2 - F3)) if r: r1 = collect_const(r[F2]).match(cF2) r1.update(collect_const(r[F3]).match(bF3)) if r1: if eq[1].has(r1[F2]) and not eq[1].has(r1[F3]): r1[F2], r1[F3] = r1[F3], r1[F2] r1[c], r1[b] = -r1[b], -r1[c] r2 = (diff(y(t),t) - eq[1]).match(y(t)(ar1[F3] - r1[c]F1)) if r2: r3 = (diff(z(t),t) - eq[2] == z(t)(r1[b]r2[F1] - r2[a]r1[F2])) if r1 and r2 and r3: return 'type5' return None def check_nonlinear_3eq_order2(eq, func, func_coef): return None def checksysodesol(eqs, sols, func=None): r""" Substitutes corresponding ``sols`` for each functions into each ``eqs`` and checks that the result of substitutions for each equation is ``0``. The equations and solutions passed can be any iterable. This only works when each ``sols`` have one function only, like `x(t)` or `y(t)`. For each function, ``sols`` can have a single solution or a list of solutions. In most cases it will not be necessary to explicitly identify the function, but if the function cannot be inferred from the original equation it can be supplied through the ``func`` argument. When a sequence of equations is passed, the same sequence is used to return the result for each equation with each function substituted with corresponding solutions. It tries the following method to find zero equivalence for each equation: Substitute the solutions for functions, like `x(t)` and `y(t)` into the original equations containing those functions. This function returns a tuple. The first item in the tuple is ``True`` if the substitution results for each equation is ``0``, and ``False`` otherwise. The second item in the tuple is what the substitution results in. Each element of the ``list`` should always be ``0`` corresponding to each equation if the first item is ``True``. Note that sometimes this function may return ``False``, but with an expression that is identically equal to ``0``, instead of returning ``True``. This is because :py:meth:`~sympy.simplify.simplify.simplify` cannot reduce the expression to ``0``. If an expression returned by each function vanishes identically, then ``sols`` really is a solution to ``eqs``. If this function seems to hang, it is probably because of a difficult simplification. Examples ======== >>> from sympy import Eq, diff, symbols, sin, cos, exp, sqrt, S, Function >>> from sympy.solvers.ode import checksysodesol >>> C1, C2 = symbols('C1:3') >>> t = symbols('t') >>> x, y = symbols('x, y', cls=Function) >>> eq = (Eq(diff(x(t),t), x(t) + y(t) + 17), Eq(diff(y(t),t), -2x(t) + y(t) + 12)) >>> sol = [Eq(x(t), (C1sin(sqrt(2)t) + C2cos(sqrt(2)t))exp(t) - S(5)/3), ... Eq(y(t), (sqrt(2)C1cos(sqrt(2)t) - sqrt(2)C2sin(sqrt(2)t))exp(t) - S(46)/3)] >>> checksysodesol(eq, sol) (True, [0, 0]) >>> eq = (Eq(diff(x(t),t),x(t)y(t)4), Eq(diff(y(t),t),y(t)3)) >>> sol = [Eq(x(t), C1exp(-1/(4(C2 + t)))), Eq(y(t), -sqrt(2)sqrt(-1/(C2 + t))/2), ... Eq(x(t), C1exp(-1/(4(C2 + t)))), Eq(y(t), sqrt(2)sqrt(-1/(C2 + t))/2)] >>> checksysodesol(eq, sol) (True, [0, 0]) """ def _sympify(eq): return list(map(sympify, eq if iterable(eq) else [eq])) eqs = _sympify(eqs) for i in range(len(eqs)): if isinstance(eqs[i], Equality): eqs[i] = eqs[i].lhs - eqs[i].rhs if func is None: funcs = [] for eq in eqs: derivs = eq.atoms(Derivative) func = set().union([d.atoms(AppliedUndef) for d in derivs]) for func_ in func: funcs.append(func_) funcs = list(set(funcs)) if not all(isinstance(func, AppliedUndef) and len(func.args) == 1 for func in funcs)\ and len({func.args for func in funcs})!=1: raise ValueError("func must be a function of one variable, not %s" % func) for sol in sols: if len(sol.atoms(AppliedUndef)) != 1: raise ValueError("solutions should have one function only") if len(funcs) != len({sol.lhs for sol in sols}): raise ValueError("number of solutions provided does not match the number of equations") dictsol = dict() for sol in sols: func = list(sol.atoms(AppliedUndef))[0] if sol.rhs == func: sol = sol.reversed solved = sol.lhs == func and not sol.rhs.has(func) if not solved: rhs = solve(sol, func) if not rhs: raise NotImplementedError else: rhs = sol.rhs dictsol[func] = rhs checkeq = [] for eq in eqs: for func in funcs: eq = sub_func_doit(eq, func, dictsol[func]) ss = simplify(eq) if ss != 0: eq = ss.expand(force=True) else: eq = 0 checkeq.append(eq) if len(set(checkeq)) == 1 and list(set(checkeq))[0] == 0: return (True, checkeq) else: return (False, checkeq) @vectorize(0) def odesimp(ode, eq, func, hint): r""" Simplifies solutions of ODEs, including trying to solve for ``func`` and running :py:meth:`~sympy.solvers.ode.constantsimp`. It may use knowledge of the type of solution that the hint returns to apply additional simplifications. It also attempts to integrate any :py:class:`~sympy.integrals.Integral`\s in the expression, if the hint is not an ``_Integral`` hint. This function should have no effect on expressions returned by :py:meth:`~sympy.solvers.ode.dsolve`, as :py:meth:`~sympy.solvers.ode.dsolve` already calls :py:meth:`~sympy.solvers.ode.odesimp`, but the individual hint functions do not call :py:meth:`~sympy.solvers.ode.odesimp` (because the :py:meth:`~sympy.solvers.ode.dsolve` wrapper does). Therefore, this function is designed for mainly internal use. Examples ======== >>> from sympy import sin, symbols, dsolve, pprint, Function >>> from sympy.solvers.ode import odesimp >>> x , u2, C1= symbols('x,u2,C1') >>> f = Function('f') >>> eq = dsolve(xf(x).diff(x) - f(x) - xsin(f(x)/x), f(x), ... hint='1st_homogeneous_coeff_subs_indep_div_dep_Integral', ... simplify=False) >>> pprint(eq, wrap_line=False) x ---- f(x) / \| \| / 1 \ \| -\|u2 + -------\| \| \| /1 \\| \| \| sin\|--\|\| \| \ \u2// log(f(x)) = log(C1) + \| ---------------- d(u2) \| 2 \| u2 \| / >>> pprint(odesimp(eq, f(x), 1, {C1}, ... hint='1st_homogeneous_coeff_subs_indep_div_dep' ... )) #doctest: +SKIP x --------- = C1 /f(x)\ tan\|----\| \2x / """ x = func.args[0] f = func.func C1 = get_numbered_constants(eq, num=1) constants = eq.free_symbols - ode.free_symbols # First, integrate if the hint allows it. eq = _handle_Integral(eq, func, hint) if hint.startswith("nth_linear_euler_eq_nonhomogeneous"): eq = simplify(eq) if not isinstance(eq, Equality): raise TypeError("eq should be an instance of Equality") # Second, clean up the arbitrary constants. # Right now, nth linear hints can put as many as 2order constants in an # expression. If that number grows with another hint, the third argument # here should be raised accordingly, or constantsimp() rewritten to handle # an arbitrary number of constants. eq = constantsimp(eq, constants) # Lastly, now that we have cleaned up the expression, try solving for func. # When CRootOf is implemented in solve(), we will want to return a CRootOf # every time instead of an Equality. # Get the f(x) on the left if possible. if eq.rhs == func and not eq.lhs.has(func): eq = [Eq(eq.rhs, eq.lhs)] # make sure we are working with lists of solutions in simplified form. if eq.lhs == func and not eq.rhs.has(func): # The solution is already solved eq = [eq] # special simplification of the rhs if hint.startswith("nth_linear_constant_coeff"): # Collect terms to make the solution look nice. # This is also necessary for constantsimp to remove unnecessary # terms from the particular solution from variation of parameters # # Collect is not behaving reliably here. The results for # some linear constant-coefficient equations with repeated # roots do not properly simplify all constants sometimes. # 'collectterms' gives different orders sometimes, and results # differ in collect based on that order. The # sort-reverse trick fixes things, but may fail in the # future. In addition, collect is splitting exponentials with # rational powers for no reason. We have to do a match # to fix this using Wilds. global collectterms try: collectterms.sort(key=default_sort_key) collectterms.reverse() except Exception: pass assert len(eq) == 1 and eq[0].lhs == f(x) sol = eq[0].rhs sol = expand_mul(sol) for i, reroot, imroot in collectterms: sol = collect(sol, xiexp(rerootx)sin(abs(imroot)x)) sol = collect(sol, xiexp(rerootx)cos(imrootx)) for i, reroot, imroot in collectterms: sol = collect(sol, xiexp(rerootx)) del collectterms # Collect is splitting exponentials with rational powers for # no reason. We call powsimp to fix. sol = powsimp(sol) eq[0] = Eq(f(x), sol) else: # The solution is not solved, so try to solve it try: floats = any(i.is_Float for i in eq.atoms(Number)) eqsol = solve(eq, func, force=True, rational=False if floats else None) if not eqsol: raise NotImplementedError except (NotImplementedError, PolynomialError): eq = [eq] else: def _expand(expr): numer, denom = expr.as_numer_denom() if denom.is_Add: return expr else: return powsimp(expr.expand(), combine='exp', deep=True) # XXX: the rest of odesimp() expects each ``t`` to be in a # specific normal form: rational expression with numerator # expanded, but with combined exponential functions (at # least in this setup all tests pass). eq = [Eq(f(x), _expand(t)) for t in eqsol] # special simplification of the lhs. if hint.startswith("1st_homogeneous_coeff"): for j, eqi in enumerate(eq): newi = logcombine(eqi, force=True) if isinstance(newi.lhs, log) and newi.rhs == 0: newi = Eq(newi.lhs.args[0]/C1, C1) eq[j] = newi # We cleaned up the constants before solving to help the solve engine with # a simpler expression, but the solved expression could have introduced # things like -C1, so rerun constantsimp() one last time before returning. for i, eqi in enumerate(eq): eq[i] = constantsimp(eqi, constants) eq[i] = constant_renumber(eq[i], ode.free_symbols) # If there is only 1 solution, return it; # otherwise return the list of solutions. if len(eq) == 1: eq = eq[0] return eq def checkodesol(ode, sol, func=None, order='auto', solve_for_func=True): r""" Substitutes ``sol`` into ``ode`` and checks that the result is ``0``. This only works when ``func`` is one function, like `f(x)`. ``sol`` can be a single solution or a list of solutions. Each solution may be an :py:class:`~sympy.core.relational.Equality` that the solution satisfies, e.g. ``Eq(f(x), C1), Eq(f(x) + C1, 0)``; or simply an :py:class:`~sympy.core.expr.Expr`, e.g. ``f(x) - C1``. In most cases it will not be necessary to explicitly identify the function, but if the function cannot be inferred from the original equation it can be supplied through the ``func`` argument. If a sequence of solutions is passed, the same sort of container will be used to return the result for each solution. It tries the following methods, in order, until it finds zero equivalence: 1. Substitute the solution for `f` in the original equation. This only works if ``ode`` is solved for `f`. It will attempt to solve it first unless ``solve_for_func == False``. 2. Take `n` derivatives of the solution, where `n` is the order of ``ode``, and check to see if that is equal to the solution. This only works on exact ODEs. 3. Take the 1st, 2nd, ..., `n`\th derivatives of the solution, each time solving for the derivative of `f` of that order (this will always be possible because `f` is a linear operator). Then back substitute each derivative into ``ode`` in reverse order. This function returns a tuple. The first item in the tuple is ``True`` if the substitution results in ``0``, and ``False`` otherwise. The second item in the tuple is what the substitution results in. It should always be ``0`` if the first item is ``True``. Sometimes this function will return ``False`` even when an expression is identically equal to ``0``. This happens when :py:meth:`~sympy.simplify.simplify.simplify` does not reduce the expression to ``0``. If an expression returned by this function vanishes identically, then ``sol`` really is a solution to the ``ode``. If this function seems to hang, it is probably because of a hard simplification. To use this function to test, test the first item of the tuple. Examples ======== >>> from sympy import Eq, Function, checkodesol, symbols >>> x, C1 = symbols('x,C1') >>> f = Function('f') >>> checkodesol(f(x).diff(x), Eq(f(x), C1)) (True, 0) >>> assert checkodesol(f(x).diff(x), C1)[0] >>> assert not checkodesol(f(x).diff(x), x)[0] >>> checkodesol(f(x).diff(x, 2), x2) (False, 2) """ if not isinstance(ode, Equality): ode = Eq(ode, 0) if func is None: try: _, func = _preprocess(ode.lhs) except ValueError: funcs = [s.atoms(AppliedUndef) for s in ( sol if is_sequence(sol, set) else [sol])] funcs = set().union(funcs) if len(funcs) != 1: raise ValueError( 'must pass func arg to checkodesol for this case.') func = funcs.pop() if not isinstance(func, AppliedUndef) or len(func.args) != 1: raise ValueError( "func must be a function of one variable, not %s" % func) if is_sequence(sol, set): return type(sol)([checkodesol(ode, i, order=order, solve_for_func=solve_for_func) for i in sol]) if not isinstance(sol, Equality): sol = Eq(func, sol) elif sol.rhs == func: sol = sol.reversed if order == 'auto': order = ode_order(ode, func) solved = sol.lhs == func and not sol.rhs.has(func) if solve_for_func and not solved: rhs = solve(sol, func) if rhs: eqs = [Eq(func, t) for t in rhs] if len(rhs) == 1: eqs = eqs[0] return checkodesol(ode, eqs, order=order, solve_for_func=False) s = True testnum = 0 x = func.args[0] while s: if testnum == 0: # First pass, try substituting a solved solution directly into the # ODE. This has the highest chance of succeeding. ode_diff = ode.lhs - ode.rhs if sol.lhs == func: s = sub_func_doit(ode_diff, func, sol.rhs) else: testnum += 1 continue ss = simplify(s) if ss: # with the new numer_denom in power.py, if we do a simple # expansion then testnum == 0 verifies all solutions. s = ss.expand(force=True) else: s = 0 testnum += 1 elif testnum == 1: # Second pass. If we cannot substitute f, try seeing if the nth # derivative is equal, this will only work for odes that are exact, # by definition. s = simplify( trigsimp(diff(sol.lhs, x, order) - diff(sol.rhs, x, order)) - trigsimp(ode.lhs) + trigsimp(ode.rhs)) # s2 = simplify( # diff(sol.lhs, x, order) - diff(sol.rhs, x, order) - \ # ode.lhs + ode.rhs) testnum += 1 elif testnum == 2: # Third pass. Try solving for df/dx and substituting that into the # ODE. Thanks to Chris Smith for suggesting this method. Many of # the comments below are his, too. # The method: # - Take each of 1..n derivatives of the solution. # - Solve each nth derivative for d^(n)f/dx^(n) # (the differential of that order) # - Back substitute into the ODE in decreasing order # (i.e., n, n-1, ...) # - Check the result for zero equivalence if sol.lhs == func and not sol.rhs.has(func): diffsols = {0: sol.rhs} elif sol.rhs == func and not sol.lhs.has(func): diffsols = {0: sol.lhs} else: diffsols = {} sol = sol.lhs - sol.rhs for i in range(1, order + 1): # Differentiation is a linear operator, so there should always # be 1 solution. Nonetheless, we test just to make sure. # We only need to solve once. After that, we automatically # have the solution to the differential in the order we want. if i == 1: ds = sol.diff(x) try: sdf = solve(ds, func.diff(x, i)) if not sdf: raise NotImplementedError except NotImplementedError: testnum += 1 break else: diffsols[i] = sdf[0] else: # This is what the solution says df/dx should be. diffsols[i] = diffsols[i - 1].diff(x) # Make sure the above didn't fail. if testnum > 2: continue else: # Substitute it into ODE to check for self consistency. lhs, rhs = ode.lhs, ode.rhs for i in range(order, -1, -1): if i == 0 and 0 not in diffsols: # We can only substitute f(x) if the solution was # solved for f(x). break lhs = sub_func_doit(lhs, func.diff(x, i), diffsols[i]) rhs = sub_func_doit(rhs, func.diff(x, i), diffsols[i]) ode_or_bool = Eq(lhs, rhs) ode_or_bool = simplify(ode_or_bool) if isinstance(ode_or_bool, (bool, BooleanAtom)): if ode_or_bool: lhs = rhs = S.Zero else: lhs = ode_or_bool.lhs rhs = ode_or_bool.rhs # No sense in overworking simplify -- just prove that the # numerator goes to zero num = trigsimp((lhs - rhs).as_numer_denom()[0]) # since solutions are obtained using force=True we test # using the same level of assumptions ## replace function with dummy so assumptions will work _func = Dummy('func') num = num.subs(func, _func) ## posify the expression num, reps = posify(num) s = simplify(num).xreplace(reps).xreplace({_func: func}) testnum += 1 else: break if not s: return (True, s) elif s is True: # The code above never was able to change s raise NotImplementedError("Unable to test if " + str(sol) + " is a solution to " + str(ode) + ".") else: return (False, s) def ode_sol_simplicity(sol, func, trysolving=True): r""" Returns an extended integer representing how simple a solution to an ODE is. The following things are considered, in order from most simple to least: - ``sol`` is solved for ``func``. - ``sol`` is not solved for ``func``, but can be if passed to solve (e.g., a solution returned by ``dsolve(ode, func, simplify=False``). - If ``sol`` is not solved for ``func``, then base the result on the length of ``sol``, as computed by ``len(str(sol))``. - If ``sol`` has any unevaluated :py:class:`~sympy.integrals.Integral`\s, this will automatically be considered less simple than any of the above. This function returns an integer such that if solution A is simpler than solution B by above metric, then ``ode_sol_simplicity(sola, func) < ode_sol_simplicity(solb, func)``. Currently, the following are the numbers returned, but if the heuristic is ever improved, this may change. Only the ordering is guaranteed. +----------------------------------------------+-------------------+ \| Simplicity \| Return \| +==============================================+===================+ \| ``sol`` solved for ``func`` \| ``-2`` \| +----------------------------------------------+-------------------+ \| ``sol`` not solved for ``func`` but can be \| ``-1`` \| +----------------------------------------------+-------------------+ \| ``sol`` is not solved nor solvable for \| ``len(str(sol))`` \| \| ``func`` \| \| +----------------------------------------------+-------------------+ \| ``sol`` contains an \| ``oo`` \| \| :py:class:`~sympy.integrals.Integral` \| \| +----------------------------------------------+-------------------+ ``oo`` here means the SymPy infinity, which should compare greater than any integer. If you already know :py:meth:`~sympy.solvers.solvers.solve` cannot solve ``sol``, you can use ``trysolving=False`` to skip that step, which is the only potentially slow step. For example, :py:meth:`~sympy.solvers.ode.dsolve` with the ``simplify=False`` flag should do this. If ``sol`` is a list of solutions, if the worst solution in the list returns ``oo`` it returns that, otherwise it returns ``len(str(sol))``, that is, the length of the string representation of the whole list. Examples ======== This function is designed to be passed to ``min`` as the key argument, such as ``min(listofsolutions, key=lambda i: ode_sol_simplicity(i, f(x)))``. >>> from sympy import symbols, Function, Eq, tan, cos, sqrt, Integral >>> from sympy.solvers.ode import ode_sol_simplicity >>> x, C1, C2 = symbols('x, C1, C2') >>> f = Function('f') >>> ode_sol_simplicity(Eq(f(x), C1x2), f(x)) -2 >>> ode_sol_simplicity(Eq(x2 + f(x), C1), f(x)) -1 >>> ode_sol_simplicity(Eq(f(x), C1Integral(2x, x)), f(x)) oo >>> eq1 = Eq(f(x)/tan(f(x)/(2x)), C1) >>> eq2 = Eq(f(x)/tan(f(x)/(2x) + f(x)), C2) >>> [ode_sol_simplicity(eq, f(x)) for eq in [eq1, eq2]] [28, 35] >>> min([eq1, eq2], key=lambda i: ode_sol_simplicity(i, f(x))) Eq(f(x)/tan(f(x)/(2x)), C1) """ # TODO: if two solutions are solved for f(x), we still want to be # able to get the simpler of the two # See the docstring for the coercion rules. We check easier (faster) # things here first, to save time. if iterable(sol): # See if there are Integrals for i in sol: if ode_sol_simplicity(i, func, trysolving=trysolving) == oo: return oo return len(str(sol)) if sol.has(Integral): return oo # Next, try to solve for func. This code will change slightly when CRootOf # is implemented in solve(). Probably a CRootOf solution should fall # somewhere between a normal solution and an unsolvable expression. # First, see if they are already solved if sol.lhs == func and not sol.rhs.has(func) or \ sol.rhs == func and not sol.lhs.has(func): return -2 # We are not so lucky, try solving manually if trysolving: try: sols = solve(sol, func) if not sols: raise NotImplementedError except NotImplementedError: pass else: return -1 # Finally, a naive computation based on the length of the string version # of the expression. This may favor combined fractions because they # will not have duplicate denominators, and may slightly favor expressions # with fewer additions and subtractions, as those are separated by spaces # by the printer. # Additional ideas for simplicity heuristics are welcome, like maybe # checking if a equation has a larger domain, or if constantsimp has # introduced arbitrary constants numbered higher than the order of a # given ODE that sol is a solution of. return len(str(sol)) def _get_constant_subexpressions(expr, Cs): Cs = set(Cs) Ces = [] def _recursive_walk(expr): expr_syms = expr.free_symbols if expr_syms and expr_syms.issubset(Cs): Ces.append(expr) else: if expr.func == exp: expr = expr.expand(mul=True) if expr.func in (Add, Mul): d = sift(expr.args, lambda i : i.free_symbols.issubset(Cs)) if len(d[True]) > 1: x = expr.func(d[True]) if not x.is_number: Ces.append(x) elif isinstance(expr, Integral): if expr.free_symbols.issubset(Cs) and \ all(len(x) == 3 for x in expr.limits): Ces.append(expr) for i in expr.args: _recursive_walk(i) return _recursive_walk(expr) return Ces def __remove_linear_redundancies(expr, Cs): cnts = {i: expr.count(i) for i in Cs} Cs = [i for i in Cs if cnts[i] > 0] def _linear(expr): if isinstance(expr, Add): xs = [i for i in Cs if expr.count(i)==cnts[i] \ and 0 == expr.diff(i, 2)] d = {} for x in xs: y = expr.diff(x) if y not in d: d[y]=[] d[y].append(x) for y in d: if len(d[y]) > 1: d[y].sort(key=str) for x in d[y][1:]: expr = expr.subs(x, 0) return expr def _recursive_walk(expr): if len(expr.args) != 0: expr = expr.func([_recursive_walk(i) for i in expr.args]) expr = _linear(expr) return expr if isinstance(expr, Equality): lhs, rhs = [_recursive_walk(i) for i in expr.args] f = lambda i: isinstance(i, Number) or i in Cs if isinstance(lhs, Symbol) and lhs in Cs: rhs, lhs = lhs, rhs if lhs.func in (Add, Symbol) and rhs.func in (Add, Symbol): dlhs = sift([lhs] if isinstance(lhs, AtomicExpr) else lhs.args, f) drhs = sift([rhs] if isinstance(rhs, AtomicExpr) else rhs.args, f) for i in [True, False]: for hs in [dlhs, drhs]: if i not in hs: hs[i] = [0] # this calculation can be simplified lhs = Add(dlhs[False]) - Add(drhs[False]) rhs = Add(drhs[True]) - Add(dlhs[True]) elif lhs.func in (Mul, Symbol) and rhs.func in (Mul, Symbol): dlhs = sift([lhs] if isinstance(lhs, AtomicExpr) else lhs.args, f) if True in dlhs: if False not in dlhs: dlhs[False] = [1] lhs = Mul(dlhs[False]) rhs = rhs/Mul(dlhs[True]) return Eq(lhs, rhs) else: return _recursive_walk(expr) @vectorize(0) def constantsimp(expr, constants): r""" Simplifies an expression with arbitrary constants in it. This function is written specifically to work with :py:meth:`~sympy.solvers.ode.dsolve`, and is not intended for general use. Simplification is done by "absorbing" the arbitrary constants into other arbitrary constants, numbers, and symbols that they are not independent of. The symbols must all have the same name with numbers after it, for example, ``C1``, ``C2``, ``C3``. The ``symbolname`` here would be '``C``', the ``startnumber`` would be 1, and the ``endnumber`` would be 3. If the arbitrary constants are independent of the variable ``x``, then the independent symbol would be ``x``. There is no need to specify the dependent function, such as ``f(x)``, because it already has the independent symbol, ``x``, in it. Because terms are "absorbed" into arbitrary constants and because constants are renumbered after simplifying, the arbitrary constants in expr are not necessarily equal to the ones of the same name in the returned result. If two or more arbitrary constants are added, multiplied, or raised to the power of each other, they are first absorbed together into a single arbitrary constant. Then the new constant is combined into other terms if necessary. Absorption of constants is done with limited assistance: 1. terms of :py:class:`~sympy.core.add.Add`\s are collected to try join constants so `e^x (C_1 \cos(x) + C_2 \cos(x))` will simplify to `e^x C_1 \cos(x)`; 2. powers with exponents that are :py:class:`~sympy.core.add.Add`\s are expanded so `e^{C_1 + x}` will be simplified to `C_1 e^x`. Use :py:meth:`~sympy.solvers.ode.constant_renumber` to renumber constants after simplification or else arbitrary numbers on constants may appear, e.g. `C_1 + C_3 x`. In rare cases, a single constant can be "simplified" into two constants. Every differential equation solution should have as many arbitrary constants as the order of the differential equation. The result here will be technically correct, but it may, for example, have `C_1` and `C_2` in an expression, when `C_1` is actually equal to `C_2`. Use your discretion in such situations, and also take advantage of the ability to use hints in :py:meth:`~sympy.solvers.ode.dsolve`. Examples ======== >>> from sympy import symbols >>> from sympy.solvers.ode import constantsimp >>> C1, C2, C3, x, y = symbols('C1, C2, C3, x, y') >>> constantsimp(2C1x, {C1, C2, C3}) C1x >>> constantsimp(C1 + 2 + x, {C1, C2, C3}) C1 + x >>> constantsimp(C1C2 + 2 + C2 + C3x, {C1, C2, C3}) C1 + C3x """ # This function works recursively. The idea is that, for Mul, # Add, Pow, and Function, if the class has a constant in it, then # we can simplify it, which we do by recursing down and # simplifying up. Otherwise, we can skip that part of the # expression. Cs = constants orig_expr = expr constant_subexprs = _get_constant_subexpressions(expr, Cs) for xe in constant_subexprs: xes = list(xe.free_symbols) if not xes: continue if all([expr.count(c) == xe.count(c) for c in xes]): xes.sort(key=str) expr = expr.subs(xe, xes[0]) # try to perform common sub-expression elimination of constant terms try: commons, rexpr = cse(expr) commons.reverse() rexpr = rexpr[0] for s in commons: cs = list(s[1].atoms(Symbol)) if len(cs) == 1 and cs[0] in Cs and \ cs[0] not in rexpr.atoms(Symbol) and \ not any(cs[0] in ex for ex in commons if ex != s): rexpr = rexpr.subs(s[0], cs[0]) else: rexpr = rexpr.subs(s) expr = rexpr except Exception: pass expr = __remove_linear_redundancies(expr, Cs) def _conditional_term_factoring(expr): new_expr = terms_gcd(expr, clear=False, deep=True, expand=False) # we do not want to factor exponentials, so handle this separately if new_expr.is_Mul: infac = False asfac = False for m in new_expr.args: if isinstance(m, exp): asfac = True elif m.is_Add: infac = any(isinstance(fi, exp) for t in m.args for fi in Mul.make_args(t)) if asfac and infac: new_expr = expr break return new_expr expr = _conditional_term_factoring(expr) # call recursively if more simplification is possible if orig_expr != expr: return constantsimp(expr, Cs) return expr def constant_renumber(expr, variables=None, newconstants=None): r""" Renumber arbitrary constants in ``expr`` to use the symbol names as given in ``newconstants``. In the process, this reorders expression terms in a standard way. If ``newconstants`` is not provided then the new constant names will be ``C1``, ``C2`` etc. Otherwise ``newconstants`` should be an iterable giving the new symbols to use for the constants in order. The ``variables`` argument is a list of non-constant symbols. All other free symbols found in ``expr`` are assumed to be constants and will be renumbered. If ``variables`` is not given then any numbered symbol beginning with ``C`` (e.g. ``C1``) is assumed to be a constant. Symbols are renumbered based on ``.sort_key()``, so they should be numbered roughly in the order that they appear in the final, printed expression. Note that this ordering is based in part on hashes, so it can produce different results on different machines. The structure of this function is very similar to that of :py:meth:`~sympy.solvers.ode.constantsimp`. Examples ======== >>> from sympy import symbols, Eq, pprint >>> from sympy.solvers.ode import constant_renumber >>> x, C1, C2, C3 = symbols('x,C1:4') >>> expr = C3 + C2x + C1x2 >>> expr C1x*2 + C2x + C3 >>> constant_renumber(expr) C1 + C2x + C3x*2 The ``variables`` argument specifies which are constants so that the other symbols will not be renumbered: >>> constant_renumber(expr, [C1, x]) C1x*2 + C2 + C3x The ``newconstants`` argument is used to specify what symbols to use when replacing the constants: >>> constant_renumber(expr, [x], newconstants=symbols('E1:4')) E1 + E2x + E3x*2 """ if type(expr) in (set, list, tuple): renumbered = [constant_renumber(e, variables, newconstants) for e in expr] return type(expr)(renumbered) # Symbols in solution but not ODE are constants if variables is not None: variables = set(variables) constantsymbols = list(expr.free_symbols - variables) # Any Cn is a constant... else: variables = set() isconstant = lambda s: s.startswith('C') and s[1:].isdigit() constantsymbols = [sym for sym in expr.free_symbols if isconstant(sym.name)] # Find new constants checking that they aren't already in the ODE if newconstants is None: iter_constants = numbered_symbols(start=1, prefix='C', exclude=variables) else: iter_constants = (sym for sym in newconstants if sym not in variables) global newstartnumber newstartnumber = 1 endnumber = len(constantsymbols) constants_found = [None](endnumber + 2) # make a mapping to send all constantsymbols to S.One and use # that to make sure that term ordering is not dependent on # the indexed value of C C_1 = [(ci, S.One) for ci in constantsymbols] sort_key=lambda arg: default_sort_key(arg.subs(C_1)) def _constant_renumber(expr): r""" We need to have an internal recursive function so that newstartnumber maintains its values throughout recursive calls. """ # FIXME: Use nonlocal here when support for Py2 is dropped: global newstartnumber if isinstance(expr, Equality): return Eq( _constant_renumber(expr.lhs), _constant_renumber(expr.rhs)) if type(expr) not in (Mul, Add, Pow) and not expr.is_Function and \ not expr.has(constantsymbols): # Base case, as above. Hope there aren't constants inside # of some other class, because they won't be renumbered. return expr elif expr.is_Piecewise: return expr elif expr in constantsymbols: if expr not in constants_found: constants_found[newstartnumber] = expr newstartnumber += 1 return expr elif expr.is_Function or expr.is_Pow or isinstance(expr, Tuple): return expr.func( [_constant_renumber(x) for x in expr.args]) else: sortedargs = list(expr.args) sortedargs.sort(key=sort_key) return expr.func([_constant_renumber(x) for x in sortedargs]) expr = _constant_renumber(expr) # Don't renumber symbols present in the ODE. constants_found = [c for c in constants_found if c not in variables] # Renumbering happens here expr = expr.subs(zip(constants_found[1:], iter_constants), simultaneous=True) return expr def _handle_Integral(expr, func, hint): r""" Converts a solution with Integrals in it into an actual solution. For most hints, this simply runs ``expr.doit()``. """ global y x = func.args[0] f = func.func if hint == "1st_exact": sol = (expr.doit()).subs(y, f(x)) del y elif hint == "1st_exact_Integral": sol = Eq(Subs(expr.lhs, y, f(x)), expr.rhs) del y elif hint == "nth_linear_constant_coeff_homogeneous": sol = expr elif not hint.endswith("_Integral"): sol = expr.doit() else: sol = expr return sol # FIXME: replace the general solution in the docstring with # dsolve(equation, hint='1st_exact_Integral'). You will need to be able # to have assumptions on P and Q that dP/dy = dQ/dx. def ode_1st_exact(eq, func, order, match): r""" Solves 1st order exact ordinary differential equations. A 1st order differential equation is called exact if it is the total differential of a function. That is, the differential equation .. math:: P(x, y) \,\partial{}x + Q(x, y) \,\partial{}y = 0 is exact if there is some function `F(x, y)` such that `P(x, y) = \partial{}F/\partial{}x` and `Q(x, y) = \partial{}F/\partial{}y`. It can be shown that a necessary and sufficient condition for a first order ODE to be exact is that `\partial{}P/\partial{}y = \partial{}Q/\partial{}x`. Then, the solution will be as given below:: >>> from sympy import Function, Eq, Integral, symbols, pprint >>> x, y, t, x0, y0, C1= symbols('x,y,t,x0,y0,C1') >>> P, Q, F= map(Function, ['P', 'Q', 'F']) >>> pprint(Eq(Eq(F(x, y), Integral(P(t, y), (t, x0, x)) + ... Integral(Q(x0, t), (t, y0, y))), C1)) x y / / \| \| F(x, y) = \| P(t, y) dt + \| Q(x0, t) dt = C1 \| \| / / x0 y0 Where the first partials of `P` and `Q` exist and are continuous in a simply connected region. A note: SymPy currently has no way to represent inert substitution on an expression, so the hint ``1st_exact_Integral`` will return an integral with `dy`. This is supposed to represent the function that you are solving for. Examples ======== >>> from sympy import Function, dsolve, cos, sin >>> from sympy.abc import x >>> f = Function('f') >>> dsolve(cos(f(x)) - (xsin(f(x)) - f(x)*2)f(x).diff(x), ... f(x), hint='1st_exact') Eq(xcos(f(x)) + f(x)3/3, C1) References ========== - https://en.wikipedia.org/wiki/Exact_differential_equation - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 73 # indirect doctest """ x = func.args[0] r = match # d+ediff(f(x),x) e = r[r['e']] d = r[r['d']] global y # This is the only way to pass dummy y to _handle_Integral y = r['y'] C1 = get_numbered_constants(eq, num=1) # Refer Joel Moses, "Symbolic Integration - The Stormy Decade", # Communications of the ACM, Volume 14, Number 8, August 1971, pp. 558 # which gives the method to solve an exact differential equation. sol = Integral(d, x) + Integral((e - (Integral(d, x).diff(y))), y) return Eq(sol, C1) def ode_1st_homogeneous_coeff_best(eq, func, order, match): r""" Returns the best solution to an ODE from the two hints ``1st_homogeneous_coeff_subs_dep_div_indep`` and ``1st_homogeneous_coeff_subs_indep_div_dep``. This is as determined by :py:meth:`~sympy.solvers.ode.ode_sol_simplicity`. See the :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_subs_indep_div_dep` and :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_subs_dep_div_indep` docstrings for more information on these hints. Note that there is no ``ode_1st_homogeneous_coeff_best_Integral`` hint. Examples ======== >>> from sympy import Function, dsolve, pprint >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(2xf(x) + (x2 + f(x)2)f(x).diff(x), f(x), ... hint='1st_homogeneous_coeff_best', simplify=False)) / 2 \ \| 3x \| log\|----- + 1\| \| 2 \| \f (x) / log(f(x)) = log(C1) - -------------- 3 References ========== - https://en.wikipedia.org/wiki/Homogeneous_differential_equation - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 59 # indirect doctest """ # There are two substitutions that solve the equation, u1=y/x and u2=x/y # They produce different integrals, so try them both and see which # one is easier. sol1 = ode_1st_homogeneous_coeff_subs_indep_div_dep(eq, func, order, match) sol2 = ode_1st_homogeneous_coeff_subs_dep_div_indep(eq, func, order, match) simplify = match.get('simplify', True) if simplify: # why is odesimp called here? Should it be at the usual spot? sol1 = odesimp(eq, sol1, func, "1st_homogeneous_coeff_subs_indep_div_dep") sol2 = odesimp(eq, sol2, func, "1st_homogeneous_coeff_subs_dep_div_indep") return min([sol1, sol2], key=lambda x: ode_sol_simplicity(x, func, trysolving=not simplify)) def ode_1st_homogeneous_coeff_subs_dep_div_indep(eq, func, order, match): r""" Solves a 1st order differential equation with homogeneous coefficients using the substitution `u_1 = \frac{\text{<dependent variable>}}{\text{<independent variable>}}`. This is a differential equation .. math:: P(x, y) + Q(x, y) dy/dx = 0 such that `P` and `Q` are homogeneous and of the same order. A function `F(x, y)` is homogeneous of order `n` if `F(x t, y t) = t^n F(x, y)`. Equivalently, `F(x, y)` can be rewritten as `G(y/x)` or `H(x/y)`. See also the docstring of :py:meth:`~sympy.solvers.ode.homogeneous_order`. If the coefficients `P` and `Q` in the differential equation above are homogeneous functions of the same order, then it can be shown that the substitution `y = u_1 x` (i.e. `u_1 = y/x`) will turn the differential equation into an equation separable in the variables `x` and `u`. If `h(u_1)` is the function that results from making the substitution `u_1 = f(x)/x` on `P(x, f(x))` and `g(u_2)` is the function that results from the substitution on `Q(x, f(x))` in the differential equation `P(x, f(x)) + Q(x, f(x)) f'(x) = 0`, then the general solution is:: >>> from sympy import Function, dsolve, pprint >>> from sympy.abc import x >>> f, g, h = map(Function, ['f', 'g', 'h']) >>> genform = g(f(x)/x) + h(f(x)/x)f(x).diff(x) >>> pprint(genform) /f(x)\ /f(x)\ d g\|----\| + h\|----\|--(f(x)) \ x / \ x / dx >>> pprint(dsolve(genform, f(x), ... hint='1st_homogeneous_coeff_subs_dep_div_indep_Integral')) f(x) ---- x / \| \| -h(u1) log(x) = C1 + \| ---------------- d(u1) \| u1h(u1) + g(u1) \| / Where `u_1 h(u_1) + g(u_1) \ne 0` and `x \ne 0`. See also the docstrings of :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_best` and :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_subs_indep_div_dep`. Examples ======== >>> from sympy import Function, dsolve >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(2xf(x) + (x2 + f(x)2)f(x).diff(x), f(x), ... hint='1st_homogeneous_coeff_subs_dep_div_indep', simplify=False)) / 3 \ \|3f(x) f (x)\| log\|------ + -----\| \| x 3 \| \ x / log(x) = log(C1) - ------------------- 3 References ========== - https://en.wikipedia.org/wiki/Homogeneous_differential_equation - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 59 # indirect doctest """ x = func.args[0] f = func.func u = Dummy('u') u1 = Dummy('u1') # u1 == f(x)/x r = match # d+ediff(f(x),x) C1 = get_numbered_constants(eq, num=1) xarg = match.get('xarg', 0) yarg = match.get('yarg', 0) int = Integral( (-r[r['e']]/(r[r['d']] + u1r[r['e']])).subs({x: 1, r['y']: u1}), (u1, None, f(x)/x)) sol = logcombine(Eq(log(x), int + log(C1)), force=True) sol = sol.subs(f(x), u).subs(((u, u - yarg), (x, x - xarg), (u, f(x)))) return sol def ode_1st_homogeneous_coeff_subs_indep_div_dep(eq, func, order, match): r""" Solves a 1st order differential equation with homogeneous coefficients using the substitution `u_2 = \frac{\text{<independent variable>}}{\text{<dependent variable>}}`. This is a differential equation .. math:: P(x, y) + Q(x, y) dy/dx = 0 such that `P` and `Q` are homogeneous and of the same order. A function `F(x, y)` is homogeneous of order `n` if `F(x t, y t) = t^n F(x, y)`. Equivalently, `F(x, y)` can be rewritten as `G(y/x)` or `H(x/y)`. See also the docstring of :py:meth:`~sympy.solvers.ode.homogeneous_order`. If the coefficients `P` and `Q` in the differential equation above are homogeneous functions of the same order, then it can be shown that the substitution `x = u_2 y` (i.e. `u_2 = x/y`) will turn the differential equation into an equation separable in the variables `y` and `u_2`. If `h(u_2)` is the function that results from making the substitution `u_2 = x/f(x)` on `P(x, f(x))` and `g(u_2)` is the function that results from the substitution on `Q(x, f(x))` in the differential equation `P(x, f(x)) + Q(x, f(x)) f'(x) = 0`, then the general solution is: >>> from sympy import Function, dsolve, pprint >>> from sympy.abc import x >>> f, g, h = map(Function, ['f', 'g', 'h']) >>> genform = g(x/f(x)) + h(x/f(x))f(x).diff(x) >>> pprint(genform) / x \ / x \ d g\|----\| + h\|----\|--(f(x)) \f(x)/ \f(x)/ dx >>> pprint(dsolve(genform, f(x), ... hint='1st_homogeneous_coeff_subs_indep_div_dep_Integral')) x ---- f(x) / \| \| -g(u2) \| ---------------- d(u2) \| u2g(u2) + h(u2) \| / <BLANKLINE> f(x) = C1e Where `u_2 g(u_2) + h(u_2) \ne 0` and `f(x) \ne 0`. See also the docstrings of :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_best` and :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_subs_dep_div_indep`. Examples ======== >>> from sympy import Function, pprint, dsolve >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(2xf(x) + (x2 + f(x)2)f(x).diff(x), f(x), ... hint='1st_homogeneous_coeff_subs_indep_div_dep', ... simplify=False)) / 2 \ \| 3x \| log\|----- + 1\| \| 2 \| \f (x) / log(f(x)) = log(C1) - -------------- 3 References ========== - https://en.wikipedia.org/wiki/Homogeneous_differential_equation - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 59 # indirect doctest """ x = func.args[0] f = func.func u = Dummy('u') u2 = Dummy('u2') # u2 == x/f(x) r = match # d+ediff(f(x),x) C1 = get_numbered_constants(eq, num=1) xarg = match.get('xarg', 0) # If xarg present take xarg, else zero yarg = match.get('yarg', 0) # If yarg present take yarg, else zero int = Integral( simplify( (-r[r['d']]/(r[r['e']] + u2r[r['d']])).subs({x: u2, r['y']: 1})), (u2, None, x/f(x))) sol = logcombine(Eq(log(f(x)), int + log(C1)), force=True) sol = sol.subs(f(x), u).subs(((u, u - yarg), (x, x - xarg), (u, f(x)))) return sol # XXX: Should this function maybe go somewhere else? def homogeneous_order(eq, symbols): r""" Returns the order `n` if `g` is homogeneous and ``None`` if it is not homogeneous. Determines if a function is homogeneous and if so of what order. A function `f(x, y, \cdots)` is homogeneous of order `n` if `f(t x, t y, \cdots) = t^n f(x, y, \cdots)`. If the function is of two variables, `F(x, y)`, then `f` being homogeneous of any order is equivalent to being able to rewrite `F(x, y)` as `G(x/y)` or `H(y/x)`. This fact is used to solve 1st order ordinary differential equations whose coefficients are homogeneous of the same order (see the docstrings of :py:meth:`~solvers.ode.ode_1st_homogeneous_coeff_subs_dep_div_indep` and :py:meth:`~solvers.ode.ode_1st_homogeneous_coeff_subs_indep_div_dep`). Symbols can be functions, but every argument of the function must be a symbol, and the arguments of the function that appear in the expression must match those given in the list of symbols. If a declared function appears with different arguments than given in the list of symbols, ``None`` is returned. Examples ======== >>> from sympy import Function, homogeneous_order, sqrt >>> from sympy.abc import x, y >>> f = Function('f') >>> homogeneous_order(f(x), f(x)) is None True >>> homogeneous_order(f(x,y), f(y, x), x, y) is None True >>> homogeneous_order(f(x), f(x), x) 1 >>> homogeneous_order(x*2f(x)/sqrt(x2+f(x)2), x, f(x)) 2 >>> homogeneous_order(x*2+f(x), x, f(x)) is None True """ if not symbols: raise ValueError("homogeneous_order: no symbols were given.") symset = set(symbols) eq = sympify(eq) # The following are not supported if eq.has(Order, Derivative): return None # These are all constants if (eq.is_Number or eq.is_NumberSymbol or eq.is_number ): return S.Zero # Replace all functions with dummy variables dum = numbered_symbols(prefix='d', cls=Dummy) newsyms = set() for i in [j for j in symset if getattr(j, 'is_Function')]: iargs = set(i.args) if iargs.difference(symset): return None else: dummyvar = next(dum) eq = eq.subs(i, dummyvar) symset.remove(i) newsyms.add(dummyvar) symset.update(newsyms) if not eq.free_symbols & symset: return None # assuming order of a nested function can only be equal to zero if isinstance(eq, Function): return None if homogeneous_order( eq.args[0], tuple(symset)) != 0 else S.Zero # make the replacement of x with xt and see if t can be factored out t = Dummy('t', positive=True) # It is sufficient that t > 0 eqs = separatevars(eq.subs([(i, ti) for i in symset]), [t], dict=True)[t] if eqs is S.One: return S.Zero # there was no term with only t i, d = eqs.as_independent(t, as_Add=False) b, e = d.as_base_exp() if b == t: return e def ode_1st_linear(eq, func, order, match): r""" Solves 1st order linear differential equations. These are differential equations of the form .. math:: dy/dx + P(x) y = Q(x)\text{.} These kinds of differential equations can be solved in a general way. The integrating factor `e^{\int P(x) \,dx}` will turn the equation into a separable equation. The general solution is:: >>> from sympy import Function, dsolve, Eq, pprint, diff, sin >>> from sympy.abc import x >>> f, P, Q = map(Function, ['f', 'P', 'Q']) >>> genform = Eq(f(x).diff(x) + P(x)f(x), Q(x)) >>> pprint(genform) d P(x)f(x) + --(f(x)) = Q(x) dx >>> pprint(dsolve(genform, f(x), hint='1st_linear_Integral')) / / \ \| \| \| \| \| / \| / \| \| \| \| \| \| \| \| P(x) dx \| - \| P(x) dx \| \| \| \| \| \| \| / \| / f(x) = \|C1 + \| Q(x)e dx\|e \| \| \| \ / / Examples ======== >>> f = Function('f') >>> pprint(dsolve(Eq(xdiff(f(x), x) - f(x), x2sin(x)), ... f(x), '1st_linear')) f(x) = x(C1 - cos(x)) References ========== - https://en.wikipedia.org/wiki/Linear_differential_equation#First_order_equation - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 92 # indirect doctest """ x = func.args[0] f = func.func r = match # adiff(f(x),x) + bf(x) + c C1 = get_numbered_constants(eq, num=1) t = exp(Integral(r[r['b']]/r[r['a']], x)) tt = Integral(t(-r[r['c']]/r[r['a']]), x) f = match.get('u', f(x)) # take almost-linear u if present, else f(x) return Eq(f, (tt + C1)/t) def ode_Bernoulli(eq, func, order, match): r""" Solves Bernoulli differential equations. These are equations of the form .. math:: dy/dx + P(x) y = Q(x) y^n\text{, }n \ne 1`\text{.} The substitution `w = 1/y^{1-n}` will transform an equation of this form into one that is linear (see the docstring of :py:meth:`~sympy.solvers.ode.ode_1st_linear`). The general solution is:: >>> from sympy import Function, dsolve, Eq, pprint >>> from sympy.abc import x, n >>> f, P, Q = map(Function, ['f', 'P', 'Q']) >>> genform = Eq(f(x).diff(x) + P(x)f(x), Q(x)f(x)*n) >>> pprint(genform) d n P(x)f(x) + --(f(x)) = Q(x)f (x) dx >>> pprint(dsolve(genform, f(x), hint='Bernoulli_Integral')) #doctest: +SKIP 1 ---- 1 - n // / \ \ \|\| \| \| \| \|\| \| / \| / \| \|\| \| \| \| \| \| \|\| \| (1 - n) \| P(x) dx \| (-1 + n)* \| P(x) dx\| \|\| \| \| \| \| \| \|\| \| / \| / \| f(x) = \|\|C1 + (-1 + n)* \| -Q(x)e dx\|e \| \|\| \| \| \| \\ / / / Note that the equation is separable when `n = 1` (see the docstring of :py:meth:`~sympy.solvers.ode.ode_separable`). >>> pprint(dsolve(Eq(f(x).diff(x) + P(x)f(x), Q(x)f(x)), f(x), ... hint='separable_Integral')) f(x) / \| / \| 1 \| \| - dy = C1 + \| (-P(x) + Q(x)) dx \| y \| \| / / Examples ======== >>> from sympy import Function, dsolve, Eq, pprint, log >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(Eq(xf(x).diff(x) + f(x), log(x)f(x)*2), ... f(x), hint='Bernoulli')) 1 f(x) = ------------------- / log(x) 1\ x\|C1 + ------ + -\| \ x x/ References ========== - https://en.wikipedia.org/wiki/Bernoulli_differential_equation - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 95 # indirect doctest """ x = func.args[0] f = func.func r = match # adiff(f(x),x) + bf(x) + cf(x)n, n != 1 C1 = get_numbered_constants(eq, num=1) t = exp((1 - r[r['n']])Integral(r[r['b']]/r[r['a']], x)) tt = (r[r['n']] - 1)Integral(tr[r['c']]/r[r['a']], x) return Eq(f(x), ((tt + C1)/t)*(1/(1 - r[r['n']]))) def ode_Riccati_special_minus2(eq, func, order, match): r""" The general Riccati equation has the form .. math:: dy/dx = f(x) y^2 + g(x) y + h(x)\text{.} While it does not have a general solution [1], the "special" form, `dy/dx = a y^2 - b x^c`, does have solutions in many cases [2]. This routine returns a solution for `a(dy/dx) = b y^2 + c y/x + d/x^2` that is obtained by using a suitable change of variables to reduce it to the special form and is valid when neither `a` nor `b` are zero and either `c` or `d` is zero. >>> from sympy.abc import x, y, a, b, c, d >>> from sympy.solvers.ode import dsolve, checkodesol >>> from sympy import pprint, Function >>> f = Function('f') >>> y = f(x) >>> genform = ay.diff(x) - (by2 + cy/x + d/x*2) >>> sol = dsolve(genform, y) >>> pprint(sol, wrap_line=False) / / __________________ \\ \| __________________ \| / 2 \|\| \| / 2 \| \/ 4bd - (a + c) log(x)\|\| -\|a + c - \/ 4bd - (a + c) tan\|C1 + ----------------------------\|\| \ \ 2a // f(x) = ------------------------------------------------------------------------ 2bx >>> checkodesol(genform, sol, order=1)[0] True References ========== 1. http://www.maplesoft.com/support/help/Maple/view.aspx?path=odeadvisor/Riccati 2. http://eqworld.ipmnet.ru/en/solutions/ode/ode0106.pdf - http://eqworld.ipmnet.ru/en/solutions/ode/ode0123.pdf """ x = func.args[0] f = func.func r = match # a2diff(f(x),x) + b2f(x) + c2f(x)/x + d2/x2 a2, b2, c2, d2 = [r[r[s]] for s in 'a2 b2 c2 d2'.split()] C1 = get_numbered_constants(eq, num=1) mu = sqrt(4d2b2 - (a2 - c2)2) return Eq(f(x), (a2 - c2 - mutan(mu/(2a2)log(x) + C1))/(2b2x)) def ode_Liouville(eq, func, order, match): r""" Solves 2nd order Liouville differential equations. The general form of a Liouville ODE is .. math:: \frac{d^2 y}{dx^2} + g(y) \left(\! \frac{dy}{dx}\!\right)^2 + h(x) \frac{dy}{dx}\text{.} The general solution is: >>> from sympy import Function, dsolve, Eq, pprint, diff >>> from sympy.abc import x >>> f, g, h = map(Function, ['f', 'g', 'h']) >>> genform = Eq(diff(f(x),x,x) + g(f(x))diff(f(x),x)2 + ... h(x)diff(f(x),x), 0) >>> pprint(genform) 2 2 /d \ d d g(f(x))\|--(f(x))\| + h(x)--(f(x)) + ---(f(x)) = 0 \dx / dx 2 dx >>> pprint(dsolve(genform, f(x), hint='Liouville_Integral')) f(x) / / \| \| \| / \| / \| \| \| \| \| - \| h(x) dx \| \| g(y) dy \| \| \| \| \| / \| / C1 + C2* \| e dx + \| e dy = 0 \| \| / / Examples ======== >>> from sympy import Function, dsolve, Eq, pprint >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(diff(f(x), x, x) + diff(f(x), x)*2/f(x) + ... diff(f(x), x)/x, f(x), hint='Liouville')) ________________ ________________ [f(x) = -\/ C1 + C2log(x) , f(x) = \/ C1 + C2log(x) ] References ========== - Goldstein and Braun, "Advanced Methods for the Solution of Differential Equations", pp. 98 - http://www.maplesoft.com/support/help/Maple/view.aspx?path=odeadvisor/Liouville # indirect doctest """ # Liouville ODE: # f(x).diff(x, 2) + g(f(x))(f(x).diff(x, 2))*2 + h(x)f(x).diff(x) # See Goldstein and Braun, "Advanced Methods for the Solution of # Differential Equations", pg. 98, as well as # http://www.maplesoft.com/support/help/view.aspx?path=odeadvisor/Liouville x = func.args[0] f = func.func r = match # f(x).diff(x, 2) + gf(x).diff(x)2 + hf(x).diff(x) y = r['y'] C1, C2 = get_numbered_constants(eq, num=2) int = Integral(exp(Integral(r['g'], y)), (y, None, f(x))) sol = Eq(int + C1Integral(exp(-Integral(r['h'], x)), x) + C2, 0) return sol def ode_2nd_power_series_ordinary(eq, func, order, match): r""" Gives a power series solution to a second order homogeneous differential equation with polynomial coefficients at an ordinary point. A homogeneous differential equation is of the form .. math :: P(x)\frac{d^2y}{dx^2} + Q(x)\frac{dy}{dx} + R(x) = 0 For simplicity it is assumed that `P(x)`, `Q(x)` and `R(x)` are polynomials, it is sufficient that `\frac{Q(x)}{P(x)}` and `\frac{R(x)}{P(x)}` exists at `x_{0}`. A recurrence relation is obtained by substituting `y` as `\sum_{n=0}^\infty a_{n}x^{n}`, in the differential equation, and equating the nth term. Using this relation various terms can be generated. Examples ======== >>> from sympy import dsolve, Function, pprint >>> from sympy.abc import x, y >>> f = Function("f") >>> eq = f(x).diff(x, 2) + f(x) >>> pprint(dsolve(eq, hint='2nd_power_series_ordinary')) / 4 2 \ / 2\ \|x x \| \| x \| / 6\ f(x) = C2\|-- - -- + 1\| + C1x\|1 - --\| + O\x / \24 2 / \ 6 / References ========== - http://tutorial.math.lamar.edu/Classes/DE/SeriesSolutions.aspx - George E. Simmons, "Differential Equations with Applications and Historical Notes", p.p 176 - 184 """ x = func.args[0] f = func.func C0, C1 = get_numbered_constants(eq, num=2) n = Dummy("n", integer=True) s = Wild("s") k = Wild("k", exclude=[x]) x0 = match.get('x0') terms = match.get('terms', 5) p = match[match['a3']] q = match[match['b3']] r = match[match['c3']] seriesdict = {} recurr = Function("r") # Generating the recurrence relation which works this way: # for the second order term the summation begins at n = 2. The coefficients # p is multiplied with an(n - 1)(n - 2)xn-2 and a substitution is made such that # the exponent of x becomes n. # For example, if p is x, then the second degree recurrence term is # an(n - 1)(n - 2)x*n-1, substituting (n - 1) as n, it transforms to # an+1n(n - 1)x*n. # A similar process is done with the first order and zeroth order term. coefflist = [(recurr(n), r), (nrecurr(n), q), (n(n - 1)recurr(n), p)] for index, coeff in enumerate(coefflist): if coeff[1]: f2 = powsimp(expand((coeff[1](x - x0)(n - index)).subs(x, x + x0))) if f2.is_Add: addargs = f2.args else: addargs = [f2] for arg in addargs: powm = arg.match(sx*k) term = coeff[0]powm[s] if not powm[k].is_Symbol: term = term.subs(n, n - powm[k].as_independent(n)[0]) startind = powm[k].subs(n, index) # Seeing if the startterm can be reduced further. # If it vanishes for n lesser than startind, it is # equal to summation from n. if startind: for i in reversed(range(startind)): if not term.subs(n, i): seriesdict[term] = i else: seriesdict[term] = i + 1 break else: seriesdict[term] = S(0) # Stripping of terms so that the sum starts with the same number. teq = S(0) suminit = seriesdict.values() rkeys = seriesdict.keys() req = Add(rkeys) if any(suminit): maxval = max(suminit) for term in seriesdict: val = seriesdict[term] if val != maxval: for i in range(val, maxval): teq += term.subs(n, val) finaldict = {} if teq: fargs = teq.atoms(AppliedUndef) if len(fargs) == 1: finaldict[fargs.pop()] = 0 else: maxf = max(fargs, key = lambda x: x.args[0]) sol = solve(teq, maxf) if isinstance(sol, list): sol = sol[0] finaldict[maxf] = sol # Finding the recurrence relation in terms of the largest term. fargs = req.atoms(AppliedUndef) maxf = max(fargs, key = lambda x: x.args[0]) minf = min(fargs, key = lambda x: x.args[0]) if minf.args[0].is_Symbol: startiter = 0 else: startiter = -minf.args[0].as_independent(n)[0] lhs = maxf rhs = solve(req, maxf) if isinstance(rhs, list): rhs = rhs[0] # Checking how many values are already present tcounter = len([t for t in finaldict.values() if t]) for _ in range(tcounter, terms - 3): # Assuming c0 and c1 to be arbitrary check = rhs.subs(n, startiter) nlhs = lhs.subs(n, startiter) nrhs = check.subs(finaldict) finaldict[nlhs] = nrhs startiter += 1 # Post processing series = C0 + C1(x - x0) for term in finaldict: if finaldict[term]: fact = term.args[0] series += (finaldict[term].subs([(recurr(0), C0), (recurr(1), C1)])( x - x0)fact) series = collect(expand_mul(series), [C0, C1]) + Order(xterms) return Eq(f(x), series) def ode_2nd_power_series_regular(eq, func, order, match): r""" Gives a power series solution to a second order homogeneous differential equation with polynomial coefficients at a regular point. A second order homogeneous differential equation is of the form .. math :: P(x)\frac{d^2y}{dx^2} + Q(x)\frac{dy}{dx} + R(x) = 0 A point is said to regular singular at `x0` if `x - x0\frac{Q(x)}{P(x)}` and `(x - x0)^{2}\frac{R(x)}{P(x)}` are analytic at `x0`. For simplicity `P(x)`, `Q(x)` and `R(x)` are assumed to be polynomials. The algorithm for finding the power series solutions is: 1. Try expressing `(x - x0)P(x)` and `((x - x0)^{2})Q(x)` as power series solutions about x0. Find `p0` and `q0` which are the constants of the power series expansions. 2. Solve the indicial equation `f(m) = m(m - 1) + mp0 + q0`, to obtain the roots `m1` and `m2` of the indicial equation. 3. If `m1 - m2` is a non integer there exists two series solutions. If `m1 = m2`, there exists only one solution. If `m1 - m2` is an integer, then the existence of one solution is confirmed. The other solution may or may not exist. The power series solution is of the form `x^{m}\sum_{n=0}^\infty a_{n}x^{n}`. The coefficients are determined by the following recurrence relation. `a_{n} = -\frac{\sum_{k=0}^{n-1} q_{n-k} + (m + k)p_{n-k}}{f(m + n)}`. For the case in which `m1 - m2` is an integer, it can be seen from the recurrence relation that for the lower root `m`, when `n` equals the difference of both the roots, the denominator becomes zero. So if the numerator is not equal to zero, a second series solution exists. Examples ======== >>> from sympy import dsolve, Function, pprint >>> from sympy.abc import x, y >>> f = Function("f") >>> eq = x(f(x).diff(x, 2)) + 2(f(x).diff(x)) + xf(x) >>> pprint(dsolve(eq)) / 6 4 2 \ \| x x x \| / 4 2 \ C1\|- --- + -- - -- + 1\| \| x x \| \ 720 24 2 / / 6\ f(x) = C2\|--- - -- + 1\| + ------------------------ + O\x / \120 6 / x References ========== - George E. Simmons, "Differential Equations with Applications and Historical Notes", p.p 176 - 184 """ x = func.args[0] f = func.func C0, C1 = get_numbered_constants(eq, num=2) m = Dummy("m") # for solving the indicial equation x0 = match.get('x0') terms = match.get('terms', 5) p = match['p'] q = match['q'] # Generating the indicial equation indicial = [] for term in [p, q]: if not term.has(x): indicial.append(term) else: term = series(term, n=1, x0=x0) if isinstance(term, Order): indicial.append(S(0)) else: for arg in term.args: if not arg.has(x): indicial.append(arg) break p0, q0 = indicial sollist = solve(m(m - 1) + mp0 + q0, m) if sollist and isinstance(sollist, list) and all( [sol.is_real for sol in sollist]): serdict1 = {} serdict2 = {} if len(sollist) == 1: # Only one series solution exists in this case. m1 = m2 = sollist.pop() if terms-m1-1 <= 0: return Eq(f(x), Order(terms)) serdict1 = _frobenius(terms-m1-1, m1, p0, q0, p, q, x0, x, C0) else: m1 = sollist[0] m2 = sollist[1] if m1 < m2: m1, m2 = m2, m1 # Irrespective of whether m1 - m2 is an integer or not, one # Frobenius series solution exists. serdict1 = _frobenius(terms-m1-1, m1, p0, q0, p, q, x0, x, C0) if not (m1 - m2).is_integer: # Second frobenius series solution exists. serdict2 = _frobenius(terms-m2-1, m2, p0, q0, p, q, x0, x, C1) else: # Check if second frobenius series solution exists. serdict2 = _frobenius(terms-m2-1, m2, p0, q0, p, q, x0, x, C1, check=m1) if serdict1: finalseries1 = C0 for key in serdict1: power = int(key.name[1:]) finalseries1 += serdict1[key](x - x0)power finalseries1 = (x - x0)m1finalseries1 finalseries2 = S(0) if serdict2: for key in serdict2: power = int(key.name[1:]) finalseries2 += serdict2[key](x - x0)power finalseries2 += C1 finalseries2 = (x - x0)m2finalseries2 return Eq(f(x), collect(finalseries1 + finalseries2, [C0, C1]) + Order(xterms)) def _frobenius(n, m, p0, q0, p, q, x0, x, c, check=None): r""" Returns a dict with keys as coefficients and values as their values in terms of C0 """ n = int(n) # In cases where m1 - m2 is not an integer m2 = check d = Dummy("d") numsyms = numbered_symbols("C", start=0) numsyms = [next(numsyms) for i in range(n + 1)] serlist = [] for ser in [p, q]: # Order term not present if ser.is_polynomial(x) and Poly(ser, x).degree() <= n: if x0: ser = ser.subs(x, x + x0) dict_ = Poly(ser, x).as_dict() # Order term present else: tseries = series(ser, x=x0, n=n+1) # Removing order dict_ = Poly(list(ordered(tseries.args))[: -1], x).as_dict() # Fill in with zeros, if coefficients are zero. for i in range(n + 1): if (i,) not in dict_: dict_[(i,)] = S(0) serlist.append(dict_) pseries = serlist[0] qseries = serlist[1] indicial = d(d - 1) + dp0 + q0 frobdict = {} for i in range(1, n + 1): num = c(mpseries[(i,)] + qseries[(i,)]) for j in range(1, i): sym = Symbol("C" + str(j)) num += frobdict[sym]((m + j)pseries[(i - j,)] + qseries[(i - j,)]) # Checking for cases when m1 - m2 is an integer. If num equals zero # then a second Frobenius series solution cannot be found. If num is not zero # then set constant as zero and proceed. if m2 is not None and i == m2 - m: if num: return False else: frobdict[numsyms[i]] = S(0) else: frobdict[numsyms[i]] = -num/(indicial.subs(d, m+i)) return frobdict def _nth_order_reducible_match(eq, func): r""" Matches any differential equation that can be rewritten with a smaller order. Only derivatives of ``func`` alone, wrt a single variable, are considered, and only in them should ``func`` appear. """ # ODE only handles functions of 1 variable so this affirms that state assert len(func.args) == 1 x = func.args[0] vc = [d.variable_count[0] for d in eq.atoms(Derivative) if d.expr == func and len(d.variable_count) == 1] ords = [c for v, c in vc if v == x] if len(ords) < 2: return smallest = min(ords) # make sure func does not appear outside of derivatives D = Dummy() if eq.subs(func.diff(x, smallest), D).has(func): return return {'n': smallest} def ode_nth_order_reducible(eq, func, order, match): r""" Solves ODEs that only involve derivatives of the dependent variable using a substitution of the form `f^n(x) = g(x)`. For example any second order ODE of the form `f''(x) = h(f'(x), x)` can be transformed into a pair of 1st order ODEs `g'(x) = h(g(x), x)` and `f'(x) = g(x)`. Usually the 1st order ODE for `g` is easier to solve. If that gives an explicit solution for `g` then `f` is found simply by integration. Examples ======== >>> from sympy import Function, dsolve, Eq >>> from sympy.abc import x >>> f = Function('f') >>> eq = Eq(xf(x).diff(x)*2 + f(x).diff(x, 2), 0) >>> dsolve(eq, f(x), hint='nth_order_reducible') ... # doctest: +NORMALIZE_WHITESPACE Eq(f(x), C1 - sqrt(-1/C2)log(-C2sqrt(-1/C2) + x) + sqrt(-1/C2)log(C2sqrt(-1/C2) + x)) """ x = func.args[0] f = func.func n = match['n'] # get a unique function name for g names = [a.name for a in eq.atoms(AppliedUndef)] while True: name = Dummy().name if name not in names: g = Function(name) break w = f(x).diff(x, n) geq = eq.subs(w, g(x)) gsol = dsolve(geq, g(x)) if not isinstance(gsol, list): gsol = [gsol] # Might be multiple solutions to the reduced ODE: fsol = [] for gsoli in gsol: fsoli = dsolve(gsoli.subs(g(x), w), f(x)) # or do integration n times fsol.append(fsoli) if len(fsol) == 1: fsol = fsol[0] return fsol # This needs to produce an invertible function but the inverse depends # which variable we are integrating with respect to. Since the class can # be stored in cached results we need to ensure that we always get the # same class back for each particular integration variable so we store these # classes in a global dict: _nth_algebraic_diffx_stored = {} def _nth_algebraic_diffx(var): cls = _nth_algebraic_diffx_stored.get(var, None) if cls is None: # A class that behaves like Derivative wrt var but is "invertible". class diffx(Function): def inverse(self): # don't use integrate here because fx has been replaced by _t # in the equation; integrals will not be correct while solve # is at work. return lambda expr: Integral(expr, var) + Dummy('C') cls = _nth_algebraic_diffx_stored.setdefault(var, diffx) return cls def _nth_algebraic_match(eq, func): r""" Matches any differential equation that nth_algebraic can solve. Uses `sympy.solve` but teaches it how to integrate derivatives. This involves calling `sympy.solve` and does most of the work of finding a solution (apart from evaluating the integrals). """ # The independent variable var = func.args[0] # Derivative that solve can handle: diffx = _nth_algebraic_diffx(var) # Replace derivatives wrt the independent variable with diffx def replace(eq, var): def expand_diffx(args): differand, diffs = args[0], args[1:] toreplace = differand for v, n in diffs: for _ in range(n): if v == var: toreplace = diffx(toreplace) else: toreplace = Derivative(toreplace, v) return toreplace return eq.replace(Derivative, expand_diffx) # Restore derivatives in solution afterwards def unreplace(eq, var): return eq.replace(diffx, lambda e: Derivative(e, var)) subs_eqn = replace(eq, var) try: # turn off simplification to protect Integrals that have # _t instead of fx in them and would otherwise factor # as t_Integral(1, x) solns = solve(subs_eqn, func, simplify=False) except NotImplementedError: solns = [] solns = [simplify(unreplace(soln, var)) for soln in solns] solns = [Equality(func, soln) for soln in solns] return {'var':var, 'solutions':solns} def ode_nth_algebraic(eq, func, order, match): r""" Solves an `n`\th order ordinary differential equation using algebra and integrals. There is no general form for the kind of equation that this can solve. The the equation is solved algebraically treating differentiation as an invertible algebraic function. Examples ======== >>> from sympy import Function, dsolve, Eq >>> from sympy.abc import x >>> f = Function('f') >>> eq = Eq(f(x) (f(x).diff(x)*2 - 1), 0) >>> dsolve(eq, f(x), hint='nth_algebraic') ... # doctest: +NORMALIZE_WHITESPACE [Eq(f(x), 0), Eq(f(x), C1 - x), Eq(f(x), C1 + x)] Note that this solver can return algebraic solutions that do not have any integration constants (f(x) = 0 in the above example). # indirect doctest """ solns = match['solutions'] var = match['var'] solns = _nth_algebraic_remove_redundant_solutions(eq, solns, order, var) if len(solns) == 1: return solns[0] else: return solns # FIXME: Maybe something like this function should be applied to the solutions # returned by dsolve in general rather than just for nth_algebraic... def _nth_algebraic_remove_redundant_solutions(eq, solns, order, var): r""" Remove redundant solutions from the set of solutions returned by nth_algebraic. This function is needed because otherwise nth_algebraic can return redundant solutions where both algebraic solutions and integral solutions are found to the ODE. As an example consider: eq = Eq(f(x) f(x).diff(x), 0) There are two ways to find solutions to eq. The first is the algebraic solution f(x)=0. The second is to solve the equation f(x).diff(x) = 0 leading to the solution f(x) = C1. In this particular case we then see that the first solution is a special case of the second and we don't want to return it. This does not always happen for algebraic solutions though since if we have eq = Eq(f(x)(1 + f(x).diff(x)), 0) then we get the algebraic solution f(x) = 0 and the integral solution f(x) = -x + C1 and in this case the two solutions are not equivalent wrt initial conditions so both should be returned. """ def is_special_case_of(soln1, soln2): return _nth_algebraic_is_special_case_of(soln1, soln2, eq, order, var) unique_solns = [] for soln1 in solns: for soln2 in unique_solns[:]: if is_special_case_of(soln1, soln2): break elif is_special_case_of(soln2, soln1): unique_solns.remove(soln2) else: unique_solns.append(soln1) return unique_solns def _nth_algebraic_is_special_case_of(soln1, soln2, eq, order, var): r""" True if soln1 is found to be a special case of soln2 wrt some value of the constants that appear in soln2. False otherwise. """ # The solutions returned by nth_algebraic should be given explicitly as in # Eq(f(x), expr). We will equate the RHSs of the two solutions giving an # equation f1(x) = f2(x). # # Since this is supposed to hold for all x it also holds for derivatives # f1'(x) and f2'(x). For an order n ode we should be able to differentiate # each solution n times to get n+1 equations. # # We then try to solve those n+1 equations for the integrations constants # in f2(x). If we can find a solution that doesn't depend on x then it # means that some value of the constants in f1(x) is a special case of # f2(x) corresponding to a paritcular choice of the integration constants. constants1 = soln1.free_symbols.difference(eq.free_symbols) constants2 = soln2.free_symbols.difference(eq.free_symbols) constants1_new = get_numbered_constants(soln1.rhs - soln2.rhs, len(constants1)) if len(constants1) == 1: constants1_new = {constants1_new} for c_old, c_new in zip(constants1, constants1_new): soln1 = soln1.subs(c_old, c_new) # n equations for f1(x)=f2(x), f1'(x)=f2'(x), ... lhs = soln1.rhs.doit() rhs = soln2.rhs.doit() eqns = [Eq(lhs, rhs)] for n in range(1, order): lhs = lhs.diff(var) rhs = rhs.diff(var) eq = Eq(lhs, rhs) eqns.append(eq) # BooleanTrue/False awkwardly show up for trivial equations if any(isinstance(eq, BooleanFalse) for eq in eqns): return False eqns = [eq for eq in eqns if not isinstance(eq, BooleanTrue)] constant_solns = solve(eqns, constants2) # Sometimes returns a dict and sometimes a list of dicts if isinstance(constant_solns, dict): constant_solns = [constant_solns] # If any solution gives all constants as expressions that don't depend on # x then there exists constants for soln2 that give soln1 for constant_soln in constant_solns: if not any(c.has(var) for c in constant_soln.values()): return True return False def _nth_linear_match(eq, func, order): r""" Matches a differential equation to the linear form: .. math:: a_n(x) y^{(n)} + \cdots + a_1(x)y' + a_0(x) y + B(x) = 0 Returns a dict of order:coeff terms, where order is the order of the derivative on each term, and coeff is the coefficient of that derivative. The key ``-1`` holds the function `B(x)`. Returns ``None`` if the ODE is not linear. This function assumes that ``func`` has already been checked to be good. Examples ======== >>> from sympy import Function, cos, sin >>> from sympy.abc import x >>> from sympy.solvers.ode import _nth_linear_match >>> f = Function('f') >>> _nth_linear_match(f(x).diff(x, 3) + 2f(x).diff(x) + ... xf(x).diff(x, 2) + cos(x)f(x).diff(x) + x - f(x) - ... sin(x), f(x), 3) {-1: x - sin(x), 0: -1, 1: cos(x) + 2, 2: x, 3: 1} >>> _nth_linear_match(f(x).diff(x, 3) + 2f(x).diff(x) + ... xf(x).diff(x, 2) + cos(x)f(x).diff(x) + x - f(x) - ... sin(f(x)), f(x), 3) == None True """ x = func.args[0] one_x = {x} terms = {i: S.Zero for i in range(-1, order + 1)} for i in Add.make_args(eq): if not i.has(func): terms[-1] += i else: c, f = i.as_independent(func) if (isinstance(f, Derivative) and set(f.variables) == one_x and f.args[0] == func): terms[f.derivative_count] += c elif f == func: terms[len(f.args[1:])] += c else: return None return terms def ode_nth_linear_euler_eq_homogeneous(eq, func, order, match, returns='sol'): r""" Solves an `n`\th order linear homogeneous variable-coefficient Cauchy-Euler equidimensional ordinary differential equation. This is an equation with form `0 = a_0 f(x) + a_1 x f'(x) + a_2 x^2 f''(x) \cdots`. These equations can be solved in a general manner, by substituting solutions of the form `f(x) = x^r`, and deriving a characteristic equation for `r`. When there are repeated roots, we include extra terms of the form `C_{r k} \ln^k(x) x^r`, where `C_{r k}` is an arbitrary integration constant, `r` is a root of the characteristic equation, and `k` ranges over the multiplicity of `r`. In the cases where the roots are complex, solutions of the form `C_1 x^a \sin(b \log(x)) + C_2 x^a \cos(b \log(x))` are returned, based on expansions with Euler's formula. The general solution is the sum of the terms found. If SymPy cannot find exact roots to the characteristic equation, a :py:class:`~sympy.polys.rootoftools.CRootOf` instance will be returned instead. >>> from sympy import Function, dsolve, Eq >>> from sympy.abc import x >>> f = Function('f') >>> dsolve(4x*2f(x).diff(x, 2) + f(x), f(x), ... hint='nth_linear_euler_eq_homogeneous') ... # doctest: +NORMALIZE_WHITESPACE Eq(f(x), sqrt(x)(C1 + C2log(x))) Note that because this method does not involve integration, there is no ``nth_linear_euler_eq_homogeneous_Integral`` hint. The following is for internal use: - ``returns = 'sol'`` returns the solution to the ODE. - ``returns = 'list'`` returns a list of linearly independent solutions, corresponding to the fundamental solution set, for use with non homogeneous solution methods like variation of parameters and undetermined coefficients. Note that, though the solutions should be linearly independent, this function does not explicitly check that. You can do ``assert simplify(wronskian(sollist)) != 0`` to check for linear independence. Also, ``assert len(sollist) == order`` will need to pass. - ``returns = 'both'``, return a dictionary ``{'sol': <solution to ODE>, 'list': <list of linearly independent solutions>}``. Examples ======== >>> from sympy import Function, dsolve, pprint >>> from sympy.abc import x >>> f = Function('f') >>> eq = f(x).diff(x, 2)x2 - 4f(x).diff(x)x + 6f(x) >>> pprint(dsolve(eq, f(x), ... hint='nth_linear_euler_eq_homogeneous')) 2 f(x) = x (C1 + C2x) References ========== - https://en.wikipedia.org/wiki/Cauchy%E2%80%93Euler_equation - C. Bender & S. Orszag, "Advanced Mathematical Methods for Scientists and Engineers", Springer 1999, pp. 12 # indirect doctest """ global collectterms collectterms = [] x = func.args[0] f = func.func r = match # First, set up characteristic equation. chareq, symbol = S.Zero, Dummy('x') for i in r.keys(): if not isinstance(i, string_types) and i >= 0: chareq += (r[i]diff(xsymbol, x, i)x*-symbol).expand() chareq = Poly(chareq, symbol) chareqroots = [rootof(chareq, k) for k in range(chareq.degree())] # A generator of constants constants = list(get_numbered_constants(eq, num=chareq.degree()2)) constants.reverse() # Create a dict root: multiplicity or charroots charroots = defaultdict(int) for root in chareqroots: charroots[root] += 1 gsol = S(0) # We need keep track of terms so we can run collect() at the end. # This is necessary for constantsimp to work properly. ln = log for root, multiplicity in charroots.items(): for i in range(multiplicity): if isinstance(root, RootOf): gsol += (x*root) constants.pop() if multiplicity != 1: raise ValueError("Value should be 1") collectterms = [(0, root, 0)] + collectterms elif root.is_real: gsol += ln(x)*i(x*root) constants.pop() collectterms = [(i, root, 0)] + collectterms else: reroot = re(root) imroot = im(root) gsol += ln(x)*i (x*reroot) ( constants.pop() * sin(abs(imroot)ln(x)) + constants.pop() cos(imrootln(x))) # Preserve ordering (multiplicity, real part, imaginary part) # It will be assumed implicitly when constructing # fundamental solution sets. collectterms = [(i, reroot, imroot)] + collectterms if returns == 'sol': return Eq(f(x), gsol) elif returns in ('list' 'both'): # HOW TO TEST THIS CODE? (dsolve does not pass 'returns' through) # Create a list of (hopefully) linearly independent solutions gensols = [] # Keep track of when to use sin or cos for nonzero imroot for i, reroot, imroot in collectterms: if imroot == 0: gensols.append(ln(x)ixreroot) else: sin_form = ln(x)ixrerootsin(abs(imroot)ln(x)) if sin_form in gensols: cos_form = ln(x)ix*rerootcos(imrootln(x)) gensols.append(cos_form) else: gensols.append(sin_form) if returns == 'list': return gensols else: return {'sol': Eq(f(x), gsol), 'list': gensols} else: raise ValueError('Unknown value for key "returns".') def ode_nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients(eq, func, order, match, returns='sol'): r""" Solves an `n`\th order linear non homogeneous Cauchy-Euler equidimensional ordinary differential equation using undetermined coefficients. This is an equation with form `g(x) = a_0 f(x) + a_1 x f'(x) + a_2 x^2 f''(x) \cdots`. These equations can be solved in a general manner, by substituting solutions of the form `x = exp(t)`, and deriving a characteristic equation of form `g(exp(t)) = b_0 f(t) + b_1 f'(t) + b_2 f''(t) \cdots` which can be then solved by nth_linear_constant_coeff_undetermined_coefficients if g(exp(t)) has finite number of linearly independent derivatives. Functions that fit this requirement are finite sums functions of the form `a x^i e^{b x} \sin(c x + d)` or `a x^i e^{b x} \cos(c x + d)`, where `i` is a non-negative integer and `a`, `b`, `c`, and `d` are constants. For example any polynomial in `x`, functions like `x^2 e^{2 x}`, `x \sin(x)`, and `e^x \cos(x)` can all be used. Products of `\sin`'s and `\cos`'s have a finite number of derivatives, because they can be expanded into `\sin(a x)` and `\cos(b x)` terms. However, SymPy currently cannot do that expansion, so you will need to manually rewrite the expression in terms of the above to use this method. So, for example, you will need to manually convert `\sin^2(x)` into `(1 + \cos(2 x))/2` to properly apply the method of undetermined coefficients on it. After replacement of x by exp(t), this method works by creating a trial function from the expression and all of its linear independent derivatives and substituting them into the original ODE. The coefficients for each term will be a system of linear equations, which are be solved for and substituted, giving the solution. If any of the trial functions are linearly dependent on the solution to the homogeneous equation, they are multiplied by sufficient `x` to make them linearly independent. Examples ======== >>> from sympy import dsolve, Function, Derivative, log >>> from sympy.abc import x >>> f = Function('f') >>> eq = x2Derivative(f(x), x, x) - 2xDerivative(f(x), x) + 2f(x) - log(x) >>> dsolve(eq, f(x), ... hint='nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients').expand() Eq(f(x), C1x + C2x2 + log(x)/2 + 3/4) """ x = func.args[0] f = func.func r = match chareq, eq, symbol = S.Zero, S.Zero, Dummy('x') for i in r.keys(): if not isinstance(i, string_types) and i >= 0: chareq += (r[i]diff(x*symbol, x, i)x-symbol).expand() for i in range(1,degree(Poly(chareq, symbol))+1): eq += chareq.coeff(symboli)diff(f(x), x, i) if chareq.as_coeff_add(symbol)[0]: eq += chareq.as_coeff_add(symbol)[0]f(x) e, re = posify(r[-1].subs(x, exp(x))) eq += e.subs(re) match = _nth_linear_match(eq, f(x), ode_order(eq, f(x))) match['trialset'] = r['trialset'] return ode_nth_linear_constant_coeff_undetermined_coefficients(eq, func, order, match).subs(x, log(x)).subs(f(log(x)), f(x)).expand() def ode_nth_linear_euler_eq_nonhomogeneous_variation_of_parameters(eq, func, order, match, returns='sol'): r""" Solves an `n`\th order linear non homogeneous Cauchy-Euler equidimensional ordinary differential equation using variation of parameters. This is an equation with form `g(x) = a_0 f(x) + a_1 x f'(x) + a_2 x^2 f''(x) \cdots`. This method works by assuming that the particular solution takes the form .. math:: \sum_{x=1}^{n} c_i(x) y_i(x) {a_n} {x^n} \text{,} where `y_i` is the `i`\th solution to the homogeneous equation. The solution is then solved using Wronskian's and Cramer's Rule. The particular solution is given by multiplying eq given below with `a_n x^{n}` .. math:: \sum_{x=1}^n \left( \int \frac{W_i(x)}{W(x)} \,dx \right) y_i(x) \text{,} where `W(x)` is the Wronskian of the fundamental system (the system of `n` linearly independent solutions to the homogeneous equation), and `W_i(x)` is the Wronskian of the fundamental system with the `i`\th column replaced with `[0, 0, \cdots, 0, \frac{x^{- n}}{a_n} g{\left(x \right)}]`. This method is general enough to solve any `n`\th order inhomogeneous linear differential equation, but sometimes SymPy cannot simplify the Wronskian well enough to integrate it. If this method hangs, try using the ``nth_linear_constant_coeff_variation_of_parameters_Integral`` hint and simplifying the integrals manually. Also, prefer using ``nth_linear_constant_coeff_undetermined_coefficients`` when it applies, because it doesn't use integration, making it faster and more reliable. Warning, using simplify=False with 'nth_linear_constant_coeff_variation_of_parameters' in :py:meth:`~sympy.solvers.ode.dsolve` may cause it to hang, because it will not attempt to simplify the Wronskian before integrating. It is recommended that you only use simplify=False with 'nth_linear_constant_coeff_variation_of_parameters_Integral' for this method, especially if the solution to the homogeneous equation has trigonometric functions in it. Examples ======== >>> from sympy import Function, dsolve, Derivative >>> from sympy.abc import x >>> f = Function('f') >>> eq = x*2Derivative(f(x), x, x) - 2xDerivative(f(x), x) + 2f(x) - x4 >>> dsolve(eq, f(x), ... hint='nth_linear_euler_eq_nonhomogeneous_variation_of_parameters').expand() Eq(f(x), C1x + C2x2 + x4/6) """ x = func.args[0] f = func.func r = match gensol = ode_nth_linear_euler_eq_homogeneous(eq, func, order, match, returns='both') match.update(gensol) r[-1] = r[-1]/r[ode_order(eq, f(x))] sol = _solve_variation_of_parameters(eq, func, order, match) return Eq(f(x), r['sol'].rhs + (sol.rhs - r['sol'].rhs)r[ode_order(eq, f(x))]) def ode_almost_linear(eq, func, order, match): r""" Solves an almost-linear differential equation. The general form of an almost linear differential equation is .. math:: f(x) g(y) y + k(x) l(y) + m(x) = 0 \text{where} l'(y) = g(y)\text{.} This can be solved by substituting `l(y) = u(y)`. Making the given substitution reduces it to a linear differential equation of the form `u' + P(x) u + Q(x) = 0`. The general solution is >>> from sympy import Function, dsolve, Eq, pprint >>> from sympy.abc import x, y, n >>> f, g, k, l = map(Function, ['f', 'g', 'k', 'l']) >>> genform = Eq(f(x)(l(y).diff(y)) + k(x)l(y) + g(x), 0) >>> pprint(genform) d f(x)--(l(y)) + g(x) + k(x)l(y) = 0 dy >>> pprint(dsolve(genform, hint = 'almost_linear')) / // yk(x) \\ \| \|\| ------ \|\| \| \|\| f(x) \|\| -yk(x) \| \|\|-g(x)e \|\| -------- \| \|\|-------------- for k(x) != 0\|\| f(x) l(y) = \|C1 + \|< k(x) \|\|e \| \|\| \|\| \| \|\| -yg(x) \|\| \| \|\| -------- otherwise \|\| \| \|\| f(x) \|\| \ \\ // See Also ======== :meth:`sympy.solvers.ode.ode_1st_linear` Examples ======== >>> from sympy import Function, Derivative, pprint >>> from sympy.solvers.ode import dsolve, classify_ode >>> from sympy.abc import x >>> f = Function('f') >>> d = f(x).diff(x) >>> eq = xd + xf(x) + 1 >>> dsolve(eq, f(x), hint='almost_linear') Eq(f(x), (C1 - Ei(x))exp(-x)) >>> pprint(dsolve(eq, f(x), hint='almost_linear')) -x f(x) = (C1 - Ei(x))e References ========== - Joel Moses, "Symbolic Integration - The Stormy Decade", Communications of the ACM, Volume 14, Number 8, August 1971, pp. 558 """ # Since ode_1st_linear has already been implemented, and the # coefficients have been modified to the required form in # classify_ode, just passing eq, func, order and match to # ode_1st_linear will give the required output. return ode_1st_linear(eq, func, order, match) def _linear_coeff_match(expr, func): r""" Helper function to match hint ``linear_coefficients``. Matches the expression to the form `(a_1 x + b_1 f(x) + c_1)/(a_2 x + b_2 f(x) + c_2)` where the following conditions hold: 1. `a_1`, `b_1`, `c_1`, `a_2`, `b_2`, `c_2` are Rationals; 2. `c_1` or `c_2` are not equal to zero; 3. `a_2 b_1 - a_1 b_2` is not equal to zero. Return ``xarg``, ``yarg`` where 1. ``xarg`` = `(b_2 c_1 - b_1 c_2)/(a_2 b_1 - a_1 b_2)` 2. ``yarg`` = `(a_1 c_2 - a_2 c_1)/(a_2 b_1 - a_1 b_2)` Examples ======== >>> from sympy import Function >>> from sympy.abc import x >>> from sympy.solvers.ode import _linear_coeff_match >>> from sympy.functions.elementary.trigonometric import sin >>> f = Function('f') >>> _linear_coeff_match(( ... (-25f(x) - 8x + 62)/(4f(x) + 11x - 11)), f(x)) (1/9, 22/9) >>> _linear_coeff_match( ... sin((-5f(x) - 8x + 6)/(4f(x) + x - 1)), f(x)) (19/27, 2/27) >>> _linear_coeff_match(sin(f(x)/x), f(x)) """ f = func.func x = func.args[0] def abc(eq): r''' Internal function of _linear_coeff_match that returns Rationals a, b, c if eq is ax + bf(x) + c, else None. ''' eq = _mexpand(eq) c = eq.as_independent(x, f(x), as_Add=True)[0] if not c.is_Rational: return a = eq.coeff(x) if not a.is_Rational: return b = eq.coeff(f(x)) if not b.is_Rational: return if eq == ax + bf(x) + c: return a, b, c def match(arg): r''' Internal function of _linear_coeff_match that returns Rationals a1, b1, c1, a2, b2, c2 and a2b1 - a1b2 of the expression (a1x + b1f(x) + c1)/(a2x + b2f(x) + c2) if one of c1 or c2 and a2b1 - a1b2 is non-zero, else None. ''' n, d = arg.together().as_numer_denom() m = abc(n) if m is not None: a1, b1, c1 = m m = abc(d) if m is not None: a2, b2, c2 = m d = a2b1 - a1b2 if (c1 or c2) and d: return a1, b1, c1, a2, b2, c2, d m = [fi.args[0] for fi in expr.atoms(Function) if fi.func != f and len(fi.args) == 1 and not fi.args[0].is_Function] or {expr} m1 = match(m.pop()) if m1 and all(match(mi) == m1 for mi in m): a1, b1, c1, a2, b2, c2, denom = m1 return (b2c1 - b1c2)/denom, (a1c2 - a2c1)/denom def ode_linear_coefficients(eq, func, order, match): r""" Solves a differential equation with linear coefficients. The general form of a differential equation with linear coefficients is .. math:: y' + F\left(\!\frac{a_1 x + b_1 y + c_1}{a_2 x + b_2 y + c_2}\!\right) = 0\text{,} where `a_1`, `b_1`, `c_1`, `a_2`, `b_2`, `c_2` are constants and `a_1 b_2 - a_2 b_1 \ne 0`. This can be solved by substituting: .. math:: x = x' + \frac{b_2 c_1 - b_1 c_2}{a_2 b_1 - a_1 b_2} y = y' + \frac{a_1 c_2 - a_2 c_1}{a_2 b_1 - a_1 b_2}\text{.} This substitution reduces the equation to a homogeneous differential equation. See Also ======== :meth:`sympy.solvers.ode.ode_1st_homogeneous_coeff_best` :meth:`sympy.solvers.ode.ode_1st_homogeneous_coeff_subs_indep_div_dep` :meth:`sympy.solvers.ode.ode_1st_homogeneous_coeff_subs_dep_div_indep` Examples ======== >>> from sympy import Function, Derivative, pprint >>> from sympy.solvers.ode import dsolve, classify_ode >>> from sympy.abc import x >>> f = Function('f') >>> df = f(x).diff(x) >>> eq = (x + f(x) + 1)df + (f(x) - 6x + 1) >>> dsolve(eq, hint='linear_coefficients') [Eq(f(x), -x - sqrt(C1 + 7x2) - 1), Eq(f(x), -x + sqrt(C1 + 7x*2) - 1)] >>> pprint(dsolve(eq, hint='linear_coefficients')) ___________ ___________ / 2 / 2 [f(x) = -x - \/ C1 + 7x - 1, f(x) = -x + \/ C1 + 7x - 1] References ========== - Joel Moses, "Symbolic Integration - The Stormy Decade", Communications of the ACM, Volume 14, Number 8, August 1971, pp. 558 """ return ode_1st_homogeneous_coeff_best(eq, func, order, match) def ode_separable_reduced(eq, func, order, match): r""" Solves a differential equation that can be reduced to the separable form. The general form of this equation is .. math:: y' + (y/x) H(x^n y) = 0\text{}. This can be solved by substituting `u(y) = x^n y`. The equation then reduces to the separable form `\frac{u'}{u (\mathrm{power} - H(u))} - \frac{1}{x} = 0`. The general solution is: >>> from sympy import Function, dsolve, Eq, pprint >>> from sympy.abc import x, n >>> f, g = map(Function, ['f', 'g']) >>> genform = f(x).diff(x) + (f(x)/x)g(x*nf(x)) >>> pprint(genform) / n \ d f(x)g\x f(x)/ --(f(x)) + --------------- dx x >>> pprint(dsolve(genform, hint='separable_reduced')) n x f(x) / \| \| 1 \| ------------ dy = C1 + log(x) \| y(n - g(y)) \| / See Also ======== :meth:`sympy.solvers.ode.ode_separable` Examples ======== >>> from sympy import Function, Derivative, pprint >>> from sympy.solvers.ode import dsolve, classify_ode >>> from sympy.abc import x >>> f = Function('f') >>> d = f(x).diff(x) >>> eq = (x - x*2f(x))d - f(x) >>> dsolve(eq, hint='separable_reduced') [Eq(f(x), (1 - sqrt(C1x*2 + 1))/x), Eq(f(x), (sqrt(C1x*2 + 1) + 1)/x)] >>> pprint(dsolve(eq, hint='separable_reduced')) ___________ ___________ / 2 / 2 1 - \/ C1x + 1 \/ C1x + 1 + 1 [f(x) = ------------------, f(x) = ------------------] x x References ========== - Joel Moses, "Symbolic Integration - The Stormy Decade", Communications of the ACM, Volume 14, Number 8, August 1971, pp. 558 """ # Arguments are passed in a way so that they are coherent with the # ode_separable function x = func.args[0] f = func.func y = Dummy('y') u = match['u'].subs(match['t'], y) ycoeff = 1/(y(match['power'] - u)) m1 = {y: 1, x: -1/x, 'coeff': 1} m2 = {y: ycoeff, x: 1, 'coeff': 1} r = {'m1': m1, 'm2': m2, 'y': y, 'hint': x*match['power']f(x)} return ode_separable(eq, func, order, r) def ode_1st_power_series(eq, func, order, match): r""" The power series solution is a method which gives the Taylor series expansion to the solution of a differential equation. For a first order differential equation `\frac{dy}{dx} = h(x, y)`, a power series solution exists at a point `x = x_{0}` if `h(x, y)` is analytic at `x_{0}`. The solution is given by .. math:: y(x) = y(x_{0}) + \sum_{n = 1}^{\infty} \frac{F_{n}(x_{0},b)(x - x_{0})^n}{n!}, where `y(x_{0}) = b` is the value of y at the initial value of `x_{0}`. To compute the values of the `F_{n}(x_{0},b)` the following algorithm is followed, until the required number of terms are generated. 1. `F_1 = h(x_{0}, b)` 2. `F_{n+1} = \frac{\partial F_{n}}{\partial x} + \frac{\partial F_{n}}{\partial y}F_{1}` Examples ======== >>> from sympy import Function, Derivative, pprint, exp >>> from sympy.solvers.ode import dsolve >>> from sympy.abc import x >>> f = Function('f') >>> eq = exp(x)(f(x).diff(x)) - f(x) >>> pprint(dsolve(eq, hint='1st_power_series')) 3 4 5 C1x C1x C1x / 6\ f(x) = C1 + C1x - ----- + ----- + ----- + O\x / 6 24 60 References ========== - Travis W. Walker, Analytic power series technique for solving first-order differential equations, p.p 17, 18 """ x = func.args[0] y = match['y'] f = func.func h = -match[match['d']]/match[match['e']] point = match.get('f0') value = match.get('f0val') terms = match.get('terms') # First term F = h if not h: return Eq(f(x), value) # Initialization series = value if terms > 1: hc = h.subs({x: point, y: value}) if hc.has(oo) or hc.has(NaN) or hc.has(zoo): # Derivative does not exist, not analytic return Eq(f(x), oo) elif hc: series += hc(x - point) for factcount in range(2, terms): Fnew = F.diff(x) + F.diff(y)h Fnewc = Fnew.subs({x: point, y: value}) # Same logic as above if Fnewc.has(oo) or Fnewc.has(NaN) or Fnewc.has(-oo) or Fnewc.has(zoo): return Eq(f(x), oo) series += Fnewc((x - point)factcount)/factorial(factcount) F = Fnew series += Order(xterms) return Eq(f(x), series) def ode_nth_linear_constant_coeff_homogeneous(eq, func, order, match, returns='sol'): r""" Solves an `n`\th order linear homogeneous differential equation with constant coefficients. This is an equation of the form .. math:: a_n f^{(n)}(x) + a_{n-1} f^{(n-1)}(x) + \cdots + a_1 f'(x) + a_0 f(x) = 0\text{.} These equations can be solved in a general manner, by taking the roots of the characteristic equation `a_n m^n + a_{n-1} m^{n-1} + \cdots + a_1 m + a_0 = 0`. The solution will then be the sum of `C_n x^i e^{r x}` terms, for each where `C_n` is an arbitrary constant, `r` is a root of the characteristic equation and `i` is one of each from 0 to the multiplicity of the root - 1 (for example, a root 3 of multiplicity 2 would create the terms `C_1 e^{3 x} + C_2 x e^{3 x}`). The exponential is usually expanded for complex roots using Euler's equation `e^{I x} = \cos(x) + I \sin(x)`. Complex roots always come in conjugate pairs in polynomials with real coefficients, so the two roots will be represented (after simplifying the constants) as `e^{a x} \left(C_1 \cos(b x) + C_2 \sin(b x)\right)`. If SymPy cannot find exact roots to the characteristic equation, a :py:class:`~sympy.polys.rootoftools.CRootOf` instance will be return instead. >>> from sympy import Function, dsolve, Eq >>> from sympy.abc import x >>> f = Function('f') >>> dsolve(f(x).diff(x, 5) + 10f(x).diff(x) - 2f(x), f(x), ... hint='nth_linear_constant_coeff_homogeneous') ... # doctest: +NORMALIZE_WHITESPACE Eq(f(x), C5exp(xCRootOf(_x*5 + 10_x - 2, 0)) + (C1sin(xim(CRootOf(_x*5 + 10_x - 2, 1))) + C2cos(xim(CRootOf(_x*5 + 10_x - 2, 1))))exp(xre(CRootOf(_x*5 + 10_x - 2, 1))) + (C3sin(xim(CRootOf(_x*5 + 10_x - 2, 3))) + C4cos(xim(CRootOf(_x*5 + 10_x - 2, 3))))exp(xre(CRootOf(_x*5 + 10_x - 2, 3)))) Note that because this method does not involve integration, there is no ``nth_linear_constant_coeff_homogeneous_Integral`` hint. The following is for internal use: - ``returns = 'sol'`` returns the solution to the ODE. - ``returns = 'list'`` returns a list of linearly independent solutions, for use with non homogeneous solution methods like variation of parameters and undetermined coefficients. Note that, though the solutions should be linearly independent, this function does not explicitly check that. You can do ``assert simplify(wronskian(sollist)) != 0`` to check for linear independence. Also, ``assert len(sollist) == order`` will need to pass. - ``returns = 'both'``, return a dictionary ``{'sol': <solution to ODE>, 'list': <list of linearly independent solutions>}``. Examples ======== >>> from sympy import Function, dsolve, pprint >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(f(x).diff(x, 4) + 2f(x).diff(x, 3) - ... 2f(x).diff(x, 2) - 6f(x).diff(x) + 5f(x), f(x), ... hint='nth_linear_constant_coeff_homogeneous')) x -2x f(x) = (C1 + C2x)e + (C3sin(x) + C4cos(x))e References ========== - https://en.wikipedia.org/wiki/Linear_differential_equation section: Nonhomogeneous_equation_with_constant_coefficients - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 211 # indirect doctest """ x = func.args[0] f = func.func r = match # First, set up characteristic equation. chareq, symbol = S.Zero, Dummy('x') for i in r.keys(): if type(i) == str or i < 0: pass else: chareq += r[i]symboli chareq = Poly(chareq, symbol) # Can't just call roots because it doesn't return rootof for unsolveable # polynomials. chareqroots = roots(chareq, multiple=True) if len(chareqroots) != order: chareqroots = [rootof(chareq, k) for k in range(chareq.degree())] chareq_is_complex = not all([i.is_real for i in chareq.all_coeffs()]) # A generator of constants constants = list(get_numbered_constants(eq, num=chareq.degree()2)) # Create a dict root: multiplicity or charroots charroots = defaultdict(int) for root in chareqroots: charroots[root] += 1 # We need to keep track of terms so we can run collect() at the end. # This is necessary for constantsimp to work properly. global collectterms collectterms = [] gensols = [] conjugate_roots = [] # used to prevent double-use of conjugate roots # Loop over roots in theorder provided by roots/rootof... for root in chareqroots: # but don't repoeat multiple roots. if root not in charroots: continue multiplicity = charroots.pop(root) for i in range(multiplicity): if chareq_is_complex: gensols.append(x*iexp(rootx)) collectterms = [(i, root, 0)] + collectterms continue reroot = re(root) imroot = im(root) if imroot.has(atan2) and reroot.has(atan2): # Remove this condition when re and im stop returning # circular atan2 usages. gensols.append(xiexp(rootx)) collectterms = [(i, root, 0)] + collectterms else: if root in conjugate_roots: collectterms = [(i, reroot, imroot)] + collectterms continue if imroot == 0: gensols.append(xiexp(rerootx)) collectterms = [(i, reroot, 0)] + collectterms continue conjugate_roots.append(conjugate(root)) gensols.append(xiexp(rerootx) sin(abs(imroot) * x)) gensols.append(x*iexp(rerootx) cos( imroot * x)) # This ordering is important collectterms = [(i, reroot, imroot)] + collectterms if returns == 'list': return gensols elif returns in ('sol' 'both'): gsol = Add([ij for (i, j) in zip(constants, gensols)]) if returns == 'sol': return Eq(f(x), gsol) else: return {'sol': Eq(f(x), gsol), 'list': gensols} else: raise ValueError('Unknown value for key "returns".') def ode_nth_linear_constant_coeff_undetermined_coefficients(eq, func, order, match): r""" Solves an `n`\th order linear differential equation with constant coefficients using the method of undetermined coefficients. This method works on differential equations of the form .. math:: a_n f^{(n)}(x) + a_{n-1} f^{(n-1)}(x) + \cdots + a_1 f'(x) + a_0 f(x) = P(x)\text{,} where `P(x)` is a function that has a finite number of linearly independent derivatives. Functions that fit this requirement are finite sums functions of the form `a x^i e^{b x} \sin(c x + d)` or `a x^i e^{b x} \cos(c x + d)`, where `i` is a non-negative integer and `a`, `b`, `c`, and `d` are constants. For example any polynomial in `x`, functions like `x^2 e^{2 x}`, `x \sin(x)`, and `e^x \cos(x)` can all be used. Products of `\sin`'s and `\cos`'s have a finite number of derivatives, because they can be expanded into `\sin(a x)` and `\cos(b x)` terms. However, SymPy currently cannot do that expansion, so you will need to manually rewrite the expression in terms of the above to use this method. So, for example, you will need to manually convert `\sin^2(x)` into `(1 + \cos(2 x))/2` to properly apply the method of undetermined coefficients on it. This method works by creating a trial function from the expression and all of its linear independent derivatives and substituting them into the original ODE. The coefficients for each term will be a system of linear equations, which are be solved for and substituted, giving the solution. If any of the trial functions are linearly dependent on the solution to the homogeneous equation, they are multiplied by sufficient `x` to make them linearly independent. Examples ======== >>> from sympy import Function, dsolve, pprint, exp, cos >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(f(x).diff(x, 2) + 2f(x).diff(x) + f(x) - ... 4exp(-x)x2 + cos(2x), f(x), ... hint='nth_linear_constant_coeff_undetermined_coefficients')) / 4\ \| x \| -x 4sin(2x) 3cos(2x) f(x) = \|C1 + C2x + --\|e - ---------- + ---------- \ 3 / 25 25 References ========== - https://en.wikipedia.org/wiki/Method_of_undetermined_coefficients - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 221 # indirect doctest """ gensol = ode_nth_linear_constant_coeff_homogeneous(eq, func, order, match, returns='both') match.update(gensol) return _solve_undetermined_coefficients(eq, func, order, match) def _solve_undetermined_coefficients(eq, func, order, match): r""" Helper function for the method of undetermined coefficients. See the :py:meth:`~sympy.solvers.ode.ode_nth_linear_constant_coeff_undetermined_coefficients` docstring for more information on this method. The parameter ``match`` should be a dictionary that has the following keys: ``list`` A list of solutions to the homogeneous equation, such as the list returned by ``ode_nth_linear_constant_coeff_homogeneous(returns='list')``. ``sol`` The general solution, such as the solution returned by ``ode_nth_linear_constant_coeff_homogeneous(returns='sol')``. ``trialset`` The set of trial functions as returned by ``_undetermined_coefficients_match()['trialset']``. """ x = func.args[0] f = func.func r = match coeffs = numbered_symbols('a', cls=Dummy) coefflist = [] gensols = r['list'] gsol = r['sol'] trialset = r['trialset'] notneedset = set([]) global collectterms if len(gensols) != order: raise NotImplementedError("Cannot find " + str(order) + " solutions to the homogeneous equation necessary to apply" + " undetermined coefficients to " + str(eq) + " (number of terms != order)") usedsin = set([]) mult = 0 # The multiplicity of the root getmult = True for i, reroot, imroot in collectterms: if getmult: mult = i + 1 getmult = False if i == 0: getmult = True if imroot: # Alternate between sin and cos if (i, reroot) in usedsin: check = x*iexp(rerootx)cos(imrootx) else: check = xiexp(rerootx)sin(abs(imroot)x) usedsin.add((i, reroot)) else: check = xiexp(rerootx) if check in trialset: # If an element of the trial function is already part of the # homogeneous solution, we need to multiply by sufficient x to # make it linearly independent. We also don't need to bother # checking for the coefficients on those elements, since we # already know it will be 0. while True: if checkx*mult in trialset: mult += 1 else: break trialset.add(checkx*mult) notneedset.add(check) newtrialset = trialset - notneedset trialfunc = 0 for i in newtrialset: c = next(coeffs) coefflist.append(c) trialfunc += ci eqs = sub_func_doit(eq, f(x), trialfunc) coeffsdict = dict(list(zip(trialset, [0](len(trialset) + 1)))) eqs = _mexpand(eqs) for i in Add.make_args(eqs): s = separatevars(i, dict=True, symbols=[x]) coeffsdict[s[x]] += s['coeff'] coeffvals = solve(list(coeffsdict.values()), coefflist) if not coeffvals: raise NotImplementedError( "Could not solve `%s` using the " "method of undetermined coefficients " "(unable to solve for coefficients)." % eq) psol = trialfunc.subs(coeffvals) return Eq(f(x), gsol.rhs + psol) def _undetermined_coefficients_match(expr, x): r""" Returns a trial function match if undetermined coefficients can be applied to ``expr``, and ``None`` otherwise. A trial expression can be found for an expression for use with the method of undetermined coefficients if the expression is an additive/multiplicative combination of constants, polynomials in `x` (the independent variable of expr), `\sin(a x + b)`, `\cos(a x + b)`, and `e^{a x}` terms (in other words, it has a finite number of linearly independent derivatives). Note that you may still need to multiply each term returned here by sufficient `x` to make it linearly independent with the solutions to the homogeneous equation. This is intended for internal use by ``undetermined_coefficients`` hints. SymPy currently has no way to convert `\sin^n(x) \cos^m(y)` into a sum of only `\sin(a x)` and `\cos(b x)` terms, so these are not implemented. So, for example, you will need to manually convert `\sin^2(x)` into `[1 + \cos(2 x)]/2` to properly apply the method of undetermined coefficients on it. Examples ======== >>> from sympy import log, exp >>> from sympy.solvers.ode import _undetermined_coefficients_match >>> from sympy.abc import x >>> _undetermined_coefficients_match(9xexp(x) + exp(-x), x) {'test': True, 'trialset': {xexp(x), exp(-x), exp(x)}} >>> _undetermined_coefficients_match(log(x), x) {'test': False} """ a = Wild('a', exclude=[x]) b = Wild('b', exclude=[x]) expr = powsimp(expr, combine='exp') # exp(x)exp(2x + 1) => exp(3x + 1) retdict = {} def _test_term(expr, x): r""" Test if ``expr`` fits the proper form for undetermined coefficients. """ if not expr.has(x): return True elif expr.is_Add: return all(_test_term(i, x) for i in expr.args) elif expr.is_Mul: if expr.has(sin, cos): foundtrig = False # Make sure that there is only one trig function in the args. # See the docstring. for i in expr.args: if i.has(sin, cos): if foundtrig: return False else: foundtrig = True return all(_test_term(i, x) for i in expr.args) elif expr.is_Function: if expr.func in (sin, cos, exp): if expr.args[0].match(ax + b): return True else: return False else: return False elif expr.is_Pow and expr.base.is_Symbol and expr.exp.is_Integer and \ expr.exp >= 0: return True elif expr.is_Pow and expr.base.is_number: if expr.exp.match(ax + b): return True else: return False elif expr.is_Symbol or expr.is_number: return True else: return False def _get_trial_set(expr, x, exprs=set([])): r""" Returns a set of trial terms for undetermined coefficients. The idea behind undetermined coefficients is that the terms expression repeat themselves after a finite number of derivatives, except for the coefficients (they are linearly dependent). So if we collect these, we should have the terms of our trial function. """ def _remove_coefficient(expr, x): r""" Returns the expression without a coefficient. Similar to expr.as_independent(x)[1], except it only works multiplicatively. """ term = S.One if expr.is_Mul: for i in expr.args: if i.has(x): term = i elif expr.has(x): term = expr return term expr = expand_mul(expr) if expr.is_Add: for term in expr.args: if _remove_coefficient(term, x) in exprs: pass else: exprs.add(_remove_coefficient(term, x)) exprs = exprs.union(_get_trial_set(term, x, exprs)) else: term = _remove_coefficient(expr, x) tmpset = exprs.union({term}) oldset = set([]) while tmpset != oldset: # If you get stuck in this loop, then _test_term is probably # broken oldset = tmpset.copy() expr = expr.diff(x) term = _remove_coefficient(expr, x) if term.is_Add: tmpset = tmpset.union(_get_trial_set(term, x, tmpset)) else: tmpset.add(term) exprs = tmpset return exprs retdict['test'] = _test_term(expr, x) if retdict['test']: # Try to generate a list of trial solutions that will have the # undetermined coefficients. Note that if any of these are not linearly # independent with any of the solutions to the homogeneous equation, # then they will need to be multiplied by sufficient x to make them so. # This function DOES NOT do that (it doesn't even look at the # homogeneous equation). retdict['trialset'] = _get_trial_set(expr, x) return retdict def ode_nth_linear_constant_coeff_variation_of_parameters(eq, func, order, match): r""" Solves an `n`\th order linear differential equation with constant coefficients using the method of variation of parameters. This method works on any differential equations of the form .. math:: f^{(n)}(x) + a_{n-1} f^{(n-1)}(x) + \cdots + a_1 f'(x) + a_0 f(x) = P(x)\text{.} This method works by assuming that the particular solution takes the form .. math:: \sum_{x=1}^{n} c_i(x) y_i(x)\text{,} where `y_i` is the `i`\th solution to the homogeneous equation. The solution is then solved using Wronskian's and Cramer's Rule. The particular solution is given by .. math:: \sum_{x=1}^n \left( \int \frac{W_i(x)}{W(x)} \,dx \right) y_i(x) \text{,} where `W(x)` is the Wronskian of the fundamental system (the system of `n` linearly independent solutions to the homogeneous equation), and `W_i(x)` is the Wronskian of the fundamental system with the `i`\th column replaced with `[0, 0, \cdots, 0, P(x)]`. This method is general enough to solve any `n`\th order inhomogeneous linear differential equation with constant coefficients, but sometimes SymPy cannot simplify the Wronskian well enough to integrate it. If this method hangs, try using the ``nth_linear_constant_coeff_variation_of_parameters_Integral`` hint and simplifying the integrals manually. Also, prefer using ``nth_linear_constant_coeff_undetermined_coefficients`` when it applies, because it doesn't use integration, making it faster and more reliable. Warning, using simplify=False with 'nth_linear_constant_coeff_variation_of_parameters' in :py:meth:`~sympy.solvers.ode.dsolve` may cause it to hang, because it will not attempt to simplify the Wronskian before integrating. It is recommended that you only use simplify=False with 'nth_linear_constant_coeff_variation_of_parameters_Integral' for this method, especially if the solution to the homogeneous equation has trigonometric functions in it. Examples ======== >>> from sympy import Function, dsolve, pprint, exp, log >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(f(x).diff(x, 3) - 3f(x).diff(x, 2) + ... 3f(x).diff(x) - f(x) - exp(x)log(x), f(x), ... hint='nth_linear_constant_coeff_variation_of_parameters')) / 3 \ \| 2 x (6log(x) - 11)\| x f(x) = \|C1 + C2x + C3x + ------------------\|e \ 36 / References ========== - https://en.wikipedia.org/wiki/Variation_of_parameters - http://planetmath.org/VariationOfParameters - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 233 # indirect doctest """ gensol = ode_nth_linear_constant_coeff_homogeneous(eq, func, order, match, returns='both') match.update(gensol) return _solve_variation_of_parameters(eq, func, order, match) def _solve_variation_of_parameters(eq, func, order, match): r""" Helper function for the method of variation of parameters and nonhomogeneous euler eq. See the :py:meth:`~sympy.solvers.ode.ode_nth_linear_constant_coeff_variation_of_parameters` docstring for more information on this method. The parameter ``match`` should be a dictionary that has the following keys: ``list`` A list of solutions to the homogeneous equation, such as the list returned by ``ode_nth_linear_constant_coeff_homogeneous(returns='list')``. ``sol`` The general solution, such as the solution returned by ``ode_nth_linear_constant_coeff_homogeneous(returns='sol')``. """ x = func.args[0] f = func.func r = match psol = 0 gensols = r['list'] gsol = r['sol'] wr = wronskian(gensols, x) if r.get('simplify', True): wr = simplify(wr) # We need much better simplification for # some ODEs. See issue 4662, for example. # To reduce commonly occurring sin(x)2 + cos(x)2 to 1 wr = trigsimp(wr, deep=True, recursive=True) if not wr: # The wronskian will be 0 iff the solutions are not linearly # independent. raise NotImplementedError("Cannot find " + str(order) + " solutions to the homogeneous equation necessary to apply " + "variation of parameters to " + str(eq) + " (Wronskian == 0)") if len(gensols) != order: raise NotImplementedError("Cannot find " + str(order) + " solutions to the homogeneous equation necessary to apply " + "variation of parameters to " + str(eq) + " (number of terms != order)") negoneterm = (-1)*(order) for i in gensols: psol += negonetermIntegral(wronskian([sol for sol in gensols if sol != i], x)r[-1]/wr, x)i/r[order] negoneterm = -1 if r.get('simplify', True): psol = simplify(psol) psol = trigsimp(psol, deep=True) return Eq(f(x), gsol.rhs + psol) def ode_separable(eq, func, order, match): r""" Solves separable 1st order differential equations. This is any differential equation that can be written as `P(y) \tfrac{dy}{dx} = Q(x)`. The solution can then just be found by rearranging terms and integrating: `\int P(y) \,dy = \int Q(x) \,dx`. This hint uses :py:meth:`sympy.simplify.simplify.separatevars` as its back end, so if a separable equation is not caught by this solver, it is most likely the fault of that function. :py:meth:`~sympy.simplify.simplify.separatevars` is smart enough to do most expansion and factoring necessary to convert a separable equation `F(x, y)` into the proper form `P(x)\cdot{}Q(y)`. The general solution is:: >>> from sympy import Function, dsolve, Eq, pprint >>> from sympy.abc import x >>> a, b, c, d, f = map(Function, ['a', 'b', 'c', 'd', 'f']) >>> genform = Eq(a(x)b(f(x))f(x).diff(x), c(x)d(f(x))) >>> pprint(genform) d a(x)b(f(x))--(f(x)) = c(x)d(f(x)) dx >>> pprint(dsolve(genform, f(x), hint='separable_Integral')) f(x) / / \| \| \| b(y) \| c(x) \| ---- dy = C1 + \| ---- dx \| d(y) \| a(x) \| \| / / Examples ======== >>> from sympy import Function, dsolve, Eq >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(Eq(f(x)f(x).diff(x) + x, 3xf(x)*2), f(x), ... hint='separable', simplify=False)) / 2 \ 2 log\3f (x) - 1/ x ---------------- = C1 + -- 6 2 References ========== - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 52 # indirect doctest """ x = func.args[0] f = func.func C1 = get_numbered_constants(eq, num=1) r = match # {'m1':m1, 'm2':m2, 'y':y} u = r.get('hint', f(x)) # get u from separable_reduced else get f(x) return Eq(Integral(r['m2']['coeff']r['m2'][r['y']]/r['m1'][r['y']], (r['y'], None, u)), Integral(-r['m1']['coeff']r['m1'][x]/ r['m2'][x], x) + C1) def checkinfsol(eq, infinitesimals, func=None, order=None): r""" This function is used to check if the given infinitesimals are the actual infinitesimals of the given first order differential equation. This method is specific to the Lie Group Solver of ODEs. As of now, it simply checks, by substituting the infinitesimals in the partial differential equation. .. math:: \frac{\partial \eta}{\partial x} + \left(\frac{\partial \eta}{\partial y} - \frac{\partial \xi}{\partial x}\right)h - \frac{\partial \xi}{\partial y}h^{2} - \xi\frac{\partial h}{\partial x} - \eta\frac{\partial h}{\partial y} = 0 where `\eta`, and `\xi` are the infinitesimals and `h(x,y) = \frac{dy}{dx}` The infinitesimals should be given in the form of a list of dicts ``[{xi(x, y): inf, eta(x, y): inf}]``, corresponding to the output of the function infinitesimals. It returns a list of values of the form ``[(True/False, sol)]`` where ``sol`` is the value obtained after substituting the infinitesimals in the PDE. If it is ``True``, then ``sol`` would be 0. """ if isinstance(eq, Equality): eq = eq.lhs - eq.rhs if not func: eq, func = _preprocess(eq) variables = func.args if len(variables) != 1: raise ValueError("ODE's have only one independent variable") else: x = variables[0] if not order: order = ode_order(eq, func) if order != 1: raise NotImplementedError("Lie groups solver has been implemented " "only for first order differential equations") else: df = func.diff(x) a = Wild('a', exclude = [df]) b = Wild('b', exclude = [df]) match = collect(expand(eq), df).match(adf + b) if match: h = -simplify(match[b]/match[a]) else: try: sol = solve(eq, df) except NotImplementedError: raise NotImplementedError("Infinitesimals for the " "first order ODE could not be found") else: h = sol[0] # Find infinitesimals for one solution y = Dummy('y') h = h.subs(func, y) xi = Function('xi')(x, y) eta = Function('eta')(x, y) dxi = Function('xi')(x, func) deta = Function('eta')(x, func) pde = (eta.diff(x) + (eta.diff(y) - xi.diff(x))h - (xi.diff(y))h2 - xi(h.diff(x)) - eta(h.diff(y))) soltup = [] for sol in infinitesimals: tsol = {xi: S(sol[dxi]).subs(func, y), eta: S(sol[deta]).subs(func, y)} sol = simplify(pde.subs(tsol).doit()) if sol: soltup.append((False, sol.subs(y, func))) else: soltup.append((True, 0)) return soltup def ode_lie_group(eq, func, order, match): r""" This hint implements the Lie group method of solving first order differential equations. The aim is to convert the given differential equation from the given coordinate given system into another coordinate system where it becomes invariant under the one-parameter Lie group of translations. The converted ODE is quadrature and can be solved easily. It makes use of the :py:meth:`sympy.solvers.ode.infinitesimals` function which returns the infinitesimals of the transformation. The coordinates `r` and `s` can be found by solving the following Partial Differential Equations. .. math :: \xi\frac{\partial r}{\partial x} + \eta\frac{\partial r}{\partial y} = 0 .. math :: \xi\frac{\partial s}{\partial x} + \eta\frac{\partial s}{\partial y} = 1 The differential equation becomes separable in the new coordinate system .. math :: \frac{ds}{dr} = \frac{\frac{\partial s}{\partial x} + h(x, y)\frac{\partial s}{\partial y}}{ \frac{\partial r}{\partial x} + h(x, y)\frac{\partial r}{\partial y}} After finding the solution by integration, it is then converted back to the original coordinate system by substituting `r` and `s` in terms of `x` and `y` again. Examples ======== >>> from sympy import Function, dsolve, Eq, exp, pprint >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(f(x).diff(x) + 2xf(x) - xexp(-x*2), f(x), ... hint='lie_group')) / 2\ 2 \| x \| -x f(x) = \|C1 + --\|e \ 2 / References ========== - Solving differential equations by Symmetry Groups, John Starrett, pp. 1 - pp. 14 """ heuristics = lie_heuristics inf = {} f = func.func x = func.args[0] df = func.diff(x) xi = Function("xi") eta = Function("eta") xis = match.pop('xi') etas = match.pop('eta') if match: h = -simplify(match[match['d']]/match[match['e']]) y = match['y'] else: try: sol = solve(eq, df) if sol == []: raise NotImplementedError except NotImplementedError: raise NotImplementedError("Unable to solve the differential equation " + str(eq) + " by the lie group method") else: y = Dummy("y") h = sol[0].subs(func, y) if xis is not None and etas is not None: inf = [{xi(x, f(x)): S(xis), eta(x, f(x)): S(etas)}] if not checkinfsol(eq, inf, func=f(x), order=1)[0][0]: raise ValueError("The given infinitesimals xi and eta" " are not the infinitesimals to the given equation") else: heuristics = ["user_defined"] match = {'h': h, 'y': y} # This is done so that if: # a] solve raises a NotImplementedError. # b] any heuristic raises a ValueError # another heuristic can be used. tempsol = [] # Used by solve below for heuristic in heuristics: try: if not inf: inf = infinitesimals(eq, hint=heuristic, func=func, order=1, match=match) except ValueError: continue else: for infsim in inf: xiinf = (infsim[xi(x, func)]).subs(func, y) etainf = (infsim[eta(x, func)]).subs(func, y) # This condition creates recursion while using pdsolve. # Since the first step while solving a PDE of form # a(f(x, y).diff(x)) + b(f(x, y).diff(y)) + c = 0 # is to solve the ODE dy/dx = b/a if simplify(etainf/xiinf) == h: continue rpde = f(x, y).diff(x)xiinf + f(x, y).diff(y)etainf r = pdsolve(rpde, func=f(x, y)).rhs s = pdsolve(rpde - 1, func=f(x, y)).rhs newcoord = [_lie_group_remove(coord) for coord in [r, s]] r = Dummy("r") s = Dummy("s") C1 = Symbol("C1") rcoord = newcoord[0] scoord = newcoord[-1] try: sol = solve([r - rcoord, s - scoord], x, y, dict=True) except NotImplementedError: continue else: sol = sol[0] xsub = sol[x] ysub = sol[y] num = simplify(scoord.diff(x) + scoord.diff(y)h) denom = simplify(rcoord.diff(x) + rcoord.diff(y)h) if num and denom: diffeq = simplify((num/denom).subs([(x, xsub), (y, ysub)])) sep = separatevars(diffeq, symbols=[r, s], dict=True) if sep: # Trying to separate, r and s coordinates deq = integrate((1/sep[s]), s) + C1 - integrate(sep['coeff']sep[r], r) # Substituting and reverting back to original coordinates deq = deq.subs([(r, rcoord), (s, scoord)]) try: sdeq = solve(deq, y) except NotImplementedError: tempsol.append(deq) else: if len(sdeq) == 1: return Eq(f(x), sdeq.pop()) else: return [Eq(f(x), sol) for sol in sdeq] elif denom: # (ds/dr) is zero which means s is constant return Eq(f(x), solve(scoord - C1, y)[0]) elif num: # (dr/ds) is zero which means r is constant return Eq(f(x), solve(rcoord - C1, y)[0]) # If nothing works, return solution as it is, without solving for y if tempsol: if len(tempsol) == 1: return Eq(tempsol.pop().subs(y, f(x)), 0) else: return [Eq(sol.subs(y, f(x)), 0) for sol in tempsol] raise NotImplementedError("The given ODE " + str(eq) + " cannot be solved by" + " the lie group method") def _lie_group_remove(coords): r""" This function is strictly meant for internal use by the Lie group ODE solving method. It replaces arbitrary functions returned by pdsolve with either 0 or 1 or the args of the arbitrary function. The algorithm used is: 1] If coords is an instance of an Undefined Function, then the args are returned 2] If the arbitrary function is present in an Add object, it is replaced by zero. 3] If the arbitrary function is present in an Mul object, it is replaced by one. 4] If coords has no Undefined Function, it is returned as it is. Examples ======== >>> from sympy.solvers.ode import _lie_group_remove >>> from sympy import Function >>> from sympy.abc import x, y >>> F = Function("F") >>> eq = x2y >>> _lie_group_remove(eq) x*2y >>> eq = F(x*2y) >>> _lie_group_remove(eq) x*2y >>> eq = y*2x + F(x*3) >>> _lie_group_remove(eq) xy2 >>> eq = (F(x3) + y)x4 >>> _lie_group_remove(eq) x4y """ if isinstance(coords, AppliedUndef): return coords.args[0] elif coords.is_Add: subfunc = coords.atoms(AppliedUndef) if subfunc: for func in subfunc: coords = coords.subs(func, 0) return coords elif coords.is_Pow: base, expr = coords.as_base_exp() base = _lie_group_remove(base) expr = _lie_group_remove(expr) return base*expr elif coords.is_Mul: mulargs = [] coordargs = coords.args for arg in coordargs: if not isinstance(coords, AppliedUndef): mulargs.append(_lie_group_remove(arg)) return Mul(mulargs) return coords def infinitesimals(eq, func=None, order=None, hint='default', match=None): r""" The infinitesimal functions of an ordinary differential equation, `\xi(x,y)` and `\eta(x,y)`, are the infinitesimals of the Lie group of point transformations for which the differential equation is invariant. So, the ODE `y'=f(x,y)` would admit a Lie group `x^=X(x,y;\varepsilon)=x+\varepsilon\xi(x,y)`, `y^=Y(x,y;\varepsilon)=y+\varepsilon\eta(x,y)` such that `(y^)'=f(x^, y^)`. A change of coordinates, to `r(x,y)` and `s(x,y)`, can be performed so this Lie group becomes the translation group, `r^=r` and `s^=s+\varepsilon`. They are tangents to the coordinate curves of the new system. Consider the transformation `(x, y) \to (X, Y)` such that the differential equation remains invariant. `\xi` and `\eta` are the tangents to the transformed coordinates `X` and `Y`, at `\varepsilon=0`. .. math:: \left(\frac{\partial X(x,y;\varepsilon)}{\partial\varepsilon }\right)\|_{\varepsilon=0} = \xi, \left(\frac{\partial Y(x,y;\varepsilon)}{\partial\varepsilon }\right)\|_{\varepsilon=0} = \eta, The infinitesimals can be found by solving the following PDE: >>> from sympy import Function, diff, Eq, pprint >>> from sympy.abc import x, y >>> xi, eta, h = map(Function, ['xi', 'eta', 'h']) >>> h = h(x, y) # dy/dx = h >>> eta = eta(x, y) >>> xi = xi(x, y) >>> genform = Eq(eta.diff(x) + (eta.diff(y) - xi.diff(x))h ... - (xi.diff(y))h2 - xi(h.diff(x)) - eta(h.diff(y)), 0) >>> pprint(genform) /d d \ d 2 d \|--(eta(x, y)) - --(xi(x, y))\|h(x, y) - eta(x, y)--(h(x, y)) - h (x, y)--(x \dy dx / dy dy <BLANKLINE> d d i(x, y)) - xi(x, y)--(h(x, y)) + --(eta(x, y)) = 0 dx dx Solving the above mentioned PDE is not trivial, and can be solved only by making intelligent assumptions for `\xi` and `\eta` (heuristics). Once an infinitesimal is found, the attempt to find more heuristics stops. This is done to optimise the speed of solving the differential equation. If a list of all the infinitesimals is needed, ``hint`` should be flagged as ``all``, which gives the complete list of infinitesimals. If the infinitesimals for a particular heuristic needs to be found, it can be passed as a flag to ``hint``. Examples ======== >>> from sympy import Function, diff >>> from sympy.solvers.ode import infinitesimals >>> from sympy.abc import x >>> f = Function('f') >>> eq = f(x).diff(x) - x2f(x) >>> infinitesimals(eq) [{eta(x, f(x)): exp(x*3/3), xi(x, f(x)): 0}] References ========== - Solving differential equations by Symmetry Groups, John Starrett, pp. 1 - pp. 14 """ if isinstance(eq, Equality): eq = eq.lhs - eq.rhs if not func: eq, func = _preprocess(eq) variables = func.args if len(variables) != 1: raise ValueError("ODE's have only one independent variable") else: x = variables[0] if not order: order = ode_order(eq, func) if order != 1: raise NotImplementedError("Infinitesimals for only " "first order ODE's have been implemented") else: df = func.diff(x) # Matching differential equation of the form adf + b a = Wild('a', exclude = [df]) b = Wild('b', exclude = [df]) if match: # Used by lie_group hint h = match['h'] y = match['y'] else: match = collect(expand(eq), df).match(adf + b) if match: h = -simplify(match[b]/match[a]) else: try: sol = solve(eq, df) except NotImplementedError: raise NotImplementedError("Infinitesimals for the " "first order ODE could not be found") else: h = sol[0] # Find infinitesimals for one solution y = Dummy("y") h = h.subs(func, y) u = Dummy("u") hx = h.diff(x) hy = h.diff(y) hinv = ((1/h).subs([(x, u), (y, x)])).subs(u, y) # Inverse ODE match = {'h': h, 'func': func, 'hx': hx, 'hy': hy, 'y': y, 'hinv': hinv} if hint == 'all': xieta = [] for heuristic in lie_heuristics: function = globals()['lie_heuristic_' + heuristic] inflist = function(match, comp=True) if inflist: xieta.extend([inf for inf in inflist if inf not in xieta]) if xieta: return xieta else: raise NotImplementedError("Infinitesimals could not be found for " "the given ODE") elif hint == 'default': for heuristic in lie_heuristics: function = globals()['lie_heuristic_' + heuristic] xieta = function(match, comp=False) if xieta: return xieta raise NotImplementedError("Infinitesimals could not be found for" " the given ODE") elif hint not in lie_heuristics: raise ValueError("Heuristic not recognized: " + hint) else: function = globals()['lie_heuristic_' + hint] xieta = function(match, comp=True) if xieta: return xieta else: raise ValueError("Infinitesimals could not be found using the" " given heuristic") def lie_heuristic_abaco1_simple(match, comp=False): r""" The first heuristic uses the following four sets of assumptions on `\xi` and `\eta` .. math:: \xi = 0, \eta = f(x) .. math:: \xi = 0, \eta = f(y) .. math:: \xi = f(x), \eta = 0 .. math:: \xi = f(y), \eta = 0 The success of this heuristic is determined by algebraic factorisation. For the first assumption `\xi = 0` and `\eta` to be a function of `x`, the PDE .. math:: \frac{\partial \eta}{\partial x} + (\frac{\partial \eta}{\partial y} - \frac{\partial \xi}{\partial x})h - \frac{\partial \xi}{\partial y}h^{2} - \xi\frac{\partial h}{\partial x} - \eta\frac{\partial h}{\partial y} = 0 reduces to `f'(x) - f\frac{\partial h}{\partial y} = 0` If `\frac{\partial h}{\partial y}` is a function of `x`, then this can usually be integrated easily. A similar idea is applied to the other 3 assumptions as well. References ========== - E.S Cheb-Terrab, L.G.S Duarte and L.A,C.P da Mota, Computer Algebra Solving of First Order ODEs Using Symmetry Methods, pp. 8 """ xieta = [] y = match['y'] h = match['h'] func = match['func'] x = func.args[0] hx = match['hx'] hy = match['hy'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) hysym = hy.free_symbols if y not in hysym: try: fx = exp(integrate(hy, x)) except NotImplementedError: pass else: inf = {xi: S(0), eta: fx} if not comp: return [inf] if comp and inf not in xieta: xieta.append(inf) factor = hy/h facsym = factor.free_symbols if x not in facsym: try: fy = exp(integrate(factor, y)) except NotImplementedError: pass else: inf = {xi: S(0), eta: fy.subs(y, func)} if not comp: return [inf] if comp and inf not in xieta: xieta.append(inf) factor = -hx/h facsym = factor.free_symbols if y not in facsym: try: fx = exp(integrate(factor, x)) except NotImplementedError: pass else: inf = {xi: fx, eta: S(0)} if not comp: return [inf] if comp and inf not in xieta: xieta.append(inf) factor = -hx/(h2) facsym = factor.free_symbols if x not in facsym: try: fy = exp(integrate(factor, y)) except NotImplementedError: pass else: inf = {xi: fy.subs(y, func), eta: S(0)} if not comp: return [inf] if comp and inf not in xieta: xieta.append(inf) if xieta: return xieta def lie_heuristic_abaco1_product(match, comp=False): r""" The second heuristic uses the following two assumptions on `\xi` and `\eta` .. math:: \eta = 0, \xi = f(x)g(y) .. math:: \eta = f(x)g(y), \xi = 0 The first assumption of this heuristic holds good if `\frac{1}{h^{2}}\frac{\partial^2}{\partial x \partial y}\log(h)` is separable in `x` and `y`, then the separated factors containing `x` is `f(x)`, and `g(y)` is obtained by .. math:: e^{\int f\frac{\partial}{\partial x}\left(\frac{1}{fh}\right)\,dy} provided `f\frac{\partial}{\partial x}\left(\frac{1}{fh}\right)` is a function of `y` only. The second assumption holds good if `\frac{dy}{dx} = h(x, y)` is rewritten as `\frac{dy}{dx} = \frac{1}{h(y, x)}` and the same properties of the first assumption satisfies. After obtaining `f(x)` and `g(y)`, the coordinates are again interchanged, to get `\eta` as `f(x)g(y)` References ========== - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order ODE Patterns, pp. 7 - pp. 8 """ xieta = [] y = match['y'] h = match['h'] hinv = match['hinv'] func = match['func'] x = func.args[0] xi = Function('xi')(x, func) eta = Function('eta')(x, func) inf = separatevars(((log(h).diff(y)).diff(x))/h*2, dict=True, symbols=[x, y]) if inf and inf['coeff']: fx = inf[x] gy = simplify(fx((1/(fxh)).diff(x))) gysyms = gy.free_symbols if x not in gysyms: gy = exp(integrate(gy, y)) inf = {eta: S(0), xi: (fxgy).subs(y, func)} if not comp: return [inf] if comp and inf not in xieta: xieta.append(inf) u1 = Dummy("u1") inf = separatevars(((log(hinv).diff(y)).diff(x))/hinv*2, dict=True, symbols=[x, y]) if inf and inf['coeff']: fx = inf[x] gy = simplify(fx((1/(fxhinv)).diff(x))) gysyms = gy.free_symbols if x not in gysyms: gy = exp(integrate(gy, y)) etaval = fxgy etaval = (etaval.subs([(x, u1), (y, x)])).subs(u1, y) inf = {eta: etaval.subs(y, func), xi: S(0)} if not comp: return [inf] if comp and inf not in xieta: xieta.append(inf) if xieta: return xieta def lie_heuristic_bivariate(match, comp=False): r""" The third heuristic assumes the infinitesimals `\xi` and `\eta` to be bi-variate polynomials in `x` and `y`. The assumption made here for the logic below is that `h` is a rational function in `x` and `y` though that may not be necessary for the infinitesimals to be bivariate polynomials. The coefficients of the infinitesimals are found out by substituting them in the PDE and grouping similar terms that are polynomials and since they form a linear system, solve and check for non trivial solutions. The degree of the assumed bivariates are increased till a certain maximum value. References ========== - Lie Groups and Differential Equations pp. 327 - pp. 329 """ h = match['h'] hx = match['hx'] hy = match['hy'] func = match['func'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) if h.is_rational_function(): # The maximum degree that the infinitesimals can take is # calculated by this technique. etax, etay, etad, xix, xiy, xid = symbols("etax etay etad xix xiy xid") ipde = etax + (etay - xix)h - xiyh*2 - xidhx - etadhy num, denom = cancel(ipde).as_numer_denom() deg = Poly(num, x, y).total_degree() deta = Function('deta')(x, y) dxi = Function('dxi')(x, y) ipde = (deta.diff(x) + (deta.diff(y) - dxi.diff(x))h - (dxi.diff(y))h2 - dxihx - detahy) xieq = Symbol("xi0") etaeq = Symbol("eta0") for i in range(deg + 1): if i: xieq += Add([ Symbol("xi_" + str(power) + "_" + str(i - power))xpowery*(i - power) for power in range(i + 1)]) etaeq += Add([ Symbol("eta_" + str(power) + "_" + str(i - power))xpowery*(i - power) for power in range(i + 1)]) pden, denom = (ipde.subs({dxi: xieq, deta: etaeq}).doit()).as_numer_denom() pden = expand(pden) # If the individual terms are monomials, the coefficients # are grouped if pden.is_polynomial(x, y) and pden.is_Add: polyy = Poly(pden, x, y).as_dict() if polyy: symset = xieq.free_symbols.union(etaeq.free_symbols) - {x, y} soldict = solve(polyy.values(), symset) if isinstance(soldict, list): soldict = soldict[0] if any(soldict.values()): xired = xieq.subs(soldict) etared = etaeq.subs(soldict) # Scaling is done by substituting one for the parameters # This can be any number except zero. dict_ = dict((sym, 1) for sym in symset) inf = {eta: etared.subs(dict_).subs(y, func), xi: xired.subs(dict_).subs(y, func)} return [inf] def lie_heuristic_chi(match, comp=False): r""" The aim of the fourth heuristic is to find the function `\chi(x, y)` that satisfies the PDE `\frac{d\chi}{dx} + h\frac{d\chi}{dx} - \frac{\partial h}{\partial y}\chi = 0`. This assumes `\chi` to be a bivariate polynomial in `x` and `y`. By intuition, `h` should be a rational function in `x` and `y`. The method used here is to substitute a general binomial for `\chi` up to a certain maximum degree is reached. The coefficients of the polynomials, are calculated by by collecting terms of the same order in `x` and `y`. After finding `\chi`, the next step is to use `\eta = \xih + \chi`, to determine `\xi` and `\eta`. This can be done by dividing `\chi` by `h` which would give `-\xi` as the quotient and `\eta` as the remainder. References ========== - E.S Cheb-Terrab, L.G.S Duarte and L.A,C.P da Mota, Computer Algebra Solving of First Order ODEs Using Symmetry Methods, pp. 8 """ h = match['h'] hy = match['hy'] func = match['func'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) if h.is_rational_function(): schi, schix, schiy = symbols("schi, schix, schiy") cpde = schix + hschiy - hyschi num, denom = cancel(cpde).as_numer_denom() deg = Poly(num, x, y).total_degree() chi = Function('chi')(x, y) chix = chi.diff(x) chiy = chi.diff(y) cpde = chix + hchiy - hychi chieq = Symbol("chi") for i in range(1, deg + 1): chieq += Add([ Symbol("chi_" + str(power) + "_" + str(i - power))xpowery*(i - power) for power in range(i + 1)]) cnum, cden = cancel(cpde.subs({chi : chieq}).doit()).as_numer_denom() cnum = expand(cnum) if cnum.is_polynomial(x, y) and cnum.is_Add: cpoly = Poly(cnum, x, y).as_dict() if cpoly: solsyms = chieq.free_symbols - {x, y} soldict = solve(cpoly.values(), solsyms) if isinstance(soldict, list): soldict = soldict[0] if any(soldict.values()): chieq = chieq.subs(soldict) dict_ = dict((sym, 1) for sym in solsyms) chieq = chieq.subs(dict_) # After finding chi, the main aim is to find out # eta, xi by the equation eta = xih + chi # One method to set xi, would be rearranging it to # (eta/h) - xi = (chi/h). This would mean dividing # chi by h would give -xi as the quotient and eta # as the remainder. Thanks to Sean Vig for suggesting # this method. xic, etac = div(chieq, h) inf = {eta: etac.subs(y, func), xi: -xic.subs(y, func)} return [inf] def lie_heuristic_function_sum(match, comp=False): r""" This heuristic uses the following two assumptions on `\xi` and `\eta` .. math:: \eta = 0, \xi = f(x) + g(y) .. math:: \eta = f(x) + g(y), \xi = 0 The first assumption of this heuristic holds good if .. math:: \frac{\partial}{\partial y}[(h\frac{\partial^{2}}{ \partial x^{2}}(h^{-1}))^{-1}] is separable in `x` and `y`, 1. The separated factors containing `y` is `\frac{\partial g}{\partial y}`. From this `g(y)` can be determined. 2. The separated factors containing `x` is `f''(x)`. 3. `h\frac{\partial^{2}}{\partial x^{2}}(h^{-1})` equals `\frac{f''(x)}{f(x) + g(y)}`. From this `f(x)` can be determined. The second assumption holds good if `\frac{dy}{dx} = h(x, y)` is rewritten as `\frac{dy}{dx} = \frac{1}{h(y, x)}` and the same properties of the first assumption satisfies. After obtaining `f(x)` and `g(y)`, the coordinates are again interchanged, to get `\eta` as `f(x) + g(y)`. For both assumptions, the constant factors are separated among `g(y)` and `f''(x)`, such that `f''(x)` obtained from 3] is the same as that obtained from 2]. If not possible, then this heuristic fails. References ========== - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order ODE Patterns, pp. 7 - pp. 8 """ xieta = [] h = match['h'] func = match['func'] hinv = match['hinv'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) for odefac in [h, hinv]: factor = odefac((1/odefac).diff(x, 2)) sep = separatevars((1/factor).diff(y), dict=True, symbols=[x, y]) if sep and sep['coeff'] and sep[x].has(x) and sep[y].has(y): k = Dummy("k") try: gy = kintegrate(sep[y], y) except NotImplementedError: pass else: fdd = 1/(ksep[x]sep['coeff']) fx = simplify(fdd/factor - gy) check = simplify(fx.diff(x, 2) - fdd) if fx: if not check: fx = fx.subs(k, 1) gy = (gy/k) else: sol = solve(check, k) if sol: sol = sol[0] fx = fx.subs(k, sol) gy = (gy/k)sol else: continue if odefac == hinv: # Inverse ODE fx = fx.subs(x, y) gy = gy.subs(y, x) etaval = factor_terms(fx + gy) if etaval.is_Mul: etaval = Mul([arg for arg in etaval.args if arg.has(x, y)]) if odefac == hinv: # Inverse ODE inf = {eta: etaval.subs(y, func), xi : S(0)} else: inf = {xi: etaval.subs(y, func), eta : S(0)} if not comp: return [inf] else: xieta.append(inf) if xieta: return xieta def lie_heuristic_abaco2_similar(match, comp=False): r""" This heuristic uses the following two assumptions on `\xi` and `\eta` .. math:: \eta = g(x), \xi = f(x) .. math:: \eta = f(y), \xi = g(y) For the first assumption, 1. First `\frac{\frac{\partial h}{\partial y}}{\frac{\partial^{2} h}{ \partial yy}}` is calculated. Let us say this value is A 2. If this is constant, then `h` is matched to the form `A(x) + B(x)e^{ \frac{y}{C}}` then, `\frac{e^{\int \frac{A(x)}{C} \,dx}}{B(x)}` gives `f(x)` and `A(x)f(x)` gives `g(x)` 3. Otherwise `\frac{\frac{\partial A}{\partial X}}{\frac{\partial A}{ \partial Y}} = \gamma` is calculated. If a] `\gamma` is a function of `x` alone b] `\frac{\gamma\frac{\partial h}{\partial y} - \gamma'(x) - \frac{ \partial h}{\partial x}}{h + \gamma} = G` is a function of `x` alone. then, `e^{\int G \,dx}` gives `f(x)` and `-\gammaf(x)` gives `g(x)` The second assumption holds good if `\frac{dy}{dx} = h(x, y)` is rewritten as `\frac{dy}{dx} = \frac{1}{h(y, x)}` and the same properties of the first assumption satisfies. After obtaining `f(x)` and `g(x)`, the coordinates are again interchanged, to get `\xi` as `f(x^)` and `\eta` as `g(y^)` References ========== - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order ODE Patterns, pp. 10 - pp. 12 """ h = match['h'] hx = match['hx'] hy = match['hy'] func = match['func'] hinv = match['hinv'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) factor = cancel(h.diff(y)/h.diff(y, 2)) factorx = factor.diff(x) factory = factor.diff(y) if not factor.has(x) and not factor.has(y): A = Wild('A', exclude=[y]) B = Wild('B', exclude=[y]) C = Wild('C', exclude=[x, y]) match = h.match(A + Bexp(y/C)) try: tau = exp(-integrate(match[A]/match[C]), x)/match[B] except NotImplementedError: pass else: gx = match[A]tau return [{xi: tau, eta: gx}] else: gamma = cancel(factorx/factory) if not gamma.has(y): tauint = cancel((gammahy - gamma.diff(x) - hx)/(h + gamma)) if not tauint.has(y): try: tau = exp(integrate(tauint, x)) except NotImplementedError: pass else: gx = -taugamma return [{xi: tau, eta: gx}] factor = cancel(hinv.diff(y)/hinv.diff(y, 2)) factorx = factor.diff(x) factory = factor.diff(y) if not factor.has(x) and not factor.has(y): A = Wild('A', exclude=[y]) B = Wild('B', exclude=[y]) C = Wild('C', exclude=[x, y]) match = h.match(A + Bexp(y/C)) try: tau = exp(-integrate(match[A]/match[C]), x)/match[B] except NotImplementedError: pass else: gx = match[A]tau return [{eta: tau.subs(x, func), xi: gx.subs(x, func)}] else: gamma = cancel(factorx/factory) if not gamma.has(y): tauint = cancel((gammahinv.diff(y) - gamma.diff(x) - hinv.diff(x))/( hinv + gamma)) if not tauint.has(y): try: tau = exp(integrate(tauint, x)) except NotImplementedError: pass else: gx = -taugamma return [{eta: tau.subs(x, func), xi: gx.subs(x, func)}] def lie_heuristic_abaco2_unique_unknown(match, comp=False): r""" This heuristic assumes the presence of unknown functions or known functions with non-integer powers. 1. A list of all functions and non-integer powers containing x and y 2. Loop over each element `f` in the list, find `\frac{\frac{\partial f}{\partial x}}{ \frac{\partial f}{\partial x}} = R` If it is separable in `x` and `y`, let `X` be the factors containing `x`. Then a] Check if `\xi = X` and `\eta = -\frac{X}{R}` satisfy the PDE. If yes, then return `\xi` and `\eta` b] Check if `\xi = \frac{-R}{X}` and `\eta = -\frac{1}{X}` satisfy the PDE. If yes, then return `\xi` and `\eta` If not, then check if a] :math:`\xi = -R,\eta = 1` b] :math:`\xi = 1, \eta = -\frac{1}{R}` are solutions. References ========== - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order ODE Patterns, pp. 10 - pp. 12 """ h = match['h'] hx = match['hx'] hy = match['hy'] func = match['func'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) funclist = [] for atom in h.atoms(Pow): base, exp = atom.as_base_exp() if base.has(x) and base.has(y): if not exp.is_Integer: funclist.append(atom) for function in h.atoms(AppliedUndef): syms = function.free_symbols if x in syms and y in syms: funclist.append(function) for f in funclist: frac = cancel(f.diff(y)/f.diff(x)) sep = separatevars(frac, dict=True, symbols=[x, y]) if sep and sep['coeff']: xitry1 = sep[x] etatry1 = -1/(sep[y]sep['coeff']) pde1 = etatry1.diff(y)h - xitry1.diff(x)h - xitry1hx - etatry1hy if not simplify(pde1): return [{xi: xitry1, eta: etatry1.subs(y, func)}] xitry2 = 1/etatry1 etatry2 = 1/xitry1 pde2 = etatry2.diff(x) - (xitry2.diff(y))h2 - xitry2hx - etatry2hy if not simplify(expand(pde2)): return [{xi: xitry2.subs(y, func), eta: etatry2}] else: etatry = -1/frac pde = etatry.diff(x) + etatry.diff(y)h - hx - etatryhy if not simplify(pde): return [{xi: S(1), eta: etatry.subs(y, func)}] xitry = -frac pde = -xitry.diff(x)h -xitry.diff(y)h2 - xitryhx -hy if not simplify(expand(pde)): return [{xi: xitry.subs(y, func), eta: S(1)}] def lie_heuristic_abaco2_unique_general(match, comp=False): r""" This heuristic finds if infinitesimals of the form `\eta = f(x)`, `\xi = g(y)` without making any assumptions on `h`. The complete sequence of steps is given in the paper mentioned below. References ========== - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order ODE Patterns, pp. 10 - pp. 12 """ hx = match['hx'] hy = match['hy'] func = match['func'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) A = hx.diff(y) B = hy.diff(y) + hy2 C = hx.diff(x) - hx2 if not (A and B and C): return Ax = A.diff(x) Ay = A.diff(y) Axy = Ax.diff(y) Axx = Ax.diff(x) Ayy = Ay.diff(y) D = simplify(2Axy + hxAy - Axhy + (hxhy + 2A)A)A - 3AxAy if not D: E1 = simplify(3Ax2 + ((hx2 + 2C)A - 2Axx)A) if E1: E2 = simplify((2Ayy + (2B - hy*2)A)A - 3Ay*2) if not E2: E3 = simplify( E1((28Ax + 4hxA)A*3 - E1(hyA + Ay)) - E1.diff(x)8A4) if not E3: etaval = cancel((4A*3(Ax - hxA) + E1(hyA - Ay))/(S(2)AE1)) if x not in etaval: try: etaval = exp(integrate(etaval, y)) except NotImplementedError: pass else: xival = -4A*3etaval/E1 if y not in xival: return [{xi: xival, eta: etaval.subs(y, func)}] else: E1 = simplify((2Ayy + (2B - hy*2)A)A - 3Ay*2) if E1: E2 = simplify( 4A*3D - D*2 + E1((2Axx - (hx2 + 2C)A)A - 3Ax2)) if not E2: E3 = simplify( -(AD)E1.diff(y) + ((E1.diff(x) - hyD)A + 3AyD + (Ahx - 3Ax)E1)E1) if not E3: etaval = cancel(((Ahx - Ax)E1 - (Ay + Ahy)D)/(S(2)AD)) if x not in etaval: try: etaval = exp(integrate(etaval, y)) except NotImplementedError: pass else: xival = -E1etaval/D if y not in xival: return [{xi: xival, eta: etaval.subs(y, func)}] def lie_heuristic_linear(match, comp=False): r""" This heuristic assumes 1. `\xi = ax + by + c` and 2. `\eta = fx + gy + h` After substituting the following assumptions in the determining PDE, it reduces to .. math:: f + (g - a)h - bh^{2} - (ax + by + c)\frac{\partial h}{\partial x} - (fx + gy + c)\frac{\partial h}{\partial y} Solving the reduced PDE obtained, using the method of characteristics, becomes impractical. The method followed is grouping similar terms and solving the system of linear equations obtained. The difference between the bivariate heuristic is that `h` need not be a rational function in this case. References ========== - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order ODE Patterns, pp. 10 - pp. 12 """ h = match['h'] hx = match['hx'] hy = match['hy'] func = match['func'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) coeffdict = {} symbols = numbered_symbols("c", cls=Dummy) symlist = [next(symbols) for _ in islice(symbols, 6)] C0, C1, C2, C3, C4, C5 = symlist pde = C3 + (C4 - C0)h - (C0x + C1y + C2)hx - (C3x + C4y + C5)hy - C1h*2 pde, denom = pde.as_numer_denom() pde = powsimp(expand(pde)) if pde.is_Add: terms = pde.args for term in terms: if term.is_Mul: rem = Mul([m for m in term.args if not m.has(x, y)]) xypart = term/rem if xypart not in coeffdict: coeffdict[xypart] = rem else: coeffdict[xypart] += rem else: if term not in coeffdict: coeffdict[term] = S(1) else: coeffdict[term] += S(1) sollist = coeffdict.values() soldict = solve(sollist, symlist) if soldict: if isinstance(soldict, list): soldict = soldict[0] subval = soldict.values() if any(t for t in subval): onedict = dict(zip(symlist, [1]6)) xival = C0x + C1func + C2 etaval = C3x + C4func + C5 xival = xival.subs(soldict) etaval = etaval.subs(soldict) xival = xival.subs(onedict) etaval = etaval.subs(onedict) return [{xi: xival, eta: etaval}] def sysode_linear_2eq_order1(match_): x = match_['func'][0].func y = match_['func'][1].func func = match_['func'] fc = match_['func_coeff'] eq = match_['eq'] r = dict() t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] for i in range(2): eqs = 0 for terms in Add.make_args(eq[i]): eqs += terms/fc[i,func[i],1] eq[i] = eqs # for equations Eq(a1diff(x(t),t), ax(t) + by(t) + k1) # and Eq(a2diff(x(t),t), cx(t) + dy(t) + k2) r['a'] = -fc[0,x(t),0]/fc[0,x(t),1] r['c'] = -fc[1,x(t),0]/fc[1,y(t),1] r['b'] = -fc[0,y(t),0]/fc[0,x(t),1] r['d'] = -fc[1,y(t),0]/fc[1,y(t),1] forcing = [S(0),S(0)] for i in range(2): for j in Add.make_args(eq[i]): if not j.has(x(t), y(t)): forcing[i] += j if not (forcing[0].has(t) or forcing[1].has(t)): r['k1'] = forcing[0] r['k2'] = forcing[1] else: raise NotImplementedError("Only homogeneous problems are supported" + " (and constant inhomogeneity)") if match_['type_of_equation'] == 'type1': sol = _linear_2eq_order1_type1(x, y, t, r, eq) if match_['type_of_equation'] == 'type2': gsol = _linear_2eq_order1_type1(x, y, t, r, eq) psol = _linear_2eq_order1_type2(x, y, t, r, eq) sol = [Eq(x(t), gsol[0].rhs+psol[0]), Eq(y(t), gsol[1].rhs+psol[1])] if match_['type_of_equation'] == 'type3': sol = _linear_2eq_order1_type3(x, y, t, r, eq) if match_['type_of_equation'] == 'type4': sol = _linear_2eq_order1_type4(x, y, t, r, eq) if match_['type_of_equation'] == 'type5': sol = _linear_2eq_order1_type5(x, y, t, r, eq) if match_['type_of_equation'] == 'type6': sol = _linear_2eq_order1_type6(x, y, t, r, eq) if match_['type_of_equation'] == 'type7': sol = _linear_2eq_order1_type7(x, y, t, r, eq) return sol def _linear_2eq_order1_type1(x, y, t, r, eq): r""" It is classified under system of two linear homogeneous first-order constant-coefficient ordinary differential equations. The equations which come under this type are .. math:: x' = ax + by, .. math:: y' = cx + dy The characteristics equation is written as .. math:: \lambda^{2} + (a+d) \lambda + ad - bc = 0 and its discriminant is `D = (a-d)^{2} + 4bc`. There are several cases 1. Case when `ad - bc \neq 0`. The origin of coordinates, `x = y = 0`, is the only stationary point; it is - a node if `D = 0` - a node if `D > 0` and `ad - bc > 0` - a saddle if `D > 0` and `ad - bc < 0` - a focus if `D < 0` and `a + d \neq 0` - a centre if `D < 0` and `a + d \neq 0`. 1.1. If `D > 0`. The characteristic equation has two distinct real roots `\lambda_1` and `\lambda_ 2` . The general solution of the system in question is expressed as .. math:: x = C_1 b e^{\lambda_1 t} + C_2 b e^{\lambda_2 t} .. math:: y = C_1 (\lambda_1 - a) e^{\lambda_1 t} + C_2 (\lambda_2 - a) e^{\lambda_2 t} where `C_1` and `C_2` being arbitrary constants 1.2. If `D < 0`. The characteristics equation has two conjugate roots, `\lambda_1 = \sigma + i \beta` and `\lambda_2 = \sigma - i \beta`. The general solution of the system is given by .. math:: x = b e^{\sigma t} (C_1 \sin(\beta t) + C_2 \cos(\beta t)) .. math:: y = e^{\sigma t} ([(\sigma - a) C_1 - \beta C_2] \sin(\beta t) + [\beta C_1 + (\sigma - a) C_2 \cos(\beta t)]) 1.3. If `D = 0` and `a \neq d`. The characteristic equation has two equal roots, `\lambda_1 = \lambda_2`. The general solution of the system is written as .. math:: x = 2b (C_1 + \frac{C_2}{a-d} + C_2 t) e^{\frac{a+d}{2} t} .. math:: y = [(d - a) C_1 + C_2 + (d - a) C_2 t] e^{\frac{a+d}{2} t} 1.4. If `D = 0` and `a = d \neq 0` and `b = 0` .. math:: x = C_1 e^{a t} , y = (c C_1 t + C_2) e^{a t} 1.5. If `D = 0` and `a = d \neq 0` and `c = 0` .. math:: x = (b C_1 t + C_2) e^{a t} , y = C_1 e^{a t} 2. Case when `ad - bc = 0` and `a^{2} + b^{2} > 0`. The whole straight line `ax + by = 0` consists of singular points. The original system of differential equations can be rewritten as .. math:: x' = ax + by , y' = k (ax + by) 2.1 If `a + bk \neq 0`, solution will be .. math:: x = b C_1 + C_2 e^{(a + bk) t} , y = -a C_1 + k C_2 e^{(a + bk) t} 2.2 If `a + bk = 0`, solution will be .. math:: x = C_1 (bk t - 1) + b C_2 t , y = k^{2} b C_1 t + (b k^{2} t + 1) C_2 """ C1, C2 = get_numbered_constants(eq, num=2) a, b, c, d = r['a'], r['b'], r['c'], r['d'] real_coeff = all(v.is_real for v in (a, b, c, d)) D = (a - d)2 + 4bc l1 = (a + d + sqrt(D))/2 l2 = (a + d - sqrt(D))/2 equal_roots = Eq(D, 0).expand() gsol1, gsol2 = [], [] # Solutions have exponential form if either D > 0 with real coefficients # or D != 0 with complex coefficients. Eigenvalues are distinct. # For each eigenvalue lam, pick an eigenvector, making sure we don't get (0, 0) # The candidates are (b, lam-a) and (lam-d, c). exponential_form = D > 0 if real_coeff else Not(equal_roots) bad_ab_vector1 = And(Eq(b, 0), Eq(l1, a)) bad_ab_vector2 = And(Eq(b, 0), Eq(l2, a)) vector1 = Matrix((Piecewise((l1 - d, bad_ab_vector1), (b, True)), Piecewise((c, bad_ab_vector1), (l1 - a, True)))) vector2 = Matrix((Piecewise((l2 - d, bad_ab_vector2), (b, True)), Piecewise((c, bad_ab_vector2), (l2 - a, True)))) sol_vector = C1exp(l1t)vector1 + C2exp(l2t)vector2 gsol1.append((sol_vector[0], exponential_form)) gsol2.append((sol_vector[1], exponential_form)) # Solutions have trigonometric form for real coefficients with D < 0 # Both b and c are nonzero in this case, so (b, lam-a) is an eigenvector # It splits into real/imag parts as (b, sigma-a) and (0, beta). Then # multiply it by C1(cos(betat) + IC2sin(betat)) and separate real/imag trigonometric_form = D < 0 if real_coeff else False sigma = re(l1) if im(l1).is_positive: beta = im(l1) else: beta = im(l2) vector1 = Matrix((b, sigma - a)) vector2 = Matrix((0, beta)) sol_vector = exp(sigmat) * (C1(cos(betat)vector1 - sin(betat)vector2) + \ C2(sin(betat)vector1 + cos(betat)vector2)) gsol1.append((sol_vector[0], trigonometric_form)) gsol2.append((sol_vector[1], trigonometric_form)) # Final case is D == 0, a single eigenvalue. If the eigenspace is 2-dimensional # then we have a scalar matrix, deal with this case first. scalar_matrix = And(Eq(a, d), Eq(b, 0), Eq(c, 0)) vector1 = Matrix((S.One, S.Zero)) vector2 = Matrix((S.Zero, S.One)) sol_vector = exp(l1t) (C1vector1 + C2vector2) gsol1.append((sol_vector[0], scalar_matrix)) gsol2.append((sol_vector[1], scalar_matrix)) # Have one eigenvector. Get a generalized eigenvector from (A-lam)vector2 = vector1 vector1 = Matrix((Piecewise((l1 - d, bad_ab_vector1), (b, True)), Piecewise((c, bad_ab_vector1), (l1 - a, True)))) vector2 = Matrix((Piecewise((S.One, bad_ab_vector1), (S.Zero, Eq(a, l1)), (b/(a - l1), True)), Piecewise((S.Zero, bad_ab_vector1), (S.One, Eq(a, l1)), (S.Zero, True)))) sol_vector = exp(l1t) * (C1vector1 + C2(vector2 + tvector1)) gsol1.append((sol_vector[0], equal_roots)) gsol2.append((sol_vector[1], equal_roots)) return [Eq(x(t), Piecewise(gsol1)), Eq(y(t), Piecewise(gsol2))] def _linear_2eq_order1_type2(x, y, t, r, eq): r""" The equations of this type are .. math:: x' = ax + by + k1 , y' = cx + dy + k2 The general solution of this system is given by sum of its particular solution and the general solution of the corresponding homogeneous system is obtained from type1. 1. When `ad - bc \neq 0`. The particular solution will be `x = x_0` and `y = y_0` where `x_0` and `y_0` are determined by solving linear system of equations .. math:: a x_0 + b y_0 + k1 = 0 , c x_0 + d y_0 + k2 = 0 2. When `ad - bc = 0` and `a^{2} + b^{2} > 0`. In this case, the system of equation becomes .. math:: x' = ax + by + k_1 , y' = k (ax + by) + k_2 2.1 If `\sigma = a + bk \neq 0`, particular solution is given by .. math:: x = b \sigma^{-1} (c_1 k - c_2) t - \sigma^{-2} (a c_1 + b c_2) .. math:: y = kx + (c_2 - c_1 k) t 2.2 If `\sigma = a + bk = 0`, particular solution is given by .. math:: x = \frac{1}{2} b (c_2 - c_1 k) t^{2} + c_1 t .. math:: y = kx + (c_2 - c_1 k) t """ r['k1'] = -r['k1']; r['k2'] = -r['k2'] if (r['a']r['d'] - r['b']r['c']) != 0: x0, y0 = symbols('x0, y0', cls=Dummy) sol = solve((r['a']x0+r['b']y0+r['k1'], r['c']x0+r['d']y0+r['k2']), x0, y0) psol = [sol[x0], sol[y0]] elif (r['a']r['d'] - r['b']r['c']) == 0 and (r['a']2+r['b']2) > 0: k = r['c']/r['a'] sigma = r['a'] + r['b']k if sigma != 0: sol1 = r['b']sigma-1(r['k1']k-r['k2'])t - sigma*-2(r['a']r['k1']+r['b']r['k2']) sol2 = ksol1 + (r['k2']-r['k1']k)t else: # FIXME: a previous typo fix shows this is not covered by tests sol1 = r['b'](r['k2']-r['k1']k)t*2 + r['k1']t sol2 = ksol1 + (r['k2']-r['k1']k)t psol = [sol1, sol2] return psol def _linear_2eq_order1_type3(x, y, t, r, eq): r""" The equations of this type of ode are .. math:: x' = f(t) x + g(t) y .. math:: y' = g(t) x + f(t) y The solution of such equations is given by .. math:: x = e^{F} (C_1 e^{G} + C_2 e^{-G}) , y = e^{F} (C_1 e^{G} - C_2 e^{-G}) where `C_1` and `C_2` are arbitrary constants, and .. math:: F = \int f(t) \,dt , G = \int g(t) \,dt """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) F = Integral(r['a'], t) G = Integral(r['b'], t) sol1 = exp(F)(C1exp(G) + C2exp(-G)) sol2 = exp(F)(C1exp(G) - C2exp(-G)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order1_type4(x, y, t, r, eq): r""" The equations of this type of ode are . .. math:: x' = f(t) x + g(t) y .. math:: y' = -g(t) x + f(t) y The solution is given by .. math:: x = F (C_1 \cos(G) + C_2 \sin(G)), y = F (-C_1 \sin(G) + C_2 \cos(G)) where `C_1` and `C_2` are arbitrary constants, and .. math:: F = \int f(t) \,dt , G = \int g(t) \,dt """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) if r['b'] == -r['c']: F = exp(Integral(r['a'], t)) G = Integral(r['b'], t) sol1 = F(C1cos(G) + C2sin(G)) sol2 = F(-C1sin(G) + C2cos(G)) elif r['d'] == -r['a']: F = exp(Integral(r['c'], t)) G = Integral(r['d'], t) sol1 = F(-C1sin(G) + C2cos(G)) sol2 = F(C1cos(G) + C2sin(G)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order1_type5(x, y, t, r, eq): r""" The equations of this type of ode are . .. math:: x' = f(t) x + g(t) y .. math:: y' = a g(t) x + [f(t) + b g(t)] y The transformation of .. math:: x = e^{\int f(t) \,dt} u , y = e^{\int f(t) \,dt} v , T = \int g(t) \,dt leads to a system of constant coefficient linear differential equations .. math:: u'(T) = v , v'(T) = au + bv """ u, v = symbols('u, v', cls=Function) T = Symbol('T') if not cancel(r['c']/r['b']).has(t): p = cancel(r['c']/r['b']) q = cancel((r['d']-r['a'])/r['b']) eq = (Eq(diff(u(T),T), v(T)), Eq(diff(v(T),T), pu(T)+qv(T))) sol = dsolve(eq) sol1 = exp(Integral(r['a'], t))sol[0].rhs.subs(T, Integral(r['b'], t)) sol2 = exp(Integral(r['a'], t))sol[1].rhs.subs(T, Integral(r['b'], t)) if not cancel(r['a']/r['d']).has(t): p = cancel(r['a']/r['d']) q = cancel((r['b']-r['c'])/r['d']) sol = dsolve(Eq(diff(u(T),T), v(T)), Eq(diff(v(T),T), pu(T)+qv(T))) sol1 = exp(Integral(r['c'], t))sol[1].rhs.subs(T, Integral(r['d'], t)) sol2 = exp(Integral(r['c'], t))sol[0].rhs.subs(T, Integral(r['d'], t)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order1_type6(x, y, t, r, eq): r""" The equations of this type of ode are . .. math:: x' = f(t) x + g(t) y .. math:: y' = a [f(t) + a h(t)] x + a [g(t) - h(t)] y This is solved by first multiplying the first equation by `-a` and adding it to the second equation to obtain .. math:: y' - a x' = -a h(t) (y - a x) Setting `U = y - ax` and integrating the equation we arrive at .. math:: y - ax = C_1 e^{-a \int h(t) \,dt} and on substituting the value of y in first equation give rise to first order ODEs. After solving for `x`, we can obtain `y` by substituting the value of `x` in second equation. """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) p = 0 q = 0 p1 = cancel(r['c']/cancel(r['c']/r['d']).as_numer_denom()[0]) p2 = cancel(r['a']/cancel(r['a']/r['b']).as_numer_denom()[0]) for n, i in enumerate([p1, p2]): for j in Mul.make_args(collect_const(i)): if not j.has(t): q = j if q!=0 and n==0: if ((r['c']/j - r['a'])/(r['b'] - r['d']/j)) == j: p = 1 s = j break if q!=0 and n==1: if ((r['a']/j - r['c'])/(r['d'] - r['b']/j)) == j: p = 2 s = j break if p == 1: equ = diff(x(t),t) - r['a']x(t) - r['b'](sx(t) + C1exp(-sIntegral(r['b'] - r['d']/s, t))) hint1 = classify_ode(equ)[1] sol1 = dsolve(equ, hint=hint1+'_Integral').rhs sol2 = ssol1 + C1exp(-sIntegral(r['b'] - r['d']/s, t)) elif p ==2: equ = diff(y(t),t) - r['c']y(t) - r['d']sy(t) + C1exp(-sIntegral(r['d'] - r['b']/s, t)) hint1 = classify_ode(equ)[1] sol2 = dsolve(equ, hint=hint1+'_Integral').rhs sol1 = ssol2 + C1exp(-sIntegral(r['d'] - r['b']/s, t)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order1_type7(x, y, t, r, eq): r""" The equations of this type of ode are . .. math:: x' = f(t) x + g(t) y .. math:: y' = h(t) x + p(t) y Differentiating the first equation and substituting the value of `y` from second equation will give a second-order linear equation .. math:: g x'' - (fg + gp + g') x' + (fgp - g^{2} h + f g' - f' g) x = 0 This above equation can be easily integrated if following conditions are satisfied. 1. `fgp - g^{2} h + f g' - f' g = 0` 2. `fgp - g^{2} h + f g' - f' g = ag, fg + gp + g' = bg` If first condition is satisfied then it is solved by current dsolve solver and in second case it becomes a constant coefficient differential equation which is also solved by current solver. Otherwise if the above condition fails then, a particular solution is assumed as `x = x_0(t)` and `y = y_0(t)` Then the general solution is expressed as .. math:: x = C_1 x_0(t) + C_2 x_0(t) \int \frac{g(t) F(t) P(t)}{x_0^{2}(t)} \,dt .. math:: y = C_1 y_0(t) + C_2 [\frac{F(t) P(t)}{x_0(t)} + y_0(t) \int \frac{g(t) F(t) P(t)}{x_0^{2}(t)} \,dt] where C1 and C2 are arbitrary constants and .. math:: F(t) = e^{\int f(t) \,dt} , P(t) = e^{\int p(t) \,dt} """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) e1 = r['a']r['b']r['c'] - r['b']2r['c'] + r['a']diff(r['b'],t) - diff(r['a'],t)r['b'] e2 = r['a']r['c']r['d'] - r['b']r['c']2 + diff(r['c'],t)r['d'] - r['c']diff(r['d'],t) m1 = r['a']r['b'] + r['b']r['d'] + diff(r['b'],t) m2 = r['a']r['c'] + r['c']r['d'] + diff(r['c'],t) if e1 == 0: sol1 = dsolve(r['b']diff(x(t),t,t) - m1diff(x(t),t)).rhs sol2 = dsolve(diff(y(t),t) - r['c']sol1 - r['d']y(t)).rhs elif e2 == 0: sol2 = dsolve(r['c']diff(y(t),t,t) - m2diff(y(t),t)).rhs sol1 = dsolve(diff(x(t),t) - r['a']x(t) - r['b']sol2).rhs elif not (e1/r['b']).has(t) and not (m1/r['b']).has(t): sol1 = dsolve(diff(x(t),t,t) - (m1/r['b'])diff(x(t),t) - (e1/r['b'])x(t)).rhs sol2 = dsolve(diff(y(t),t) - r['c']sol1 - r['d']y(t)).rhs elif not (e2/r['c']).has(t) and not (m2/r['c']).has(t): sol2 = dsolve(diff(y(t),t,t) - (m2/r['c'])diff(y(t),t) - (e2/r['c'])y(t)).rhs sol1 = dsolve(diff(x(t),t) - r['a']x(t) - r['b']sol2).rhs else: x0 = Function('x0')(t) # x0 and y0 being particular solutions y0 = Function('y0')(t) F = exp(Integral(r['a'],t)) P = exp(Integral(r['d'],t)) sol1 = C1x0 + C2x0Integral(r['b']FP/x0*2, t) sol2 = C1y0 + C2(FP/x0 + y0Integral(r['b']FP/x02, t)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def sysode_linear_2eq_order2(match_): x = match_['func'][0].func y = match_['func'][1].func func = match_['func'] fc = match_['func_coeff'] eq = match_['eq'] r = dict() t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] for i in range(2): eqs = [] for terms in Add.make_args(eq[i]): eqs.append(terms/fc[i,func[i],2]) eq[i] = Add(eqs) # for equations Eq(diff(x(t),t,t), a1diff(x(t),t)+b1diff(y(t),t)+c1x(t)+d1y(t)+e1) # and Eq(a2diff(y(t),t,t), a2diff(x(t),t)+b2diff(y(t),t)+c2x(t)+d2y(t)+e2) r['a1'] = -fc[0,x(t),1]/fc[0,x(t),2] ; r['a2'] = -fc[1,x(t),1]/fc[1,y(t),2] r['b1'] = -fc[0,y(t),1]/fc[0,x(t),2] ; r['b2'] = -fc[1,y(t),1]/fc[1,y(t),2] r['c1'] = -fc[0,x(t),0]/fc[0,x(t),2] ; r['c2'] = -fc[1,x(t),0]/fc[1,y(t),2] r['d1'] = -fc[0,y(t),0]/fc[0,x(t),2] ; r['d2'] = -fc[1,y(t),0]/fc[1,y(t),2] const = [S(0), S(0)] for i in range(2): for j in Add.make_args(eq[i]): if not (j.has(x(t)) or j.has(y(t))): const[i] += j r['e1'] = -const[0] r['e2'] = -const[1] if match_['type_of_equation'] == 'type1': sol = _linear_2eq_order2_type1(x, y, t, r, eq) elif match_['type_of_equation'] == 'type2': gsol = _linear_2eq_order2_type1(x, y, t, r, eq) psol = _linear_2eq_order2_type2(x, y, t, r, eq) sol = [Eq(x(t), gsol[0].rhs+psol[0]), Eq(y(t), gsol[1].rhs+psol[1])] elif match_['type_of_equation'] == 'type3': sol = _linear_2eq_order2_type3(x, y, t, r, eq) elif match_['type_of_equation'] == 'type4': sol = _linear_2eq_order2_type4(x, y, t, r, eq) elif match_['type_of_equation'] == 'type5': sol = _linear_2eq_order2_type5(x, y, t, r, eq) elif match_['type_of_equation'] == 'type6': sol = _linear_2eq_order2_type6(x, y, t, r, eq) elif match_['type_of_equation'] == 'type7': sol = _linear_2eq_order2_type7(x, y, t, r, eq) elif match_['type_of_equation'] == 'type8': sol = _linear_2eq_order2_type8(x, y, t, r, eq) elif match_['type_of_equation'] == 'type9': sol = _linear_2eq_order2_type9(x, y, t, r, eq) elif match_['type_of_equation'] == 'type10': sol = _linear_2eq_order2_type10(x, y, t, r, eq) elif match_['type_of_equation'] == 'type11': sol = _linear_2eq_order2_type11(x, y, t, r, eq) return sol def _linear_2eq_order2_type1(x, y, t, r, eq): r""" System of two constant-coefficient second-order linear homogeneous differential equations .. math:: x'' = ax + by .. math:: y'' = cx + dy The characteristic equation for above equations .. math:: \lambda^4 - (a + d) \lambda^2 + ad - bc = 0 whose discriminant is `D = (a - d)^2 + 4bc \neq 0` 1. When `ad - bc \neq 0` 1.1. If `D \neq 0`. The characteristic equation has four distinct roots, `\lambda_1, \lambda_2, \lambda_3, \lambda_4`. The general solution of the system is .. math:: x = C_1 b e^{\lambda_1 t} + C_2 b e^{\lambda_2 t} + C_3 b e^{\lambda_3 t} + C_4 b e^{\lambda_4 t} .. math:: y = C_1 (\lambda_1^{2} - a) e^{\lambda_1 t} + C_2 (\lambda_2^{2} - a) e^{\lambda_2 t} + C_3 (\lambda_3^{2} - a) e^{\lambda_3 t} + C_4 (\lambda_4^{2} - a) e^{\lambda_4 t} where `C_1,..., C_4` are arbitrary constants. 1.2. If `D = 0` and `a \neq d`: .. math:: x = 2 C_1 (bt + \frac{2bk}{a - d}) e^{\frac{kt}{2}} + 2 C_2 (bt + \frac{2bk}{a - d}) e^{\frac{-kt}{2}} + 2b C_3 t e^{\frac{kt}{2}} + 2b C_4 t e^{\frac{-kt}{2}} .. math:: y = C_1 (d - a) t e^{\frac{kt}{2}} + C_2 (d - a) t e^{\frac{-kt}{2}} + C_3 [(d - a) t + 2k] e^{\frac{kt}{2}} + C_4 [(d - a) t - 2k] e^{\frac{-kt}{2}} where `C_1,..., C_4` are arbitrary constants and `k = \sqrt{2 (a + d)}` 1.3. If `D = 0` and `a = d \neq 0` and `b = 0`: .. math:: x = 2 \sqrt{a} C_1 e^{\sqrt{a} t} + 2 \sqrt{a} C_2 e^{-\sqrt{a} t} .. math:: y = c C_1 t e^{\sqrt{a} t} - c C_2 t e^{-\sqrt{a} t} + C_3 e^{\sqrt{a} t} + C_4 e^{-\sqrt{a} t} 1.4. If `D = 0` and `a = d \neq 0` and `c = 0`: .. math:: x = b C_1 t e^{\sqrt{a} t} - b C_2 t e^{-\sqrt{a} t} + C_3 e^{\sqrt{a} t} + C_4 e^{-\sqrt{a} t} .. math:: y = 2 \sqrt{a} C_1 e^{\sqrt{a} t} + 2 \sqrt{a} C_2 e^{-\sqrt{a} t} 2. When `ad - bc = 0` and `a^2 + b^2 > 0`. Then the original system becomes .. math:: x'' = ax + by .. math:: y'' = k (ax + by) 2.1. If `a + bk \neq 0`: .. math:: x = C_1 e^{t \sqrt{a + bk}} + C_2 e^{-t \sqrt{a + bk}} + C_3 bt + C_4 b .. math:: y = C_1 k e^{t \sqrt{a + bk}} + C_2 k e^{-t \sqrt{a + bk}} - C_3 at - C_4 a 2.2. If `a + bk = 0`: .. math:: x = C_1 b t^3 + C_2 b t^2 + C_3 t + C_4 .. math:: y = kx + 6 C_1 t + 2 C_2 """ r['a'] = r['c1'] r['b'] = r['d1'] r['c'] = r['c2'] r['d'] = r['d2'] l = Symbol('l') C1, C2, C3, C4 = get_numbered_constants(eq, num=4) chara_eq = l4 - (r['a']+r['d'])l*2 + r['a']r['d'] - r['b']r['c'] l1 = rootof(chara_eq, 0) l2 = rootof(chara_eq, 1) l3 = rootof(chara_eq, 2) l4 = rootof(chara_eq, 3) D = (r['a'] - r['d'])2 + 4r['b']r['c'] if (r['a']r['d'] - r['b']r['c']) != 0: if D != 0: gsol1 = C1r['b']exp(l1t) + C2r['b']exp(l2t) + C3r['b']exp(l3t) \ + C4r['b']exp(l4t) gsol2 = C1(l1*2-r['a'])exp(l1t) + C2(l2*2-r['a'])exp(l2t) + \ C3(l3*2-r['a'])exp(l3t) + C4(l4*2-r['a'])exp(l4t) else: if r['a'] != r['d']: k = sqrt(2(r['a']+r['d'])) mid = r['b']t+2r['b']k/(r['a']-r['d']) gsol1 = 2C1midexp(kt/2) + 2C2midexp(-kt/2) + \ 2r['b']C3texp(kt/2) + 2r['b']C4texp(-kt/2) gsol2 = C1(r['d']-r['a'])texp(kt/2) + C2(r['d']-r['a'])texp(-kt/2) + \ C3((r['d']-r['a'])t+2k)exp(kt/2) + C4((r['d']-r['a'])t-2k)exp(-kt/2) elif r['a'] == r['d'] != 0 and r['b'] == 0: sa = sqrt(r['a']) gsol1 = 2saC1exp(sat) + 2saC2exp(-sat) gsol2 = r['c']C1texp(sat)-r['c']C2texp(-sat)+C3exp(sat)+C4exp(-sat) elif r['a'] == r['d'] != 0 and r['c'] == 0: sa = sqrt(r['a']) gsol1 = r['b']C1texp(sat)-r['b']C2texp(-sat)+C3exp(sat)+C4exp(-sat) gsol2 = 2saC1exp(sat) + 2saC2exp(-sat) elif (r['a']r['d'] - r['b']r['c']) == 0 and (r['a']2 + r['b']2) > 0: k = r['c']/r['a'] if r['a'] + r['b']k != 0: mid = sqrt(r['a'] + r['b']k) gsol1 = C1exp(midt) + C2exp(-midt) + C3r['b']t + C4r['b'] gsol2 = C1kexp(midt) + C2kexp(-midt) - C3r['a']t - C4r['a'] else: gsol1 = C1r['b']t3 + C2r['b']t2 + C3t + C4 gsol2 = kgsol1 + 6C1t + 2C2 return [Eq(x(t), gsol1), Eq(y(t), gsol2)] def _linear_2eq_order2_type2(x, y, t, r, eq): r""" The equations in this type are .. math:: x'' = a_1 x + b_1 y + c_1 .. math:: y'' = a_2 x + b_2 y + c_2 The general solution of this system is given by the sum of its particular solution and the general solution of the homogeneous system. The general solution is given by the linear system of 2 equation of order 2 and type 1 1. If `a_1 b_2 - a_2 b_1 \neq 0`. A particular solution will be `x = x_0` and `y = y_0` where the constants `x_0` and `y_0` are determined by solving the linear algebraic system .. math:: a_1 x_0 + b_1 y_0 + c_1 = 0, a_2 x_0 + b_2 y_0 + c_2 = 0 2. If `a_1 b_2 - a_2 b_1 = 0` and `a_1^2 + b_1^2 > 0`. In this case, the system in question becomes .. math:: x'' = ax + by + c_1, y'' = k (ax + by) + c_2 2.1. If `\sigma = a + bk \neq 0`, the particular solution will be .. math:: x = \frac{1}{2} b \sigma^{-1} (c_1 k - c_2) t^2 - \sigma^{-2} (a c_1 + b c_2) .. math:: y = kx + \frac{1}{2} (c_2 - c_1 k) t^2 2.2. If `\sigma = a + bk = 0`, the particular solution will be .. math:: x = \frac{1}{24} b (c_2 - c_1 k) t^4 + \frac{1}{2} c_1 t^2 .. math:: y = kx + \frac{1}{2} (c_2 - c_1 k) t^2 """ x0, y0 = symbols('x0, y0') if r['c1']r['d2'] - r['c2']r['d1'] != 0: sol = solve((r['c1']x0+r['d1']y0+r['e1'], r['c2']x0+r['d2']y0+r['e2']), x0, y0) psol = [sol[x0], sol[y0]] elif r['c1']r['d2'] - r['c2']r['d1'] == 0 and (r['c1']2 + r['d1']2) > 0: k = r['c2']/r['c1'] sig = r['c1'] + r['d1']k if sig != 0: psol1 = r['d1']sig*-1(r['e1']k-r['e2'])t2/2 - \ sig-2(r['c1']r['e1']+r['d1']r['e2']) psol2 = kpsol1 + (r['e2'] - r['e1']k)t*2/2 psol = [psol1, psol2] else: psol1 = r['d1'](r['e2']-r['e1']k)t*4/24 + r['e1']t*2/2 psol2 = kpsol1 + (r['e2']-r['e1']k)t2/2 psol = [psol1, psol2] return psol def _linear_2eq_order2_type3(x, y, t, r, eq): r""" These type of equation is used for describing the horizontal motion of a pendulum taking into account the Earth rotation. The solution is given with `a^2 + 4b > 0`: .. math:: x = C_1 \cos(\alpha t) + C_2 \sin(\alpha t) + C_3 \cos(\beta t) + C_4 \sin(\beta t) .. math:: y = -C_1 \sin(\alpha t) + C_2 \cos(\alpha t) - C_3 \sin(\beta t) + C_4 \cos(\beta t) where `C_1,...,C_4` and .. math:: \alpha = \frac{1}{2} a + \frac{1}{2} \sqrt{a^2 + 4b}, \beta = \frac{1}{2} a - \frac{1}{2} \sqrt{a^2 + 4b} """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) if r['b1']2 - 4r['c1'] > 0: r['a'] = r['b1'] ; r['b'] = -r['c1'] alpha = r['a']/2 + sqrt(r['a']2 + 4r['b'])/2 beta = r['a']/2 - sqrt(r['a']*2 + 4r['b'])/2 sol1 = C1cos(alphat) + C2sin(alphat) + C3cos(betat) + C4sin(betat) sol2 = -C1sin(alphat) + C2cos(alphat) - C3sin(betat) + C4cos(betat) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type4(x, y, t, r, eq): r""" These equations are found in the theory of oscillations .. math:: x'' + a_1 x' + b_1 y' + c_1 x + d_1 y = k_1 e^{i \omega t} .. math:: y'' + a_2 x' + b_2 y' + c_2 x + d_2 y = k_2 e^{i \omega t} The general solution of this linear nonhomogeneous system of constant-coefficient differential equations is given by the sum of its particular solution and the general solution of the corresponding homogeneous system (with `k_1 = k_2 = 0`) 1. A particular solution is obtained by the method of undetermined coefficients: .. math:: x = A_* e^{i \omega t}, y = B_* e^{i \omega t} On substituting these expressions into the original system of differential equations, one arrive at a linear nonhomogeneous system of algebraic equations for the coefficients `A` and `B`. 2. The general solution of the homogeneous system of differential equations is determined by a linear combination of linearly independent particular solutions determined by the method of undetermined coefficients in the form of exponentials: .. math:: x = A e^{\lambda t}, y = B e^{\lambda t} On substituting these expressions into the original system and collecting the coefficients of the unknown `A` and `B`, one obtains .. math:: (\lambda^{2} + a_1 \lambda + c_1) A + (b_1 \lambda + d_1) B = 0 .. math:: (a_2 \lambda + c_2) A + (\lambda^{2} + b_2 \lambda + d_2) B = 0 The determinant of this system must vanish for nontrivial solutions A, B to exist. This requirement results in the following characteristic equation for `\lambda` .. math:: (\lambda^2 + a_1 \lambda + c_1) (\lambda^2 + b_2 \lambda + d_2) - (b_1 \lambda + d_1) (a_2 \lambda + c_2) = 0 If all roots `k_1,...,k_4` of this equation are distinct, the general solution of the original system of the differential equations has the form .. math:: x = C_1 (b_1 \lambda_1 + d_1) e^{\lambda_1 t} - C_2 (b_1 \lambda_2 + d_1) e^{\lambda_2 t} - C_3 (b_1 \lambda_3 + d_1) e^{\lambda_3 t} - C_4 (b_1 \lambda_4 + d_1) e^{\lambda_4 t} .. math:: y = C_1 (\lambda_1^{2} + a_1 \lambda_1 + c_1) e^{\lambda_1 t} + C_2 (\lambda_2^{2} + a_1 \lambda_2 + c_1) e^{\lambda_2 t} + C_3 (\lambda_3^{2} + a_1 \lambda_3 + c_1) e^{\lambda_3 t} + C_4 (\lambda_4^{2} + a_1 \lambda_4 + c_1) e^{\lambda_4 t} """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) k = Symbol('k') Ra, Ca, Rb, Cb = symbols('Ra, Ca, Rb, Cb') a1 = r['a1'] ; a2 = r['a2'] b1 = r['b1'] ; b2 = r['b2'] c1 = r['c1'] ; c2 = r['c2'] d1 = r['d1'] ; d2 = r['d2'] k1 = r['e1'].expand().as_independent(t)[0] k2 = r['e2'].expand().as_independent(t)[0] ew1 = r['e1'].expand().as_independent(t)[1] ew2 = powdenest(ew1).as_base_exp()[1] ew3 = collect(ew2, t).coeff(t) w = cancel(ew3/I) # The particular solution is assumed to be (Ra+ICa)exp(Iwt) and # (Rb+ICb)exp(Iwt) for x(t) and y(t) respectively peq1 = (-w*2+c1)Ra - a1wCa + d1Rb - b1wCb - k1 peq2 = a1wRa + (-w2+c1)Ca + b1wRb + d1Cb peq3 = c2Ra - a2wCa + (-w*2+d2)Rb - b2wCb - k2 peq4 = a2wRa + c2Ca + b2wRb + (-w2+d2)Cb # FIXME: solve for what in what? Ra, Rb, etc I guess # but then psol not used for anything? psol = solve([peq1, peq2, peq3, peq4]) chareq = (k*2+a1k+c1)(k2+b2k+d2) - (b1k+d1)(a2k+c2) [k1, k2, k3, k4] = roots_quartic(Poly(chareq)) sol1 = -C1(b1k1+d1)exp(k1t) - C2(b1k2+d1)exp(k2t) - \ C3(b1k3+d1)exp(k3t) - C4(b1k4+d1)exp(k4t) + (Ra+ICa)exp(Iwt) a1_ = (a1-1) sol2 = C1(k1*2+a1_k1+c1)exp(k1t) + C2(k22+a1_k2+c1)exp(k2t) + \ C3(k32+a1_k3+c1)exp(k3t) + C4(k42+a1_k4+c1)exp(k4t) + (Rb+ICb)exp(Iwt) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type5(x, y, t, r, eq): r""" The equation which come under this category are .. math:: x'' = a (t y' - y) .. math:: y'' = b (t x' - x) The transformation .. math:: u = t x' - x, b = t y' - y leads to the first-order system .. math:: u' = atv, v' = btu The general solution of this system is given by If `ab > 0`: .. math:: u = C_1 a e^{\frac{1}{2} \sqrt{ab} t^2} + C_2 a e^{-\frac{1}{2} \sqrt{ab} t^2} .. math:: v = C_1 \sqrt{ab} e^{\frac{1}{2} \sqrt{ab} t^2} - C_2 \sqrt{ab} e^{-\frac{1}{2} \sqrt{ab} t^2} If `ab < 0`: .. math:: u = C_1 a \cos(\frac{1}{2} \sqrt{\left\|ab\right\|} t^2) + C_2 a \sin(-\frac{1}{2} \sqrt{\left\|ab\right\|} t^2) .. math:: v = C_1 \sqrt{\left\|ab\right\|} \sin(\frac{1}{2} \sqrt{\left\|ab\right\|} t^2) + C_2 \sqrt{\left\|ab\right\|} \cos(-\frac{1}{2} \sqrt{\left\|ab\right\|} t^2) where `C_1` and `C_2` are arbitrary constants. On substituting the value of `u` and `v` in above equations and integrating the resulting expressions, the general solution will become .. math:: x = C_3 t + t \int \frac{u}{t^2} \,dt, y = C_4 t + t \int \frac{u}{t^2} \,dt where `C_3` and `C_4` are arbitrary constants. """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) r['a'] = -r['d1'] ; r['b'] = -r['c2'] mul = sqrt(abs(r['a']r['b'])) if r['a']r['b'] > 0: u = C1r['a']exp(mult2/2) + C2r['a']exp(-mult*2/2) v = C1mulexp(mult*2/2) - C2mulexp(-mult*2/2) else: u = C1r['a']cos(mult*2/2) + C2r['a']sin(mult*2/2) v = -C1mulsin(mult*2/2) + C2mulcos(mult*2/2) sol1 = C3t + tIntegral(u/t2, t) sol2 = C4t + tIntegral(v/t2, t) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type6(x, y, t, r, eq): r""" The equations are .. math:: x'' = f(t) (a_1 x + b_1 y) .. math:: y'' = f(t) (a_2 x + b_2 y) If `k_1` and `k_2` are roots of the quadratic equation .. math:: k^2 - (a_1 + b_2) k + a_1 b_2 - a_2 b_1 = 0 Then by multiplying appropriate constants and adding together original equations we obtain two independent equations: .. math:: z_1'' = k_1 f(t) z_1, z_1 = a_2 x + (k_1 - a_1) y .. math:: z_2'' = k_2 f(t) z_2, z_2 = a_2 x + (k_2 - a_1) y Solving the equations will give the values of `x` and `y` after obtaining the value of `z_1` and `z_2` by solving the differential equation and substituting the result. """ k = Symbol('k') z = Function('z') num, den = cancel( (r['c1']x(t) + r['d1']y(t))/ (r['c2']x(t) + r['d2']y(t))).as_numer_denom() f = r['c1']/num.coeff(x(t)) a1 = num.coeff(x(t)) b1 = num.coeff(y(t)) a2 = den.coeff(x(t)) b2 = den.coeff(y(t)) chareq = k2 - (a1 + b2)k + a1b2 - a2b1 k1, k2 = [rootof(chareq, k) for k in range(Poly(chareq).degree())] z1 = dsolve(diff(z(t),t,t) - k1fz(t)).rhs z2 = dsolve(diff(z(t),t,t) - k2fz(t)).rhs sol1 = (k1z2 - k2z1 + a1(z1 - z2))/(a2(k1-k2)) sol2 = (z1 - z2)/(k1 - k2) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type7(x, y, t, r, eq): r""" The equations are given as .. math:: x'' = f(t) (a_1 x' + b_1 y') .. math:: y'' = f(t) (a_2 x' + b_2 y') If `k_1` and 'k_2` are roots of the quadratic equation .. math:: k^2 - (a_1 + b_2) k + a_1 b_2 - a_2 b_1 = 0 Then the system can be reduced by adding together the two equations multiplied by appropriate constants give following two independent equations: .. math:: z_1'' = k_1 f(t) z_1', z_1 = a_2 x + (k_1 - a_1) y .. math:: z_2'' = k_2 f(t) z_2', z_2 = a_2 x + (k_2 - a_1) y Integrating these and returning to the original variables, one arrives at a linear algebraic system for the unknowns `x` and `y`: .. math:: a_2 x + (k_1 - a_1) y = C_1 \int e^{k_1 F(t)} \,dt + C_2 .. math:: a_2 x + (k_2 - a_1) y = C_3 \int e^{k_2 F(t)} \,dt + C_4 where `C_1,...,C_4` are arbitrary constants and `F(t) = \int f(t) \,dt` """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) k = Symbol('k') num, den = cancel( (r['a1']x(t) + r['b1']y(t))/ (r['a2']x(t) + r['b2']y(t))).as_numer_denom() f = r['a1']/num.coeff(x(t)) a1 = num.coeff(x(t)) b1 = num.coeff(y(t)) a2 = den.coeff(x(t)) b2 = den.coeff(y(t)) chareq = k*2 - (a1 + b2)k + a1b2 - a2b1 [k1, k2] = [rootof(chareq, k) for k in range(Poly(chareq).degree())] F = Integral(f, t) z1 = C1Integral(exp(k1F), t) + C2 z2 = C3Integral(exp(k2F), t) + C4 sol1 = (k1z2 - k2z1 + a1(z1 - z2))/(a2(k1-k2)) sol2 = (z1 - z2)/(k1 - k2) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type8(x, y, t, r, eq): r""" The equation of this category are .. math:: x'' = a f(t) (t y' - y) .. math:: y'' = b f(t) (t x' - x) The transformation .. math:: u = t x' - x, v = t y' - y leads to the system of first-order equations .. math:: u' = a t f(t) v, v' = b t f(t) u The general solution of this system has the form If `ab > 0`: .. math:: u = C_1 a e^{\sqrt{ab} \int t f(t) \,dt} + C_2 a e^{-\sqrt{ab} \int t f(t) \,dt} .. math:: v = C_1 \sqrt{ab} e^{\sqrt{ab} \int t f(t) \,dt} - C_2 \sqrt{ab} e^{-\sqrt{ab} \int t f(t) \,dt} If `ab < 0`: .. math:: u = C_1 a \cos(\sqrt{\left\|ab\right\|} \int t f(t) \,dt) + C_2 a \sin(-\sqrt{\left\|ab\right\|} \int t f(t) \,dt) .. math:: v = C_1 \sqrt{\left\|ab\right\|} \sin(\sqrt{\left\|ab\right\|} \int t f(t) \,dt) + C_2 \sqrt{\left\|ab\right\|} \cos(-\sqrt{\left\|ab\right\|} \int t f(t) \,dt) where `C_1` and `C_2` are arbitrary constants. On substituting the value of `u` and `v` in above equations and integrating the resulting expressions, the general solution will become .. math:: x = C_3 t + t \int \frac{u}{t^2} \,dt, y = C_4 t + t \int \frac{u}{t^2} \,dt where `C_3` and `C_4` are arbitrary constants. """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) num, den = cancel(r['d1']/r['c2']).as_numer_denom() f = -r['d1']/num a = num b = den mul = sqrt(abs(ab)) Igral = Integral(tf, t) if ab > 0: u = C1aexp(mulIgral) + C2aexp(-mulIgral) v = C1mulexp(mulIgral) - C2mulexp(-mulIgral) else: u = C1acos(mulIgral) + C2asin(mulIgral) v = -C1mulsin(mulIgral) + C2mulcos(mulIgral) sol1 = C3t + tIntegral(u/t2, t) sol2 = C4t + tIntegral(v/t2, t) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type9(x, y, t, r, eq): r""" .. math:: t^2 x'' + a_1 t x' + b_1 t y' + c_1 x + d_1 y = 0 .. math:: t^2 y'' + a_2 t x' + b_2 t y' + c_2 x + d_2 y = 0 These system of equations are euler type. The substitution of `t = \sigma e^{\tau} (\sigma \neq 0)` leads to the system of constant coefficient linear differential equations .. math:: x'' + (a_1 - 1) x' + b_1 y' + c_1 x + d_1 y = 0 .. math:: y'' + a_2 x' + (b_2 - 1) y' + c_2 x + d_2 y = 0 The general solution of the homogeneous system of differential equations is determined by a linear combination of linearly independent particular solutions determined by the method of undetermined coefficients in the form of exponentials .. math:: x = A e^{\lambda t}, y = B e^{\lambda t} On substituting these expressions into the original system and collecting the coefficients of the unknown `A` and `B`, one obtains .. math:: (\lambda^{2} + (a_1 - 1) \lambda + c_1) A + (b_1 \lambda + d_1) B = 0 .. math:: (a_2 \lambda + c_2) A + (\lambda^{2} + (b_2 - 1) \lambda + d_2) B = 0 The determinant of this system must vanish for nontrivial solutions A, B to exist. This requirement results in the following characteristic equation for `\lambda` .. math:: (\lambda^2 + (a_1 - 1) \lambda + c_1) (\lambda^2 + (b_2 - 1) \lambda + d_2) - (b_1 \lambda + d_1) (a_2 \lambda + c_2) = 0 If all roots `k_1,...,k_4` of this equation are distinct, the general solution of the original system of the differential equations has the form .. math:: x = C_1 (b_1 \lambda_1 + d_1) e^{\lambda_1 t} - C_2 (b_1 \lambda_2 + d_1) e^{\lambda_2 t} - C_3 (b_1 \lambda_3 + d_1) e^{\lambda_3 t} - C_4 (b_1 \lambda_4 + d_1) e^{\lambda_4 t} .. math:: y = C_1 (\lambda_1^{2} + (a_1 - 1) \lambda_1 + c_1) e^{\lambda_1 t} + C_2 (\lambda_2^{2} + (a_1 - 1) \lambda_2 + c_1) e^{\lambda_2 t} + C_3 (\lambda_3^{2} + (a_1 - 1) \lambda_3 + c_1) e^{\lambda_3 t} + C_4 (\lambda_4^{2} + (a_1 - 1) \lambda_4 + c_1) e^{\lambda_4 t} """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) k = Symbol('k') a1 = -r['a1']t; a2 = -r['a2']t b1 = -r['b1']t; b2 = -r['b2']t c1 = -r['c1']t*2; c2 = -r['c2']t*2 d1 = -r['d1']t*2; d2 = -r['d2']t2 eq = (k2+(a1-1)k+c1)(k*2+(b2-1)k+d2)-(b1k+d1)(a2k+c2) [k1, k2, k3, k4] = roots_quartic(Poly(eq)) sol1 = -C1(b1k1+d1)exp(k1log(t)) - C2(b1k2+d1)exp(k2log(t)) - \ C3(b1k3+d1)exp(k3log(t)) - C4(b1k4+d1)exp(k4log(t)) a1_ = (a1-1) sol2 = C1(k1*2+a1_k1+c1)exp(k1log(t)) + C2(k22+a1_k2+c1)exp(k2log(t)) \ + C3(k32+a1_k3+c1)exp(k3log(t)) + C4(k42+a1_k4+c1)exp(k4log(t)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type10(x, y, t, r, eq): r""" The equation of this category are .. math:: (\alpha t^2 + \beta t + \gamma)^{2} x'' = ax + by .. math:: (\alpha t^2 + \beta t + \gamma)^{2} y'' = cx + dy The transformation .. math:: \tau = \int \frac{1}{\alpha t^2 + \beta t + \gamma} \,dt , u = \frac{x}{\sqrt{\left\|\alpha t^2 + \beta t + \gamma\right\|}} , v = \frac{y}{\sqrt{\left\|\alpha t^2 + \beta t + \gamma\right\|}} leads to a constant coefficient linear system of equations .. math:: u'' = (a - \alpha \gamma + \frac{1}{4} \beta^{2}) u + b v .. math:: v'' = c u + (d - \alpha \gamma + \frac{1}{4} \beta^{2}) v These system of equations obtained can be solved by type1 of System of two constant-coefficient second-order linear homogeneous differential equations. """ u, v = symbols('u, v', cls=Function) assert False p = Wild('p', exclude=[t, t2]) q = Wild('q', exclude=[t, t2]) s = Wild('s', exclude=[t, t2]) n = Wild('n', exclude=[t, t2]) num, den = r['c1'].as_numer_denom() dic = den.match((n(pt*2+qt+s)*2).expand()) eqz = dic[p]t*2 + dic[q]t + dic[s] a = num/dic[n] b = cancel(r['d1']eqz2) c = cancel(r['c2']eqz*2) d = cancel(r['d2']eqz*2) [msol1, msol2] = dsolve([Eq(diff(u(t), t, t), (a - dic[p]dic[s] + dic[q]*2/4)u(t) \ + bv(t)), Eq(diff(v(t),t,t), cu(t) + (d - dic[p]dic[s] + dic[q]2/4)v(t))]) sol1 = (msol1.rhssqrt(abs(eqz))).subs(t, Integral(1/eqz, t)) sol2 = (msol2.rhssqrt(abs(eqz))).subs(t, Integral(1/eqz, t)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type11(x, y, t, r, eq): r""" The equations which comes under this type are .. math:: x'' = f(t) (t x' - x) + g(t) (t y' - y) .. math:: y'' = h(t) (t x' - x) + p(t) (t y' - y) The transformation .. math:: u = t x' - x, v = t y' - y leads to the linear system of first-order equations .. math:: u' = t f(t) u + t g(t) v, v' = t h(t) u + t p(t) v On substituting the value of `u` and `v` in transformed equation gives value of `x` and `y` as .. math:: x = C_3 t + t \int \frac{u}{t^2} \,dt , y = C_4 t + t \int \frac{v}{t^2} \,dt. where `C_3` and `C_4` are arbitrary constants. """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) u, v = symbols('u, v', cls=Function) f = -r['c1'] ; g = -r['d1'] h = -r['c2'] ; p = -r['d2'] [msol1, msol2] = dsolve([Eq(diff(u(t),t), tfu(t) + tgv(t)), Eq(diff(v(t),t), thu(t) + tpv(t))]) sol1 = C3t + tIntegral(msol1.rhs/t*2, t) sol2 = C4t + tIntegral(msol2.rhs/t2, t) return [Eq(x(t), sol1), Eq(y(t), sol2)] def sysode_linear_3eq_order1(match_): x = match_['func'][0].func y = match_['func'][1].func z = match_['func'][2].func func = match_['func'] fc = match_['func_coeff'] eq = match_['eq'] r = dict() t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] for i in range(3): eqs = 0 for terms in Add.make_args(eq[i]): eqs += terms/fc[i,func[i],1] eq[i] = eqs # for equations: # Eq(g1diff(x(t),t), a1x(t)+b1y(t)+c1z(t)+d1), # Eq(g2diff(y(t),t), a2x(t)+b2y(t)+c2z(t)+d2), and # Eq(g3diff(z(t),t), a3x(t)+b3y(t)+c3z(t)+d3) r['a1'] = fc[0,x(t),0]/fc[0,x(t),1]; r['a2'] = fc[1,x(t),0]/fc[1,y(t),1]; r['a3'] = fc[2,x(t),0]/fc[2,z(t),1] r['b1'] = fc[0,y(t),0]/fc[0,x(t),1]; r['b2'] = fc[1,y(t),0]/fc[1,y(t),1]; r['b3'] = fc[2,y(t),0]/fc[2,z(t),1] r['c1'] = fc[0,z(t),0]/fc[0,x(t),1]; r['c2'] = fc[1,z(t),0]/fc[1,y(t),1]; r['c3'] = fc[2,z(t),0]/fc[2,z(t),1] for i in range(3): for j in Add.make_args(eq[i]): if not j.has(x(t), y(t), z(t)): raise NotImplementedError("Only homogeneous problems are supported, non-homogeneous are not supported currently.") if match_['type_of_equation'] == 'type1': sol = _linear_3eq_order1_type1(x, y, z, t, r, eq) if match_['type_of_equation'] == 'type2': sol = _linear_3eq_order1_type2(x, y, z, t, r, eq) if match_['type_of_equation'] == 'type3': sol = _linear_3eq_order1_type3(x, y, z, t, r, eq) if match_['type_of_equation'] == 'type4': sol = _linear_3eq_order1_type4(x, y, z, t, r, eq) if match_['type_of_equation'] == 'type6': sol = _linear_neq_order1_type1(match_) return sol def _linear_3eq_order1_type1(x, y, z, t, r, eq): r""" .. math:: x' = ax .. math:: y' = bx + cy .. math:: z' = dx + ky + pz Solution of such equations are forward substitution. Solving first equations gives the value of `x`, substituting it in second and third equation and solving second equation gives `y` and similarly substituting `y` in third equation give `z`. .. math:: x = C_1 e^{at} .. math:: y = \frac{b C_1}{a - c} e^{at} + C_2 e^{ct} .. math:: z = \frac{C_1}{a - p} (d + \frac{bk}{a - c}) e^{at} + \frac{k C_2}{c - p} e^{ct} + C_3 e^{pt} where `C_1, C_2` and `C_3` are arbitrary constants. """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) a = -r['a1']; b = -r['a2']; c = -r['b2'] d = -r['a3']; k = -r['b3']; p = -r['c3'] sol1 = C1exp(at) sol2 = bC1exp(at)/(a-c) + C2exp(ct) sol3 = C1(d+bk/(a-c))exp(at)/(a-p) + kC2exp(ct)/(c-p) + C3exp(pt) return [Eq(x(t), sol1), Eq(y(t), sol2), Eq(z(t), sol3)] def _linear_3eq_order1_type2(x, y, z, t, r, eq): r""" The equations of this type are .. math:: x' = cy - bz .. math:: y' = az - cx .. math:: z' = bx - ay 1. First integral: .. math:: ax + by + cz = A \qquad - (1) .. math:: x^2 + y^2 + z^2 = B^2 \qquad - (2) where `A` and `B` are arbitrary constants. It follows from these integrals that the integral lines are circles formed by the intersection of the planes `(1)` and sphere `(2)` 2. Solution: .. math:: x = a C_0 + k C_1 \cos(kt) + (c C_2 - b C_3) \sin(kt) .. math:: y = b C_0 + k C_2 \cos(kt) + (a C_2 - c C_3) \sin(kt) .. math:: z = c C_0 + k C_3 \cos(kt) + (b C_2 - a C_3) \sin(kt) where `k = \sqrt{a^2 + b^2 + c^2}` and the four constants of integration, `C_1,...,C_4` are constrained by a single relation, .. math:: a C_1 + b C_2 + c C_3 = 0 """ C0, C1, C2, C3 = get_numbered_constants(eq, num=4, start=0) a = -r['c2']; b = -r['a3']; c = -r['b1'] k = sqrt(a2 + b2 + c2) C3 = (-aC1 - bC2)/c sol1 = aC0 + kC1cos(kt) + (cC2-bC3)sin(kt) sol2 = bC0 + kC2cos(kt) + (aC3-cC1)sin(kt) sol3 = cC0 + kC3cos(kt) + (bC1-aC2)sin(kt) return [Eq(x(t), sol1), Eq(y(t), sol2), Eq(z(t), sol3)] def _linear_3eq_order1_type3(x, y, z, t, r, eq): r""" Equations of this system of ODEs .. math:: a x' = bc (y - z) .. math:: b y' = ac (z - x) .. math:: c z' = ab (x - y) 1. First integral: .. math:: a^2 x + b^2 y + c^2 z = A where A is an arbitrary constant. It follows that the integral lines are plane curves. 2. Solution: .. math:: x = C_0 + k C_1 \cos(kt) + a^{-1} bc (C_2 - C_3) \sin(kt) .. math:: y = C_0 + k C_2 \cos(kt) + a b^{-1} c (C_3 - C_1) \sin(kt) .. math:: z = C_0 + k C_3 \cos(kt) + ab c^{-1} (C_1 - C_2) \sin(kt) where `k = \sqrt{a^2 + b^2 + c^2}` and the four constants of integration, `C_1,...,C_4` are constrained by a single relation .. math:: a^2 C_1 + b^2 C_2 + c^2 C_3 = 0 """ C0, C1, C2, C3 = get_numbered_constants(eq, num=4, start=0) c = sqrt(r['b1']r['c2']) b = sqrt(r['b1']r['a3']) a = sqrt(r['c2']r['a3']) C3 = (-a*2C1-b*2C2)/c2 k = sqrt(a2 + b2 + c2) sol1 = C0 + kC1cos(kt) + a-1bc(C2-C3)sin(kt) sol2 = C0 + kC2cos(kt) + ab*-1c(C3-C1)sin(kt) sol3 = C0 + kC3cos(kt) + abc*-1(C1-C2)sin(kt) return [Eq(x(t), sol1), Eq(y(t), sol2), Eq(z(t), sol3)] def _linear_3eq_order1_type4(x, y, z, t, r, eq): r""" Equations: .. math:: x' = (a_1 f(t) + g(t)) x + a_2 f(t) y + a_3 f(t) z .. math:: y' = b_1 f(t) x + (b_2 f(t) + g(t)) y + b_3 f(t) z .. math:: z' = c_1 f(t) x + c_2 f(t) y + (c_3 f(t) + g(t)) z The transformation .. math:: x = e^{\int g(t) \,dt} u, y = e^{\int g(t) \,dt} v, z = e^{\int g(t) \,dt} w, \tau = \int f(t) \,dt leads to the system of constant coefficient linear differential equations .. math:: u' = a_1 u + a_2 v + a_3 w .. math:: v' = b_1 u + b_2 v + b_3 w .. math:: w' = c_1 u + c_2 v + c_3 w These system of equations are solved by homogeneous linear system of constant coefficients of `n` equations of first order. Then substituting the value of `u, v` and `w` in transformed equation gives value of `x, y` and `z`. """ u, v, w = symbols('u, v, w', cls=Function) a2, a3 = cancel(r['b1']/r['c1']).as_numer_denom() f = cancel(r['b1']/a2) b1 = cancel(r['a2']/f); b3 = cancel(r['c2']/f) c1 = cancel(r['a3']/f); c2 = cancel(r['b3']/f) a1, g = div(r['a1'],f) b2 = div(r['b2'],f)[0] c3 = div(r['c3'],f)[0] trans_eq = (diff(u(t),t)-a1u(t)-a2v(t)-a3w(t), diff(v(t),t)-b1u(t)-\ b2v(t)-b3w(t), diff(w(t),t)-c1u(t)-c2v(t)-c3w(t)) sol = dsolve(trans_eq) sol1 = exp(Integral(g,t))((sol[0].rhs).subs(t, Integral(f,t))) sol2 = exp(Integral(g,t))((sol[1].rhs).subs(t, Integral(f,t))) sol3 = exp(Integral(g,t))((sol[2].rhs).subs(t, Integral(f,t))) return [Eq(x(t), sol1), Eq(y(t), sol2), Eq(z(t), sol3)] def sysode_linear_neq_order1(match_): sol = _linear_neq_order1_type1(match_) return sol def _linear_neq_order1_type1(match_): r""" System of n first-order constant-coefficient linear nonhomogeneous differential equation .. math:: y'_k = a_{k1} y_1 + a_{k2} y_2 +...+ a_{kn} y_n; k = 1,2,...,n or that can be written as `\vec{y'} = A . \vec{y}` where `\vec{y}` is matrix of `y_k` for `k = 1,2,...n` and `A` is a `n \times n` matrix. Since these equations are equivalent to a first order homogeneous linear differential equation. So the general solution will contain `n` linearly independent parts and solution will consist some type of exponential functions. Assuming `y = \vec{v} e^{rt}` is a solution of the system where `\vec{v}` is a vector of coefficients of `y_1,...,y_n`. Substituting `y` and `y' = r v e^{r t}` into the equation `\vec{y'} = A . \vec{y}`, we get .. math:: r \vec{v} e^{rt} = A \vec{v} e^{rt} .. math:: r \vec{v} = A \vec{v} where `r` comes out to be eigenvalue of `A` and vector `\vec{v}` is the eigenvector of `A` corresponding to `r`. There are three possibilities of eigenvalues of `A` - `n` distinct real eigenvalues - complex conjugate eigenvalues - eigenvalues with multiplicity `k` 1. When all eigenvalues `r_1,..,r_n` are distinct with `n` different eigenvectors `v_1,...v_n` then the solution is given by .. math:: \vec{y} = C_1 e^{r_1 t} \vec{v_1} + C_2 e^{r_2 t} \vec{v_2} +...+ C_n e^{r_n t} \vec{v_n} where `C_1,C_2,...,C_n` are arbitrary constants. 2. When some eigenvalues are complex then in order to make the solution real, we take a linear combination: if `r = a + bi` has an eigenvector `\vec{v} = \vec{w_1} + i \vec{w_2}` then to obtain real-valued solutions to the system, replace the complex-valued solutions `e^{rx} \vec{v}` with real-valued solution `e^{ax} (\vec{w_1} \cos(bx) - \vec{w_2} \sin(bx))` and for `r = a - bi` replace the solution `e^{-r x} \vec{v}` with `e^{ax} (\vec{w_1} \sin(bx) + \vec{w_2} \cos(bx))` 3. If some eigenvalues are repeated. Then we get fewer than `n` linearly independent eigenvectors, we miss some of the solutions and need to construct the missing ones. We do this via generalized eigenvectors, vectors which are not eigenvectors but are close enough that we can use to write down the remaining solutions. For a eigenvalue `r` with eigenvector `\vec{w}` we obtain `\vec{w_2},...,\vec{w_k}` using .. math:: (A - r I) . \vec{w_2} = \vec{w} .. math:: (A - r I) . \vec{w_3} = \vec{w_2} .. math:: \vdots .. math:: (A - r I) . \vec{w_k} = \vec{w_{k-1}} Then the solutions to the system for the eigenspace are `e^{rt} [\vec{w}], e^{rt} [t \vec{w} + \vec{w_2}], e^{rt} [\frac{t^2}{2} \vec{w} + t \vec{w_2} + \vec{w_3}], ...,e^{rt} [\frac{t^{k-1}}{(k-1)!} \vec{w} + \frac{t^{k-2}}{(k-2)!} \vec{w_2} +...+ t \vec{w_{k-1}} + \vec{w_k}]` So, If `\vec{y_1},...,\vec{y_n}` are `n` solution of obtained from three categories of `A`, then general solution to the system `\vec{y'} = A . \vec{y}` .. math:: \vec{y} = C_1 \vec{y_1} + C_2 \vec{y_2} + \cdots + C_n \vec{y_n} """ eq = match_['eq'] func = match_['func'] fc = match_['func_coeff'] n = len(eq) t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] constants = numbered_symbols(prefix='C', cls=Symbol, start=1) M = Matrix(n,n,lambda i,j:-fc[i,func[j],0]) evector = M.eigenvects(simplify=True) def is_complex(mat, root): return Matrix(n, 1, lambda i,j: re(mat[i])cos(im(root)t) - im(mat[i])sin(im(root)t)) def is_complex_conjugate(mat, root): return Matrix(n, 1, lambda i,j: re(mat[i])sin(abs(im(root))t) + im(mat[i])cos(im(root)t)abs(im(root))/im(root)) conjugate_root = [] e_vector = zeros(n,1) for evects in evector: if evects[0] not in conjugate_root: # If number of column of an eigenvector is not equal to the multiplicity # of its eigenvalue then the legt eigenvectors are calculated if len(evects[2])!=evects[1]: var_mat = Matrix(n, 1, lambda i,j: Symbol('x'+str(i))) Mnew = (M - evects[0]eye(evects[2][-1].rows))var_mat w = [0 for i in range(evects[1])] w[0] = evects[2][-1] for r in range(1, evects[1]): w_ = Mnew - w[r-1] sol_dict = solve(list(w_), var_mat[1:]) sol_dict[var_mat[0]] = var_mat[0] for key, value in sol_dict.items(): sol_dict[key] = value.subs(var_mat[0],1) w[r] = Matrix(n, 1, lambda i,j: sol_dict[var_mat[i]]) evects[2].append(w[r]) for i in range(evects[1]): C = next(constants) for j in range(i+1): if evects[0].has(I): evects[2][j] = simplify(evects[2][j]) e_vector += Cis_complex(evects[2][j], evects[0])t(i-j)exp(re(evects[0])t)/factorial(i-j) C = next(constants) e_vector += Cis_complex_conjugate(evects[2][j], evects[0])t(i-j)exp(re(evects[0])t)/factorial(i-j) else: e_vector += Cevects[2][j]t(i-j)exp(evects[0]t)/factorial(i-j) if evects[0].has(I): conjugate_root.append(conjugate(evects[0])) sol = [] for i in range(len(eq)): sol.append(Eq(func[i],e_vector[i])) return sol def sysode_nonlinear_2eq_order1(match_): func = match_['func'] eq = match_['eq'] fc = match_['func_coeff'] t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] if match_['type_of_equation'] == 'type5': sol = _nonlinear_2eq_order1_type5(func, t, eq) return sol x = func[0].func y = func[1].func for i in range(2): eqs = 0 for terms in Add.make_args(eq[i]): eqs += terms/fc[i,func[i],1] eq[i] = eqs if match_['type_of_equation'] == 'type1': sol = _nonlinear_2eq_order1_type1(x, y, t, eq) elif match_['type_of_equation'] == 'type2': sol = _nonlinear_2eq_order1_type2(x, y, t, eq) elif match_['type_of_equation'] == 'type3': sol = _nonlinear_2eq_order1_type3(x, y, t, eq) elif match_['type_of_equation'] == 'type4': sol = _nonlinear_2eq_order1_type4(x, y, t, eq) return sol def _nonlinear_2eq_order1_type1(x, y, t, eq): r""" Equations: .. math:: x' = x^n F(x,y) .. math:: y' = g(y) F(x,y) Solution: .. math:: x = \varphi(y), \int \frac{1}{g(y) F(\varphi(y),y)} \,dy = t + C_2 where if `n \neq 1` .. math:: \varphi = [C_1 + (1-n) \int \frac{1}{g(y)} \,dy]^{\frac{1}{1-n}} if `n = 1` .. math:: \varphi = C_1 e^{\int \frac{1}{g(y)} \,dy} where `C_1` and `C_2` are arbitrary constants. """ C1, C2 = get_numbered_constants(eq, num=2) n = Wild('n', exclude=[x(t),y(t)]) f = Wild('f') u, v = symbols('u, v') r = eq[0].match(diff(x(t),t) - x(t)nf) g = ((diff(y(t),t) - eq[1])/r[f]).subs(y(t),v) F = r[f].subs(x(t),u).subs(y(t),v) n = r[n] if n!=1: phi = (C1 + (1-n)Integral(1/g, v))(1/(1-n)) else: phi = C1exp(Integral(1/g, v)) phi = phi.doit() sol2 = solve(Integral(1/(gF.subs(u,phi)), v).doit() - t - C2, v) sol = [] for sols in sol2: sol.append(Eq(x(t),phi.subs(v, sols))) sol.append(Eq(y(t), sols)) return sol def _nonlinear_2eq_order1_type2(x, y, t, eq): r""" Equations: .. math:: x' = e^{\lambda x} F(x,y) .. math:: y' = g(y) F(x,y) Solution: .. math:: x = \varphi(y), \int \frac{1}{g(y) F(\varphi(y),y)} \,dy = t + C_2 where if `\lambda \neq 0` .. math:: \varphi = -\frac{1}{\lambda} log(C_1 - \lambda \int \frac{1}{g(y)} \,dy) if `\lambda = 0` .. math:: \varphi = C_1 + \int \frac{1}{g(y)} \,dy where `C_1` and `C_2` are arbitrary constants. """ C1, C2 = get_numbered_constants(eq, num=2) n = Wild('n', exclude=[x(t),y(t)]) f = Wild('f') u, v = symbols('u, v') r = eq[0].match(diff(x(t),t) - exp(nx(t))f) g = ((diff(y(t),t) - eq[1])/r[f]).subs(y(t),v) F = r[f].subs(x(t),u).subs(y(t),v) n = r[n] if n: phi = -1/nlog(C1 - nIntegral(1/g, v)) else: phi = C1 + Integral(1/g, v) phi = phi.doit() sol2 = solve(Integral(1/(gF.subs(u,phi)), v).doit() - t - C2, v) sol = [] for sols in sol2: sol.append(Eq(x(t),phi.subs(v, sols))) sol.append(Eq(y(t), sols)) return sol def _nonlinear_2eq_order1_type3(x, y, t, eq): r""" Autonomous system of general form .. math:: x' = F(x,y) .. math:: y' = G(x,y) Assuming `y = y(x, C_1)` where `C_1` is an arbitrary constant is the general solution of the first-order equation .. math:: F(x,y) y'_x = G(x,y) Then the general solution of the original system of equations has the form .. math:: \int \frac{1}{F(x,y(x,C_1))} \,dx = t + C_1 """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) v = Function('v') u = Symbol('u') f = Wild('f') g = Wild('g') r1 = eq[0].match(diff(x(t),t) - f) r2 = eq[1].match(diff(y(t),t) - g) F = r1[f].subs(x(t), u).subs(y(t), v(u)) G = r2[g].subs(x(t), u).subs(y(t), v(u)) sol2r = dsolve(Eq(diff(v(u), u), G/F)) for sol2s in sol2r: sol1 = solve(Integral(1/F.subs(v(u), sol2s.rhs), u).doit() - t - C2, u) sol = [] for sols in sol1: sol.append(Eq(x(t), sols)) sol.append(Eq(y(t), (sol2s.rhs).subs(u, sols))) return sol def _nonlinear_2eq_order1_type4(x, y, t, eq): r""" Equation: .. math:: x' = f_1(x) g_1(y) \phi(x,y,t) .. math:: y' = f_2(x) g_2(y) \phi(x,y,t) First integral: .. math:: \int \frac{f_2(x)}{f_1(x)} \,dx - \int \frac{g_1(y)}{g_2(y)} \,dy = C where `C` is an arbitrary constant. On solving the first integral for `x` (resp., `y` ) and on substituting the resulting expression into either equation of the original solution, one arrives at a first-order equation for determining `y` (resp., `x` ). """ C1, C2 = get_numbered_constants(eq, num=2) u, v = symbols('u, v') U, V = symbols('U, V', cls=Function) f = Wild('f') g = Wild('g') f1 = Wild('f1', exclude=[v,t]) f2 = Wild('f2', exclude=[v,t]) g1 = Wild('g1', exclude=[u,t]) g2 = Wild('g2', exclude=[u,t]) r1 = eq[0].match(diff(x(t),t) - f) r2 = eq[1].match(diff(y(t),t) - g) num, den = ( (r1[f].subs(x(t),u).subs(y(t),v))/ (r2[g].subs(x(t),u).subs(y(t),v))).as_numer_denom() R1 = num.match(f1g1) R2 = den.match(f2g2) phi = (r1[f].subs(x(t),u).subs(y(t),v))/num F1 = R1[f1]; F2 = R2[f2] G1 = R1[g1]; G2 = R2[g2] sol1r = solve(Integral(F2/F1, u).doit() - Integral(G1/G2,v).doit() - C1, u) sol2r = solve(Integral(F2/F1, u).doit() - Integral(G1/G2,v).doit() - C1, v) sol = [] for sols in sol1r: sol.append(Eq(y(t), dsolve(diff(V(t),t) - F2.subs(u,sols).subs(v,V(t))G2.subs(v,V(t))phi.subs(u,sols).subs(v,V(t))).rhs)) for sols in sol2r: sol.append(Eq(x(t), dsolve(diff(U(t),t) - F1.subs(u,U(t))G1.subs(v,sols).subs(u,U(t))phi.subs(v,sols).subs(u,U(t))).rhs)) return set(sol) def _nonlinear_2eq_order1_type5(func, t, eq): r""" Clairaut system of ODEs .. math:: x = t x' + F(x',y') .. math:: y = t y' + G(x',y') The following are solutions of the system `(i)` straight lines: .. math:: x = C_1 t + F(C_1, C_2), y = C_2 t + G(C_1, C_2) where `C_1` and `C_2` are arbitrary constants; `(ii)` envelopes of the above lines; `(iii)` continuously differentiable lines made up from segments of the lines `(i)` and `(ii)`. """ C1, C2 = get_numbered_constants(eq, num=2) f = Wild('f') g = Wild('g') def check_type(x, y): r1 = eq[0].match(tdiff(x(t),t) - x(t) + f) r2 = eq[1].match(tdiff(y(t),t) - y(t) + g) if not (r1 and r2): r1 = eq[0].match(diff(x(t),t) - x(t)/t + f/t) r2 = eq[1].match(diff(y(t),t) - y(t)/t + g/t) if not (r1 and r2): r1 = (-eq[0]).match(tdiff(x(t),t) - x(t) + f) r2 = (-eq[1]).match(tdiff(y(t),t) - y(t) + g) if not (r1 and r2): r1 = (-eq[0]).match(diff(x(t),t) - x(t)/t + f/t) r2 = (-eq[1]).match(diff(y(t),t) - y(t)/t + g/t) return [r1, r2] for func_ in func: if isinstance(func_, list): x = func[0][0].func y = func[0][1].func [r1, r2] = check_type(x, y) if not (r1 and r2): [r1, r2] = check_type(y, x) x, y = y, x x1 = diff(x(t),t); y1 = diff(y(t),t) return {Eq(x(t), C1t + r1[f].subs(x1,C1).subs(y1,C2)), Eq(y(t), C2t + r2[g].subs(x1,C1).subs(y1,C2))} def sysode_nonlinear_3eq_order1(match_): x = match_['func'][0].func y = match_['func'][1].func z = match_['func'][2].func eq = match_['eq'] t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] if match_['type_of_equation'] == 'type1': sol = _nonlinear_3eq_order1_type1(x, y, z, t, eq) if match_['type_of_equation'] == 'type2': sol = _nonlinear_3eq_order1_type2(x, y, z, t, eq) if match_['type_of_equation'] == 'type3': sol = _nonlinear_3eq_order1_type3(x, y, z, t, eq) if match_['type_of_equation'] == 'type4': sol = _nonlinear_3eq_order1_type4(x, y, z, t, eq) if match_['type_of_equation'] == 'type5': sol = _nonlinear_3eq_order1_type5(x, y, z, t, eq) return sol def _nonlinear_3eq_order1_type1(x, y, z, t, eq): r""" Equations: .. math:: a x' = (b - c) y z, \enspace b y' = (c - a) z x, \enspace c z' = (a - b) x y First Integrals: .. math:: a x^{2} + b y^{2} + c z^{2} = C_1 .. math:: a^{2} x^{2} + b^{2} y^{2} + c^{2} z^{2} = C_2 where `C_1` and `C_2` are arbitrary constants. On solving the integrals for `y` and `z` and on substituting the resulting expressions into the first equation of the system, we arrives at a separable first-order equation on `x`. Similarly doing that for other two equations, we will arrive at first order equation on `y` and `z` too. References ========== -http://eqworld.ipmnet.ru/en/solutions/sysode/sode0401.pdf """ C1, C2 = get_numbered_constants(eq, num=2) u, v, w = symbols('u, v, w') p = Wild('p', exclude=[x(t), y(t), z(t), t]) q = Wild('q', exclude=[x(t), y(t), z(t), t]) s = Wild('s', exclude=[x(t), y(t), z(t), t]) r = (diff(x(t),t) - eq[0]).match(py(t)z(t)) r.update((diff(y(t),t) - eq[1]).match(qz(t)x(t))) r.update((diff(z(t),t) - eq[2]).match(sx(t)y(t))) n1, d1 = r[p].as_numer_denom() n2, d2 = r[q].as_numer_denom() n3, d3 = r[s].as_numer_denom() val = solve([n1u-d1v+d1w, d2u+n2v-d2w, d3u-d3v-n3w],[u,v]) vals = [val[v], val[u]] c = lcm(vals[0].as_numer_denom()[1], vals[1].as_numer_denom()[1]) b = vals[0].subs(w, c) a = vals[1].subs(w, c) y_x = sqrt(((cC1-C2) - a(c-a)x(t)*2)/(b(c-b))) z_x = sqrt(((bC1-C2) - a(b-a)x(t)2)/(c(b-c))) z_y = sqrt(((aC1-C2) - b(a-b)y(t)2)/(c(a-c))) x_y = sqrt(((cC1-C2) - b(c-b)y(t)2)/(a(c-a))) x_z = sqrt(((bC1-C2) - c(b-c)z(t)2)/(a(b-a))) y_z = sqrt(((aC1-C2) - c(a-c)z(t)2)/(b(a-b))) sol1 = dsolve(adiff(x(t),t) - (b-c)y_xz_x) sol2 = dsolve(bdiff(y(t),t) - (c-a)z_yx_y) sol3 = dsolve(cdiff(z(t),t) - (a-b)x_zy_z) return [sol1, sol2, sol3] def _nonlinear_3eq_order1_type2(x, y, z, t, eq): r""" Equations: .. math:: a x' = (b - c) y z f(x, y, z, t) .. math:: b y' = (c - a) z x f(x, y, z, t) .. math:: c z' = (a - b) x y f(x, y, z, t) First Integrals: .. math:: a x^{2} + b y^{2} + c z^{2} = C_1 .. math:: a^{2} x^{2} + b^{2} y^{2} + c^{2} z^{2} = C_2 where `C_1` and `C_2` are arbitrary constants. On solving the integrals for `y` and `z` and on substituting the resulting expressions into the first equation of the system, we arrives at a first-order differential equations on `x`. Similarly doing that for other two equations we will arrive at first order equation on `y` and `z`. References ========== -http://eqworld.ipmnet.ru/en/solutions/sysode/sode0402.pdf """ C1, C2 = get_numbered_constants(eq, num=2) u, v, w = symbols('u, v, w') p = Wild('p', exclude=[x(t), y(t), z(t), t]) q = Wild('q', exclude=[x(t), y(t), z(t), t]) s = Wild('s', exclude=[x(t), y(t), z(t), t]) f = Wild('f') r1 = (diff(x(t),t) - eq[0]).match(y(t)z(t)f) r = collect_const(r1[f]).match(pf) r.update(((diff(y(t),t) - eq[1])/r[f]).match(qz(t)x(t))) r.update(((diff(z(t),t) - eq[2])/r[f]).match(sx(t)y(t))) n1, d1 = r[p].as_numer_denom() n2, d2 = r[q].as_numer_denom() n3, d3 = r[s].as_numer_denom() val = solve([n1u-d1v+d1w, d2u+n2v-d2w, -d3u+d3v+n3w],[u,v]) vals = [val[v], val[u]] c = lcm(vals[0].as_numer_denom()[1], vals[1].as_numer_denom()[1]) a = vals[0].subs(w, c) b = vals[1].subs(w, c) y_x = sqrt(((cC1-C2) - a(c-a)x(t)*2)/(b(c-b))) z_x = sqrt(((bC1-C2) - a(b-a)x(t)2)/(c(b-c))) z_y = sqrt(((aC1-C2) - b(a-b)y(t)2)/(c(a-c))) x_y = sqrt(((cC1-C2) - b(c-b)y(t)2)/(a(c-a))) x_z = sqrt(((bC1-C2) - c(b-c)z(t)2)/(a(b-a))) y_z = sqrt(((aC1-C2) - c(a-c)z(t)2)/(b(a-b))) sol1 = dsolve(adiff(x(t),t) - (b-c)y_xz_xr[f]) sol2 = dsolve(bdiff(y(t),t) - (c-a)z_yx_yr[f]) sol3 = dsolve(cdiff(z(t),t) - (a-b)x_zy_zr[f]) return [sol1, sol2, sol3] def _nonlinear_3eq_order1_type3(x, y, z, t, eq): r""" Equations: .. math:: x' = c F_2 - b F_3, \enspace y' = a F_3 - c F_1, \enspace z' = b F_1 - a F_2 where `F_n = F_n(x, y, z, t)`. 1. First Integral: .. math:: a x + b y + c z = C_1, where C is an arbitrary constant. 2. If we assume function `F_n` to be independent of `t`,i.e, `F_n` = `F_n (x, y, z)` Then, on eliminating `t` and `z` from the first two equation of the system, one arrives at the first-order equation .. math:: \frac{dy}{dx} = \frac{a F_3 (x, y, z) - c F_1 (x, y, z)}{c F_2 (x, y, z) - b F_3 (x, y, z)} where `z = \frac{1}{c} (C_1 - a x - b y)` References ========== -http://eqworld.ipmnet.ru/en/solutions/sysode/sode0404.pdf """ C1 = get_numbered_constants(eq, num=1) u, v, w = symbols('u, v, w') p = Wild('p', exclude=[x(t), y(t), z(t), t]) q = Wild('q', exclude=[x(t), y(t), z(t), t]) s = Wild('s', exclude=[x(t), y(t), z(t), t]) F1, F2, F3 = symbols('F1, F2, F3', cls=Wild) r1 = (diff(x(t), t) - eq[0]).match(F2-F3) r = collect_const(r1[F2]).match(sF2) r.update(collect_const(r1[F3]).match(qF3)) if eq[1].has(r[F2]) and not eq[1].has(r[F3]): r[F2], r[F3] = r[F3], r[F2] r[s], r[q] = -r[q], -r[s] r.update((diff(y(t), t) - eq[1]).match(pr[F3] - r[s]F1)) a = r[p]; b = r[q]; c = r[s] F1 = r[F1].subs(x(t), u).subs(y(t),v).subs(z(t), w) F2 = r[F2].subs(x(t), u).subs(y(t),v).subs(z(t), w) F3 = r[F3].subs(x(t), u).subs(y(t),v).subs(z(t), w) z_xy = (C1-au-bv)/c y_zx = (C1-au-cw)/b x_yz = (C1-bv-cw)/a y_x = dsolve(diff(v(u),u) - ((aF3-cF1)/(cF2-bF3)).subs(w,z_xy).subs(v,v(u))).rhs z_x = dsolve(diff(w(u),u) - ((bF1-aF2)/(cF2-bF3)).subs(v,y_zx).subs(w,w(u))).rhs z_y = dsolve(diff(w(v),v) - ((bF1-aF2)/(aF3-cF1)).subs(u,x_yz).subs(w,w(v))).rhs x_y = dsolve(diff(u(v),v) - ((cF2-bF3)/(aF3-cF1)).subs(w,z_xy).subs(u,u(v))).rhs y_z = dsolve(diff(v(w),w) - ((aF3-cF1)/(bF1-aF2)).subs(u,x_yz).subs(v,v(w))).rhs x_z = dsolve(diff(u(w),w) - ((cF2-bF3)/(bF1-aF2)).subs(v,y_zx).subs(u,u(w))).rhs sol1 = dsolve(diff(u(t),t) - (cF2 - bF3).subs(v,y_x).subs(w,z_x).subs(u,u(t))).rhs sol2 = dsolve(diff(v(t),t) - (aF3 - cF1).subs(u,x_y).subs(w,z_y).subs(v,v(t))).rhs sol3 = dsolve(diff(w(t),t) - (bF1 - aF2).subs(u,x_z).subs(v,y_z).subs(w,w(t))).rhs return [sol1, sol2, sol3] def _nonlinear_3eq_order1_type4(x, y, z, t, eq): r""" Equations: .. math:: x' = c z F_2 - b y F_3, \enspace y' = a x F_3 - c z F_1, \enspace z' = b y F_1 - a x F_2 where `F_n = F_n (x, y, z, t)` 1. First integral: .. math:: a x^{2} + b y^{2} + c z^{2} = C_1 where `C` is an arbitrary constant. 2. Assuming the function `F_n` is independent of `t`: `F_n = F_n (x, y, z)`. Then on eliminating `t` and `z` from the first two equations of the system, one arrives at the first-order equation .. math:: \frac{dy}{dx} = \frac{a x F_3 (x, y, z) - c z F_1 (x, y, z)} {c z F_2 (x, y, z) - b y F_3 (x, y, z)} where `z = \pm \sqrt{\frac{1}{c} (C_1 - a x^{2} - b y^{2})}` References ========== -http://eqworld.ipmnet.ru/en/solutions/sysode/sode0405.pdf """ C1 = get_numbered_constants(eq, num=1) u, v, w = symbols('u, v, w') p = Wild('p', exclude=[x(t), y(t), z(t), t]) q = Wild('q', exclude=[x(t), y(t), z(t), t]) s = Wild('s', exclude=[x(t), y(t), z(t), t]) F1, F2, F3 = symbols('F1, F2, F3', cls=Wild) r1 = eq[0].match(diff(x(t),t) - z(t)F2 + y(t)F3) r = collect_const(r1[F2]).match(sF2) r.update(collect_const(r1[F3]).match(qF3)) if eq[1].has(r[F2]) and not eq[1].has(r[F3]): r[F2], r[F3] = r[F3], r[F2] r[s], r[q] = -r[q], -r[s] r.update((diff(y(t),t) - eq[1]).match(px(t)r[F3] - r[s]z(t)F1)) a = r[p]; b = r[q]; c = r[s] F1 = r[F1].subs(x(t),u).subs(y(t),v).subs(z(t),w) F2 = r[F2].subs(x(t),u).subs(y(t),v).subs(z(t),w) F3 = r[F3].subs(x(t),u).subs(y(t),v).subs(z(t),w) x_yz = sqrt((C1 - bv2 - cw*2)/a) y_zx = sqrt((C1 - cw*2 - au*2)/b) z_xy = sqrt((C1 - au*2 - bv*2)/c) y_x = dsolve(diff(v(u),u) - ((auF3-cwF1)/(cwF2-bvF3)).subs(w,z_xy).subs(v,v(u))).rhs z_x = dsolve(diff(w(u),u) - ((bvF1-auF2)/(cwF2-bvF3)).subs(v,y_zx).subs(w,w(u))).rhs z_y = dsolve(diff(w(v),v) - ((bvF1-auF2)/(auF3-cwF1)).subs(u,x_yz).subs(w,w(v))).rhs x_y = dsolve(diff(u(v),v) - ((cwF2-bvF3)/(auF3-cwF1)).subs(w,z_xy).subs(u,u(v))).rhs y_z = dsolve(diff(v(w),w) - ((auF3-cwF1)/(bvF1-auF2)).subs(u,x_yz).subs(v,v(w))).rhs x_z = dsolve(diff(u(w),w) - ((cwF2-bvF3)/(bvF1-auF2)).subs(v,y_zx).subs(u,u(w))).rhs sol1 = dsolve(diff(u(t),t) - (cwF2 - bvF3).subs(v,y_x).subs(w,z_x).subs(u,u(t))).rhs sol2 = dsolve(diff(v(t),t) - (auF3 - cwF1).subs(u,x_y).subs(w,z_y).subs(v,v(t))).rhs sol3 = dsolve(diff(w(t),t) - (bvF1 - auF2).subs(u,x_z).subs(v,y_z).subs(w,w(t))).rhs return [sol1, sol2, sol3] def _nonlinear_3eq_order1_type5(x, y, z, t, eq): r""" .. math:: x' = x (c F_2 - b F_3), \enspace y' = y (a F_3 - c F_1), \enspace z' = z (b F_1 - a F_2) where `F_n = F_n (x, y, z, t)` and are arbitrary functions. First Integral: .. math:: \left\|x\right\|^{a} \left\|y\right\|^{b} \left\|z\right\|^{c} = C_1 where `C` is an arbitrary constant. If the function `F_n` is independent of `t`, then, by eliminating `t` and `z` from the first two equations of the system, one arrives at a first-order equation. References ========== -http://eqworld.ipmnet.ru/en/solutions/sysode/sode0406.pdf """ C1 = get_numbered_constants(eq, num=1) u, v, w = symbols('u, v, w') p = Wild('p', exclude=[x(t), y(t), z(t), t]) q = Wild('q', exclude=[x(t), y(t), z(t), t]) s = Wild('s', exclude=[x(t), y(t), z(t), t]) F1, F2, F3 = symbols('F1, F2, F3', cls=Wild) r1 = eq[0].match(diff(x(t), t) - x(t)(F2 - F3)) r = collect_const(r1[F2]).match(sF2) r.update(collect_const(r1[F3]).match(qF3)) if eq[1].has(r[F2]) and not eq[1].has(r[F3]): r[F2], r[F3] = r[F3], r[F2] r[s], r[q] = -r[q], -r[s] r.update((diff(y(t), t) - eq[1]).match(y(t)(pr[F3] - r[s]F1))) a = r[p]; b = r[q]; c = r[s] F1 = r[F1].subs(x(t), u).subs(y(t), v).subs(z(t), w) F2 = r[F2].subs(x(t), u).subs(y(t), v).subs(z(t), w) F3 = r[F3].subs(x(t), u).subs(y(t), v).subs(z(t), w) x_yz = (C1v*-bw-c)-a y_zx = (C1w-cu-a)-b z_xy = (C1u-av-b)-c y_x = dsolve(diff(v(u), u) - ((v(aF3 - cF1))/(u(cF2 - bF3))).subs(w, z_xy).subs(v, v(u))).rhs z_x = dsolve(diff(w(u), u) - ((w(bF1 - aF2))/(u(cF2 - bF3))).subs(v, y_zx).subs(w, w(u))).rhs z_y = dsolve(diff(w(v), v) - ((w(bF1 - aF2))/(v(aF3 - cF1))).subs(u, x_yz).subs(w, w(v))).rhs x_y = dsolve(diff(u(v), v) - ((u(cF2 - bF3))/(v(aF3 - cF1))).subs(w, z_xy).subs(u, u(v))).rhs y_z = dsolve(diff(v(w), w) - ((v(aF3 - cF1))/(w(bF1 - aF2))).subs(u, x_yz).subs(v, v(w))).rhs x_z = dsolve(diff(u(w), w) - ((u(cF2 - bF3))/(w(bF1 - aF2))).subs(v, y_zx).subs(u, u(w))).rhs sol1 = dsolve(diff(u(t), t) - (u(cF2 - bF3)).subs(v, y_x).subs(w, z_x).subs(u, u(t))).rhs sol2 = dsolve(diff(v(t), t) - (v(aF3 - cF1)).subs(u, x_y).subs(w, z_y).subs(v, v(t))).rhs sol3 = dsolve(diff(w(t), t) - (w(bF1 - a*F2)).subs(u, x_z).subs(v, y_z).subs(w, w(t))).rhs return [sol1, sol2, sol3]
571ba5d67f3bc76b5f145794678ba908c30ea0a9792af624aeb6eff5beb5d2fb	from __future__ import print_function, division from sympy.core.add import Add from sympy.core.compatibility import as_int, is_sequence, range from sympy.core.exprtools import factor_terms from sympy.core.function import _mexpand from sympy.core.mul import Mul from sympy.core.numbers import Rational from sympy.core.numbers import igcdex, ilcm, igcd from sympy.core.power import integer_nthroot, isqrt from sympy.core.relational import Eq from sympy.core.singleton import S from sympy.core.symbol import Symbol, symbols from sympy.functions.elementary.complexes import sign from sympy.functions.elementary.integers import floor from sympy.functions.elementary.miscellaneous import sqrt from sympy.matrices.dense import MutableDenseMatrix as Matrix from sympy.ntheory.factor_ import ( divisors, factorint, multiplicity, perfect_power) from sympy.ntheory.generate import nextprime from sympy.ntheory.primetest import is_square, isprime from sympy.ntheory.residue_ntheory import sqrt_mod from sympy.polys.polyerrors import GeneratorsNeeded from sympy.polys.polytools import Poly, factor_list from sympy.simplify.simplify import signsimp from sympy.solvers.solvers import check_assumptions from sympy.solvers.solveset import solveset_real from sympy.utilities import default_sort_key, numbered_symbols from sympy.utilities.misc import filldedent # these are imported with 'from sympy.solvers.diophantine import * __all__ = ['diophantine', 'classify_diop'] # these types are known (but not necessarily handled) diop_known = { "binary_quadratic", "cubic_thue", "general_pythagorean", "general_sum_of_even_powers", "general_sum_of_squares", "homogeneous_general_quadratic", "homogeneous_ternary_quadratic", "homogeneous_ternary_quadratic_normal", "inhomogeneous_general_quadratic", "inhomogeneous_ternary_quadratic", "linear", "univariate"} def _is_int(i): try: as_int(i) return True except ValueError: pass def _sorted_tuple(i): return tuple(sorted(i)) def _remove_gcd(x): try: g = igcd(x) return tuple([i//g for i in x]) except ValueError: return x except TypeError: raise TypeError('_remove_gcd(a,b,c) or _remove_gcd(container)') def _rational_pq(a, b): # return `(numer, denom)` for a/b; sign in numer and gcd removed return _remove_gcd(sign(b)a, abs(b)) def _nint_or_floor(p, q): # return nearest int to p/q; in case of tie return floor(p/q) w, r = divmod(p, q) if abs(r) <= abs(q)//2: return w return w + 1 def _odd(i): return i % 2 != 0 def _even(i): return i % 2 == 0 def diophantine(eq, param=symbols("t", integer=True), syms=None, permute=False): """ Simplify the solution procedure of diophantine equation ``eq`` by converting it into a product of terms which should equal zero. For example, when solving, `x^2 - y^2 = 0` this is treated as `(x + y)(x - y) = 0` and `x + y = 0` and `x - y = 0` are solved independently and combined. Each term is solved by calling ``diop_solve()``. (Although it is possible to call ``diop_solve()`` directly, one must be careful to pass an equation in the correct form and to interpret the output correctly; ``diophantine()`` is the public-facing function to use in general.) Output of ``diophantine()`` is a set of tuples. The elements of the tuple are the solutions for each variable in the equation and are arranged according to the alphabetic ordering of the variables. e.g. For an equation with two variables, `a` and `b`, the first element of the tuple is the solution for `a` and the second for `b`. Usage ===== ``diophantine(eq, t, syms)``: Solve the diophantine equation ``eq``. ``t`` is the optional parameter to be used by ``diop_solve()``. ``syms`` is an optional list of symbols which determines the order of the elements in the returned tuple. By default, only the base solution is returned. If ``permute`` is set to True then permutations of the base solution and/or permutations of the signs of the values will be returned when applicable. >>> from sympy.solvers.diophantine import diophantine >>> from sympy.abc import a, b >>> eq = a4 + b4 - (24 + 34) >>> diophantine(eq) {(2, 3)} >>> diophantine(eq, permute=True) {(-3, -2), (-3, 2), (-2, -3), (-2, 3), (2, -3), (2, 3), (3, -2), (3, 2)} Details ======= ``eq`` should be an expression which is assumed to be zero. ``t`` is the parameter to be used in the solution. Examples ======== >>> from sympy.abc import x, y, z >>> diophantine(x2 - y2) {(t_0, -t_0), (t_0, t_0)} >>> diophantine(x(2x + 3y - z)) {(0, n1, n2), (t_0, t_1, 2t_0 + 3t_1)} >>> diophantine(x*2 + 3xy + 4x) {(0, n1), (3t_0 - 4, -t_0)} See Also ======== diop_solve() sympy.utilities.iterables.permute_signs sympy.utilities.iterables.signed_permutations """ from sympy.utilities.iterables import ( subsets, permute_signs, signed_permutations) if isinstance(eq, Eq): eq = eq.lhs - eq.rhs try: var = list(eq.expand(force=True).free_symbols) var.sort(key=default_sort_key) if syms: if not is_sequence(syms): raise TypeError( 'syms should be given as a sequence, e.g. a list') syms = [i for i in syms if i in var] if syms != var: dict_sym_index = dict(zip(syms, range(len(syms)))) return {tuple([t[dict_sym_index[i]] for i in var]) for t in diophantine(eq, param)} n, d = eq.as_numer_denom() if n.is_number: return set() if not d.is_number: dsol = diophantine(d) good = diophantine(n) - dsol return {s for s in good if _mexpand(d.subs(zip(var, s)))} else: eq = n eq = factor_terms(eq) assert not eq.is_number eq = eq.as_independent(var, as_Add=False)[1] p = Poly(eq) assert not any(g.is_number for g in p.gens) eq = p.as_expr() assert eq.is_polynomial() except (GeneratorsNeeded, AssertionError, AttributeError): raise TypeError(filldedent(''' Equation should be a polynomial with Rational coefficients.''')) # permute only sign do_permute_signs = False # permute sign and values do_permute_signs_var = False # permute few signs permute_few_signs = False try: # if we know that factoring should not be attempted, skip # the factoring step v, c, t = classify_diop(eq) # check for permute sign if permute: len_var = len(v) permute_signs_for = [ 'general_sum_of_squares', 'general_sum_of_even_powers'] permute_signs_check = [ 'homogeneous_ternary_quadratic', 'homogeneous_ternary_quadratic_normal', 'binary_quadratic'] if t in permute_signs_for: do_permute_signs_var = True elif t in permute_signs_check: # if all the variables in eq have even powers # then do_permute_sign = True if len_var == 3: var_mul = list(subsets(v, 2)) # here var_mul is like [(x, y), (x, z), (y, z)] xy_coeff = True x_coeff = True var1_mul_var2 = map(lambda a: a[0]a[1], var_mul) # if coeff(yz), coeff(yx), coeff(xz) is not 0 then # `xy_coeff` => True and do_permute_sign => False. # Means no permuted solution. for v1_mul_v2 in var1_mul_var2: try: coeff = c[v1_mul_v2] except KeyError: coeff = 0 xy_coeff = bool(xy_coeff) and bool(coeff) var_mul = list(subsets(v, 1)) # here var_mul is like [(x,), (y, )] for v1 in var_mul: try: coeff = c[v1[0]] except KeyError: coeff = 0 x_coeff = bool(x_coeff) and bool(coeff) if not any([xy_coeff, x_coeff]): # means only x2, y2, z*2, const is present do_permute_signs = True elif not x_coeff: permute_few_signs = True elif len_var == 2: var_mul = list(subsets(v, 2)) # here var_mul is like [(x, y)] xy_coeff = True x_coeff = True var1_mul_var2 = map(lambda x: x[0]x[1], var_mul) for v1_mul_v2 in var1_mul_var2: try: coeff = c[v1_mul_v2] except KeyError: coeff = 0 xy_coeff = bool(xy_coeff) and bool(coeff) var_mul = list(subsets(v, 1)) # here var_mul is like [(x,), (y, )] for v1 in var_mul: try: coeff = c[v1[0]] except KeyError: coeff = 0 x_coeff = bool(x_coeff) and bool(coeff) if not any([xy_coeff, x_coeff]): # means only x2, y2 and const is present # so we can get more soln by permuting this soln. do_permute_signs = True elif not x_coeff: # when coeff(x), coeff(y) is not present then signs of # x, y can be permuted such that their sign are same # as sign of xy. # e.g 1. (x_val,y_val)=> (x_val,y_val), (-x_val,-y_val) # 2. (-x_vall, y_val)=> (-x_val,y_val), (x_val,-y_val) permute_few_signs = True if t == 'general_sum_of_squares': # trying to factor such expressions will sometimes hang terms = [(eq, 1)] else: raise TypeError except (TypeError, NotImplementedError): terms = factor_list(eq)[1] sols = set([]) for term in terms: base, _ = term var_t, _, eq_type = classify_diop(base, _dict=False) _, base = signsimp(base, evaluate=False).as_coeff_Mul() solution = diop_solve(base, param) if eq_type in [ "linear", "homogeneous_ternary_quadratic", "homogeneous_ternary_quadratic_normal", "general_pythagorean"]: sols.add(merge_solution(var, var_t, solution)) elif eq_type in [ "binary_quadratic", "general_sum_of_squares", "general_sum_of_even_powers", "univariate"]: for sol in solution: sols.add(merge_solution(var, var_t, sol)) else: raise NotImplementedError('unhandled type: %s' % eq_type) # remove null merge results if () in sols: sols.remove(()) null = tuple([0]len(var)) # if there is no solution, return trivial solution if not sols and eq.subs(zip(var, null)) is S.Zero: sols.add(null) final_soln = set([]) for sol in sols: if all(_is_int(s) for s in sol): if do_permute_signs: permuted_sign = set(permute_signs(sol)) final_soln.update(permuted_sign) elif permute_few_signs: lst = list(permute_signs(sol)) lst = list(filter(lambda x: x[0]x[1] == sol[1]sol[0], lst)) permuted_sign = set(lst) final_soln.update(permuted_sign) elif do_permute_signs_var: permuted_sign_var = set(signed_permutations(sol)) final_soln.update(permuted_sign_var) else: final_soln.add(sol) else: final_soln.add(sol) return final_soln def merge_solution(var, var_t, solution): """ This is used to construct the full solution from the solutions of sub equations. For example when solving the equation `(x - y)(x^2 + y^2 - z^2) = 0`, solutions for each of the equations `x - y = 0` and `x^2 + y^2 - z^2` are found independently. Solutions for `x - y = 0` are `(x, y) = (t, t)`. But we should introduce a value for z when we output the solution for the original equation. This function converts `(t, t)` into `(t, t, n_{1})` where `n_{1}` is an integer parameter. """ sol = [] if None in solution: return () solution = iter(solution) params = numbered_symbols("n", integer=True, start=1) for v in var: if v in var_t: sol.append(next(solution)) else: sol.append(next(params)) for val, symb in zip(sol, var): if check_assumptions(val, *symb.assumptions0) is False: return tuple() return tuple(sol) def diop_solve(eq, param=symbols("t", integer=True)): """ Solves the diophantine equation ``eq``. Unlike ``diophantine()``, factoring of ``eq`` is not attempted. Uses ``classify_diop()`` to determine the type of the equation and calls the appropriate solver function. Use of ``diophantine()`` is recommended over other helper functions. ``diop_solve()`` can return either a set or a tuple depending on the nature of the equation. Usage ===== ``diop_solve(eq, t)``: Solve diophantine equation, ``eq`` using ``t`` as a parameter if needed. Details ======= ``eq`` should be an expression which is assumed to be zero. ``t`` is a parameter to be used in the solution. Examples ======== >>> from sympy.solvers.diophantine import diop_solve >>> from sympy.abc import x, y, z, w >>> diop_solve(2x + 3y - 5) (3t_0 - 5, 5 - 2t_0) >>> diop_solve(4x + 3y - 4z + 5) (t_0, 8t_0 + 4t_1 + 5, 7t_0 + 3t_1 + 5) >>> diop_solve(x + 3y - 4z + w - 6) (t_0, t_0 + t_1, 6t_0 + 5t_1 + 4t_2 - 6, 5t_0 + 4t_1 + 3t_2 - 6) >>> diop_solve(x2 + y2 - 5) {(-2, -1), (-2, 1), (-1, -2), (-1, 2), (1, -2), (1, 2), (2, -1), (2, 1)} See Also ======== diophantine() """ var, coeff, eq_type = classify_diop(eq, _dict=False) if eq_type == "linear": return _diop_linear(var, coeff, param) elif eq_type == "binary_quadratic": return _diop_quadratic(var, coeff, param) elif eq_type == "homogeneous_ternary_quadratic": x_0, y_0, z_0 = _diop_ternary_quadratic(var, coeff) return _parametrize_ternary_quadratic( (x_0, y_0, z_0), var, coeff) elif eq_type == "homogeneous_ternary_quadratic_normal": x_0, y_0, z_0 = _diop_ternary_quadratic_normal(var, coeff) return _parametrize_ternary_quadratic( (x_0, y_0, z_0), var, coeff) elif eq_type == "general_pythagorean": return _diop_general_pythagorean(var, coeff, param) elif eq_type == "univariate": return set([(int(i),) for i in solveset_real( eq, var[0]).intersect(S.Integers)]) elif eq_type == "general_sum_of_squares": return _diop_general_sum_of_squares(var, -int(coeff[1]), limit=S.Infinity) elif eq_type == "general_sum_of_even_powers": for k in coeff.keys(): if k.is_Pow and coeff[k]: p = k.exp return _diop_general_sum_of_even_powers(var, p, -int(coeff[1]), limit=S.Infinity) if eq_type is not None and eq_type not in diop_known: raise ValueError(filldedent(''' Alhough this type of equation was identified, it is not yet handled. It should, however, be listed in `diop_known` at the top of this file. Developers should see comments at the end of `classify_diop`. ''')) # pragma: no cover else: raise NotImplementedError( 'No solver has been written for %s.' % eq_type) def classify_diop(eq, _dict=True): # docstring supplied externally try: var = list(eq.free_symbols) assert var except (AttributeError, AssertionError): raise ValueError('equation should have 1 or more free symbols') var.sort(key=default_sort_key) eq = eq.expand(force=True) coeff = eq.as_coefficients_dict() if not all(_is_int(c) for c in coeff.values()): raise TypeError("Coefficients should be Integers") diop_type = None total_degree = Poly(eq).total_degree() homogeneous = 1 not in coeff if total_degree == 1: diop_type = "linear" elif len(var) == 1: diop_type = "univariate" elif total_degree == 2 and len(var) == 2: diop_type = "binary_quadratic" elif total_degree == 2 and len(var) == 3 and homogeneous: if set(coeff) & set(var): diop_type = "inhomogeneous_ternary_quadratic" else: nonzero = [k for k in coeff if coeff[k]] if len(nonzero) == 3 and all(i2 in nonzero for i in var): diop_type = "homogeneous_ternary_quadratic_normal" else: diop_type = "homogeneous_ternary_quadratic" elif total_degree == 2 and len(var) >= 3: if set(coeff) & set(var): diop_type = "inhomogeneous_general_quadratic" else: # there may be Pow keys like x2 or Mul keys like xy if any(k.is_Mul for k in coeff): # cross terms if not homogeneous: diop_type = "inhomogeneous_general_quadratic" else: diop_type = "homogeneous_general_quadratic" else: # all squares: x2 + y2 + ... + constant if all(coeff[k] == 1 for k in coeff if k != 1): diop_type = "general_sum_of_squares" elif all(is_square(abs(coeff[k])) for k in coeff): if abs(sum(sign(coeff[k]) for k in coeff)) == \ len(var) - 2: # all but one has the same sign # e.g. 4x2 + y2 - 4z2 diop_type = "general_pythagorean" elif total_degree == 3 and len(var) == 2: diop_type = "cubic_thue" elif (total_degree > 3 and total_degree % 2 == 0 and all(k.is_Pow and k.exp == total_degree for k in coeff if k != 1)): if all(coeff[k] == 1 for k in coeff if k != 1): diop_type = 'general_sum_of_even_powers' if diop_type is not None: return var, dict(coeff) if _dict else coeff, diop_type # new diop type instructions # -------------------------- # if this error raises and the equation can* be classified, # * it should be identified in the if-block above # * the type should be added to the diop_known # if a solver can be written for it, # * a dedicated handler should be written (e.g. diop_linear) # * it should be passed to that handler in diop_solve raise NotImplementedError(filldedent(''' This equation is not yet recognized or else has not been simplified sufficiently to put it in a form recognized by diop_classify().''')) classify_diop.func_doc = ''' Helper routine used by diop_solve() to find information about ``eq``. Returns a tuple containing the type of the diophantine equation along with the variables (free symbols) and their coefficients. Variables are returned as a list and coefficients are returned as a dict with the key being the respective term and the constant term is keyed to 1. The type is one of the following: * %s Usage ===== ``classify_diop(eq)``: Return variables, coefficients and type of the ``eq``. Details ======= ``eq`` should be an expression which is assumed to be zero. ``_dict`` is for internal use: when True (default) a dict is returned, otherwise a defaultdict which supplies 0 for missing keys is returned. Examples ======== >>> from sympy.solvers.diophantine import classify_diop >>> from sympy.abc import x, y, z, w, t >>> classify_diop(4x + 6y - 4) ([x, y], {1: -4, x: 4, y: 6}, 'linear') >>> classify_diop(x + 3y -4z + 5) ([x, y, z], {1: 5, x: 1, y: 3, z: -4}, 'linear') >>> classify_diop(x2 + y2 - xy + x + 5) ([x, y], {1: 5, x: 1, x2: 1, y2: 1, xy: -1}, 'binary_quadratic') ''' % ('\n * '.join(sorted(diop_known))) def diop_linear(eq, param=symbols("t", integer=True)): """ Solves linear diophantine equations. A linear diophantine equation is an equation of the form `a_{1}x_{1} + a_{2}x_{2} + .. + a_{n}x_{n} = 0` where `a_{1}, a_{2}, ..a_{n}` are integer constants and `x_{1}, x_{2}, ..x_{n}` are integer variables. Usage ===== ``diop_linear(eq)``: Returns a tuple containing solutions to the diophantine equation ``eq``. Values in the tuple is arranged in the same order as the sorted variables. Details ======= ``eq`` is a linear diophantine equation which is assumed to be zero. ``param`` is the parameter to be used in the solution. Examples ======== >>> from sympy.solvers.diophantine import diop_linear >>> from sympy.abc import x, y, z, t >>> diop_linear(2x - 3y - 5) # solves equation 2x - 3y - 5 == 0 (3t_0 - 5, 2t_0 - 5) Here x = -3t_0 - 5 and y = -2t_0 - 5 >>> diop_linear(2x - 3y - 4z -3) (t_0, 2t_0 + 4t_1 + 3, -t_0 - 3t_1 - 3) See Also ======== diop_quadratic(), diop_ternary_quadratic(), diop_general_pythagorean(), diop_general_sum_of_squares() """ from sympy.core.function import count_ops var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "linear": return _diop_linear(var, coeff, param) def _diop_linear(var, coeff, param): """ Solves diophantine equations of the form: a_0x_0 + a_1x_1 + ... + a_nx_n == c Note that no solution exists if gcd(a_0, ..., a_n) doesn't divide c. """ if 1 in coeff: # negate coeff[] because input is of the form: ax + by + c == 0 # but is used as: ax + by == -c c = -coeff[1] else: c = 0 # Some solutions will have multiple free variables in their solutions. if param is None: params = [symbols('t')]len(var) else: temp = str(param) + "_%i" params = [symbols(temp % i, integer=True) for i in range(len(var))] if len(var) == 1: q, r = divmod(c, coeff[var[0]]) if not r: return (q,) else: return (None,) ''' base_solution_linear() can solve diophantine equations of the form: ax + by == c We break down multivariate linear diophantine equations into a series of bivariate linear diophantine equations which can then be solved individually by base_solution_linear(). Consider the following: a_0x_0 + a_1x_1 + a_2x_2 == c which can be re-written as: a_0x_0 + g_0y_0 == c where g_0 == gcd(a_1, a_2) and y == (a_1x_1)/g_0 + (a_2x_2)/g_0 This leaves us with two binary linear diophantine equations. For the first equation: a == a_0 b == g_0 c == c For the second: a == a_1/g_0 b == a_2/g_0 c == the solution we find for y_0 in the first equation. The arrays A and B are the arrays of integers used for 'a' and 'b' in each of the n-1 bivariate equations we solve. ''' A = [coeff[v] for v in var] B = [] if len(var) > 2: B.append(igcd(A[-2], A[-1])) A[-2] = A[-2] // B[0] A[-1] = A[-1] // B[0] for i in range(len(A) - 3, 0, -1): gcd = igcd(B[0], A[i]) B[0] = B[0] // gcd A[i] = A[i] // gcd B.insert(0, gcd) B.append(A[-1]) ''' Consider the trivariate linear equation: 4x_0 + 6x_1 + 3x_2 == 2 This can be re-written as: 4x_0 + 3y_0 == 2 where y_0 == 2x_1 + x_2 (Note that gcd(3, 6) == 3) The complete integral solution to this equation is: x_0 == 2 + 3t_0 y_0 == -2 - 4t_0 where 't_0' is any integer. Now that we have a solution for 'x_0', find 'x_1' and 'x_2': 2x_1 + x_2 == -2 - 4t_0 We can then solve for '-2' and '-4' independently, and combine the results: 2x_1a + x_2a == -2 x_1a == 0 + t_0 x_2a == -2 - 2t_0 2x_1b + x_2b == -4t_0 x_1b == 0t_0 + t_1 x_2b == -4t_0 - 2t_1 ==> x_1 == t_0 + t_1 x_2 == -2 - 6t_0 - 2t_1 where 't_0' and 't_1' are any integers. Note that: 4(2 + 3t_0) + 6(t_0 + t_1) + 3(-2 - 6t_0 - 2t_1) == 2 for any integral values of 't_0', 't_1'; as required. This method is generalised for many variables, below. ''' solutions = [] for i in range(len(B)): tot_x, tot_y = [], [] for j, arg in enumerate(Add.make_args(c)): if arg.is_Integer: # example: 5 -> k = 5 k, p = arg, S.One pnew = params[0] else: # arg is a Mul or Symbol # example: 3t_1 -> k = 3 # example: t_0 -> k = 1 k, p = arg.as_coeff_Mul() pnew = params[params.index(p) + 1] sol = sol_x, sol_y = base_solution_linear(k, A[i], B[i], pnew) if p is S.One: if None in sol: return tuple([None]len(var)) else: # convert a + bpnew -> ap + bpnew if isinstance(sol_x, Add): sol_x = sol_x.args[0]p + sol_x.args[1] if isinstance(sol_y, Add): sol_y = sol_y.args[0]p + sol_y.args[1] tot_x.append(sol_x) tot_y.append(sol_y) solutions.append(Add(tot_x)) c = Add(tot_y) solutions.append(c) if param is None: # just keep the additive constant (i.e. replace t with 0) solutions = [i.as_coeff_Add()[0] for i in solutions] return tuple(solutions) def base_solution_linear(c, a, b, t=None): """ Return the base solution for the linear equation, `ax + by = c`. Used by ``diop_linear()`` to find the base solution of a linear Diophantine equation. If ``t`` is given then the parametrized solution is returned. Usage ===== ``base_solution_linear(c, a, b, t)``: ``a``, ``b``, ``c`` are coefficients in `ax + by = c` and ``t`` is the parameter to be used in the solution. Examples ======== >>> from sympy.solvers.diophantine import base_solution_linear >>> from sympy.abc import t >>> base_solution_linear(5, 2, 3) # equation 2x + 3y = 5 (-5, 5) >>> base_solution_linear(0, 5, 7) # equation 5x + 7y = 0 (0, 0) >>> base_solution_linear(5, 2, 3, t) # equation 2x + 3y = 5 (3t - 5, 5 - 2t) >>> base_solution_linear(0, 5, 7, t) # equation 5x + 7y = 0 (7t, -5t) """ a, b, c = _remove_gcd(a, b, c) if c == 0: if t is not None: if b < 0: t = -t return (bt , -at) else: return (0, 0) else: x0, y0, d = igcdex(abs(a), abs(b)) x0 = sign(a) y0 = sign(b) if divisible(c, d): if t is not None: if b < 0: t = -t return (cx0 + bt, cy0 - at) else: return (cx0, cy0) else: return (None, None) def divisible(a, b): """ Returns `True` if ``a`` is divisible by ``b`` and `False` otherwise. """ return not a % b def diop_quadratic(eq, param=symbols("t", integer=True)): """ Solves quadratic diophantine equations. i.e. equations of the form `Ax^2 + Bxy + Cy^2 + Dx + Ey + F = 0`. Returns a set containing the tuples `(x, y)` which contains the solutions. If there are no solutions then `(None, None)` is returned. Usage ===== ``diop_quadratic(eq, param)``: ``eq`` is a quadratic binary diophantine equation. ``param`` is used to indicate the parameter to be used in the solution. Details ======= ``eq`` should be an expression which is assumed to be zero. ``param`` is a parameter to be used in the solution. Examples ======== >>> from sympy.abc import x, y, t >>> from sympy.solvers.diophantine import diop_quadratic >>> diop_quadratic(x2 + y2 + 2x + 2y + 2, t) {(-1, -1)} References ========== .. [1] Methods to solve Ax^2 + Bxy + Cy^2 + Dx + Ey + F = 0, [online], Available: http://www.alpertron.com.ar/METHODS.HTM .. [2] Solving the equation ax^2+ bxy + cy^2 + dx + ey + f= 0, [online], Available: http://www.jpr2718.org/ax2p.pdf See Also ======== diop_linear(), diop_ternary_quadratic(), diop_general_sum_of_squares(), diop_general_pythagorean() """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "binary_quadratic": return _diop_quadratic(var, coeff, param) def _diop_quadratic(var, coeff, t): x, y = var A = coeff[x2] B = coeff[xy] C = coeff[y2] D = coeff[x] E = coeff[y] F = coeff[1] A, B, C, D, E, F = [as_int(i) for i in _remove_gcd(A, B, C, D, E, F)] # (1) Simple-Hyperbolic case: A = C = 0, B != 0 # In this case equation can be converted to (Bx + E)(By + D) = DE - BF # We consider two cases; DE - BF = 0 and DE - BF != 0 # More details, http://www.alpertron.com.ar/METHODS.HTM#SHyperb sol = set([]) discr = B2 - 4AC if A == 0 and C == 0 and B != 0: if DE - BF == 0: q, r = divmod(E, B) if not r: sol.add((-q, t)) q, r = divmod(D, B) if not r: sol.add((t, -q)) else: div = divisors(DE - BF) div = div + [-term for term in div] for d in div: x0, r = divmod(d - E, B) if not r: q, r = divmod(DE - BF, d) if not r: y0, r = divmod(q - D, B) if not r: sol.add((x0, y0)) # (2) Parabolic case: B*2 - 4AC = 0 # There are two subcases to be considered in this case. # sqrt(c)D - sqrt(a)E = 0 and sqrt(c)D - sqrt(a)E != 0 # More Details, http://www.alpertron.com.ar/METHODS.HTM#Parabol elif discr == 0: if A == 0: s = _diop_quadratic([y, x], coeff, t) for soln in s: sol.add((soln[1], soln[0])) else: g = sign(A)igcd(A, C) a = A // g b = B // g c = C // g e = sign(B/A) sqa = isqrt(a) sqc = isqrt(c) _c = esqcD - sqaE if not _c: z = symbols("z", real=True) eq = sqagz2 + Dz + sqaF roots = solveset_real(eq, z).intersect(S.Integers) for root in roots: ans = diop_solve(sqax + esqcy - root) sol.add((ans[0], ans[1])) elif _is_int(c): solve_x = lambda u: -esqcg_ct*2 - (E + 2esqcgu)t\ - (esqcgu2 + Eu + esqcF) // _c solve_y = lambda u: sqag_ct2 + (D + 2sqagu)t \ + (sqagu2 + Du + sqaF) // _c for z0 in range(0, abs(_c)): # Check if the coefficients of y and x obtained are integers or not if (divisible(sqagz02 + Dz0 + sqaF, _c) and divisible(esqc*gz0*2 + Ez0 + esqcF, _c)): sol.add((solve_x(z0), solve_y(z0))) # (3) Method used when B*2 - 4AC is a square, is described in p. 6 of the below paper # by John P. Robertson. # http://www.jpr2718.org/ax2p.pdf elif is_square(discr): if A != 0: r = sqrt(discr) u, v = symbols("u, v", integer=True) eq = _mexpand( 4Aruv + 4AD(Bv + ru + rv - Bu) + 2A4AE(u - v) + 4Ar4AF) solution = diop_solve(eq, t) for s0, t0 in solution: num = Bt0 + rs0 + rt0 - Bs0 x_0 = S(num)/(4Ar) y_0 = S(s0 - t0)/(2r) if isinstance(s0, Symbol) or isinstance(t0, Symbol): if check_param(x_0, y_0, 4Ar, t) != (None, None): ans = check_param(x_0, y_0, 4Ar, t) sol.add((ans[0], ans[1])) elif x_0.is_Integer and y_0.is_Integer: if is_solution_quad(var, coeff, x_0, y_0): sol.add((x_0, y_0)) else: s = _diop_quadratic(var[::-1], coeff, t) # Interchange x and y while s: # \| sol.add(s.pop()[::-1]) # and solution <--------+ # (4) B2 - 4AC > 0 and B2 - 4AC not a square or B2 - 4AC < 0 else: P, Q = _transformation_to_DN(var, coeff) D, N = _find_DN(var, coeff) solns_pell = diop_DN(D, N) if D < 0: for x0, y0 in solns_pell: for x in [-x0, x0]: for y in [-y0, y0]: s = PMatrix([x, y]) + Q try: sol.add(tuple([as_int(_) for _ in s])) except ValueError: pass else: # In this case equation can be transformed into a Pell equation solns_pell = set(solns_pell) for X, Y in list(solns_pell): solns_pell.add((-X, -Y)) a = diop_DN(D, 1) T = a[0][0] U = a[0][1] if all(_is_int(_) for _ in P[:4] + Q[:2]): for r, s in solns_pell: _a = (r + ssqrt(D))(T + Usqrt(D))t _b = (r - ssqrt(D))(T - Usqrt(D))*t x_n = _mexpand(S(_a + _b)/2) y_n = _mexpand(S(_a - _b)/(2sqrt(D))) s = PMatrix([x_n, y_n]) + Q sol.add(tuple(s)) else: L = ilcm([_.q for _ in P[:4] + Q[:2]]) k = 1 T_k = T U_k = U while (T_k - 1) % L != 0 or U_k % L != 0: T_k, U_k = T_kT + DU_kU, T_kU + U_kT k += 1 for X, Y in solns_pell: for i in range(k): if all(_is_int(_) for _ in PMatrix([X, Y]) + Q): _a = (X + sqrt(D)Y)(T_k + sqrt(D)U_k)t _b = (X - sqrt(D)Y)(T_k - sqrt(D)U_k)*t Xt = S(_a + _b)/2 Yt = S(_a - _b)/(2sqrt(D)) s = PMatrix([Xt, Yt]) + Q sol.add(tuple(s)) X, Y = XT + DUY, XU + YT return sol def is_solution_quad(var, coeff, u, v): """ Check whether `(u, v)` is solution to the quadratic binary diophantine equation with the variable list ``var`` and coefficient dictionary ``coeff``. Not intended for use by normal users. """ reps = dict(zip(var, (u, v))) eq = Add([ji.xreplace(reps) for i, j in coeff.items()]) return _mexpand(eq) == 0 def diop_DN(D, N, t=symbols("t", integer=True)): """ Solves the equation `x^2 - Dy^2 = N`. Mainly concerned with the case `D > 0, D` is not a perfect square, which is the same as the generalized Pell equation. The LMM algorithm [1]_ is used to solve this equation. Returns one solution tuple, (`x, y)` for each class of the solutions. Other solutions of the class can be constructed according to the values of ``D`` and ``N``. Usage ===== ``diop_DN(D, N, t)``: D and N are integers as in `x^2 - Dy^2 = N` and ``t`` is the parameter to be used in the solutions. Details ======= ``D`` and ``N`` correspond to D and N in the equation. ``t`` is the parameter to be used in the solutions. Examples ======== >>> from sympy.solvers.diophantine import diop_DN >>> diop_DN(13, -4) # Solves equation x*2 - 13y2 = -4 [(3, 1), (393, 109), (36, 10)] The output can be interpreted as follows: There are three fundamental solutions to the equation `x^2 - 13y^2 = -4` given by (3, 1), (393, 109) and (36, 10). Each tuple is in the form (x, y), i.e. solution (3, 1) means that `x = 3` and `y = 1`. >>> diop_DN(986, 1) # Solves equation x2 - 986y2 = 1 [(49299, 1570)] See Also ======== find_DN(), diop_bf_DN() References ========== .. [1] Solving the generalized Pell equation x2 - Dy2 = N, John P. Robertson, July 31, 2004, Pages 16 - 17. [online], Available: http://www.jpr2718.org/pell.pdf """ if D < 0: if N == 0: return [(0, 0)] elif N < 0: return [] elif N > 0: sol = [] for d in divisors(square_factor(N)): sols = cornacchia(1, -D, N // d2) if sols: for x, y in sols: sol.append((dx, dy)) if D == -1: sol.append((dy, dx)) return sol elif D == 0: if N < 0: return [] if N == 0: return [(0, t)] sN, _exact = integer_nthroot(N, 2) if _exact: return [(sN, t)] else: return [] else: # D > 0 sD, _exact = integer_nthroot(D, 2) if _exact: if N == 0: return [(sDt, t)] else: sol = [] for y in range(floor(sign(N)(N - 1)/(2sD)) + 1): try: sq, _exact = integer_nthroot(Dy2 + N, 2) except ValueError: _exact = False if _exact: sol.append((sq, y)) return sol elif 1 < N2 < D: # It is much faster to call `_special_diop_DN`. return _special_diop_DN(D, N) else: if N == 0: return [(0, 0)] elif abs(N) == 1: pqa = PQa(0, 1, D) j = 0 G = [] B = [] for i in pqa: a = i[2] G.append(i[5]) B.append(i[4]) if j != 0 and a == 2sD: break j = j + 1 if _odd(j): if N == -1: x = G[j - 1] y = B[j - 1] else: count = j while count < 2j - 1: i = next(pqa) G.append(i[5]) B.append(i[4]) count += 1 x = G[count] y = B[count] else: if N == 1: x = G[j - 1] y = B[j - 1] else: return [] return [(x, y)] else: fs = [] sol = [] div = divisors(N) for d in div: if divisible(N, d2): fs.append(d) for f in fs: m = N // f2 zs = sqrt_mod(D, abs(m), all_roots=True) zs = [i for i in zs if i <= abs(m) // 2 ] if abs(m) != 2: zs = zs + [-i for i in zs if i] # omit dupl 0 for z in zs: pqa = PQa(z, abs(m), D) j = 0 G = [] B = [] for i in pqa: G.append(i[5]) B.append(i[4]) if j != 0 and abs(i[1]) == 1: r = G[j-1] s = B[j-1] if r*2 - Ds*2 == m: sol.append((fr, fs)) elif diop_DN(D, -1) != []: a = diop_DN(D, -1) sol.append((f(ra[0][0] + a[0][1]sD), f(ra[0][1] + sa[0][0]))) break j = j + 1 if j == length(z, abs(m), D): break return sol def _special_diop_DN(D, N): """ Solves the equation `x^2 - Dy^2 = N` for the special case where `1 < N2 < D` and `D` is not a perfect square. It is better to call `diop_DN` rather than this function, as the former checks the condition `1 < N2 < D`, and calls the latter only if appropriate. Usage ===== WARNING: Internal method. Do not call directly! ``_special_diop_DN(D, N)``: D and N are integers as in `x^2 - Dy^2 = N`. Details ======= ``D`` and ``N`` correspond to D and N in the equation. Examples ======== >>> from sympy.solvers.diophantine import _special_diop_DN >>> _special_diop_DN(13, -3) # Solves equation x*2 - 13y2 = -3 [(7, 2), (137, 38)] The output can be interpreted as follows: There are two fundamental solutions to the equation `x^2 - 13y^2 = -3` given by (7, 2) and (137, 38). Each tuple is in the form (x, y), i.e. solution (7, 2) means that `x = 7` and `y = 2`. >>> _special_diop_DN(2445, -20) # Solves equation x2 - 2445y2 = -20 [(445, 9), (17625560, 356454), (698095554475, 14118073569)] See Also ======== diop_DN() References ========== .. [1] Section 4.4.4 of the following book: Quadratic Diophantine Equations, T. Andreescu and D. Andrica, Springer, 2015. """ # The following assertion was removed for efficiency, with the understanding # that this method is not called directly. The parent method, `diop_DN` # is responsible for performing the appropriate checks. # # assert (1 < N2 < D) and (not integer_nthroot(D, 2)[1]) sqrt_D = sqrt(D) F = [(N, 1)] f = 2 while True: f2 = f2 if f2 > abs(N): break n, r = divmod(N, f2) if r == 0: F.append((n, f)) f += 1 P = 0 Q = 1 G0, G1 = 0, 1 B0, B1 = 1, 0 solutions = [] i = 0 while True: a = floor((P + sqrt_D) / Q) P = aQ - P Q = (D - P*2) // Q G2 = aG1 + G0 B2 = aB1 + B0 for n, f in F: if G22 - DB2*2 == n: solutions.append((fG2, fB2)) i += 1 if Q == 1 and i % 2 == 0: break G0, G1 = G1, G2 B0, B1 = B1, B2 return solutions def cornacchia(a, b, m): r""" Solves `ax^2 + by^2 = m` where `\gcd(a, b) = 1 = gcd(a, m)` and `a, b > 0`. Uses the algorithm due to Cornacchia. The method only finds primitive solutions, i.e. ones with `\gcd(x, y) = 1`. So this method can't be used to find the solutions of `x^2 + y^2 = 20` since the only solution to former is `(x, y) = (4, 2)` and it is not primitive. When `a = b`, only the solutions with `x \leq y` are found. For more details, see the References. Examples ======== >>> from sympy.solvers.diophantine import cornacchia >>> cornacchia(2, 3, 35) # equation 2x2 + 3y2 = 35 {(2, 3), (4, 1)} >>> cornacchia(1, 1, 25) # equation x2 + y2 = 25 {(4, 3)} References =========== .. [1] A. Nitaj, "L'algorithme de Cornacchia" .. [2] Solving the diophantine equation ax2 + by2 = m by Cornacchia's method, [online], Available: http://www.numbertheory.org/php/cornacchia.html See Also ======== sympy.utilities.iterables.signed_permutations """ sols = set() a1 = igcdex(a, m)[0] v = sqrt_mod(-ba1, m, all_roots=True) if not v: return None for t in v: if t < m // 2: continue u, r = t, m while True: u, r = r, u % r if ar2 < m: break m1 = m - ar*2 if m1 % b == 0: m1 = m1 // b s, _exact = integer_nthroot(m1, 2) if _exact: if a == b and r < s: r, s = s, r sols.add((int(r), int(s))) return sols def PQa(P_0, Q_0, D): r""" Returns useful information needed to solve the Pell equation. There are six sequences of integers defined related to the continued fraction representation of `\\frac{P + \sqrt{D}}{Q}`, namely {`P_{i}`}, {`Q_{i}`}, {`a_{i}`},{`A_{i}`}, {`B_{i}`}, {`G_{i}`}. ``PQa()`` Returns these values as a 6-tuple in the same order as mentioned above. Refer [1]_ for more detailed information. Usage ===== ``PQa(P_0, Q_0, D)``: ``P_0``, ``Q_0`` and ``D`` are integers corresponding to `P_{0}`, `Q_{0}` and `D` in the continued fraction `\\frac{P_{0} + \sqrt{D}}{Q_{0}}`. Also it's assumed that `P_{0}^2 == D mod(\|Q_{0}\|)` and `D` is square free. Examples ======== >>> from sympy.solvers.diophantine import PQa >>> pqa = PQa(13, 4, 5) # (13 + sqrt(5))/4 >>> next(pqa) # (P_0, Q_0, a_0, A_0, B_0, G_0) (13, 4, 3, 3, 1, -1) >>> next(pqa) # (P_1, Q_1, a_1, A_1, B_1, G_1) (-1, 1, 1, 4, 1, 3) References ========== .. [1] Solving the generalized Pell equation x^2 - Dy^2 = N, John P. Robertson, July 31, 2004, Pages 4 - 8. http://www.jpr2718.org/pell.pdf """ A_i_2 = B_i_1 = 0 A_i_1 = B_i_2 = 1 G_i_2 = -P_0 G_i_1 = Q_0 P_i = P_0 Q_i = Q_0 while True: a_i = floor((P_i + sqrt(D))/Q_i) A_i = a_iA_i_1 + A_i_2 B_i = a_iB_i_1 + B_i_2 G_i = a_iG_i_1 + G_i_2 yield P_i, Q_i, a_i, A_i, B_i, G_i A_i_1, A_i_2 = A_i, A_i_1 B_i_1, B_i_2 = B_i, B_i_1 G_i_1, G_i_2 = G_i, G_i_1 P_i = a_iQ_i - P_i Q_i = (D - P_i2)/Q_i def diop_bf_DN(D, N, t=symbols("t", integer=True)): r""" Uses brute force to solve the equation, `x^2 - Dy^2 = N`. Mainly concerned with the generalized Pell equation which is the case when `D > 0, D` is not a perfect square. For more information on the case refer [1]_. Let `(t, u)` be the minimal positive solution of the equation `x^2 - Dy^2 = 1`. Then this method requires `\sqrt{\\frac{\mid N \mid (t \pm 1)}{2D}}` to be small. Usage ===== ``diop_bf_DN(D, N, t)``: ``D`` and ``N`` are coefficients in `x^2 - Dy^2 = N` and ``t`` is the parameter to be used in the solutions. Details ======= ``D`` and ``N`` correspond to D and N in the equation. ``t`` is the parameter to be used in the solutions. Examples ======== >>> from sympy.solvers.diophantine import diop_bf_DN >>> diop_bf_DN(13, -4) [(3, 1), (-3, 1), (36, 10)] >>> diop_bf_DN(986, 1) [(49299, 1570)] See Also ======== diop_DN() References ========== .. [1] Solving the generalized Pell equation x2 - Dy*2 = N, John P. Robertson, July 31, 2004, Page 15. http://www.jpr2718.org/pell.pdf """ D = as_int(D) N = as_int(N) sol = [] a = diop_DN(D, 1) u = a[0][0] v = a[0][1] if abs(N) == 1: return diop_DN(D, N) elif N > 1: L1 = 0 L2 = integer_nthroot(int(N(u - 1)/(2D)), 2)[0] + 1 elif N < -1: L1, _exact = integer_nthroot(-int(N/D), 2) if not _exact: L1 += 1 L2 = integer_nthroot(-int(N(u + 1)/(2D)), 2)[0] + 1 else: # N = 0 if D < 0: return [(0, 0)] elif D == 0: return [(0, t)] else: sD, _exact = integer_nthroot(D, 2) if _exact: return [(sDt, t), (-sDt, t)] else: return [(0, 0)] for y in range(L1, L2): try: x, _exact = integer_nthroot(N + Dy2, 2) except ValueError: _exact = False if _exact: sol.append((x, y)) if not equivalent(x, y, -x, y, D, N): sol.append((-x, y)) return sol def equivalent(u, v, r, s, D, N): """ Returns True if two solutions `(u, v)` and `(r, s)` of `x^2 - Dy^2 = N` belongs to the same equivalence class and False otherwise. Two solutions `(u, v)` and `(r, s)` to the above equation fall to the same equivalence class iff both `(ur - Dvs)` and `(us - vr)` are divisible by `N`. See reference [1]_. No test is performed to test whether `(u, v)` and `(r, s)` are actually solutions to the equation. User should take care of this. Usage ===== ``equivalent(u, v, r, s, D, N)``: `(u, v)` and `(r, s)` are two solutions of the equation `x^2 - Dy^2 = N` and all parameters involved are integers. Examples ======== >>> from sympy.solvers.diophantine import equivalent >>> equivalent(18, 5, -18, -5, 13, -1) True >>> equivalent(3, 1, -18, 393, 109, -4) False References ========== .. [1] Solving the generalized Pell equation x2 - Dy2 = N, John P. Robertson, July 31, 2004, Page 12. http://www.jpr2718.org/pell.pdf """ return divisible(ur - Dvs, N) and divisible(us - vr, N) def length(P, Q, D): r""" Returns the (length of aperiodic part + length of periodic part) of continued fraction representation of `\\frac{P + \sqrt{D}}{Q}`. It is important to remember that this does NOT return the length of the periodic part but the sum of the lengths of the two parts as mentioned above. Usage ===== ``length(P, Q, D)``: ``P``, ``Q`` and ``D`` are integers corresponding to the continued fraction `\\frac{P + \sqrt{D}}{Q}`. Details ======= ``P``, ``D`` and ``Q`` corresponds to P, D and Q in the continued fraction, `\\frac{P + \sqrt{D}}{Q}`. Examples ======== >>> from sympy.solvers.diophantine import length >>> length(-2 , 4, 5) # (-2 + sqrt(5))/4 3 >>> length(-5, 4, 17) # (-5 + sqrt(17))/4 4 See Also ======== sympy.ntheory.continued_fraction.continued_fraction_periodic """ from sympy.ntheory.continued_fraction import continued_fraction_periodic v = continued_fraction_periodic(P, Q, D) if type(v[-1]) is list: rpt = len(v[-1]) nonrpt = len(v) - 1 else: rpt = 0 nonrpt = len(v) return rpt + nonrpt def transformation_to_DN(eq): """ This function transforms general quadratic, `ax^2 + bxy + cy^2 + dx + ey + f = 0` to more easy to deal with `X^2 - DY^2 = N` form. This is used to solve the general quadratic equation by transforming it to the latter form. Refer [1]_ for more detailed information on the transformation. This function returns a tuple (A, B) where A is a 2 X 2 matrix and B is a 2 X 1 matrix such that, Transpose([x y]) = A * Transpose([X Y]) + B Usage ===== ``transformation_to_DN(eq)``: where ``eq`` is the quadratic to be transformed. Examples ======== >>> from sympy.abc import x, y >>> from sympy.solvers.diophantine import transformation_to_DN >>> from sympy.solvers.diophantine import classify_diop >>> A, B = transformation_to_DN(x*2 - 3xy - y2 - 2y + 1) >>> A Matrix([ [1/26, 3/26], [ 0, 1/13]]) >>> B Matrix([ [-6/13], [-4/13]]) A, B returned are such that Transpose((x y)) = A * Transpose((X Y)) + B. Substituting these values for `x` and `y` and a bit of simplifying work will give an equation of the form `x^2 - Dy^2 = N`. >>> from sympy.abc import X, Y >>> from sympy import Matrix, simplify >>> u = (AMatrix([X, Y]) + B)[0] # Transformation for x >>> u X/26 + 3Y/26 - 6/13 >>> v = (AMatrix([X, Y]) + B)[1] # Transformation for y >>> v Y/13 - 4/13 Next we will substitute these formulas for `x` and `y` and do ``simplify()``. >>> eq = simplify((x2 - 3xy - y2 - 2y + 1).subs(zip((x, y), (u, v)))) >>> eq X2/676 - Y2/52 + 17/13 By multiplying the denominator appropriately, we can get a Pell equation in the standard form. >>> eq * 676 X*2 - 13Y2 + 884 If only the final equation is needed, ``find_DN()`` can be used. See Also ======== find_DN() References ========== .. [1] Solving the equation ax^2 + bxy + cy^2 + dx + ey + f = 0, John P.Robertson, May 8, 2003, Page 7 - 11. http://www.jpr2718.org/ax2p.pdf """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "binary_quadratic": return _transformation_to_DN(var, coeff) def _transformation_to_DN(var, coeff): x, y = var a = coeff[x2] b = coeff[xy] c = coeff[y2] d = coeff[x] e = coeff[y] f = coeff[1] a, b, c, d, e, f = [as_int(i) for i in _remove_gcd(a, b, c, d, e, f)] X, Y = symbols("X, Y", integer=True) if b: B, C = _rational_pq(2a, b) A, T = _rational_pq(a, B*2) # eq_1 = ABX2 + B(cT - AC*2)Y*2 + dTX + (BeT - dTC)Y + fTB coeff = {X*2: AB, XY: 0, Y2: B(cT - AC*2), X: dT, Y: BeT - dTC, 1: fTB} A_0, B_0 = _transformation_to_DN([X, Y], coeff) return Matrix(2, 2, [S(1)/B, -S(C)/B, 0, 1])A_0, Matrix(2, 2, [S(1)/B, -S(C)/B, 0, 1])B_0 else: if d: B, C = _rational_pq(2a, d) A, T = _rational_pq(a, B2) # eq_2 = AX*2 + cTY2 + eTY + fT - AC2 coeff = {X2: A, XY: 0, Y*2: cT, X: 0, Y: eT, 1: fT - AC2} A_0, B_0 = _transformation_to_DN([X, Y], coeff) return Matrix(2, 2, [S(1)/B, 0, 0, 1])A_0, Matrix(2, 2, [S(1)/B, 0, 0, 1])B_0 + Matrix([-S(C)/B, 0]) else: if e: B, C = _rational_pq(2c, e) A, T = _rational_pq(c, B*2) # eq_3 = aTX2 + AY*2 + fT - AC2 coeff = {X2: aT, XY: 0, Y2: A, X: 0, Y: 0, 1: fT - AC2} A_0, B_0 = _transformation_to_DN([X, Y], coeff) return Matrix(2, 2, [1, 0, 0, S(1)/B])A_0, Matrix(2, 2, [1, 0, 0, S(1)/B])B_0 + Matrix([0, -S(C)/B]) else: # TODO: pre-simplification: Not necessary but may simplify # the equation. return Matrix(2, 2, [S(1)/a, 0, 0, 1]), Matrix([0, 0]) def find_DN(eq): """ This function returns a tuple, `(D, N)` of the simplified form, `x^2 - Dy^2 = N`, corresponding to the general quadratic, `ax^2 + bxy + cy^2 + dx + ey + f = 0`. Solving the general quadratic is then equivalent to solving the equation `X^2 - DY^2 = N` and transforming the solutions by using the transformation matrices returned by ``transformation_to_DN()``. Usage ===== ``find_DN(eq)``: where ``eq`` is the quadratic to be transformed. Examples ======== >>> from sympy.abc import x, y >>> from sympy.solvers.diophantine import find_DN >>> find_DN(x2 - 3xy - y2 - 2y + 1) (13, -884) Interpretation of the output is that we get `X^2 -13Y^2 = -884` after transforming `x^2 - 3xy - y^2 - 2y + 1` using the transformation returned by ``transformation_to_DN()``. See Also ======== transformation_to_DN() References ========== .. [1] Solving the equation ax^2 + bxy + cy^2 + dx + ey + f = 0, John P.Robertson, May 8, 2003, Page 7 - 11. http://www.jpr2718.org/ax2p.pdf """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "binary_quadratic": return _find_DN(var, coeff) def _find_DN(var, coeff): x, y = var X, Y = symbols("X, Y", integer=True) A, B = _transformation_to_DN(var, coeff) u = (AMatrix([X, Y]) + B)[0] v = (AMatrix([X, Y]) + B)[1] eq = x*2coeff[x*2] + xycoeff[xy] + y*2coeff[y*2] + xcoeff[x] + ycoeff[y] + coeff[1] simplified = _mexpand(eq.subs(zip((x, y), (u, v)))) coeff = simplified.as_coefficients_dict() return -coeff[Y2]/coeff[X2], -coeff[1]/coeff[X2] def check_param(x, y, a, t): """ If there is a number modulo ``a`` such that ``x`` and ``y`` are both integers, then return a parametric representation for ``x`` and ``y`` else return (None, None). Here ``x`` and ``y`` are functions of ``t``. """ from sympy.simplify.simplify import clear_coefficients if x.is_number and not x.is_Integer: return (None, None) if y.is_number and not y.is_Integer: return (None, None) m, n = symbols("m, n", integer=True) c, p = (mx + ny).as_content_primitive() if a % c.q: return (None, None) # clear_coefficients(mx + b, R)[1] -> (R - b)/m eq = clear_coefficients(x, m)[1] - clear_coefficients(y, n)[1] junk, eq = eq.as_content_primitive() return diop_solve(eq, t) def diop_ternary_quadratic(eq): """ Solves the general quadratic ternary form, `ax^2 + by^2 + cz^2 + fxy + gyz + hxz = 0`. Returns a tuple `(x, y, z)` which is a base solution for the above equation. If there are no solutions, `(None, None, None)` is returned. Usage ===== ``diop_ternary_quadratic(eq)``: Return a tuple containing a basic solution to ``eq``. Details ======= ``eq`` should be an homogeneous expression of degree two in three variables and it is assumed to be zero. Examples ======== >>> from sympy.abc import x, y, z >>> from sympy.solvers.diophantine import diop_ternary_quadratic >>> diop_ternary_quadratic(x2 + 3y2 - z2) (1, 0, 1) >>> diop_ternary_quadratic(4x2 + 5y2 - z2) (1, 0, 2) >>> diop_ternary_quadratic(45x2 - 7y*2 - 8xy - z2) (28, 45, 105) >>> diop_ternary_quadratic(x2 - 49y2 - z2 + 13zy -8xy) (9, 1, 5) """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type in ( "homogeneous_ternary_quadratic", "homogeneous_ternary_quadratic_normal"): return _diop_ternary_quadratic(var, coeff) def _diop_ternary_quadratic(_var, coeff): x, y, z = _var var = [x, y, z] # Equations of the form Bxy + Czx + Eyz = 0 and At least two of the # coefficients A, B, C are non-zero. # There are infinitely many solutions for the equation. # Ex: (0, 0, t), (0, t, 0), (t, 0, 0) # Equation can be re-written as y(Bx + Ez) = -Cxz and we can find rather # unobvious solutions. Set y = -C and Bx + Ez = xz. The latter can be solved by # using methods for binary quadratic diophantine equations. Let's select the # solution which minimizes \|x\| + \|z\| if not any(coeff[i*2] for i in var): if coeff[xz]: sols = diophantine(coeff[xy]x + coeff[yz]z - xz) s = sols.pop() min_sum = abs(s[0]) + abs(s[1]) for r in sols: m = abs(r[0]) + abs(r[1]) if m < min_sum: s = r min_sum = m x_0, y_0, z_0 = s[0], -coeff[xz], s[1] else: var[0], var[1] = _var[1], _var[0] y_0, x_0, z_0 = _diop_ternary_quadratic(var, coeff) return _remove_gcd(x_0, y_0, z_0) if coeff[x2] == 0: # If the coefficient of x is zero change the variables if coeff[y2] == 0: var[0], var[2] = _var[2], _var[0] z_0, y_0, x_0 = _diop_ternary_quadratic(var, coeff) else: var[0], var[1] = _var[1], _var[0] y_0, x_0, z_0 = _diop_ternary_quadratic(var, coeff) else: if coeff[xy] or coeff[xz]: # Apply the transformation x --> X - (By + Cz)/(2A) A = coeff[x2] B = coeff[xy] C = coeff[xz] D = coeff[y2] E = coeff[yz] F = coeff[z2] _coeff = dict() _coeff[x2] = 4A2 _coeff[y2] = 4AD - B2 _coeff[z2] = 4AF - C2 _coeff[yz] = 4AE - 2BC _coeff[xy] = 0 _coeff[xz] = 0 x_0, y_0, z_0 = _diop_ternary_quadratic(var, _coeff) if x_0 is None: return (None, None, None) p, q = _rational_pq(By_0 + Cz_0, 2A) x_0, y_0, z_0 = x_0q - p, y_0q, z_0q elif coeff[zy] != 0: if coeff[y2] == 0: if coeff[z2] == 0: # Equations of the form Ax*2 + Eyz = 0. A = coeff[x*2] E = coeff[yz] b, a = _rational_pq(-E, A) x_0, y_0, z_0 = b, a, b else: # Ax*2 + Eyz + Fz*2 = 0 var[0], var[2] = _var[2], _var[0] z_0, y_0, x_0 = _diop_ternary_quadratic(var, coeff) else: # Ax*2 + Dy*2 + Eyz + Fz2 = 0, C may be zero var[0], var[1] = _var[1], _var[0] y_0, x_0, z_0 = _diop_ternary_quadratic(var, coeff) else: # Ax2 + Dy2 + Fz2 = 0, C may be zero x_0, y_0, z_0 = _diop_ternary_quadratic_normal(var, coeff) return _remove_gcd(x_0, y_0, z_0) def transformation_to_normal(eq): """ Returns the transformation Matrix that converts a general ternary quadratic equation `eq` (`ax^2 + by^2 + cz^2 + dxy + eyz + fxz`) to a form without cross terms: `ax^2 + by^2 + cz^2 = 0`. This is not used in solving ternary quadratics; it is only implemented for the sake of completeness. """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type in ( "homogeneous_ternary_quadratic", "homogeneous_ternary_quadratic_normal"): return _transformation_to_normal(var, coeff) def _transformation_to_normal(var, coeff): _var = list(var) # copy x, y, z = var if not any(coeff[i2] for i in var): # https://math.stackexchange.com/questions/448051/transform-quadratic-ternary-form-to-normal-form/448065#448065 a = coeff[xy] b = coeff[yz] c = coeff[xz] swap = False if not a: # b can't be 0 or else there aren't 3 vars swap = True a, b = b, a T = Matrix(((1, 1, -b/a), (1, -1, -c/a), (0, 0, 1))) if swap: T.row_swap(0, 1) T.col_swap(0, 1) return T if coeff[x2] == 0: # If the coefficient of x is zero change the variables if coeff[y2] == 0: _var[0], _var[2] = var[2], var[0] T = _transformation_to_normal(_var, coeff) T.row_swap(0, 2) T.col_swap(0, 2) return T else: _var[0], _var[1] = var[1], var[0] T = _transformation_to_normal(_var, coeff) T.row_swap(0, 1) T.col_swap(0, 1) return T # Apply the transformation x --> X - (BY + CZ)/(2A) if coeff[xy] != 0 or coeff[xz] != 0: A = coeff[x*2] B = coeff[xy] C = coeff[xz] D = coeff[y2] E = coeff[yz] F = coeff[z2] _coeff = dict() _coeff[x2] = 4A2 _coeff[y2] = 4AD - B2 _coeff[z2] = 4AF - C2 _coeff[yz] = 4AE - 2BC _coeff[xy] = 0 _coeff[xz] = 0 T_0 = _transformation_to_normal(_var, _coeff) return Matrix(3, 3, [1, S(-B)/(2A), S(-C)/(2A), 0, 1, 0, 0, 0, 1])T_0 elif coeff[yz] != 0: if coeff[y2] == 0: if coeff[z2] == 0: # Equations of the form Ax2 + Eyz = 0. # Apply transformation y -> Y + Z ans z -> Y - Z return Matrix(3, 3, [1, 0, 0, 0, 1, 1, 0, 1, -1]) else: # Ax*2 + Eyz + Fz*2 = 0 _var[0], _var[2] = var[2], var[0] T = _transformation_to_normal(_var, coeff) T.row_swap(0, 2) T.col_swap(0, 2) return T else: # Ax*2 + Dy*2 + Eyz + Fz2 = 0, F may be zero _var[0], _var[1] = var[1], var[0] T = _transformation_to_normal(_var, coeff) T.row_swap(0, 1) T.col_swap(0, 1) return T else: return Matrix.eye(3) def parametrize_ternary_quadratic(eq): """ Returns the parametrized general solution for the ternary quadratic equation ``eq`` which has the form `ax^2 + by^2 + cz^2 + fxy + gyz + hxz = 0`. Examples ======== >>> from sympy.abc import x, y, z >>> from sympy.solvers.diophantine import parametrize_ternary_quadratic >>> parametrize_ternary_quadratic(x2 + y2 - z2) (2pq, p2 - q2, p2 + q2) Here `p` and `q` are two co-prime integers. >>> parametrize_ternary_quadratic(3x2 + 2y2 - z2 - 2xy + 5yz - 7yz) (2p2 - 2pq - q2, 2p*2 + 2pq - q2, 2p*2 - 2pq + 3q*2) >>> parametrize_ternary_quadratic(124x*2 - 30y*2 - 7729z*2) (-1410p*2 - 363263q*2, 2700p*2 + 30916pq - 695610q*2, -60p*2 + 5400pq + 15458q*2) References ========== .. [1] The algorithmic resolution of Diophantine equations, Nigel P. Smart, London Mathematical Society Student Texts 41, Cambridge University Press, Cambridge, 1998. """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type in ( "homogeneous_ternary_quadratic", "homogeneous_ternary_quadratic_normal"): x_0, y_0, z_0 = _diop_ternary_quadratic(var, coeff) return _parametrize_ternary_quadratic( (x_0, y_0, z_0), var, coeff) def _parametrize_ternary_quadratic(solution, _var, coeff): # called for ax*2 + by*2 + cz*2 + dxy + eyz + fxz = 0 assert 1 not in coeff x_0, y_0, z_0 = solution v = list(_var) # copy if x_0 is None: return (None, None, None) if solution.count(0) >= 2: # if there are 2 zeros the equation reduces # to kX*2 == 0 where X is x, y, or z so X must # be zero, too. So there is only the trivial # solution. return (None, None, None) if x_0 == 0: v[0], v[1] = v[1], v[0] y_p, x_p, z_p = _parametrize_ternary_quadratic( (y_0, x_0, z_0), v, coeff) return x_p, y_p, z_p x, y, z = v r, p, q = symbols("r, p, q", integer=True) eq = sum(kv for k, v in coeff.items()) eq_1 = _mexpand(eq.subs(zip( (x, y, z), (rx_0, ry_0 + p, rz_0 + q)))) A, B = eq_1.as_independent(r, as_Add=True) x = Ax_0 y = (Ay_0 - _mexpand(B/rp)) z = (Az_0 - _mexpand(B/rq)) return x, y, z def diop_ternary_quadratic_normal(eq): """ Solves the quadratic ternary diophantine equation, `ax^2 + by^2 + cz^2 = 0`. Here the coefficients `a`, `b`, and `c` should be non zero. Otherwise the equation will be a quadratic binary or univariate equation. If solvable, returns a tuple `(x, y, z)` that satisfies the given equation. If the equation does not have integer solutions, `(None, None, None)` is returned. Usage ===== ``diop_ternary_quadratic_normal(eq)``: where ``eq`` is an equation of the form `ax^2 + by^2 + cz^2 = 0`. Examples ======== >>> from sympy.abc import x, y, z >>> from sympy.solvers.diophantine import diop_ternary_quadratic_normal >>> diop_ternary_quadratic_normal(x*2 + 3y2 - z2) (1, 0, 1) >>> diop_ternary_quadratic_normal(4x2 + 5y2 - z2) (1, 0, 2) >>> diop_ternary_quadratic_normal(34x2 - 3y*2 - 301z2) (4, 9, 1) """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "homogeneous_ternary_quadratic_normal": return _diop_ternary_quadratic_normal(var, coeff) def _diop_ternary_quadratic_normal(var, coeff): x, y, z = var a = coeff[x2] b = coeff[y2] c = coeff[z2] try: assert len([k for k in coeff if coeff[k]]) == 3 assert all(coeff[i*2] for i in var) except AssertionError: raise ValueError(filldedent(''' coeff dict is not consistent with assumption of this routine: coefficients should be those of an expression in the form ax*2 + by*2 + cz*2 where abc != 0.''')) (sqf_of_a, sqf_of_b, sqf_of_c), (a_1, b_1, c_1), (a_2, b_2, c_2) = \ sqf_normal(a, b, c, steps=True) A = -a_2c_2 B = -b_2c_2 # If following two conditions are satisfied then there are no solutions if A < 0 and B < 0: return (None, None, None) if ( sqrt_mod(-b_2c_2, a_2) is None or sqrt_mod(-c_2a_2, b_2) is None or sqrt_mod(-a_2b_2, c_2) is None): return (None, None, None) z_0, x_0, y_0 = descent(A, B) z_0, q = _rational_pq(z_0, abs(c_2)) x_0 = q y_0 = q x_0, y_0, z_0 = _remove_gcd(x_0, y_0, z_0) # Holzer reduction if sign(a) == sign(b): x_0, y_0, z_0 = holzer(x_0, y_0, z_0, abs(a_2), abs(b_2), abs(c_2)) elif sign(a) == sign(c): x_0, z_0, y_0 = holzer(x_0, z_0, y_0, abs(a_2), abs(c_2), abs(b_2)) else: y_0, z_0, x_0 = holzer(y_0, z_0, x_0, abs(b_2), abs(c_2), abs(a_2)) x_0 = reconstruct(b_1, c_1, x_0) y_0 = reconstruct(a_1, c_1, y_0) z_0 = reconstruct(a_1, b_1, z_0) sq_lcm = ilcm(sqf_of_a, sqf_of_b, sqf_of_c) x_0 = abs(x_0sq_lcm//sqf_of_a) y_0 = abs(y_0sq_lcm//sqf_of_b) z_0 = abs(z_0sq_lcm//sqf_of_c) return _remove_gcd(x_0, y_0, z_0) def sqf_normal(a, b, c, steps=False): """ Return `a', b', c'`, the coefficients of the square-free normal form of `ax^2 + by^2 + cz^2 = 0`, where `a', b', c'` are pairwise prime. If `steps` is True then also return three tuples: `sq`, `sqf`, and `(a', b', c')` where `sq` contains the square factors of `a`, `b` and `c` after removing the `gcd(a, b, c)`; `sqf` contains the values of `a`, `b` and `c` after removing both the `gcd(a, b, c)` and the square factors. The solutions for `ax^2 + by^2 + cz^2 = 0` can be recovered from the solutions of `a'x^2 + b'y^2 + c'z^2 = 0`. Examples ======== >>> from sympy.solvers.diophantine import sqf_normal >>> sqf_normal(2 3*2 5, 2 * 5 * 11, 2 * 7*2 11) (11, 1, 5) >>> sqf_normal(2 * 3*2 5, 2 * 5 * 11, 2 * 7*2 11, True) ((3, 1, 7), (5, 55, 11), (11, 1, 5)) References ========== .. [1] Legendre's Theorem, Legrange's Descent, http://public.csusm.edu/aitken_html/notes/legendre.pdf See Also ======== reconstruct() """ ABC = _remove_gcd(a, b, c) sq = tuple(square_factor(i) for i in ABC) sqf = A, B, C = tuple([i//j*2 for i,j in zip(ABC, sq)]) pc = igcd(A, B) A /= pc B /= pc pa = igcd(B, C) B /= pa C /= pa pb = igcd(A, C) A /= pb B /= pb A = pa B = pb C = pc if steps: return (sq, sqf, (A, B, C)) else: return A, B, C def square_factor(a): r""" Returns an integer `c` s.t. `a = c^2k, \ c,k \in Z`. Here `k` is square free. `a` can be given as an integer or a dictionary of factors. Examples ======== >>> from sympy.solvers.diophantine import square_factor >>> square_factor(24) 2 >>> square_factor(-363) 6 >>> square_factor(1) 1 >>> square_factor({3: 2, 2: 1, -1: 1}) # -18 3 See Also ======== sympy.ntheory.factor_.core """ f = a if isinstance(a, dict) else factorint(a) return Mul([p*(e//2) for p, e in f.items()]) def reconstruct(A, B, z): """ Reconstruct the `z` value of an equivalent solution of `ax^2 + by^2 + cz^2` from the `z` value of a solution of the square-free normal form of the equation, `a'x^2 + b'y^2 + c'z^2`, where `a'`, `b'` and `c'` are square free and `gcd(a', b', c') == 1`. """ f = factorint(igcd(A, B)) for p, e in f.items(): if e != 1: raise ValueError('a and b should be square-free') z = p return z def ldescent(A, B): """ Return a non-trivial solution to `w^2 = Ax^2 + By^2` using Lagrange's method; return None if there is no such solution. . Here, `A \\neq 0` and `B \\neq 0` and `A` and `B` are square free. Output a tuple `(w_0, x_0, y_0)` which is a solution to the above equation. Examples ======== >>> from sympy.solvers.diophantine import ldescent >>> ldescent(1, 1) # w^2 = x^2 + y^2 (1, 1, 0) >>> ldescent(4, -7) # w^2 = 4x^2 - 7y^2 (2, -1, 0) This means that `x = -1, y = 0` and `w = 2` is a solution to the equation `w^2 = 4x^2 - 7y^2` >>> ldescent(5, -1) # w^2 = 5x^2 - y^2 (2, 1, -1) References ========== .. [1] The algorithmic resolution of Diophantine equations, Nigel P. Smart, London Mathematical Society Student Texts 41, Cambridge University Press, Cambridge, 1998. .. [2] Efficient Solution of Rational Conices, J. E. Cremona and D. Rusin, [online], Available: http://eprints.nottingham.ac.uk/60/1/kvxefz87.pdf """ if abs(A) > abs(B): w, y, x = ldescent(B, A) return w, x, y if A == 1: return (1, 1, 0) if B == 1: return (1, 0, 1) if B == -1: # and A == -1 return r = sqrt_mod(A, B) Q = (r2 - A) // B if Q == 0: B_0 = 1 d = 0 else: div = divisors(Q) B_0 = None for i in div: sQ, _exact = integer_nthroot(abs(Q) // i, 2) if _exact: B_0, d = sign(Q)i, sQ break if B_0 is not None: W, X, Y = ldescent(A, B_0) return _remove_gcd((-AX + rW), (rX - W), Y(B_0d)) def descent(A, B): """ Returns a non-trivial solution, (x, y, z), to `x^2 = Ay^2 + Bz^2` using Lagrange's descent method with lattice-reduction. `A` and `B` are assumed to be valid for such a solution to exist. This is faster than the normal Lagrange's descent algorithm because the Gaussian reduction is used. Examples ======== >>> from sympy.solvers.diophantine import descent >>> descent(3, 1) # x2 = 3y2 + z2 (1, 0, 1) `(x, y, z) = (1, 0, 1)` is a solution to the above equation. >>> descent(41, -113) (-16, -3, 1) References ========== .. [1] Efficient Solution of Rational Conices, J. E. Cremona and D. Rusin, Mathematics of Computation, Volume 00, Number 0. """ if abs(A) > abs(B): x, y, z = descent(B, A) return x, z, y if B == 1: return (1, 0, 1) if A == 1: return (1, 1, 0) if B == -A: return (0, 1, 1) if B == A: x, z, y = descent(-1, A) return (Ay, z, x) w = sqrt_mod(A, B) x_0, z_0 = gaussian_reduce(w, A, B) t = (x_02 - Az_02) // B t_2 = square_factor(t) t_1 = t // t_22 x_1, z_1, y_1 = descent(A, t_1) return _remove_gcd(x_0x_1 + Az_0z_1, z_0x_1 + x_0z_1, t_1t_2y_1) def gaussian_reduce(w, a, b): r""" Returns a reduced solution `(x, z)` to the congruence `X^2 - aZ^2 \equiv 0 \ (mod \ b)` so that `x^2 + \|a\|z^2` is minimal. Details ======= Here ``w`` is a solution of the congruence `x^2 \equiv a \ (mod \ b)` References ========== .. [1] Gaussian lattice Reduction [online]. Available: http://home.ie.cuhk.edu.hk/~wkshum/wordpress/?p=404 .. [2] Efficient Solution of Rational Conices, J. E. Cremona and D. Rusin, Mathematics of Computation, Volume 00, Number 0. """ u = (0, 1) v = (1, 0) if dot(u, v, w, a, b) < 0: v = (-v[0], -v[1]) if norm(u, w, a, b) < norm(v, w, a, b): u, v = v, u while norm(u, w, a, b) > norm(v, w, a, b): k = dot(u, v, w, a, b) // dot(v, v, w, a, b) u, v = v, (u[0]- kv[0], u[1]- kv[1]) u, v = v, u if dot(u, v, w, a, b) < dot(v, v, w, a, b)/2 or norm((u[0]-v[0], u[1]-v[1]), w, a, b) > norm(v, w, a, b): c = v else: c = (u[0] - v[0], u[1] - v[1]) return c[0]w + bc[1], c[0] def dot(u, v, w, a, b): r""" Returns a special dot product of the vectors `u = (u_{1}, u_{2})` and `v = (v_{1}, v_{2})` which is defined in order to reduce solution of the congruence equation `X^2 - aZ^2 \equiv 0 \ (mod \ b)`. """ u_1, u_2 = u v_1, v_2 = v return (wu_1 + bu_2)(wv_1 + bv_2) + abs(a)u_1v_1 def norm(u, w, a, b): r""" Returns the norm of the vector `u = (u_{1}, u_{2})` under the dot product defined by `u \cdot v = (wu_{1} + bu_{2})(wv_{1} + bv_{2}) + \|a\|u_{1}v_{1}` where `u = (u_{1}, u_{2})` and `v = (v_{1}, v_{2})`. """ u_1, u_2 = u return sqrt(dot((u_1, u_2), (u_1, u_2), w, a, b)) def holzer(x, y, z, a, b, c): r""" Simplify the solution `(x, y, z)` of the equation `ax^2 + by^2 = cz^2` with `a, b, c > 0` and `z^2 \geq \mid ab \mid` to a new reduced solution `(x', y', z')` such that `z'^2 \leq \mid ab \mid`. The algorithm is an interpretation of Mordell's reduction as described on page 8 of Cremona and Rusin's paper [1]_ and the work of Mordell in reference [2]_. References ========== .. [1] Efficient Solution of Rational Conices, J. E. Cremona and D. Rusin, Mathematics of Computation, Volume 00, Number 0. .. [2] Diophantine Equations, L. J. Mordell, page 48. """ if _odd(c): k = 2c else: k = c//2 small = abc step = 0 while True: t1, t2, t3 = ax2, by*2, cz*2 # check that it's a solution if t1 + t2 != t3: if step == 0: raise ValueError('bad starting solution') break x_0, y_0, z_0 = x, y, z if max(t1, t2, t3) <= small: # Holzer condition break uv = u, v = base_solution_linear(k, y_0, -x_0) if None in uv: break p, q = -(aux_0 + bvy_0), cz_0 r = Rational(p, q) if _even(c): w = _nint_or_floor(p, q) assert abs(w - r) <= S.Half else: w = p//q # floor if _odd(au + bv + cw): w += 1 assert abs(w - r) <= S.One A = (au*2 + bv*2 + cw*2) B = (aux_0 + bvy_0 + cwz_0) x = Rational(x_0A - 2uB, k) y = Rational(y_0A - 2vB, k) z = Rational(z_0A - 2wB, k) assert all(i.is_Integer for i in (x, y, z)) step += 1 return tuple([int(i) for i in (x_0, y_0, z_0)]) def diop_general_pythagorean(eq, param=symbols("m", integer=True)): """ Solves the general pythagorean equation, `a_{1}^2x_{1}^2 + a_{2}^2x_{2}^2 + . . . + a_{n}^2x_{n}^2 - a_{n + 1}^2x_{n + 1}^2 = 0`. Returns a tuple which contains a parametrized solution to the equation, sorted in the same order as the input variables. Usage ===== ``diop_general_pythagorean(eq, param)``: where ``eq`` is a general pythagorean equation which is assumed to be zero and ``param`` is the base parameter used to construct other parameters by subscripting. Examples ======== >>> from sympy.solvers.diophantine import diop_general_pythagorean >>> from sympy.abc import a, b, c, d, e >>> diop_general_pythagorean(a2 + b2 + c2 - d2) (m12 + m22 - m3*2, 2m1m3, 2m2m3, m12 + m22 + m32) >>> diop_general_pythagorean(9a*2 - 4b*2 + 16c*2 + 25d2 + e2) (10m12 + 10m2*2 + 10m3*2 - 10m4*2, 15m1*2 + 15m2*2 + 15m3*2 + 15m4*2, 15m1m4, 12m2m4, 60m3m4) """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "general_pythagorean": return _diop_general_pythagorean(var, coeff, param) def _diop_general_pythagorean(var, coeff, t): if sign(coeff[var[0]2]) + sign(coeff[var[1]2]) + sign(coeff[var[2]2]) < 0: for key in coeff.keys(): coeff[key] = -coeff[key] n = len(var) index = 0 for i, v in enumerate(var): if sign(coeff[v2]) == -1: index = i m = symbols('%s1:%i' % (t, n), integer=True) ith = sum(m_i2 for m_i in m) L = [ith - 2m[n - 2]*2] L.extend([2m[i]m[n-2] for i in range(n - 2)]) sol = L[:index] + [ith] + L[index:] lcm = 1 for i, v in enumerate(var): if i == index or (index > 0 and i == 0) or (index == 0 and i == 1): lcm = ilcm(lcm, sqrt(abs(coeff[v2]))) else: s = sqrt(coeff[v2]) lcm = ilcm(lcm, s if _odd(s) else s//2) for i, v in enumerate(var): sol[i] = (lcmsol[i]) / sqrt(abs(coeff[v2])) return tuple(sol) def diop_general_sum_of_squares(eq, limit=1): r""" Solves the equation `x_{1}^2 + x_{2}^2 + . . . + x_{n}^2 - k = 0`. Returns at most ``limit`` number of solutions. Usage ===== ``general_sum_of_squares(eq, limit)`` : Here ``eq`` is an expression which is assumed to be zero. Also, ``eq`` should be in the form, `x_{1}^2 + x_{2}^2 + . . . + x_{n}^2 - k = 0`. Details ======= When `n = 3` if `k = 4^a(8m + 7)` for some `a, m \in Z` then there will be no solutions. Refer [1]_ for more details. Examples ======== >>> from sympy.solvers.diophantine import diop_general_sum_of_squares >>> from sympy.abc import a, b, c, d, e, f >>> diop_general_sum_of_squares(a2 + b2 + c2 + d2 + e2 - 2345) {(15, 22, 22, 24, 24)} Reference ========= .. [1] Representing an integer as a sum of three squares, [online], Available: http://www.proofwiki.org/wiki/Integer_as_Sum_of_Three_Squares """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "general_sum_of_squares": return _diop_general_sum_of_squares(var, -coeff[1], limit) def _diop_general_sum_of_squares(var, k, limit=1): # solves Eq(sum(i*2 for i in var), k) n = len(var) if n < 3: raise ValueError('n must be greater than 2') s = set() if k < 0 or limit < 1: return s sign = [-1 if x.is_nonpositive else 1 for x in var] negs = sign.count(-1) != 0 took = 0 for t in sum_of_squares(k, n, zeros=True): if negs: s.add(tuple([sign[i]j for i, j in enumerate(t)])) else: s.add(t) took += 1 if took == limit: break return s def diop_general_sum_of_even_powers(eq, limit=1): """ Solves the equation `x_{1}^e + x_{2}^e + . . . + x_{n}^e - k = 0` where `e` is an even, integer power. Returns at most ``limit`` number of solutions. Usage ===== ``general_sum_of_even_powers(eq, limit)`` : Here ``eq`` is an expression which is assumed to be zero. Also, ``eq`` should be in the form, `x_{1}^e + x_{2}^e + . . . + x_{n}^e - k = 0`. Examples ======== >>> from sympy.solvers.diophantine import diop_general_sum_of_even_powers >>> from sympy.abc import a, b >>> diop_general_sum_of_even_powers(a4 + b4 - (24 + 34)) {(2, 3)} See Also ======== power_representation() """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "general_sum_of_even_powers": for k in coeff.keys(): if k.is_Pow and coeff[k]: p = k.exp return _diop_general_sum_of_even_powers(var, p, -coeff[1], limit) def _diop_general_sum_of_even_powers(var, p, n, limit=1): # solves Eq(sum(i*2 for i in var), n) k = len(var) s = set() if n < 0 or limit < 1: return s sign = [-1 if x.is_nonpositive else 1 for x in var] negs = sign.count(-1) != 0 took = 0 for t in power_representation(n, p, k): if negs: s.add(tuple([sign[i]j for i, j in enumerate(t)])) else: s.add(t) took += 1 if took == limit: break return s ## Functions below this comment can be more suitably grouped under ## an Additive number theory module rather than the Diophantine ## equation module. def partition(n, k=None, zeros=False): """ Returns a generator that can be used to generate partitions of an integer `n`. A partition of `n` is a set of positive integers which add up to `n`. For example, partitions of 3 are 3, 1 + 2, 1 + 1 + 1. A partition is returned as a tuple. If ``k`` equals None, then all possible partitions are returned irrespective of their size, otherwise only the partitions of size ``k`` are returned. If the ``zero`` parameter is set to True then a suitable number of zeros are added at the end of every partition of size less than ``k``. ``zero`` parameter is considered only if ``k`` is not None. When the partitions are over, the last `next()` call throws the ``StopIteration`` exception, so this function should always be used inside a try - except block. Details ======= ``partition(n, k)``: Here ``n`` is a positive integer and ``k`` is the size of the partition which is also positive integer. Examples ======== >>> from sympy.solvers.diophantine import partition >>> f = partition(5) >>> next(f) (1, 1, 1, 1, 1) >>> next(f) (1, 1, 1, 2) >>> g = partition(5, 3) >>> next(g) (1, 1, 3) >>> next(g) (1, 2, 2) >>> g = partition(5, 3, zeros=True) >>> next(g) (0, 0, 5) """ from sympy.utilities.iterables import ordered_partitions if not zeros or k is None: for i in ordered_partitions(n, k): yield tuple(i) else: for m in range(1, k + 1): for i in ordered_partitions(n, m): i = tuple(i) yield (0,)(k - len(i)) + i def prime_as_sum_of_two_squares(p): """ Represent a prime `p` as a unique sum of two squares; this can only be done if the prime is congruent to 1 mod 4. Examples ======== >>> from sympy.solvers.diophantine import prime_as_sum_of_two_squares >>> prime_as_sum_of_two_squares(7) # can't be done >>> prime_as_sum_of_two_squares(5) (1, 2) Reference ========= .. [1] Representing a number as a sum of four squares, [online], Available: http://schorn.ch/lagrange.html See Also ======== sum_of_squares() """ if not p % 4 == 1: return if p % 8 == 5: b = 2 else: b = 3 while pow(b, (p - 1) // 2, p) == 1: b = nextprime(b) b = pow(b, (p - 1) // 4, p) a = p while b2 > p: a, b = b, a % b return (int(a % b), int(b)) # convert from long def sum_of_three_squares(n): r""" Returns a 3-tuple `(a, b, c)` such that `a^2 + b^2 + c^2 = n` and `a, b, c \geq 0`. Returns None if `n = 4^a(8m + 7)` for some `a, m \in Z`. See [1]_ for more details. Usage ===== ``sum_of_three_squares(n)``: Here ``n`` is a non-negative integer. Examples ======== >>> from sympy.solvers.diophantine import sum_of_three_squares >>> sum_of_three_squares(44542) (18, 37, 207) References ========== .. [1] Representing a number as a sum of three squares, [online], Available: http://schorn.ch/lagrange.html See Also ======== sum_of_squares() """ special = {1:(1, 0, 0), 2:(1, 1, 0), 3:(1, 1, 1), 10: (1, 3, 0), 34: (3, 3, 4), 58:(3, 7, 0), 85:(6, 7, 0), 130:(3, 11, 0), 214:(3, 6, 13), 226:(8, 9, 9), 370:(8, 9, 15), 526:(6, 7, 21), 706:(15, 15, 16), 730:(1, 27, 0), 1414:(6, 17, 33), 1906:(13, 21, 36), 2986: (21, 32, 39), 9634: (56, 57, 57)} v = 0 if n == 0: return (0, 0, 0) v = multiplicity(4, n) n //= 4v if n % 8 == 7: return if n in special.keys(): x, y, z = special[n] return _sorted_tuple(2vx, 2*vy, 2*vz) s, _exact = integer_nthroot(n, 2) if _exact: return (2*vs, 0, 0) x = None if n % 8 == 3: s = s if _odd(s) else s - 1 for x in range(s, -1, -2): N = (n - x2) // 2 if isprime(N): y, z = prime_as_sum_of_two_squares(N) return _sorted_tuple(2vx, 2v(y + z), 2*vabs(y - z)) return if n % 8 == 2 or n % 8 == 6: s = s if _odd(s) else s - 1 else: s = s - 1 if _odd(s) else s for x in range(s, -1, -2): N = n - x2 if isprime(N): y, z = prime_as_sum_of_two_squares(N) return _sorted_tuple(2vx, 2vy, 2*vz) def sum_of_four_squares(n): r""" Returns a 4-tuple `(a, b, c, d)` such that `a^2 + b^2 + c^2 + d^2 = n`. Here `a, b, c, d \geq 0`. Usage ===== ``sum_of_four_squares(n)``: Here ``n`` is a non-negative integer. Examples ======== >>> from sympy.solvers.diophantine import sum_of_four_squares >>> sum_of_four_squares(3456) (8, 8, 32, 48) >>> sum_of_four_squares(1294585930293) (0, 1234, 2161, 1137796) References ========== .. [1] Representing a number as a sum of four squares, [online], Available: http://schorn.ch/lagrange.html See Also ======== sum_of_squares() """ if n == 0: return (0, 0, 0, 0) v = multiplicity(4, n) n //= 4v if n % 8 == 7: d = 2 n = n - 4 elif n % 8 == 6 or n % 8 == 2: d = 1 n = n - 1 else: d = 0 x, y, z = sum_of_three_squares(n) return _sorted_tuple(2vd, 2vx, 2*vy, 2*vz) def power_representation(n, p, k, zeros=False): """ Returns a generator for finding k-tuples of integers, `(n_{1}, n_{2}, . . . n_{k})`, such that `n = n_{1}^p + n_{2}^p + . . . n_{k}^p`. Usage ===== ``power_representation(n, p, k, zeros)``: Represent non-negative number ``n`` as a sum of ``k`` ``p``th powers. If ``zeros`` is true, then the solutions is allowed to contain zeros. Examples ======== >>> from sympy.solvers.diophantine import power_representation Represent 1729 as a sum of two cubes: >>> f = power_representation(1729, 3, 2) >>> next(f) (9, 10) >>> next(f) (1, 12) If the flag `zeros` is True, the solution may contain tuples with zeros; any such solutions will be generated after the solutions without zeros: >>> list(power_representation(125, 2, 3, zeros=True)) [(5, 6, 8), (3, 4, 10), (0, 5, 10), (0, 2, 11)] For even `p` the `permute_sign` function can be used to get all signed values: >>> from sympy.utilities.iterables import permute_signs >>> list(permute_signs((1, 12))) [(1, 12), (-1, 12), (1, -12), (-1, -12)] All possible signed permutations can also be obtained: >>> from sympy.utilities.iterables import signed_permutations >>> list(signed_permutations((1, 12))) [(1, 12), (-1, 12), (1, -12), (-1, -12), (12, 1), (-12, 1), (12, -1), (-12, -1)] """ n, p, k = [as_int(i) for i in (n, p, k)] if n < 0: if p % 2: for t in power_representation(-n, p, k, zeros): yield tuple(-i for i in t) return if p < 1 or k < 1: raise ValueError(filldedent(''' Expecting positive integers for `(p, k)`, but got `(%s, %s)`''' % (p, k))) if n == 0: if zeros: yield (0,)k return if k == 1: if p == 1: yield (n,) else: be = perfect_power(n) if be: b, e = be d, r = divmod(e, p) if not r: yield (bd,) return if p == 1: for t in partition(n, k, zeros=zeros): yield t return if p == 2: feasible = _can_do_sum_of_squares(n, k) if not feasible: return if not zeros and n > 33 and k >= 5 and k <= n and n - k in ( 13, 10, 7, 5, 4, 2, 1): '''Todd G. Will, "When Is n^2 a Sum of k Squares?", [online]. Available: https://www.maa.org/sites/default/files/Will-MMz-201037918.pdf''' return if feasible is not True: # it's prime and k == 2 yield prime_as_sum_of_two_squares(n) return if k == 2 and p > 2: be = perfect_power(n) if be and be[1] % p == 0: return # Fermat: an + bn = cn has no solution for n > 2 if n >= k: a = integer_nthroot(n - (k - 1), p)[0] for t in pow_rep_recursive(a, k, n, [], p): yield tuple(reversed(t)) if zeros: a = integer_nthroot(n, p)[0] for i in range(1, k): for t in pow_rep_recursive(a, i, n, [], p): yield tuple(reversed(t + (0,) (k - i))) sum_of_powers = power_representation def pow_rep_recursive(n_i, k, n_remaining, terms, p): if k == 0 and n_remaining == 0: yield tuple(terms) else: if n_i >= 1 and k > 0: for t in pow_rep_recursive(n_i - 1, k, n_remaining, terms, p): yield t residual = n_remaining - pow(n_i, p) if residual >= 0: for t in pow_rep_recursive(n_i, k - 1, residual, terms + [n_i], p): yield t def sum_of_squares(n, k, zeros=False): """Return a generator that yields the k-tuples of nonnegative values, the squares of which sum to n. If zeros is False (default) then the solution will not contain zeros. The nonnegative elements of a tuple are sorted. * If k == 1 and n is square, (n,) is returned. * If k == 2 then n can only be written as a sum of squares if every prime in the factorization of n that has the form 4k + 3 has an even multiplicity. If n is prime then it can only be written as a sum of two squares if it is in the form 4k + 1. * if k == 3 then n can be written as a sum of squares if it does not have the form 4*m(8k + 7). all integers can be written as the sum of 4 squares. * if k > 4 then n can be partitioned and each partition can be written as a sum of 4 squares; if n is not evenly divisible by 4 then n can be written as a sum of squares only if the an additional partition can be written as sum of squares. For example, if k = 6 then n is partitioned into two parts, the first being written as a sum of 4 squares and the second being written as a sum of 2 squares -- which can only be done if the condition above for k = 2 can be met, so this will automatically reject certain partitions of n. Examples ======== >>> from sympy.solvers.diophantine import sum_of_squares >>> list(sum_of_squares(25, 2)) [(3, 4)] >>> list(sum_of_squares(25, 2, True)) [(3, 4), (0, 5)] >>> list(sum_of_squares(25, 4)) [(1, 2, 2, 4)] See Also ======== sympy.utilities.iterables.signed_permutations """ for t in power_representation(n, 2, k, zeros): yield t def _can_do_sum_of_squares(n, k): """Return True if n can be written as the sum of k squares, False if it can't, or 1 if k == 2 and n is prime (in which case it can be written as a sum of two squares). A False is returned only if it can't be written as k-squares, even if 0s are allowed. """ if k < 1: return False if n < 0: return False if n == 0: return True if k == 1: return is_square(n) if k == 2: if n in (1, 2): return True if isprime(n): if n % 4 == 1: return 1 # signal that it was prime return False else: f = factorint(n) for p, m in f.items(): # we can proceed iff no prime factor in the form 4k + 3 # has an odd multiplicity if (p % 4 == 3) and m % 2: return False return True if k == 3: if (n//4*multiplicity(4, n)) % 8 == 7: return False # every number can be written as a sum of 4 squares; for k > 4 partitions # can be 0 return True
ca4841fbd70c9c13d35d507188a6cd465cc2a838dc23588e2820d298cd7dc464	""" This module contain solvers for all kinds of equations: - algebraic or transcendental, use solve() - recurrence, use rsolve() - differential, use dsolve() - nonlinear (numerically), use nsolve() (you will need a good starting point) """ from __future__ import print_function, division from sympy import divisors from sympy.core.compatibility import (iterable, is_sequence, ordered, default_sort_key, range) from sympy.core.sympify import sympify from sympy.core import (S, Add, Symbol, Equality, Dummy, Expr, Mul, Pow, Unequality) from sympy.core.exprtools import factor_terms from sympy.core.function import (expand_mul, expand_log, Derivative, AppliedUndef, UndefinedFunction, nfloat, Function, expand_power_exp, Lambda, _mexpand, expand) from sympy.integrals.integrals import Integral from sympy.core.numbers import ilcm, Float, Rational from sympy.core.relational import Relational, Ge from sympy.core.logic import fuzzy_not, fuzzy_and from sympy.core.power import integer_log from sympy.logic.boolalg import And, Or, BooleanAtom from sympy.core.basic import preorder_traversal from sympy.functions import (log, exp, LambertW, cos, sin, tan, acos, asin, atan, Abs, re, im, arg, sqrt, atan2) from sympy.functions.elementary.trigonometric import (TrigonometricFunction, HyperbolicFunction) from sympy.simplify import (simplify, collect, powsimp, posify, powdenest, nsimplify, denom, logcombine, sqrtdenest, fraction) from sympy.simplify.sqrtdenest import sqrt_depth from sympy.simplify.fu import TR1 from sympy.matrices import Matrix, zeros from sympy.polys import roots, cancel, factor, Poly, degree from sympy.polys.polyerrors import GeneratorsNeeded, PolynomialError from sympy.functions.elementary.piecewise import piecewise_fold, Piecewise from sympy.utilities.lambdify import lambdify from sympy.utilities.misc import filldedent from sympy.utilities.iterables import uniq, generate_bell, flatten from sympy.utilities.decorator import conserve_mpmath_dps from mpmath import findroot from sympy.solvers.polysys import solve_poly_system from sympy.solvers.inequalities import reduce_inequalities from types import GeneratorType from collections import defaultdict import warnings def recast_to_symbols(eqs, symbols): """Return (e, s, d) where e and s are versions of eqs and symbols in which any non-Symbol objects in symbols have been replaced with generic Dummy symbols and d is a dictionary that can be used to restore the original expressions. Examples ======== >>> from sympy.solvers.solvers import recast_to_symbols >>> from sympy import symbols, Function >>> x, y = symbols('x y') >>> fx = Function('f')(x) >>> eqs, syms = [fx + 1, x, y], [fx, y] >>> e, s, d = recast_to_symbols(eqs, syms); (e, s, d) ([_X0 + 1, x, y], [_X0, y], {_X0: f(x)}) The original equations and symbols can be restored using d: >>> assert [i.xreplace(d) for i in eqs] == eqs >>> assert [d.get(i, i) for i in s] == syms """ if not iterable(eqs) and iterable(symbols): raise ValueError('Both eqs and symbols must be iterable') new_symbols = list(symbols) swap_sym = {} for i, s in enumerate(symbols): if not isinstance(s, Symbol) and s not in swap_sym: swap_sym[s] = Dummy('X%d' % i) new_symbols[i] = swap_sym[s] new_f = [] for i in eqs: isubs = getattr(i, 'subs', None) if isubs is not None: new_f.append(isubs(swap_sym)) else: new_f.append(i) swap_sym = {v: k for k, v in swap_sym.items()} return new_f, new_symbols, swap_sym def _ispow(e): """Return True if e is a Pow or is exp.""" return isinstance(e, Expr) and (e.is_Pow or isinstance(e, exp)) def _simple_dens(f, symbols): # when checking if a denominator is zero, we can just check the # base of powers with nonzero exponents since if the base is zero # the power will be zero, too. To keep it simple and fast, we # limit simplification to exponents that are Numbers dens = set() for d in denoms(f, symbols): if d.is_Pow and d.exp.is_Number: if d.exp.is_zero: continue # foo*0 is never 0 d = d.base dens.add(d) return dens def denoms(eq, symbols): """Return (recursively) set of all denominators that appear in eq that contain any symbol in ``symbols``; if ``symbols`` are not provided then all denominators will be returned. Examples ======== >>> from sympy.solvers.solvers import denoms >>> from sympy.abc import x, y, z >>> from sympy import sqrt >>> denoms(x/y) {y} >>> denoms(x/(yz)) {y, z} >>> denoms(3/x + y/z) {x, z} >>> denoms(x/2 + y/z) {2, z} If `symbols` are provided then only denominators containing those symbols will be returned >>> denoms(1/x + 1/y + 1/z, y, z) {y, z} """ pot = preorder_traversal(eq) dens = set() for p in pot: den = denom(p) if den is S.One: continue for d in Mul.make_args(den): dens.add(d) if not symbols: return dens elif len(symbols) == 1: if iterable(symbols[0]): symbols = symbols[0] rv = [] for d in dens: free = d.free_symbols if any(s in free for s in symbols): rv.append(d) return set(rv) def checksol(f, symbol, sol=None, flags): """Checks whether sol is a solution of equation f == 0. Input can be either a single symbol and corresponding value or a dictionary of symbols and values. When given as a dictionary and flag ``simplify=True``, the values in the dictionary will be simplified. ``f`` can be a single equation or an iterable of equations. A solution must satisfy all equations in ``f`` to be considered valid; if a solution does not satisfy any equation, False is returned; if one or more checks are inconclusive (and none are False) then None is returned. Examples ======== >>> from sympy import symbols >>> from sympy.solvers import checksol >>> x, y = symbols('x,y') >>> checksol(x4 - 1, x, 1) True >>> checksol(x4 - 1, x, 0) False >>> checksol(x2 + y2 - 52, {x: 3, y: 4}) True To check if an expression is zero using checksol, pass it as ``f`` and send an empty dictionary for ``symbol``: >>> checksol(x2 + x - x(x + 1), {}) True None is returned if checksol() could not conclude. flags: 'numerical=True (default)' do a fast numerical check if ``f`` has only one symbol. 'minimal=True (default is False)' a very fast, minimal testing. 'warn=True (default is False)' show a warning if checksol() could not conclude. 'simplify=True (default)' simplify solution before substituting into function and simplify the function before trying specific simplifications 'force=True (default is False)' make positive all symbols without assumptions regarding sign. """ from sympy.physics.units import Unit minimal = flags.get('minimal', False) if sol is not None: sol = {symbol: sol} elif isinstance(symbol, dict): sol = symbol else: msg = 'Expecting (sym, val) or ({sym: val}, None) but got (%s, %s)' raise ValueError(msg % (symbol, sol)) if iterable(f): if not f: raise ValueError('no functions to check') rv = True for fi in f: check = checksol(fi, sol, *flags) if check: continue if check is False: return False rv = None # don't return, wait to see if there's a False return rv if isinstance(f, Poly): f = f.as_expr() elif isinstance(f, (Equality, Unequality)): if f.rhs in (S.true, S.false): f = f.reversed B, E = f.args if B in (S.true, S.false): f = f.subs(sol) if f not in (S.true, S.false): return else: f = f.rewrite(Add, evaluate=False) if isinstance(f, BooleanAtom): return bool(f) elif not f.is_Relational and not f: return True if sol and not f.free_symbols & set(sol.keys()): # if f(y) == 0, x=3 does not set f(y) to zero...nor does it not return None illegal = set([S.NaN, S.ComplexInfinity, S.Infinity, S.NegativeInfinity]) if any(sympify(v).atoms() & illegal for k, v in sol.items()): return False was = f attempt = -1 numerical = flags.get('numerical', True) while 1: attempt += 1 if attempt == 0: val = f.subs(sol) if isinstance(val, Mul): val = val.as_independent(Unit)[0] if val.atoms() & illegal: return False elif attempt == 1: if not val.is_number: if not val.is_constant(list(sol.keys()), simplify=not minimal): return False # there are free symbols -- simple expansion might work _, val = val.as_content_primitive() val = _mexpand(val.as_numer_denom()[0], recursive=True) elif attempt == 2: if minimal: return if flags.get('simplify', True): for k in sol: sol[k] = simplify(sol[k]) # start over without the failed expanded form, possibly # with a simplified solution val = simplify(f.subs(sol)) if flags.get('force', True): val, reps = posify(val) # expansion may work now, so try again and check exval = _mexpand(val, recursive=True) if exval.is_number: # we can decide now val = exval else: # if there are no radicals and no functions then this can't be # zero anymore -- can it? pot = preorder_traversal(expand_mul(val)) seen = set() saw_pow_func = False for p in pot: if p in seen: continue seen.add(p) if p.is_Pow and not p.exp.is_Integer: saw_pow_func = True elif p.is_Function: saw_pow_func = True elif isinstance(p, UndefinedFunction): saw_pow_func = True if saw_pow_func: break if saw_pow_func is False: return False if flags.get('force', True): # don't do a zero check with the positive assumptions in place val = val.subs(reps) nz = fuzzy_not(val.is_zero) if nz is not None: # issue 5673: nz may be True even when False # so these are just hacks to keep a false positive # from being returned # HACK 1: LambertW (issue 5673) if val.is_number and val.has(LambertW): # don't eval this to verify solution since if we got here, # numerical must be False return None # add other HACKs here if necessary, otherwise we assume # the nz value is correct return not nz break if val == was: continue elif val.is_Rational: return val == 0 if numerical and val.is_number: if val in (S.true, S.false): return bool(val) return bool(abs(val.n(18).n(12, chop=True)) < 1e-9) was = val if flags.get('warn', False): warnings.warn("\n\tWarning: could not verify solution %s." % sol) # returns None if it can't conclude # TODO: improve solution testing def failing_assumptions(expr, *assumptions): """Return a dictionary containing assumptions with values not matching those of the passed assumptions. Examples ======== >>> from sympy import failing_assumptions, Symbol >>> x = Symbol('x', real=True, positive=True) >>> y = Symbol('y') >>> failing_assumptions(6x + y, real=True, positive=True) {'positive': None, 'real': None} >>> failing_assumptions(x2 - 1, positive=True) {'positive': None} If all assumptions satisfy the `expr` an empty dictionary is returned. >>> failing_assumptions(x2, positive=True) {} """ expr = sympify(expr) failed = {} for key in list(assumptions.keys()): test = getattr(expr, 'is_%s' % key, None) if test is not assumptions[key]: failed[key] = test return failed # {} or {assumption: value != desired} def check_assumptions(expr, against=None, *assumptions): """Checks whether expression `expr` satisfies all assumptions. `assumptions` is a dict of assumptions: {'assumption': True\|False, ...}. Examples ======== >>> from sympy import Symbol, pi, I, exp, check_assumptions >>> check_assumptions(-5, integer=True) True >>> check_assumptions(pi, real=True, integer=False) True >>> check_assumptions(pi, real=True, negative=True) False >>> check_assumptions(exp(Ipi/7), real=False) True >>> x = Symbol('x', real=True, positive=True) >>> check_assumptions(2x + 1, real=True, positive=True) True >>> check_assumptions(-2x - 5, real=True, positive=True) False To check assumptions of ``expr`` against another variable or expression, pass the expression or variable as ``against``. >>> check_assumptions(2x + 1, x) True `None` is returned if check_assumptions() could not conclude. >>> check_assumptions(2x - 1, real=True, positive=True) >>> z = Symbol('z') >>> check_assumptions(z, real=True) See Also ======== failing_assumptions """ expr = sympify(expr) if against: if not isinstance(against, Symbol): raise TypeError('against should be of type Symbol') if assumptions: raise AssertionError('No assumptions should be specified') assumptions = against.assumptions0 def _test(key): v = getattr(expr, 'is_' + key, None) if v is not None: return assumptions[key] is v return fuzzy_and(_test(key) for key in assumptions) def solve(f, symbols, flags): r""" Algebraically solves equations and systems of equations. Currently supported are: - polynomial, - transcendental - piecewise combinations of the above - systems of linear and polynomial equations - systems containing relational expressions. Input is formed as: f - a single Expr or Poly that must be zero, - an Equality - a Relational expression - a Boolean - iterable of one or more of the above * symbols (object(s) to solve for) specified as - none given (other non-numeric objects will be used) - single symbol - denested list of symbols e.g. solve(f, x, y) - ordered iterable of symbols e.g. solve(f, [x, y]) * flags 'dict'=True (default is False) return list (perhaps empty) of solution mappings 'set'=True (default is False) return list of symbols and set of tuple(s) of solution(s) 'exclude=[] (default)' don't try to solve for any of the free symbols in exclude; if expressions are given, the free symbols in them will be extracted automatically. 'check=True (default)' If False, don't do any testing of solutions. This can be useful if one wants to include solutions that make any denominator zero. 'numerical=True (default)' do a fast numerical check if ``f`` has only one symbol. 'minimal=True (default is False)' a very fast, minimal testing. 'warn=True (default is False)' show a warning if checksol() could not conclude. 'simplify=True (default)' simplify all but polynomials of order 3 or greater before returning them and (if check is not False) use the general simplify function on the solutions and the expression obtained when they are substituted into the function which should be zero 'force=True (default is False)' make positive all symbols without assumptions regarding sign. 'rational=True (default)' recast Floats as Rational; if this option is not used, the system containing floats may fail to solve because of issues with polys. If rational=None, Floats will be recast as rationals but the answer will be recast as Floats. If the flag is False then nothing will be done to the Floats. 'manual=True (default is False)' do not use the polys/matrix method to solve a system of equations, solve them one at a time as you might "manually" 'implicit=True (default is False)' allows solve to return a solution for a pattern in terms of other functions that contain that pattern; this is only needed if the pattern is inside of some invertible function like cos, exp, .... 'particular=True (default is False)' instructs solve to try to find a particular solution to a linear system with as many zeros as possible; this is very expensive 'quick=True (default is False)' when using particular=True, use a fast heuristic instead to find a solution with many zeros (instead of using the very slow method guaranteed to find the largest number of zeros possible) 'cubics=True (default)' return explicit solutions when cubic expressions are encountered 'quartics=True (default)' return explicit solutions when quartic expressions are encountered 'quintics=True (default)' return explicit solutions (if possible) when quintic expressions are encountered Examples ======== The output varies according to the input and can be seen by example:: >>> from sympy import solve, Poly, Eq, Function, exp >>> from sympy.abc import x, y, z, a, b >>> f = Function('f') * boolean or univariate Relational >>> solve(x < 3) (-oo < x) & (x < 3) * to always get a list of solution mappings, use flag dict=True >>> solve(x - 3, dict=True) [{x: 3}] >>> sol = solve([x - 3, y - 1], dict=True) >>> sol [{x: 3, y: 1}] >>> sol[0][x] 3 >>> sol[0][y] 1 * to get a list of symbols and set of solution(s) use flag set=True >>> solve([x*2 - 3, y - 1], set=True) ([x, y], {(-sqrt(3), 1), (sqrt(3), 1)}) single expression and single symbol that is in the expression >>> solve(x - y, x) [y] >>> solve(x - 3, x) [3] >>> solve(Eq(x, 3), x) [3] >>> solve(Poly(x - 3), x) [3] >>> solve(x2 - y2, x, set=True) ([x], {(-y,), (y,)}) >>> solve(x*4 - 1, x, set=True) ([x], {(-1,), (1,), (-I,), (I,)}) single expression with no symbol that is in the expression >>> solve(3, x) [] >>> solve(x - 3, y) [] * single expression with no symbol given In this case, all free symbols will be selected as potential symbols to solve for. If the equation is univariate then a list of solutions is returned; otherwise -- as is the case when symbols are given as an iterable of length > 1 -- a list of mappings will be returned. >>> solve(x - 3) [3] >>> solve(x2 - y2) [{x: -y}, {x: y}] >>> solve(z*2x2 - z2y2) [{x: -y}, {x: y}, {z: 0}] >>> solve(z2x - z*2y2) [{x: y2}, {z: 0}] * when an object other than a Symbol is given as a symbol, it is isolated algebraically and an implicit solution may be obtained. This is mostly provided as a convenience to save one from replacing the object with a Symbol and solving for that Symbol. It will only work if the specified object can be replaced with a Symbol using the subs method. >>> solve(f(x) - x, f(x)) [x] >>> solve(f(x).diff(x) - f(x) - x, f(x).diff(x)) [x + f(x)] >>> solve(f(x).diff(x) - f(x) - x, f(x)) [-x + Derivative(f(x), x)] >>> solve(x + exp(x)*2, exp(x), set=True) ([exp(x)], {(-sqrt(-x),), (sqrt(-x),)}) >>> from sympy import Indexed, IndexedBase, Tuple, sqrt >>> A = IndexedBase('A') >>> eqs = Tuple(A[1] + A[2] - 3, A[1] - A[2] + 1) >>> solve(eqs, eqs.atoms(Indexed)) {A[1]: 1, A[2]: 2} To solve for a symbol implicitly, use 'implicit=True': >>> solve(x + exp(x), x) [-LambertW(1)] >>> solve(x + exp(x), x, implicit=True) [-exp(x)] * It is possible to solve for anything that can be targeted with subs: >>> solve(x + 2 + sqrt(3), x + 2) [-sqrt(3)] >>> solve((x + 2 + sqrt(3), x + 4 + y), y, x + 2) {y: -2 + sqrt(3), x + 2: -sqrt(3)} * Nothing heroic is done in this implicit solving so you may end up with a symbol still in the solution: >>> eqs = (xy + 3y + sqrt(3), x + 4 + y) >>> solve(eqs, y, x + 2) {y: -sqrt(3)/(x + 3), x + 2: (-2x - 6 + sqrt(3))/(x + 3)} >>> solve(eqs, yx, x) {x: -y - 4, xy: -3y - sqrt(3)} * if you attempt to solve for a number remember that the number you have obtained does not necessarily mean that the value is equivalent to the expression obtained: >>> solve(sqrt(2) - 1, 1) [sqrt(2)] >>> solve(x - y + 1, 1) # /!\ -1 is targeted, too [x/(y - 1)] >>> [_.subs(z, -1) for _ in solve((x - y + 1).subs(-1, z), 1)] [-x + y] * To solve for a function within a derivative, use dsolve. * single expression and more than 1 symbol * when there is a linear solution >>> solve(x - y2, x, y) [(y2, y)] >>> solve(x2 - y, x, y) [(x, x2)] >>> solve(x2 - y, x, y, dict=True) [{y: x2}] * when undetermined coefficients are identified * that are linear >>> solve((a + b)x - b + 2, a, b) {a: -2, b: 2} that are nonlinear >>> solve((a + b)x - b2 + 2, a, b, set=True) ([a, b], {(-sqrt(2), sqrt(2)), (sqrt(2), -sqrt(2))}) if there is no linear solution then the first successful attempt for a nonlinear solution will be returned >>> solve(x2 - y2, x, y, dict=True) [{x: -y}, {x: y}] >>> solve(x2 - y2/exp(x), x, y, dict=True) [{x: 2LambertW(-y/2)}, {x: 2LambertW(y/2)}] >>> solve(x2 - y2/exp(x), y, x) [(-xsqrt(exp(x)), x), (xsqrt(exp(x)), x)] * iterable of one or more of the above * involving relationals or bools >>> solve([x < 3, x - 2]) Eq(x, 2) >>> solve([x > 3, x - 2]) False * when the system is linear * with a solution >>> solve([x - 3], x) {x: 3} >>> solve((x + 5y - 2, -3x + 6y - 15), x, y) {x: -3, y: 1} >>> solve((x + 5y - 2, -3x + 6y - 15), x, y, z) {x: -3, y: 1} >>> solve((x + 5y - 2, -3x + 6y - z), z, x, y) {x: 2 - 5y, z: 21y - 6} without a solution >>> solve([x + 3, x - 3]) [] * when the system is not linear >>> solve([x2 + y -2, y2 - 4], x, y, set=True) ([x, y], {(-2, -2), (0, 2), (2, -2)}) * if no symbols are given, all free symbols will be selected and a list of mappings returned >>> solve([x - 2, x2 + y]) [{x: 2, y: -4}] >>> solve([x - 2, x2 + f(x)], {f(x), x}) [{x: 2, f(x): -4}] * if any equation doesn't depend on the symbol(s) given it will be eliminated from the equation set and an answer may be given implicitly in terms of variables that were not of interest >>> solve([x - y, y - 3], x) {x: y} Notes ===== solve() with check=True (default) will run through the symbol tags to elimate unwanted solutions. If no assumptions are included all possible solutions will be returned. >>> from sympy import Symbol, solve >>> x = Symbol("x") >>> solve(x2 - 1) [-1, 1] By using the positive tag only one solution will be returned: >>> pos = Symbol("pos", positive=True) >>> solve(pos2 - 1) [1] Assumptions aren't checked when `solve()` input involves relationals or bools. When the solutions are checked, those that make any denominator zero are automatically excluded. If you do not want to exclude such solutions then use the check=False option: >>> from sympy import sin, limit >>> solve(sin(x)/x) # 0 is excluded [pi] If check=False then a solution to the numerator being zero is found: x = 0. In this case, this is a spurious solution since sin(x)/x has the well known limit (without dicontinuity) of 1 at x = 0: >>> solve(sin(x)/x, check=False) [0, pi] In the following case, however, the limit exists and is equal to the value of x = 0 that is excluded when check=True: >>> eq = x*2(1/x - z2/x) >>> solve(eq, x) [] >>> solve(eq, x, check=False) [0] >>> limit(eq, x, 0, '-') 0 >>> limit(eq, x, 0, '+') 0 Disabling high-order, explicit solutions ---------------------------------------- When solving polynomial expressions, one might not want explicit solutions (which can be quite long). If the expression is univariate, CRootOf instances will be returned instead: >>> solve(x3 - x + 1) [-1/((-1/2 - sqrt(3)I/2)(3sqrt(69)/2 + 27/2)(1/3)) - (-1/2 - sqrt(3)I/2)(3sqrt(69)/2 + 27/2)*(1/3)/3, -(-1/2 + sqrt(3)I/2)(3sqrt(69)/2 + 27/2)*(1/3)/3 - 1/((-1/2 + sqrt(3)I/2)(3sqrt(69)/2 + 27/2)*(1/3)), -(3sqrt(69)/2 + 27/2)*(1/3)/3 - 1/(3sqrt(69)/2 + 27/2)(1/3)] >>> solve(x3 - x + 1, cubics=False) [CRootOf(x3 - x + 1, 0), CRootOf(x3 - x + 1, 1), CRootOf(x3 - x + 1, 2)] If the expression is multivariate, no solution might be returned: >>> solve(x3 - x + a, x, cubics=False) [] Sometimes solutions will be obtained even when a flag is False because the expression could be factored. In the following example, the equation can be factored as the product of a linear and a quadratic factor so explicit solutions (which did not require solving a cubic expression) are obtained: >>> eq = x*3 + 3x2 + x - 1 >>> solve(eq, cubics=False) [-1, -1 + sqrt(2), -sqrt(2) - 1] Solving equations involving radicals ------------------------------------ Because of SymPy's use of the principle root (issue #8789), some solutions to radical equations will be missed unless check=False: >>> from sympy import root >>> eq = root(x3 - 3x2, 3) + 1 - x >>> solve(eq) [] >>> solve(eq, check=False) [1/3] In the above example there is only a single solution to the equation. Other expressions will yield spurious roots which must be checked manually; roots which give a negative argument to odd-powered radicals will also need special checking: >>> from sympy import real_root, S >>> eq = root(x, 3) - root(x, 5) + S(1)/7 >>> solve(eq) # this gives 2 solutions but misses a 3rd [CRootOf(7_p*5 - 7_p3 + 1, 1)15, CRootOf(7_p5 - 7_p3 + 1, 2)15] >>> sol = solve(eq, check=False) >>> [abs(eq.subs(x,i).n(2)) for i in sol] [0.48, 0.e-110, 0.e-110, 0.052, 0.052] The first solution is negative so real_root must be used to see that it satisfies the expression: >>> abs(real_root(eq.subs(x, sol[0])).n(2)) 0.e-110 If the roots of the equation are not real then more care will be necessary to find the roots, especially for higher order equations. Consider the following expression: >>> expr = root(x, 3) - root(x, 5) We will construct a known value for this expression at x = 3 by selecting the 1-th root for each radical: >>> expr1 = root(x, 3, 1) - root(x, 5, 1) >>> v = expr1.subs(x, -3) The solve function is unable to find any exact roots to this equation: >>> eq = Eq(expr, v); eq1 = Eq(expr1, v) >>> solve(eq, check=False), solve(eq1, check=False) ([], []) The function unrad, however, can be used to get a form of the equation for which numerical roots can be found: >>> from sympy.solvers.solvers import unrad >>> from sympy import nroots >>> e, (p, cov) = unrad(eq) >>> pvals = nroots(e) >>> inversion = solve(cov, x)[0] >>> xvals = [inversion.subs(p, i) for i in pvals] Although eq or eq1 could have been used to find xvals, the solution can only be verified with expr1: >>> z = expr - v >>> [xi.n(chop=1e-9) for xi in xvals if abs(z.subs(x, xi).n()) < 1e-9] [] >>> z1 = expr1 - v >>> [xi.n(chop=1e-9) for xi in xvals if abs(z1.subs(x, xi).n()) < 1e-9] [-3.0] See Also ======== - rsolve() for solving recurrence relationships - dsolve() for solving differential equations """ # keeping track of how f was passed since if it is a list # a dictionary of results will be returned. ########################################################################### def _sympified_list(w): return list(map(sympify, w if iterable(w) else [w])) bare_f = not iterable(f) ordered_symbols = (symbols and symbols[0] and (isinstance(symbols[0], Symbol) or is_sequence(symbols[0], include=GeneratorType) ) ) f, symbols = (_sympified_list(w) for w in [f, symbols]) if isinstance(f, list): f = [s for s in f if s is not S.true and s is not True] implicit = flags.get('implicit', False) # preprocess symbol(s) ########################################################################### if not symbols: # get symbols from equations symbols = set().union([fi.free_symbols for fi in f]) if len(symbols) < len(f): for fi in f: pot = preorder_traversal(fi) for p in pot: if isinstance(p, AppliedUndef): flags['dict'] = True # better show symbols symbols.add(p) pot.skip() # don't go any deeper symbols = list(symbols) ordered_symbols = False elif len(symbols) == 1 and iterable(symbols[0]): symbols = symbols[0] # remove symbols the user is not interested in exclude = flags.pop('exclude', set()) if exclude: if isinstance(exclude, Expr): exclude = [exclude] exclude = set().union([e.free_symbols for e in sympify(exclude)]) symbols = [s for s in symbols if s not in exclude] # preprocess equation(s) ########################################################################### for i, fi in enumerate(f): if isinstance(fi, (Equality, Unequality)): if 'ImmutableDenseMatrix' in [type(a).__name__ for a in fi.args]: fi = fi.lhs - fi.rhs else: args = fi.args if args[1] in (S.true, S.false): args = args[1], args[0] L, R = args if L in (S.false, S.true): if isinstance(fi, Unequality): L = ~L if R.is_Relational: fi = ~R if L is S.false else R elif R.is_Symbol: return L elif R.is_Boolean and (~R).is_Symbol: return ~L else: raise NotImplementedError(filldedent(''' Unanticipated argument of Eq when other arg is True or False. ''')) else: fi = fi.rewrite(Add, evaluate=False) f[i] = fi if fi.is_Relational: return reduce_inequalities(f, symbols=symbols) if isinstance(fi, Poly): f[i] = fi.as_expr() # rewrite hyperbolics in terms of exp f[i] = f[i].replace(lambda w: isinstance(w, HyperbolicFunction), lambda w: w.rewrite(exp)) # if we have a Matrix, we need to iterate over its elements again if f[i].is_Matrix: bare_f = False f.extend(list(f[i])) f[i] = S.Zero # if we can split it into real and imaginary parts then do so freei = f[i].free_symbols if freei and all(s.is_extended_real or s.is_imaginary for s in freei): fr, fi = f[i].as_real_imag() # accept as long as new re, im, arg or atan2 are not introduced had = f[i].atoms(re, im, arg, atan2) if fr and fi and fr != fi and not any( i.atoms(re, im, arg, atan2) - had for i in (fr, fi)): if bare_f: bare_f = False f[i: i + 1] = [fr, fi] # real/imag handling ----------------------------- if any(isinstance(fi, (bool, BooleanAtom)) for fi in f): if flags.get('set', False): return [], set() return [] w = Dummy('w') piece = Lambda(w, Piecewise((w, Ge(w, 0)), (-w, True))) for i, fi in enumerate(f): # Abs reps = [] for a in fi.atoms(Abs): if not a.has(symbols): continue if a.args[0].is_extended_real is None: raise NotImplementedError('solving %s when the argument ' 'is not real or imaginary.' % a) reps.append((a, piece(a.args[0]) if a.args[0].is_extended_real else \ piece(a.args[0]S.ImaginaryUnit))) fi = fi.subs(reps) # arg _arg = [a for a in fi.atoms(arg) if a.has(symbols)] fi = fi.xreplace(dict(list(zip(_arg, [atan(im(a.args[0])/re(a.args[0])) for a in _arg])))) # save changes f[i] = fi # see if re(s) or im(s) appear irf = [] for s in symbols: if s.is_extended_real or s.is_imaginary: continue # neither re(x) nor im(x) will appear # if re(s) or im(s) appear, the auxiliary equation must be present if any(fi.has(re(s), im(s)) for fi in f): irf.append((s, re(s) + S.ImaginaryUnitim(s))) if irf: for s, rhs in irf: for i, fi in enumerate(f): f[i] = fi.xreplace({s: rhs}) f.append(s - rhs) symbols.extend([re(s), im(s)]) if bare_f: bare_f = False flags['dict'] = True # end of real/imag handling ----------------------------- symbols = list(uniq(symbols)) if not ordered_symbols: # we do this to make the results returned canonical in case f # contains a system of nonlinear equations; all other cases should # be unambiguous symbols = sorted(symbols, key=default_sort_key) # we can solve for non-symbol entities by replacing them with Dummy symbols f, symbols, swap_sym = recast_to_symbols(f, symbols) # this is needed in the next two events symset = set(symbols) # get rid of equations that have no symbols of interest; we don't # try to solve them because the user didn't ask and they might be # hard to solve; this means that solutions may be given in terms # of the eliminated equations e.g. solve((x-y, y-3), x) -> {x: y} newf = [] for fi in f: # let the solver handle equations that.. # - have no symbols but are expressions # - have symbols of interest # - have no symbols of interest but are constant # but when an expression is not constant and has no symbols of # interest, it can't change what we obtain for a solution from # the remaining equations so we don't include it; and if it's # zero it can be removed and if it's not zero, there is no # solution for the equation set as a whole # # The reason for doing this filtering is to allow an answer # to be obtained to queries like solve((x - y, y), x); without # this mod the return value is [] ok = False if fi.has(symset): ok = True else: if fi.is_number: if fi.is_Number: if fi.is_zero: continue return [] ok = True else: if fi.is_constant(): ok = True if ok: newf.append(fi) if not newf: return [] f = newf del newf # mask off any Object that we aren't going to invert: Derivative, # Integral, etc... so that solving for anything that they contain will # give an implicit solution seen = set() non_inverts = set() for fi in f: pot = preorder_traversal(fi) for p in pot: if not isinstance(p, Expr) or isinstance(p, Piecewise): pass elif (isinstance(p, bool) or not p.args or p in symset or p.is_Add or p.is_Mul or p.is_Pow and not implicit or p.is_Function and not implicit) and p.func not in (re, im): continue elif not p in seen: seen.add(p) if p.free_symbols & symset: non_inverts.add(p) else: continue pot.skip() del seen non_inverts = dict(list(zip(non_inverts, [Dummy() for _ in non_inverts]))) f = [fi.subs(non_inverts) for fi in f] # Both xreplace and subs are needed below: xreplace to force substitution # inside Derivative, subs to handle non-straightforward substitutions non_inverts = [(v, k.xreplace(swap_sym).subs(swap_sym)) for k, v in non_inverts.items()] # rationalize Floats floats = False if flags.get('rational', True) is not False: for i, fi in enumerate(f): if fi.has(Float): floats = True f[i] = nsimplify(fi, rational=True) # capture any denominators before rewriting since # they may disappear after the rewrite, e.g. issue 14779 flags['_denominators'] = _simple_dens(f[0], symbols) # Any embedded piecewise functions need to be brought out to the # top level so that the appropriate strategy gets selected. # However, this is necessary only if one of the piecewise # functions depends on one of the symbols we are solving for. def _has_piecewise(e): if e.is_Piecewise: return e.has(symbols) return any([_has_piecewise(a) for a in e.args]) for i, fi in enumerate(f): if _has_piecewise(fi): f[i] = piecewise_fold(fi) # # try to get a solution ########################################################################### if bare_f: solution = _solve(f[0], symbols, flags) else: solution = _solve_system(f, symbols, flags) # # postprocessing ########################################################################### # Restore masked-off objects if non_inverts: def _do_dict(solution): return {k: v.subs(non_inverts) for k, v in solution.items()} for i in range(1): if isinstance(solution, dict): solution = _do_dict(solution) break elif solution and isinstance(solution, list): if isinstance(solution[0], dict): solution = [_do_dict(s) for s in solution] break elif isinstance(solution[0], tuple): solution = [tuple([v.subs(non_inverts) for v in s]) for s in solution] break else: solution = [v.subs(non_inverts) for v in solution] break elif not solution: break else: raise NotImplementedError(filldedent(''' no handling of %s was implemented''' % solution)) # Restore original "symbols" if a dictionary is returned. # This is not necessary for # - the single univariate equation case # since the symbol will have been removed from the solution; # - the nonlinear poly_system since that only supports zero-dimensional # systems and those results come back as a list # # * unless there were Derivatives with the symbols, but those were handled # above. if swap_sym: symbols = [swap_sym.get(k, k) for k in symbols] if isinstance(solution, dict): solution = {swap_sym.get(k, k): v.subs(swap_sym) for k, v in solution.items()} elif solution and isinstance(solution, list) and isinstance(solution[0], dict): for i, sol in enumerate(solution): solution[i] = {swap_sym.get(k, k): v.subs(swap_sym) for k, v in sol.items()} # undo the dictionary solutions returned when the system was only partially # solved with poly-system if all symbols are present if ( not flags.get('dict', False) and solution and ordered_symbols and not isinstance(solution, dict) and all(isinstance(sol, dict) for sol in solution) ): solution = [tuple([r.get(s, s).subs(r) for s in symbols]) for r in solution] # Get assumptions about symbols, to filter solutions. # Note that if assumptions about a solution can't be verified, it is still # returned. check = flags.get('check', True) # restore floats if floats and solution and flags.get('rational', None) is None: solution = nfloat(solution, exponent=False) if check and solution: # assumption checking warn = flags.get('warn', False) got_None = [] # solutions for which one or more symbols gave None no_False = [] # solutions for which no symbols gave False if isinstance(solution, tuple): # this has already been checked and is in as_set form return solution elif isinstance(solution, list): if isinstance(solution[0], tuple): for sol in solution: for symb, val in zip(symbols, sol): test = check_assumptions(val, symb.assumptions0) if test is False: break if test is None: got_None.append(sol) else: no_False.append(sol) elif isinstance(solution[0], dict): for sol in solution: a_None = False for symb, val in sol.items(): test = check_assumptions(val, symb.assumptions0) if test: continue if test is False: break a_None = True else: no_False.append(sol) if a_None: got_None.append(sol) else: # list of expressions for sol in solution: test = check_assumptions(sol, symbols[0].assumptions0) if test is False: continue no_False.append(sol) if test is None: got_None.append(sol) elif isinstance(solution, dict): a_None = False for symb, val in solution.items(): test = check_assumptions(val, symb.assumptions0) if test: continue if test is False: no_False = None break a_None = True else: no_False = solution if a_None: got_None.append(solution) elif isinstance(solution, (Relational, And, Or)): if len(symbols) != 1: raise ValueError("Length should be 1") if warn and symbols[0].assumptions0: warnings.warn(filldedent(""" \tWarning: assumptions about variable '%s' are not handled currently.""" % symbols[0])) # TODO: check also variable assumptions for inequalities else: raise TypeError('Unrecognized solution') # improve the checker solution = no_False if warn and got_None: warnings.warn(filldedent(""" \tWarning: assumptions concerning following solution(s) can't be checked:""" + '\n\t' + ', '.join(str(s) for s in got_None))) # # done ########################################################################### as_dict = flags.get('dict', False) as_set = flags.get('set', False) if not as_set and isinstance(solution, list): # Make sure that a list of solutions is ordered in a canonical way. solution.sort(key=default_sort_key) if not as_dict and not as_set: return solution or [] # return a list of mappings or [] if not solution: solution = [] else: if isinstance(solution, dict): solution = [solution] elif iterable(solution[0]): solution = [dict(list(zip(symbols, s))) for s in solution] elif isinstance(solution[0], dict): pass else: if len(symbols) != 1: raise ValueError("Length should be 1") solution = [{symbols[0]: s} for s in solution] if as_dict: return solution assert as_set if not solution: return [], set() k = list(ordered(solution[0].keys())) return k, {tuple([s[ki] for ki in k]) for s in solution} def _solve(f, symbols, flags): """Return a checked solution for f in terms of one or more of the symbols. A list should be returned except for the case when a linear undetermined-coefficients equation is encountered (in which case a dictionary is returned). If no method is implemented to solve the equation, a NotImplementedError will be raised. In the case that conversion of an expression to a Poly gives None a ValueError will be raised.""" not_impl_msg = "No algorithms are implemented to solve equation %s" if len(symbols) != 1: soln = None free = f.free_symbols ex = free - set(symbols) if len(ex) != 1: ind, dep = f.as_independent(symbols) ex = ind.free_symbols & dep.free_symbols if len(ex) == 1: ex = ex.pop() try: # soln may come back as dict, list of dicts or tuples, or # tuple of symbol list and set of solution tuples soln = solve_undetermined_coeffs(f, symbols, ex, flags) except NotImplementedError: pass if soln: if flags.get('simplify', True): if isinstance(soln, dict): for k in soln: soln[k] = simplify(soln[k]) elif isinstance(soln, list): if isinstance(soln[0], dict): for d in soln: for k in d: d[k] = simplify(d[k]) elif isinstance(soln[0], tuple): soln = [tuple(simplify(i) for i in j) for j in soln] else: raise TypeError('unrecognized args in list') elif isinstance(soln, tuple): sym, sols = soln soln = sym, {tuple(simplify(i) for i in j) for j in sols} else: raise TypeError('unrecognized solution type') return soln # find first successful solution failed = [] got_s = set([]) result = [] for s in symbols: xi, v = solve_linear(f, symbols=[s]) if xi == s: # no need to check but we should simplify if desired if flags.get('simplify', True): v = simplify(v) vfree = v.free_symbols if got_s and any([ss in vfree for ss in got_s]): # sol depends on previously solved symbols: discard it continue got_s.add(xi) result.append({xi: v}) elif xi: # there might be a non-linear solution if xi is not 0 failed.append(s) if not failed: return result for s in failed: try: soln = _solve(f, s, flags) for sol in soln: if got_s and any([ss in sol.free_symbols for ss in got_s]): # sol depends on previously solved symbols: discard it continue got_s.add(s) result.append({s: sol}) except NotImplementedError: continue if got_s: return result else: raise NotImplementedError(not_impl_msg % f) symbol = symbols[0] # /!\ capture this flag then set it to False so that no checking in # recursive calls will be done; only the final answer is checked flags['check'] = checkdens = check = flags.pop('check', True) # build up solutions if f is a Mul if f.is_Mul: result = set() for m in f.args: if m in set([S.NegativeInfinity, S.ComplexInfinity, S.Infinity]): result = set() break soln = _solve(m, symbol, flags) result.update(set(soln)) result = list(result) if check: # all solutions have been checked but now we must # check that the solutions do not set denominators # in any factor to zero dens = flags.get('_denominators', _simple_dens(f, symbols)) result = [s for s in result if all(not checksol(den, {symbol: s}, flags) for den in dens)] # set flags for quick exit at end; solutions for each # factor were already checked and simplified check = False flags['simplify'] = False elif f.is_Piecewise: result = set() for i, (expr, cond) in enumerate(f.args): if expr.is_zero: raise NotImplementedError( 'solve cannot represent interval solutions') candidates = _solve(expr, symbol, *flags) # the explicit condition for this expr is the current cond # and none of the previous conditions args = [~c for _, c in f.args[:i]] + [cond] cond = And(args) for candidate in candidates: if candidate in result: # an unconditional value was already there continue try: v = cond.subs(symbol, candidate) _eval_simpify = getattr(v, '_eval_simpify', None) if _eval_simpify is not None: # unconditionally take the simpification of v v = _eval_simpify(ratio=2, measure=lambda x: 1) except TypeError: # incompatible type with condition(s) continue if v == False: continue result.add(Piecewise( (candidate, v), (S.NaN, True))) # set flags for quick exit at end; solutions for each # piece were already checked and simplified check = False flags['simplify'] = False else: # first see if it really depends on symbol and whether there # is only a linear solution f_num, sol = solve_linear(f, symbols=symbols) if f_num is S.Zero or sol is S.NaN: return [] elif f_num.is_Symbol: # no need to check but simplify if desired if flags.get('simplify', True): sol = simplify(sol) return [sol] result = False # no solution was obtained msg = '' # there is no failure message # Poly is generally robust enough to convert anything to # a polynomial and tell us the different generators that it # contains, so we will inspect the generators identified by # polys to figure out what to do. # try to identify a single generator that will allow us to solve this # as a polynomial, followed (perhaps) by a change of variables if the # generator is not a symbol try: poly = Poly(f_num) if poly is None: raise ValueError('could not convert %s to Poly' % f_num) except GeneratorsNeeded: simplified_f = simplify(f_num) if simplified_f != f_num: return _solve(simplified_f, symbol, flags) raise ValueError('expression appears to be a constant') gens = [g for g in poly.gens if g.has(symbol)] def _as_base_q(x): """Return (be, q) for x = b*(pe/q) where p/q is the leading Rational of the exponent of x, e.g. exp(-2x/3) -> (exp(x), 3) """ b, e = x.as_base_exp() if e.is_Rational: return b, e.q if not e.is_Mul: return x, 1 c, ee = e.as_coeff_Mul() if c.is_Rational and c is not S.One: # c could be a Float return bee, c.q return x, 1 if len(gens) > 1: # If there is more than one generator, it could be that the # generators have the same base but different powers, e.g. # >>> Poly(exp(x) + 1/exp(x)) # Poly(exp(-x) + exp(x), exp(-x), exp(x), domain='ZZ') # # If unrad was not disabled then there should be no rational # exponents appearing as in # >>> Poly(sqrt(x) + sqrt(sqrt(x))) # Poly(sqrt(x) + x(1/4), sqrt(x), x(1/4), domain='ZZ') bases, qs = list(zip([_as_base_q(g) for g in gens])) bases = set(bases) if len(bases) > 1 or not all(q == 1 for q in qs): funcs = set(b for b in bases if b.is_Function) trig = set([_ for _ in funcs if isinstance(_, TrigonometricFunction)]) other = funcs - trig if not other and len(funcs.intersection(trig)) > 1: newf = TR1(f_num).rewrite(tan) if newf != f_num: # don't check the rewritten form --check # solutions in the un-rewritten form below flags['check'] = False result = _solve(newf, symbol, flags) flags['check'] = check # just a simple case - see if replacement of single function # clears all symbol-dependent functions, e.g. # log(x) - log(log(x) - 1) - 3 can be solved even though it has # two generators. if result is False and funcs: funcs = list(ordered(funcs)) # put shallowest function first f1 = funcs[0] t = Dummy('t') # perform the substitution ftry = f_num.subs(f1, t) # if no Functions left, we can proceed with usual solve if not ftry.has(symbol): cv_sols = _solve(ftry, t, flags) cv_inv = _solve(t - f1, symbol, flags)[0] sols = list() for sol in cv_sols: sols.append(cv_inv.subs(t, sol)) result = list(ordered(sols)) if result is False: msg = 'multiple generators %s' % gens else: # e.g. case where gens are exp(x), exp(-x) u = bases.pop() t = Dummy('t') inv = _solve(u - t, symbol, flags) if isinstance(u, (Pow, exp)): # this will be resolved by factor in _tsolve but we might # as well try a simple expansion here to get things in # order so something like the following will work now without # having to factor: # # >>> eq = (exp(I(-x-2))+exp(I(x+2))) # >>> eq.subs(exp(x),y) # fails # exp(I(-x - 2)) + exp(I(x + 2)) # >>> eq.expand().subs(exp(x),y) # works # y*Iexp(2I) + y(-I)exp(-2I) def _expand(p): b, e = p.as_base_exp() e = expand_mul(e) return expand_power_exp(be) ftry = f_num.replace( lambda w: w.is_Pow or isinstance(w, exp), _expand).subs(u, t) if not ftry.has(symbol): soln = _solve(ftry, t, flags) sols = list() for sol in soln: for i in inv: sols.append(i.subs(t, sol)) result = list(ordered(sols)) elif len(gens) == 1: # There is only one generator that we are interested in, but # there may have been more than one generator identified by # polys (e.g. for symbols other than the one we are interested # in) so recast the poly in terms of our generator of interest. # Also use composite=True with f_num since Poly won't update # poly as documented in issue 8810. poly = Poly(f_num, gens[0], composite=True) # if we aren't on the tsolve-pass, use roots if not flags.pop('tsolve', False): soln = None deg = poly.degree() flags['tsolve'] = True solvers = {k: flags.get(k, True) for k in ('cubics', 'quartics', 'quintics')} soln = roots(poly, solvers) if sum(soln.values()) < deg: # e.g. roots(32x*5 + 400x*4 + 2032x*3 + # 5000x*2 + 6250x + 3189) -> {} # so all_roots is used and RootOf instances are # returned unless the system is multivariate # or high-order EX domain. try: soln = poly.all_roots() except NotImplementedError: if not flags.get('incomplete', True): raise NotImplementedError( filldedent(''' Neither high-order multivariate polynomials nor sorting of EX-domain polynomials is supported. If you want to see any results, pass keyword incomplete=True to solve; to see numerical values of roots for univariate expressions, use nroots. ''')) else: pass else: soln = list(soln.keys()) if soln is not None: u = poly.gen if u != symbol: try: t = Dummy('t') iv = _solve(u - t, symbol, flags) soln = list(ordered({i.subs(t, s) for i in iv for s in soln})) except NotImplementedError: # perhaps _tsolve can handle f_num soln = None else: check = False # only dens need to be checked if soln is not None: if len(soln) > 2: # if the flag wasn't set then unset it since high-order # results are quite long. Perhaps one could base this # decision on a certain critical length of the # roots. In addition, wester test M2 has an expression # whose roots can be shown to be real with the # unsimplified form of the solution whereas only one of # the simplified forms appears to be real. flags['simplify'] = flags.get('simplify', False) result = soln # fallback if above fails # ----------------------- if result is False: # try unrad if flags.pop('_unrad', True): try: u = unrad(f_num, symbol) except (ValueError, NotImplementedError): u = False if u: eq, cov = u if cov: isym, ieq = cov inv = _solve(ieq, symbol, flags)[0] rv = {inv.subs(isym, xi) for xi in _solve(eq, isym, flags)} else: try: rv = set(_solve(eq, symbol, flags)) except NotImplementedError: rv = None if rv is not None: result = list(ordered(rv)) # if the flag wasn't set then unset it since unrad results # can be quite long or of very high order flags['simplify'] = flags.get('simplify', False) else: pass # for coverage # try _tsolve if result is False: flags.pop('tsolve', None) # allow tsolve to be used on next pass try: soln = _tsolve(f_num, symbol, flags) if soln is not None: result = soln except PolynomialError: pass # ----------- end of fallback ---------------------------- if result is False: raise NotImplementedError('\n'.join([msg, not_impl_msg % f])) if flags.get('simplify', True): result = list(map(simplify, result)) # we just simplified the solution so we now set the flag to # False so the simplification doesn't happen again in checksol() flags['simplify'] = False if checkdens: # reject any result that makes any denom. affirmatively 0; # if in doubt, keep it dens = _simple_dens(f, symbols) result = [s for s in result if all(not checksol(d, {symbol: s}, flags) for d in dens)] if check: # keep only results if the check is not False result = [r for r in result if checksol(f_num, {symbol: r}, flags) is not False] return result def _solve_system(exprs, symbols, flags): if not exprs: return [] polys = [] dens = set() failed = [] result = False linear = False manual = flags.get('manual', False) checkdens = check = flags.get('check', True) for j, g in enumerate(exprs): dens.update(_simple_dens(g, symbols)) i, d = _invert(g, symbols) g = d - i g = g.as_numer_denom()[0] if manual: failed.append(g) continue poly = g.as_poly(symbols, extension=True) if poly is not None: polys.append(poly) else: failed.append(g) if not polys: solved_syms = [] else: if all(p.is_linear for p in polys): n, m = len(polys), len(symbols) matrix = zeros(n, m + 1) for i, poly in enumerate(polys): for monom, coeff in poly.terms(): try: j = monom.index(1) matrix[i, j] = coeff except ValueError: matrix[i, m] = -coeff # returns a dictionary ({symbols: values}) or None if flags.pop('particular', False): result = minsolve_linear_system(matrix, symbols, flags) else: result = solve_linear_system(matrix, symbols, *flags) if failed: if result: solved_syms = list(result.keys()) else: solved_syms = [] else: linear = True else: if len(symbols) > len(polys): from sympy.utilities.iterables import subsets free = set().union([p.free_symbols for p in polys]) free = list(ordered(free.intersection(symbols))) got_s = set() result = [] for syms in subsets(free, len(polys)): try: # returns [] or list of tuples of solutions for syms res = solve_poly_system(polys, syms) if res: for r in res: skip = False for r1 in r: if got_s and any([ss in r1.free_symbols for ss in got_s]): # sol depends on previously # solved symbols: discard it skip = True if not skip: got_s.update(syms) result.extend([dict(list(zip(syms, r)))]) except NotImplementedError: pass if got_s: solved_syms = list(got_s) else: raise NotImplementedError('no valid subset found') else: try: result = solve_poly_system(polys, symbols) if result: solved_syms = symbols # we don't know here if the symbols provided # were given or not, so let solve resolve that. # A list of dictionaries is going to always be # returned from here. result = [dict(list(zip(solved_syms, r))) for r in result] except NotImplementedError: failed.extend([g.as_expr() for g in polys]) solved_syms = [] result = None if result: if isinstance(result, dict): result = [result] else: result = [{}] if failed: # For each failed equation, see if we can solve for one of the # remaining symbols from that equation. If so, we update the # solution set and continue with the next failed equation, # repeating until we are done or we get an equation that can't # be solved. def _ok_syms(e, sort=False): rv = (e.free_symbols - solved_syms) & legal if sort: rv = list(rv) rv.sort(key=default_sort_key) return rv solved_syms = set(solved_syms) # set of symbols we have solved for legal = set(symbols) # what we are interested in # sort so equation with the fewest potential symbols is first u = Dummy() # used in solution checking for eq in ordered(failed, lambda _: len(_ok_syms(_))): newresult = [] bad_results = [] got_s = set() hit = False for r in result: # update eq with everything that is known so far eq2 = eq.subs(r) # if check is True then we see if it satisfies this # equation, otherwise we just accept it if check and r: b = checksol(u, u, eq2, minimal=True) if b is not None: # this solution is sufficient to know whether # it is valid or not so we either accept or # reject it, then continue if b: newresult.append(r) else: bad_results.append(r) continue # search for a symbol amongst those available that # can be solved for ok_syms = _ok_syms(eq2, sort=True) if not ok_syms: if r: newresult.append(r) break # skip as it's independent of desired symbols for s in ok_syms: try: soln = _solve(eq2, s, flags) except NotImplementedError: continue # put each solution in r and append the now-expanded # result in the new result list; use copy since the # solution for s in being added in-place for sol in soln: if got_s and any([ss in sol.free_symbols for ss in got_s]): # sol depends on previously solved symbols: discard it continue rnew = r.copy() for k, v in r.items(): rnew[k] = v.subs(s, sol) # and add this new solution rnew[s] = sol newresult.append(rnew) hit = True got_s.add(s) if not hit: raise NotImplementedError('could not solve %s' % eq2) else: result = newresult for b in bad_results: if b in result: result.remove(b) default_simplify = bool(failed) # rely on system-solvers to simplify if flags.get('simplify', default_simplify): for r in result: for k in r: r[k] = simplify(r[k]) flags['simplify'] = False # don't need to do so in checksol now if checkdens: result = [r for r in result if not any(checksol(d, r, flags) for d in dens)] if check and not linear: result = [r for r in result if not any(checksol(e, r, *flags) is False for e in exprs)] result = [r for r in result if r] if linear and result: result = result[0] return result def solve_linear(lhs, rhs=0, symbols=[], exclude=[]): r""" Return a tuple derived from f = lhs - rhs that is one of the following: (0, 1) meaning that ``f`` is independent of the symbols in ``symbols`` that aren't in ``exclude``, e.g:: >>> from sympy.solvers.solvers import solve_linear >>> from sympy.abc import x, y, z >>> from sympy import cos, sin >>> eq = ycos(x)*2 + ysin(x)*2 - y # = y(1 - 1) = 0 >>> solve_linear(eq) (0, 1) >>> eq = cos(x)2 + sin(x)2 # = 1 >>> solve_linear(eq) (0, 1) >>> solve_linear(x, exclude=[x]) (0, 1) (0, 0) meaning that there is no solution to the equation amongst the symbols given. (If the first element of the tuple is not zero then the function is guaranteed to be dependent on a symbol in ``symbols``.) (symbol, solution) where symbol appears linearly in the numerator of ``f``, is in ``symbols`` (if given) and is not in ``exclude`` (if given). No simplification is done to ``f`` other than a ``mul=True`` expansion, so the solution will correspond strictly to a unique solution. ``(n, d)`` where ``n`` and ``d`` are the numerator and denominator of ``f`` when the numerator was not linear in any symbol of interest; ``n`` will never be a symbol unless a solution for that symbol was found (in which case the second element is the solution, not the denominator). Examples ======== >>> from sympy.core.power import Pow >>> from sympy.polys.polytools import cancel The variable ``x`` appears as a linear variable in each of the following: >>> solve_linear(x + y2) (x, -y2) >>> solve_linear(1/x - y2) (x, y(-2)) When not linear in x or y then the numerator and denominator are returned. >>> solve_linear(x2/y2 - 3) (x*2 - 3y2, y2) If the numerator of the expression is a symbol then (0, 0) is returned if the solution for that symbol would have set any denominator to 0: >>> eq = 1/(1/x - 2) >>> eq.as_numer_denom() (x, 1 - 2x) >>> solve_linear(eq) (0, 0) But automatic rewriting may cause a symbol in the denominator to appear in the numerator so a solution will be returned: >>> (1/x)-1 x >>> solve_linear((1/x)-1) (x, 0) Use an unevaluated expression to avoid this: >>> solve_linear(Pow(1/x, -1, evaluate=False)) (0, 0) If ``x`` is allowed to cancel in the following expression, then it appears to be linear in ``x``, but this sort of cancellation is not done by ``solve_linear`` so the solution will always satisfy the original expression without causing a division by zero error. >>> eq = x2(1/x - z2/x) >>> solve_linear(cancel(eq)) (x, 0) >>> solve_linear(eq) (x2(1 - z2), x) A list of symbols for which a solution is desired may be given: >>> solve_linear(x + y + z, symbols=[y]) (y, -x - z) A list of symbols to ignore may also be given: >>> solve_linear(x + y + z, exclude=[x]) (y, -x - z) (A solution for ``y`` is obtained because it is the first variable from the canonically sorted list of symbols that had a linear solution.) """ if isinstance(lhs, Equality): if rhs: raise ValueError(filldedent(''' If lhs is an Equality, rhs must be 0 but was %s''' % rhs)) rhs = lhs.rhs lhs = lhs.lhs dens = None eq = lhs - rhs n, d = eq.as_numer_denom() if not n: return S.Zero, S.One free = n.free_symbols if not symbols: symbols = free else: bad = [s for s in symbols if not s.is_Symbol] if bad: if len(bad) == 1: bad = bad[0] if len(symbols) == 1: eg = 'solve(%s, %s)' % (eq, symbols[0]) else: eg = 'solve(%s, %s)' % (eq, list(symbols)) raise ValueError(filldedent(''' solve_linear only handles symbols, not %s. To isolate non-symbols use solve, e.g. >>> %s <<<. ''' % (bad, eg))) symbols = free.intersection(symbols) symbols = symbols.difference(exclude) if not symbols: return S.Zero, S.One dfree = d.free_symbols # derivatives are easy to do but tricky to analyze to see if they # are going to disallow a linear solution, so for simplicity we # just evaluate the ones that have the symbols of interest derivs = defaultdict(list) for der in n.atoms(Derivative): csym = der.free_symbols & symbols for c in csym: derivs[c].append(der) all_zero = True for xi in sorted(symbols, key=default_sort_key): # canonical order # if there are derivatives in this var, calculate them now if isinstance(derivs[xi], list): derivs[xi] = {der: der.doit() for der in derivs[xi]} newn = n.subs(derivs[xi]) dnewn_dxi = newn.diff(xi) # dnewn_dxi can be nonzero if it survives differentation by any # of its free symbols free = dnewn_dxi.free_symbols if dnewn_dxi and (not free or any(dnewn_dxi.diff(s) for s in free)): all_zero = False if dnewn_dxi is S.NaN: break if xi not in dnewn_dxi.free_symbols: vi = -1/dnewn_dxi(newn.subs(xi, 0)) if dens is None: dens = _simple_dens(eq, symbols) if not any(checksol(di, {xi: vi}, minimal=True) is True for di in dens): # simplify any trivial integral irep = [(i, i.doit()) for i in vi.atoms(Integral) if i.function.is_number] # do a slight bit of simplification vi = expand_mul(vi.subs(irep)) return xi, vi if all_zero: return S.Zero, S.One if n.is_Symbol: # no solution for this symbol was found return S.Zero, S.Zero return n, d def minsolve_linear_system(system, symbols, *flags): r""" Find a particular solution to a linear system. In particular, try to find a solution with the minimal possible number of non-zero variables using a naive algorithm with exponential complexity. If ``quick=True``, a heuristic is used. """ quick = flags.get('quick', False) # Check if there are any non-zero solutions at all s0 = solve_linear_system(system, symbols, *flags) if not s0 or all(v == 0 for v in s0.values()): return s0 if quick: # We just solve the system and try to heuristically find a nice # solution. s = solve_linear_system(system, symbols) def update(determined, solution): delete = [] for k, v in solution.items(): solution[k] = v.subs(determined) if not solution[k].free_symbols: delete.append(k) determined[k] = solution[k] for k in delete: del solution[k] determined = {} update(determined, s) while s: # NOTE sort by default_sort_key to get deterministic result k = max((k for k in s.values()), key=lambda x: (len(x.free_symbols), default_sort_key(x))) x = max(k.free_symbols, key=default_sort_key) if len(k.free_symbols) != 1: determined[x] = S(0) else: val = solve(k)[0] if val == 0 and all(v.subs(x, val) == 0 for v in s.values()): determined[x] = S(1) else: determined[x] = val update(determined, s) return determined else: # We try to select n variables which we want to be non-zero. # All others will be assumed zero. We try to solve the modified system. # If there is a non-trivial solution, just set the free variables to # one. If we do this for increasing n, trying all combinations of # variables, we will find an optimal solution. # We speed up slightly by starting at one less than the number of # variables the quick method manages. from itertools import combinations from sympy.utilities.misc import debug N = len(symbols) bestsol = minsolve_linear_system(system, symbols, quick=True) n0 = len([x for x in bestsol.values() if x != 0]) for n in range(n0 - 1, 1, -1): debug('minsolve: %s' % n) thissol = None for nonzeros in combinations(list(range(N)), n): subm = Matrix([system.col(i).T for i in nonzeros] + [system.col(-1).T]).T s = solve_linear_system(subm, [symbols[i] for i in nonzeros]) if s and not all(v == 0 for v in s.values()): subs = [(symbols[v], S(1)) for v in nonzeros] for k, v in s.items(): s[k] = v.subs(subs) for sym in symbols: if sym not in s: if symbols.index(sym) in nonzeros: s[sym] = S(1) else: s[sym] = S(0) thissol = s break if thissol is None: break bestsol = thissol return bestsol def solve_linear_system(system, symbols, flags): r""" Solve system of N linear equations with M variables, which means both under- and overdetermined systems are supported. The possible number of solutions is zero, one or infinite. Respectively, this procedure will return None or a dictionary with solutions. In the case of underdetermined systems, all arbitrary parameters are skipped. This may cause a situation in which an empty dictionary is returned. In that case, all symbols can be assigned arbitrary values. Input to this functions is a Nx(M+1) matrix, which means it has to be in augmented form. If you prefer to enter N equations and M unknowns then use `solve(Neqs, Msymbols)` instead. Note: a local copy of the matrix is made by this routine so the matrix that is passed will not be modified. The algorithm used here is fraction-free Gaussian elimination, which results, after elimination, in an upper-triangular matrix. Then solutions are found using back-substitution. This approach is more efficient and compact than the Gauss-Jordan method. >>> from sympy import Matrix, solve_linear_system >>> from sympy.abc import x, y Solve the following system:: x + 4 y == 2 -2 x + y == 14 >>> system = Matrix(( (1, 4, 2), (-2, 1, 14))) >>> solve_linear_system(system, x, y) {x: -6, y: 2} A degenerate system returns an empty dictionary. >>> system = Matrix(( (0,0,0), (0,0,0) )) >>> solve_linear_system(system, x, y) {} """ do_simplify = flags.get('simplify', True) if system.rows == system.cols - 1 == len(symbols): try: # well behaved n-equations and n-unknowns inv = inv_quick(system[:, :-1]) rv = dict(zip(symbols, invsystem[:, -1])) if do_simplify: for k, v in rv.items(): rv[k] = simplify(v) if not all(i.is_zero for i in rv.values()): # non-trivial solution return rv except ValueError: pass matrix = system[:, :] syms = list(symbols) i, m = 0, matrix.cols - 1 # don't count augmentation while i < matrix.rows: if i == m: # an overdetermined system if any(matrix[i:, m]): return None # no solutions else: # remove trailing rows matrix = matrix[:i, :] break if not matrix[i, i]: # there is no pivot in current column # so try to find one in other columns for k in range(i + 1, m): if matrix[i, k]: break else: if matrix[i, m]: # We need to know if this is always zero or not. We # assume that if there are free symbols that it is not # identically zero (or that there is more than one way # to make this zero). Otherwise, if there are none, this # is a constant and we assume that it does not simplify # to zero XXX are there better (fast) ways to test this? # The .equals(0) method could be used but that can be # slow; numerical testing is prone to errors of scaling. if not matrix[i, m].free_symbols: return None # no solution # A row of zeros with a non-zero rhs can only be accepted # if there is another equivalent row. Any such rows will # be deleted. nrows = matrix.rows rowi = matrix.row(i) ip = None j = i + 1 while j < matrix.rows: # do we need to see if the rhs of j # is a constant multiple of i's rhs? rowj = matrix.row(j) if rowj == rowi: matrix.row_del(j) elif rowj[:-1] == rowi[:-1]: if ip is None: _, ip = rowi[-1].as_content_primitive() _, jp = rowj[-1].as_content_primitive() if not (simplify(jp - ip) or simplify(jp + ip)): matrix.row_del(j) j += 1 if nrows == matrix.rows: # no solution return None # zero row or was a linear combination of # other rows or was a row with a symbolic # expression that matched other rows, e.g. [0, 0, x - y] # so now we can safely skip it matrix.row_del(i) if not matrix: # every choice of variable values is a solution # so we return an empty dict instead of None return dict() continue # we want to change the order of columns so # the order of variables must also change syms[i], syms[k] = syms[k], syms[i] matrix.col_swap(i, k) pivot_inv = S.One/matrix[i, i] # divide all elements in the current row by the pivot matrix.row_op(i, lambda x, _: x pivot_inv) for k in range(i + 1, matrix.rows): if matrix[k, i]: coeff = matrix[k, i] # subtract from the current row the row containing # pivot and multiplied by extracted coefficient matrix.row_op(k, lambda x, j: simplify(x - matrix[i, j]coeff)) i += 1 # if there weren't any problems, augmented matrix is now # in row-echelon form so we can check how many solutions # there are and extract them using back substitution if len(syms) == matrix.rows: # this system is Cramer equivalent so there is # exactly one solution to this system of equations k, solutions = i - 1, {} while k >= 0: content = matrix[k, m] # run back-substitution for variables for j in range(k + 1, m): content -= matrix[k, j]solutions[syms[j]] if do_simplify: solutions[syms[k]] = simplify(content) else: solutions[syms[k]] = content k -= 1 return solutions elif len(syms) > matrix.rows: # this system will have infinite number of solutions # dependent on exactly len(syms) - i parameters k, solutions = i - 1, {} while k >= 0: content = matrix[k, m] # run back-substitution for variables for j in range(k + 1, i): content -= matrix[k, j]solutions[syms[j]] # run back-substitution for parameters for j in range(i, m): content -= matrix[k, j]syms[j] if do_simplify: solutions[syms[k]] = simplify(content) else: solutions[syms[k]] = content k -= 1 return solutions else: return [] # no solutions def solve_undetermined_coeffs(equ, coeffs, sym, *flags): """Solve equation of a type p(x; a_1, ..., a_k) == q(x) where both p, q are univariate polynomials and f depends on k parameters. The result of this functions is a dictionary with symbolic values of those parameters with respect to coefficients in q. This functions accepts both Equations class instances and ordinary SymPy expressions. Specification of parameters and variable is obligatory for efficiency and simplicity reason. >>> from sympy import Eq >>> from sympy.abc import a, b, c, x >>> from sympy.solvers import solve_undetermined_coeffs >>> solve_undetermined_coeffs(Eq(2ax + a+b, x), [a, b], x) {a: 1/2, b: -1/2} >>> solve_undetermined_coeffs(Eq(acx + a+b, x), [a, b], x) {a: 1/c, b: -1/c} """ if isinstance(equ, Equality): # got equation, so move all the # terms to the left hand side equ = equ.lhs - equ.rhs equ = cancel(equ).as_numer_denom()[0] system = list(collect(equ.expand(), sym, evaluate=False).values()) if not any(equ.has(sym) for equ in system): # consecutive powers in the input expressions have # been successfully collected, so solve remaining # system using Gaussian elimination algorithm return solve(system, coeffs, *flags) else: return None # no solutions def solve_linear_system_LU(matrix, syms): """ Solves the augmented matrix system using LUsolve and returns a dictionary in which solutions are keyed to the symbols of syms as ordered. The matrix must be invertible. Examples ======== >>> from sympy import Matrix >>> from sympy.abc import x, y, z >>> from sympy.solvers.solvers import solve_linear_system_LU >>> solve_linear_system_LU(Matrix([ ... [1, 2, 0, 1], ... [3, 2, 2, 1], ... [2, 0, 0, 1]]), [x, y, z]) {x: 1/2, y: 1/4, z: -1/2} See Also ======== sympy.matrices.LUsolve """ if matrix.rows != matrix.cols - 1: raise ValueError("Rows should be equal to columns - 1") A = matrix[:matrix.rows, :matrix.rows] b = matrix[:, matrix.cols - 1:] soln = A.LUsolve(b) solutions = {} for i in range(soln.rows): solutions[syms[i]] = soln[i, 0] return solutions def det_perm(M): """Return the det(``M``) by using permutations to select factors. For size larger than 8 the number of permutations becomes prohibitively large, or if there are no symbols in the matrix, it is better to use the standard determinant routines, e.g. `M.det()`. See Also ======== det_minor det_quick """ args = [] s = True n = M.rows list_ = getattr(M, '_mat', None) if list_ is None: list_ = flatten(M.tolist()) for perm in generate_bell(n): fac = [] idx = 0 for j in perm: fac.append(list_[idx + j]) idx += n term = Mul(fac) # disaster with unevaluated Mul -- takes forever for n=7 args.append(term if s else -term) s = not s return Add(args) def det_minor(M): """Return the ``det(M)`` computed from minors without introducing new nesting in products. See Also ======== det_perm det_quick """ n = M.rows if n == 2: return M[0, 0]M[1, 1] - M[1, 0]M[0, 1] else: return sum([(1, -1)[i % 2]Add([M[0, i]d for d in Add.make_args(det_minor(M.minor_submatrix(0, i)))]) if M[0, i] else S.Zero for i in range(n)]) def det_quick(M, method=None): """Return ``det(M)`` assuming that either there are lots of zeros or the size of the matrix is small. If this assumption is not met, then the normal Matrix.det function will be used with method = ``method``. See Also ======== det_minor det_perm """ if any(i.has(Symbol) for i in M): if M.rows < 8 and all(i.has(Symbol) for i in M): return det_perm(M) return det_minor(M) else: return M.det(method=method) if method else M.det() def inv_quick(M): """Return the inverse of ``M``, assuming that either there are lots of zeros or the size of the matrix is small. """ from sympy.matrices import zeros if not all(i.is_Number for i in M): if not any(i.is_Number for i in M): det = lambda _: det_perm(_) else: det = lambda _: det_minor(_) else: return M.inv() n = M.rows d = det(M) if d is S.Zero: raise ValueError("Matrix det == 0; not invertible.") ret = zeros(n) s1 = -1 for i in range(n): s = s1 = -s1 for j in range(n): di = det(M.minor_submatrix(i, j)) ret[j, i] = sdi/d s = -s return ret # these are functions that have multiple inverse values per period multi_inverses = { sin: lambda x: (asin(x), S.Pi - asin(x)), cos: lambda x: (acos(x), 2S.Pi - acos(x)), } def _tsolve(eq, sym, flags): """ Helper for _solve that solves a transcendental equation with respect to the given symbol. Various equations containing powers and logarithms, can be solved. There is currently no guarantee that all solutions will be returned or that a real solution will be favored over a complex one. Either a list of potential solutions will be returned or None will be returned (in the case that no method was known to get a solution for the equation). All other errors (like the inability to cast an expression as a Poly) are unhandled. Examples ======== >>> from sympy import log >>> from sympy.solvers.solvers import _tsolve as tsolve >>> from sympy.abc import x >>> tsolve(3(2x + 5) - 4, x) [-5/2 + log(2)/log(3), (-5log(3)/2 + log(2) + Ipi)/log(3)] >>> tsolve(log(x) + 2x, x) [LambertW(2)/2] """ if 'tsolve_saw' not in flags: flags['tsolve_saw'] = [] if eq in flags['tsolve_saw']: return None else: flags['tsolve_saw'].append(eq) rhs, lhs = _invert(eq, sym) if lhs == sym: return [rhs] try: if lhs.is_Add: # it's time to try factoring; powdenest is used # to try get powers in standard form for better factoring f = factor(powdenest(lhs - rhs)) if f.is_Mul: return _solve(f, sym, flags) if rhs: f = logcombine(lhs, force=flags.get('force', True)) if f.count(log) != lhs.count(log): if isinstance(f, log): return _solve(f.args[0] - exp(rhs), sym, flags) return _tsolve(f - rhs, sym, flags) elif lhs.is_Pow: if lhs.exp.is_Integer: if lhs - rhs != eq: return _solve(lhs - rhs, sym, flags) if sym not in lhs.exp.free_symbols: return _solve(lhs.base - rhs(1/lhs.exp), sym, flags) # _tsolve calls this with Dummy before passing the actual number in. if any(t.is_Dummy for t in rhs.free_symbols): raise NotImplementedError # _tsolve will call here again... # a g(x) == 0 if not rhs: # f(x)g(x) only has solutions where f(x) == 0 and g(x) != 0 at # the same place sol_base = _solve(lhs.base, sym, flags) return [s for s in sol_base if lhs.exp.subs(sym, s) != 0] # a g(x) == b if not lhs.base.has(sym): if lhs.base == 0: return _solve(lhs.exp, sym, flags) if rhs != 0 else [] # Gets most solutions... if lhs.base == rhs.as_base_exp()[0]: # handles case when bases are equal sol = _solve(lhs.exp - rhs.as_base_exp()[1], sym, flags) else: # handles cases when bases are not equal and exp # may or may not be equal sol = _solve(exp(log(lhs.base)lhs.exp)-exp(log(rhs)), sym, flags) # Check for duplicate solutions def equal(expr1, expr2): return expr1.equals(expr2) or nsimplify(expr1) == nsimplify(expr2) # Guess a rational exponent e_rat = nsimplify(log(abs(rhs))/log(abs(lhs.base))) e_rat = simplify(posify(e_rat)[0]) n, d = fraction(e_rat) if expand(lhs.basen - rhsd) == 0: sol = [s for s in sol if not equal(lhs.exp.subs(sym, s), e_rat)] sol.extend(_solve(lhs.exp - e_rat, sym, flags)) return list(ordered(set(sol))) # f(x) * g(x) == c else: sol = [] logform = lhs.explog(lhs.base) - log(rhs) if logform != lhs - rhs: try: sol.extend(_solve(logform, sym, flags)) except NotImplementedError: pass # Collect possible solutions and check with substitution later. check = [] if rhs == 1: # f(x) * g(x) = 1 -- g(x)=0 or f(x)=+-1 check.extend(_solve(lhs.exp, sym, flags)) check.extend(_solve(lhs.base - 1, sym, flags)) check.extend(_solve(lhs.base + 1, sym, flags)) elif rhs.is_Rational: for d in (i for i in divisors(abs(rhs.p)) if i != 1): e, t = integer_log(rhs.p, d) if not t: continue # rhs.p != db for s in divisors(abs(rhs.q)): if se== rhs.q: r = Rational(d, s) check.extend(_solve(lhs.base - r, sym, flags)) check.extend(_solve(lhs.base + r, sym, flags)) check.extend(_solve(lhs.exp - e, sym, flags)) elif rhs.is_irrational: b_l, e_l = lhs.base.as_base_exp() n, d = e_llhs.exp.as_numer_denom() b, e = sqrtdenest(rhs).as_base_exp() check = [sqrtdenest(i) for i in (_solve(lhs.base - b, sym, flags))] check.extend([sqrtdenest(i) for i in (_solve(lhs.exp - e, sym, flags))]) if (e_ld) !=1 : check.extend(_solve(b_l(n) - rhs(e_ld), sym, flags)) sol.extend(s for s in check if eq.subs(sym, s).equals(0)) return list(ordered(set(sol))) elif lhs.is_Function and len(lhs.args) == 1: if lhs.func in multi_inverses: # sin(x) = 1/3 -> x - asin(1/3) & x - (pi - asin(1/3)) soln = [] for i in multi_inverses[lhs.func](rhs): soln.extend(_solve(lhs.args[0] - i, sym, flags)) return list(ordered(soln)) elif lhs.func == LambertW: return _solve(lhs.args[0] - rhsexp(rhs), sym, flags) rewrite = lhs.rewrite(exp) if rewrite != lhs: return _solve(rewrite - rhs, sym, flags) except NotImplementedError: pass # maybe it is a lambert pattern if flags.pop('bivariate', True): # lambert forms may need some help being recognized, e.g. changing # 2*(3x) + x*3log(2)*3 + 3x*2log(2)*2 + 3xlog(2) + 1 # to 2(3x) + (xlog(2) + 1)3 g = _filtered_gens(eq.as_poly(), sym) up_or_log = set() for gi in g: if isinstance(gi, exp) or isinstance(gi, log): up_or_log.add(gi) elif gi.is_Pow: gisimp = powdenest(expand_power_exp(gi)) if gisimp.is_Pow and sym in gisimp.exp.free_symbols: up_or_log.add(gi) down = g.difference(up_or_log) eq_down = expand_log(expand_power_exp(eq)).subs( dict(list(zip(up_or_log, [0]len(up_or_log))))) eq = expand_power_exp(factor(eq_down, deep=True) + (eq - eq_down)) rhs, lhs = _invert(eq, sym) if lhs.has(sym): try: poly = lhs.as_poly() g = _filtered_gens(poly, sym) sols = _solve_lambert(lhs - rhs, sym, g) for n, s in enumerate(sols): ns = nsimplify(s) if ns != s and eq.subs(sym, ns).equals(0): sols[n] = ns return sols except NotImplementedError: # maybe it's a convoluted function if len(g) == 2: try: gpu = bivariate_type(lhs - rhs, g) if gpu is None: raise NotImplementedError g, p, u = gpu flags['bivariate'] = False inversion = _tsolve(g - u, sym, flags) if inversion: sol = _solve(p, u, flags) return list(ordered(set([i.subs(u, s) for i in inversion for s in sol]))) except NotImplementedError: pass else: pass if flags.pop('force', True): flags['force'] = False pos, reps = posify(lhs - rhs) for u, s in reps.items(): if s == sym: break else: u = sym if pos.has(u): try: soln = _solve(pos, u, flags) return list(ordered([s.subs(reps) for s in soln])) except NotImplementedError: pass else: pass # here for coverage return # here for coverage # TODO: option for calculating J numerically @conserve_mpmath_dps def nsolve(args, kwargs): r""" Solve a nonlinear equation system numerically:: nsolve(f, [args,] x0, modules=['mpmath'], kwargs) f is a vector function of symbolic expressions representing the system. args are the variables. If there is only one variable, this argument can be omitted. x0 is a starting vector close to a solution. Use the modules keyword to specify which modules should be used to evaluate the function and the Jacobian matrix. Make sure to use a module that supports matrices. For more information on the syntax, please see the docstring of lambdify. If the keyword arguments contain 'dict'=True (default is False) nsolve will return a list (perhaps empty) of solution mappings. This might be especially useful if you want to use nsolve as a fallback to solve since using the dict argument for both methods produces return values of consistent type structure. Please note: to keep this consistency with solve, the solution will be returned in a list even though nsolve (currently at least) only finds one solution at a time. Overdetermined systems are supported. >>> from sympy import Symbol, nsolve >>> import sympy >>> import mpmath >>> mpmath.mp.dps = 15 >>> x1 = Symbol('x1') >>> x2 = Symbol('x2') >>> f1 = 3 * x1*2 - 2 x22 - 1 >>> f2 = x12 - 2 * x1 + x2*2 + 2 x2 - 8 >>> print(nsolve((f1, f2), (x1, x2), (-1, 1))) Matrix([[-1.19287309935246], [1.27844411169911]]) For one-dimensional functions the syntax is simplified: >>> from sympy import sin, nsolve >>> from sympy.abc import x >>> nsolve(sin(x), x, 2) 3.14159265358979 >>> nsolve(sin(x), 2) 3.14159265358979 To solve with higher precision than the default, use the prec argument. >>> from sympy import cos >>> nsolve(cos(x) - x, 1) 0.739085133215161 >>> nsolve(cos(x) - x, 1, prec=50) 0.73908513321516064165531208767387340401341175890076 >>> cos(_) 0.73908513321516064165531208767387340401341175890076 To solve for complex roots of real functions, a nonreal initial point must be specified: >>> from sympy import I >>> nsolve(x*2 + 2, I) 1.4142135623731I mpmath.findroot is used and you can find there more extensive documentation, especially concerning keyword parameters and available solvers. Note, however, that functions which are very steep near the root the verification of the solution may fail. In this case you should use the flag `verify=False` and independently verify the solution. >>> from sympy import cos, cosh >>> from sympy.abc import i >>> f = cos(x)cosh(x) - 1 >>> nsolve(f, 3.14100) Traceback (most recent call last): ... ValueError: Could not find root within given tolerance. (1.39267e+230 > 2.1684e-19) >>> ans = nsolve(f, 3.14100, verify=False); ans 312.588469032184 >>> f.subs(x, ans).n(2) 2.1e+121 >>> (f/f.diff(x)).subs(x, ans).n(2) 7.4e-15 One might safely skip the verification if bounds of the root are known and a bisection method is used: >>> bounds = lambda i: (3.14i, 3.14(i + 1)) >>> nsolve(f, bounds(100), solver='bisect', verify=False) 315.730061685774 Alternatively, a function may be better behaved when the denominator is ignored. Since this is not always the case, however, the decision of what function to use is left to the discretion of the user. >>> eq = x2/(1 - x)/(1 - 2x)2 - 100 >>> nsolve(eq, 0.46) Traceback (most recent call last): ... ValueError: Could not find root within given tolerance. (10000 > 2.1684e-19) Try another starting point or tweak arguments. >>> nsolve(eq.as_numer_denom()[0], 0.46) 0.46792545969349058 """ # there are several other SymPy functions that use method= so # guard against that here if 'method' in kwargs: raise ValueError(filldedent(''' Keyword "method" should not be used in this context. When using some mpmath solvers directly, the keyword "method" is used, but when using nsolve (and findroot) the keyword to use is "solver".''')) if 'prec' in kwargs: prec = kwargs.pop('prec') import mpmath mpmath.mp.dps = prec else: prec = None # keyword argument to return result as a dictionary as_dict = kwargs.pop('dict', False) # interpret arguments if len(args) == 3: f = args[0] fargs = args[1] x0 = args[2] if iterable(fargs) and iterable(x0): if len(x0) != len(fargs): raise TypeError('nsolve expected exactly %i guess vectors, got %i' % (len(fargs), len(x0))) elif len(args) == 2: f = args[0] fargs = None x0 = args[1] if iterable(f): raise TypeError('nsolve expected 3 arguments, got 2') elif len(args) < 2: raise TypeError('nsolve expected at least 2 arguments, got %i' % len(args)) else: raise TypeError('nsolve expected at most 3 arguments, got %i' % len(args)) modules = kwargs.get('modules', ['mpmath']) if iterable(f): f = list(f) for i, fi in enumerate(f): if isinstance(fi, Equality): f[i] = fi.lhs - fi.rhs f = Matrix(f).T if iterable(x0): x0 = list(x0) if not isinstance(f, Matrix): # assume it's a sympy expression if isinstance(f, Equality): f = f.lhs - f.rhs syms = f.free_symbols if fargs is None: fargs = syms.copy().pop() if not (len(syms) == 1 and (fargs in syms or fargs[0] in syms)): raise ValueError(filldedent(''' expected a one-dimensional and numerical function''')) # the function is much better behaved if there is no denominator # but sending the numerator is left to the user since sometimes # the function is better behaved when the denominator is present # e.g., issue 11768 f = lambdify(fargs, f, modules) x = sympify(findroot(f, x0, kwargs)) if as_dict: return [{fargs: x}] return x if len(fargs) > f.cols: raise NotImplementedError(filldedent(''' need at least as many equations as variables''')) verbose = kwargs.get('verbose', False) if verbose: print('f(x):') print(f) # derive Jacobian J = f.jacobian(fargs) if verbose: print('J(x):') print(J) # create functions f = lambdify(fargs, f.T, modules) J = lambdify(fargs, J, modules) # solve the system numerically x = findroot(f, x0, J=J, *kwargs) if as_dict: return [dict(zip(fargs, [sympify(xi) for xi in x]))] return Matrix(x) def _invert(eq, symbols, *kwargs): """Return tuple (i, d) where ``i`` is independent of ``symbols`` and ``d`` contains symbols. ``i`` and ``d`` are obtained after recursively using algebraic inversion until an uninvertible ``d`` remains. If there are no free symbols then ``d`` will be zero. Some (but not necessarily all) solutions to the expression ``i - d`` will be related to the solutions of the original expression. Examples ======== >>> from sympy.solvers.solvers import _invert as invert >>> from sympy import sqrt, cos >>> from sympy.abc import x, y >>> invert(x - 3) (3, x) >>> invert(3) (3, 0) >>> invert(2cos(x) - 1) (1/2, cos(x)) >>> invert(sqrt(x) - 3) (3, sqrt(x)) >>> invert(sqrt(x) + y, x) (-y, sqrt(x)) >>> invert(sqrt(x) + y, y) (-sqrt(x), y) >>> invert(sqrt(x) + y, x, y) (0, sqrt(x) + y) If there is more than one symbol in a power's base and the exponent is not an Integer, then the principal root will be used for the inversion: >>> invert(sqrt(x + y) - 2) (4, x + y) >>> invert(sqrt(x + y) - 2) (4, x + y) If the exponent is an integer, setting ``integer_power`` to True will force the principal root to be selected: >>> invert(x*2 - 4, integer_power=True) (2, x) """ eq = sympify(eq) if eq.args: # make sure we are working with flat eq eq = eq.func(eq.args) free = eq.free_symbols if not symbols: symbols = free if not free & set(symbols): return eq, S.Zero dointpow = bool(kwargs.get('integer_power', False)) lhs = eq rhs = S.Zero while True: was = lhs while True: indep, dep = lhs.as_independent(symbols) # dep + indep == rhs if lhs.is_Add: # this indicates we have done it all if indep is S.Zero: break lhs = dep rhs -= indep # dep indep == rhs else: # this indicates we have done it all if indep is S.One: break lhs = dep rhs /= indep # collect like-terms in symbols if lhs.is_Add: terms = {} for a in lhs.args: i, d = a.as_independent(symbols) terms.setdefault(d, []).append(i) if any(len(v) > 1 for v in terms.values()): args = [] for d, i in terms.items(): if len(i) > 1: args.append(Add(i)d) else: args.append(i[0]d) lhs = Add(args) # if it's a two-term Add with rhs = 0 and two powers we can get the # dependent terms together, e.g. 3f(x) + 2g(x) -> f(x)/g(x) = -2/3 if lhs.is_Add and not rhs and len(lhs.args) == 2 and \ not lhs.is_polynomial(symbols): a, b = ordered(lhs.args) ai, ad = a.as_independent(symbols) bi, bd = b.as_independent(symbols) if any(_ispow(i) for i in (ad, bd)): a_base, a_exp = ad.as_base_exp() b_base, b_exp = bd.as_base_exp() if a_base == b_base: # a = -b lhs = powsimp(powdenest(ad/bd)) rhs = -bi/ai else: rat = ad/bd _lhs = powsimp(ad/bd) if _lhs != rat: lhs = _lhs rhs = -bi/ai elif ai == -bi: if isinstance(ad, Function) and ad.func == bd.func: if len(ad.args) == len(bd.args) == 1: lhs = ad.args[0] - bd.args[0] elif len(ad.args) == len(bd.args): # should be able to solve # f(x, y) - f(2 - x, 0) == 0 -> x == 1 raise NotImplementedError( 'equal function with more than 1 argument') else: raise ValueError( 'function with different numbers of args') elif lhs.is_Mul and any(_ispow(a) for a in lhs.args): lhs = powsimp(powdenest(lhs)) if lhs.is_Function: if hasattr(lhs, 'inverse') and len(lhs.args) == 1: # -1 # f(x) = g -> x = f (g) # # /!\ inverse should not be defined if there are multiple values # for the function -- these are handled in _tsolve # rhs = lhs.inverse()(rhs) lhs = lhs.args[0] elif isinstance(lhs, atan2): y, x = lhs.args lhs = 2atan(y/(sqrt(x2 + y2) + x)) elif lhs.func == rhs.func: if len(lhs.args) == len(rhs.args) == 1: lhs = lhs.args[0] rhs = rhs.args[0] elif len(lhs.args) == len(rhs.args): # should be able to solve # f(x, y) == f(2, 3) -> x == 2 # f(x, x + y) == f(2, 3) -> x == 2 raise NotImplementedError( 'equal function with more than 1 argument') else: raise ValueError( 'function with different numbers of args') if rhs and lhs.is_Pow and lhs.exp.is_Integer and lhs.exp < 0: lhs = 1/lhs rhs = 1/rhs # basea = b -> base = b(1/a) if # a is an Integer and dointpow=True (this gives real branch of root) # a is not an Integer and the equation is multivariate and the # base has more than 1 symbol in it # The rationale for this is that right now the multi-system solvers # doesn't try to resolve generators to see, for example, if the whole # system is written in terms of sqrt(x + y) so it will just fail, so we # do that step here. if lhs.is_Pow and ( lhs.exp.is_Integer and dointpow or not lhs.exp.is_Integer and len(symbols) > 1 and len(lhs.base.free_symbols & set(symbols)) > 1): rhs = rhs(1/lhs.exp) lhs = lhs.base if lhs == was: break return rhs, lhs def unrad(eq, syms, flags): """ Remove radicals with symbolic arguments and return (eq, cov), None or raise an error: None is returned if there are no radicals to remove. NotImplementedError is raised if there are radicals and they cannot be removed or if the relationship between the original symbols and the change of variable needed to rewrite the system as a polynomial cannot be solved. Otherwise the tuple, ``(eq, cov)``, is returned where:: ``eq``, ``cov`` ``eq`` is an equation without radicals (in the symbol(s) of interest) whose solutions are a superset of the solutions to the original expression. ``eq`` might be re-written in terms of a new variable; the relationship to the original variables is given by ``cov`` which is a list containing ``v`` and ``vp - b`` where ``p`` is the power needed to clear the radical and ``b`` is the radical now expressed as a polynomial in the symbols of interest. For example, for sqrt(2 - x) the tuple would be ``(c, c*2 - 2 + x)``. The solutions of ``eq`` will contain solutions to the original equation (if there are any). ``syms`` an iterable of symbols which, if provided, will limit the focus of radical removal: only radicals with one or more of the symbols of interest will be cleared. All free symbols are used if ``syms`` is not set. ``flags`` are used internally for communication during recursive calls. Two options are also recognized:: ``take``, when defined, is interpreted as a single-argument function that returns True if a given Pow should be handled. Radicals can be removed from an expression if:: all bases of the radicals are the same; a change of variables is done in this case. * if all radicals appear in one term of the expression * there are only 4 terms with sqrt() factors or there are less than four terms having sqrt() factors * there are only two terms with radicals Examples ======== >>> from sympy.solvers.solvers import unrad >>> from sympy.abc import x >>> from sympy import sqrt, Rational, root, real_roots, solve >>> unrad(sqrt(x)xRational(1, 3) + 2) (x5 - 64, []) >>> unrad(sqrt(x) + root(x + 1, 3)) (x3 - x2 - 2x - 1, []) >>> eq = sqrt(x) + root(x, 3) - 2 >>> unrad(eq) (_p3 + _p2 - 2, [_p, _p6 - x]) """ _inv_error = 'cannot get an analytical solution for the inversion' uflags = dict(check=False, simplify=False) def _cov(p, e): if cov: # XXX - uncovered oldp, olde = cov if Poly(e, p).degree(p) in (1, 2): cov[:] = [p, olde.subs(oldp, _solve(e, p, uflags)[0])] else: raise NotImplementedError else: cov[:] = [p, e] def _canonical(eq, cov): if cov: # change symbol to vanilla so no solutions are eliminated p, e = cov rep = {p: Dummy(p.name)} eq = eq.xreplace(rep) cov = [p.xreplace(rep), e.xreplace(rep)] # remove constants and powers of factors since these don't change # the location of the root; XXX should factor or factor_terms be used? eq = factor_terms(_mexpand(eq.as_numer_denom()[0], recursive=True), clear=True) if eq.is_Mul: args = [] for f in eq.args: if f.is_number: continue if f.is_Pow and _take(f, True): args.append(f.base) else: args.append(f) eq = Mul(args) # leave as Mul for more efficient solving # make the sign canonical free = eq.free_symbols if len(free) == 1: if eq.coeff(free.pop()degree(eq)).could_extract_minus_sign(): eq = -eq elif eq.could_extract_minus_sign(): eq = -eq return eq, cov def _Q(pow): # return leading Rational of denominator of Pow's exponent c = pow.as_base_exp()[1].as_coeff_Mul()[0] if not c.is_Rational: return S.One return c.q # define the _take method that will determine whether a term is of interest def _take(d, take_int_pow): # return True if coefficient of any factor's exponent's den is not 1 for pow in Mul.make_args(d): if not (pow.is_Symbol or pow.is_Pow): continue b, e = pow.as_base_exp() if not b.has(syms): continue if not take_int_pow and _Q(pow) == 1: continue free = pow.free_symbols if free.intersection(syms): return True return False _take = flags.setdefault('_take', _take) cov, nwas, rpt = [flags.setdefault(k, v) for k, v in sorted(dict(cov=[], n=None, rpt=0).items())] # preconditioning eq = powdenest(factor_terms(eq, radical=True, clear=True)) eq, d = eq.as_numer_denom() eq = _mexpand(eq, recursive=True) if eq.is_number: return syms = set(syms) or eq.free_symbols poly = eq.as_poly() gens = [g for g in poly.gens if _take(g, True)] if not gens: return # check for trivial case # - already a polynomial in integer powers if all(_Q(g) == 1 for g in gens): return # - an exponent has a symbol of interest (don't handle) if any(g.as_base_exp()[1].has(syms) for g in gens): return def _rads_bases_lcm(poly): # if all the bases are the same or all the radicals are in one # term, `lcm` will be the lcm of the denominators of the # exponents of the radicals lcm = 1 rads = set() bases = set() for g in poly.gens: if not _take(g, False): continue q = _Q(g) if q != 1: rads.add(g) lcm = ilcm(lcm, q) bases.add(g.base) return rads, bases, lcm rads, bases, lcm = _rads_bases_lcm(poly) if not rads: return covsym = Dummy('p', nonnegative=True) # only keep in syms symbols that actually appear in radicals; # and update gens newsyms = set() for r in rads: newsyms.update(syms & r.free_symbols) if newsyms != syms: syms = newsyms gens = [g for g in gens if g.free_symbols & syms] # get terms together that have common generators drad = dict(list(zip(rads, list(range(len(rads)))))) rterms = {(): []} args = Add.make_args(poly.as_expr()) for t in args: if _take(t, False): common = set(t.as_poly().gens).intersection(rads) key = tuple(sorted([drad[i] for i in common])) else: key = () rterms.setdefault(key, []).append(t) others = Add(rterms.pop(())) rterms = [Add(rterms[k]) for k in rterms.keys()] # the output will depend on the order terms are processed, so # make it canonical quickly rterms = list(reversed(list(ordered(rterms)))) ok = False # we don't have a solution yet depth = sqrt_depth(eq) if len(rterms) == 1 and not (rterms[0].is_Add and lcm > 2): eq = rterms[0]lcm - ((-others)lcm) ok = True else: if len(rterms) == 1 and rterms[0].is_Add: rterms = list(rterms[0].args) if len(bases) == 1: b = bases.pop() if len(syms) > 1: free = b.free_symbols x = {g for g in gens if g.is_Symbol} & free if not x: x = free x = ordered(x) else: x = syms x = list(x)[0] try: inv = _solve(covsymlcm - b, x, uflags) if not inv: raise NotImplementedError eq = poly.as_expr().subs(b, covsymlcm).subs(x, inv[0]) _cov(covsym, covsymlcm - b) return _canonical(eq, cov) except NotImplementedError: pass else: # no longer consider integer powers as generators gens = [g for g in gens if _Q(g) != 1] if len(rterms) == 2: if not others: eq = rterms[0]lcm - (-rterms[1])lcm ok = True elif not log(lcm, 2).is_Integer: # the lcm-is-power-of-two case is handled below r0, r1 = rterms if flags.get('_reverse', False): r1, r0 = r0, r1 i0 = _rads0, _bases0, lcm0 = _rads_bases_lcm(r0.as_poly()) i1 = _rads1, _bases1, lcm1 = _rads_bases_lcm(r1.as_poly()) for reverse in range(2): if reverse: i0, i1 = i1, i0 r0, r1 = r1, r0 _rads1, _, lcm1 = i1 _rads1 = Mul(_rads1) t1 = _rads1lcm1 c = covsymlcm1 - t1 for x in syms: try: sol = _solve(c, x, *uflags) if not sol: raise NotImplementedError neweq = r0.subs(x, sol[0]) + covsymr1/_rads1 + \ others tmp = unrad(neweq, covsym) if tmp: eq, newcov = tmp if newcov: newp, newc = newcov _cov(newp, c.subs(covsym, _solve(newc, covsym, uflags)[0])) else: _cov(covsym, c) else: eq = neweq _cov(covsym, c) ok = True break except NotImplementedError: if reverse: raise NotImplementedError( 'no successful change of variable found') else: pass if ok: break elif len(rterms) == 3: # two cube roots and another with order less than 5 # (so an analytical solution can be found) or a base # that matches one of the cube root bases info = [_rads_bases_lcm(i.as_poly()) for i in rterms] RAD = 0 BASES = 1 LCM = 2 if info[0][LCM] != 3: info.append(info.pop(0)) rterms.append(rterms.pop(0)) elif info[1][LCM] != 3: info.append(info.pop(1)) rterms.append(rterms.pop(1)) if info[0][LCM] == info[1][LCM] == 3: if info[1][BASES] != info[2][BASES]: info[0], info[1] = info[1], info[0] rterms[0], rterms[1] = rterms[1], rterms[0] if info[1][BASES] == info[2][BASES]: eq = rterms[0]3 + (rterms[1] + rterms[2] + others)*3 ok = True elif info[2][LCM] < 5: # aroot(A, 3) + broot(B, 3) + others = c a, b, c, d, A, B = [Dummy(i) for i in 'abcdAB'] # zz represents the unraded expression into which the # specifics for this case are substituted zz = (c - d)(A*3a*9 + 3A*2Ba6b*3 - 3A*2a*6c*3 + 9A*2a*6c*2d - 9A2a*6cd2 + 3A*2a*6d*3 + 3AB2a*3b*6 + 21ABa*3b*3c*3 - 63ABa*3b*3c*2d + 63ABa3b*3cd2 - 21ABa*3b*3d*3 + 3Aa3c*6 - 18Aa3c*5d + 45Aa*3c*4d*2 - 60Aa3c*3d*3 + 45Aa3c*2d*4 - 18Aa3cd5 + 3Aa3d6 + B3b9 - 3B*2b*6c*3 + 9B*2b*6c*2d - 9B2b*6cd2 + 3B*2b*6d*3 + 3Bb3c*6 - 18Bb3c*5d + 45Bb*3c*4d*2 - 60Bb3c*3d*3 + 45Bb3c*2d*4 - 18Bb3cd5 + 3Bb3d6 - c9 + 9c8d - 36c7d*2 + 84c*6d*3 - 126c*5d*4 + 126c*4d*5 - 84c*3d*6 + 36c*2d*7 - 9cd8 + d9) def _t(i): b = Mul(info[i][RAD]) return cancel(rterms[i]/b), Mul(info[i][BASES]) aa, AA = _t(0) bb, BB = _t(1) cc = -rterms[2] dd = others eq = zz.xreplace(dict(zip( (a, A, b, B, c, d), (aa, AA, bb, BB, cc, dd)))) ok = True # handle power-of-2 cases if not ok: if log(lcm, 2).is_Integer and (not others and len(rterms) == 4 or len(rterms) < 4): def _norm2(a, b): return a2 + b2 + 2ab if len(rterms) == 4: # (r0+r1)2 - (r2+r3)2 r0, r1, r2, r3 = rterms eq = _norm2(r0, r1) - _norm2(r2, r3) ok = True elif len(rterms) == 3: # (r1+r2)2 - (r0+others)2 r0, r1, r2 = rterms eq = _norm2(r1, r2) - _norm2(r0, others) ok = True elif len(rterms) == 2: # r02 - (r1+others)2 r0, r1 = rterms eq = r02 - _norm2(r1, others) ok = True new_depth = sqrt_depth(eq) if ok else depth rpt += 1 # XXX how many repeats with others unchanging is enough? if not ok or ( nwas is not None and len(rterms) == nwas and new_depth is not None and new_depth == depth and rpt > 3): raise NotImplementedError('Cannot remove all radicals') flags.update(dict(cov=cov, n=len(rterms), rpt=rpt)) neq = unrad(eq, syms, **flags) if neq: eq, cov = neq eq, cov = _canonical(eq, cov) return eq, cov from sympy.solvers.bivariate import ( bivariate_type, _solve_lambert, _filtered_gens)
19dda14fc0d39382644a4b0f011ef46ed41fd2093bb44f561c74d8ff04b0a687	""" Finite difference weights ========================= This module implements an algorithm for efficient generation of finite difference weights for ordinary differentials of functions for derivatives from 0 (interpolation) up to arbitrary order. The core algorithm is provided in the finite difference weight generating function (``finite_diff_weights``), and two convenience functions are provided for: - estimating a derivative (or interpolate) directly from a series of points is also provided (``apply_finite_diff``). - differentiating by using finite difference approximations (``differentiate_finite``). """ from sympy import Derivative, S from sympy.core.compatibility import iterable, range from sympy.core.decorators import deprecated def finite_diff_weights(order, x_list, x0=S.One): """ Calculates the finite difference weights for an arbitrarily spaced one-dimensional grid (``x_list``) for derivatives at ``x0`` of order 0, 1, ..., up to ``order`` using a recursive formula. Order of accuracy is at least ``len(x_list) - order``, if ``x_list`` is defined correctly. Parameters ========== order: int Up to what derivative order weights should be calculated. 0 corresponds to interpolation. x_list: sequence Sequence of (unique) values for the independent variable. It is useful (but not necessary) to order ``x_list`` from nearest to furthest from ``x0``; see examples below. x0: Number or Symbol Root or value of the independent variable for which the finite difference weights should be generated. Default is ``S.One``. Returns ======= list A list of sublists, each corresponding to coefficients for increasing derivative order, and each containing lists of coefficients for increasing subsets of x_list. Examples ======== >>> from sympy import S >>> from sympy.calculus import finite_diff_weights >>> res = finite_diff_weights(1, [-S(1)/2, S(1)/2, S(3)/2, S(5)/2], 0) >>> res [[[1, 0, 0, 0], [1/2, 1/2, 0, 0], [3/8, 3/4, -1/8, 0], [5/16, 15/16, -5/16, 1/16]], [[0, 0, 0, 0], [-1, 1, 0, 0], [-1, 1, 0, 0], [-23/24, 7/8, 1/8, -1/24]]] >>> res[0][-1] # FD weights for 0th derivative, using full x_list [5/16, 15/16, -5/16, 1/16] >>> res[1][-1] # FD weights for 1st derivative [-23/24, 7/8, 1/8, -1/24] >>> res[1][-2] # FD weights for 1st derivative, using x_list[:-1] [-1, 1, 0, 0] >>> res[1][-1][0] # FD weight for 1st deriv. for x_list[0] -23/24 >>> res[1][-1][1] # FD weight for 1st deriv. for x_list[1], etc. 7/8 Each sublist contains the most accurate formula at the end. Note, that in the above example ``res[1][1]`` is the same as ``res[1][2]``. Since res[1][2] has an order of accuracy of ``len(x_list[:3]) - order = 3 - 1 = 2``, the same is true for ``res[1][1]``! >>> from sympy import S >>> from sympy.calculus import finite_diff_weights >>> res = finite_diff_weights(1, [S(0), S(1), -S(1), S(2), -S(2)], 0)[1] >>> res [[0, 0, 0, 0, 0], [-1, 1, 0, 0, 0], [0, 1/2, -1/2, 0, 0], [-1/2, 1, -1/3, -1/6, 0], [0, 2/3, -2/3, -1/12, 1/12]] >>> res[0] # no approximation possible, using x_list[0] only [0, 0, 0, 0, 0] >>> res[1] # classic forward step approximation [-1, 1, 0, 0, 0] >>> res[2] # classic centered approximation [0, 1/2, -1/2, 0, 0] >>> res[3:] # higher order approximations [[-1/2, 1, -1/3, -1/6, 0], [0, 2/3, -2/3, -1/12, 1/12]] Let us compare this to a differently defined ``x_list``. Pay attention to ``foo[i][k]`` corresponding to the gridpoint defined by ``x_list[k]``. >>> from sympy import S >>> from sympy.calculus import finite_diff_weights >>> foo = finite_diff_weights(1, [-S(2), -S(1), S(0), S(1), S(2)], 0)[1] >>> foo [[0, 0, 0, 0, 0], [-1, 1, 0, 0, 0], [1/2, -2, 3/2, 0, 0], [1/6, -1, 1/2, 1/3, 0], [1/12, -2/3, 0, 2/3, -1/12]] >>> foo[1] # not the same and of lower accuracy as res[1]! [-1, 1, 0, 0, 0] >>> foo[2] # classic double backward step approximation [1/2, -2, 3/2, 0, 0] >>> foo[4] # the same as res[4] [1/12, -2/3, 0, 2/3, -1/12] Note that, unless you plan on using approximations based on subsets of ``x_list``, the order of gridpoints does not matter. The capability to generate weights at arbitrary points can be used e.g. to minimize Runge's phenomenon by using Chebyshev nodes: >>> from sympy import cos, symbols, pi, simplify >>> from sympy.calculus import finite_diff_weights >>> N, (h, x) = 4, symbols('h x') >>> x_list = [x+hcos(ipi/(N)) for i in range(N,-1,-1)] # chebyshev nodes >>> print(x_list) [-h + x, -sqrt(2)h/2 + x, x, sqrt(2)h/2 + x, h + x] >>> mycoeffs = finite_diff_weights(1, x_list, 0)[1][4] >>> [simplify(c) for c in mycoeffs] #doctest: +NORMALIZE_WHITESPACE [(h3/2 + h2x - 3hx2 - 4x3)/h4, (-sqrt(2)h3 - 4h*2x + 3sqrt(2)hx2 + 8x3)/h4, 6x/h2 - 8x3/h4, (sqrt(2)h3 - 4h*2x - 3sqrt(2)hx2 + 8x3)/h4, (-h3/2 + h2x + 3hx2 - 4x3)/h4] Notes ===== If weights for a finite difference approximation of 3rd order derivative is wanted, weights for 0th, 1st and 2nd order are calculated "for free", so are formulae using subsets of ``x_list``. This is something one can take advantage of to save computational cost. Be aware that one should define ``x_list`` from nearest to furthest from ``x0``. If not, subsets of ``x_list`` will yield poorer approximations, which might not grand an order of accuracy of ``len(x_list) - order``. See also ======== sympy.calculus.finite_diff.apply_finite_diff References ========== .. [1] Generation of Finite Difference Formulas on Arbitrarily Spaced Grids, Bengt Fornberg; Mathematics of computation; 51; 184; (1988); 699-706; doi:10.1090/S0025-5718-1988-0935077-0 """ # The notation below closely corresponds to the one used in the paper. if order < 0: raise ValueError("Negative derivative order illegal.") if int(order) != order: raise ValueError("Non-integer order illegal") M = order N = len(x_list) - 1 delta = [[[0 for nu in range(N+1)] for n in range(N+1)] for m in range(M+1)] delta[0][0][0] = S(1) c1 = S(1) for n in range(1, N+1): c2 = S(1) for nu in range(0, n): c3 = x_list[n]-x_list[nu] c2 = c2 * c3 if n <= M: delta[n][n-1][nu] = 0 for m in range(0, min(n, M)+1): delta[m][n][nu] = (x_list[n]-x0)delta[m][n-1][nu] -\ mdelta[m-1][n-1][nu] delta[m][n][nu] /= c3 for m in range(0, min(n, M)+1): delta[m][n][n] = c1/c2(mdelta[m-1][n-1][n-1] - (x_list[n-1]-x0)delta[m][n-1][n-1]) c1 = c2 return delta def apply_finite_diff(order, x_list, y_list, x0=S(0)): """ Calculates the finite difference approximation of the derivative of requested order at ``x0`` from points provided in ``x_list`` and ``y_list``. Parameters ========== order: int order of derivative to approximate. 0 corresponds to interpolation. x_list: sequence Sequence of (unique) values for the independent variable. y_list: sequence The function value at corresponding values for the independent variable in x_list. x0: Number or Symbol At what value of the independent variable the derivative should be evaluated. Defaults to S(0). Returns ======= sympy.core.add.Add or sympy.core.numbers.Number The finite difference expression approximating the requested derivative order at ``x0``. Examples ======== >>> from sympy.calculus import apply_finite_diff >>> cube = lambda arg: (1.0arg)*3 >>> xlist = range(-3,3+1) >>> apply_finite_diff(2, xlist, map(cube, xlist), 2) - 12 # doctest: +SKIP -3.55271367880050e-15 we see that the example above only contain rounding errors. apply_finite_diff can also be used on more abstract objects: >>> from sympy import IndexedBase, Idx >>> from sympy.calculus import apply_finite_diff >>> x, y = map(IndexedBase, 'xy') >>> i = Idx('i') >>> x_list, y_list = zip([(x[i+j], y[i+j]) for j in range(-1,2)]) >>> apply_finite_diff(1, x_list, y_list, x[i]) ((x[i + 1] - x[i])/(-x[i - 1] + x[i]) - 1)y[i]/(x[i + 1] - x[i]) - \ (x[i + 1] - x[i])y[i - 1]/((x[i + 1] - x[i - 1])(-x[i - 1] + x[i])) + \ (-x[i - 1] + x[i])y[i + 1]/((x[i + 1] - x[i - 1])(x[i + 1] - x[i])) Notes ===== Order = 0 corresponds to interpolation. Only supply so many points you think makes sense to around x0 when extracting the derivative (the function need to be well behaved within that region). Also beware of Runge's phenomenon. See also ======== sympy.calculus.finite_diff.finite_diff_weights References ========== Fortran 90 implementation with Python interface for numerics: finitediff_ .. _finitediff: https://github.com/bjodah/finitediff """ # In the original paper the following holds for the notation: # M = order # N = len(x_list) - 1 N = len(x_list) - 1 if len(x_list) != len(y_list): raise ValueError("x_list and y_list not equal in length.") delta = finite_diff_weights(order, x_list, x0) derivative = 0 for nu in range(0, len(x_list)): derivative += delta[order][N][nu]y_list[nu] return derivative def _as_finite_diff(derivative, points=1, x0=None, wrt=None): """ Returns an approximation of a derivative of a function in the form of a finite difference formula. The expression is a weighted sum of the function at a number of discrete values of (one of) the independent variable(s). Parameters ========== derivative: a Derivative instance points: sequence or coefficient, optional If sequence: discrete values (length >= order+1) of the independent variable used for generating the finite difference weights. If it is a coefficient, it will be used as the step-size for generating an equidistant sequence of length order+1 centered around ``x0``. default: 1 (step-size 1) x0: number or Symbol, optional the value of the independent variable (``wrt``) at which the derivative is to be approximated. Default: same as ``wrt``. wrt: Symbol, optional "with respect to" the variable for which the (partial) derivative is to be approximated for. If not provided it is required that the Derivative is ordinary. Default: ``None``. Examples ======== >>> from sympy import symbols, Function, exp, sqrt, Symbol, as_finite_diff >>> from sympy.utilities.exceptions import SymPyDeprecationWarning >>> import warnings >>> warnings.simplefilter("ignore", SymPyDeprecationWarning) >>> x, h = symbols('x h') >>> f = Function('f') >>> as_finite_diff(f(x).diff(x)) -f(x - 1/2) + f(x + 1/2) The default step size and number of points are 1 and ``order + 1`` respectively. We can change the step size by passing a symbol as a parameter: >>> as_finite_diff(f(x).diff(x), h) -f(-h/2 + x)/h + f(h/2 + x)/h We can also specify the discretized values to be used in a sequence: >>> as_finite_diff(f(x).diff(x), [x, x+h, x+2h]) -3f(x)/(2h) + 2f(h + x)/h - f(2h + x)/(2h) The algorithm is not restricted to use equidistant spacing, nor do we need to make the approximation around ``x0``, but we can get an expression estimating the derivative at an offset: >>> e, sq2 = exp(1), sqrt(2) >>> xl = [x-h, x+h, x+eh] >>> as_finite_diff(f(x).diff(x, 1), xl, x+hsq2) 2h((h + sqrt(2)h)/(2h) - (-sqrt(2)h + h)/(2h))f(Eh + x)/\ ((-h + Eh)(h + Eh)) + (-(-sqrt(2)h + h)/(2h) - \ (-sqrt(2)h + Eh)/(2h))f(-h + x)/(h + Eh) + \ (-(h + sqrt(2)h)/(2h) + (-sqrt(2)h + Eh)/(2h))f(h + x)/(-h + Eh) Partial derivatives are also supported: >>> y = Symbol('y') >>> d2fdxdy=f(x,y).diff(x,y) >>> as_finite_diff(d2fdxdy, wrt=x) -Derivative(f(x - 1/2, y), y) + Derivative(f(x + 1/2, y), y) See also ======== sympy.calculus.finite_diff.apply_finite_diff sympy.calculus.finite_diff.finite_diff_weights """ if derivative.is_Derivative: pass elif derivative.is_Atom: return derivative else: return derivative.fromiter( [_as_finite_diff(ar, points, x0, wrt) for ar in derivative.args], derivative.assumptions0) if wrt is None: old = None for v in derivative.variables: if old is v: continue derivative = _as_finite_diff(derivative, points, x0, v) old = v return derivative order = derivative.variables.count(wrt) if x0 is None: x0 = wrt if not iterable(points): if getattr(points, 'is_Function', False) and wrt in points.args: points = points.subs(wrt, x0) # points is simply the step-size, let's make it a # equidistant sequence centered around x0 if order % 2 == 0: # even order => odd number of points, grid point included points = [x0 + pointsi for i in range(-order//2, order//2 + 1)] else: # odd order => even number of points, half-way wrt grid point points = [x0 + pointsS(i)/2 for i in range(-order, order + 1, 2)] others = [wrt, 0] for v in set(derivative.variables): if v == wrt: continue others += [v, derivative.variables.count(v)] if len(points) < order+1: raise ValueError("Too few points for order %d" % order) return apply_finite_diff(order, points, [ Derivative(derivative.expr.subs({wrt: x}), others) for x in points], x0) as_finite_diff = deprecated( useinstead="Derivative.as_finite_difference", deprecated_since_version="1.1", issue=11410)(_as_finite_diff) as_finite_diff.__doc__ = """ Deprecated function. Use Diff.as_finite_difference instead. """ def differentiate_finite(expr, symbols, # points=1, x0=None, wrt=None, evaluate=True, #Py2: kwargs): r""" Differentiate expr and replace Derivatives with finite differences. Parameters ========== expr : expression \symbols : differentiate with respect to symbols points: sequence or coefficient, optional see ``Derivative.as_finite_difference`` x0: number or Symbol, optional see ``Derivative.as_finite_difference`` wrt: Symbol, optional see ``Derivative.as_finite_difference`` evaluate : bool kwarg passed on to ``diff``, whether or not to evaluate the Derivative intermediately (default: ``False``). Examples ======== >>> from sympy import cos, sin, Function, differentiate_finite >>> from sympy.abc import x, y, h >>> f, g = Function('f'), Function('g') >>> differentiate_finite(f(x)g(x), x, points=[x-h, x+h]) -f(-h + x)g(-h + x)/(2h) + f(h + x)g(h + x)/(2h) Note that the above form preserves the product rule in discrete form. If we want we can pass ``evaluate=True`` to get another form (which is usually not what we want): >>> differentiate_finite(f(x)g(x), x, points=[x-h, x+h], evaluate=True).simplify() -((f(-h + x) - f(h + x))g(x) + (g(-h + x) - g(h + x))f(x))/(2h) ``differentiate_finite`` works on any expression: >>> differentiate_finite(f(x) + sin(x), x, 2) -2f(x) + f(x - 1) + f(x + 1) - 2sin(x) + sin(x - 1) + sin(x + 1) >>> differentiate_finite(f(x) + sin(x), x, 2, evaluate=True) -2f(x) + f(x - 1) + f(x + 1) - sin(x) >>> differentiate_finite(f(x, y), x, y) f(x - 1/2, y - 1/2) - f(x - 1/2, y + 1/2) - f(x + 1/2, y - 1/2) + f(x + 1/2, y + 1/2) """ # Key-word only arguments only available in Python 3 points = kwargs.pop('points', 1) x0 = kwargs.pop('x0', None) wrt = kwargs.pop('wrt', None) evaluate = kwargs.pop('evaluate', False) if kwargs: raise ValueError("Unknown kwargs: %s" % kwargs) Dexpr = expr.diff(*symbols, evaluate=evaluate) return Dexpr.replace( lambda arg: arg.is_Derivative, lambda arg: arg.as_finite_difference(points=points, x0=x0, wrt=wrt))
8d74baf1a03748fd69da42cf8b2e282e0767d1ea414dfe3557bb0a15c28ccfad	""" module for generating C, C++, Fortran77, Fortran90, Julia, Rust and Octave/Matlab routines that evaluate sympy expressions. This module is work in progress. Only the milestones with a '+' character in the list below have been completed. --- How is sympy.utilities.codegen different from sympy.printing.ccode? --- We considered the idea to extend the printing routines for sympy functions in such a way that it prints complete compilable code, but this leads to a few unsurmountable issues that can only be tackled with dedicated code generator: - For C, one needs both a code and a header file, while the printing routines generate just one string. This code generator can be extended to support .pyf files for f2py. - SymPy functions are not concerned with programming-technical issues, such as input, output and input-output arguments. Other examples are contiguous or non-contiguous arrays, including headers of other libraries such as gsl or others. - It is highly interesting to evaluate several sympy functions in one C routine, eventually sharing common intermediate results with the help of the cse routine. This is more than just printing. - From the programming perspective, expressions with constants should be evaluated in the code generator as much as possible. This is different for printing. --- Basic assumptions --- * A generic Routine data structure describes the routine that must be translated into C/Fortran/... code. This data structure covers all features present in one or more of the supported languages. * Descendants from the CodeGen class transform multiple Routine instances into compilable code. Each derived class translates into a specific language. * In many cases, one wants a simple workflow. The friendly functions in the last part are a simple api on top of the Routine/CodeGen stuff. They are easier to use, but are less powerful. --- Milestones --- + First working version with scalar input arguments, generating C code, tests + Friendly functions that are easier to use than the rigorous Routine/CodeGen workflow. + Integer and Real numbers as input and output + Output arguments + InputOutput arguments + Sort input/output arguments properly + Contiguous array arguments (numpy matrices) + Also generate .pyf code for f2py (in autowrap module) + Isolate constants and evaluate them beforehand in double precision + Fortran 90 + Octave/Matlab - Common Subexpression Elimination - User defined comments in the generated code - Optional extra include lines for libraries/objects that can eval special functions - Test other C compilers and libraries: gcc, tcc, libtcc, gcc+gsl, ... - Contiguous array arguments (sympy matrices) - Non-contiguous array arguments (sympy matrices) - ccode must raise an error when it encounters something that can not be translated into c. ccode(integrate(sin(x)/x, x)) does not make sense. - Complex numbers as input and output - A default complex datatype - Include extra information in the header: date, user, hostname, sha1 hash, ... - Fortran 77 - C++ - Python - Julia - Rust - ... """ from __future__ import print_function, division import os import textwrap from sympy import __version__ as sympy_version from sympy.core import Symbol, S, Tuple, Equality, Function, Basic from sympy.core.compatibility import is_sequence, StringIO, string_types from sympy.printing.ccode import c_code_printers from sympy.printing.codeprinter import AssignmentError from sympy.printing.fcode import FCodePrinter from sympy.printing.julia import JuliaCodePrinter from sympy.printing.octave import OctaveCodePrinter from sympy.printing.rust import RustCodePrinter from sympy.tensor import Idx, Indexed, IndexedBase from sympy.matrices import (MatrixSymbol, ImmutableMatrix, MatrixBase, MatrixExpr, MatrixSlice) __all__ = [ # description of routines "Routine", "DataType", "default_datatypes", "get_default_datatype", "Argument", "InputArgument", "OutputArgument", "Result", # routines -> code "CodeGen", "CCodeGen", "FCodeGen", "JuliaCodeGen", "OctaveCodeGen", "RustCodeGen", # friendly functions "codegen", "make_routine", ] # # Description of routines # class Routine(object): """Generic description of evaluation routine for set of expressions. A CodeGen class can translate instances of this class into code in a particular language. The routine specification covers all the features present in these languages. The CodeGen part must raise an exception when certain features are not present in the target language. For example, multiple return values are possible in Python, but not in C or Fortran. Another example: Fortran and Python support complex numbers, while C does not. """ def __init__(self, name, arguments, results, local_vars, global_vars): """Initialize a Routine instance. Parameters ========== name : string Name of the routine. arguments : list of Arguments These are things that appear in arguments of a routine, often appearing on the right-hand side of a function call. These are commonly InputArguments but in some languages, they can also be OutputArguments or InOutArguments (e.g., pass-by-reference in C code). results : list of Results These are the return values of the routine, often appearing on the left-hand side of a function call. The difference between Results and OutputArguments and when you should use each is language-specific. local_vars : list of Results These are variables that will be defined at the beginning of the function. global_vars : list of Symbols Variables which will not be passed into the function. """ # extract all input symbols and all symbols appearing in an expression input_symbols = set([]) symbols = set([]) for arg in arguments: if isinstance(arg, OutputArgument): symbols.update(arg.expr.free_symbols - arg.expr.atoms(Indexed)) elif isinstance(arg, InputArgument): input_symbols.add(arg.name) elif isinstance(arg, InOutArgument): input_symbols.add(arg.name) symbols.update(arg.expr.free_symbols - arg.expr.atoms(Indexed)) else: raise ValueError("Unknown Routine argument: %s" % arg) for r in results: if not isinstance(r, Result): raise ValueError("Unknown Routine result: %s" % r) symbols.update(r.expr.free_symbols - r.expr.atoms(Indexed)) local_symbols = set() for r in local_vars: if isinstance(r, Result): symbols.update(r.expr.free_symbols - r.expr.atoms(Indexed)) local_symbols.add(r.name) else: local_symbols.add(r) symbols = set([s.label if isinstance(s, Idx) else s for s in symbols]) # Check that all symbols in the expressions are covered by # InputArguments/InOutArguments---subset because user could # specify additional (unused) InputArguments or local_vars. notcovered = symbols.difference( input_symbols.union(local_symbols).union(global_vars)) if notcovered != set([]): raise ValueError("Symbols needed for output are not in input " + ", ".join([str(x) for x in notcovered])) self.name = name self.arguments = arguments self.results = results self.local_vars = local_vars self.global_vars = global_vars def __str__(self): return self.__class__.__name__ + "({name!r}, {arguments}, {results}, {local_vars}, {global_vars})".format(*self.__dict__) __repr__ = __str__ @property def variables(self): """Returns a set of all variables possibly used in the routine. For routines with unnamed return values, the dummies that may or may not be used will be included in the set. """ v = set(self.local_vars) for arg in self.arguments: v.add(arg.name) for res in self.results: v.add(res.result_var) return v @property def result_variables(self): """Returns a list of OutputArgument, InOutArgument and Result. If return values are present, they are at the end ot the list. """ args = [arg for arg in self.arguments if isinstance( arg, (OutputArgument, InOutArgument))] args.extend(self.results) return args class DataType(object): """Holds strings for a certain datatype in different languages.""" def __init__(self, cname, fname, pyname, jlname, octname, rsname): self.cname = cname self.fname = fname self.pyname = pyname self.jlname = jlname self.octname = octname self.rsname = rsname default_datatypes = { "int": DataType("int", "INTEGER4", "int", "", "", "i32"), "float": DataType("double", "REAL8", "float", "", "", "f64"), "complex": DataType("double", "COMPLEX16", "complex", "", "", "float") #FIXME: # complex is only supported in fortran, python, julia, and octave. # So to not break c or rust code generation, we stick with double or # float, respecitvely (but actually should raise an exception for # explicitly complex variables (x.is_complex==True)) } COMPLEX_ALLOWED = False def get_default_datatype(expr, complex_allowed=None): """Derives an appropriate datatype based on the expression.""" if complex_allowed is None: complex_allowed = COMPLEX_ALLOWED if complex_allowed: final_dtype = "complex" else: final_dtype = "float" if expr.is_integer: return default_datatypes["int"] elif expr.is_real: return default_datatypes["float"] elif isinstance(expr, MatrixBase): #check all entries dt = "int" for element in expr: if dt == "int" and not element.is_integer: dt = "float" if dt == "float" and not element.is_real: return default_datatypes[final_dtype] return default_datatypes[dt] else: return default_datatypes[final_dtype] class Variable(object): """Represents a typed variable.""" def __init__(self, name, datatype=None, dimensions=None, precision=None): """Return a new variable. Parameters ========== name : Symbol or MatrixSymbol datatype : optional When not given, the data type will be guessed based on the assumptions on the symbol argument. dimension : sequence containing tupes, optional If present, the argument is interpreted as an array, where this sequence of tuples specifies (lower, upper) bounds for each index of the array. precision : int, optional Controls the precision of floating point constants. """ if not isinstance(name, (Symbol, MatrixSymbol)): raise TypeError("The first argument must be a sympy symbol.") if datatype is None: datatype = get_default_datatype(name) elif not isinstance(datatype, DataType): raise TypeError("The (optional) `datatype' argument must be an " "instance of the DataType class.") if dimensions and not isinstance(dimensions, (tuple, list)): raise TypeError( "The dimension argument must be a sequence of tuples") self._name = name self._datatype = { 'C': datatype.cname, 'FORTRAN': datatype.fname, 'JULIA': datatype.jlname, 'OCTAVE': datatype.octname, 'PYTHON': datatype.pyname, 'RUST': datatype.rsname, } self.dimensions = dimensions self.precision = precision def __str__(self): return "%s(%r)" % (self.__class__.__name__, self.name) __repr__ = __str__ @property def name(self): return self._name def get_datatype(self, language): """Returns the datatype string for the requested language. Examples ======== >>> from sympy import Symbol >>> from sympy.utilities.codegen import Variable >>> x = Variable(Symbol('x')) >>> x.get_datatype('c') 'double' >>> x.get_datatype('fortran') 'REAL8' """ try: return self._datatype[language.upper()] except KeyError: raise CodeGenError("Has datatypes for languages: %s" % ", ".join(self._datatype)) class Argument(Variable): """An abstract Argument data structure: a name and a data type. This structure is refined in the descendants below. """ pass class InputArgument(Argument): pass class ResultBase(object): """Base class for all "outgoing" information from a routine. Objects of this class stores a sympy expression, and a sympy object representing a result variable that will be used in the generated code only if necessary. """ def __init__(self, expr, result_var): self.expr = expr self.result_var = result_var def __str__(self): return "%s(%r, %r)" % (self.__class__.__name__, self.expr, self.result_var) __repr__ = __str__ class OutputArgument(Argument, ResultBase): """OutputArgument are always initialized in the routine.""" def __init__(self, name, result_var, expr, datatype=None, dimensions=None, precision=None): """Return a new variable. Parameters ========== name : Symbol, MatrixSymbol The name of this variable. When used for code generation, this might appear, for example, in the prototype of function in the argument list. result_var : Symbol, Indexed Something that can be used to assign a value to this variable. Typically the same as `name` but for Indexed this should be e.g., "y[i]" whereas `name` should be the Symbol "y". expr : object The expression that should be output, typically a SymPy expression. datatype : optional When not given, the data type will be guessed based on the assumptions on the symbol argument. dimension : sequence containing tupes, optional If present, the argument is interpreted as an array, where this sequence of tuples specifies (lower, upper) bounds for each index of the array. precision : int, optional Controls the precision of floating point constants. """ Argument.__init__(self, name, datatype, dimensions, precision) ResultBase.__init__(self, expr, result_var) def __str__(self): return "%s(%r, %r, %r)" % (self.__class__.__name__, self.name, self.result_var, self.expr) __repr__ = __str__ class InOutArgument(Argument, ResultBase): """InOutArgument are never initialized in the routine.""" def __init__(self, name, result_var, expr, datatype=None, dimensions=None, precision=None): if not datatype: datatype = get_default_datatype(expr) Argument.__init__(self, name, datatype, dimensions, precision) ResultBase.__init__(self, expr, result_var) __init__.__doc__ = OutputArgument.__init__.__doc__ def __str__(self): return "%s(%r, %r, %r)" % (self.__class__.__name__, self.name, self.expr, self.result_var) __repr__ = __str__ class Result(Variable, ResultBase): """An expression for a return value. The name result is used to avoid conflicts with the reserved word "return" in the python language. It is also shorter than ReturnValue. These may or may not need a name in the destination (e.g., "return(xy)" might return a value without ever naming it). """ def __init__(self, expr, name=None, result_var=None, datatype=None, dimensions=None, precision=None): """Initialize a return value. Parameters ========== expr : SymPy expression name : Symbol, MatrixSymbol, optional The name of this return variable. When used for code generation, this might appear, for example, in the prototype of function in a list of return values. A dummy name is generated if omitted. result_var : Symbol, Indexed, optional Something that can be used to assign a value to this variable. Typically the same as `name` but for Indexed this should be e.g., "y[i]" whereas `name` should be the Symbol "y". Defaults to `name` if omitted. datatype : optional When not given, the data type will be guessed based on the assumptions on the expr argument. dimension : sequence containing tupes, optional If present, this variable is interpreted as an array, where this sequence of tuples specifies (lower, upper) bounds for each index of the array. precision : int, optional Controls the precision of floating point constants. """ # Basic because it is the base class for all types of expressions if not isinstance(expr, (Basic, MatrixBase)): raise TypeError("The first argument must be a sympy expression.") if name is None: name = 'result_%d' % abs(hash(expr)) if datatype is None: #try to infer data type from the expression datatype = get_default_datatype(expr) if isinstance(name, string_types): if isinstance(expr, (MatrixBase, MatrixExpr)): name = MatrixSymbol(name, expr.shape) else: name = Symbol(name) if result_var is None: result_var = name Variable.__init__(self, name, datatype=datatype, dimensions=dimensions, precision=precision) ResultBase.__init__(self, expr, result_var) def __str__(self): return "%s(%r, %r, %r)" % (self.__class__.__name__, self.expr, self.name, self.result_var) __repr__ = __str__ # # Transformation of routine objects into code # class CodeGen(object): """Abstract class for the code generators.""" printer = None # will be set to an instance of a CodePrinter subclass def _indent_code(self, codelines): return self.printer.indent_code(codelines) def _printer_method_with_settings(self, method, settings=None, args, *kwargs): settings = settings or {} ori = {k: self.printer._settings[k] for k in settings} for k, v in settings.items(): self.printer._settings[k] = v result = getattr(self.printer, method)(args, *kwargs) for k, v in ori.items(): self.printer._settings[k] = v return result def _get_symbol(self, s): """Returns the symbol as fcode prints it.""" if self.printer._settings['human']: expr_str = self.printer.doprint(s) else: constants, not_supported, expr_str = self.printer.doprint(s) if constants or not_supported: raise ValueError("Failed to print %s" % str(s)) return expr_str.strip() def __init__(self, project="project", cse=False): """Initialize a code generator. Derived classes will offer more options that affect the generated code. """ self.project = project self.cse = cse def routine(self, name, expr, argument_sequence=None, global_vars=None): """Creates an Routine object that is appropriate for this language. This implementation is appropriate for at least C/Fortran. Subclasses can override this if necessary. Here, we assume at most one return value (the l-value) which must be scalar. Additional outputs are OutputArguments (e.g., pointers on right-hand-side or pass-by-reference). Matrices are always returned via OutputArguments. If ``argument_sequence`` is None, arguments will be ordered alphabetically, but with all InputArguments first, and then OutputArgument and InOutArguments. """ if self.cse: from sympy.simplify.cse_main import cse if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)): if not expr: raise ValueError("No expression given") for e in expr: if not e.is_Equality: raise CodeGenError("Lists of expressions must all be Equalities. {} is not.".format(e)) # create a list of right hand sides and simplify them rhs = [e.rhs for e in expr] common, simplified = cse(rhs) # pack the simplified expressions back up with their left hand sides expr = [Equality(e.lhs, rhs) for e, rhs in zip(expr, simplified)] else: rhs = [expr] if isinstance(expr, Equality): common, simplified = cse(expr.rhs) #, ignore=in_out_args) expr = Equality(expr.lhs, simplified[0]) else: common, simplified = cse(expr) expr = simplified local_vars = [Result(b,a) for a,b in common] local_symbols = set([a for a,_ in common]) local_expressions = Tuple([b for _,b in common]) else: local_expressions = Tuple() if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)): if not expr: raise ValueError("No expression given") expressions = Tuple(expr) else: expressions = Tuple(expr) if self.cse: if {i.label for i in expressions.atoms(Idx)} != set(): raise CodeGenError("CSE and Indexed expressions do not play well together yet") else: # local variables for indexed expressions local_vars = {i.label for i in expressions.atoms(Idx)} local_symbols = local_vars # global variables global_vars = set() if global_vars is None else set(global_vars) # symbols that should be arguments symbols = (expressions.free_symbols \| local_expressions.free_symbols) - local_symbols - global_vars new_symbols = set([]) new_symbols.update(symbols) for symbol in symbols: if isinstance(symbol, Idx): new_symbols.remove(symbol) new_symbols.update(symbol.args[1].free_symbols) if isinstance(symbol, Indexed): new_symbols.remove(symbol) symbols = new_symbols # Decide whether to use output argument or return value return_val = [] output_args = [] for expr in expressions: if isinstance(expr, Equality): out_arg = expr.lhs expr = expr.rhs if isinstance(out_arg, Indexed): dims = tuple([ (S.Zero, dim - 1) for dim in out_arg.shape]) symbol = out_arg.base.label elif isinstance(out_arg, Symbol): dims = [] symbol = out_arg elif isinstance(out_arg, MatrixSymbol): dims = tuple([ (S.Zero, dim - 1) for dim in out_arg.shape]) symbol = out_arg else: raise CodeGenError("Only Indexed, Symbol, or MatrixSymbol " "can define output arguments.") if expr.has(symbol): output_args.append( InOutArgument(symbol, out_arg, expr, dimensions=dims)) else: output_args.append( OutputArgument(symbol, out_arg, expr, dimensions=dims)) # remove duplicate arguments when they are not local variables if symbol not in local_vars: # avoid duplicate arguments symbols.remove(symbol) elif isinstance(expr, (ImmutableMatrix, MatrixSlice)): # Create a "dummy" MatrixSymbol to use as the Output arg out_arg = MatrixSymbol('out_%s' % abs(hash(expr)), expr.shape) dims = tuple([(S.Zero, dim - 1) for dim in out_arg.shape]) output_args.append( OutputArgument(out_arg, out_arg, expr, dimensions=dims)) else: return_val.append(Result(expr)) arg_list = [] # setup input argument list # helper to get dimensions for data for array-like args def dimensions(s): return [(S.Zero, dim - 1) for dim in s.shape] array_symbols = {} for array in expressions.atoms(Indexed) \| local_expressions.atoms(Indexed): array_symbols[array.base.label] = array for array in expressions.atoms(MatrixSymbol) \| local_expressions.atoms(MatrixSymbol): array_symbols[array] = array for symbol in sorted(symbols, key=str): if symbol in array_symbols: array = array_symbols[symbol] metadata = {'dimensions': dimensions(array)} else: metadata = {} arg_list.append(InputArgument(symbol, metadata)) output_args.sort(key=lambda x: str(x.name)) arg_list.extend(output_args) if argument_sequence is not None: # if the user has supplied IndexedBase instances, we'll accept that new_sequence = [] for arg in argument_sequence: if isinstance(arg, IndexedBase): new_sequence.append(arg.label) else: new_sequence.append(arg) argument_sequence = new_sequence missing = [x for x in arg_list if x.name not in argument_sequence] if missing: msg = "Argument list didn't specify: {0} " msg = msg.format(", ".join([str(m.name) for m in missing])) raise CodeGenArgumentListError(msg, missing) # create redundant arguments to produce the requested sequence name_arg_dict = {x.name: x for x in arg_list} new_args = [] for symbol in argument_sequence: try: new_args.append(name_arg_dict[symbol]) except KeyError: if isinstance(symbol, (IndexedBase, MatrixSymbol)): metadata = {'dimensions': dimensions(symbol)} else: metadata = {} new_args.append(InputArgument(symbol, metadata)) arg_list = new_args return Routine(name, arg_list, return_val, local_vars, global_vars) def write(self, routines, prefix, to_files=False, header=True, empty=True): """Writes all the source code files for the given routines. The generated source is returned as a list of (filename, contents) tuples, or is written to files (see below). Each filename consists of the given prefix, appended with an appropriate extension. Parameters ========== routines : list A list of Routine instances to be written prefix : string The prefix for the output files to_files : bool, optional When True, the output is written to files. Otherwise, a list of (filename, contents) tuples is returned. [default: False] header : bool, optional When True, a header comment is included on top of each source file. [default: True] empty : bool, optional When True, empty lines are included to structure the source files. [default: True] """ if to_files: for dump_fn in self.dump_fns: filename = "%s.%s" % (prefix, dump_fn.extension) with open(filename, "w") as f: dump_fn(self, routines, f, prefix, header, empty) else: result = [] for dump_fn in self.dump_fns: filename = "%s.%s" % (prefix, dump_fn.extension) contents = StringIO() dump_fn(self, routines, contents, prefix, header, empty) result.append((filename, contents.getvalue())) return result def dump_code(self, routines, f, prefix, header=True, empty=True): """Write the code by calling language specific methods. The generated file contains all the definitions of the routines in low-level code and refers to the header file if appropriate. Parameters ========== routines : list A list of Routine instances. f : file-like Where to write the file. prefix : string The filename prefix, used to refer to the proper header file. Only the basename of the prefix is used. header : bool, optional When True, a header comment is included on top of each source file. [default : True] empty : bool, optional When True, empty lines are included to structure the source files. [default : True] """ code_lines = self._preprocessor_statements(prefix) for routine in routines: if empty: code_lines.append("\n") code_lines.extend(self._get_routine_opening(routine)) code_lines.extend(self._declare_arguments(routine)) code_lines.extend(self._declare_globals(routine)) code_lines.extend(self._declare_locals(routine)) if empty: code_lines.append("\n") code_lines.extend(self._call_printer(routine)) if empty: code_lines.append("\n") code_lines.extend(self._get_routine_ending(routine)) code_lines = self._indent_code(''.join(code_lines)) if header: code_lines = ''.join(self._get_header() + [code_lines]) if code_lines: f.write(code_lines) class CodeGenError(Exception): pass class CodeGenArgumentListError(Exception): @property def missing_args(self): return self.args[1] header_comment = """Code generated with sympy %(version)s See http://www.sympy.org/ for more information. This file is part of '%(project)s' """ class CCodeGen(CodeGen): """Generator for C code. The .write() method inherited from CodeGen will output a code file and an interface file, <prefix>.c and <prefix>.h respectively. """ code_extension = "c" interface_extension = "h" standard = 'c99' def __init__(self, project="project", printer=None, preprocessor_statements=None, cse=False): super(CCodeGen, self).__init__(project=project, cse=cse) self.printer = printer or c_code_printers[self.standard.lower()]() self.preprocessor_statements = preprocessor_statements if preprocessor_statements is None: self.preprocessor_statements = ['#include <math.h>'] def _get_header(self): """Writes a common header for the generated files.""" code_lines = [] code_lines.append("/" + ""78 + '\n') tmp = header_comment % {"version": sympy_version, "project": self.project} for line in tmp.splitlines(): code_lines.append(" %s\n" % line.center(76)) code_lines.append(" " + ""78 + "/\n") return code_lines def get_prototype(self, routine): """Returns a string for the function prototype of the routine. If the routine has multiple result objects, an CodeGenError is raised. See: https://en.wikipedia.org/wiki/Function_prototype """ if len(routine.results) > 1: raise CodeGenError("C only supports a single or no return value.") elif len(routine.results) == 1: ctype = routine.results[0].get_datatype('C') else: ctype = "void" type_args = [] for arg in routine.arguments: name = self.printer.doprint(arg.name) if arg.dimensions or isinstance(arg, ResultBase): type_args.append((arg.get_datatype('C'), "%s" % name)) else: type_args.append((arg.get_datatype('C'), name)) arguments = ", ".join([ "%s %s" % t for t in type_args]) return "%s %s(%s)" % (ctype, routine.name, arguments) def _preprocessor_statements(self, prefix): code_lines = [] code_lines.append('#include "{}.h"'.format(os.path.basename(prefix))) code_lines.extend(self.preprocessor_statements) code_lines = ['{}\n'.format(l) for l in code_lines] return code_lines def _get_routine_opening(self, routine): prototype = self.get_prototype(routine) return ["%s {\n" % prototype] def _declare_arguments(self, routine): # arguments are declared in prototype return [] def _declare_globals(self, routine): # global variables are not explicitly declared within C functions return [] def _declare_locals(self, routine): # Compose a list of symbols to be dereferenced in the function # body. These are the arguments that were passed by a reference # pointer, excluding arrays. dereference = [] for arg in routine.arguments: if isinstance(arg, ResultBase) and not arg.dimensions: dereference.append(arg.name) code_lines = [] for result in routine.local_vars: # local variables that are simple symbols such as those used as indices into # for loops are defined declared elsewhere. if not isinstance(result, Result): continue if result.name != result.result_var: raise CodeGen("Result variable and name should match: {}".format(result)) assign_to = result.name t = result.get_datatype('c') if isinstance(result.expr, (MatrixBase, MatrixExpr)): dims = result.expr.shape if dims[1] != 1: raise CodeGenError("Only column vectors are supported in local variabels. Local result {} has dimensions {}".format(result, dims)) code_lines.append("{0} {1}[{2}];\n".format(t, str(assign_to), dims[0])) prefix = "" else: prefix = "const {0} ".format(t) constants, not_c, c_expr = self._printer_method_with_settings( 'doprint', dict(human=False, dereference=dereference), result.expr, assign_to=assign_to) for name, value in sorted(constants, key=str): code_lines.append("double const %s = %s;\n" % (name, value)) code_lines.append("{}{}\n".format(prefix, c_expr)) return code_lines def _call_printer(self, routine): code_lines = [] # Compose a list of symbols to be dereferenced in the function # body. These are the arguments that were passed by a reference # pointer, excluding arrays. dereference = [] for arg in routine.arguments: if isinstance(arg, ResultBase) and not arg.dimensions: dereference.append(arg.name) return_val = None for result in routine.result_variables: if isinstance(result, Result): assign_to = routine.name + "_result" t = result.get_datatype('c') code_lines.append("{0} {1};\n".format(t, str(assign_to))) return_val = assign_to else: assign_to = result.result_var try: constants, not_c, c_expr = self._printer_method_with_settings( 'doprint', dict(human=False, dereference=dereference), result.expr, assign_to=assign_to) except AssignmentError: assign_to = result.result_var code_lines.append( "%s %s;\n" % (result.get_datatype('c'), str(assign_to))) constants, not_c, c_expr = self._printer_method_with_settings( 'doprint', dict(human=False, dereference=dereference), result.expr, assign_to=assign_to) for name, value in sorted(constants, key=str): code_lines.append("double const %s = %s;\n" % (name, value)) code_lines.append("%s\n" % c_expr) if return_val: code_lines.append(" return %s;\n" % return_val) return code_lines def _get_routine_ending(self, routine): return ["}\n"] def dump_c(self, routines, f, prefix, header=True, empty=True): self.dump_code(routines, f, prefix, header, empty) dump_c.extension = code_extension dump_c.__doc__ = CodeGen.dump_code.__doc__ def dump_h(self, routines, f, prefix, header=True, empty=True): """Writes the C header file. This file contains all the function declarations. Parameters ========== routines : list A list of Routine instances. f : file-like Where to write the file. prefix : string The filename prefix, used to construct the include guards. Only the basename of the prefix is used. header : bool, optional When True, a header comment is included on top of each source file. [default : True] empty : bool, optional When True, empty lines are included to structure the source files. [default : True] """ if header: print(''.join(self._get_header()), file=f) guard_name = "%s__%s__H" % (self.project.replace( " ", "_").upper(), prefix.replace("/", "_").upper()) # include guards if empty: print(file=f) print("#ifndef %s" % guard_name, file=f) print("#define %s" % guard_name, file=f) if empty: print(file=f) # declaration of the function prototypes for routine in routines: prototype = self.get_prototype(routine) print("%s;" % prototype, file=f) # end if include guards if empty: print(file=f) print("#endif", file=f) if empty: print(file=f) dump_h.extension = interface_extension # This list of dump functions is used by CodeGen.write to know which dump # functions it has to call. dump_fns = [dump_c, dump_h] class C89CodeGen(CCodeGen): standard = 'C89' class C99CodeGen(CCodeGen): standard = 'C99' class FCodeGen(CodeGen): """Generator for Fortran 95 code The .write() method inherited from CodeGen will output a code file and an interface file, <prefix>.f90 and <prefix>.h respectively. """ code_extension = "f90" interface_extension = "h" def __init__(self, project='project', printer=None): super(FCodeGen, self).__init__(project) self.printer = printer or FCodePrinter() def _get_header(self): """Writes a common header for the generated files.""" code_lines = [] code_lines.append("!" + ""78 + '\n') tmp = header_comment % {"version": sympy_version, "project": self.project} for line in tmp.splitlines(): code_lines.append("!%s\n" % line.center(76)) code_lines.append("!" + ""78 + '\n') return code_lines def _preprocessor_statements(self, prefix): return [] def _get_routine_opening(self, routine): """Returns the opening statements of the fortran routine.""" code_list = [] if len(routine.results) > 1: raise CodeGenError( "Fortran only supports a single or no return value.") elif len(routine.results) == 1: result = routine.results[0] code_list.append(result.get_datatype('fortran')) code_list.append("function") else: code_list.append("subroutine") args = ", ".join("%s" % self._get_symbol(arg.name) for arg in routine.arguments) call_sig = "{0}({1})\n".format(routine.name, args) # Fortran 95 requires all lines be less than 132 characters, so wrap # this line before appending. call_sig = ' &\n'.join(textwrap.wrap(call_sig, width=60, break_long_words=False)) + '\n' code_list.append(call_sig) code_list = [' '.join(code_list)] code_list.append('implicit none\n') return code_list def _declare_arguments(self, routine): # argument type declarations code_list = [] array_list = [] scalar_list = [] for arg in routine.arguments: if isinstance(arg, InputArgument): typeinfo = "%s, intent(in)" % arg.get_datatype('fortran') elif isinstance(arg, InOutArgument): typeinfo = "%s, intent(inout)" % arg.get_datatype('fortran') elif isinstance(arg, OutputArgument): typeinfo = "%s, intent(out)" % arg.get_datatype('fortran') else: raise CodeGenError("Unknown Argument type: %s" % type(arg)) fprint = self._get_symbol if arg.dimensions: # fortran arrays start at 1 dimstr = ", ".join(["%s:%s" % ( fprint(dim[0] + 1), fprint(dim[1] + 1)) for dim in arg.dimensions]) typeinfo += ", dimension(%s)" % dimstr array_list.append("%s :: %s\n" % (typeinfo, fprint(arg.name))) else: scalar_list.append("%s :: %s\n" % (typeinfo, fprint(arg.name))) # scalars first, because they can be used in array declarations code_list.extend(scalar_list) code_list.extend(array_list) return code_list def _declare_globals(self, routine): # Global variables not explicitly declared within Fortran 90 functions. # Note: a future F77 mode may need to generate "common" blocks. return [] def _declare_locals(self, routine): code_list = [] for var in sorted(routine.local_vars, key=str): typeinfo = get_default_datatype(var) code_list.append("%s :: %s\n" % ( typeinfo.fname, self._get_symbol(var))) return code_list def _get_routine_ending(self, routine): """Returns the closing statements of the fortran routine.""" if len(routine.results) == 1: return ["end function\n"] else: return ["end subroutine\n"] def get_interface(self, routine): """Returns a string for the function interface. The routine should have a single result object, which can be None. If the routine has multiple result objects, a CodeGenError is raised. See: https://en.wikipedia.org/wiki/Function_prototype """ prototype = [ "interface\n" ] prototype.extend(self._get_routine_opening(routine)) prototype.extend(self._declare_arguments(routine)) prototype.extend(self._get_routine_ending(routine)) prototype.append("end interface\n") return "".join(prototype) def _call_printer(self, routine): declarations = [] code_lines = [] for result in routine.result_variables: if isinstance(result, Result): assign_to = routine.name elif isinstance(result, (OutputArgument, InOutArgument)): assign_to = result.result_var constants, not_fortran, f_expr = self._printer_method_with_settings( 'doprint', dict(human=False, source_format='free', standard=95), result.expr, assign_to=assign_to) for obj, v in sorted(constants, key=str): t = get_default_datatype(obj) declarations.append( "%s, parameter :: %s = %s\n" % (t.fname, obj, v)) for obj in sorted(not_fortran, key=str): t = get_default_datatype(obj) if isinstance(obj, Function): name = obj.func else: name = obj declarations.append("%s :: %s\n" % (t.fname, name)) code_lines.append("%s\n" % f_expr) return declarations + code_lines def _indent_code(self, codelines): return self._printer_method_with_settings( 'indent_code', dict(human=False, source_format='free'), codelines) def dump_f95(self, routines, f, prefix, header=True, empty=True): # check that symbols are unique with ignorecase for r in routines: lowercase = {str(x).lower() for x in r.variables} orig_case = {str(x) for x in r.variables} if len(lowercase) < len(orig_case): raise CodeGenError("Fortran ignores case. Got symbols: %s" % (", ".join([str(var) for var in r.variables]))) self.dump_code(routines, f, prefix, header, empty) dump_f95.extension = code_extension dump_f95.__doc__ = CodeGen.dump_code.__doc__ def dump_h(self, routines, f, prefix, header=True, empty=True): """Writes the interface to a header file. This file contains all the function declarations. Parameters ========== routines : list A list of Routine instances. f : file-like Where to write the file. prefix : string The filename prefix. header : bool, optional When True, a header comment is included on top of each source file. [default : True] empty : bool, optional When True, empty lines are included to structure the source files. [default : True] """ if header: print(''.join(self._get_header()), file=f) if empty: print(file=f) # declaration of the function prototypes for routine in routines: prototype = self.get_interface(routine) f.write(prototype) if empty: print(file=f) dump_h.extension = interface_extension # This list of dump functions is used by CodeGen.write to know which dump # functions it has to call. dump_fns = [dump_f95, dump_h] class JuliaCodeGen(CodeGen): """Generator for Julia code. The .write() method inherited from CodeGen will output a code file <prefix>.jl. """ code_extension = "jl" def __init__(self, project='project', printer=None): super(JuliaCodeGen, self).__init__(project) self.printer = printer or JuliaCodePrinter() def routine(self, name, expr, argument_sequence, global_vars): """Specialized Routine creation for Julia.""" if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)): if not expr: raise ValueError("No expression given") expressions = Tuple(expr) else: expressions = Tuple(expr) # local variables local_vars = {i.label for i in expressions.atoms(Idx)} # global variables global_vars = set() if global_vars is None else set(global_vars) # symbols that should be arguments old_symbols = expressions.free_symbols - local_vars - global_vars symbols = set([]) for s in old_symbols: if isinstance(s, Idx): symbols.update(s.args[1].free_symbols) elif not isinstance(s, Indexed): symbols.add(s) # Julia supports multiple return values return_vals = [] output_args = [] for (i, expr) in enumerate(expressions): if isinstance(expr, Equality): out_arg = expr.lhs expr = expr.rhs symbol = out_arg if isinstance(out_arg, Indexed): dims = tuple([ (S.One, dim) for dim in out_arg.shape]) symbol = out_arg.base.label output_args.append(InOutArgument(symbol, out_arg, expr, dimensions=dims)) if not isinstance(out_arg, (Indexed, Symbol, MatrixSymbol)): raise CodeGenError("Only Indexed, Symbol, or MatrixSymbol " "can define output arguments.") return_vals.append(Result(expr, name=symbol, result_var=out_arg)) if not expr.has(symbol): # this is a pure output: remove from the symbols list, so # it doesn't become an input. symbols.remove(symbol) else: # we have no name for this output return_vals.append(Result(expr, name='out%d' % (i+1))) # setup input argument list output_args.sort(key=lambda x: str(x.name)) arg_list = list(output_args) array_symbols = {} for array in expressions.atoms(Indexed): array_symbols[array.base.label] = array for array in expressions.atoms(MatrixSymbol): array_symbols[array] = array for symbol in sorted(symbols, key=str): arg_list.append(InputArgument(symbol)) if argument_sequence is not None: # if the user has supplied IndexedBase instances, we'll accept that new_sequence = [] for arg in argument_sequence: if isinstance(arg, IndexedBase): new_sequence.append(arg.label) else: new_sequence.append(arg) argument_sequence = new_sequence missing = [x for x in arg_list if x.name not in argument_sequence] if missing: msg = "Argument list didn't specify: {0} " msg = msg.format(", ".join([str(m.name) for m in missing])) raise CodeGenArgumentListError(msg, missing) # create redundant arguments to produce the requested sequence name_arg_dict = {x.name: x for x in arg_list} new_args = [] for symbol in argument_sequence: try: new_args.append(name_arg_dict[symbol]) except KeyError: new_args.append(InputArgument(symbol)) arg_list = new_args return Routine(name, arg_list, return_vals, local_vars, global_vars) def _get_header(self): """Writes a common header for the generated files.""" code_lines = [] tmp = header_comment % {"version": sympy_version, "project": self.project} for line in tmp.splitlines(): if line == '': code_lines.append("#\n") else: code_lines.append("# %s\n" % line) return code_lines def _preprocessor_statements(self, prefix): return [] def _get_routine_opening(self, routine): """Returns the opening statements of the routine.""" code_list = [] code_list.append("function ") # Inputs args = [] for i, arg in enumerate(routine.arguments): if isinstance(arg, OutputArgument): raise CodeGenError("Julia: invalid argument of type %s" % str(type(arg))) if isinstance(arg, (InputArgument, InOutArgument)): args.append("%s" % self._get_symbol(arg.name)) args = ", ".join(args) code_list.append("%s(%s)\n" % (routine.name, args)) code_list = [ "".join(code_list) ] return code_list def _declare_arguments(self, routine): return [] def _declare_globals(self, routine): return [] def _declare_locals(self, routine): return [] def _get_routine_ending(self, routine): outs = [] for result in routine.results: if isinstance(result, Result): # Note: name not result_var; want `y` not `y[i]` for Indexed s = self._get_symbol(result.name) else: raise CodeGenError("unexpected object in Routine results") outs.append(s) return ["return " + ", ".join(outs) + "\nend\n"] def _call_printer(self, routine): declarations = [] code_lines = [] for i, result in enumerate(routine.results): if isinstance(result, Result): assign_to = result.result_var else: raise CodeGenError("unexpected object in Routine results") constants, not_supported, jl_expr = self._printer_method_with_settings( 'doprint', dict(human=False), result.expr, assign_to=assign_to) for obj, v in sorted(constants, key=str): declarations.append( "%s = %s\n" % (obj, v)) for obj in sorted(not_supported, key=str): if isinstance(obj, Function): name = obj.func else: name = obj declarations.append( "# unsupported: %s\n" % (name)) code_lines.append("%s\n" % (jl_expr)) return declarations + code_lines def _indent_code(self, codelines): # Note that indenting seems to happen twice, first # statement-by-statement by JuliaPrinter then again here. p = JuliaCodePrinter({'human': False}) return p.indent_code(codelines) def dump_jl(self, routines, f, prefix, header=True, empty=True): self.dump_code(routines, f, prefix, header, empty) dump_jl.extension = code_extension dump_jl.__doc__ = CodeGen.dump_code.__doc__ # This list of dump functions is used by CodeGen.write to know which dump # functions it has to call. dump_fns = [dump_jl] class OctaveCodeGen(CodeGen): """Generator for Octave code. The .write() method inherited from CodeGen will output a code file <prefix>.m. Octave .m files usually contain one function. That function name should match the filename (``prefix``). If you pass multiple ``name_expr`` pairs, the latter ones are presumed to be private functions accessed by the primary function. You should only pass inputs to ``argument_sequence``: outputs are ordered according to their order in ``name_expr``. """ code_extension = "m" def __init__(self, project='project', printer=None): super(OctaveCodeGen, self).__init__(project) self.printer = printer or OctaveCodePrinter() def routine(self, name, expr, argument_sequence, global_vars): """Specialized Routine creation for Octave.""" # FIXME: this is probably general enough for other high-level # languages, perhaps its the C/Fortran one that is specialized! if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)): if not expr: raise ValueError("No expression given") expressions = Tuple(expr) else: expressions = Tuple(expr) # local variables local_vars = {i.label for i in expressions.atoms(Idx)} # global variables global_vars = set() if global_vars is None else set(global_vars) # symbols that should be arguments old_symbols = expressions.free_symbols - local_vars - global_vars symbols = set([]) for s in old_symbols: if isinstance(s, Idx): symbols.update(s.args[1].free_symbols) elif not isinstance(s, Indexed): symbols.add(s) # Octave supports multiple return values return_vals = [] for (i, expr) in enumerate(expressions): if isinstance(expr, Equality): out_arg = expr.lhs expr = expr.rhs symbol = out_arg if isinstance(out_arg, Indexed): symbol = out_arg.base.label if not isinstance(out_arg, (Indexed, Symbol, MatrixSymbol)): raise CodeGenError("Only Indexed, Symbol, or MatrixSymbol " "can define output arguments.") return_vals.append(Result(expr, name=symbol, result_var=out_arg)) if not expr.has(symbol): # this is a pure output: remove from the symbols list, so # it doesn't become an input. symbols.remove(symbol) else: # we have no name for this output return_vals.append(Result(expr, name='out%d' % (i+1))) # setup input argument list arg_list = [] array_symbols = {} for array in expressions.atoms(Indexed): array_symbols[array.base.label] = array for array in expressions.atoms(MatrixSymbol): array_symbols[array] = array for symbol in sorted(symbols, key=str): arg_list.append(InputArgument(symbol)) if argument_sequence is not None: # if the user has supplied IndexedBase instances, we'll accept that new_sequence = [] for arg in argument_sequence: if isinstance(arg, IndexedBase): new_sequence.append(arg.label) else: new_sequence.append(arg) argument_sequence = new_sequence missing = [x for x in arg_list if x.name not in argument_sequence] if missing: msg = "Argument list didn't specify: {0} " msg = msg.format(", ".join([str(m.name) for m in missing])) raise CodeGenArgumentListError(msg, missing) # create redundant arguments to produce the requested sequence name_arg_dict = {x.name: x for x in arg_list} new_args = [] for symbol in argument_sequence: try: new_args.append(name_arg_dict[symbol]) except KeyError: new_args.append(InputArgument(symbol)) arg_list = new_args return Routine(name, arg_list, return_vals, local_vars, global_vars) def _get_header(self): """Writes a common header for the generated files.""" code_lines = [] tmp = header_comment % {"version": sympy_version, "project": self.project} for line in tmp.splitlines(): if line == '': code_lines.append("%\n") else: code_lines.append("%% %s\n" % line) return code_lines def _preprocessor_statements(self, prefix): return [] def _get_routine_opening(self, routine): """Returns the opening statements of the routine.""" code_list = [] code_list.append("function ") # Outputs outs = [] for i, result in enumerate(routine.results): if isinstance(result, Result): # Note: name not result_var; want `y` not `y(i)` for Indexed s = self._get_symbol(result.name) else: raise CodeGenError("unexpected object in Routine results") outs.append(s) if len(outs) > 1: code_list.append("[" + (", ".join(outs)) + "]") else: code_list.append("".join(outs)) code_list.append(" = ") # Inputs args = [] for i, arg in enumerate(routine.arguments): if isinstance(arg, (OutputArgument, InOutArgument)): raise CodeGenError("Octave: invalid argument of type %s" % str(type(arg))) if isinstance(arg, InputArgument): args.append("%s" % self._get_symbol(arg.name)) args = ", ".join(args) code_list.append("%s(%s)\n" % (routine.name, args)) code_list = [ "".join(code_list) ] return code_list def _declare_arguments(self, routine): return [] def _declare_globals(self, routine): if not routine.global_vars: return [] s = " ".join(sorted([self._get_symbol(g) for g in routine.global_vars])) return ["global " + s + "\n"] def _declare_locals(self, routine): return [] def _get_routine_ending(self, routine): return ["end\n"] def _call_printer(self, routine): declarations = [] code_lines = [] for i, result in enumerate(routine.results): if isinstance(result, Result): assign_to = result.result_var else: raise CodeGenError("unexpected object in Routine results") constants, not_supported, oct_expr = self._printer_method_with_settings( 'doprint', dict(human=False), result.expr, assign_to=assign_to) for obj, v in sorted(constants, key=str): declarations.append( " %s = %s; %% constant\n" % (obj, v)) for obj in sorted(not_supported, key=str): if isinstance(obj, Function): name = obj.func else: name = obj declarations.append( " %% unsupported: %s\n" % (name)) code_lines.append("%s\n" % (oct_expr)) return declarations + code_lines def _indent_code(self, codelines): return self._printer_method_with_settings( 'indent_code', dict(human=False), codelines) def dump_m(self, routines, f, prefix, header=True, empty=True, inline=True): # Note used to call self.dump_code() but we need more control for header code_lines = self._preprocessor_statements(prefix) for i, routine in enumerate(routines): if i > 0: if empty: code_lines.append("\n") code_lines.extend(self._get_routine_opening(routine)) if i == 0: if routine.name != prefix: raise ValueError('Octave function name should match prefix') if header: code_lines.append("%" + prefix.upper() + " Autogenerated by sympy\n") code_lines.append(''.join(self._get_header())) code_lines.extend(self._declare_arguments(routine)) code_lines.extend(self._declare_globals(routine)) code_lines.extend(self._declare_locals(routine)) if empty: code_lines.append("\n") code_lines.extend(self._call_printer(routine)) if empty: code_lines.append("\n") code_lines.extend(self._get_routine_ending(routine)) code_lines = self._indent_code(''.join(code_lines)) if code_lines: f.write(code_lines) dump_m.extension = code_extension dump_m.__doc__ = CodeGen.dump_code.__doc__ # This list of dump functions is used by CodeGen.write to know which dump # functions it has to call. dump_fns = [dump_m] class RustCodeGen(CodeGen): """Generator for Rust code. The .write() method inherited from CodeGen will output a code file <prefix>.rs """ code_extension = "rs" def __init__(self, project="project", printer=None): super(RustCodeGen, self).__init__(project=project) self.printer = printer or RustCodePrinter() def routine(self, name, expr, argument_sequence, global_vars): """Specialized Routine creation for Rust.""" if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)): if not expr: raise ValueError("No expression given") expressions = Tuple(expr) else: expressions = Tuple(expr) # local variables local_vars = set([i.label for i in expressions.atoms(Idx)]) # global variables global_vars = set() if global_vars is None else set(global_vars) # symbols that should be arguments symbols = expressions.free_symbols - local_vars - global_vars - expressions.atoms(Indexed) # Rust supports multiple return values return_vals = [] output_args = [] for (i, expr) in enumerate(expressions): if isinstance(expr, Equality): out_arg = expr.lhs expr = expr.rhs symbol = out_arg if isinstance(out_arg, Indexed): dims = tuple([ (S.One, dim) for dim in out_arg.shape]) symbol = out_arg.base.label output_args.append(InOutArgument(symbol, out_arg, expr, dimensions=dims)) if not isinstance(out_arg, (Indexed, Symbol, MatrixSymbol)): raise CodeGenError("Only Indexed, Symbol, or MatrixSymbol " "can define output arguments.") return_vals.append(Result(expr, name=symbol, result_var=out_arg)) if not expr.has(symbol): # this is a pure output: remove from the symbols list, so # it doesn't become an input. symbols.remove(symbol) else: # we have no name for this output return_vals.append(Result(expr, name='out%d' % (i+1))) # setup input argument list output_args.sort(key=lambda x: str(x.name)) arg_list = list(output_args) array_symbols = {} for array in expressions.atoms(Indexed): array_symbols[array.base.label] = array for array in expressions.atoms(MatrixSymbol): array_symbols[array] = array for symbol in sorted(symbols, key=str): arg_list.append(InputArgument(symbol)) if argument_sequence is not None: # if the user has supplied IndexedBase instances, we'll accept that new_sequence = [] for arg in argument_sequence: if isinstance(arg, IndexedBase): new_sequence.append(arg.label) else: new_sequence.append(arg) argument_sequence = new_sequence missing = [x for x in arg_list if x.name not in argument_sequence] if missing: msg = "Argument list didn't specify: {0} " msg = msg.format(", ".join([str(m.name) for m in missing])) raise CodeGenArgumentListError(msg, missing) # create redundant arguments to produce the requested sequence name_arg_dict = {x.name: x for x in arg_list} new_args = [] for symbol in argument_sequence: try: new_args.append(name_arg_dict[symbol]) except KeyError: new_args.append(InputArgument(symbol)) arg_list = new_args return Routine(name, arg_list, return_vals, local_vars, global_vars) def _get_header(self): """Writes a common header for the generated files.""" code_lines = [] code_lines.append("/\n") tmp = header_comment % {"version": sympy_version, "project": self.project} for line in tmp.splitlines(): code_lines.append((" %s" % line.center(76)).rstrip() + "\n") code_lines.append(" /\n") return code_lines def get_prototype(self, routine): """Returns a string for the function prototype of the routine. If the routine has multiple result objects, an CodeGenError is raised. See: https://en.wikipedia.org/wiki/Function_prototype """ results = [i.get_datatype('Rust') for i in routine.results] if len(results) == 1: rstype = " -> " + results[0] elif len(routine.results) > 1: rstype = " -> (" + ", ".join(results) + ")" else: rstype = "" type_args = [] for arg in routine.arguments: name = self.printer.doprint(arg.name) if arg.dimensions or isinstance(arg, ResultBase): type_args.append(("%s" % name, arg.get_datatype('Rust'))) else: type_args.append((name, arg.get_datatype('Rust'))) arguments = ", ".join([ "%s: %s" % t for t in type_args]) return "fn %s(%s)%s" % (routine.name, arguments, rstype) def _preprocessor_statements(self, prefix): code_lines = [] # code_lines.append("use std::f64::consts::;\n") return code_lines def _get_routine_opening(self, routine): prototype = self.get_prototype(routine) return ["%s {\n" % prototype] def _declare_arguments(self, routine): # arguments are declared in prototype return [] def _declare_globals(self, routine): # global variables are not explicitly declared within C functions return [] def _declare_locals(self, routine): # loop variables are declared in loop statement return [] def _call_printer(self, routine): code_lines = [] declarations = [] returns = [] # Compose a list of symbols to be dereferenced in the function # body. These are the arguments that were passed by a reference # pointer, excluding arrays. dereference = [] for arg in routine.arguments: if isinstance(arg, ResultBase) and not arg.dimensions: dereference.append(arg.name) for i, result in enumerate(routine.results): if isinstance(result, Result): assign_to = result.result_var returns.append(str(result.result_var)) else: raise CodeGenError("unexpected object in Routine results") constants, not_supported, rs_expr = self._printer_method_with_settings( 'doprint', dict(human=False), result.expr, assign_to=assign_to) for name, value in sorted(constants, key=str): declarations.append("const %s: f64 = %s;\n" % (name, value)) for obj in sorted(not_supported, key=str): if isinstance(obj, Function): name = obj.func else: name = obj declarations.append("// unsupported: %s\n" % (name)) code_lines.append("let %s\n" % rs_expr); if len(returns) > 1: returns = ['(' + ', '.join(returns) + ')'] returns.append('\n') return declarations + code_lines + returns def _get_routine_ending(self, routine): return ["}\n"] def dump_rs(self, routines, f, prefix, header=True, empty=True): self.dump_code(routines, f, prefix, header, empty) dump_rs.extension = code_extension dump_rs.__doc__ = CodeGen.dump_code.__doc__ # This list of dump functions is used by CodeGen.write to know which dump # functions it has to call. dump_fns = [dump_rs] def get_code_generator(language, project=None, standard=None, printer = None): if language == 'C': if standard is None: pass elif standard.lower() == 'c89': language = 'C89' elif standard.lower() == 'c99': language = 'C99' CodeGenClass = {"C": CCodeGen, "C89": C89CodeGen, "C99": C99CodeGen, "F95": FCodeGen, "JULIA": JuliaCodeGen, "OCTAVE": OctaveCodeGen, "RUST": RustCodeGen}.get(language.upper()) if CodeGenClass is None: raise ValueError("Language '%s' is not supported." % language) return CodeGenClass(project, printer) # # Friendly functions # def codegen(name_expr, language=None, prefix=None, project="project", to_files=False, header=True, empty=True, argument_sequence=None, global_vars=None, standard=None, code_gen=None, printer = None): """Generate source code for expressions in a given language. Parameters ========== name_expr : tuple, or list of tuples A single (name, expression) tuple or a list of (name, expression) tuples. Each tuple corresponds to a routine. If the expression is an equality (an instance of class Equality) the left hand side is considered an output argument. If expression is an iterable, then the routine will have multiple outputs. language : string, A string that indicates the source code language. This is case insensitive. Currently, 'C', 'F95' and 'Octave' are supported. 'Octave' generates code compatible with both Octave and Matlab. prefix : string, optional A prefix for the names of the files that contain the source code. Language-dependent suffixes will be appended. If omitted, the name of the first name_expr tuple is used. project : string, optional A project name, used for making unique preprocessor instructions. [default: "project"] to_files : bool, optional When True, the code will be written to one or more files with the given prefix, otherwise strings with the names and contents of these files are returned. [default: False] header : bool, optional When True, a header is written on top of each source file. [default: True] empty : bool, optional When True, empty lines are used to structure the code. [default: True] argument_sequence : iterable, optional Sequence of arguments for the routine in a preferred order. A CodeGenError is raised if required arguments are missing. Redundant arguments are used without warning. If omitted, arguments will be ordered alphabetically, but with all input arguments first, and then output or in-out arguments. global_vars : iterable, optional Sequence of global variables used by the routine. Variables listed here will not show up as function arguments. standard : string code_gen : CodeGen instance An instance of a CodeGen subclass. Overrides ``language``. Examples ======== >>> from sympy.utilities.codegen import codegen >>> from sympy.abc import x, y, z >>> [(c_name, c_code), (h_name, c_header)] = codegen( ... ("f", x+yz), "C89", "test", header=False, empty=False) >>> print(c_name) test.c >>> print(c_code) #include "test.h" #include <math.h> double f(double x, double y, double z) { double f_result; f_result = x + yz; return f_result; } <BLANKLINE> >>> print(h_name) test.h >>> print(c_header) #ifndef PROJECT__TEST__H #define PROJECT__TEST__H double f(double x, double y, double z); #endif <BLANKLINE> Another example using Equality objects to give named outputs. Here the filename (prefix) is taken from the first (name, expr) pair. >>> from sympy.abc import f, g >>> from sympy import Eq >>> [(c_name, c_code), (h_name, c_header)] = codegen( ... [("myfcn", x + y), ("fcn2", [Eq(f, 2x), Eq(g, y)])], ... "C99", header=False, empty=False) >>> print(c_name) myfcn.c >>> print(c_code) #include "myfcn.h" #include <math.h> double myfcn(double x, double y) { double myfcn_result; myfcn_result = x + y; return myfcn_result; } void fcn2(double x, double y, double f, double g) { (f) = 2x; (g) = y; } <BLANKLINE> If the generated function(s) will be part of a larger project where various global variables have been defined, the 'global_vars' option can be used to remove the specified variables from the function signature >>> from sympy.utilities.codegen import codegen >>> from sympy.abc import x, y, z >>> [(f_name, f_code), header] = codegen( ... ("f", x+yz), "F95", header=False, empty=False, ... argument_sequence=(x, y), global_vars=(z,)) >>> print(f_code) REAL8 function f(x, y) implicit none REAL8, intent(in) :: x REAL8, intent(in) :: y f = x + yz end function <BLANKLINE> """ # Initialize the code generator. if language is None: if code_gen is None: raise ValueError("Need either language or code_gen") else: if code_gen is not None: raise ValueError("You cannot specify both language and code_gen.") code_gen = get_code_generator(language, project, standard, printer) if isinstance(name_expr[0], string_types): # single tuple is given, turn it into a singleton list with a tuple. name_expr = [name_expr] if prefix is None: prefix = name_expr[0][0] # Construct Routines appropriate for this code_gen from (name, expr) pairs. routines = [] for name, expr in name_expr: routines.append(code_gen.routine(name, expr, argument_sequence, global_vars)) # Write the code. return code_gen.write(routines, prefix, to_files, header, empty) def make_routine(name, expr, argument_sequence=None, global_vars=None, language="F95"): """A factory that makes an appropriate Routine from an expression. Parameters ========== name : string The name of this routine in the generated code. expr : expression or list/tuple of expressions A SymPy expression that the Routine instance will represent. If given a list or tuple of expressions, the routine will be considered to have multiple return values and/or output arguments. argument_sequence : list or tuple, optional List arguments for the routine in a preferred order. If omitted, the results are language dependent, for example, alphabetical order or in the same order as the given expressions. global_vars : iterable, optional Sequence of global variables used by the routine. Variables listed here will not show up as function arguments. language : string, optional Specify a target language. The Routine itself should be language-agnostic but the precise way one is created, error checking, etc depend on the language. [default: "F95"]. A decision about whether to use output arguments or return values is made depending on both the language and the particular mathematical expressions. For an expression of type Equality, the left hand side is typically made into an OutputArgument (or perhaps an InOutArgument if appropriate). Otherwise, typically, the calculated expression is made a return values of the routine. Examples ======== >>> from sympy.utilities.codegen import make_routine >>> from sympy.abc import x, y, f, g >>> from sympy import Eq >>> r = make_routine('test', [Eq(f, 2x), Eq(g, x + y)]) >>> [arg.result_var for arg in r.results] [] >>> [arg.name for arg in r.arguments] [x, y, f, g] >>> [arg.name for arg in r.result_variables] [f, g] >>> r.local_vars set() Another more complicated example with a mixture of specified and automatically-assigned names. Also has Matrix output. >>> from sympy import Matrix >>> r = make_routine('fcn', [xy, Eq(f, 1), Eq(g, x + g), Matrix([[x, 2]])]) >>> [arg.result_var for arg in r.results] # doctest: +SKIP [result_5397460570204848505] >>> [arg.expr for arg in r.results] [x*y] >>> [arg.name for arg in r.arguments] # doctest: +SKIP [x, y, f, g, out_8598435338387848786] We can examine the various arguments more closely: >>> from sympy.utilities.codegen import (InputArgument, OutputArgument, ... InOutArgument) >>> [a.name for a in r.arguments if isinstance(a, InputArgument)] [x, y] >>> [a.name for a in r.arguments if isinstance(a, OutputArgument)] # doctest: +SKIP [f, out_8598435338387848786] >>> [a.expr for a in r.arguments if isinstance(a, OutputArgument)] [1, Matrix([[x, 2]])] >>> [a.name for a in r.arguments if isinstance(a, InOutArgument)] [g] >>> [a.expr for a in r.arguments if isinstance(a, InOutArgument)] [g + x] """ # initialize a new code generator code_gen = get_code_generator(language) return code_gen.routine(name, expr, argument_sequence, global_vars)
2714f0b69eb3e522275d665375c1af7be58147810e44cf327d72b6c2218465d3	from __future__ import print_function, division from collections import defaultdict, OrderedDict from itertools import ( combinations, combinations_with_replacement, permutations, product, product as cartes ) import random from operator import gt from sympy.core import Basic # this is the logical location of these functions from sympy.core.compatibility import ( as_int, default_sort_key, is_sequence, iterable, ordered, range, string_types ) from sympy.utilities.enumerative import ( multiset_partitions_taocp, list_visitor, MultisetPartitionTraverser) def flatten(iterable, levels=None, cls=None): """ Recursively denest iterable containers. >>> from sympy.utilities.iterables import flatten >>> flatten([1, 2, 3]) [1, 2, 3] >>> flatten([1, 2, [3]]) [1, 2, 3] >>> flatten([1, [2, 3], [4, 5]]) [1, 2, 3, 4, 5] >>> flatten([1.0, 2, (1, None)]) [1.0, 2, 1, None] If you want to denest only a specified number of levels of nested containers, then set ``levels`` flag to the desired number of levels:: >>> ls = [[(-2, -1), (1, 2)], [(0, 0)]] >>> flatten(ls, levels=1) [(-2, -1), (1, 2), (0, 0)] If cls argument is specified, it will only flatten instances of that class, for example: >>> from sympy.core import Basic >>> class MyOp(Basic): ... pass ... >>> flatten([MyOp(1, MyOp(2, 3))], cls=MyOp) [1, 2, 3] adapted from https://kogs-www.informatik.uni-hamburg.de/~meine/python_tricks """ if levels is not None: if not levels: return iterable elif levels > 0: levels -= 1 else: raise ValueError( "expected non-negative number of levels, got %s" % levels) if cls is None: reducible = lambda x: is_sequence(x, set) else: reducible = lambda x: isinstance(x, cls) result = [] for el in iterable: if reducible(el): if hasattr(el, 'args'): el = el.args result.extend(flatten(el, levels=levels, cls=cls)) else: result.append(el) return result def unflatten(iter, n=2): """Group ``iter`` into tuples of length ``n``. Raise an error if the length of ``iter`` is not a multiple of ``n``. """ if n < 1 or len(iter) % n: raise ValueError('iter length is not a multiple of %i' % n) return list(zip((iter[i::n] for i in range(n)))) def reshape(seq, how): """Reshape the sequence according to the template in ``how``. Examples ======== >>> from sympy.utilities import reshape >>> seq = list(range(1, 9)) >>> reshape(seq, [4]) # lists of 4 [[1, 2, 3, 4], [5, 6, 7, 8]] >>> reshape(seq, (4,)) # tuples of 4 [(1, 2, 3, 4), (5, 6, 7, 8)] >>> reshape(seq, (2, 2)) # tuples of 4 [(1, 2, 3, 4), (5, 6, 7, 8)] >>> reshape(seq, (2, [2])) # (i, i, [i, i]) [(1, 2, [3, 4]), (5, 6, [7, 8])] >>> reshape(seq, ((2,), [2])) # etc.... [((1, 2), [3, 4]), ((5, 6), [7, 8])] >>> reshape(seq, (1, [2], 1)) [(1, [2, 3], 4), (5, [6, 7], 8)] >>> reshape(tuple(seq), ([[1], 1, (2,)],)) (([[1], 2, (3, 4)],), ([[5], 6, (7, 8)],)) >>> reshape(tuple(seq), ([1], 1, (2,))) (([1], 2, (3, 4)), ([5], 6, (7, 8))) >>> reshape(list(range(12)), [2, [3], {2}, (1, (3,), 1)]) [[0, 1, [2, 3, 4], {5, 6}, (7, (8, 9, 10), 11)]] """ m = sum(flatten(how)) n, rem = divmod(len(seq), m) if m < 0 or rem: raise ValueError('template must sum to positive number ' 'that divides the length of the sequence') i = 0 container = type(how) rv = [None]n for k in range(len(rv)): rv[k] = [] for hi in how: if type(hi) is int: rv[k].extend(seq[i: i + hi]) i += hi else: n = sum(flatten(hi)) hi_type = type(hi) rv[k].append(hi_type(reshape(seq[i: i + n], hi)[0])) i += n rv[k] = container(rv[k]) return type(seq)(rv) def group(seq, multiple=True): """ Splits a sequence into a list of lists of equal, adjacent elements. Examples ======== >>> from sympy.utilities.iterables import group >>> group([1, 1, 1, 2, 2, 3]) [[1, 1, 1], [2, 2], [3]] >>> group([1, 1, 1, 2, 2, 3], multiple=False) [(1, 3), (2, 2), (3, 1)] >>> group([1, 1, 3, 2, 2, 1], multiple=False) [(1, 2), (3, 1), (2, 2), (1, 1)] See Also ======== multiset """ if not seq: return [] current, groups = [seq[0]], [] for elem in seq[1:]: if elem == current[-1]: current.append(elem) else: groups.append(current) current = [elem] groups.append(current) if multiple: return groups for i, current in enumerate(groups): groups[i] = (current[0], len(current)) return groups def multiset(seq): """Return the hashable sequence in multiset form with values being the multiplicity of the item in the sequence. Examples ======== >>> from sympy.utilities.iterables import multiset >>> multiset('mississippi') {'i': 4, 'm': 1, 'p': 2, 's': 4} See Also ======== group """ rv = defaultdict(int) for s in seq: rv[s] += 1 return dict(rv) def postorder_traversal(node, keys=None): """ Do a postorder traversal of a tree. This generator recursively yields nodes that it has visited in a postorder fashion. That is, it descends through the tree depth-first to yield all of a node's children's postorder traversal before yielding the node itself. Parameters ========== node : sympy expression The expression to traverse. keys : (default None) sort key(s) The key(s) used to sort args of Basic objects. When None, args of Basic objects are processed in arbitrary order. If key is defined, it will be passed along to ordered() as the only key(s) to use to sort the arguments; if ``key`` is simply True then the default keys of ``ordered`` will be used (node count and default_sort_key). Yields ====== subtree : sympy expression All of the subtrees in the tree. Examples ======== >>> from sympy.utilities.iterables import postorder_traversal >>> from sympy.abc import w, x, y, z The nodes are returned in the order that they are encountered unless key is given; simply passing key=True will guarantee that the traversal is unique. >>> list(postorder_traversal(w + (x + y)z)) # doctest: +SKIP [z, y, x, x + y, z(x + y), w, w + z(x + y)] >>> list(postorder_traversal(w + (x + y)z, keys=True)) [w, z, x, y, x + y, z(x + y), w + z(x + y)] """ if isinstance(node, Basic): args = node.args if keys: if keys != True: args = ordered(args, keys, default=False) else: args = ordered(args) for arg in args: for subtree in postorder_traversal(arg, keys): yield subtree elif iterable(node): for item in node: for subtree in postorder_traversal(item, keys): yield subtree yield node def interactive_traversal(expr): """Traverse a tree asking a user which branch to choose. """ from sympy.printing import pprint RED, BRED = '\033[0;31m', '\033[1;31m' GREEN, BGREEN = '\033[0;32m', '\033[1;32m' YELLOW, BYELLOW = '\033[0;33m', '\033[1;33m' BLUE, BBLUE = '\033[0;34m', '\033[1;34m' MAGENTA, BMAGENTA = '\033[0;35m', '\033[1;35m' CYAN, BCYAN = '\033[0;36m', '\033[1;36m' END = '\033[0m' def cprint(args): print("".join(map(str, args)) + END) def _interactive_traversal(expr, stage): if stage > 0: print() cprint("Current expression (stage ", BYELLOW, stage, END, "):") print(BCYAN) pprint(expr) print(END) if isinstance(expr, Basic): if expr.is_Add: args = expr.as_ordered_terms() elif expr.is_Mul: args = expr.as_ordered_factors() else: args = expr.args elif hasattr(expr, "__iter__"): args = list(expr) else: return expr n_args = len(args) if not n_args: return expr for i, arg in enumerate(args): cprint(GREEN, "[", BGREEN, i, GREEN, "] ", BLUE, type(arg), END) pprint(arg) print if n_args == 1: choices = '0' else: choices = '0-%d' % (n_args - 1) try: choice = raw_input("Your choice [%s,f,l,r,d,?]: " % choices) except EOFError: result = expr print() else: if choice == '?': cprint(RED, "%s - select subexpression with the given index" % choices) cprint(RED, "f - select the first subexpression") cprint(RED, "l - select the last subexpression") cprint(RED, "r - select a random subexpression") cprint(RED, "d - done\n") result = _interactive_traversal(expr, stage) elif choice in ['d', '']: result = expr elif choice == 'f': result = _interactive_traversal(args[0], stage + 1) elif choice == 'l': result = _interactive_traversal(args[-1], stage + 1) elif choice == 'r': result = _interactive_traversal(random.choice(args), stage + 1) else: try: choice = int(choice) except ValueError: cprint(BRED, "Choice must be a number in %s range\n" % choices) result = _interactive_traversal(expr, stage) else: if choice < 0 or choice >= n_args: cprint(BRED, "Choice must be in %s range\n" % choices) result = _interactive_traversal(expr, stage) else: result = _interactive_traversal(args[choice], stage + 1) return result return _interactive_traversal(expr, 0) def ibin(n, bits=0, str=False): """Return a list of length ``bits`` corresponding to the binary value of ``n`` with small bits to the right (last). If bits is omitted, the length will be the number required to represent ``n``. If the bits are desired in reversed order, use the ``[::-1]`` slice of the returned list. If a sequence of all bits-length lists starting from ``[0, 0,..., 0]`` through ``[1, 1, ..., 1]`` are desired, pass a non-integer for bits, e.g. ``'all'``. If the bit string* is desired pass ``str=True``. Examples ======== >>> from sympy.utilities.iterables import ibin >>> ibin(2) [1, 0] >>> ibin(2, 4) [0, 0, 1, 0] >>> ibin(2, 4)[::-1] [0, 1, 0, 0] If all lists corresponding to 0 to 2n - 1, pass a non-integer for bits: >>> bits = 2 >>> for i in ibin(2, 'all'): ... print(i) (0, 0) (0, 1) (1, 0) (1, 1) If a bit string is desired of a given length, use str=True: >>> n = 123 >>> bits = 10 >>> ibin(n, bits, str=True) '0001111011' >>> ibin(n, bits, str=True)[::-1] # small bits left '1101111000' >>> list(ibin(3, 'all', str=True)) ['000', '001', '010', '011', '100', '101', '110', '111'] """ if not str: try: bits = as_int(bits) return [1 if i == "1" else 0 for i in bin(n)[2:].rjust(bits, "0")] except ValueError: return variations(list(range(2)), n, repetition=True) else: try: bits = as_int(bits) return bin(n)[2:].rjust(bits, "0") except ValueError: return (bin(i)[2:].rjust(n, "0") for i in range(2n)) def variations(seq, n, repetition=False): r"""Returns a generator of the n-sized variations of ``seq`` (size N). ``repetition`` controls whether items in ``seq`` can appear more than once; Examples ======== ``variations(seq, n)`` will return `\frac{N!}{(N - n)!}` permutations without repetition of ``seq``'s elements: >>> from sympy.utilities.iterables import variations >>> list(variations([1, 2], 2)) [(1, 2), (2, 1)] ``variations(seq, n, True)`` will return the `N^n` permutations obtained by allowing repetition of elements: >>> list(variations([1, 2], 2, repetition=True)) [(1, 1), (1, 2), (2, 1), (2, 2)] If you ask for more items than are in the set you get the empty set unless you allow repetitions: >>> list(variations([0, 1], 3, repetition=False)) [] >>> list(variations([0, 1], 3, repetition=True))[:4] [(0, 0, 0), (0, 0, 1), (0, 1, 0), (0, 1, 1)] See Also ======== sympy.core.compatibility.permutations sympy.core.compatibility.product """ if not repetition: seq = tuple(seq) if len(seq) < n: return for i in permutations(seq, n): yield i else: if n == 0: yield () else: for i in product(seq, repeat=n): yield i def subsets(seq, k=None, repetition=False): r"""Generates all `k`-subsets (combinations) from an `n`-element set, ``seq``. A `k`-subset of an `n`-element set is any subset of length exactly `k`. The number of `k`-subsets of an `n`-element set is given by ``binomial(n, k)``, whereas there are `2^n` subsets all together. If `k` is ``None`` then all `2^n` subsets will be returned from shortest to longest. Examples ======== >>> from sympy.utilities.iterables import subsets ``subsets(seq, k)`` will return the `\frac{n!}{k!(n - k)!}` `k`-subsets (combinations) without repetition, i.e. once an item has been removed, it can no longer be "taken": >>> list(subsets([1, 2], 2)) [(1, 2)] >>> list(subsets([1, 2])) [(), (1,), (2,), (1, 2)] >>> list(subsets([1, 2, 3], 2)) [(1, 2), (1, 3), (2, 3)] ``subsets(seq, k, repetition=True)`` will return the `\frac{(n - 1 + k)!}{k!(n - 1)!}` combinations with repetition: >>> list(subsets([1, 2], 2, repetition=True)) [(1, 1), (1, 2), (2, 2)] If you ask for more items than are in the set you get the empty set unless you allow repetitions: >>> list(subsets([0, 1], 3, repetition=False)) [] >>> list(subsets([0, 1], 3, repetition=True)) [(0, 0, 0), (0, 0, 1), (0, 1, 1), (1, 1, 1)] """ if k is None: for k in range(len(seq) + 1): for i in subsets(seq, k, repetition): yield i else: if not repetition: for i in combinations(seq, k): yield i else: for i in combinations_with_replacement(seq, k): yield i def filter_symbols(iterator, exclude): """ Only yield elements from `iterator` that do not occur in `exclude`. Parameters ========== iterator : iterable iterator to take elements from exclude : iterable elements to exclude Returns ======= iterator : iterator filtered iterator """ exclude = set(exclude) for s in iterator: if s not in exclude: yield s def numbered_symbols(prefix='x', cls=None, start=0, exclude=[], args, assumptions): """ Generate an infinite stream of Symbols consisting of a prefix and increasing subscripts provided that they do not occur in ``exclude``. Parameters ========== prefix : str, optional The prefix to use. By default, this function will generate symbols of the form "x0", "x1", etc. cls : class, optional The class to use. By default, it uses ``Symbol``, but you can also use ``Wild`` or ``Dummy``. start : int, optional The start number. By default, it is 0. Returns ======= sym : Symbol The subscripted symbols. """ exclude = set(exclude or []) if cls is None: # We can't just make the default cls=Symbol because it isn't # imported yet. from sympy import Symbol cls = Symbol while True: name = '%s%s' % (prefix, start) s = cls(name, args, assumptions) if s not in exclude: yield s start += 1 def capture(func): """Return the printed output of func(). ``func`` should be a function without arguments that produces output with print statements. >>> from sympy.utilities.iterables import capture >>> from sympy import pprint >>> from sympy.abc import x >>> def foo(): ... print('hello world!') ... >>> 'hello' in capture(foo) # foo, not foo() True >>> capture(lambda: pprint(2/x)) '2\\n-\\nx\\n' """ from sympy.core.compatibility import StringIO import sys stdout = sys.stdout sys.stdout = file = StringIO() try: func() finally: sys.stdout = stdout return file.getvalue() def sift(seq, keyfunc, binary=False): """ Sift the sequence, ``seq`` according to ``keyfunc``. Returns ======= When ``binary`` is ``False`` (default), the output is a dictionary where elements of ``seq`` are stored in a list keyed to the value of keyfunc for that element. If ``binary`` is True then a tuple with lists ``T`` and ``F`` are returned where ``T`` is a list containing elements of seq for which ``keyfunc`` was ``True`` and ``F`` containing those elements for which ``keyfunc`` was ``False``; a ValueError is raised if the ``keyfunc`` is not binary. Examples ======== >>> from sympy.utilities import sift >>> from sympy.abc import x, y >>> from sympy import sqrt, exp, pi, Tuple >>> sift(range(5), lambda x: x % 2) {0: [0, 2, 4], 1: [1, 3]} sift() returns a defaultdict() object, so any key that has no matches will give []. >>> sift([x], lambda x: x.is_commutative) {True: [x]} >>> _[False] [] Sometimes you will not know how many keys you will get: >>> sift([sqrt(x), exp(x), (yx)2], ... lambda x: x.as_base_exp()[0]) {E: [exp(x)], x: [sqrt(x)], y: [y(2x)]} Sometimes you expect the results to be binary; the results can be unpacked by setting ``binary`` to True: >>> sift(range(4), lambda x: x % 2, binary=True) ([1, 3], [0, 2]) >>> sift(Tuple(1, pi), lambda x: x.is_rational, binary=True) ([1], [pi]) A ValueError is raised if the predicate was not actually binary (which is a good test for the logic where sifting is used and binary results were expected): >>> unknown = exp(1) - pi # the rationality of this is unknown >>> args = Tuple(1, pi, unknown) >>> sift(args, lambda x: x.is_rational, binary=True) Traceback (most recent call last): ... ValueError: keyfunc gave non-binary output The non-binary sifting shows that there were 3 keys generated: >>> set(sift(args, lambda x: x.is_rational).keys()) {None, False, True} If you need to sort the sifted items it might be better to use ``ordered`` which can economically apply multiple sort keys to a sequence while sorting. See Also ======== ordered """ if not binary: m = defaultdict(list) for i in seq: m[keyfunc(i)].append(i) return m sift = F, T = [], [] for i in seq: try: sift[keyfunc(i)].append(i) except (IndexError, TypeError): raise ValueError('keyfunc gave non-binary output') return T, F def take(iter, n): """Return ``n`` items from ``iter`` iterator. """ return [ value for _, value in zip(range(n), iter) ] def dict_merge(dicts): """Merge dictionaries into a single dictionary. """ merged = {} for dict in dicts: merged.update(dict) return merged def common_prefix(seqs): """Return the subsequence that is a common start of sequences in ``seqs``. >>> from sympy.utilities.iterables import common_prefix >>> common_prefix(list(range(3))) [0, 1, 2] >>> common_prefix(list(range(3)), list(range(4))) [0, 1, 2] >>> common_prefix([1, 2, 3], [1, 2, 5]) [1, 2] >>> common_prefix([1, 2, 3], [1, 3, 5]) [1] """ if any(not s for s in seqs): return [] elif len(seqs) == 1: return seqs[0] i = 0 for i in range(min(len(s) for s in seqs)): if not all(seqs[j][i] == seqs[0][i] for j in range(len(seqs))): break else: i += 1 return seqs[0][:i] def common_suffix(seqs): """Return the subsequence that is a common ending of sequences in ``seqs``. >>> from sympy.utilities.iterables import common_suffix >>> common_suffix(list(range(3))) [0, 1, 2] >>> common_suffix(list(range(3)), list(range(4))) [] >>> common_suffix([1, 2, 3], [9, 2, 3]) [2, 3] >>> common_suffix([1, 2, 3], [9, 7, 3]) [3] """ if any(not s for s in seqs): return [] elif len(seqs) == 1: return seqs[0] i = 0 for i in range(-1, -min(len(s) for s in seqs) - 1, -1): if not all(seqs[j][i] == seqs[0][i] for j in range(len(seqs))): break else: i -= 1 if i == -1: return [] else: return seqs[0][i + 1:] def prefixes(seq): """ Generate all prefixes of a sequence. Examples ======== >>> from sympy.utilities.iterables import prefixes >>> list(prefixes([1,2,3,4])) [[1], [1, 2], [1, 2, 3], [1, 2, 3, 4]] """ n = len(seq) for i in range(n): yield seq[:i + 1] def postfixes(seq): """ Generate all postfixes of a sequence. Examples ======== >>> from sympy.utilities.iterables import postfixes >>> list(postfixes([1,2,3,4])) [[4], [3, 4], [2, 3, 4], [1, 2, 3, 4]] """ n = len(seq) for i in range(n): yield seq[n - i - 1:] def topological_sort(graph, key=None): r""" Topological sort of graph's vertices. Parameters ========== graph : tuple[list, list[tuple[T, T]] A tuple consisting of a list of vertices and a list of edges of a graph to be sorted topologically. key : callable[T] (optional) Ordering key for vertices on the same level. By default the natural (e.g. lexicographic) ordering is used (in this case the base type must implement ordering relations). Examples ======== Consider a graph:: +---+ +---+ +---+ \| 7 \|\ \| 5 \| \| 3 \| +---+ \ +---+ +---+ \| _\___/ ____ _/ \| \| / \___/ \ / \| V V V V \| +----+ +---+ \| \| 11 \| \| 8 \| \| +----+ +---+ \| \| \| \____ ___/ _ \| \| \ \ / / \ \| V \ V V / V V +---+ \ +---+ \| +----+ \| 2 \| \| \| 9 \| \| \| 10 \| +---+ \| +---+ \| +----+ \________/ where vertices are integers. This graph can be encoded using elementary Python's data structures as follows:: >>> V = [2, 3, 5, 7, 8, 9, 10, 11] >>> E = [(7, 11), (7, 8), (5, 11), (3, 8), (3, 10), ... (11, 2), (11, 9), (11, 10), (8, 9)] To compute a topological sort for graph ``(V, E)`` issue:: >>> from sympy.utilities.iterables import topological_sort >>> topological_sort((V, E)) [3, 5, 7, 8, 11, 2, 9, 10] If specific tie breaking approach is needed, use ``key`` parameter:: >>> topological_sort((V, E), key=lambda v: -v) [7, 5, 11, 3, 10, 8, 9, 2] Only acyclic graphs can be sorted. If the input graph has a cycle, then :py:exc:`ValueError` will be raised:: >>> topological_sort((V, E + [(10, 7)])) Traceback (most recent call last): ... ValueError: cycle detected References ========== .. [1] https://en.wikipedia.org/wiki/Topological_sorting """ V, E = graph L = [] S = set(V) E = list(E) for v, u in E: S.discard(u) if key is None: key = lambda value: value S = sorted(S, key=key, reverse=True) while S: node = S.pop() L.append(node) for u, v in list(E): if u == node: E.remove((u, v)) for _u, _v in E: if v == _v: break else: kv = key(v) for i, s in enumerate(S): ks = key(s) if kv > ks: S.insert(i, v) break else: S.append(v) if E: raise ValueError("cycle detected") else: return L def strongly_connected_components(G): r""" Strongly connected components of a directed graph in reverse topological order. Parameters ========== graph : tuple[list, list[tuple[T, T]] A tuple consisting of a list of vertices and a list of edges of a graph whose strongly connected components are to be found. Examples ======== Consider a directed graph (in dot notation):: digraph { A -> B A -> C B -> C C -> B B -> D } where vertices are the letters A, B, C and D. This graph can be encoded using Python's elementary data structures as follows:: >>> V = ['A', 'B', 'C', 'D'] >>> E = [('A', 'B'), ('A', 'C'), ('B', 'C'), ('C', 'B'), ('B', 'D')] The strongly connected components of this graph can be computed as >>> from sympy.utilities.iterables import strongly_connected_components >>> strongly_connected_components((V, E)) [['D'], ['B', 'C'], ['A']] This also gives the components in reverse topological order. Since the subgraph containing B and C has a cycle they must be together in a strongly connected component. A and D are connected to the rest of the graph but not in a cyclic manner so they appear as their own strongly connected components. Notes ===== The vertices of the graph must be hashable for the data structures used. If the vertices are unhashable replace them with integer indices. This function uses Tarjan's algorithm to compute the strongly connected components in `O(\|V\|+\|E\|)` (linear) time. References ========== .. [1] https://en.wikipedia.org/wiki/Strongly_connected_component .. [2] https://en.wikipedia.org/wiki/Tarjan%27s_strongly_connected_components_algorithm See Also ======== utilities.iterables.connected_components() """ # Map from a vertex to its neighbours V, E = G Gmap = {vi: [] for vi in V} for v1, v2 in E: Gmap[v1].append(v2) # Non-recursive Tarjan's algorithm: lowlink = {} indices = {} stack = OrderedDict() callstack = [] components = [] nomore = object() def start(v): index = len(stack) indices[v] = lowlink[v] = index stack[v] = None callstack.append((v, iter(Gmap[v]))) def finish(v1): # Finished a component? if lowlink[v1] == indices[v1]: component = [stack.popitem()[0]] while component[-1] is not v1: component.append(stack.popitem()[0]) components.append(component[::-1]) v2, _ = callstack.pop() if callstack: v1, _ = callstack[-1] lowlink[v1] = min(lowlink[v1], lowlink[v2]) for v in V: if v in indices: continue start(v) while callstack: v1, it1 = callstack[-1] v2 = next(it1, nomore) # Finished children of v1? if v2 is nomore: finish(v1) # Recurse on v2 elif v2 not in indices: start(v2) elif v2 in stack: lowlink[v1] = min(lowlink[v1], indices[v2]) # Reverse topological sort order: return components def connected_components(G): r""" Connected components of an undirected graph or weakly connected components of a directed graph. Parameters ========== graph : tuple[list, list[tuple[T, T]] A tuple consisting of a list of vertices and a list of edges of a graph whose connected components are to be found. Examples ======== Given an undirected graph:: graph { A -- B C -- D } We can find the connected components using this function if we include each edge in both directions:: >>> from sympy.utilities.iterables import connected_components >>> V = ['A', 'B', 'C', 'D'] >>> E = [('A', 'B'), ('B', 'A'), ('C', 'D'), ('D', 'C')] >>> connected_components((V, E)) [['A', 'B'], ['C', 'D']] The weakly connected components of a directed graph can found the same way. Notes ===== The vertices of the graph must be hashable for the data structures used. If the vertices are unhashable replace them with integer indices. This function uses Tarjan's algorithm to compute the connected components in `O(\|V\|+\|E\|)` (linear) time. References ========== .. [1] https://en.wikipedia.org/wiki/Connected_component_(graph_theory) .. [2] https://en.wikipedia.org/wiki/Tarjan%27s_strongly_connected_components_algorithm See Also ======== utilities.iterables.strongly_connected_components() """ # Duplicate edges both ways so that the graph is effectively undirected # and return the strongly connected components: V, E = G E_undirected = [] for v1, v2 in E: E_undirected.extend([(v1, v2), (v2, v1)]) return strongly_connected_components((V, E_undirected)) def rotate_left(x, y): """ Left rotates a list x by the number of steps specified in y. Examples ======== >>> from sympy.utilities.iterables import rotate_left >>> a = [0, 1, 2] >>> rotate_left(a, 1) [1, 2, 0] """ if len(x) == 0: return [] y = y % len(x) return x[y:] + x[:y] def rotate_right(x, y): """ Right rotates a list x by the number of steps specified in y. Examples ======== >>> from sympy.utilities.iterables import rotate_right >>> a = [0, 1, 2] >>> rotate_right(a, 1) [2, 0, 1] """ if len(x) == 0: return [] y = len(x) - y % len(x) return x[y:] + x[:y] def least_rotation(x): ''' Returns the number of steps of left rotation required to obtain lexicographically minimal string/list/tuple, etc. Examples ======== >>> from sympy.utilities.iterables import least_rotation, rotate_left >>> a = [3, 1, 5, 1, 2] >>> least_rotation(a) 3 >>> rotate_left(a, _) [1, 2, 3, 1, 5] References ========== .. [1] https://en.wikipedia.org/wiki/Lexicographically_minimal_string_rotation ''' S = x + x # Concatenate string to it self to avoid modular arithmetic f = [-1] * len(S) # Failure function k = 0 # Least rotation of string found so far for j in range(1,len(S)): sj = S[j] i = f[j-k-1] while i != -1 and sj != S[k+i+1]: if sj < S[k+i+1]: k = j-i-1 i = f[i] if sj != S[k+i+1]: if sj < S[k]: k = j f[j-k] = -1 else: f[j-k] = i+1 return k def multiset_combinations(m, n, g=None): """ Return the unique combinations of size ``n`` from multiset ``m``. Examples ======== >>> from sympy.utilities.iterables import multiset_combinations >>> from itertools import combinations >>> [''.join(i) for i in multiset_combinations('baby', 3)] ['abb', 'aby', 'bby'] >>> def count(f, s): return len(list(f(s, 3))) The number of combinations depends on the number of letters; the number of unique combinations depends on how the letters are repeated. >>> s1 = 'abracadabra' >>> s2 = 'banana tree' >>> count(combinations, s1), count(multiset_combinations, s1) (165, 23) >>> count(combinations, s2), count(multiset_combinations, s2) (165, 54) """ if g is None: if type(m) is dict: if n > sum(m.values()): return g = [[k, m[k]] for k in ordered(m)] else: m = list(m) if n > len(m): return try: m = multiset(m) g = [(k, m[k]) for k in ordered(m)] except TypeError: m = list(ordered(m)) g = [list(i) for i in group(m, multiple=False)] del m if sum(v for k, v in g) < n or not n: yield [] else: for i, (k, v) in enumerate(g): if v >= n: yield [k]n v = n - 1 for v in range(min(n, v), 0, -1): for j in multiset_combinations(None, n - v, g[i + 1:]): rv = [k]v + j if len(rv) == n: yield rv def multiset_permutations(m, size=None, g=None): """ Return the unique permutations of multiset ``m``. Examples ======== >>> from sympy.utilities.iterables import multiset_permutations >>> from sympy import factorial >>> [''.join(i) for i in multiset_permutations('aab')] ['aab', 'aba', 'baa'] >>> factorial(len('banana')) 720 >>> len(list(multiset_permutations('banana'))) 60 """ if g is None: if type(m) is dict: g = [[k, m[k]] for k in ordered(m)] else: m = list(ordered(m)) g = [list(i) for i in group(m, multiple=False)] del m do = [gi for gi in g if gi[1] > 0] SUM = sum([gi[1] for gi in do]) if not do or size is not None and (size > SUM or size < 1): if size < 1: yield [] return elif size == 1: for k, v in do: yield [k] elif len(do) == 1: k, v = do[0] v = v if size is None else (size if size <= v else 0) yield [k for i in range(v)] elif all(v == 1 for k, v in do): for p in permutations([k for k, v in do], size): yield list(p) else: size = size if size is not None else SUM for i, (k, v) in enumerate(do): do[i][1] -= 1 for j in multiset_permutations(None, size - 1, do): if j: yield [k] + j do[i][1] += 1 def _partition(seq, vector, m=None): """ Return the partition of seq as specified by the partition vector. Examples ======== >>> from sympy.utilities.iterables import _partition >>> _partition('abcde', [1, 0, 1, 2, 0]) [['b', 'e'], ['a', 'c'], ['d']] Specifying the number of bins in the partition is optional: >>> _partition('abcde', [1, 0, 1, 2, 0], 3) [['b', 'e'], ['a', 'c'], ['d']] The output of _set_partitions can be passed as follows: >>> output = (3, [1, 0, 1, 2, 0]) >>> _partition('abcde', output) [['b', 'e'], ['a', 'c'], ['d']] See Also ======== combinatorics.partitions.Partition.from_rgs() """ if m is None: m = max(vector) + 1 elif type(vector) is int: # entered as m, vector vector, m = m, vector p = [[] for i in range(m)] for i, v in enumerate(vector): p[v].append(seq[i]) return p def _set_partitions(n): """Cycle through all partions of n elements, yielding the current number of partitions, ``m``, and a mutable list, ``q`` such that element[i] is in part q[i] of the partition. NOTE: ``q`` is modified in place and generally should not be changed between function calls. Examples ======== >>> from sympy.utilities.iterables import _set_partitions, _partition >>> for m, q in _set_partitions(3): ... print('%s %s %s' % (m, q, _partition('abc', q, m))) 1 [0, 0, 0] [['a', 'b', 'c']] 2 [0, 0, 1] [['a', 'b'], ['c']] 2 [0, 1, 0] [['a', 'c'], ['b']] 2 [0, 1, 1] [['a'], ['b', 'c']] 3 [0, 1, 2] [['a'], ['b'], ['c']] Notes ===== This algorithm is similar to, and solves the same problem as, Algorithm 7.2.1.5H, from volume 4A of Knuth's The Art of Computer Programming. Knuth uses the term "restricted growth string" where this code refers to a "partition vector". In each case, the meaning is the same: the value in the ith element of the vector specifies to which part the ith set element is to be assigned. At the lowest level, this code implements an n-digit big-endian counter (stored in the array q) which is incremented (with carries) to get the next partition in the sequence. A special twist is that a digit is constrained to be at most one greater than the maximum of all the digits to the left of it. The array p maintains this maximum, so that the code can efficiently decide when a digit can be incremented in place or whether it needs to be reset to 0 and trigger a carry to the next digit. The enumeration starts with all the digits 0 (which corresponds to all the set elements being assigned to the same 0th part), and ends with 0123...n, which corresponds to each set element being assigned to a different, singleton, part. This routine was rewritten to use 0-based lists while trying to preserve the beauty and efficiency of the original algorithm. References ========== .. [1] Nijenhuis, Albert and Wilf, Herbert. (1978) Combinatorial Algorithms, 2nd Ed, p 91, algorithm "nexequ". Available online from https://www.math.upenn.edu/~wilf/website/CombAlgDownld.html (viewed November 17, 2012). """ p = [0]n q = [0]n nc = 1 yield nc, q while nc != n: m = n while 1: m -= 1 i = q[m] if p[i] != 1: break q[m] = 0 i += 1 q[m] = i m += 1 nc += m - n p[0] += n - m if i == nc: p[nc] = 0 nc += 1 p[i - 1] -= 1 p[i] += 1 yield nc, q def multiset_partitions(multiset, m=None): """ Return unique partitions of the given multiset (in list form). If ``m`` is None, all multisets will be returned, otherwise only partitions with ``m`` parts will be returned. If ``multiset`` is an integer, a range [0, 1, ..., multiset - 1] will be supplied. Examples ======== >>> from sympy.utilities.iterables import multiset_partitions >>> list(multiset_partitions([1, 2, 3, 4], 2)) [[[1, 2, 3], [4]], [[1, 2, 4], [3]], [[1, 2], [3, 4]], [[1, 3, 4], [2]], [[1, 3], [2, 4]], [[1, 4], [2, 3]], [[1], [2, 3, 4]]] >>> list(multiset_partitions([1, 2, 3, 4], 1)) [[[1, 2, 3, 4]]] Only unique partitions are returned and these will be returned in a canonical order regardless of the order of the input: >>> a = [1, 2, 2, 1] >>> ans = list(multiset_partitions(a, 2)) >>> a.sort() >>> list(multiset_partitions(a, 2)) == ans True >>> a = range(3, 1, -1) >>> (list(multiset_partitions(a)) == ... list(multiset_partitions(sorted(a)))) True If m is omitted then all partitions will be returned: >>> list(multiset_partitions([1, 1, 2])) [[[1, 1, 2]], [[1, 1], [2]], [[1, 2], [1]], [[1], [1], [2]]] >>> list(multiset_partitions([1]3)) [[[1, 1, 1]], [[1], [1, 1]], [[1], [1], [1]]] Counting ======== The number of partitions of a set is given by the bell number: >>> from sympy import bell >>> len(list(multiset_partitions(5))) == bell(5) == 52 True The number of partitions of length k from a set of size n is given by the Stirling Number of the 2nd kind: >>> from sympy.functions.combinatorial.numbers import stirling >>> stirling(5, 2) == len(list(multiset_partitions(5, 2))) == 15 True These comments on counting apply to sets, not multisets. Notes ===== When all the elements are the same in the multiset, the order of the returned partitions is determined by the ``partitions`` routine. If one is counting partitions then it is better to use the ``nT`` function. See Also ======== partitions sympy.combinatorics.partitions.Partition sympy.combinatorics.partitions.IntegerPartition sympy.functions.combinatorial.numbers.nT """ # This function looks at the supplied input and dispatches to # several special-case routines as they apply. if type(multiset) is int: n = multiset if m and m > n: return multiset = list(range(n)) if m == 1: yield [multiset[:]] return # If m is not None, it can sometimes be faster to use # MultisetPartitionTraverser.enum_range() even for inputs # which are sets. Since the _set_partitions code is quite # fast, this is only advantageous when the overall set # partitions outnumber those with the desired number of parts # by a large factor. (At least 60.) Such a switch is not # currently implemented. for nc, q in _set_partitions(n): if m is None or nc == m: rv = [[] for i in range(nc)] for i in range(n): rv[q[i]].append(multiset[i]) yield rv return if len(multiset) == 1 and isinstance(multiset, string_types): multiset = [multiset] if not has_variety(multiset): # Only one component, repeated n times. The resulting # partitions correspond to partitions of integer n. n = len(multiset) if m and m > n: return if m == 1: yield [multiset[:]] return x = multiset[:1] for size, p in partitions(n, m, size=True): if m is None or size == m: rv = [] for k in sorted(p): rv.extend([xk]p[k]) yield rv else: multiset = list(ordered(multiset)) n = len(multiset) if m and m > n: return if m == 1: yield [multiset[:]] return # Split the information of the multiset into two lists - # one of the elements themselves, and one (of the same length) # giving the number of repeats for the corresponding element. elements, multiplicities = zip(group(multiset, False)) if len(elements) < len(multiset): # General case - multiset with more than one distinct element # and at least one element repeated more than once. if m: mpt = MultisetPartitionTraverser() for state in mpt.enum_range(multiplicities, m-1, m): yield list_visitor(state, elements) else: for state in multiset_partitions_taocp(multiplicities): yield list_visitor(state, elements) else: # Set partitions case - no repeated elements. Pretty much # same as int argument case above, with same possible, but # currently unimplemented optimization for some cases when # m is not None for nc, q in _set_partitions(n): if m is None or nc == m: rv = [[] for i in range(nc)] for i in range(n): rv[q[i]].append(i) yield [[multiset[j] for j in i] for i in rv] def partitions(n, m=None, k=None, size=False): """Generate all partitions of positive integer, n. Parameters ========== m : integer (default gives partitions of all sizes) limits number of parts in partition (mnemonic: m, maximum parts) k : integer (default gives partitions number from 1 through n) limits the numbers that are kept in the partition (mnemonic: k, keys) size : bool (default False, only partition is returned) when ``True`` then (M, P) is returned where M is the sum of the multiplicities and P is the generated partition. Each partition is represented as a dictionary, mapping an integer to the number of copies of that integer in the partition. For example, the first partition of 4 returned is {4: 1}, "4: one of them". Examples ======== >>> from sympy.utilities.iterables import partitions The numbers appearing in the partition (the key of the returned dict) are limited with k: >>> for p in partitions(6, k=2): # doctest: +SKIP ... print(p) {2: 3} {1: 2, 2: 2} {1: 4, 2: 1} {1: 6} The maximum number of parts in the partition (the sum of the values in the returned dict) are limited with m (default value, None, gives partitions from 1 through n): >>> for p in partitions(6, m=2): # doctest: +SKIP ... print(p) ... {6: 1} {1: 1, 5: 1} {2: 1, 4: 1} {3: 2} Note that the _same_ dictionary object is returned each time. This is for speed: generating each partition goes quickly, taking constant time, independent of n. >>> [p for p in partitions(6, k=2)] [{1: 6}, {1: 6}, {1: 6}, {1: 6}] If you want to build a list of the returned dictionaries then make a copy of them: >>> [p.copy() for p in partitions(6, k=2)] # doctest: +SKIP [{2: 3}, {1: 2, 2: 2}, {1: 4, 2: 1}, {1: 6}] >>> [(M, p.copy()) for M, p in partitions(6, k=2, size=True)] # doctest: +SKIP [(3, {2: 3}), (4, {1: 2, 2: 2}), (5, {1: 4, 2: 1}), (6, {1: 6})] References ========== .. [1] modified from Tim Peter's version to allow for k and m values: http://code.activestate.com/recipes/218332-generator-for-integer-partitions/ See Also ======== sympy.combinatorics.partitions.Partition sympy.combinatorics.partitions.IntegerPartition """ if (n <= 0 or m is not None and m < 1 or k is not None and k < 1 or m and k and mk < n): # the empty set is the only way to handle these inputs # and returning {} to represent it is consistent with # the counting convention, e.g. nT(0) == 1. if size: yield 0, {} else: yield {} return if m is None: m = n else: m = min(m, n) if n == 0: if size: yield 1, {0: 1} else: yield {0: 1} return k = min(k or n, n) n, m, k = as_int(n), as_int(m), as_int(k) q, r = divmod(n, k) ms = {k: q} keys = [k] # ms.keys(), from largest to smallest if r: ms[r] = 1 keys.append(r) room = m - q - bool(r) if size: yield sum(ms.values()), ms else: yield ms while keys != [1]: # Reuse any 1's. if keys[-1] == 1: del keys[-1] reuse = ms.pop(1) room += reuse else: reuse = 0 while 1: # Let i be the smallest key larger than 1. Reuse one # instance of i. i = keys[-1] newcount = ms[i] = ms[i] - 1 reuse += i if newcount == 0: del keys[-1], ms[i] room += 1 # Break the remainder into pieces of size i-1. i -= 1 q, r = divmod(reuse, i) need = q + bool(r) if need > room: if not keys: return continue ms[i] = q keys.append(i) if r: ms[r] = 1 keys.append(r) break room -= need if size: yield sum(ms.values()), ms else: yield ms def ordered_partitions(n, m=None, sort=True): """Generates ordered partitions of integer ``n``. Parameters ========== m : integer (default None) The default value gives partitions of all sizes else only those with size m. In addition, if ``m`` is not None then partitions are generated in place (see examples). sort : bool (default True) Controls whether partitions are returned in sorted order when ``m`` is not None; when False, the partitions are returned as fast as possible with elements sorted, but when m\|n the partitions will not be in ascending lexicographical order. Examples ======== >>> from sympy.utilities.iterables import ordered_partitions All partitions of 5 in ascending lexicographical: >>> for p in ordered_partitions(5): ... print(p) [1, 1, 1, 1, 1] [1, 1, 1, 2] [1, 1, 3] [1, 2, 2] [1, 4] [2, 3] [5] Only partitions of 5 with two parts: >>> for p in ordered_partitions(5, 2): ... print(p) [1, 4] [2, 3] When ``m`` is given, a given list objects will be used more than once for speed reasons so you will not see the correct partitions unless you make a copy of each as it is generated: >>> [p for p in ordered_partitions(7, 3)] [[1, 1, 1], [1, 1, 1], [1, 1, 1], [2, 2, 2]] >>> [list(p) for p in ordered_partitions(7, 3)] [[1, 1, 5], [1, 2, 4], [1, 3, 3], [2, 2, 3]] When ``n`` is a multiple of ``m``, the elements are still sorted but the partitions themselves will be unordered if sort is False; the default is to return them in ascending lexicographical order. >>> for p in ordered_partitions(6, 2): ... print(p) [1, 5] [2, 4] [3, 3] But if speed is more important than ordering, sort can be set to False: >>> for p in ordered_partitions(6, 2, sort=False): ... print(p) [1, 5] [3, 3] [2, 4] References ========== .. [1] Generating Integer Partitions, [online], Available: https://jeromekelleher.net/generating-integer-partitions.html .. [2] Jerome Kelleher and Barry O'Sullivan, "Generating All Partitions: A Comparison Of Two Encodings", [online], Available: https://arxiv.org/pdf/0909.2331v2.pdf """ if n < 1 or m is not None and m < 1: # the empty set is the only way to handle these inputs # and returning {} to represent it is consistent with # the counting convention, e.g. nT(0) == 1. yield [] return if m is None: # The list `a`'s leading elements contain the partition in which # y is the biggest element and x is either the same as y or the # 2nd largest element; v and w are adjacent element indices # to which x and y are being assigned, respectively. a = [1]n y = -1 v = n while v > 0: v -= 1 x = a[v] + 1 while y >= 2 x: a[v] = x y -= x v += 1 w = v + 1 while x <= y: a[v] = x a[w] = y yield a[:w + 1] x += 1 y -= 1 a[v] = x + y y = a[v] - 1 yield a[:w] elif m == 1: yield [n] elif n == m: yield [1]n else: # recursively generate partitions of size m for b in range(1, n//m + 1): a = [b]m x = n - bm if not x: if sort: yield a elif not sort and x <= m: for ax in ordered_partitions(x, sort=False): mi = len(ax) a[-mi:] = [i + b for i in ax] yield a a[-mi:] = [b]mi else: for mi in range(1, m): for ax in ordered_partitions(x, mi, sort=True): a[-mi:] = [i + b for i in ax] yield a a[-mi:] = [b]mi def binary_partitions(n): """ Generates the binary partition of n. A binary partition consists only of numbers that are powers of two. Each step reduces a `2^{k+1}` to `2^k` and `2^k`. Thus 16 is converted to 8 and 8. Examples ======== >>> from sympy.utilities.iterables import binary_partitions >>> for i in binary_partitions(5): ... print(i) ... [4, 1] [2, 2, 1] [2, 1, 1, 1] [1, 1, 1, 1, 1] References ========== .. [1] TAOCP 4, section 7.2.1.5, problem 64 """ from math import ceil, log pow = int(2(ceil(log(n, 2)))) sum = 0 partition = [] while pow: if sum + pow <= n: partition.append(pow) sum += pow pow >>= 1 last_num = len(partition) - 1 - (n & 1) while last_num >= 0: yield partition if partition[last_num] == 2: partition[last_num] = 1 partition.append(1) last_num -= 1 continue partition.append(1) partition[last_num] >>= 1 x = partition[last_num + 1] = partition[last_num] last_num += 1 while x > 1: if x <= len(partition) - last_num - 1: del partition[-x + 1:] last_num += 1 partition[last_num] = x else: x >>= 1 yield [1]n def has_dups(seq): """Return True if there are any duplicate elements in ``seq``. Examples ======== >>> from sympy.utilities.iterables import has_dups >>> from sympy import Dict, Set >>> has_dups((1, 2, 1)) True >>> has_dups(range(3)) False >>> all(has_dups(c) is False for c in (set(), Set(), dict(), Dict())) True """ from sympy.core.containers import Dict from sympy.sets.sets import Set if isinstance(seq, (dict, set, Dict, Set)): return False uniq = set() return any(True for s in seq if s in uniq or uniq.add(s)) def has_variety(seq): """Return True if there are any different elements in ``seq``. Examples ======== >>> from sympy.utilities.iterables import has_variety >>> has_variety((1, 2, 1)) True >>> has_variety((1, 1, 1)) False """ for i, s in enumerate(seq): if i == 0: sentinel = s else: if s != sentinel: return True return False def uniq(seq, result=None): """ Yield unique elements from ``seq`` as an iterator. The second parameter ``result`` is used internally; it is not necessary to pass anything for this. Examples ======== >>> from sympy.utilities.iterables import uniq >>> dat = [1, 4, 1, 5, 4, 2, 1, 2] >>> type(uniq(dat)) in (list, tuple) False >>> list(uniq(dat)) [1, 4, 5, 2] >>> list(uniq(x for x in dat)) [1, 4, 5, 2] >>> list(uniq([[1], [2, 1], [1]])) [[1], [2, 1]] """ try: seen = set() result = result or [] for i, s in enumerate(seq): if not (s in seen or seen.add(s)): yield s except TypeError: if s not in result: yield s result.append(s) if hasattr(seq, '__getitem__'): for s in uniq(seq[i + 1:], result): yield s else: for s in uniq(seq, result): yield s def generate_bell(n): """Return permutations of [0, 1, ..., n - 1] such that each permutation differs from the last by the exchange of a single pair of neighbors. The ``n!`` permutations are returned as an iterator. In order to obtain the next permutation from a random starting permutation, use the ``next_trotterjohnson`` method of the Permutation class (which generates the same sequence in a different manner). Examples ======== >>> from itertools import permutations >>> from sympy.utilities.iterables import generate_bell >>> from sympy import zeros, Matrix This is the sort of permutation used in the ringing of physical bells, and does not produce permutations in lexicographical order. Rather, the permutations differ from each other by exactly one inversion, and the position at which the swapping occurs varies periodically in a simple fashion. Consider the first few permutations of 4 elements generated by ``permutations`` and ``generate_bell``: >>> list(permutations(range(4)))[:5] [(0, 1, 2, 3), (0, 1, 3, 2), (0, 2, 1, 3), (0, 2, 3, 1), (0, 3, 1, 2)] >>> list(generate_bell(4))[:5] [(0, 1, 2, 3), (0, 1, 3, 2), (0, 3, 1, 2), (3, 0, 1, 2), (3, 0, 2, 1)] Notice how the 2nd and 3rd lexicographical permutations have 3 elements out of place whereas each "bell" permutation always has only two elements out of place relative to the previous permutation (and so the signature (+/-1) of a permutation is opposite of the signature of the previous permutation). How the position of inversion varies across the elements can be seen by tracing out where the largest number appears in the permutations: >>> m = zeros(4, 24) >>> for i, p in enumerate(generate_bell(4)): ... m[:, i] = Matrix([j - 3 for j in list(p)]) # make largest zero >>> m.print_nonzero('X') [XXX XXXXXX XXXXXX XXX] [XX XX XXXX XX XXXX XX XX] [X XXXX XX XXXX XX XXXX X] [ XXXXXX XXXXXX XXXXXX ] See Also ======== sympy.combinatorics.Permutation.next_trotterjohnson References ========== .. [1] https://en.wikipedia.org/wiki/Method_ringing .. [2] https://stackoverflow.com/questions/4856615/recursive-permutation/4857018 .. [3] http://programminggeeks.com/bell-algorithm-for-permutation/ .. [4] https://en.wikipedia.org/wiki/Steinhaus%E2%80%93Johnson%E2%80%93Trotter_algorithm .. [5] Generating involutions, derangements, and relatives by ECO Vincent Vajnovszki, DMTCS vol 1 issue 12, 2010 """ n = as_int(n) if n < 1: raise ValueError('n must be a positive integer') if n == 1: yield (0,) elif n == 2: yield (0, 1) yield (1, 0) elif n == 3: for li in [(0, 1, 2), (0, 2, 1), (2, 0, 1), (2, 1, 0), (1, 2, 0), (1, 0, 2)]: yield li else: m = n - 1 op = [0] + [-1]m l = list(range(n)) while True: yield tuple(l) # find biggest element with op big = None, -1 # idx, value for i in range(n): if op[i] and l[i] > big[1]: big = i, l[i] i, _ = big if i is None: break # there are no ops left # swap it with neighbor in the indicated direction j = i + op[i] l[i], l[j] = l[j], l[i] op[i], op[j] = op[j], op[i] # if it landed at the end or if the neighbor in the same # direction is bigger then turn off op if j == 0 or j == m or l[j + op[j]] > l[j]: op[j] = 0 # any element bigger to the left gets +1 op for i in range(j): if l[i] > l[j]: op[i] = 1 # any element bigger to the right gets -1 op for i in range(j + 1, n): if l[i] > l[j]: op[i] = -1 def generate_involutions(n): """ Generates involutions. An involution is a permutation that when multiplied by itself equals the identity permutation. In this implementation the involutions are generated using Fixed Points. Alternatively, an involution can be considered as a permutation that does not contain any cycles with a length that is greater than two. Examples ======== >>> from sympy.utilities.iterables import generate_involutions >>> list(generate_involutions(3)) [(0, 1, 2), (0, 2, 1), (1, 0, 2), (2, 1, 0)] >>> len(list(generate_involutions(4))) 10 References ========== .. [1] http://mathworld.wolfram.com/PermutationInvolution.html """ idx = list(range(n)) for p in permutations(idx): for i in idx: if p[p[i]] != i: break else: yield p def generate_derangements(perm): """ Routine to generate unique derangements. TODO: This will be rewritten to use the ECO operator approach once the permutations branch is in master. Examples ======== >>> from sympy.utilities.iterables import generate_derangements >>> list(generate_derangements([0, 1, 2])) [[1, 2, 0], [2, 0, 1]] >>> list(generate_derangements([0, 1, 2, 3])) [[1, 0, 3, 2], [1, 2, 3, 0], [1, 3, 0, 2], [2, 0, 3, 1], \ [2, 3, 0, 1], [2, 3, 1, 0], [3, 0, 1, 2], [3, 2, 0, 1], \ [3, 2, 1, 0]] >>> list(generate_derangements([0, 1, 1])) [] See Also ======== sympy.functions.combinatorial.factorials.subfactorial """ p = multiset_permutations(perm) indices = range(len(perm)) p0 = next(p) for pi in p: if all(pi[i] != p0[i] for i in indices): yield pi def necklaces(n, k, free=False): """ A routine to generate necklaces that may (free=True) or may not (free=False) be turned over to be viewed. The "necklaces" returned are comprised of ``n`` integers (beads) with ``k`` different values (colors). Only unique necklaces are returned. Examples ======== >>> from sympy.utilities.iterables import necklaces, bracelets >>> def show(s, i): ... return ''.join(s[j] for j in i) The "unrestricted necklace" is sometimes also referred to as a "bracelet" (an object that can be turned over, a sequence that can be reversed) and the term "necklace" is used to imply a sequence that cannot be reversed. So ACB == ABC for a bracelet (rotate and reverse) while the two are different for a necklace since rotation alone cannot make the two sequences the same. (mnemonic: Bracelets can be viewed Backwards, but Not Necklaces.) >>> B = [show('ABC', i) for i in bracelets(3, 3)] >>> N = [show('ABC', i) for i in necklaces(3, 3)] >>> set(N) - set(B) {'ACB'} >>> list(necklaces(4, 2)) [(0, 0, 0, 0), (0, 0, 0, 1), (0, 0, 1, 1), (0, 1, 0, 1), (0, 1, 1, 1), (1, 1, 1, 1)] >>> [show('.o', i) for i in bracelets(4, 2)] ['....', '...o', '..oo', '.o.o', '.ooo', 'oooo'] References ========== .. [1] http://mathworld.wolfram.com/Necklace.html """ return uniq(minlex(i, directed=not free) for i in variations(list(range(k)), n, repetition=True)) def bracelets(n, k): """Wrapper to necklaces to return a free (unrestricted) necklace.""" return necklaces(n, k, free=True) def generate_oriented_forest(n): """ This algorithm generates oriented forests. An oriented graph is a directed graph having no symmetric pair of directed edges. A forest is an acyclic graph, i.e., it has no cycles. A forest can also be described as a disjoint union of trees, which are graphs in which any two vertices are connected by exactly one simple path. Examples ======== >>> from sympy.utilities.iterables import generate_oriented_forest >>> list(generate_oriented_forest(4)) [[0, 1, 2, 3], [0, 1, 2, 2], [0, 1, 2, 1], [0, 1, 2, 0], \ [0, 1, 1, 1], [0, 1, 1, 0], [0, 1, 0, 1], [0, 1, 0, 0], [0, 0, 0, 0]] References ========== .. [1] T. Beyer and S.M. Hedetniemi: constant time generation of rooted trees, SIAM J. Computing Vol. 9, No. 4, November 1980 .. [2] https://stackoverflow.com/questions/1633833/oriented-forest-taocp-algorithm-in-python """ P = list(range(-1, n)) while True: yield P[1:] if P[n] > 0: P[n] = P[P[n]] else: for p in range(n - 1, 0, -1): if P[p] != 0: target = P[p] - 1 for q in range(p - 1, 0, -1): if P[q] == target: break offset = p - q for i in range(p, n + 1): P[i] = P[i - offset] break else: break def minlex(seq, directed=True, is_set=False, small=None): """ Return a tuple where the smallest element appears first; if ``directed`` is True (default) then the order is preserved, otherwise the sequence will be reversed if that gives a smaller ordering. If every element appears only once then is_set can be set to True for more efficient processing. If the smallest element is known at the time of calling, it can be passed and the calculation of the smallest element will be omitted. Examples ======== >>> from sympy.combinatorics.polyhedron import minlex >>> minlex((1, 2, 0)) (0, 1, 2) >>> minlex((1, 0, 2)) (0, 2, 1) >>> minlex((1, 0, 2), directed=False) (0, 1, 2) >>> minlex('11010011000', directed=True) '00011010011' >>> minlex('11010011000', directed=False) '00011001011' """ is_str = isinstance(seq, string_types) seq = list(seq) if small is None: small = min(seq, key=default_sort_key) if is_set: i = seq.index(small) if not directed: n = len(seq) p = (i + 1) % n m = (i - 1) % n if default_sort_key(seq[p]) > default_sort_key(seq[m]): seq = list(reversed(seq)) i = n - i - 1 if i: seq = rotate_left(seq, i) best = seq else: count = seq.count(small) if count == 1 and directed: best = rotate_left(seq, seq.index(small)) else: # if not directed, and not a set, we can't just # pass this off to minlex with is_set True since # peeking at the neighbor may not be sufficient to # make the decision so we continue... best = seq for i in range(count): seq = rotate_left(seq, seq.index(small, count != 1)) if seq < best: best = seq # it's cheaper to rotate now rather than search # again for these in reversed order so we test # the reverse now if not directed: seq = rotate_left(seq, 1) seq = list(reversed(seq)) if seq < best: best = seq seq = list(reversed(seq)) seq = rotate_right(seq, 1) # common return if is_str: return ''.join(best) return tuple(best) def runs(seq, op=gt): """Group the sequence into lists in which successive elements all compare the same with the comparison operator, ``op``: op(seq[i + 1], seq[i]) is True from all elements in a run. Examples ======== >>> from sympy.utilities.iterables import runs >>> from operator import ge >>> runs([0, 1, 2, 2, 1, 4, 3, 2, 2]) [[0, 1, 2], [2], [1, 4], [3], [2], [2]] >>> runs([0, 1, 2, 2, 1, 4, 3, 2, 2], op=ge) [[0, 1, 2, 2], [1, 4], [3], [2, 2]] """ cycles = [] seq = iter(seq) try: run = [next(seq)] except StopIteration: return [] while True: try: ei = next(seq) except StopIteration: break if op(ei, run[-1]): run.append(ei) continue else: cycles.append(run) run = [ei] if run: cycles.append(run) return cycles def kbins(l, k, ordered=None): """ Return sequence ``l`` partitioned into ``k`` bins. Examples ======== >>> from sympy.utilities.iterables import kbins The default is to give the items in the same order, but grouped into k partitions without any reordering: >>> from __future__ import print_function >>> for p in kbins(list(range(5)), 2): ... print(p) ... [[0], [1, 2, 3, 4]] [[0, 1], [2, 3, 4]] [[0, 1, 2], [3, 4]] [[0, 1, 2, 3], [4]] The ``ordered`` flag is either None (to give the simple partition of the elements) or is a 2 digit integer indicating whether the order of the bins and the order of the items in the bins matters. Given:: A = [[0], [1, 2]] B = [[1, 2], [0]] C = [[2, 1], [0]] D = [[0], [2, 1]] the following values for ``ordered`` have the shown meanings:: 00 means A == B == C == D 01 means A == B 10 means A == D 11 means A == A >>> for ordered in [None, 0, 1, 10, 11]: ... print('ordered = %s' % ordered) ... for p in kbins(list(range(3)), 2, ordered=ordered): ... print(' %s' % p) ... ordered = None [[0], [1, 2]] [[0, 1], [2]] ordered = 0 [[0, 1], [2]] [[0, 2], [1]] [[0], [1, 2]] ordered = 1 [[0], [1, 2]] [[0], [2, 1]] [[1], [0, 2]] [[1], [2, 0]] [[2], [0, 1]] [[2], [1, 0]] ordered = 10 [[0, 1], [2]] [[2], [0, 1]] [[0, 2], [1]] [[1], [0, 2]] [[0], [1, 2]] [[1, 2], [0]] ordered = 11 [[0], [1, 2]] [[0, 1], [2]] [[0], [2, 1]] [[0, 2], [1]] [[1], [0, 2]] [[1, 0], [2]] [[1], [2, 0]] [[1, 2], [0]] [[2], [0, 1]] [[2, 0], [1]] [[2], [1, 0]] [[2, 1], [0]] See Also ======== partitions, multiset_partitions """ def partition(lista, bins): # EnricoGiampieri's partition generator from # https://stackoverflow.com/questions/13131491/ # partition-n-items-into-k-bins-in-python-lazily if len(lista) == 1 or bins == 1: yield [lista] elif len(lista) > 1 and bins > 1: for i in range(1, len(lista)): for part in partition(lista[i:], bins - 1): if len([lista[:i]] + part) == bins: yield [lista[:i]] + part if ordered is None: for p in partition(l, k): yield p elif ordered == 11: for pl in multiset_permutations(l): pl = list(pl) for p in partition(pl, k): yield p elif ordered == 00: for p in multiset_partitions(l, k): yield p elif ordered == 10: for p in multiset_partitions(l, k): for perm in permutations(p): yield list(perm) elif ordered == 1: for kgot, p in partitions(len(l), k, size=True): if kgot != k: continue for li in multiset_permutations(l): rv = [] i = j = 0 li = list(li) for size, multiplicity in sorted(p.items()): for m in range(multiplicity): j = i + size rv.append(li[i: j]) i = j yield rv else: raise ValueError( 'ordered must be one of 00, 01, 10 or 11, not %s' % ordered) def permute_signs(t): """Return iterator in which the signs of non-zero elements of t are permuted. Examples ======== >>> from sympy.utilities.iterables import permute_signs >>> list(permute_signs((0, 1, 2))) [(0, 1, 2), (0, -1, 2), (0, 1, -2), (0, -1, -2)] """ for signs in cartes([(1, -1)](len(t) - t.count(0))): signs = list(signs) yield type(t)([isigns.pop() if i else i for i in t]) def signed_permutations(t): """Return iterator in which the signs of non-zero elements of t and the order of the elements are permuted. Examples ======== >>> from sympy.utilities.iterables import signed_permutations >>> list(signed_permutations((0, 1, 2))) [(0, 1, 2), (0, -1, 2), (0, 1, -2), (0, -1, -2), (0, 2, 1), (0, -2, 1), (0, 2, -1), (0, -2, -1), (1, 0, 2), (-1, 0, 2), (1, 0, -2), (-1, 0, -2), (1, 2, 0), (-1, 2, 0), (1, -2, 0), (-1, -2, 0), (2, 0, 1), (-2, 0, 1), (2, 0, -1), (-2, 0, -1), (2, 1, 0), (-2, 1, 0), (2, -1, 0), (-2, -1, 0)] """ return (type(t)(i) for j in permutations(t) for i in permute_signs(j)) def rotations(s, dir=1): """Return a generator giving the items in s as list where each subsequent list has the items rotated to the left (default) or right (dir=-1) relative to the previous list. Examples ======== >>> from sympy.utilities.iterables import rotations >>> list(rotations([1,2,3])) [[1, 2, 3], [2, 3, 1], [3, 1, 2]] >>> list(rotations([1,2,3], -1)) [[1, 2, 3], [3, 1, 2], [2, 3, 1]] """ seq = list(s) for i in range(len(seq)): yield seq seq = rotate_left(seq, dir)
08466959c55b31891c9599b0f1d4c7c5c5f7a29c12f7109d1c5cd84d3faa8ac6	""" This is our testing framework. Goals: * it should be compatible with py.test and operate very similarly (or identically) * doesn't require any external dependencies * preferably all the functionality should be in this file only * no magic, just import the test file and execute the test functions, that's it * portable """ from __future__ import print_function, division import os import sys import platform import inspect import traceback import pdb import re import linecache import time from fnmatch import fnmatch from timeit import default_timer as clock import doctest as pdoctest # avoid clashing with our doctest() function from doctest import DocTestFinder, DocTestRunner import random import subprocess import signal import stat import tempfile from sympy.core.cache import clear_cache from sympy.core.compatibility import exec_, PY3, string_types, range, unwrap from sympy.utilities.misc import find_executable from sympy.external import import_module from sympy.utilities.exceptions import SymPyDeprecationWarning IS_WINDOWS = (os.name == 'nt') ON_TRAVIS = os.getenv('TRAVIS_BUILD_NUMBER', None) # emperically generated list of the proportion of time spent running # an even split of tests. This should periodically be regenerated. # A list of [.6, .1, .3] would mean that if the tests are evenly split # into '1/3', '2/3', '3/3', the first split would take 60% of the time, # the second 10% and the third 30%. These lists are normalized to sum # to 1, so [60, 10, 30] has the same behavior as [6, 1, 3] or [.6, .1, .3]. # # This list can be generated with the code: # from time import time # import sympy # # delays, num_splits = [], 30 # for i in range(1, num_splits + 1): # tic = time() # sympy.test(split='{}/{}'.format(i, num_splits), time_balance=False) # Add slow=True for slow tests # delays.append(time() - tic) # tot = sum(delays) # print([round(x / tot, 4) for x in delays]) SPLIT_DENSITY = [0.0801, 0.0099, 0.0429, 0.0103, 0.0122, 0.0055, 0.0533, 0.0191, 0.0977, 0.0878, 0.0026, 0.0028, 0.0147, 0.0118, 0.0358, 0.0063, 0.0026, 0.0351, 0.0084, 0.0027, 0.0158, 0.0156, 0.0024, 0.0416, 0.0566, 0.0425, 0.2123, 0.0042, 0.0099, 0.0576] SPLIT_DENSITY_SLOW = [0.1525, 0.0342, 0.0092, 0.0004, 0.0005, 0.0005, 0.0379, 0.0353, 0.0637, 0.0801, 0.0005, 0.0004, 0.0133, 0.0021, 0.0098, 0.0108, 0.0005, 0.0076, 0.0005, 0.0004, 0.0056, 0.0093, 0.0005, 0.0264, 0.0051, 0.0956, 0.2983, 0.0005, 0.0005, 0.0981] class Skipped(Exception): pass class TimeOutError(Exception): pass class DependencyError(Exception): pass # add more flags ?? future_flags = division.compiler_flag def _indent(s, indent=4): """ Add the given number of space characters to the beginning of every non-blank line in ``s``, and return the result. If the string ``s`` is Unicode, it is encoded using the stdout encoding and the ``backslashreplace`` error handler. """ # After a 2to3 run the below code is bogus, so wrap it with a version check if not PY3: if isinstance(s, unicode): s = s.encode(pdoctest._encoding, 'backslashreplace') # This regexp matches the start of non-blank lines: return re.sub('(?m)^(?!$)', indent' ', s) pdoctest._indent = _indent # override reporter to maintain windows and python3 def _report_failure(self, out, test, example, got): """ Report that the given example failed. """ s = self._checker.output_difference(example, got, self.optionflags) s = s.encode('raw_unicode_escape').decode('utf8', 'ignore') out(self._failure_header(test, example) + s) if PY3 and IS_WINDOWS: DocTestRunner.report_failure = _report_failure def convert_to_native_paths(lst): """ Converts a list of '/' separated paths into a list of native (os.sep separated) paths and converts to lowercase if the system is case insensitive. """ newlst = [] for i, rv in enumerate(lst): rv = os.path.join(rv.split("/")) # on windows the slash after the colon is dropped if sys.platform == "win32": pos = rv.find(':') if pos != -1: if rv[pos + 1] != '\\': rv = rv[:pos + 1] + '\\' + rv[pos + 1:] newlst.append(os.path.normcase(rv)) return newlst def get_sympy_dir(): """ Returns the root sympy directory and set the global value indicating whether the system is case sensitive or not. """ this_file = os.path.abspath(__file__) sympy_dir = os.path.join(os.path.dirname(this_file), "..", "..") sympy_dir = os.path.normpath(sympy_dir) return os.path.normcase(sympy_dir) def setup_pprint(): from sympy import pprint_use_unicode, init_printing import sympy.interactive.printing as interactive_printing # force pprint to be in ascii mode in doctests use_unicode_prev = pprint_use_unicode(False) # hook our nice, hash-stable strprinter init_printing(pretty_print=False) # Prevent init_printing() in doctests from affecting other doctests interactive_printing.NO_GLOBAL = True return use_unicode_prev def run_in_subprocess_with_hash_randomization( function, function_args=(), function_kwargs=None, command=sys.executable, module='sympy.utilities.runtests', force=False): """ Run a function in a Python subprocess with hash randomization enabled. If hash randomization is not supported by the version of Python given, it returns False. Otherwise, it returns the exit value of the command. The function is passed to sys.exit(), so the return value of the function will be the return value. The environment variable PYTHONHASHSEED is used to seed Python's hash randomization. If it is set, this function will return False, because starting a new subprocess is unnecessary in that case. If it is not set, one is set at random, and the tests are run. Note that if this environment variable is set when Python starts, hash randomization is automatically enabled. To force a subprocess to be created even if PYTHONHASHSEED is set, pass ``force=True``. This flag will not force a subprocess in Python versions that do not support hash randomization (see below), because those versions of Python do not support the ``-R`` flag. ``function`` should be a string name of a function that is importable from the module ``module``, like "_test". The default for ``module`` is "sympy.utilities.runtests". ``function_args`` and ``function_kwargs`` should be a repr-able tuple and dict, respectively. The default Python command is sys.executable, which is the currently running Python command. This function is necessary because the seed for hash randomization must be set by the environment variable before Python starts. Hence, in order to use a predetermined seed for tests, we must start Python in a separate subprocess. Hash randomization was added in the minor Python versions 2.6.8, 2.7.3, 3.1.5, and 3.2.3, and is enabled by default in all Python versions after and including 3.3.0. Examples ======== >>> from sympy.utilities.runtests import ( ... run_in_subprocess_with_hash_randomization) >>> # run the core tests in verbose mode >>> run_in_subprocess_with_hash_randomization("_test", ... function_args=("core",), ... function_kwargs={'verbose': True}) # doctest: +SKIP # Will return 0 if sys.executable supports hash randomization and tests # pass, 1 if they fail, and False if it does not support hash # randomization. """ # Note, we must return False everywhere, not None, as subprocess.call will # sometimes return None. # First check if the Python version supports hash randomization # If it doesn't have this support, it won't reconize the -R flag p = subprocess.Popen([command, "-RV"], stdout=subprocess.PIPE, stderr=subprocess.STDOUT) p.communicate() if p.returncode != 0: return False hash_seed = os.getenv("PYTHONHASHSEED") if not hash_seed: os.environ["PYTHONHASHSEED"] = str(random.randrange(2*32)) else: if not force: return False function_kwargs = function_kwargs or {} # Now run the command commandstring = ("import sys; from %s import %s;sys.exit(%s(%s, *%s))" % (module, function, function, repr(function_args), repr(function_kwargs))) try: p = subprocess.Popen([command, "-R", "-c", commandstring]) p.communicate() except KeyboardInterrupt: p.wait() finally: # Put the environment variable back, so that it reads correctly for # the current Python process. if hash_seed is None: del os.environ["PYTHONHASHSEED"] else: os.environ["PYTHONHASHSEED"] = hash_seed return p.returncode def run_all_tests(test_args=(), test_kwargs=None, doctest_args=(), doctest_kwargs=None, examples_args=(), examples_kwargs=None): """ Run all tests. Right now, this runs the regular tests (bin/test), the doctests (bin/doctest), the examples (examples/all.py), and the sage tests (see sympy/external/tests/test_sage.py). This is what ``setup.py test`` uses. You can pass arguments and keyword arguments to the test functions that support them (for now, test, doctest, and the examples). See the docstrings of those functions for a description of the available options. For example, to run the solvers tests with colors turned off: >>> from sympy.utilities.runtests import run_all_tests >>> run_all_tests(test_args=("solvers",), ... test_kwargs={"colors:False"}) # doctest: +SKIP """ tests_successful = True test_kwargs = test_kwargs or {} doctest_kwargs = doctest_kwargs or {} examples_kwargs = examples_kwargs or {'quiet': True} try: # Regular tests if not test(test_args, *test_kwargs): # some regular test fails, so set the tests_successful # flag to false and continue running the doctests tests_successful = False # Doctests print() if not doctest(doctest_args, *doctest_kwargs): tests_successful = False # Examples print() sys.path.append("examples") from all import run_examples # examples/all.py if not run_examples(examples_args, *examples_kwargs): tests_successful = False # Sage tests if sys.platform != "win32" and not PY3 and os.path.exists("bin/test"): # run Sage tests; Sage currently doesn't support Windows or Python 3 # Only run Sage tests if 'bin/test' is present (it is missing from # our release because everything in the 'bin' directory gets # installed). dev_null = open(os.devnull, 'w') if subprocess.call("sage -v", shell=True, stdout=dev_null, stderr=dev_null) == 0: if subprocess.call("sage -python bin/test " "sympy/external/tests/test_sage.py", shell=True, cwd=os.path.dirname(os.path.dirname(os.path.dirname(__file__)))) != 0: tests_successful = False if tests_successful: return else: # Return nonzero exit code sys.exit(1) except KeyboardInterrupt: print() print("DO NOT* COMMIT!") sys.exit(1) def test(paths, kwargs): """ Run tests in the specified test_.py files. Tests in a particular test_.py file are run if any of the given strings in ``paths`` matches a part of the test file's path. If ``paths=[]``, tests in all test_.py files are run. Notes: - If sort=False, tests are run in random order (not default). - Paths can be entered in native system format or in unix, forward-slash format. - Files that are on the blacklist can be tested by providing their path; they are only excluded if no paths are given. Explanation of test results ====== =============================================================== Output Meaning ====== =============================================================== . passed F failed X XPassed (expected to fail but passed) f XFAILed (expected to fail and indeed failed) s skipped w slow T timeout (e.g., when ``--timeout`` is used) K KeyboardInterrupt (when running the slow tests with ``--slow``, you can interrupt one of them without killing the test runner) ====== =============================================================== Colors have no additional meaning and are used just to facilitate interpreting the output. Examples ======== >>> import sympy Run all tests: >>> sympy.test() # doctest: +SKIP Run one file: >>> sympy.test("sympy/core/tests/test_basic.py") # doctest: +SKIP >>> sympy.test("_basic") # doctest: +SKIP Run all tests in sympy/functions/ and some particular file: >>> sympy.test("sympy/core/tests/test_basic.py", ... "sympy/functions") # doctest: +SKIP Run all tests in sympy/core and sympy/utilities: >>> sympy.test("/core", "/util") # doctest: +SKIP Run specific test from a file: >>> sympy.test("sympy/core/tests/test_basic.py", ... kw="test_equality") # doctest: +SKIP Run specific test from any file: >>> sympy.test(kw="subs") # doctest: +SKIP Run the tests with verbose mode on: >>> sympy.test(verbose=True) # doctest: +SKIP Don't sort the test output: >>> sympy.test(sort=False) # doctest: +SKIP Turn on post-mortem pdb: >>> sympy.test(pdb=True) # doctest: +SKIP Turn off colors: >>> sympy.test(colors=False) # doctest: +SKIP Force colors, even when the output is not to a terminal (this is useful, e.g., if you are piping to ``less -r`` and you still want colors) >>> sympy.test(force_colors=False) # doctest: +SKIP The traceback verboseness can be set to "short" or "no" (default is "short") >>> sympy.test(tb='no') # doctest: +SKIP The ``split`` option can be passed to split the test run into parts. The split currently only splits the test files, though this may change in the future. ``split`` should be a string of the form 'a/b', which will run part ``a`` of ``b``. For instance, to run the first half of the test suite: >>> sympy.test(split='1/2') # doctest: +SKIP The ``time_balance`` option can be passed in conjunction with ``split``. If ``time_balance=True`` (the default for ``sympy.test``), sympy will attempt to split the tests such that each split takes equal time. This heuristic for balancing is based on pre-recorded test data. >>> sympy.test(split='1/2', time_balance=True) # doctest: +SKIP You can disable running the tests in a separate subprocess using ``subprocess=False``. This is done to support seeding hash randomization, which is enabled by default in the Python versions where it is supported. If subprocess=False, hash randomization is enabled/disabled according to whether it has been enabled or not in the calling Python process. However, even if it is enabled, the seed cannot be printed unless it is called from a new Python process. Hash randomization was added in the minor Python versions 2.6.8, 2.7.3, 3.1.5, and 3.2.3, and is enabled by default in all Python versions after and including 3.3.0. If hash randomization is not supported ``subprocess=False`` is used automatically. >>> sympy.test(subprocess=False) # doctest: +SKIP To set the hash randomization seed, set the environment variable ``PYTHONHASHSEED`` before running the tests. This can be done from within Python using >>> import os >>> os.environ['PYTHONHASHSEED'] = '42' # doctest: +SKIP Or from the command line using $ PYTHONHASHSEED=42 ./bin/test If the seed is not set, a random seed will be chosen. Note that to reproduce the same hash values, you must use both the same seed as well as the same architecture (32-bit vs. 64-bit). """ subprocess = kwargs.pop("subprocess", True) rerun = kwargs.pop("rerun", 0) # count up from 0, do not print 0 print_counter = lambda i : (print("rerun %d" % (rerun-i)) if rerun-i else None) if subprocess: # loop backwards so last i is 0 for i in range(rerun, -1, -1): print_counter(i) ret = run_in_subprocess_with_hash_randomization("_test", function_args=paths, function_kwargs=kwargs) if ret is False: break val = not bool(ret) # exit on the first failure or if done if not val or i == 0: return val # rerun even if hash randomization is not supported for i in range(rerun, -1, -1): print_counter(i) val = not bool(_test(paths, kwargs)) if not val or i == 0: return val def _test(paths, *kwargs): """ Internal function that actually runs the tests. All keyword arguments from ``test()`` are passed to this function except for ``subprocess``. Returns 0 if tests passed and 1 if they failed. See the docstring of ``test()`` for more information. """ verbose = kwargs.get("verbose", False) tb = kwargs.get("tb", "short") kw = kwargs.get("kw", None) or () # ensure that kw is a tuple if isinstance(kw, string_types): kw = (kw, ) post_mortem = kwargs.get("pdb", False) colors = kwargs.get("colors", True) force_colors = kwargs.get("force_colors", False) sort = kwargs.get("sort", True) seed = kwargs.get("seed", None) if seed is None: seed = random.randrange(100000000) timeout = kwargs.get("timeout", False) fail_on_timeout = kwargs.get("fail_on_timeout", False) if ON_TRAVIS and timeout is False: # Travis times out if no activity is seen for 10 minutes. timeout = 595 fail_on_timeout = True slow = kwargs.get("slow", False) enhance_asserts = kwargs.get("enhance_asserts", False) split = kwargs.get('split', None) time_balance = kwargs.get('time_balance', True) blacklist = kwargs.get('blacklist', ['sympy/integrals/rubi/rubi_tests/tests']) if ON_TRAVIS: # pyglet does not work on Travis blacklist.extend(['sympy/plotting/pygletplot/tests']) blacklist = convert_to_native_paths(blacklist) fast_threshold = kwargs.get('fast_threshold', None) slow_threshold = kwargs.get('slow_threshold', None) r = PyTestReporter(verbose=verbose, tb=tb, colors=colors, force_colors=force_colors, split=split) t = SymPyTests(r, kw, post_mortem, seed, fast_threshold=fast_threshold, slow_threshold=slow_threshold) # Show deprecation warnings import warnings warnings.simplefilter("error", SymPyDeprecationWarning) warnings.filterwarnings('error', '.', DeprecationWarning, module='sympy.') test_files = t.get_test_files('sympy') not_blacklisted = [f for f in test_files if not any(b in f for b in blacklist)] if len(paths) == 0: matched = not_blacklisted else: paths = convert_to_native_paths(paths) matched = [] for f in not_blacklisted: basename = os.path.basename(f) for p in paths: if p in f or fnmatch(basename, p): matched.append(f) break density = None if time_balance: if slow: density = SPLIT_DENSITY_SLOW else: density = SPLIT_DENSITY if split: matched = split_list(matched, split, density=density) t._testfiles.extend(matched) return int(not t.test(sort=sort, timeout=timeout, slow=slow, enhance_asserts=enhance_asserts, fail_on_timeout=fail_on_timeout)) def doctest(paths, *kwargs): r""" Runs doctests in all \.py files in the sympy directory which match any of the given strings in ``paths`` or all tests if paths=[]. Notes: - Paths can be entered in native system format or in unix, forward-slash format. - Files that are on the blacklist can be tested by providing their path; they are only excluded if no paths are given. Examples ======== >>> import sympy Run all tests: >>> sympy.doctest() # doctest: +SKIP Run one file: >>> sympy.doctest("sympy/core/basic.py") # doctest: +SKIP >>> sympy.doctest("polynomial.rst") # doctest: +SKIP Run all tests in sympy/functions/ and some particular file: >>> sympy.doctest("/functions", "basic.py") # doctest: +SKIP Run any file having polynomial in its name, doc/src/modules/polynomial.rst, sympy/functions/special/polynomials.py, and sympy/polys/polynomial.py: >>> sympy.doctest("polynomial") # doctest: +SKIP The ``split`` option can be passed to split the test run into parts. The split currently only splits the test files, though this may change in the future. ``split`` should be a string of the form 'a/b', which will run part ``a`` of ``b``. Note that the regular doctests and the Sphinx doctests are split independently. For instance, to run the first half of the test suite: >>> sympy.doctest(split='1/2') # doctest: +SKIP The ``subprocess`` and ``verbose`` options are the same as with the function ``test()``. See the docstring of that function for more information. """ subprocess = kwargs.pop("subprocess", True) rerun = kwargs.pop("rerun", 0) # count up from 0, do not print 0 print_counter = lambda i : (print("rerun %d" % (rerun-i)) if rerun-i else None) if subprocess: # loop backwards so last i is 0 for i in range(rerun, -1, -1): print_counter(i) ret = run_in_subprocess_with_hash_randomization("_doctest", function_args=paths, function_kwargs=kwargs) if ret is False: break val = not bool(ret) # exit on the first failure or if done if not val or i == 0: return val # rerun even if hash randomization is not supported for i in range(rerun, -1, -1): print_counter(i) val = not bool(_doctest(paths, kwargs)) if not val or i == 0: return val def _get_doctest_blacklist(): '''Get the default blacklist for the doctests''' blacklist = [] blacklist.extend([ "doc/src/modules/plotting.rst", # generates live plots "doc/src/modules/physics/mechanics/autolev_parser.rst", "sympy/physics/gaussopt.py", # raises deprecation warning "sympy/galgebra.py", # raises ImportError "sympy/this.py", # Prints text to the terminal "sympy/matrices/densearith.py", # raises deprecation warning "sympy/matrices/densesolve.py", # raises deprecation warning "sympy/matrices/densetools.py", # raises deprecation warning "sympy/physics/unitsystems.py", # raises deprecation warning "sympy/parsing/autolev/_antlr/autolevlexer.py", # generated code "sympy/parsing/autolev/_antlr/autolevparser.py", # generated code "sympy/parsing/autolev/_antlr/autolevlistener.py", # generated code "sympy/parsing/latex/_antlr/latexlexer.py", # generated code "sympy/parsing/latex/_antlr/latexparser.py", # generated code "sympy/integrals/rubi/rubi.py" ]) # autolev parser tests num = 12 for i in range (1, num+1): blacklist.append("sympy/parsing/autolev/test-examples/ruletest" + str(i) + ".py") blacklist.extend(["sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.py", "sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.py", "sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.py", "sympy/parsing/autolev/test-examples/pydy-example-repo/non_min_pendulum.py"]) if import_module('numpy') is None: blacklist.extend([ "sympy/plotting/experimental_lambdify.py", "sympy/plotting/plot_implicit.py", "examples/advanced/autowrap_integrators.py", "examples/advanced/autowrap_ufuncify.py", "examples/intermediate/sample.py", "examples/intermediate/mplot2d.py", "examples/intermediate/mplot3d.py", "doc/src/modules/numeric-computation.rst" ]) else: if import_module('matplotlib') is None: blacklist.extend([ "examples/intermediate/mplot2d.py", "examples/intermediate/mplot3d.py" ]) else: # Use a non-windowed backend, so that the tests work on Travis import matplotlib matplotlib.use('Agg') if ON_TRAVIS or import_module('pyglet') is None: blacklist.extend(["sympy/plotting/pygletplot"]) if import_module('theano') is None: blacklist.extend([ "sympy/printing/theanocode.py", "doc/src/modules/numeric-computation.rst", ]) if import_module('antlr4') is None: blacklist.extend([ "sympy/parsing/autolev/__init__.py", "sympy/parsing/latex/_parse_latex_antlr.py", ]) # disabled because of doctest failures in asmeurer's bot blacklist.extend([ "sympy/utilities/autowrap.py", "examples/advanced/autowrap_integrators.py", "examples/advanced/autowrap_ufuncify.py" ]) # blacklist these modules until issue 4840 is resolved blacklist.extend([ "sympy/conftest.py", "sympy/utilities/benchmarking.py" ]) blacklist = convert_to_native_paths(blacklist) return blacklist def _doctest(paths, *kwargs): """ Internal function that actually runs the doctests. All keyword arguments from ``doctest()`` are passed to this function except for ``subprocess``. Returns 0 if tests passed and 1 if they failed. See the docstrings of ``doctest()`` and ``test()`` for more information. """ from sympy import pprint_use_unicode normal = kwargs.get("normal", False) verbose = kwargs.get("verbose", False) colors = kwargs.get("colors", True) force_colors = kwargs.get("force_colors", False) blacklist = kwargs.get("blacklist", []) split = kwargs.get('split', None) blacklist.extend(_get_doctest_blacklist()) # Use a non-windowed backend, so that the tests work on Travis if import_module('matplotlib') is not None: import matplotlib matplotlib.use('Agg') # Disable warnings for external modules import sympy.external sympy.external.importtools.WARN_OLD_VERSION = False sympy.external.importtools.WARN_NOT_INSTALLED = False # Disable showing up of plots from sympy.plotting.plot import unset_show unset_show() # Show deprecation warnings import warnings warnings.simplefilter("error", SymPyDeprecationWarning) warnings.filterwarnings('error', '.', DeprecationWarning, module='sympy.') r = PyTestReporter(verbose, split=split, colors=colors,\ force_colors=force_colors) t = SymPyDocTests(r, normal) test_files = t.get_test_files('sympy') test_files.extend(t.get_test_files('examples', init_only=False)) not_blacklisted = [f for f in test_files if not any(b in f for b in blacklist)] if len(paths) == 0: matched = not_blacklisted else: # take only what was requested...but not blacklisted items # and allow for partial match anywhere or fnmatch of name paths = convert_to_native_paths(paths) matched = [] for f in not_blacklisted: basename = os.path.basename(f) for p in paths: if p in f or fnmatch(basename, p): matched.append(f) break if split: matched = split_list(matched, split) t._testfiles.extend(matched) # run the tests and record the result for this py portion of the tests if t._testfiles: failed = not t.test() else: failed = False # N.B. # -------------------------------------------------------------------- # Here we test .rst files at or below doc/src. Code from these must # be self supporting in terms of imports since there is no importing # of necessary modules by doctest.testfile. If you try to pass .py # files through this they might fail because they will lack the needed # imports and smarter parsing that can be done with source code. # test_files = t.get_test_files('doc/src', '.rst', init_only=False) test_files.sort() not_blacklisted = [f for f in test_files if not any(b in f for b in blacklist)] if len(paths) == 0: matched = not_blacklisted else: # Take only what was requested as long as it's not on the blacklist. # Paths were already made native in py tests so don't repeat here. # There's no chance of having a py file slip through since we # only have rst files in test_files. matched = [] for f in not_blacklisted: basename = os.path.basename(f) for p in paths: if p in f or fnmatch(basename, p): matched.append(f) break if split: matched = split_list(matched, split) first_report = True for rst_file in matched: if not os.path.isfile(rst_file): continue old_displayhook = sys.displayhook try: use_unicode_prev = setup_pprint() out = sympytestfile( rst_file, module_relative=False, encoding='utf-8', optionflags=pdoctest.ELLIPSIS \| pdoctest.NORMALIZE_WHITESPACE \| pdoctest.IGNORE_EXCEPTION_DETAIL) finally: # make sure we return to the original displayhook in case some # doctest has changed that sys.displayhook = old_displayhook # The NO_GLOBAL flag overrides the no_global flag to init_printing # if True import sympy.interactive.printing as interactive_printing interactive_printing.NO_GLOBAL = False pprint_use_unicode(use_unicode_prev) rstfailed, tested = out if tested: failed = rstfailed or failed if first_report: first_report = False msg = 'rst doctests start' if not t._testfiles: r.start(msg=msg) else: r.write_center(msg) print() # use as the id, everything past the first 'sympy' file_id = rst_file[rst_file.find('sympy') + len('sympy') + 1:] print(file_id, end=" ") # get at least the name out so it is know who is being tested wid = r.terminal_width - len(file_id) - 1 # update width test_file = '[%s]' % (tested) report = '[%s]' % (rstfailed or 'OK') print(''.join( [test_file, ' '(wid - len(test_file) - len(report)), report]) ) # the doctests for py will have printed this message already if there was # a failure, so now only print it if there was intervening reporting by # testing the rst as evidenced by first_report no longer being True. if not first_report and failed: print() print("DO NOT* COMMIT!") return int(failed) sp = re.compile(r'([0-9]+)/([1-9][0-9])') def split_list(l, split, density=None): """ Splits a list into part a of b split should be a string of the form 'a/b'. For instance, '1/3' would give the split one of three. If the length of the list is not divisible by the number of splits, the last split will have more items. `density` may be specified as a list. If specified, tests will be balanced so that each split has as equal-as-possible amount of mass according to `density`. >>> from sympy.utilities.runtests import split_list >>> a = list(range(10)) >>> split_list(a, '1/3') [0, 1, 2] >>> split_list(a, '2/3') [3, 4, 5] >>> split_list(a, '3/3') [6, 7, 8, 9] """ m = sp.match(split) if not m: raise ValueError("split must be a string of the form a/b where a and b are ints") i, t = map(int, m.groups()) if not density: return l[(i - 1)len(l)//t : ilen(l)//t] # normalize density tot = sum(density) density = [x / tot for x in density] def density_inv(x): """Interpolate the inverse to the cumulative distribution function given by density""" if x <= 0: return 0 if x >= sum(density): return 1 # find the first time the cumulative sum surpasses x # and linearly interpolate cumm = 0 for i, d in enumerate(density): cumm += d if cumm >= x: break frac = (d - (cumm - x)) / d return (i + frac) / len(density) lower_frac = density_inv((i - 1) / t) higher_frac = density_inv(i / t) return l[int(lower_fraclen(l)) : int(higher_fraclen(l))] from collections import namedtuple SymPyTestResults = namedtuple('TestResults', 'failed attempted') def sympytestfile(filename, module_relative=True, name=None, package=None, globs=None, verbose=None, report=True, optionflags=0, extraglobs=None, raise_on_error=False, parser=pdoctest.DocTestParser(), encoding=None): """ Test examples in the given file. Return (#failures, #tests). Optional keyword arg ``module_relative`` specifies how filenames should be interpreted: - If ``module_relative`` is True (the default), then ``filename`` specifies a module-relative path. By default, this path is relative to the calling module's directory; but if the ``package`` argument is specified, then it is relative to that package. To ensure os-independence, ``filename`` should use "/" characters to separate path segments, and should not be an absolute path (i.e., it may not begin with "/"). - If ``module_relative`` is False, then ``filename`` specifies an os-specific path. The path may be absolute or relative (to the current working directory). Optional keyword arg ``name`` gives the name of the test; by default use the file's basename. Optional keyword argument ``package`` is a Python package or the name of a Python package whose directory should be used as the base directory for a module relative filename. If no package is specified, then the calling module's directory is used as the base directory for module relative filenames. It is an error to specify ``package`` if ``module_relative`` is False. Optional keyword arg ``globs`` gives a dict to be used as the globals when executing examples; by default, use {}. A copy of this dict is actually used for each docstring, so that each docstring's examples start with a clean slate. Optional keyword arg ``extraglobs`` gives a dictionary that should be merged into the globals that are used to execute examples. By default, no extra globals are used. Optional keyword arg ``verbose`` prints lots of stuff if true, prints only failures if false; by default, it's true iff "-v" is in sys.argv. Optional keyword arg ``report`` prints a summary at the end when true, else prints nothing at the end. In verbose mode, the summary is detailed, else very brief (in fact, empty if all tests passed). Optional keyword arg ``optionflags`` or's together module constants, and defaults to 0. Possible values (see the docs for details): - DONT_ACCEPT_TRUE_FOR_1 - DONT_ACCEPT_BLANKLINE - NORMALIZE_WHITESPACE - ELLIPSIS - SKIP - IGNORE_EXCEPTION_DETAIL - REPORT_UDIFF - REPORT_CDIFF - REPORT_NDIFF - REPORT_ONLY_FIRST_FAILURE Optional keyword arg ``raise_on_error`` raises an exception on the first unexpected exception or failure. This allows failures to be post-mortem debugged. Optional keyword arg ``parser`` specifies a DocTestParser (or subclass) that should be used to extract tests from the files. Optional keyword arg ``encoding`` specifies an encoding that should be used to convert the file to unicode. Advanced tomfoolery: testmod runs methods of a local instance of class doctest.Tester, then merges the results into (or creates) global Tester instance doctest.master. Methods of doctest.master can be called directly too, if you want to do something unusual. Passing report=0 to testmod is especially useful then, to delay displaying a summary. Invoke doctest.master.summarize(verbose) when you're done fiddling. """ if package and not module_relative: raise ValueError("Package may only be specified for module-" "relative paths.") # Relativize the path if not PY3: text, filename = pdoctest._load_testfile( filename, package, module_relative) if encoding is not None: text = text.decode(encoding) else: text, filename = pdoctest._load_testfile( filename, package, module_relative, encoding) # If no name was given, then use the file's name. if name is None: name = os.path.basename(filename) # Assemble the globals. if globs is None: globs = {} else: globs = globs.copy() if extraglobs is not None: globs.update(extraglobs) if '__name__' not in globs: globs['__name__'] = '__main__' if raise_on_error: runner = pdoctest.DebugRunner(verbose=verbose, optionflags=optionflags) else: runner = SymPyDocTestRunner(verbose=verbose, optionflags=optionflags) runner._checker = SymPyOutputChecker() # Read the file, convert it to a test, and run it. test = parser.get_doctest(text, globs, name, filename, 0) runner.run(test, compileflags=future_flags) if report: runner.summarize() if pdoctest.master is None: pdoctest.master = runner else: pdoctest.master.merge(runner) return SymPyTestResults(runner.failures, runner.tries) class SymPyTests(object): def __init__(self, reporter, kw="", post_mortem=False, seed=None, fast_threshold=None, slow_threshold=None): self._post_mortem = post_mortem self._kw = kw self._count = 0 self._root_dir = get_sympy_dir() self._reporter = reporter self._reporter.root_dir(self._root_dir) self._testfiles = [] self._seed = seed if seed is not None else random.random() # Defaults in seconds, from human / UX design limits # http://www.nngroup.com/articles/response-times-3-important-limits/ # # These defaults are NOT* set in stone as we are measuring different # things, so others feel free to come up with a better yardstick :) if fast_threshold: self._fast_threshold = float(fast_threshold) else: self._fast_threshold = 5 if slow_threshold: self._slow_threshold = float(slow_threshold) else: self._slow_threshold = 10 def test(self, sort=False, timeout=False, slow=False, enhance_asserts=False, fail_on_timeout=False): """ Runs the tests returning True if all tests pass, otherwise False. If sort=False run tests in random order. """ if sort: self._testfiles.sort() elif slow: pass else: random.seed(self._seed) random.shuffle(self._testfiles) self._reporter.start(self._seed) for f in self._testfiles: try: self.test_file(f, sort, timeout, slow, enhance_asserts, fail_on_timeout) except KeyboardInterrupt: print(" interrupted by user") self._reporter.finish() raise return self._reporter.finish() def _enhance_asserts(self, source): from ast import (NodeTransformer, Compare, Name, Store, Load, Tuple, Assign, BinOp, Str, Mod, Assert, parse, fix_missing_locations) ops = {"Eq": '==', "NotEq": '!=', "Lt": '<', "LtE": '<=', "Gt": '>', "GtE": '>=', "Is": 'is', "IsNot": 'is not', "In": 'in', "NotIn": 'not in'} class Transform(NodeTransformer): def visit_Assert(self, stmt): if isinstance(stmt.test, Compare): compare = stmt.test values = [compare.left] + compare.comparators names = [ "_%s" % i for i, _ in enumerate(values) ] names_store = [ Name(n, Store()) for n in names ] names_load = [ Name(n, Load()) for n in names ] target = Tuple(names_store, Store()) value = Tuple(values, Load()) assign = Assign([target], value) new_compare = Compare(names_load[0], compare.ops, names_load[1:]) msg_format = "\n%s " + "\n%s ".join([ ops[op.__class__.__name__] for op in compare.ops ]) + "\n%s" msg = BinOp(Str(msg_format), Mod(), Tuple(names_load, Load())) test = Assert(new_compare, msg, lineno=stmt.lineno, col_offset=stmt.col_offset) return [assign, test] else: return stmt tree = parse(source) new_tree = Transform().visit(tree) return fix_missing_locations(new_tree) def test_file(self, filename, sort=True, timeout=False, slow=False, enhance_asserts=False, fail_on_timeout=False): reporter = self._reporter funcs = [] try: gl = {'__file__': filename} try: if PY3: open_file = lambda: open(filename, encoding="utf8") else: open_file = lambda: open(filename) with open_file() as f: source = f.read() if self._kw: for l in source.splitlines(): if l.lstrip().startswith('def '): if any(l.find(k) != -1 for k in self._kw): break else: return if enhance_asserts: try: source = self._enhance_asserts(source) except ImportError: pass code = compile(source, filename, "exec", flags=0, dont_inherit=True) exec_(code, gl) except (SystemExit, KeyboardInterrupt): raise except ImportError: reporter.import_error(filename, sys.exc_info()) return except Exception: reporter.test_exception(sys.exc_info()) clear_cache() self._count += 1 random.seed(self._seed) disabled = gl.get("disabled", False) if not disabled: # we need to filter only those functions that begin with 'test_' # We have to be careful about decorated functions. As long as # the decorator uses functools.wraps, we can detect it. funcs = [] for f in gl: if (f.startswith("test_") and (inspect.isfunction(gl[f]) or inspect.ismethod(gl[f]))): func = gl[f] # Handle multiple decorators while hasattr(func, '__wrapped__'): func = func.__wrapped__ if inspect.getsourcefile(func) == filename: funcs.append(gl[f]) if slow: funcs = [f for f in funcs if getattr(f, '_slow', False)] # Sorting of XFAILed functions isn't fixed yet :-( funcs.sort(key=lambda x: inspect.getsourcelines(x)[1]) i = 0 while i < len(funcs): if inspect.isgeneratorfunction(funcs[i]): # some tests can be generators, that return the actual # test functions. We unpack it below: f = funcs.pop(i) for fg in f(): func = fg[0] args = fg[1:] fgw = lambda: func(args) funcs.insert(i, fgw) i += 1 else: i += 1 # drop functions that are not selected with the keyword expression: funcs = [x for x in funcs if self.matches(x)] if not funcs: return except Exception: reporter.entering_filename(filename, len(funcs)) raise reporter.entering_filename(filename, len(funcs)) if not sort: random.shuffle(funcs) for f in funcs: start = time.time() reporter.entering_test(f) try: if getattr(f, '_slow', False) and not slow: raise Skipped("Slow") if timeout: self._timeout(f, timeout, fail_on_timeout) else: random.seed(self._seed) f() except KeyboardInterrupt: if getattr(f, '_slow', False): reporter.test_skip("KeyboardInterrupt") else: raise except Exception: if timeout: signal.alarm(0) # Disable the alarm. It could not be handled before. t, v, tr = sys.exc_info() if t is AssertionError: reporter.test_fail((t, v, tr)) if self._post_mortem: pdb.post_mortem(tr) elif t.__name__ == "Skipped": reporter.test_skip(v) elif t.__name__ == "XFail": reporter.test_xfail() elif t.__name__ == "XPass": reporter.test_xpass(v) else: reporter.test_exception((t, v, tr)) if self._post_mortem: pdb.post_mortem(tr) else: reporter.test_pass() taken = time.time() - start if taken > self._slow_threshold: reporter.slow_test_functions.append((f.__name__, taken)) if getattr(f, '_slow', False) and slow: if taken < self._fast_threshold: reporter.fast_test_functions.append((f.__name__, taken)) reporter.leaving_filename() def _timeout(self, function, timeout, fail_on_timeout): def callback(x, y): signal.alarm(0) if fail_on_timeout: raise TimeOutError("Timed out after %d seconds" % timeout) else: raise Skipped("Timeout") signal.signal(signal.SIGALRM, callback) signal.alarm(timeout) # Set an alarm with a given timeout function() signal.alarm(0) # Disable the alarm def matches(self, x): """ Does the keyword expression self._kw match "x"? Returns True/False. Always returns True if self._kw is "". """ if not self._kw: return True for kw in self._kw: if x.__name__.find(kw) != -1: return True return False def get_test_files(self, dir, pat='test_.py'): """ Returns the list of test_.py (default) files at or below directory ``dir`` relative to the sympy home directory. """ dir = os.path.join(self._root_dir, convert_to_native_paths([dir])[0]) g = [] for path, folders, files in os.walk(dir): g.extend([os.path.join(path, f) for f in files if fnmatch(f, pat)]) return sorted([os.path.normcase(gi) for gi in g]) class SymPyDocTests(object): def __init__(self, reporter, normal): self._count = 0 self._root_dir = get_sympy_dir() self._reporter = reporter self._reporter.root_dir(self._root_dir) self._normal = normal self._testfiles = [] def test(self): """ Runs the tests and returns True if all tests pass, otherwise False. """ self._reporter.start() for f in self._testfiles: try: self.test_file(f) except KeyboardInterrupt: print(" interrupted by user") self._reporter.finish() raise return self._reporter.finish() def test_file(self, filename): clear_cache() from sympy.core.compatibility import StringIO import sympy.interactive.printing as interactive_printing from sympy import pprint_use_unicode rel_name = filename[len(self._root_dir) + 1:] dirname, file = os.path.split(filename) module = rel_name.replace(os.sep, '.')[:-3] if rel_name.startswith("examples"): # Examples files do not have __init__.py files, # So we have to temporarily extend sys.path to import them sys.path.insert(0, dirname) module = file[:-3] # remove ".py" try: module = pdoctest._normalize_module(module) tests = SymPyDocTestFinder().find(module) except (SystemExit, KeyboardInterrupt): raise except ImportError: self._reporter.import_error(filename, sys.exc_info()) return finally: if rel_name.startswith("examples"): del sys.path[0] tests = [test for test in tests if len(test.examples) > 0] # By default tests are sorted by alphabetical order by function name. # We sort by line number so one can edit the file sequentially from # bottom to top. However, if there are decorated functions, their line # numbers will be too large and for now one must just search for these # by text and function name. tests.sort(key=lambda x: -x.lineno) if not tests: return self._reporter.entering_filename(filename, len(tests)) for test in tests: assert len(test.examples) != 0 if self._reporter._verbose: self._reporter.write("\n{} ".format(test.name)) # check if there are external dependencies which need to be met if '_doctest_depends_on' in test.globs: try: self._check_dependencies(test.globs['_doctest_depends_on']) except DependencyError as e: self._reporter.test_skip(v=str(e)) continue runner = SymPyDocTestRunner(optionflags=pdoctest.ELLIPSIS \| pdoctest.NORMALIZE_WHITESPACE \| pdoctest.IGNORE_EXCEPTION_DETAIL) runner._checker = SymPyOutputChecker() old = sys.stdout new = StringIO() sys.stdout = new # If the testing is normal, the doctests get importing magic to # provide the global namespace. If not normal (the default) then # then must run on their own; all imports must be explicit within # a function's docstring. Once imported that import will be # available to the rest of the tests in a given function's # docstring (unless clear_globs=True below). if not self._normal: test.globs = {} # if this is uncommented then all the test would get is what # comes by default with a "from sympy import " #exec('from sympy import ') in test.globs test.globs['print_function'] = print_function old_displayhook = sys.displayhook use_unicode_prev = setup_pprint() try: f, t = runner.run(test, compileflags=future_flags, out=new.write, clear_globs=False) except KeyboardInterrupt: raise finally: sys.stdout = old if f > 0: self._reporter.doctest_fail(test.name, new.getvalue()) else: self._reporter.test_pass() sys.displayhook = old_displayhook interactive_printing.NO_GLOBAL = False pprint_use_unicode(use_unicode_prev) self._reporter.leaving_filename() def get_test_files(self, dir, pat='.py', init_only=True): r""" Returns the list of \.py files (default) from which docstrings will be tested which are at or below directory ``dir``. By default, only those that have an __init__.py in their parent directory and do not start with ``test_`` will be included. """ def importable(x): """ Checks if given pathname x is an importable module by checking for __init__.py file. Returns True/False. Currently we only test if the __init__.py file exists in the directory with the file "x" (in theory we should also test all the parent dirs). """ init_py = os.path.join(os.path.dirname(x), "__init__.py") return os.path.exists(init_py) dir = os.path.join(self._root_dir, convert_to_native_paths([dir])[0]) g = [] for path, folders, files in os.walk(dir): g.extend([os.path.join(path, f) for f in files if not f.startswith('test_') and fnmatch(f, pat)]) if init_only: # skip files that are not importable (i.e. missing __init__.py) g = [x for x in g if importable(x)] return [os.path.normcase(gi) for gi in g] def _check_dependencies(self, executables=(), modules=(), disable_viewers=(), python_version=(2,)): """ Checks if the dependencies for the test are installed. Raises ``DependencyError`` it at least one dependency is not installed. """ for executable in executables: if not find_executable(executable): raise DependencyError("Could not find %s" % executable) for module in modules: if module == 'matplotlib': matplotlib = import_module( 'matplotlib', __import__kwargs={'fromlist': ['pyplot', 'cm', 'collections']}, min_module_version='1.0.0', catch=(RuntimeError,)) if matplotlib is None: raise DependencyError("Could not import matplotlib") else: if not import_module(module): raise DependencyError("Could not import %s" % module) if disable_viewers: tempdir = tempfile.mkdtemp() os.environ['PATH'] = '%s:%s' % (tempdir, os.environ['PATH']) vw = ('#!/usr/bin/env {}\n' 'import sys\n' 'if len(sys.argv) <= 1:\n' ' exit("wrong number of args")\n').format( 'python3' if PY3 else 'python') for viewer in disable_viewers: with open(os.path.join(tempdir, viewer), 'w') as fh: fh.write(vw) # make the file executable os.chmod(os.path.join(tempdir, viewer), stat.S_IREAD \| stat.S_IWRITE \| stat.S_IXUSR) if python_version: if sys.version_info < python_version: raise DependencyError("Requires Python >= " + '.'.join(map(str, python_version))) if 'pyglet' in modules: # monkey-patch pyglet s.t. it does not open a window during # doctesting import pyglet class DummyWindow(object): def __init__(self, args, *kwargs): self.has_exit = True self.width = 600 self.height = 400 def set_vsync(self, x): pass def switch_to(self): pass def push_handlers(self, x): pass def close(self): pass pyglet.window.Window = DummyWindow class SymPyDocTestFinder(DocTestFinder): """ A class used to extract the DocTests that are relevant to a given object, from its docstring and the docstrings of its contained objects. Doctests can currently be extracted from the following object types: modules, functions, classes, methods, staticmethods, classmethods, and properties. Modified from doctest's version to look harder for code that appears comes from a different module. For example, the @vectorize decorator makes it look like functions come from multidimensional.py even though their code exists elsewhere. """ def _find(self, tests, obj, name, module, source_lines, globs, seen): """ Find tests for the given object and any contained objects, and add them to ``tests``. """ if self._verbose: print('Finding tests in %s' % name) # If we've already processed this object, then ignore it. if id(obj) in seen: return seen[id(obj)] = 1 # Make sure we don't run doctests for classes outside of sympy, such # as in numpy or scipy. if inspect.isclass(obj): if obj.__module__.split('.')[0] != 'sympy': return # Find a test for this object, and add it to the list of tests. test = self._get_test(obj, name, module, globs, source_lines) if test is not None: tests.append(test) if not self._recurse: return # Look for tests in a module's contained objects. if inspect.ismodule(obj): for rawname, val in obj.__dict__.items(): # Recurse to functions & classes. if inspect.isfunction(val) or inspect.isclass(val): # Make sure we don't run doctests functions or classes # from different modules if val.__module__ != module.__name__: continue assert self._from_module(module, val), \ "%s is not in module %s (rawname %s)" % (val, module, rawname) try: valname = '%s.%s' % (name, rawname) self._find(tests, val, valname, module, source_lines, globs, seen) except KeyboardInterrupt: raise # Look for tests in a module's __test__ dictionary. for valname, val in getattr(obj, '__test__', {}).items(): if not isinstance(valname, string_types): raise ValueError("SymPyDocTestFinder.find: __test__ keys " "must be strings: %r" % (type(valname),)) if not (inspect.isfunction(val) or inspect.isclass(val) or inspect.ismethod(val) or inspect.ismodule(val) or isinstance(val, string_types)): raise ValueError("SymPyDocTestFinder.find: __test__ values " "must be strings, functions, methods, " "classes, or modules: %r" % (type(val),)) valname = '%s.__test__.%s' % (name, valname) self._find(tests, val, valname, module, source_lines, globs, seen) # Look for tests in a class's contained objects. if inspect.isclass(obj): for valname, val in obj.__dict__.items(): # Special handling for staticmethod/classmethod. if isinstance(val, staticmethod): val = getattr(obj, valname) if isinstance(val, classmethod): val = getattr(obj, valname).__func__ # Recurse to methods, properties, and nested classes. if ((inspect.isfunction(unwrap(val)) or inspect.isclass(val) or isinstance(val, property)) and self._from_module(module, val)): # Make sure we don't run doctests functions or classes # from different modules if isinstance(val, property): if hasattr(val.fget, '__module__'): if val.fget.__module__ != module.__name__: continue else: if val.__module__ != module.__name__: continue assert self._from_module(module, val), \ "%s is not in module %s (valname %s)" % ( val, module, valname) valname = '%s.%s' % (name, valname) self._find(tests, val, valname, module, source_lines, globs, seen) def _get_test(self, obj, name, module, globs, source_lines): """ Return a DocTest for the given object, if it defines a docstring; otherwise, return None. """ lineno = None # Extract the object's docstring. If it doesn't have one, # then return None (no test for this object). if isinstance(obj, string_types): # obj is a string in the case for objects in the polys package. # Note that source_lines is a binary string (compiled polys # modules), which can't be handled by _find_lineno so determine # the line number here. docstring = obj matches = re.findall(r"line \d+", name) assert len(matches) == 1, \ "string '%s' does not contain lineno " % name # NOTE: this is not the exact linenumber but its better than no # lineno ;) lineno = int(matches[0][5:]) else: try: if obj.__doc__ is None: docstring = '' else: docstring = obj.__doc__ if not isinstance(docstring, string_types): docstring = str(docstring) except (TypeError, AttributeError): docstring = '' # Don't bother if the docstring is empty. if self._exclude_empty and not docstring: return None # check that properties have a docstring because _find_lineno # assumes it if isinstance(obj, property): if obj.fget.__doc__ is None: return None # Find the docstring's location in the file. if lineno is None: obj = unwrap(obj) # handling of properties is not implemented in _find_lineno so do # it here if hasattr(obj, 'func_closure') and obj.func_closure is not None: tobj = obj.func_closure[0].cell_contents elif isinstance(obj, property): tobj = obj.fget else: tobj = obj lineno = self._find_lineno(tobj, source_lines) if lineno is None: return None # Return a DocTest for this object. if module is None: filename = None else: filename = getattr(module, '__file__', module.__name__) if filename[-4:] in (".pyc", ".pyo"): filename = filename[:-1] globs['_doctest_depends_on'] = getattr(obj, '_doctest_depends_on', {}) return self._parser.get_doctest(docstring, globs, name, filename, lineno) class SymPyDocTestRunner(DocTestRunner): """ A class used to run DocTest test cases, and accumulate statistics. The ``run`` method is used to process a single DocTest case. It returns a tuple ``(f, t)``, where ``t`` is the number of test cases tried, and ``f`` is the number of test cases that failed. Modified from the doctest version to not reset the sys.displayhook (see issue 5140). See the docstring of the original DocTestRunner for more information. """ def run(self, test, compileflags=None, out=None, clear_globs=True): """ Run the examples in ``test``, and display the results using the writer function ``out``. The examples are run in the namespace ``test.globs``. If ``clear_globs`` is true (the default), then this namespace will be cleared after the test runs, to help with garbage collection. If you would like to examine the namespace after the test completes, then use ``clear_globs=False``. ``compileflags`` gives the set of flags that should be used by the Python compiler when running the examples. If not specified, then it will default to the set of future-import flags that apply to ``globs``. The output of each example is checked using ``SymPyDocTestRunner.check_output``, and the results are formatted by the ``SymPyDocTestRunner.report_`` methods. """ self.test = test if compileflags is None: compileflags = pdoctest._extract_future_flags(test.globs) save_stdout = sys.stdout if out is None: out = save_stdout.write sys.stdout = self._fakeout # Patch pdb.set_trace to restore sys.stdout during interactive # debugging (so it's not still redirected to self._fakeout). # Note that the interactive output will go to our # save_stdout, even if that's not the real sys.stdout; this # allows us to write test cases for the set_trace behavior. save_set_trace = pdb.set_trace self.debugger = pdoctest._OutputRedirectingPdb(save_stdout) self.debugger.reset() pdb.set_trace = self.debugger.set_trace # Patch linecache.getlines, so we can see the example's source # when we're inside the debugger. self.save_linecache_getlines = pdoctest.linecache.getlines linecache.getlines = self.__patched_linecache_getlines try: test.globs['print_function'] = print_function return self.__run(test, compileflags, out) finally: sys.stdout = save_stdout pdb.set_trace = save_set_trace linecache.getlines = self.save_linecache_getlines if clear_globs: test.globs.clear() # We have to override the name mangled methods. SymPyDocTestRunner._SymPyDocTestRunner__patched_linecache_getlines = \ DocTestRunner._DocTestRunner__patched_linecache_getlines SymPyDocTestRunner._SymPyDocTestRunner__run = DocTestRunner._DocTestRunner__run SymPyDocTestRunner._SymPyDocTestRunner__record_outcome = \ DocTestRunner._DocTestRunner__record_outcome class SymPyOutputChecker(pdoctest.OutputChecker): """ Compared to the OutputChecker from the stdlib our OutputChecker class supports numerical comparison of floats occurring in the output of the doctest examples """ def __init__(self): # NOTE OutputChecker is an old-style class with no __init__ method, # so we can't call the base class version of __init__ here got_floats = r'(\d+\.\d\|\.\d+)' # floats in the 'want' string may contain ellipses want_floats = got_floats + r'(\.{3})?' front_sep = r'\s\|\+\|\-\|\\|,' back_sep = front_sep + r'\|j\|e' fbeg = r'^%s(?=%s\|$)' % (got_floats, back_sep) fmidend = r'(?<=%s)%s(?=%s\|$)' % (front_sep, got_floats, back_sep) self.num_got_rgx = re.compile(r'(%s\|%s)' %(fbeg, fmidend)) fbeg = r'^%s(?=%s\|$)' % (want_floats, back_sep) fmidend = r'(?<=%s)%s(?=%s\|$)' % (front_sep, want_floats, back_sep) self.num_want_rgx = re.compile(r'(%s\|%s)' %(fbeg, fmidend)) def check_output(self, want, got, optionflags): """ Return True iff the actual output from an example (`got`) matches the expected output (`want`). These strings are always considered to match if they are identical; but depending on what option flags the test runner is using, several non-exact match types are also possible. See the documentation for `TestRunner` for more information about option flags. """ # Handle the common case first, for efficiency: # if they're string-identical, always return true. if got == want: return True # TODO parse integers as well ? # Parse floats and compare them. If some of the parsed floats contain # ellipses, skip the comparison. matches = self.num_got_rgx.finditer(got) numbers_got = [match.group(1) for match in matches] # list of strs matches = self.num_want_rgx.finditer(want) numbers_want = [match.group(1) for match in matches] # list of strs if len(numbers_got) != len(numbers_want): return False if len(numbers_got) > 0: nw_ = [] for ng, nw in zip(numbers_got, numbers_want): if '...' in nw: nw_.append(ng) continue else: nw_.append(nw) if abs(float(ng)-float(nw)) > 1e-5: return False got = self.num_got_rgx.sub(r'%s', got) got = got % tuple(nw_) # <BLANKLINE> can be used as a special sequence to signify a # blank line, unless the DONT_ACCEPT_BLANKLINE flag is used. if not (optionflags & pdoctest.DONT_ACCEPT_BLANKLINE): # Replace <BLANKLINE> in want with a blank line. want = re.sub(r'(?m)^%s\s?$' % re.escape(pdoctest.BLANKLINE_MARKER), '', want) # If a line in got contains only spaces, then remove the # spaces. got = re.sub(r'(?m)^\s?$', '', got) if got == want: return True # This flag causes doctest to ignore any differences in the # contents of whitespace strings. Note that this can be used # in conjunction with the ELLIPSIS flag. if optionflags & pdoctest.NORMALIZE_WHITESPACE: got = ' '.join(got.split()) want = ' '.join(want.split()) if got == want: return True # The ELLIPSIS flag says to let the sequence "..." in `want` # match any substring in `got`. if optionflags & pdoctest.ELLIPSIS: if pdoctest._ellipsis_match(want, got): return True # We didn't find any match; return false. return False class Reporter(object): """ Parent class for all reporters. """ pass class PyTestReporter(Reporter): """ Py.test like reporter. Should produce output identical to py.test. """ def __init__(self, verbose=False, tb="short", colors=True, force_colors=False, split=None): self._verbose = verbose self._tb_style = tb self._colors = colors self._force_colors = force_colors self._xfailed = 0 self._xpassed = [] self._failed = [] self._failed_doctest = [] self._passed = 0 self._skipped = 0 self._exceptions = [] self._terminal_width = None self._default_width = 80 self._split = split self._active_file = '' self._active_f = None # TODO: Should these be protected? self.slow_test_functions = [] self.fast_test_functions = [] # this tracks the x-position of the cursor (useful for positioning # things on the screen), without the need for any readline library: self._write_pos = 0 self._line_wrap = False def root_dir(self, dir): self._root_dir = dir @property def terminal_width(self): if self._terminal_width is not None: return self._terminal_width def findout_terminal_width(): if sys.platform == "win32": # Windows support is based on: # # http://code.activestate.com/recipes/ # 440694-determine-size-of-console-window-on-windows/ from ctypes import windll, create_string_buffer h = windll.kernel32.GetStdHandle(-12) csbi = create_string_buffer(22) res = windll.kernel32.GetConsoleScreenBufferInfo(h, csbi) if res: import struct (_, _, _, _, _, left, _, right, _, _, _) = \ struct.unpack("hhhhHhhhhhh", csbi.raw) return right - left else: return self._default_width if hasattr(sys.stdout, 'isatty') and not sys.stdout.isatty(): return self._default_width # leave PIPEs alone try: process = subprocess.Popen(['stty', '-a'], stdout=subprocess.PIPE, stderr=subprocess.PIPE) stdout = process.stdout.read() if PY3: stdout = stdout.decode("utf-8") except (OSError, IOError): pass else: # We support the following output formats from stty: # # 1) Linux -> columns 80 # 2) OS X -> 80 columns # 3) Solaris -> columns = 80 re_linux = r"columns\s+(?P<columns>\d+);" re_osx = r"(?P<columns>\d+)\scolumns;" re_solaris = r"columns\s+=\s+(?P<columns>\d+);" for regex in (re_linux, re_osx, re_solaris): match = re.search(regex, stdout) if match is not None: columns = match.group('columns') try: width = int(columns) except ValueError: pass if width != 0: return width return self._default_width width = findout_terminal_width() self._terminal_width = width return width def write(self, text, color="", align="left", width=None, force_colors=False): """ Prints a text on the screen. It uses sys.stdout.write(), so no readline library is necessary. Parameters ========== color : choose from the colors below, "" means default color align : "left"/"right", "left" is a normal print, "right" is aligned on the right-hand side of the screen, filled with spaces if necessary width : the screen width """ color_templates = ( ("Black", "0;30"), ("Red", "0;31"), ("Green", "0;32"), ("Brown", "0;33"), ("Blue", "0;34"), ("Purple", "0;35"), ("Cyan", "0;36"), ("LightGray", "0;37"), ("DarkGray", "1;30"), ("LightRed", "1;31"), ("LightGreen", "1;32"), ("Yellow", "1;33"), ("LightBlue", "1;34"), ("LightPurple", "1;35"), ("LightCyan", "1;36"), ("White", "1;37"), ) colors = {} for name, value in color_templates: colors[name] = value c_normal = '\033[0m' c_color = '\033[%sm' if width is None: width = self.terminal_width if align == "right": if self._write_pos + len(text) > width: # we don't fit on the current line, create a new line self.write("\n") self.write(" "(width - self._write_pos - len(text))) if not self._force_colors and hasattr(sys.stdout, 'isatty') and not \ sys.stdout.isatty(): # the stdout is not a terminal, this for example happens if the # output is piped to less, e.g. "bin/test \| less". In this case, # the terminal control sequences would be printed verbatim, so # don't use any colors. color = "" elif sys.platform == "win32": # Windows consoles don't support ANSI escape sequences color = "" elif not self._colors: color = "" if self._line_wrap: if text[0] != "\n": sys.stdout.write("\n") # Avoid UnicodeEncodeError when printing out test failures if PY3 and IS_WINDOWS: text = text.encode('raw_unicode_escape').decode('utf8', 'ignore') elif PY3 and not sys.stdout.encoding.lower().startswith('utf'): text = text.encode(sys.stdout.encoding, 'backslashreplace' ).decode(sys.stdout.encoding) if color == "": sys.stdout.write(text) else: sys.stdout.write("%s%s%s" % (c_color % colors[color], text, c_normal)) sys.stdout.flush() l = text.rfind("\n") if l == -1: self._write_pos += len(text) else: self._write_pos = len(text) - l - 1 self._line_wrap = self._write_pos >= width self._write_pos %= width def write_center(self, text, delim="="): width = self.terminal_width if text != "": text = " %s " % text idx = (width - len(text)) // 2 t = delimidx + text + delim(width - idx - len(text)) self.write(t + "\n") def write_exception(self, e, val, tb): # remove the first item, as that is always runtests.py tb = tb.tb_next t = traceback.format_exception(e, val, tb) self.write("".join(t)) def start(self, seed=None, msg="test process starts"): self.write_center(msg) executable = sys.executable v = tuple(sys.version_info) python_version = "%s.%s.%s-%s-%s" % v implementation = platform.python_implementation() if implementation == 'PyPy': implementation += " %s.%s.%s-%s-%s" % sys.pypy_version_info self.write("executable: %s (%s) [%s]\n" % (executable, python_version, implementation)) from .misc import ARCH self.write("architecture: %s\n" % ARCH) from sympy.core.cache import USE_CACHE self.write("cache: %s\n" % USE_CACHE) from sympy.core.compatibility import GROUND_TYPES, HAS_GMPY version = '' if GROUND_TYPES =='gmpy': if HAS_GMPY == 1: import gmpy elif HAS_GMPY == 2: import gmpy2 as gmpy version = gmpy.version() self.write("ground types: %s %s\n" % (GROUND_TYPES, version)) numpy = import_module('numpy') self.write("numpy: %s\n" % (None if not numpy else numpy.__version__)) if seed is not None: self.write("random seed: %d\n" % seed) from .misc import HASH_RANDOMIZATION self.write("hash randomization: ") hash_seed = os.getenv("PYTHONHASHSEED") or '0' if HASH_RANDOMIZATION and (hash_seed == "random" or int(hash_seed)): self.write("on (PYTHONHASHSEED=%s)\n" % hash_seed) else: self.write("off\n") if self._split: self.write("split: %s\n" % self._split) self.write('\n') self._t_start = clock() def finish(self): self._t_end = clock() self.write("\n") global text, linelen text = "tests finished: %d passed, " % self._passed linelen = len(text) def add_text(mytext): global text, linelen """Break new text if too long.""" if linelen + len(mytext) > self.terminal_width: text += '\n' linelen = 0 text += mytext linelen += len(mytext) if len(self._failed) > 0: add_text("%d failed, " % len(self._failed)) if len(self._failed_doctest) > 0: add_text("%d failed, " % len(self._failed_doctest)) if self._skipped > 0: add_text("%d skipped, " % self._skipped) if self._xfailed > 0: add_text("%d expected to fail, " % self._xfailed) if len(self._xpassed) > 0: add_text("%d expected to fail but passed, " % len(self._xpassed)) if len(self._exceptions) > 0: add_text("%d exceptions, " % len(self._exceptions)) add_text("in %.2f seconds" % (self._t_end - self._t_start)) if self.slow_test_functions: self.write_center('slowest tests', '_') sorted_slow = sorted(self.slow_test_functions, key=lambda r: r[1]) for slow_func_name, taken in sorted_slow: print('%s - Took %.3f seconds' % (slow_func_name, taken)) if self.fast_test_functions: self.write_center('unexpectedly fast tests', '_') sorted_fast = sorted(self.fast_test_functions, key=lambda r: r[1]) for fast_func_name, taken in sorted_fast: print('%s - Took %.3f seconds' % (fast_func_name, taken)) if len(self._xpassed) > 0: self.write_center("xpassed tests", "_") for e in self._xpassed: self.write("%s: %s\n" % (e[0], e[1])) self.write("\n") if self._tb_style != "no" and len(self._exceptions) > 0: for e in self._exceptions: filename, f, (t, val, tb) = e self.write_center("", "_") if f is None: s = "%s" % filename else: s = "%s:%s" % (filename, f.__name__) self.write_center(s, "_") self.write_exception(t, val, tb) self.write("\n") if self._tb_style != "no" and len(self._failed) > 0: for e in self._failed: filename, f, (t, val, tb) = e self.write_center("", "_") self.write_center("%s:%s" % (filename, f.__name__), "_") self.write_exception(t, val, tb) self.write("\n") if self._tb_style != "no" and len(self._failed_doctest) > 0: for e in self._failed_doctest: filename, msg = e self.write_center("", "_") self.write_center("%s" % filename, "_") self.write(msg) self.write("\n") self.write_center(text) ok = len(self._failed) == 0 and len(self._exceptions) == 0 and \ len(self._failed_doctest) == 0 if not ok: self.write("DO NOT COMMIT!\n") return ok def entering_filename(self, filename, n): rel_name = filename[len(self._root_dir) + 1:] self._active_file = rel_name self._active_file_error = False self.write(rel_name) self.write("[%d] " % n) def leaving_filename(self): self.write(" ") if self._active_file_error: self.write("[FAIL]", "Red", align="right") else: self.write("[OK]", "Green", align="right") self.write("\n") if self._verbose: self.write("\n") def entering_test(self, f): self._active_f = f if self._verbose: self.write("\n" + f.__name__ + " ") def test_xfail(self): self._xfailed += 1 self.write("f", "Green") def test_xpass(self, v): message = str(v) self._xpassed.append((self._active_file, message)) self.write("X", "Green") def test_fail(self, exc_info): self._failed.append((self._active_file, self._active_f, exc_info)) self.write("F", "Red") self._active_file_error = True def doctest_fail(self, name, error_msg): # the first line contains "******", remove it: error_msg = "\n".join(error_msg.split("\n")[1:]) self._failed_doctest.append((name, error_msg)) self.write("F", "Red") self._active_file_error = True def test_pass(self, char="."): self._passed += 1 if self._verbose: self.write("ok", "Green") else: self.write(char, "Green") def test_skip(self, v=None): char = "s" self._skipped += 1 if v is not None: message = str(v) if message == "KeyboardInterrupt": char = "K" elif message == "Timeout": char = "T" elif message == "Slow": char = "w" if self._verbose: if v is not None: self.write(message + ' ', "Blue") else: self.write(" - ", "Blue") self.write(char, "Blue") def test_exception(self, exc_info): self._exceptions.append((self._active_file, self._active_f, exc_info)) if exc_info[0] is TimeOutError: self.write("T", "Red") else: self.write("E", "Red") self._active_file_error = True def import_error(self, filename, exc_info): self._exceptions.append((filename, None, exc_info)) rel_name = filename[len(self._root_dir) + 1:] self.write(rel_name) self.write("[?] Failed to import", "Red") self.write(" ") self.write("[FAIL]", "Red", align="right") self.write("\n")
4ade5cd3d100c7c6b87db84cd65d925aa831482424ac1a0c12a2de02eb4bc6f4	""" Python code printers This module contains python code printers for plain python as well as NumPy & SciPy enabled code. """ from collections import defaultdict from itertools import chain from sympy.core import S from .precedence import precedence from .codeprinter import CodePrinter _kw_py2and3 = { 'and', 'as', 'assert', 'break', 'class', 'continue', 'def', 'del', 'elif', 'else', 'except', 'finally', 'for', 'from', 'global', 'if', 'import', 'in', 'is', 'lambda', 'not', 'or', 'pass', 'raise', 'return', 'try', 'while', 'with', 'yield', 'None' # 'None' is actually not in Python 2's keyword.kwlist } _kw_only_py2 = {'exec', 'print'} _kw_only_py3 = {'False', 'nonlocal', 'True'} _known_functions = { 'Abs': 'abs', } _known_functions_math = { 'acos': 'acos', 'acosh': 'acosh', 'asin': 'asin', 'asinh': 'asinh', 'atan': 'atan', 'atan2': 'atan2', 'atanh': 'atanh', 'ceiling': 'ceil', 'cos': 'cos', 'cosh': 'cosh', 'erf': 'erf', 'erfc': 'erfc', 'exp': 'exp', 'expm1': 'expm1', 'factorial': 'factorial', 'floor': 'floor', 'gamma': 'gamma', 'hypot': 'hypot', 'loggamma': 'lgamma', 'log': 'log', 'ln': 'log', 'log10': 'log10', 'log1p': 'log1p', 'log2': 'log2', 'sin': 'sin', 'sinh': 'sinh', 'Sqrt': 'sqrt', 'tan': 'tan', 'tanh': 'tanh' } # Not used from ``math``: [copysign isclose isfinite isinf isnan ldexp frexp pow modf # radians trunc fmod fsum gcd degrees fabs] _known_constants_math = { 'Exp1': 'e', 'Pi': 'pi', 'E': 'e' # Only in python >= 3.5: # 'Infinity': 'inf', # 'NaN': 'nan' } def _print_known_func(self, expr): known = self.known_functions[expr.__class__.__name__] return '{name}({args})'.format(name=self._module_format(known), args=', '.join(map(lambda arg: self._print(arg), expr.args))) def _print_known_const(self, expr): known = self.known_constants[expr.__class__.__name__] return self._module_format(known) class AbstractPythonCodePrinter(CodePrinter): printmethod = "_pythoncode" language = "Python" reserved_words = _kw_py2and3.union(_kw_only_py3) modules = None # initialized to a set in __init__ tab = ' ' _kf = dict(chain( _known_functions.items(), [(k, 'math.' + v) for k, v in _known_functions_math.items()] )) _kc = {k: 'math.'+v for k, v in _known_constants_math.items()} _operators = {'and': 'and', 'or': 'or', 'not': 'not'} _default_settings = dict( CodePrinter._default_settings, user_functions={}, precision=17, inline=True, fully_qualified_modules=True, contract=False, standard='python3' ) def __init__(self, settings=None): super(AbstractPythonCodePrinter, self).__init__(settings) # XXX Remove after dropping python 2 support. # Python standard handler std = self._settings['standard'] if std is None: import sys std = 'python{}'.format(sys.version_info.major) if std not in ('python2', 'python3'): raise ValueError('Unrecognized python standard : {}'.format(std)) self.standard = std self.module_imports = defaultdict(set) # Known functions and constants handler self.known_functions = dict(self._kf, (settings or {}).get( 'user_functions', {})) self.known_constants = dict(self._kc, (settings or {}).get( 'user_constants', {})) def _declare_number_const(self, name, value): return "%s = %s" % (name, value) def _module_format(self, fqn, register=True): parts = fqn.split('.') if register and len(parts) > 1: self.module_imports['.'.join(parts[:-1])].add(parts[-1]) if self._settings['fully_qualified_modules']: return fqn else: return fqn.split('(')[0].split('[')[0].split('.')[-1] def _format_code(self, lines): return lines def _get_statement(self, codestring): return "{}".format(codestring) def _get_comment(self, text): return " # {0}".format(text) def _expand_fold_binary_op(self, op, args): """ This method expands a fold on binary operations. ``functools.reduce`` is an example of a folded operation. For example, the expression `A + B + C + D` is folded into `((A + B) + C) + D` """ if len(args) == 1: return self._print(args[0]) else: return "%s(%s, %s)" % ( self._module_format(op), self._expand_fold_binary_op(op, args[:-1]), self._print(args[-1]), ) def _expand_reduce_binary_op(self, op, args): """ This method expands a reductin on binary operations. Notice: this is NOT the same as ``functools.reduce``. For example, the expression `A + B + C + D` is reduced into: `(A + B) + (C + D)` """ if len(args) == 1: return self._print(args[0]) else: N = len(args) Nhalf = N // 2 return "%s(%s, %s)" % ( self._module_format(op), self._expand_reduce_binary_op(args[:Nhalf]), self._expand_reduce_binary_op(args[Nhalf:]), ) def _get_einsum_string(self, subranks, contraction_indices): letters = self._get_letter_generator_for_einsum() contraction_string = "" counter = 0 d = {j: min(i) for i in contraction_indices for j in i} indices = [] for rank_arg in subranks: lindices = [] for i in range(rank_arg): if counter in d: lindices.append(d[counter]) else: lindices.append(counter) counter += 1 indices.append(lindices) mapping = {} letters_free = [] letters_dum = [] for i in indices: for j in i: if j not in mapping: l = next(letters) mapping[j] = l else: l = mapping[j] contraction_string += l if j in d: if l not in letters_dum: letters_dum.append(l) else: letters_free.append(l) contraction_string += "," contraction_string = contraction_string[:-1] return contraction_string, letters_free, letters_dum def _print_NaN(self, expr): return "float('nan')" def _print_Infinity(self, expr): return "float('inf')" def _print_NegativeInfinity(self, expr): return "float('-inf')" def _print_ComplexInfinity(self, expr): return self._print_NaN(expr) def _print_Mod(self, expr): PREC = precedence(expr) return ('{0} % {1}'.format(map(lambda x: self.parenthesize(x, PREC), expr.args))) def _print_Piecewise(self, expr): result = [] i = 0 for arg in expr.args: e = arg.expr c = arg.cond if i == 0: result.append('(') result.append('(') result.append(self._print(e)) result.append(')') result.append(' if ') result.append(self._print(c)) result.append(' else ') i += 1 result = result[:-1] if result[-1] == 'True': result = result[:-2] result.append(')') else: result.append(' else None)') return ''.join(result) def _print_Relational(self, expr): "Relational printer for Equality and Unequality" op = { '==' :'equal', '!=' :'not_equal', '<' :'less', '<=' :'less_equal', '>' :'greater', '>=' :'greater_equal', } if expr.rel_op in op: lhs = self._print(expr.lhs) rhs = self._print(expr.rhs) return '({lhs} {op} {rhs})'.format(op=expr.rel_op, lhs=lhs, rhs=rhs) return super(AbstractPythonCodePrinter, self)._print_Relational(expr) def _print_ITE(self, expr): from sympy.functions.elementary.piecewise import Piecewise return self._print(expr.rewrite(Piecewise)) def _print_Sum(self, expr): loops = ( 'for {i} in range({a}, {b}+1)'.format( i=self._print(i), a=self._print(a), b=self._print(b)) for i, a, b in expr.limits) return '(builtins.sum({function} {loops}))'.format( function=self._print(expr.function), loops=' '.join(loops)) def _print_ImaginaryUnit(self, expr): return '1j' def _print_MatrixBase(self, expr): name = expr.__class__.__name__ func = self.known_functions.get(name, name) return "%s(%s)" % (func, self._print(expr.tolist())) _print_SparseMatrix = \ _print_MutableSparseMatrix = \ _print_ImmutableSparseMatrix = \ _print_Matrix = \ _print_DenseMatrix = \ _print_MutableDenseMatrix = \ _print_ImmutableMatrix = \ _print_ImmutableDenseMatrix = \ lambda self, expr: self._print_MatrixBase(expr) def _indent_codestring(self, codestring): return '\n'.join([self.tab + line for line in codestring.split('\n')]) def _print_FunctionDefinition(self, fd): body = '\n'.join(map(lambda arg: self._print(arg), fd.body)) return "def {name}({parameters}):\n{body}".format( name=self._print(fd.name), parameters=', '.join([self._print(var.symbol) for var in fd.parameters]), body=self._indent_codestring(body) ) def _print_While(self, whl): body = '\n'.join(map(lambda arg: self._print(arg), whl.body)) return "while {cond}:\n{body}".format( cond=self._print(whl.condition), body=self._indent_codestring(body) ) def _print_Declaration(self, decl): return '%s = %s' % ( self._print(decl.variable.symbol), self._print(decl.variable.value) ) def _print_Return(self, ret): arg, = ret.args return 'return %s' % self._print(arg) def _print_Print(self, prnt): print_args = ', '.join(map(lambda arg: self._print(arg), prnt.print_args)) if prnt.format_string != None: # Must be '!= None', cannot be 'is not None' print_args = '{0} % ({1})'.format( self._print(prnt.format_string), print_args) if prnt.file != None: # Must be '!= None', cannot be 'is not None' print_args += ', file=%s' % self._print(prnt.file) # XXX Remove after dropping python 2 support. if self.standard == 'python2': return 'print %s' % print_args return 'print(%s)' % print_args def _print_Stream(self, strm): if str(strm.name) == 'stdout': return self._module_format('sys.stdout') elif str(strm.name) == 'stderr': return self._module_format('sys.stderr') else: return self._print(strm.name) def _print_NoneToken(self, arg): return 'None' class PythonCodePrinter(AbstractPythonCodePrinter): def _print_sign(self, e): return '(0.0 if {e} == 0 else {f}(1, {e}))'.format( f=self._module_format('math.copysign'), e=self._print(e.args[0])) def _print_Not(self, expr): PREC = precedence(expr) return self._operators['not'] + self.parenthesize(expr.args[0], PREC) def _print_Indexed(self, expr): base = expr.args[0] index = expr.args[1:] return "{}[{}]".format(str(base), ", ".join([self._print(ind) for ind in index])) def _hprint_Pow(self, expr, rational=False, sqrt='math.sqrt'): """Printing helper function for ``Pow`` Notes ===== This only preprocesses the ``sqrt`` as math formatter Examples ======== >>> from sympy.functions import sqrt >>> from sympy.printing.pycode import PythonCodePrinter >>> from sympy.abc import x Python code printer automatically looks up ``math.sqrt``. >>> printer = PythonCodePrinter({'standard':'python3'}) >>> printer._hprint_Pow(sqrt(x), rational=True) 'x(1/2)' >>> printer._hprint_Pow(sqrt(x), rational=False) 'math.sqrt(x)' >>> printer._hprint_Pow(1/sqrt(x), rational=True) 'x(-1/2)' >>> printer._hprint_Pow(1/sqrt(x), rational=False) '1/math.sqrt(x)' Using sqrt from numpy or mpmath >>> printer._hprint_Pow(sqrt(x), sqrt='numpy.sqrt') 'numpy.sqrt(x)' >>> printer._hprint_Pow(sqrt(x), sqrt='mpmath.sqrt') 'mpmath.sqrt(x)' See Also ======== sympy.printing.str.StrPrinter._print_Pow """ PREC = precedence(expr) if expr.exp == S.Half and not rational: func = self._module_format(sqrt) arg = self._print(expr.base) return '{func}({arg})'.format(func=func, arg=arg) if expr.is_commutative: if -expr.exp is S.Half and not rational: func = self._module_format(sqrt) num = self._print(S.One) arg = self._print(expr.base) return "{num}/{func}({arg})".format( num=num, func=func, arg=arg) base_str = self.parenthesize(expr.base, PREC, strict=False) exp_str = self.parenthesize(expr.exp, PREC, strict=False) return "{}{}".format(base_str, exp_str) def _print_Pow(self, expr, rational=False): return self._hprint_Pow(expr, rational=rational) def _print_Rational(self, expr): # XXX Remove after dropping python 2 support. if self.standard == 'python2': return '{}./{}.'.format(expr.p, expr.q) return '{}/{}'.format(expr.p, expr.q) def _print_Half(self, expr): return self._print_Rational(expr) for k in PythonCodePrinter._kf: setattr(PythonCodePrinter, '_print_%s' % k, _print_known_func) for k in _known_constants_math: setattr(PythonCodePrinter, '_print_%s' % k, _print_known_const) def pycode(expr, settings): """ Converts an expr to a string of Python code Parameters ========== expr : Expr A SymPy expression. fully_qualified_modules : bool Whether or not to write out full module names of functions (``math.sin`` vs. ``sin``). default: ``True``. standard : str or None, optional If 'python2', Python 2 sematics will be used. If 'python3', Python 3 sematics will be used. If None, the standard will be automatically detected. Default is 'python3'. And this parameter may be removed in the future. Examples ======== >>> from sympy import tan, Symbol >>> from sympy.printing.pycode import pycode >>> pycode(tan(Symbol('x')) + 1) 'math.tan(x) + 1' """ return PythonCodePrinter(settings).doprint(expr) _not_in_mpmath = 'log1p log2'.split() _in_mpmath = [(k, v) for k, v in _known_functions_math.items() if k not in _not_in_mpmath] _known_functions_mpmath = dict(_in_mpmath, { 'sign': 'sign', }) _known_constants_mpmath = { 'Pi': 'pi' } class MpmathPrinter(PythonCodePrinter): """ Lambda printer for mpmath which maintains precision for floats """ printmethod = "_mpmathcode" _kf = dict(chain( _known_functions.items(), [(k, 'mpmath.' + v) for k, v in _known_functions_mpmath.items()] )) def _print_Float(self, e): # XXX: This does not handle setting mpmath.mp.dps. It is assumed that # the caller of the lambdified function will have set it to sufficient # precision to match the Floats in the expression. # Remove 'mpz' if gmpy is installed. args = str(tuple(map(int, e._mpf_))) return '{func}({args})'.format(func=self._module_format('mpmath.mpf'), args=args) def _print_Rational(self, e): return "{func}({p})/{func}({q})".format( func=self._module_format('mpmath.mpf'), q=self._print(e.q), p=self._print(e.p) ) def _print_Half(self, e): return self._print_Rational(e) def _print_uppergamma(self, e): return "{0}({1}, {2}, {3})".format( self._module_format('mpmath.gammainc'), self._print(e.args[0]), self._print(e.args[1]), self._module_format('mpmath.inf')) def _print_lowergamma(self, e): return "{0}({1}, 0, {2})".format( self._module_format('mpmath.gammainc'), self._print(e.args[0]), self._print(e.args[1])) def _print_log2(self, e): return '{0}({1})/{0}(2)'.format( self._module_format('mpmath.log'), self._print(e.args[0])) def _print_log1p(self, e): return '{0}({1}+1)'.format( self._module_format('mpmath.log'), self._print(e.args[0])) def _print_Pow(self, expr, rational=False): return self._hprint_Pow(expr, rational=rational, sqrt='mpmath.sqrt') for k in MpmathPrinter._kf: setattr(MpmathPrinter, '_print_%s' % k, _print_known_func) for k in _known_constants_mpmath: setattr(MpmathPrinter, '_print_%s' % k, _print_known_const) _not_in_numpy = 'erf erfc factorial gamma loggamma'.split() _in_numpy = [(k, v) for k, v in _known_functions_math.items() if k not in _not_in_numpy] _known_functions_numpy = dict(_in_numpy, { 'acos': 'arccos', 'acosh': 'arccosh', 'asin': 'arcsin', 'asinh': 'arcsinh', 'atan': 'arctan', 'atan2': 'arctan2', 'atanh': 'arctanh', 'exp2': 'exp2', 'sign': 'sign', }) class NumPyPrinter(PythonCodePrinter): """ Numpy printer which handles vectorized piecewise functions, logical operators, etc. """ printmethod = "_numpycode" _kf = dict(chain( PythonCodePrinter._kf.items(), [(k, 'numpy.' + v) for k, v in _known_functions_numpy.items()] )) _kc = {k: 'numpy.'+v for k, v in _known_constants_math.items()} def _print_seq(self, seq): "General sequence printer: converts to tuple" # Print tuples here instead of lists because numba supports # tuples in nopython mode. delimiter=', ' return '({},)'.format(delimiter.join(self._print(item) for item in seq)) def _print_MatMul(self, expr): "Matrix multiplication printer" if expr.as_coeff_matrices()[0] is not S(1): expr_list = expr.as_coeff_matrices()[1]+[(expr.as_coeff_matrices()[0])] return '({0})'.format(').dot('.join(self._print(i) for i in expr_list)) return '({0})'.format(').dot('.join(self._print(i) for i in expr.args)) def _print_MatPow(self, expr): "Matrix power printer" return '{0}({1}, {2})'.format(self._module_format('numpy.linalg.matrix_power'), self._print(expr.args[0]), self._print(expr.args[1])) def _print_Inverse(self, expr): "Matrix inverse printer" return '{0}({1})'.format(self._module_format('numpy.linalg.inv'), self._print(expr.args[0])) def _print_DotProduct(self, expr): # DotProduct allows any shape order, but numpy.dot does matrix # multiplication, so we have to make sure it gets 1 x n by n x 1. arg1, arg2 = expr.args if arg1.shape[0] != 1: arg1 = arg1.T if arg2.shape[1] != 1: arg2 = arg2.T return "%s(%s, %s)" % (self._module_format('numpy.dot'), self._print(arg1), self._print(arg2)) def _print_MatrixSolve(self, expr): return "%s(%s, %s)" % (self._module_format('numpy.linalg.solve'), self._print(expr.matrix), self._print(expr.vector)) def _print_Piecewise(self, expr): "Piecewise function printer" exprs = '[{0}]'.format(','.join(self._print(arg.expr) for arg in expr.args)) conds = '[{0}]'.format(','.join(self._print(arg.cond) for arg in expr.args)) # If [default_value, True] is a (expr, cond) sequence in a Piecewise object # it will behave the same as passing the 'default' kwarg to select() # as long as* it is the last element in expr.args. # If this is not the case, it may be triggered prematurely. return '{0}({1}, {2}, default=numpy.nan)'.format(self._module_format('numpy.select'), conds, exprs) def _print_Relational(self, expr): "Relational printer for Equality and Unequality" op = { '==' :'equal', '!=' :'not_equal', '<' :'less', '<=' :'less_equal', '>' :'greater', '>=' :'greater_equal', } if expr.rel_op in op: lhs = self._print(expr.lhs) rhs = self._print(expr.rhs) return '{op}({lhs}, {rhs})'.format(op=self._module_format('numpy.'+op[expr.rel_op]), lhs=lhs, rhs=rhs) return super(NumPyPrinter, self)._print_Relational(expr) def _print_And(self, expr): "Logical And printer" # We have to override LambdaPrinter because it uses Python 'and' keyword. # If LambdaPrinter didn't define it, we could use StrPrinter's # version of the function and add 'logical_and' to NUMPY_TRANSLATIONS. return '{0}.reduce(({1}))'.format(self._module_format('numpy.logical_and'), ','.join(self._print(i) for i in expr.args)) def _print_Or(self, expr): "Logical Or printer" # We have to override LambdaPrinter because it uses Python 'or' keyword. # If LambdaPrinter didn't define it, we could use StrPrinter's # version of the function and add 'logical_or' to NUMPY_TRANSLATIONS. return '{0}.reduce(({1}))'.format(self._module_format('numpy.logical_or'), ','.join(self._print(i) for i in expr.args)) def _print_Not(self, expr): "Logical Not printer" # We have to override LambdaPrinter because it uses Python 'not' keyword. # If LambdaPrinter didn't define it, we would still have to define our # own because StrPrinter doesn't define it. return '{0}({1})'.format(self._module_format('numpy.logical_not'), ','.join(self._print(i) for i in expr.args)) def _print_Pow(self, expr, rational=False): # XXX Workaround for negative integer power error if expr.exp.is_integer and expr.exp.is_negative: expr = expr.base ** expr.exp.evalf() return self._hprint_Pow(expr, rational=rational, sqrt='numpy.sqrt') def _print_Min(self, expr): return '{0}(({1}))'.format(self._module_format('numpy.amin'), ','.join(self._print(i) for i in expr.args)) def _print_Max(self, expr): return '{0}(({1}))'.format(self._module_format('numpy.amax'), ','.join(self._print(i) for i in expr.args)) def _print_arg(self, expr): return "%s(%s)" % (self._module_format('numpy.angle'), self._print(expr.args[0])) def _print_im(self, expr): return "%s(%s)" % (self._module_format('numpy.imag'), self._print(expr.args[0])) def _print_Mod(self, expr): return "%s(%s)" % (self._module_format('numpy.mod'), ', '.join( map(lambda arg: self._print(arg), expr.args))) def _print_re(self, expr): return "%s(%s)" % (self._module_format('numpy.real'), self._print(expr.args[0])) def _print_sinc(self, expr): return "%s(%s)" % (self._module_format('numpy.sinc'), self._print(expr.args[0]/S.Pi)) def _print_MatrixBase(self, expr): func = self.known_functions.get(expr.__class__.__name__, None) if func is None: func = self._module_format('numpy.array') return "%s(%s)" % (func, self._print(expr.tolist())) def _print_Identity(self, expr): shape = expr.shape if all([dim.is_Integer for dim in shape]): return "%s(%s)" % (self._module_format('numpy.eye'), self._print(expr.shape[0])) else: raise NotImplementedError("Symbolic matrix dimensions are not yet supported for identity matrices") def _print_BlockMatrix(self, expr): return '{0}({1})'.format(self._module_format('numpy.block'), self._print(expr.args[0].tolist())) def _print_CodegenArrayTensorProduct(self, expr): array_list = [j for i, arg in enumerate(expr.args) for j in (self._print(arg), "[%i, %i]" % (2i, 2i+1))] return "%s(%s)" % (self._module_format('numpy.einsum'), ", ".join(array_list)) def _print_CodegenArrayContraction(self, expr): from sympy.codegen.array_utils import CodegenArrayTensorProduct base = expr.expr contraction_indices = expr.contraction_indices if not contraction_indices: return self._print(base) if isinstance(base, CodegenArrayTensorProduct): counter = 0 d = {j: min(i) for i in contraction_indices for j in i} indices = [] for rank_arg in base.subranks: lindices = [] for i in range(rank_arg): if counter in d: lindices.append(d[counter]) else: lindices.append(counter) counter += 1 indices.append(lindices) elems = ["%s, %s" % (self._print(arg), ind) for arg, ind in zip(base.args, indices)] return "%s(%s)" % ( self._module_format('numpy.einsum'), ", ".join(elems) ) raise NotImplementedError() def _print_CodegenArrayDiagonal(self, expr): diagonal_indices = list(expr.diagonal_indices) if len(diagonal_indices) > 1: # TODO: this should be handled in sympy.codegen.array_utils, # possibly by creating the possibility of unfolding the # CodegenArrayDiagonal object into nested ones. Same reasoning for # the array contraction. raise NotImplementedError if len(diagonal_indices[0]) != 2: raise NotImplementedError return "%s(%s, 0, axis1=%s, axis2=%s)" % ( self._module_format("numpy.diagonal"), self._print(expr.expr), diagonal_indices[0][0], diagonal_indices[0][1], ) def _print_CodegenArrayPermuteDims(self, expr): return "%s(%s, %s)" % ( self._module_format("numpy.transpose"), self._print(expr.expr), self._print(expr.permutation.args[0]), ) def _print_CodegenArrayElementwiseAdd(self, expr): return self._expand_fold_binary_op('numpy.add', expr.args) for k in NumPyPrinter._kf: setattr(NumPyPrinter, '_print_%s' % k, _print_known_func) for k in NumPyPrinter._kc: setattr(NumPyPrinter, '_print_%s' % k, _print_known_const) _known_functions_scipy_special = { 'erf': 'erf', 'erfc': 'erfc', 'besselj': 'jv', 'bessely': 'yv', 'besseli': 'iv', 'besselk': 'kv', 'factorial': 'factorial', 'gamma': 'gamma', 'loggamma': 'gammaln', 'digamma': 'psi', 'RisingFactorial': 'poch', 'jacobi': 'eval_jacobi', 'gegenbauer': 'eval_gegenbauer', 'chebyshevt': 'eval_chebyt', 'chebyshevu': 'eval_chebyu', 'legendre': 'eval_legendre', 'hermite': 'eval_hermite', 'laguerre': 'eval_laguerre', 'assoc_laguerre': 'eval_genlaguerre', } _known_constants_scipy_constants = { 'GoldenRatio': 'golden_ratio', 'Pi': 'pi', 'E': 'e' } class SciPyPrinter(NumPyPrinter): _kf = dict(chain( NumPyPrinter._kf.items(), [(k, 'scipy.special.' + v) for k, v in _known_functions_scipy_special.items()] )) _kc = {k: 'scipy.constants.' + v for k, v in _known_constants_scipy_constants.items()} def _print_SparseMatrix(self, expr): i, j, data = [], [], [] for (r, c), v in expr._smat.items(): i.append(r) j.append(c) data.append(v) return "{name}({data}, ({i}, {j}), shape={shape})".format( name=self._module_format('scipy.sparse.coo_matrix'), data=data, i=i, j=j, shape=expr.shape ) _print_ImmutableSparseMatrix = _print_SparseMatrix # SciPy's lpmv has a different order of arguments from assoc_legendre def _print_assoc_legendre(self, expr): return "{0}({2}, {1}, {3})".format( self._module_format('scipy.special.lpmv'), self._print(expr.args[0]), self._print(expr.args[1]), self._print(expr.args[2])) for k in SciPyPrinter._kf: setattr(SciPyPrinter, '_print_%s' % k, _print_known_func) for k in SciPyPrinter._kc: setattr(SciPyPrinter, '_print_%s' % k, _print_known_const) class SymPyPrinter(PythonCodePrinter): _kf = {k: 'sympy.' + v for k, v in chain( _known_functions.items(), _known_functions_math.items() )} def _print_Function(self, expr): mod = expr.func.__module__ or '' return '%s(%s)' % (self._module_format(mod + ('.' if mod else '') + expr.func.__name__), ', '.join(map(lambda arg: self._print(arg), expr.args))) def _print_Pow(self, expr, rational=False): return self._hprint_Pow(expr, rational=rational, sqrt='sympy.sqrt')
6560df5dd6fa76f9d4aa453ae3e4ea09a45149a02c3395a62eac217d9e62d174	""" Rust code printer The `RustCodePrinter` converts SymPy expressions into Rust expressions. A complete code generator, which uses `rust_code` extensively, can be found in `sympy.utilities.codegen`. The `codegen` module can be used to generate complete source code files. """ # Possible Improvement # # * make sure we follow Rust Style Guidelines_ # * make use of pattern matching # * better support for reference # * generate generic code and use trait to make sure they have specific methods # * use crates_ to get more math support # - num_ # + BigInt_, BigUint_ # + Complex_ # + Rational64_, Rational32_, BigRational_ # # .. _crates: https://crates.io/ # .. _Guidelines: https://github.com/rust-lang/rust/tree/master/src/doc/style # .. _num: http://rust-num.github.io/num/num/ # .. _BigInt: http://rust-num.github.io/num/num/bigint/struct.BigInt.html # .. _BigUint: http://rust-num.github.io/num/num/bigint/struct.BigUint.html # .. _Complex: http://rust-num.github.io/num/num/complex/struct.Complex.html # .. _Rational32: http://rust-num.github.io/num/num/rational/type.Rational32.html # .. _Rational64: http://rust-num.github.io/num/num/rational/type.Rational64.html # .. _BigRational: http://rust-num.github.io/num/num/rational/type.BigRational.html from __future__ import print_function, division from sympy.core import S, Rational, Float, Lambda from sympy.core.compatibility import string_types, range from sympy.printing.codeprinter import CodePrinter # Rust's methods for integer and float can be found at here : # # * `Rust - Primitive Type f64 <https://doc.rust-lang.org/std/primitive.f64.html>`_ # * `Rust - Primitive Type i64 <https://doc.rust-lang.org/std/primitive.i64.html>`_ # # Function Style : # # 1. args[0].func(args[1:]), method with arguments # 2. args[0].func(), method without arguments # 3. args[1].func(), method without arguments (e.g. (e, x) => x.exp()) # 4. func(args), function with arguments # dictionary mapping sympy function to (argument_conditions, Rust_function). # Used in RustCodePrinter._print_Function(self) # f64 method in Rust known_functions = { "": "is_nan", "": "is_infinite", "": "is_finite", "": "is_normal", "": "classify", "floor": "floor", "ceiling": "ceil", "": "round", "": "trunc", "": "fract", "Abs": "abs", "sign": "signum", "": "is_sign_positive", "": "is_sign_negative", "": "mul_add", "Pow": [(lambda base, exp: exp == -S.One, "recip", 2), # 1.0/x (lambda base, exp: exp == S.Half, "sqrt", 2), # x 0.5 (lambda base, exp: exp == -S.Half, "sqrt().recip", 2), # 1/(x 0.5) (lambda base, exp: exp == Rational(1, 3), "cbrt", 2), # x ** (1/3) (lambda base, exp: base == S.One2, "exp2", 3), # 2 * x (lambda base, exp: exp.is_integer, "powi", 1), # x y, for i32 (lambda base, exp: not exp.is_integer, "powf", 1)], # x y, for f64 "exp": [(lambda exp: True, "exp", 2)], # e x "log": "ln", "": "log", # number.log(base) "": "log2", "": "log10", "": "to_degrees", "": "to_radians", "Max": "max", "Min": "min", "": "hypot", # (x2 + y2) 0.5 "sin": "sin", "cos": "cos", "tan": "tan", "asin": "asin", "acos": "acos", "atan": "atan", "atan2": "atan2", "": "sin_cos", "": "exp_m1", # e ** x - 1 "": "ln_1p", # ln(1 + x) "sinh": "sinh", "cosh": "cosh", "tanh": "tanh", "asinh": "asinh", "acosh": "acosh", "atanh": "atanh", } # i64 method in Rust # known_functions_i64 = { # "": "min_value", # "": "max_value", # "": "from_str_radix", # "": "count_ones", # "": "count_zeros", # "": "leading_zeros", # "": "trainling_zeros", # "": "rotate_left", # "": "rotate_right", # "": "swap_bytes", # "": "from_be", # "": "from_le", # "": "to_be", # to big endian # "": "to_le", # to little endian # "": "checked_add", # "": "checked_sub", # "": "checked_mul", # "": "checked_div", # "": "checked_rem", # "": "checked_neg", # "": "checked_shl", # "": "checked_shr", # "": "checked_abs", # "": "saturating_add", # "": "saturating_sub", # "": "saturating_mul", # "": "wrapping_add", # "": "wrapping_sub", # "": "wrapping_mul", # "": "wrapping_div", # "": "wrapping_rem", # "": "wrapping_neg", # "": "wrapping_shl", # "": "wrapping_shr", # "": "wrapping_abs", # "": "overflowing_add", # "": "overflowing_sub", # "": "overflowing_mul", # "": "overflowing_div", # "": "overflowing_rem", # "": "overflowing_neg", # "": "overflowing_shl", # "": "overflowing_shr", # "": "overflowing_abs", # "Pow": "pow", # "Abs": "abs", # "sign": "signum", # "": "is_positive", # "": "is_negnative", # } # These are the core reserved words in the Rust language. Taken from: # http://doc.rust-lang.org/grammar.html#keywords reserved_words = ['abstract', 'alignof', 'as', 'become', 'box', 'break', 'const', 'continue', 'crate', 'do', 'else', 'enum', 'extern', 'false', 'final', 'fn', 'for', 'if', 'impl', 'in', 'let', 'loop', 'macro', 'match', 'mod', 'move', 'mut', 'offsetof', 'override', 'priv', 'proc', 'pub', 'pure', 'ref', 'return', 'Self', 'self', 'sizeof', 'static', 'struct', 'super', 'trait', 'true', 'type', 'typeof', 'unsafe', 'unsized', 'use', 'virtual', 'where', 'while', 'yield'] class RustCodePrinter(CodePrinter): """A printer to convert python expressions to strings of Rust code""" printmethod = "_rust_code" language = "Rust" _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 17, 'user_functions': {}, 'human': True, 'contract': True, 'dereference': set(), 'error_on_reserved': False, 'reserved_word_suffix': '_', 'inline': False, } def __init__(self, settings={}): CodePrinter.__init__(self, settings) self.known_functions = dict(known_functions) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) self._dereference = set(settings.get('dereference', [])) self.reserved_words = set(reserved_words) def _rate_index_position(self, p): return p5 def _get_statement(self, codestring): return "%s;" % codestring def _get_comment(self, text): return "// %s" % text def _declare_number_const(self, name, value): return "const %s: f64 = %s;" % (name, value) def _format_code(self, lines): return self.indent_code(lines) def _traverse_matrix_indices(self, mat): rows, cols = mat.shape return ((i, j) for i in range(rows) for j in range(cols)) def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] loopstart = "for %(var)s in %(start)s..%(end)s {" for i in indices: # Rust arrays start at 0 and end at dimension-1 open_lines.append(loopstart % { 'var': self._print(i), 'start': self._print(i.lower), 'end': self._print(i.upper + 1)}) close_lines.append("}") return open_lines, close_lines def _print_caller_var(self, expr): if len(expr.args) > 1: # for something like `sin(x + y + z)`, # make sure we can get '(x + y + z).sin()' # instead of 'x + y + z.sin()' return '(' + self._print(expr) + ')' elif expr.is_number: return self._print(expr, _type=True) else: return self._print(expr) def _print_Function(self, expr): """ basic function for printing `Function` Function Style : 1. args[0].func(args[1:]), method with arguments 2. args[0].func(), method without arguments 3. args[1].func(), method without arguments (e.g. (e, x) => x.exp()) 4. func(args), function with arguments """ if expr.func.__name__ in self.known_functions: cond_func = self.known_functions[expr.func.__name__] func = None style = 1 if isinstance(cond_func, string_types): func = cond_func else: for cond, func, style in cond_func: if cond(expr.args): break if func is not None: if style == 1: ret = "%(var)s.%(method)s(%(args)s)" % { 'var': self._print_caller_var(expr.args[0]), 'method': func, 'args': self.stringify(expr.args[1:], ", ") if len(expr.args) > 1 else '' } elif style == 2: ret = "%(var)s.%(method)s()" % { 'var': self._print_caller_var(expr.args[0]), 'method': func, } elif style == 3: ret = "%(var)s.%(method)s()" % { 'var': self._print_caller_var(expr.args[1]), 'method': func, } else: ret = "%(func)s(%(args)s)" % { 'func': func, 'args': self.stringify(expr.args, ", "), } return ret elif hasattr(expr, '_imp_') and isinstance(expr._imp_, Lambda): # inlined function return self._print(expr._imp_(expr.args)) else: return self._print_not_supported(expr) def _print_Pow(self, expr): if expr.base.is_integer and not expr.exp.is_integer: expr = type(expr)(Float(expr.base), expr.exp) return self._print(expr) return self._print_Function(expr) def _print_Float(self, expr, _type=False): ret = super(RustCodePrinter, self)._print_Float(expr) if _type: return ret + '_f64' else: return ret def _print_Integer(self, expr, _type=False): ret = super(RustCodePrinter, self)._print_Integer(expr) if _type: return ret + '_i32' else: return ret def _print_Rational(self, expr): p, q = int(expr.p), int(expr.q) return '%d_f64/%d.0' % (p, q) def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_Indexed(self, expr): # calculate index for 1d array dims = expr.shape elem = S.Zero offset = S.One for i in reversed(range(expr.rank)): elem += expr.indices[i]offset offset = dims[i] return "%s[%s]" % (self._print(expr.base.label), self._print(elem)) def _print_Idx(self, expr): return expr.label.name def _print_Dummy(self, expr): return expr.name def _print_Exp1(self, expr, _type=False): return "E" def _print_Pi(self, expr, _type=False): return 'PI' def _print_Infinity(self, expr, _type=False): return 'INFINITY' def _print_NegativeInfinity(self, expr, _type=False): return 'NEG_INFINITY' def _print_BooleanTrue(self, expr, _type=False): return "true" def _print_BooleanFalse(self, expr, _type=False): return "false" def _print_bool(self, expr, _type=False): return str(expr).lower() def _print_NaN(self, expr, _type=False): return "NAN" def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s) {" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines[-1] += " else {" else: lines[-1] += " else if (%s) {" % self._print(c) code0 = self._print(e) lines.append(code0) lines.append("}") if self._settings['inline']: return " ".join(lines) else: return "\n".join(lines) def _print_ITE(self, expr): from sympy.functions import Piecewise _piecewise = Piecewise((expr.args[1], expr.args[0]), (expr.args[2], True)) return self._print(_piecewise) def _print_Matrix(self, expr): return "%s[%s]" % (expr.parent, expr.j + expr.iexpr.parent.shape[1]) def _print_MatrixBase(self, A): if A.cols == 1: return "[%s]" % ", ".join(self._print(a) for a in A) else: raise ValueError("Full Matrix Support in Rust need Crates (https://crates.io/keywords/matrix).") def _print_MatrixElement(self, expr): return "%s[%s]" % (expr.parent, expr.j + expr.iexpr.parent.shape[1]) # FIXME: Str/CodePrinter could define each of these to call the _print # method from higher up the class hierarchy (see _print_NumberSymbol). # Then subclasses like us would not need to repeat all this. _print_Matrix = \ _print_MatrixElement = \ _print_DenseMatrix = \ _print_MutableDenseMatrix = \ _print_ImmutableMatrix = \ _print_ImmutableDenseMatrix = \ _print_MatrixBase def _print_Symbol(self, expr): name = super(RustCodePrinter, self)._print_Symbol(expr) if expr in self._dereference: return '(%s)' % name else: return name def _print_Assignment(self, expr): from sympy.tensor.indexed import IndexedBase lhs = expr.lhs rhs = expr.rhs if self._settings["contract"] and (lhs.has(IndexedBase) or rhs.has(IndexedBase)): # Here we check if there is looping to be done, and if so # print the required loops. return self._doprint_loops(rhs, lhs) else: lhs_code = self._print(lhs) rhs_code = self._print(rhs) return self._get_statement("%s = %s" % (lhs_code, rhs_code)) def indent_code(self, code): """Accepts a string of code or a list of code lines""" if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_token = ('{', '(', '{\n', '(\n') dec_token = ('}', ')') code = [ line.lstrip(' \t') for line in code ] increase = [ int(any(map(line.endswith, inc_token))) for line in code ] decrease = [ int(any(map(line.startswith, dec_token))) for line in code ] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tablevel, line)) level += increase[n] return pretty def rust_code(expr, assign_to=None, settings): """Converts an expr to a string of Rust code Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of line-wrapping, or for expressions that generate multi-line statements. precision : integer, optional The precision for numbers such as pi [default=15]. user_functions : dict, optional A dictionary where the keys are string representations of either ``FunctionClass`` or ``UndefinedFunction`` instances and the values are their desired C string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. See below for examples. dereference : iterable, optional An iterable of symbols that should be dereferenced in the printed code expression. These would be values passed by address to the function. For example, if ``dereference=[a]``, the resulting code would print ``(a)`` instead of ``a``. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. Examples ======== >>> from sympy import rust_code, symbols, Rational, sin, ceiling, Abs, Function >>> x, tau = symbols("x, tau") >>> rust_code((2tau)Rational(7, 2)) '81.4142135623731tau.powf(7_f64/2.0)' >>> rust_code(sin(x), assign_to="s") 's = x.sin();' Simple custom printing can be defined for certain types by passing a dictionary of {"type" : "function"} to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. >>> custom_functions = { ... "ceiling": "CEIL", ... "Abs": [(lambda x: not x.is_integer, "fabs", 4), ... (lambda x: x.is_integer, "ABS", 4)], ... "func": "f" ... } >>> func = Function('func') >>> rust_code(func(Abs(x) + ceiling(x)), user_functions=custom_functions) '(fabs(x) + x.CEIL()).f()' ``Piecewise`` expressions are converted into conditionals. If an ``assign_to`` variable is provided an if statement is created, otherwise the ternary operator is used. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> expr = Piecewise((x + 1, x > 0), (x, True)) >>> print(rust_code(expr, tau)) tau = if (x > 0) { x + 1 } else { x }; Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> rust_code(e.rhs, assign_to=e.lhs, contract=False) 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions must be provided to ``assign_to``. Note that any expression that can be generated normally can also exist inside a Matrix: >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([x2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) >>> A = MatrixSymbol('A', 3, 1) >>> print(rust_code(mat, A)) A = [x.powi(2), if (x > 0) { x + 1 } else { x }, x.sin()]; """ return RustCodePrinter(settings).doprint(expr, assign_to) def print_rust_code(expr, settings): """Prints Rust representation of the given expression.""" print(rust_code(expr, *settings))
6b75f7b8c2ced98a056d4dd475c078b9d94cce98d535771ee704aa9257027f11	""" A Printer which converts an expression into its LaTeX equivalent. """ from __future__ import print_function, division import itertools from sympy.core import S, Add, Symbol, Mod from sympy.core.alphabets import greeks from sympy.core.containers import Tuple from sympy.core.function import _coeff_isneg, AppliedUndef, Derivative from sympy.core.operations import AssocOp from sympy.core.sympify import SympifyError from sympy.logic.boolalg import true # sympy.printing imports from sympy.printing.precedence import precedence_traditional from sympy.printing.printer import Printer from sympy.printing.conventions import split_super_sub, requires_partial from sympy.printing.precedence import precedence, PRECEDENCE import mpmath.libmp as mlib from mpmath.libmp import prec_to_dps from sympy.core.compatibility import default_sort_key, range from sympy.utilities.iterables import has_variety import re # Hand-picked functions which can be used directly in both LaTeX and MathJax # Complete list at # https://docs.mathjax.org/en/latest/tex.html#supported-latex-commands # This variable only contains those functions which sympy uses. accepted_latex_functions = ['arcsin', 'arccos', 'arctan', 'sin', 'cos', 'tan', 'sinh', 'cosh', 'tanh', 'sqrt', 'ln', 'log', 'sec', 'csc', 'cot', 'coth', 're', 'im', 'frac', 'root', 'arg', ] tex_greek_dictionary = { 'Alpha': 'A', 'Beta': 'B', 'Gamma': r'\Gamma', 'Delta': r'\Delta', 'Epsilon': 'E', 'Zeta': 'Z', 'Eta': 'H', 'Theta': r'\Theta', 'Iota': 'I', 'Kappa': 'K', 'Lambda': r'\Lambda', 'Mu': 'M', 'Nu': 'N', 'Xi': r'\Xi', 'omicron': 'o', 'Omicron': 'O', 'Pi': r'\Pi', 'Rho': 'P', 'Sigma': r'\Sigma', 'Tau': 'T', 'Upsilon': r'\Upsilon', 'Phi': r'\Phi', 'Chi': 'X', 'Psi': r'\Psi', 'Omega': r'\Omega', 'lamda': r'\lambda', 'Lamda': r'\Lambda', 'khi': r'\chi', 'Khi': r'X', 'varepsilon': r'\varepsilon', 'varkappa': r'\varkappa', 'varphi': r'\varphi', 'varpi': r'\varpi', 'varrho': r'\varrho', 'varsigma': r'\varsigma', 'vartheta': r'\vartheta', } other_symbols = set(['aleph', 'beth', 'daleth', 'gimel', 'ell', 'eth', 'hbar', 'hslash', 'mho', 'wp', ]) # Variable name modifiers modifier_dict = { # Accents 'mathring': lambda s: r'\mathring{'+s+r'}', 'ddddot': lambda s: r'\ddddot{'+s+r'}', 'dddot': lambda s: r'\dddot{'+s+r'}', 'ddot': lambda s: r'\ddot{'+s+r'}', 'dot': lambda s: r'\dot{'+s+r'}', 'check': lambda s: r'\check{'+s+r'}', 'breve': lambda s: r'\breve{'+s+r'}', 'acute': lambda s: r'\acute{'+s+r'}', 'grave': lambda s: r'\grave{'+s+r'}', 'tilde': lambda s: r'\tilde{'+s+r'}', 'hat': lambda s: r'\hat{'+s+r'}', 'bar': lambda s: r'\bar{'+s+r'}', 'vec': lambda s: r'\vec{'+s+r'}', 'prime': lambda s: "{"+s+"}'", 'prm': lambda s: "{"+s+"}'", # Faces 'bold': lambda s: r'\boldsymbol{'+s+r'}', 'bm': lambda s: r'\boldsymbol{'+s+r'}', 'cal': lambda s: r'\mathcal{'+s+r'}', 'scr': lambda s: r'\mathscr{'+s+r'}', 'frak': lambda s: r'\mathfrak{'+s+r'}', # Brackets 'norm': lambda s: r'\left\\|{'+s+r'}\right\\|', 'avg': lambda s: r'\left\langle{'+s+r'}\right\rangle', 'abs': lambda s: r'\left\|{'+s+r'}\right\|', 'mag': lambda s: r'\left\|{'+s+r'}\right\|', } greek_letters_set = frozenset(greeks) _between_two_numbers_p = ( re.compile(r'[0-9][} ]$'), # search re.compile(r'[{ ][-+0-9]'), # match ) class LatexPrinter(Printer): printmethod = "_latex" _default_settings = { "fold_frac_powers": False, "fold_func_brackets": False, "fold_short_frac": None, "inv_trig_style": "abbreviated", "itex": False, "ln_notation": False, "long_frac_ratio": None, "mat_delim": "[", "mat_str": None, "mode": "plain", "mul_symbol": None, "order": None, "symbol_names": {}, "root_notation": True, "mat_symbol_style": "plain", "imaginary_unit": "i", "gothic_re_im": False, "decimal_separator": "period", } def __init__(self, settings=None): Printer.__init__(self, settings) if 'mode' in self._settings: valid_modes = ['inline', 'plain', 'equation', 'equation'] if self._settings['mode'] not in valid_modes: raise ValueError("'mode' must be one of 'inline', 'plain', " "'equation' or 'equation'") if self._settings['fold_short_frac'] is None and \ self._settings['mode'] == 'inline': self._settings['fold_short_frac'] = True mul_symbol_table = { None: r" ", "ldot": r" \,.\, ", "dot": r" \cdot ", "times": r" \times " } try: self._settings['mul_symbol_latex'] = \ mul_symbol_table[self._settings['mul_symbol']] except KeyError: self._settings['mul_symbol_latex'] = \ self._settings['mul_symbol'] try: self._settings['mul_symbol_latex_numbers'] = \ mul_symbol_table[self._settings['mul_symbol'] or 'dot'] except KeyError: if (self._settings['mul_symbol'].strip() in ['', ' ', '\\', '\\,', '\\:', '\\;', '\\quad']): self._settings['mul_symbol_latex_numbers'] = \ mul_symbol_table['dot'] else: self._settings['mul_symbol_latex_numbers'] = \ self._settings['mul_symbol'] self._delim_dict = {'(': ')', '[': ']'} imaginary_unit_table = { None: r"i", "i": r"i", "ri": r"\mathrm{i}", "ti": r"\text{i}", "j": r"j", "rj": r"\mathrm{j}", "tj": r"\text{j}", } try: self._settings['imaginary_unit_latex'] = \ imaginary_unit_table[self._settings['imaginary_unit']] except KeyError: self._settings['imaginary_unit_latex'] = \ self._settings['imaginary_unit'] def parenthesize(self, item, level, strict=False): prec_val = precedence_traditional(item) if (prec_val < level) or ((not strict) and prec_val <= level): return r"\left({}\right)".format(self._print(item)) else: return self._print(item) def parenthesize_super(self, s): """ Parenthesize s if there is a superscript in s""" if "^" in s: return r"\left({}\right)".format(s) return s def embed_super(self, s): """ Embed s in {} if there is a superscript in s""" if "^" in s: return "{{{}}}".format(s) return s def doprint(self, expr): tex = Printer.doprint(self, expr) if self._settings['mode'] == 'plain': return tex elif self._settings['mode'] == 'inline': return r"$%s$" % tex elif self._settings['itex']: return r"$$%s$$" % tex else: env_str = self._settings['mode'] return r"\begin{%s}%s\end{%s}" % (env_str, tex, env_str) def _needs_brackets(self, expr): """ Returns True if the expression needs to be wrapped in brackets when printed, False otherwise. For example: a + b => True; a => False; 10 => False; -10 => True. """ return not ((expr.is_Integer and expr.is_nonnegative) or (expr.is_Atom and (expr is not S.NegativeOne and expr.is_Rational is False))) def _needs_function_brackets(self, expr): """ Returns True if the expression needs to be wrapped in brackets when passed as an argument to a function, False otherwise. This is a more liberal version of _needs_brackets, in that many expressions which need to be wrapped in brackets when added/subtracted/raised to a power do not need them when passed to a function. Such an example is ab. """ if not self._needs_brackets(expr): return False else: # Muls of the form abc... can be folded if expr.is_Mul and not self._mul_is_clean(expr): return True # Pows which don't need brackets can be folded elif expr.is_Pow and not self._pow_is_clean(expr): return True # Add and Function always need brackets elif expr.is_Add or expr.is_Function: return True else: return False def _needs_mul_brackets(self, expr, first=False, last=False): """ Returns True if the expression needs to be wrapped in brackets when printed as part of a Mul, False otherwise. This is True for Add, but also for some container objects that would not need brackets when appearing last in a Mul, e.g. an Integral. ``last=True`` specifies that this expr is the last to appear in a Mul. ``first=True`` specifies that this expr is the first to appear in a Mul. """ from sympy import Integral, Product, Sum if expr.is_Mul: if not first and _coeff_isneg(expr): return True elif precedence_traditional(expr) < PRECEDENCE["Mul"]: return True elif expr.is_Relational: return True if expr.is_Piecewise: return True if any([expr.has(x) for x in (Mod,)]): return True if (not last and any([expr.has(x) for x in (Integral, Product, Sum)])): return True return False def _needs_add_brackets(self, expr): """ Returns True if the expression needs to be wrapped in brackets when printed as part of an Add, False otherwise. This is False for most things. """ if expr.is_Relational: return True if any([expr.has(x) for x in (Mod,)]): return True if expr.is_Add: return True return False def _mul_is_clean(self, expr): for arg in expr.args: if arg.is_Function: return False return True def _pow_is_clean(self, expr): return not self._needs_brackets(expr.base) def _do_exponent(self, expr, exp): if exp is not None: return r"\left(%s\right)^{%s}" % (expr, exp) else: return expr def _print_Basic(self, expr): ls = [self._print(o) for o in expr.args] return self._deal_with_super_sub(expr.__class__.__name__) + \ r"\left(%s\right)" % ", ".join(ls) def _print_bool(self, e): return r"\text{%s}" % e _print_BooleanTrue = _print_bool _print_BooleanFalse = _print_bool def _print_NoneType(self, e): return r"\text{%s}" % e def _print_Add(self, expr, order=None): if self.order == 'none': terms = list(expr.args) else: terms = self._as_ordered_terms(expr, order=order) tex = "" for i, term in enumerate(terms): if i == 0: pass elif _coeff_isneg(term): tex += " - " term = -term else: tex += " + " term_tex = self._print(term) if self._needs_add_brackets(term): term_tex = r"\left(%s\right)" % term_tex tex += term_tex return tex def _print_Cycle(self, expr): from sympy.combinatorics.permutations import Permutation if expr.size == 0: return r"\left( \right)" expr = Permutation(expr) expr_perm = expr.cyclic_form siz = expr.size if expr.array_form[-1] == siz - 1: expr_perm = expr_perm + [[siz - 1]] term_tex = '' for i in expr_perm: term_tex += str(i).replace(',', r"\;") term_tex = term_tex.replace('[', r"\left( ") term_tex = term_tex.replace(']', r"\right)") return term_tex _print_Permutation = _print_Cycle def _print_Float(self, expr): # Based off of that in StrPrinter dps = prec_to_dps(expr._prec) str_real = mlib.to_str(expr._mpf_, dps, strip_zeros=True) # Must always have a mul symbol (as 2.5 10^{20} just looks odd) # thus we use the number separator separator = self._settings['mul_symbol_latex_numbers'] if 'e' in str_real: (mant, exp) = str_real.split('e') if exp[0] == '+': exp = exp[1:] if self._settings['decimal_separator'] == 'comma': mant = mant.replace('.','{,}') return r"%s%s10^{%s}" % (mant, separator, exp) elif str_real == "+inf": return r"\infty" elif str_real == "-inf": return r"- \infty" else: if self._settings['decimal_separator'] == 'comma': str_real = str_real.replace('.','{,}') return str_real def _print_Cross(self, expr): vec1 = expr._expr1 vec2 = expr._expr2 return r"%s \times %s" % (self.parenthesize(vec1, PRECEDENCE['Mul']), self.parenthesize(vec2, PRECEDENCE['Mul'])) def _print_Curl(self, expr): vec = expr._expr return r"\nabla\times %s" % self.parenthesize(vec, PRECEDENCE['Mul']) def _print_Divergence(self, expr): vec = expr._expr return r"\nabla\cdot %s" % self.parenthesize(vec, PRECEDENCE['Mul']) def _print_Dot(self, expr): vec1 = expr._expr1 vec2 = expr._expr2 return r"%s \cdot %s" % (self.parenthesize(vec1, PRECEDENCE['Mul']), self.parenthesize(vec2, PRECEDENCE['Mul'])) def _print_Gradient(self, expr): func = expr._expr return r"\nabla %s" % self.parenthesize(func, PRECEDENCE['Mul']) def _print_Laplacian(self, expr): func = expr._expr return r"\triangle %s" % self.parenthesize(func, PRECEDENCE['Mul']) def _print_Mul(self, expr): from sympy.core.power import Pow from sympy.physics.units import Quantity include_parens = False if _coeff_isneg(expr): expr = -expr tex = "- " if expr.is_Add: tex += "(" include_parens = True else: tex = "" from sympy.simplify import fraction numer, denom = fraction(expr, exact=True) separator = self._settings['mul_symbol_latex'] numbersep = self._settings['mul_symbol_latex_numbers'] def convert(expr): if not expr.is_Mul: return str(self._print(expr)) else: _tex = last_term_tex = "" if self.order not in ('old', 'none'): args = expr.as_ordered_factors() else: args = list(expr.args) # If quantities are present append them at the back args = sorted(args, key=lambda x: isinstance(x, Quantity) or (isinstance(x, Pow) and isinstance(x.base, Quantity))) for i, term in enumerate(args): term_tex = self._print(term) if self._needs_mul_brackets(term, first=(i == 0), last=(i == len(args) - 1)): term_tex = r"\left(%s\right)" % term_tex if _between_two_numbers_p[0].search(last_term_tex) and \ _between_two_numbers_p[1].match(term_tex): # between two numbers _tex += numbersep elif _tex: _tex += separator _tex += term_tex last_term_tex = term_tex return _tex if denom is S.One and Pow(1, -1, evaluate=False) not in expr.args: # use the original expression here, since fraction() may have # altered it when producing numer and denom tex += convert(expr) else: snumer = convert(numer) sdenom = convert(denom) ldenom = len(sdenom.split()) ratio = self._settings['long_frac_ratio'] if self._settings['fold_short_frac'] and ldenom <= 2 and \ "^" not in sdenom: # handle short fractions if self._needs_mul_brackets(numer, last=False): tex += r"\left(%s\right) / %s" % (snumer, sdenom) else: tex += r"%s / %s" % (snumer, sdenom) elif ratio is not None and \ len(snumer.split()) > ratioldenom: # handle long fractions if self._needs_mul_brackets(numer, last=True): tex += r"\frac{1}{%s}%s\left(%s\right)" \ % (sdenom, separator, snumer) elif numer.is_Mul: # split a long numerator a = S.One b = S.One for x in numer.args: if self._needs_mul_brackets(x, last=False) or \ len(convert(ax).split()) > ratioldenom or \ (b.is_commutative is x.is_commutative is False): b = x else: a = x if self._needs_mul_brackets(b, last=True): tex += r"\frac{%s}{%s}%s\left(%s\right)" \ % (convert(a), sdenom, separator, convert(b)) else: tex += r"\frac{%s}{%s}%s%s" \ % (convert(a), sdenom, separator, convert(b)) else: tex += r"\frac{1}{%s}%s%s" % (sdenom, separator, snumer) else: tex += r"\frac{%s}{%s}" % (snumer, sdenom) if include_parens: tex += ")" return tex def _print_Pow(self, expr): # Treat x*Rational(1,n) as special case if expr.exp.is_Rational and abs(expr.exp.p) == 1 and expr.exp.q != 1 \ and self._settings['root_notation']: base = self._print(expr.base) expq = expr.exp.q if expq == 2: tex = r"\sqrt{%s}" % base elif self._settings['itex']: tex = r"\root{%d}{%s}" % (expq, base) else: tex = r"\sqrt[%d]{%s}" % (expq, base) if expr.exp.is_negative: return r"\frac{1}{%s}" % tex else: return tex elif self._settings['fold_frac_powers'] \ and expr.exp.is_Rational \ and expr.exp.q != 1: base = self.parenthesize(expr.base, PRECEDENCE['Pow']) p, q = expr.exp.p, expr.exp.q # issue #12886: add parentheses for superscripts raised to powers if '^' in base and expr.base.is_Symbol: base = r"\left(%s\right)" % base if expr.base.is_Function: return self._print(expr.base, exp="%s/%s" % (p, q)) return r"%s^{%s/%s}" % (base, p, q) elif expr.exp.is_Rational and expr.exp.is_negative and \ expr.base.is_commutative: # special case for 1^(-x), issue 9216 if expr.base == 1: return r"%s^{%s}" % (expr.base, expr.exp) # things like 1/x return self._print_Mul(expr) else: if expr.base.is_Function: return self._print(expr.base, exp=self._print(expr.exp)) else: tex = r"%s^{%s}" return self._helper_print_standard_power(expr, tex) def _helper_print_standard_power(self, expr, template): exp = self._print(expr.exp) # issue #12886: add parentheses around superscripts raised # to powers base = self.parenthesize(expr.base, PRECEDENCE['Pow']) if '^' in base and expr.base.is_Symbol: base = r"\left(%s\right)" % base elif (isinstance(expr.base, Derivative) and base.startswith(r'\left(') and re.match(r'\\left\(\\d?d?dot', base) and base.endswith(r'\right)')): # don't use parentheses around dotted derivative base = base[6: -7] # remove outermost added parens return template % (base, exp) def _print_UnevaluatedExpr(self, expr): return self._print(expr.args[0]) def _print_Sum(self, expr): if len(expr.limits) == 1: tex = r"\sum_{%s=%s}^{%s} " % \ tuple([self._print(i) for i in expr.limits[0]]) else: def _format_ineq(l): return r"%s \leq %s \leq %s" % \ tuple([self._print(s) for s in (l[1], l[0], l[2])]) tex = r"\sum_{\substack{%s}} " % \ str.join('\\\\', [_format_ineq(l) for l in expr.limits]) if isinstance(expr.function, Add): tex += r"\left(%s\right)" % self._print(expr.function) else: tex += self._print(expr.function) return tex def _print_Product(self, expr): if len(expr.limits) == 1: tex = r"\prod_{%s=%s}^{%s} " % \ tuple([self._print(i) for i in expr.limits[0]]) else: def _format_ineq(l): return r"%s \leq %s \leq %s" % \ tuple([self._print(s) for s in (l[1], l[0], l[2])]) tex = r"\prod_{\substack{%s}} " % \ str.join('\\\\', [_format_ineq(l) for l in expr.limits]) if isinstance(expr.function, Add): tex += r"\left(%s\right)" % self._print(expr.function) else: tex += self._print(expr.function) return tex def _print_BasisDependent(self, expr): from sympy.vector import Vector o1 = [] if expr == expr.zero: return expr.zero._latex_form if isinstance(expr, Vector): items = expr.separate().items() else: items = [(0, expr)] for system, vect in items: inneritems = list(vect.components.items()) inneritems.sort(key=lambda x: x[0].__str__()) for k, v in inneritems: if v == 1: o1.append(' + ' + k._latex_form) elif v == -1: o1.append(' - ' + k._latex_form) else: arg_str = '(' + LatexPrinter().doprint(v) + ')' o1.append(' + ' + arg_str + k._latex_form) outstr = (''.join(o1)) if outstr[1] != '-': outstr = outstr[3:] else: outstr = outstr[1:] return outstr def _print_Indexed(self, expr): tex_base = self._print(expr.base) tex = '{'+tex_base+'}'+'_{%s}' % ','.join( map(self._print, expr.indices)) return tex def _print_IndexedBase(self, expr): return self._print(expr.label) def _print_Derivative(self, expr): if requires_partial(expr): diff_symbol = r'\partial' else: diff_symbol = r'd' tex = "" dim = 0 for x, num in reversed(expr.variable_count): dim += num if num == 1: tex += r"%s %s" % (diff_symbol, self._print(x)) else: tex += r"%s %s^{%s}" % (diff_symbol, self.parenthesize_super(self._print(x)), self._print(num)) if dim == 1: tex = r"\frac{%s}{%s}" % (diff_symbol, tex) else: tex = r"\frac{%s^{%s}}{%s}" % (diff_symbol, self._print(dim), tex) return r"%s %s" % (tex, self.parenthesize(expr.expr, PRECEDENCE["Mul"], strict=True)) def _print_Subs(self, subs): expr, old, new = subs.args latex_expr = self._print(expr) latex_old = (self._print(e) for e in old) latex_new = (self._print(e) for e in new) latex_subs = r'\\ '.join( e[0] + '=' + e[1] for e in zip(latex_old, latex_new)) return r'\left. %s \right\|_{\substack{ %s }}' % (latex_expr, latex_subs) def _print_Integral(self, expr): tex, symbols = "", [] # Only up to \iiiint exists if len(expr.limits) <= 4 and all(len(lim) == 1 for lim in expr.limits): # Use len(expr.limits)-1 so that syntax highlighters don't think # \" is an escaped quote tex = r"\i" + "i"(len(expr.limits) - 1) + "nt" symbols = [r"\, d%s" % self._print(symbol[0]) for symbol in expr.limits] else: for lim in reversed(expr.limits): symbol = lim[0] tex += r"\int" if len(lim) > 1: if self._settings['mode'] != 'inline' \ and not self._settings['itex']: tex += r"\limits" if len(lim) == 3: tex += "_{%s}^{%s}" % (self._print(lim[1]), self._print(lim[2])) if len(lim) == 2: tex += "^{%s}" % (self._print(lim[1])) symbols.insert(0, r"\, d%s" % self._print(symbol)) return r"%s %s%s" % (tex, self.parenthesize(expr.function, PRECEDENCE["Mul"], strict=True), "".join(symbols)) def _print_Limit(self, expr): e, z, z0, dir = expr.args tex = r"\lim_{%s \to " % self._print(z) if str(dir) == '+-' or z0 in (S.Infinity, S.NegativeInfinity): tex += r"%s}" % self._print(z0) else: tex += r"%s^%s}" % (self._print(z0), self._print(dir)) if isinstance(e, AssocOp): return r"%s\left(%s\right)" % (tex, self._print(e)) else: return r"%s %s" % (tex, self._print(e)) def _hprint_Function(self, func): r''' Logic to decide how to render a function to latex - if it is a recognized latex name, use the appropriate latex command - if it is a single letter, just use that letter - if it is a longer name, then put \operatorname{} around it and be mindful of undercores in the name ''' func = self._deal_with_super_sub(func) if func in accepted_latex_functions: name = r"\%s" % func elif len(func) == 1 or func.startswith('\\'): name = func else: name = r"\operatorname{%s}" % func return name def _print_Function(self, expr, exp=None): r''' Render functions to LaTeX, handling functions that LaTeX knows about e.g., sin, cos, ... by using the proper LaTeX command (\sin, \cos, ...). For single-letter function names, render them as regular LaTeX math symbols. For multi-letter function names that LaTeX does not know about, (e.g., Li, sech) use \operatorname{} so that the function name is rendered in Roman font and LaTeX handles spacing properly. expr is the expression involving the function exp is an exponent ''' func = expr.func.__name__ if hasattr(self, '_print_' + func) and \ not isinstance(expr, AppliedUndef): return getattr(self, '_print_' + func)(expr, exp) else: args = [str(self._print(arg)) for arg in expr.args] # How inverse trig functions should be displayed, formats are: # abbreviated: asin, full: arcsin, power: sin^-1 inv_trig_style = self._settings['inv_trig_style'] # If we are dealing with a power-style inverse trig function inv_trig_power_case = False # If it is applicable to fold the argument brackets can_fold_brackets = self._settings['fold_func_brackets'] and \ len(args) == 1 and \ not self._needs_function_brackets(expr.args[0]) inv_trig_table = ["asin", "acos", "atan", "acsc", "asec", "acot"] # If the function is an inverse trig function, handle the style if func in inv_trig_table: if inv_trig_style == "abbreviated": pass elif inv_trig_style == "full": func = "arc" + func[1:] elif inv_trig_style == "power": func = func[1:] inv_trig_power_case = True # Can never fold brackets if we're raised to a power if exp is not None: can_fold_brackets = False if inv_trig_power_case: if func in accepted_latex_functions: name = r"\%s^{-1}" % func else: name = r"\operatorname{%s}^{-1}" % func elif exp is not None: name = r'%s^{%s}' % (self._hprint_Function(func), exp) else: name = self._hprint_Function(func) if can_fold_brackets: if func in accepted_latex_functions: # Wrap argument safely to avoid parse-time conflicts # with the function name itself name += r" {%s}" else: name += r"%s" else: name += r"{\left(%s \right)}" if inv_trig_power_case and exp is not None: name += r"^{%s}" % exp return name % ",".join(args) def _print_UndefinedFunction(self, expr): return self._hprint_Function(str(expr)) def _print_ElementwiseApplyFunction(self, expr): return r"%s\left({%s}\ldots\right)" % ( self._print(expr.function), self._print(expr.expr), ) @property def _special_function_classes(self): from sympy.functions.special.tensor_functions import KroneckerDelta from sympy.functions.special.gamma_functions import gamma, lowergamma from sympy.functions.special.beta_functions import beta from sympy.functions.special.delta_functions import DiracDelta from sympy.functions.special.error_functions import Chi return {KroneckerDelta: r'\delta', gamma: r'\Gamma', lowergamma: r'\gamma', beta: r'\operatorname{B}', DiracDelta: r'\delta', Chi: r'\operatorname{Chi}'} def _print_FunctionClass(self, expr): for cls in self._special_function_classes: if issubclass(expr, cls) and expr.__name__ == cls.__name__: return self._special_function_classes[cls] return self._hprint_Function(str(expr)) def _print_Lambda(self, expr): symbols, expr = expr.args if len(symbols) == 1: symbols = self._print(symbols[0]) else: symbols = self._print(tuple(symbols)) tex = r"\left( %s \mapsto %s \right)" % (symbols, self._print(expr)) return tex def _hprint_variadic_function(self, expr, exp=None): args = sorted(expr.args, key=default_sort_key) texargs = [r"%s" % self._print(symbol) for symbol in args] tex = r"\%s\left(%s\right)" % (self._print((str(expr.func)).lower()), ", ".join(texargs)) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex _print_Min = _print_Max = _hprint_variadic_function def _print_floor(self, expr, exp=None): tex = r"\left\lfloor{%s}\right\rfloor" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_ceiling(self, expr, exp=None): tex = r"\left\lceil{%s}\right\rceil" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_log(self, expr, exp=None): if not self._settings["ln_notation"]: tex = r"\log{\left(%s \right)}" % self._print(expr.args[0]) else: tex = r"\ln{\left(%s \right)}" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_Abs(self, expr, exp=None): tex = r"\left\|{%s}\right\|" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex _print_Determinant = _print_Abs def _print_re(self, expr, exp=None): if self._settings['gothic_re_im']: tex = r"\Re{%s}" % self.parenthesize(expr.args[0], PRECEDENCE['Atom']) else: tex = r"\operatorname{{re}}{{{}}}".format(self.parenthesize(expr.args[0], PRECEDENCE['Atom'])) return self._do_exponent(tex, exp) def _print_im(self, expr, exp=None): if self._settings['gothic_re_im']: tex = r"\Im{%s}" % self.parenthesize(expr.args[0], PRECEDENCE['Atom']) else: tex = r"\operatorname{{im}}{{{}}}".format(self.parenthesize(expr.args[0], PRECEDENCE['Atom'])) return self._do_exponent(tex, exp) def _print_Not(self, e): from sympy import Equivalent, Implies if isinstance(e.args[0], Equivalent): return self._print_Equivalent(e.args[0], r"\not\Leftrightarrow") if isinstance(e.args[0], Implies): return self._print_Implies(e.args[0], r"\not\Rightarrow") if (e.args[0].is_Boolean): return r"\neg \left(%s\right)" % self._print(e.args[0]) else: return r"\neg %s" % self._print(e.args[0]) def _print_LogOp(self, args, char): arg = args[0] if arg.is_Boolean and not arg.is_Not: tex = r"\left(%s\right)" % self._print(arg) else: tex = r"%s" % self._print(arg) for arg in args[1:]: if arg.is_Boolean and not arg.is_Not: tex += r" %s \left(%s\right)" % (char, self._print(arg)) else: tex += r" %s %s" % (char, self._print(arg)) return tex def _print_And(self, e): args = sorted(e.args, key=default_sort_key) return self._print_LogOp(args, r"\wedge") def _print_Or(self, e): args = sorted(e.args, key=default_sort_key) return self._print_LogOp(args, r"\vee") def _print_Xor(self, e): args = sorted(e.args, key=default_sort_key) return self._print_LogOp(args, r"\veebar") def _print_Implies(self, e, altchar=None): return self._print_LogOp(e.args, altchar or r"\Rightarrow") def _print_Equivalent(self, e, altchar=None): args = sorted(e.args, key=default_sort_key) return self._print_LogOp(args, altchar or r"\Leftrightarrow") def _print_conjugate(self, expr, exp=None): tex = r"\overline{%s}" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_polar_lift(self, expr, exp=None): func = r"\operatorname{polar\_lift}" arg = r"{\left(%s \right)}" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}%s" % (func, exp, arg) else: return r"%s%s" % (func, arg) def _print_ExpBase(self, expr, exp=None): # TODO should exp_polar be printed differently? # what about exp_polar(0), exp_polar(1)? tex = r"e^{%s}" % self._print(expr.args[0]) return self._do_exponent(tex, exp) def _print_elliptic_k(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"K^{%s}%s" % (exp, tex) else: return r"K%s" % tex def _print_elliptic_f(self, expr, exp=None): tex = r"\left(%s\middle\| %s\right)" % \ (self._print(expr.args[0]), self._print(expr.args[1])) if exp is not None: return r"F^{%s}%s" % (exp, tex) else: return r"F%s" % tex def _print_elliptic_e(self, expr, exp=None): if len(expr.args) == 2: tex = r"\left(%s\middle\| %s\right)" % \ (self._print(expr.args[0]), self._print(expr.args[1])) else: tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"E^{%s}%s" % (exp, tex) else: return r"E%s" % tex def _print_elliptic_pi(self, expr, exp=None): if len(expr.args) == 3: tex = r"\left(%s; %s\middle\| %s\right)" % \ (self._print(expr.args[0]), self._print(expr.args[1]), self._print(expr.args[2])) else: tex = r"\left(%s\middle\| %s\right)" % \ (self._print(expr.args[0]), self._print(expr.args[1])) if exp is not None: return r"\Pi^{%s}%s" % (exp, tex) else: return r"\Pi%s" % tex def _print_beta(self, expr, exp=None): tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]), self._print(expr.args[1])) if exp is not None: return r"\operatorname{B}^{%s}%s" % (exp, tex) else: return r"\operatorname{B}%s" % tex def _print_uppergamma(self, expr, exp=None): tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]), self._print(expr.args[1])) if exp is not None: return r"\Gamma^{%s}%s" % (exp, tex) else: return r"\Gamma%s" % tex def _print_lowergamma(self, expr, exp=None): tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]), self._print(expr.args[1])) if exp is not None: return r"\gamma^{%s}%s" % (exp, tex) else: return r"\gamma%s" % tex def _hprint_one_arg_func(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}%s" % (self._print(expr.func), exp, tex) else: return r"%s%s" % (self._print(expr.func), tex) _print_gamma = _hprint_one_arg_func def _print_Chi(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"\operatorname{Chi}^{%s}%s" % (exp, tex) else: return r"\operatorname{Chi}%s" % tex def _print_expint(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[1]) nu = self._print(expr.args[0]) if exp is not None: return r"\operatorname{E}_{%s}^{%s}%s" % (nu, exp, tex) else: return r"\operatorname{E}_{%s}%s" % (nu, tex) def _print_fresnels(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"S^{%s}%s" % (exp, tex) else: return r"S%s" % tex def _print_fresnelc(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"C^{%s}%s" % (exp, tex) else: return r"C%s" % tex def _print_subfactorial(self, expr, exp=None): tex = r"!%s" % self.parenthesize(expr.args[0], PRECEDENCE["Func"]) if exp is not None: return r"\left(%s\right)^{%s}" % (tex, exp) else: return tex def _print_factorial(self, expr, exp=None): tex = r"%s!" % self.parenthesize(expr.args[0], PRECEDENCE["Func"]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_factorial2(self, expr, exp=None): tex = r"%s!!" % self.parenthesize(expr.args[0], PRECEDENCE["Func"]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_binomial(self, expr, exp=None): tex = r"{\binom{%s}{%s}}" % (self._print(expr.args[0]), self._print(expr.args[1])) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_RisingFactorial(self, expr, exp=None): n, k = expr.args base = r"%s" % self.parenthesize(n, PRECEDENCE['Func']) tex = r"{%s}^{\left(%s\right)}" % (base, self._print(k)) return self._do_exponent(tex, exp) def _print_FallingFactorial(self, expr, exp=None): n, k = expr.args sub = r"%s" % self.parenthesize(k, PRECEDENCE['Func']) tex = r"{\left(%s\right)}_{%s}" % (self._print(n), sub) return self._do_exponent(tex, exp) def _hprint_BesselBase(self, expr, exp, sym): tex = r"%s" % (sym) need_exp = False if exp is not None: if tex.find('^') == -1: tex = r"%s^{%s}" % (tex, self._print(exp)) else: need_exp = True tex = r"%s_{%s}\left(%s\right)" % (tex, self._print(expr.order), self._print(expr.argument)) if need_exp: tex = self._do_exponent(tex, exp) return tex def _hprint_vec(self, vec): if not vec: return "" s = "" for i in vec[:-1]: s += "%s, " % self._print(i) s += self._print(vec[-1]) return s def _print_besselj(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'J') def _print_besseli(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'I') def _print_besselk(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'K') def _print_bessely(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'Y') def _print_yn(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'y') def _print_jn(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'j') def _print_hankel1(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'H^{(1)}') def _print_hankel2(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'H^{(2)}') def _print_hn1(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'h^{(1)}') def _print_hn2(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'h^{(2)}') def _hprint_airy(self, expr, exp=None, notation=""): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}%s" % (notation, exp, tex) else: return r"%s%s" % (notation, tex) def _hprint_airy_prime(self, expr, exp=None, notation=""): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"{%s^\prime}^{%s}%s" % (notation, exp, tex) else: return r"%s^\prime%s" % (notation, tex) def _print_airyai(self, expr, exp=None): return self._hprint_airy(expr, exp, 'Ai') def _print_airybi(self, expr, exp=None): return self._hprint_airy(expr, exp, 'Bi') def _print_airyaiprime(self, expr, exp=None): return self._hprint_airy_prime(expr, exp, 'Ai') def _print_airybiprime(self, expr, exp=None): return self._hprint_airy_prime(expr, exp, 'Bi') def _print_hyper(self, expr, exp=None): tex = r"{{}_{%s}F_{%s}\left(\begin{matrix} %s \\ %s \end{matrix}" \ r"\middle\| {%s} \right)}" % \ (self._print(len(expr.ap)), self._print(len(expr.bq)), self._hprint_vec(expr.ap), self._hprint_vec(expr.bq), self._print(expr.argument)) if exp is not None: tex = r"{%s}^{%s}" % (tex, self._print(exp)) return tex def _print_meijerg(self, expr, exp=None): tex = r"{G_{%s, %s}^{%s, %s}\left(\begin{matrix} %s & %s \\" \ r"%s & %s \end{matrix} \middle\| {%s} \right)}" % \ (self._print(len(expr.ap)), self._print(len(expr.bq)), self._print(len(expr.bm)), self._print(len(expr.an)), self._hprint_vec(expr.an), self._hprint_vec(expr.aother), self._hprint_vec(expr.bm), self._hprint_vec(expr.bother), self._print(expr.argument)) if exp is not None: tex = r"{%s}^{%s}" % (tex, self._print(exp)) return tex def _print_dirichlet_eta(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"\eta^{%s}%s" % (self._print(exp), tex) return r"\eta%s" % tex def _print_zeta(self, expr, exp=None): if len(expr.args) == 2: tex = r"\left(%s, %s\right)" % tuple(map(self._print, expr.args)) else: tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"\zeta^{%s}%s" % (self._print(exp), tex) return r"\zeta%s" % tex def _print_stieltjes(self, expr, exp=None): if len(expr.args) == 2: tex = r"_{%s}\left(%s\right)" % tuple(map(self._print, expr.args)) else: tex = r"_{%s}" % self._print(expr.args[0]) if exp is not None: return r"\gamma%s^{%s}" % (tex, self._print(exp)) return r"\gamma%s" % tex def _print_lerchphi(self, expr, exp=None): tex = r"\left(%s, %s, %s\right)" % tuple(map(self._print, expr.args)) if exp is None: return r"\Phi%s" % tex return r"\Phi^{%s}%s" % (self._print(exp), tex) def _print_polylog(self, expr, exp=None): s, z = map(self._print, expr.args) tex = r"\left(%s\right)" % z if exp is None: return r"\operatorname{Li}_{%s}%s" % (s, tex) return r"\operatorname{Li}_{%s}^{%s}%s" % (s, self._print(exp), tex) def _print_jacobi(self, expr, exp=None): n, a, b, x = map(self._print, expr.args) tex = r"P_{%s}^{\left(%s,%s\right)}\left(%s\right)" % (n, a, b, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_gegenbauer(self, expr, exp=None): n, a, x = map(self._print, expr.args) tex = r"C_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_chebyshevt(self, expr, exp=None): n, x = map(self._print, expr.args) tex = r"T_{%s}\left(%s\right)" % (n, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_chebyshevu(self, expr, exp=None): n, x = map(self._print, expr.args) tex = r"U_{%s}\left(%s\right)" % (n, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_legendre(self, expr, exp=None): n, x = map(self._print, expr.args) tex = r"P_{%s}\left(%s\right)" % (n, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_assoc_legendre(self, expr, exp=None): n, a, x = map(self._print, expr.args) tex = r"P_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_hermite(self, expr, exp=None): n, x = map(self._print, expr.args) tex = r"H_{%s}\left(%s\right)" % (n, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_laguerre(self, expr, exp=None): n, x = map(self._print, expr.args) tex = r"L_{%s}\left(%s\right)" % (n, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_assoc_laguerre(self, expr, exp=None): n, a, x = map(self._print, expr.args) tex = r"L_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_Ynm(self, expr, exp=None): n, m, theta, phi = map(self._print, expr.args) tex = r"Y_{%s}^{%s}\left(%s,%s\right)" % (n, m, theta, phi) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_Znm(self, expr, exp=None): n, m, theta, phi = map(self._print, expr.args) tex = r"Z_{%s}^{%s}\left(%s,%s\right)" % (n, m, theta, phi) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def __print_mathieu_functions(self, character, args, prime=False, exp=None): a, q, z = map(self._print, args) sup = r"^{\prime}" if prime else "" exp = "" if not exp else "^{%s}" % self._print(exp) return r"%s%s\left(%s, %s, %s\right)%s" % (character, sup, a, q, z, exp) def _print_mathieuc(self, expr, exp=None): return self.__print_mathieu_functions("C", expr.args, exp=exp) def _print_mathieus(self, expr, exp=None): return self.__print_mathieu_functions("S", expr.args, exp=exp) def _print_mathieucprime(self, expr, exp=None): return self.__print_mathieu_functions("C", expr.args, prime=True, exp=exp) def _print_mathieusprime(self, expr, exp=None): return self.__print_mathieu_functions("S", expr.args, prime=True, exp=exp) def _print_Rational(self, expr): if expr.q != 1: sign = "" p = expr.p if expr.p < 0: sign = "- " p = -p if self._settings['fold_short_frac']: return r"%s%d / %d" % (sign, p, expr.q) return r"%s\frac{%d}{%d}" % (sign, p, expr.q) else: return self._print(expr.p) def _print_Order(self, expr): s = self._print(expr.expr) if expr.point and any(p != S.Zero for p in expr.point) or \ len(expr.variables) > 1: s += '; ' if len(expr.variables) > 1: s += self._print(expr.variables) elif expr.variables: s += self._print(expr.variables[0]) s += r'\rightarrow ' if len(expr.point) > 1: s += self._print(expr.point) else: s += self._print(expr.point[0]) return r"O\left(%s\right)" % s def _print_Symbol(self, expr, style='plain'): if expr in self._settings['symbol_names']: return self._settings['symbol_names'][expr] result = self._deal_with_super_sub(expr.name) if \ '\\' not in expr.name else expr.name if style == 'bold': result = r"\mathbf{{{}}}".format(result) return result _print_RandomSymbol = _print_Symbol def _deal_with_super_sub(self, string): if '{' in string: return string name, supers, subs = split_super_sub(string) name = translate(name) supers = [translate(sup) for sup in supers] subs = [translate(sub) for sub in subs] # glue all items together: if supers: name += "^{%s}" % " ".join(supers) if subs: name += "_{%s}" % " ".join(subs) return name def _print_Relational(self, expr): if self._settings['itex']: gt = r"\gt" lt = r"\lt" else: gt = ">" lt = "<" charmap = { "==": "=", ">": gt, "<": lt, ">=": r"\geq", "<=": r"\leq", "!=": r"\neq", } return "%s %s %s" % (self._print(expr.lhs), charmap[expr.rel_op], self._print(expr.rhs)) def _print_Piecewise(self, expr): ecpairs = [r"%s & \text{for}\: %s" % (self._print(e), self._print(c)) for e, c in expr.args[:-1]] if expr.args[-1].cond == true: ecpairs.append(r"%s & \text{otherwise}" % self._print(expr.args[-1].expr)) else: ecpairs.append(r"%s & \text{for}\: %s" % (self._print(expr.args[-1].expr), self._print(expr.args[-1].cond))) tex = r"\begin{cases} %s \end{cases}" return tex % r" \\".join(ecpairs) def _print_MatrixBase(self, expr): lines = [] for line in range(expr.rows): # horrible, should be 'rows' lines.append(" & ".join([self._print(i) for i in expr[line, :]])) mat_str = self._settings['mat_str'] if mat_str is None: if self._settings['mode'] == 'inline': mat_str = 'smallmatrix' else: if (expr.cols <= 10) is True: mat_str = 'matrix' else: mat_str = 'array' out_str = r'\begin{%MATSTR%}%s\end{%MATSTR%}' out_str = out_str.replace('%MATSTR%', mat_str) if mat_str == 'array': out_str = out_str.replace('%s', '{' + 'c'expr.cols + '}%s') if self._settings['mat_delim']: left_delim = self._settings['mat_delim'] right_delim = self._delim_dict[left_delim] out_str = r'\left' + left_delim + out_str + \ r'\right' + right_delim return out_str % r"\\".join(lines) _print_ImmutableMatrix = _print_ImmutableDenseMatrix \ = _print_Matrix \ = _print_MatrixBase def _print_MatrixElement(self, expr): return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True)\ + '_{%s, %s}' % (self._print(expr.i), self._print(expr.j)) def _print_MatrixSlice(self, expr): def latexslice(x): x = list(x) if x[2] == 1: del x[2] if x[1] == x[0] + 1: del x[1] if x[0] == 0: x[0] = '' return ':'.join(map(self._print, x)) return (self._print(expr.parent) + r'\left[' + latexslice(expr.rowslice) + ', ' + latexslice(expr.colslice) + r'\right]') def _print_BlockMatrix(self, expr): return self._print(expr.blocks) def _print_Transpose(self, expr): mat = expr.arg from sympy.matrices import MatrixSymbol if not isinstance(mat, MatrixSymbol): return r"\left(%s\right)^{T}" % self._print(mat) else: return "%s^{T}" % self.parenthesize(mat, precedence_traditional(expr), True) def _print_Trace(self, expr): mat = expr.arg return r"\operatorname{tr}\left(%s \right)" % self._print(mat) def _print_Adjoint(self, expr): mat = expr.arg from sympy.matrices import MatrixSymbol if not isinstance(mat, MatrixSymbol): return r"\left(%s\right)^{\dagger}" % self._print(mat) else: return r"%s^{\dagger}" % self._print(mat) def _print_MatMul(self, expr): from sympy import MatMul, Mul parens = lambda x: self.parenthesize(x, precedence_traditional(expr), False) args = expr.args if isinstance(args[0], Mul): args = args[0].as_ordered_factors() + list(args[1:]) else: args = list(args) if isinstance(expr, MatMul) and _coeff_isneg(expr): if args[0] == -1: args = args[1:] else: args[0] = -args[0] return '- ' + ' '.join(map(parens, args)) else: return ' '.join(map(parens, args)) def _print_Mod(self, expr, exp=None): if exp is not None: return r'\left(%s\bmod{%s}\right)^{%s}' % \ (self.parenthesize(expr.args[0], PRECEDENCE['Mul'], strict=True), self._print(expr.args[1]), self._print(exp)) return r'%s\bmod{%s}' % (self.parenthesize(expr.args[0], PRECEDENCE['Mul'], strict=True), self._print(expr.args[1])) def _print_HadamardProduct(self, expr): args = expr.args prec = PRECEDENCE['Pow'] parens = self.parenthesize return r' \circ '.join( map(lambda arg: parens(arg, prec, strict=True), args)) def _print_HadamardPower(self, expr): template = r"%s^{\circ {%s}}" return self._helper_print_standard_power(expr, template) def _print_KroneckerProduct(self, expr): args = expr.args prec = PRECEDENCE['Pow'] parens = self.parenthesize return r' \otimes '.join( map(lambda arg: parens(arg, prec, strict=True), args)) def _print_MatPow(self, expr): base, exp = expr.base, expr.exp from sympy.matrices import MatrixSymbol if not isinstance(base, MatrixSymbol): return "\\left(%s\\right)^{%s}" % (self._print(base), self._print(exp)) else: return "%s^{%s}" % (self._print(base), self._print(exp)) def _print_MatrixSymbol(self, expr): return self._print_Symbol(expr, style=self._settings[ 'mat_symbol_style']) def _print_ZeroMatrix(self, Z): return r"\mathbb{0}" if self._settings[ 'mat_symbol_style'] == 'plain' else r"\mathbf{0}" def _print_OneMatrix(self, O): return r"\mathbb{1}" if self._settings[ 'mat_symbol_style'] == 'plain' else r"\mathbf{1}" def _print_Identity(self, I): return r"\mathbb{I}" if self._settings[ 'mat_symbol_style'] == 'plain' else r"\mathbf{I}" def _print_NDimArray(self, expr): if expr.rank() == 0: return self._print(expr[()]) mat_str = self._settings['mat_str'] if mat_str is None: if self._settings['mode'] == 'inline': mat_str = 'smallmatrix' else: if (expr.rank() == 0) or (expr.shape[-1] <= 10): mat_str = 'matrix' else: mat_str = 'array' block_str = r'\begin{%MATSTR%}%s\end{%MATSTR%}' block_str = block_str.replace('%MATSTR%', mat_str) if self._settings['mat_delim']: left_delim = self._settings['mat_delim'] right_delim = self._delim_dict[left_delim] block_str = r'\left' + left_delim + block_str + \ r'\right' + right_delim if expr.rank() == 0: return block_str % "" level_str = [[]] + [[] for i in range(expr.rank())] shape_ranges = [list(range(i)) for i in expr.shape] for outer_i in itertools.product(shape_ranges): level_str[-1].append(self._print(expr[outer_i])) even = True for back_outer_i in range(expr.rank()-1, -1, -1): if len(level_str[back_outer_i+1]) < expr.shape[back_outer_i]: break if even: level_str[back_outer_i].append( r" & ".join(level_str[back_outer_i+1])) else: level_str[back_outer_i].append( block_str % (r"\\".join(level_str[back_outer_i+1]))) if len(level_str[back_outer_i+1]) == 1: level_str[back_outer_i][-1] = r"\left[" + \ level_str[back_outer_i][-1] + r"\right]" even = not even level_str[back_outer_i+1] = [] out_str = level_str[0][0] if expr.rank() % 2 == 1: out_str = block_str % out_str return out_str _print_ImmutableDenseNDimArray = _print_NDimArray _print_ImmutableSparseNDimArray = _print_NDimArray _print_MutableDenseNDimArray = _print_NDimArray _print_MutableSparseNDimArray = _print_NDimArray def _printer_tensor_indices(self, name, indices, index_map={}): out_str = self._print(name) last_valence = None prev_map = None for index in indices: new_valence = index.is_up if ((index in index_map) or prev_map) and \ last_valence == new_valence: out_str += "," if last_valence != new_valence: if last_valence is not None: out_str += "}" if index.is_up: out_str += "{}^{" else: out_str += "{}_{" out_str += self._print(index.args[0]) if index in index_map: out_str += "=" out_str += self._print(index_map[index]) prev_map = True else: prev_map = False last_valence = new_valence if last_valence is not None: out_str += "}" return out_str def _print_Tensor(self, expr): name = expr.args[0].args[0] indices = expr.get_indices() return self._printer_tensor_indices(name, indices) def _print_TensorElement(self, expr): name = expr.expr.args[0].args[0] indices = expr.expr.get_indices() index_map = expr.index_map return self._printer_tensor_indices(name, indices, index_map) def _print_TensMul(self, expr): # prints expressions like "A(a)", "3A(a)", "(1+x)A(a)" sign, args = expr._get_args_for_traditional_printer() return sign + "".join( [self.parenthesize(arg, precedence(expr)) for arg in args] ) def _print_TensAdd(self, expr): a = [] args = expr.args for x in args: a.append(self.parenthesize(x, precedence(expr))) a.sort() s = ' + '.join(a) s = s.replace('+ -', '- ') return s def _print_TensorIndex(self, expr): return "{}%s{%s}" % ( "^" if expr.is_up else "_", self._print(expr.args[0]) ) def _print_UniversalSet(self, expr): return r"\mathbb{U}" def _print_frac(self, expr, exp=None): if exp is None: return r"\operatorname{frac}{\left(%s\right)}" % self._print(expr.args[0]) else: return r"\operatorname{frac}{\left(%s\right)}^{%s}" % ( self._print(expr.args[0]), self._print(exp)) def _print_tuple(self, expr): if self._settings['decimal_separator'] =='comma': return r"\left( %s\right)" % \ r"; \ ".join([self._print(i) for i in expr]) elif self._settings['decimal_separator'] =='period': return r"\left( %s\right)" % \ r", \ ".join([self._print(i) for i in expr]) else: raise ValueError('Unknown Decimal Separator') def _print_TensorProduct(self, expr): elements = [self._print(a) for a in expr.args] return r' \otimes '.join(elements) def _print_WedgeProduct(self, expr): elements = [self._print(a) for a in expr.args] return r' \wedge '.join(elements) def _print_Tuple(self, expr): return self._print_tuple(expr) def _print_list(self, expr): if self._settings['decimal_separator'] == 'comma': return r"\left[ %s\right]" % \ r"; \ ".join([self._print(i) for i in expr]) elif self._settings['decimal_separator'] == 'period': return r"\left[ %s\right]" % \ r", \ ".join([self._print(i) for i in expr]) else: raise ValueError('Unknown Decimal Separator') def _print_dict(self, d): keys = sorted(d.keys(), key=default_sort_key) items = [] for key in keys: val = d[key] items.append("%s : %s" % (self._print(key), self._print(val))) return r"\left\{ %s\right\}" % r", \ ".join(items) def _print_Dict(self, expr): return self._print_dict(expr) def _print_DiracDelta(self, expr, exp=None): if len(expr.args) == 1 or expr.args[1] == 0: tex = r"\delta\left(%s\right)" % self._print(expr.args[0]) else: tex = r"\delta^{\left( %s \right)}\left( %s \right)" % ( self._print(expr.args[1]), self._print(expr.args[0])) if exp: tex = r"\left(%s\right)^{%s}" % (tex, exp) return tex def _print_SingularityFunction(self, expr): shift = self._print(expr.args[0] - expr.args[1]) power = self._print(expr.args[2]) tex = r"{\left\langle %s \right\rangle}^{%s}" % (shift, power) return tex def _print_Heaviside(self, expr, exp=None): tex = r"\theta\left(%s\right)" % self._print(expr.args[0]) if exp: tex = r"\left(%s\right)^{%s}" % (tex, exp) return tex def _print_KroneckerDelta(self, expr, exp=None): i = self._print(expr.args[0]) j = self._print(expr.args[1]) if expr.args[0].is_Atom and expr.args[1].is_Atom: tex = r'\delta_{%s %s}' % (i, j) else: tex = r'\delta_{%s, %s}' % (i, j) if exp is not None: tex = r'\left(%s\right)^{%s}' % (tex, exp) return tex def _print_LeviCivita(self, expr, exp=None): indices = map(self._print, expr.args) if all(x.is_Atom for x in expr.args): tex = r'\varepsilon_{%s}' % " ".join(indices) else: tex = r'\varepsilon_{%s}' % ", ".join(indices) if exp: tex = r'\left(%s\right)^{%s}' % (tex, exp) return tex def _print_ProductSet(self, p): if len(p.sets) > 1 and not has_variety(p.sets): return self._print(p.sets[0]) + "^{%d}" % len(p.sets) else: return r" \times ".join(self._print(set) for set in p.sets) def _print_RandomDomain(self, d): if hasattr(d, 'as_boolean'): return '\\text{Domain: }' + self._print(d.as_boolean()) elif hasattr(d, 'set'): return ('\\text{Domain: }' + self._print(d.symbols) + '\\text{ in }' + self._print(d.set)) elif hasattr(d, 'symbols'): return '\\text{Domain on }' + self._print(d.symbols) else: return self._print(None) def _print_FiniteSet(self, s): items = sorted(s.args, key=default_sort_key) return self._print_set(items) def _print_set(self, s): items = sorted(s, key=default_sort_key) if self._settings['decimal_separator'] == 'comma': items = "; ".join(map(self._print, items)) elif self._settings['decimal_separator'] == 'period': items = ", ".join(map(self._print, items)) else: raise ValueError('Unknown Decimal Separator') return r"\left\{%s\right\}" % items _print_frozenset = _print_set def _print_Range(self, s): dots = r'\ldots' if s.start.is_infinite: printset = dots, s[-1] - s.step, s[-1] elif s.stop.is_infinite: it = iter(s) printset = next(it), next(it), dots elif len(s) > 4: it = iter(s) printset = next(it), next(it), dots, s[-1] else: printset = tuple(s) return (r"\left\{" + r", ".join(self._print(el) for el in printset) + r"\right\}") def __print_number_polynomial(self, expr, letter, exp=None): if len(expr.args) == 2: if exp is not None: return r"%s_{%s}^{%s}\left(%s\right)" % (letter, self._print(expr.args[0]), self._print(exp), self._print(expr.args[1])) return r"%s_{%s}\left(%s\right)" % (letter, self._print(expr.args[0]), self._print(expr.args[1])) tex = r"%s_{%s}" % (letter, self._print(expr.args[0])) if exp is not None: tex = r"%s^{%s}" % (tex, self._print(exp)) return tex def _print_bernoulli(self, expr, exp=None): return self.__print_number_polynomial(expr, "B", exp) def _print_bell(self, expr, exp=None): if len(expr.args) == 3: tex1 = r"B_{%s, %s}" % (self._print(expr.args[0]), self._print(expr.args[1])) tex2 = r"\left(%s\right)" % r", ".join(self._print(el) for el in expr.args[2]) if exp is not None: tex = r"%s^{%s}%s" % (tex1, self._print(exp), tex2) else: tex = tex1 + tex2 return tex return self.__print_number_polynomial(expr, "B", exp) def _print_fibonacci(self, expr, exp=None): return self.__print_number_polynomial(expr, "F", exp) def _print_lucas(self, expr, exp=None): tex = r"L_{%s}" % self._print(expr.args[0]) if exp is not None: tex = r"%s^{%s}" % (tex, self._print(exp)) return tex def _print_tribonacci(self, expr, exp=None): return self.__print_number_polynomial(expr, "T", exp) def _print_SeqFormula(self, s): if len(s.start.free_symbols) > 0 or len(s.stop.free_symbols) > 0: return r"\left\{%s\right\}_{%s=%s}^{%s}" % ( self._print(s.formula), self._print(s.variables[0]), self._print(s.start), self._print(s.stop) ) if s.start is S.NegativeInfinity: stop = s.stop printset = (r'\ldots', s.coeff(stop - 3), s.coeff(stop - 2), s.coeff(stop - 1), s.coeff(stop)) elif s.stop is S.Infinity or s.length > 4: printset = s[:4] printset.append(r'\ldots') else: printset = tuple(s) return (r"\left[" + r", ".join(self._print(el) for el in printset) + r"\right]") _print_SeqPer = _print_SeqFormula _print_SeqAdd = _print_SeqFormula _print_SeqMul = _print_SeqFormula def _print_Interval(self, i): if i.start == i.end: return r"\left\{%s\right\}" % self._print(i.start) else: if i.left_open: left = '(' else: left = '[' if i.right_open: right = ')' else: right = ']' return r"\left%s%s, %s\right%s" % \ (left, self._print(i.start), self._print(i.end), right) def _print_AccumulationBounds(self, i): return r"\left\langle %s, %s\right\rangle" % \ (self._print(i.min), self._print(i.max)) def _print_Union(self, u): return r" \cup ".join([self._print(i) for i in u.args]) def _print_Complement(self, u): return r" \setminus ".join([self._print(i) for i in u.args]) def _print_Intersection(self, u): return r" \cap ".join([self._print(i) for i in u.args]) def _print_SymmetricDifference(self, u): return r" \triangle ".join([self._print(i) for i in u.args]) def _print_EmptySet(self, e): return r"\emptyset" def _print_Naturals(self, n): return r"\mathbb{N}" def _print_Naturals0(self, n): return r"\mathbb{N}_0" def _print_Integers(self, i): return r"\mathbb{Z}" def _print_Reals(self, i): return r"\mathbb{R}" def _print_Complexes(self, i): return r"\mathbb{C}" def _print_ImageSet(self, s): sets = s.args[1:] varsets = [r"%s \in %s" % (self._print(var), self._print(setv)) for var, setv in zip(s.lamda.variables, sets)] return r"\left\{%s\; \|\; %s\right\}" % ( self._print(s.lamda.expr), ', '.join(varsets)) def _print_ConditionSet(self, s): vars_print = ', '.join([self._print(var) for var in Tuple(s.sym)]) if s.base_set is S.UniversalSet: return r"\left\{%s \mid %s \right\}" % \ (vars_print, self._print(s.condition.as_expr())) return r"\left\{%s \mid %s \in %s \wedge %s \right\}" % ( vars_print, vars_print, self._print(s.base_set), self._print(s.condition)) def _print_ComplexRegion(self, s): vars_print = ', '.join([self._print(var) for var in s.variables]) return r"\left\{%s\; \|\; %s \in %s \right\}" % ( self._print(s.expr), vars_print, self._print(s.sets)) def _print_Contains(self, e): return r"%s \in %s" % tuple(self._print(a) for a in e.args) def _print_FourierSeries(self, s): return self._print_Add(s.truncate()) + self._print(r' + \ldots') def _print_FormalPowerSeries(self, s): return self._print_Add(s.infinite) def _print_FiniteField(self, expr): return r"\mathbb{F}_{%s}" % expr.mod def _print_IntegerRing(self, expr): return r"\mathbb{Z}" def _print_RationalField(self, expr): return r"\mathbb{Q}" def _print_RealField(self, expr): return r"\mathbb{R}" def _print_ComplexField(self, expr): return r"\mathbb{C}" def _print_PolynomialRing(self, expr): domain = self._print(expr.domain) symbols = ", ".join(map(self._print, expr.symbols)) return r"%s\left[%s\right]" % (domain, symbols) def _print_FractionField(self, expr): domain = self._print(expr.domain) symbols = ", ".join(map(self._print, expr.symbols)) return r"%s\left(%s\right)" % (domain, symbols) def _print_PolynomialRingBase(self, expr): domain = self._print(expr.domain) symbols = ", ".join(map(self._print, expr.symbols)) inv = "" if not expr.is_Poly: inv = r"S_<^{-1}" return r"%s%s\left[%s\right]" % (inv, domain, symbols) def _print_Poly(self, poly): cls = poly.__class__.__name__ terms = [] for monom, coeff in poly.terms(): s_monom = '' for i, exp in enumerate(monom): if exp > 0: if exp == 1: s_monom += self._print(poly.gens[i]) else: s_monom += self._print(pow(poly.gens[i], exp)) if coeff.is_Add: if s_monom: s_coeff = r"\left(%s\right)" % self._print(coeff) else: s_coeff = self._print(coeff) else: if s_monom: if coeff is S.One: terms.extend(['+', s_monom]) continue if coeff is S.NegativeOne: terms.extend(['-', s_monom]) continue s_coeff = self._print(coeff) if not s_monom: s_term = s_coeff else: s_term = s_coeff + " " + s_monom if s_term.startswith('-'): terms.extend(['-', s_term[1:]]) else: terms.extend(['+', s_term]) if terms[0] in ['-', '+']: modifier = terms.pop(0) if modifier == '-': terms[0] = '-' + terms[0] expr = ' '.join(terms) gens = list(map(self._print, poly.gens)) domain = "domain=%s" % self._print(poly.get_domain()) args = ", ".join([expr] + gens + [domain]) if cls in accepted_latex_functions: tex = r"\%s {\left(%s \right)}" % (cls, args) else: tex = r"\operatorname{%s}{\left( %s \right)}" % (cls, args) return tex def _print_ComplexRootOf(self, root): cls = root.__class__.__name__ if cls == "ComplexRootOf": cls = "CRootOf" expr = self._print(root.expr) index = root.index if cls in accepted_latex_functions: return r"\%s {\left(%s, %d\right)}" % (cls, expr, index) else: return r"\operatorname{%s} {\left(%s, %d\right)}" % (cls, expr, index) def _print_RootSum(self, expr): cls = expr.__class__.__name__ args = [self._print(expr.expr)] if expr.fun is not S.IdentityFunction: args.append(self._print(expr.fun)) if cls in accepted_latex_functions: return r"\%s {\left(%s\right)}" % (cls, ", ".join(args)) else: return r"\operatorname{%s} {\left(%s\right)}" % (cls, ", ".join(args)) def _print_PolyElement(self, poly): mul_symbol = self._settings['mul_symbol_latex'] return poly.str(self, PRECEDENCE, "{%s}^{%d}", mul_symbol) def _print_FracElement(self, frac): if frac.denom == 1: return self._print(frac.numer) else: numer = self._print(frac.numer) denom = self._print(frac.denom) return r"\frac{%s}{%s}" % (numer, denom) def _print_euler(self, expr, exp=None): m, x = (expr.args[0], None) if len(expr.args) == 1 else expr.args tex = r"E_{%s}" % self._print(m) if exp is not None: tex = r"%s^{%s}" % (tex, self._print(exp)) if x is not None: tex = r"%s\left(%s\right)" % (tex, self._print(x)) return tex def _print_catalan(self, expr, exp=None): tex = r"C_{%s}" % self._print(expr.args[0]) if exp is not None: tex = r"%s^{%s}" % (tex, self._print(exp)) return tex def _print_UnifiedTransform(self, expr, s, inverse=False): return r"\mathcal{{{}}}{}_{{{}}}\left[{}\right]\left({}\right)".format(s, '^{-1}' if inverse else '', self._print(expr.args[1]), self._print(expr.args[0]), self._print(expr.args[2])) def _print_MellinTransform(self, expr): return self._print_UnifiedTransform(expr, 'M') def _print_InverseMellinTransform(self, expr): return self._print_UnifiedTransform(expr, 'M', True) def _print_LaplaceTransform(self, expr): return self._print_UnifiedTransform(expr, 'L') def _print_InverseLaplaceTransform(self, expr): return self._print_UnifiedTransform(expr, 'L', True) def _print_FourierTransform(self, expr): return self._print_UnifiedTransform(expr, 'F') def _print_InverseFourierTransform(self, expr): return self._print_UnifiedTransform(expr, 'F', True) def _print_SineTransform(self, expr): return self._print_UnifiedTransform(expr, 'SIN') def _print_InverseSineTransform(self, expr): return self._print_UnifiedTransform(expr, 'SIN', True) def _print_CosineTransform(self, expr): return self._print_UnifiedTransform(expr, 'COS') def _print_InverseCosineTransform(self, expr): return self._print_UnifiedTransform(expr, 'COS', True) def _print_DMP(self, p): try: if p.ring is not None: # TODO incorporate order return self._print(p.ring.to_sympy(p)) except SympifyError: pass return self._print(repr(p)) def _print_DMF(self, p): return self._print_DMP(p) def _print_Object(self, object): return self._print(Symbol(object.name)) def _print_LambertW(self, expr): return r"W\left(%s\right)" % self._print(expr.args[0]) def _print_Morphism(self, morphism): domain = self._print(morphism.domain) codomain = self._print(morphism.codomain) return "%s\\rightarrow %s" % (domain, codomain) def _print_NamedMorphism(self, morphism): pretty_name = self._print(Symbol(morphism.name)) pretty_morphism = self._print_Morphism(morphism) return "%s:%s" % (pretty_name, pretty_morphism) def _print_IdentityMorphism(self, morphism): from sympy.categories import NamedMorphism return self._print_NamedMorphism(NamedMorphism( morphism.domain, morphism.codomain, "id")) def _print_CompositeMorphism(self, morphism): # All components of the morphism have names and it is thus # possible to build the name of the composite. component_names_list = [self._print(Symbol(component.name)) for component in morphism.components] component_names_list.reverse() component_names = "\\circ ".join(component_names_list) + ":" pretty_morphism = self._print_Morphism(morphism) return component_names + pretty_morphism def _print_Category(self, morphism): return r"\mathbf{{{}}}".format(self._print(Symbol(morphism.name))) def _print_Diagram(self, diagram): if not diagram.premises: # This is an empty diagram. return self._print(S.EmptySet) latex_result = self._print(diagram.premises) if diagram.conclusions: latex_result += "\\Longrightarrow %s" % \ self._print(diagram.conclusions) return latex_result def _print_DiagramGrid(self, grid): latex_result = "\\begin{array}{%s}\n" % ("c" * grid.width) for i in range(grid.height): for j in range(grid.width): if grid[i, j]: latex_result += latex(grid[i, j]) latex_result += " " if j != grid.width - 1: latex_result += "& " if i != grid.height - 1: latex_result += "\\\\" latex_result += "\n" latex_result += "\\end{array}\n" return latex_result def _print_FreeModule(self, M): return '{{{}}}^{{{}}}'.format(self._print(M.ring), self._print(M.rank)) def _print_FreeModuleElement(self, m): # Print as row vector for convenience, for now. return r"\left[ {} \right]".format(",".join( '{' + self._print(x) + '}' for x in m)) def _print_SubModule(self, m): return r"\left\langle {} \right\rangle".format(",".join( '{' + self._print(x) + '}' for x in m.gens)) def _print_ModuleImplementedIdeal(self, m): return r"\left\langle {} \right\rangle".format(",".join( '{' + self._print(x) + '}' for [x] in m._module.gens)) def _print_Quaternion(self, expr): # TODO: This expression is potentially confusing, # shall we print it as `Quaternion( ... )`? s = [self.parenthesize(i, PRECEDENCE["Mul"], strict=True) for i in expr.args] a = [s[0]] + [i+" "+j for i, j in zip(s[1:], "ijk")] return " + ".join(a) def _print_QuotientRing(self, R): # TODO nicer fractions for few generators... return r"\frac{{{}}}{{{}}}".format(self._print(R.ring), self._print(R.base_ideal)) def _print_QuotientRingElement(self, x): return r"{{{}}} + {{{}}}".format(self._print(x.data), self._print(x.ring.base_ideal)) def _print_QuotientModuleElement(self, m): return r"{{{}}} + {{{}}}".format(self._print(m.data), self._print(m.module.killed_module)) def _print_QuotientModule(self, M): # TODO nicer fractions for few generators... return r"\frac{{{}}}{{{}}}".format(self._print(M.base), self._print(M.killed_module)) def _print_MatrixHomomorphism(self, h): return r"{{{}}} : {{{}}} \to {{{}}}".format(self._print(h._sympy_matrix()), self._print(h.domain), self._print(h.codomain)) def _print_BaseScalarField(self, field): string = field._coord_sys._names[field._index] return r'\mathbf{{{}}}'.format(self._print(Symbol(string))) def _print_BaseVectorField(self, field): string = field._coord_sys._names[field._index] return r'\partial_{{{}}}'.format(self._print(Symbol(string))) def _print_Differential(self, diff): field = diff._form_field if hasattr(field, '_coord_sys'): string = field._coord_sys._names[field._index] return r'\operatorname{{d}}{}'.format(self._print(Symbol(string))) else: string = self._print(field) return r'\operatorname{{d}}\left({}\right)'.format(string) def _print_Tr(self, p): # TODO: Handle indices contents = self._print(p.args[0]) return r'\operatorname{{tr}}\left({}\right)'.format(contents) def _print_totient(self, expr, exp=None): if exp is not None: return r'\left(\phi\left(%s\right)\right)^{%s}' % \ (self._print(expr.args[0]), self._print(exp)) return r'\phi\left(%s\right)' % self._print(expr.args[0]) def _print_reduced_totient(self, expr, exp=None): if exp is not None: return r'\left(\lambda\left(%s\right)\right)^{%s}' % \ (self._print(expr.args[0]), self._print(exp)) return r'\lambda\left(%s\right)' % self._print(expr.args[0]) def _print_divisor_sigma(self, expr, exp=None): if len(expr.args) == 2: tex = r"_%s\left(%s\right)" % tuple(map(self._print, (expr.args[1], expr.args[0]))) else: tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"\sigma^{%s}%s" % (self._print(exp), tex) return r"\sigma%s" % tex def _print_udivisor_sigma(self, expr, exp=None): if len(expr.args) == 2: tex = r"_%s\left(%s\right)" % tuple(map(self._print, (expr.args[1], expr.args[0]))) else: tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"\sigma^^{%s}%s" % (self._print(exp), tex) return r"\sigma^%s" % tex def _print_primenu(self, expr, exp=None): if exp is not None: return r'\left(\nu\left(%s\right)\right)^{%s}' % \ (self._print(expr.args[0]), self._print(exp)) return r'\nu\left(%s\right)' % self._print(expr.args[0]) def _print_primeomega(self, expr, exp=None): if exp is not None: return r'\left(\Omega\left(%s\right)\right)^{%s}' % \ (self._print(expr.args[0]), self._print(exp)) return r'\Omega\left(%s\right)' % self._print(expr.args[0]) def translate(s): r''' Check for a modifier ending the string. If present, convert the modifier to latex and translate the rest recursively. Given a description of a Greek letter or other special character, return the appropriate latex. Let everything else pass as given. >>> from sympy.printing.latex import translate >>> translate('alphahatdotprime') "{\\dot{\\hat{\\alpha}}}'" ''' # Process the rest tex = tex_greek_dictionary.get(s) if tex: return tex elif s.lower() in greek_letters_set: return "\\" + s.lower() elif s in other_symbols: return "\\" + s else: # Process modifiers, if any, and recurse for key in sorted(modifier_dict.keys(), key=lambda k:len(k), reverse=True): if s.lower().endswith(key) and len(s) > len(key): return modifier_dict[key](translate(s[:-len(key)])) return s def latex(expr, fold_frac_powers=False, fold_func_brackets=False, fold_short_frac=None, inv_trig_style="abbreviated", itex=False, ln_notation=False, long_frac_ratio=None, mat_delim="[", mat_str=None, mode="plain", mul_symbol=None, order=None, symbol_names=None, root_notation=True, mat_symbol_style="plain", imaginary_unit="i", gothic_re_im=False, decimal_separator="period" ): r"""Convert the given expression to LaTeX string representation. Parameters ========== fold_frac_powers : boolean, optional Emit ``^{p/q}`` instead of ``^{\frac{p}{q}}`` for fractional powers. fold_func_brackets : boolean, optional Fold function brackets where applicable. fold_short_frac : boolean, optional Emit ``p / q`` instead of ``\frac{p}{q}`` when the denominator is simple enough (at most two terms and no powers). The default value is ``True`` for inline mode, ``False`` otherwise. inv_trig_style : string, optional How inverse trig functions should be displayed. Can be one of ``abbreviated``, ``full``, or ``power``. Defaults to ``abbreviated``. itex : boolean, optional Specifies if itex-specific syntax is used, including emitting ``$$...$$``. ln_notation : boolean, optional If set to ``True``, ``\ln`` is used instead of default ``\log``. long_frac_ratio : float or None, optional The allowed ratio of the width of the numerator to the width of the denominator before the printer breaks off long fractions. If ``None`` (the default value), long fractions are not broken up. mat_delim : string, optional The delimiter to wrap around matrices. Can be one of ``[``, ``(``, or the empty string. Defaults to ``[``. mat_str : string, optional Which matrix environment string to emit. ``smallmatrix``, ``matrix``, ``array``, etc. Defaults to ``smallmatrix`` for inline mode, ``matrix`` for matrices of no more than 10 columns, and ``array`` otherwise. mode: string, optional Specifies how the generated code will be delimited. ``mode`` can be one of ``plain``, ``inline``, ``equation`` or ``equation``. If ``mode`` is set to ``plain``, then the resulting code will not be delimited at all (this is the default). If ``mode`` is set to ``inline`` then inline LaTeX ``$...$`` will be used. If ``mode`` is set to ``equation`` or ``equation``, the resulting code will be enclosed in the ``equation`` or ``equation`` environment (remember to import ``amsmath`` for ``equation``), unless the ``itex`` option is set. In the latter case, the ``$$...$$`` syntax is used. mul_symbol : string or None, optional The symbol to use for multiplication. Can be one of ``None``, ``ldot``, ``dot``, or ``times``. order: string, optional Any of the supported monomial orderings (currently ``lex``, ``grlex``, or ``grevlex``), ``old``, and ``none``. This parameter does nothing for Mul objects. Setting order to ``old`` uses the compatibility ordering for Add defined in Printer. For very large expressions, set the ``order`` keyword to ``none`` if speed is a concern. symbol_names : dictionary of strings mapped to symbols, optional Dictionary of symbols and the custom strings they should be emitted as. root_notation : boolean, optional If set to ``False``, exponents of the form 1/n are printed in fractonal form. Default is ``True``, to print exponent in root form. mat_symbol_style : string, optional Can be either ``plain`` (default) or ``bold``. If set to ``bold``, a MatrixSymbol A will be printed as ``\mathbf{A}``, otherwise as ``A``. imaginary_unit : string, optional String to use for the imaginary unit. Defined options are "i" (default) and "j". Adding "r" or "t" in front gives ``\mathrm`` or ``\text``, so "ri" leads to ``\mathrm{i}`` which gives `\mathrm{i}`. gothic_re_im : boolean, optional If set to ``True``, `\Re` and `\Im` is used for ``re`` and ``im``, respectively. The default is ``False`` leading to `\operatorname{re}` and `\operatorname{im}`. decimal_separator : string, optional Specifies what separator to use to separate the whole and fractional parts of a floating point number as in `2.5` for the default, ``period`` or `2{,}5` when ``comma`` is specified. Lists, sets, and tuple are printed with semicolon separating the elements when ``comma`` is chosen. For example, [1; 2; 3] when ``comma`` is chosen and [1,2,3] for when ``period`` is chosen. Notes ===== Not using a print statement for printing, results in double backslashes for latex commands since that's the way Python escapes backslashes in strings. >>> from sympy import latex, Rational >>> from sympy.abc import tau >>> latex((2tau)Rational(7,2)) '8 \\sqrt{2} \\tau^{\\frac{7}{2}}' >>> print(latex((2tau)*Rational(7,2))) 8 \sqrt{2} \tau^{\frac{7}{2}} Examples ======== >>> from sympy import latex, pi, sin, asin, Integral, Matrix, Rational, log >>> from sympy.abc import x, y, mu, r, tau Basic usage: >>> print(latex((2tau)*Rational(7,2))) 8 \sqrt{2} \tau^{\frac{7}{2}} ``mode`` and ``itex`` options: >>> print(latex((2mu)*Rational(7,2), mode='plain')) 8 \sqrt{2} \mu^{\frac{7}{2}} >>> print(latex((2tau)*Rational(7,2), mode='inline')) $8 \sqrt{2} \tau^{7 / 2}$ >>> print(latex((2mu)*Rational(7,2), mode='equation')) \begin{equation}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation} >>> print(latex((2mu)Rational(7,2), mode='equation')) \begin{equation}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation} >>> print(latex((2mu)*Rational(7,2), mode='equation', itex=True)) $$8 \sqrt{2} \mu^{\frac{7}{2}}$$ >>> print(latex((2mu)*Rational(7,2), mode='plain')) 8 \sqrt{2} \mu^{\frac{7}{2}} >>> print(latex((2tau)*Rational(7,2), mode='inline')) $8 \sqrt{2} \tau^{7 / 2}$ >>> print(latex((2mu)*Rational(7,2), mode='equation')) \begin{equation}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation} >>> print(latex((2mu)Rational(7,2), mode='equation')) \begin{equation}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation} >>> print(latex((2mu)*Rational(7,2), mode='equation', itex=True)) $$8 \sqrt{2} \mu^{\frac{7}{2}}$$ Fraction options: >>> print(latex((2tau)*Rational(7,2), fold_frac_powers=True)) 8 \sqrt{2} \tau^{7/2} >>> print(latex((2tau)*sin(Rational(7,2)))) \left(2 \tau\right)^{\sin{\left(\frac{7}{2} \right)}} >>> print(latex((2tau)*sin(Rational(7,2)), fold_func_brackets=True)) \left(2 \tau\right)^{\sin {\frac{7}{2}}} >>> print(latex(3x*2/y)) \frac{3 x^{2}}{y} >>> print(latex(3x*2/y, fold_short_frac=True)) 3 x^{2} / y >>> print(latex(Integral(r, r)/2/pi, long_frac_ratio=2)) \frac{\int r\, dr}{2 \pi} >>> print(latex(Integral(r, r)/2/pi, long_frac_ratio=0)) \frac{1}{2 \pi} \int r\, dr Multiplication options: >>> print(latex((2tau)sin(Rational(7,2)), mul_symbol="times")) \left(2 \times \tau\right)^{\sin{\left(\frac{7}{2} \right)}} Trig options: >>> print(latex(asin(Rational(7,2)))) \operatorname{asin}{\left(\frac{7}{2} \right)} >>> print(latex(asin(Rational(7,2)), inv_trig_style="full")) \arcsin{\left(\frac{7}{2} \right)} >>> print(latex(asin(Rational(7,2)), inv_trig_style="power")) \sin^{-1}{\left(\frac{7}{2} \right)} Matrix options: >>> print(latex(Matrix(2, 1, [x, y]))) \left[\begin{matrix}x\\y\end{matrix}\right] >>> print(latex(Matrix(2, 1, [x, y]), mat_str = "array")) \left[\begin{array}{c}x\\y\end{array}\right] >>> print(latex(Matrix(2, 1, [x, y]), mat_delim="(")) \left(\begin{matrix}x\\y\end{matrix}\right) Custom printing of symbols: >>> print(latex(x2, symbol_names={x: 'x_i'})) x_i^{2} Logarithms: >>> print(latex(log(10))) \log{\left(10 \right)} >>> print(latex(log(10), ln_notation=True)) \ln{\left(10 \right)} ``latex()`` also supports the builtin container types list, tuple, and dictionary. >>> print(latex([2/x, y], mode='inline')) $\left[ 2 / x, \ y\right]$ """ if symbol_names is None: symbol_names = {} settings = { 'fold_frac_powers': fold_frac_powers, 'fold_func_brackets': fold_func_brackets, 'fold_short_frac': fold_short_frac, 'inv_trig_style': inv_trig_style, 'itex': itex, 'ln_notation': ln_notation, 'long_frac_ratio': long_frac_ratio, 'mat_delim': mat_delim, 'mat_str': mat_str, 'mode': mode, 'mul_symbol': mul_symbol, 'order': order, 'symbol_names': symbol_names, 'root_notation': root_notation, 'mat_symbol_style': mat_symbol_style, 'imaginary_unit': imaginary_unit, 'gothic_re_im': gothic_re_im, 'decimal_separator': decimal_separator, } return LatexPrinter(settings).doprint(expr) def print_latex(expr, settings): """Prints LaTeX representation of the given expression. Takes the same settings as ``latex()``.""" print(latex(expr, settings)) def multiline_latex(lhs, rhs, terms_per_line=1, environment="align", use_dots=False, settings): r""" This function generates a LaTeX equation with a multiline right-hand side in an ``align``, ``eqnarray`` or ``IEEEeqnarray`` environment. Parameters ========== lhs : Expr Left-hand side of equation rhs : Expr Right-hand side of equation terms_per_line : integer, optional Number of terms per line to print. Default is 1. environment : "string", optional Which LaTeX wnvironment to use for the output. Options are "align" (default), "eqnarray", and "IEEEeqnarray". use_dots : boolean, optional If ``True``, ``\\dots`` is added to the end of each line. Default is ``False``. Examples ======== >>> from sympy import multiline_latex, symbols, sin, cos, exp, log, I >>> x, y, alpha = symbols('x y alpha') >>> expr = sin(alphay) + exp(Ialpha) - cos(log(y)) >>> print(multiline_latex(x, expr)) \begin{align} x = & e^{i \alpha} \\ & + \sin{\left(\alpha y \right)} \\ & - \cos{\left(\log{\left(y \right)} \right)} \end{align} Using at most two terms per line: >>> print(multiline_latex(x, expr, 2)) \begin{align} x = & e^{i \alpha} + \sin{\left(\alpha y \right)} \\ & - \cos{\left(\log{\left(y \right)} \right)} \end{align} Using ``eqnarray`` and dots: >>> print(multiline_latex(x, expr, terms_per_line=2, environment="eqnarray", use_dots=True)) \begin{eqnarray} x & = & e^{i \alpha} + \sin{\left(\alpha y \right)} \dots\nonumber\\ & & - \cos{\left(\log{\left(y \right)} \right)} \end{eqnarray} Using ``IEEEeqnarray``: >>> print(multiline_latex(x, expr, environment="IEEEeqnarray")) \begin{IEEEeqnarray}{rCl} x & = & e^{i \alpha} \nonumber\\ & & + \sin{\left(\alpha y \right)} \nonumber\\ & & - \cos{\left(\log{\left(y \right)} \right)} \end{IEEEeqnarray} Notes ===== All optional parameters from ``latex`` can also be used. """ # Based on code from https://github.com/sympy/sympy/issues/3001 l = LatexPrinter(settings) if environment == "eqnarray": result = r'\begin{eqnarray}' + '\n' first_term = '& = &' nonumber = r'\nonumber' end_term = '\n\\end{eqnarray}' doubleet = True elif environment == "IEEEeqnarray": result = r'\begin{IEEEeqnarray}{rCl}' + '\n' first_term = '& = &' nonumber = r'\nonumber' end_term = '\n\\end{IEEEeqnarray}' doubleet = True elif environment == "align": result = r'\begin{align}' + '\n' first_term = '= &' nonumber = '' end_term = '\n\\end{align}' doubleet = False else: raise ValueError("Unknown environment: {}".format(environment)) dots = '' if use_dots: dots=r'\dots' terms = rhs.as_ordered_terms() n_terms = len(terms) term_count = 1 for i in range(n_terms): term = terms[i] term_start = '' term_end = '' sign = '+' if term_count > terms_per_line: if doubleet: term_start = '& & ' else: term_start = '& ' term_count = 1 if term_count == terms_per_line: # End of line if i < n_terms-1: # There are terms remaining term_end = dots + nonumber + r'\\' + '\n' else: term_end = '' if term.as_ordered_factors()[0] == -1: term = -1*term sign = r'-' if i == 0: # beginning if sign == '+': sign = '' result += r'{:s} {:s}{:s} {:s} {:s}'.format(l.doprint(lhs), first_term, sign, l.doprint(term), term_end) else: result += r'{:s}{:s} {:s} {:s}'.format(term_start, sign, l.doprint(term), term_end) term_count += 1 result += end_term return result
22474219f45c1022c683b06bffc21a3c97e320e0d87088932329c9f314c63a2c	""" Mathematica code printer """ from __future__ import print_function, division from sympy.printing.codeprinter import CodePrinter from sympy.printing.precedence import precedence # Used in MCodePrinter._print_Function(self) known_functions = { "exp": [(lambda x: True, "Exp")], "log": [(lambda x: True, "Log")], "sin": [(lambda x: True, "Sin")], "cos": [(lambda x: True, "Cos")], "tan": [(lambda x: True, "Tan")], "cot": [(lambda x: True, "Cot")], "sec": [(lambda x: True, "Sec")], "csc": [(lambda x: True, "Csc")], "asin": [(lambda x: True, "ArcSin")], "acos": [(lambda x: True, "ArcCos")], "atan": [(lambda x: True, "ArcTan")], "acot": [(lambda x: True, "ArcCot")], "asec": [(lambda x: True, "ArcSec")], "acsc": [(lambda x: True, "ArcCsc")], "atan2": [(lambda x: True, "ArcTan")], "sinh": [(lambda x: True, "Sinh")], "cosh": [(lambda x: True, "Cosh")], "tanh": [(lambda x: True, "Tanh")], "coth": [(lambda x: True, "Coth")], "sech": [(lambda x: True, "Sech")], "csch": [(lambda x: True, "Csch")], "asinh": [(lambda x: True, "ArcSinh")], "acosh": [(lambda x: True, "ArcCosh")], "atanh": [(lambda x: True, "ArcTanh")], "acoth": [(lambda x: True, "ArcCoth")], "asech": [(lambda x: True, "ArcSech")], "acsch": [(lambda x: True, "ArcCsch")], "conjugate": [(lambda x: True, "Conjugate")], "Max": [(lambda x: True, "Max")], "Min": [(lambda x: True, "Min")], "erf": [(lambda x: True, "Erf")], "erf2": [(lambda x: True, "Erf")], "erfc": [(lambda x: True, "Erfc")], "erfi": [(lambda x: True, "Erfi")], "erfinv": [(lambda x: True, "InverseErf")], "erfcinv": [(lambda x: True, "InverseErfc")], "erf2inv": [(lambda x: True, "InverseErf")], "expint": [(lambda x: True, "ExpIntegralE")], "Ei": [(lambda x: True, "ExpIntegralEi")], "fresnelc": [(lambda x: True, "FresnelC")], "fresnels": [(lambda x: True, "FresnelS")], "gamma": [(lambda x: True, "Gamma")], "uppergamma": [(lambda x: True, "Gamma")], "polygamma": [(lambda x: True, "PolyGamma")], "loggamma": [(lambda x: True, "LogGamma")], "beta": [(lambda x: True, "Beta")], "Ci": [(lambda x: True, "CosIntegral")], "Si": [(lambda x: True, "SinIntegral")], "Chi": [(lambda x: True, "CoshIntegral")], "Shi": [(lambda x: True, "SinhIntegral")], "li": [(lambda x: True, "LogIntegral")], "factorial": [(lambda x: True, "Factorial")], "factorial2": [(lambda x: True, "Factorial2")], "subfactorial": [(lambda x: True, "Subfactorial")], "catalan": [(lambda x: True, "CatalanNumber")], "harmonic": [(lambda x: True, "HarmonicNumber")], "RisingFactorial": [(lambda x: True, "Pochhammer")], "FallingFactorial": [(lambda x: True, "FactorialPower")], "laguerre": [(lambda x: True, "LaguerreL")], "assoc_laguerre": [(lambda x: True, "LaguerreL")], "hermite": [(lambda x: True, "HermiteH")], "jacobi": [(lambda x: True, "JacobiP")], "gegenbauer": [(lambda x: True, "GegenbauerC")], "chebyshevt": [(lambda x: True, "ChebyshevT")], "chebyshevu": [(lambda x: True, "ChebyshevU")], "legendre": [(lambda x: True, "LegendreP")], "assoc_legendre": [(lambda x: True, "LegendreP")], "mathieuc": [(lambda x: True, "MathieuC")], "mathieus": [(lambda x: True, "MathieuS")], "mathieucprime": [(lambda x: True, "MathieuCPrime")], "mathieusprime": [(lambda x: True, "MathieuSPrime")], "stieltjes": [(lambda x: True, "StieltjesGamma")], "elliptic_e": [(lambda x: True, "EllipticE")], "elliptic_f": [(lambda x: True, "EllipticE")], "elliptic_k": [(lambda x: True, "EllipticK")], "elliptic_pi": [(lambda x: True, "EllipticPi")], "zeta": [(lambda x: True, "Zeta")], "besseli": [(lambda x: True, "BesselI")], "besselj": [(lambda x: True, "BesselJ")], "besselk": [(lambda x: True, "BesselK")], "bessely": [(lambda x: True, "BesselY")], "hankel1": [(lambda x: True, "HankelH1")], "hankel2": [(lambda x: True, "HankelH2")], "airyai": [(lambda x: True, "AiryAi")], "airybi": [(lambda x: True, "AiryBi")], "airyaiprime": [(lambda x: True, "AiryAiPrime")], "airybiprime": [(lambda x: True, "AiryBiPrime")], "polylog": [(lambda x: True, "PolyLog")], "lerchphi": [(lambda x: True, "LerchPhi")], "gcd": [(lambda x: True, "GCD")], "lcm": [(lambda x: True, "LCM")], "jn": [(lambda x: True, "SphericalBesselJ")], "yn": [(lambda x: True, "SphericalBesselY")], "hyper": [(lambda x: True, "HypergeometricPFQ")], "meijerg": [(lambda x: True, "MeijerG")], "appellf1": [(lambda x: True, "AppellF1")], "DiracDelta": [(lambda x: True, "DiracDelta")], "Heaviside": [(lambda x: True, "HeavisideTheta")], "KroneckerDelta": [(lambda x: True, "KroneckerDelta")], "LambertW": [(lambda x: True, "ProductLog")], } class MCodePrinter(CodePrinter): """A printer to convert python expressions to strings of the Wolfram's Mathematica code """ printmethod = "_mcode" language = "Wolfram Language" _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 15, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, } _number_symbols = set() _not_supported = set() def __init__(self, settings={}): """Register function mappings supplied by user""" CodePrinter.__init__(self, settings) self.known_functions = dict(known_functions) userfuncs = settings.get('user_functions', {}).copy() for k, v in userfuncs.items(): if not isinstance(v, list): userfuncs[k] = [(lambda x: True, v)] self.known_functions.update(userfuncs) def _format_code(self, lines): return lines def _print_Pow(self, expr): PREC = precedence(expr) return '%s^%s' % (self.parenthesize(expr.base, PREC), self.parenthesize(expr.exp, PREC)) def _print_Mul(self, expr): PREC = precedence(expr) c, nc = expr.args_cnc() res = super(MCodePrinter, self)._print_Mul(expr.func(c)) if nc: res += '' res += '*'.join(self.parenthesize(a, PREC) for a in nc) return res def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) # Primitive numbers def _print_Zero(self, expr): return '0' def _print_One(self, expr): return '1' def _print_NegativeOne(self, expr): return '-1' def _print_Half(self, expr): return '1/2' def _print_ImaginaryUnit(self, expr): return 'I' # Infinity and invalid numbers def _print_Infinity(self, expr): return 'Infinity' def _print_NegativeInfinity(self, expr): return '-Infinity' def _print_ComplexInfinity(self, expr): return 'ComplexInfinity' def _print_NaN(self, expr): return 'Indeterminate' # Mathematical constants def _print_Exp1(self, expr): return 'E' def _print_Pi(self, expr): return 'Pi' def _print_GoldenRatio(self, expr): return 'GoldenRatio' def _print_TribonacciConstant(self, expr): expanded = expr.expand(func=True) PREC = precedence(expr) return self.parenthesize(expanded, PREC) def _print_EulerGamma(self, expr): return 'EulerGamma' def _print_Catalan(self, expr): return 'Catalan' def _print_list(self, expr): return '{' + ', '.join(self.doprint(a) for a in expr) + '}' _print_tuple = _print_list _print_Tuple = _print_list def _print_ImmutableDenseMatrix(self, expr): return self.doprint(expr.tolist()) def _print_ImmutableSparseMatrix(self, expr): from sympy.core.compatibility import default_sort_key def print_rule(pos, val): return '{} -> {}'.format( self.doprint((pos[0]+1, pos[1]+1)), self.doprint(val)) def print_data(): items = sorted(expr._smat.items(), key=default_sort_key) return '{' + \ ', '.join(print_rule(k, v) for k, v in items) + \ '}' def print_dims(): return self.doprint(expr.shape) return 'SparseArray[{}, {}]'.format(print_data(), print_dims()) def _print_ImmutableDenseNDimArray(self, expr): return self.doprint(expr.tolist()) def _print_ImmutableSparseNDimArray(self, expr): def print_string_list(string_list): return '{' + ', '.join(a for a in string_list) + '}' def to_mathematica_index(args): """Helper function to change Python style indexing to Pathematica indexing. Python indexing (0, 1 ... n-1) -> Mathematica indexing (1, 2 ... n) """ return tuple(i + 1 for i in args) def print_rule(pos, val): """Helper function to print a rule of Mathematica""" return '{} -> {}'.format(self.doprint(pos), self.doprint(val)) def print_data(): """Helper function to print data part of Mathematica sparse array. It uses the fourth notation ``SparseArray[data,{d1,d2,...}]`` from https://reference.wolfram.com/language/ref/SparseArray.html ``data`` must be formatted with rule. """ return print_string_list( [print_rule( to_mathematica_index((expr._get_tuple_index(key))), value) for key, value in sorted(expr._sparse_array.items())] ) def print_dims(): """Helper function to print dimensions part of Mathematica sparse array. It uses the fourth notation ``SparseArray[data,{d1,d2,...}]`` from https://reference.wolfram.com/language/ref/SparseArray.html """ return self.doprint(expr.shape) return 'SparseArray[{}, {}]'.format(print_data(), print_dims()) def _print_Function(self, expr): if expr.func.__name__ in self.known_functions: cond_mfunc = self.known_functions[expr.func.__name__] for cond, mfunc in cond_mfunc: if cond(expr.args): return "%s[%s]" % (mfunc, self.stringify(expr.args, ", ")) elif (expr.func.__name__ in self._rewriteable_functions and self._rewriteable_functions[expr.func.__name__] in self.known_functions): # Simple rewrite to supported function possible return self._print(expr.rewrite(self._rewriteable_functions[expr.func.__name__])) return expr.func.__name__ + "[%s]" % self.stringify(expr.args, ", ") _print_MinMaxBase = _print_Function def _print_Integral(self, expr): if len(expr.variables) == 1 and not expr.limits[0][1:]: args = [expr.args[0], expr.variables[0]] else: args = expr.args return "Hold[Integrate[" + ', '.join(self.doprint(a) for a in args) + "]]" def _print_Sum(self, expr): return "Hold[Sum[" + ', '.join(self.doprint(a) for a in expr.args) + "]]" def _print_Derivative(self, expr): dexpr = expr.expr dvars = [i[0] if i[1] == 1 else i for i in expr.variable_count] return "Hold[D[" + ', '.join(self.doprint(a) for a in [dexpr] + dvars) + "]]" def _get_comment(self, text): return "(* {} )".format(text) def mathematica_code(expr, settings): r"""Converts an expr to a string of the Wolfram Mathematica code Examples ======== >>> from sympy import mathematica_code as mcode, symbols, sin >>> x = symbols('x') >>> mcode(sin(x).series(x).removeO()) '(1/120)x^5 - 1/6*x^3 + x' """ return MCodePrinter(settings).doprint(expr)
046f2004065c2b5c26853a03fc4ca3b7b52caf5518193b686a15523fa697c6a3	""" C code printer The C89CodePrinter & C99CodePrinter converts single sympy expressions into single C expressions, using the functions defined in math.h where possible. A complete code generator, which uses ccode extensively, can be found in sympy.utilities.codegen. The codegen module can be used to generate complete source code files that are compilable without further modifications. """ from __future__ import print_function, division from functools import wraps from itertools import chain from sympy.core import S from sympy.core.compatibility import string_types, range from sympy.core.decorators import deprecated from sympy.codegen.ast import ( Assignment, Pointer, Variable, Declaration, real, complex_, integer, bool_, float32, float64, float80, complex64, complex128, intc, value_const, pointer_const, int8, int16, int32, int64, uint8, uint16, uint32, uint64, untyped ) from sympy.printing.codeprinter import CodePrinter, requires from sympy.printing.precedence import precedence, PRECEDENCE from sympy.sets.fancysets import Range # dictionary mapping sympy function to (argument_conditions, C_function). # Used in C89CodePrinter._print_Function(self) known_functions_C89 = { "Abs": [(lambda x: not x.is_integer, "fabs"), (lambda x: x.is_integer, "abs")], "sin": "sin", "cos": "cos", "tan": "tan", "asin": "asin", "acos": "acos", "atan": "atan", "atan2": "atan2", "exp": "exp", "log": "log", "sinh": "sinh", "cosh": "cosh", "tanh": "tanh", "floor": "floor", "ceiling": "ceil", } # move to C99 once CCodePrinter is removed: _known_functions_C9X = dict(known_functions_C89, { "asinh": "asinh", "acosh": "acosh", "atanh": "atanh", "erf": "erf", "gamma": "tgamma", }) known_functions = _known_functions_C9X known_functions_C99 = dict(_known_functions_C9X, { 'exp2': 'exp2', 'expm1': 'expm1', 'log10': 'log10', 'log2': 'log2', 'log1p': 'log1p', 'Cbrt': 'cbrt', 'hypot': 'hypot', 'fma': 'fma', 'loggamma': 'lgamma', 'erfc': 'erfc', 'Max': 'fmax', 'Min': 'fmin' }) # These are the core reserved words in the C language. Taken from: # http://en.cppreference.com/w/c/keyword reserved_words = [ 'auto', 'break', 'case', 'char', 'const', 'continue', 'default', 'do', 'double', 'else', 'enum', 'extern', 'float', 'for', 'goto', 'if', 'int', 'long', 'register', 'return', 'short', 'signed', 'sizeof', 'static', 'struct', 'entry', # never standardized, we'll leave it here anyway 'switch', 'typedef', 'union', 'unsigned', 'void', 'volatile', 'while' ] reserved_words_c99 = ['inline', 'restrict'] def get_math_macros(): """ Returns a dictionary with math-related macros from math.h/cmath Note that these macros are not strictly required by the C/C++-standard. For MSVC they are enabled by defining "_USE_MATH_DEFINES" (preferably via a compilation flag). Returns ======= Dictionary mapping sympy expressions to strings (macro names) """ from sympy.codegen.cfunctions import log2, Sqrt from sympy.functions.elementary.exponential import log from sympy.functions.elementary.miscellaneous import sqrt return { S.Exp1: 'M_E', log2(S.Exp1): 'M_LOG2E', 1/log(2): 'M_LOG2E', log(2): 'M_LN2', log(10): 'M_LN10', S.Pi: 'M_PI', S.Pi/2: 'M_PI_2', S.Pi/4: 'M_PI_4', 1/S.Pi: 'M_1_PI', 2/S.Pi: 'M_2_PI', 2/sqrt(S.Pi): 'M_2_SQRTPI', 2/Sqrt(S.Pi): 'M_2_SQRTPI', sqrt(2): 'M_SQRT2', Sqrt(2): 'M_SQRT2', 1/sqrt(2): 'M_SQRT1_2', 1/Sqrt(2): 'M_SQRT1_2' } def _as_macro_if_defined(meth): """ Decorator for printer methods When a Printer's method is decorated using this decorator the expressions printed will first be looked for in the attribute ``math_macros``, and if present it will print the macro name in ``math_macros`` followed by a type suffix for the type ``real``. e.g. printing ``sympy.pi`` would print ``M_PIl`` if real is mapped to float80. """ @wraps(meth) def _meth_wrapper(self, expr, kwargs): if expr in self.math_macros: return '%s%s' % (self.math_macros[expr], self._get_math_macro_suffix(real)) else: return meth(self, expr, kwargs) return _meth_wrapper class C89CodePrinter(CodePrinter): """A printer to convert python expressions to strings of c code""" printmethod = "_ccode" language = "C" standard = "C89" reserved_words = set(reserved_words) _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 17, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, 'contract': True, 'dereference': set(), 'error_on_reserved': False, 'reserved_word_suffix': '_', } type_aliases = { real: float64, complex_: complex128, integer: intc } type_mappings = { real: 'double', intc: 'int', float32: 'float', float64: 'double', integer: 'int', bool_: 'bool', int8: 'int8_t', int16: 'int16_t', int32: 'int32_t', int64: 'int64_t', uint8: 'int8_t', uint16: 'int16_t', uint32: 'int32_t', uint64: 'int64_t', } type_headers = { bool_: {'stdbool.h'}, int8: {'stdint.h'}, int16: {'stdint.h'}, int32: {'stdint.h'}, int64: {'stdint.h'}, uint8: {'stdint.h'}, uint16: {'stdint.h'}, uint32: {'stdint.h'}, uint64: {'stdint.h'}, } type_macros = {} # Macros needed to be defined when using a Type type_func_suffixes = { float32: 'f', float64: '', float80: 'l' } type_literal_suffixes = { float32: 'F', float64: '', float80: 'L' } type_math_macro_suffixes = { float80: 'l' } math_macros = None _ns = '' # namespace, C++ uses 'std::' _kf = known_functions_C89 # known_functions-dict to copy def __init__(self, settings=None): settings = settings or {} if self.math_macros is None: self.math_macros = settings.pop('math_macros', get_math_macros()) self.type_aliases = dict(chain(self.type_aliases.items(), settings.pop('type_aliases', {}).items())) self.type_mappings = dict(chain(self.type_mappings.items(), settings.pop('type_mappings', {}).items())) self.type_headers = dict(chain(self.type_headers.items(), settings.pop('type_headers', {}).items())) self.type_macros = dict(chain(self.type_macros.items(), settings.pop('type_macros', {}).items())) self.type_func_suffixes = dict(chain(self.type_func_suffixes.items(), settings.pop('type_func_suffixes', {}).items())) self.type_literal_suffixes = dict(chain(self.type_literal_suffixes.items(), settings.pop('type_literal_suffixes', {}).items())) self.type_math_macro_suffixes = dict(chain(self.type_math_macro_suffixes.items(), settings.pop('type_math_macro_suffixes', {}).items())) super(C89CodePrinter, self).__init__(settings) self.known_functions = dict(self._kf, *settings.get('user_functions', {})) self._dereference = set(settings.get('dereference', [])) self.headers = set() self.libraries = set() self.macros = set() def _rate_index_position(self, p): return p5 def _get_statement(self, codestring): """ Get code string as a statement - i.e. ending with a semicolon. """ return codestring if codestring.endswith(';') else codestring + ';' def _get_comment(self, text): return "// {0}".format(text) def _declare_number_const(self, name, value): type_ = self.type_aliases[real] var = Variable(name, type=type_, value=value.evalf(type_.decimal_dig), attrs={value_const}) decl = Declaration(var) return self._get_statement(self._print(decl)) def _format_code(self, lines): return self.indent_code(lines) def _traverse_matrix_indices(self, mat): rows, cols = mat.shape return ((i, j) for i in range(rows) for j in range(cols)) @_as_macro_if_defined def _print_Mul(self, expr, kwargs): return super(C89CodePrinter, self)._print_Mul(expr, kwargs) @_as_macro_if_defined def _print_Pow(self, expr): if "Pow" in self.known_functions: return self._print_Function(expr) PREC = precedence(expr) suffix = self._get_func_suffix(real) if expr.exp == -1: return '1.0%s/%s' % (suffix.upper(), self.parenthesize(expr.base, PREC)) elif expr.exp == 0.5: return '%ssqrt%s(%s)' % (self._ns, suffix, self._print(expr.base)) elif expr.exp == S.One/3 and self.standard != 'C89': return '%scbrt%s(%s)' % (self._ns, suffix, self._print(expr.base)) else: return '%spow%s(%s, %s)' % (self._ns, suffix, self._print(expr.base), self._print(expr.exp)) def _print_Mod(self, expr): num, den = expr.args if num.is_integer and den.is_integer: return "(({}) % ({}))".format(self._print(num), self._print(den)) else: return self._print_math_func(expr, known='fmod') def _print_Rational(self, expr): p, q = int(expr.p), int(expr.q) suffix = self._get_literal_suffix(real) return '%d.0%s/%d.0%s' % (p, suffix, q, suffix) def _print_Indexed(self, expr): # calculate index for 1d array offset = getattr(expr.base, 'offset', S.Zero) strides = getattr(expr.base, 'strides', None) indices = expr.indices if strides is None or isinstance(strides, string_types): dims = expr.shape shift = S.One temp = tuple() if strides == 'C' or strides is None: traversal = reversed(range(expr.rank)) indices = indices[::-1] elif strides == 'F': traversal = range(expr.rank) for i in traversal: temp += (shift,) shift = dims[i] strides = temp flat_index = sum([x[0]x[1] for x in zip(indices, strides)]) + offset return "%s[%s]" % (self._print(expr.base.label), self._print(flat_index)) def _print_Idx(self, expr): return self._print(expr.label) @_as_macro_if_defined def _print_NumberSymbol(self, expr): return super(C89CodePrinter, self)._print_NumberSymbol(expr) def _print_Infinity(self, expr): return 'HUGE_VAL' def _print_NegativeInfinity(self, expr): return '-HUGE_VAL' def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] if expr.has(Assignment): for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s) {" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines.append("else {") else: lines.append("else if (%s) {" % self._print(c)) code0 = self._print(e) lines.append(code0) lines.append("}") return "\n".join(lines) else: # The piecewise was used in an expression, need to do inline # operators. This has the downside that inline operators will # not work for statements that span multiple lines (Matrix or # Indexed expressions). ecpairs = ["((%s) ? (\n%s\n)\n" % (self._print(c), self._print(e)) for e, c in expr.args[:-1]] last_line = ": (\n%s\n)" % self._print(expr.args[-1].expr) return ": ".join(ecpairs) + last_line + " ".join([")"len(ecpairs)]) def _print_ITE(self, expr): from sympy.functions import Piecewise _piecewise = Piecewise((expr.args[1], expr.args[0]), (expr.args[2], True)) return self._print(_piecewise) def _print_MatrixElement(self, expr): return "{0}[{1}]".format(self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True), expr.j + expr.iexpr.parent.shape[1]) def _print_Symbol(self, expr): name = super(C89CodePrinter, self)._print_Symbol(expr) if expr in self._settings['dereference']: return '({0})'.format(name) else: return name def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_sinc(self, expr): from sympy.functions.elementary.trigonometric import sin from sympy.core.relational import Ne from sympy.functions import Piecewise _piecewise = Piecewise( (sin(expr.args[0]) / expr.args[0], Ne(expr.args[0], 0)), (1, True)) return self._print(_piecewise) def _print_For(self, expr): target = self._print(expr.target) if isinstance(expr.iterable, Range): start, stop, step = expr.iterable.args else: raise NotImplementedError("Only iterable currently supported is Range") body = self._print(expr.body) return ('for ({target} = {start}; {target} < {stop}; {target} += ' '{step}) {{\n{body}\n}}').format(target=target, start=start, stop=stop, step=step, body=body) def _print_sign(self, func): return '((({0}) > 0) - (({0}) < 0))'.format(self._print(func.args[0])) def _print_Max(self, expr): if "Max" in self.known_functions: return self._print_Function(expr) def inner_print_max(args): # The more natural abstraction of creating if len(args) == 1: # and printing smaller Max objects is slow return self._print(args[0]) # when there are many arguments. half = len(args) // 2 return "((%(a)s > %(b)s) ? %(a)s : %(b)s)" % { 'a': inner_print_max(args[:half]), 'b': inner_print_max(args[half:]) } return inner_print_max(expr.args) def _print_Min(self, expr): if "Min" in self.known_functions: return self._print_Function(expr) def inner_print_min(args): # The more natural abstraction of creating if len(args) == 1: # and printing smaller Min objects is slow return self._print(args[0]) # when there are many arguments. half = len(args) // 2 return "((%(a)s < %(b)s) ? %(a)s : %(b)s)" % { 'a': inner_print_min(args[:half]), 'b': inner_print_min(args[half:]) } return inner_print_min(expr.args) def indent_code(self, code): """Accepts a string of code or a list of code lines""" if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_token = ('{', '(', '{\n', '(\n') dec_token = ('}', ')') code = [line.lstrip(' \t') for line in code] increase = [int(any(map(line.endswith, inc_token))) for line in code] decrease = [int(any(map(line.startswith, dec_token))) for line in code] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tablevel, line)) level += increase[n] return pretty def _get_func_suffix(self, type_): return self.type_func_suffixes[self.type_aliases.get(type_, type_)] def _get_literal_suffix(self, type_): return self.type_literal_suffixes[self.type_aliases.get(type_, type_)] def _get_math_macro_suffix(self, type_): alias = self.type_aliases.get(type_, type_) dflt = self.type_math_macro_suffixes.get(alias, '') return self.type_math_macro_suffixes.get(type_, dflt) def _print_Type(self, type_): self.headers.update(self.type_headers.get(type_, set())) self.macros.update(self.type_macros.get(type_, set())) return self._print(self.type_mappings.get(type_, type_.name)) def _print_Declaration(self, decl): from sympy.codegen.cnodes import restrict var = decl.variable val = var.value if var.type == untyped: raise ValueError("C does not support untyped variables") if isinstance(var, Pointer): result = '{vc}{t} {pc} {r}{s}'.format( vc='const ' if value_const in var.attrs else '', t=self._print(var.type), pc=' const' if pointer_const in var.attrs else '', r='restrict ' if restrict in var.attrs else '', s=self._print(var.symbol) ) elif isinstance(var, Variable): result = '{vc}{t} {s}'.format( vc='const ' if value_const in var.attrs else '', t=self._print(var.type), s=self._print(var.symbol) ) else: raise NotImplementedError("Unknown type of var: %s" % type(var)) if val != None: # Must be "!= None", cannot be "is not None" result += ' = %s' % self._print(val) return result def _print_Float(self, flt): type_ = self.type_aliases.get(real, real) self.macros.update(self.type_macros.get(type_, set())) suffix = self._get_literal_suffix(type_) num = str(flt.evalf(type_.decimal_dig)) if 'e' not in num and '.' not in num: num += '.0' num_parts = num.split('e') num_parts[0] = num_parts[0].rstrip('0') if num_parts[0].endswith('.'): num_parts[0] += '0' return 'e'.join(num_parts) + suffix @requires(headers={'stdbool.h'}) def _print_BooleanTrue(self, expr): return 'true' @requires(headers={'stdbool.h'}) def _print_BooleanFalse(self, expr): return 'false' def _print_Element(self, elem): if elem.strides == None: # Must be "== None", cannot be "is None" if elem.offset != None: # Must be "!= None", cannot be "is not None" raise ValueError("Expected strides when offset is given") idxs = ']['.join(map(lambda arg: self._print(arg), elem.indices)) else: global_idx = sum([is for i, s in zip(elem.indices, elem.strides)]) if elem.offset != None: # Must be "!= None", cannot be "is not None" global_idx += elem.offset idxs = self._print(global_idx) return "{symb}[{idxs}]".format( symb=self._print(elem.symbol), idxs=idxs ) def _print_CodeBlock(self, expr): """ Elements of code blocks printed as statements. """ return '\n'.join([self._get_statement(self._print(i)) for i in expr.args]) def _print_While(self, expr): return 'while ({condition}) {{\n{body}\n}}'.format(*expr.kwargs( apply=lambda arg: self._print(arg))) def _print_Scope(self, expr): return '{\n%s\n}' % self._print_CodeBlock(expr.body) @requires(headers={'stdio.h'}) def _print_Print(self, expr): return 'printf({fmt}, {pargs})'.format( fmt=self._print(expr.format_string), pargs=', '.join(map(lambda arg: self._print(arg), expr.print_args)) ) def _print_FunctionPrototype(self, expr): pars = ', '.join(map(lambda arg: self._print(Declaration(arg)), expr.parameters)) return "%s %s(%s)" % ( tuple(map(lambda arg: self._print(arg), (expr.return_type, expr.name))) + (pars,) ) def _print_FunctionDefinition(self, expr): return "%s%s" % (self._print_FunctionPrototype(expr), self._print_Scope(expr)) def _print_Return(self, expr): arg, = expr.args return 'return %s' % self._print(arg) def _print_CommaOperator(self, expr): return '(%s)' % ', '.join(map(lambda arg: self._print(arg), expr.args)) def _print_Label(self, expr): return '%s:' % str(expr) def _print_goto(self, expr): return 'goto %s' % expr.label def _print_PreIncrement(self, expr): arg, = expr.args return '++(%s)' % self._print(arg) def _print_PostIncrement(self, expr): arg, = expr.args return '(%s)++' % self._print(arg) def _print_PreDecrement(self, expr): arg, = expr.args return '--(%s)' % self._print(arg) def _print_PostDecrement(self, expr): arg, = expr.args return '(%s)--' % self._print(arg) def _print_struct(self, expr): return "%(keyword)s %(name)s {\n%(lines)s}" % dict( keyword=expr.__class__.__name__, name=expr.name, lines=';\n'.join( [self._print(decl) for decl in expr.declarations] + ['']) ) def _print_BreakToken(self, _): return 'break' def _print_ContinueToken(self, _): return 'continue' _print_union = _print_struct class _C9XCodePrinter(object): # Move these methods to C99CodePrinter when removing CCodePrinter def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] loopstart = "for (int %(var)s=%(start)s; %(var)s<%(end)s; %(var)s++){" # C99 for i in indices: # C arrays start at 0 and end at dimension-1 open_lines.append(loopstart % { 'var': self._print(i.label), 'start': self._print(i.lower), 'end': self._print(i.upper + 1)}) close_lines.append("}") return open_lines, close_lines @deprecated( last_supported_version='1.0', useinstead="C89CodePrinter or C99CodePrinter, e.g. ccode(..., standard='C99')", issue=12220, deprecated_since_version='1.1') class CCodePrinter(_C9XCodePrinter, C89CodePrinter): """ Deprecated. Alias for C89CodePrinter, for backwards compatibility. """ _kf = _known_functions_C9X # known_functions-dict to copy class C99CodePrinter(_C9XCodePrinter, C89CodePrinter): standard = 'C99' reserved_words = set(reserved_words + reserved_words_c99) type_mappings=dict(chain(C89CodePrinter.type_mappings.items(), { complex64: 'float complex', complex128: 'double complex', }.items())) type_headers = dict(chain(C89CodePrinter.type_headers.items(), { complex64: {'complex.h'}, complex128: {'complex.h'} }.items())) _kf = known_functions_C99 # known_functions-dict to copy # functions with versions with 'f' and 'l' suffixes: _prec_funcs = ('fabs fmod remainder remquo fma fmax fmin fdim nan exp exp2' ' expm1 log log10 log2 log1p pow sqrt cbrt hypot sin cos tan' ' asin acos atan atan2 sinh cosh tanh asinh acosh atanh erf' ' erfc tgamma lgamma ceil floor trunc round nearbyint rint' ' frexp ldexp modf scalbn ilogb logb nextafter copysign').split() def _print_Infinity(self, expr): return 'INFINITY' def _print_NegativeInfinity(self, expr): return '-INFINITY' def _print_NaN(self, expr): return 'NAN' # tgamma was already covered by 'known_functions' dict @requires(headers={'math.h'}, libraries={'m'}) @_as_macro_if_defined def _print_math_func(self, expr, nest=False, known=None): if known is None: known = self.known_functions[expr.__class__.__name__] if not isinstance(known, string_types): for cb, name in known: if cb(expr.args): known = name break else: raise ValueError("No matching printer") try: return known(self, expr.args) except TypeError: suffix = self._get_func_suffix(real) if self._ns + known in self._prec_funcs else '' if nest: args = self._print(expr.args[0]) if len(expr.args) > 1: paren_pile = '' for curr_arg in expr.args[1:-1]: paren_pile += ')' args += ', {ns}{name}{suffix}({next}'.format( ns=self._ns, name=known, suffix=suffix, next = self._print(curr_arg) ) args += ', %s%s' % ( self._print(expr.func(expr.args[-1])), paren_pile ) else: args = ', '.join(map(lambda arg: self._print(arg), expr.args)) return '{ns}{name}{suffix}({args})'.format( ns=self._ns, name=known, suffix=suffix, args=args ) def _print_Max(self, expr): return self._print_math_func(expr, nest=True) def _print_Min(self, expr): return self._print_math_func(expr, nest=True) for k in ('Abs Sqrt exp exp2 expm1 log log10 log2 log1p Cbrt hypot fma' ' loggamma sin cos tan asin acos atan atan2 sinh cosh tanh asinh acosh ' 'atanh erf erfc loggamma gamma ceiling floor').split(): setattr(C99CodePrinter, '_print_%s' % k, C99CodePrinter._print_math_func) class C11CodePrinter(C99CodePrinter): @requires(headers={'stdalign.h'}) def _print_alignof(self, expr): arg, = expr.args return 'alignof(%s)' % self._print(arg) c_code_printers = { 'c89': C89CodePrinter, 'c99': C99CodePrinter, 'c11': C11CodePrinter } def ccode(expr, assign_to=None, standard='c99', settings): """Converts an expr to a string of c code Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of line-wrapping, or for expressions that generate multi-line statements. standard : str, optional String specifying the standard. If your compiler supports a more modern standard you may set this to 'c99' to allow the printer to use more math functions. [default='c89']. precision : integer, optional The precision for numbers such as pi [default=17]. user_functions : dict, optional A dictionary where the keys are string representations of either ``FunctionClass`` or ``UndefinedFunction`` instances and the values are their desired C string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)] or [(argument_test, cfunction_formater)]. See below for examples. dereference : iterable, optional An iterable of symbols that should be dereferenced in the printed code expression. These would be values passed by address to the function. For example, if ``dereference=[a]``, the resulting code would print ``(a)`` instead of ``a``. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. Examples ======== >>> from sympy import ccode, symbols, Rational, sin, ceiling, Abs, Function >>> x, tau = symbols("x, tau") >>> expr = (2tau)Rational(7, 2) >>> ccode(expr) '8M_SQRT2pow(tau, 7.0/2.0)' >>> ccode(expr, math_macros={}) '8sqrt(2)pow(tau, 7.0/2.0)' >>> ccode(sin(x), assign_to="s") 's = sin(x);' >>> from sympy.codegen.ast import real, float80 >>> ccode(expr, type_aliases={real: float80}) '8M_SQRT2lpowl(tau, 7.0L/2.0L)' Simple custom printing can be defined for certain types by passing a dictionary of {"type" : "function"} to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. >>> custom_functions = { ... "ceiling": "CEIL", ... "Abs": [(lambda x: not x.is_integer, "fabs"), ... (lambda x: x.is_integer, "ABS")], ... "func": "f" ... } >>> func = Function('func') >>> ccode(func(Abs(x) + ceiling(x)), standard='C89', user_functions=custom_functions) 'f(fabs(x) + CEIL(x))' or if the C-function takes a subset of the original arguments: >>> ccode(2x + 3x, standard='C99', user_functions={'Pow': [ ... (lambda b, e: b == 2, lambda b, e: 'exp2(%s)' % e), ... (lambda b, e: b != 2, 'pow')]}) 'exp2(x) + pow(3, x)' ``Piecewise`` expressions are converted into conditionals. If an ``assign_to`` variable is provided an if statement is created, otherwise the ternary operator is used. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> expr = Piecewise((x + 1, x > 0), (x, True)) >>> print(ccode(expr, tau, standard='C89')) if (x > 0) { tau = x + 1; } else { tau = x; } Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> ccode(e.rhs, assign_to=e.lhs, contract=False, standard='C89') 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions must be provided to ``assign_to``. Note that any expression that can be generated normally can also exist inside a Matrix: >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([x2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) >>> A = MatrixSymbol('A', 3, 1) >>> print(ccode(mat, A, standard='C89')) A[0] = pow(x, 2); if (x > 0) { A[1] = x + 1; } else { A[1] = x; } A[2] = sin(x); """ return c_code_printers[standard.lower()](settings).doprint(expr, assign_to) def print_ccode(expr, settings): """Prints C representation of the given expression.""" print(ccode(expr, *settings))
ebb17aa2cdae84bd61289de82af86cb7080bfd173ceac43e52e3d4130c110a44	""" A MathML printer. """ from __future__ import print_function, division from sympy import sympify, S, Mul from sympy.core.compatibility import range, string_types, default_sort_key from sympy.core.function import _coeff_isneg from sympy.printing.conventions import split_super_sub, requires_partial from sympy.printing.precedence import precedence_traditional, PRECEDENCE from sympy.printing.pretty.pretty_symbology import greek_unicode from sympy.printing.printer import Printer import mpmath.libmp as mlib from mpmath.libmp import prec_to_dps class MathMLPrinterBase(Printer): """Contains common code required for MathMLContentPrinter and MathMLPresentationPrinter. """ _default_settings = { "order": None, "encoding": "utf-8", "fold_frac_powers": False, "fold_func_brackets": False, "fold_short_frac": None, "inv_trig_style": "abbreviated", "ln_notation": False, "long_frac_ratio": None, "mat_delim": "[", "mat_symbol_style": "plain", "mul_symbol": None, "root_notation": True, "symbol_names": {}, "mul_symbol_mathml_numbers": '·', } def __init__(self, settings=None): Printer.__init__(self, settings) from xml.dom.minidom import Document, Text self.dom = Document() # Workaround to allow strings to remain unescaped # Based on # https://stackoverflow.com/questions/38015864/python-xml-dom-minidom-\ # please-dont-escape-my-strings/38041194 class RawText(Text): def writexml(self, writer, indent='', addindent='', newl=''): if self.data: writer.write(u'{}{}{}'.format(indent, self.data, newl)) def createRawTextNode(data): r = RawText() r.data = data r.ownerDocument = self.dom return r self.dom.createTextNode = createRawTextNode def doprint(self, expr): """ Prints the expression as MathML. """ mathML = Printer._print(self, expr) unistr = mathML.toxml() xmlbstr = unistr.encode('ascii', 'xmlcharrefreplace') res = xmlbstr.decode() return res def apply_patch(self): # Applying the patch of xml.dom.minidom bug # Date: 2011-11-18 # Description: http://ronrothman.com/public/leftbraned/xml-dom-minidom\ # -toprettyxml-and-silly-whitespace/#best-solution # Issue: http://bugs.python.org/issue4147 # Patch: http://hg.python.org/cpython/rev/7262f8f276ff/ from xml.dom.minidom import Element, Text, Node, _write_data def writexml(self, writer, indent="", addindent="", newl=""): # indent = current indentation # addindent = indentation to add to higher levels # newl = newline string writer.write(indent + "<" + self.tagName) attrs = self._get_attributes() a_names = list(attrs.keys()) a_names.sort() for a_name in a_names: writer.write(" %s=\"" % a_name) _write_data(writer, attrs[a_name].value) writer.write("\"") if self.childNodes: writer.write(">") if (len(self.childNodes) == 1 and self.childNodes[0].nodeType == Node.TEXT_NODE): self.childNodes[0].writexml(writer, '', '', '') else: writer.write(newl) for node in self.childNodes: node.writexml( writer, indent + addindent, addindent, newl) writer.write(indent) writer.write("</%s>%s" % (self.tagName, newl)) else: writer.write("/>%s" % (newl)) self._Element_writexml_old = Element.writexml Element.writexml = writexml def writexml(self, writer, indent="", addindent="", newl=""): _write_data(writer, "%s%s%s" % (indent, self.data, newl)) self._Text_writexml_old = Text.writexml Text.writexml = writexml def restore_patch(self): from xml.dom.minidom import Element, Text Element.writexml = self._Element_writexml_old Text.writexml = self._Text_writexml_old class MathMLContentPrinter(MathMLPrinterBase): """Prints an expression to the Content MathML markup language. References: https://www.w3.org/TR/MathML2/chapter4.html """ printmethod = "_mathml_content" def mathml_tag(self, e): """Returns the MathML tag for an expression.""" translate = { 'Add': 'plus', 'Mul': 'times', 'Derivative': 'diff', 'Number': 'cn', 'int': 'cn', 'Pow': 'power', 'Max': 'max', 'Min': 'min', 'Abs': 'abs', 'And': 'and', 'Or': 'or', 'Xor': 'xor', 'Not': 'not', 'Implies': 'implies', 'Symbol': 'ci', 'MatrixSymbol': 'ci', 'RandomSymbol': 'ci', 'Integral': 'int', 'Sum': 'sum', 'sin': 'sin', 'cos': 'cos', 'tan': 'tan', 'cot': 'cot', 'csc': 'csc', 'sec': 'sec', 'sinh': 'sinh', 'cosh': 'cosh', 'tanh': 'tanh', 'coth': 'coth', 'csch': 'csch', 'sech': 'sech', 'asin': 'arcsin', 'asinh': 'arcsinh', 'acos': 'arccos', 'acosh': 'arccosh', 'atan': 'arctan', 'atanh': 'arctanh', 'atan2': 'arctan', 'acot': 'arccot', 'acoth': 'arccoth', 'asec': 'arcsec', 'asech': 'arcsech', 'acsc': 'arccsc', 'acsch': 'arccsch', 'log': 'ln', 'Equality': 'eq', 'Unequality': 'neq', 'GreaterThan': 'geq', 'LessThan': 'leq', 'StrictGreaterThan': 'gt', 'StrictLessThan': 'lt', } for cls in e.__class__.__mro__: n = cls.__name__ if n in translate: return translate[n] # Not found in the MRO set n = e.__class__.__name__ return n.lower() def _print_Mul(self, expr): if _coeff_isneg(expr): x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('minus')) x.appendChild(self._print_Mul(-expr)) return x from sympy.simplify import fraction numer, denom = fraction(expr) if denom is not S.One: x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('divide')) x.appendChild(self._print(numer)) x.appendChild(self._print(denom)) return x coeff, terms = expr.as_coeff_mul() if coeff is S.One and len(terms) == 1: # XXX since the negative coefficient has been handled, I don't # think a coeff of 1 can remain return self._print(terms[0]) if self.order != 'old': terms = Mul._from_args(terms).as_ordered_factors() x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('times')) if coeff != 1: x.appendChild(self._print(coeff)) for term in terms: x.appendChild(self._print(term)) return x def _print_Add(self, expr, order=None): args = self._as_ordered_terms(expr, order=order) lastProcessed = self._print(args[0]) plusNodes = [] for arg in args[1:]: if _coeff_isneg(arg): # use minus x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('minus')) x.appendChild(lastProcessed) x.appendChild(self._print(-arg)) # invert expression since this is now minused lastProcessed = x if arg == args[-1]: plusNodes.append(lastProcessed) else: plusNodes.append(lastProcessed) lastProcessed = self._print(arg) if arg == args[-1]: plusNodes.append(self._print(arg)) if len(plusNodes) == 1: return lastProcessed x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('plus')) while plusNodes: x.appendChild(plusNodes.pop(0)) return x def _print_MatrixBase(self, m): x = self.dom.createElement('matrix') for i in range(m.rows): x_r = self.dom.createElement('matrixrow') for j in range(m.cols): x_r.appendChild(self._print(m[i, j])) x.appendChild(x_r) return x def _print_Rational(self, e): if e.q == 1: # don't divide x = self.dom.createElement('cn') x.appendChild(self.dom.createTextNode(str(e.p))) return x x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('divide')) # numerator xnum = self.dom.createElement('cn') xnum.appendChild(self.dom.createTextNode(str(e.p))) # denominator xdenom = self.dom.createElement('cn') xdenom.appendChild(self.dom.createTextNode(str(e.q))) x.appendChild(xnum) x.appendChild(xdenom) return x def _print_Limit(self, e): x = self.dom.createElement('apply') x.appendChild(self.dom.createElement(self.mathml_tag(e))) x_1 = self.dom.createElement('bvar') x_2 = self.dom.createElement('lowlimit') x_1.appendChild(self._print(e.args[1])) x_2.appendChild(self._print(e.args[2])) x.appendChild(x_1) x.appendChild(x_2) x.appendChild(self._print(e.args[0])) return x def _print_ImaginaryUnit(self, e): return self.dom.createElement('imaginaryi') def _print_EulerGamma(self, e): return self.dom.createElement('eulergamma') def _print_GoldenRatio(self, e): """We use unicode #x3c6 for Greek letter phi as defined here http://www.w3.org/2003/entities/2007doc/isogrk1.html""" x = self.dom.createElement('cn') x.appendChild(self.dom.createTextNode(u"\N{GREEK SMALL LETTER PHI}")) return x def _print_Exp1(self, e): return self.dom.createElement('exponentiale') def _print_Pi(self, e): return self.dom.createElement('pi') def _print_Infinity(self, e): return self.dom.createElement('infinity') def _print_NaN(self, e): return self.dom.createElement('notanumber') def _print_EmptySet(self, e): return self.dom.createElement('emptyset') def _print_BooleanTrue(self, e): return self.dom.createElement('true') def _print_BooleanFalse(self, e): return self.dom.createElement('false') def _print_NegativeInfinity(self, e): x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('minus')) x.appendChild(self.dom.createElement('infinity')) return x def _print_Integral(self, e): def lime_recur(limits): x = self.dom.createElement('apply') x.appendChild(self.dom.createElement(self.mathml_tag(e))) bvar_elem = self.dom.createElement('bvar') bvar_elem.appendChild(self._print(limits[0][0])) x.appendChild(bvar_elem) if len(limits[0]) == 3: low_elem = self.dom.createElement('lowlimit') low_elem.appendChild(self._print(limits[0][1])) x.appendChild(low_elem) up_elem = self.dom.createElement('uplimit') up_elem.appendChild(self._print(limits[0][2])) x.appendChild(up_elem) if len(limits[0]) == 2: up_elem = self.dom.createElement('uplimit') up_elem.appendChild(self._print(limits[0][1])) x.appendChild(up_elem) if len(limits) == 1: x.appendChild(self._print(e.function)) else: x.appendChild(lime_recur(limits[1:])) return x limits = list(e.limits) limits.reverse() return lime_recur(limits) def _print_Sum(self, e): # Printer can be shared because Sum and Integral have the # same internal representation. return self._print_Integral(e) def _print_Symbol(self, sym): ci = self.dom.createElement(self.mathml_tag(sym)) def join(items): if len(items) > 1: mrow = self.dom.createElement('mml:mrow') for i, item in enumerate(items): if i > 0: mo = self.dom.createElement('mml:mo') mo.appendChild(self.dom.createTextNode(" ")) mrow.appendChild(mo) mi = self.dom.createElement('mml:mi') mi.appendChild(self.dom.createTextNode(item)) mrow.appendChild(mi) return mrow else: mi = self.dom.createElement('mml:mi') mi.appendChild(self.dom.createTextNode(items[0])) return mi # translate name, supers and subs to unicode characters def translate(s): if s in greek_unicode: return greek_unicode.get(s) else: return s name, supers, subs = split_super_sub(sym.name) name = translate(name) supers = [translate(sup) for sup in supers] subs = [translate(sub) for sub in subs] mname = self.dom.createElement('mml:mi') mname.appendChild(self.dom.createTextNode(name)) if not supers: if not subs: ci.appendChild(self.dom.createTextNode(name)) else: msub = self.dom.createElement('mml:msub') msub.appendChild(mname) msub.appendChild(join(subs)) ci.appendChild(msub) else: if not subs: msup = self.dom.createElement('mml:msup') msup.appendChild(mname) msup.appendChild(join(supers)) ci.appendChild(msup) else: msubsup = self.dom.createElement('mml:msubsup') msubsup.appendChild(mname) msubsup.appendChild(join(subs)) msubsup.appendChild(join(supers)) ci.appendChild(msubsup) return ci _print_MatrixSymbol = _print_Symbol _print_RandomSymbol = _print_Symbol def _print_Pow(self, e): # Here we use root instead of power if the exponent is the reciprocal # of an integer if (self._settings['root_notation'] and e.exp.is_Rational and e.exp.p == 1): x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('root')) if e.exp.q != 2: xmldeg = self.dom.createElement('degree') xmlci = self.dom.createElement('ci') xmlci.appendChild(self.dom.createTextNode(str(e.exp.q))) xmldeg.appendChild(xmlci) x.appendChild(xmldeg) x.appendChild(self._print(e.base)) return x x = self.dom.createElement('apply') x_1 = self.dom.createElement(self.mathml_tag(e)) x.appendChild(x_1) x.appendChild(self._print(e.base)) x.appendChild(self._print(e.exp)) return x def _print_Number(self, e): x = self.dom.createElement(self.mathml_tag(e)) x.appendChild(self.dom.createTextNode(str(e))) return x def _print_Derivative(self, e): x = self.dom.createElement('apply') diff_symbol = self.mathml_tag(e) if requires_partial(e): diff_symbol = 'partialdiff' x.appendChild(self.dom.createElement(diff_symbol)) x_1 = self.dom.createElement('bvar') for sym, times in reversed(e.variable_count): x_1.appendChild(self._print(sym)) if times > 1: degree = self.dom.createElement('degree') degree.appendChild(self._print(sympify(times))) x_1.appendChild(degree) x.appendChild(x_1) x.appendChild(self._print(e.expr)) return x def _print_Function(self, e): x = self.dom.createElement("apply") x.appendChild(self.dom.createElement(self.mathml_tag(e))) for arg in e.args: x.appendChild(self._print(arg)) return x def _print_Basic(self, e): x = self.dom.createElement(self.mathml_tag(e)) for arg in e.args: x.appendChild(self._print(arg)) return x def _print_AssocOp(self, e): x = self.dom.createElement('apply') x_1 = self.dom.createElement(self.mathml_tag(e)) x.appendChild(x_1) for arg in e.args: x.appendChild(self._print(arg)) return x def _print_Relational(self, e): x = self.dom.createElement('apply') x.appendChild(self.dom.createElement(self.mathml_tag(e))) x.appendChild(self._print(e.lhs)) x.appendChild(self._print(e.rhs)) return x def _print_list(self, seq): """MathML reference for the <list> element: http://www.w3.org/TR/MathML2/chapter4.html#contm.list""" dom_element = self.dom.createElement('list') for item in seq: dom_element.appendChild(self._print(item)) return dom_element def _print_int(self, p): dom_element = self.dom.createElement(self.mathml_tag(p)) dom_element.appendChild(self.dom.createTextNode(str(p))) return dom_element _print_Implies = _print_AssocOp _print_Not = _print_AssocOp _print_Xor = _print_AssocOp class MathMLPresentationPrinter(MathMLPrinterBase): """Prints an expression to the Presentation MathML markup language. References: https://www.w3.org/TR/MathML2/chapter3.html """ printmethod = "_mathml_presentation" def mathml_tag(self, e): """Returns the MathML tag for an expression.""" translate = { 'Number': 'mn', 'Limit': '→', 'Derivative': '&dd;', 'int': 'mn', 'Symbol': 'mi', 'Integral': '∫', 'Sum': '∑', 'sin': 'sin', 'cos': 'cos', 'tan': 'tan', 'cot': 'cot', 'asin': 'arcsin', 'asinh': 'arcsinh', 'acos': 'arccos', 'acosh': 'arccosh', 'atan': 'arctan', 'atanh': 'arctanh', 'acot': 'arccot', 'atan2': 'arctan', 'Equality': '=', 'Unequality': '≠', 'GreaterThan': '≥', 'LessThan': '≤', 'StrictGreaterThan': '>', 'StrictLessThan': '<', 'lerchphi': 'Φ', 'zeta': 'ζ', 'dirichlet_eta': 'η', 'elliptic_k': 'Κ', 'lowergamma': 'γ', 'uppergamma': 'Γ', 'gamma': 'Γ', 'totient': 'ϕ', 'reduced_totient': 'λ', 'primenu': 'ν', 'primeomega': 'Ω', 'fresnels': 'S', 'fresnelc': 'C', 'LambertW': 'W', 'Heaviside': 'Θ', 'BooleanTrue': 'True', 'BooleanFalse': 'False', 'NoneType': 'None', 'mathieus': 'S', 'mathieuc': 'C', 'mathieusprime': 'S′', 'mathieucprime': 'C′', } def mul_symbol_selection(): if (self._settings["mul_symbol"] is None or self._settings["mul_symbol"] == 'None'): return '⁢' elif self._settings["mul_symbol"] == 'times': return '×' elif self._settings["mul_symbol"] == 'dot': return '·' elif self._settings["mul_symbol"] == 'ldot': return '․' elif not isinstance(self._settings["mul_symbol"], string_types): raise TypeError else: return self._settings["mul_symbol"] for cls in e.__class__.__mro__: n = cls.__name__ if n in translate: return translate[n] # Not found in the MRO set if e.__class__.__name__ == "Mul": return mul_symbol_selection() n = e.__class__.__name__ return n.lower() def parenthesize(self, item, level, strict=False): prec_val = precedence_traditional(item) if (prec_val < level) or ((not strict) and prec_val <= level): brac = self.dom.createElement('mfenced') brac.appendChild(self._print(item)) return brac else: return self._print(item) def _print_Mul(self, expr): def multiply(expr, mrow): from sympy.simplify import fraction numer, denom = fraction(expr) if denom is not S.One: frac = self.dom.createElement('mfrac') if self._settings["fold_short_frac"] and len(str(expr)) < 7: frac.setAttribute('bevelled', 'true') xnum = self._print(numer) xden = self._print(denom) frac.appendChild(xnum) frac.appendChild(xden) mrow.appendChild(frac) return mrow coeff, terms = expr.as_coeff_mul() if coeff is S.One and len(terms) == 1: mrow.appendChild(self._print(terms[0])) return mrow if self.order != 'old': terms = Mul._from_args(terms).as_ordered_factors() if coeff != 1: x = self._print(coeff) y = self.dom.createElement('mo') y.appendChild(self.dom.createTextNode(self.mathml_tag(expr))) mrow.appendChild(x) mrow.appendChild(y) for term in terms: mrow.appendChild(self.parenthesize(term, PRECEDENCE['Mul'])) if not term == terms[-1]: y = self.dom.createElement('mo') y.appendChild(self.dom.createTextNode(self.mathml_tag(expr))) mrow.appendChild(y) return mrow mrow = self.dom.createElement('mrow') if _coeff_isneg(expr): x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode('-')) mrow.appendChild(x) mrow = multiply(-expr, mrow) else: mrow = multiply(expr, mrow) return mrow def _print_Add(self, expr, order=None): mrow = self.dom.createElement('mrow') args = self._as_ordered_terms(expr, order=order) mrow.appendChild(self._print(args[0])) for arg in args[1:]: if _coeff_isneg(arg): # use minus x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode('-')) y = self._print(-arg) # invert expression since this is now minused else: x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode('+')) y = self._print(arg) mrow.appendChild(x) mrow.appendChild(y) return mrow def _print_MatrixBase(self, m): table = self.dom.createElement('mtable') for i in range(m.rows): x = self.dom.createElement('mtr') for j in range(m.cols): y = self.dom.createElement('mtd') y.appendChild(self._print(m[i, j])) x.appendChild(y) table.appendChild(x) if self._settings["mat_delim"] == '': return table brac = self.dom.createElement('mfenced') if self._settings["mat_delim"] == "[": brac.setAttribute('close', ']') brac.setAttribute('open', '[') brac.appendChild(table) return brac def _get_printed_Rational(self, e, folded=None): if e.p < 0: p = -e.p else: p = e.p x = self.dom.createElement('mfrac') if folded or self._settings["fold_short_frac"]: x.setAttribute('bevelled', 'true') x.appendChild(self._print(p)) x.appendChild(self._print(e.q)) if e.p < 0: mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('-')) mrow.appendChild(mo) mrow.appendChild(x) return mrow else: return x def _print_Rational(self, e): if e.q == 1: # don't divide return self._print(e.p) return self._get_printed_Rational(e, self._settings["fold_short_frac"]) def _print_Limit(self, e): mrow = self.dom.createElement('mrow') munder = self.dom.createElement('munder') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode('lim')) x = self.dom.createElement('mrow') x_1 = self._print(e.args[1]) arrow = self.dom.createElement('mo') arrow.appendChild(self.dom.createTextNode(self.mathml_tag(e))) x_2 = self._print(e.args[2]) x.appendChild(x_1) x.appendChild(arrow) x.appendChild(x_2) munder.appendChild(mi) munder.appendChild(x) mrow.appendChild(munder) mrow.appendChild(self._print(e.args[0])) return mrow def _print_ImaginaryUnit(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('&ImaginaryI;')) return x def _print_GoldenRatio(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('Φ')) return x def _print_Exp1(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('&ExponentialE;')) return x def _print_Pi(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('π')) return x def _print_Infinity(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('∞')) return x def _print_NegativeInfinity(self, e): mrow = self.dom.createElement('mrow') y = self.dom.createElement('mo') y.appendChild(self.dom.createTextNode('-')) x = self._print_Infinity(e) mrow.appendChild(y) mrow.appendChild(x) return mrow def _print_HBar(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('ℏ')) return x def _print_EulerGamma(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('γ')) return x def _print_TribonacciConstant(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('TribonacciConstant')) return x def _print_Dagger(self, e): msup = self.dom.createElement('msup') msup.appendChild(self._print(e.args[0])) msup.appendChild(self.dom.createTextNode('†')) return msup def _print_Contains(self, e): mrow = self.dom.createElement('mrow') mrow.appendChild(self._print(e.args[0])) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∈')) mrow.appendChild(mo) mrow.appendChild(self._print(e.args[1])) return mrow def _print_HilbertSpace(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('ℋ')) return x def _print_ComplexSpace(self, e): msup = self.dom.createElement('msup') msup.appendChild(self.dom.createTextNode('𝒞')) msup.appendChild(self._print(e.args[0])) return msup def _print_FockSpace(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('ℱ')) return x def _print_Integral(self, expr): intsymbols = {1: "∫", 2: "∬", 3: "∭"} mrow = self.dom.createElement('mrow') if len(expr.limits) <= 3 and all(len(lim) == 1 for lim in expr.limits): # Only up to three-integral signs exists mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode(intsymbols[len(expr.limits)])) mrow.appendChild(mo) else: # Either more than three or limits provided for lim in reversed(expr.limits): mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode(intsymbols[1])) if len(lim) == 1: mrow.appendChild(mo) if len(lim) == 2: msup = self.dom.createElement('msup') msup.appendChild(mo) msup.appendChild(self._print(lim[1])) mrow.appendChild(msup) if len(lim) == 3: msubsup = self.dom.createElement('msubsup') msubsup.appendChild(mo) msubsup.appendChild(self._print(lim[1])) msubsup.appendChild(self._print(lim[2])) mrow.appendChild(msubsup) # print function mrow.appendChild(self.parenthesize(expr.function, PRECEDENCE["Mul"], strict=True)) # print integration variables for lim in reversed(expr.limits): d = self.dom.createElement('mo') d.appendChild(self.dom.createTextNode('&dd;')) mrow.appendChild(d) mrow.appendChild(self._print(lim[0])) return mrow def _print_Sum(self, e): limits = list(e.limits) subsup = self.dom.createElement('munderover') low_elem = self._print(limits[0][1]) up_elem = self._print(limits[0][2]) summand = self.dom.createElement('mo') summand.appendChild(self.dom.createTextNode(self.mathml_tag(e))) low = self.dom.createElement('mrow') var = self._print(limits[0][0]) equal = self.dom.createElement('mo') equal.appendChild(self.dom.createTextNode('=')) low.appendChild(var) low.appendChild(equal) low.appendChild(low_elem) subsup.appendChild(summand) subsup.appendChild(low) subsup.appendChild(up_elem) mrow = self.dom.createElement('mrow') mrow.appendChild(subsup) if len(str(e.function)) == 1: mrow.appendChild(self._print(e.function)) else: fence = self.dom.createElement('mfenced') fence.appendChild(self._print(e.function)) mrow.appendChild(fence) return mrow def _print_Symbol(self, sym, style='plain'): def join(items): if len(items) > 1: mrow = self.dom.createElement('mrow') for i, item in enumerate(items): if i > 0: mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode(" ")) mrow.appendChild(mo) mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(item)) mrow.appendChild(mi) return mrow else: mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(items[0])) return mi # translate name, supers and subs to unicode characters def translate(s): if s in greek_unicode: return greek_unicode.get(s) else: return s name, supers, subs = split_super_sub(sym.name) name = translate(name) supers = [translate(sup) for sup in supers] subs = [translate(sub) for sub in subs] mname = self.dom.createElement('mi') mname.appendChild(self.dom.createTextNode(name)) if len(supers) == 0: if len(subs) == 0: x = mname else: x = self.dom.createElement('msub') x.appendChild(mname) x.appendChild(join(subs)) else: if len(subs) == 0: x = self.dom.createElement('msup') x.appendChild(mname) x.appendChild(join(supers)) else: x = self.dom.createElement('msubsup') x.appendChild(mname) x.appendChild(join(subs)) x.appendChild(join(supers)) # Set bold font? if style == 'bold': x.setAttribute('mathvariant', 'bold') return x def _print_MatrixSymbol(self, sym): return self._print_Symbol(sym, style=self._settings['mat_symbol_style']) _print_RandomSymbol = _print_Symbol def _print_conjugate(self, expr): enc = self.dom.createElement('menclose') enc.setAttribute('notation', 'top') enc.appendChild(self._print(expr.args[0])) return enc def _print_operator_after(self, op, expr): row = self.dom.createElement('mrow') row.appendChild(self.parenthesize(expr, PRECEDENCE["Func"])) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode(op)) row.appendChild(mo) return row def _print_factorial(self, expr): return self._print_operator_after('!', expr.args[0]) def _print_factorial2(self, expr): return self._print_operator_after('!!', expr.args[0]) def _print_binomial(self, expr): brac = self.dom.createElement('mfenced') frac = self.dom.createElement('mfrac') frac.setAttribute('linethickness', '0') frac.appendChild(self._print(expr.args[0])) frac.appendChild(self._print(expr.args[1])) brac.appendChild(frac) return brac def _print_Pow(self, e): # Here we use root instead of power if the exponent is the # reciprocal of an integer if (e.exp.is_Rational and abs(e.exp.p) == 1 and e.exp.q != 1 and self._settings['root_notation']): if e.exp.q == 2: x = self.dom.createElement('msqrt') x.appendChild(self._print(e.base)) if e.exp.q != 2: x = self.dom.createElement('mroot') x.appendChild(self._print(e.base)) x.appendChild(self._print(e.exp.q)) if e.exp.p == -1: frac = self.dom.createElement('mfrac') frac.appendChild(self._print(1)) frac.appendChild(x) return frac else: return x if e.exp.is_Rational and e.exp.q != 1: if e.exp.is_negative: top = self.dom.createElement('mfrac') top.appendChild(self._print(1)) x = self.dom.createElement('msup') x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow'])) x.appendChild(self._get_printed_Rational(-e.exp, self._settings['fold_frac_powers'])) top.appendChild(x) return top else: x = self.dom.createElement('msup') x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow'])) x.appendChild(self._get_printed_Rational(e.exp, self._settings['fold_frac_powers'])) return x if e.exp.is_negative: top = self.dom.createElement('mfrac') top.appendChild(self._print(1)) if e.exp == -1: top.appendChild(self._print(e.base)) else: x = self.dom.createElement('msup') x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow'])) x.appendChild(self._print(-e.exp)) top.appendChild(x) return top x = self.dom.createElement('msup') x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow'])) x.appendChild(self._print(e.exp)) return x def _print_Number(self, e): x = self.dom.createElement(self.mathml_tag(e)) x.appendChild(self.dom.createTextNode(str(e))) return x def _print_AccumulationBounds(self, i): brac = self.dom.createElement('mfenced') brac.setAttribute('close', u'\u27e9') brac.setAttribute('open', u'\u27e8') brac.appendChild(self._print(i.min)) brac.appendChild(self._print(i.max)) return brac def _print_Derivative(self, e): if requires_partial(e): d = '∂' else: d = self.mathml_tag(e) # Determine denominator m = self.dom.createElement('mrow') dim = 0 # Total diff dimension, for numerator for sym, num in reversed(e.variable_count): dim += num if num >= 2: x = self.dom.createElement('msup') xx = self.dom.createElement('mo') xx.appendChild(self.dom.createTextNode(d)) x.appendChild(xx) x.appendChild(self._print(num)) else: x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode(d)) m.appendChild(x) y = self._print(sym) m.appendChild(y) mnum = self.dom.createElement('mrow') if dim >= 2: x = self.dom.createElement('msup') xx = self.dom.createElement('mo') xx.appendChild(self.dom.createTextNode(d)) x.appendChild(xx) x.appendChild(self._print(dim)) else: x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode(d)) mnum.appendChild(x) mrow = self.dom.createElement('mrow') frac = self.dom.createElement('mfrac') frac.appendChild(mnum) frac.appendChild(m) mrow.appendChild(frac) # Print function mrow.appendChild(self._print(e.expr)) return mrow def _print_Function(self, e): mrow = self.dom.createElement('mrow') x = self.dom.createElement('mi') if self.mathml_tag(e) == 'log' and self._settings["ln_notation"]: x.appendChild(self.dom.createTextNode('ln')) else: x.appendChild(self.dom.createTextNode(self.mathml_tag(e))) y = self.dom.createElement('mfenced') for arg in e.args: y.appendChild(self._print(arg)) mrow.appendChild(x) mrow.appendChild(y) return mrow def _print_Float(self, expr): # Based off of that in StrPrinter dps = prec_to_dps(expr._prec) str_real = mlib.to_str(expr._mpf_, dps, strip_zeros=True) # Must always have a mul symbol (as 2.5 10^{20} just looks odd) # thus we use the number separator separator = self._settings['mul_symbol_mathml_numbers'] mrow = self.dom.createElement('mrow') if 'e' in str_real: (mant, exp) = str_real.split('e') if exp[0] == '+': exp = exp[1:] mn = self.dom.createElement('mn') mn.appendChild(self.dom.createTextNode(mant)) mrow.appendChild(mn) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode(separator)) mrow.appendChild(mo) msup = self.dom.createElement('msup') mn = self.dom.createElement('mn') mn.appendChild(self.dom.createTextNode("10")) msup.appendChild(mn) mn = self.dom.createElement('mn') mn.appendChild(self.dom.createTextNode(exp)) msup.appendChild(mn) mrow.appendChild(msup) return mrow elif str_real == "+inf": return self._print_Infinity(None) elif str_real == "-inf": return self._print_NegativeInfinity(None) else: mn = self.dom.createElement('mn') mn.appendChild(self.dom.createTextNode(str_real)) return mn def _print_polylog(self, expr): mrow = self.dom.createElement('mrow') m = self.dom.createElement('msub') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode('Li')) m.appendChild(mi) m.appendChild(self._print(expr.args[0])) mrow.appendChild(m) brac = self.dom.createElement('mfenced') brac.appendChild(self._print(expr.args[1])) mrow.appendChild(brac) return mrow def _print_Basic(self, e): mrow = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(self.mathml_tag(e))) mrow.appendChild(mi) brac = self.dom.createElement('mfenced') for arg in e.args: brac.appendChild(self._print(arg)) mrow.appendChild(brac) return mrow def _print_Tuple(self, e): mrow = self.dom.createElement('mrow') x = self.dom.createElement('mfenced') for arg in e.args: x.appendChild(self._print(arg)) mrow.appendChild(x) return mrow def _print_Interval(self, i): mrow = self.dom.createElement('mrow') brac = self.dom.createElement('mfenced') if i.start == i.end: # Most often, this type of Interval is converted to a FiniteSet brac.setAttribute('close', '}') brac.setAttribute('open', '{') brac.appendChild(self._print(i.start)) else: if i.right_open: brac.setAttribute('close', ')') else: brac.setAttribute('close', ']') if i.left_open: brac.setAttribute('open', '(') else: brac.setAttribute('open', '[') brac.appendChild(self._print(i.start)) brac.appendChild(self._print(i.end)) mrow.appendChild(brac) return mrow def _print_Abs(self, expr, exp=None): mrow = self.dom.createElement('mrow') x = self.dom.createElement('mfenced') x.setAttribute('close', '\|') x.setAttribute('open', '\|') x.appendChild(self._print(expr.args[0])) mrow.appendChild(x) return mrow _print_Determinant = _print_Abs def _print_re_im(self, c, expr): mrow = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.setAttribute('mathvariant', 'fraktur') mi.appendChild(self.dom.createTextNode(c)) mrow.appendChild(mi) brac = self.dom.createElement('mfenced') brac.appendChild(self._print(expr)) mrow.appendChild(brac) return mrow def _print_re(self, expr, exp=None): return self._print_re_im('R', expr.args[0]) def _print_im(self, expr, exp=None): return self._print_re_im('I', expr.args[0]) def _print_AssocOp(self, e): mrow = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(self.mathml_tag(e))) mrow.appendChild(mi) for arg in e.args: mrow.appendChild(self._print(arg)) return mrow def _print_SetOp(self, expr, symbol): mrow = self.dom.createElement('mrow') mrow.appendChild(self._print(expr.args[0])) for arg in expr.args[1:]: x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode(symbol)) y = self._print(arg) mrow.appendChild(x) mrow.appendChild(y) return mrow def _print_Union(self, expr): return self._print_SetOp(expr, '∪') def _print_Intersection(self, expr): return self._print_SetOp(expr, '∩') def _print_Complement(self, expr): return self._print_SetOp(expr, '∖') def _print_SymmetricDifference(self, expr): return self._print_SetOp(expr, '∆') def _print_FiniteSet(self, s): return self._print_set(s.args) def _print_set(self, s): items = sorted(s, key=default_sort_key) brac = self.dom.createElement('mfenced') brac.setAttribute('close', '}') brac.setAttribute('open', '{') for item in items: brac.appendChild(self._print(item)) return brac _print_frozenset = _print_set def _print_LogOp(self, args, symbol): mrow = self.dom.createElement('mrow') if args[0].is_Boolean and not args[0].is_Not: brac = self.dom.createElement('mfenced') brac.appendChild(self._print(args[0])) mrow.appendChild(brac) else: mrow.appendChild(self._print(args[0])) for arg in args[1:]: x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode(symbol)) if arg.is_Boolean and not arg.is_Not: y = self.dom.createElement('mfenced') y.appendChild(self._print(arg)) else: y = self._print(arg) mrow.appendChild(x) mrow.appendChild(y) return mrow def _print_BasisDependent(self, expr): from sympy.vector import Vector if expr == expr.zero: # Not clear if this is ever called return self._print(expr.zero) if isinstance(expr, Vector): items = expr.separate().items() else: items = [(0, expr)] mrow = self.dom.createElement('mrow') for system, vect in items: inneritems = list(vect.components.items()) inneritems.sort(key = lambda x:x[0].__str__()) for i, (k, v) in enumerate(inneritems): if v == 1: if i: # No + for first item mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('+')) mrow.appendChild(mo) mrow.appendChild(self._print(k)) elif v == -1: mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('-')) mrow.appendChild(mo) mrow.appendChild(self._print(k)) else: if i: # No + for first item mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('+')) mrow.appendChild(mo) mbrac = self.dom.createElement('mfenced') mbrac.appendChild(self._print(v)) mrow.appendChild(mbrac) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('⁢')) mrow.appendChild(mo) mrow.appendChild(self._print(k)) return mrow def _print_And(self, expr): args = sorted(expr.args, key=default_sort_key) return self._print_LogOp(args, '∧') def _print_Or(self, expr): args = sorted(expr.args, key=default_sort_key) return self._print_LogOp(args, '∨') def _print_Xor(self, expr): args = sorted(expr.args, key=default_sort_key) return self._print_LogOp(args, '⊻') def _print_Implies(self, expr): return self._print_LogOp(expr.args, '⇒') def _print_Equivalent(self, expr): args = sorted(expr.args, key=default_sort_key) return self._print_LogOp(args, '⇔') def _print_Not(self, e): mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('¬')) mrow.appendChild(mo) if (e.args[0].is_Boolean): x = self.dom.createElement('mfenced') x.appendChild(self._print(e.args[0])) else: x = self._print(e.args[0]) mrow.appendChild(x) return mrow def _print_bool(self, e): mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(self.mathml_tag(e))) return mi _print_BooleanTrue = _print_bool _print_BooleanFalse = _print_bool def _print_NoneType(self, e): mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(self.mathml_tag(e))) return mi def _print_Range(self, s): dots = u"\u2026" brac = self.dom.createElement('mfenced') brac.setAttribute('close', '}') brac.setAttribute('open', '{') if s.start.is_infinite: printset = dots, s[-1] - s.step, s[-1] elif s.stop.is_infinite: it = iter(s) printset = next(it), next(it), dots elif len(s) > 4: it = iter(s) printset = next(it), next(it), dots, s[-1] else: printset = tuple(s) for el in printset: if el == dots: mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(dots)) brac.appendChild(mi) else: brac.appendChild(self._print(el)) return brac def _hprint_variadic_function(self, expr): args = sorted(expr.args, key=default_sort_key) mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode((str(expr.func)).lower())) mrow.appendChild(mo) brac = self.dom.createElement('mfenced') for symbol in args: brac.appendChild(self._print(symbol)) mrow.appendChild(brac) return mrow _print_Min = _print_Max = _hprint_variadic_function def _print_exp(self, expr): msup = self.dom.createElement('msup') msup.appendChild(self._print_Exp1(None)) msup.appendChild(self._print(expr.args[0])) return msup def _print_Relational(self, e): mrow = self.dom.createElement('mrow') mrow.appendChild(self._print(e.lhs)) x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode(self.mathml_tag(e))) mrow.appendChild(x) mrow.appendChild(self._print(e.rhs)) return mrow def _print_int(self, p): dom_element = self.dom.createElement(self.mathml_tag(p)) dom_element.appendChild(self.dom.createTextNode(str(p))) return dom_element def _print_BaseScalar(self, e): msub = self.dom.createElement('msub') index, system = e._id mi = self.dom.createElement('mi') mi.setAttribute('mathvariant', 'bold') mi.appendChild(self.dom.createTextNode(system._variable_names[index])) msub.appendChild(mi) mi = self.dom.createElement('mi') mi.setAttribute('mathvariant', 'bold') mi.appendChild(self.dom.createTextNode(system._name)) msub.appendChild(mi) return msub def _print_BaseVector(self, e): msub = self.dom.createElement('msub') index, system = e._id mover = self.dom.createElement('mover') mi = self.dom.createElement('mi') mi.setAttribute('mathvariant', 'bold') mi.appendChild(self.dom.createTextNode(system._vector_names[index])) mover.appendChild(mi) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('^')) mover.appendChild(mo) msub.appendChild(mover) mi = self.dom.createElement('mi') mi.setAttribute('mathvariant', 'bold') mi.appendChild(self.dom.createTextNode(system._name)) msub.appendChild(mi) return msub def _print_VectorZero(self, e): mover = self.dom.createElement('mover') mi = self.dom.createElement('mi') mi.setAttribute('mathvariant', 'bold') mi.appendChild(self.dom.createTextNode("0")) mover.appendChild(mi) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('^')) mover.appendChild(mo) return mover def _print_Cross(self, expr): mrow = self.dom.createElement('mrow') vec1 = expr._expr1 vec2 = expr._expr2 mrow.appendChild(self.parenthesize(vec1, PRECEDENCE['Mul'])) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('×')) mrow.appendChild(mo) mrow.appendChild(self.parenthesize(vec2, PRECEDENCE['Mul'])) return mrow def _print_Curl(self, expr): mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∇')) mrow.appendChild(mo) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('×')) mrow.appendChild(mo) mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul'])) return mrow def _print_Divergence(self, expr): mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∇')) mrow.appendChild(mo) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('·')) mrow.appendChild(mo) mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul'])) return mrow def _print_Dot(self, expr): mrow = self.dom.createElement('mrow') vec1 = expr._expr1 vec2 = expr._expr2 mrow.appendChild(self.parenthesize(vec1, PRECEDENCE['Mul'])) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('·')) mrow.appendChild(mo) mrow.appendChild(self.parenthesize(vec2, PRECEDENCE['Mul'])) return mrow def _print_Gradient(self, expr): mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∇')) mrow.appendChild(mo) mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul'])) return mrow def _print_Laplacian(self, expr): mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∆')) mrow.appendChild(mo) mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul'])) return mrow def _print_Integers(self, e): x = self.dom.createElement('mi') x.setAttribute('mathvariant', 'normal') x.appendChild(self.dom.createTextNode('ℤ')) return x def _print_Complexes(self, e): x = self.dom.createElement('mi') x.setAttribute('mathvariant', 'normal') x.appendChild(self.dom.createTextNode('ℂ')) return x def _print_Reals(self, e): x = self.dom.createElement('mi') x.setAttribute('mathvariant', 'normal') x.appendChild(self.dom.createTextNode('ℝ')) return x def _print_Naturals(self, e): x = self.dom.createElement('mi') x.setAttribute('mathvariant', 'normal') x.appendChild(self.dom.createTextNode('ℕ')) return x def _print_Naturals0(self, e): sub = self.dom.createElement('msub') x = self.dom.createElement('mi') x.setAttribute('mathvariant', 'normal') x.appendChild(self.dom.createTextNode('ℕ')) sub.appendChild(x) sub.appendChild(self._print(S.Zero)) return sub def _print_SingularityFunction(self, expr): shift = expr.args[0] - expr.args[1] power = expr.args[2] sup = self.dom.createElement('msup') brac = self.dom.createElement('mfenced') brac.setAttribute('close', u'\u27e9') brac.setAttribute('open', u'\u27e8') brac.appendChild(self._print(shift)) sup.appendChild(brac) sup.appendChild(self._print(power)) return sup def _print_NaN(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('NaN')) return x def _print_number_function(self, e, name): # Print name_arg[0] for one argument or name_arg[0](arg[1]) # for more than one argument sub = self.dom.createElement('msub') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(name)) sub.appendChild(mi) sub.appendChild(self._print(e.args[0])) if len(e.args) == 1: return sub # TODO: copy-pasted from _print_Function: can we do better? mrow = self.dom.createElement('mrow') y = self.dom.createElement('mfenced') for arg in e.args[1:]: y.appendChild(self._print(arg)) mrow.appendChild(sub) mrow.appendChild(y) return mrow def _print_bernoulli(self, e): return self._print_number_function(e, 'B') _print_bell = _print_bernoulli def _print_catalan(self, e): return self._print_number_function(e, 'C') def _print_euler(self, e): return self._print_number_function(e, 'E') def _print_fibonacci(self, e): return self._print_number_function(e, 'F') def _print_lucas(self, e): return self._print_number_function(e, 'L') def _print_stieltjes(self, e): return self._print_number_function(e, 'γ') def _print_tribonacci(self, e): return self._print_number_function(e, 'T') def _print_ComplexInfinity(self, e): x = self.dom.createElement('mover') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∞')) x.appendChild(mo) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('~')) x.appendChild(mo) return x def _print_EmptySet(self, e): x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode('∅')) return x def _print_UniversalSet(self, e): x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode('𝕌')) return x def _print_Adjoint(self, expr): from sympy.matrices import MatrixSymbol mat = expr.arg sup = self.dom.createElement('msup') if not isinstance(mat, MatrixSymbol): brac = self.dom.createElement('mfenced') brac.appendChild(self._print(mat)) sup.appendChild(brac) else: sup.appendChild(self._print(mat)) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('†')) sup.appendChild(mo) return sup def _print_Transpose(self, expr): from sympy.matrices import MatrixSymbol mat = expr.arg sup = self.dom.createElement('msup') if not isinstance(mat, MatrixSymbol): brac = self.dom.createElement('mfenced') brac.appendChild(self._print(mat)) sup.appendChild(brac) else: sup.appendChild(self._print(mat)) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('T')) sup.appendChild(mo) return sup def _print_Inverse(self, expr): from sympy.matrices import MatrixSymbol mat = expr.arg sup = self.dom.createElement('msup') if not isinstance(mat, MatrixSymbol): brac = self.dom.createElement('mfenced') brac.appendChild(self._print(mat)) sup.appendChild(brac) else: sup.appendChild(self._print(mat)) sup.appendChild(self._print(-1)) return sup def _print_MatMul(self, expr): from sympy import MatMul x = self.dom.createElement('mrow') args = expr.args if isinstance(args[0], Mul): args = args[0].as_ordered_factors() + list(args[1:]) else: args = list(args) if isinstance(expr, MatMul) and _coeff_isneg(expr): if args[0] == -1: args = args[1:] else: args[0] = -args[0] mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('-')) x.appendChild(mo) for arg in args[:-1]: x.appendChild(self.parenthesize(arg, precedence_traditional(expr), False)) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('⁢')) x.appendChild(mo) x.appendChild(self.parenthesize(args[-1], precedence_traditional(expr), False)) return x def _print_MatPow(self, expr): from sympy.matrices import MatrixSymbol base, exp = expr.base, expr.exp sup = self.dom.createElement('msup') if not isinstance(base, MatrixSymbol): brac = self.dom.createElement('mfenced') brac.appendChild(self._print(base)) sup.appendChild(brac) else: sup.appendChild(self._print(base)) sup.appendChild(self._print(exp)) return sup def _print_HadamardProduct(self, expr): x = self.dom.createElement('mrow') args = expr.args for arg in args[:-1]: x.appendChild( self.parenthesize(arg, precedence_traditional(expr), False)) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∘')) x.appendChild(mo) x.appendChild( self.parenthesize(args[-1], precedence_traditional(expr), False)) return x def _print_ZeroMatrix(self, Z): x = self.dom.createElement('mn') x.appendChild(self.dom.createTextNode('&#x1D7D8')) return x def _print_OneMatrix(self, Z): x = self.dom.createElement('mn') x.appendChild(self.dom.createTextNode('&#x1D7D9')) return x def _print_Identity(self, I): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('𝕀')) return x def _print_floor(self, e): mrow = self.dom.createElement('mrow') x = self.dom.createElement('mfenced') x.setAttribute('close', u'\u230B') x.setAttribute('open', u'\u230A') x.appendChild(self._print(e.args[0])) mrow.appendChild(x) return mrow def _print_ceiling(self, e): mrow = self.dom.createElement('mrow') x = self.dom.createElement('mfenced') x.setAttribute('close', u'\u2309') x.setAttribute('open', u'\u2308') x.appendChild(self._print(e.args[0])) mrow.appendChild(x) return mrow def _print_Lambda(self, e): x = self.dom.createElement('mfenced') mrow = self.dom.createElement('mrow') symbols = e.args[0] if len(symbols) == 1: symbols = self._print(symbols[0]) else: symbols = self._print(symbols) mrow.appendChild(symbols) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('↦')) mrow.appendChild(mo) mrow.appendChild(self._print(e.args[1])) x.appendChild(mrow) return x def _print_tuple(self, e): x = self.dom.createElement('mfenced') for i in e: x.appendChild(self._print(i)) return x def _print_IndexedBase(self, e): return self._print(e.label) def _print_Indexed(self, e): x = self.dom.createElement('msub') x.appendChild(self._print(e.base)) if len(e.indices) == 1: x.appendChild(self._print(e.indices[0])) return x x.appendChild(self._print(e.indices)) return x def _print_MatrixElement(self, e): x = self.dom.createElement('msub') x.appendChild(self.parenthesize(e.parent, PRECEDENCE["Atom"], strict = True)) brac = self.dom.createElement('mfenced') brac.setAttribute("close", "") brac.setAttribute("open", "") for i in e.indices: brac.appendChild(self._print(i)) x.appendChild(brac) return x def _print_elliptic_f(self, e): x = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode('𝖥')) x.appendChild(mi) y = self.dom.createElement('mfenced') y.setAttribute("separators", "\|") for i in e.args: y.appendChild(self._print(i)) x.appendChild(y) return x def _print_elliptic_e(self, e): x = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode('𝖤')) x.appendChild(mi) y = self.dom.createElement('mfenced') y.setAttribute("separators", "\|") for i in e.args: y.appendChild(self._print(i)) x.appendChild(y) return x def _print_elliptic_pi(self, e): x = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode('𝛱')) x.appendChild(mi) y = self.dom.createElement('mfenced') if len(e.args) == 2: y.setAttribute("separators", "\|") else: y.setAttribute("separators", ";\|") for i in e.args: y.appendChild(self._print(i)) x.appendChild(y) return x def _print_Ei(self, e): x = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode('Ei')) x.appendChild(mi) x.appendChild(self._print(e.args)) return x def _print_expint(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msub') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('E')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) x.appendChild(y) x.appendChild(self._print(e.args[1:])) return x def _print_jacobi(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msubsup') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('P')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) y.appendChild(self._print(e.args[1:3])) x.appendChild(y) x.appendChild(self._print(e.args[3:])) return x def _print_gegenbauer(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msubsup') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('C')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) y.appendChild(self._print(e.args[1:2])) x.appendChild(y) x.appendChild(self._print(e.args[2:])) return x def _print_chebyshevt(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msub') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('T')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) x.appendChild(y) x.appendChild(self._print(e.args[1:])) return x def _print_chebyshevu(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msub') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('U')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) x.appendChild(y) x.appendChild(self._print(e.args[1:])) return x def _print_legendre(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msub') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('P')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) x.appendChild(y) x.appendChild(self._print(e.args[1:])) return x def _print_assoc_legendre(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msubsup') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('P')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) y.appendChild(self._print(e.args[1:2])) x.appendChild(y) x.appendChild(self._print(e.args[2:])) return x def _print_laguerre(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msub') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('L')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) x.appendChild(y) x.appendChild(self._print(e.args[1:])) return x def _print_assoc_laguerre(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msubsup') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('L')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) y.appendChild(self._print(e.args[1:2])) x.appendChild(y) x.appendChild(self._print(e.args[2:])) return x def _print_hermite(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msub') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('H')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) x.appendChild(y) x.appendChild(self._print(e.args[1:])) return x def mathml(expr, printer='content', settings): """Returns the MathML representation of expr. If printer is presentation then prints Presentation MathML else prints content MathML. """ if printer == 'presentation': return MathMLPresentationPrinter(settings).doprint(expr) else: return MathMLContentPrinter(settings).doprint(expr) def print_mathml(expr, printer='content', settings): """ Prints a pretty representation of the MathML code for expr. If printer is presentation then prints Presentation MathML else prints content MathML. Examples ======== >>> ## >>> from sympy.printing.mathml import print_mathml >>> from sympy.abc import x >>> print_mathml(x+1) #doctest: +NORMALIZE_WHITESPACE <apply> <plus/> <ci>x</ci> <cn>1</cn> </apply> >>> print_mathml(x+1, printer='presentation') <mrow> <mi>x</mi> <mo>+</mo> <mn>1</mn> </mrow> """ if printer == 'presentation': s = MathMLPresentationPrinter(settings) else: s = MathMLContentPrinter(settings) xml = s._print(sympify(expr)) s.apply_patch() pretty_xml = xml.toprettyxml() s.restore_patch() print(pretty_xml) # For backward compatibility MathMLPrinter = MathMLContentPrinter
4852efe07b6e3186b5e5905f8ed06864b107b3ec6e1a72f4212c059e65ecfc90	""" R code printer The RCodePrinter converts single sympy expressions into single R expressions, using the functions defined in math.h where possible. """ from __future__ import print_function, division from sympy.codegen.ast import Assignment from sympy.core.compatibility import string_types, range from sympy.printing.codeprinter import CodePrinter from sympy.printing.precedence import precedence, PRECEDENCE from sympy.sets.fancysets import Range # dictionary mapping sympy function to (argument_conditions, C_function). # Used in RCodePrinter._print_Function(self) known_functions = { #"Abs": [(lambda x: not x.is_integer, "fabs")], "Abs": "abs", "sin": "sin", "cos": "cos", "tan": "tan", "asin": "asin", "acos": "acos", "atan": "atan", "atan2": "atan2", "exp": "exp", "log": "log", "erf": "erf", "sinh": "sinh", "cosh": "cosh", "tanh": "tanh", "asinh": "asinh", "acosh": "acosh", "atanh": "atanh", "floor": "floor", "ceiling": "ceiling", "sign": "sign", "Max": "max", "Min": "min", "factorial": "factorial", "gamma": "gamma", "digamma": "digamma", "trigamma": "trigamma", "beta": "beta", } # These are the core reserved words in the R language. Taken from: # https://cran.r-project.org/doc/manuals/r-release/R-lang.html#Reserved-words reserved_words = ['if', 'else', 'repeat', 'while', 'function', 'for', 'in', 'next', 'break', 'TRUE', 'FALSE', 'NULL', 'Inf', 'NaN', 'NA', 'NA_integer_', 'NA_real_', 'NA_complex_', 'NA_character_', 'volatile'] class RCodePrinter(CodePrinter): """A printer to convert python expressions to strings of R code""" printmethod = "_rcode" language = "R" _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 15, 'user_functions': {}, 'human': True, 'contract': True, 'dereference': set(), 'error_on_reserved': False, 'reserved_word_suffix': '_', } _operators = { 'and': '&', 'or': '\|', 'not': '!', } _relationals = { } def __init__(self, settings={}): CodePrinter.__init__(self, settings) self.known_functions = dict(known_functions) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) self._dereference = set(settings.get('dereference', [])) self.reserved_words = set(reserved_words) def _rate_index_position(self, p): return p5 def _get_statement(self, codestring): return "%s;" % codestring def _get_comment(self, text): return "// {0}".format(text) def _declare_number_const(self, name, value): return "{0} = {1};".format(name, value) def _format_code(self, lines): return self.indent_code(lines) def _traverse_matrix_indices(self, mat): rows, cols = mat.shape return ((i, j) for i in range(rows) for j in range(cols)) def _get_loop_opening_ending(self, indices): """Returns a tuple (open_lines, close_lines) containing lists of codelines """ open_lines = [] close_lines = [] loopstart = "for (%(var)s in %(start)s:%(end)s){" for i in indices: # R arrays start at 1 and end at dimension open_lines.append(loopstart % { 'var': self._print(i.label), 'start': self._print(i.lower+1), 'end': self._print(i.upper + 1)}) close_lines.append("}") return open_lines, close_lines def _print_Pow(self, expr): if "Pow" in self.known_functions: return self._print_Function(expr) PREC = precedence(expr) if expr.exp == -1: return '1.0/%s' % (self.parenthesize(expr.base, PREC)) elif expr.exp == 0.5: return 'sqrt(%s)' % self._print(expr.base) else: return '%s^%s' % (self.parenthesize(expr.base, PREC), self.parenthesize(expr.exp, PREC)) def _print_Rational(self, expr): p, q = int(expr.p), int(expr.q) return '%d.0/%d.0' % (p, q) def _print_Indexed(self, expr): inds = [ self._print(i) for i in expr.indices ] return "%s[%s]" % (self._print(expr.base.label), ", ".join(inds)) def _print_Idx(self, expr): return self._print(expr.label) def _print_Exp1(self, expr): return "exp(1)" def _print_Pi(self, expr): return 'pi' def _print_Infinity(self, expr): return 'Inf' def _print_NegativeInfinity(self, expr): return '-Inf' def _print_Assignment(self, expr): from sympy.matrices.expressions.matexpr import MatrixSymbol from sympy.tensor.indexed import IndexedBase lhs = expr.lhs rhs = expr.rhs # We special case assignments that take multiple lines #if isinstance(expr.rhs, Piecewise): # from sympy.functions.elementary.piecewise import Piecewise # # Here we modify Piecewise so each expression is now # # an Assignment, and then continue on the print. # expressions = [] # conditions = [] # for (e, c) in rhs.args: # expressions.append(Assignment(lhs, e)) # conditions.append(c) # temp = Piecewise(zip(expressions, conditions)) # return self._print(temp) #elif isinstance(lhs, MatrixSymbol): if isinstance(lhs, MatrixSymbol): # Here we form an Assignment for each element in the array, # printing each one. lines = [] for (i, j) in self._traverse_matrix_indices(lhs): temp = Assignment(lhs[i, j], rhs[i, j]) code0 = self._print(temp) lines.append(code0) return "\n".join(lines) elif self._settings["contract"] and (lhs.has(IndexedBase) or rhs.has(IndexedBase)): # Here we check if there is looping to be done, and if so # print the required loops. return self._doprint_loops(rhs, lhs) else: lhs_code = self._print(lhs) rhs_code = self._print(rhs) return self._get_statement("%s = %s" % (lhs_code, rhs_code)) def _print_Piecewise(self, expr): # This method is called only for inline if constructs # Top level piecewise is handled in doprint() if expr.args[-1].cond == True: last_line = "%s" % self._print(expr.args[-1].expr) else: last_line = "ifelse(%s,%s,NA)" % (self._print(expr.args[-1].cond), self._print(expr.args[-1].expr)) code=last_line for e, c in reversed(expr.args[:-1]): code= "ifelse(%s,%s," % (self._print(c), self._print(e))+code+")" return(code) def _print_ITE(self, expr): from sympy.functions import Piecewise _piecewise = Piecewise((expr.args[1], expr.args[0]), (expr.args[2], True)) return self._print(_piecewise) def _print_MatrixElement(self, expr): return "{0}[{1}]".format(self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True), expr.j + expr.iexpr.parent.shape[1]) def _print_Symbol(self, expr): name = super(RCodePrinter, self)._print_Symbol(expr) if expr in self._dereference: return '({0})'.format(name) else: return name def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_sinc(self, expr): from sympy.functions.elementary.trigonometric import sin from sympy.core.relational import Ne from sympy.functions import Piecewise _piecewise = Piecewise( (sin(expr.args[0]) / expr.args[0], Ne(expr.args[0], 0)), (1, True)) return self._print(_piecewise) def _print_AugmentedAssignment(self, expr): lhs_code = self._print(expr.lhs) op = expr.op rhs_code = self._print(expr.rhs) return "{0} {1} {2};".format(lhs_code, op, rhs_code) def _print_For(self, expr): target = self._print(expr.target) if isinstance(expr.iterable, Range): start, stop, step = expr.iterable.args else: raise NotImplementedError("Only iterable currently supported is Range") body = self._print(expr.body) return ('for ({target} = {start}; {target} < {stop}; {target} += ' '{step}) {{\n{body}\n}}').format(target=target, start=start, stop=stop, step=step, body=body) def indent_code(self, code): """Accepts a string of code or a list of code lines""" if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_token = ('{', '(', '{\n', '(\n') dec_token = ('}', ')') code = [ line.lstrip(' \t') for line in code ] increase = [ int(any(map(line.endswith, inc_token))) for line in code ] decrease = [ int(any(map(line.startswith, dec_token))) for line in code ] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tablevel, line)) level += increase[n] return pretty def rcode(expr, assign_to=None, settings): """Converts an expr to a string of r code Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of line-wrapping, or for expressions that generate multi-line statements. precision : integer, optional The precision for numbers such as pi [default=15]. user_functions : dict, optional A dictionary where the keys are string representations of either ``FunctionClass`` or ``UndefinedFunction`` instances and the values are their desired R string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, rfunction_string)] or [(argument_test, rfunction_formater)]. See below for examples. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. Examples ======== >>> from sympy import rcode, symbols, Rational, sin, ceiling, Abs, Function >>> x, tau = symbols("x, tau") >>> rcode((2tau)*Rational(7, 2)) '8sqrt(2)tau^(7.0/2.0)' >>> rcode(sin(x), assign_to="s") 's = sin(x);' Simple custom printing can be defined for certain types by passing a dictionary of {"type" : "function"} to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. >>> custom_functions = { ... "ceiling": "CEIL", ... "Abs": [(lambda x: not x.is_integer, "fabs"), ... (lambda x: x.is_integer, "ABS")], ... "func": "f" ... } >>> func = Function('func') >>> rcode(func(Abs(x) + ceiling(x)), user_functions=custom_functions) 'f(fabs(x) + CEIL(x))' or if the R-function takes a subset of the original arguments: >>> rcode(2x + 3x, user_functions={'Pow': [ ... (lambda b, e: b == 2, lambda b, e: 'exp2(%s)' % e), ... (lambda b, e: b != 2, 'pow')]}) 'exp2(x) + pow(3, x)' ``Piecewise`` expressions are converted into conditionals. If an ``assign_to`` variable is provided an if statement is created, otherwise the ternary operator is used. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> expr = Piecewise((x + 1, x > 0), (x, True)) >>> print(rcode(expr, assign_to=tau)) tau = ifelse(x > 0,x + 1,x); Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> rcode(e.rhs, assign_to=e.lhs, contract=False) 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions must be provided to ``assign_to``. Note that any expression that can be generated normally can also exist inside a Matrix: >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([x2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) >>> A = MatrixSymbol('A', 3, 1) >>> print(rcode(mat, A)) A[0] = x^2; A[1] = ifelse(x > 0,x + 1,x); A[2] = sin(x); """ return RCodePrinter(settings).doprint(expr, assign_to) def print_rcode(expr, settings): """Prints R representation of the given expression.""" print(rcode(expr, *settings))
76a0077194427a676dd8a5a1e1b43b2446274f10a6b4ab5022b448380067d982	""" Octave (and Matlab) code printer The `OctaveCodePrinter` converts SymPy expressions into Octave expressions. It uses a subset of the Octave language for Matlab compatibility. A complete code generator, which uses `octave_code` extensively, can be found in `sympy.utilities.codegen`. The `codegen` module can be used to generate complete source code files. """ from __future__ import print_function, division from sympy.codegen.ast import Assignment from sympy.core import Mul, Pow, S, Rational from sympy.core.compatibility import string_types, range from sympy.core.mul import _keep_coeff from sympy.printing.codeprinter import CodePrinter from sympy.printing.precedence import precedence, PRECEDENCE from re import search # List of known functions. First, those that have the same name in # SymPy and Octave. This is almost certainly incomplete! known_fcns_src1 = ["sin", "cos", "tan", "cot", "sec", "csc", "asin", "acos", "acot", "atan", "atan2", "asec", "acsc", "sinh", "cosh", "tanh", "coth", "csch", "sech", "asinh", "acosh", "atanh", "acoth", "asech", "acsch", "erfc", "erfi", "erf", "erfinv", "erfcinv", "besseli", "besselj", "besselk", "bessely", "bernoulli", "beta", "euler", "exp", "factorial", "floor", "fresnelc", "fresnels", "gamma", "harmonic", "log", "polylog", "sign", "zeta", "legendre"] # These functions have different names ("Sympy": "Octave"), more # generally a mapping to (argument_conditions, octave_function). known_fcns_src2 = { "Abs": "abs", "arg": "angle", # arg/angle ok in Octave but only angle in Matlab "binomial": "bincoeff", "ceiling": "ceil", "chebyshevu": "chebyshevU", "chebyshevt": "chebyshevT", "Chi": "coshint", "Ci": "cosint", "conjugate": "conj", "DiracDelta": "dirac", "Heaviside": "heaviside", "im": "imag", "laguerre": "laguerreL", "LambertW": "lambertw", "li": "logint", "loggamma": "gammaln", "Max": "max", "Min": "min", "Mod": "mod", "polygamma": "psi", "re": "real", "RisingFactorial": "pochhammer", "Shi": "sinhint", "Si": "sinint", } class OctaveCodePrinter(CodePrinter): """ A printer to convert expressions to strings of Octave/Matlab code. """ printmethod = "_octave" language = "Octave" _operators = { 'and': '&', 'or': '\|', 'not': '~', } _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 17, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, 'contract': True, 'inline': True, } # Note: contract is for expressing tensors as loops (if True), or just # assignment (if False). FIXME: this should be looked a more carefully # for Octave. def __init__(self, settings={}): super(OctaveCodePrinter, self).__init__(settings) self.known_functions = dict(zip(known_fcns_src1, known_fcns_src1)) self.known_functions.update(dict(known_fcns_src2)) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) def _rate_index_position(self, p): return p5 def _get_statement(self, codestring): return "%s;" % codestring def _get_comment(self, text): return "% {0}".format(text) def _declare_number_const(self, name, value): return "{0} = {1};".format(name, value) def _format_code(self, lines): return self.indent_code(lines) def _traverse_matrix_indices(self, mat): # Octave uses Fortran order (column-major) rows, cols = mat.shape return ((i, j) for j in range(cols) for i in range(rows)) def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] for i in indices: # Octave arrays start at 1 and end at dimension var, start, stop = map(self._print, [i.label, i.lower + 1, i.upper + 1]) open_lines.append("for %s = %s:%s" % (var, start, stop)) close_lines.append("end") return open_lines, close_lines def _print_Mul(self, expr): # print complex numbers nicely in Octave if (expr.is_number and expr.is_imaginary and (S.ImaginaryUnitexpr).is_Integer): return "%si" % self._print(-S.ImaginaryUnitexpr) # cribbed from str.py prec = precedence(expr) c, e = expr.as_coeff_Mul() if c < 0: expr = _keep_coeff(-c, e) sign = "-" else: sign = "" a = [] # items in the numerator b = [] # items that are in the denominator (if any) pow_paren = [] # Will collect all pow with more than one base element and exp = -1 if self.order not in ('old', 'none'): args = expr.as_ordered_factors() else: # use make_args in case expr was something like -x -> x args = Mul.make_args(expr) # Gather args for numerator/denominator for item in args: if (item.is_commutative and item.is_Pow and item.exp.is_Rational and item.exp.is_negative): if item.exp != -1: b.append(Pow(item.base, -item.exp, evaluate=False)) else: if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160 pow_paren.append(item) b.append(Pow(item.base, -item.exp)) elif item.is_Rational and item is not S.Infinity: if item.p != 1: a.append(Rational(item.p)) if item.q != 1: b.append(Rational(item.q)) else: a.append(item) a = a or [S.One] a_str = [self.parenthesize(x, prec) for x in a] b_str = [self.parenthesize(x, prec) for x in b] # To parenthesize Pow with exp = -1 and having more than one Symbol for item in pow_paren: if item.base in b: b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)] # from here it differs from str.py to deal with "" and "." def multjoin(a, a_str): # here we probably are assuming the constants will come first r = a_str[0] for i in range(1, len(a)): mulsym = '' if a[i-1].is_number else '.' r = r + mulsym + a_str[i] return r if not b: return sign + multjoin(a, a_str) elif len(b) == 1: divsym = '/' if b[0].is_number else './' return sign + multjoin(a, a_str) + divsym + b_str[0] else: divsym = '/' if all([bi.is_number for bi in b]) else './' return (sign + multjoin(a, a_str) + divsym + "(%s)" % multjoin(b, b_str)) def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_Pow(self, expr): powsymbol = '^' if all([x.is_number for x in expr.args]) else '.^' PREC = precedence(expr) if expr.exp == S.Half: return "sqrt(%s)" % self._print(expr.base) if expr.is_commutative: if expr.exp == -S.Half: sym = '/' if expr.base.is_number else './' return "1" + sym + "sqrt(%s)" % self._print(expr.base) if expr.exp == -S.One: sym = '/' if expr.base.is_number else './' return "1" + sym + "%s" % self.parenthesize(expr.base, PREC) return '%s%s%s' % (self.parenthesize(expr.base, PREC), powsymbol, self.parenthesize(expr.exp, PREC)) def _print_MatPow(self, expr): PREC = precedence(expr) return '%s^%s' % (self.parenthesize(expr.base, PREC), self.parenthesize(expr.exp, PREC)) def _print_MatrixSolve(self, expr): PREC = precedence(expr) return "%s \\ %s" % (self.parenthesize(expr.matrix, PREC), self.parenthesize(expr.vector, PREC)) def _print_Pi(self, expr): return 'pi' def _print_ImaginaryUnit(self, expr): return "1i" def _print_Exp1(self, expr): return "exp(1)" def _print_GoldenRatio(self, expr): # FIXME: how to do better, e.g., for octave_code(2GoldenRatio)? #return self._print((1+sqrt(S(5)))/2) return "(1+sqrt(5))/2" def _print_Assignment(self, expr): from sympy.functions.elementary.piecewise import Piecewise from sympy.tensor.indexed import IndexedBase # Copied from codeprinter, but remove special MatrixSymbol treatment lhs = expr.lhs rhs = expr.rhs # We special case assignments that take multiple lines if not self._settings["inline"] and isinstance(expr.rhs, Piecewise): # Here we modify Piecewise so each expression is now # an Assignment, and then continue on the print. expressions = [] conditions = [] for (e, c) in rhs.args: expressions.append(Assignment(lhs, e)) conditions.append(c) temp = Piecewise(zip(expressions, conditions)) return self._print(temp) if self._settings["contract"] and (lhs.has(IndexedBase) or rhs.has(IndexedBase)): # Here we check if there is looping to be done, and if so # print the required loops. return self._doprint_loops(rhs, lhs) else: lhs_code = self._print(lhs) rhs_code = self._print(rhs) return self._get_statement("%s = %s" % (lhs_code, rhs_code)) def _print_Infinity(self, expr): return 'inf' def _print_NegativeInfinity(self, expr): return '-inf' def _print_NaN(self, expr): return 'NaN' def _print_list(self, expr): return '{' + ', '.join(self._print(a) for a in expr) + '}' _print_tuple = _print_list _print_Tuple = _print_list def _print_BooleanTrue(self, expr): return "true" def _print_BooleanFalse(self, expr): return "false" def _print_bool(self, expr): return str(expr).lower() # Could generate quadrature code for definite Integrals? #_print_Integral = _print_not_supported def _print_MatrixBase(self, A): # Handle zero dimensions: if (A.rows, A.cols) == (0, 0): return '[]' elif A.rows == 0 or A.cols == 0: return 'zeros(%s, %s)' % (A.rows, A.cols) elif (A.rows, A.cols) == (1, 1): # Octave does not distinguish between scalars and 1x1 matrices return self._print(A[0, 0]) return "[%s]" % "; ".join(" ".join([self._print(a) for a in A[r, :]]) for r in range(A.rows)) def _print_SparseMatrix(self, A): from sympy.matrices import Matrix L = A.col_list(); # make row vectors of the indices and entries I = Matrix([[k[0] + 1 for k in L]]) J = Matrix([[k[1] + 1 for k in L]]) AIJ = Matrix([[k[2] for k in L]]) return "sparse(%s, %s, %s, %s, %s)" % (self._print(I), self._print(J), self._print(AIJ), A.rows, A.cols) # FIXME: Str/CodePrinter could define each of these to call the _print # method from higher up the class hierarchy (see _print_NumberSymbol). # Then subclasses like us would not need to repeat all this. _print_Matrix = \ _print_DenseMatrix = \ _print_MutableDenseMatrix = \ _print_ImmutableMatrix = \ _print_ImmutableDenseMatrix = \ _print_MatrixBase _print_MutableSparseMatrix = \ _print_ImmutableSparseMatrix = \ _print_SparseMatrix def _print_MatrixElement(self, expr): return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) \ + '(%s, %s)' % (expr.i + 1, expr.j + 1) def _print_MatrixSlice(self, expr): def strslice(x, lim): l = x[0] + 1 h = x[1] step = x[2] lstr = self._print(l) hstr = 'end' if h == lim else self._print(h) if step == 1: if l == 1 and h == lim: return ':' if l == h: return lstr else: return lstr + ':' + hstr else: return ':'.join((lstr, self._print(step), hstr)) return (self._print(expr.parent) + '(' + strslice(expr.rowslice, expr.parent.shape[0]) + ', ' + strslice(expr.colslice, expr.parent.shape[1]) + ')') def _print_Indexed(self, expr): inds = [ self._print(i) for i in expr.indices ] return "%s(%s)" % (self._print(expr.base.label), ", ".join(inds)) def _print_Idx(self, expr): return self._print(expr.label) def _print_KroneckerDelta(self, expr): prec = PRECEDENCE["Pow"] return "double(%s == %s)" % tuple(self.parenthesize(x, prec) for x in expr.args) def _print_Identity(self, expr): shape = expr.shape if len(shape) == 2 and shape[0] == shape[1]: shape = [shape[0]] s = ", ".join(self._print(n) for n in shape) return "eye(" + s + ")" def _print_lowergamma(self, expr): # Octave implements regularized incomplete gamma function return "(gammainc({1}, {0}).gamma({0}))".format( self._print(expr.args[0]), self._print(expr.args[1])) def _print_uppergamma(self, expr): return "(gammainc({1}, {0}, 'upper').gamma({0}))".format( self._print(expr.args[0]), self._print(expr.args[1])) def _print_sinc(self, expr): #Note: Divide by pi because Octave implements normalized sinc function. return "sinc(%s)" % self._print(expr.args[0]/S.Pi) def _print_hankel1(self, expr): return "besselh(%s, 1, %s)" % (self._print(expr.order), self._print(expr.argument)) def _print_hankel2(self, expr): return "besselh(%s, 2, %s)" % (self._print(expr.order), self._print(expr.argument)) # Note: as of 2015, Octave doesn't have spherical Bessel functions def _print_jn(self, expr): from sympy.functions import sqrt, besselj x = expr.argument expr2 = sqrt(S.Pi/(2x))besselj(expr.order + S.Half, x) return self._print(expr2) def _print_yn(self, expr): from sympy.functions import sqrt, bessely x = expr.argument expr2 = sqrt(S.Pi/(2x))bessely(expr.order + S.Half, x) return self._print(expr2) def _print_airyai(self, expr): return "airy(0, %s)" % self._print(expr.args[0]) def _print_airyaiprime(self, expr): return "airy(1, %s)" % self._print(expr.args[0]) def _print_airybi(self, expr): return "airy(2, %s)" % self._print(expr.args[0]) def _print_airybiprime(self, expr): return "airy(3, %s)" % self._print(expr.args[0]) def _print_expint(self, expr): mu, x = expr.args if mu != 1: return self._print_not_supported(expr) return "expint(%s)" % self._print(x) def _one_or_two_reversed_args(self, expr): assert len(expr.args) <= 2 return '{name}({args})'.format( name=self.known_functions[expr.__class__.__name__], args=", ".join([self._print(x) for x in reversed(expr.args)]) ) _print_DiracDelta = _print_LambertW = _one_or_two_reversed_args def _nested_binary_math_func(self, expr): return '{name}({arg1}, {arg2})'.format( name=self.known_functions[expr.__class__.__name__], arg1=self._print(expr.args[0]), arg2=self._print(expr.func(expr.args[1:])) ) _print_Max = _print_Min = _nested_binary_math_func def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] if self._settings["inline"]: # Express each (cond, expr) pair in a nested Horner form: # (condition) .* (expr) + (not cond) .* (<others>) # Expressions that result in multiple statements won't work here. ecpairs = ["({0}).({1}) + (~({0})).(".format (self._print(c), self._print(e)) for e, c in expr.args[:-1]] elast = "%s" % self._print(expr.args[-1].expr) pw = " ...\n".join(ecpairs) + elast + ")"len(ecpairs) # Note: current need these outer brackets for 2pw. Would be # nicer to teach parenthesize() to do this for us when needed! return "(" + pw + ")" else: for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s)" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines.append("else") else: lines.append("elseif (%s)" % self._print(c)) code0 = self._print(e) lines.append(code0) if i == len(expr.args) - 1: lines.append("end") return "\n".join(lines) def _print_zeta(self, expr): if len(expr.args) == 1: return "zeta(%s)" % self._print(expr.args[0]) else: # Matlab two argument zeta is not equivalent to SymPy's return self._print_not_supported(expr) def indent_code(self, code): """Accepts a string of code or a list of code lines""" # code mostly copied from ccode if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_regex = ('^function ', '^if ', '^elseif ', '^else$', '^for ') dec_regex = ('^end$', '^elseif ', '^else$') # pre-strip left-space from the code code = [ line.lstrip(' \t') for line in code ] increase = [ int(any([search(re, line) for re in inc_regex])) for line in code ] decrease = [ int(any([search(re, line) for re in dec_regex])) for line in code ] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tablevel, line)) level += increase[n] return pretty def octave_code(expr, assign_to=None, settings): r"""Converts `expr` to a string of Octave (or Matlab) code. The string uses a subset of the Octave language for Matlab compatibility. Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This can be helpful for expressions that generate multi-line statements. precision : integer, optional The precision for numbers such as pi [default=16]. user_functions : dict, optional A dictionary where keys are ``FunctionClass`` instances and values are their string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. See below for examples. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. inline: bool, optional If True, we try to create single-statement code instead of multiple statements. [default=True]. Examples ======== >>> from sympy import octave_code, symbols, sin, pi >>> x = symbols('x') >>> octave_code(sin(x).series(x).removeO()) 'x.^5/120 - x.^3/6 + x' >>> from sympy import Rational, ceiling, Abs >>> x, y, tau = symbols("x, y, tau") >>> octave_code((2tau)*Rational(7, 2)) '8sqrt(2)tau.^(7/2)' Note that element-wise (Hadamard) operations are used by default between symbols. This is because its very common in Octave to write "vectorized" code. It is harmless if the values are scalars. >>> octave_code(sin(pixy), assign_to="s") 's = sin(pix.y);' If you need a matrix product "" or matrix power "^", you can specify the symbol as a ``MatrixSymbol``. >>> from sympy import Symbol, MatrixSymbol >>> n = Symbol('n', integer=True, positive=True) >>> A = MatrixSymbol('A', n, n) >>> octave_code(3piA*3) '(3pi)A^3' This class uses several rules to decide which symbol to use a product. Pure numbers use "", Symbols use "." and MatrixSymbols use "". A HadamardProduct can be used to specify componentwise multiplication "." of two MatrixSymbols. There is currently there is no easy way to specify scalar symbols, so sometimes the code might have some minor cosmetic issues. For example, suppose x and y are scalars and A is a Matrix, then while a human programmer might write "(x^2y)A^3", we generate: >>> octave_code(x2yA3) '(x.^2.y)A^3' Matrices are supported using Octave inline notation. When using ``assign_to`` with matrices, the name can be specified either as a string or as a ``MatrixSymbol``. The dimensions must align in the latter case. >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([[x2, sin(x), ceiling(x)]]) >>> octave_code(mat, assign_to='A') 'A = [x.^2 sin(x) ceil(x)];' ``Piecewise`` expressions are implemented with logical masking by default. Alternatively, you can pass "inline=False" to use if-else conditionals. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> pw = Piecewise((x + 1, x > 0), (x, True)) >>> octave_code(pw, assign_to=tau) 'tau = ((x > 0).(x + 1) + (~(x > 0)).(x));' Note that any expression that can be generated normally can also exist inside a Matrix: >>> mat = Matrix([[x2, pw, sin(x)]]) >>> octave_code(mat, assign_to='A') 'A = [x.^2 ((x > 0).(x + 1) + (~(x > 0)).(x)) sin(x)];' Custom printing can be defined for certain types by passing a dictionary of "type" : "function" to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e., [(argument_test, cfunction_string)]. This can be used to call a custom Octave function. >>> from sympy import Function >>> f = Function('f') >>> g = Function('g') >>> custom_functions = { ... "f": "existing_octave_fcn", ... "g": [(lambda x: x.is_Matrix, "my_mat_fcn"), ... (lambda x: not x.is_Matrix, "my_fcn")] ... } >>> mat = Matrix([[1, x]]) >>> octave_code(f(x) + g(x) + g(mat), user_functions=custom_functions) 'existing_octave_fcn(x) + my_fcn(x) + my_mat_fcn([1 x])' Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx, ccode >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e = Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> octave_code(e.rhs, assign_to=e.lhs, contract=False) 'Dy(i) = (y(i + 1) - y(i))./(t(i + 1) - t(i));' """ return OctaveCodePrinter(settings).doprint(expr, assign_to) def print_octave_code(expr, settings): """Prints the Octave (or Matlab) representation of the given expression. See `octave_code` for the meaning of the optional arguments. """ print(octave_code(expr, *settings))
0a11064bd1f12df8b1432dcb0390cf05ab43da579bd37445eb7930fa316195f0	""" Fortran code printer The FCodePrinter converts single sympy expressions into single Fortran expressions, using the functions defined in the Fortran 77 standard where possible. Some useful pointers to Fortran can be found on wikipedia: https://en.wikipedia.org/wiki/Fortran Most of the code below is based on the "Professional Programmer\'s Guide to Fortran77" by Clive G. Page: http://www.star.le.ac.uk/~cgp/prof77.html Fortran is a case-insensitive language. This might cause trouble because SymPy is case sensitive. So, fcode adds underscores to variable names when it is necessary to make them different for Fortran. """ from __future__ import print_function, division from collections import defaultdict from itertools import chain import string from sympy.codegen.ast import ( Assignment, Declaration, Pointer, value_const, float32, float64, float80, complex64, complex128, int8, int16, int32, int64, intc, real, integer, bool_, complex_ ) from sympy.codegen.fnodes import ( allocatable, isign, dsign, cmplx, merge, literal_dp, elemental, pure, intent_in, intent_out, intent_inout ) from sympy.core import S, Add, N, Float, Symbol from sympy.core.compatibility import string_types, range from sympy.core.function import Function from sympy.core.relational import Eq from sympy.sets import Range from sympy.printing.codeprinter import CodePrinter from sympy.printing.precedence import precedence, PRECEDENCE from sympy.printing.printer import printer_context known_functions = { "sin": "sin", "cos": "cos", "tan": "tan", "asin": "asin", "acos": "acos", "atan": "atan", "atan2": "atan2", "sinh": "sinh", "cosh": "cosh", "tanh": "tanh", "log": "log", "exp": "exp", "erf": "erf", "Abs": "abs", "conjugate": "conjg", "Max": "max", "Min": "min", } class FCodePrinter(CodePrinter): """A printer to convert sympy expressions to strings of Fortran code""" printmethod = "_fcode" language = "Fortran" type_aliases = { integer: int32, real: float64, complex_: complex128, } type_mappings = { intc: 'integer(c_int)', float32: 'real4', # real(kind(0.e0)) float64: 'real8', # real(kind(0.d0)) float80: 'real10', # real(kind(????)) complex64: 'complex8', complex128: 'complex16', int8: 'integer1', int16: 'integer2', int32: 'integer4', int64: 'integer8', bool_: 'logical' } type_modules = { intc: {'iso_c_binding': 'c_int'} } _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 17, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, 'source_format': 'fixed', 'contract': True, 'standard': 77, 'name_mangling' : True, } _operators = { 'and': '.and.', 'or': '.or.', 'xor': '.neqv.', 'equivalent': '.eqv.', 'not': '.not. ', } _relationals = { '!=': '/=', } def __init__(self, settings=None): if not settings: settings = {} self.mangled_symbols = {} # Dict showing mapping of all words self.used_name = [] self.type_aliases = dict(chain(self.type_aliases.items(), settings.pop('type_aliases', {}).items())) self.type_mappings = dict(chain(self.type_mappings.items(), settings.pop('type_mappings', {}).items())) super(FCodePrinter, self).__init__(settings) self.known_functions = dict(known_functions) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) # leading columns depend on fixed or free format standards = {66, 77, 90, 95, 2003, 2008} if self._settings['standard'] not in standards: raise ValueError("Unknown Fortran standard: %s" % self._settings[ 'standard']) self.module_uses = defaultdict(set) # e.g.: use iso_c_binding, only: c_int @property def _lead(self): if self._settings['source_format'] == 'fixed': return {'code': " ", 'cont': " @ ", 'comment': "C "} elif self._settings['source_format'] == 'free': return {'code': "", 'cont': " ", 'comment': "! "} else: raise ValueError("Unknown source format: %s" % self._settings['source_format']) def _print_Symbol(self, expr): if self._settings['name_mangling'] == True: if expr not in self.mangled_symbols: name = expr.name while name.lower() in self.used_name: name += '_' self.used_name.append(name.lower()) if name == expr.name: self.mangled_symbols[expr] = expr else: self.mangled_symbols[expr] = Symbol(name) expr = expr.xreplace(self.mangled_symbols) name = super(FCodePrinter, self)._print_Symbol(expr) return name def _rate_index_position(self, p): return -p5 def _get_statement(self, codestring): return codestring def _get_comment(self, text): return "! {0}".format(text) def _declare_number_const(self, name, value): return "parameter ({0} = {1})".format(name, self._print(value)) def _print_NumberSymbol(self, expr): # A Number symbol that is not implemented here or with _printmethod # is registered and evaluated self._number_symbols.add((expr, Float(expr.evalf(self._settings['precision'])))) return str(expr) def _format_code(self, lines): return self._wrap_fortran(self.indent_code(lines)) def _traverse_matrix_indices(self, mat): rows, cols = mat.shape return ((i, j) for j in range(cols) for i in range(rows)) def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] for i in indices: # fortran arrays start at 1 and end at dimension var, start, stop = map(self._print, [i.label, i.lower + 1, i.upper + 1]) open_lines.append("do %s = %s, %s" % (var, start, stop)) close_lines.append("end do") return open_lines, close_lines def _print_sign(self, expr): from sympy import Abs arg, = expr.args if arg.is_integer: new_expr = merge(0, isign(1, arg), Eq(arg, 0)) elif arg.is_complex: new_expr = merge(cmplx(literal_dp(0), literal_dp(0)), arg/Abs(arg), Eq(Abs(arg), literal_dp(0))) else: new_expr = merge(literal_dp(0), dsign(literal_dp(1), arg), Eq(arg, literal_dp(0))) return self._print(new_expr) def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] if expr.has(Assignment): for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s) then" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines.append("else") else: lines.append("else if (%s) then" % self._print(c)) lines.append(self._print(e)) lines.append("end if") return "\n".join(lines) elif self._settings["standard"] >= 95: # Only supported in F95 and newer: # The piecewise was used in an expression, need to do inline # operators. This has the downside that inline operators will # not work for statements that span multiple lines (Matrix or # Indexed expressions). pattern = "merge({T}, {F}, {COND})" code = self._print(expr.args[-1].expr) terms = list(expr.args[:-1]) while terms: e, c = terms.pop() expr = self._print(e) cond = self._print(c) code = pattern.format(T=expr, F=code, COND=cond) return code else: # `merge` is not supported prior to F95 raise NotImplementedError("Using Piecewise as an expression using " "inline operators is not supported in " "standards earlier than Fortran95.") def _print_MatrixElement(self, expr): return "{0}({1}, {2})".format(self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True), expr.i + 1, expr.j + 1) def _print_Add(self, expr): # purpose: print complex numbers nicely in Fortran. # collect the purely real and purely imaginary parts: pure_real = [] pure_imaginary = [] mixed = [] for arg in expr.args: if arg.is_number and arg.is_real: pure_real.append(arg) elif arg.is_number and arg.is_imaginary: pure_imaginary.append(arg) else: mixed.append(arg) if pure_imaginary: if mixed: PREC = precedence(expr) term = Add(mixed) t = self._print(term) if t.startswith('-'): sign = "-" t = t[1:] else: sign = "+" if precedence(term) < PREC: t = "(%s)" % t return "cmplx(%s,%s) %s %s" % ( self._print(Add(pure_real)), self._print(-S.ImaginaryUnitAdd(pure_imaginary)), sign, t, ) else: return "cmplx(%s,%s)" % ( self._print(Add(pure_real)), self._print(-S.ImaginaryUnitAdd(pure_imaginary)), ) else: return CodePrinter._print_Add(self, expr) def _print_Function(self, expr): # All constant function args are evaluated as floats prec = self._settings['precision'] args = [N(a, prec) for a in expr.args] eval_expr = expr.func(args) if not isinstance(eval_expr, Function): return self._print(eval_expr) else: return CodePrinter._print_Function(self, expr.func(args)) def _print_Mod(self, expr): # NOTE : Fortran has the functions mod() and modulo(). modulo() behaves # the same wrt to the sign of the arguments as Python and SymPy's # modulus computations (% and Mod()) but is not available in Fortran 66 # or Fortran 77, thus we raise an error. if self._settings['standard'] in [66, 77]: msg = ("Python % operator and SymPy's Mod() function are not " "supported by Fortran 66 or 77 standards.") raise NotImplementedError(msg) else: x, y = expr.args return " modulo({}, {})".format(self._print(x), self._print(y)) def _print_ImaginaryUnit(self, expr): # purpose: print complex numbers nicely in Fortran. return "cmplx(0,1)" def _print_int(self, expr): return str(expr) def _print_Mul(self, expr): # purpose: print complex numbers nicely in Fortran. if expr.is_number and expr.is_imaginary: return "cmplx(0,%s)" % ( self._print(-S.ImaginaryUnitexpr) ) else: return CodePrinter._print_Mul(self, expr) def _print_Pow(self, expr): PREC = precedence(expr) if expr.exp == -1: return '%s/%s' % ( self._print(literal_dp(1)), self.parenthesize(expr.base, PREC) ) elif expr.exp == 0.5: if expr.base.is_integer: # Fortran intrinsic sqrt() does not accept integer argument if expr.base.is_Number: return 'sqrt(%s.0d0)' % self._print(expr.base) else: return 'sqrt(dble(%s))' % self._print(expr.base) else: return 'sqrt(%s)' % self._print(expr.base) else: return CodePrinter._print_Pow(self, expr) def _print_Rational(self, expr): p, q = int(expr.p), int(expr.q) return "%d.0d0/%d.0d0" % (p, q) def _print_Float(self, expr): printed = CodePrinter._print_Float(self, expr) e = printed.find('e') if e > -1: return "%sd%s" % (printed[:e], printed[e + 1:]) return "%sd0" % printed def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op op = op if op not in self._relationals else self._relationals[op] return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_Indexed(self, expr): inds = [ self._print(i) for i in expr.indices ] return "%s(%s)" % (self._print(expr.base.label), ", ".join(inds)) def _print_Idx(self, expr): return self._print(expr.label) def _print_AugmentedAssignment(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) return self._get_statement("{0} = {0} {1} {2}".format( map(lambda arg: self._print(arg), [lhs_code, expr.binop, rhs_code]))) def _print_sum_(self, sm): params = self._print(sm.array) if sm.dim != None: # Must use '!= None', cannot use 'is not None' params += ', ' + self._print(sm.dim) if sm.mask != None: # Must use '!= None', cannot use 'is not None' params += ', mask=' + self._print(sm.mask) return '%s(%s)' % (sm.__class__.__name__.rstrip('_'), params) def _print_product_(self, prod): return self._print_sum_(prod) def _print_Do(self, do): excl = ['concurrent'] if do.step == 1: excl.append('step') step = '' else: step = ', {step}' return ( 'do {concurrent}{counter} = {first}, {last}'+step+'\n' '{body}\n' 'end do\n' ).format( concurrent='concurrent ' if do.concurrent else '', do.kwargs(apply=lambda arg: self._print(arg), exclude=excl) ) def _print_ImpliedDoLoop(self, idl): step = '' if idl.step == 1 else ', {step}' return ('({expr}, {counter} = {first}, {last}'+step+')').format( idl.kwargs(apply=lambda arg: self._print(arg)) ) def _print_For(self, expr): target = self._print(expr.target) if isinstance(expr.iterable, Range): start, stop, step = expr.iterable.args else: raise NotImplementedError("Only iterable currently supported is Range") body = self._print(expr.body) return ('do {target} = {start}, {stop}, {step}\n' '{body}\n' 'end do').format(target=target, start=start, stop=stop, step=step, body=body) def _print_Type(self, type_): type_ = self.type_aliases.get(type_, type_) type_str = self.type_mappings.get(type_, type_.name) module_uses = self.type_modules.get(type_) if module_uses: for k, v in module_uses: self.module_uses[k].add(v) return type_str def _print_Element(self, elem): return '{symbol}({idxs})'.format( symbol=self._print(elem.symbol), idxs=', '.join(map(lambda arg: self._print(arg), elem.indices)) ) def _print_Extent(self, ext): return str(ext) def _print_Declaration(self, expr): var = expr.variable val = var.value dim = var.attr_params('dimension') intents = [intent in var.attrs for intent in (intent_in, intent_out, intent_inout)] if intents.count(True) == 0: intent = '' elif intents.count(True) == 1: intent = ', intent(%s)' % ['in', 'out', 'inout'][intents.index(True)] else: raise ValueError("Multiple intents specified for %s" % self) if isinstance(var, Pointer): raise NotImplementedError("Pointers are not available by default in Fortran.") if self._settings["standard"] >= 90: result = '{t}{vc}{dim}{intent}{alloc} :: {s}'.format( t=self._print(var.type), vc=', parameter' if value_const in var.attrs else '', dim=', dimension(%s)' % ', '.join(map(lambda arg: self._print(arg), dim)) if dim else '', intent=intent, alloc=', allocatable' if allocatable in var.attrs else '', s=self._print(var.symbol) ) if val != None: # Must be "!= None", cannot be "is not None" result += ' = %s' % self._print(val) else: if value_const in var.attrs or val: raise NotImplementedError("F77 init./parameter statem. req. multiple lines.") result = ' '.join(map(lambda arg: self._print(arg), [var.type, var.symbol])) return result def _print_Infinity(self, expr): return '(huge(%s) + 1)' % self._print(literal_dp(0)) def _print_While(self, expr): return 'do while ({condition})\n{body}\nend do'.format(expr.kwargs( apply=lambda arg: self._print(arg))) def _print_BooleanTrue(self, expr): return '.true.' def _print_BooleanFalse(self, expr): return '.false.' def _pad_leading_columns(self, lines): result = [] for line in lines: if line.startswith('!'): result.append(self._lead['comment'] + line[1:].lstrip()) else: result.append(self._lead['code'] + line) return result def _wrap_fortran(self, lines): """Wrap long Fortran lines Argument: lines -- a list of lines (without \\n character) A comment line is split at white space. Code lines are split with a more complex rule to give nice results. """ # routine to find split point in a code line my_alnum = set("_+-." + string.digits + string.ascii_letters) my_white = set(" \t()") def split_pos_code(line, endpos): if len(line) <= endpos: return len(line) pos = endpos split = lambda pos: \ (line[pos] in my_alnum and line[pos - 1] not in my_alnum) or \ (line[pos] not in my_alnum and line[pos - 1] in my_alnum) or \ (line[pos] in my_white and line[pos - 1] not in my_white) or \ (line[pos] not in my_white and line[pos - 1] in my_white) while not split(pos): pos -= 1 if pos == 0: return endpos return pos # split line by line and add the split lines to result result = [] if self._settings['source_format'] == 'free': trailing = ' &' else: trailing = '' for line in lines: if line.startswith(self._lead['comment']): # comment line if len(line) > 72: pos = line.rfind(" ", 6, 72) if pos == -1: pos = 72 hunk = line[:pos] line = line[pos:].lstrip() result.append(hunk) while line: pos = line.rfind(" ", 0, 66) if pos == -1 or len(line) < 66: pos = 66 hunk = line[:pos] line = line[pos:].lstrip() result.append("%s%s" % (self._lead['comment'], hunk)) else: result.append(line) elif line.startswith(self._lead['code']): # code line pos = split_pos_code(line, 72) hunk = line[:pos].rstrip() line = line[pos:].lstrip() if line: hunk += trailing result.append(hunk) while line: pos = split_pos_code(line, 65) hunk = line[:pos].rstrip() line = line[pos:].lstrip() if line: hunk += trailing result.append("%s%s" % (self._lead['cont'], hunk)) else: result.append(line) return result def indent_code(self, code): """Accepts a string of code or a list of code lines""" if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) free = self._settings['source_format'] == 'free' code = [ line.lstrip(' \t') for line in code ] inc_keyword = ('do ', 'if(', 'if ', 'do\n', 'else', 'program', 'interface') dec_keyword = ('end do', 'enddo', 'end if', 'endif', 'else', 'end program', 'end interface') increase = [ int(any(map(line.startswith, inc_keyword))) for line in code ] decrease = [ int(any(map(line.startswith, dec_keyword))) for line in code ] continuation = [ int(any(map(line.endswith, ['&', '&\n']))) for line in code ] level = 0 cont_padding = 0 tabwidth = 3 new_code = [] for i, line in enumerate(code): if line == '' or line == '\n': new_code.append(line) continue level -= decrease[i] if free: padding = " "(leveltabwidth + cont_padding) else: padding = " "leveltabwidth line = "%s%s" % (padding, line) if not free: line = self._pad_leading_columns([line])[0] new_code.append(line) if continuation[i]: cont_padding = 2tabwidth else: cont_padding = 0 level += increase[i] if not free: return self._wrap_fortran(new_code) return new_code def _print_GoTo(self, goto): if goto.expr: # computed goto return "go to ({labels}), {expr}".format( labels=', '.join(map(lambda arg: self._print(arg), goto.labels)), expr=self._print(goto.expr) ) else: lbl, = goto.labels return "go to %s" % self._print(lbl) def _print_Program(self, prog): return ( "program {name}\n" "{body}\n" "end program\n" ).format(prog.kwargs(apply=lambda arg: self._print(arg))) def _print_Module(self, mod): return ( "module {name}\n" "{declarations}\n" "\ncontains\n\n" "{definitions}\n" "end module\n" ).format(mod.kwargs(apply=lambda arg: self._print(arg))) def _print_Stream(self, strm): if strm.name == 'stdout' and self._settings["standard"] >= 2003: self.module_uses['iso_c_binding'].add('stdint=>input_unit') return 'input_unit' elif strm.name == 'stderr' and self._settings["standard"] >= 2003: self.module_uses['iso_c_binding'].add('stdint=>error_unit') return 'error_unit' else: if strm.name == 'stdout': return '' else: return strm.name def _print_Print(self, ps): if ps.format_string != None: # Must be '!= None', cannot be 'is not None' fmt = self._print(ps.format_string) else: fmt = "" return "print {fmt}, {iolist}".format(fmt=fmt, iolist=', '.join( map(lambda arg: self._print(arg), ps.print_args))) def _print_Return(self, rs): arg, = rs.args return "{result_name} = {arg}".format( result_name=self._context.get('result_name', 'sympy_result'), arg=self._print(arg) ) def _print_FortranReturn(self, frs): arg, = frs.args if arg: return 'return %s' % self._print(arg) else: return 'return' def _head(self, entity, fp, kwargs): bind_C_params = fp.attr_params('bind_C') if bind_C_params is None: bind = '' else: bind = ' bind(C, name="%s")' % bind_C_params[0] if bind_C_params else ' bind(C)' result_name = self._settings.get('result_name', None) return ( "{entity}{name}({arg_names}){result}{bind}\n" "{arg_declarations}" ).format( entity=entity, name=self._print(fp.name), arg_names=', '.join([self._print(arg.symbol) for arg in fp.parameters]), result=(' result(%s)' % result_name) if result_name else '', bind=bind, arg_declarations='\n'.join(map(lambda arg: self._print(Declaration(arg)), fp.parameters)) ) def _print_FunctionPrototype(self, fp): entity = "{0} function ".format(self._print(fp.return_type)) return ( "interface\n" "{function_head}\n" "end function\n" "end interface" ).format(function_head=self._head(entity, fp)) def _print_FunctionDefinition(self, fd): if elemental in fd.attrs: prefix = 'elemental ' elif pure in fd.attrs: prefix = 'pure ' else: prefix = '' entity = "{0} function ".format(self._print(fd.return_type)) with printer_context(self, result_name=fd.name): return ( "{prefix}{function_head}\n" "{body}\n" "end function\n" ).format( prefix=prefix, function_head=self._head(entity, fd), body=self._print(fd.body) ) def _print_Subroutine(self, sub): return ( '{subroutine_head}\n' '{body}\n' 'end subroutine\n' ).format( subroutine_head=self._head('subroutine ', sub), body=self._print(sub.body) ) def _print_SubroutineCall(self, scall): return 'call {name}({args})'.format( name=self._print(scall.name), args=', '.join(map(lambda arg: self._print(arg), scall.subroutine_args)) ) def _print_use_rename(self, rnm): return "%s => %s" % tuple(map(lambda arg: self._print(arg), rnm.args)) def _print_use(self, use): result = 'use %s' % self._print(use.namespace) if use.rename != None: # Must be '!= None', cannot be 'is not None' result += ', ' + ', '.join([self._print(rnm) for rnm in use.rename]) if use.only != None: # Must be '!= None', cannot be 'is not None' result += ', only: ' + ', '.join([self._print(nly) for nly in use.only]) return result def _print_BreakToken(self, _): return 'exit' def _print_ContinueToken(self, _): return 'cycle' def _print_ArrayConstructor(self, ac): fmtstr = "[%s]" if self._settings["standard"] >= 2003 else '(/%s/)' return fmtstr % ', '.join(map(lambda arg: self._print(arg), ac.elements)) def fcode(expr, assign_to=None, settings): """Converts an expr to a string of fortran code Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of line-wrapping, or for expressions that generate multi-line statements. precision : integer, optional DEPRECATED. Use type_mappings instead. The precision for numbers such as pi [default=17]. user_functions : dict, optional A dictionary where keys are ``FunctionClass`` instances and values are their string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. See below for examples. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. source_format : optional The source format can be either 'fixed' or 'free'. [default='fixed'] standard : integer, optional The Fortran standard to be followed. This is specified as an integer. Acceptable standards are 66, 77, 90, 95, 2003, and 2008. Default is 77. Note that currently the only distinction internally is between standards before 95, and those 95 and after. This may change later as more features are added. name_mangling : bool, optional If True, then the variables that would become identical in case-insensitive Fortran are mangled by appending different number of ``_`` at the end. If False, SymPy won't interfere with naming of variables. [default=True] Examples ======== >>> from sympy import fcode, symbols, Rational, sin, ceiling, floor >>> x, tau = symbols("x, tau") >>> fcode((2tau)Rational(7, 2)) ' 8sqrt(2.0d0)tau(7.0d0/2.0d0)' >>> fcode(sin(x), assign_to="s") ' s = sin(x)' Custom printing can be defined for certain types by passing a dictionary of "type" : "function" to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. >>> custom_functions = { ... "ceiling": "CEIL", ... "floor": [(lambda x: not x.is_integer, "FLOOR1"), ... (lambda x: x.is_integer, "FLOOR2")] ... } >>> fcode(floor(x) + ceiling(x), user_functions=custom_functions) ' CEIL(x) + FLOOR1(x)' ``Piecewise`` expressions are converted into conditionals. If an ``assign_to`` variable is provided an if statement is created, otherwise the ternary operator is used. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> expr = Piecewise((x + 1, x > 0), (x, True)) >>> print(fcode(expr, tau)) if (x > 0) then tau = x + 1 else tau = x end if Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> fcode(e.rhs, assign_to=e.lhs, contract=False) ' Dy(i) = (y(i + 1) - y(i))/(t(i + 1) - t(i))' Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions must be provided to ``assign_to``. Note that any expression that can be generated normally can also exist inside a Matrix: >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([x2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) >>> A = MatrixSymbol('A', 3, 1) >>> print(fcode(mat, A)) A(1, 1) = x2 if (x > 0) then A(2, 1) = x + 1 else A(2, 1) = x end if A(3, 1) = sin(x) """ return FCodePrinter(settings).doprint(expr, assign_to) def print_fcode(expr, settings): """Prints the Fortran representation of the given expression. See fcode for the meaning of the optional arguments. """ print(fcode(expr, *settings))
6cf2b0973be81aa1a19b398899bf933e33106a0c886b9184dada05f96944000c	from __future__ import print_function, division from functools import wraps from sympy.core import Add, Mul, Pow, S, sympify, Float from sympy.core.basic import Basic from sympy.core.compatibility import default_sort_key, string_types from sympy.core.function import Lambda from sympy.core.mul import _keep_coeff from sympy.core.symbol import Symbol from sympy.printing.str import StrPrinter from sympy.printing.precedence import precedence # Backwards compatibility from sympy.codegen.ast import Assignment class requires(object): """ Decorator for registering requirements on print methods. """ def __init__(self, *kwargs): self._req = kwargs def __call__(self, method): def _method_wrapper(self_, args, *kwargs): for k, v in self._req.items(): getattr(self_, k).update(v) return method(self_, args, *kwargs) return wraps(method)(_method_wrapper) class AssignmentError(Exception): """ Raised if an assignment variable for a loop is missing. """ pass class CodePrinter(StrPrinter): """ The base class for code-printing subclasses. """ _operators = { 'and': '&&', 'or': '\|\|', 'not': '!', } _default_settings = { 'order': None, 'full_prec': 'auto', 'error_on_reserved': False, 'reserved_word_suffix': '_', 'human': True, 'inline': False, 'allow_unknown_functions': False, } # Functions which are "simple" to rewrite to other functions that # may be supported _rewriteable_functions = { 'erf2': 'erf', 'Li': 'li', } def __init__(self, settings=None): super(CodePrinter, self).__init__(settings=settings) if not hasattr(self, 'reserved_words'): self.reserved_words = set() def doprint(self, expr, assign_to=None): """ Print the expression as code. Parameters ---------- expr : Expression The expression to be printed. assign_to : Symbol, MatrixSymbol, or string (optional) If provided, the printed code will set the expression to a variable with name ``assign_to``. """ from sympy.matrices.expressions.matexpr import MatrixSymbol if isinstance(assign_to, string_types): if expr.is_Matrix: assign_to = MatrixSymbol(assign_to, expr.shape) else: assign_to = Symbol(assign_to) elif not isinstance(assign_to, (Basic, type(None))): raise TypeError("{0} cannot assign to object of type {1}".format( type(self).__name__, type(assign_to))) if assign_to: expr = Assignment(assign_to, expr) else: # _sympify is not enough b/c it errors on iterables expr = sympify(expr) # keep a set of expressions that are not strictly translatable to Code # and number constants that must be declared and initialized self._not_supported = set() self._number_symbols = set() lines = self._print(expr).splitlines() # format the output if self._settings["human"]: frontlines = [] if self._not_supported: frontlines.append(self._get_comment( "Not supported in {0}:".format(self.language))) for expr in sorted(self._not_supported, key=str): frontlines.append(self._get_comment(type(expr).__name__)) for name, value in sorted(self._number_symbols, key=str): frontlines.append(self._declare_number_const(name, value)) lines = frontlines + lines lines = self._format_code(lines) result = "\n".join(lines) else: lines = self._format_code(lines) num_syms = set([(k, self._print(v)) for k, v in self._number_symbols]) result = (num_syms, self._not_supported, "\n".join(lines)) self._not_supported = set() self._number_symbols = set() return result def _doprint_loops(self, expr, assign_to=None): # Here we print an expression that contains Indexed objects, they # correspond to arrays in the generated code. The low-level implementation # involves looping over array elements and possibly storing results in temporary # variables or accumulate it in the assign_to object. if self._settings.get('contract', True): from sympy.tensor import get_contraction_structure # Setup loops over non-dummy indices -- all terms need these indices = self._get_expression_indices(expr, assign_to) # Setup loops over dummy indices -- each term needs separate treatment dummies = get_contraction_structure(expr) else: indices = [] dummies = {None: (expr,)} openloop, closeloop = self._get_loop_opening_ending(indices) # terms with no summations first if None in dummies: text = StrPrinter.doprint(self, Add(dummies[None])) else: # If all terms have summations we must initialize array to Zero text = StrPrinter.doprint(self, 0) # skip redundant assignments (where lhs == rhs) lhs_printed = self._print(assign_to) lines = [] if text != lhs_printed: lines.extend(openloop) if assign_to is not None: text = self._get_statement("%s = %s" % (lhs_printed, text)) lines.append(text) lines.extend(closeloop) # then terms with summations for d in dummies: if isinstance(d, tuple): indices = self._sort_optimized(d, expr) openloop_d, closeloop_d = self._get_loop_opening_ending( indices) for term in dummies[d]: if term in dummies and not ([list(f.keys()) for f in dummies[term]] == [[None] for f in dummies[term]]): # If one factor in the term has it's own internal # contractions, those must be computed first. # (temporary variables?) raise NotImplementedError( "FIXME: no support for contractions in factor yet") else: # We need the lhs expression as an accumulator for # the loops, i.e # # for (int d=0; d < dim; d++){ # lhs[] = lhs[] + term[][d] # } ^.................. the accumulator # # We check if the expression already contains the # lhs, and raise an exception if it does, as that # syntax is currently undefined. FIXME: What would be # a good interpretation? if assign_to is None: raise AssignmentError( "need assignment variable for loops") if term.has(assign_to): raise ValueError("FIXME: lhs present in rhs,\ this is undefined in CodePrinter") lines.extend(openloop) lines.extend(openloop_d) text = "%s = %s" % (lhs_printed, StrPrinter.doprint( self, assign_to + term)) lines.append(self._get_statement(text)) lines.extend(closeloop_d) lines.extend(closeloop) return "\n".join(lines) def _get_expression_indices(self, expr, assign_to): from sympy.tensor import get_indices rinds, junk = get_indices(expr) linds, junk = get_indices(assign_to) # support broadcast of scalar if linds and not rinds: rinds = linds if rinds != linds: raise ValueError("lhs indices must match non-dummy" " rhs indices in %s" % expr) return self._sort_optimized(rinds, assign_to) def _sort_optimized(self, indices, expr): from sympy.tensor.indexed import Indexed if not indices: return [] # determine optimized loop order by giving a score to each index # the index with the highest score are put in the innermost loop. score_table = {} for i in indices: score_table[i] = 0 arrays = expr.atoms(Indexed) for arr in arrays: for p, ind in enumerate(arr.indices): try: score_table[ind] += self._rate_index_position(p) except KeyError: pass return sorted(indices, key=lambda x: score_table[x]) def _rate_index_position(self, p): """function to calculate score based on position among indices This method is used to sort loops in an optimized order, see CodePrinter._sort_optimized() """ raise NotImplementedError("This function must be implemented by " "subclass of CodePrinter.") def _get_statement(self, codestring): """Formats a codestring with the proper line ending.""" raise NotImplementedError("This function must be implemented by " "subclass of CodePrinter.") def _get_comment(self, text): """Formats a text string as a comment.""" raise NotImplementedError("This function must be implemented by " "subclass of CodePrinter.") def _declare_number_const(self, name, value): """Declare a numeric constant at the top of a function""" raise NotImplementedError("This function must be implemented by " "subclass of CodePrinter.") def _format_code(self, lines): """Take in a list of lines of code, and format them accordingly. This may include indenting, wrapping long lines, etc...""" raise NotImplementedError("This function must be implemented by " "subclass of CodePrinter.") def _get_loop_opening_ending(self, indices): """Returns a tuple (open_lines, close_lines) containing lists of codelines""" raise NotImplementedError("This function must be implemented by " "subclass of CodePrinter.") def _print_Dummy(self, expr): if expr.name.startswith('Dummy_'): return '_' + expr.name else: return '%s_%d' % (expr.name, expr.dummy_index) def _print_CodeBlock(self, expr): return '\n'.join([self._print(i) for i in expr.args]) def _print_String(self, string): return str(string) def _print_QuotedString(self, arg): return '"%s"' % arg.text def _print_Comment(self, string): return self._get_comment(str(string)) def _print_Assignment(self, expr): from sympy.functions.elementary.piecewise import Piecewise from sympy.matrices.expressions.matexpr import MatrixSymbol from sympy.tensor.indexed import IndexedBase lhs = expr.lhs rhs = expr.rhs # We special case assignments that take multiple lines if isinstance(expr.rhs, Piecewise): # Here we modify Piecewise so each expression is now # an Assignment, and then continue on the print. expressions = [] conditions = [] for (e, c) in rhs.args: expressions.append(Assignment(lhs, e)) conditions.append(c) temp = Piecewise(zip(expressions, conditions)) return self._print(temp) elif isinstance(lhs, MatrixSymbol): # Here we form an Assignment for each element in the array, # printing each one. lines = [] for (i, j) in self._traverse_matrix_indices(lhs): temp = Assignment(lhs[i, j], rhs[i, j]) code0 = self._print(temp) lines.append(code0) return "\n".join(lines) elif self._settings.get("contract", False) and (lhs.has(IndexedBase) or rhs.has(IndexedBase)): # Here we check if there is looping to be done, and if so # print the required loops. return self._doprint_loops(rhs, lhs) else: lhs_code = self._print(lhs) rhs_code = self._print(rhs) return self._get_statement("%s = %s" % (lhs_code, rhs_code)) def _print_AugmentedAssignment(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) return self._get_statement("{0} {1} {2}".format( map(lambda arg: self._print(arg), [lhs_code, expr.op, rhs_code]))) def _print_FunctionCall(self, expr): return '%s(%s)' % ( expr.name, ', '.join(map(lambda arg: self._print(arg), expr.function_args))) def _print_Variable(self, expr): return self._print(expr.symbol) def _print_Statement(self, expr): arg, = expr.args return self._get_statement(self._print(arg)) def _print_Symbol(self, expr): name = super(CodePrinter, self)._print_Symbol(expr) if name in self.reserved_words: if self._settings['error_on_reserved']: msg = ('This expression includes the symbol "{}" which is a ' 'reserved keyword in this language.') raise ValueError(msg.format(name)) return name + self._settings['reserved_word_suffix'] else: return name def _print_Function(self, expr): if expr.func.__name__ in self.known_functions: cond_func = self.known_functions[expr.func.__name__] func = None if isinstance(cond_func, string_types): func = cond_func else: for cond, func in cond_func: if cond(expr.args): break if func is not None: try: return func([self.parenthesize(item, 0) for item in expr.args]) except TypeError: return "%s(%s)" % (func, self.stringify(expr.args, ", ")) elif hasattr(expr, '_imp_') and isinstance(expr._imp_, Lambda): # inlined function return self._print(expr._imp_(expr.args)) elif expr.is_Function and self._settings.get('allow_unknown_functions', False): return '%s(%s)' % (self._print(expr.func), ', '.join(map(self._print, expr.args))) elif (expr.func.__name__ in self._rewriteable_functions and self._rewriteable_functions[expr.func.__name__] in self.known_functions): # Simple rewrite to supported function possible return self._print(expr.rewrite(self._rewriteable_functions[expr.func.__name__])) else: return self._print_not_supported(expr) _print_Expr = _print_Function def _print_NumberSymbol(self, expr): if self._settings.get("inline", False): return self._print(Float(expr.evalf(self._settings["precision"]))) else: # A Number symbol that is not implemented here or with _printmethod # is registered and evaluated self._number_symbols.add((expr, Float(expr.evalf(self._settings["precision"])))) return str(expr) def _print_Catalan(self, expr): return self._print_NumberSymbol(expr) def _print_EulerGamma(self, expr): return self._print_NumberSymbol(expr) def _print_GoldenRatio(self, expr): return self._print_NumberSymbol(expr) def _print_TribonacciConstant(self, expr): return self._print_NumberSymbol(expr) def _print_Exp1(self, expr): return self._print_NumberSymbol(expr) def _print_Pi(self, expr): return self._print_NumberSymbol(expr) def _print_And(self, expr): PREC = precedence(expr) return (" %s " % self._operators['and']).join(self.parenthesize(a, PREC) for a in sorted(expr.args, key=default_sort_key)) def _print_Or(self, expr): PREC = precedence(expr) return (" %s " % self._operators['or']).join(self.parenthesize(a, PREC) for a in sorted(expr.args, key=default_sort_key)) def _print_Xor(self, expr): if self._operators.get('xor') is None: return self._print_not_supported(expr) PREC = precedence(expr) return (" %s " % self._operators['xor']).join(self.parenthesize(a, PREC) for a in expr.args) def _print_Equivalent(self, expr): if self._operators.get('equivalent') is None: return self._print_not_supported(expr) PREC = precedence(expr) return (" %s " % self._operators['equivalent']).join(self.parenthesize(a, PREC) for a in expr.args) def _print_Not(self, expr): PREC = precedence(expr) return self._operators['not'] + self.parenthesize(expr.args[0], PREC) def _print_Mul(self, expr): prec = precedence(expr) c, e = expr.as_coeff_Mul() if c < 0: expr = _keep_coeff(-c, e) sign = "-" else: sign = "" a = [] # items in the numerator b = [] # items that are in the denominator (if any) pow_paren = [] # Will collect all pow with more than one base element and exp = -1 if self.order not in ('old', 'none'): args = expr.as_ordered_factors() else: # use make_args in case expr was something like -x -> x args = Mul.make_args(expr) # Gather args for numerator/denominator for item in args: if item.is_commutative and item.is_Pow and item.exp.is_Rational and item.exp.is_negative: if item.exp != -1: b.append(Pow(item.base, -item.exp, evaluate=False)) else: if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160 pow_paren.append(item) b.append(Pow(item.base, -item.exp)) else: a.append(item) a = a or [S.One] a_str = [self.parenthesize(x, prec) for x in a] b_str = [self.parenthesize(x, prec) for x in b] # To parenthesize Pow with exp = -1 and having more than one Symbol for item in pow_paren: if item.base in b: b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)] if not b: return sign + ''.join(a_str) elif len(b) == 1: return sign + ''.join(a_str) + "/" + b_str[0] else: return sign + ''.join(a_str) + "/(%s)" % ''.join(b_str) def _print_not_supported(self, expr): self._not_supported.add(expr) return self.emptyPrinter(expr) # The following can not be simply translated into C or Fortran _print_Basic = _print_not_supported _print_ComplexInfinity = _print_not_supported _print_Derivative = _print_not_supported _print_ExprCondPair = _print_not_supported _print_GeometryEntity = _print_not_supported _print_Infinity = _print_not_supported _print_Integral = _print_not_supported _print_Interval = _print_not_supported _print_AccumulationBounds = _print_not_supported _print_Limit = _print_not_supported _print_Matrix = _print_not_supported _print_ImmutableMatrix = _print_not_supported _print_ImmutableDenseMatrix = _print_not_supported _print_MutableDenseMatrix = _print_not_supported _print_MatrixBase = _print_not_supported _print_DeferredVector = _print_not_supported _print_NaN = _print_not_supported _print_NegativeInfinity = _print_not_supported _print_Order = _print_not_supported _print_RootOf = _print_not_supported _print_RootsOf = _print_not_supported _print_RootSum = _print_not_supported _print_SparseMatrix = _print_not_supported _print_MutableSparseMatrix = _print_not_supported _print_ImmutableSparseMatrix = _print_not_supported _print_Uniform = _print_not_supported _print_Unit = _print_not_supported _print_Wild = _print_not_supported _print_WildFunction = _print_not_supported _print_Relational = _print_not_supported
abbd4889fe44e18827c63997bf02d83196d4eadea996edcdccbb32d50d59e2ab	""" Javascript code printer The JavascriptCodePrinter converts single sympy expressions into single Javascript expressions, using the functions defined in the Javascript Math object where possible. """ from __future__ import print_function, division from sympy.codegen.ast import Assignment from sympy.core import S from sympy.core.compatibility import string_types, range from sympy.printing.codeprinter import CodePrinter from sympy.printing.precedence import precedence, PRECEDENCE # dictionary mapping sympy function to (argument_conditions, Javascript_function). # Used in JavascriptCodePrinter._print_Function(self) known_functions = { 'Abs': 'Math.abs', 'acos': 'Math.acos', 'acosh': 'Math.acosh', 'asin': 'Math.asin', 'asinh': 'Math.asinh', 'atan': 'Math.atan', 'atan2': 'Math.atan2', 'atanh': 'Math.atanh', 'ceiling': 'Math.ceil', 'cos': 'Math.cos', 'cosh': 'Math.cosh', 'exp': 'Math.exp', 'floor': 'Math.floor', 'log': 'Math.log', 'Max': 'Math.max', 'Min': 'Math.min', 'sign': 'Math.sign', 'sin': 'Math.sin', 'sinh': 'Math.sinh', 'tan': 'Math.tan', 'tanh': 'Math.tanh', } class JavascriptCodePrinter(CodePrinter): """"A Printer to convert python expressions to strings of javascript code """ printmethod = '_javascript' language = 'Javascript' _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 17, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, 'contract': True } def __init__(self, settings={}): CodePrinter.__init__(self, settings) self.known_functions = dict(known_functions) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) def _rate_index_position(self, p): return p5 def _get_statement(self, codestring): return "%s;" % codestring def _get_comment(self, text): return "// {0}".format(text) def _declare_number_const(self, name, value): return "var {0} = {1};".format(name, value.evalf(self._settings['precision'])) def _format_code(self, lines): return self.indent_code(lines) def _traverse_matrix_indices(self, mat): rows, cols = mat.shape return ((i, j) for i in range(rows) for j in range(cols)) def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] loopstart = "for (var %(varble)s=%(start)s; %(varble)s<%(end)s; %(varble)s++){" for i in indices: # Javascript arrays start at 0 and end at dimension-1 open_lines.append(loopstart % { 'varble': self._print(i.label), 'start': self._print(i.lower), 'end': self._print(i.upper + 1)}) close_lines.append("}") return open_lines, close_lines def _print_Pow(self, expr): PREC = precedence(expr) if expr.exp == -1: return '1/%s' % (self.parenthesize(expr.base, PREC)) elif expr.exp == 0.5: return 'Math.sqrt(%s)' % self._print(expr.base) elif expr.exp == S(1)/3: return 'Math.cbrt(%s)' % self._print(expr.base) else: return 'Math.pow(%s, %s)' % (self._print(expr.base), self._print(expr.exp)) def _print_Rational(self, expr): p, q = int(expr.p), int(expr.q) return '%d/%d' % (p, q) def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_Indexed(self, expr): # calculate index for 1d array dims = expr.shape elem = S.Zero offset = S.One for i in reversed(range(expr.rank)): elem += expr.indices[i]offset offset = dims[i] return "%s[%s]" % (self._print(expr.base.label), self._print(elem)) def _print_Idx(self, expr): return self._print(expr.label) def _print_Exp1(self, expr): return "Math.E" def _print_Pi(self, expr): return 'Math.PI' def _print_Infinity(self, expr): return 'Number.POSITIVE_INFINITY' def _print_NegativeInfinity(self, expr): return 'Number.NEGATIVE_INFINITY' def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] if expr.has(Assignment): for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s) {" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines.append("else {") else: lines.append("else if (%s) {" % self._print(c)) code0 = self._print(e) lines.append(code0) lines.append("}") return "\n".join(lines) else: # The piecewise was used in an expression, need to do inline # operators. This has the downside that inline operators will # not work for statements that span multiple lines (Matrix or # Indexed expressions). ecpairs = ["((%s) ? (\n%s\n)\n" % (self._print(c), self._print(e)) for e, c in expr.args[:-1]] last_line = ": (\n%s\n)" % self._print(expr.args[-1].expr) return ": ".join(ecpairs) + last_line + " ".join([")"len(ecpairs)]) def _print_MatrixElement(self, expr): return "{0}[{1}]".format(self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True), expr.j + expr.iexpr.parent.shape[1]) def indent_code(self, code): """Accepts a string of code or a list of code lines""" if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_token = ('{', '(', '{\n', '(\n') dec_token = ('}', ')') code = [ line.lstrip(' \t') for line in code ] increase = [ int(any(map(line.endswith, inc_token))) for line in code ] decrease = [ int(any(map(line.startswith, dec_token))) for line in code ] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tablevel, line)) level += increase[n] return pretty def jscode(expr, assign_to=None, *settings): """Converts an expr to a string of javascript code Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of line-wrapping, or for expressions that generate multi-line statements. precision : integer, optional The precision for numbers such as pi [default=15]. user_functions : dict, optional A dictionary where keys are ``FunctionClass`` instances and values are their string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, js_function_string)]. See below for examples. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. Examples ======== >>> from sympy import jscode, symbols, Rational, sin, ceiling, Abs >>> x, tau = symbols("x, tau") >>> jscode((2tau)*Rational(7, 2)) '8Math.sqrt(2)Math.pow(tau, 7/2)' >>> jscode(sin(x), assign_to="s") 's = Math.sin(x);' Custom printing can be defined for certain types by passing a dictionary of "type" : "function" to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, js_function_string)]. >>> custom_functions = { ... "ceiling": "CEIL", ... "Abs": [(lambda x: not x.is_integer, "fabs"), ... (lambda x: x.is_integer, "ABS")] ... } >>> jscode(Abs(x) + ceiling(x), user_functions=custom_functions) 'fabs(x) + CEIL(x)' ``Piecewise`` expressions are converted into conditionals. If an ``assign_to`` variable is provided an if statement is created, otherwise the ternary operator is used. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> expr = Piecewise((x + 1, x > 0), (x, True)) >>> print(jscode(expr, tau)) if (x > 0) { tau = x + 1; } else { tau = x; } Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> jscode(e.rhs, assign_to=e.lhs, contract=False) 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions must be provided to ``assign_to``. Note that any expression that can be generated normally can also exist inside a Matrix: >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([x2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) >>> A = MatrixSymbol('A', 3, 1) >>> print(jscode(mat, A)) A[0] = Math.pow(x, 2); if (x > 0) { A[1] = x + 1; } else { A[1] = x; } A[2] = Math.sin(x); """ return JavascriptCodePrinter(settings).doprint(expr, assign_to) def print_jscode(expr, settings): """Prints the Javascript representation of the given expression. See jscode for the meaning of the optional arguments. """ print(jscode(expr, *settings))
e68b0e9308f459a994494ee6d2415914c9d7c8c2211858e313c311a6d9e050a4	""" Julia code printer The `JuliaCodePrinter` converts SymPy expressions into Julia expressions. A complete code generator, which uses `julia_code` extensively, can be found in `sympy.utilities.codegen`. The `codegen` module can be used to generate complete source code files. """ from __future__ import print_function, division from sympy.core import Mul, Pow, S, Rational from sympy.core.compatibility import string_types, range from sympy.core.mul import _keep_coeff from sympy.printing.codeprinter import CodePrinter, Assignment from sympy.printing.precedence import precedence, PRECEDENCE from re import search # List of known functions. First, those that have the same name in # SymPy and Julia. This is almost certainly incomplete! known_fcns_src1 = ["sin", "cos", "tan", "cot", "sec", "csc", "asin", "acos", "atan", "acot", "asec", "acsc", "sinh", "cosh", "tanh", "coth", "sech", "csch", "asinh", "acosh", "atanh", "acoth", "asech", "acsch", "sinc", "atan2", "sign", "floor", "log", "exp", "cbrt", "sqrt", "erf", "erfc", "erfi", "factorial", "gamma", "digamma", "trigamma", "polygamma", "beta", "airyai", "airyaiprime", "airybi", "airybiprime", "besselj", "bessely", "besseli", "besselk", "erfinv", "erfcinv"] # These functions have different names ("Sympy": "Julia"), more # generally a mapping to (argument_conditions, julia_function). known_fcns_src2 = { "Abs": "abs", "ceiling": "ceil", "conjugate": "conj", "hankel1": "hankelh1", "hankel2": "hankelh2", "im": "imag", "re": "real" } class JuliaCodePrinter(CodePrinter): """ A printer to convert expressions to strings of Julia code. """ printmethod = "_julia" language = "Julia" _operators = { 'and': '&&', 'or': '\|\|', 'not': '!', } _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 17, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, 'contract': True, 'inline': True, } # Note: contract is for expressing tensors as loops (if True), or just # assignment (if False). FIXME: this should be looked a more carefully # for Julia. def __init__(self, settings={}): super(JuliaCodePrinter, self).__init__(settings) self.known_functions = dict(zip(known_fcns_src1, known_fcns_src1)) self.known_functions.update(dict(known_fcns_src2)) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) def _rate_index_position(self, p): return p5 def _get_statement(self, codestring): return "%s" % codestring def _get_comment(self, text): return "# {0}".format(text) def _declare_number_const(self, name, value): return "const {0} = {1}".format(name, value) def _format_code(self, lines): return self.indent_code(lines) def _traverse_matrix_indices(self, mat): # Julia uses Fortran order (column-major) rows, cols = mat.shape return ((i, j) for j in range(cols) for i in range(rows)) def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] for i in indices: # Julia arrays start at 1 and end at dimension var, start, stop = map(self._print, [i.label, i.lower + 1, i.upper + 1]) open_lines.append("for %s = %s:%s" % (var, start, stop)) close_lines.append("end") return open_lines, close_lines def _print_Mul(self, expr): # print complex numbers nicely in Julia if (expr.is_number and expr.is_imaginary and expr.as_coeff_Mul()[0].is_integer): return "%sim" % self._print(-S.ImaginaryUnitexpr) # cribbed from str.py prec = precedence(expr) c, e = expr.as_coeff_Mul() if c < 0: expr = _keep_coeff(-c, e) sign = "-" else: sign = "" a = [] # items in the numerator b = [] # items that are in the denominator (if any) pow_paren = [] # Will collect all pow with more than one base element and exp = -1 if self.order not in ('old', 'none'): args = expr.as_ordered_factors() else: # use make_args in case expr was something like -x -> x args = Mul.make_args(expr) # Gather args for numerator/denominator for item in args: if (item.is_commutative and item.is_Pow and item.exp.is_Rational and item.exp.is_negative): if item.exp != -1: b.append(Pow(item.base, -item.exp, evaluate=False)) else: if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160 pow_paren.append(item) b.append(Pow(item.base, -item.exp)) elif item.is_Rational and item is not S.Infinity: if item.p != 1: a.append(Rational(item.p)) if item.q != 1: b.append(Rational(item.q)) else: a.append(item) a = a or [S.One] a_str = [self.parenthesize(x, prec) for x in a] b_str = [self.parenthesize(x, prec) for x in b] # To parenthesize Pow with exp = -1 and having more than one Symbol for item in pow_paren: if item.base in b: b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)] # from here it differs from str.py to deal with "" and "." def multjoin(a, a_str): # here we probably are assuming the constants will come first r = a_str[0] for i in range(1, len(a)): mulsym = '' if a[i-1].is_number else '.' r = r + mulsym + a_str[i] return r if not b: return sign + multjoin(a, a_str) elif len(b) == 1: divsym = '/' if b[0].is_number else './' return sign + multjoin(a, a_str) + divsym + b_str[0] else: divsym = '/' if all([bi.is_number for bi in b]) else './' return (sign + multjoin(a, a_str) + divsym + "(%s)" % multjoin(b, b_str)) def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_Pow(self, expr): powsymbol = '^' if all([x.is_number for x in expr.args]) else '.^' PREC = precedence(expr) if expr.exp == S.Half: return "sqrt(%s)" % self._print(expr.base) if expr.is_commutative: if expr.exp == -S.Half: sym = '/' if expr.base.is_number else './' return "1" + sym + "sqrt(%s)" % self._print(expr.base) if expr.exp == -S.One: sym = '/' if expr.base.is_number else './' return "1" + sym + "%s" % self.parenthesize(expr.base, PREC) return '%s%s%s' % (self.parenthesize(expr.base, PREC), powsymbol, self.parenthesize(expr.exp, PREC)) def _print_MatPow(self, expr): PREC = precedence(expr) return '%s^%s' % (self.parenthesize(expr.base, PREC), self.parenthesize(expr.exp, PREC)) def _print_Pi(self, expr): if self._settings["inline"]: return "pi" else: return super(JuliaCodePrinter, self)._print_NumberSymbol(expr) def _print_ImaginaryUnit(self, expr): return "im" def _print_Exp1(self, expr): if self._settings["inline"]: return "e" else: return super(JuliaCodePrinter, self)._print_NumberSymbol(expr) def _print_EulerGamma(self, expr): if self._settings["inline"]: return "eulergamma" else: return super(JuliaCodePrinter, self)._print_NumberSymbol(expr) def _print_Catalan(self, expr): if self._settings["inline"]: return "catalan" else: return super(JuliaCodePrinter, self)._print_NumberSymbol(expr) def _print_GoldenRatio(self, expr): if self._settings["inline"]: return "golden" else: return super(JuliaCodePrinter, self)._print_NumberSymbol(expr) def _print_Assignment(self, expr): from sympy.functions.elementary.piecewise import Piecewise from sympy.tensor.indexed import IndexedBase # Copied from codeprinter, but remove special MatrixSymbol treatment lhs = expr.lhs rhs = expr.rhs # We special case assignments that take multiple lines if not self._settings["inline"] and isinstance(expr.rhs, Piecewise): # Here we modify Piecewise so each expression is now # an Assignment, and then continue on the print. expressions = [] conditions = [] for (e, c) in rhs.args: expressions.append(Assignment(lhs, e)) conditions.append(c) temp = Piecewise(zip(expressions, conditions)) return self._print(temp) if self._settings["contract"] and (lhs.has(IndexedBase) or rhs.has(IndexedBase)): # Here we check if there is looping to be done, and if so # print the required loops. return self._doprint_loops(rhs, lhs) else: lhs_code = self._print(lhs) rhs_code = self._print(rhs) return self._get_statement("%s = %s" % (lhs_code, rhs_code)) def _print_Infinity(self, expr): return 'Inf' def _print_NegativeInfinity(self, expr): return '-Inf' def _print_NaN(self, expr): return 'NaN' def _print_list(self, expr): return 'Any[' + ', '.join(self._print(a) for a in expr) + ']' def _print_tuple(self, expr): if len(expr) == 1: return "(%s,)" % self._print(expr[0]) else: return "(%s)" % self.stringify(expr, ", ") _print_Tuple = _print_tuple def _print_BooleanTrue(self, expr): return "true" def _print_BooleanFalse(self, expr): return "false" def _print_bool(self, expr): return str(expr).lower() # Could generate quadrature code for definite Integrals? #_print_Integral = _print_not_supported def _print_MatrixBase(self, A): # Handle zero dimensions: if A.rows == 0 or A.cols == 0: return 'zeros(%s, %s)' % (A.rows, A.cols) elif (A.rows, A.cols) == (1, 1): return "[%s]" % A[0, 0] elif A.rows == 1: return "[%s]" % A.table(self, rowstart='', rowend='', colsep=' ') elif A.cols == 1: # note .table would unnecessarily equispace the rows return "[%s]" % ", ".join([self._print(a) for a in A]) return "[%s]" % A.table(self, rowstart='', rowend='', rowsep=';\n', colsep=' ') def _print_SparseMatrix(self, A): from sympy.matrices import Matrix L = A.col_list(); # make row vectors of the indices and entries I = Matrix([k[0] + 1 for k in L]) J = Matrix([k[1] + 1 for k in L]) AIJ = Matrix([k[2] for k in L]) return "sparse(%s, %s, %s, %s, %s)" % (self._print(I), self._print(J), self._print(AIJ), A.rows, A.cols) # FIXME: Str/CodePrinter could define each of these to call the _print # method from higher up the class hierarchy (see _print_NumberSymbol). # Then subclasses like us would not need to repeat all this. _print_Matrix = \ _print_DenseMatrix = \ _print_MutableDenseMatrix = \ _print_ImmutableMatrix = \ _print_ImmutableDenseMatrix = \ _print_MatrixBase _print_MutableSparseMatrix = \ _print_ImmutableSparseMatrix = \ _print_SparseMatrix def _print_MatrixElement(self, expr): return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) \ + '[%s,%s]' % (expr.i + 1, expr.j + 1) def _print_MatrixSlice(self, expr): def strslice(x, lim): l = x[0] + 1 h = x[1] step = x[2] lstr = self._print(l) hstr = 'end' if h == lim else self._print(h) if step == 1: if l == 1 and h == lim: return ':' if l == h: return lstr else: return lstr + ':' + hstr else: return ':'.join((lstr, self._print(step), hstr)) return (self._print(expr.parent) + '[' + strslice(expr.rowslice, expr.parent.shape[0]) + ',' + strslice(expr.colslice, expr.parent.shape[1]) + ']') def _print_Indexed(self, expr): inds = [ self._print(i) for i in expr.indices ] return "%s[%s]" % (self._print(expr.base.label), ",".join(inds)) def _print_Idx(self, expr): return self._print(expr.label) def _print_Identity(self, expr): return "eye(%s)" % self._print(expr.shape[0]) # Note: as of 2015, Julia doesn't have spherical Bessel functions def _print_jn(self, expr): from sympy.functions import sqrt, besselj x = expr.argument expr2 = sqrt(S.Pi/(2x))besselj(expr.order + S.Half, x) return self._print(expr2) def _print_yn(self, expr): from sympy.functions import sqrt, bessely x = expr.argument expr2 = sqrt(S.Pi/(2x))bessely(expr.order + S.Half, x) return self._print(expr2) def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] if self._settings["inline"]: # Express each (cond, expr) pair in a nested Horner form: # (condition) . (expr) + (not cond) .* (<others>) # Expressions that result in multiple statements won't work here. ecpairs = ["({0}) ? ({1}) :".format (self._print(c), self._print(e)) for e, c in expr.args[:-1]] elast = " (%s)" % self._print(expr.args[-1].expr) pw = "\n".join(ecpairs) + elast # Note: current need these outer brackets for 2pw. Would be # nicer to teach parenthesize() to do this for us when needed! return "(" + pw + ")" else: for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s)" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines.append("else") else: lines.append("elseif (%s)" % self._print(c)) code0 = self._print(e) lines.append(code0) if i == len(expr.args) - 1: lines.append("end") return "\n".join(lines) def indent_code(self, code): """Accepts a string of code or a list of code lines""" # code mostly copied from ccode if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_regex = ('^function ', '^if ', '^elseif ', '^else$', '^for ') dec_regex = ('^end$', '^elseif ', '^else$') # pre-strip left-space from the code code = [ line.lstrip(' \t') for line in code ] increase = [ int(any([search(re, line) for re in inc_regex])) for line in code ] decrease = [ int(any([search(re, line) for re in dec_regex])) for line in code ] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tablevel, line)) level += increase[n] return pretty def julia_code(expr, assign_to=None, *settings): r"""Converts `expr` to a string of Julia code. Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This can be helpful for expressions that generate multi-line statements. precision : integer, optional The precision for numbers such as pi [default=16]. user_functions : dict, optional A dictionary where keys are ``FunctionClass`` instances and values are their string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. See below for examples. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. inline: bool, optional If True, we try to create single-statement code instead of multiple statements. [default=True]. Examples ======== >>> from sympy import julia_code, symbols, sin, pi >>> x = symbols('x') >>> julia_code(sin(x).series(x).removeO()) 'x.^5/120 - x.^3/6 + x' >>> from sympy import Rational, ceiling, Abs >>> x, y, tau = symbols("x, y, tau") >>> julia_code((2tau)*Rational(7, 2)) '8sqrt(2)tau.^(7/2)' Note that element-wise (Hadamard) operations are used by default between symbols. This is because its possible in Julia to write "vectorized" code. It is harmless if the values are scalars. >>> julia_code(sin(pixy), assign_to="s") 's = sin(pix.y)' If you need a matrix product "" or matrix power "^", you can specify the symbol as a ``MatrixSymbol``. >>> from sympy import Symbol, MatrixSymbol >>> n = Symbol('n', integer=True, positive=True) >>> A = MatrixSymbol('A', n, n) >>> julia_code(3piA*3) '(3pi)A^3' This class uses several rules to decide which symbol to use a product. Pure numbers use "", Symbols use "." and MatrixSymbols use "". A HadamardProduct can be used to specify componentwise multiplication "." of two MatrixSymbols. There is currently there is no easy way to specify scalar symbols, so sometimes the code might have some minor cosmetic issues. For example, suppose x and y are scalars and A is a Matrix, then while a human programmer might write "(x^2y)A^3", we generate: >>> julia_code(x2yA3) '(x.^2.y)A^3' Matrices are supported using Julia inline notation. When using ``assign_to`` with matrices, the name can be specified either as a string or as a ``MatrixSymbol``. The dimensions must align in the latter case. >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([[x2, sin(x), ceiling(x)]]) >>> julia_code(mat, assign_to='A') 'A = [x.^2 sin(x) ceil(x)]' ``Piecewise`` expressions are implemented with logical masking by default. Alternatively, you can pass "inline=False" to use if-else conditionals. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> pw = Piecewise((x + 1, x > 0), (x, True)) >>> julia_code(pw, assign_to=tau) 'tau = ((x > 0) ? (x + 1) : (x))' Note that any expression that can be generated normally can also exist inside a Matrix: >>> mat = Matrix([[x2, pw, sin(x)]]) >>> julia_code(mat, assign_to='A') 'A = [x.^2 ((x > 0) ? (x + 1) : (x)) sin(x)]' Custom printing can be defined for certain types by passing a dictionary of "type" : "function" to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e., [(argument_test, cfunction_string)]. This can be used to call a custom Julia function. >>> from sympy import Function >>> f = Function('f') >>> g = Function('g') >>> custom_functions = { ... "f": "existing_julia_fcn", ... "g": [(lambda x: x.is_Matrix, "my_mat_fcn"), ... (lambda x: not x.is_Matrix, "my_fcn")] ... } >>> mat = Matrix([[1, x]]) >>> julia_code(f(x) + g(x) + g(mat), user_functions=custom_functions) 'existing_julia_fcn(x) + my_fcn(x) + my_mat_fcn([1 x])' Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx, ccode >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e = Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> julia_code(e.rhs, assign_to=e.lhs, contract=False) 'Dy[i] = (y[i + 1] - y[i])./(t[i + 1] - t[i])' """ return JuliaCodePrinter(settings).doprint(expr, assign_to) def print_julia_code(expr, settings): """Prints the Julia representation of the given expression. See `julia_code` for the meaning of the optional arguments. """ print(julia_code(expr, *settings))
47ab36679e72dff1e74d6e4494bf7ab5ede17500013615112b3a28483373648e	from sympy.codegen.ast import Assignment from sympy.core import S from sympy.core.compatibility import string_types, range from sympy.core.function import _coeff_isneg, Lambda from sympy.printing.codeprinter import CodePrinter from sympy.printing.precedence import precedence from functools import reduce known_functions = { 'Abs': 'abs', 'sin': 'sin', 'cos': 'cos', 'tan': 'tan', 'acos': 'acos', 'asin': 'asin', 'atan': 'atan', 'atan2': 'atan', 'ceiling': 'ceil', 'floor': 'floor', 'sign': 'sign', 'exp': 'exp', 'log': 'log', 'add': 'add', 'sub': 'sub', 'mul': 'mul', 'pow': 'pow' } class GLSLPrinter(CodePrinter): """ Rudimentary, generic GLSL printing tools. Additional settings: 'use_operators': Boolean (should the printer use operators for +,-,, or functions?) """ _not_supported = set() printmethod = "_glsl" language = "GLSL" _default_settings = { 'use_operators': True, 'mat_nested': False, 'mat_separator': ',\n', 'mat_transpose': False, 'glsl_types': True, 'order': None, 'full_prec': 'auto', 'precision': 9, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, 'contract': True, 'error_on_reserved': False, 'reserved_word_suffix': '_' } def __init__(self, settings={}): CodePrinter.__init__(self, settings) self.known_functions = dict(known_functions) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) def _rate_index_position(self, p): return p5 def _get_statement(self, codestring): return "%s;" % codestring def _get_comment(self, text): return "// {0}".format(text) def _declare_number_const(self, name, value): return "float {0} = {1};".format(name, value) def _format_code(self, lines): return self.indent_code(lines) def indent_code(self, code): """Accepts a string of code or a list of code lines""" if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_token = ('{', '(', '{\n', '(\n') dec_token = ('}', ')') code = [line.lstrip(' \t') for line in code] increase = [int(any(map(line.endswith, inc_token))) for line in code] decrease = [int(any(map(line.startswith, dec_token))) for line in code] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tablevel, line)) level += increase[n] return pretty def _print_MatrixBase(self, mat): mat_separator = self._settings['mat_separator'] mat_transpose = self._settings['mat_transpose'] glsl_types = self._settings['glsl_types'] column_vector = (mat.rows == 1) if mat_transpose else (mat.cols == 1) A = mat.transpose() if mat_transpose != column_vector else mat if A.cols == 1: return self._print(A[0]); if A.rows <= 4 and A.cols <= 4 and glsl_types: if A.rows == 1: return 'vec%s%s' % (A.cols, A.table(self,rowstart='(',rowend=')')) elif A.rows == A.cols: return 'mat%s(%s)' % (A.rows, A.table(self,rowsep=', ', rowstart='',rowend='')) else: return 'mat%sx%s(%s)' % (A.cols, A.rows, A.table(self,rowsep=', ', rowstart='',rowend='')) elif A.cols == 1 or A.rows == 1: return 'float[%s](%s)' % (A.colsA.rows, A.table(self,rowsep=mat_separator,rowstart='',rowend='')) elif not self._settings['mat_nested']: return 'float[%s](\n%s\n) /* a %sx%s matrix /' % (A.colsA.rows, A.table(self,rowsep=mat_separator,rowstart='',rowend=''), A.rows,A.cols) elif self._settings['mat_nested']: return 'float[%s][%s](\n%s\n)' % (A.rows,A.cols,A.table(self,rowsep=mat_separator,rowstart='float[](',rowend=')')) _print_Matrix = \ _print_MatrixElement = \ _print_DenseMatrix = \ _print_MutableDenseMatrix = \ _print_ImmutableMatrix = \ _print_ImmutableDenseMatrix = \ _print_MatrixBase def _traverse_matrix_indices(self, mat): mat_transpose = self._settings['mat_transpose'] if mat_transpose: rows,cols = mat.shape else: cols,rows = mat.shape return ((i, j) for i in range(cols) for j in range(rows)) def _print_MatrixElement(self, expr): # print('begin _print_MatrixElement') nest = self._settings['mat_nested']; glsl_types = self._settings['glsl_types']; mat_transpose = self._settings['mat_transpose']; if mat_transpose: cols,rows = expr.parent.shape i,j = expr.j,expr.i else: rows,cols = expr.parent.shape i,j = expr.i,expr.j pnt = self._print(expr.parent) if glsl_types and ((rows <= 4 and cols <=4) or nest): # print('end _print_MatrixElement case A',nest,glsl_types) return "%s[%s][%s]" % (pnt, i, j) else: # print('end _print_MatrixElement case B',nest,glsl_types) return "{0}[{1}]".format(pnt, i + jrows) def _print_list(self, expr): l = ', '.join(self._print(item) for item in expr) glsl_types = self._settings['glsl_types'] if len(expr) <= 4 and glsl_types: return 'vec%s(%s)' % (len(expr),l) else: return 'float[%s](%s)' % (len(expr),l) _print_tuple = _print_list _print_Tuple = _print_list def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] loopstart = "for (int %(varble)s=%(start)s; %(varble)s<%(end)s; %(varble)s++){" for i in indices: # GLSL arrays start at 0 and end at dimension-1 open_lines.append(loopstart % { 'varble': self._print(i.label), 'start': self._print(i.lower), 'end': self._print(i.upper + 1)}) close_lines.append("}") return open_lines, close_lines def _print_Function_with_args(self, func, func_args): if func in self.known_functions: cond_func = self.known_functions[func] func = None if isinstance(cond_func, string_types): func = cond_func else: for cond, func in cond_func: if cond(func_args): break if func is not None: try: return func([self.parenthesize(item, 0) for item in func_args]) except TypeError: return "%s(%s)" % (func, self.stringify(func_args, ", ")) elif isinstance(func, Lambda): # inlined function return self._print(func(func_args)) else: return self._print_not_supported(func) def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] if expr.has(Assignment): for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s) {" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines.append("else {") else: lines.append("else if (%s) {" % self._print(c)) code0 = self._print(e) lines.append(code0) lines.append("}") return "\n".join(lines) else: # The piecewise was used in an expression, need to do inline # operators. This has the downside that inline operators will # not work for statements that span multiple lines (Matrix or # Indexed expressions). ecpairs = ["((%s) ? (\n%s\n)\n" % (self._print(c), self._print(e)) for e, c in expr.args[:-1]] last_line = ": (\n%s\n)" % self._print(expr.args[-1].expr) return ": ".join(ecpairs) + last_line + " ".join([")"len(ecpairs)]) def _print_Idx(self, expr): return self._print(expr.label) def _print_Indexed(self, expr): # calculate index for 1d array dims = expr.shape elem = S.Zero offset = S.One for i in reversed(range(expr.rank)): elem += expr.indices[i]offset offset = dims[i] return "%s[%s]" % (self._print(expr.base.label), self._print(elem)) def _print_Pow(self, expr): PREC = precedence(expr) if expr.exp == -1: return '1.0/%s' % (self.parenthesize(expr.base, PREC)) elif expr.exp == 0.5: return 'sqrt(%s)' % self._print(expr.base) else: try: e = self._print(float(expr.exp)) except TypeError: e = self._print(expr.exp) # return self.known_functions['pow']+'(%s, %s)' % (self._print(expr.base),e) return self._print_Function_with_args('pow', ( self._print(expr.base), e )) def _print_int(self, expr): return str(float(expr)) def _print_Rational(self, expr): return "%s.0/%s.0" % (expr.p, expr.q) def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_Add(self, expr, order=None): if self._settings['use_operators']: return CodePrinter._print_Add(self, expr, order=order) terms = expr.as_ordered_terms() def partition(p,l): return reduce(lambda x, y: (x[0]+[y], x[1]) if p(y) else (x[0], x[1]+[y]), l, ([], [])) def add(a,b): return self._print_Function_with_args('add', (a, b)) # return self.known_functions['add']+'(%s, %s)' % (a,b) neg, pos = partition(lambda arg: _coeff_isneg(arg), terms) s = pos = reduce(lambda a,b: add(a,b), map(lambda t: self._print(t),pos)) if neg: # sum the absolute values of the negative terms neg = reduce(lambda a,b: add(a,b), map(lambda n: self._print(-n),neg)) # then subtract them from the positive terms s = self._print_Function_with_args('sub', (pos,neg)) # s = self.known_functions['sub']+'(%s, %s)' % (pos,neg) return s def _print_Mul(self, expr, kwargs): if self._settings['use_operators']: return CodePrinter._print_Mul(self, expr, kwargs) terms = expr.as_ordered_factors() def mul(a,b): # return self.known_functions['mul']+'(%s, %s)' % (a,b) return self._print_Function_with_args('mul', (a,b)) s = reduce(lambda a,b: mul(a,b), map(lambda t: self._print(t), terms)) return s def glsl_code(expr,assign_to=None,*settings): """Converts an expr to a string of GLSL code Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of line-wrapping, or for expressions that generate multi-line statements. use_operators: bool, optional If set to False, then ,/,+,- operators will be replaced with functions mul, add, and sub, which must be implemented by the user, e.g. for implementing non-standard rings or emulated quad/octal precision. [default=True] glsl_types: bool, optional Set this argument to ``False`` in order to avoid using the ``vec`` and ``mat`` types. The printer will instead use arrays (or nested arrays). [default=True] mat_nested: bool, optional GLSL version 4.3 and above support nested arrays (arrays of arrays). Set this to ``True`` to render matrices as nested arrays. [default=False] mat_separator: str, optional By default, matrices are rendered with newlines using this separator, making them easier to read, but less compact. By removing the newline this option can be used to make them more vertically compact. [default=',\n'] mat_transpose: bool, optional GLSL's matrix multiplication implementation assumes column-major indexing. By default, this printer ignores that convention. Setting this option to ``True`` transposes all matrix output. [default=False] precision : integer, optional The precision for numbers such as pi [default=15]. user_functions : dict, optional A dictionary where keys are ``FunctionClass`` instances and values are their string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, js_function_string)]. See below for examples. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. Examples ======== >>> from sympy import glsl_code, symbols, Rational, sin, ceiling, Abs >>> x, tau = symbols("x, tau") >>> glsl_code((2tau)Rational(7, 2)) '8sqrt(2)pow(tau, 3.5)' >>> glsl_code(sin(x), assign_to="float y") 'float y = sin(x);' Various GLSL types are supported: >>> from sympy import Matrix, glsl_code >>> glsl_code(Matrix([1,2,3])) 'vec3(1, 2, 3)' >>> glsl_code(Matrix([[1, 2],[3, 4]])) 'mat2(1, 2, 3, 4)' Pass ``mat_transpose = True`` to switch to column-major indexing: >>> glsl_code(Matrix([[1, 2],[3, 4]]), mat_transpose = True) 'mat2(1, 3, 2, 4)' By default, larger matrices get collapsed into float arrays: >>> print(glsl_code( Matrix([[1,2,3,4,5],[6,7,8,9,10]]) )) float[10]( 1, 2, 3, 4, 5, 6, 7, 8, 9, 10 ) / a 2x5 matrix / Passing ``mat_nested = True`` instead prints out nested float arrays, which are supported in GLSL 4.3 and above. >>> mat = Matrix([ ... [ 0, 1, 2], ... [ 3, 4, 5], ... [ 6, 7, 8], ... [ 9, 10, 11], ... [12, 13, 14]]) >>> print(glsl_code( mat, mat_nested = True )) float[5][3]( float[]( 0, 1, 2), float[]( 3, 4, 5), float[]( 6, 7, 8), float[]( 9, 10, 11), float[](12, 13, 14) ) Custom printing can be defined for certain types by passing a dictionary of "type" : "function" to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, js_function_string)]. >>> custom_functions = { ... "ceiling": "CEIL", ... "Abs": [(lambda x: not x.is_integer, "fabs"), ... (lambda x: x.is_integer, "ABS")] ... } >>> glsl_code(Abs(x) + ceiling(x), user_functions=custom_functions) 'fabs(x) + CEIL(x)' If further control is needed, addition, subtraction, multiplication and division operators can be replaced with ``add``, ``sub``, and ``mul`` functions. This is done by passing ``use_operators = False``: >>> x,y,z = symbols('x,y,z') >>> glsl_code(x(y+z), use_operators = False) 'mul(x, add(y, z))' >>> glsl_code(x(y+z(x-y)z), use_operators = False) 'mul(x, add(y, mul(z, pow(sub(x, y), z))))' ``Piecewise`` expressions are converted into conditionals. If an ``assign_to`` variable is provided an if statement is created, otherwise the ternary operator is used. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> expr = Piecewise((x + 1, x > 0), (x, True)) >>> print(glsl_code(expr, tau)) if (x > 0) { tau = x + 1; } else { tau = x; } Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> glsl_code(e.rhs, assign_to=e.lhs, contract=False) 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([x2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) >>> A = MatrixSymbol('A', 3, 1) >>> print(glsl_code(mat, A)) A[0][0] = pow(x, 2.0); if (x > 0) { A[1][0] = x + 1; } else { A[1][0] = x; } A[2][0] = sin(x); """ return GLSLPrinter(settings).doprint(expr,assign_to) def print_glsl(expr, settings): """Prints the GLSL representation of the given expression. See GLSLPrinter init function for settings. """ print(glsl_code(expr, settings))
e22cdc9f25dd0e606da4c5d28439e31b31a84edf9cb3f870e09b0f1780f38ed0	from __future__ import print_function, division from sympy.concrete.expr_with_limits import AddWithLimits from sympy.core.add import Add from sympy.core.basic import Basic from sympy.core.compatibility import is_sequence from sympy.core.containers import Tuple from sympy.core.expr import Expr from sympy.core.function import diff from sympy.core.logic import fuzzy_bool from sympy.core.mul import Mul from sympy.core.numbers import oo, pi from sympy.core.relational import Ne from sympy.core.singleton import S from sympy.core.symbol import (Dummy, Symbol, Wild) from sympy.core.sympify import sympify from sympy.functions import Piecewise, sqrt, piecewise_fold, tan, cot, atan from sympy.functions.elementary.exponential import log from sympy.functions.elementary.integers import floor from sympy.functions.elementary.complexes import Abs, sign from sympy.functions.elementary.miscellaneous import Min, Max from sympy.integrals.manualintegrate import manualintegrate from sympy.integrals.trigonometry import trigintegrate from sympy.integrals.meijerint import meijerint_definite, meijerint_indefinite from sympy.matrices import MatrixBase from sympy.polys import Poly, PolynomialError from sympy.series import limit from sympy.series.order import Order from sympy.series.formal import FormalPowerSeries from sympy.simplify.fu import sincos_to_sum from sympy.utilities.misc import filldedent class Integral(AddWithLimits): """Represents unevaluated integral.""" __slots__ = ['is_commutative'] def __new__(cls, function, symbols, assumptions): """Create an unevaluated integral. Arguments are an integrand followed by one or more limits. If no limits are given and there is only one free symbol in the expression, that symbol will be used, otherwise an error will be raised. >>> from sympy import Integral >>> from sympy.abc import x, y >>> Integral(x) Integral(x, x) >>> Integral(y) Integral(y, y) When limits are provided, they are interpreted as follows (using ``x`` as though it were the variable of integration): (x,) or x - indefinite integral (x, a) - "evaluate at" integral is an abstract antiderivative (x, a, b) - definite integral The ``as_dummy`` method can be used to see which symbols cannot be targeted by subs: those with a prepended underscore cannot be changed with ``subs``. (Also, the integration variables themselves -- the first element of a limit -- can never be changed by subs.) >>> i = Integral(x, x) >>> at = Integral(x, (x, x)) >>> i.as_dummy() Integral(x, x) >>> at.as_dummy() Integral(_0, (_0, x)) """ #This will help other classes define their own definitions #of behaviour with Integral. if hasattr(function, '_eval_Integral'): return function._eval_Integral(symbols, *assumptions) obj = AddWithLimits.__new__(cls, function, symbols, *assumptions) return obj def __getnewargs__(self): return (self.function,) + tuple([tuple(xab) for xab in self.limits]) @property def free_symbols(self): """ This method returns the symbols that will exist when the integral is evaluated. This is useful if one is trying to determine whether an integral depends on a certain symbol or not. Examples ======== >>> from sympy import Integral >>> from sympy.abc import x, y >>> Integral(x, (x, y, 1)).free_symbols {y} See Also ======== function, limits, variables """ return AddWithLimits.free_symbols.fget(self) def _eval_is_zero(self): # This is a very naive and quick test, not intended to do the integral to # answer whether it is zero or not, e.g. Integral(sin(x), (x, 0, 2pi)) # is zero but this routine should return None for that case. But, like # Mul, there are trivial situations for which the integral will be # zero so we check for those. if self.function.is_zero: return True got_none = False for l in self.limits: if len(l) == 3: z = (l[1] == l[2]) or (l[1] - l[2]).is_zero if z: return True elif z is None: got_none = True free = self.function.free_symbols for xab in self.limits: if len(xab) == 1: free.add(xab[0]) continue if len(xab) == 2 and xab[0] not in free: if xab[1].is_zero: return True elif xab[1].is_zero is None: got_none = True # take integration symbol out of free since it will be replaced # with the free symbols in the limits free.discard(xab[0]) # add in the new symbols for i in xab[1:]: free.update(i.free_symbols) if self.function.is_zero is False and got_none is False: return False def transform(self, x, u): r""" Performs a change of variables from `x` to `u` using the relationship given by `x` and `u` which will define the transformations `f` and `F` (which are inverses of each other) as follows: 1) If `x` is a Symbol (which is a variable of integration) then `u` will be interpreted as some function, f(u), with inverse F(u). This, in effect, just makes the substitution of x with f(x). 2) If `u` is a Symbol then `x` will be interpreted as some function, F(x), with inverse f(u). This is commonly referred to as u-substitution. Once f and F have been identified, the transformation is made as follows: .. math:: \int_a^b x \mathrm{d}x \rightarrow \int_{F(a)}^{F(b)} f(x) \frac{\mathrm{d}}{\mathrm{d}x} where `F(x)` is the inverse of `f(x)` and the limits and integrand have been corrected so as to retain the same value after integration. Notes ===== The mappings, F(x) or f(u), must lead to a unique integral. Linear or rational linear expression, `2x`, `1/x` and `sqrt(x)`, will always work; quadratic expressions like `x2 - 1` are acceptable as long as the resulting integrand does not depend on the sign of the solutions (see examples). The integral will be returned unchanged if `x` is not a variable of integration. `x` must be (or contain) only one of of the integration variables. If `u` has more than one free symbol then it should be sent as a tuple (`u`, `uvar`) where `uvar` identifies which variable is replacing the integration variable. XXX can it contain another integration variable? Examples ======== >>> from sympy.abc import a, b, c, d, x, u, y >>> from sympy import Integral, S, cos, sqrt >>> i = Integral(xcos(x*2 - 1), (x, 0, 1)) transform can change the variable of integration >>> i.transform(x, u) Integral(ucos(u2 - 1), (u, 0, 1)) transform can perform u-substitution as long as a unique integrand is obtained: >>> i.transform(x2 - 1, u) Integral(cos(u)/2, (u, -1, 0)) This attempt fails because x = +/-sqrt(u + 1) and the sign does not cancel out of the integrand: >>> Integral(cos(x2 - 1), (x, 0, 1)).transform(x2 - 1, u) Traceback (most recent call last): ... ValueError: The mapping between F(x) and f(u) did not give a unique integrand. transform can do a substitution. Here, the previous result is transformed back into the original expression using "u-substitution": >>> ui = _ >>> _.transform(sqrt(u + 1), x) == i True We can accomplish the same with a regular substitution: >>> ui.transform(u, x*2 - 1) == i True If the `x` does not contain a symbol of integration then the integral will be returned unchanged. Integral `i` does not have an integration variable `a` so no change is made: >>> i.transform(a, x) == i True When `u` has more than one free symbol the symbol that is replacing `x` must be identified by passing `u` as a tuple: >>> Integral(x, (x, 0, 1)).transform(x, (u + a, u)) Integral(a + u, (u, -a, 1 - a)) >>> Integral(x, (x, 0, 1)).transform(x, (u + a, a)) Integral(a + u, (a, -u, 1 - u)) See Also ======== variables : Lists the integration variables as_dummy : Replace integration variables with dummy ones """ from sympy.solvers.solvers import solve, posify d = Dummy('d') xfree = x.free_symbols.intersection(self.variables) if len(xfree) > 1: raise ValueError( 'F(x) can only contain one of: %s' % self.variables) xvar = xfree.pop() if xfree else d if xvar not in self.variables: return self u = sympify(u) if isinstance(u, Expr): ufree = u.free_symbols if len(ufree) == 0: raise ValueError(filldedent(''' f(u) cannot be a constant''')) if len(ufree) > 1: raise ValueError(filldedent(''' When f(u) has more than one free symbol, the one replacing x must be identified: pass f(u) as (f(u), u)''')) uvar = ufree.pop() else: u, uvar = u if uvar not in u.free_symbols: raise ValueError(filldedent(''' Expecting a tuple (expr, symbol) where symbol identified a free symbol in expr, but symbol is not in expr's free symbols.''')) if not isinstance(uvar, Symbol): # This probably never evaluates to True raise ValueError(filldedent(''' Expecting a tuple (expr, symbol) but didn't get a symbol; got %s''' % uvar)) if x.is_Symbol and u.is_Symbol: return self.xreplace({x: u}) if not x.is_Symbol and not u.is_Symbol: raise ValueError('either x or u must be a symbol') if uvar == xvar: return self.transform(x, (u.subs(uvar, d), d)).xreplace({d: uvar}) if uvar in self.limits: raise ValueError(filldedent(''' u must contain the same variable as in x or a variable that is not already an integration variable''')) if not x.is_Symbol: F = [x.subs(xvar, d)] soln = solve(u - x, xvar, check=False) if not soln: raise ValueError('no solution for solve(F(x) - f(u), x)') f = [fi.subs(uvar, d) for fi in soln] else: f = [u.subs(uvar, d)] pdiff, reps = posify(u - x) puvar = uvar.subs([(v, k) for k, v in reps.items()]) soln = [s.subs(reps) for s in solve(pdiff, puvar)] if not soln: raise ValueError('no solution for solve(F(x) - f(u), u)') F = [fi.subs(xvar, d) for fi in soln] newfuncs = set([(self.function.subs(xvar, fi)fi.diff(d) ).subs(d, uvar) for fi in f]) if len(newfuncs) > 1: raise ValueError(filldedent(''' The mapping between F(x) and f(u) did not give a unique integrand.''')) newfunc = newfuncs.pop() def _calc_limit_1(F, a, b): """ replace d with a, using subs if possible, otherwise limit where sign of b is considered """ wok = F.subs(d, a) if wok is S.NaN or wok.is_finite is False and a.is_finite: return limit(sign(b)F, d, a) return wok def _calc_limit(a, b): """ replace d with a, using subs if possible, otherwise limit where sign of b is considered """ avals = list({_calc_limit_1(Fi, a, b) for Fi in F}) if len(avals) > 1: raise ValueError(filldedent(''' The mapping between F(x) and f(u) did not give a unique limit.''')) return avals[0] newlimits = [] for xab in self.limits: sym = xab[0] if sym == xvar: if len(xab) == 3: a, b = xab[1:] a, b = _calc_limit(a, b), _calc_limit(b, a) if fuzzy_bool(a - b > 0): a, b = b, a newfunc = -newfunc newlimits.append((uvar, a, b)) elif len(xab) == 2: a = _calc_limit(xab[1], 1) newlimits.append((uvar, a)) else: newlimits.append(uvar) else: newlimits.append(xab) return self.func(newfunc, newlimits) def doit(self, hints): """ Perform the integration using any hints given. Examples ======== >>> from sympy import Integral, Piecewise, S >>> from sympy.abc import x, t >>> p = x2 + Piecewise((0, x/t < 0), (1, True)) >>> p.integrate((t, S(4)/5, 1), (x, -1, 1)) 1/3 See Also ======== sympy.integrals.trigonometry.trigintegrate sympy.integrals.risch.heurisch sympy.integrals.rationaltools.ratint as_sum : Approximate the integral using a sum """ if not hints.get('integrals', True): return self deep = hints.get('deep', True) meijerg = hints.get('meijerg', None) conds = hints.get('conds', 'piecewise') risch = hints.get('risch', None) heurisch = hints.get('heurisch', None) manual = hints.get('manual', None) if len(list(filter(None, (manual, meijerg, risch, heurisch)))) > 1: raise ValueError("At most one of manual, meijerg, risch, heurisch can be True") elif manual: meijerg = risch = heurisch = False elif meijerg: manual = risch = heurisch = False elif risch: manual = meijerg = heurisch = False elif heurisch: manual = meijerg = risch = False eval_kwargs = dict(meijerg=meijerg, risch=risch, manual=manual, heurisch=heurisch, conds=conds) if conds not in ['separate', 'piecewise', 'none']: raise ValueError('conds must be one of "separate", "piecewise", ' '"none", got: %s' % conds) if risch and any(len(xab) > 1 for xab in self.limits): raise ValueError('risch=True is only allowed for indefinite integrals.') # check for the trivial zero if self.is_zero: return S.Zero # now compute and check the function function = self.function if deep: function = function.doit(hints) if function.is_zero: return S.Zero # hacks to handle special cases if isinstance(function, MatrixBase): return function.applyfunc( lambda f: self.func(f, self.limits).doit(hints)) if isinstance(function, FormalPowerSeries): if len(self.limits) > 1: raise NotImplementedError xab = self.limits[0] if len(xab) > 1: return function.integrate(xab, eval_kwargs) else: return function.integrate(xab[0], eval_kwargs) # There is no trivial answer and special handling # is done so continue # first make sure any definite limits have integration # variables with matching assumptions reps = {} for xab in self.limits: if len(xab) != 3: continue x, a, b = xab l = (a, b) if all(i.is_nonnegative for i in l) and not x.is_nonnegative: d = Dummy(positive=True) elif all(i.is_nonpositive for i in l) and not x.is_nonpositive: d = Dummy(negative=True) elif all(i.is_real for i in l) and not x.is_real: d = Dummy(real=True) else: d = None if d: reps[x] = d if reps: undo = dict([(v, k) for k, v in reps.items()]) did = self.xreplace(reps).doit(*hints) if type(did) is tuple: # when separate=True did = tuple([i.xreplace(undo) for i in did]) else: did = did.xreplace(undo) return did # continue with existing assumptions undone_limits = [] # ulj = free symbols of any undone limits' upper and lower limits ulj = set() for xab in self.limits: # compute uli, the free symbols in the # Upper and Lower limits of limit I if len(xab) == 1: uli = set(xab[:1]) elif len(xab) == 2: uli = xab[1].free_symbols elif len(xab) == 3: uli = xab[1].free_symbols.union(xab[2].free_symbols) # this integral can be done as long as there is no blocking # limit that has been undone. An undone limit is blocking if # it contains an integration variable that is in this limit's # upper or lower free symbols or vice versa if xab[0] in ulj or any(v[0] in uli for v in undone_limits): undone_limits.append(xab) ulj.update(uli) function = self.func(([function] + [xab])) factored_function = function.factor() if not isinstance(factored_function, Integral): function = factored_function continue if function.has(Abs, sign) and ( (len(xab) < 3 and all(x.is_extended_real for x in xab)) or (len(xab) == 3 and all(x.is_extended_real and not x.is_infinite for x in xab[1:]))): # some improper integrals are better off with Abs xr = Dummy("xr", real=True) function = (function.xreplace({xab[0]: xr}) .rewrite(Piecewise).xreplace({xr: xab[0]})) elif function.has(Min, Max): function = function.rewrite(Piecewise) if (function.has(Piecewise) and not isinstance(function, Piecewise)): function = piecewise_fold(function) if isinstance(function, Piecewise): if len(xab) == 1: antideriv = function._eval_integral(xab[0], eval_kwargs) else: antideriv = self._eval_integral( function, xab[0], eval_kwargs) else: # There are a number of tradeoffs in using the # Meijer G method. It can sometimes be a lot faster # than other methods, and sometimes slower. And # there are certain types of integrals for which it # is more likely to work than others. These # heuristics are incorporated in deciding what # integration methods to try, in what order. See the # integrate() docstring for details. def try_meijerg(function, xab): ret = None if len(xab) == 3 and meijerg is not False: x, a, b = xab try: res = meijerint_definite(function, x, a, b) except NotImplementedError: from sympy.integrals.meijerint import _debug _debug('NotImplementedError ' 'from meijerint_definite') res = None if res is not None: f, cond = res if conds == 'piecewise': ret = Piecewise( (f, cond), (self.func( function, (x, a, b)), True)) elif conds == 'separate': if len(self.limits) != 1: raise ValueError(filldedent(''' conds=separate not supported in multiple integrals''')) ret = f, cond else: ret = f return ret meijerg1 = meijerg if (meijerg is not False and len(xab) == 3 and xab[1].is_extended_real and xab[2].is_extended_real and not function.is_Poly and (xab[1].has(oo, -oo) or xab[2].has(oo, -oo))): ret = try_meijerg(function, xab) if ret is not None: function = ret continue meijerg1 = False # If the special meijerg code did not succeed in # finding a definite integral, then the code using # meijerint_indefinite will not either (it might # find an antiderivative, but the answer is likely # to be nonsensical). Thus if we are requested to # only use Meijer G-function methods, we give up at # this stage. Otherwise we just disable G-function # methods. if meijerg1 is False and meijerg is True: antideriv = None else: antideriv = self._eval_integral( function, xab[0], *eval_kwargs) if antideriv is None and meijerg is True: ret = try_meijerg(function, xab) if ret is not None: function = ret continue if not isinstance(antideriv, Integral) and antideriv is not None: sym = xab[0] for atan_term in antideriv.atoms(atan): atan_arg = atan_term.args[0] # Checking `atan_arg` to be linear combination of `tan` or `cot` for tan_part in atan_arg.atoms(tan): x1 = Dummy('x1') tan_exp1 = atan_arg.subs(tan_part, x1) # The coefficient of `tan` should be constant coeff = tan_exp1.diff(x1) if x1 not in coeff.free_symbols: a = tan_part.args[0] antideriv = antideriv.subs(atan_term, Add(atan_term, sign(coeff)pifloor((a-pi/2)/pi))) for cot_part in atan_arg.atoms(cot): x1 = Dummy('x1') cot_exp1 = atan_arg.subs(cot_part, x1) # The coefficient of `cot` should be constant coeff = cot_exp1.diff(x1) if x1 not in coeff.free_symbols: a = cot_part.args[0] antideriv = antideriv.subs(atan_term, Add(atan_term, sign(coeff)pifloor((a)/pi))) if antideriv is None: undone_limits.append(xab) function = self.func(([function] + [xab])).factor() factored_function = function.factor() if not isinstance(factored_function, Integral): function = factored_function continue else: if len(xab) == 1: function = antideriv else: if len(xab) == 3: x, a, b = xab elif len(xab) == 2: x, b = xab a = None else: raise NotImplementedError if deep: if isinstance(a, Basic): a = a.doit(hints) if isinstance(b, Basic): b = b.doit(hints) if antideriv.is_Poly: gens = list(antideriv.gens) gens.remove(x) antideriv = antideriv.as_expr() function = antideriv._eval_interval(x, a, b) function = Poly(function, gens) else: def is_indef_int(g, x): return (isinstance(g, Integral) and any(i == (x,) for i in g.limits)) def eval_factored(f, x, a, b): # _eval_interval for integrals with # (constant) factors # a single indefinite integral is assumed args = [] for g in Mul.make_args(f): if is_indef_int(g, x): args.append(g._eval_interval(x, a, b)) else: args.append(g) return Mul(args) integrals, others, piecewises = [], [], [] for f in Add.make_args(antideriv): if any(is_indef_int(g, x) for g in Mul.make_args(f)): integrals.append(f) elif any(isinstance(g, Piecewise) for g in Mul.make_args(f)): piecewises.append(piecewise_fold(f)) else: others.append(f) uneval = Add([eval_factored(f, x, a, b) for f in integrals]) try: evalued = Add(others)._eval_interval(x, a, b) evalued_pw = piecewise_fold(Add(piecewises))._eval_interval(x, a, b) function = uneval + evalued + evalued_pw except NotImplementedError: # This can happen if _eval_interval depends in a # complicated way on limits that cannot be computed undone_limits.append(xab) function = self.func(([function] + [xab])) factored_function = function.factor() if not isinstance(factored_function, Integral): function = factored_function return function def _eval_derivative(self, sym): """Evaluate the derivative of the current Integral object by differentiating under the integral sign [1], using the Fundamental Theorem of Calculus [2] when possible. Whenever an Integral is encountered that is equivalent to zero or has an integrand that is independent of the variable of integration those integrals are performed. All others are returned as Integral instances which can be resolved with doit() (provided they are integrable). References: [1] https://en.wikipedia.org/wiki/Differentiation_under_the_integral_sign [2] https://en.wikipedia.org/wiki/Fundamental_theorem_of_calculus Examples ======== >>> from sympy import Integral >>> from sympy.abc import x, y >>> i = Integral(x + y, y, (y, 1, x)) >>> i.diff(x) Integral(x + y, (y, x)) + Integral(1, y, (y, 1, x)) >>> i.doit().diff(x) == i.diff(x).doit() True >>> i.diff(y) 0 The previous must be true since there is no y in the evaluated integral: >>> i.free_symbols {x} >>> i.doit() 2x3/3 - x/2 - 1/6 """ # differentiate under the integral sign; we do not # check for regularity conditions (TODO), see issue 4215 # get limits and the function f, limits = self.function, list(self.limits) # the order matters if variables of integration appear in the limits # so work our way in from the outside to the inside. limit = limits.pop(-1) if len(limit) == 3: x, a, b = limit elif len(limit) == 2: x, b = limit a = None else: a = b = None x = limit[0] if limits: # f is the argument to an integral f = self.func(f, tuple(limits)) # assemble the pieces def _do(f, ab): dab_dsym = diff(ab, sym) if not dab_dsym: return S.Zero if isinstance(f, Integral): limits = [(x, x) if (len(l) == 1 and l[0] == x) else l for l in f.limits] f = self.func(f.function, limits) return f.subs(x, ab)dab_dsym rv = S.Zero if b is not None: rv += _do(f, b) if a is not None: rv -= _do(f, a) if len(limit) == 1 and sym == x: # the dummy variable is also the real-world variable arg = f rv += arg else: # the dummy variable might match sym but it's # only a dummy and the actual variable is determined # by the limits, so mask off the variable of integration # while differentiating u = Dummy('u') arg = f.subs(x, u).diff(sym).subs(u, x) if arg: rv += self.func(arg, Tuple(x, a, b)) return rv def _eval_integral(self, f, x, meijerg=None, risch=None, manual=None, heurisch=None, conds='piecewise'): """ Calculate the anti-derivative to the function f(x). The following algorithms are applied (roughly in this order): 1. Simple heuristics (based on pattern matching and integral table): - most frequently used functions (e.g. polynomials, products of trig functions) 2. Integration of rational functions: - A complete algorithm for integrating rational functions is implemented (the Lazard-Rioboo-Trager algorithm). The algorithm also uses the partial fraction decomposition algorithm implemented in apart() as a preprocessor to make this process faster. Note that the integral of a rational function is always elementary, but in general, it may include a RootSum. 3. Full Risch algorithm: - The Risch algorithm is a complete decision procedure for integrating elementary functions, which means that given any elementary function, it will either compute an elementary antiderivative, or else prove that none exists. Currently, part of transcendental case is implemented, meaning elementary integrals containing exponentials, logarithms, and (soon!) trigonometric functions can be computed. The algebraic case, e.g., functions containing roots, is much more difficult and is not implemented yet. - If the routine fails (because the integrand is not elementary, or because a case is not implemented yet), it continues on to the next algorithms below. If the routine proves that the integrals is nonelementary, it still moves on to the algorithms below, because we might be able to find a closed-form solution in terms of special functions. If risch=True, however, it will stop here. 4. The Meijer G-Function algorithm: - This algorithm works by first rewriting the integrand in terms of very general Meijer G-Function (meijerg in SymPy), integrating it, and then rewriting the result back, if possible. This algorithm is particularly powerful for definite integrals (which is actually part of a different method of Integral), since it can compute closed-form solutions of definite integrals even when no closed-form indefinite integral exists. But it also is capable of computing many indefinite integrals as well. - Another advantage of this method is that it can use some results about the Meijer G-Function to give a result in terms of a Piecewise expression, which allows to express conditionally convergent integrals. - Setting meijerg=True will cause integrate() to use only this method. 5. The "manual integration" algorithm: - This algorithm tries to mimic how a person would find an antiderivative by hand, for example by looking for a substitution or applying integration by parts. This algorithm does not handle as many integrands but can return results in a more familiar form. - Sometimes this algorithm can evaluate parts of an integral; in this case integrate() will try to evaluate the rest of the integrand using the other methods here. - Setting manual=True will cause integrate() to use only this method. 6. The Heuristic Risch algorithm: - This is a heuristic version of the Risch algorithm, meaning that it is not deterministic. This is tried as a last resort because it can be very slow. It is still used because not enough of the full Risch algorithm is implemented, so that there are still some integrals that can only be computed using this method. The goal is to implement enough of the Risch and Meijer G-function methods so that this can be deleted. Setting heurisch=True will cause integrate() to use only this method. Set heurisch=False to not use it. """ from sympy.integrals.deltafunctions import deltaintegrate from sympy.integrals.singularityfunctions import singularityintegrate from sympy.integrals.heurisch import heurisch as heurisch_, heurisch_wrapper from sympy.integrals.rationaltools import ratint from sympy.integrals.risch import risch_integrate if risch: try: return risch_integrate(f, x, conds=conds) except NotImplementedError: return None if manual: try: result = manualintegrate(f, x) if result is not None and result.func != Integral: return result except (ValueError, PolynomialError): pass eval_kwargs = dict(meijerg=meijerg, risch=risch, manual=manual, heurisch=heurisch, conds=conds) # if it is a poly(x) then let the polynomial integrate itself (fast) # # It is important to make this check first, otherwise the other code # will return a sympy expression instead of a Polynomial. # # see Polynomial for details. if isinstance(f, Poly) and not (manual or meijerg or risch): return f.integrate(x) # Piecewise antiderivatives need to call special integrate. if isinstance(f, Piecewise): return f.piecewise_integrate(x, *eval_kwargs) # let's cut it short if `f` does not depend on `x`; if # x is only a dummy, that will be handled below if not f.has(x): return fx # try to convert to poly(x) and then integrate if successful (fast) poly = f.as_poly(x) if poly is not None and not (manual or meijerg or risch): return poly.integrate().as_expr() if risch is not False: try: result, i = risch_integrate(f, x, separate_integral=True, conds=conds) except NotImplementedError: pass else: if i: # There was a nonelementary integral. Try integrating it. # if no part of the NonElementaryIntegral is integrated by # the Risch algorithm, then use the original function to # integrate, instead of re-written one if result == 0: from sympy.integrals.risch import NonElementaryIntegral return NonElementaryIntegral(f, x).doit(risch=False) else: return result + i.doit(risch=False) else: return result # since Integral(f=g1+g2+...) == Integral(g1) + Integral(g2) + ... # we are going to handle Add terms separately, # if `f` is not Add -- we only have one term # Note that in general, this is a bad idea, because Integral(g1) + # Integral(g2) might not be computable, even if Integral(g1 + g2) is. # For example, Integral(xx + xxlog(x)). But many heuristics only # work term-wise. So we compute this step last, after trying # risch_integrate. We also try risch_integrate again in this loop, # because maybe the integral is a sum of an elementary part and a # nonelementary part (like erf(x) + exp(x)). risch_integrate() is # quite fast, so this is acceptable. parts = [] args = Add.make_args(f) for g in args: coeff, g = g.as_independent(x) # g(x) = const if g is S.One and not meijerg: parts.append(coeffx) continue # g(x) = expr + O(xn) order_term = g.getO() if order_term is not None: h = self._eval_integral(g.removeO(), x, eval_kwargs) if h is not None: h_order_expr = self._eval_integral(order_term.expr, x, *eval_kwargs) if h_order_expr is not None: h_order_term = order_term.func( h_order_expr, order_term.variables) parts.append(coeff(h + h_order_term)) continue # NOTE: if there is O(xn) and we fail to integrate then # there is no point in trying other methods because they # will fail, too. return None # c # g(x) = (ax+b) if g.is_Pow and not g.exp.has(x) and not meijerg: a = Wild('a', exclude=[x]) b = Wild('b', exclude=[x]) M = g.base.match(ax + b) if M is not None: if g.exp == -1: h = log(g.base) elif conds != 'piecewise': h = g.base(g.exp + 1) / (g.exp + 1) else: h1 = log(g.base) h2 = g.base(g.exp + 1) / (g.exp + 1) h = Piecewise((h2, Ne(g.exp, -1)), (h1, True)) parts.append(coeff h / M[a]) continue # poly(x) # g(x) = ------- # poly(x) if g.is_rational_function(x) and not (manual or meijerg or risch): parts.append(coeff * ratint(g, x)) continue if not (manual or meijerg or risch): # g(x) = Mul(trig) h = trigintegrate(g, x, conds=conds) if h is not None: parts.append(coeff * h) continue # g(x) has at least a DiracDelta term h = deltaintegrate(g, x) if h is not None: parts.append(coeff * h) continue # g(x) has at least a Singularity Function term h = singularityintegrate(g, x) if h is not None: parts.append(coeff * h) continue # Try risch again. if risch is not False: try: h, i = risch_integrate(g, x, separate_integral=True, conds=conds) except NotImplementedError: h = None else: if i: h = h + i.doit(risch=False) parts.append(coeffh) continue # fall back to heurisch if heurisch is not False: try: if conds == 'piecewise': h = heurisch_wrapper(g, x, hints=[]) else: h = heurisch_(g, x, hints=[]) except PolynomialError: # XXX: this exception means there is a bug in the # implementation of heuristic Risch integration # algorithm. h = None else: h = None if meijerg is not False and h is None: # rewrite using G functions try: h = meijerint_indefinite(g, x) except NotImplementedError: from sympy.integrals.meijerint import _debug _debug('NotImplementedError from meijerint_definite') res = None if h is not None: parts.append(coeff h) continue if h is None and manual is not False: try: result = manualintegrate(g, x) if result is not None and not isinstance(result, Integral): if result.has(Integral) and not manual: # Try to have other algorithms do the integrals # manualintegrate can't handle, # unless we were asked to use manual only. # Keep the rest of eval_kwargs in case another # method was set to False already new_eval_kwargs = eval_kwargs new_eval_kwargs["manual"] = False result = result.func([ arg.doit(new_eval_kwargs) if arg.has(Integral) else arg for arg in result.args ]).expand(multinomial=False, log=False, power_exp=False, power_base=False) if not result.has(Integral): parts.append(coeff result) continue except (ValueError, PolynomialError): # can't handle some SymPy expressions pass # if we failed maybe it was because we had # a product that could have been expanded, # so let's try an expansion of the whole # thing before giving up; we don't try this # at the outset because there are things # that cannot be solved unless they are # NOT expanded e.g., x*x(1+log(x)). There # should probably be a checker somewhere in this # routine to look for such cases and try to do # collection on the expressions if they are already # in an expanded form if not h and len(args) == 1: f = sincos_to_sum(f).expand(mul=True, deep=False) if f.is_Add: # Note: risch will be identical on the expanded # expression, but maybe it will be able to pick out parts, # like x(exp(x) + erf(x)). return self._eval_integral(f, x, eval_kwargs) if h is not None: parts.append(coeff h) else: return None return Add(parts) def _eval_lseries(self, x, logx): expr = self.as_dummy() symb = x for l in expr.limits: if x in l[1:]: symb = l[0] break for term in expr.function.lseries(symb, logx): yield integrate(term, expr.limits) def _eval_nseries(self, x, n, logx): expr = self.as_dummy() symb = x for l in expr.limits: if x in l[1:]: symb = l[0] break terms, order = expr.function.nseries( x=symb, n=n, logx=logx).as_coeff_add(Order) order = [o.subs(symb, x) for o in order] return integrate(terms, expr.limits) + Add(order)x def _eval_as_leading_term(self, x): series_gen = self.args[0].lseries(x) for leading_term in series_gen: if leading_term != 0: break return integrate(leading_term, self.args[1:]) def _eval_simplify(self, *kwargs): from sympy.core.exprtools import factor_terms from sympy.simplify.simplify import simplify expr = factor_terms(self) if isinstance(expr, Integral): return expr.func([simplify(i, kwargs) for i in expr.args]) return expr.simplify(kwargs) def as_sum(self, n=None, method="midpoint", evaluate=True): """ Approximates a definite integral by a sum. Arguments --------- n The number of subintervals to use, optional. method One of: 'left', 'right', 'midpoint', 'trapezoid'. evaluate If False, returns an unevaluated Sum expression. The default is True, evaluate the sum. These methods of approximate integration are described in [1]. [1] https://en.wikipedia.org/wiki/Riemann_sum#Methods Examples ======== >>> from sympy import sin, sqrt >>> from sympy.abc import x, n >>> from sympy.integrals import Integral >>> e = Integral(sin(x), (x, 3, 7)) >>> e Integral(sin(x), (x, 3, 7)) For demonstration purposes, this interval will only be split into 2 regions, bounded by [3, 5] and [5, 7]. The left-hand rule uses function evaluations at the left of each interval: >>> e.as_sum(2, 'left') 2sin(5) + 2sin(3) The midpoint rule uses evaluations at the center of each interval: >>> e.as_sum(2, 'midpoint') 2sin(4) + 2sin(6) The right-hand rule uses function evaluations at the right of each interval: >>> e.as_sum(2, 'right') 2sin(5) + 2sin(7) The trapezoid rule uses function evaluations on both sides of the intervals. This is equivalent to taking the average of the left and right hand rule results: >>> e.as_sum(2, 'trapezoid') 2sin(5) + sin(3) + sin(7) >>> (e.as_sum(2, 'left') + e.as_sum(2, 'right'))/2 == _ True Here, the discontinuity at x = 0 can be avoided by using the midpoint or right-hand method: >>> e = Integral(1/sqrt(x), (x, 0, 1)) >>> e.as_sum(5).n(4) 1.730 >>> e.as_sum(10).n(4) 1.809 >>> e.doit().n(4) # the actual value is 2 2.000 The left- or trapezoid method will encounter the discontinuity and return infinity: >>> e.as_sum(5, 'left') zoo The number of intervals can be symbolic. If omitted, a dummy symbol will be used for it. >>> e = Integral(x2, (x, 0, 2)) >>> e.as_sum(n, 'right').expand() 8/3 + 4/n + 4/(3n*2) This shows that the midpoint rule is more accurate, as its error term decays as the square of n: >>> e.as_sum(method='midpoint').expand() 8/3 - 2/(3_n*2) A symbolic sum is returned with evaluate=False: >>> e.as_sum(n, 'midpoint', evaluate=False) 2Sum((2_k/n - 1/n)2, (_k, 1, n))/n See Also ======== Integral.doit : Perform the integration using any hints """ from sympy.concrete.summations import Sum limits = self.limits if len(limits) > 1: raise NotImplementedError( "Multidimensional midpoint rule not implemented yet") else: limit = limits[0] if (len(limit) != 3 or limit[1].is_finite is False or limit[2].is_finite is False): raise ValueError("Expecting a definite integral over " "a finite interval.") if n is None: n = Dummy('n', integer=True, positive=True) else: n = sympify(n) if (n.is_positive is False or n.is_integer is False or n.is_finite is False): raise ValueError("n must be a positive integer, got %s" % n) x, a, b = limit dx = (b - a)/n k = Dummy('k', integer=True, positive=True) f = self.function if method == "left": result = dxSum(f.subs(x, a + (k-1)dx), (k, 1, n)) elif method == "right": result = dxSum(f.subs(x, a + kdx), (k, 1, n)) elif method == "midpoint": result = dxSum(f.subs(x, a + kdx - dx/2), (k, 1, n)) elif method == "trapezoid": result = dx((f.subs(x, a) + f.subs(x, b))/2 + Sum(f.subs(x, a + kdx), (k, 1, n - 1))) else: raise ValueError("Unknown method %s" % method) return result.doit() if evaluate else result def _sage_(self): import sage.all as sage f, limits = self.function._sage_(), list(self.limits) for limit in limits: if len(limit) == 1: x = limit[0] f = sage.integral(f, x._sage_(), hold=True) elif len(limit) == 2: x, b = limit f = sage.integral(f, x._sage_(), b._sage_(), hold=True) else: x, a, b = limit f = sage.integral(f, (x._sage_(), a._sage_(), b._sage_()), hold=True) return f def principal_value(self, kwargs): """ Compute the Cauchy Principal Value of the definite integral of a real function in the given interval on the real axis. In mathematics, the Cauchy principal value, is a method for assigning values to certain improper integrals which would otherwise be undefined. Examples ======== >>> from sympy import Dummy, symbols, integrate, limit, oo >>> from sympy.integrals.integrals import Integral >>> from sympy.calculus.singularities import singularities >>> x = symbols('x') >>> Integral(x+1, (x, -oo, oo)).principal_value() oo >>> f = 1 / (x3) >>> Integral(f, (x, -oo, oo)).principal_value() 0 >>> Integral(f, (x, -10, 10)).principal_value() 0 >>> Integral(f, (x, -10, oo)).principal_value() + Integral(f, (x, -oo, 10)).principal_value() 0 References ========== .. [1] https://en.wikipedia.org/wiki/Cauchy_principal_value .. [2] http://mathworld.wolfram.com/CauchyPrincipalValue.html """ from sympy.calculus import singularities if len(self.limits) != 1 or len(list(self.limits[0])) != 3: raise ValueError("You need to insert a variable, lower_limit, and upper_limit correctly to calculate " "cauchy's principal value") x, a, b = self.limits[0] if not (a.is_comparable and b.is_comparable and a <= b): raise ValueError("The lower_limit must be smaller than or equal to the upper_limit to calculate " "cauchy's principal value. Also, a and b need to be comparable.") if a == b: return 0 r = Dummy('r') f = self.function singularities_list = [s for s in singularities(f, x) if s.is_comparable and a <= s <= b] for i in singularities_list: if (i == b) or (i == a): raise ValueError( 'The principal value is not defined in the given interval due to singularity at %d.' % (i)) F = integrate(f, x, kwargs) if F.has(Integral): return self if a is -oo and b is oo: I = limit(F - F.subs(x, -x), x, oo) else: I = limit(F, x, b, '-') - limit(F, x, a, '+') for s in singularities_list: I += limit(((F.subs(x, s - r)) - F.subs(x, s + r)), r, 0, '+') return I def integrate(args, kwargs): """integrate(f, var, ...) Compute definite or indefinite integral of one or more variables using Risch-Norman algorithm and table lookup. This procedure is able to handle elementary algebraic and transcendental functions and also a huge class of special functions, including Airy, Bessel, Whittaker and Lambert. var can be: - a symbol -- indefinite integration - a tuple (symbol, a) -- indefinite integration with result given with `a` replacing `symbol` - a tuple (symbol, a, b) -- definite integration Several variables can be specified, in which case the result is multiple integration. (If var is omitted and the integrand is univariate, the indefinite integral in that variable will be performed.) Indefinite integrals are returned without terms that are independent of the integration variables. (see examples) Definite improper integrals often entail delicate convergence conditions. Pass conds='piecewise', 'separate' or 'none' to have these returned, respectively, as a Piecewise function, as a separate result (i.e. result will be a tuple), or not at all (default is 'piecewise'). Strategy** SymPy uses various approaches to definite integration. One method is to find an antiderivative for the integrand, and then use the fundamental theorem of calculus. Various functions are implemented to integrate polynomial, rational and trigonometric functions, and integrands containing DiracDelta terms. SymPy also implements the part of the Risch algorithm, which is a decision procedure for integrating elementary functions, i.e., the algorithm can either find an elementary antiderivative, or prove that one does not exist. There is also a (very successful, albeit somewhat slow) general implementation of the heuristic Risch algorithm. This algorithm will eventually be phased out as more of the full Risch algorithm is implemented. See the docstring of Integral._eval_integral() for more details on computing the antiderivative using algebraic methods. The option risch=True can be used to use only the (full) Risch algorithm. This is useful if you want to know if an elementary function has an elementary antiderivative. If the indefinite Integral returned by this function is an instance of NonElementaryIntegral, that means that the Risch algorithm has proven that integral to be non-elementary. Note that by default, additional methods (such as the Meijer G method outlined below) are tried on these integrals, as they may be expressible in terms of special functions, so if you only care about elementary answers, use risch=True. Also note that an unevaluated Integral returned by this function is not necessarily a NonElementaryIntegral, even with risch=True, as it may just be an indication that the particular part of the Risch algorithm needed to integrate that function is not yet implemented. Another family of strategies comes from re-writing the integrand in terms of so-called Meijer G-functions. Indefinite integrals of a single G-function can always be computed, and the definite integral of a product of two G-functions can be computed from zero to infinity. Various strategies are implemented to rewrite integrands as G-functions, and use this information to compute integrals (see the ``meijerint`` module). The option manual=True can be used to use only an algorithm that tries to mimic integration by hand. This algorithm does not handle as many integrands as the other algorithms implemented but may return results in a more familiar form. The ``manualintegrate`` module has functions that return the steps used (see the module docstring for more information). In general, the algebraic methods work best for computing antiderivatives of (possibly complicated) combinations of elementary functions. The G-function methods work best for computing definite integrals from zero to infinity of moderately complicated combinations of special functions, or indefinite integrals of very simple combinations of special functions. The strategy employed by the integration code is as follows: - If computing a definite integral, and both limits are real, and at least one limit is +- oo, try the G-function method of definite integration first. - Try to find an antiderivative, using all available methods, ordered by performance (that is try fastest method first, slowest last; in particular polynomial integration is tried first, Meijer G-functions second to last, and heuristic Risch last). - If still not successful, try G-functions irrespective of the limits. The option meijerg=True, False, None can be used to, respectively: always use G-function methods and no others, never use G-function methods, or use all available methods (in order as described above). It defaults to None. Examples ======== >>> from sympy import integrate, log, exp, oo >>> from sympy.abc import a, x, y >>> integrate(xy, x) x2y/2 >>> integrate(log(x), x) xlog(x) - x >>> integrate(log(x), (x, 1, a)) alog(a) - a + 1 >>> integrate(x) x*2/2 Terms that are independent of x are dropped by indefinite integration: >>> from sympy import sqrt >>> integrate(sqrt(1 + x), (x, 0, x)) 2(x + 1)*(3/2)/3 - 2/3 >>> integrate(sqrt(1 + x), x) 2(x + 1)*(3/2)/3 >>> integrate(xy) Traceback (most recent call last): ... ValueError: specify integration variables to integrate xy Note that ``integrate(x)`` syntax is meant only for convenience in interactive sessions and should be avoided in library code. >>> integrate(xaexp(-x), (x, 0, oo)) # same as conds='piecewise' Piecewise((gamma(a + 1), re(a) > -1), (Integral(x*aexp(-x), (x, 0, oo)), True)) >>> integrate(x*aexp(-x), (x, 0, oo), conds='none') gamma(a + 1) >>> integrate(x*aexp(-x), (x, 0, oo), conds='separate') (gamma(a + 1), -re(a) < 1) See Also ======== Integral, Integral.doit """ doit_flags = { 'deep': False, 'meijerg': kwargs.pop('meijerg', None), 'conds': kwargs.pop('conds', 'piecewise'), 'risch': kwargs.pop('risch', None), 'heurisch': kwargs.pop('heurisch', None), 'manual': kwargs.pop('manual', None) } integral = Integral(args, kwargs) if isinstance(integral, Integral): return integral.doit(doit_flags) else: new_args = [a.doit(doit_flags) if isinstance(a, Integral) else a for a in integral.args] return integral.func(new_args) def line_integrate(field, curve, vars): """line_integrate(field, Curve, variables) Compute the line integral. Examples ======== >>> from sympy import Curve, line_integrate, E, ln >>> from sympy.abc import x, y, t >>> C = Curve([Et + 1, Et - 1], (t, 0, ln(2))) >>> line_integrate(x + y, C, [x, y]) 3sqrt(2) See Also ======== integrate, Integral """ from sympy.geometry import Curve F = sympify(field) if not F: raise ValueError( "Expecting function specifying field as first argument.") if not isinstance(curve, Curve): raise ValueError("Expecting Curve entity as second argument.") if not is_sequence(vars): raise ValueError("Expecting ordered iterable for variables.") if len(curve.functions) != len(vars): raise ValueError("Field variable size does not match curve dimension.") if curve.parameter in vars: raise ValueError("Curve parameter clashes with field parameters.") # Calculate derivatives for line parameter functions # F(r) -> F(r(t)) and finally F(r(t)r'(t)) Ft = F dldt = 0 for i, var in enumerate(vars): _f = curve.functions[i] _dn = diff(_f, curve.parameter) # ...arc length dldt = dldt + (_dn * _dn) Ft = Ft.subs(var, _f) Ft = Ft * sqrt(dldt) integral = Integral(Ft, curve.limits).doit(deep=False) return integral
6b0d0aff54c99171cb1eb0a0edecbfcbd95c8ca31994a4d814aaad2ee8406175	""" Algorithms for solving Parametric Risch Differential Equations. The methods used for solving Parametric Risch Differential Equations parallel those for solving Risch Differential Equations. See the outline in the docstring of rde.py for more information. The Parametric Risch Differential Equation problem is, given f, g1, ..., gm in K(t), to determine if there exist y in K(t) and c1, ..., cm in Const(K) such that Dy + fy == Sum(cigi, (i, 1, m)), and to find such y and ci if they exist. For the algorithms here G is a list of tuples of factions of the terms on the right hand side of the equation (i.e., gi in k(t)), and Q is a list of terms on the right hand side of the equation (i.e., qi in k[t]). See the docstring of each function for more information. """ from __future__ import print_function, division from sympy.core import Dummy, ilcm, Add, Mul, Pow, S from sympy.core.compatibility import reduce, range from sympy.integrals.rde import (order_at, order_at_oo, weak_normalizer, bound_degree) from sympy.integrals.risch import (gcdex_diophantine, frac_in, derivation, residue_reduce, splitfactor, residue_reduce_derivation, DecrementLevel, recognize_log_derivative) from sympy.matrices import zeros, eye from sympy.polys import Poly, lcm, cancel, sqf_list from sympy.polys.polymatrix import PolyMatrix as Matrix from sympy.solvers import solve def prde_normal_denom(fa, fd, G, DE): """ Parametric Risch Differential Equation - Normal part of the denominator. Given a derivation D on k[t] and f, g1, ..., gm in k(t) with f weakly normalized with respect to t, return the tuple (a, b, G, h) such that a, h in k[t], b in k<t>, G = [g1, ..., gm] in k(t)^m, and for any solution c1, ..., cm in Const(k) and y in k(t) of Dy + fy == Sum(cigi, (i, 1, m)), q == yh in k<t> satisfies aDq + bq == Sum(ciGi, (i, 1, m)). """ dn, ds = splitfactor(fd, DE) Gas, Gds = list(zip(G)) gd = reduce(lambda i, j: i.lcm(j), Gds, Poly(1, DE.t)) en, es = splitfactor(gd, DE) p = dn.gcd(en) h = en.gcd(en.diff(DE.t)).quo(p.gcd(p.diff(DE.t))) a = dnh c = ah ba = afa - dnderivation(h, DE)fd ba, bd = ba.cancel(fd, include=True) G = [(cA).cancel(D, include=True) for A, D in G] return (a, (ba, bd), G, h) def real_imag(ba, bd, gen): """ Helper function, to get the real and imaginary part of a rational function evaluated at sqrt(-1) without actually evaluating it at sqrt(-1) Separates the even and odd power terms by checking the degree of terms wrt mod 4. Returns a tuple (ba[0], ba[1], bd) where ba[0] is real part of the numerator ba[1] is the imaginary part and bd is the denominator of the rational function. """ bd = bd.as_poly(gen).as_dict() ba = ba.as_poly(gen).as_dict() denom_real = [value if key[0] % 4 == 0 else -value if key[0] % 4 == 2 else 0 for key, value in bd.items()] denom_imag = [value if key[0] % 4 == 1 else -value if key[0] % 4 == 3 else 0 for key, value in bd.items()] bd_real = sum(r for r in denom_real) bd_imag = sum(r for r in denom_imag) num_real = [value if key[0] % 4 == 0 else -value if key[0] % 4 == 2 else 0 for key, value in ba.items()] num_imag = [value if key[0] % 4 == 1 else -value if key[0] % 4 == 3 else 0 for key, value in ba.items()] ba_real = sum(r for r in num_real) ba_imag = sum(r for r in num_imag) ba = ((ba_realbd_real + ba_imagbd_imag).as_poly(gen), (ba_imagbd_real - ba_realbd_imag).as_poly(gen)) bd = (bd_realbd_real + bd_imagbd_imag).as_poly(gen) return (ba[0], ba[1], bd) def prde_special_denom(a, ba, bd, G, DE, case='auto'): """ Parametric Risch Differential Equation - Special part of the denominator. case is one of {'exp', 'tan', 'primitive'} for the hyperexponential, hypertangent, and primitive cases, respectively. For the hyperexponential (resp. hypertangent) case, given a derivation D on k[t] and a in k[t], b in k<t>, and g1, ..., gm in k(t) with Dt/t in k (resp. Dt/(t2 + 1) in k, sqrt(-1) not in k), a != 0, and gcd(a, t) == 1 (resp. gcd(a, t2 + 1) == 1), return the tuple (A, B, GG, h) such that A, B, h in k[t], GG = [gg1, ..., ggm] in k(t)^m, and for any solution c1, ..., cm in Const(k) and q in k<t> of aDq + bq == Sum(cigi, (i, 1, m)), r == qh in k[t] satisfies ADr + Br == Sum(ciggi, (i, 1, m)). For case == 'primitive', k<t> == k[t], so it returns (a, b, G, 1) in this case. """ # TODO: Merge this with the very similar special_denom() in rde.py if case == 'auto': case = DE.case if case == 'exp': p = Poly(DE.t, DE.t) elif case == 'tan': p = Poly(DE.t2 + 1, DE.t) elif case in ['primitive', 'base']: B = ba.quo(bd) return (a, B, G, Poly(1, DE.t)) else: raise ValueError("case must be one of {'exp', 'tan', 'primitive', " "'base'}, not %s." % case) nb = order_at(ba, p, DE.t) - order_at(bd, p, DE.t) nc = min([order_at(Ga, p, DE.t) - order_at(Gd, p, DE.t) for Ga, Gd in G]) n = min(0, nc - min(0, nb)) if not nb: # Possible cancellation. if case == 'exp': dcoeff = DE.d.quo(Poly(DE.t, DE.t)) with DecrementLevel(DE): # We are guaranteed to not have problems, # because case != 'base'. alphaa, alphad = frac_in(-ba.eval(0)/bd.eval(0)/a.eval(0), DE.t) etaa, etad = frac_in(dcoeff, DE.t) A = parametric_log_deriv(alphaa, alphad, etaa, etad, DE) if A is not None: Q, m, z = A if Q == 1: n = min(n, m) elif case == 'tan': dcoeff = DE.d.quo(Poly(DE.t2 + 1, DE.t)) with DecrementLevel(DE): # We are guaranteed to not have problems, # because case != 'base'. betaa, alphaa, alphad = real_imag(ba, bda, DE.t) betad = alphad etaa, etad = frac_in(dcoeff, DE.t) if recognize_log_derivative(2betaa, betad, DE): A = parametric_log_deriv(alphaa, alphad, etaa, etad, DE) B = parametric_log_deriv(betaa, betad, etaa, etad, DE) if A is not None and B is not None: Q, s, z = A # TODO: Add test if Q == 1: n = min(n, s/2) N = max(0, -nb) pN = pN pn = p-n # This is 1/h A = apN B = bapN.quo(bd) + Poly(n, DE.t)aderivation(p, DE).quo(p)pN G = [(GapNpn).cancel(Gd, include=True) for Ga, Gd in G] h = pn # (ap*N, (b + naDp/p)p*N, g1p*(N - n), ..., gmp(N - n), p-n) return (A, B, G, h) def prde_linear_constraints(a, b, G, DE): """ Parametric Risch Differential Equation - Generate linear constraints on the constants. Given a derivation D on k[t], a, b, in k[t] with gcd(a, b) == 1, and G = [g1, ..., gm] in k(t)^m, return Q = [q1, ..., qm] in k[t]^m and a matrix M with entries in k(t) such that for any solution c1, ..., cm in Const(k) and p in k[t] of aDp + bp == Sum(cigi, (i, 1, m)), (c1, ..., cm) is a solution of Mx == 0, and p and the ci satisfy aDp + bp == Sum(ciqi, (i, 1, m)). Because M has entries in k(t), and because Matrix doesn't play well with Poly, M will be a Matrix of Basic expressions. """ m = len(G) Gns, Gds = list(zip(G)) d = reduce(lambda i, j: i.lcm(j), Gds) d = Poly(d, field=True) Q = [(ga(d).quo(gd)).div(d) for ga, gd in G] if not all([ri.is_zero for _, ri in Q]): N = max([ri.degree(DE.t) for _, ri in Q]) M = Matrix(N + 1, m, lambda i, j: Q[j][1].nth(i)) else: M = Matrix(0, m, []) # No constraints, return the empty matrix. qs, _ = list(zip(Q)) return (qs, M) def poly_linear_constraints(p, d): """ Given p = [p1, ..., pm] in k[t]^m and d in k[t], return q = [q1, ..., qm] in k[t]^m and a matrix M with entries in k such that Sum(cipi, (i, 1, m)), for c1, ..., cm in k, is divisible by d if and only if (c1, ..., cm) is a solution of Mx = 0, in which case the quotient is Sum(ciqi, (i, 1, m)). """ m = len(p) q, r = zip([pi.div(d) for pi in p]) if not all([ri.is_zero for ri in r]): n = max([ri.degree() for ri in r]) M = Matrix(n + 1, m, lambda i, j: r[j].nth(i)) else: M = Matrix(0, m, []) # No constraints. return q, M def constant_system(A, u, DE): """ Generate a system for the constant solutions. Given a differential field (K, D) with constant field C = Const(K), a Matrix A, and a vector (Matrix) u with coefficients in K, returns the tuple (B, v, s), where B is a Matrix with coefficients in C and v is a vector (Matrix) such that either v has coefficients in C, in which case s is True and the solutions in C of Ax == u are exactly all the solutions of Bx == v, or v has a non-constant coefficient, in which case s is False Ax == u has no constant solution. This algorithm is used both in solving parametric problems and in determining if an element a of K is a derivative of an element of K or the logarithmic derivative of a K-radical using the structure theorem approach. Because Poly does not play well with Matrix yet, this algorithm assumes that all matrix entries are Basic expressions. """ if not A: return A, u Au = A.row_join(u) Au = Au.rref(simplify=cancel, normalize_last=False)[0] # Warning: This will NOT return correct results if cancel() cannot reduce # an identically zero expression to 0. The danger is that we might # incorrectly prove that an integral is nonelementary (such as # risch_integrate(exp((sin(x)2 + cos(x)2 - 1)x2), x). # But this is a limitation in computer algebra in general, and implicit # in the correctness of the Risch Algorithm is the computability of the # constant field (actually, this same correctness problem exists in any # algorithm that uses rref()). # # We therefore limit ourselves to constant fields that are computable # via the cancel() function, in order to prevent a speed bottleneck from # calling some more complex simplification function (rational function # coefficients will fall into this class). Furthermore, (I believe) this # problem will only crop up if the integral explicitly contains an # expression in the constant field that is identically zero, but cannot # be reduced to such by cancel(). Therefore, a careful user can avoid this # problem entirely by being careful with the sorts of expressions that # appear in his integrand in the variables other than the integration # variable (the structure theorems should be able to completely decide these # problems in the integration variable). Au = Au.applyfunc(cancel) A, u = Au[:, :-1], Au[:, -1] for j in range(A.cols): for i in range(A.rows): if A[i, j].has(DE.T): # This assumes that const(F(t0, ..., tn) == const(K) == F Ri = A[i, :] # Rm+1; m = A.rows Rm1 = Ri.applyfunc(lambda x: derivation(x, DE, basic=True)/ derivation(A[i, j], DE, basic=True)) Rm1 = Rm1.applyfunc(cancel) um1 = cancel(derivation(u[i], DE, basic=True)/ derivation(A[i, j], DE, basic=True)) for s in range(A.rows): # A[s, :] = A[s, :] - A[s, i]A[:, m+1] Asj = A[s, j] A.row_op(s, lambda r, jj: cancel(r - AsjRm1[jj])) # u[s] = u[s] - A[s, j]u[m+1 u.row_op(s, lambda r, jj: cancel(r - Asjum1)) A = A.col_join(Rm1) u = u.col_join(Matrix([um1])) return (A, u) def prde_spde(a, b, Q, n, DE): """ Special Polynomial Differential Equation algorithm: Parametric Version. Given a derivation D on k[t], an integer n, and a, b, q1, ..., qm in k[t] with deg(a) > 0 and gcd(a, b) == 1, return (A, B, Q, R, n1), with Qq = [q1, ..., qm] and R = [r1, ..., rm], such that for any solution c1, ..., cm in Const(k) and q in k[t] of degree at most n of aDq + bq == Sum(cigi, (i, 1, m)), p = (q - Sum(ciri, (i, 1, m)))/a has degree at most n1 and satisfies ADp + Bp == Sum(ciqi, (i, 1, m)) """ R, Z = list(zip([gcdex_diophantine(b, a, qi) for qi in Q])) A = a B = b + derivation(a, DE) Qq = [zi - derivation(ri, DE) for ri, zi in zip(R, Z)] R = list(R) n1 = n - a.degree(DE.t) return (A, B, Qq, R, n1) def prde_no_cancel_b_large(b, Q, n, DE): """ Parametric Poly Risch Differential Equation - No cancellation: deg(b) large enough. Given a derivation D on k[t], n in ZZ, and b, q1, ..., qm in k[t] with b != 0 and either D == d/dt or deg(b) > max(0, deg(D) - 1), returns h1, ..., hr in k[t] and a matrix A with coefficients in Const(k) such that if c1, ..., cm in Const(k) and q in k[t] satisfy deg(q) <= n and Dq + bq == Sum(ciqi, (i, 1, m)), then q = Sum(djhj, (j, 1, r)), where d1, ..., dr in Const(k) and AMatrix([[c1, ..., cm, d1, ..., dr]]).T == 0. """ db = b.degree(DE.t) m = len(Q) H = [Poly(0, DE.t)]m for N in range(n, -1, -1): # [n, ..., 0] for i in range(m): si = Q[i].nth(N + db)/b.LC() sitn = Poly(siDE.t*N, DE.t) H[i] = H[i] + sitn Q[i] = Q[i] - derivation(sitn, DE) - bsitn if all(qi.is_zero for qi in Q): dc = -1 M = zeros(0, 2) else: dc = max([qi.degree(DE.t) for qi in Q]) M = Matrix(dc + 1, m, lambda i, j: Q[j].nth(i)) A, u = constant_system(M, zeros(dc + 1, 1), DE) c = eye(m) A = A.row_join(zeros(A.rows, m)).col_join(c.row_join(-c)) return (H, A) def prde_no_cancel_b_small(b, Q, n, DE): """ Parametric Poly Risch Differential Equation - No cancellation: deg(b) small enough. Given a derivation D on k[t], n in ZZ, and b, q1, ..., qm in k[t] with deg(b) < deg(D) - 1 and either D == d/dt or deg(D) >= 2, returns h1, ..., hr in k[t] and a matrix A with coefficients in Const(k) such that if c1, ..., cm in Const(k) and q in k[t] satisfy deg(q) <= n and Dq + bq == Sum(ciqi, (i, 1, m)) then q = Sum(djhj, (j, 1, r)) where d1, ..., dr in Const(k) and AMatrix([[c1, ..., cm, d1, ..., dr]]).T == 0. """ m = len(Q) H = [Poly(0, DE.t)]m for N in range(n, 0, -1): # [n, ..., 1] for i in range(m): si = Q[i].nth(N + DE.d.degree(DE.t) - 1)/(NDE.d.LC()) sitn = Poly(siDE.tN, DE.t) H[i] = H[i] + sitn Q[i] = Q[i] - derivation(sitn, DE) - bsitn if b.degree(DE.t) > 0: for i in range(m): si = Poly(Q[i].nth(b.degree(DE.t))/b.LC(), DE.t) H[i] = H[i] + si Q[i] = Q[i] - derivation(si, DE) - bsi if all(qi.is_zero for qi in Q): dc = -1 M = Matrix() else: dc = max([qi.degree(DE.t) for qi in Q]) M = Matrix(dc + 1, m, lambda i, j: Q[j].nth(i)) A, u = constant_system(M, zeros(dc + 1, 1), DE) c = eye(m) A = A.row_join(zeros(A.rows, m)).col_join(c.row_join(-c)) return (H, A) # else: b is in k, deg(qi) < deg(Dt) t = DE.t if DE.case != 'base': with DecrementLevel(DE): t0 = DE.t # k = k0(t0) ba, bd = frac_in(b, t0, field=True) Q0 = [frac_in(qi.TC(), t0, field=True) for qi in Q] f, B = param_rischDE(ba, bd, Q0, DE) # f = [f1, ..., fr] in k^r and B is a matrix with # m + r columns and entries in Const(k) = Const(k0) # such that Dy0 + by0 = Sum(ciqi, (i, 1, m)) has # a solution y0 in k with c1, ..., cm in Const(k) # if and only y0 = Sum(djfj, (j, 1, r)) where # d1, ..., dr ar in Const(k) and # BMatrix([c1, ..., cm, d1, ..., dr]) == 0. # Transform fractions (fa, fd) in f into constant # polynomials fa/fd in k[t]. # (Is there a better way?) f = [Poly(fa.as_expr()/fd.as_expr(), t, field=True) for fa, fd in f] else: # Base case. Dy == 0 for all y in k and b == 0. # Dy + by = Sum(ciqi) is solvable if and only if # Sum(ciqi) == 0 in which case the solutions are # y = d1f1 for f1 = 1 and any d1 in Const(k) = k. f = [Poly(1, t, field=True)] # r = 1 B = Matrix([[qi.TC() for qi in Q] + [S(0)]]) # The condition for solvability is # BMatrix([c1, ..., cm, d1]) == 0 # There are no constraints on d1. # Coefficients of t^j (j > 0) in Sum(ciqi) must be zero. d = max([qi.degree(DE.t) for qi in Q]) if d > 0: M = Matrix(d, m, lambda i, j: Q[j].nth(i + 1)) A, _ = constant_system(M, zeros(d, 1), DE) else: # No constraints on the hj. A = Matrix(0, m, []) # Solutions of the original equation are # y = Sum(djfj, (j, 1, r) + Sum(eihi, (i, 1, m)), # where ei == ci (i = 1, ..., m), when # AMatrix([c1, ..., cm]) == 0 and # BMatrix([c1, ..., cm, d1, ..., dr]) == 0 # Build combined constraint matrix with m + r + m columns. r = len(f) I = eye(m) A = A.row_join(zeros(A.rows, r + m)) B = B.row_join(zeros(B.rows, m)) C = I.row_join(zeros(m, r)).row_join(-I) return f + H, A.col_join(B).col_join(C) def prde_cancel_liouvillian(b, Q, n, DE): """ Pg, 237. """ H = [] # Why use DecrementLevel? Below line answers that: # Assuming that we can solve such problems over 'k' (not k[t]) if DE.case == 'primitive': with DecrementLevel(DE): ba, bd = frac_in(b, DE.t, field=True) for i in range(n, -1, -1): if DE.case == 'exp': # this re-checking can be avoided with DecrementLevel(DE): ba, bd = frac_in(b + iderivation(DE.t, DE)/DE.t, DE.t, field=True) with DecrementLevel(DE): Qy = [frac_in(q.nth(i), DE.t, field=True) for q in Q] fi, Ai = param_rischDE(ba, bd, Qy, DE) fi = [Poly(fa.as_expr()/fd.as_expr(), DE.t, field=True) for fa, fd in fi] ri = len(fi) if i == n: M = Ai else: M = Ai.col_join(M.row_join(zeros(M.rows, ri))) Fi, hi = [None]ri, [None]ri # from eq. on top of p.238 (unnumbered) for j in range(ri): hji = fi[j]DE.ti hi[j] = hji # building up Sum(djn(D(fjnt^n) - bfjnt^n)) Fi[j] = -(derivation(hji, DE) - bhji) H += hi # in the next loop instead of Q it has # to be Q + Fi taking its place Q = Q + Fi return (H, M) def param_poly_rischDE(a, b, q, n, DE): """Polynomial solutions of a parametric Risch differential equation. Given a derivation D in k[t], a, b in k[t] relatively prime, and q = [q1, ..., qm] in k[t]^m, return h = [h1, ..., hr] in k[t]^r and a matrix A with m + r columns and entries in Const(k) such that aDp + bp = Sum(ciqi, (i, 1, m)) has a solution p of degree <= n in k[t] with c1, ..., cm in Const(k) if and only if p = Sum(djhj, (j, 1, r)) where d1, ..., dr are in Const(k) and (c1, ..., cm, d1, ..., dr) is a solution of Ax == 0. """ m = len(q) if n < 0: # Only the trivial zero solution is possible. # Find relations between the qi. if all([qi.is_zero for qi in q]): return [], zeros(1, m) # No constraints. N = max([qi.degree(DE.t) for qi in q]) M = Matrix(N + 1, m, lambda i, j: q[j].nth(i)) A, _ = constant_system(M, zeros(M.rows, 1), DE) return [], A if a.is_ground: # Normalization: a = 1. a = a.LC() b, q = b.quo_ground(a), [qi.quo_ground(a) for qi in q] if not b.is_zero and (DE.case == 'base' or b.degree() > max(0, DE.d.degree() - 1)): return prde_no_cancel_b_large(b, q, n, DE) elif ((b.is_zero or b.degree() < DE.d.degree() - 1) and (DE.case == 'base' or DE.d.degree() >= 2)): return prde_no_cancel_b_small(b, q, n, DE) elif (DE.d.degree() >= 2 and b.degree() == DE.d.degree() - 1 and n > -b.as_poly().LC()/DE.d.as_poly().LC()): raise NotImplementedError("prde_no_cancel_b_equal() is " "not yet implemented.") else: # Liouvillian cases if DE.case == 'primitive' or DE.case == 'exp': return prde_cancel_liouvillian(b, q, n, DE) else: raise NotImplementedError("non-linear and hypertangent " "cases have not yet been implemented") # else: deg(a) > 0 # Iterate SPDE as long as possible cumulating coefficient # and terms for the recovery of original solutions. alpha, beta = 1, [0]m while n >= 0: # and a, b relatively prime a, b, q, r, n = prde_spde(a, b, q, n, DE) beta = [betai + alphari for betai, ri in zip(beta, r)] alpha = a # Solutions p of aDp + bp = Sum(ciqi) correspond to # solutions alphap + Sum(cibetai) of the initial equation. d = a.gcd(b) if not d.is_ground: break # aDp + bp = Sum(ciqi) may have a polynomial solution # only if the sum is divisible by d. qq, M = poly_linear_constraints(q, d) # qq = [qq1, ..., qqm] where qqi = qi.quo(d). # M is a matrix with m columns an entries in k. # Sum(fiqi, (i, 1, m)), where f1, ..., fm are elements of k, is # divisible by d if and only if MMatrix([f1, ..., fm]) == 0, # in which case the quotient is Sum(fiqqi). A, _ = constant_system(M, zeros(M.rows, 1), DE) # A is a matrix with m columns and entries in Const(k). # Sum(ciqqi) is Sum(ciqi).quo(d), and the remainder is zero # for c1, ..., cm in Const(k) if and only if # AMatrix([c1, ...,cm]) == 0. V = A.nullspace() # V = [v1, ..., vu] where each vj is a column matrix with # entries aj1, ..., ajm in Const(k). # Sum(ajiqi) is divisible by d with exact quotient Sum(ajiqqi). # Sum(ciqi) is divisible by d if and only if ci = Sum(djaji) # (i = 1, ..., m) for some d1, ..., du in Const(k). # In that case, solutions of # aDp + bp = Sum(ciqi) = Sum(djSum(ajiqi)) # are the same as those of # (a/d)Dp + (b/d)p = Sum(djrj) # where rj = Sum(ajiqqi). if not V: # No non-trivial solution. return [], eye(m) # Could return A, but this has # the minimum number of rows. Mqq = Matrix([qq]) # A single row. r = [(Mqqvj)[0] for vj in V] # [r1, ..., ru] # Solutions of (a/d)Dp + (b/d)p = Sum(djrj) correspond to # solutions alphap + Sum(Sum(djaji)betai) of the initial # equation. These are equal to alphap + Sum(djfj) where # fj = Sum(ajibetai). Mbeta = Matrix([beta]) f = [(Mbetavj)[0] for vj in V] # [f1, ..., fu] # # Solve the reduced equation recursively. # g, B = param_poly_rischDE(a.quo(d), b.quo(d), r, n, DE) # g = [g1, ..., gv] in k[t]^v and and B is a matrix with u + v # columns and entries in Const(k) such that # (a/d)Dp + (b/d)p = Sum(djrj) has a solution p of degree <= n # in k[t] if and only if p = Sum(ekgk) where e1, ..., ev are in # Const(k) and BMatrix([d1, ..., du, e1, ..., ev]) == 0. # The solutions of the original equation are then # Sum(djfj, (j, 1, u)) + alphaSum(ekgk, (k, 1, v)). # Collect solution components. h = f + [alphagk for gk in g] # Build combined relation matrix. A = -eye(m) for vj in V: A = A.row_join(vj) A = A.row_join(zeros(m, len(g))) A = A.col_join(zeros(B.rows, m).row_join(B)) return h, A def param_rischDE(fa, fd, G, DE): """ Solve a Parametric Risch Differential Equation: Dy + fy == Sum(ciGi, (i, 1, m)). Given a derivation D in k(t), f in k(t), and G = [G1, ..., Gm] in k(t)^m, return h = [h1, ..., hr] in k(t)^r and a matrix A with m + r columns and entries in Const(k) such that Dy + fy = Sum(ciGi, (i, 1, m)) has a solution y in k(t) with c1, ..., cm in Const(k) if and only if y = Sum(djhj, (j, 1, r)) where d1, ..., dr are in Const(k) and (c1, ..., cm, d1, ..., dr) is a solution of Ax == 0. Elements of k(t) are tuples (a, d) with a and d in k[t]. """ m = len(G) q, (fa, fd) = weak_normalizer(fa, fd, DE) # Solutions of the weakly normalized equation Dz + fz = qSum(ciGi) # correspond to solutions y = z/q of the original equation. gamma = q G = [(qga).cancel(gd, include=True) for ga, gd in G] a, (ba, bd), G, hn = prde_normal_denom(fa, fd, G, DE) # Solutions q in k<t> of aDq + bq = Sum(ciGi) correspond # to solutions z = q/hn of the weakly normalized equation. gamma = hn A, B, G, hs = prde_special_denom(a, ba, bd, G, DE) # Solutions p in k[t] of ADp + Bp = Sum(ciGi) correspond # to solutions q = p/hs of the previous equation. gamma = hs g = A.gcd(B) a, b, g = A.quo(g), B.quo(g), [gia.cancel(gidg, include=True) for gia, gid in G] # aDp + bp = Sum(cigi) may have a polynomial solution # only if the sum is in k[t]. q, M = prde_linear_constraints(a, b, g, DE) # q = [q1, ..., qm] where qi in k[t] is the polynomial component # of the partial fraction expansion of gi. # M is a matrix with m columns and entries in k. # Sum(figi, (i, 1, m)), where f1, ..., fm are elements of k, # is a polynomial if and only if MMatrix([f1, ..., fm]) == 0, # in which case the sum is equal to Sum(fiqi). M, _ = constant_system(M, zeros(M.rows, 1), DE) # M is a matrix with m columns and entries in Const(k). # Sum(cigi) is in k[t] for c1, ..., cm in Const(k) # if and only if MMatrix([c1, ..., cm]) == 0, # in which case the sum is Sum(ciqi). ## Reduce number of constants at this point V = M.nullspace() # V = [v1, ..., vu] where each vj is a column matrix with # entries aj1, ..., ajm in Const(k). # Sum(ajigi) is in k[t] and equal to Sum(ajiqi) (j = 1, ..., u). # Sum(cigi) is in k[t] if and only is ci = Sum(djaji) # (i = 1, ..., m) for some d1, ..., du in Const(k). # In that case, # Sum(cigi) = Sum(ciqi) = Sum(djSum(ajiqi)) = Sum(djrj) # where rj = Sum(ajiqi) (j = 1, ..., u) in k[t]. if not V: # No non-trivial solution return [], eye(m) Mq = Matrix([q]) # A single row. r = [(Mqvj)[0] for vj in V] # [r1, ..., ru] # Solutions of aDp + bp = Sum(djrj) correspond to solutions # y = p/gamma of the initial equation with ci = Sum(djaji). try: # We try n=5. At least for prde_spde, it will always # terminate no matter what n is. n = bound_degree(a, b, r, DE, parametric=True) except NotImplementedError: # A temporary bound is set. Eventually, it will be removed. # the currently added test case takes large time # even with n=5, and much longer with large n's. n = 5 h, B = param_poly_rischDE(a, b, r, n, DE) # h = [h1, ..., hv] in k[t]^v and and B is a matrix with u + v # columns and entries in Const(k) such that # aDp + bp = Sum(djrj) has a solution p of degree <= n # in k[t] if and only if p = Sum(ekhk) where e1, ..., ev are in # Const(k) and BMatrix([d1, ..., du, e1, ..., ev]) == 0. # The solutions of the original equation for ci = Sum(djaji) # (i = 1, ..., m) are then y = Sum(ekhk, (k, 1, v))/gamma. ## Build combined relation matrix with m + u + v columns. A = -eye(m) for vj in V: A = A.row_join(vj) A = A.row_join(zeros(m, len(h))) A = A.col_join(zeros(B.rows, m).row_join(B)) ## Eliminate d1, ..., du. W = A.nullspace() # W = [w1, ..., wt] where each wl is a column matrix with # entries blk (k = 1, ..., m + u + v) in Const(k). # The vectors (bl1, ..., blm) generate the space of those # constant families (c1, ..., cm) for which a solution of # the equation Dy + fy == Sum(ciGi) exists. They generate # the space and form a basis except possibly when Dy + fy == 0 # is solvable in k(t}. The corresponding solutions are # y = Sum(blk'hk, (k, 1, v))/gamma, where k' = k + m + u. v = len(h) M = Matrix([wl[:m] + wl[-v:] for wl in W]) # excise dj's. N = M.nullspace() # N = [n1, ..., ns] where the ni in Const(k)^(m + v) are column # vectors generating the space of linear relations between # c1, ..., cm, e1, ..., ev. C = Matrix([ni[:] for ni in N]) # rows n1, ..., ns. return [hk.cancel(gamma, include=True) for hk in h], C def limited_integrate_reduce(fa, fd, G, DE): """ Simpler version of step 1 & 2 for the limited integration problem. Given a derivation D on k(t) and f, g1, ..., gn in k(t), return (a, b, h, N, g, V) such that a, b, h in k[t], N is a non-negative integer, g in k(t), V == [v1, ..., vm] in k(t)^m, and for any solution v in k(t), c1, ..., cm in C of f == Dv + Sum(ciwi, (i, 1, m)), p = vh is in k<t>, and p and the ci satisfy aDp + bp == g + Sum(civi, (i, 1, m)). Furthermore, if S1irr == Sirr, then p is in k[t], and if t is nonlinear or Liouvillian over k, then deg(p) <= N. So that the special part is always computed, this function calls the more general prde_special_denom() automatically if it cannot determine that S1irr == Sirr. Furthermore, it will automatically call bound_degree() when t is linear and non-Liouvillian, which for the transcendental case, implies that Dt == at + b with for some a, b in k. """ dn, ds = splitfactor(fd, DE) E = [splitfactor(gd, DE) for _, gd in G] En, Es = list(zip(E)) c = reduce(lambda i, j: i.lcm(j), (dn,) + En) # lcm(dn, en1, ..., enm) hn = c.gcd(c.diff(DE.t)) a = hn b = -derivation(hn, DE) N = 0 # These are the cases where we know that S1irr = Sirr, but there could be # others, and this algorithm will need to be extended to handle them. if DE.case in ['base', 'primitive', 'exp', 'tan']: hs = reduce(lambda i, j: i.lcm(j), (ds,) + Es) # lcm(ds, es1, ..., esm) a = hnhs b -= (hnderivation(hs, DE)).quo(hs) mu = min(order_at_oo(fa, fd, DE.t), min([order_at_oo(ga, gd, DE.t) for ga, gd in G])) # So far, all the above are also nonlinear or Liouvillian, but if this # changes, then this will need to be updated to call bound_degree() # as per the docstring of this function (DE.case == 'other_linear'). N = hn.degree(DE.t) + hs.degree(DE.t) + max(0, 1 - DE.d.degree(DE.t) - mu) else: # TODO: implement this raise NotImplementedError V = [(-ahnga).cancel(gd, include=True) for ga, gd in G] return (a, b, a, N, (ahnfa).cancel(fd, include=True), V) def limited_integrate(fa, fd, G, DE): """ Solves the limited integration problem: f = Dv + Sum(ciwi, (i, 1, n)) """ fa, fd = faPoly(1/fd.LC(), DE.t), fd.monic() # interpreting limited integration problem as a # parametric Risch DE problem Fa = Poly(0, DE.t) Fd = Poly(1, DE.t) G = [(fa, fd)] + G h, A = param_rischDE(Fa, Fd, G, DE) V = A.nullspace() V = [v for v in V if v[0] != 0] if not V: return None else: # we can take any vector from V, we take V[0] c0 = V[0][0] # v = [-1, c1, ..., cm, d1, ..., dr] v = V[0]/(-c0) r = len(h) m = len(v) - r - 1 C = list(v[1: m + 1]) y = -sum([v[m + 1 + i]h[i][0].as_expr()/h[i][1].as_expr() \ for i in range(r)]) y_num, y_den = y.as_numer_denom() Ya, Yd = Poly(y_num, DE.t), Poly(y_den, DE.t) Y = YaPoly(1/Yd.LC(), DE.t), Yd.monic() return Y, C def parametric_log_deriv_heu(fa, fd, wa, wd, DE, c1=None): """ Parametric logarithmic derivative heuristic. Given a derivation D on k[t], f in k(t), and a hyperexponential monomial theta over k(t), raises either NotImplementedError, in which case the heuristic failed, or returns None, in which case it has proven that no solution exists, or returns a solution (n, m, v) of the equation nf == Dv/v + mDtheta/theta, with v in k(t)* and n, m in ZZ with n != 0. If this heuristic fails, the structure theorem approach will need to be used. The argument w == Dtheta/theta """ # TODO: finish writing this and write tests c1 = c1 or Dummy('c1') p, a = fa.div(fd) q, b = wa.div(wd) B = max(0, derivation(DE.t, DE).degree(DE.t) - 1) C = max(p.degree(DE.t), q.degree(DE.t)) if q.degree(DE.t) > B: eqs = [p.nth(i) - c1q.nth(i) for i in range(B + 1, C + 1)] s = solve(eqs, c1) if not s or not s[c1].is_Rational: # deg(q) > B, no solution for c. return None M, N = s[c1].as_numer_denom() nfmwa = Nfawd - Mwafd nfmwd = fdwd Qv = is_log_deriv_k_t_radical_in_field(Nfawd - Mwafd, fdwd, DE, 'auto') if Qv is None: # (Nf - Mw) is not the logarithmic derivative of a k(t)-radical. return None Q, v = Qv if Q.is_zero or v.is_zero: return None return (QN, QM, v) if p.degree(DE.t) > B: return None c = lcm(fd.as_poly(DE.t).LC(), wd.as_poly(DE.t).LC()) l = fd.monic().lcm(wd.monic())Poly(c, DE.t) ln, ls = splitfactor(l, DE) z = lsln.gcd(ln.diff(DE.t)) if not z.has(DE.t): # TODO: We treat this as 'no solution', until the structure # theorem version of parametric_log_deriv is implemented. return None u1, r1 = (fal.quo(fd)).div(z) # (lf).div(z) u2, r2 = (wal.quo(wd)).div(z) # (lw).div(z) eqs = [r1.nth(i) - c1r2.nth(i) for i in range(z.degree(DE.t))] s = solve(eqs, c1) if not s or not s[c1].is_Rational: # deg(q) <= B, no solution for c. return None M, N = s[c1].as_numer_denom() nfmwa = N.as_poly(DE.t)fawd - M.as_poly(DE.t)wafd nfmwd = fdwd Qv = is_log_deriv_k_t_radical_in_field(nfmwa, nfmwd, DE) if Qv is None: # (Nf - Mw) is not the logarithmic derivative of a k(t)-radical. return None Q, v = Qv if Q.is_zero or v.is_zero: return None return (QN, QM, v) def parametric_log_deriv(fa, fd, wa, wd, DE): # TODO: Write the full algorithm using the structure theorems. # try: A = parametric_log_deriv_heu(fa, fd, wa, wd, DE) # except NotImplementedError: # Heuristic failed, we have to use the full method. # TODO: This could be implemented more efficiently. # It isn't too worrisome, because the heuristic handles most difficult # cases. return A def is_deriv_k(fa, fd, DE): r""" Checks if Df/f is the derivative of an element of k(t). a in k(t) is the derivative of an element of k(t) if there exists b in k(t) such that a = Db. Either returns (ans, u), such that Df/f == Du, or None, which means that Df/f is not the derivative of an element of k(t). ans is a list of tuples such that Add([ij for i, j in ans]) == u. This is useful for seeing exactly which elements of k(t) produce u. This function uses the structure theorem approach, which says that for any f in K, Df/f is the derivative of a element of K if and only if there are ri in QQ such that:: --- --- Dt \ r Dt + \ r * i Df / i i / i --- = --. --- --- t f i in L i in E i K/C(x) K/C(x) Where C = Const(K), L_K/C(x) = { i in {1, ..., n} such that t_i is transcendental over C(x)(t_1, ..., t_i-1) and Dt_i = Da_i/a_i, for some a_i in C(x)(t_1, ..., t_i-1)* } (i.e., the set of all indices of logarithmic monomials of K over C(x)), and E_K/C(x) = { i in {1, ..., n} such that t_i is transcendental over C(x)(t_1, ..., t_i-1) and Dt_i/t_i = Da_i, for some a_i in C(x)(t_1, ..., t_i-1) } (i.e., the set of all indices of hyperexponential monomials of K over C(x)). If K is an elementary extension over C(x), then the cardinality of L_K/C(x) U E_K/C(x) is exactly the transcendence degree of K over C(x). Furthermore, because Const_D(K) == Const_D(C(x)) == C, deg(Dt_i) == 1 when t_i is in E_K/C(x) and deg(Dt_i) == 0 when t_i is in L_K/C(x), implying in particular that E_K/C(x) and L_K/C(x) are disjoint. The sets L_K/C(x) and E_K/C(x) must, by their nature, be computed recursively using this same function. Therefore, it is required to pass them as indices to D (or T). E_args are the arguments of the hyperexponentials indexed by E_K (i.e., if i is in E_K, then T[i] == exp(E_args[i])). This is needed to compute the final answer u such that Df/f == Du. log(f) will be the same as u up to a additive constant. This is because they will both behave the same as monomials. For example, both log(x) and log(2x) == log(x) + log(2) satisfy Dt == 1/x, because log(2) is constant. Therefore, the term const is returned. const is such that log(const) + f == u. This is calculated by dividing the arguments of one logarithm from the other. Therefore, it is necessary to pass the arguments of the logarithmic terms in L_args. To handle the case where we are given Df/f, not f, use is_deriv_k_in_field(). See also ======== is_log_deriv_k_t_radical_in_field, is_log_deriv_k_t_radical """ # Compute Df/f dfa, dfd = (fdderivation(fa, DE) - faderivation(fd, DE)), fdfa dfa, dfd = dfa.cancel(dfd, include=True) # Our assumption here is that each monomial is recursively transcendental if len(DE.exts) != len(DE.D): if [i for i in DE.cases if i == 'tan'] or \ (set([i for i in DE.cases if i == 'primitive']) - set(DE.indices('log'))): raise NotImplementedError("Real version of the structure " "theorems with hypertangent support is not yet implemented.") # TODO: What should really be done in this case? raise NotImplementedError("Nonelementary extensions not supported " "in the structure theorems.") E_part = [DE.D[i].quo(Poly(DE.T[i], DE.T[i])).as_expr() for i in DE.indices('exp')] L_part = [DE.D[i].as_expr() for i in DE.indices('log')] lhs = Matrix([E_part + L_part]) rhs = Matrix([dfa.as_expr()/dfd.as_expr()]) A, u = constant_system(lhs, rhs, DE) if not all(derivation(i, DE, basic=True).is_zero for i in u) or not A: # If the elements of u are not all constant # Note: See comment in constant_system # Also note: derivation(basic=True) calls cancel() return None else: if not all(i.is_Rational for i in u): raise NotImplementedError("Cannot work with non-rational " "coefficients in this case.") else: terms = ([DE.extargs[i] for i in DE.indices('exp')] + [DE.T[i] for i in DE.indices('log')]) ans = list(zip(terms, u)) result = Add([Mul(i, j) for i, j in ans]) argterms = ([DE.T[i] for i in DE.indices('exp')] + [DE.extargs[i] for i in DE.indices('log')]) l = [] ld = [] for i, j in zip(argterms, u): # We need to get around things like sqrt(x2) != x # and also sqrt(x2 + 2x + 1) != x + 1 # Issue 10798: i need not be a polynomial i, d = i.as_numer_denom() icoeff, iterms = sqf_list(i) l.append(Mul(([Pow(icoeff, j)] + [Pow(b, ej) for b, e in iterms]))) dcoeff, dterms = sqf_list(d) ld.append(Mul(([Pow(dcoeff, j)] + [Pow(b, ej) for b, e in dterms]))) const = cancel(fa.as_expr()/fd.as_expr()/Mul(l)Mul(ld)) return (ans, result, const) def is_log_deriv_k_t_radical(fa, fd, DE, Df=True): r""" Checks if Df is the logarithmic derivative of a k(t)-radical. b in k(t) can be written as the logarithmic derivative of a k(t) radical if there exist n in ZZ and u in k(t) with n, u != 0 such that nb == Du/u. Either returns (ans, u, n, const) or None, which means that Df cannot be written as the logarithmic derivative of a k(t)-radical. ans is a list of tuples such that Mul([ij for i, j in ans]) == u. This is useful for seeing exactly what elements of k(t) produce u. This function uses the structure theorem approach, which says that for any f in K, Df is the logarithmic derivative of a K-radical if and only if there are ri in QQ such that:: --- --- Dt \ r Dt + \ r * i / i i / i --- = Df. --- --- t i in L i in E i K/C(x) K/C(x) Where C = Const(K), L_K/C(x) = { i in {1, ..., n} such that t_i is transcendental over C(x)(t_1, ..., t_i-1) and Dt_i = Da_i/a_i, for some a_i in C(x)(t_1, ..., t_i-1)* } (i.e., the set of all indices of logarithmic monomials of K over C(x)), and E_K/C(x) = { i in {1, ..., n} such that t_i is transcendental over C(x)(t_1, ..., t_i-1) and Dt_i/t_i = Da_i, for some a_i in C(x)(t_1, ..., t_i-1) } (i.e., the set of all indices of hyperexponential monomials of K over C(x)). If K is an elementary extension over C(x), then the cardinality of L_K/C(x) U E_K/C(x) is exactly the transcendence degree of K over C(x). Furthermore, because Const_D(K) == Const_D(C(x)) == C, deg(Dt_i) == 1 when t_i is in E_K/C(x) and deg(Dt_i) == 0 when t_i is in L_K/C(x), implying in particular that E_K/C(x) and L_K/C(x) are disjoint. The sets L_K/C(x) and E_K/C(x) must, by their nature, be computed recursively using this same function. Therefore, it is required to pass them as indices to D (or T). L_args are the arguments of the logarithms indexed by L_K (i.e., if i is in L_K, then T[i] == log(L_args[i])). This is needed to compute the final answer u such that nf == Du/u. exp(f) will be the same as u up to a multiplicative constant. This is because they will both behave the same as monomials. For example, both exp(x) and exp(x + 1) == Eexp(x) satisfy Dt == t. Therefore, the term const is returned. const is such that exp(const)f == u. This is calculated by subtracting the arguments of one exponential from the other. Therefore, it is necessary to pass the arguments of the exponential terms in E_args. To handle the case where we are given Df, not f, use is_log_deriv_k_t_radical_in_field(). See also ======== is_log_deriv_k_t_radical_in_field, is_deriv_k """ H = [] if Df: dfa, dfd = (fdderivation(fa, DE) - faderivation(fd, DE)).cancel(fd2, include=True) else: dfa, dfd = fa, fd # Our assumption here is that each monomial is recursively transcendental if len(DE.exts) != len(DE.D): if [i for i in DE.cases if i == 'tan'] or \ (set([i for i in DE.cases if i == 'primitive']) - set(DE.indices('log'))): raise NotImplementedError("Real version of the structure " "theorems with hypertangent support is not yet implemented.") # TODO: What should really be done in this case? raise NotImplementedError("Nonelementary extensions not supported " "in the structure theorems.") E_part = [DE.D[i].quo(Poly(DE.T[i], DE.T[i])).as_expr() for i in DE.indices('exp')] L_part = [DE.D[i].as_expr() for i in DE.indices('log')] lhs = Matrix([E_part + L_part]) rhs = Matrix([dfa.as_expr()/dfd.as_expr()]) A, u = constant_system(lhs, rhs, DE) if not all(derivation(i, DE, basic=True).is_zero for i in u) or not A: # If the elements of u are not all constant # Note: See comment in constant_system # Also note: derivation(basic=True) calls cancel() return None else: if not all(i.is_Rational for i in u): # TODO: But maybe we can tell if they're not rational, like # log(2)/log(3). Also, there should be an option to continue # anyway, even if the result might potentially be wrong. raise NotImplementedError("Cannot work with non-rational " "coefficients in this case.") else: n = reduce(ilcm, [i.as_numer_denom()[1] for i in u]) u = n terms = ([DE.T[i] for i in DE.indices('exp')] + [DE.extargs[i] for i in DE.indices('log')]) ans = list(zip(terms, u)) result = Mul([Pow(i, j) for i, j in ans]) # exp(f) will be the same as result up to a multiplicative # constant. We now find the log of that constant. argterms = ([DE.extargs[i] for i in DE.indices('exp')] + [DE.T[i] for i in DE.indices('log')]) const = cancel(fa.as_expr()/fd.as_expr() - Add([Mul(i, j/n) for i, j in zip(argterms, u)])) return (ans, result, n, const) def is_log_deriv_k_t_radical_in_field(fa, fd, DE, case='auto', z=None): """ Checks if f can be written as the logarithmic derivative of a k(t)-radical. It differs from is_log_deriv_k_t_radical(fa, fd, DE, Df=False) for any given fa, fd, DE in that it finds the solution in the given field not in some (possibly unspecified extension) and "in_field" with the function name is used to indicate that. f in k(t) can be written as the logarithmic derivative of a k(t) radical if there exist n in ZZ and u in k(t) with n, u != 0 such that nf == Du/u. Either returns (n, u) or None, which means that f cannot be written as the logarithmic derivative of a k(t)-radical. case is one of {'primitive', 'exp', 'tan', 'auto'} for the primitive, hyperexponential, and hypertangent cases, respectively. If case is 'auto', it will attempt to determine the type of the derivation automatically. See also ======== is_log_deriv_k_t_radical, is_deriv_k """ fa, fd = fa.cancel(fd, include=True) # f must be simple n, s = splitfactor(fd, DE) if not s.is_one: pass z = z or Dummy('z') H, b = residue_reduce(fa, fd, DE, z=z) if not b: # I will have to verify, but I believe that the answer should be # None in this case. This should never happen for the # functions given when solving the parametric logarithmic # derivative problem when integration elementary functions (see # Bronstein's book, page 255), so most likely this indicates a bug. return None roots = [(i, i.real_roots()) for i, _ in H] if not all(len(j) == i.degree() and all(k.is_Rational for k in j) for i, j in roots): # If f is the logarithmic derivative of a k(t)-radical, then all the # roots of the resultant must be rational numbers. return None # [(a, i), ...], where ilog(a) is a term in the log-part of the integral # of f respolys, residues = list(zip(roots)) or [[], []] # Note: this might be empty, but everything below should work find in that # case (it should be the same as if it were [[1, 1]]) residueterms = [(H[j][1].subs(z, i), i) for j in range(len(H)) for i in residues[j]] # TODO: finish writing this and write tests p = cancel(fa.as_expr()/fd.as_expr() - residue_reduce_derivation(H, DE, z)) p = p.as_poly(DE.t) if p is None: # f - Dg will be in k[t] if f is the logarithmic derivative of a k(t)-radical return None if p.degree(DE.t) >= max(1, DE.d.degree(DE.t)): return None if case == 'auto': case = DE.case if case == 'exp': wa, wd = derivation(DE.t, DE).cancel(Poly(DE.t, DE.t), include=True) with DecrementLevel(DE): pa, pd = frac_in(p, DE.t, cancel=True) wa, wd = frac_in((wa, wd), DE.t) A = parametric_log_deriv(pa, pd, wa, wd, DE) if A is None: return None n, e, u = A u = DE.t*e elif case == 'primitive': with DecrementLevel(DE): pa, pd = frac_in(p, DE.t) A = is_log_deriv_k_t_radical_in_field(pa, pd, DE, case='auto') if A is None: return None n, u = A elif case == 'base': # TODO: we can use more efficient residue reduction from ratint() if not fd.is_sqf or fa.degree() >= fd.degree(): # f is the logarithmic derivative in the base case if and only if # f = fa/fd, fd is square-free, deg(fa) < deg(fd), and # gcd(fa, fd) == 1. The last condition is handled by cancel() above. return None # Note: if residueterms = [], returns (1, 1) # f had better be 0 in that case. n = reduce(ilcm, [i.as_numer_denom()[1] for _, i in residueterms], S(1)) u = Mul([Pow(i, jn) for i, j in residueterms]) return (n, u) elif case == 'tan': raise NotImplementedError("The hypertangent case is " "not yet implemented for is_log_deriv_k_t_radical_in_field()") elif case in ['other_linear', 'other_nonlinear']: # XXX: If these are supported by the structure theorems, change to NotImplementedError. raise ValueError("The %s case is not supported in this function." % case) else: raise ValueError("case must be one of {'primitive', 'exp', 'tan', " "'base', 'auto'}, not %s" % case) common_denom = reduce(ilcm, [i.as_numer_denom()[1] for i in [j for _, j in residueterms]] + [n], S(1)) residueterms = [(i, jcommon_denom) for i, j in residueterms] m = common_denom//n if common_denom != nm: # Verify exact division raise ValueError("Inexact division") u = cancel(umMul(*[Pow(i, j) for i, j in residueterms])) return (common_denom, u)
4c8fc9d9bb93ff3b0ceea89345afb6827c861ae70be72011b071f9aaa47e026e	""" Integrate functions by rewriting them as Meijer G-functions. There are three user-visible functions that can be used by other parts of the sympy library to solve various integration problems: - meijerint_indefinite - meijerint_definite - meijerint_inversion They can be used to compute, respectively, indefinite integrals, definite integrals over intervals of the real line, and inverse laplace-type integrals (from c-Ioo to c+Ioo). See the respective docstrings for details. The main references for this are: [L] Luke, Y. L. (1969), The Special Functions and Their Approximations, Volume 1 [R] Kelly B. Roach. Meijer G Function Representations. In: Proceedings of the 1997 International Symposium on Symbolic and Algebraic Computation, pages 205-211, New York, 1997. ACM. [P] A. P. Prudnikov, Yu. A. Brychkov and O. I. Marichev (1990). Integrals and Series: More Special Functions, Vol. 3,. Gordon and Breach Science Publisher """ from __future__ import print_function, division from sympy.core import oo, S, pi, Expr from sympy.core.exprtools import factor_terms from sympy.core.function import expand, expand_mul, expand_power_base from sympy.core.add import Add from sympy.core.mul import Mul from sympy.core.compatibility import range from sympy.core.cache import cacheit from sympy.core.symbol import Dummy, Wild from sympy.simplify import hyperexpand, powdenest, collect from sympy.simplify.fu import sincos_to_sum from sympy.logic.boolalg import And, Or, BooleanAtom from sympy.functions.special.delta_functions import DiracDelta, Heaviside from sympy.functions.elementary.exponential import exp from sympy.functions.elementary.piecewise import Piecewise, piecewise_fold from sympy.functions.elementary.hyperbolic import \ _rewrite_hyperbolics_as_exp, HyperbolicFunction from sympy.functions.elementary.trigonometric import cos, sin from sympy.functions.special.hyper import meijerg from sympy.utilities.iterables import multiset_partitions, ordered from sympy.utilities.misc import debug as _debug from sympy.utilities import default_sort_key # keep this at top for easy reference z = Dummy('z') def _has(res, f): # return True if res has f; in the case of Piecewise # only return True if all* pieces have f res = piecewise_fold(res) if getattr(res, 'is_Piecewise', False): return all(_has(i, f) for i in res.args) return res.has(f) def _create_lookup_table(table): """ Add formulae for the function -> meijerg lookup table. """ def wild(n): return Wild(n, exclude=[z]) p, q, a, b, c = list(map(wild, 'pqabc')) n = Wild('n', properties=[lambda x: x.is_Integer and x > 0]) t = pzq def add(formula, an, ap, bm, bq, arg=t, fac=S(1), cond=True, hint=True): table.setdefault(_mytype(formula, z), []).append((formula, [(fac, meijerg(an, ap, bm, bq, arg))], cond, hint)) def addi(formula, inst, cond, hint=True): table.setdefault( _mytype(formula, z), []).append((formula, inst, cond, hint)) def constant(a): return [(a, meijerg([1], [], [], [0], z)), (a, meijerg([], [1], [0], [], z))] table[()] = [(a, constant(a), True, True)] # [P], Section 8. from sympy import unpolarify, Function, Not class IsNonPositiveInteger(Function): @classmethod def eval(cls, arg): arg = unpolarify(arg) if arg.is_Integer is True: return arg <= 0 # Section 8.4.2 from sympy import (gamma, pi, cos, exp, re, sin, sinc, sqrt, sinh, cosh, factorial, log, erf, erfc, erfi, polar_lift) # TODO this needs more polar_lift (c/f entry for exp) add(Heaviside(t - b)(t - b)*(a - 1), [a], [], [], [0], t/b, gamma(a)b*(a - 1), And(b > 0)) add(Heaviside(b - t)(b - t)*(a - 1), [], [a], [0], [], t/b, gamma(a)b(a - 1), And(b > 0)) add(Heaviside(z - (b/p)(1/q))(t - b)(a - 1), [a], [], [], [0], t/b, gamma(a)b(a - 1), And(b > 0)) add(Heaviside((b/p)(1/q) - z)(b - t)(a - 1), [], [a], [0], [], t/b, gamma(a)b(a - 1), And(b > 0)) add((b + t)(-a), [1 - a], [], [0], [], t/b, b(-a)/gamma(a), hint=Not(IsNonPositiveInteger(a))) add(abs(b - t)(-a), [1 - a], [(1 - a)/2], [0], [(1 - a)/2], t/b, 2sin(pia/2)gamma(1 - a)abs(b)(-a), re(a) < 1) add((ta - ba)/(t - b), [0, a], [], [0, a], [], t/b, b(a - 1)sin(api)/pi) # 12 def A1(r, sign, nu): return pi*(-S(1)/2)(-signnu/2)(1 - 2r) def tmpadd(r, sgn): # XXX the a2 is bad for matching add((sqrt(a2 + t) + sgna)b/(a2 + t)r, [(1 + b)/2, 1 - 2r + b/2], [], [(b - sgnb)/2], [(b + sgnb)/2], t/a2, a(b - 2r)A1(r, sgn, b)) tmpadd(0, 1) tmpadd(0, -1) tmpadd(S(1)/2, 1) tmpadd(S(1)/2, -1) # 13 def tmpadd(r, sgn): add((sqrt(a + pzq) + sgnsqrt(p)z(q/2))b/(a + pzq)r, [1 - r + sgnb/2], [1 - r - sgnb/2], [0, S(1)/2], [], pzq/a, a(b/2 - r)A1(r, sgn, b)) tmpadd(0, 1) tmpadd(0, -1) tmpadd(S(1)/2, 1) tmpadd(S(1)/2, -1) # (those after look obscure) # Section 8.4.3 add(exp(polar_lift(-1)t), [], [], [0], []) # TODO can do sin^n, sinh^n by expansion ... where? # 8.4.4 (hyperbolic functions) add(sinh(t), [], [1], [S(1)/2], [1, 0], t2/4, pi(S(3)/2)) add(cosh(t), [], [S(1)/2], [0], [S(1)/2, S(1)/2], t2/4, pi(S(3)/2)) # Section 8.4.5 # TODO can do t + a. but can also do by expansion... (XXX not really) add(sin(t), [], [], [S(1)/2], [0], t2/4, sqrt(pi)) add(cos(t), [], [], [0], [S(1)/2], t2/4, sqrt(pi)) # Section 8.4.6 (sinc function) add(sinc(t), [], [], [0], [S(-1)/2], t2/4, sqrt(pi)/2) # Section 8.5.5 def make_log1(subs): N = subs[n] return [((-1)Nfactorial(N), meijerg([], [1](N + 1), [0](N + 1), [], t))] def make_log2(subs): N = subs[n] return [(factorial(N), meijerg([1](N + 1), [], [], [0](N + 1), t))] # TODO these only hold for positive p, and can be made more general # but who uses log(x)Heaviside(a-x) anyway ... # TODO also it would be nice to derive them recursively ... addi(log(t)nHeaviside(1 - t), make_log1, True) addi(log(t)*nHeaviside(t - 1), make_log2, True) def make_log3(subs): return make_log1(subs) + make_log2(subs) addi(log(t)*n, make_log3, True) addi(log(t + a), constant(log(a)) + [(S(1), meijerg([1, 1], [], [1], [0], t/a))], True) addi(log(abs(t - a)), constant(log(abs(a))) + [(pi, meijerg([1, 1], [S(1)/2], [1], [0, S(1)/2], t/a))], True) # TODO log(x)/(x+a) and log(x)/(x-1) can also be done. should they # be derivable? # TODO further formulae in this section seem obscure # Sections 8.4.9-10 # TODO # Section 8.4.11 from sympy import Ei, I, expint, Si, Ci, Shi, Chi, fresnels, fresnelc addi(Ei(t), constant(-Ipi) + [(S(-1), meijerg([], [1], [0, 0], [], tpolar_lift(-1)))], True) # Section 8.4.12 add(Si(t), [1], [], [S(1)/2], [0, 0], t2/4, sqrt(pi)/2) add(Ci(t), [], [1], [0, 0], [S(1)/2], t2/4, -sqrt(pi)/2) # Section 8.4.13 add(Shi(t), [S(1)/2], [], [0], [S(-1)/2, S(-1)/2], polar_lift(-1)t*2/4, tsqrt(pi)/4) add(Chi(t), [], [S(1)/2, 1], [0, 0], [S(1)/2, S(1)/2], t2/4, - piS('3/2')/2) # generalized exponential integral add(expint(a, t), [], [a], [a - 1, 0], [], t) # Section 8.4.14 add(erf(t), [1], [], [S(1)/2], [0], t*2, 1/sqrt(pi)) # TODO exp(-x)erf(Ix) does not work add(erfc(t), [], [1], [0, S(1)/2], [], t2, 1/sqrt(pi)) # This formula for erfi(z) yields a wrong(?) minus sign #add(erfi(t), [1], [], [S(1)/2], [0], -t2, I/sqrt(pi)) add(erfi(t), [S(1)/2], [], [0], [-S(1)/2], -t2, t/sqrt(pi)) # Fresnel Integrals add(fresnels(t), [1], [], [S(3)/4], [0, S(1)/4], pi2t4/16, S(1)/2) add(fresnelc(t), [1], [], [S(1)/4], [0, S(3)/4], pi2t4/16, S(1)/2) ##### bessel-type functions ##### from sympy import besselj, bessely, besseli, besselk # Section 8.4.19 add(besselj(a, t), [], [], [a/2], [-a/2], t2/4) # all of the following are derivable #add(sin(t)besselj(a, t), [S(1)/4, S(3)/4], [], [(1+a)/2], # [-a/2, a/2, (1-a)/2], t*2, 1/sqrt(2)) #add(cos(t)besselj(a, t), [S(1)/4, S(3)/4], [], [a/2], # [-a/2, (1+a)/2, (1-a)/2], t2, 1/sqrt(2)) #add(besselj(a, t)2, [S(1)/2], [], [a], [-a, 0], t*2, 1/sqrt(pi)) #add(besselj(a, t)besselj(b, t), [0, S(1)/2], [], [(a + b)/2], # [-(a+b)/2, (a - b)/2, (b - a)/2], t2, 1/sqrt(pi)) # Section 8.4.20 add(bessely(a, t), [], [-(a + 1)/2], [a/2, -a/2], [-(a + 1)/2], t2/4) # TODO all of the following should be derivable #add(sin(t)bessely(a, t), [S(1)/4, S(3)/4], [(1 - a - 1)/2], # [(1 + a)/2, (1 - a)/2], [(1 - a - 1)/2, (1 - 1 - a)/2, (1 - 1 + a)/2], # t2, 1/sqrt(2)) #add(cos(t)bessely(a, t), [S(1)/4, S(3)/4], [(0 - a - 1)/2], # [(0 + a)/2, (0 - a)/2], [(0 - a - 1)/2, (1 - 0 - a)/2, (1 - 0 + a)/2], # t*2, 1/sqrt(2)) #add(besselj(a, t)bessely(b, t), [0, S(1)/2], [(a - b - 1)/2], # [(a + b)/2, (a - b)/2], [(a - b - 1)/2, -(a + b)/2, (b - a)/2], # t2, 1/sqrt(pi)) #addi(bessely(a, t)2, # [(2/sqrt(pi), meijerg([], [S(1)/2, S(1)/2 - a], [0, a, -a], # [S(1)/2 - a], t2)), # (1/sqrt(pi), meijerg([S(1)/2], [], [a], [-a, 0], t2))], # True) #addi(bessely(a, t)bessely(b, t), # [(2/sqrt(pi), meijerg([], [0, S(1)/2, (1 - a - b)/2], # [(a + b)/2, (a - b)/2, (b - a)/2, -(a + b)/2], # [(1 - a - b)/2], t2)), # (1/sqrt(pi), meijerg([0, S(1)/2], [], [(a + b)/2], # [-(a + b)/2, (a - b)/2, (b - a)/2], t2))], # True) # Section 8.4.21 ? # Section 8.4.22 add(besseli(a, t), [], [(1 + a)/2], [a/2], [-a/2, (1 + a)/2], t2/4, pi) # TODO many more formulas. should all be derivable # Section 8.4.23 add(besselk(a, t), [], [], [a/2, -a/2], [], t2/4, S(1)/2) # TODO many more formulas. should all be derivable # Complete elliptic integrals K(z) and E(z) from sympy import elliptic_k, elliptic_e add(elliptic_k(t), [S.Half, S.Half], [], [0], [0], -t, S.Half) add(elliptic_e(t), [S.Half, 3S.Half], [], [0], [0], -t, -S.Half/2) #################################################################### # First some helper functions. #################################################################### from sympy.utilities.timeutils import timethis timeit = timethis('meijerg') def _mytype(f, x): """ Create a hashable entity describing the type of f. """ if x not in f.free_symbols: return () elif f.is_Function: return (type(f),) else: types = [_mytype(a, x) for a in f.args] res = [] for t in types: res += list(t) res.sort() return tuple(res) class _CoeffExpValueError(ValueError): """ Exception raised by _get_coeff_exp, for internal use only. """ pass def _get_coeff_exp(expr, x): """ When expr is known to be of the form cxb, with c and/or b possibly 1, return c, b. >>> from sympy.abc import x, a, b >>> from sympy.integrals.meijerint import _get_coeff_exp >>> _get_coeff_exp(ax*b, x) (a, b) >>> _get_coeff_exp(x, x) (1, 1) >>> _get_coeff_exp(2x, x) (2, 1) >>> _get_coeff_exp(x*3, x) (1, 3) """ from sympy import powsimp (c, m) = expand_power_base(powsimp(expr)).as_coeff_mul(x) if not m: return c, S(0) [m] = m if m.is_Pow: if m.base != x: raise _CoeffExpValueError('expr not of form ax*b') return c, m.exp elif m == x: return c, S(1) else: raise _CoeffExpValueError('expr not of form axb: %s' % expr) def _exponents(expr, x): """ Find the exponents of ``x`` (not including zero) in ``expr``. >>> from sympy.integrals.meijerint import _exponents >>> from sympy.abc import x, y >>> from sympy import sin >>> _exponents(x, x) {1} >>> _exponents(x2, x) {2} >>> _exponents(x2 + x, x) {1, 2} >>> _exponents(x3sin(x + xy) + 1/x, x) {-1, 1, 3, y} """ def _exponents_(expr, x, res): if expr == x: res.update([1]) return if expr.is_Pow and expr.base == x: res.update([expr.exp]) return for arg in expr.args: _exponents_(arg, x, res) res = set() _exponents_(expr, x, res) return res def _functions(expr, x): """ Find the types of functions in expr, to estimate the complexity. """ from sympy import Function return set(e.func for e in expr.atoms(Function) if x in e.free_symbols) def _find_splitting_points(expr, x): """ Find numbers a such that a linear substitution x -> x + a would (hopefully) simplify expr. >>> from sympy.integrals.meijerint import _find_splitting_points as fsp >>> from sympy import sin >>> from sympy.abc import a, x >>> fsp(x, x) {0} >>> fsp((x-1)3, x) {1} >>> fsp(sin(x+3)x, x) {-3, 0} """ p, q = [Wild(n, exclude=[x]) for n in 'pq'] def compute_innermost(expr, res): if not isinstance(expr, Expr): return m = expr.match(px + q) if m and m[p] != 0: res.add(-m[q]/m[p]) return if expr.is_Atom: return for arg in expr.args: compute_innermost(arg, res) innermost = set() compute_innermost(expr, innermost) return innermost def _split_mul(f, x): """ Split expression ``f`` into fac, po, g, where fac is a constant factor, po = xs for some s independent of s, and g is "the rest". >>> from sympy.integrals.meijerint import _split_mul >>> from sympy import sin >>> from sympy.abc import s, x >>> _split_mul((3x)*ssin(x*2)x, x) (3*s, xxs, sin(x2)) """ from sympy import polarify, unpolarify fac = S(1) po = S(1) g = S(1) f = expand_power_base(f) args = Mul.make_args(f) for a in args: if a == x: po = x elif x not in a.free_symbols: fac = a else: if a.is_Pow and x not in a.exp.free_symbols: c, t = a.base.as_coeff_mul(x) if t != (x,): c, t = expand_mul(a.base).as_coeff_mul(x) if t == (x,): po = xa.exp fac = unpolarify(polarify(c*a.exp, subs=False)) continue g = a return fac, po, g def _mul_args(f): """ Return a list ``L`` such that Mul(L) == f. If f is not a Mul or Pow, L=[f]. If f=gn for an integer n, L=[g]n. If f is a Mul, L comes from applying _mul_args to all factors of f. """ args = Mul.make_args(f) gs = [] for g in args: if g.is_Pow and g.exp.is_Integer: n = g.exp base = g.base if n < 0: n = -n base = 1/base gs += [base]n else: gs.append(g) return gs def _mul_as_two_parts(f): """ Find all the ways to split f into a product of two terms. Return None on failure. Although the order is canonical from multiset_partitions, this is not necessarily the best order to process the terms. For example, if the case of len(gs) == 2 is removed and multiset is allowed to sort the terms, some tests fail. >>> from sympy.integrals.meijerint import _mul_as_two_parts >>> from sympy import sin, exp, ordered >>> from sympy.abc import x >>> list(ordered(_mul_as_two_parts(xsin(x)exp(x)))) [(x, exp(x)sin(x)), (xexp(x), sin(x)), (xsin(x), exp(x))] """ gs = _mul_args(f) if len(gs) < 2: return None if len(gs) == 2: return [tuple(gs)] return [(Mul(x), Mul(y)) for (x, y) in multiset_partitions(gs, 2)] def _inflate_g(g, n): """ Return C, h such that h is a G function of argument z*n and g = Ch. """ # TODO should this be a method of meijerg? # See: [L, page 150, equation (5)] def inflate(params, n): """ (a1, .., ak) -> (a1/n, (a1+1)/n, ..., (ak + n-1)/n) """ res = [] for a in params: for i in range(n): res.append((a + i)/n) return res v = S(len(g.ap) - len(g.bq)) C = n*(1 + g.nu + v/2) C /= (2pi)*((n - 1)g.delta) return C, meijerg(inflate(g.an, n), inflate(g.aother, n), inflate(g.bm, n), inflate(g.bother, n), g.argument*n n*(nv)) def _flip_g(g): """ Turn the G function into one of inverse argument (i.e. G(1/x) -> G'(x)) """ # See [L], section 5.2 def tr(l): return [1 - a for a in l] return meijerg(tr(g.bm), tr(g.bother), tr(g.an), tr(g.aother), 1/g.argument) def _inflate_fox_h(g, a): r""" Let d denote the integrand in the definition of the G function ``g``. Consider the function H which is defined in the same way, but with integrand d/Gamma(as) (contour conventions as usual). If a is rational, the function H can be written as CG, for a constant C and a G-function G. This function returns C, G. """ if a < 0: return _inflate_fox_h(_flip_g(g), -a) p = S(a.p) q = S(a.q) # We use the substitution s->qs, i.e. inflate g by q. We are left with an # extra factor of Gamma(ps), for which we use Gauss' multiplication # theorem. D, g = _inflate_g(g, q) z = g.argument D /= (2pi)*((1 - p)/2)p(-S(1)/2) z /= pp bs = [(n + 1)/p for n in range(p)] return D, meijerg(g.an, g.aother, g.bm, list(g.bother) + bs, z) _dummies = {} def _dummy(name, token, expr, kwargs): """ Return a dummy. This will return the same dummy if the same token+name is requested more than once, and it is not already in expr. This is for being cache-friendly. """ d = _dummy_(name, token, kwargs) if d in expr.free_symbols: return Dummy(name, kwargs) return d def _dummy_(name, token, kwargs): """ Return a dummy associated to name and token. Same effect as declaring it globally. """ global _dummies if not (name, token) in _dummies: _dummies[(name, token)] = Dummy(name, *kwargs) return _dummies[(name, token)] def _is_analytic(f, x): """ Check if f(x), when expressed using G functions on the positive reals, will in fact agree with the G functions almost everywhere """ from sympy import Heaviside, Abs return not any(x in expr.free_symbols for expr in f.atoms(Heaviside, Abs)) def _condsimp(cond): """ Do naive simplifications on ``cond``. Note that this routine is completely ad-hoc, simplification rules being added as need arises rather than following any logical pattern. >>> from sympy.integrals.meijerint import _condsimp as simp >>> from sympy import Or, Eq, unbranched_argument as arg, And >>> from sympy.abc import x, y, z >>> simp(Or(x < y, z, Eq(x, y))) z \| (x <= y) >>> simp(Or(x <= y, And(x < y, z))) x <= y """ from sympy import ( symbols, Wild, Eq, unbranched_argument, exp_polar, pi, I, arg, periodic_argument, oo, polar_lift) from sympy.logic.boolalg import BooleanFunction if not isinstance(cond, BooleanFunction): return cond cond = cond.func(list(map(_condsimp, cond.args))) change = True p, q, r = symbols('p q r', cls=Wild) rules = [ (Or(p < q, Eq(p, q)), p <= q), # The next two obviously are instances of a general pattern, but it is # easier to spell out the few cases we care about. (And(abs(arg(p)) <= pi, abs(arg(p) - 2pi) <= pi), Eq(arg(p) - pi, 0)), (And(abs(2arg(p) + pi) <= pi, abs(2arg(p) - pi) <= pi), Eq(arg(p), 0)), (And(abs(unbranched_argument(p)) <= pi, abs(unbranched_argument(exp_polar(-2piI)p)) <= pi), Eq(unbranched_argument(exp_polar(-Ipi)p), 0)), (And(abs(unbranched_argument(p)) <= pi/2, abs(unbranched_argument(exp_polar(-piI)p)) <= pi/2), Eq(unbranched_argument(exp_polar(-Ipi/2)p), 0)), (Or(p <= q, And(p < q, r)), p <= q) ] while change: change = False for fro, to in rules: if fro.func != cond.func: continue for n, arg1 in enumerate(cond.args): if r in fro.args[0].free_symbols: m = arg1.match(fro.args[1]) num = 1 else: num = 0 m = arg1.match(fro.args[0]) if not m: continue otherargs = [x.subs(m) for x in fro.args[:num] + fro.args[num + 1:]] otherlist = [n] for arg2 in otherargs: for k, arg3 in enumerate(cond.args): if k in otherlist: continue if arg2 == arg3: otherlist += [k] break if isinstance(arg3, And) and arg2.args[1] == r and \ isinstance(arg2, And) and arg2.args[0] in arg3.args: otherlist += [k] break if isinstance(arg3, And) and arg2.args[0] == r and \ isinstance(arg2, And) and arg2.args[1] in arg3.args: otherlist += [k] break if len(otherlist) != len(otherargs) + 1: continue newargs = [arg_ for (k, arg_) in enumerate(cond.args) if k not in otherlist] + [to.subs(m)] cond = cond.func(newargs) change = True break # final tweak def repl_eq(orig): if orig.lhs == 0: expr = orig.rhs elif orig.rhs == 0: expr = orig.lhs else: return orig m = expr.match(arg(p)q) if not m: m = expr.match(unbranched_argument(polar_lift(p)q)) if not m: if isinstance(expr, periodic_argument) and not expr.args[0].is_polar \ and expr.args[1] == oo: return (expr.args[0] > 0) return orig return (m[p] > 0) return cond.replace( lambda expr: expr.is_Relational and expr.rel_op == '==', repl_eq) def _eval_cond(cond): """ Re-evaluate the conditions. """ if isinstance(cond, bool): return cond return _condsimp(cond.doit()) #################################################################### # Now the "backbone" functions to do actual integration. #################################################################### def _my_principal_branch(expr, period, full_pb=False): """ Bring expr nearer to its principal branch by removing superfluous factors. This function does not* guarantee to yield the principal branch, to avoid introducing opaque principal_branch() objects, unless full_pb=True. """ from sympy import principal_branch res = principal_branch(expr, period) if not full_pb: res = res.replace(principal_branch, lambda x, y: x) return res def _rewrite_saxena_1(fac, po, g, x): """ Rewrite the integral facpog dx, from zero to infinity, as integral facG, where G has argument ax. Note po=xs. Return fac, G. """ _, s = _get_coeff_exp(po, x) a, b = _get_coeff_exp(g.argument, x) period = g.get_period() a = _my_principal_branch(a, period) # We substitute t = xb. C = fac/(abs(b)a((s + 1)/b - 1)) # Absorb a factor of (at)((1 + s)/b - 1). def tr(l): return [a + (1 + s)/b - 1 for a in l] return C, meijerg(tr(g.an), tr(g.aother), tr(g.bm), tr(g.bother), ax) def _check_antecedents_1(g, x, helper=False): r""" Return a condition under which the mellin transform of g exists. Any power of x has already been absorbed into the G function, so this is just int_0^\infty g dx. See [L, section 5.6.1]. (Note that s=1.) If ``helper`` is True, only check if the MT exists at infinity, i.e. if int_1^\infty g dx exists. """ # NOTE if you update these conditions, please update the documentation as well from sympy import Eq, Not, ceiling, Ne, re, unbranched_argument as arg delta = g.delta eta, _ = _get_coeff_exp(g.argument, x) m, n, p, q = S([len(g.bm), len(g.an), len(g.ap), len(g.bq)]) xi = m + n - p if p > q: def tr(l): return [1 - x for x in l] return _check_antecedents_1(meijerg(tr(g.bm), tr(g.bother), tr(g.an), tr(g.aother), x/eta), x) tmp = [] for b in g.bm: tmp += [-re(b) < 1] for a in g.an: tmp += [1 < 1 - re(a)] cond_3 = And(tmp) for b in g.bother: tmp += [-re(b) < 1] for a in g.aother: tmp += [1 < 1 - re(a)] cond_3_star = And(tmp) cond_4 = (-re(g.nu) + (q + 1 - p)/2 > q - p) def debug(msg): _debug(msg) debug('Checking antecedents for 1 function:') debug(' delta=%s, eta=%s, m=%s, n=%s, p=%s, q=%s' % (delta, eta, m, n, p, q)) debug(' ap = %s, %s' % (list(g.an), list(g.aother))) debug(' bq = %s, %s' % (list(g.bm), list(g.bother))) debug(' cond_3=%s, cond_3=%s, cond_4=%s' % (cond_3, cond_3_star, cond_4)) conds = [] # case 1 case1 = [] tmp1 = [1 <= n, p < q, 1 <= m] tmp2 = [1 <= p, 1 <= m, Eq(q, p + 1), Not(And(Eq(n, 0), Eq(m, p + 1)))] tmp3 = [1 <= p, Eq(q, p)] for k in range(ceiling(delta/2) + 1): tmp3 += [Ne(abs(arg(eta)), (delta - 2k)pi)] tmp = [delta > 0, abs(arg(eta)) < deltapi] extra = [Ne(eta, 0), cond_3] if helper: extra = [] for t in [tmp1, tmp2, tmp3]: case1 += [And((t + tmp + extra))] conds += case1 debug(' case 1:', case1) # case 2 extra = [cond_3] if helper: extra = [] case2 = [And(Eq(n, 0), p + 1 <= m, m <= q, abs(arg(eta)) < deltapi, extra)] conds += case2 debug(' case 2:', case2) # case 3 extra = [cond_3, cond_4] if helper: extra = [] case3 = [And(p < q, 1 <= m, delta > 0, Eq(abs(arg(eta)), deltapi), extra)] case3 += [And(p <= q - 2, Eq(delta, 0), Eq(abs(arg(eta)), 0), extra)] conds += case3 debug(' case 3:', case3) # TODO altered cases 4-7 # extra case from wofram functions site: # (reproduced verbatim from Prudnikov, section 2.24.2) # http://functions.wolfram.com/HypergeometricFunctions/MeijerG/21/02/01/ case_extra = [] case_extra += [Eq(p, q), Eq(delta, 0), Eq(arg(eta), 0), Ne(eta, 0)] if not helper: case_extra += [cond_3] s = [] for a, b in zip(g.ap, g.bq): s += [b - a] case_extra += [re(Add(s)) < 0] case_extra = And(case_extra) conds += [case_extra] debug(' extra case:', [case_extra]) case_extra_2 = [And(delta > 0, abs(arg(eta)) < deltapi)] if not helper: case_extra_2 += [cond_3] case_extra_2 = And(case_extra_2) conds += [case_extra_2] debug(' second extra case:', [case_extra_2]) # TODO This leaves only one case from the three listed by Prudnikov. # Investigate if these indeed cover everything; if so, remove the rest. return Or(conds) def _int0oo_1(g, x): r""" Evaluate int_0^\infty g dx using G functions, assuming the necessary conditions are fulfilled. >>> from sympy.abc import a, b, c, d, x, y >>> from sympy import meijerg >>> from sympy.integrals.meijerint import _int0oo_1 >>> _int0oo_1(meijerg([a], [b], [c], [d], xy), x) gamma(-a)gamma(c + 1)/(ygamma(-d)gamma(b + 1)) """ # See [L, section 5.6.1]. Note that s=1. from sympy import gamma, gammasimp, unpolarify eta, _ = _get_coeff_exp(g.argument, x) res = 1/eta # XXX TODO we should reduce order first for b in g.bm: res = gamma(b + 1) for a in g.an: res = gamma(1 - a - 1) for b in g.bother: res /= gamma(1 - b - 1) for a in g.aother: res /= gamma(a + 1) return gammasimp(unpolarify(res)) def _rewrite_saxena(fac, po, g1, g2, x, full_pb=False): """ Rewrite the integral facpog1g2 from 0 to oo in terms of G functions with argument cx. Return C, f1, f2 such that integral C f1 f2 from 0 to infinity equals integral fac po g1 g2 from 0 to infinity. >>> from sympy.integrals.meijerint import _rewrite_saxena >>> from sympy.abc import s, t, m >>> from sympy import meijerg >>> g1 = meijerg([], [], [0], [], st) >>> g2 = meijerg([], [], [m/2], [-m/2], t2/4) >>> r = _rewrite_saxena(1, t0, g1, g2, t) >>> r[0] s/(4sqrt(pi)) >>> r[1] meijerg(((), ()), ((-1/2, 0), ()), s2t/4) >>> r[2] meijerg(((), ()), ((m/2,), (-m/2,)), t/4) """ from sympy.core.numbers import ilcm def pb(g): a, b = _get_coeff_exp(g.argument, x) per = g.get_period() return meijerg(g.an, g.aother, g.bm, g.bother, _my_principal_branch(a, per, full_pb)xb) _, s = _get_coeff_exp(po, x) _, b1 = _get_coeff_exp(g1.argument, x) _, b2 = _get_coeff_exp(g2.argument, x) if (b1 < 0) == True: b1 = -b1 g1 = _flip_g(g1) if (b2 < 0) == True: b2 = -b2 g2 = _flip_g(g2) if not b1.is_Rational or not b2.is_Rational: return m1, n1 = b1.p, b1.q m2, n2 = b2.p, b2.q tau = ilcm(m1n2, m2n1) r1 = tau//(m1n2) r2 = tau//(m2n1) C1, g1 = _inflate_g(g1, r1) C2, g2 = _inflate_g(g2, r2) g1 = pb(g1) g2 = pb(g2) fac = C1C2 a1, b = _get_coeff_exp(g1.argument, x) a2, _ = _get_coeff_exp(g2.argument, x) # arbitrarily tack on the xs part to g1 # TODO should we try both? exp = (s + 1)/b - 1 fac = fac/(abs(b) a1*exp) def tr(l): return [a + exp for a in l] g1 = meijerg(tr(g1.an), tr(g1.aother), tr(g1.bm), tr(g1.bother), a1x) g2 = meijerg(g2.an, g2.aother, g2.bm, g2.bother, a2x) return powdenest(fac, polar=True), g1, g2 def _check_antecedents(g1, g2, x): """ Return a condition under which the integral theorem applies. """ from sympy import re, Eq, Ne, cos, I, exp, sin, sign, unpolarify from sympy import arg as arg_, unbranched_argument as arg # Yes, this is madness. # XXX TODO this is a testing nightmare* # NOTE if you update these conditions, please update the documentation as well # The following conditions are found in # [P], Section 2.24.1 # # They are also reproduced (verbatim!) at # http://functions.wolfram.com/HypergeometricFunctions/MeijerG/21/02/03/ # # Note: k=l=r=alpha=1 sigma, _ = _get_coeff_exp(g1.argument, x) omega, _ = _get_coeff_exp(g2.argument, x) s, t, u, v = S([len(g1.bm), len(g1.an), len(g1.ap), len(g1.bq)]) m, n, p, q = S([len(g2.bm), len(g2.an), len(g2.ap), len(g2.bq)]) bstar = s + t - (u + v)/2 cstar = m + n - (p + q)/2 rho = g1.nu + (u - v)/2 + 1 mu = g2.nu + (p - q)/2 + 1 phi = q - p - (v - u) eta = 1 - (v - u) - mu - rho psi = (pi(q - m - n) + abs(arg(omega)))/(q - p) theta = (pi(v - s - t) + abs(arg(sigma)))/(v - u) _debug('Checking antecedents:') _debug(' sigma=%s, s=%s, t=%s, u=%s, v=%s, b=%s, rho=%s' % (sigma, s, t, u, v, bstar, rho)) _debug(' omega=%s, m=%s, n=%s, p=%s, q=%s, c=%s, mu=%s,' % (omega, m, n, p, q, cstar, mu)) _debug(' phi=%s, eta=%s, psi=%s, theta=%s' % (phi, eta, psi, theta)) def _c1(): for g in [g1, g2]: for i in g.an: for j in g.bm: diff = i - j if diff.is_integer and diff.is_positive: return False return True c1 = _c1() c2 = And([re(1 + i + j) > 0 for i in g1.bm for j in g2.bm]) c3 = And([re(1 + i + j) < 1 + 1 for i in g1.an for j in g2.an]) c4 = And([(p - q)re(1 + i - 1) - re(mu) > -S(3)/2 for i in g1.an]) c5 = And([(p - q)re(1 + i) - re(mu) > -S(3)/2 for i in g1.bm]) c6 = And([(u - v)re(1 + i - 1) - re(rho) > -S(3)/2 for i in g2.an]) c7 = And([(u - v)re(1 + i) - re(rho) > -S(3)/2 for i in g2.bm]) c8 = (abs(phi) + 2re((rho - 1)(q - p) + (v - u)(q - p) + (mu - 1)(v - u)) > 0) c9 = (abs(phi) - 2re((rho - 1)(q - p) + (v - u)(q - p) + (mu - 1)(v - u)) > 0) c10 = (abs(arg(sigma)) < bstarpi) c11 = Eq(abs(arg(sigma)), bstarpi) c12 = (abs(arg(omega)) < cstarpi) c13 = Eq(abs(arg(omega)), cstarpi) # The following condition is not implemented as stated on the wolfram # function site. In the book of Prudnikov there is an additional part # (the And involving re()). However, I only have this book in russian, and # I don't read any russian. The following condition is what other people # have told me it means. # Worryingly, it is different from the condition implemented in REDUCE. # The REDUCE implementation: # https://reduce-algebra.svn.sourceforge.net/svnroot/reduce-algebra/trunk/packages/defint/definta.red # (search for tst14) # The Wolfram alpha version: # http://functions.wolfram.com/HypergeometricFunctions/MeijerG/21/02/03/03/0014/ z0 = exp(-(bstar + cstar)piI) zos = unpolarify(z0omega/sigma) zso = unpolarify(z0sigma/omega) if zos == 1/zso: c14 = And(Eq(phi, 0), bstar + cstar <= 1, Or(Ne(zos, 1), re(mu + rho + v - u) < 1, re(mu + rho + q - p) < 1)) else: def _cond(z): '''Returns True if abs(arg(1-z)) < pi, avoiding arg(0). Note: if `z` is 1 then arg is NaN. This raises a TypeError on `NaN < pi`. Previously this gave `False` so this behavior has been hardcoded here but someone should check if this NaN is more serious! This NaN is triggered by test_meijerint() in test_meijerint.py: `meijerint_definite(exp(x), x, 0, I)` ''' return z != 1 and abs(arg_(1 - z)) < pi c14 = And(Eq(phi, 0), bstar - 1 + cstar <= 0, Or(And(Ne(zos, 1), _cond(zos)), And(re(mu + rho + v - u) < 1, Eq(zos, 1)))) c14_alt = And(Eq(phi, 0), cstar - 1 + bstar <= 0, Or(And(Ne(zso, 1), _cond(zso)), And(re(mu + rho + q - p) < 1, Eq(zso, 1)))) # Since r=k=l=1, in our case there is c14_alt which is the same as calling # us with (g1, g2) = (g2, g1). The conditions below enumerate all cases # (i.e. we don't have to try arguments reversed by hand), and indeed try # all symmetric cases. (i.e. whenever there is a condition involving c14, # there is also a dual condition which is exactly what we would get when g1, # g2 were interchanged, but c14 was unaltered). # Hence the following seems correct: c14 = Or(c14, c14_alt) ''' When `c15` is NaN (e.g. from `psi` being NaN as happens during 'test_issue_4992' and/or `theta` is NaN as in 'test_issue_6253', both in `test_integrals.py`) the comparison to 0 formerly gave False whereas now an error is raised. To keep the old behavior, the value of NaN is replaced with False but perhaps a closer look at this condition should be made: XXX how should conditions leading to c15=NaN be handled? ''' try: lambda_c = (q - p)abs(omega)(1/(q - p))cos(psi) \ + (v - u)abs(sigma)(1/(v - u))cos(theta) # the TypeError might be raised here, e.g. if lambda_c is NaN if _eval_cond(lambda_c > 0) != False: c15 = (lambda_c > 0) else: def lambda_s0(c1, c2): return c1(q - p)abs(omega)*(1/(q - p))sin(psi) \ + c2(v - u)abs(sigma)*(1/(v - u))sin(theta) lambda_s = Piecewise( ((lambda_s0(+1, +1)lambda_s0(-1, -1)), And(Eq(arg(sigma), 0), Eq(arg(omega), 0))), (lambda_s0(sign(arg(omega)), +1)lambda_s0(sign(arg(omega)), -1), And(Eq(arg(sigma), 0), Ne(arg(omega), 0))), (lambda_s0(+1, sign(arg(sigma)))lambda_s0(-1, sign(arg(sigma))), And(Ne(arg(sigma), 0), Eq(arg(omega), 0))), (lambda_s0(sign(arg(omega)), sign(arg(sigma))), True)) tmp = [lambda_c > 0, And(Eq(lambda_c, 0), Ne(lambda_s, 0), re(eta) > -1), And(Eq(lambda_c, 0), Eq(lambda_s, 0), re(eta) > 0)] c15 = Or(tmp) except TypeError: c15 = False for cond, i in [(c1, 1), (c2, 2), (c3, 3), (c4, 4), (c5, 5), (c6, 6), (c7, 7), (c8, 8), (c9, 9), (c10, 10), (c11, 11), (c12, 12), (c13, 13), (c14, 14), (c15, 15)]: _debug(' c%s:' % i, cond) # We will return Or(conds) conds = [] def pr(count): _debug(' case %s:' % count, conds[-1]) conds += [And(mnst != 0, bstar.is_positive is True, cstar.is_positive is True, c1, c2, c3, c10, c12)] # 1 pr(1) conds += [And(Eq(u, v), Eq(bstar, 0), cstar.is_positive is True, sigma.is_positive is True, re(rho) < 1, c1, c2, c3, c12)] # 2 pr(2) conds += [And(Eq(p, q), Eq(cstar, 0), bstar.is_positive is True, omega.is_positive is True, re(mu) < 1, c1, c2, c3, c10)] # 3 pr(3) conds += [And(Eq(p, q), Eq(u, v), Eq(bstar, 0), Eq(cstar, 0), sigma.is_positive is True, omega.is_positive is True, re(mu) < 1, re(rho) < 1, Ne(sigma, omega), c1, c2, c3)] # 4 pr(4) conds += [And(Eq(p, q), Eq(u, v), Eq(bstar, 0), Eq(cstar, 0), sigma.is_positive is True, omega.is_positive is True, re(mu + rho) < 1, Ne(omega, sigma), c1, c2, c3)] # 5 pr(5) conds += [And(p > q, s.is_positive is True, bstar.is_positive is True, cstar >= 0, c1, c2, c3, c5, c10, c13)] # 6 pr(6) conds += [And(p < q, t.is_positive is True, bstar.is_positive is True, cstar >= 0, c1, c2, c3, c4, c10, c13)] # 7 pr(7) conds += [And(u > v, m.is_positive is True, cstar.is_positive is True, bstar >= 0, c1, c2, c3, c7, c11, c12)] # 8 pr(8) conds += [And(u < v, n.is_positive is True, cstar.is_positive is True, bstar >= 0, c1, c2, c3, c6, c11, c12)] # 9 pr(9) conds += [And(p > q, Eq(u, v), Eq(bstar, 0), cstar >= 0, sigma.is_positive is True, re(rho) < 1, c1, c2, c3, c5, c13)] # 10 pr(10) conds += [And(p < q, Eq(u, v), Eq(bstar, 0), cstar >= 0, sigma.is_positive is True, re(rho) < 1, c1, c2, c3, c4, c13)] # 11 pr(11) conds += [And(Eq(p, q), u > v, bstar >= 0, Eq(cstar, 0), omega.is_positive is True, re(mu) < 1, c1, c2, c3, c7, c11)] # 12 pr(12) conds += [And(Eq(p, q), u < v, bstar >= 0, Eq(cstar, 0), omega.is_positive is True, re(mu) < 1, c1, c2, c3, c6, c11)] # 13 pr(13) conds += [And(p < q, u > v, bstar >= 0, cstar >= 0, c1, c2, c3, c4, c7, c11, c13)] # 14 pr(14) conds += [And(p > q, u < v, bstar >= 0, cstar >= 0, c1, c2, c3, c5, c6, c11, c13)] # 15 pr(15) conds += [And(p > q, u > v, bstar >= 0, cstar >= 0, c1, c2, c3, c5, c7, c8, c11, c13, c14)] # 16 pr(16) conds += [And(p < q, u < v, bstar >= 0, cstar >= 0, c1, c2, c3, c4, c6, c9, c11, c13, c14)] # 17 pr(17) conds += [And(Eq(t, 0), s.is_positive is True, bstar.is_positive is True, phi.is_positive is True, c1, c2, c10)] # 18 pr(18) conds += [And(Eq(s, 0), t.is_positive is True, bstar.is_positive is True, phi.is_negative is True, c1, c3, c10)] # 19 pr(19) conds += [And(Eq(n, 0), m.is_positive is True, cstar.is_positive is True, phi.is_negative is True, c1, c2, c12)] # 20 pr(20) conds += [And(Eq(m, 0), n.is_positive is True, cstar.is_positive is True, phi.is_positive is True, c1, c3, c12)] # 21 pr(21) conds += [And(Eq(st, 0), bstar.is_positive is True, cstar.is_positive is True, c1, c2, c3, c10, c12)] # 22 pr(22) conds += [And(Eq(mn, 0), bstar.is_positive is True, cstar.is_positive is True, c1, c2, c3, c10, c12)] # 23 pr(23) # The following case is from [Luke1969]. As far as I can tell, it is not # covered by Prudnikov's. # Let G1 and G2 be the two G-functions. Suppose the integral exists from # 0 to a > 0 (this is easy the easy part), that G1 is exponential decay at # infinity, and that the mellin transform of G2 exists. # Then the integral exists. mt1_exists = _check_antecedents_1(g1, x, helper=True) mt2_exists = _check_antecedents_1(g2, x, helper=True) conds += [And(mt2_exists, Eq(t, 0), u < s, bstar.is_positive is True, c10, c1, c2, c3)] pr('E1') conds += [And(mt2_exists, Eq(s, 0), v < t, bstar.is_positive is True, c10, c1, c2, c3)] pr('E2') conds += [And(mt1_exists, Eq(n, 0), p < m, cstar.is_positive is True, c12, c1, c2, c3)] pr('E3') conds += [And(mt1_exists, Eq(m, 0), q < n, cstar.is_positive is True, c12, c1, c2, c3)] pr('E4') # Let's short-circuit if this worked ... # the rest is corner-cases and terrible to read. r = Or(conds) if _eval_cond(r) != False: return r conds += [And(m + n > p, Eq(t, 0), Eq(phi, 0), s.is_positive is True, bstar.is_positive is True, cstar.is_negative is True, abs(arg(omega)) < (m + n - p + 1)pi, c1, c2, c10, c14, c15)] # 24 pr(24) conds += [And(m + n > q, Eq(s, 0), Eq(phi, 0), t.is_positive is True, bstar.is_positive is True, cstar.is_negative is True, abs(arg(omega)) < (m + n - q + 1)pi, c1, c3, c10, c14, c15)] # 25 pr(25) conds += [And(Eq(p, q - 1), Eq(t, 0), Eq(phi, 0), s.is_positive is True, bstar.is_positive is True, cstar >= 0, cstarpi < abs(arg(omega)), c1, c2, c10, c14, c15)] # 26 pr(26) conds += [And(Eq(p, q + 1), Eq(s, 0), Eq(phi, 0), t.is_positive is True, bstar.is_positive is True, cstar >= 0, cstarpi < abs(arg(omega)), c1, c3, c10, c14, c15)] # 27 pr(27) conds += [And(p < q - 1, Eq(t, 0), Eq(phi, 0), s.is_positive is True, bstar.is_positive is True, cstar >= 0, cstarpi < abs(arg(omega)), abs(arg(omega)) < (m + n - p + 1)pi, c1, c2, c10, c14, c15)] # 28 pr(28) conds += [And( p > q + 1, Eq(s, 0), Eq(phi, 0), t.is_positive is True, bstar.is_positive is True, cstar >= 0, cstarpi < abs(arg(omega)), abs(arg(omega)) < (m + n - q + 1)pi, c1, c3, c10, c14, c15)] # 29 pr(29) conds += [And(Eq(n, 0), Eq(phi, 0), s + t > 0, m.is_positive is True, cstar.is_positive is True, bstar.is_negative is True, abs(arg(sigma)) < (s + t - u + 1)pi, c1, c2, c12, c14, c15)] # 30 pr(30) conds += [And(Eq(m, 0), Eq(phi, 0), s + t > v, n.is_positive is True, cstar.is_positive is True, bstar.is_negative is True, abs(arg(sigma)) < (s + t - v + 1)pi, c1, c3, c12, c14, c15)] # 31 pr(31) conds += [And(Eq(n, 0), Eq(phi, 0), Eq(u, v - 1), m.is_positive is True, cstar.is_positive is True, bstar >= 0, bstarpi < abs(arg(sigma)), abs(arg(sigma)) < (bstar + 1)pi, c1, c2, c12, c14, c15)] # 32 pr(32) conds += [And(Eq(m, 0), Eq(phi, 0), Eq(u, v + 1), n.is_positive is True, cstar.is_positive is True, bstar >= 0, bstarpi < abs(arg(sigma)), abs(arg(sigma)) < (bstar + 1)pi, c1, c3, c12, c14, c15)] # 33 pr(33) conds += [And( Eq(n, 0), Eq(phi, 0), u < v - 1, m.is_positive is True, cstar.is_positive is True, bstar >= 0, bstarpi < abs(arg(sigma)), abs(arg(sigma)) < (s + t - u + 1)pi, c1, c2, c12, c14, c15)] # 34 pr(34) conds += [And( Eq(m, 0), Eq(phi, 0), u > v + 1, n.is_positive is True, cstar.is_positive is True, bstar >= 0, bstarpi < abs(arg(sigma)), abs(arg(sigma)) < (s + t - v + 1)pi, c1, c3, c12, c14, c15)] # 35 pr(35) return Or(conds) # NOTE An alternative, but as far as I can tell weaker, set of conditions # can be found in [L, section 5.6.2]. def _int0oo(g1, g2, x): """ Express integral from zero to infinity g1g2 using a G function, assuming the necessary conditions are fulfilled. >>> from sympy.integrals.meijerint import _int0oo >>> from sympy.abc import s, t, m >>> from sympy import meijerg, S >>> g1 = meijerg([], [], [-S(1)/2, 0], [], s2t/4) >>> g2 = meijerg([], [], [m/2], [-m/2], t/4) >>> _int0oo(g1, g2, t) 4meijerg(((1/2, 0), ()), ((m/2,), (-m/2,)), s(-2))/s2 """ # See: [L, section 5.6.2, equation (1)] eta, _ = _get_coeff_exp(g1.argument, x) omega, _ = _get_coeff_exp(g2.argument, x) def neg(l): return [-x for x in l] a1 = neg(g1.bm) + list(g2.an) a2 = list(g2.aother) + neg(g1.bother) b1 = neg(g1.an) + list(g2.bm) b2 = list(g2.bother) + neg(g1.aother) return meijerg(a1, a2, b1, b2, omega/eta)/eta def _rewrite_inversion(fac, po, g, x): """ Absorb ``po`` == xs into g. """ _, s = _get_coeff_exp(po, x) a, b = _get_coeff_exp(g.argument, x) def tr(l): return [t + s/b for t in l] return (powdenest(fac/a(s/b), polar=True), meijerg(tr(g.an), tr(g.aother), tr(g.bm), tr(g.bother), g.argument)) def _check_antecedents_inversion(g, x): """ Check antecedents for the laplace inversion integral. """ from sympy import re, im, Or, And, Eq, exp, I, Add, nan, Ne _debug('Checking antecedents for inversion:') z = g.argument _, e = _get_coeff_exp(z, x) if e < 0: _debug(' Flipping G.') # We want to assume that argument gets large as \|x\| -> oo return _check_antecedents_inversion(_flip_g(g), x) def statement_half(a, b, c, z, plus): coeff, exponent = _get_coeff_exp(z, x) a = exponent b = coeffc c = exponent conds = [] wp = bexp(Ire(c)pi/2) wm = bexp(-Ire(c)pi/2) if plus: w = wp else: w = wm conds += [And(Or(Eq(b, 0), re(c) <= 0), re(a) <= -1)] conds += [And(Ne(b, 0), Eq(im(c), 0), re(c) > 0, re(w) < 0)] conds += [And(Ne(b, 0), Eq(im(c), 0), re(c) > 0, re(w) <= 0, re(a) <= -1)] return Or(conds) def statement(a, b, c, z): """ Provide a convergence statement for za exp(bzc), c/f sphinx docs. """ return And(statement_half(a, b, c, z, True), statement_half(a, b, c, z, False)) # Notations from [L], section 5.7-10 m, n, p, q = S([len(g.bm), len(g.an), len(g.ap), len(g.bq)]) tau = m + n - p nu = q - m - n rho = (tau - nu)/2 sigma = q - p if sigma == 1: epsilon = S(1)/2 elif sigma > 1: epsilon = 1 else: epsilon = nan theta = ((1 - sigma)/2 + Add(g.bq) - Add(g.ap))/sigma delta = g.delta _debug(' m=%s, n=%s, p=%s, q=%s, tau=%s, nu=%s, rho=%s, sigma=%s' % ( m, n, p, q, tau, nu, rho, sigma)) _debug(' epsilon=%s, theta=%s, delta=%s' % (epsilon, theta, delta)) # First check if the computation is valid. if not (g.delta >= e/2 or (p >= 1 and p >= q)): _debug(' Computation not valid for these parameters.') return False # Now check if the inversion integral exists. # Test "condition A" for a in g.an: for b in g.bm: if (a - b).is_integer and a > b: _debug(' Not a valid G function.') return False # There are two cases. If p >= q, we can directly use a slater expansion # like [L], 5.2 (11). Note in particular that the asymptotics of such an # expansion even hold when some of the parameters differ by integers, i.e. # the formula itself would not be valid! (b/c G functions are cts. in their # parameters) # When p < q, we need to use the theorems of [L], 5.10. if p >= q: _debug(' Using asymptotic Slater expansion.') return And([statement(a - 1, 0, 0, z) for a in g.an]) def E(z): return And([statement(a - 1, 0, 0, z) for a in g.an]) def H(z): return statement(theta, -sigma, 1/sigma, z) def Hp(z): return statement_half(theta, -sigma, 1/sigma, z, True) def Hm(z): return statement_half(theta, -sigma, 1/sigma, z, False) # [L], section 5.10 conds = [] # Theorem 1 -- p < q from test above conds += [And(1 <= n, 1 <= m, rhopi - delta >= pi/2, delta > 0, E(zexp(Ipi(nu + 1))))] # Theorem 2, statements (2) and (3) conds += [And(p + 1 <= m, m + 1 <= q, delta > 0, delta < pi/2, n == 0, (m - p + 1)pi - delta >= pi/2, Hp(zexp(Ipi(q - m))), Hm(zexp(-Ipi(q - m))))] # Theorem 2, statement (5) -- p < q from test above conds += [And(m == q, n == 0, delta > 0, (sigma + epsilon)pi - delta >= pi/2, H(z))] # Theorem 3, statements (6) and (7) conds += [And(Or(And(p <= q - 2, 1 <= tau, tau <= sigma/2), And(p + 1 <= m + n, m + n <= (p + q)/2)), delta > 0, delta < pi/2, (tau + 1)pi - delta >= pi/2, Hp(zexp(Ipinu)), Hm(zexp(-Ipinu)))] # Theorem 4, statements (10) and (11) -- p < q from test above conds += [And(1 <= m, rho > 0, delta > 0, delta + rhopi < pi/2, (tau + epsilon)pi - delta >= pi/2, Hp(zexp(Ipinu)), Hm(zexp(-Ipinu)))] # Trivial case conds += [m == 0] # TODO # Theorem 5 is quite general # Theorem 6 contains special cases for q=p+1 return Or(conds) def _int_inversion(g, x, t): """ Compute the laplace inversion integral, assuming the formula applies. """ b, a = _get_coeff_exp(g.argument, x) C, g = _inflate_fox_h(meijerg(g.an, g.aother, g.bm, g.bother, b/ta), -a) return C/tg #################################################################### # Finally, the real meat. #################################################################### _lookup_table = None @cacheit @timeit def _rewrite_single(f, x, recursive=True): """ Try to rewrite f as a sum of single G functions of the form CxsG(axb), where b is a rational number and C is independent of x. We guarantee that result.argument.as_coeff_mul(x) returns (a, (xb,)) or (a, ()). Returns a list of tuples (C, s, G) and a condition cond. Returns None on failure. """ from sympy import polarify, unpolarify, oo, zoo, Tuple global _lookup_table if not _lookup_table: _lookup_table = {} _create_lookup_table(_lookup_table) if isinstance(f, meijerg): from sympy import factor coeff, m = factor(f.argument, x).as_coeff_mul(x) if len(m) > 1: return None m = m[0] if m.is_Pow: if m.base != x or not m.exp.is_Rational: return None elif m != x: return None return [(1, 0, meijerg(f.an, f.aother, f.bm, f.bother, coeffm))], True f_ = f f = f.subs(x, z) t = _mytype(f, z) if t in _lookup_table: l = _lookup_table[t] for formula, terms, cond, hint in l: subs = f.match(formula, old=True) if subs: subs_ = {} for fro, to in subs.items(): subs_[fro] = unpolarify(polarify(to, lift=True), exponents_only=True) subs = subs_ if not isinstance(hint, bool): hint = hint.subs(subs) if hint == False: continue if not isinstance(cond, (bool, BooleanAtom)): cond = unpolarify(cond.subs(subs)) if _eval_cond(cond) == False: continue if not isinstance(terms, list): terms = terms(subs) res = [] for fac, g in terms: r1 = _get_coeff_exp(unpolarify(fac.subs(subs).subs(z, x), exponents_only=True), x) try: g = g.subs(subs).subs(z, x) except ValueError: continue # NOTE these substitutions can in principle introduce oo, # zoo and other absurdities. It shouldn't matter, # but better be safe. if Tuple((r1 + (g,))).has(oo, zoo, -oo): continue g = meijerg(g.an, g.aother, g.bm, g.bother, unpolarify(g.argument, exponents_only=True)) res.append(r1 + (g,)) if res: return res, cond # try recursive mellin transform if not recursive: return None _debug('Trying recursive Mellin transform method.') from sympy.integrals.transforms import (mellin_transform, inverse_mellin_transform, IntegralTransformError, MellinTransformStripError) from sympy import oo, nan, zoo, simplify, cancel def my_imt(F, s, x, strip): """ Calling simplify() all the time is slow and not helpful, since most of the time it only factors things in a way that has to be un-done anyway. But sometimes it can remove apparent poles. """ # XXX should this be in inverse_mellin_transform? try: return inverse_mellin_transform(F, s, x, strip, as_meijerg=True, needeval=True) except MellinTransformStripError: return inverse_mellin_transform( simplify(cancel(expand(F))), s, x, strip, as_meijerg=True, needeval=True) f = f_ s = _dummy('s', 'rewrite-single', f) # to avoid infinite recursion, we have to force the two g functions case def my_integrator(f, x): from sympy import Integral, hyperexpand r = _meijerint_definite_4(f, x, only_double=True) if r is not None: res, cond = r res = _my_unpolarify(hyperexpand(res, rewrite='nonrepsmall')) return Piecewise((res, cond), (Integral(f, (x, 0, oo)), True)) return Integral(f, (x, 0, oo)) try: F, strip, _ = mellin_transform(f, x, s, integrator=my_integrator, simplify=False, needeval=True) g = my_imt(F, s, x, strip) except IntegralTransformError: g = None if g is None: # We try to find an expression by analytic continuation. # (also if the dummy is already in the expression, there is no point in # putting in another one) a = _dummy_('a', 'rewrite-single') if a not in f.free_symbols and _is_analytic(f, x): try: F, strip, _ = mellin_transform(f.subs(x, ax), x, s, integrator=my_integrator, needeval=True, simplify=False) g = my_imt(F, s, x, strip).subs(a, 1) except IntegralTransformError: g = None if g is None or g.has(oo, nan, zoo): _debug('Recursive Mellin transform failed.') return None args = Add.make_args(g) res = [] for f in args: c, m = f.as_coeff_mul(x) if len(m) > 1: raise NotImplementedError('Unexpected form...') g = m[0] a, b = _get_coeff_exp(g.argument, x) res += [(c, 0, meijerg(g.an, g.aother, g.bm, g.bother, unpolarify(polarify( a, lift=True), exponents_only=True) xb))] _debug('Recursive Mellin transform worked:', g) return res, True def _rewrite1(f, x, recursive=True): """ Try to rewrite f using a (sum of) single G functions with argument ax*b. Return fac, po, g such that f = facpog, fac is independent of x and po = xs. Here g is a result from _rewrite_single. Return None on failure. """ fac, po, g = _split_mul(f, x) g = _rewrite_single(g, x, recursive) if g: return fac, po, g[0], g[1] def _rewrite2(f, x): """ Try to rewrite f as a product of two G functions of arguments ax*b. Return fac, po, g1, g2 such that f = facpog1g2, where fac is independent of x and po is x*s. Here g1 and g2 are results of _rewrite_single. Returns None on failure. """ fac, po, g = _split_mul(f, x) if any(_rewrite_single(expr, x, False) is None for expr in _mul_args(g)): return None l = _mul_as_two_parts(g) if not l: return None l = list(ordered(l, [ lambda p: max(len(_exponents(p[0], x)), len(_exponents(p[1], x))), lambda p: max(len(_functions(p[0], x)), len(_functions(p[1], x))), lambda p: max(len(_find_splitting_points(p[0], x)), len(_find_splitting_points(p[1], x)))])) for recursive in [False, True]: for fac1, fac2 in l: g1 = _rewrite_single(fac1, x, recursive) g2 = _rewrite_single(fac2, x, recursive) if g1 and g2: cond = And(g1[1], g2[1]) if cond != False: return fac, po, g1[0], g2[0], cond def meijerint_indefinite(f, x): """ Compute an indefinite integral of ``f`` by rewriting it as a G function. Examples ======== >>> from sympy.integrals.meijerint import meijerint_indefinite >>> from sympy import sin >>> from sympy.abc import x >>> meijerint_indefinite(sin(x), x) -cos(x) """ from sympy import hyper, meijerg results = [] for a in sorted(_find_splitting_points(f, x) \| {S(0)}, key=default_sort_key): res = _meijerint_indefinite_1(f.subs(x, x + a), x) if not res: continue res = res.subs(x, x - a) if _has(res, hyper, meijerg): results.append(res) else: return res if f.has(HyperbolicFunction): _debug('Try rewriting hyperbolics in terms of exp.') rv = meijerint_indefinite( _rewrite_hyperbolics_as_exp(f), x) if rv: if not type(rv) is list: return collect(factor_terms(rv), rv.atoms(exp)) results.extend(rv) if results: return next(ordered(results)) def _meijerint_indefinite_1(f, x): """ Helper that does not attempt any substitution. """ from sympy import Integral, piecewise_fold, nan, zoo _debug('Trying to compute the indefinite integral of', f, 'wrt', x) gs = _rewrite1(f, x) if gs is None: # Note: the code that calls us will do expand() and try again return None fac, po, gl, cond = gs _debug(' could rewrite:', gs) res = S(0) for C, s, g in gl: a, b = _get_coeff_exp(g.argument, x) _, c = _get_coeff_exp(po, x) c += s # we do a substitution t=ax*b, get integrand fact*rhog fac_ = fac * C / (ba((1 + c)/b)) rho = (c + 1)/b - 1 # we now use trhoG(params, t) = G(params + rho, t) # [L, page 150, equation (4)] # and integral G(params, t) dt = G(1, params+1, 0, t) # (or a similar expression with 1 and 0 exchanged ... pick the one # which yields a well-defined function) # [R, section 5] # (Note that this dummy will immediately go away again, so we # can safely pass S(1) for ``expr``.) t = _dummy('t', 'meijerint-indefinite', S(1)) def tr(p): return [a + rho + 1 for a in p] if any(b.is_integer and (b <= 0) == True for b in tr(g.bm)): r = -meijerg( tr(g.an), tr(g.aother) + [1], tr(g.bm) + [0], tr(g.bother), t) else: r = meijerg( tr(g.an) + [1], tr(g.aother), tr(g.bm), tr(g.bother) + [0], t) # The antiderivative is most often expected to be defined # in the neighborhood of x = 0. place = 0 if b < 0 or f.subs(x, 0).has(nan, zoo): place = None r = hyperexpand(r.subs(t, axb), place=place) # now substitute back # Note: we really do want the powers of x to combine. res += powdenest(fac_r, polar=True) def _clean(res): """This multiplies out superfluous powers of x we created, and chops off constants: >> _clean(x(exp(x)/x - 1/x) + 3) exp(x) cancel is used before mul_expand since it is possible for an expression to have an additive constant that doesn't become isolated with simple expansion. Such a situation was identified in issue 6369: >>> from sympy import sqrt, cancel >>> from sympy.abc import x >>> a = sqrt(2x + 1) >>> bad = (3xa*5 + 2x - a5 + 1)/a2 >>> bad.expand().as_independent(x)[0] 0 >>> cancel(bad).expand().as_independent(x)[0] 1 """ from sympy import cancel res = expand_mul(cancel(res), deep=False) return Add._from_args(res.as_coeff_add(x)[1]) res = piecewise_fold(res) if res.is_Piecewise: newargs = [] for expr, cond in res.args: expr = _my_unpolarify(_clean(expr)) newargs += [(expr, cond)] res = Piecewise(newargs) else: res = _my_unpolarify(_clean(res)) return Piecewise((res, _my_unpolarify(cond)), (Integral(f, x), True)) @timeit def meijerint_definite(f, x, a, b): """ Integrate ``f`` over the interval [``a``, ``b``], by rewriting it as a product of two G functions, or as a single G function. Return res, cond, where cond are convergence conditions. Examples ======== >>> from sympy.integrals.meijerint import meijerint_definite >>> from sympy import exp, oo >>> from sympy.abc import x >>> meijerint_definite(exp(-x2), x, -oo, oo) (sqrt(pi), True) This function is implemented as a succession of functions meijerint_definite, _meijerint_definite_2, _meijerint_definite_3, _meijerint_definite_4. Each function in the list calls the next one (presumably) several times. This means that calling meijerint_definite can be very costly. """ # This consists of three steps: # 1) Change the integration limits to 0, oo # 2) Rewrite in terms of G functions # 3) Evaluate the integral # # There are usually several ways of doing this, and we want to try all. # This function does (1), calls _meijerint_definite_2 for step (2). from sympy import arg, exp, I, And, DiracDelta, SingularityFunction _debug('Integrating', f, 'wrt %s from %s to %s.' % (x, a, b)) if f.has(DiracDelta): _debug('Integrand has DiracDelta terms - giving up.') return None if f.has(SingularityFunction): _debug('Integrand has Singularity Function terms - giving up.') return None f_, x_, a_, b_ = f, x, a, b # Let's use a dummy in case any of the boundaries has x. d = Dummy('x') f = f.subs(x, d) x = d if a == b: return (S.Zero, True) results = [] if a == -oo and b != oo: return meijerint_definite(f.subs(x, -x), x, -b, -a) elif a == -oo: # Integrating -oo to oo. We need to find a place to split the integral. _debug(' Integrating -oo to +oo.') innermost = _find_splitting_points(f, x) _debug(' Sensible splitting points:', innermost) for c in sorted(innermost, key=default_sort_key, reverse=True) + [S(0)]: _debug(' Trying to split at', c) if not c.is_extended_real: _debug(' Non-real splitting point.') continue res1 = _meijerint_definite_2(f.subs(x, x + c), x) if res1 is None: _debug(' But could not compute first integral.') continue res2 = _meijerint_definite_2(f.subs(x, c - x), x) if res2 is None: _debug(' But could not compute second integral.') continue res1, cond1 = res1 res2, cond2 = res2 cond = _condsimp(And(cond1, cond2)) if cond == False: _debug(' But combined condition is always false.') continue res = res1 + res2 return res, cond elif a == oo: res = meijerint_definite(f, x, b, oo) return -res[0], res[1] elif (a, b) == (0, oo): # This is a common case - try it directly first. res = _meijerint_definite_2(f, x) if res: if _has(res[0], meijerg): results.append(res) else: return res else: if b == oo: for split in _find_splitting_points(f, x): if (a - split >= 0) == True: _debug('Trying x -> x + %s' % split) res = _meijerint_definite_2(f.subs(x, x + split) Heaviside(x + split - a), x) if res: if _has(res[0], meijerg): results.append(res) else: return res f = f.subs(x, x + a) b = b - a a = 0 if b != oo: phi = exp(Iarg(b)) b = abs(b) f = f.subs(x, phix) f = Heaviside(b - x)phi b = oo _debug('Changed limits to', a, b) _debug('Changed function to', f) res = _meijerint_definite_2(f, x) if res: if _has(res[0], meijerg): results.append(res) else: return res if f_.has(HyperbolicFunction): _debug('Try rewriting hyperbolics in terms of exp.') rv = meijerint_definite( _rewrite_hyperbolics_as_exp(f_), x_, a_, b_) if rv: if not type(rv) is list: rv = (collect(factor_terms(rv[0]), rv[0].atoms(exp)),) + rv[1:] return rv results.extend(rv) if results: return next(ordered(results)) def _guess_expansion(f, x): """ Try to guess sensible rewritings for integrand f(x). """ from sympy import expand_trig from sympy.functions.elementary.trigonometric import TrigonometricFunction res = [(f, 'original integrand')] orig = res[-1][0] saw = {orig} expanded = expand_mul(orig) if expanded not in saw: res += [(expanded, 'expand_mul')] saw.add(expanded) expanded = expand(orig) if expanded not in saw: res += [(expanded, 'expand')] saw.add(expanded) if orig.has(TrigonometricFunction, HyperbolicFunction): expanded = expand_mul(expand_trig(orig)) if expanded not in saw: res += [(expanded, 'expand_trig, expand_mul')] saw.add(expanded) if orig.has(cos, sin): reduced = sincos_to_sum(orig) if reduced not in saw: res += [(reduced, 'trig power reduction')] saw.add(reduced) return res def _meijerint_definite_2(f, x): """ Try to integrate f dx from zero to infinity. The body of this function computes various 'simplifications' f1, f2, ... of f (e.g. by calling expand_mul(), trigexpand() - see _guess_expansion) and calls _meijerint_definite_3 with each of these in succession. If _meijerint_definite_3 succeeds with any of the simplified functions, returns this result. """ # This function does preparation for (2), calls # _meijerint_definite_3 for (2) and (3) combined. # use a positive dummy - we integrate from 0 to oo # XXX if a nonnegative symbol is used there will be test failures dummy = _dummy('x', 'meijerint-definite2', f, positive=True) f = f.subs(x, dummy) x = dummy if f == 0: return S(0), True for g, explanation in _guess_expansion(f, x): _debug('Trying', explanation) res = _meijerint_definite_3(g, x) if res: return res def _meijerint_definite_3(f, x): """ Try to integrate f dx from zero to infinity. This function calls _meijerint_definite_4 to try to compute the integral. If this fails, it tries using linearity. """ res = _meijerint_definite_4(f, x) if res and res[1] != False: return res if f.is_Add: _debug('Expanding and evaluating all terms.') ress = [_meijerint_definite_4(g, x) for g in f.args] if all(r is not None for r in ress): conds = [] res = S(0) for r, c in ress: res += r conds += [c] c = And(conds) if c != False: return res, c def _my_unpolarify(f): from sympy import unpolarify return _eval_cond(unpolarify(f)) @timeit def _meijerint_definite_4(f, x, only_double=False): """ Try to integrate f dx from zero to infinity. This function tries to apply the integration theorems found in literature, i.e. it tries to rewrite f as either one or a product of two G-functions. The parameter ``only_double`` is used internally in the recursive algorithm to disable trying to rewrite f as a single G-function. """ # This function does (2) and (3) _debug('Integrating', f) # Try single G function. if not only_double: gs = _rewrite1(f, x, recursive=False) if gs is not None: fac, po, g, cond = gs _debug('Could rewrite as single G function:', fac, po, g) res = S(0) for C, s, f in g: if C == 0: continue C, f = _rewrite_saxena_1(facC, poxs, f, x) res += C_int0oo_1(f, x) cond = And(cond, _check_antecedents_1(f, x)) if cond == False: break cond = _my_unpolarify(cond) if cond == False: _debug('But cond is always False.') else: _debug('Result before branch substitutions is:', res) return _my_unpolarify(hyperexpand(res)), cond # Try two G functions. gs = _rewrite2(f, x) if gs is not None: for full_pb in [False, True]: fac, po, g1, g2, cond = gs _debug('Could rewrite as two G functions:', fac, po, g1, g2) res = S(0) for C1, s1, f1 in g1: for C2, s2, f2 in g2: r = _rewrite_saxena(facC1C2, pox(s1 + s2), f1, f2, x, full_pb) if r is None: _debug('Non-rational exponents.') return C, f1_, f2_ = r _debug('Saxena subst for yielded:', C, f1_, f2_) cond = And(cond, _check_antecedents(f1_, f2_, x)) if cond == False: break res += C_int0oo(f1_, f2_, x) else: continue break cond = _my_unpolarify(cond) if cond == False: _debug('But cond is always False (full_pb=%s).' % full_pb) else: _debug('Result before branch substitutions is:', res) if only_double: return res, cond return _my_unpolarify(hyperexpand(res)), cond def meijerint_inversion(f, x, t): r""" Compute the inverse laplace transform :math:\int_{c+i\infty}^{c-i\infty} f(x) e^{tx) dx, for real c larger than the real part of all singularities of f. Note that ``t`` is always assumed real and positive. Return None if the integral does not exist or could not be evaluated. Examples ======== >>> from sympy.abc import x, t >>> from sympy.integrals.meijerint import meijerint_inversion >>> meijerint_inversion(1/x, x, t) Heaviside(t) """ from sympy import I, Integral, exp, expand, log, Add, Mul, Heaviside f_ = f t_ = t t = Dummy('t', polar=True) # We don't want sqrt(t*2) = abs(t) etc f = f.subs(t_, t) _debug('Laplace-inverting', f) if not _is_analytic(f, x): _debug('But expression is not analytic.') return None # Exponentials correspond to shifts; we filter them out and then # shift the result later. If we are given an Add this will not # work, but the calling code will take care of that. shift = S.Zero if f.is_Mul: args = list(f.args) elif isinstance(f, exp): args = [f] else: args = None if args: newargs = [] exponentials = [] while args: arg = args.pop() if isinstance(arg, exp): arg2 = expand(arg) if arg2.is_Mul: args += arg2.args continue try: a, b = _get_coeff_exp(arg.args[0], x) except _CoeffExpValueError: b = 0 if b == 1: exponentials.append(a) else: newargs.append(arg) elif arg.is_Pow: arg2 = expand(arg) if arg2.is_Mul: args += arg2.args continue if x not in arg.base.free_symbols: try: a, b = _get_coeff_exp(arg.exp, x) except _CoeffExpValueError: b = 0 if b == 1: exponentials.append(alog(arg.base)) newargs.append(arg) else: newargs.append(arg) shift = Add(exponentials) f = Mul(newargs) if x not in f.free_symbols: _debug('Expression consists of constant and exp shift:', f, shift) from sympy import Eq, im cond = Eq(im(shift), 0) if cond == False: _debug('but shift is nonreal, cannot be a Laplace transform') return None res = fDiracDelta(t + shift) _debug('Result is a delta function, possibly conditional:', res, cond) # cond is True or Eq return Piecewise((res.subs(t, t_), cond)) gs = _rewrite1(f, x) if gs is not None: fac, po, g, cond = gs _debug('Could rewrite as single G function:', fac, po, g) res = S(0) for C, s, f in g: C, f = _rewrite_inversion(facC, poxs, f, x) res += C_int_inversion(f, x, t) cond = And(cond, _check_antecedents_inversion(f, x)) if cond == False: break cond = _my_unpolarify(cond) if cond == False: _debug('But cond is always False.') else: _debug('Result before branch substitution:', res) res = _my_unpolarify(hyperexpand(res)) if not res.has(Heaviside): res *= Heaviside(t) res = res.subs(t, t + shift) if not isinstance(cond, bool): cond = cond.subs(t, t + shift) from sympy import InverseLaplaceTransform return Piecewise((res.subs(t, t_), cond), (InverseLaplaceTransform(f_.subs(t, t_), x, t_, None), True))
4137b02da73faa6847be89b6685f296c6961f8bf1f69d9c15530c2d0e46b9463	"""Base class for all the objects in SymPy""" from __future__ import print_function, division from collections import defaultdict from itertools import chain from .assumptions import BasicMeta, ManagedProperties from .cache import cacheit from .sympify import _sympify, sympify, SympifyError from .compatibility import (iterable, Iterator, ordered, string_types, with_metaclass, zip_longest, range, PY3, Mapping) from .singleton import S from inspect import getmro def as_Basic(expr): """Return expr as a Basic instance using strict sympify or raise a TypeError; this is just a wrapper to _sympify, raising a TypeError instead of a SympifyError.""" from sympy.utilities.misc import func_name try: return _sympify(expr) except SympifyError: raise TypeError( 'Argument must be a Basic object, not `%s`' % func_name( expr)) class Basic(with_metaclass(ManagedProperties)): """ Base class for all objects in SymPy. Conventions: 1) Always use ``.args``, when accessing parameters of some instance: >>> from sympy import cot >>> from sympy.abc import x, y >>> cot(x).args (x,) >>> cot(x).args[0] x >>> (xy).args (x, y) >>> (xy).args[1] y 2) Never use internal methods or variables (the ones prefixed with ``_``): >>> cot(x)._args # do not use this, use cot(x).args instead (x,) """ __slots__ = ['_mhash', # hash value '_args', # arguments '_assumptions' ] # To be overridden with True in the appropriate subclasses is_number = False is_Atom = False is_Symbol = False is_symbol = False is_Indexed = False is_Dummy = False is_Wild = False is_Function = False is_Add = False is_Mul = False is_Pow = False is_Number = False is_Float = False is_Rational = False is_Integer = False is_NumberSymbol = False is_Order = False is_Derivative = False is_Piecewise = False is_Poly = False is_AlgebraicNumber = False is_Relational = False is_Equality = False is_Boolean = False is_Not = False is_Matrix = False is_Vector = False is_Point = False is_MatAdd = False is_MatMul = False def __new__(cls, args): obj = object.__new__(cls) obj._assumptions = cls.default_assumptions obj._mhash = None # will be set by __hash__ method. obj._args = args # all items in args must be Basic objects return obj def copy(self): return self.func(self.args) def __reduce_ex__(self, proto): """ Pickling support.""" return type(self), self.__getnewargs__(), self.__getstate__() def __getnewargs__(self): return self.args def __getstate__(self): return {} def __setstate__(self, state): for k, v in state.items(): setattr(self, k, v) def __hash__(self): # hash cannot be cached using cache_it because infinite recurrence # occurs as hash is needed for setting cache dictionary keys h = self._mhash if h is None: h = hash((type(self).__name__,) + self._hashable_content()) self._mhash = h return h def _hashable_content(self): """Return a tuple of information about self that can be used to compute the hash. If a class defines additional attributes, like ``name`` in Symbol, then this method should be updated accordingly to return such relevant attributes. Defining more than _hashable_content is necessary if __eq__ has been defined by a class. See note about this in Basic.__eq__.""" return self._args @property def assumptions0(self): """ Return object `type` assumptions. For example: Symbol('x', real=True) Symbol('x', integer=True) are different objects. In other words, besides Python type (Symbol in this case), the initial assumptions are also forming their typeinfo. Examples ======== >>> from sympy import Symbol >>> from sympy.abc import x >>> x.assumptions0 {'commutative': True} >>> x = Symbol("x", positive=True) >>> x.assumptions0 {'commutative': True, 'complex': True, 'extended_negative': False, 'extended_nonnegative': True, 'extended_nonpositive': False, 'extended_nonzero': True, 'extended_positive': True, 'extended_real': True, 'finite': True, 'hermitian': True, 'imaginary': False, 'infinite': False, 'negative': False, 'nonnegative': True, 'nonpositive': False, 'nonzero': True, 'positive': True, 'real': True, 'zero': False} """ return {} def compare(self, other): """ Return -1, 0, 1 if the object is smaller, equal, or greater than other. Not in the mathematical sense. If the object is of a different type from the "other" then their classes are ordered according to the sorted_classes list. Examples ======== >>> from sympy.abc import x, y >>> x.compare(y) -1 >>> x.compare(x) 0 >>> y.compare(x) 1 """ # all redefinitions of __cmp__ method should start with the # following lines: if self is other: return 0 n1 = self.__class__ n2 = other.__class__ c = (n1 > n2) - (n1 < n2) if c: return c # st = self._hashable_content() ot = other._hashable_content() c = (len(st) > len(ot)) - (len(st) < len(ot)) if c: return c for l, r in zip(st, ot): l = Basic(l) if isinstance(l, frozenset) else l r = Basic(r) if isinstance(r, frozenset) else r if isinstance(l, Basic): c = l.compare(r) else: c = (l > r) - (l < r) if c: return c return 0 @staticmethod def _compare_pretty(a, b): from sympy.series.order import Order if isinstance(a, Order) and not isinstance(b, Order): return 1 if not isinstance(a, Order) and isinstance(b, Order): return -1 if a.is_Rational and b.is_Rational: l = a.p * b.q r = b.p * a.q return (l > r) - (l < r) else: from sympy.core.symbol import Wild p1, p2, p3 = Wild("p1"), Wild("p2"), Wild("p3") r_a = a.match(p1 * p2*p3) if r_a and p3 in r_a: a3 = r_a[p3] r_b = b.match(p1 p2p3) if r_b and p3 in r_b: b3 = r_b[p3] c = Basic.compare(a3, b3) if c != 0: return c return Basic.compare(a, b) @classmethod def fromiter(cls, args, assumptions): """ Create a new object from an iterable. This is a convenience function that allows one to create objects from any iterable, without having to convert to a list or tuple first. Examples ======== >>> from sympy import Tuple >>> Tuple.fromiter(i for i in range(5)) (0, 1, 2, 3, 4) """ return cls(tuple(args), assumptions) @classmethod def class_key(cls): """Nice order of classes. """ return 5, 0, cls.__name__ @cacheit def sort_key(self, order=None): """ Return a sort key. Examples ======== >>> from sympy.core import S, I >>> sorted([S(1)/2, I, -I], key=lambda x: x.sort_key()) [1/2, -I, I] >>> S("[x, 1/x, 1/x2, x2, x(1/2), x(1/4), x(3/2)]") [x, 1/x, x(-2), x2, sqrt(x), x(1/4), x(3/2)] >>> sorted(_, key=lambda x: x.sort_key()) [x(-2), 1/x, x(1/4), sqrt(x), x, x(3/2), x2] """ # XXX: remove this when issue 5169 is fixed def inner_key(arg): if isinstance(arg, Basic): return arg.sort_key(order) else: return arg args = self._sorted_args args = len(args), tuple([inner_key(arg) for arg in args]) return self.class_key(), args, S.One.sort_key(), S.One def __eq__(self, other): """Return a boolean indicating whether a == b on the basis of their symbolic trees. This is the same as a.compare(b) == 0 but faster. Notes ===== If a class that overrides __eq__() needs to retain the implementation of __hash__() from a parent class, the interpreter must be told this explicitly by setting __hash__ = <ParentClass>.__hash__. Otherwise the inheritance of __hash__() will be blocked, just as if __hash__ had been explicitly set to None. References ========== from http://docs.python.org/dev/reference/datamodel.html#object.__hash__ """ if self is other: return True tself = type(self) tother = type(other) if tself is not tother: try: other = _sympify(other) tother = type(other) except SympifyError: return NotImplemented # As long as we have the ordering of classes (sympy.core), # comparing types will be slow in Python 2, because it uses # __cmp__. Until we can remove it # (https://github.com/sympy/sympy/issues/4269), we only compare # types in Python 2 directly if they actually have __ne__. if PY3 or type(tself).__ne__ is not type.__ne__: if tself != tother: return False elif tself is not tother: return False return self._hashable_content() == other._hashable_content() def __ne__(self, other): """``a != b`` -> Compare two symbolic trees and see whether they are different this is the same as: ``a.compare(b) != 0`` but faster """ return not self == other def dummy_eq(self, other, symbol=None): """ Compare two expressions and handle dummy symbols. Examples ======== >>> from sympy import Dummy >>> from sympy.abc import x, y >>> u = Dummy('u') >>> (u2 + 1).dummy_eq(x2 + 1) True >>> (u2 + 1) == (x2 + 1) False >>> (u2 + y).dummy_eq(x2 + y, x) True >>> (u2 + y).dummy_eq(x2 + y, y) False """ s = self.as_dummy() o = _sympify(other) o = o.as_dummy() dummy_symbols = [i for i in s.free_symbols if i.is_Dummy] if len(dummy_symbols) == 1: dummy = dummy_symbols.pop() else: return s == o if symbol is None: symbols = o.free_symbols if len(symbols) == 1: symbol = symbols.pop() else: return s == o tmp = dummy.__class__() return s.subs(dummy, tmp) == o.subs(symbol, tmp) # Note, we always use the default ordering (lex) in __str__ and __repr__, # regardless of the global setting. See issue 5487. def __repr__(self): """Method to return the string representation. Return the expression as a string. """ from sympy.printing import sstr return sstr(self, order=None) def __str__(self): from sympy.printing import sstr return sstr(self, order=None) # We don't define _repr_png_ here because it would add a large amount of # data to any notebook containing SymPy expressions, without adding # anything useful to the notebook. It can still enabled manually, e.g., # for the qtconsole, with init_printing(). def _repr_latex_(self): """ IPython/Jupyter LaTeX printing To change the behavior of this (e.g., pass in some settings to LaTeX), use init_printing(). init_printing() will also enable LaTeX printing for built in numeric types like ints and container types that contain SymPy objects, like lists and dictionaries of expressions. """ from sympy.printing.latex import latex s = latex(self, mode='plain') return "$\\displaystyle %s$" % s _repr_latex_orig = _repr_latex_ def atoms(self, types): """Returns the atoms that form the current object. By default, only objects that are truly atomic and can't be divided into smaller pieces are returned: symbols, numbers, and number symbols like I and pi. It is possible to request atoms of any type, however, as demonstrated below. Examples ======== >>> from sympy import I, pi, sin >>> from sympy.abc import x, y >>> (1 + x + 2sin(y + Ipi)).atoms() {1, 2, I, pi, x, y} If one or more types are given, the results will contain only those types of atoms. >>> from sympy import Number, NumberSymbol, Symbol >>> (1 + x + 2sin(y + Ipi)).atoms(Symbol) {x, y} >>> (1 + x + 2sin(y + Ipi)).atoms(Number) {1, 2} >>> (1 + x + 2sin(y + Ipi)).atoms(Number, NumberSymbol) {1, 2, pi} >>> (1 + x + 2sin(y + Ipi)).atoms(Number, NumberSymbol, I) {1, 2, I, pi} Note that I (imaginary unit) and zoo (complex infinity) are special types of number symbols and are not part of the NumberSymbol class. The type can be given implicitly, too: >>> (1 + x + 2sin(y + Ipi)).atoms(x) # x is a Symbol {x, y} Be careful to check your assumptions when using the implicit option since ``S(1).is_Integer = True`` but ``type(S(1))`` is ``One``, a special type of sympy atom, while ``type(S(2))`` is type ``Integer`` and will find all integers in an expression: >>> from sympy import S >>> (1 + x + 2sin(y + Ipi)).atoms(S(1)) {1} >>> (1 + x + 2sin(y + Ipi)).atoms(S(2)) {1, 2} Finally, arguments to atoms() can select more than atomic atoms: any sympy type (loaded in core/__init__.py) can be listed as an argument and those types of "atoms" as found in scanning the arguments of the expression recursively: >>> from sympy import Function, Mul >>> from sympy.core.function import AppliedUndef >>> f = Function('f') >>> (1 + f(x) + 2sin(y + Ipi)).atoms(Function) {f(x), sin(y + Ipi)} >>> (1 + f(x) + 2sin(y + Ipi)).atoms(AppliedUndef) {f(x)} >>> (1 + x + 2sin(y + Ipi)).atoms(Mul) {Ipi, 2sin(y + Ipi)} """ if types: types = tuple( [t if isinstance(t, type) else type(t) for t in types]) else: types = (Atom,) result = set() for expr in preorder_traversal(self): if isinstance(expr, types): result.add(expr) return result @property def free_symbols(self): """Return from the atoms of self those which are free symbols. For most expressions, all symbols are free symbols. For some classes this is not true. e.g. Integrals use Symbols for the dummy variables which are bound variables, so Integral has a method to return all symbols except those. Derivative keeps track of symbols with respect to which it will perform a derivative; those are bound variables, too, so it has its own free_symbols method. Any other method that uses bound variables should implement a free_symbols method.""" return set().union([a.free_symbols for a in self.args]) @property def expr_free_symbols(self): return set([]) def as_dummy(self): """Return the expression with any objects having structurally bound symbols replaced with unique, canonical symbols within the object in which they appear and having only the default assumption for commutativity being True. Examples ======== >>> from sympy import Integral, Symbol >>> from sympy.abc import x, y >>> r = Symbol('r', real=True) >>> Integral(r, (r, x)).as_dummy() Integral(_0, (_0, x)) >>> _.variables[0].is_real is None True Notes ===== Any object that has structural dummy variables should have a property, `bound_symbols` that returns a list of structural dummy symbols of the object itself. Lambda and Subs have bound symbols, but because of how they are cached, they already compare the same regardless of their bound symbols: >>> from sympy import Lambda >>> Lambda(x, x + 1) == Lambda(y, y + 1) True """ def can(x): d = {i: i.as_dummy() for i in x.bound_symbols} # mask free that shadow bound x = x.subs(d) c = x.canonical_variables # replace bound x = x.xreplace(c) # undo masking x = x.xreplace(dict((v, k) for k, v in d.items())) return x return self.replace( lambda x: hasattr(x, 'bound_symbols'), lambda x: can(x)) @property def canonical_variables(self): """Return a dictionary mapping any variable defined in ``self.bound_symbols`` to Symbols that do not clash with any existing symbol in the expression. Examples ======== >>> from sympy import Lambda >>> from sympy.abc import x >>> Lambda(x, 2x).canonical_variables {x: _0} """ from sympy.core.symbol import Symbol from sympy.utilities.iterables import numbered_symbols if not hasattr(self, 'bound_symbols'): return {} dums = numbered_symbols('_') reps = {} v = self.bound_symbols # this free will include bound symbols that are not part of # self's bound symbols free = set([i.name for i in self.atoms(Symbol) - set(v)]) for v in v: d = next(dums) if v.is_Symbol: while v.name == d.name or d.name in free: d = next(dums) reps[v] = d return reps def rcall(self, args): """Apply on the argument recursively through the expression tree. This method is used to simulate a common abuse of notation for operators. For instance in SymPy the the following will not work: ``(x+Lambda(y, 2y))(z) == x+2z``, however you can use >>> from sympy import Lambda >>> from sympy.abc import x, y, z >>> (x + Lambda(y, 2y)).rcall(z) x + 2z """ return Basic._recursive_call(self, args) @staticmethod def _recursive_call(expr_to_call, on_args): """Helper for rcall method.""" from sympy import Symbol def the_call_method_is_overridden(expr): for cls in getmro(type(expr)): if '__call__' in cls.__dict__: return cls != Basic if callable(expr_to_call) and the_call_method_is_overridden(expr_to_call): if isinstance(expr_to_call, Symbol): # XXX When you call a Symbol it is return expr_to_call # transformed into an UndefFunction else: return expr_to_call(on_args) elif expr_to_call.args: args = [Basic._recursive_call( sub, on_args) for sub in expr_to_call.args] return type(expr_to_call)(args) else: return expr_to_call def is_hypergeometric(self, k): from sympy.simplify import hypersimp return hypersimp(self, k) is not None @property def is_comparable(self): """Return True if self can be computed to a real number (or already is a real number) with precision, else False. Examples ======== >>> from sympy import exp_polar, pi, I >>> (Iexp_polar(Ipi/2)).is_comparable True >>> (Iexp_polar(Ipi2)).is_comparable False A False result does not mean that `self` cannot be rewritten into a form that would be comparable. For example, the difference computed below is zero but without simplification it does not evaluate to a zero with precision: >>> e = 2*pi(1 + 2*pi) >>> dif = e - e.expand() >>> dif.is_comparable False >>> dif.n(2)._prec 1 """ is_extended_real = self.is_extended_real if is_extended_real is False: return False if not self.is_number: return False # don't re-eval numbers that are already evaluated since # this will create spurious precision n, i = [p.evalf(2) if not p.is_Number else p for p in self.as_real_imag()] if not (i.is_Number and n.is_Number): return False if i: # if _prec = 1 we can't decide and if not, # the answer is False because numbers with # imaginary parts can't be compared # so return False return False else: return n._prec != 1 @property def func(self): """ The top-level function in an expression. The following should hold for all objects:: >> x == x.func(x.args) Examples ======== >>> from sympy.abc import x >>> a = 2x >>> a.func <class 'sympy.core.mul.Mul'> >>> a.args (2, x) >>> a.func(a.args) 2x >>> a == a.func(a.args) True """ return self.__class__ @property def args(self): """Returns a tuple of arguments of 'self'. Examples ======== >>> from sympy import cot >>> from sympy.abc import x, y >>> cot(x).args (x,) >>> cot(x).args[0] x >>> (xy).args (x, y) >>> (xy).args[1] y Notes ===== Never use self._args, always use self.args. Only use _args in __new__ when creating a new function. Don't override .args() from Basic (so that it's easy to change the interface in the future if needed). """ return self._args @property def _sorted_args(self): """ The same as ``args``. Derived classes which don't fix an order on their arguments should override this method to produce the sorted representation. """ return self.args def as_poly(self, gens, args): """Converts ``self`` to a polynomial or returns ``None``. >>> from sympy import sin >>> from sympy.abc import x, y >>> print((x2 + xy).as_poly()) Poly(x*2 + xy, x, y, domain='ZZ') >>> print((x*2 + xy).as_poly(x, y)) Poly(x*2 + xy, x, y, domain='ZZ') >>> print((x*2 + sin(y)).as_poly(x, y)) None """ from sympy.polys import Poly, PolynomialError try: poly = Poly(self, gens, *args) if not poly.is_Poly: return None else: return poly except PolynomialError: return None def as_content_primitive(self, radical=False, clear=True): """A stub to allow Basic args (like Tuple) to be skipped when computing the content and primitive components of an expression. See Also ======== sympy.core.expr.Expr.as_content_primitive """ return S.One, self def subs(self, args, *kwargs): """ Substitutes old for new in an expression after sympifying args. `args` is either: - two arguments, e.g. foo.subs(old, new) - one iterable argument, e.g. foo.subs(iterable). The iterable may be o an iterable container with (old, new) pairs. In this case the replacements are processed in the order given with successive patterns possibly affecting replacements already made. o a dict or set whose key/value items correspond to old/new pairs. In this case the old/new pairs will be sorted by op count and in case of a tie, by number of args and the default_sort_key. The resulting sorted list is then processed as an iterable container (see previous). If the keyword ``simultaneous`` is True, the subexpressions will not be evaluated until all the substitutions have been made. Examples ======== >>> from sympy import pi, exp, limit, oo >>> from sympy.abc import x, y >>> (1 + xy).subs(x, pi) piy + 1 >>> (1 + xy).subs({x:pi, y:2}) 1 + 2pi >>> (1 + xy).subs([(x, pi), (y, 2)]) 1 + 2pi >>> reps = [(y, x2), (x, 2)] >>> (x + y).subs(reps) 6 >>> (x + y).subs(reversed(reps)) x2 + 2 >>> (x2 + x4).subs(x2, y) y2 + y To replace only the x2 but not the x4, use xreplace: >>> (x2 + x4).xreplace({x2: y}) x4 + y To delay evaluation until all substitutions have been made, set the keyword ``simultaneous`` to True: >>> (x/y).subs([(x, 0), (y, 0)]) 0 >>> (x/y).subs([(x, 0), (y, 0)], simultaneous=True) nan This has the added feature of not allowing subsequent substitutions to affect those already made: >>> ((x + y)/y).subs({x + y: y, y: x + y}) 1 >>> ((x + y)/y).subs({x + y: y, y: x + y}, simultaneous=True) y/(x + y) In order to obtain a canonical result, unordered iterables are sorted by count_op length, number of arguments and by the default_sort_key to break any ties. All other iterables are left unsorted. >>> from sympy import sqrt, sin, cos >>> from sympy.abc import a, b, c, d, e >>> A = (sqrt(sin(2x)), a) >>> B = (sin(2x), b) >>> C = (cos(2x), c) >>> D = (x, d) >>> E = (exp(x), e) >>> expr = sqrt(sin(2x))sin(exp(x)x)cos(2x) + sin(2x) >>> expr.subs(dict([A, B, C, D, E])) acsin(de) + b The resulting expression represents a literal replacement of the old arguments with the new arguments. This may not reflect the limiting behavior of the expression: >>> (x3 - 3x).subs({x: oo}) nan >>> limit(x*3 - 3x, x, oo) oo If the substitution will be followed by numerical evaluation, it is better to pass the substitution to evalf as >>> (1/x).evalf(subs={x: 3.0}, n=21) 0.333333333333333333333 rather than >>> (1/x).subs({x: 3.0}).evalf(21) 0.333333333333333314830 as the former will ensure that the desired level of precision is obtained. See Also ======== replace: replacement capable of doing wildcard-like matching, parsing of match, and conditional replacements xreplace: exact node replacement in expr tree; also capable of using matching rules evalf: calculates the given formula to a desired level of precision """ from sympy.core.containers import Dict from sympy.utilities import default_sort_key from sympy import Dummy, Symbol unordered = False if len(args) == 1: sequence = args[0] if isinstance(sequence, set): unordered = True elif isinstance(sequence, (Dict, Mapping)): unordered = True sequence = sequence.items() elif not iterable(sequence): from sympy.utilities.misc import filldedent raise ValueError(filldedent(""" When a single argument is passed to subs it should be a dictionary of old: new pairs or an iterable of (old, new) tuples.""")) elif len(args) == 2: sequence = [args] else: raise ValueError("subs accepts either 1 or 2 arguments") sequence = list(sequence) for i, s in enumerate(sequence): if isinstance(s[0], string_types): # when old is a string we prefer Symbol s = Symbol(s[0]), s[1] try: s = [sympify(_, strict=not isinstance(_, string_types)) for _ in s] except SympifyError: # if it can't be sympified, skip it sequence[i] = None continue # skip if there is no change sequence[i] = None if _aresame(s) else tuple(s) sequence = list(filter(None, sequence)) if unordered: sequence = dict(sequence) if not all(k.is_Atom for k in sequence): d = {} for o, n in sequence.items(): try: ops = o.count_ops(), len(o.args) except TypeError: ops = (0, 0) d.setdefault(ops, []).append((o, n)) newseq = [] for k in sorted(d.keys(), reverse=True): newseq.extend( sorted([v[0] for v in d[k]], key=default_sort_key)) sequence = [(k, sequence[k]) for k in newseq] del newseq, d else: sequence = sorted([(k, v) for (k, v) in sequence.items()], key=default_sort_key) if kwargs.pop('simultaneous', False): # XXX should this be the default for dict subs? reps = {} rv = self kwargs['hack2'] = True m = Dummy() for old, new in sequence: d = Dummy(commutative=new.is_commutative) # using dm so Subs will be used on dummy variables # in things like Derivative(f(x, y), x) in which x # is both free and bound rv = rv._subs(old, dm, kwargs) if not isinstance(rv, Basic): break reps[d] = new reps[m] = S.One # get rid of m return rv.xreplace(reps) else: rv = self for old, new in sequence: rv = rv._subs(old, new, kwargs) if not isinstance(rv, Basic): break return rv @cacheit def _subs(self, old, new, hints): """Substitutes an expression old -> new. If self is not equal to old then _eval_subs is called. If _eval_subs doesn't want to make any special replacement then a None is received which indicates that the fallback should be applied wherein a search for replacements is made amongst the arguments of self. >>> from sympy import Add >>> from sympy.abc import x, y, z Examples ======== Add's _eval_subs knows how to target x + y in the following so it makes the change: >>> (x + y + z).subs(x + y, 1) z + 1 Add's _eval_subs doesn't need to know how to find x + y in the following: >>> Add._eval_subs(z(x + y) + 3, x + y, 1) is None True The returned None will cause the fallback routine to traverse the args and pass the z(x + y) arg to Mul where the change will take place and the substitution will succeed: >>> (z(x + y) + 3).subs(x + y, 1) z + 3 Developers Notes An _eval_subs routine for a class should be written if: 1) any arguments are not instances of Basic (e.g. bool, tuple); 2) some arguments should not be targeted (as in integration variables); 3) if there is something other than a literal replacement that should be attempted (as in Piecewise where the condition may be updated without doing a replacement). If it is overridden, here are some special cases that might arise: 1) If it turns out that no special change was made and all the original sub-arguments should be checked for replacements then None should be returned. 2) If it is necessary to do substitutions on a portion of the expression then _subs should be called. _subs will handle the case of any sub-expression being equal to old (which usually would not be the case) while its fallback will handle the recursion into the sub-arguments. For example, after Add's _eval_subs removes some matching terms it must process the remaining terms so it calls _subs on each of the un-matched terms and then adds them onto the terms previously obtained. 3) If the initial expression should remain unchanged then the original expression should be returned. (Whenever an expression is returned, modified or not, no further substitution of old -> new is attempted.) Sum's _eval_subs routine uses this strategy when a substitution is attempted on any of its summation variables. """ def fallback(self, old, new): """ Try to replace old with new in any of self's arguments. """ hit = False args = list(self.args) for i, arg in enumerate(args): if not hasattr(arg, '_eval_subs'): continue arg = arg._subs(old, new, *hints) if not _aresame(arg, args[i]): hit = True args[i] = arg if hit: rv = self.func(args) hack2 = hints.get('hack2', False) if hack2 and self.is_Mul and not rv.is_Mul: # 2-arg hack coeff = S.One nonnumber = [] for i in args: if i.is_Number: coeff = i else: nonnumber.append(i) nonnumber = self.func(nonnumber) if coeff is S.One: return nonnumber else: return self.func(coeff, nonnumber, evaluate=False) return rv return self if _aresame(self, old): return new rv = self._eval_subs(old, new) if rv is None: rv = fallback(self, old, new) return rv def _eval_subs(self, old, new): """Override this stub if you want to do anything more than attempt a replacement of old with new in the arguments of self. See also ======== _subs """ return None def xreplace(self, rule): """ Replace occurrences of objects within the expression. Parameters ========== rule : dict-like Expresses a replacement rule Returns ======= xreplace : the result of the replacement Examples ======== >>> from sympy import symbols, pi, exp >>> x, y, z = symbols('x y z') >>> (1 + xy).xreplace({x: pi}) piy + 1 >>> (1 + xy).xreplace({x: pi, y: 2}) 1 + 2pi Replacements occur only if an entire node in the expression tree is matched: >>> (xy + z).xreplace({xy: pi}) z + pi >>> (xyz).xreplace({xy: pi}) xyz >>> (2x).xreplace({2x: y, x: z}) y >>> (22x).xreplace({2x: y, x: z}) 4z >>> (x + y + 2).xreplace({x + y: 2}) x + y + 2 >>> (x + 2 + exp(x + 2)).xreplace({x + 2: y}) x + exp(y) + 2 xreplace doesn't differentiate between free and bound symbols. In the following, subs(x, y) would not change x since it is a bound symbol, but xreplace does: >>> from sympy import Integral >>> Integral(x, (x, 1, 2x)).xreplace({x: y}) Integral(y, (y, 1, 2y)) Trying to replace x with an expression raises an error: >>> Integral(x, (x, 1, 2x)).xreplace({x: 2y}) # doctest: +SKIP ValueError: Invalid limits given: ((2y, 1, 4y),) See Also ======== replace: replacement capable of doing wildcard-like matching, parsing of match, and conditional replacements subs: substitution of subexpressions as defined by the objects themselves. """ value, _ = self._xreplace(rule) return value def _xreplace(self, rule): """ Helper for xreplace. Tracks whether a replacement actually occurred. """ if self in rule: return rule[self], True elif rule: args = [] changed = False for a in self.args: _xreplace = getattr(a, '_xreplace', None) if _xreplace is not None: a_xr = _xreplace(rule) args.append(a_xr[0]) changed \|= a_xr[1] else: args.append(a) args = tuple(args) if changed: return self.func(args), True return self, False @cacheit def has(self, patterns): """ Test whether any subexpression matches any of the patterns. Examples ======== >>> from sympy import sin >>> from sympy.abc import x, y, z >>> (x2 + sin(xy)).has(z) False >>> (x*2 + sin(xy)).has(x, y, z) True >>> x.has(x) True Note ``has`` is a structural algorithm with no knowledge of mathematics. Consider the following half-open interval: >>> from sympy.sets import Interval >>> i = Interval.Lopen(0, 5); i Interval.Lopen(0, 5) >>> i.args (0, 5, True, False) >>> i.has(4) # there is no "4" in the arguments False >>> i.has(0) # there is a "0" in the arguments True Instead, use ``contains`` to determine whether a number is in the interval or not: >>> i.contains(4) True >>> i.contains(0) False Note that ``expr.has(patterns)`` is exactly equivalent to ``any(expr.has(p) for p in patterns)``. In particular, ``False`` is returned when the list of patterns is empty. >>> x.has() False """ return any(self._has(pattern) for pattern in patterns) def _has(self, pattern): """Helper for .has()""" from sympy.core.function import UndefinedFunction, Function if isinstance(pattern, UndefinedFunction): return any(f.func == pattern or f == pattern for f in self.atoms(Function, UndefinedFunction)) pattern = sympify(pattern) if isinstance(pattern, BasicMeta): return any(isinstance(arg, pattern) for arg in preorder_traversal(self)) _has_matcher = getattr(pattern, '_has_matcher', None) if _has_matcher is not None: match = _has_matcher() return any(match(arg) for arg in preorder_traversal(self)) else: return any(arg == pattern for arg in preorder_traversal(self)) def _has_matcher(self): """Helper for .has()""" return lambda other: self == other def replace(self, query, value, map=False, simultaneous=True, exact=None): """ Replace matching subexpressions of ``self`` with ``value``. If ``map = True`` then also return the mapping {old: new} where ``old`` was a sub-expression found with query and ``new`` is the replacement value for it. If the expression itself doesn't match the query, then the returned value will be ``self.xreplace(map)`` otherwise it should be ``self.subs(ordered(map.items()))``. Traverses an expression tree and performs replacement of matching subexpressions from the bottom to the top of the tree. The default approach is to do the replacement in a simultaneous fashion so changes made are targeted only once. If this is not desired or causes problems, ``simultaneous`` can be set to False. In addition, if an expression containing more than one Wild symbol is being used to match subexpressions and the ``exact`` flag is None it will be set to True so the match will only succeed if all non-zero values are received for each Wild that appears in the match pattern. Setting this to False accepts a match of 0; while setting it True accepts all matches that have a 0 in them. See example below for cautions. The list of possible combinations of queries and replacement values is listed below: Examples ======== Initial setup >>> from sympy import log, sin, cos, tan, Wild, Mul, Add >>> from sympy.abc import x, y >>> f = log(sin(x)) + tan(sin(x2)) 1.1. type -> type obj.replace(type, newtype) When object of type ``type`` is found, replace it with the result of passing its argument(s) to ``newtype``. >>> f.replace(sin, cos) log(cos(x)) + tan(cos(x2)) >>> sin(x).replace(sin, cos, map=True) (cos(x), {sin(x): cos(x)}) >>> (xy).replace(Mul, Add) x + y 1.2. type -> func obj.replace(type, func) When object of type ``type`` is found, apply ``func`` to its argument(s). ``func`` must be written to handle the number of arguments of ``type``. >>> f.replace(sin, lambda arg: sin(2arg)) log(sin(2x)) + tan(sin(2x2)) >>> (xy).replace(Mul, lambda args: sin(2Mul(args))) sin(2xy) 2.1. pattern -> expr obj.replace(pattern(wild), expr(wild)) Replace subexpressions matching ``pattern`` with the expression written in terms of the Wild symbols in ``pattern``. >>> a, b = map(Wild, 'ab') >>> f.replace(sin(a), tan(a)) log(tan(x)) + tan(tan(x2)) >>> f.replace(sin(a), tan(a/2)) log(tan(x/2)) + tan(tan(x2/2)) >>> f.replace(sin(a), a) log(x) + tan(x2) >>> (xy).replace(ax, a) y Matching is exact by default when more than one Wild symbol is used: matching fails unless the match gives non-zero values for all Wild symbols: >>> (2x + y).replace(ax + b, b - a) y - 2 >>> (2x).replace(ax + b, b - a) 2x When set to False, the results may be non-intuitive: >>> (2x).replace(ax + b, b - a, exact=False) 2/x 2.2. pattern -> func obj.replace(pattern(wild), lambda wild: expr(wild)) All behavior is the same as in 2.1 but now a function in terms of pattern variables is used rather than an expression: >>> f.replace(sin(a), lambda a: sin(2a)) log(sin(2x)) + tan(sin(2x2)) 3.1. func -> func obj.replace(filter, func) Replace subexpression ``e`` with ``func(e)`` if ``filter(e)`` is True. >>> g = 2sin(x3) >>> g.replace(lambda expr: expr.is_Number, lambda expr: expr2) 4sin(x9) The expression itself is also targeted by the query but is done in such a fashion that changes are not made twice. >>> e = x(xy + 1) >>> e.replace(lambda x: x.is_Mul, lambda x: 2x) 2x(2xy + 1) When matching a single symbol, `exact` will default to True, but this may or may not be the behavior that is desired: Here, we want `exact=False`: >>> from sympy import Function >>> f = Function('f') >>> e = f(1) + f(0) >>> q = f(a), lambda a: f(a + 1) >>> e.replace(q, exact=False) f(1) + f(2) >>> e.replace(q, exact=True) f(0) + f(2) But here, the nature of matching makes selecting the right setting tricky: >>> e = x(1 + y) >>> (x(1 + y)).replace(x(1 + a), lambda a: x-a, exact=False) 1 >>> (x(1 + y)).replace(x(1 + a), lambda a: x-a, exact=True) x(-x - y + 1) >>> (xy).replace(x(1 + a), lambda a: x-a, exact=False) 1 >>> (xy).replace(x(1 + a), lambda a: x-a, exact=True) x(1 - y) It is probably better to use a different form of the query that describes the target expression more precisely: >>> (1 + x(1 + y)).replace( ... lambda x: x.is_Pow and x.exp.is_Add and x.exp.args[0] == 1, ... lambda x: x.base(1 - (x.exp - 1))) ... x(1 - y) + 1 See Also ======== subs: substitution of subexpressions as defined by the objects themselves. xreplace: exact node replacement in expr tree; also capable of using matching rules """ from sympy.core.symbol import Dummy, Wild from sympy.simplify.simplify import bottom_up try: query = _sympify(query) except SympifyError: pass try: value = _sympify(value) except SympifyError: pass if isinstance(query, type): _query = lambda expr: isinstance(expr, query) if isinstance(value, type): _value = lambda expr, result: value(expr.args) elif callable(value): _value = lambda expr, result: value(expr.args) else: raise TypeError( "given a type, replace() expects another " "type or a callable") elif isinstance(query, Basic): _query = lambda expr: expr.match(query) if exact is None: exact = (len(query.atoms(Wild)) > 1) if isinstance(value, Basic): if exact: _value = lambda expr, result: (value.subs(result) if all(result.values()) else expr) else: _value = lambda expr, result: value.subs(result) elif callable(value): # match dictionary keys get the trailing underscore stripped # from them and are then passed as keywords to the callable; # if ``exact`` is True, only accept match if there are no null # values amongst those matched. if exact: _value = lambda expr, result: (value( {str(k)[:-1]: v for k, v in result.items()}) if all(val for val in result.values()) else expr) else: _value = lambda expr, result: value( {str(k)[:-1]: v for k, v in result.items()}) else: raise TypeError( "given an expression, replace() expects " "another expression or a callable") elif callable(query): _query = query if callable(value): _value = lambda expr, result: value(expr) else: raise TypeError( "given a callable, replace() expects " "another callable") else: raise TypeError( "first argument to replace() must be a " "type, an expression or a callable") mapping = {} # changes that took place mask = [] # the dummies that were used as change placeholders def rec_replace(expr): result = _query(expr) if result or result == {}: new = _value(expr, result) if new is not None and new != expr: mapping[expr] = new if simultaneous: # don't let this expression be changed during rebuilding com = getattr(new, 'is_commutative', True) if com is None: com = True d = Dummy(commutative=com) mask.append((d, new)) expr = d else: expr = new return expr rv = bottom_up(self, rec_replace, atoms=True) # restore original expressions for Dummy symbols if simultaneous: mask = list(reversed(mask)) for o, n in mask: r = {o: n} rv = rv.xreplace(r) if not map: return rv else: if simultaneous: # restore subexpressions in mapping for o, n in mask: r = {o: n} mapping = {k.xreplace(r): v.xreplace(r) for k, v in mapping.items()} return rv, mapping def find(self, query, group=False): """Find all subexpressions matching a query. """ query = _make_find_query(query) results = list(filter(query, preorder_traversal(self))) if not group: return set(results) else: groups = {} for result in results: if result in groups: groups[result] += 1 else: groups[result] = 1 return groups def count(self, query): """Count the number of matching subexpressions. """ query = _make_find_query(query) return sum(bool(query(sub)) for sub in preorder_traversal(self)) def matches(self, expr, repl_dict={}, old=False): """ Helper method for match() that looks for a match between Wild symbols in self and expressions in expr. Examples ======== >>> from sympy import symbols, Wild, Basic >>> a, b, c = symbols('a b c') >>> x = Wild('x') >>> Basic(a + x, x).matches(Basic(a + b, c)) is None True >>> Basic(a + x, x).matches(Basic(a + b + c, b + c)) {x_: b + c} """ expr = sympify(expr) if not isinstance(expr, self.__class__): return None if self == expr: return repl_dict if len(self.args) != len(expr.args): return None d = repl_dict.copy() for arg, other_arg in zip(self.args, expr.args): if arg == other_arg: continue d = arg.xreplace(d).matches(other_arg, d, old=old) if d is None: return None return d def match(self, pattern, old=False): """ Pattern matching. Wild symbols match all. Return ``None`` when expression (self) does not match with pattern. Otherwise return a dictionary such that:: pattern.xreplace(self.match(pattern)) == self Examples ======== >>> from sympy import Wild >>> from sympy.abc import x, y >>> p = Wild("p") >>> q = Wild("q") >>> r = Wild("r") >>> e = (x+y)(x+y) >>> e.match(pp) {p_: x + y} >>> e.match(p*q) {p_: x + y, q_: x + y} >>> e = (2x)*2 >>> e.match(pq*r) {p_: 4, q_: x, r_: 2} >>> (pq*r).xreplace(e.match(pq*r)) 4x*2 The ``old`` flag will give the old-style pattern matching where expressions and patterns are essentially solved to give the match. Both of the following give None unless ``old=True``: >>> (x - 2).match(p - x, old=True) {p_: 2x - 2} >>> (2/x).match(px, old=True) {p_: 2/x2} """ pattern = sympify(pattern) return pattern.matches(self, old=old) def count_ops(self, visual=None): """wrapper for count_ops that returns the operation count.""" from sympy import count_ops return count_ops(self, visual) def doit(self, hints): """Evaluate objects that are not evaluated by default like limits, integrals, sums and products. All objects of this kind will be evaluated recursively, unless some species were excluded via 'hints' or unless the 'deep' hint was set to 'False'. >>> from sympy import Integral >>> from sympy.abc import x >>> 2Integral(x, x) 2Integral(x, x) >>> (2Integral(x, x)).doit() x*2 >>> (2Integral(x, x)).doit(deep=False) 2Integral(x, x) """ if hints.get('deep', True): terms = [term.doit(hints) if isinstance(term, Basic) else term for term in self.args] return self.func(terms) else: return self def _eval_rewrite(self, pattern, rule, hints): if self.is_Atom: if hasattr(self, rule): return getattr(self, rule)() return self if hints.get('deep', True): args = [a._eval_rewrite(pattern, rule, hints) if isinstance(a, Basic) else a for a in self.args] else: args = self.args if pattern is None or isinstance(self, pattern): if hasattr(self, rule): rewritten = getattr(self, rule)(args, hints) if rewritten is not None: return rewritten return self.func(args) if hints.get('evaluate', True) else self def _accept_eval_derivative(self, s): # This method needs to be overridden by array-like objects return s._visit_eval_derivative_scalar(self) def _visit_eval_derivative_scalar(self, base): # Base is a scalar # Types are (base: scalar, self: scalar) return base._eval_derivative(self) def _visit_eval_derivative_array(self, base): # Types are (base: array/matrix, self: scalar) # Base is some kind of array/matrix, # it should have `.applyfunc(lambda x: x.diff(self)` implemented: return base._eval_derivative_array(self) def _eval_derivative_n_times(self, s, n): # This is the default evaluator for derivatives (as called by `diff` # and `Derivative`), it will attempt a loop to derive the expression # `n` times by calling the corresponding `_eval_derivative` method, # while leaving the derivative unevaluated if `n` is symbolic. This # method should be overridden if the object has a closed form for its # symbolic n-th derivative. from sympy import Integer if isinstance(n, (int, Integer)): obj = self for i in range(n): obj2 = obj._accept_eval_derivative(s) if obj == obj2 or obj2 is None: break obj = obj2 return obj2 else: return None def rewrite(self, args, hints): """ Rewrite functions in terms of other functions. Rewrites expression containing applications of functions of one kind in terms of functions of different kind. For example you can rewrite trigonometric functions as complex exponentials or combinatorial functions as gamma function. As a pattern this function accepts a list of functions to to rewrite (instances of DefinedFunction class). As rule you can use string or a destination function instance (in this case rewrite() will use the str() function). There is also the possibility to pass hints on how to rewrite the given expressions. For now there is only one such hint defined called 'deep'. When 'deep' is set to False it will forbid functions to rewrite their contents. Examples ======== >>> from sympy import sin, exp >>> from sympy.abc import x Unspecified pattern: >>> sin(x).rewrite(exp) -I(exp(Ix) - exp(-Ix))/2 Pattern as a single function: >>> sin(x).rewrite(sin, exp) -I(exp(Ix) - exp(-Ix))/2 Pattern as a list of functions: >>> sin(x).rewrite([sin, ], exp) -I(exp(Ix) - exp(-Ix))/2 """ if not args: return self else: pattern = args[:-1] if isinstance(args[-1], string_types): rule = '_eval_rewrite_as_' + args[-1] else: try: rule = '_eval_rewrite_as_' + args[-1].__name__ except: rule = '_eval_rewrite_as_' + args[-1].__class__.__name__ if not pattern: return self._eval_rewrite(None, rule, hints) else: if iterable(pattern[0]): pattern = pattern[0] pattern = [p for p in pattern if self.has(p)] if pattern: return self._eval_rewrite(tuple(pattern), rule, hints) else: return self _constructor_postprocessor_mapping = {} @classmethod def _exec_constructor_postprocessors(cls, obj): # WARNING: This API is experimental. # This is an experimental API that introduces constructor # postprosessors for SymPy Core elements. If an argument of a SymPy # expression has a `_constructor_postprocessor_mapping` attribute, it will # be interpreted as a dictionary containing lists of postprocessing # functions for matching expression node names. clsname = obj.__class__.__name__ postprocessors = defaultdict(list) for i in obj.args: try: postprocessor_mappings = ( Basic._constructor_postprocessor_mapping[cls].items() for cls in type(i).mro() if cls in Basic._constructor_postprocessor_mapping ) for k, v in chain.from_iterable(postprocessor_mappings): postprocessors[k].extend([j for j in v if j not in postprocessors[k]]) except TypeError: pass for f in postprocessors.get(clsname, []): obj = f(obj) return obj class Atom(Basic): """ A parent class for atomic things. An atom is an expression with no subexpressions. Examples ======== Symbol, Number, Rational, Integer, ... But not: Add, Mul, Pow, ... """ is_Atom = True __slots__ = [] def matches(self, expr, repl_dict={}, old=False): if self == expr: return repl_dict def xreplace(self, rule, hack2=False): return rule.get(self, self) def doit(self, hints): return self @classmethod def class_key(cls): return 2, 0, cls.__name__ @cacheit def sort_key(self, order=None): return self.class_key(), (1, (str(self),)), S.One.sort_key(), S.One def _eval_simplify(self, kwargs): return self @property def _sorted_args(self): # this is here as a safeguard against accidentally using _sorted_args # on Atoms -- they cannot be rebuilt as atom.func(atom._sorted_args) # since there are no args. So the calling routine should be checking # to see that this property is not called for Atoms. raise AttributeError('Atoms have no args. It might be necessary' ' to make a check for Atoms in the calling code.') def _aresame(a, b): """Return True if a and b are structurally the same, else False. Examples ======== In SymPy (as in Python) two numbers compare the same if they have the same underlying base-2 representation even though they may not be the same type: >>> from sympy import S >>> 2.0 == S(2) True >>> 0.5 == S.Half True This routine was written to provide a query for such cases that would give false when the types do not match: >>> from sympy.core.basic import _aresame >>> _aresame(S(2.0), S(2)) False """ from .numbers import Number from .function import AppliedUndef, UndefinedFunction as UndefFunc if isinstance(a, Number) and isinstance(b, Number): return a == b and a.__class__ == b.__class__ for i, j in zip_longest(preorder_traversal(a), preorder_traversal(b)): if i != j or type(i) != type(j): if ((isinstance(i, UndefFunc) and isinstance(j, UndefFunc)) or (isinstance(i, AppliedUndef) and isinstance(j, AppliedUndef))): if i.class_key() != j.class_key(): return False else: return False return True def _atomic(e, recursive=False): """Return atom-like quantities as far as substitution is concerned: Derivatives, Functions and Symbols. Don't return any 'atoms' that are inside such quantities unless they also appear outside, too, unless `recursive` is True. Examples ======== >>> from sympy import Derivative, Function, cos >>> from sympy.abc import x, y >>> from sympy.core.basic import _atomic >>> f = Function('f') >>> _atomic(x + y) {x, y} >>> _atomic(x + f(y)) {x, f(y)} >>> _atomic(Derivative(f(x), x) + cos(x) + y) {y, cos(x), Derivative(f(x), x)} """ from sympy import Derivative, Function, Symbol pot = preorder_traversal(e) seen = set() if isinstance(e, Basic): free = getattr(e, "free_symbols", None) if free is None: return {e} else: return set() atoms = set() for p in pot: if p in seen: pot.skip() continue seen.add(p) if isinstance(p, Symbol) and p in free: atoms.add(p) elif isinstance(p, (Derivative, Function)): if not recursive: pot.skip() atoms.add(p) return atoms class preorder_traversal(Iterator): """ Do a pre-order traversal of a tree. This iterator recursively yields nodes that it has visited in a pre-order fashion. That is, it yields the current node then descends through the tree breadth-first to yield all of a node's children's pre-order traversal. For an expression, the order of the traversal depends on the order of .args, which in many cases can be arbitrary. Parameters ========== node : sympy expression The expression to traverse. keys : (default None) sort key(s) The key(s) used to sort args of Basic objects. When None, args of Basic objects are processed in arbitrary order. If key is defined, it will be passed along to ordered() as the only key(s) to use to sort the arguments; if ``key`` is simply True then the default keys of ordered will be used. Yields ====== subtree : sympy expression All of the subtrees in the tree. Examples ======== >>> from sympy import symbols >>> from sympy.core.basic import preorder_traversal >>> x, y, z = symbols('x y z') The nodes are returned in the order that they are encountered unless key is given; simply passing key=True will guarantee that the traversal is unique. >>> list(preorder_traversal((x + y)z, keys=None)) # doctest: +SKIP [z(x + y), z, x + y, y, x] >>> list(preorder_traversal((x + y)z, keys=True)) [z(x + y), z, x + y, x, y] """ def __init__(self, node, keys=None): self._skip_flag = False self._pt = self._preorder_traversal(node, keys) def _preorder_traversal(self, node, keys): yield node if self._skip_flag: self._skip_flag = False return if isinstance(node, Basic): if not keys and hasattr(node, '_argset'): # LatticeOp keeps args as a set. We should use this if we # don't care about the order, to prevent unnecessary sorting. args = node._argset else: args = node.args if keys: if keys != True: args = ordered(args, keys, default=False) else: args = ordered(args) for arg in args: for subtree in self._preorder_traversal(arg, keys): yield subtree elif iterable(node): for item in node: for subtree in self._preorder_traversal(item, keys): yield subtree def skip(self): """ Skip yielding current node's (last yielded node's) subtrees. Examples ======== >>> from sympy.core import symbols >>> from sympy.core.basic import preorder_traversal >>> x, y, z = symbols('x y z') >>> pt = preorder_traversal((x+yz)z) >>> for i in pt: ... print(i) ... if i == x+yz: ... pt.skip() z(x + yz) z x + y*z """ self._skip_flag = True def __next__(self): return next(self._pt) def __iter__(self): return self def _make_find_query(query): """Convert the argument of Basic.find() into a callable""" try: query = sympify(query) except SympifyError: pass if isinstance(query, type): return lambda expr: isinstance(expr, query) elif isinstance(query, Basic): return lambda expr: expr.match(query) is not None return query
16e6b82b3862a102c651bab36b6dfe362a8ffb8acddaa8e4e7a9eb5e1e633c4d	""" There are three types of functions implemented in SymPy: 1) defined functions (in the sense that they can be evaluated) like exp or sin; they have a name and a body: f = exp 2) undefined function which have a name but no body. Undefined functions can be defined using a Function class as follows: f = Function('f') (the result will be a Function instance) 3) anonymous function (or lambda function) which have a body (defined with dummy variables) but have no name: f = Lambda(x, exp(x)x) f = Lambda((x, y), exp(x)y) The fourth type of functions are composites, like (sin + cos)(x); these work in SymPy core, but are not yet part of SymPy. Examples ======== >>> import sympy >>> f = sympy.Function("f") >>> from sympy.abc import x >>> f(x) f(x) >>> print(sympy.srepr(f(x).func)) Function('f') >>> f(x).args (x,) """ from __future__ import print_function, division from .add import Add from .assumptions import ManagedProperties, _assume_defined from .basic import Basic, _atomic from .cache import cacheit from .compatibility import iterable, is_sequence, as_int, ordered, Iterable from .decorators import _sympifyit from .expr import Expr, AtomicExpr from .numbers import Rational, Float from .operations import LatticeOp from .rules import Transform from .singleton import S from .sympify import sympify from sympy.core.containers import Tuple, Dict from sympy.core.logic import fuzzy_and from sympy.core.compatibility import string_types, with_metaclass, PY3, range from sympy.utilities import default_sort_key from sympy.utilities.misc import filldedent from sympy.utilities.iterables import has_dups, sift from sympy.core.evaluate import global_evaluate import mpmath import mpmath.libmp as mlib import inspect from collections import Counter def _coeff_isneg(a): """Return True if the leading Number is negative. Examples ======== >>> from sympy.core.function import _coeff_isneg >>> from sympy import S, Symbol, oo, pi >>> _coeff_isneg(-3pi) True >>> _coeff_isneg(S(3)) False >>> _coeff_isneg(-oo) True >>> _coeff_isneg(Symbol('n', negative=True)) # coeff is 1 False For matrix expressions: >>> from sympy import MatrixSymbol, sqrt >>> A = MatrixSymbol("A", 3, 3) >>> _coeff_isneg(-sqrt(2)A) True >>> _coeff_isneg(sqrt(2)A) False """ if a.is_MatMul: a = a.args[0] if a.is_Mul: a = a.args[0] return a.is_Number and a.is_extended_negative class PoleError(Exception): pass class ArgumentIndexError(ValueError): def __str__(self): return ("Invalid operation with argument number %s for Function %s" % (self.args[1], self.args[0])) # Python 2/3 version that does not raise a Deprecation warning def arity(cls): """Return the arity of the function if it is known, else None. When default values are specified for some arguments, they are optional and the arity is reported as a tuple of possible values. Examples ======== >>> from sympy.core.function import arity >>> from sympy import log >>> arity(lambda x: x) 1 >>> arity(log) (1, 2) >>> arity(lambda x: sum(x)) is None True """ eval_ = getattr(cls, 'eval', cls) if PY3: parameters = inspect.signature(eval_).parameters.items() if [p for _, p in parameters if p.kind == p.VAR_POSITIONAL]: return p_or_k = [p for _, p in parameters if p.kind == p.POSITIONAL_OR_KEYWORD] # how many have no default and how many have a default value no, yes = map(len, sift(p_or_k, lambda p:p.default == p.empty, binary=True)) return no if not yes else tuple(range(no, no + yes + 1)) else: cls_ = int(hasattr(cls, 'eval')) # correction for cls arguments evalargspec = inspect.getargspec(eval_) if evalargspec.varargs: return else: evalargs = len(evalargspec.args) - cls_ if evalargspec.defaults: # if there are default args then they are optional; the # fewest args will occur when all defaults are used and # the most when none are used (i.e. all args are given) fewest = evalargs - len(evalargspec.defaults) return tuple(range(fewest, evalargs + 1)) return evalargs class FunctionClass(ManagedProperties): """ Base class for function classes. FunctionClass is a subclass of type. Use Function('<function name>' [ , signature ]) to create undefined function classes. """ _new = type.__new__ def __init__(cls, args, kwargs): # honor kwarg value or class-defined value before using # the number of arguments in the eval function (if present) nargs = kwargs.pop('nargs', cls.__dict__.get('nargs', arity(cls))) # Canonicalize nargs here; change to set in nargs. if is_sequence(nargs): if not nargs: raise ValueError(filldedent(''' Incorrectly specified nargs as %s: if there are no arguments, it should be `nargs = 0`; if there are any number of arguments, it should be `nargs = None`''' % str(nargs))) nargs = tuple(ordered(set(nargs))) elif nargs is not None: nargs = (as_int(nargs),) cls._nargs = nargs super(FunctionClass, cls).__init__(args, kwargs) @property def __signature__(self): """ Allow Python 3's inspect.signature to give a useful signature for Function subclasses. """ # Python 3 only, but backports (like the one in IPython) still might # call this. try: from inspect import signature except ImportError: return None # TODO: Look at nargs return signature(self.eval) @property def free_symbols(self): return set() @property def xreplace(self): # Function needs args so we define a property that returns # a function that takes args...and then use that function # to return the right value return lambda rule, _: rule.get(self, self) @property def nargs(self): """Return a set of the allowed number of arguments for the function. Examples ======== >>> from sympy.core.function import Function >>> from sympy.abc import x, y >>> f = Function('f') If the function can take any number of arguments, the set of whole numbers is returned: >>> Function('f').nargs Naturals0 If the function was initialized to accept one or more arguments, a corresponding set will be returned: >>> Function('f', nargs=1).nargs {1} >>> Function('f', nargs=(2, 1)).nargs {1, 2} The undefined function, after application, also has the nargs attribute; the actual number of arguments is always available by checking the ``args`` attribute: >>> f = Function('f') >>> f(1).nargs Naturals0 >>> len(f(1).args) 1 """ from sympy.sets.sets import FiniteSet # XXX it would be nice to handle this in __init__ but there are import # problems with trying to import FiniteSet there return FiniteSet(self._nargs) if self._nargs else S.Naturals0 def __repr__(cls): return cls.__name__ class Application(with_metaclass(FunctionClass, Basic)): """ Base class for applied functions. Instances of Application represent the result of applying an application of any type to any object. """ is_Function = True @cacheit def __new__(cls, args, *options): from sympy.sets.fancysets import Naturals0 from sympy.sets.sets import FiniteSet args = list(map(sympify, args)) evaluate = options.pop('evaluate', global_evaluate[0]) # WildFunction (and anything else like it) may have nargs defined # and we throw that value away here options.pop('nargs', None) if options: raise ValueError("Unknown options: %s" % options) if evaluate: evaluated = cls.eval(args) if evaluated is not None: return evaluated obj = super(Application, cls).__new__(cls, args, options) # make nargs uniform here sentinel = object() objnargs = getattr(obj, "nargs", sentinel) if objnargs is not sentinel: # things passing through here: # - functions subclassed from Function (e.g. myfunc(1).nargs) # - functions like cos(1).nargs # - AppliedUndef with given nargs like Function('f', nargs=1)(1).nargs # Canonicalize nargs here if is_sequence(objnargs): nargs = tuple(ordered(set(objnargs))) elif objnargs is not None: nargs = (as_int(objnargs),) else: nargs = None else: # things passing through here: # - WildFunction('f').nargs # - AppliedUndef with no nargs like Function('f')(1).nargs nargs = obj._nargs # note the underscore here # convert to FiniteSet obj.nargs = FiniteSet(nargs) if nargs else Naturals0() return obj @classmethod def eval(cls, args): """ Returns a canonical form of cls applied to arguments args. The eval() method is called when the class cls is about to be instantiated and it should return either some simplified instance (possible of some other class), or if the class cls should be unmodified, return None. Examples of eval() for the function "sign" --------------------------------------------- .. code-block:: python @classmethod def eval(cls, arg): if arg is S.NaN: return S.NaN if arg is S.Zero: return S.Zero if arg.is_positive: return S.One if arg.is_negative: return S.NegativeOne if isinstance(arg, Mul): coeff, terms = arg.as_coeff_Mul(rational=True) if coeff is not S.One: return cls(coeff) cls(terms) """ return @property def func(self): return self.__class__ def _eval_subs(self, old, new): if (old.is_Function and new.is_Function and callable(old) and callable(new) and old == self.func and len(self.args) in new.nargs): return new([i._subs(old, new) for i in self.args]) class Function(Application, Expr): """ Base class for applied mathematical functions. It also serves as a constructor for undefined function classes. Examples ======== First example shows how to use Function as a constructor for undefined function classes: >>> from sympy import Function, Symbol >>> x = Symbol('x') >>> f = Function('f') >>> g = Function('g')(x) >>> f f >>> f(x) f(x) >>> g g(x) >>> f(x).diff(x) Derivative(f(x), x) >>> g.diff(x) Derivative(g(x), x) Assumptions can be passed to Function, and if function is initialized with a Symbol, the function inherits the name and assumptions associated with the Symbol: >>> f_real = Function('f', real=True) >>> f_real(x).is_real True >>> f_real_inherit = Function(Symbol('f', real=True)) >>> f_real_inherit(x).is_real True Note that assumptions on a function are unrelated to the assumptions on the variable it is called on. If you want to add a relationship, subclass Function and define the appropriate ``_eval_is_assumption`` methods. In the following example Function is used as a base class for ``my_func`` that represents a mathematical function my_func. Suppose that it is well known, that my_func(0)* is 1 and my_func at infinity goes to 0, so we want those two simplifications to occur automatically. Suppose also that my_func(x) is real exactly when x is real. Here is an implementation that honours those requirements: >>> from sympy import Function, S, oo, I, sin >>> class my_func(Function): ... ... @classmethod ... def eval(cls, x): ... if x.is_Number: ... if x is S.Zero: ... return S.One ... elif x is S.Infinity: ... return S.Zero ... ... def _eval_is_real(self): ... return self.args[0].is_real ... >>> x = S('x') >>> my_func(0) + sin(0) 1 >>> my_func(oo) 0 >>> my_func(3.54).n() # Not yet implemented for my_func. my_func(3.54) >>> my_func(I).is_real False In order for ``my_func`` to become useful, several other methods would need to be implemented. See source code of some of the already implemented functions for more complete examples. Also, if the function can take more than one argument, then ``nargs`` must be defined, e.g. if ``my_func`` can take one or two arguments then, >>> class my_func(Function): ... nargs = (1, 2) ... >>> """ @property def _diff_wrt(self): return False @cacheit def __new__(cls, args, options): # Handle calls like Function('f') if cls is Function: return UndefinedFunction(args, *options) n = len(args) if n not in cls.nargs: # XXX: exception message must be in exactly this format to # make it work with NumPy's functions like vectorize(). See, # for example, https://github.com/numpy/numpy/issues/1697. # The ideal solution would be just to attach metadata to # the exception and change NumPy to take advantage of this. temp = ('%(name)s takes %(qual)s %(args)s ' 'argument%(plural)s (%(given)s given)') raise TypeError(temp % { 'name': cls, 'qual': 'exactly' if len(cls.nargs) == 1 else 'at least', 'args': min(cls.nargs), 'plural': 's'(min(cls.nargs) != 1), 'given': n}) evaluate = options.get('evaluate', global_evaluate[0]) result = super(Function, cls).__new__(cls, args, options) if evaluate and isinstance(result, cls) and result.args: pr2 = min(cls._should_evalf(a) for a in result.args) if pr2 > 0: pr = max(cls._should_evalf(a) for a in result.args) result = result.evalf(mlib.libmpf.prec_to_dps(pr)) return result @classmethod def _should_evalf(cls, arg): """ Decide if the function should automatically evalf(). By default (in this implementation), this happens if (and only if) the ARG is a floating point number. This function is used by __new__. Returns the precision to evalf to, or -1 if it shouldn't evalf. """ from sympy.core.evalf import pure_complex if arg.is_Float: return arg._prec if not arg.is_Add: return -1 m = pure_complex(arg) if m is None or not (m[0].is_Float or m[1].is_Float): return -1 l = [i._prec for i in m if i.is_Float] l.append(-1) return max(l) @classmethod def class_key(cls): from sympy.sets.fancysets import Naturals0 funcs = { 'exp': 10, 'log': 11, 'sin': 20, 'cos': 21, 'tan': 22, 'cot': 23, 'sinh': 30, 'cosh': 31, 'tanh': 32, 'coth': 33, 'conjugate': 40, 're': 41, 'im': 42, 'arg': 43, } name = cls.__name__ try: i = funcs[name] except KeyError: i = 0 if isinstance(cls.nargs, Naturals0) else 10000 return 4, i, name @property def is_commutative(self): """ Returns whether the function is commutative. """ if all(getattr(t, 'is_commutative') for t in self.args): return True else: return False def _eval_evalf(self, prec): def _get_mpmath_func(fname): """Lookup mpmath function based on name""" if isinstance(self, AppliedUndef): # Shouldn't lookup in mpmath but might have ._imp_ return None if not hasattr(mpmath, fname): from sympy.utilities.lambdify import MPMATH_TRANSLATIONS fname = MPMATH_TRANSLATIONS.get(fname, None) if fname is None: return None return getattr(mpmath, fname) func = _get_mpmath_func(self.func.__name__) # Fall-back evaluation if func is None: imp = getattr(self, '_imp_', None) if imp is None: return None try: return Float(imp([i.evalf(prec) for i in self.args]), prec) except (TypeError, ValueError) as e: return None # Convert all args to mpf or mpc # Convert the arguments to higher precision than requested for the # final result. # XXX + 5 is a guess, it is similar to what is used in evalf.py. Should # we be more intelligent about it? try: args = [arg._to_mpmath(prec + 5) for arg in self.args] def bad(m): from mpmath import mpf, mpc # the precision of an mpf value is the last element # if that is 1 (and m[1] is not 1 which would indicate a # power of 2), then the eval failed; so check that none of # the arguments failed to compute to a finite precision. # Note: An mpc value has two parts, the re and imag tuple; # check each of those parts, too. Anything else is allowed to # pass if isinstance(m, mpf): m = m._mpf_ return m[1] !=1 and m[-1] == 1 elif isinstance(m, mpc): m, n = m._mpc_ return m[1] !=1 and m[-1] == 1 and \ n[1] !=1 and n[-1] == 1 else: return False if any(bad(a) for a in args): raise ValueError # one or more args failed to compute with significance except ValueError: return with mpmath.workprec(prec): v = func(args) return Expr._from_mpmath(v, prec) def _eval_derivative(self, s): # f(x).diff(s) -> x.diff(s) f.fdiff(1)(s) i = 0 l = [] for a in self.args: i += 1 da = a.diff(s) if da is S.Zero: continue try: df = self.fdiff(i) except ArgumentIndexError: df = Function.fdiff(self, i) l.append(df * da) return Add(l) def _eval_is_commutative(self): return fuzzy_and(a.is_commutative for a in self.args) def _eval_is_complex(self): return fuzzy_and(a.is_complex for a in self.args) def as_base_exp(self): """ Returns the method as the 2-tuple (base, exponent). """ return self, S.One def _eval_aseries(self, n, args0, x, logx): """ Compute an asymptotic expansion around args0, in terms of self.args. This function is only used internally by _eval_nseries and should not be called directly; derived classes can overwrite this to implement asymptotic expansions. """ from sympy.utilities.misc import filldedent raise PoleError(filldedent(''' Asymptotic expansion of %s around %s is not implemented.''' % (type(self), args0))) def _eval_nseries(self, x, n, logx): """ This function does compute series for multivariate functions, but the expansion is always in terms of one* variable. Examples ======== >>> from sympy import atan2 >>> from sympy.abc import x, y >>> atan2(x, y).series(x, n=2) atan2(0, y) + x/y + O(x2) >>> atan2(x, y).series(y, n=2) -y/x + atan2(x, 0) + O(y2) This function also computes asymptotic expansions, if necessary and possible: >>> from sympy import loggamma >>> loggamma(1/x)._eval_nseries(x,0,None) -1/x - log(x)/x + log(x)/2 + O(1) """ from sympy import Order from sympy.sets.sets import FiniteSet args = self.args args0 = [t.limit(x, 0) for t in args] if any(t.is_finite is False for t in args0): from sympy import oo, zoo, nan # XXX could use t.as_leading_term(x) here but it's a little # slower a = [t.compute_leading_term(x, logx=logx) for t in args] a0 = [t.limit(x, 0) for t in a] if any([t.has(oo, -oo, zoo, nan) for t in a0]): return self._eval_aseries(n, args0, x, logx) # Careful: the argument goes to oo, but only logarithmically so. We # are supposed to do a power series expansion "around the # logarithmic term". e.g. # f(1+x+log(x)) # -> f(1+logx) + xf'(1+logx) + O(x2) # where 'logx' is given in the argument a = [t._eval_nseries(x, n, logx) for t in args] z = [r - r0 for (r, r0) in zip(a, a0)] p = [Dummy() for _ in z] q = [] v = None for ai, zi, pi in zip(a0, z, p): if zi.has(x): if v is not None: raise NotImplementedError q.append(ai + pi) v = pi else: q.append(ai) e1 = self.func(q) if v is None: return e1 s = e1._eval_nseries(v, n, logx) o = s.getO() s = s.removeO() s = s.subs(v, zi).expand() + Order(o.expr.subs(v, zi), x) return s if (self.func.nargs is S.Naturals0 or (self.func.nargs == FiniteSet(1) and args0[0]) or any(c > 1 for c in self.func.nargs)): e = self e1 = e.expand() if e == e1: #for example when e = sin(x+1) or e = sin(cos(x)) #let's try the general algorithm term = e.subs(x, S.Zero) if term.is_finite is False or term is S.NaN: raise PoleError("Cannot expand %s around 0" % (self)) series = term fact = S.One _x = Dummy('x') e = e.subs(x, _x) for i in range(n - 1): i += 1 fact = Rational(i) e = e.diff(_x) subs = e.subs(_x, S.Zero) if subs is S.NaN: # try to evaluate a limit if we have to subs = e.limit(_x, S.Zero) if subs.is_finite is False: raise PoleError("Cannot expand %s around 0" % (self)) term = subs(xi)/fact term = term.expand() series += term return series + Order(xn, x) return e1.nseries(x, n=n, logx=logx) arg = self.args[0] l = [] g = None # try to predict a number of terms needed nterms = n + 2 cf = Order(arg.as_leading_term(x), x).getn() if cf != 0: nterms = int(nterms / cf) for i in range(nterms): g = self.taylor_term(i, arg, g) g = g.nseries(x, n=n, logx=logx) l.append(g) return Add(l) + Order(xn, x) def fdiff(self, argindex=1): """ Returns the first derivative of the function. """ if not (1 <= argindex <= len(self.args)): raise ArgumentIndexError(self, argindex) ix = argindex - 1 A = self.args[ix] if A._diff_wrt: if len(self.args) == 1: return Derivative(self, A) if A.is_Symbol: for i, v in enumerate(self.args): if i != ix and A in v.free_symbols: # it can't be in any other argument's free symbols # issue 8510 break else: return Derivative(self, A) else: free = A.free_symbols for i, a in enumerate(self.args): if ix != i and a.free_symbols & free: break else: # there is no possible interaction bewtween args return Derivative(self, A) # See issue 4624 and issue 4719, 5600 and 8510 D = Dummy('xi_%i' % argindex, dummy_index=hash(A)) args = self.args[:ix] + (D,) + self.args[ix + 1:] return Subs(Derivative(self.func(args), D), D, A) def _eval_as_leading_term(self, x): """Stub that should be overridden by new Functions to return the first non-zero term in a series if ever an x-dependent argument whose leading term vanishes as x -> 0 might be encountered. See, for example, cos._eval_as_leading_term. """ from sympy import Order args = [a.as_leading_term(x) for a in self.args] o = Order(1, x) if any(x in a.free_symbols and o.contains(a) for a in args): # Whereas x and any finite number are contained in O(1, x), # expressions like 1/x are not. If any arg simplified to a # vanishing expression as x -> 0 (like x or x*2, but not # 3, 1/x, etc...) then the _eval_as_leading_term is needed # to supply the first non-zero term of the series, # # e.g. expression leading term # ---------- ------------ # cos(1/x) cos(1/x) # cos(cos(x)) cos(1) # cos(x) 1 <- _eval_as_leading_term needed # sin(x) x <- _eval_as_leading_term needed # raise NotImplementedError( '%s has no _eval_as_leading_term routine' % self.func) else: return self.func(args) def _sage_(self): import sage.all as sage fname = self.func.__name__ func = getattr(sage, fname, None) args = [arg._sage_() for arg in self.args] # In the case the function is not known in sage: if func is None: import sympy if getattr(sympy, fname, None) is None: # abstract function return sage.function(fname)(args) else: # the function defined in sympy is not known in sage # this exception is caught in sage raise AttributeError return func(args) class AppliedUndef(Function): """ Base class for expressions resulting from the application of an undefined function. """ is_number = False def __new__(cls, args, options): args = list(map(sympify, args)) obj = super(AppliedUndef, cls).__new__(cls, args, *options) return obj def _eval_as_leading_term(self, x): return self def _sage_(self): import sage.all as sage fname = str(self.func) args = [arg._sage_() for arg in self.args] func = sage.function(fname)(args) return func @property def _diff_wrt(self): """ Allow derivatives wrt to undefined functions. Examples ======== >>> from sympy import Function, Symbol >>> f = Function('f') >>> x = Symbol('x') >>> f(x)._diff_wrt True >>> f(x).diff(x) Derivative(f(x), x) """ return True class UndefinedFunction(FunctionClass): """ The (meta)class of undefined functions. """ def __new__(mcl, name, bases=(AppliedUndef,), __dict__=None, kwargs): from .symbol import _filter_assumptions # Allow Function('f', real=True) # and/or Function(Symbol('f', real=True)) assumptions, kwargs = _filter_assumptions(kwargs) if isinstance(name, Symbol): assumptions = name._merge(assumptions) name = name.name elif not isinstance(name, string_types): raise TypeError('expecting string or Symbol for name') else: commutative = assumptions.get('commutative', None) assumptions = Symbol(name, assumptions).assumptions0 if commutative is None: assumptions.pop('commutative') __dict__ = __dict__ or {} # put the `is_` for into __dict__ __dict__.update({'is_%s' % k: v for k, v in assumptions.items()}) # You can add other attributes, although they do have to be hashable # (but seriously, if you want to add anything other than assumptions, # just subclass Function) __dict__.update(kwargs) # add back the sanitized assumptions without the is_ prefix kwargs.update(assumptions) # Save these for __eq__ __dict__.update({'_kwargs': kwargs}) # do this for pickling __dict__['__module__'] = None obj = super(UndefinedFunction, mcl).__new__(mcl, name, bases, __dict__) obj.name = name return obj def __instancecheck__(cls, instance): return cls in type(instance).__mro__ _kwargs = {} def __hash__(self): return hash((self.class_key(), frozenset(self._kwargs.items()))) def __eq__(self, other): return (isinstance(other, self.__class__) and self.class_key() == other.class_key() and self._kwargs == other._kwargs) def __ne__(self, other): return not self == other class WildFunction(Function, AtomicExpr): """ A WildFunction function matches any function (with its arguments). Examples ======== >>> from sympy import WildFunction, Function, cos >>> from sympy.abc import x, y >>> F = WildFunction('F') >>> f = Function('f') >>> F.nargs Naturals0 >>> x.match(F) >>> F.match(F) {F_: F_} >>> f(x).match(F) {F_: f(x)} >>> cos(x).match(F) {F_: cos(x)} >>> f(x, y).match(F) {F_: f(x, y)} To match functions with a given number of arguments, set ``nargs`` to the desired value at instantiation: >>> F = WildFunction('F', nargs=2) >>> F.nargs {2} >>> f(x).match(F) >>> f(x, y).match(F) {F_: f(x, y)} To match functions with a range of arguments, set ``nargs`` to a tuple containing the desired number of arguments, e.g. if ``nargs = (1, 2)`` then functions with 1 or 2 arguments will be matched. >>> F = WildFunction('F', nargs=(1, 2)) >>> F.nargs {1, 2} >>> f(x).match(F) {F_: f(x)} >>> f(x, y).match(F) {F_: f(x, y)} >>> f(x, y, 1).match(F) """ include = set() def __init__(cls, name, assumptions): from sympy.sets.sets import Set, FiniteSet cls.name = name nargs = assumptions.pop('nargs', S.Naturals0) if not isinstance(nargs, Set): # Canonicalize nargs here. See also FunctionClass. if is_sequence(nargs): nargs = tuple(ordered(set(nargs))) elif nargs is not None: nargs = (as_int(nargs),) nargs = FiniteSet(nargs) cls.nargs = nargs def matches(self, expr, repl_dict={}, old=False): if not isinstance(expr, (AppliedUndef, Function)): return None if len(expr.args) not in self.nargs: return None repl_dict = repl_dict.copy() repl_dict[self] = expr return repl_dict class Derivative(Expr): """ Carries out differentiation of the given expression with respect to symbols. Examples ======== >>> from sympy import Derivative, Function, symbols, Subs >>> from sympy.abc import x, y >>> f, g = symbols('f g', cls=Function) >>> Derivative(x*2, x, evaluate=True) 2x Denesting of derivatives retains the ordering of variables: >>> Derivative(Derivative(f(x, y), y), x) Derivative(f(x, y), y, x) Contiguously identical symbols are merged into a tuple giving the symbol and the count: >>> Derivative(f(x), x, x, y, x) Derivative(f(x), (x, 2), y, x) If the derivative cannot be performed, and evaluate is True, the order of the variables of differentiation will be made canonical: >>> Derivative(f(x, y), y, x, evaluate=True) Derivative(f(x, y), x, y) Derivatives with respect to undefined functions can be calculated: >>> Derivative(f(x)*2, f(x), evaluate=True) 2f(x) Such derivatives will show up when the chain rule is used to evalulate a derivative: >>> f(g(x)).diff(x) Derivative(f(g(x)), g(x))Derivative(g(x), x) Substitution is used to represent derivatives of functions with arguments that are not symbols or functions: >>> f(2x + 3).diff(x) == 2Subs(f(y).diff(y), y, 2x + 3) True Notes ===== Simplification of high-order derivatives: Because there can be a significant amount of simplification that can be done when multiple differentiations are performed, results will be automatically simplified in a fairly conservative fashion unless the keyword ``simplify`` is set to False. >>> from sympy import cos, sin, sqrt, diff, Function, symbols >>> from sympy.abc import x, y, z >>> f, g = symbols('f,g', cls=Function) >>> e = sqrt((x + 1)*2 + x) >>> diff(e, (x, 5), simplify=False).count_ops() 136 >>> diff(e, (x, 5)).count_ops() 30 Ordering of variables: If evaluate is set to True and the expression cannot be evaluated, the list of differentiation symbols will be sorted, that is, the expression is assumed to have continuous derivatives up to the order asked. Derivative wrt non-Symbols: For the most part, one may not differentiate wrt non-symbols. For example, we do not allow differentiation wrt `xy` because there are multiple ways of structurally defining where xy appears in an expression: a very strict definition would make (xyz).diff(xy) == 0. Derivatives wrt defined functions (like cos(x)) are not allowed, either: >>> (xyz).diff(xy) Traceback (most recent call last): ... ValueError: Can't calculate derivative wrt xy. To make it easier to work with variational calculus, however, derivatives wrt AppliedUndef and Derivatives are allowed. For example, in the Euler-Lagrange method one may write F(t, u, v) where u = f(t) and v = f'(t). These variables can be written explicitly as functions of time:: >>> from sympy.abc import t >>> F = Function('F') >>> U = f(t) >>> V = U.diff(t) The derivative wrt f(t) can be obtained directly: >>> direct = F(t, U, V).diff(U) When differentiation wrt a non-Symbol is attempted, the non-Symbol is temporarily converted to a Symbol while the differentiation is performed and the same answer is obtained: >>> indirect = F(t, U, V).subs(U, x).diff(x).subs(x, U) >>> assert direct == indirect The implication of this non-symbol replacement is that all functions are treated as independent of other functions and the symbols are independent of the functions that contain them:: >>> x.diff(f(x)) 0 >>> g(x).diff(f(x)) 0 It also means that derivatives are assumed to depend only on the variables of differentiation, not on anything contained within the expression being differentiated:: >>> F = f(x) >>> Fx = F.diff(x) >>> Fx.diff(F) # derivative depends on x, not F 0 >>> Fxx = Fx.diff(x) >>> Fxx.diff(Fx) # derivative depends on x, not Fx 0 The last example can be made explicit by showing the replacement of Fx in Fxx with y: >>> Fxx.subs(Fx, y) Derivative(y, x) Since that in itself will evaluate to zero, differentiating wrt Fx will also be zero: >>> _.doit() 0 Replacing undefined functions with concrete expressions One must be careful to replace undefined functions with expressions that contain variables consistent with the function definition and the variables of differentiation or else insconsistent result will be obtained. Consider the following example: >>> eq = f(x)g(y) >>> eq.subs(f(x), xy).diff(x, y).doit() yDerivative(g(y), y) + g(y) >>> eq.diff(x, y).subs(f(x), xy).doit() yDerivative(g(y), y) The results differ because `f(x)` was replaced with an expression that involved both variables of differentiation. In the abstract case, differentiation of `f(x)` by `y` is 0; in the concrete case, the presence of `y` made that derivative nonvanishing and produced the extra `g(y)` term. Defining differentiation for an object An object must define ._eval_derivative(symbol) method that returns the differentiation result. This function only needs to consider the non-trivial case where expr contains symbol and it should call the diff() method internally (not _eval_derivative); Derivative should be the only one to call _eval_derivative. Any class can allow derivatives to be taken with respect to itself (while indicating its scalar nature). See the docstring of Expr._diff_wrt. See Also ======== _sort_variable_count """ is_Derivative = True @property def _diff_wrt(self): """An expression may be differentiated wrt a Derivative if it is in elementary form. Examples ======== >>> from sympy import Function, Derivative, cos >>> from sympy.abc import x >>> f = Function('f') >>> Derivative(f(x), x)._diff_wrt True >>> Derivative(cos(x), x)._diff_wrt False >>> Derivative(x + 1, x)._diff_wrt False A Derivative might be an unevaluated form of what will not be a valid variable of differentiation if evaluated. For example, >>> Derivative(f(f(x)), x).doit() Derivative(f(x), x)Derivative(f(f(x)), f(x)) Such an expression will present the same ambiguities as arise when dealing with any other product, like `2x`, so `_diff_wrt` is False: >>> Derivative(f(f(x)), x)._diff_wrt False """ return self.expr._diff_wrt and isinstance(self.doit(), Derivative) def __new__(cls, expr, variables, *kwargs): from sympy.matrices.common import MatrixCommon from sympy import Integer, MatrixExpr from sympy.tensor.array import Array, NDimArray, derive_by_array from sympy.utilities.misc import filldedent expr = sympify(expr) symbols_or_none = getattr(expr, "free_symbols", None) has_symbol_set = isinstance(symbols_or_none, set) if not has_symbol_set: raise ValueError(filldedent(''' Since there are no variables in the expression %s, it cannot be differentiated.''' % expr)) # determine value for variables if it wasn't given if not variables: variables = expr.free_symbols if len(variables) != 1: if expr.is_number: return S.Zero if len(variables) == 0: raise ValueError(filldedent(''' Since there are no variables in the expression, the variable(s) of differentiation must be supplied to differentiate %s''' % expr)) else: raise ValueError(filldedent(''' Since there is more than one variable in the expression, the variable(s) of differentiation must be supplied to differentiate %s''' % expr)) # Standardize the variables by sympifying them: variables = list(sympify(variables)) # Split the list of variables into a list of the variables we are diff # wrt, where each element of the list has the form (s, count) where # s is the entity to diff wrt and count is the order of the # derivative. variable_count = [] array_likes = (tuple, list, Tuple) for i, v in enumerate(variables): if isinstance(v, Integer): if i == 0: raise ValueError("First variable cannot be a number: %i" % v) count = v prev, prevcount = variable_count[-1] if prevcount != 1: raise TypeError("tuple {0} followed by number {1}".format((prev, prevcount), v)) if count == 0: variable_count.pop() else: variable_count[-1] = Tuple(prev, count) else: if isinstance(v, array_likes): if len(v) == 0: # Ignore empty tuples: Derivative(expr, ... , (), ... ) continue if isinstance(v[0], array_likes): # Derive by array: Derivative(expr, ... , [[x, y, z]], ... ) if len(v) == 1: v = Array(v[0]) count = 1 else: v, count = v v = Array(v) else: v, count = v if count == 0: continue else: count = 1 variable_count.append(Tuple(v, count)) # light evaluation of contiguous, identical # items: (x, 1), (x, 1) -> (x, 2) merged = [] for t in variable_count: v, c = t if c.is_negative: raise ValueError( 'order of differentiation must be nonnegative') if merged and merged[-1][0] == v: c += merged[-1][1] if not c: merged.pop() else: merged[-1] = Tuple(v, c) else: merged.append(t) variable_count = merged # sanity check of variables of differentation; we waited # until the counts were computed since some variables may # have been removed because the count was 0 for v, c in variable_count: # v must have _diff_wrt True if not v._diff_wrt: __ = '' # filler to make error message neater raise ValueError(filldedent(''' Can't calculate derivative wrt %s.%s''' % (v, __))) # We make a special case for 0th derivative, because there is no # good way to unambiguously print this. if len(variable_count) == 0: return expr evaluate = kwargs.get('evaluate', False) if evaluate: if isinstance(expr, Derivative): expr = expr.canonical variable_count = [ (v.canonical if isinstance(v, Derivative) else v, c) for v, c in variable_count] # Look for a quick exit if there are symbols that don't appear in # expression at all. Note, this cannot check non-symbols like # Derivatives as those can be created by intermediate # derivatives. zero = False free = expr.free_symbols for v, c in variable_count: vfree = v.free_symbols if c.is_positive and vfree: if isinstance(v, AppliedUndef): # these match exactly since # x.diff(f(x)) == g(x).diff(f(x)) == 0 # and are not created by differentiation D = Dummy() if not expr.xreplace({v: D}).has(D): zero = True break elif isinstance(v, MatrixExpr): zero = False break elif isinstance(v, Symbol) and v not in free: zero = True break else: if not free & vfree: # e.g. v is IndexedBase or Matrix zero = True break if zero: if isinstance(expr, (MatrixCommon, NDimArray)): return expr.zeros(expr.shape) elif expr.is_scalar: return S.Zero # make the order of symbols canonical #TODO: check if assumption of discontinuous derivatives exist variable_count = cls._sort_variable_count(variable_count) # denest if isinstance(expr, Derivative): variable_count = list(expr.variable_count) + variable_count expr = expr.expr return Derivative(expr, variable_count, kwargs) # we return here if evaluate is False or if there is no # _eval_derivative method if not evaluate or not hasattr(expr, '_eval_derivative'): # return an unevaluated Derivative if evaluate and variable_count == [(expr, 1)] and expr.is_scalar: # special hack providing evaluation for classes # that have defined is_scalar=True but have no # _eval_derivative defined return S.One return Expr.__new__(cls, expr, variable_count) # evaluate the derivative by calling _eval_derivative method # of expr for each variable # ------------------------------------------------------------- nderivs = 0 # how many derivatives were performed unhandled = [] for i, (v, count) in enumerate(variable_count): old_expr = expr old_v = None is_symbol = v.is_symbol or isinstance(v, (Iterable, Tuple, MatrixCommon, NDimArray)) if not is_symbol: old_v = v v = Dummy('xi') expr = expr.xreplace({old_v: v}) # Derivatives and UndefinedFunctions are independent # of all others clashing = not (isinstance(old_v, Derivative) or \ isinstance(old_v, AppliedUndef)) if not v in expr.free_symbols and not clashing: return expr.diff(v) # expr's version of 0 if not old_v.is_scalar and not hasattr( old_v, '_eval_derivative'): # special hack providing evaluation for classes # that have defined is_scalar=True but have no # _eval_derivative defined expr = old_v.diff(old_v) # Evaluate the derivative `n` times. If # `_eval_derivative_n_times` is not overridden by the current # object, the default in `Basic` will call a loop over # `_eval_derivative`: obj = expr._eval_derivative_n_times(v, count) if obj is not None and obj.is_zero: return obj nderivs += count if old_v is not None: if obj is not None: # remove the dummy that was used obj = obj.subs(v, old_v) # restore expr expr = old_expr if obj is None: # we've already checked for quick-exit conditions # that give 0 so the remaining variables # are contained in the expression but the expression # did not compute a derivative so we stop taking # derivatives unhandled = variable_count[i:] break expr = obj # what we have so far can be made canonical expr = expr.replace( lambda x: isinstance(x, Derivative), lambda x: x.canonical) if unhandled: if isinstance(expr, Derivative): unhandled = list(expr.variable_count) + unhandled expr = expr.expr expr = Expr.__new__(cls, expr, unhandled) if (nderivs > 1) == True and kwargs.get('simplify', True): from sympy.core.exprtools import factor_terms from sympy.simplify.simplify import signsimp expr = factor_terms(signsimp(expr)) return expr @property def canonical(cls): return cls.func(cls.expr, Derivative._sort_variable_count(cls.variable_count)) @classmethod def _sort_variable_count(cls, vc): """ Sort (variable, count) pairs into canonical order while retaining order of variables that do not commute during differentiation: symbols and functions commute with each other * derivatives commute with each other * a derivative doesn't commute with anything it contains * any other object is not allowed to commute if it has free symbols in common with another object Examples ======== >>> from sympy import Derivative, Function, symbols, cos >>> vsort = Derivative._sort_variable_count >>> x, y, z = symbols('x y z') >>> f, g, h = symbols('f g h', cls=Function) Contiguous items are collapsed into one pair: >>> vsort([(x, 1), (x, 1)]) [(x, 2)] >>> vsort([(y, 1), (f(x), 1), (y, 1), (f(x), 1)]) [(y, 2), (f(x), 2)] Ordering is canonical. >>> def vsort0(v): ... # docstring helper to ... # change vi -> (vi, 0), sort, and return vi vals ... return [i[0] for i in vsort([(i, 0) for i in v])] >>> vsort0(y, x) [x, y] >>> vsort0(g(y), g(x), f(y)) [f(y), g(x), g(y)] Symbols are sorted as far to the left as possible but never move to the left of a derivative having the same symbol in its variables; the same applies to AppliedUndef which are always sorted after Symbols: >>> dfx = f(x).diff(x) >>> assert vsort0(dfx, y) == [y, dfx] >>> assert vsort0(dfx, x) == [dfx, x] """ from sympy.utilities.iterables import uniq, topological_sort if not vc: return [] vc = list(vc) if len(vc) == 1: return [Tuple(vc[0])] V = list(range(len(vc))) E = [] v = lambda i: vc[i][0] D = Dummy() def _block(d, v, wrt=False): # return True if v should not come before d else False if d == v: return wrt if d.is_Symbol: return False if isinstance(d, Derivative): # a derivative blocks if any of it's variables contain # v; the wrt flag will return True for an exact match # and will cause an AppliedUndef to block if v is in # the arguments if any(_block(k, v, wrt=True) for k in d._wrt_variables): return True return False if not wrt and isinstance(d, AppliedUndef): return False if v.is_Symbol: return v in d.free_symbols if isinstance(v, AppliedUndef): return _block(d.xreplace({v: D}), D) return d.free_symbols & v.free_symbols for i in range(len(vc)): for j in range(i): if _block(v(j), v(i)): E.append((j,i)) # this is the default ordering to use in case of ties O = dict(zip(ordered(uniq([i for i, c in vc])), range(len(vc)))) ix = topological_sort((V, E), key=lambda i: O[v(i)]) # merge counts of contiguously identical items merged = [] for v, c in [vc[i] for i in ix]: if merged and merged[-1][0] == v: merged[-1][1] += c else: merged.append([v, c]) return [Tuple(i) for i in merged] def _eval_is_commutative(self): return self.expr.is_commutative def _eval_derivative(self, v): # If v (the variable of differentiation) is not in # self.variables, we might be able to take the derivative. if v not in self._wrt_variables: dedv = self.expr.diff(v) if isinstance(dedv, Derivative): return dedv.func(dedv.expr, (self.variable_count + dedv.variable_count)) # dedv (d(self.expr)/dv) could have simplified things such that the # derivative wrt things in self.variables can now be done. Thus, # we set evaluate=True to see if there are any other derivatives # that can be done. The most common case is when dedv is a simple # number so that the derivative wrt anything else will vanish. return self.func(dedv, self.variables, evaluate=True) # In this case v was in self.variables so the derivative wrt v has # already been attempted and was not computed, either because it # couldn't be or evaluate=False originally. variable_count = list(self.variable_count) variable_count.append((v, 1)) return self.func(self.expr, variable_count, evaluate=False) def doit(self, hints): expr = self.expr if hints.get('deep', True): expr = expr.doit(hints) hints['evaluate'] = True rv = self.func(expr, self.variable_count, hints) if rv!= self and rv.has(Derivative): rv = rv.doit(hints) return rv @_sympifyit('z0', NotImplementedError) def doit_numerically(self, z0): """ Evaluate the derivative at z numerically. When we can represent derivatives at a point, this should be folded into the normal evalf. For now, we need a special method. """ if len(self.free_symbols) != 1 or len(self.variables) != 1: raise NotImplementedError('partials and higher order derivatives') z = list(self.free_symbols)[0] def eval(x): f0 = self.expr.subs(z, Expr._from_mpmath(x, prec=mpmath.mp.prec)) f0 = f0.evalf(mlib.libmpf.prec_to_dps(mpmath.mp.prec)) return f0._to_mpmath(mpmath.mp.prec) return Expr._from_mpmath(mpmath.diff(eval, z0._to_mpmath(mpmath.mp.prec)), mpmath.mp.prec) @property def expr(self): return self._args[0] @property def _wrt_variables(self): # return the variables of differentiation without # respect to the type of count (int or symbolic) return [i[0] for i in self.variable_count] @property def variables(self): # TODO: deprecate? YES, make this 'enumerated_variables' and # name _wrt_variables as variables # TODO: support for `d^n`? rv = [] for v, count in self.variable_count: if not count.is_Integer: raise TypeError(filldedent(''' Cannot give expansion for symbolic count. If you just want a list of all variables of differentiation, use _wrt_variables.''')) rv.extend([v]count) return tuple(rv) @property def variable_count(self): return self._args[1:] @property def derivative_count(self): return sum([count for var, count in self.variable_count], 0) @property def free_symbols(self): return self.expr.free_symbols def _eval_subs(self, old, new): # The substitution (old, new) cannot be done inside # Derivative(expr, vars) for a variety of reasons # as handled below. if old in self._wrt_variables: # first handle the counts expr = self.func(self.expr, [(v, c.subs(old, new)) for v, c in self.variable_count]) if expr != self: return expr._eval_subs(old, new) # quick exit case if not getattr(new, '_diff_wrt', False): # case (0): new is not a valid variable of # differentiation if isinstance(old, Symbol): # don't introduce a new symbol if the old will do return Subs(self, old, new) else: xi = Dummy('xi') return Subs(self.xreplace({old: xi}), xi, new) # If both are Derivatives with the same expr, check if old is # equivalent to self or if old is a subderivative of self. if old.is_Derivative and old.expr == self.expr: if self.canonical == old.canonical: return new # collections.Counter doesn't have __le__ def _subset(a, b): return all((a[i] <= b[i]) == True for i in a) old_vars = Counter(dict(reversed(old.variable_count))) self_vars = Counter(dict(reversed(self.variable_count))) if _subset(old_vars, self_vars): return Derivative(new, (self_vars - old_vars).items()).canonical args = list(self.args) newargs = list(x._subs(old, new) for x in args) if args[0] == old: # complete replacement of self.expr # we already checked that the new is valid so we know # it won't be a problem should it appear in variables return Derivative(newargs) if newargs[0] != args[0]: # case (1) can't change expr by introducing something that is in # the _wrt_variables if it was already in the expr # e.g. # for Derivative(f(x, g(y)), y), x cannot be replaced with # anything that has y in it; for f(g(x), g(y)).diff(g(y)) # g(x) cannot be replaced with anything that has g(y) syms = {vi: Dummy() for vi in self._wrt_variables if not vi.is_Symbol} wrt = set(syms.get(vi, vi) for vi in self._wrt_variables) forbidden = args[0].xreplace(syms).free_symbols & wrt nfree = new.xreplace(syms).free_symbols ofree = old.xreplace(syms).free_symbols if (nfree - ofree) & forbidden: return Subs(self, old, new) viter = ((i, j) for ((i, _), (j, _)) in zip(newargs[1:], args[1:])) if any(i != j for i, j in viter): # a wrt-variable change # case (2) can't change vars by introducing a variable # that is contained in expr, e.g. # for Derivative(f(z, g(h(x), y)), y), y cannot be changed to # x, h(x), or g(h(x), y) for a in _atomic(self.expr, recursive=True): for i in range(1, len(newargs)): vi, _ = newargs[i] if a == vi and vi != args[i][0]: return Subs(self, old, new) # more arg-wise checks vc = newargs[1:] oldv = self._wrt_variables newe = self.expr subs = [] for i, (vi, ci) in enumerate(vc): if not vi._diff_wrt: # case (3) invalid differentiation expression so # create a replacement dummy xi = Dummy('xi_%i' % i) # replace the old valid variable with the dummy # in the expression newe = newe.xreplace({oldv[i]: xi}) # and replace the bad variable with the dummy vc[i] = (xi, ci) # and record the dummy with the new (invalid) # differentiation expression subs.append((xi, vi)) if subs: # handle any residual substitution in the expression newe = newe._subs(old, new) # return the Subs-wrapped derivative return Subs(Derivative(newe, vc), zip(subs)) # everything was ok return Derivative(newargs) def _eval_lseries(self, x, logx): dx = self.variables for term in self.expr.lseries(x, logx=logx): yield self.func(term, dx) def _eval_nseries(self, x, n, logx): arg = self.expr.nseries(x, n=n, logx=logx) o = arg.getO() dx = self.variables rv = [self.func(a, dx) for a in Add.make_args(arg.removeO())] if o: rv.append(o/x) return Add(rv) def _eval_as_leading_term(self, x): series_gen = self.expr.lseries(x) d = S.Zero for leading_term in series_gen: d = diff(leading_term, self.variables) if d != 0: break return d def _sage_(self): import sage.all as sage args = [arg._sage_() for arg in self.args] return sage.derivative(args) def as_finite_difference(self, points=1, x0=None, wrt=None): """ Expresses a Derivative instance as a finite difference. Parameters ========== points : sequence or coefficient, optional If sequence: discrete values (length >= order+1) of the independent variable used for generating the finite difference weights. If it is a coefficient, it will be used as the step-size for generating an equidistant sequence of length order+1 centered around ``x0``. Default: 1 (step-size 1) x0 : number or Symbol, optional the value of the independent variable (``wrt``) at which the derivative is to be approximated. Default: same as ``wrt``. wrt : Symbol, optional "with respect to" the variable for which the (partial) derivative is to be approximated for. If not provided it is required that the derivative is ordinary. Default: ``None``. Examples ======== >>> from sympy import symbols, Function, exp, sqrt, Symbol >>> x, h = symbols('x h') >>> f = Function('f') >>> f(x).diff(x).as_finite_difference() -f(x - 1/2) + f(x + 1/2) The default step size and number of points are 1 and ``order + 1`` respectively. We can change the step size by passing a symbol as a parameter: >>> f(x).diff(x).as_finite_difference(h) -f(-h/2 + x)/h + f(h/2 + x)/h We can also specify the discretized values to be used in a sequence: >>> f(x).diff(x).as_finite_difference([x, x+h, x+2h]) -3f(x)/(2h) + 2f(h + x)/h - f(2h + x)/(2h) The algorithm is not restricted to use equidistant spacing, nor do we need to make the approximation around ``x0``, but we can get an expression estimating the derivative at an offset: >>> e, sq2 = exp(1), sqrt(2) >>> xl = [x-h, x+h, x+eh] >>> f(x).diff(x, 1).as_finite_difference(xl, x+hsq2) # doctest: +ELLIPSIS 2h((h + sqrt(2)h)/(2h) - (-sqrt(2)h + h)/(2h))f(Eh + x)/... To approximate ``Derivative`` around ``x0`` using a non-equidistant spacing step, the algorithm supports assignment of undefined functions to ``points``: >>> dx = Function('dx') >>> f(x).diff(x).as_finite_difference(points=dx(x), x0=x-h) -f(-h + x - dx(-h + x)/2)/dx(-h + x) + f(-h + x + dx(-h + x)/2)/dx(-h + x) Partial derivatives are also supported: >>> y = Symbol('y') >>> d2fdxdy=f(x,y).diff(x,y) >>> d2fdxdy.as_finite_difference(wrt=x) -Derivative(f(x - 1/2, y), y) + Derivative(f(x + 1/2, y), y) We can apply ``as_finite_difference`` to ``Derivative`` instances in compound expressions using ``replace``: >>> (1 + 42f(x).diff(x)).replace(lambda arg: arg.is_Derivative, ... lambda arg: arg.as_finite_difference()) 42(-f(x - 1/2) + f(x + 1/2)) + 1 See also ======== sympy.calculus.finite_diff.apply_finite_diff sympy.calculus.finite_diff.differentiate_finite sympy.calculus.finite_diff.finite_diff_weights """ from ..calculus.finite_diff import _as_finite_diff return _as_finite_diff(self, points, x0, wrt) class Lambda(Expr): """ Lambda(x, expr) represents a lambda function similar to Python's 'lambda x: expr'. A function of several variables is written as Lambda((x, y, ...), expr). A simple example: >>> from sympy import Lambda >>> from sympy.abc import x >>> f = Lambda(x, x2) >>> f(4) 16 For multivariate functions, use: >>> from sympy.abc import y, z, t >>> f2 = Lambda((x, y, z, t), x + yz + t*z) >>> f2(1, 2, 3, 4) 73 A handy shortcut for lots of arguments: >>> p = x, y, z >>> f = Lambda(p, x + yz) >>> f(p) x + yz """ is_Function = True def __new__(cls, variables, expr): from sympy.sets.sets import FiniteSet v = list(variables) if iterable(variables) else [variables] for i in v: if not getattr(i, 'is_symbol', False): raise TypeError('variable is not a symbol: %s' % i) if len(v) != len(set(v)): x = [i for i in v if v.count(i) > 1][0] raise SyntaxError("duplicate argument '%s' in Lambda args" % x) if len(v) == 1 and v[0] == expr: return S.IdentityFunction obj = Expr.__new__(cls, Tuple(v), sympify(expr)) obj.nargs = FiniteSet(len(v)) return obj @property def variables(self): """The variables used in the internal representation of the function""" return self._args[0] bound_symbols = variables @property def expr(self): """The return value of the function""" return self._args[1] @property def free_symbols(self): return self.expr.free_symbols - set(self.variables) def __call__(self, args): n = len(args) if n not in self.nargs: # Lambda only ever has 1 value in nargs # XXX: exception message must be in exactly this format to # make it work with NumPy's functions like vectorize(). See, # for example, https://github.com/numpy/numpy/issues/1697. # The ideal solution would be just to attach metadata to # the exception and change NumPy to take advantage of this. ## XXX does this apply to Lambda? If not, remove this comment. temp = ('%(name)s takes exactly %(args)s ' 'argument%(plural)s (%(given)s given)') raise TypeError(temp % { 'name': self, 'args': list(self.nargs)[0], 'plural': 's'(list(self.nargs)[0] != 1), 'given': n}) return self.expr.xreplace(dict(list(zip(self.variables, args)))) def __eq__(self, other): if not isinstance(other, Lambda): return False if self.nargs != other.nargs: return False selfexpr = self.args[1] otherexpr = other.args[1] otherexpr = otherexpr.xreplace(dict(list(zip(other.args[0], self.args[0])))) return selfexpr == otherexpr def __ne__(self, other): return not(self == other) def __hash__(self): return super(Lambda, self).__hash__() def _hashable_content(self): return (self.expr.xreplace(self.canonical_variables),) @property def is_identity(self): """Return ``True`` if this ``Lambda`` is an identity function. """ if len(self.args) == 2: return self.args[0] == self.args[1] else: return None class Subs(Expr): """ Represents unevaluated substitutions of an expression. ``Subs(expr, x, x0)`` receives 3 arguments: an expression, a variable or list of distinct variables and a point or list of evaluation points corresponding to those variables. ``Subs`` objects are generally useful to represent unevaluated derivatives calculated at a point. The variables may be expressions, but they are subjected to the limitations of subs(), so it is usually a good practice to use only symbols for variables, since in that case there can be no ambiguity. There's no automatic expansion - use the method .doit() to effect all possible substitutions of the object and also of objects inside the expression. When evaluating derivatives at a point that is not a symbol, a Subs object is returned. One is also able to calculate derivatives of Subs objects - in this case the expression is always expanded (for the unevaluated form, use Derivative()). Examples ======== >>> from sympy import Subs, Function, sin, cos >>> from sympy.abc import x, y, z >>> f = Function('f') Subs are created when a particular substitution cannot be made. The x in the derivative cannot be replaced with 0 because 0 is not a valid variables of differentiation: >>> f(x).diff(x).subs(x, 0) Subs(Derivative(f(x), x), x, 0) Once f is known, the derivative and evaluation at 0 can be done: >>> _.subs(f, sin).doit() == sin(x).diff(x).subs(x, 0) == cos(0) True Subs can also be created directly with one or more variables: >>> Subs(f(x)sin(y) + z, (x, y), (0, 1)) Subs(z + f(x)sin(y), (x, y), (0, 1)) >>> _.doit() z + f(0)sin(1) Notes ===== In order to allow expressions to combine before doit is done, a representation of the Subs expression is used internally to make expressions that are superficially different compare the same: >>> a, b = Subs(x, x, 0), Subs(y, y, 0) >>> a + b 2Subs(x, x, 0) This can lead to unexpected consequences when using methods like `has` that are cached: >>> s = Subs(x, x, 0) >>> s.has(x), s.has(y) (True, False) >>> ss = s.subs(x, y) >>> ss.has(x), ss.has(y) (True, False) >>> s, ss (Subs(x, x, 0), Subs(y, y, 0)) """ def __new__(cls, expr, variables, point, assumptions): from sympy import Symbol if not is_sequence(variables, Tuple): variables = [variables] variables = Tuple(variables) if has_dups(variables): repeated = [str(v) for v, i in Counter(variables).items() if i > 1] __ = ', '.join(repeated) raise ValueError(filldedent(''' The following expressions appear more than once: %s ''' % __)) point = Tuple((point if is_sequence(point, Tuple) else [point])) if len(point) != len(variables): raise ValueError('Number of point values must be the same as ' 'the number of variables.') if not point: return sympify(expr) # denest if isinstance(expr, Subs): variables = expr.variables + variables point = expr.point + point expr = expr.expr else: expr = sympify(expr) # use symbols with names equal to the point value (with prepended _) # to give a variable-independent expression pre = "_" pts = sorted(set(point), key=default_sort_key) from sympy.printing import StrPrinter class CustomStrPrinter(StrPrinter): def _print_Dummy(self, expr): return str(expr) + str(expr.dummy_index) def mystr(expr, settings): p = CustomStrPrinter(settings) return p.doprint(expr) while 1: s_pts = {p: Symbol(pre + mystr(p)) for p in pts} reps = [(v, s_pts[p]) for v, p in zip(variables, point)] # if any underscore-prepended symbol is already a free symbol # and is a variable with a different point value, then there # is a clash, e.g. _0 clashes in Subs(_0 + _1, (_0, _1), (1, 0)) # because the new symbol that would be created is _1 but _1 # is already mapped to 0 so __0 and __1 are used for the new # symbols if any(r in expr.free_symbols and r in variables and Symbol(pre + mystr(point[variables.index(r)])) != r for _, r in reps): pre += "_" continue break obj = Expr.__new__(cls, expr, Tuple(variables), point) obj._expr = expr.xreplace(dict(reps)) return obj def _eval_is_commutative(self): return self.expr.is_commutative def doit(self, *hints): e, v, p = self.args # remove self mappings for i, (vi, pi) in enumerate(zip(v, p)): if vi == pi: v = v[:i] + v[i + 1:] p = p[:i] + p[i + 1:] if not v: return self.expr if isinstance(e, Derivative): # apply functions first, e.g. f -> cos undone = [] for i, vi in enumerate(v): if isinstance(vi, FunctionClass): e = e.subs(vi, p[i]) else: undone.append((vi, p[i])) if not isinstance(e, Derivative): e = e.doit() if isinstance(e, Derivative): # do Subs that aren't related to differentiation undone2 = [] D = Dummy() for vi, pi in undone: if D not in e.xreplace({vi: D}).free_symbols: e = e.subs(vi, pi) else: undone2.append((vi, pi)) undone = undone2 # differentiate wrt variables that are present wrt = [] D = Dummy() expr = e.expr free = expr.free_symbols for vi, ci in e.variable_count: if isinstance(vi, Symbol) and vi in free: expr = expr.diff((vi, ci)) elif D in expr.subs(vi, D).free_symbols: expr = expr.diff((vi, ci)) else: wrt.append((vi, ci)) # inject remaining subs rv = expr.subs(undone) # do remaining differentiation in order given* for vc in wrt: rv = rv.diff(vc) else: # inject remaining subs rv = e.subs(undone) else: rv = e.doit(hints).subs(list(zip(v, p))) if hints.get('deep', True) and rv != self: rv = rv.doit(hints) return rv def evalf(self, prec=None, options): return self.doit().evalf(prec, options) n = evalf @property def variables(self): """The variables to be evaluated""" return self._args[1] bound_symbols = variables @property def expr(self): """The expression on which the substitution operates""" return self._args[0] @property def point(self): """The values for which the variables are to be substituted""" return self._args[2] @property def free_symbols(self): return (self.expr.free_symbols - set(self.variables) \| set(self.point.free_symbols)) @property def expr_free_symbols(self): return (self.expr.expr_free_symbols - set(self.variables) \| set(self.point.expr_free_symbols)) def __eq__(self, other): if not isinstance(other, Subs): return False return self._hashable_content() == other._hashable_content() def __ne__(self, other): return not(self == other) def __hash__(self): return super(Subs, self).__hash__() def _hashable_content(self): return (self._expr.xreplace(self.canonical_variables), ) + tuple(ordered([(v, p) for v, p in zip(self.variables, self.point) if not self.expr.has(v)])) def _eval_subs(self, old, new): # Subs doit will do the variables in order; the semantics # of subs for Subs is have the following invariant for # Subs object foo: # foo.doit().subs(reps) == foo.subs(reps).doit() pt = list(self.point) if old in self.variables: if _atomic(new) == set([new]) and not any( i.has(new) for i in self.args): # the substitution is neutral return self.xreplace({old: new}) # any occurrence of old before this point will get # handled by replacements from here on i = self.variables.index(old) for j in range(i, len(self.variables)): pt[j] = pt[j]._subs(old, new) return self.func(self.expr, self.variables, pt) v = [i._subs(old, new) for i in self.variables] if v != list(self.variables): return self.func(self.expr, self.variables + (old,), pt + [new]) expr = self.expr._subs(old, new) pt = [i._subs(old, new) for i in self.point] return self.func(expr, v, pt) def _eval_derivative(self, s): # Apply the chain rule of the derivative on the substitution variables: val = Add.fromiter(p.diff(s) * Subs(self.expr.diff(v), self.variables, self.point).doit() for v, p in zip(self.variables, self.point)) # Check if there are free symbols in `self.expr`: # First get the `expr_free_symbols`, which returns the free symbols # that are directly contained in an expression node (i.e. stop # searching if the node isn't an expression). At this point turn the # expressions into `free_symbols` and check if there are common free # symbols in `self.expr` and the deriving factor. fs1 = {j for i in self.expr_free_symbols for j in i.free_symbols} if len(fs1 & s.free_symbols) > 0: val += Subs(self.expr.diff(s), self.variables, self.point).doit() return val def _eval_nseries(self, x, n, logx): if x in self.point: # x is the variable being substituted into apos = self.point.index(x) other = self.variables[apos] else: other = x arg = self.expr.nseries(other, n=n, logx=logx) o = arg.getO() terms = Add.make_args(arg.removeO()) rv = Add([self.func(a, self.args[1:]) for a in terms]) if o: rv += o.subs(other, x) return rv def _eval_as_leading_term(self, x): if x in self.point: ipos = self.point.index(x) xvar = self.variables[ipos] return self.expr.as_leading_term(xvar) if x in self.variables: # if `x` is a dummy variable, it means it won't exist after the # substitution has been performed: return self # The variable is independent of the substitution: return self.expr.as_leading_term(x) def diff(f, symbols, kwargs): """ Differentiate f with respect to symbols. This is just a wrapper to unify .diff() and the Derivative class; its interface is similar to that of integrate(). You can use the same shortcuts for multiple variables as with Derivative. For example, diff(f(x), x, x, x) and diff(f(x), x, 3) both return the third derivative of f(x). You can pass evaluate=False to get an unevaluated Derivative class. Note that if there are 0 symbols (such as diff(f(x), x, 0), then the result will be the function (the zeroth derivative), even if evaluate=False. Examples ======== >>> from sympy import sin, cos, Function, diff >>> from sympy.abc import x, y >>> f = Function('f') >>> diff(sin(x), x) cos(x) >>> diff(f(x), x, x, x) Derivative(f(x), (x, 3)) >>> diff(f(x), x, 3) Derivative(f(x), (x, 3)) >>> diff(sin(x)cos(y), x, 2, y, 2) sin(x)cos(y) >>> type(diff(sin(x), x)) cos >>> type(diff(sin(x), x, evaluate=False)) <class 'sympy.core.function.Derivative'> >>> type(diff(sin(x), x, 0)) sin >>> type(diff(sin(x), x, 0, evaluate=False)) sin >>> diff(sin(x)) cos(x) >>> diff(sin(xy)) Traceback (most recent call last): ... ValueError: specify differentiation variables to differentiate sin(xy) Note that ``diff(sin(x))`` syntax is meant only for convenience in interactive sessions and should be avoided in library code. References ========== http://reference.wolfram.com/legacy/v5_2/Built-inFunctions/AlgebraicComputation/Calculus/D.html See Also ======== Derivative sympy.geometry.util.idiff: computes the derivative implicitly """ if hasattr(f, 'diff'): return f.diff(symbols, *kwargs) kwargs.setdefault('evaluate', True) return Derivative(f, symbols, kwargs) def expand(e, deep=True, modulus=None, power_base=True, power_exp=True, mul=True, log=True, multinomial=True, basic=True, hints): r""" Expand an expression using methods given as hints. Hints evaluated unless explicitly set to False are: ``basic``, ``log``, ``multinomial``, ``mul``, ``power_base``, and ``power_exp`` The following hints are supported but not applied unless set to True: ``complex``, ``func``, and ``trig``. In addition, the following meta-hints are supported by some or all of the other hints: ``frac``, ``numer``, ``denom``, ``modulus``, and ``force``. ``deep`` is supported by all hints. Additionally, subclasses of Expr may define their own hints or meta-hints. The ``basic`` hint is used for any special rewriting of an object that should be done automatically (along with the other hints like ``mul``) when expand is called. This is a catch-all hint to handle any sort of expansion that may not be described by the existing hint names. To use this hint an object should override the ``_eval_expand_basic`` method. Objects may also define their own expand methods, which are not run by default. See the API section below. If ``deep`` is set to ``True`` (the default), things like arguments of functions are recursively expanded. Use ``deep=False`` to only expand on the top level. If the ``force`` hint is used, assumptions about variables will be ignored in making the expansion. Hints ===== These hints are run by default mul --- Distributes multiplication over addition: >>> from sympy import cos, exp, sin >>> from sympy.abc import x, y, z >>> (y(x + z)).expand(mul=True) xy + yz multinomial ----------- Expand (x + y + ...)n where n is a positive integer. >>> ((x + y + z)2).expand(multinomial=True) x2 + 2xy + 2xz + y2 + 2yz + z2 power_exp --------- Expand addition in exponents into multiplied bases. >>> exp(x + y).expand(power_exp=True) exp(x)exp(y) >>> (2(x + y)).expand(power_exp=True) 2x2y power_base ---------- Split powers of multiplied bases. This only happens by default if assumptions allow, or if the ``force`` meta-hint is used: >>> ((xy)*z).expand(power_base=True) (xy)*z >>> ((xy)z).expand(power_base=True, force=True) xzyz >>> ((2y)z).expand(power_base=True) 2zyz Note that in some cases where this expansion always holds, SymPy performs it automatically: >>> (xy)2 x2y2 log --- Pull out power of an argument as a coefficient and split logs products into sums of logs. Note that these only work if the arguments of the log function have the proper assumptions--the arguments must be positive and the exponents must be real--or else the ``force`` hint must be True: >>> from sympy import log, symbols >>> log(x2y).expand(log=True) log(x*2y) >>> log(x*2y).expand(log=True, force=True) 2log(x) + log(y) >>> x, y = symbols('x,y', positive=True) >>> log(x2y).expand(log=True) 2log(x) + log(y) basic ----- This hint is intended primarily as a way for custom subclasses to enable expansion by default. These hints are not run by default: complex ------- Split an expression into real and imaginary parts. >>> x, y = symbols('x,y') >>> (x + y).expand(complex=True) re(x) + re(y) + Iim(x) + Iim(y) >>> cos(x).expand(complex=True) -Isin(re(x))sinh(im(x)) + cos(re(x))cosh(im(x)) Note that this is just a wrapper around ``as_real_imag()``. Most objects that wish to redefine ``_eval_expand_complex()`` should consider redefining ``as_real_imag()`` instead. func ---- Expand other functions. >>> from sympy import gamma >>> gamma(x + 1).expand(func=True) xgamma(x) trig ---- Do trigonometric expansions. >>> cos(x + y).expand(trig=True) -sin(x)sin(y) + cos(x)cos(y) >>> sin(2x).expand(trig=True) 2sin(x)cos(x) Note that the forms of ``sin(nx)`` and ``cos(nx)`` in terms of ``sin(x)`` and ``cos(x)`` are not unique, due to the identity `\sin^2(x) + \cos^2(x) = 1`. The current implementation uses the form obtained from Chebyshev polynomials, but this may change. See `this MathWorld article <http://mathworld.wolfram.com/Multiple-AngleFormulas.html>`_ for more information. Notes ===== - You can shut off unwanted methods:: >>> (exp(x + y)(x + y)).expand() xexp(x)exp(y) + yexp(x)exp(y) >>> (exp(x + y)(x + y)).expand(power_exp=False) xexp(x + y) + yexp(x + y) >>> (exp(x + y)(x + y)).expand(mul=False) (x + y)exp(x)exp(y) - Use deep=False to only expand on the top level:: >>> exp(x + exp(x + y)).expand() exp(x)exp(exp(x)exp(y)) >>> exp(x + exp(x + y)).expand(deep=False) exp(x)exp(exp(x + y)) - Hints are applied in an arbitrary, but consistent order (in the current implementation, they are applied in alphabetical order, except multinomial comes before mul, but this may change). Because of this, some hints may prevent expansion by other hints if they are applied first. For example, ``mul`` may distribute multiplications and prevent ``log`` and ``power_base`` from expanding them. Also, if ``mul`` is applied before ``multinomial`, the expression might not be fully distributed. The solution is to use the various ``expand_hint`` helper functions or to use ``hint=False`` to this function to finely control which hints are applied. Here are some examples:: >>> from sympy import expand, expand_mul, expand_power_base >>> x, y, z = symbols('x,y,z', positive=True) >>> expand(log(x(y + z))) log(x) + log(y + z) Here, we see that ``log`` was applied before ``mul``. To get the mul expanded form, either of the following will work:: >>> expand_mul(log(x(y + z))) log(xy + xz) >>> expand(log(x(y + z)), log=False) log(xy + xz) A similar thing can happen with the ``power_base`` hint:: >>> expand((x(y + z))*x) (xy + xz)x To get the ``power_base`` expanded form, either of the following will work:: >>> expand((x(y + z))x, mul=False) xx(y + z)x >>> expand_power_base((x(y + z))x) xx(y + z)x >>> expand((x + y)y/x) y + y*2/x The parts of a rational expression can be targeted:: >>> expand((x + y)y/x/(x + 1), frac=True) (xy + y2)/(x2 + x) >>> expand((x + y)y/x/(x + 1), numer=True) (xy + y2)/(x(x + 1)) >>> expand((x + y)y/x/(x + 1), denom=True) y(x + y)/(x*2 + x) - The ``modulus`` meta-hint can be used to reduce the coefficients of an expression post-expansion:: >>> expand((3x + 1)*2) 9x*2 + 6x + 1 >>> expand((3x + 1)2, modulus=5) 4x2 + x + 1 - Either ``expand()`` the function or ``.expand()`` the method can be used. Both are equivalent:: >>> expand((x + 1)2) x*2 + 2x + 1 >>> ((x + 1)2).expand() x2 + 2x + 1 API === Objects can define their own expand hints by defining ``_eval_expand_hint()``. The function should take the form:: def _eval_expand_hint(self, hints): # Only apply the method to the top-level expression ... See also the example below. Objects should define ``_eval_expand_hint()`` methods only if ``hint`` applies to that specific object. The generic ``_eval_expand_hint()`` method defined in Expr will handle the no-op case. Each hint should be responsible for expanding that hint only. Furthermore, the expansion should be applied to the top-level expression only. ``expand()`` takes care of the recursion that happens when ``deep=True``. You should only call ``_eval_expand_hint()`` methods directly if you are 100% sure that the object has the method, as otherwise you are liable to get unexpected ``AttributeError``s. Note, again, that you do not need to recursively apply the hint to args of your object: this is handled automatically by ``expand()``. ``_eval_expand_hint()`` should generally not be used at all outside of an ``_eval_expand_hint()`` method. If you want to apply a specific expansion from within another method, use the public ``expand()`` function, method, or ``expand_hint()`` functions. In order for expand to work, objects must be rebuildable by their args, i.e., ``obj.func(obj.args) == obj`` must hold. Expand methods are passed ``*hints`` so that expand hints may use 'metahints'--hints that control how different expand methods are applied. For example, the ``force=True`` hint described above that causes ``expand(log=True)`` to ignore assumptions is such a metahint. The ``deep`` meta-hint is handled exclusively by ``expand()`` and is not passed to ``_eval_expand_hint()`` methods. Note that expansion hints should generally be methods that perform some kind of 'expansion'. For hints that simply rewrite an expression, use the .rewrite() API. Examples ======== >>> from sympy import Expr, sympify >>> class MyClass(Expr): ... def __new__(cls, args): ... args = sympify(args) ... return Expr.__new__(cls, args) ... ... def _eval_expand_double(self, hints): ... ''' ... Doubles the args of MyClass. ... ... If there more than four args, doubling is not performed, ... unless force=True is also used (False by default). ... ''' ... force = hints.pop('force', False) ... if not force and len(self.args) > 4: ... return self ... return self.func((self.args + self.args)) ... >>> a = MyClass(1, 2, MyClass(3, 4)) >>> a MyClass(1, 2, MyClass(3, 4)) >>> a.expand(double=True) MyClass(1, 2, MyClass(3, 4, 3, 4), 1, 2, MyClass(3, 4, 3, 4)) >>> a.expand(double=True, deep=False) MyClass(1, 2, MyClass(3, 4), 1, 2, MyClass(3, 4)) >>> b = MyClass(1, 2, 3, 4, 5) >>> b.expand(double=True) MyClass(1, 2, 3, 4, 5) >>> b.expand(double=True, force=True) MyClass(1, 2, 3, 4, 5, 1, 2, 3, 4, 5) See Also ======== expand_log, expand_mul, expand_multinomial, expand_complex, expand_trig, expand_power_base, expand_power_exp, expand_func, hyperexpand """ # don't modify this; modify the Expr.expand method hints['power_base'] = power_base hints['power_exp'] = power_exp hints['mul'] = mul hints['log'] = log hints['multinomial'] = multinomial hints['basic'] = basic return sympify(e).expand(deep=deep, modulus=modulus, *hints) # This is a special application of two hints def _mexpand(expr, recursive=False): # expand multinomials and then expand products; this may not always # be sufficient to give a fully expanded expression (see # test_issue_8247_8354 in test_arit) if expr is None: return was = None while was != expr: was, expr = expr, expand_mul(expand_multinomial(expr)) if not recursive: break return expr # These are simple wrappers around single hints. def expand_mul(expr, deep=True): """ Wrapper around expand that only uses the mul hint. See the expand docstring for more information. Examples ======== >>> from sympy import symbols, expand_mul, exp, log >>> x, y = symbols('x,y', positive=True) >>> expand_mul(exp(x+y)(x+y)log(xy*2)) xexp(x + y)log(xy*2) + yexp(x + y)log(xy2) """ return sympify(expr).expand(deep=deep, mul=True, power_exp=False, power_base=False, basic=False, multinomial=False, log=False) def expand_multinomial(expr, deep=True): """ Wrapper around expand that only uses the multinomial hint. See the expand docstring for more information. Examples ======== >>> from sympy import symbols, expand_multinomial, exp >>> x, y = symbols('x y', positive=True) >>> expand_multinomial((x + exp(x + 1))2) x*2 + 2xexp(x + 1) + exp(2x + 2) """ return sympify(expr).expand(deep=deep, mul=False, power_exp=False, power_base=False, basic=False, multinomial=True, log=False) def expand_log(expr, deep=True, force=False): """ Wrapper around expand that only uses the log hint. See the expand docstring for more information. Examples ======== >>> from sympy import symbols, expand_log, exp, log >>> x, y = symbols('x,y', positive=True) >>> expand_log(exp(x+y)(x+y)log(xy2)) (x + y)(log(x) + 2log(y))exp(x + y) """ return sympify(expr).expand(deep=deep, log=True, mul=False, power_exp=False, power_base=False, multinomial=False, basic=False, force=force) def expand_func(expr, deep=True): """ Wrapper around expand that only uses the func hint. See the expand docstring for more information. Examples ======== >>> from sympy import expand_func, gamma >>> from sympy.abc import x >>> expand_func(gamma(x + 2)) x(x + 1)gamma(x) """ return sympify(expr).expand(deep=deep, func=True, basic=False, log=False, mul=False, power_exp=False, power_base=False, multinomial=False) def expand_trig(expr, deep=True): """ Wrapper around expand that only uses the trig hint. See the expand docstring for more information. Examples ======== >>> from sympy import expand_trig, sin >>> from sympy.abc import x, y >>> expand_trig(sin(x+y)(x+y)) (x + y)(sin(x)cos(y) + sin(y)cos(x)) """ return sympify(expr).expand(deep=deep, trig=True, basic=False, log=False, mul=False, power_exp=False, power_base=False, multinomial=False) def expand_complex(expr, deep=True): """ Wrapper around expand that only uses the complex hint. See the expand docstring for more information. Examples ======== >>> from sympy import expand_complex, exp, sqrt, I >>> from sympy.abc import z >>> expand_complex(exp(z)) Iexp(re(z))sin(im(z)) + exp(re(z))cos(im(z)) >>> expand_complex(sqrt(I)) sqrt(2)/2 + sqrt(2)I/2 See Also ======== Expr.as_real_imag """ return sympify(expr).expand(deep=deep, complex=True, basic=False, log=False, mul=False, power_exp=False, power_base=False, multinomial=False) def expand_power_base(expr, deep=True, force=False): """ Wrapper around expand that only uses the power_base hint. See the expand docstring for more information. A wrapper to expand(power_base=True) which separates a power with a base that is a Mul into a product of powers, without performing any other expansions, provided that assumptions about the power's base and exponent allow. deep=False (default is True) will only apply to the top-level expression. force=True (default is False) will cause the expansion to ignore assumptions about the base and exponent. When False, the expansion will only happen if the base is non-negative or the exponent is an integer. >>> from sympy.abc import x, y, z >>> from sympy import expand_power_base, sin, cos, exp >>> (xy)2 x2y*2 >>> (2x)*y (2x)y >>> expand_power_base(_) 2yxy >>> expand_power_base((xy)*z) (xy)*z >>> expand_power_base((xy)z, force=True) xzyz >>> expand_power_base(sin((xy)*z), deep=False) sin((xy)*z) >>> expand_power_base(sin((xy)z), force=True) sin(xzyz) >>> expand_power_base((2sin(x))*y + (2cos(x))y) 2ysin(x)y + 2ycos(x)*y >>> expand_power_base((2exp(y))x) 2xexp(y)x >>> expand_power_base((2cos(x))y) 2ycos(x)y Notice that sums are left untouched. If this is not the desired behavior, apply full ``expand()`` to the expression: >>> expand_power_base(((x+y)z)2) z2(x + y)2 >>> (((x+y)z)2).expand() x2z2 + 2xyz2 + y2z2 >>> expand_power_base((2y)(1+z)) 2(z + 1)y(z + 1) >>> ((2y)*(1+z)).expand() 22*zyyz """ return sympify(expr).expand(deep=deep, log=False, mul=False, power_exp=False, power_base=True, multinomial=False, basic=False, force=force) def expand_power_exp(expr, deep=True): """ Wrapper around expand that only uses the power_exp hint. See the expand docstring for more information. Examples ======== >>> from sympy import expand_power_exp >>> from sympy.abc import x, y >>> expand_power_exp(x(y + 2)) x2xy """ return sympify(expr).expand(deep=deep, complex=False, basic=False, log=False, mul=False, power_exp=True, power_base=False, multinomial=False) def count_ops(expr, visual=False): """ Return a representation (integer or expression) of the operations in expr. If ``visual`` is ``False`` (default) then the sum of the coefficients of the visual expression will be returned. If ``visual`` is ``True`` then the number of each type of operation is shown with the core class types (or their virtual equivalent) multiplied by the number of times they occur. If expr is an iterable, the sum of the op counts of the items will be returned. Examples ======== >>> from sympy.abc import a, b, x, y >>> from sympy import sin, count_ops Although there isn't a SUB object, minus signs are interpreted as either negations or subtractions: >>> (x - y).count_ops(visual=True) SUB >>> (-x).count_ops(visual=True) NEG Here, there are two Adds and a Pow: >>> (1 + a + b2).count_ops(visual=True) 2ADD + POW In the following, an Add, Mul, Pow and two functions: >>> (sin(x)x + sin(x)*2).count_ops(visual=True) ADD + MUL + POW + 2SIN for a total of 5: >>> (sin(x)x + sin(x)2).count_ops(visual=False) 5 Note that "what you type" is not always what you get. The expression 1/x/y is translated by sympy into 1/(xy) so it gives a DIV and MUL rather than two DIVs: >>> (1/x/y).count_ops(visual=True) DIV + MUL The visual option can be used to demonstrate the difference in operations for expressions in different forms. Here, the Horner representation is compared with the expanded form of a polynomial: >>> eq=x(1 + x(2 + x(3 + x))) >>> count_ops(eq.expand(), visual=True) - count_ops(eq, visual=True) -MUL + 3POW The count_ops function also handles iterables: >>> count_ops([x, sin(x), None, True, x + 2], visual=False) 2 >>> count_ops([x, sin(x), None, True, x + 2], visual=True) ADD + SIN >>> count_ops({x: sin(x), x + 2: y + 1}, visual=True) 2ADD + SIN """ from sympy import Integral, Symbol from sympy.core.relational import Relational from sympy.simplify.radsimp import fraction from sympy.logic.boolalg import BooleanFunction from sympy.utilities.misc import func_name expr = sympify(expr) if isinstance(expr, Expr) and not expr.is_Relational: ops = [] args = [expr] NEG = Symbol('NEG') DIV = Symbol('DIV') SUB = Symbol('SUB') ADD = Symbol('ADD') while args: a = args.pop() if a.is_Rational: #-1/3 = NEG + DIV if a is not S.One: if a.p < 0: ops.append(NEG) if a.q != 1: ops.append(DIV) continue elif a.is_Mul or a.is_MatMul: if _coeff_isneg(a): ops.append(NEG) if a.args[0] is S.NegativeOne: a = a.as_two_terms()[1] else: a = -a n, d = fraction(a) if n.is_Integer: ops.append(DIV) if n < 0: ops.append(NEG) args.append(d) continue # won't be -Mul but could be Add elif d is not S.One: if not d.is_Integer: args.append(d) ops.append(DIV) args.append(n) continue # could be -Mul elif a.is_Add or a.is_MatAdd: aargs = list(a.args) negs = 0 for i, ai in enumerate(aargs): if _coeff_isneg(ai): negs += 1 args.append(-ai) if i > 0: ops.append(SUB) else: args.append(ai) if i > 0: ops.append(ADD) if negs == len(aargs): # -x - y = NEG + SUB ops.append(NEG) elif _coeff_isneg(aargs[0]): # -x + y = SUB, but already recorded ADD ops.append(SUB - ADD) continue if a.is_Pow and a.exp is S.NegativeOne: ops.append(DIV) args.append(a.base) # won't be -Mul but could be Add continue if (a.is_Mul or a.is_Pow or a.is_Function or isinstance(a, Derivative) or isinstance(a, Integral)): o = Symbol(a.func.__name__.upper()) # count the args if (a.is_Mul or isinstance(a, LatticeOp)): ops.append(o(len(a.args) - 1)) else: ops.append(o) if not a.is_Symbol: args.extend(a.args) elif isinstance(expr, Dict): ops = [count_ops(k, visual=visual) + count_ops(v, visual=visual) for k, v in expr.items()] elif iterable(expr): ops = [count_ops(i, visual=visual) for i in expr] elif isinstance(expr, (Relational, BooleanFunction)): ops = [] for arg in expr.args: ops.append(count_ops(arg, visual=True)) o = Symbol(func_name(expr, short=True).upper()) ops.append(o) elif not isinstance(expr, Basic): ops = [] else: # it's Basic not isinstance(expr, Expr): if not isinstance(expr, Basic): raise TypeError("Invalid type of expr") else: ops = [] args = [expr] while args: a = args.pop() if a.args: o = Symbol(a.func.__name__.upper()) if a.is_Boolean: ops.append(o(len(a.args)-1)) else: ops.append(o) args.extend(a.args) if not ops: if visual: return S.Zero return 0 ops = Add(ops) if visual: return ops if ops.is_Number: return int(ops) return sum(int((a.args or [1])[0]) for a in Add.make_args(ops)) def nfloat(expr, n=15, exponent=False, dkeys=False): """Make all Rationals in expr Floats except those in exponents (unless the exponents flag is set to True). When processing dictionaries, don't modify the keys unless ``dkeys=True``. Examples ======== >>> from sympy.core.function import nfloat >>> from sympy.abc import x, y >>> from sympy import cos, pi, sqrt >>> nfloat(x4 + x/2 + cos(pi/3) + 1 + sqrt(y)) x4 + 0.5x + sqrt(y) + 1.5 >>> nfloat(x4 + sqrt(y), exponent=True) x4.0 + y0.5 Container types are not modified: >>> type(nfloat((1, 2))) is tuple True """ from sympy.core.power import Pow from sympy.polys.rootoftools import RootOf kw = dict(n=n, exponent=exponent, dkeys=dkeys) # handling of iterable containers if iterable(expr, exclude=string_types): if isinstance(expr, (dict, Dict)): if dkeys: args = [tuple(map(lambda i: nfloat(i, kw), a)) for a in expr.items()] else: args = [(k, nfloat(v, kw)) for k, v in expr.items()] if isinstance(expr, dict): return type(expr)(args) else: return expr.func(args) elif isinstance(expr, Basic): return expr.func([nfloat(a, kw) for a in expr.args]) return type(expr)([nfloat(a, kw) for a in expr]) rv = sympify(expr) if rv.is_Number: return Float(rv, n) elif rv.is_number: # evalf doesn't always set the precision rv = rv.n(n) if rv.is_Number: rv = Float(rv.n(n), n) else: pass # pure_complex(rv) is likely True return rv elif rv.is_Atom: return rv # watch out for RootOf instances that don't like to have # their exponents replaced with Dummies and also sometimes have # problems with evaluating at low precision (issue 6393) rv = rv.xreplace({ro: ro.n(n) for ro in rv.atoms(RootOf)}) if not exponent: reps = [(p, Pow(p.base, Dummy())) for p in rv.atoms(Pow)] rv = rv.xreplace(dict(reps)) rv = rv.n(n) if not exponent: rv = rv.xreplace({d.exp: p.exp for p, d in reps}) else: # Pow._eval_evalf special cases Integer exponents so if # exponent is suppose to be handled we have to do so here rv = rv.xreplace(Transform( lambda x: Pow(x.base, Float(x.exp, n)), lambda x: x.is_Pow and x.exp.is_Integer)) return rv.xreplace(Transform( lambda x: x.func(nfloat(x.args, n, exponent)), lambda x: isinstance(x, Function))) from sympy.core.symbol import Dummy, Symbol
b567dfb39f6ec0eb51d3b7b7f784f7abf73d72f96763baaf6c06f4bcb3a38e4c	from __future__ import print_function, division from collections import defaultdict from functools import cmp_to_key from .basic import Basic from .compatibility import reduce, is_sequence, range from .evaluate import global_distribute from .logic import _fuzzy_group, fuzzy_or, fuzzy_not from .singleton import S from .operations import AssocOp from .cache import cacheit from .numbers import ilcm, igcd from .expr import Expr # Key for sorting commutative args in canonical order _args_sortkey = cmp_to_key(Basic.compare) def _addsort(args): # in-place sorting of args args.sort(key=_args_sortkey) def _unevaluated_Add(args): """Return a well-formed unevaluated Add: Numbers are collected and put in slot 0 and args are sorted. Use this when args have changed but you still want to return an unevaluated Add. Examples ======== >>> from sympy.core.add import _unevaluated_Add as uAdd >>> from sympy import S, Add >>> from sympy.abc import x, y >>> a = uAdd([S(1.0), x, S(2)]) >>> a.args[0] 3.00000000000000 >>> a.args[1] x Beyond the Number being in slot 0, there is no other assurance of order for the arguments since they are hash sorted. So, for testing purposes, output produced by this in some other function can only be tested against the output of this function or as one of several options: >>> opts = (Add(x, y, evaluated=False), Add(y, x, evaluated=False)) >>> a = uAdd(x, y) >>> assert a in opts and a == uAdd(x, y) >>> uAdd(x + 1, x + 2) x + x + 3 """ args = list(args) newargs = [] co = S.Zero while args: a = args.pop() if a.is_Add: # this will keep nesting from building up # so that x + (x + 1) -> x + x + 1 (3 args) args.extend(a.args) elif a.is_Number: co += a else: newargs.append(a) _addsort(newargs) if co: newargs.insert(0, co) return Add._from_args(newargs) class Add(Expr, AssocOp): __slots__ = [] is_Add = True @classmethod def flatten(cls, seq): """ Takes the sequence "seq" of nested Adds and returns a flatten list. Returns: (commutative_part, noncommutative_part, order_symbols) Applies associativity, all terms are commutable with respect to addition. NB: the removal of 0 is already handled by AssocOp.__new__ See also ======== sympy.core.mul.Mul.flatten """ from sympy.calculus.util import AccumBounds from sympy.matrices.expressions import MatrixExpr from sympy.tensor.tensor import TensExpr rv = None if len(seq) == 2: a, b = seq if b.is_Rational: a, b = b, a if a.is_Rational: if b.is_Mul: rv = [a, b], [], None if rv: if all(s.is_commutative for s in rv[0]): return rv return [], rv[0], None terms = {} # term -> coeff # e.g. x*2 -> 5 for ... + 5x2 + ... coeff = S.Zero # coefficient (Number or zoo) to always be in slot 0 # e.g. 3 + ... order_factors = [] extra = [] for o in seq: # O(x) if o.is_Order: for o1 in order_factors: if o1.contains(o): o = None break if o is None: continue order_factors = [o] + [ o1 for o1 in order_factors if not o.contains(o1)] continue # 3 or NaN elif o.is_Number: if (o is S.NaN or coeff is S.ComplexInfinity and o.is_finite is False) and not extra: # we know for sure the result will be nan return [S.NaN], [], None if coeff.is_Number: coeff += o if coeff is S.NaN and not extra: # we know for sure the result will be nan return [S.NaN], [], None continue elif isinstance(o, AccumBounds): coeff = o.__add__(coeff) continue elif isinstance(o, MatrixExpr): # can't add 0 to Matrix so make sure coeff is not 0 extra.append(o) continue elif isinstance(o, TensExpr): coeff = o.__add__(coeff) if coeff else o continue elif o is S.ComplexInfinity: if coeff.is_finite is False and not extra: # we know for sure the result will be nan return [S.NaN], [], None coeff = S.ComplexInfinity continue # Add([...]) elif o.is_Add: # NB: here we assume Add is always commutative seq.extend(o.args) # TODO zerocopy? continue # Mul([...]) elif o.is_Mul: c, s = o.as_coeff_Mul() # check for unevaluated Pow, e.g. 23 or 2(-1/2) elif o.is_Pow: b, e = o.as_base_exp() if b.is_Number and (e.is_Integer or (e.is_Rational and e.is_negative)): seq.append(be) continue c, s = S.One, o else: # everything else c = S.One s = o # now we have: # o = cs, where # # c is a Number # s is an expression with number factor extracted # let's collect terms with the same s, so e.g. # 2x*2 + 3x*2 -> 5x*2 if s in terms: terms[s] += c if terms[s] is S.NaN and not extra: # we know for sure the result will be nan return [S.NaN], [], None else: terms[s] = c # now let's construct new args: # [2x2, x3, 7x4, pi, ...] newseq = [] noncommutative = False for s, c in terms.items(): # 0s if c is S.Zero: continue # 1s elif c is S.One: newseq.append(s) # cs else: if s.is_Mul: # Mul, already keeps its arguments in perfect order. # so we can simply put c in slot0 and go the fast way. cs = s._new_rawargs(((c,) + s.args)) newseq.append(cs) elif s.is_Add: # we just re-create the unevaluated Mul newseq.append(Mul(c, s, evaluate=False)) else: # alternatively we have to call all Mul's machinery (slow) newseq.append(Mul(c, s)) noncommutative = noncommutative or not s.is_commutative # oo, -oo if coeff is S.Infinity: newseq = [f for f in newseq if not (f.is_extended_nonnegative or f.is_real)] elif coeff is S.NegativeInfinity: newseq = [f for f in newseq if not (f.is_extended_nonpositive or f.is_real)] if coeff is S.ComplexInfinity: # zoo might be # infinite_real + finite_im # finite_real + infinite_im # infinite_real + infinite_im # addition of a finite real or imaginary number won't be able to # change the zoo nature; adding an infinite qualtity would result # in a NaN condition if it had sign opposite of the infinite # portion of zoo, e.g., infinite_real - infinite_real. newseq = [c for c in newseq if not (c.is_finite and c.is_extended_real is not None)] # process O(x) if order_factors: newseq2 = [] for t in newseq: for o in order_factors: # x + O(x) -> O(x) if o.contains(t): t = None break # x + O(x2) -> x + O(x2) if t is not None: newseq2.append(t) newseq = newseq2 + order_factors # 1 + O(1) -> O(1) for o in order_factors: if o.contains(coeff): coeff = S.Zero break # order args canonically _addsort(newseq) # current code expects coeff to be first if coeff is not S.Zero: newseq.insert(0, coeff) if extra: newseq += extra noncommutative = True # we are done if noncommutative: return [], newseq, None else: return newseq, [], None @classmethod def class_key(cls): """Nice order of classes""" return 3, 1, cls.__name__ def as_coefficients_dict(a): """Return a dictionary mapping terms to their Rational coefficient. Since the dictionary is a defaultdict, inquiries about terms which were not present will return a coefficient of 0. If an expression is not an Add it is considered to have a single term. Examples ======== >>> from sympy.abc import a, x >>> (3x + ax + 4).as_coefficients_dict() {1: 4, x: 3, ax: 1} >>> _[a] 0 >>> (3ax).as_coefficients_dict() {ax: 3} """ d = defaultdict(list) for ai in a.args: c, m = ai.as_coeff_Mul() d[m].append(c) for k, v in d.items(): if len(v) == 1: d[k] = v[0] else: d[k] = Add(v) di = defaultdict(int) di.update(d) return di @cacheit def as_coeff_add(self, deps): """ Returns a tuple (coeff, args) where self is treated as an Add and coeff is the Number term and args is a tuple of all other terms. Examples ======== >>> from sympy.abc import x >>> (7 + 3x).as_coeff_add() (7, (3x,)) >>> (7x).as_coeff_add() (0, (7x,)) """ if deps: l1 = [] l2 = [] for f in self.args: if f.has(deps): l2.append(f) else: l1.append(f) return self._new_rawargs(l1), tuple(l2) coeff, notrat = self.args[0].as_coeff_add() if coeff is not S.Zero: return coeff, notrat + self.args[1:] return S.Zero, self.args def as_coeff_Add(self, rational=False): """Efficiently extract the coefficient of a summation. """ coeff, args = self.args[0], self.args[1:] if coeff.is_Number and not rational or coeff.is_Rational: return coeff, self._new_rawargs(args) return S.Zero, self # Note, we intentionally do not implement Add.as_coeff_mul(). Rather, we # let Expr.as_coeff_mul() just always return (S.One, self) for an Add. See # issue 5524. def _eval_power(self, e): if e.is_Rational and self.is_number: from sympy.core.evalf import pure_complex from sympy.core.mul import _unevaluated_Mul from sympy.core.exprtools import factor_terms from sympy.core.function import expand_multinomial from sympy.functions.elementary.complexes import sign from sympy.functions.elementary.miscellaneous import sqrt ri = pure_complex(self) if ri: r, i = ri if e.q == 2: D = sqrt(r2 + i2) if D.is_Rational: # (r, i, D) is a Pythagorean triple root = sqrt(factor_terms((D - r)/2))*e.p return rootexpand_multinomial(( # principle value (D + r)/abs(i) + sign(i)S.ImaginaryUnit)e.p) elif e == -1: return _unevaluated_Mul( r - iS.ImaginaryUnit, 1/(r2 + i2)) elif e.is_Number and abs(e) != 1: # handle the Float case: (2.0 + 4x)e -> 2.e(1 + 2.0x)e c, m = zip([i.as_coeff_Mul() for i in self.args]) big = 0 float = False for i in c: float = float or i.is_Float if abs(i) > big: big = 1.0abs(i) s = -1 if i < 0 else 1 if float and big and big != 1: addpow = Add([(s if abs(c[i]) == big else c[i]/big)m[i] for i in range(len(c))])e return bigeaddpow @cacheit def _eval_derivative(self, s): return self.func([a.diff(s) for a in self.args]) def _eval_nseries(self, x, n, logx): terms = [t.nseries(x, n=n, logx=logx) for t in self.args] return self.func(terms) def _matches_simple(self, expr, repl_dict): # handle (w+3).matches('x+5') -> {w: x+2} coeff, terms = self.as_coeff_add() if len(terms) == 1: return terms[0].matches(expr - coeff, repl_dict) return def matches(self, expr, repl_dict={}, old=False): return AssocOp._matches_commutative(self, expr, repl_dict, old) @staticmethod def _combine_inverse(lhs, rhs): """ Returns lhs - rhs, but treats oo like a symbol so oo - oo returns 0, instead of a nan. """ from sympy.core.function import expand_mul from sympy.core.symbol import Dummy inf = (S.Infinity, S.NegativeInfinity) if lhs.has(inf) or rhs.has(inf): oo = Dummy('oo') reps = { S.Infinity: oo, S.NegativeInfinity: -oo} ireps = {v: k for k, v in reps.items()} eq = expand_mul(lhs.xreplace(reps) - rhs.xreplace(reps)) if eq.has(oo): eq = eq.replace( lambda x: x.is_Pow and x.base == oo, lambda x: x.base) return eq.xreplace(ireps) else: return expand_mul(lhs - rhs) @cacheit def as_two_terms(self): """Return head and tail of self. This is the most efficient way to get the head and tail of an expression. - if you want only the head, use self.args[0]; - if you want to process the arguments of the tail then use self.as_coef_add() which gives the head and a tuple containing the arguments of the tail when treated as an Add. - if you want the coefficient when self is treated as a Mul then use self.as_coeff_mul()[0] >>> from sympy.abc import x, y >>> (3x - 2y + 5).as_two_terms() (5, 3x - 2y) """ return self.args[0], self._new_rawargs(self.args[1:]) def as_numer_denom(self): # clear rational denominator content, expr = self.primitive() ncon, dcon = content.as_numer_denom() # collect numerators and denominators of the terms nd = defaultdict(list) for f in expr.args: ni, di = f.as_numer_denom() nd[di].append(ni) # check for quick exit if len(nd) == 1: d, n = nd.popitem() return self.func( [_keep_coeff(ncon, ni) for ni in n]), _keep_coeff(dcon, d) # sum up the terms having a common denominator for d, n in nd.items(): if len(n) == 1: nd[d] = n[0] else: nd[d] = self.func(n) # assemble single numerator and denominator denoms, numers = [list(i) for i in zip(iter(nd.items()))] n, d = self.func([Mul((denoms[:i] + [numers[i]] + denoms[i + 1:])) for i in range(len(numers))]), Mul(denoms) return _keep_coeff(ncon, n), _keep_coeff(dcon, d) def _eval_is_polynomial(self, syms): return all(term._eval_is_polynomial(syms) for term in self.args) def _eval_is_rational_function(self, syms): return all(term._eval_is_rational_function(syms) for term in self.args) def _eval_is_algebraic_expr(self, syms): return all(term._eval_is_algebraic_expr(syms) for term in self.args) # assumption methods _eval_is_real = lambda self: _fuzzy_group( (a.is_real for a in self.args), quick_exit=True) _eval_is_extended_real = lambda self: _fuzzy_group( (a.is_extended_real for a in self.args), quick_exit=True) _eval_is_complex = lambda self: _fuzzy_group( (a.is_complex for a in self.args), quick_exit=True) _eval_is_antihermitian = lambda self: _fuzzy_group( (a.is_antihermitian for a in self.args), quick_exit=True) _eval_is_finite = lambda self: _fuzzy_group( (a.is_finite for a in self.args), quick_exit=True) _eval_is_hermitian = lambda self: _fuzzy_group( (a.is_hermitian for a in self.args), quick_exit=True) _eval_is_integer = lambda self: _fuzzy_group( (a.is_integer for a in self.args), quick_exit=True) _eval_is_rational = lambda self: _fuzzy_group( (a.is_rational for a in self.args), quick_exit=True) _eval_is_algebraic = lambda self: _fuzzy_group( (a.is_algebraic for a in self.args), quick_exit=True) _eval_is_commutative = lambda self: _fuzzy_group( a.is_commutative for a in self.args) def _eval_is_imaginary(self): nz = [] im_I = [] for a in self.args: if a.is_extended_real: if a.is_zero: pass elif a.is_zero is False: nz.append(a) else: return elif a.is_imaginary: im_I.append(aS.ImaginaryUnit) elif (S.ImaginaryUnita).is_extended_real: im_I.append(aS.ImaginaryUnit) else: return b = self.func(nz) if b.is_zero: return fuzzy_not(self.func(im_I).is_zero) elif b.is_zero is False: return False def _eval_is_zero(self): if self.is_commutative is False: # issue 10528: there is no way to know if a nc symbol # is zero or not return nz = [] z = 0 im_or_z = False im = False for a in self.args: if a.is_extended_real: if a.is_zero: z += 1 elif a.is_zero is False: nz.append(a) else: return elif a.is_imaginary: im = True elif (S.ImaginaryUnita).is_extended_real: im_or_z = True else: return if z == len(self.args): return True if len(nz) == 0 or len(nz) == len(self.args): return None b = self.func(nz) if b.is_zero: if not im_or_z and not im: return True if im and not im_or_z: return False if b.is_zero is False: return False def _eval_is_odd(self): l = [f for f in self.args if not (f.is_even is True)] if not l: return False if l[0].is_odd: return self._new_rawargs(l[1:]).is_even def _eval_is_irrational(self): for t in self.args: a = t.is_irrational if a: others = list(self.args) others.remove(t) if all(x.is_rational is True for x in others): return True return None if a is None: return return False def _eval_is_extended_positive(self): from sympy.core.exprtools import _monotonic_sign if self.is_number: return super(Add, self)._eval_is_extended_positive() c, a = self.as_coeff_Add() if not c.is_zero: v = _monotonic_sign(a) if v is not None: s = v + c if s != self and s.is_extended_positive and a.is_extended_nonnegative: return True if len(self.free_symbols) == 1: v = _monotonic_sign(self) if v is not None and v != self and v.is_extended_positive: return True pos = nonneg = nonpos = unknown_sign = False saw_INF = set() args = [a for a in self.args if not a.is_zero] if not args: return False for a in args: ispos = a.is_extended_positive infinite = a.is_infinite if infinite: saw_INF.add(fuzzy_or((ispos, a.is_extended_nonnegative))) if True in saw_INF and False in saw_INF: return if ispos: pos = True continue elif a.is_extended_nonnegative: nonneg = True continue elif a.is_extended_nonpositive: nonpos = True continue if infinite is None: return unknown_sign = True if saw_INF: if len(saw_INF) > 1: return return saw_INF.pop() elif unknown_sign: return elif not nonpos and not nonneg and pos: return True elif not nonpos and pos: return True elif not pos and not nonneg: return False def _eval_is_extended_nonnegative(self): from sympy.core.exprtools import _monotonic_sign if not self.is_number: c, a = self.as_coeff_Add() if not c.is_zero and a.is_extended_nonnegative: v = _monotonic_sign(a) if v is not None: s = v + c if s != self and s.is_extended_nonnegative: return True if len(self.free_symbols) == 1: v = _monotonic_sign(self) if v is not None and v != self and v.is_extended_nonnegative: return True def _eval_is_extended_nonpositive(self): from sympy.core.exprtools import _monotonic_sign if not self.is_number: c, a = self.as_coeff_Add() if not c.is_zero and a.is_extended_nonpositive: v = _monotonic_sign(a) if v is not None: s = v + c if s != self and s.is_extended_nonpositive: return True if len(self.free_symbols) == 1: v = _monotonic_sign(self) if v is not None and v != self and v.is_extended_nonpositive: return True def _eval_is_extended_negative(self): from sympy.core.exprtools import _monotonic_sign if self.is_number: return super(Add, self)._eval_is_extended_negative() c, a = self.as_coeff_Add() if not c.is_zero: v = _monotonic_sign(a) if v is not None: s = v + c if s != self and s.is_extended_negative and a.is_extended_nonpositive: return True if len(self.free_symbols) == 1: v = _monotonic_sign(self) if v is not None and v != self and v.is_extended_negative: return True neg = nonpos = nonneg = unknown_sign = False saw_INF = set() args = [a for a in self.args if not a.is_zero] if not args: return False for a in args: isneg = a.is_extended_negative infinite = a.is_infinite if infinite: saw_INF.add(fuzzy_or((isneg, a.is_extended_nonpositive))) if True in saw_INF and False in saw_INF: return if isneg: neg = True continue elif a.is_extended_nonpositive: nonpos = True continue elif a.is_extended_nonnegative: nonneg = True continue if infinite is None: return unknown_sign = True if saw_INF: if len(saw_INF) > 1: return return saw_INF.pop() elif unknown_sign: return elif not nonneg and not nonpos and neg: return True elif not nonneg and neg: return True elif not neg and not nonpos: return False def _eval_subs(self, old, new): if not old.is_Add: if old is S.Infinity and -old in self.args: # foo - oo is foo + (-oo) internally return self.xreplace({-old: -new}) return None coeff_self, terms_self = self.as_coeff_Add() coeff_old, terms_old = old.as_coeff_Add() if coeff_self.is_Rational and coeff_old.is_Rational: if terms_self == terms_old: # (2 + a).subs( 3 + a, y) -> -1 + y return self.func(new, coeff_self, -coeff_old) if terms_self == -terms_old: # (2 + a).subs(-3 - a, y) -> -1 - y return self.func(-new, coeff_self, coeff_old) if coeff_self.is_Rational and coeff_old.is_Rational \ or coeff_self == coeff_old: args_old, args_self = self.func.make_args( terms_old), self.func.make_args(terms_self) if len(args_old) < len(args_self): # (a+b+c).subs(b+c,x) -> a+x self_set = set(args_self) old_set = set(args_old) if old_set < self_set: ret_set = self_set - old_set return self.func(new, coeff_self, -coeff_old, [s._subs(old, new) for s in ret_set]) args_old = self.func.make_args( -terms_old) # (a+b+c+d).subs(-b-c,x) -> a-x+d old_set = set(args_old) if old_set < self_set: ret_set = self_set - old_set return self.func(-new, coeff_self, coeff_old, [s._subs(old, new) for s in ret_set]) def removeO(self): args = [a for a in self.args if not a.is_Order] return self._new_rawargs(args) def getO(self): args = [a for a in self.args if a.is_Order] if args: return self._new_rawargs(args) @cacheit def extract_leading_order(self, symbols, point=None): """ Returns the leading term and its order. Examples ======== >>> from sympy.abc import x >>> (x + 1 + 1/x5).extract_leading_order(x) ((x(-5), O(x(-5))),) >>> (1 + x).extract_leading_order(x) ((1, O(1)),) >>> (x + x2).extract_leading_order(x) ((x, O(x)),) """ from sympy import Order lst = [] symbols = list(symbols if is_sequence(symbols) else [symbols]) if not point: point = [0]len(symbols) seq = [(f, Order(f, zip(symbols, point))) for f in self.args] for ef, of in seq: for e, o in lst: if o.contains(of) and o != of: of = None break if of is None: continue new_lst = [(ef, of)] for e, o in lst: if of.contains(o) and o != of: continue new_lst.append((e, o)) lst = new_lst return tuple(lst) def as_real_imag(self, deep=True, hints): """ returns a tuple representing a complex number Examples ======== >>> from sympy import I >>> (7 + 9I).as_real_imag() (7, 9) >>> ((1 + I)/(1 - I)).as_real_imag() (0, 1) >>> ((1 + 2I)(1 + 3I)).as_real_imag() (-5, 5) """ sargs = self.args re_part, im_part = [], [] for term in sargs: re, im = term.as_real_imag(deep=deep) re_part.append(re) im_part.append(im) return (self.func(re_part), self.func(im_part)) def _eval_as_leading_term(self, x): from sympy import expand_mul, factor_terms old = self expr = expand_mul(self) if not expr.is_Add: return expr.as_leading_term(x) infinite = [t for t in expr.args if t.is_infinite] expr = expr.func([t.as_leading_term(x) for t in expr.args]).removeO() if not expr: # simple leading term analysis gave us 0 but we have to send # back a term, so compute the leading term (via series) return old.compute_leading_term(x) elif expr is S.NaN: return old.func._from_args(infinite) elif not expr.is_Add: return expr else: plain = expr.func([s for s, _ in expr.extract_leading_order(x)]) rv = factor_terms(plain, fraction=False) rv_simplify = rv.simplify() # if it simplifies to an x-free expression, return that; # tests don't fail if we don't but it seems nicer to do this if x not in rv_simplify.free_symbols: if rv_simplify.is_zero and plain.is_zero is not True: return (expr - plain)._eval_as_leading_term(x) return rv_simplify return rv def _eval_adjoint(self): return self.func([t.adjoint() for t in self.args]) def _eval_conjugate(self): return self.func([t.conjugate() for t in self.args]) def _eval_transpose(self): return self.func([t.transpose() for t in self.args]) def _sage_(self): s = 0 for x in self.args: s += x._sage_() return s def primitive(self): """ Return ``(R, self/R)`` where ``R``` is the Rational GCD of ``self```. ``R`` is collected only from the leading coefficient of each term. Examples ======== >>> from sympy.abc import x, y >>> (2x + 4y).primitive() (2, x + 2y) >>> (2x/3 + 4y/9).primitive() (2/9, 3x + 2y) >>> (2x/3 + 4.2y).primitive() (1/3, 2x + 12.6y) No subprocessing of term factors is performed: >>> ((2 + 2x)x + 2).primitive() (1, x(2x + 2) + 2) Recursive processing can be done with the ``as_content_primitive()`` method: >>> ((2 + 2x)x + 2).as_content_primitive() (2, x(x + 1) + 1) See also: primitive() function in polytools.py """ terms = [] inf = False for a in self.args: c, m = a.as_coeff_Mul() if not c.is_Rational: c = S.One m = a inf = inf or m is S.ComplexInfinity terms.append((c.p, c.q, m)) if not inf: ngcd = reduce(igcd, [t[0] for t in terms], 0) dlcm = reduce(ilcm, [t[1] for t in terms], 1) else: ngcd = reduce(igcd, [t[0] for t in terms if t[1]], 0) dlcm = reduce(ilcm, [t[1] for t in terms if t[1]], 1) if ngcd == dlcm == 1: return S.One, self if not inf: for i, (p, q, term) in enumerate(terms): terms[i] = _keep_coeff(Rational((p//ngcd)(dlcm//q)), term) else: for i, (p, q, term) in enumerate(terms): if q: terms[i] = _keep_coeff(Rational((p//ngcd)(dlcm//q)), term) else: terms[i] = _keep_coeff(Rational(p, q), term) # we don't need a complete re-flattening since no new terms will join # so we just use the same sort as is used in Add.flatten. When the # coefficient changes, the ordering of terms may change, e.g. # (3x, 6y) -> (2y, x) # # We do need to make sure that term[0] stays in position 0, however. # if terms[0].is_Number or terms[0] is S.ComplexInfinity: c = terms.pop(0) else: c = None _addsort(terms) if c: terms.insert(0, c) return Rational(ngcd, dlcm), self._new_rawargs(terms) def as_content_primitive(self, radical=False, clear=True): """Return the tuple (R, self/R) where R is the positive Rational extracted from self. If radical is True (default is False) then common radicals will be removed and included as a factor of the primitive expression. Examples ======== >>> from sympy import sqrt >>> (3 + 3sqrt(2)).as_content_primitive() (3, 1 + sqrt(2)) Radical content can also be factored out of the primitive: >>> (2sqrt(2) + 4sqrt(10)).as_content_primitive(radical=True) (2, sqrt(2)(1 + 2sqrt(5))) See docstring of Expr.as_content_primitive for more examples. """ con, prim = self.func([_keep_coeff(a.as_content_primitive( radical=radical, clear=clear)) for a in self.args]).primitive() if not clear and not con.is_Integer and prim.is_Add: con, d = con.as_numer_denom() _p = prim/d if any(a.as_coeff_Mul()[0].is_Integer for a in _p.args): prim = _p else: con /= d if radical and prim.is_Add: # look for common radicals that can be removed args = prim.args rads = [] common_q = None for m in args: term_rads = defaultdict(list) for ai in Mul.make_args(m): if ai.is_Pow: b, e = ai.as_base_exp() if e.is_Rational and b.is_Integer: term_rads[e.q].append(abs(int(b))e.p) if not term_rads: break if common_q is None: common_q = set(term_rads.keys()) else: common_q = common_q & set(term_rads.keys()) if not common_q: break rads.append(term_rads) else: # process rads # keep only those in common_q for r in rads: for q in list(r.keys()): if q not in common_q: r.pop(q) for q in r: r[q] = prod(r[q]) # find the gcd of bases for each q G = [] for q in common_q: g = reduce(igcd, [r[q] for r in rads], 0) if g != 1: G.append(gRational(1, q)) if G: G = Mul(G) args = [ai/G for ai in args] prim = Gprim.func(args) return con, prim @property def _sorted_args(self): from sympy.core.compatibility import default_sort_key return tuple(sorted(self.args, key=default_sort_key)) def _eval_difference_delta(self, n, step): from sympy.series.limitseq import difference_delta as dd return self.func([dd(a, n, step) for a in self.args]) @property def _mpc_(self): """ Convert self to an mpmath mpc if possible """ from sympy.core.numbers import I, Float re_part, rest = self.as_coeff_Add() im_part, imag_unit = rest.as_coeff_Mul() if not imag_unit == I: # ValueError may seem more reasonable but since it's a @property, # we need to use AttributeError to keep from confusing things like # hasattr. raise AttributeError("Cannot convert Add to mpc. Must be of the form Number + NumberI") return (Float(re_part)._mpf_, Float(im_part)._mpf_) def __neg__(self): if not global_distribute[0]: return super(Add, self).__neg__() return Add(*[-i for i in self.args]) from .mul import Mul, _keep_coeff, prod from sympy.core.numbers import Rational
394f4388142b73d0964edc212f561e0a4d9ccb2e941c9f2a910dfca049a1a7cd	from __future__ import print_function, division from .sympify import sympify, _sympify, SympifyError from .basic import Basic, Atom from .singleton import S from .evalf import EvalfMixin, pure_complex from .decorators import _sympifyit, call_highest_priority from .cache import cacheit from .compatibility import reduce, as_int, default_sort_key, range, Iterable from sympy.utilities.misc import func_name from mpmath.libmp import mpf_log, prec_to_dps from collections import defaultdict class Expr(Basic, EvalfMixin): """ Base class for algebraic expressions. Everything that requires arithmetic operations to be defined should subclass this class, instead of Basic (which should be used only for argument storage and expression manipulation, i.e. pattern matching, substitutions, etc). See Also ======== sympy.core.basic.Basic """ __slots__ = [] is_scalar = True # self derivative is 1 @property def _diff_wrt(self): """Return True if one can differentiate with respect to this object, else False. Subclasses such as Symbol, Function and Derivative return True to enable derivatives wrt them. The implementation in Derivative separates the Symbol and non-Symbol (_diff_wrt=True) variables and temporarily converts the non-Symbols into Symbols when performing the differentiation. By default, any object deriving from Expr will behave like a scalar with self.diff(self) == 1. If this is not desired then the object must also set `is_scalar = False` or else define an _eval_derivative routine. Note, see the docstring of Derivative for how this should work mathematically. In particular, note that expr.subs(yourclass, Symbol) should be well-defined on a structural level, or this will lead to inconsistent results. Examples ======== >>> from sympy import Expr >>> e = Expr() >>> e._diff_wrt False >>> class MyScalar(Expr): ... _diff_wrt = True ... >>> MyScalar().diff(MyScalar()) 1 >>> class MySymbol(Expr): ... _diff_wrt = True ... is_scalar = False ... >>> MySymbol().diff(MySymbol()) Derivative(MySymbol(), MySymbol()) """ return False @cacheit def sort_key(self, order=None): coeff, expr = self.as_coeff_Mul() if expr.is_Pow: expr, exp = expr.args else: expr, exp = expr, S.One if expr.is_Dummy: args = (expr.sort_key(),) elif expr.is_Atom: args = (str(expr),) else: if expr.is_Add: args = expr.as_ordered_terms(order=order) elif expr.is_Mul: args = expr.as_ordered_factors(order=order) else: args = expr.args args = tuple( [ default_sort_key(arg, order=order) for arg in args ]) args = (len(args), tuple(args)) exp = exp.sort_key(order=order) return expr.class_key(), args, exp, coeff def __hash__(self): # hash cannot be cached using cache_it because infinite recurrence # occurs as hash is needed for setting cache dictionary keys h = self._mhash if h is None: h = hash((type(self).__name__,) + self._hashable_content()) self._mhash = h return h def _hashable_content(self): """Return a tuple of information about self that can be used to compute the hash. If a class defines additional attributes, like ``name`` in Symbol, then this method should be updated accordingly to return such relevant attributes. Defining more than _hashable_content is necessary if __eq__ has been defined by a class. See note about this in Basic.__eq__.""" return self._args def __eq__(self, other): try: other = sympify(other) if not isinstance(other, Expr): return False except (SympifyError, SyntaxError): return False # check for pure number expr if not (self.is_Number and other.is_Number) and ( type(self) != type(other)): return False a, b = self._hashable_content(), other._hashable_content() if a != b: return False # check number in an expression for a, b in zip(a, b): if not isinstance(a, Expr): continue if a.is_Number and type(a) != type(b): return False return True # *************** # * Arithmetics * # ************* # Expr and its sublcasses use _op_priority to determine which object # passed to a binary special method (__mul__, etc.) will handle the # operation. In general, the 'call_highest_priority' decorator will choose # the object with the highest _op_priority to handle the call. # Custom subclasses that want to define their own binary special methods # should set an _op_priority value that is higher than the default. # # NOTE*: # This is a temporary fix, and will eventually be replaced with # something better and more powerful. See issue 5510. _op_priority = 10.0 def __pos__(self): return self def __neg__(self): # Mul has its own __neg__ routine, so we just # create a 2-args Mul with the -1 in the canonical # slot 0. c = self.is_commutative return Mul._from_args((S.NegativeOne, self), c) def __abs__(self): from sympy import Abs return Abs(self) @_sympifyit('other', NotImplemented) @call_highest_priority('__radd__') def __add__(self, other): return Add(self, other) @_sympifyit('other', NotImplemented) @call_highest_priority('__add__') def __radd__(self, other): return Add(other, self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rsub__') def __sub__(self, other): return Add(self, -other) @_sympifyit('other', NotImplemented) @call_highest_priority('__sub__') def __rsub__(self, other): return Add(other, -self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rmul__') def __mul__(self, other): return Mul(self, other) @_sympifyit('other', NotImplemented) @call_highest_priority('__mul__') def __rmul__(self, other): return Mul(other, self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rpow__') def _pow(self, other): return Pow(self, other) def __pow__(self, other, mod=None): if mod is None: return self._pow(other) try: _self, other, mod = as_int(self), as_int(other), as_int(mod) if other >= 0: return pow(_self, other, mod) else: from sympy.core.numbers import mod_inverse return mod_inverse(pow(_self, -other, mod), mod) except ValueError: power = self._pow(other) try: return power%mod except TypeError: return NotImplemented @_sympifyit('other', NotImplemented) @call_highest_priority('__pow__') def __rpow__(self, other): return Pow(other, self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rdiv__') def __div__(self, other): return Mul(self, Pow(other, S.NegativeOne)) @_sympifyit('other', NotImplemented) @call_highest_priority('__div__') def __rdiv__(self, other): return Mul(other, Pow(self, S.NegativeOne)) __truediv__ = __div__ __rtruediv__ = __rdiv__ @_sympifyit('other', NotImplemented) @call_highest_priority('__rmod__') def __mod__(self, other): return Mod(self, other) @_sympifyit('other', NotImplemented) @call_highest_priority('__mod__') def __rmod__(self, other): return Mod(other, self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rfloordiv__') def __floordiv__(self, other): from sympy.functions.elementary.integers import floor return floor(self / other) @_sympifyit('other', NotImplemented) @call_highest_priority('__floordiv__') def __rfloordiv__(self, other): from sympy.functions.elementary.integers import floor return floor(other / self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rdivmod__') def __divmod__(self, other): from sympy.functions.elementary.integers import floor return floor(self / other), Mod(self, other) @_sympifyit('other', NotImplemented) @call_highest_priority('__divmod__') def __rdivmod__(self, other): from sympy.functions.elementary.integers import floor return floor(other / self), Mod(other, self) def __int__(self): # Although we only need to round to the units position, we'll # get one more digit so the extra testing below can be avoided # unless the rounded value rounded to an integer, e.g. if an # expression were equal to 1.9 and we rounded to the unit position # we would get a 2 and would not know if this rounded up or not # without doing a test (as done below). But if we keep an extra # digit we know that 1.9 is not the same as 1 and there is no # need for further testing: our int value is correct. If the value # were 1.99, however, this would round to 2.0 and our int value is # off by one. So...if our round value is the same as the int value # (regardless of how much extra work we do to calculate extra decimal # places) we need to test whether we are off by one. from sympy import Dummy if not self.is_number: raise TypeError("can't convert symbols to int") r = self.round(2) if not r.is_Number: raise TypeError("can't convert complex to int") if r in (S.NaN, S.Infinity, S.NegativeInfinity): raise TypeError("can't convert %s to int" % r) i = int(r) if not i: return 0 # off-by-one check if i == r and not (self - i).equals(0): isign = 1 if i > 0 else -1 x = Dummy() # in the following (self - i).evalf(2) will not always work while # (self - r).evalf(2) and the use of subs does; if the test that # was added when this comment was added passes, it might be safe # to simply use sign to compute this rather than doing this by hand: diff_sign = 1 if (self - x).evalf(2, subs={x: i}) > 0 else -1 if diff_sign != isign: i -= isign return i __long__ = __int__ def __float__(self): # Don't bother testing if it's a number; if it's not this is going # to fail, and if it is we still need to check that it evalf'ed to # a number. result = self.evalf() if result.is_Number: return float(result) if result.is_number and result.as_real_imag()[1]: raise TypeError("can't convert complex to float") raise TypeError("can't convert expression to float") def __complex__(self): result = self.evalf() re, im = result.as_real_imag() return complex(float(re), float(im)) def __ge__(self, other): from sympy import GreaterThan try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s >= %s" % (self, other)) for me in (self, other): if me.is_complex and me.is_extended_real is False: raise TypeError("Invalid comparison of complex %s" % me) if me is S.NaN: raise TypeError("Invalid NaN comparison") n2 = _n2(self, other) if n2 is not None: return _sympify(n2 >= 0) if self.is_extended_real and other.is_extended_real: if (self.is_infinite and self.is_extended_positive) \ or (other.is_infinite and other.is_extended_negative): return S.true nneg = (self - other).is_extended_nonnegative if nneg is not None: return sympify(nneg) return GreaterThan(self, other, evaluate=False) def __le__(self, other): from sympy import LessThan try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s <= %s" % (self, other)) for me in (self, other): if me.is_complex and me.is_extended_real is False: raise TypeError("Invalid comparison of complex %s" % me) if me is S.NaN: raise TypeError("Invalid NaN comparison") n2 = _n2(self, other) if n2 is not None: return _sympify(n2 <= 0) if self.is_extended_real and other.is_extended_real: if (self.is_infinite and self.is_extended_negative) \ or (other.is_infinite and other.is_extended_positive): return S.true npos = (self - other).is_extended_nonpositive if npos is not None: return sympify(npos) return LessThan(self, other, evaluate=False) def __gt__(self, other): from sympy import StrictGreaterThan try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) for me in (self, other): if me.is_complex and me.is_extended_real is False: raise TypeError("Invalid comparison of complex %s" % me) if me is S.NaN: raise TypeError("Invalid NaN comparison") n2 = _n2(self, other) if n2 is not None: return _sympify(n2 > 0) if self.is_extended_real and other.is_extended_real: if (self.is_infinite and self.is_extended_negative) \ or (other.is_infinite and other.is_extended_positive): return S.false pos = (self - other).is_extended_positive if pos is not None: return sympify(pos) return StrictGreaterThan(self, other, evaluate=False) def __lt__(self, other): from sympy import StrictLessThan try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s < %s" % (self, other)) for me in (self, other): if me.is_complex and me.is_extended_real is False: raise TypeError("Invalid comparison of complex %s" % me) if me is S.NaN: raise TypeError("Invalid NaN comparison") n2 = _n2(self, other) if n2 is not None: return _sympify(n2 < 0) if self.is_extended_real and other.is_extended_real: if (self.is_infinite and self.is_extended_positive) \ or (other.is_infinite and other.is_extended_negative): return S.false neg = (self - other).is_extended_negative if neg is not None: return sympify(neg) return StrictLessThan(self, other, evaluate=False) def __trunc__(self): if not self.is_number: raise TypeError("can't truncate symbols and expressions") else: return Integer(self) @staticmethod def _from_mpmath(x, prec): from sympy import Float if hasattr(x, "_mpf_"): return Float._new(x._mpf_, prec) elif hasattr(x, "_mpc_"): re, im = x._mpc_ re = Float._new(re, prec) im = Float._new(im, prec)S.ImaginaryUnit return re + im else: raise TypeError("expected mpmath number (mpf or mpc)") @property def is_number(self): """Returns True if ``self`` has no free symbols and no undefined functions (AppliedUndef, to be precise). It will be faster than ``if not self.free_symbols``, however, since ``is_number`` will fail as soon as it hits a free symbol or undefined function. Examples ======== >>> from sympy import log, Integral, cos, sin, pi >>> from sympy.core.function import Function >>> from sympy.abc import x >>> f = Function('f') >>> x.is_number False >>> f(1).is_number False >>> (2x).is_number False >>> (2 + Integral(2, x)).is_number False >>> (2 + Integral(2, (x, 1, 2))).is_number True Not all numbers are Numbers in the SymPy sense: >>> pi.is_number, pi.is_Number (True, False) If something is a number it should evaluate to a number with real and imaginary parts that are Numbers; the result may not be comparable, however, since the real and/or imaginary part of the result may not have precision. >>> cos(1).is_number and cos(1).is_comparable True >>> z = cos(1)2 + sin(1)2 - 1 >>> z.is_number True >>> z.is_comparable False See Also ======== sympy.core.basic.is_comparable """ return all(obj.is_number for obj in self.args) def _random(self, n=None, re_min=-1, im_min=-1, re_max=1, im_max=1): """Return self evaluated, if possible, replacing free symbols with random complex values, if necessary. The random complex value for each free symbol is generated by the random_complex_number routine giving real and imaginary parts in the range given by the re_min, re_max, im_min, and im_max values. The returned value is evaluated to a precision of n (if given) else the maximum of 15 and the precision needed to get more than 1 digit of precision. If the expression could not be evaluated to a number, or could not be evaluated to more than 1 digit of precision, then None is returned. Examples ======== >>> from sympy import sqrt >>> from sympy.abc import x, y >>> x._random() # doctest: +SKIP 0.0392918155679172 + 0.916050214307199I >>> x._random(2) # doctest: +SKIP -0.77 - 0.87I >>> (x + y/2)._random(2) # doctest: +SKIP -0.57 + 0.16I >>> sqrt(2)._random(2) 1.4 See Also ======== sympy.utilities.randtest.random_complex_number """ free = self.free_symbols prec = 1 if free: from sympy.utilities.randtest import random_complex_number a, c, b, d = re_min, re_max, im_min, im_max reps = dict(list(zip(free, [random_complex_number(a, b, c, d, rational=True) for zi in free]))) try: nmag = abs(self.evalf(2, subs=reps)) except (ValueError, TypeError): # if an out of range value resulted in evalf problems # then return None -- XXX is there a way to know how to # select a good random number for a given expression? # e.g. when calculating n! negative values for n should not # be used return None else: reps = {} nmag = abs(self.evalf(2)) if not hasattr(nmag, '_prec'): # e.g. exp_polar(2Ipi) doesn't evaluate but is_number is True return None if nmag._prec == 1: # increase the precision up to the default maximum # precision to see if we can get any significance from mpmath.libmp.libintmath import giant_steps from sympy.core.evalf import DEFAULT_MAXPREC as target # evaluate for prec in giant_steps(2, target): nmag = abs(self.evalf(prec, subs=reps)) if nmag._prec != 1: break if nmag._prec != 1: if n is None: n = max(prec, 15) return self.evalf(n, subs=reps) # never got any significance return None def is_constant(self, wrt, flags): """Return True if self is constant, False if not, or None if the constancy could not be determined conclusively. If an expression has no free symbols then it is a constant. If there are free symbols it is possible that the expression is a constant, perhaps (but not necessarily) zero. To test such expressions, two strategies are tried: 1) numerical evaluation at two random points. If two such evaluations give two different values and the values have a precision greater than 1 then self is not constant. If the evaluations agree or could not be obtained with any precision, no decision is made. The numerical testing is done only if ``wrt`` is different than the free symbols. 2) differentiation with respect to variables in 'wrt' (or all free symbols if omitted) to see if the expression is constant or not. This will not always lead to an expression that is zero even though an expression is constant (see added test in test_expr.py). If all derivatives are zero then self is constant with respect to the given symbols. If neither evaluation nor differentiation can prove the expression is constant, None is returned unless two numerical values happened to be the same and the flag ``failing_number`` is True -- in that case the numerical value will be returned. If flag simplify=False is passed, self will not be simplified; the default is True since self should be simplified before testing. Examples ======== >>> from sympy import cos, sin, Sum, S, pi >>> from sympy.abc import a, n, x, y >>> x.is_constant() False >>> S(2).is_constant() True >>> Sum(x, (x, 1, 10)).is_constant() True >>> Sum(x, (x, 1, n)).is_constant() False >>> Sum(x, (x, 1, n)).is_constant(y) True >>> Sum(x, (x, 1, n)).is_constant(n) False >>> Sum(x, (x, 1, n)).is_constant(x) True >>> eq = acos(x)*2 + asin(x)2 - a >>> eq.is_constant() True >>> eq.subs({x: pi, a: 2}) == eq.subs({x: pi, a: 3}) == 0 True >>> (0x).is_constant() False >>> x.is_constant() False >>> (xx).is_constant() False >>> one = cos(x)2 + sin(x)2 >>> one.is_constant() True >>> ((one - 1)(x + 1)).is_constant() in (True, False) # could be 0 or 1 True """ simplify = flags.get('simplify', True) if self.is_number: return True free = self.free_symbols if not free: return True # assume f(1) is some constant # if we are only interested in some symbols and they are not in the # free symbols then this expression is constant wrt those symbols wrt = set(wrt) if wrt and not wrt & free: return True wrt = wrt or free # simplify unless this has already been done expr = self if simplify: expr = expr.simplify() # is_zero should be a quick assumptions check; it can be wrong for # numbers (see test_is_not_constant test), giving False when it # shouldn't, but hopefully it will never give True unless it is sure. if expr.is_zero: return True # try numerical evaluation to see if we get two different values failing_number = None if wrt == free: # try 0 (for a) and 1 (for b) try: a = expr.subs(list(zip(free, [0]len(free))), simultaneous=True) if a is S.NaN: # evaluation may succeed when substitution fails a = expr._random(None, 0, 0, 0, 0) except ZeroDivisionError: a = None if a is not None and a is not S.NaN: try: b = expr.subs(list(zip(free, [1]len(free))), simultaneous=True) if b is S.NaN: # evaluation may succeed when substitution fails b = expr._random(None, 1, 0, 1, 0) except ZeroDivisionError: b = None if b is not None and b is not S.NaN and b.equals(a) is False: return False # try random real b = expr._random(None, -1, 0, 1, 0) if b is not None and b is not S.NaN and b.equals(a) is False: return False # try random complex b = expr._random() if b is not None and b is not S.NaN: if b.equals(a) is False: return False failing_number = a if a.is_number else b # now we will test each wrt symbol (or all free symbols) to see if the # expression depends on them or not using differentiation. This is # not sufficient for all expressions, however, so we don't return # False if we get a derivative other than 0 with free symbols. for w in wrt: deriv = expr.diff(w) if simplify: deriv = deriv.simplify() if deriv != 0: if not (pure_complex(deriv, or_real=True)): if flags.get('failing_number', False): return failing_number elif deriv.free_symbols: # dead line provided _random returns None in such cases return None return False return True def equals(self, other, failing_expression=False): """Return True if self == other, False if it doesn't, or None. If failing_expression is True then the expression which did not simplify to a 0 will be returned instead of None. If ``self`` is a Number (or complex number) that is not zero, then the result is False. If ``self`` is a number and has not evaluated to zero, evalf will be used to test whether the expression evaluates to zero. If it does so and the result has significance (i.e. the precision is either -1, for a Rational result, or is greater than 1) then the evalf value will be used to return True or False. """ from sympy.simplify.simplify import nsimplify, simplify from sympy.solvers.solveset import solveset from sympy.solvers.solvers import solve from sympy.polys.polyerrors import NotAlgebraic from sympy.polys.numberfields import minimal_polynomial other = sympify(other) if self == other: return True # they aren't the same so see if we can make the difference 0; # don't worry about doing simplification steps one at a time # because if the expression ever goes to 0 then the subsequent # simplification steps that are done will be very fast. diff = factor_terms(simplify(self - other), radical=True) if not diff: return True if not diff.has(Add, Mod): # if there is no expanding to be done after simplifying # then this can't be a zero return False constant = diff.is_constant(simplify=False, failing_number=True) if constant is False: return False if not diff.is_number: if constant is None: # e.g. unless the right simplification is done, a symbolic # zero is possible (see expression of issue 6829: without # simplification constant will be None). return if constant is True: # this gives a number whether there are free symbols or not ndiff = diff._random() # is_comparable will work whether the result is real # or complex; it could be None, however. if ndiff and ndiff.is_comparable: return False # sometimes we can use a simplified result to give a clue as to # what the expression should be; if the expression is not zero # then we should have been able to compute that and so now # we can just consider the cases where the approximation appears # to be zero -- we try to prove it via minimal_polynomial. # # removed # ns = nsimplify(diff) # if diff.is_number and (not ns or ns == diff): # # The thought was that if it nsimplifies to 0 that's a sure sign # to try the following to prove it; or if it changed but wasn't # zero that might be a sign that it's not going to be easy to # prove. But tests seem to be working without that logic. # if diff.is_number: # try to prove via self-consistency surds = [s for s in diff.atoms(Pow) if s.args[0].is_Integer] # it seems to work better to try big ones first surds.sort(key=lambda x: -x.args[0]) for s in surds: try: # simplify is False here -- this expression has already # been identified as being hard to identify as zero; # we will handle the checking ourselves using nsimplify # to see if we are in the right ballpark or not and if so # then the simplification will be attempted. sol = solve(diff, s, simplify=False) if sol: if s in sol: # the self-consistent result is present return True if all(si.is_Integer for si in sol): # perfect powers are removed at instantiation # so surd s cannot be an integer return False if all(i.is_algebraic is False for i in sol): # a surd is algebraic return False if any(si in surds for si in sol): # it wasn't equal to s but it is in surds # and different surds are not equal return False if any(nsimplify(s - si) == 0 and simplify(s - si) == 0 for si in sol): return True if s.is_real: if any(nsimplify(si, [s]) == s and simplify(si) == s for si in sol): return True except NotImplementedError: pass # try to prove with minimal_polynomial but know when # not to use this or else it can take a long time. e.g. issue 8354 if True: # change True to condition that assures non-hang try: mp = minimal_polynomial(diff) if mp.is_Symbol: return True return False except (NotAlgebraic, NotImplementedError): pass # diff has not simplified to zero; constant is either None, True # or the number with significance (is_comparable) that was randomly # calculated twice as the same value. if constant not in (True, None) and constant != 0: return False if failing_expression: return diff return None def _eval_is_positive(self): finite = self.is_finite if finite is False: return False extended_positive = self.is_extended_positive if finite is True: return extended_positive if extended_positive is False: return False def _eval_is_negative(self): finite = self.is_finite if finite is False: return False extended_negative = self.is_extended_negative if finite is True: return extended_negative if extended_negative is False: return False def _eval_is_extended_positive(self): from sympy.polys.numberfields import minimal_polynomial from sympy.polys.polyerrors import NotAlgebraic if self.is_number: if self.is_extended_real is False: return False # check to see that we can get a value try: n2 = self._eval_evalf(2) # XXX: This shouldn't be caught here # Catches ValueError: hypsum() failed to converge to the requested # 34 bits of accuracy except ValueError: return None if n2 is None: return None if getattr(n2, '_prec', 1) == 1: # no significance return None if n2 == S.NaN: return None r, i = self.evalf(2).as_real_imag() if not i.is_Number or not r.is_Number: return False if r._prec != 1 and i._prec != 1: return bool(not i and r > 0) elif r._prec == 1 and (not i or i._prec == 1) and \ self.is_algebraic and not self.has(Function): try: if minimal_polynomial(self).is_Symbol: return False except (NotAlgebraic, NotImplementedError): pass def _eval_is_extended_negative(self): from sympy.polys.numberfields import minimal_polynomial from sympy.polys.polyerrors import NotAlgebraic if self.is_number: if self.is_extended_real is False: return False # check to see that we can get a value try: n2 = self._eval_evalf(2) # XXX: This shouldn't be caught here # Catches ValueError: hypsum() failed to converge to the requested # 34 bits of accuracy except ValueError: return None if n2 is None: return None if getattr(n2, '_prec', 1) == 1: # no significance return None if n2 == S.NaN: return None r, i = self.evalf(2).as_real_imag() if not i.is_Number or not r.is_Number: return False if r._prec != 1 and i._prec != 1: return bool(not i and r < 0) elif r._prec == 1 and (not i or i._prec == 1) and \ self.is_algebraic and not self.has(Function): try: if minimal_polynomial(self).is_Symbol: return False except (NotAlgebraic, NotImplementedError): pass def _eval_interval(self, x, a, b): """ Returns evaluation over an interval. For most functions this is: self.subs(x, b) - self.subs(x, a), possibly using limit() if NaN is returned from subs, or if singularities are found between a and b. If b or a is None, it only evaluates -self.subs(x, a) or self.subs(b, x), respectively. """ from sympy.series import limit, Limit from sympy.solvers.solveset import solveset from sympy.sets.sets import Interval from sympy.functions.elementary.exponential import log from sympy.calculus.util import AccumBounds if (a is None and b is None): raise ValueError('Both interval ends cannot be None.') if a == b: return 0 if a is None: A = 0 else: A = self.subs(x, a) if A.has(S.NaN, S.Infinity, S.NegativeInfinity, S.ComplexInfinity, AccumBounds): if (a < b) != False: A = limit(self, x, a,"+") else: A = limit(self, x, a,"-") if A is S.NaN: return A if isinstance(A, Limit): raise NotImplementedError("Could not compute limit") if b is None: B = 0 else: B = self.subs(x, b) if B.has(S.NaN, S.Infinity, S.NegativeInfinity, S.ComplexInfinity, AccumBounds): if (a < b) != False: B = limit(self, x, b,"-") else: B = limit(self, x, b,"+") if isinstance(B, Limit): raise NotImplementedError("Could not compute limit") if (a and b) is None: return B - A value = B - A if a.is_comparable and b.is_comparable: if a < b: domain = Interval(a, b) else: domain = Interval(b, a) # check the singularities of self within the interval # if singularities is a ConditionSet (not iterable), catch the exception and pass singularities = solveset(self.cancel().as_numer_denom()[1], x, domain=domain) for logterm in self.atoms(log): singularities = singularities \| solveset(logterm.args[0], x, domain=domain) try: for s in singularities: if value is S.NaN: # no need to keep adding, it will stay NaN break if not s.is_comparable: continue if (a < s) == (s < b) == True: value += -limit(self, x, s, "+") + limit(self, x, s, "-") elif (b < s) == (s < a) == True: value += limit(self, x, s, "+") - limit(self, x, s, "-") except TypeError: pass return value def _eval_power(self, other): # subclass to compute selfother for cases when # other is not NaN, 0, or 1 return None def _eval_conjugate(self): if self.is_extended_real: return self elif self.is_imaginary: return -self def conjugate(self): from sympy.functions.elementary.complexes import conjugate as c return c(self) def _eval_transpose(self): from sympy.functions.elementary.complexes import conjugate if self.is_complex: return self elif self.is_hermitian: return conjugate(self) elif self.is_antihermitian: return -conjugate(self) def transpose(self): from sympy.functions.elementary.complexes import transpose return transpose(self) def _eval_adjoint(self): from sympy.functions.elementary.complexes import conjugate, transpose if self.is_hermitian: return self elif self.is_antihermitian: return -self obj = self._eval_conjugate() if obj is not None: return transpose(obj) obj = self._eval_transpose() if obj is not None: return conjugate(obj) def adjoint(self): from sympy.functions.elementary.complexes import adjoint return adjoint(self) @classmethod def _parse_order(cls, order): """Parse and configure the ordering of terms. """ from sympy.polys.orderings import monomial_key startswith = getattr(order, "startswith", None) if startswith is None: reverse = False else: reverse = startswith('rev-') if reverse: order = order[4:] monom_key = monomial_key(order) def neg(monom): result = [] for m in monom: if isinstance(m, tuple): result.append(neg(m)) else: result.append(-m) return tuple(result) def key(term): _, ((re, im), monom, ncpart) = term monom = neg(monom_key(monom)) ncpart = tuple([e.sort_key(order=order) for e in ncpart]) coeff = ((bool(im), im), (re, im)) return monom, ncpart, coeff return key, reverse def as_ordered_factors(self, order=None): """Return list of ordered factors (if Mul) else [self].""" return [self] def as_ordered_terms(self, order=None, data=False): """ Transform an expression to an ordered list of terms. Examples ======== >>> from sympy import sin, cos >>> from sympy.abc import x >>> (sin(x)2cos(x) + sin(x)2 + 1).as_ordered_terms() [sin(x)2cos(x), sin(x)*2, 1] """ from .numbers import Number, NumberSymbol if order is None and self.is_Add: # Spot the special case of Add(Number, Mul(Number, expr)) with the # first number positive and thhe second number nagative key = lambda x:not isinstance(x, (Number, NumberSymbol)) add_args = sorted(Add.make_args(self), key=key) if (len(add_args) == 2 and isinstance(add_args[0], (Number, NumberSymbol)) and isinstance(add_args[1], Mul)): mul_args = sorted(Mul.make_args(add_args[1]), key=key) if (len(mul_args) == 2 and isinstance(mul_args[0], Number) and add_args[0].is_positive and mul_args[0].is_negative): return add_args key, reverse = self._parse_order(order) terms, gens = self.as_terms() if not any(term.is_Order for term, _ in terms): ordered = sorted(terms, key=key, reverse=reverse) else: _terms, _order = [], [] for term, repr in terms: if not term.is_Order: _terms.append((term, repr)) else: _order.append((term, repr)) ordered = sorted(_terms, key=key, reverse=True) \ + sorted(_order, key=key, reverse=True) if data: return ordered, gens else: return [term for term, _ in ordered] def as_terms(self): """Transform an expression to a list of terms. """ from .add import Add from .mul import Mul from .exprtools import decompose_power gens, terms = set([]), [] for term in Add.make_args(self): coeff, _term = term.as_coeff_Mul() coeff = complex(coeff) cpart, ncpart = {}, [] if _term is not S.One: for factor in Mul.make_args(_term): if factor.is_number: try: coeff = complex(factor) except (TypeError, ValueError): pass else: continue if factor.is_commutative: base, exp = decompose_power(factor) cpart[base] = exp gens.add(base) else: ncpart.append(factor) coeff = coeff.real, coeff.imag ncpart = tuple(ncpart) terms.append((term, (coeff, cpart, ncpart))) gens = sorted(gens, key=default_sort_key) k, indices = len(gens), {} for i, g in enumerate(gens): indices[g] = i result = [] for term, (coeff, cpart, ncpart) in terms: monom = [0]k for base, exp in cpart.items(): monom[indices[base]] = exp result.append((term, (coeff, tuple(monom), ncpart))) return result, gens def removeO(self): """Removes the additive O(..) symbol if there is one""" return self def getO(self): """Returns the additive O(..) symbol if there is one, else None.""" return None def getn(self): """ Returns the order of the expression. The order is determined either from the O(...) term. If there is no O(...) term, it returns None. Examples ======== >>> from sympy import O >>> from sympy.abc import x >>> (1 + x + O(x2)).getn() 2 >>> (1 + x).getn() """ from sympy import Dummy, Symbol o = self.getO() if o is None: return None elif o.is_Order: o = o.expr if o is S.One: return S.Zero if o.is_Symbol: return S.One if o.is_Pow: return o.args[1] if o.is_Mul: # xnlog(x)n or xn/log(x)*n for oi in o.args: if oi.is_Symbol: return S.One if oi.is_Pow: syms = oi.atoms(Symbol) if len(syms) == 1: x = syms.pop() oi = oi.subs(x, Dummy('x', positive=True)) if oi.base.is_Symbol and oi.exp.is_Rational: return abs(oi.exp) raise NotImplementedError('not sure of order of %s' % o) def count_ops(self, visual=None): """wrapper for count_ops that returns the operation count.""" from .function import count_ops return count_ops(self, visual) def args_cnc(self, cset=False, warn=True, split_1=True): """Return [commutative factors, non-commutative factors] of self. self is treated as a Mul and the ordering of the factors is maintained. If ``cset`` is True the commutative factors will be returned in a set. If there were repeated factors (as may happen with an unevaluated Mul) then an error will be raised unless it is explicitly suppressed by setting ``warn`` to False. Note: -1 is always separated from a Number unless split_1 is False. >>> from sympy import symbols, oo >>> A, B = symbols('A B', commutative=0) >>> x, y = symbols('x y') >>> (-2xy).args_cnc() [[-1, 2, x, y], []] >>> (-2.5x).args_cnc() [[-1, 2.5, x], []] >>> (-2xABy).args_cnc() [[-1, 2, x, y], [A, B]] >>> (-2xABy).args_cnc(split_1=False) [[-2, x, y], [A, B]] >>> (-2xy).args_cnc(cset=True) [{-1, 2, x, y}, []] The arg is always treated as a Mul: >>> (-2 + x + A).args_cnc() [[], [x - 2 + A]] >>> (-oo).args_cnc() # -oo is a singleton [[-1, oo], []] """ if self.is_Mul: args = list(self.args) else: args = [self] for i, mi in enumerate(args): if not mi.is_commutative: c = args[:i] nc = args[i:] break else: c = args nc = [] if c and split_1 and ( c[0].is_Number and c[0].is_extended_negative and c[0] is not S.NegativeOne): c[:1] = [S.NegativeOne, -c[0]] if cset: clen = len(c) c = set(c) if clen and warn and len(c) != clen: raise ValueError('repeated commutative arguments: %s' % [ci for ci in c if list(self.args).count(ci) > 1]) return [c, nc] def coeff(self, x, n=1, right=False): """ Returns the coefficient from the term(s) containing ``x*n``. If ``n`` is zero then all terms independent of ``x`` will be returned. When ``x`` is noncommutative, the coefficient to the left (default) or right of ``x`` can be returned. The keyword 'right' is ignored when ``x`` is commutative. See Also ======== as_coefficient: separate the expression into a coefficient and factor as_coeff_Add: separate the additive constant from an expression as_coeff_Mul: separate the multiplicative constant from an expression as_independent: separate x-dependent terms/factors from others sympy.polys.polytools.coeff_monomial: efficiently find the single coefficient of a monomial in Poly sympy.polys.polytools.nth: like coeff_monomial but powers of monomial terms are used Examples ======== >>> from sympy import symbols >>> from sympy.abc import x, y, z You can select terms that have an explicit negative in front of them: >>> (-x + 2y).coeff(-1) x >>> (x - 2y).coeff(-1) 2y You can select terms with no Rational coefficient: >>> (x + 2y).coeff(1) x >>> (3 + 2x + 4x2).coeff(1) 0 You can select terms independent of x by making n=0; in this case expr.as_independent(x)[0] is returned (and 0 will be returned instead of None): >>> (3 + 2x + 4x2).coeff(x, 0) 3 >>> eq = ((x + 1)3).expand() + 1 >>> eq x3 + 3x*2 + 3x + 2 >>> [eq.coeff(x, i) for i in reversed(range(4))] [1, 3, 3, 2] >>> eq -= 2 >>> [eq.coeff(x, i) for i in reversed(range(4))] [1, 3, 3, 0] You can select terms that have a numerical term in front of them: >>> (-x - 2y).coeff(2) -y >>> from sympy import sqrt >>> (x + sqrt(2)x).coeff(sqrt(2)) x The matching is exact: >>> (3 + 2x + 4x*2).coeff(x) 2 >>> (3 + 2x + 4x2).coeff(x2) 4 >>> (3 + 2x + 4x2).coeff(x3) 0 >>> (z(x + y)2).coeff((x + y)2) z >>> (z(x + y)2).coeff(x + y) 0 In addition, no factoring is done, so 1 + z(1 + y) is not obtained from the following: >>> (x + z(x + xy)).coeff(x) 1 If such factoring is desired, factor_terms can be used first: >>> from sympy import factor_terms >>> factor_terms(x + z(x + xy)).coeff(x) z(y + 1) + 1 >>> n, m, o = symbols('n m o', commutative=False) >>> n.coeff(n) 1 >>> (3n).coeff(n) 3 >>> (nm + mnm).coeff(n) # = (1 + m)nm 1 + m >>> (nm + mnm).coeff(n, right=True) # = (1 + m)nm m If there is more than one possible coefficient 0 is returned: >>> (nm + mn).coeff(n) 0 If there is only one possible coefficient, it is returned: >>> (nm + xmn).coeff(mn) x >>> (nm + xmn).coeff(mn, right=1) 1 """ x = sympify(x) if not isinstance(x, Basic): return S.Zero n = as_int(n) if not x: return S.Zero if x == self: if n == 1: return S.One return S.Zero if x is S.One: co = [a for a in Add.make_args(self) if a.as_coeff_Mul()[0] is S.One] if not co: return S.Zero return Add(co) if n == 0: if x.is_Add and self.is_Add: c = self.coeff(x, right=right) if not c: return S.Zero if not right: return self - Add([ax for a in Add.make_args(c)]) return self - Add([xa for a in Add.make_args(c)]) return self.as_independent(x, as_Add=True)[0] # continue with the full method, looking for this power of x: x = xn def incommon(l1, l2): if not l1 or not l2: return [] n = min(len(l1), len(l2)) for i in range(n): if l1[i] != l2[i]: return l1[:i] return l1[:] def find(l, sub, first=True): """ Find where list sub appears in list l. When ``first`` is True the first occurrence from the left is returned, else the last occurrence is returned. Return None if sub is not in l. >> l = range(5)2 >> find(l, [2, 3]) 2 >> find(l, [2, 3], first=0) 7 >> find(l, [2, 4]) None """ if not sub or not l or len(sub) > len(l): return None n = len(sub) if not first: l.reverse() sub.reverse() for i in range(0, len(l) - n + 1): if all(l[i + j] == sub[j] for j in range(n)): break else: i = None if not first: l.reverse() sub.reverse() if i is not None and not first: i = len(l) - (i + n) return i co = [] args = Add.make_args(self) self_c = self.is_commutative x_c = x.is_commutative if self_c and not x_c: return S.Zero if self_c: xargs = x.args_cnc(cset=True, warn=False)[0] for a in args: margs = a.args_cnc(cset=True, warn=False)[0] if len(xargs) > len(margs): continue resid = margs.difference(xargs) if len(resid) + len(xargs) == len(margs): co.append(Mul(resid)) if co == []: return S.Zero elif co: return Add(co) elif x_c: xargs = x.args_cnc(cset=True, warn=False)[0] for a in args: margs, nc = a.args_cnc(cset=True) if len(xargs) > len(margs): continue resid = margs.difference(xargs) if len(resid) + len(xargs) == len(margs): co.append(Mul((list(resid) + nc))) if co == []: return S.Zero elif co: return Add(co) else: # both nc xargs, nx = x.args_cnc(cset=True) # find the parts that pass the commutative terms for a in args: margs, nc = a.args_cnc(cset=True) if len(xargs) > len(margs): continue resid = margs.difference(xargs) if len(resid) + len(xargs) == len(margs): co.append((resid, nc)) # now check the non-comm parts if not co: return S.Zero if all(n == co[0][1] for r, n in co): ii = find(co[0][1], nx, right) if ii is not None: if not right: return Mul(Add([Mul(r) for r, c in co]), Mul(co[0][1][:ii])) else: return Mul(co[0][1][ii + len(nx):]) beg = reduce(incommon, (n[1] for n in co)) if beg: ii = find(beg, nx, right) if ii is not None: if not right: gcdc = co[0][0] for i in range(1, len(co)): gcdc = gcdc.intersection(co[i][0]) if not gcdc: break return Mul((list(gcdc) + beg[:ii])) else: m = ii + len(nx) return Add([Mul((list(r) + n[m:])) for r, n in co]) end = list(reversed( reduce(incommon, (list(reversed(n[1])) for n in co)))) if end: ii = find(end, nx, right) if ii is not None: if not right: return Add([Mul((list(r) + n[:-len(end) + ii])) for r, n in co]) else: return Mul(end[ii + len(nx):]) # look for single match hit = None for i, (r, n) in enumerate(co): ii = find(n, nx, right) if ii is not None: if not hit: hit = ii, r, n else: break else: if hit: ii, r, n = hit if not right: return Mul((list(r) + n[:ii])) else: return Mul(n[ii + len(nx):]) return S.Zero def as_expr(self, gens): """ Convert a polynomial to a SymPy expression. Examples ======== >>> from sympy import sin >>> from sympy.abc import x, y >>> f = (x2 + xy).as_poly(x, y) >>> f.as_expr() x*2 + xy >>> sin(x).as_expr() sin(x) """ return self def as_coefficient(self, expr): """ Extracts symbolic coefficient at the given expression. In other words, this functions separates 'self' into the product of 'expr' and 'expr'-free coefficient. If such separation is not possible it will return None. Examples ======== >>> from sympy import E, pi, sin, I, Poly >>> from sympy.abc import x >>> E.as_coefficient(E) 1 >>> (2E).as_coefficient(E) 2 >>> (2sin(E)E).as_coefficient(E) Two terms have E in them so a sum is returned. (If one were desiring the coefficient of the term exactly matching E then the constant from the returned expression could be selected. Or, for greater precision, a method of Poly can be used to indicate the desired term from which the coefficient is desired.) >>> (2E + xE).as_coefficient(E) x + 2 >>> _.args[0] # just want the exact match 2 >>> p = Poly(2E + xE); p Poly(xE + 2E, x, E, domain='ZZ') >>> p.coeff_monomial(E) 2 >>> p.nth(0, 1) 2 Since the following cannot be written as a product containing E as a factor, None is returned. (If the coefficient ``2x`` is desired then the ``coeff`` method should be used.) >>> (2Ex + x).as_coefficient(E) >>> (2Ex + x).coeff(E) 2x >>> (E(x + 1) + x).as_coefficient(E) >>> (2piI).as_coefficient(piI) 2 >>> (2I).as_coefficient(piI) See Also ======== coeff: return sum of terms have a given factor as_coeff_Add: separate the additive constant from an expression as_coeff_Mul: separate the multiplicative constant from an expression as_independent: separate x-dependent terms/factors from others sympy.polys.polytools.coeff_monomial: efficiently find the single coefficient of a monomial in Poly sympy.polys.polytools.nth: like coeff_monomial but powers of monomial terms are used """ r = self.extract_multiplicatively(expr) if r and not r.has(expr): return r def as_independent(self, deps, *hint): """ A mostly naive separation of a Mul or Add into arguments that are not are dependent on deps. To obtain as complete a separation of variables as possible, use a separation method first, e.g.: separatevars() to change Mul, Add and Pow (including exp) into Mul * .expand(mul=True) to change Add or Mul into Add * .expand(log=True) to change log expr into an Add The only non-naive thing that is done here is to respect noncommutative ordering of variables and to always return (0, 0) for `self` of zero regardless of hints. For nonzero `self`, the returned tuple (i, d) has the following interpretation: * i will has no variable that appears in deps * d will either have terms that contain variables that are in deps, or be equal to 0 (when self is an Add) or 1 (when self is a Mul) * if self is an Add then self = i + d * if self is a Mul then self = id otherwise (self, S.One) or (S.One, self) is returned. To force the expression to be treated as an Add, use the hint as_Add=True Examples ======== -- self is an Add >>> from sympy import sin, cos, exp >>> from sympy.abc import x, y, z >>> (x + xy).as_independent(x) (0, xy + x) >>> (x + xy).as_independent(y) (x, xy) >>> (2xsin(x) + y + x + z).as_independent(x) (y + z, 2xsin(x) + x) >>> (2xsin(x) + y + x + z).as_independent(x, y) (z, 2xsin(x) + x + y) -- self is a Mul >>> (xsin(x)cos(y)).as_independent(x) (cos(y), xsin(x)) non-commutative terms cannot always be separated out when self is a Mul >>> from sympy import symbols >>> n1, n2, n3 = symbols('n1 n2 n3', commutative=False) >>> (n1 + n1n2).as_independent(n2) (n1, n1n2) >>> (n2n1 + n1n2).as_independent(n2) (0, n1n2 + n2n1) >>> (n1n2n3).as_independent(n1) (1, n1n2n3) >>> (n1n2n3).as_independent(n2) (n1, n2n3) >>> ((x-n1)(x-y)).as_independent(x) (1, (x - y)(x - n1)) -- self is anything else: >>> (sin(x)).as_independent(x) (1, sin(x)) >>> (sin(x)).as_independent(y) (sin(x), 1) >>> exp(x+y).as_independent(x) (1, exp(x + y)) -- force self to be treated as an Add: >>> (3x).as_independent(x, as_Add=True) (0, 3x) -- force self to be treated as a Mul: >>> (3+x).as_independent(x, as_Add=False) (1, x + 3) >>> (-3+x).as_independent(x, as_Add=False) (1, x - 3) Note how the below differs from the above in making the constant on the dep term positive. >>> (y(-3+x)).as_independent(x) (y, x - 3) -- use .as_independent() for true independence testing instead of .has(). The former considers only symbols in the free symbols while the latter considers all symbols >>> from sympy import Integral >>> I = Integral(x, (x, 1, 2)) >>> I.has(x) True >>> x in I.free_symbols False >>> I.as_independent(x) == (I, 1) True >>> (I + x).as_independent(x) == (I, x) True Note: when trying to get independent terms, a separation method might need to be used first. In this case, it is important to keep track of what you send to this routine so you know how to interpret the returned values >>> from sympy import separatevars, log >>> separatevars(exp(x+y)).as_independent(x) (exp(y), exp(x)) >>> (x + xy).as_independent(y) (x, xy) >>> separatevars(x + xy).as_independent(y) (x, y + 1) >>> (x(1 + y)).as_independent(y) (x, y + 1) >>> (x(1 + y)).expand(mul=True).as_independent(y) (x, xy) >>> a, b=symbols('a b', positive=True) >>> (log(ab).expand(log=True)).as_independent(b) (log(a), log(b)) See Also ======== .separatevars(), .expand(log=True), Add.as_two_terms(), Mul.as_two_terms(), .as_coeff_add(), .as_coeff_mul() """ from .symbol import Symbol from .add import _unevaluated_Add from .mul import _unevaluated_Mul from sympy.utilities.iterables import sift if self.is_zero: return S.Zero, S.Zero func = self.func if hint.get('as_Add', isinstance(self, Add) ): want = Add else: want = Mul # sift out deps into symbolic and other and ignore # all symbols but those that are in the free symbols sym = set() other = [] for d in deps: if isinstance(d, Symbol): # Symbol.is_Symbol is True sym.add(d) else: other.append(d) def has(e): """return the standard has() if there are no literal symbols, else check to see that symbol-deps are in the free symbols.""" has_other = e.has(other) if not sym: return has_other return has_other or e.has((e.free_symbols & sym)) if (want is not func or func is not Add and func is not Mul): if has(self): return (want.identity, self) else: return (self, want.identity) else: if func is Add: args = list(self.args) else: args, nc = self.args_cnc() d = sift(args, lambda x: has(x)) depend = d[True] indep = d[False] if func is Add: # all terms were treated as commutative return (Add(indep), _unevaluated_Add(depend)) else: # handle noncommutative by stopping at first dependent term for i, n in enumerate(nc): if has(n): depend.extend(nc[i:]) break indep.append(n) return Mul(indep), ( Mul(depend, evaluate=False) if nc else _unevaluated_Mul(depend)) def as_real_imag(self, deep=True, hints): """Performs complex expansion on 'self' and returns a tuple containing collected both real and imaginary parts. This method can't be confused with re() and im() functions, which does not perform complex expansion at evaluation. However it is possible to expand both re() and im() functions and get exactly the same results as with a single call to this function. >>> from sympy import symbols, I >>> x, y = symbols('x,y', real=True) >>> (x + yI).as_real_imag() (x, y) >>> from sympy.abc import z, w >>> (z + wI).as_real_imag() (re(z) - im(w), re(w) + im(z)) """ from sympy import im, re if hints.get('ignore') == self: return None else: return (re(self), im(self)) def as_powers_dict(self): """Return self as a dictionary of factors with each factor being treated as a power. The keys are the bases of the factors and the values, the corresponding exponents. The resulting dictionary should be used with caution if the expression is a Mul and contains non- commutative factors since the order that they appeared will be lost in the dictionary. See Also ======== as_ordered_factors: An alternative for noncommutative applications, returning an ordered list of factors. args_cnc: Similar to as_ordered_factors, but guarantees separation of commutative and noncommutative factors. """ d = defaultdict(int) d.update(dict([self.as_base_exp()])) return d def as_coefficients_dict(self): """Return a dictionary mapping terms to their Rational coefficient. Since the dictionary is a defaultdict, inquiries about terms which were not present will return a coefficient of 0. If an expression is not an Add it is considered to have a single term. Examples ======== >>> from sympy.abc import a, x >>> (3x + ax + 4).as_coefficients_dict() {1: 4, x: 3, ax: 1} >>> _[a] 0 >>> (3ax).as_coefficients_dict() {ax: 3} """ c, m = self.as_coeff_Mul() if not c.is_Rational: c = S.One m = self d = defaultdict(int) d.update({m: c}) return d def as_base_exp(self): # a -> b * e return self, S.One def as_coeff_mul(self, deps, kwargs): """Return the tuple (c, args) where self is written as a Mul, ``m``. c should be a Rational multiplied by any factors of the Mul that are independent of deps. args should be a tuple of all other factors of m; args is empty if self is a Number or if self is independent of deps (when given). This should be used when you don't know if self is a Mul or not but you want to treat self as a Mul or if you want to process the individual arguments of the tail of self as a Mul. - if you know self is a Mul and want only the head, use self.args[0]; - if you don't want to process the arguments of the tail but need the tail then use self.as_two_terms() which gives the head and tail; - if you want to split self into an independent and dependent parts use ``self.as_independent(deps)`` >>> from sympy import S >>> from sympy.abc import x, y >>> (S(3)).as_coeff_mul() (3, ()) >>> (3xy).as_coeff_mul() (3, (x, y)) >>> (3xy).as_coeff_mul(x) (3y, (x,)) >>> (3y).as_coeff_mul(x) (3y, ()) """ if deps: if not self.has(deps): return self, tuple() return S.One, (self,) def as_coeff_add(self, deps): """Return the tuple (c, args) where self is written as an Add, ``a``. c should be a Rational added to any terms of the Add that are independent of deps. args should be a tuple of all other terms of ``a``; args is empty if self is a Number or if self is independent of deps (when given). This should be used when you don't know if self is an Add or not but you want to treat self as an Add or if you want to process the individual arguments of the tail of self as an Add. - if you know self is an Add and want only the head, use self.args[0]; - if you don't want to process the arguments of the tail but need the tail then use self.as_two_terms() which gives the head and tail. - if you want to split self into an independent and dependent parts use ``self.as_independent(deps)`` >>> from sympy import S >>> from sympy.abc import x, y >>> (S(3)).as_coeff_add() (3, ()) >>> (3 + x).as_coeff_add() (3, (x,)) >>> (3 + x + y).as_coeff_add(x) (y + 3, (x,)) >>> (3 + y).as_coeff_add(x) (y + 3, ()) """ if deps: if not self.has(deps): return self, tuple() return S.Zero, (self,) def primitive(self): """Return the positive Rational that can be extracted non-recursively from every term of self (i.e., self is treated like an Add). This is like the as_coeff_Mul() method but primitive always extracts a positive Rational (never a negative or a Float). Examples ======== >>> from sympy.abc import x >>> (3(x + 1)2).primitive() (3, (x + 1)2) >>> a = (6x + 2); a.primitive() (2, 3x + 1) >>> b = (x/2 + 3); b.primitive() (1/2, x + 6) >>> (ab).primitive() == (1, ab) True """ if not self: return S.One, S.Zero c, r = self.as_coeff_Mul(rational=True) if c.is_negative: c, r = -c, -r return c, r def as_content_primitive(self, radical=False, clear=True): """This method should recursively remove a Rational from all arguments and return that (content) and the new self (primitive). The content should always be positive and ``Mul(foo.as_content_primitive()) == foo``. The primitive need not be in canonical form and should try to preserve the underlying structure if possible (i.e. expand_mul should not be applied to self). Examples ======== >>> from sympy import sqrt >>> from sympy.abc import x, y, z >>> eq = 2 + 2x + 2y(3 + 3y) The as_content_primitive function is recursive and retains structure: >>> eq.as_content_primitive() (2, x + 3y(y + 1) + 1) Integer powers will have Rationals extracted from the base: >>> ((2 + 6x)*2).as_content_primitive() (4, (3x + 1)*2) >>> ((2 + 6x)*(2y)).as_content_primitive() (1, (2(3x + 1))*(2y)) Terms may end up joining once their as_content_primitives are added: >>> ((5(x(1 + y)) + 2x(3 + 3y))).as_content_primitive() (11, x(y + 1)) >>> ((3(x(1 + y)) + 2x(3 + 3y))).as_content_primitive() (9, x(y + 1)) >>> ((3(z(1 + y)) + 2.0x(3 + 3y))).as_content_primitive() (1, 6.0x(y + 1) + 3z(y + 1)) >>> ((5(x(1 + y)) + 2x(3 + 3y))2).as_content_primitive() (121, x2(y + 1)2) >>> ((5(x(1 + y)) + 2.0x(3 + 3y))*2).as_content_primitive() (1, 121.0x*2(y + 1)*2) Radical content can also be factored out of the primitive: >>> (2sqrt(2) + 4sqrt(10)).as_content_primitive(radical=True) (2, sqrt(2)(1 + 2sqrt(5))) If clear=False (default is True) then content will not be removed from an Add if it can be distributed to leave one or more terms with integer coefficients. >>> (x/2 + y).as_content_primitive() (1/2, x + 2y) >>> (x/2 + y).as_content_primitive(clear=False) (1, x/2 + y) """ return S.One, self def as_numer_denom(self): """ expression -> a/b -> a, b This is just a stub that should be defined by an object's class methods to get anything else. See Also ======== normal: return a/b instead of a, b """ return self, S.One def normal(self): from .mul import _unevaluated_Mul n, d = self.as_numer_denom() if d is S.One: return n if d.is_Number: return _unevaluated_Mul(n, 1/d) else: return n/d def extract_multiplicatively(self, c): """Return None if it's not possible to make self in the form c * something in a nice way, i.e. preserving the properties of arguments of self. Examples ======== >>> from sympy import symbols, Rational >>> x, y = symbols('x,y', real=True) >>> ((xy)3).extract_multiplicatively(x2 y) xy2 >>> ((xy)3).extract_multiplicatively(x4 * y) >>> (2x).extract_multiplicatively(2) x >>> (2x).extract_multiplicatively(3) >>> (Rational(1, 2)x).extract_multiplicatively(3) x/6 """ from .add import _unevaluated_Add c = sympify(c) if self is S.NaN: return None if c is S.One: return self elif c == self: return S.One if c.is_Add: cc, pc = c.primitive() if cc is not S.One: c = Mul(cc, pc, evaluate=False) if c.is_Mul: a, b = c.as_two_terms() x = self.extract_multiplicatively(a) if x is not None: return x.extract_multiplicatively(b) quotient = self / c if self.is_Number: if self is S.Infinity: if c.is_positive: return S.Infinity elif self is S.NegativeInfinity: if c.is_negative: return S.Infinity elif c.is_positive: return S.NegativeInfinity elif self is S.ComplexInfinity: if not c.is_zero: return S.ComplexInfinity elif self.is_Integer: if not quotient.is_Integer: return None elif self.is_positive and quotient.is_negative: return None else: return quotient elif self.is_Rational: if not quotient.is_Rational: return None elif self.is_positive and quotient.is_negative: return None else: return quotient elif self.is_Float: if not quotient.is_Float: return None elif self.is_positive and quotient.is_negative: return None else: return quotient elif self.is_NumberSymbol or self.is_Symbol or self is S.ImaginaryUnit: if quotient.is_Mul and len(quotient.args) == 2: if quotient.args[0].is_Integer and quotient.args[0].is_positive and quotient.args[1] == self: return quotient elif quotient.is_Integer and c.is_Number: return quotient elif self.is_Add: cs, ps = self.primitive() # assert cs >= 1 if c.is_Number and c is not S.NegativeOne: # assert c != 1 (handled at top) if cs is not S.One: if c.is_negative: xc = -(cs.extract_multiplicatively(-c)) else: xc = cs.extract_multiplicatively(c) if xc is not None: return xcps # rely on 2-arg Mul to restore Add return # \|c\| != 1 can only be extracted from cs if c == ps: return cs # check args of ps newargs = [] for arg in ps.args: newarg = arg.extract_multiplicatively(c) if newarg is None: return # all or nothing newargs.append(newarg) if cs is not S.One: args = [cst for t in newargs] # args may be in different order return _unevaluated_Add(args) else: return Add._from_args(newargs) elif self.is_Mul: args = list(self.args) for i, arg in enumerate(args): newarg = arg.extract_multiplicatively(c) if newarg is not None: args[i] = newarg return Mul(args) elif self.is_Pow: if c.is_Pow and c.base == self.base: new_exp = self.exp.extract_additively(c.exp) if new_exp is not None: return self.base * (new_exp) elif c == self.base: new_exp = self.exp.extract_additively(1) if new_exp is not None: return self.base ** (new_exp) def extract_additively(self, c): """Return self - c if it's possible to subtract c from self and make all matching coefficients move towards zero, else return None. Examples ======== >>> from sympy.abc import x, y >>> e = 2x + 3 >>> e.extract_additively(x + 1) x + 2 >>> e.extract_additively(3x) >>> e.extract_additively(4) >>> (y(x + 1)).extract_additively(x + 1) >>> ((x + 1)(x + 2y + 1) + 3).extract_additively(x + 1) (x + 1)(x + 2y) + 3 Sometimes auto-expansion will return a less simplified result than desired; gcd_terms might be used in such cases: >>> from sympy import gcd_terms >>> (4x(y + 1) + y).extract_additively(x) 4x(y + 1) + x(4y + 3) - x(4y + 4) + y >>> gcd_terms(_) x(4y + 3) + y See Also ======== extract_multiplicatively coeff as_coefficient """ c = sympify(c) if self is S.NaN: return None if c is S.Zero: return self elif c == self: return S.Zero elif self is S.Zero: return None if self.is_Number: if not c.is_Number: return None co = self diff = co - c # XXX should we match types? i.e should 3 - .1 succeed? if (co > 0 and diff > 0 and diff < co or co < 0 and diff < 0 and diff > co): return diff return None if c.is_Number: co, t = self.as_coeff_Add() xa = co.extract_additively(c) if xa is None: return None return xa + t # handle the args[0].is_Number case separately # since we will have trouble looking for the coeff of # a number. if c.is_Add and c.args[0].is_Number: # whole term as a term factor co = self.coeff(c) xa0 = (co.extract_additively(1) or 0)c if xa0: diff = self - coc return (xa0 + (diff.extract_additively(c) or diff)) or None # term-wise h, t = c.as_coeff_Add() sh, st = self.as_coeff_Add() xa = sh.extract_additively(h) if xa is None: return None xa2 = st.extract_additively(t) if xa2 is None: return None return xa + xa2 # whole term as a term factor co = self.coeff(c) xa0 = (co.extract_additively(1) or 0)c if xa0: diff = self - coc return (xa0 + (diff.extract_additively(c) or diff)) or None # term-wise coeffs = [] for a in Add.make_args(c): ac, at = a.as_coeff_Mul() co = self.coeff(at) if not co: return None coc, cot = co.as_coeff_Add() xa = coc.extract_additively(ac) if xa is None: return None self -= coat coeffs.append((cot + xa)at) coeffs.append(self) return Add(coeffs) @property def expr_free_symbols(self): """ Like ``free_symbols``, but returns the free symbols only if they are contained in an expression node. Examples ======== >>> from sympy.abc import x, y >>> (x + y).expr_free_symbols {x, y} If the expression is contained in a non-expression object, don't return the free symbols. Compare: >>> from sympy import Tuple >>> t = Tuple(x + y) >>> t.expr_free_symbols set() >>> t.free_symbols {x, y} """ return {j for i in self.args for j in i.expr_free_symbols} def could_extract_minus_sign(self): """Return True if self is not in a canonical form with respect to its sign. For most expressions, e, there will be a difference in e and -e. When there is, True will be returned for one and False for the other; False will be returned if there is no difference. Examples ======== >>> from sympy.abc import x, y >>> e = x - y >>> {i.could_extract_minus_sign() for i in (e, -e)} {False, True} """ negative_self = -self if self == negative_self: return False # e.g. zoox == -zoox self_has_minus = (self.extract_multiplicatively(-1) is not None) negative_self_has_minus = ( (negative_self).extract_multiplicatively(-1) is not None) if self_has_minus != negative_self_has_minus: return self_has_minus else: if self.is_Add: # We choose the one with less arguments with minus signs all_args = len(self.args) negative_args = len([False for arg in self.args if arg.could_extract_minus_sign()]) positive_args = all_args - negative_args if positive_args > negative_args: return False elif positive_args < negative_args: return True elif self.is_Mul: # We choose the one with an odd number of minus signs num, den = self.as_numer_denom() args = Mul.make_args(num) + Mul.make_args(den) arg_signs = [arg.could_extract_minus_sign() for arg in args] negative_args = list(filter(None, arg_signs)) return len(negative_args) % 2 == 1 # As a last resort, we choose the one with greater value of .sort_key() return bool(self.sort_key() < negative_self.sort_key()) def extract_branch_factor(self, allow_half=False): """ Try to write self as ``exp_polar(2piIn)z`` in a nice way. Return (z, n). >>> from sympy import exp_polar, I, pi >>> from sympy.abc import x, y >>> exp_polar(Ipi).extract_branch_factor() (exp_polar(Ipi), 0) >>> exp_polar(2Ipi).extract_branch_factor() (1, 1) >>> exp_polar(-piI).extract_branch_factor() (exp_polar(Ipi), -1) >>> exp_polar(3piI + x).extract_branch_factor() (exp_polar(x + Ipi), 1) >>> (yexp_polar(-5piI)exp_polar(3piI + 2pix)).extract_branch_factor() (yexp_polar(2pix), -1) >>> exp_polar(-Ipi/2).extract_branch_factor() (exp_polar(-Ipi/2), 0) If allow_half is True, also extract exp_polar(Ipi): >>> exp_polar(Ipi).extract_branch_factor(allow_half=True) (1, 1/2) >>> exp_polar(2Ipi).extract_branch_factor(allow_half=True) (1, 1) >>> exp_polar(3Ipi).extract_branch_factor(allow_half=True) (1, 3/2) >>> exp_polar(-Ipi).extract_branch_factor(allow_half=True) (1, -1/2) """ from sympy import exp_polar, pi, I, ceiling, Add n = S(0) res = S(1) args = Mul.make_args(self) exps = [] for arg in args: if isinstance(arg, exp_polar): exps += [arg.exp] else: res = arg piimult = S(0) extras = [] while exps: exp = exps.pop() if exp.is_Add: exps += exp.args continue if exp.is_Mul: coeff = exp.as_coefficient(piI) if coeff is not None: piimult += coeff continue extras += [exp] if piimult.is_number: coeff = piimult tail = () else: coeff, tail = piimult.as_coeff_add(piimult.free_symbols) # round down to nearest multiple of 2 branchfact = ceiling(coeff/2 - S(1)/2)2 n += branchfact/2 c = coeff - branchfact if allow_half: nc = c.extract_additively(1) if nc is not None: n += S(1)/2 c = nc newexp = piIAdd(((c, ) + tail)) + Add(extras) if newexp != 0: res = exp_polar(newexp) return res, n def _eval_is_polynomial(self, syms): if self.free_symbols.intersection(syms) == set([]): return True return False def is_polynomial(self, syms): r""" Return True if self is a polynomial in syms and False otherwise. This checks if self is an exact polynomial in syms. This function returns False for expressions that are "polynomials" with symbolic exponents. Thus, you should be able to apply polynomial algorithms to expressions for which this returns True, and Poly(expr, \syms) should work if and only if expr.is_polynomial(\syms) returns True. The polynomial does not have to be in expanded form. If no symbols are given, all free symbols in the expression will be used. This is not part of the assumptions system. You cannot do Symbol('z', polynomial=True). Examples ======== >>> from sympy import Symbol >>> x = Symbol('x') >>> ((x2 + 1)4).is_polynomial(x) True >>> ((x2 + 1)4).is_polynomial() True >>> (2x + 1).is_polynomial(x) False >>> n = Symbol('n', nonnegative=True, integer=True) >>> (xn + 1).is_polynomial(x) False This function does not attempt any nontrivial simplifications that may result in an expression that does not appear to be a polynomial to become one. >>> from sympy import sqrt, factor, cancel >>> y = Symbol('y', positive=True) >>> a = sqrt(y2 + 2y + 1) >>> a.is_polynomial(y) False >>> factor(a) y + 1 >>> factor(a).is_polynomial(y) True >>> b = (y*2 + 2y + 1)/(y + 1) >>> b.is_polynomial(y) False >>> cancel(b) y + 1 >>> cancel(b).is_polynomial(y) True See also .is_rational_function() """ if syms: syms = set(map(sympify, syms)) else: syms = self.free_symbols if syms.intersection(self.free_symbols) == set([]): # constant polynomial return True else: return self._eval_is_polynomial(syms) def _eval_is_rational_function(self, syms): if self.free_symbols.intersection(syms) == set([]): return True return False def is_rational_function(self, syms): """ Test whether function is a ratio of two polynomials in the given symbols, syms. When syms is not given, all free symbols will be used. The rational function does not have to be in expanded or in any kind of canonical form. This function returns False for expressions that are "rational functions" with symbolic exponents. Thus, you should be able to call .as_numer_denom() and apply polynomial algorithms to the result for expressions for which this returns True. This is not part of the assumptions system. You cannot do Symbol('z', rational_function=True). Examples ======== >>> from sympy import Symbol, sin >>> from sympy.abc import x, y >>> (x/y).is_rational_function() True >>> (x2).is_rational_function() True >>> (x/sin(y)).is_rational_function(y) False >>> n = Symbol('n', integer=True) >>> (xn + 1).is_rational_function(x) False This function does not attempt any nontrivial simplifications that may result in an expression that does not appear to be a rational function to become one. >>> from sympy import sqrt, factor >>> y = Symbol('y', positive=True) >>> a = sqrt(y2 + 2y + 1)/y >>> a.is_rational_function(y) False >>> factor(a) (y + 1)/y >>> factor(a).is_rational_function(y) True See also is_algebraic_expr(). """ if self in [S.NaN, S.Infinity, -S.Infinity, S.ComplexInfinity]: return False if syms: syms = set(map(sympify, syms)) else: syms = self.free_symbols if syms.intersection(self.free_symbols) == set([]): # constant rational function return True else: return self._eval_is_rational_function(syms) def _eval_is_algebraic_expr(self, syms): if self.free_symbols.intersection(syms) == set([]): return True return False def is_algebraic_expr(self, syms): """ This tests whether a given expression is algebraic or not, in the given symbols, syms. When syms is not given, all free symbols will be used. The rational function does not have to be in expanded or in any kind of canonical form. This function returns False for expressions that are "algebraic expressions" with symbolic exponents. This is a simple extension to the is_rational_function, including rational exponentiation. Examples ======== >>> from sympy import Symbol, sqrt >>> x = Symbol('x', real=True) >>> sqrt(1 + x).is_rational_function() False >>> sqrt(1 + x).is_algebraic_expr() True This function does not attempt any nontrivial simplifications that may result in an expression that does not appear to be an algebraic expression to become one. >>> from sympy import exp, factor >>> a = sqrt(exp(x)2 + 2exp(x) + 1)/(exp(x) + 1) >>> a.is_algebraic_expr(x) False >>> factor(a).is_algebraic_expr() True See Also ======== is_rational_function() References ========== - https://en.wikipedia.org/wiki/Algebraic_expression """ if syms: syms = set(map(sympify, syms)) else: syms = self.free_symbols if syms.intersection(self.free_symbols) == set([]): # constant algebraic expression return True else: return self._eval_is_algebraic_expr(syms) ################################################################################### ##################### SERIES, LEADING TERM, LIMIT, ORDER METHODS ################## ################################################################################### def series(self, x=None, x0=0, n=6, dir="+", logx=None): """ Series expansion of "self" around ``x = x0`` yielding either terms of the series one by one (the lazy series given when n=None), else all the terms at once when n != None. Returns the series expansion of "self" around the point ``x = x0`` with respect to ``x`` up to ``O((x - x0)n, x, x0)`` (default n is 6). If ``x=None`` and ``self`` is univariate, the univariate symbol will be supplied, otherwise an error will be raised. Parameters ========== expr : Expression The expression whose series is to be expanded. x : Symbol It is the variable of the expression to be calculated. x0 : Value The value around which ``x`` is calculated. Can be any value from ``-oo`` to ``oo``. n : Value The number of terms upto which the series is to be expanded. dir : String, optional The series-expansion can be bi-directional. If ``dir="+"``, then (x->x0+). If ``dir="-", then (x->x0-). For infinite ``x0`` (``oo`` or ``-oo``), the ``dir`` argument is determined from the direction of the infinity (i.e., ``dir="-"`` for ``oo``). logx : optional It is used to replace any log(x) in the returned series with a symbolic value rather than evaluating the actual value. Examples ======== >>> from sympy import cos, exp, tan, oo, series >>> from sympy.abc import x, y >>> cos(x).series() 1 - x2/2 + x4/24 + O(x6) >>> cos(x).series(n=4) 1 - x2/2 + O(x4) >>> cos(x).series(x, x0=1, n=2) cos(1) - (x - 1)sin(1) + O((x - 1)2, (x, 1)) >>> e = cos(x + exp(y)) >>> e.series(y, n=2) cos(x + 1) - ysin(x + 1) + O(y*2) >>> e.series(x, n=2) cos(exp(y)) - xsin(exp(y)) + O(x2) If ``n=None`` then a generator of the series terms will be returned. >>> term=cos(x).series(n=None) >>> [next(term) for i in range(2)] [1, -x2/2] For ``dir=+`` (default) the series is calculated from the right and for ``dir=-`` the series from the left. For smooth functions this flag will not alter the results. >>> abs(x).series(dir="+") x >>> abs(x).series(dir="-") -x >>> f = tan(x) >>> f.series(x, 2, 6, "+") tan(2) + (1 + tan(2)*2)(x - 2) + (x - 2)*2(tan(2)3 + tan(2)) + (x - 2)3(1/3 + 4tan(2)2/3 + tan(2)4) + (x - 2)*4(tan(2)*5 + 5tan(2)*3/3 + 2tan(2)/3) + (x - 2)*5(2/15 + 17tan(2)2/15 + 2tan(2)4 + tan(2)6) + O((x - 2)*6, (x, 2)) >>> f.series(x, 2, 3, "-") tan(2) + (2 - x)(-tan(2)2 - 1) + (2 - x)2(tan(2)3 + tan(2)) + O((x - 2)3, (x, 2)) Returns ======= Expr : Expression Series expansion of the expression about x0 Raises ====== TypeError If "n" and "x0" are infinity objects PoleError If "x0" is an infinity object """ from sympy import collect, Dummy, Order, Rational, Symbol, ceiling if x is None: syms = self.free_symbols if not syms: return self elif len(syms) > 1: raise ValueError('x must be given for multivariate functions.') x = syms.pop() if isinstance(x, Symbol): dep = x in self.free_symbols else: d = Dummy() dep = d in self.xreplace({x: d}).free_symbols if not dep: if n is None: return (s for s in [self]) else: return self if len(dir) != 1 or dir not in '+-': raise ValueError("Dir must be '+' or '-'") if x0 in [S.Infinity, S.NegativeInfinity]: sgn = 1 if x0 is S.Infinity else -1 s = self.subs(x, sgn/x).series(x, n=n, dir='+') if n is None: return (si.subs(x, sgn/x) for si in s) return s.subs(x, sgn/x) # use rep to shift origin to x0 and change sign (if dir is negative) # and undo the process with rep2 if x0 or dir == '-': if dir == '-': rep = -x + x0 rep2 = -x rep2b = x0 else: rep = x + x0 rep2 = x rep2b = -x0 s = self.subs(x, rep).series(x, x0=0, n=n, dir='+', logx=logx) if n is None: # lseries... return (si.subs(x, rep2 + rep2b) for si in s) return s.subs(x, rep2 + rep2b) # from here on it's x0=0 and dir='+' handling if x.is_positive is x.is_negative is None or x.is_Symbol is not True: # replace x with an x that has a positive assumption xpos = Dummy('x', positive=True, finite=True) rv = self.subs(x, xpos).series(xpos, x0, n, dir, logx=logx) if n is None: return (s.subs(xpos, x) for s in rv) else: return rv.subs(xpos, x) if n is not None: # nseries handling s1 = self._eval_nseries(x, n=n, logx=logx) o = s1.getO() or S.Zero if o: # make sure the requested order is returned ngot = o.getn() if ngot > n: # leave o in its current form (e.g. with xlog(x)) so # it eats terms properly, then replace it below if n != 0: s1 += o.subs(x, x*Rational(n, ngot)) else: s1 += Order(1, x) elif ngot < n: # increase the requested number of terms to get the desired # number keep increasing (up to 9) until the received order # is different than the original order and then predict how # many additional terms are needed for more in range(1, 9): s1 = self._eval_nseries(x, n=n + more, logx=logx) newn = s1.getn() if newn != ngot: ndo = n + ceiling((n - ngot)more/(newn - ngot)) s1 = self._eval_nseries(x, n=ndo, logx=logx) while s1.getn() < n: s1 = self._eval_nseries(x, n=ndo, logx=logx) ndo += 1 break else: raise ValueError('Could not calculate %s terms for %s' % (str(n), self)) s1 += Order(xn, x) o = s1.getO() s1 = s1.removeO() else: o = Order(xn, x) s1done = s1.doit() if (s1done + o).removeO() == s1done: o = S.Zero try: return collect(s1, x) + o except NotImplementedError: return s1 + o else: # lseries handling def yield_lseries(s): """Return terms of lseries one at a time.""" for si in s: if not si.is_Add: yield si continue # yield terms 1 at a time if possible # by increasing order until all the # terms have been returned yielded = 0 o = Order(si, x)x ndid = 0 ndo = len(si.args) while 1: do = (si - yielded + o).removeO() o = x if not do or do.is_Order: continue if do.is_Add: ndid += len(do.args) else: ndid += 1 yield do if ndid == ndo: break yielded += do return yield_lseries(self.removeO()._eval_lseries(x, logx=logx)) def taylor_term(self, n, x, previous_terms): """General method for the taylor term. This method is slow, because it differentiates n-times. Subclasses can redefine it to make it faster by using the "previous_terms". """ from sympy import Dummy, factorial x = sympify(x) _x = Dummy('x') return self.subs(x, _x).diff(_x, n).subs(_x, x).subs(x, 0) xn / factorial(n) def lseries(self, x=None, x0=0, dir='+', logx=None): """ Wrapper for series yielding an iterator of the terms of the series. Note: an infinite series will yield an infinite iterator. The following, for exaxmple, will never terminate. It will just keep printing terms of the sin(x) series:: for term in sin(x).lseries(x): print term The advantage of lseries() over nseries() is that many times you are just interested in the next term in the series (i.e. the first term for example), but you don't know how many you should ask for in nseries() using the "n" parameter. See also nseries(). """ return self.series(x, x0, n=None, dir=dir, logx=logx) def _eval_lseries(self, x, logx=None): # default implementation of lseries is using nseries(), and adaptively # increasing the "n". As you can see, it is not very efficient, because # we are calculating the series over and over again. Subclasses should # override this method and implement much more efficient yielding of # terms. n = 0 series = self._eval_nseries(x, n=n, logx=logx) if not series.is_Order: if series.is_Add: yield series.removeO() else: yield series return while series.is_Order: n += 1 series = self._eval_nseries(x, n=n, logx=logx) e = series.removeO() yield e while 1: while 1: n += 1 series = self._eval_nseries(x, n=n, logx=logx).removeO() if e != series: break yield series - e e = series def nseries(self, x=None, x0=0, n=6, dir='+', logx=None): """ Wrapper to _eval_nseries if assumptions allow, else to series. If x is given, x0 is 0, dir='+', and self has x, then _eval_nseries is called. This calculates "n" terms in the innermost expressions and then builds up the final series just by "cross-multiplying" everything out. The optional ``logx`` parameter can be used to replace any log(x) in the returned series with a symbolic value to avoid evaluating log(x) at 0. A symbol to use in place of log(x) should be provided. Advantage -- it's fast, because we don't have to determine how many terms we need to calculate in advance. Disadvantage -- you may end up with less terms than you may have expected, but the O(xn) term appended will always be correct and so the result, though perhaps shorter, will also be correct. If any of those assumptions is not met, this is treated like a wrapper to series which will try harder to return the correct number of terms. See also lseries(). Examples ======== >>> from sympy import sin, log, Symbol >>> from sympy.abc import x, y >>> sin(x).nseries(x, 0, 6) x - x3/6 + x5/120 + O(x6) >>> log(x+1).nseries(x, 0, 5) x - x2/2 + x3/3 - x4/4 + O(x5) Handling of the ``logx`` parameter --- in the following example the expansion fails since ``sin`` does not have an asymptotic expansion at -oo (the limit of log(x) as x approaches 0): >>> e = sin(log(x)) >>> e.nseries(x, 0, 6) Traceback (most recent call last): ... PoleError: ... ... >>> logx = Symbol('logx') >>> e.nseries(x, 0, 6, logx=logx) sin(logx) In the following example, the expansion works but gives only an Order term unless the ``logx`` parameter is used: >>> e = xy >>> e.nseries(x, 0, 2) O(log(x)*2) >>> e.nseries(x, 0, 2, logx=logx) exp(logxy) """ if x and not x in self.free_symbols: return self if x is None or x0 or dir != '+': # {see XPOS above} or (x.is_positive == x.is_negative == None): return self.series(x, x0, n, dir) else: return self._eval_nseries(x, n=n, logx=logx) def _eval_nseries(self, x, n, logx): """ Return terms of series for self up to O(xn) at x=0 from the positive direction. This is a method that should be overridden in subclasses. Users should never call this method directly (use .nseries() instead), so you don't have to write docstrings for _eval_nseries(). """ from sympy.utilities.misc import filldedent raise NotImplementedError(filldedent(""" The _eval_nseries method should be added to %s to give terms up to O(xn) at x=0 from the positive direction so it is available when nseries calls it.""" % self.func) ) def limit(self, x, xlim, dir='+'): """ Compute limit x->xlim. """ from sympy.series.limits import limit return limit(self, x, xlim, dir) def compute_leading_term(self, x, logx=None): """ as_leading_term is only allowed for results of .series() This is a wrapper to compute a series first. """ from sympy import Dummy, log from sympy.series.gruntz import calculate_series if self.removeO() == 0: return self if logx is None: d = Dummy('logx') s = calculate_series(self, x, d).subs(d, log(x)) else: s = calculate_series(self, x, logx) return s.as_leading_term(x) @cacheit def as_leading_term(self, symbols): """ Returns the leading (nonzero) term of the series expansion of self. The _eval_as_leading_term routines are used to do this, and they must always return a non-zero value. Examples ======== >>> from sympy.abc import x >>> (1 + x + x2).as_leading_term(x) 1 >>> (1/x2 + x + x2).as_leading_term(x) x(-2) """ from sympy import powsimp if len(symbols) > 1: c = self for x in symbols: c = c.as_leading_term(x) return c elif not symbols: return self x = sympify(symbols[0]) if not x.is_symbol: raise ValueError('expecting a Symbol but got %s' % x) if x not in self.free_symbols: return self obj = self._eval_as_leading_term(x) if obj is not None: return powsimp(obj, deep=True, combine='exp') raise NotImplementedError('as_leading_term(%s, %s)' % (self, x)) def _eval_as_leading_term(self, x): return self def as_coeff_exponent(self, x): """ ``cx*e -> c,e`` where x can be any symbolic expression. """ from sympy import collect s = collect(self, x) c, p = s.as_coeff_mul(x) if len(p) == 1: b, e = p[0].as_base_exp() if b == x: return c, e return s, S.Zero def leadterm(self, x): """ Returns the leading term axb as a tuple (a, b). Examples ======== >>> from sympy.abc import x >>> (1+x+x2).leadterm(x) (1, 0) >>> (1/x2+x+x2).leadterm(x) (1, -2) """ from sympy import Dummy, log l = self.as_leading_term(x) d = Dummy('logx') if l.has(log(x)): l = l.subs(log(x), d) c, e = l.as_coeff_exponent(x) if x in c.free_symbols: from sympy.utilities.misc import filldedent raise ValueError(filldedent(""" cannot compute leadterm(%s, %s). The coefficient should have been free of x but got %s""" % (self, x, c))) c = c.subs(d, log(x)) return c, e def as_coeff_Mul(self, rational=False): """Efficiently extract the coefficient of a product. """ return S.One, self def as_coeff_Add(self, rational=False): """Efficiently extract the coefficient of a summation. """ return S.Zero, self def fps(self, x=None, x0=0, dir=1, hyper=True, order=4, rational=True, full=False): """ Compute formal power power series of self. See the docstring of the :func:`fps` function in sympy.series.formal for more information. """ from sympy.series.formal import fps return fps(self, x, x0, dir, hyper, order, rational, full) def fourier_series(self, limits=None): """Compute fourier sine/cosine series of self. See the docstring of the :func:`fourier_series` in sympy.series.fourier for more information. """ from sympy.series.fourier import fourier_series return fourier_series(self, limits) ################################################################################### ##################### DERIVATIVE, INTEGRAL, FUNCTIONAL METHODS #################### ################################################################################### def diff(self, symbols, assumptions): assumptions.setdefault("evaluate", True) return Derivative(self, symbols, assumptions) ########################################################################### ###################### EXPRESSION EXPANSION METHODS ####################### ########################################################################### # Relevant subclasses should override _eval_expand_hint() methods. See # the docstring of expand() for more info. def _eval_expand_complex(self, hints): real, imag = self.as_real_imag(*hints) return real + S.ImaginaryUnitimag @staticmethod def _expand_hint(expr, hint, deep=True, hints): """ Helper for ``expand()``. Recursively calls ``expr._eval_expand_hint()``. Returns ``(expr, hit)``, where expr is the (possibly) expanded ``expr`` and ``hit`` is ``True`` if ``expr`` was truly expanded and ``False`` otherwise. """ hit = False # XXX: Hack to support non-Basic args # \| # V if deep and getattr(expr, 'args', ()) and not expr.is_Atom: sargs = [] for arg in expr.args: arg, arghit = Expr._expand_hint(arg, hint, hints) hit \|= arghit sargs.append(arg) if hit: expr = expr.func(sargs) if hasattr(expr, hint): newexpr = getattr(expr, hint)(hints) if newexpr != expr: return (newexpr, True) return (expr, hit) @cacheit def expand(self, deep=True, modulus=None, power_base=True, power_exp=True, mul=True, log=True, multinomial=True, basic=True, hints): """ Expand an expression using hints. See the docstring of the expand() function in sympy.core.function for more information. """ from sympy.simplify.radsimp import fraction hints.update(power_base=power_base, power_exp=power_exp, mul=mul, log=log, multinomial=multinomial, basic=basic) expr = self if hints.pop('frac', False): n, d = [a.expand(deep=deep, modulus=modulus, hints) for a in fraction(self)] return n/d elif hints.pop('denom', False): n, d = fraction(self) return n/d.expand(deep=deep, modulus=modulus, hints) elif hints.pop('numer', False): n, d = fraction(self) return n.expand(deep=deep, modulus=modulus, hints)/d # Although the hints are sorted here, an earlier hint may get applied # at a given node in the expression tree before another because of how # the hints are applied. e.g. expand(log(x(y + z))) -> log(xy + # xz) because while applying log at the top level, log and mul are # applied at the deeper level in the tree so that when the log at the # upper level gets applied, the mul has already been applied at the # lower level. # Additionally, because hints are only applied once, the expression # may not be expanded all the way. For example, if mul is applied # before multinomial, x(x + 1)2 won't be expanded all the way. For # now, we just use a special case to make multinomial run before mul, # so that at least polynomials will be expanded all the way. In the # future, smarter heuristics should be applied. # TODO: Smarter heuristics def _expand_hint_key(hint): """Make multinomial come before mul""" if hint == 'mul': return 'mulz' return hint for hint in sorted(hints.keys(), key=_expand_hint_key): use_hint = hints[hint] if use_hint: hint = '_eval_expand_' + hint expr, hit = Expr._expand_hint(expr, hint, deep=deep, hints) while True: was = expr if hints.get('multinomial', False): expr, _ = Expr._expand_hint( expr, '_eval_expand_multinomial', deep=deep, hints) if hints.get('mul', False): expr, _ = Expr._expand_hint( expr, '_eval_expand_mul', deep=deep, hints) if hints.get('log', False): expr, _ = Expr._expand_hint( expr, '_eval_expand_log', deep=deep, hints) if expr == was: break if modulus is not None: modulus = sympify(modulus) if not modulus.is_Integer or modulus <= 0: raise ValueError( "modulus must be a positive integer, got %s" % modulus) terms = [] for term in Add.make_args(expr): coeff, tail = term.as_coeff_Mul(rational=True) coeff %= modulus if coeff: terms.append(coefftail) expr = Add(terms) return expr ########################################################################### ################### GLOBAL ACTION VERB WRAPPER METHODS #################### ########################################################################### def integrate(self, args, *kwargs): """See the integrate function in sympy.integrals""" from sympy.integrals import integrate return integrate(self, args, kwargs) def simplify(self, kwargs): """See the simplify function in sympy.simplify""" from sympy.simplify import simplify return simplify(self, *kwargs) def nsimplify(self, constants=[], tolerance=None, full=False): """See the nsimplify function in sympy.simplify""" from sympy.simplify import nsimplify return nsimplify(self, constants, tolerance, full) def separate(self, deep=False, force=False): """See the separate function in sympy.simplify""" from sympy.core.function import expand_power_base return expand_power_base(self, deep=deep, force=force) def collect(self, syms, func=None, evaluate=True, exact=False, distribute_order_term=True): """See the collect function in sympy.simplify""" from sympy.simplify import collect return collect(self, syms, func, evaluate, exact, distribute_order_term) def together(self, args, *kwargs): """See the together function in sympy.polys""" from sympy.polys import together return together(self, args, kwargs) def apart(self, x=None, args): """See the apart function in sympy.polys""" from sympy.polys import apart return apart(self, x, args) def ratsimp(self): """See the ratsimp function in sympy.simplify""" from sympy.simplify import ratsimp return ratsimp(self) def trigsimp(self, args): """See the trigsimp function in sympy.simplify""" from sympy.simplify import trigsimp return trigsimp(self, args) def radsimp(self, kwargs): """See the radsimp function in sympy.simplify""" from sympy.simplify import radsimp return radsimp(self, *kwargs) def powsimp(self, args, *kwargs): """See the powsimp function in sympy.simplify""" from sympy.simplify import powsimp return powsimp(self, args, *kwargs) def combsimp(self): """See the combsimp function in sympy.simplify""" from sympy.simplify import combsimp return combsimp(self) def gammasimp(self): """See the gammasimp function in sympy.simplify""" from sympy.simplify import gammasimp return gammasimp(self) def factor(self, gens, *args): """See the factor() function in sympy.polys.polytools""" from sympy.polys import factor return factor(self, gens, *args) def refine(self, assumption=True): """See the refine function in sympy.assumptions""" from sympy.assumptions import refine return refine(self, assumption) def cancel(self, gens, *args): """See the cancel function in sympy.polys""" from sympy.polys import cancel return cancel(self, gens, *args) def invert(self, g, gens, *args): """Return the multiplicative inverse of ``self`` mod ``g`` where ``self`` (and ``g``) may be symbolic expressions). See Also ======== sympy.core.numbers.mod_inverse, sympy.polys.polytools.invert """ from sympy.polys.polytools import invert from sympy.core.numbers import mod_inverse if self.is_number and getattr(g, 'is_number', True): return mod_inverse(self, g) return invert(self, g, gens, *args) def round(self, n=None): """Return x rounded to the given decimal place. If a complex number would results, apply round to the real and imaginary components of the number. Examples ======== >>> from sympy import pi, E, I, S, Add, Mul, Number >>> pi.round() 3 >>> pi.round(2) 3.14 >>> (2pi + EI).round() 6 + 3I The round method has a chopping effect: >>> (2pi + I/10).round() 6 >>> (pi/10 + 2I).round() 2I >>> (pi/10 + EI).round(2) 0.31 + 2.72I Notes ===== The Python builtin function, round, always returns a float in Python 2 while the SymPy round method (and round with a Number argument in Python 3) returns a Number. >>> from sympy.core.compatibility import PY3 >>> isinstance(round(S(123), -2), Number if PY3 else float) True For a consistent behavior, and Python 3 rounding rules, import `round` from sympy.core.compatibility. >>> from sympy.core.compatibility import round >>> isinstance(round(S(123), -2), Number) True """ from sympy.core.power import integer_log from sympy.core.numbers import Float x = self if not x.is_number: raise TypeError("can't round symbolic expression") if not x.is_Atom: if not pure_complex(x.n(2), or_real=True): raise TypeError( 'Expected a number but got %s:' % func_name(x)) elif x in (S.NaN, S.Infinity, S.NegativeInfinity, S.ComplexInfinity): return x if not x.is_extended_real: i, r = x.as_real_imag() return i.round(n) + S.ImaginaryUnitr.round(n) if not x: return S.Zero if n is None else x p = as_int(n or 0) if x.is_Integer: # XXX return Integer(round(int(x), p)) when Py2 is dropped if p >= 0: return x m = 10*-p i, r = divmod(abs(x), m) if i%2 and 2r == m: i += 1 elif 2r > m: i += 1 if x < 0: i = -1 return im digits_to_decimal = _mag(x) # _mag(12) = 2, _mag(.012) = -1 allow = digits_needed = digits_to_decimal + p precs = [f._prec for f in x.atoms(Float)] dps = prec_to_dps(max(precs)) if precs else None if dps is None: # assume everything is exact so use the Python # float default or whatever was requested dps = max(15, allow) else: allow = min(allow, dps) # this will shift all digits to right of decimal # and give us dps to work with as an int shift = -digits_to_decimal + dps extra = 1 # how far we look past known digits # NOTE # mpmath will calculate the binary representation to # an arbitrary number of digits but we must base our # answer on a finite number of those digits, e.g. # .575 2589569785738035/252 in binary. # mpmath shows us that the first 18 digits are # >>> Float(.575).n(18) # 0.574999999999999956 # The default precision is 15 digits and if we ask # for 15 we get # >>> Float(.575).n(15) # 0.575000000000000 # mpmath handles rounding at the 15th digit. But we # need to be careful since the user might be asking # for rounding at the last digit and our semantics # are to round toward the even final digit when there # is a tie. So the extra digit will be used to make # that decision. In this case, the value is the same # to 15 digits: # >>> Float(.575).n(16) # 0.5750000000000000 # Now converting this to the 15 known digits gives # 575000000000000.0 # which rounds to integer # 5750000000000000 # And now we can round to the desired digt, e.g. at # the second from the left and we get # 5800000000000000 # and rescaling that gives # 0.58 # as the final result. # If the value is made slightly less than 0.575 we might # still obtain the same value: # >>> Float(.575-1e-16).n(16)10*15 # 574999999999999.8 # What 15 digits best represents the known digits (which are # to the left of the decimal? 5750000000000000, the same as # before. The only way we will round down (in this case) is # if we declared that we had more than 15 digits of precision. # For example, if we use 16 digits of precision, the integer # we deal with is # >>> Float(.575-1e-16).n(17)10*16 # 5749999999999998.4 # and this now rounds to 5749999999999998 and (if we round to # the 2nd digit from the left) we get 5700000000000000. # xf = x.n(dps + extra)Pow(10, shift) xi = Integer(xf) # use the last digit to select the value of xi # nearest to x before rounding at the desired digit sign = 1 if x > 0 else -1 dif2 = sign(xf - xi).n(extra) if dif2 < 0: raise NotImplementedError( 'not expecting int(x) to round away from 0') if dif2 > .5: xi += sign # round away from 0 elif dif2 == .5: xi += sign if xi%2 else -sign # round toward even # shift p to the new position ip = p - shift # let Python handle the int rounding then rescale xr = xi.round(ip) # when Py2 is drop make this round(xi.p, ip) # restore scale rv = Rational(xr, Pow(10, shift)) # return Float or Integer if rv.is_Integer: if n is None: # the single-arg case return rv # use str or else it won't be a float return Float(str(rv), dps) # keep same precision else: if not allow and rv > self: allow += 1 return Float(rv, allow) __round__ = round def _eval_derivative_matrix_lines(self, x): from sympy.matrices.expressions.matexpr import _LeftRightArgs return [_LeftRightArgs([S.One, S.One], higher=self._eval_derivative(x))] class AtomicExpr(Atom, Expr): """ A parent class for object which are both atoms and Exprs. For example: Symbol, Number, Rational, Integer, ... But not: Add, Mul, Pow, ... """ is_number = False is_Atom = True __slots__ = [] def _eval_derivative(self, s): if self == s: return S.One return S.Zero def _eval_derivative_n_times(self, s, n): from sympy import Piecewise, Eq from sympy import Tuple, MatrixExpr from sympy.matrices.common import MatrixCommon if isinstance(s, (MatrixCommon, Tuple, Iterable, MatrixExpr)): return super(AtomicExpr, self)._eval_derivative_n_times(s, n) if self == s: return Piecewise((self, Eq(n, 0)), (1, Eq(n, 1)), (0, True)) else: return Piecewise((self, Eq(n, 0)), (0, True)) def _eval_is_polynomial(self, syms): return True def _eval_is_rational_function(self, syms): return True def _eval_is_algebraic_expr(self, syms): return True def _eval_nseries(self, x, n, logx): return self @property def expr_free_symbols(self): return {self} def _mag(x): """Return integer ``i`` such that .1 <= x/10i < 1 Examples ======== >>> from sympy.core.expr import _mag >>> from sympy import Float >>> _mag(Float(.1)) 0 >>> _mag(Float(.01)) -1 >>> _mag(Float(1234)) 4 """ from math import log10, ceil, log from sympy import Float xpos = abs(x.n()) if not xpos: return S.Zero try: mag_first_dig = int(ceil(log10(xpos))) except (ValueError, OverflowError): mag_first_dig = int(ceil(Float(mpf_log(xpos._mpf_, 53))/log(10))) # check that we aren't off by 1 if (xpos/10mag_first_dig) >= 1: assert 1 <= (xpos/10mag_first_dig) < 10 mag_first_dig += 1 return mag_first_dig class UnevaluatedExpr(Expr): """ Expression that is not evaluated unless released. Examples ======== >>> from sympy import UnevaluatedExpr >>> from sympy.abc import a, b, x, y >>> x(1/x) 1 >>> xUnevaluatedExpr(1/x) x1/x """ def __new__(cls, arg, kwargs): arg = _sympify(arg) obj = Expr.__new__(cls, arg, kwargs) return obj def doit(self, kwargs): if kwargs.get("deep", True): return self.args[0].doit(kwargs) else: return self.args[0] def _n2(a, b): """Return (a - b).evalf(2) if a and b are comparable, else None. This should only be used when a and b are already sympified. """ # /!\ it is very important (see issue 8245) not to # use a re-evaluated number in the calculation of dif if a.is_comparable and b.is_comparable: dif = (a - b).evalf(2) if dif.is_comparable: return dif def unchanged(func, args): """Return True if `func` applied to the `args` is unchanged. Can be used instead of `assert foo == foo`. Examples ======== >>> from sympy import Piecewise, cos, pi >>> from sympy.core.expr import unchanged >>> from sympy.abc import x >>> unchanged(cos, 1) # instead of assert cos(1) == cos(1) True >>> unchanged(cos, pi) False Comparison of args uses the builtin capabilities of the object's arguments to test for equality so args can be defined loosely. Here, the ExprCondPair arguments of Piecewise compare as equal to the tuples that can be used to create the Piecewise: >>> unchanged(Piecewise, (x, x > 1), (0, True)) True """ f = func(args) return f.func == func and f.args == args class ExprBuilder(object): def __init__(self, op, args=[], validator=None, check=True): if not hasattr(op, "__call__"): raise TypeError("op {} needs to be callable".format(op)) self.op = op self.args = args self.validator = validator if (validator is not None) and check: self.validate() @staticmethod def _build_args(args): return [i.build() if isinstance(i, ExprBuilder) else i for i in args] def validate(self): if self.validator is None: return args = self._build_args(self.args) self.validator(args) def build(self, check=True): args = self._build_args(self.args) if self.validator and check: self.validator(args) return self.op(args) def append_argument(self, arg, check=True): self.args.append(arg) if self.validator and check: self.validate(self.args) def __getitem__(self, item): if item == 0: return self.op else: return self.args[item-1] def __repr__(self): return str(self.build()) def search_element(self, elem): for i, arg in enumerate(self.args): if isinstance(arg, ExprBuilder): ret = arg.search_index(elem) if ret is not None: return (i,) + ret elif id(arg) == id(elem): return (i,) return None from .mul import Mul from .add import Add from .power import Pow from .function import Derivative, Function from .mod import Mod from .exprtools import factor_terms from .numbers import Integer, Rational
4ed46a159d2d9a568e1ef7ff1c7a509552a023e28346a762f73ee444d0de7956	from __future__ import print_function, division from sympy.utilities.exceptions import SymPyDeprecationWarning from .add import _unevaluated_Add, Add from .basic import S from .compatibility import ordered from .expr import Expr from .evalf import EvalfMixin from .sympify import _sympify from .evaluate import global_evaluate from sympy.logic.boolalg import Boolean, BooleanAtom __all__ = ( 'Rel', 'Eq', 'Ne', 'Lt', 'Le', 'Gt', 'Ge', 'Relational', 'Equality', 'Unequality', 'StrictLessThan', 'LessThan', 'StrictGreaterThan', 'GreaterThan', ) # Note, see issue 4986. Ideally, we wouldn't want to subclass both Boolean # and Expr. def _canonical(cond): # return a condition in which all relationals are canonical reps = {r: r.canonical for r in cond.atoms(Relational)} return cond.xreplace(reps) # XXX: AttributeError was being caught here but it wasn't triggered by any of # the tests so I've removed it... class Relational(Boolean, Expr, EvalfMixin): """Base class for all relation types. Subclasses of Relational should generally be instantiated directly, but Relational can be instantiated with a valid `rop` value to dispatch to the appropriate subclass. Parameters ========== rop : str or None Indicates what subclass to instantiate. Valid values can be found in the keys of Relational.ValidRelationalOperator. Examples ======== >>> from sympy import Rel >>> from sympy.abc import x, y >>> Rel(y, x + x2, '==') Eq(y, x2 + x) """ __slots__ = [] is_Relational = True # ValidRelationOperator - Defined below, because the necessary classes # have not yet been defined def __new__(cls, lhs, rhs, rop=None, assumptions): # If called by a subclass, do nothing special and pass on to Expr. if cls is not Relational: return Expr.__new__(cls, lhs, rhs, assumptions) # If called directly with an operator, look up the subclass # corresponding to that operator and delegate to it try: cls = cls.ValidRelationOperator[rop] rv = cls(lhs, rhs, *assumptions) # /// drop when Py2 is no longer supported # validate that Booleans are not being used in a relational # other than Eq/Ne; if isinstance(rv, (Eq, Ne)): pass elif isinstance(rv, Relational): # could it be otherwise? from sympy.core.symbol import Symbol from sympy.logic.boolalg import Boolean for a in rv.args: if isinstance(a, Symbol): continue if isinstance(a, Boolean): from sympy.utilities.misc import filldedent raise TypeError(filldedent(''' A Boolean argument can only be used in Eq and Ne; all other relationals expect real expressions. ''')) # \\\ return rv except KeyError: raise ValueError( "Invalid relational operator symbol: %r" % rop) @property def lhs(self): """The left-hand side of the relation.""" return self._args[0] @property def rhs(self): """The right-hand side of the relation.""" return self._args[1] @property def reversed(self): """Return the relationship with sides reversed. Examples ======== >>> from sympy import Eq >>> from sympy.abc import x >>> Eq(x, 1) Eq(x, 1) >>> _.reversed Eq(1, x) >>> x < 1 x < 1 >>> _.reversed 1 > x """ ops = {Eq: Eq, Gt: Lt, Ge: Le, Lt: Gt, Le: Ge, Ne: Ne} a, b = self.args return Relational.__new__(ops.get(self.func, self.func), b, a) @property def reversedsign(self): """Return the relationship with signs reversed. Examples ======== >>> from sympy import Eq >>> from sympy.abc import x >>> Eq(x, 1) Eq(x, 1) >>> _.reversedsign Eq(-x, -1) >>> x < 1 x < 1 >>> _.reversedsign -x > -1 """ a, b = self.args if not (isinstance(a, BooleanAtom) or isinstance(b, BooleanAtom)): ops = {Eq: Eq, Gt: Lt, Ge: Le, Lt: Gt, Le: Ge, Ne: Ne} return Relational.__new__(ops.get(self.func, self.func), -a, -b) else: return self @property def negated(self): """Return the negated relationship. Examples ======== >>> from sympy import Eq >>> from sympy.abc import x >>> Eq(x, 1) Eq(x, 1) >>> _.negated Ne(x, 1) >>> x < 1 x < 1 >>> _.negated x >= 1 Notes ===== This works more or less identical to ``~``/``Not``. The difference is that ``negated`` returns the relationship even if `evaluate=False`. Hence, this is useful in code when checking for e.g. negated relations to existing ones as it will not be affected by the `evaluate` flag. """ ops = {Eq: Ne, Ge: Lt, Gt: Le, Le: Gt, Lt: Ge, Ne: Eq} # If there ever will be new Relational subclasses, the following line # will work until it is properly sorted out # return ops.get(self.func, lambda a, b, evaluate=False: ~(self.func(a, # b, evaluate=evaluate)))(self.args, evaluate=False) return Relational.__new__(ops.get(self.func), self.args) def _eval_evalf(self, prec): return self.func([s._evalf(prec) for s in self.args]) @property def canonical(self): """Return a canonical form of the relational by putting a Number on the rhs else ordering the args. The relation is also changed so that the left-hand side expression does not start with a `-`. No other simplification is attempted. Examples ======== >>> from sympy.abc import x, y >>> x < 2 x < 2 >>> _.reversed.canonical x < 2 >>> (-y < x).canonical x > -y >>> (-y > x).canonical x < -y """ args = self.args r = self if r.rhs.is_number: if r.rhs.is_Number and r.lhs.is_Number and r.lhs > r.rhs: r = r.reversed elif r.lhs.is_number: r = r.reversed elif tuple(ordered(args)) != args: r = r.reversed # Check if first value has negative sign if not isinstance(r.lhs, BooleanAtom) and \ r.lhs.could_extract_minus_sign(): r = r.reversedsign elif not isinstance(r.rhs, BooleanAtom) and not r.rhs.is_number and \ r.rhs.could_extract_minus_sign(): # Right hand side has a minus, but not lhs. # How does the expression with reversed signs behave? # This is so that expressions of the type Eq(x, -y) and Eq(-x, y) # have the same canonical representation expr1, _ = ordered([r.lhs, -r.rhs]) if expr1 != r.lhs: r = r.reversed.reversedsign return r def equals(self, other, failing_expression=False): """Return True if the sides of the relationship are mathematically identical and the type of relationship is the same. If failing_expression is True, return the expression whose truth value was unknown.""" if isinstance(other, Relational): if self == other or self.reversed == other: return True a, b = self, other if a.func in (Eq, Ne) or b.func in (Eq, Ne): if a.func != b.func: return False left, right = [i.equals(j, failing_expression=failing_expression) for i, j in zip(a.args, b.args)] if left is True: return right if right is True: return left lr, rl = [i.equals(j, failing_expression=failing_expression) for i, j in zip(a.args, b.reversed.args)] if lr is True: return rl if rl is True: return lr e = (left, right, lr, rl) if all(i is False for i in e): return False for i in e: if i not in (True, False): return i else: if b.func != a.func: b = b.reversed if a.func != b.func: return False left = a.lhs.equals(b.lhs, failing_expression=failing_expression) if left is False: return False right = a.rhs.equals(b.rhs, failing_expression=failing_expression) if right is False: return False if left is True: return right return left def _eval_simplify(self, *kwargs): r = self r = r.func([i.simplify(*kwargs) for i in r.args]) if r.is_Relational: dif = r.lhs - r.rhs # replace dif with a valid Number that will # allow a definitive comparison with 0 v = None if dif.is_comparable: v = dif.n(2) elif dif.equals(0): # XXX this is expensive v = S.Zero if v is not None: r = r.func._eval_relation(v, S.Zero) r = r.canonical measure = kwargs['measure'] if measure(r) < kwargs['ratio']measure(self): return r else: return self def _eval_trigsimp(self, opts): from sympy.simplify import trigsimp return self.func(trigsimp(self.lhs, opts), trigsimp(self.rhs, opts)) def __nonzero__(self): raise TypeError("cannot determine truth value of Relational") __bool__ = __nonzero__ def _eval_as_set(self): # self is univariate and periodicity(self, x) in (0, None) from sympy.solvers.inequalities import solve_univariate_inequality syms = self.free_symbols assert len(syms) == 1 x = syms.pop() return solve_univariate_inequality(self, x, relational=False) @property def binary_symbols(self): # override where necessary return set() Rel = Relational class Equality(Relational): """An equal relation between two objects. Represents that two objects are equal. If they can be easily shown to be definitively equal (or unequal), this will reduce to True (or False). Otherwise, the relation is maintained as an unevaluated Equality object. Use the ``simplify`` function on this object for more nontrivial evaluation of the equality relation. As usual, the keyword argument ``evaluate=False`` can be used to prevent any evaluation. Examples ======== >>> from sympy import Eq, simplify, exp, cos >>> from sympy.abc import x, y >>> Eq(y, x + x2) Eq(y, x2 + x) >>> Eq(2, 5) False >>> Eq(2, 5, evaluate=False) Eq(2, 5) >>> _.doit() False >>> Eq(exp(x), exp(x).rewrite(cos)) Eq(exp(x), sinh(x) + cosh(x)) >>> simplify(_) True See Also ======== sympy.logic.boolalg.Equivalent : for representing equality between two boolean expressions Notes ===== This class is not the same as the == operator. The == operator tests for exact structural equality between two expressions; this class compares expressions mathematically. If either object defines an `_eval_Eq` method, it can be used in place of the default algorithm. If `lhs._eval_Eq(rhs)` or `rhs._eval_Eq(lhs)` returns anything other than None, that return value will be substituted for the Equality. If None is returned by `_eval_Eq`, an Equality object will be created as usual. Since this object is already an expression, it does not respond to the method `as_expr` if one tries to create `x - y` from Eq(x, y). This can be done with the `rewrite(Add)` method. """ rel_op = '==' __slots__ = [] is_Equality = True def __new__(cls, lhs, rhs=None, options): from sympy.core.add import Add from sympy.core.logic import fuzzy_bool from sympy.core.expr import _n2 from sympy.simplify.simplify import clear_coefficients if rhs is None: SymPyDeprecationWarning( feature="Eq(expr) with rhs default to 0", useinstead="Eq(expr, 0)", issue=16587, deprecated_since_version="1.5" ).warn() rhs = 0 lhs = _sympify(lhs) rhs = _sympify(rhs) evaluate = options.pop('evaluate', global_evaluate[0]) if evaluate: # If one expression has an _eval_Eq, return its results. if hasattr(lhs, '_eval_Eq'): r = lhs._eval_Eq(rhs) if r is not None: return r if hasattr(rhs, '_eval_Eq'): r = rhs._eval_Eq(lhs) if r is not None: return r # If expressions have the same structure, they must be equal. if lhs == rhs: return S.true # e.g. True == True elif all(isinstance(i, BooleanAtom) for i in (rhs, lhs)): return S.false # True != False elif not (lhs.is_Symbol or rhs.is_Symbol) and ( isinstance(lhs, Boolean) != isinstance(rhs, Boolean)): return S.false # only Booleans can equal Booleans # check finiteness fin = L, R = [i.is_finite for i in (lhs, rhs)] if None not in fin: if L != R: return S.false if L is False: if lhs == -rhs: # Eq(oo, -oo) return S.false return S.true elif None in fin and False in fin: return Relational.__new__(cls, lhs, rhs, *options) if all(isinstance(i, Expr) for i in (lhs, rhs)): # see if the difference evaluates dif = lhs - rhs z = dif.is_zero if z is not None: if z is False and dif.is_commutative: # issue 10728 return S.false if z: return S.true # evaluate numerically if possible n2 = _n2(lhs, rhs) if n2 is not None: return _sympify(n2 == 0) # see if the ratio evaluates n, d = dif.as_numer_denom() rv = None if n.is_zero: rv = d.is_nonzero elif n.is_finite: if d.is_infinite: rv = S.true elif n.is_zero is False: rv = d.is_infinite if rv is None: # if the condition that makes the denominator # infinite does not make the original expression # True then False can be returned l, r = clear_coefficients(d, S.Infinity) args = [_.subs(l, r) for _ in (lhs, rhs)] if args != [lhs, rhs]: rv = fuzzy_bool(Eq(args)) if rv is True: rv = None elif any(a.is_infinite for a in Add.make_args(n)): # (inf or nan)/x != 0 rv = S.false if rv is not None: return _sympify(rv) return Relational.__new__(cls, lhs, rhs, *options) @classmethod def _eval_relation(cls, lhs, rhs): return _sympify(lhs == rhs) def _eval_rewrite_as_Add(self, args, *kwargs): """return Eq(L, R) as L - R. To control the evaluation of the result set pass `evaluate=True` to give L - R; if `evaluate=None` then terms in L and R will not cancel but they will be listed in canonical order; otherwise non-canonical args will be returned. Examples ======== >>> from sympy import Eq, Add >>> from sympy.abc import b, x >>> eq = Eq(x + b, x - b) >>> eq.rewrite(Add) 2b >>> eq.rewrite(Add, evaluate=None).args (b, b, x, -x) >>> eq.rewrite(Add, evaluate=False).args (b, x, b, -x) """ L, R = args evaluate = kwargs.get('evaluate', True) if evaluate: # allow cancellation of args return L - R args = Add.make_args(L) + Add.make_args(-R) if evaluate is None: # no cancellation, but canonical return _unevaluated_Add(args) # no cancellation, not canonical return Add._from_args(args) @property def binary_symbols(self): if S.true in self.args or S.false in self.args: if self.lhs.is_Symbol: return set([self.lhs]) elif self.rhs.is_Symbol: return set([self.rhs]) return set() def _eval_simplify(self, kwargs): from sympy.solvers.solveset import linear_coeffs # standard simplify e = super(Equality, self)._eval_simplify(kwargs) if not isinstance(e, Equality): return e free = self.free_symbols if len(free) == 1: try: x = free.pop() m, b = linear_coeffs( e.rewrite(Add, evaluate=False), x) if m.is_zero is False: enew = e.func(x, -b/m) else: enew = e.func(mx, -b) measure = kwargs['measure'] if measure(enew) <= kwargs['ratio']measure(e): e = enew except ValueError: pass return e.canonical Eq = Equality class Unequality(Relational): """An unequal relation between two objects. Represents that two objects are not equal. If they can be shown to be definitively equal, this will reduce to False; if definitively unequal, this will reduce to True. Otherwise, the relation is maintained as an Unequality object. Examples ======== >>> from sympy import Ne >>> from sympy.abc import x, y >>> Ne(y, x+x2) Ne(y, x2 + x) See Also ======== Equality Notes ===== This class is not the same as the != operator. The != operator tests for exact structural equality between two expressions; this class compares expressions mathematically. This class is effectively the inverse of Equality. As such, it uses the same algorithms, including any available `_eval_Eq` methods. """ rel_op = '!=' __slots__ = [] def __new__(cls, lhs, rhs, options): lhs = _sympify(lhs) rhs = _sympify(rhs) evaluate = options.pop('evaluate', global_evaluate[0]) if evaluate: is_equal = Equality(lhs, rhs) if isinstance(is_equal, BooleanAtom): return is_equal.negated return Relational.__new__(cls, lhs, rhs, options) @classmethod def _eval_relation(cls, lhs, rhs): return _sympify(lhs != rhs) @property def binary_symbols(self): if S.true in self.args or S.false in self.args: if self.lhs.is_Symbol: return set([self.lhs]) elif self.rhs.is_Symbol: return set([self.rhs]) return set() def _eval_simplify(self, kwargs): # simplify as an equality eq = Equality(self.args)._eval_simplify(*kwargs) if isinstance(eq, Equality): # send back Ne with the new args return self.func(eq.args) return eq.negated # result of Ne is the negated Eq Ne = Unequality class _Inequality(Relational): """Internal base class for all Than types. Each subclass must implement _eval_relation to provide the method for comparing two real numbers. """ __slots__ = [] def __new__(cls, lhs, rhs, options): lhs = _sympify(lhs) rhs = _sympify(rhs) evaluate = options.pop('evaluate', global_evaluate[0]) if evaluate: # First we invoke the appropriate inequality method of `lhs` # (e.g., `lhs.__lt__`). That method will try to reduce to # boolean or raise an exception. It may keep calling # superclasses until it reaches `Expr` (e.g., `Expr.__lt__`). # In some cases, `Expr` will just invoke us again (if neither it # nor a subclass was able to reduce to boolean or raise an # exception). In that case, it must call us with # `evaluate=False` to prevent infinite recursion. r = cls._eval_relation(lhs, rhs) if r is not None: return r # Note: not sure r could be None, perhaps we never take this # path? In principle, could use this to shortcut out if a # class realizes the inequality cannot be evaluated further. # make a "non-evaluated" Expr for the inequality return Relational.__new__(cls, lhs, rhs, options) class _Greater(_Inequality): """Not intended for general use _Greater is only used so that GreaterThan and StrictGreaterThan may subclass it for the .gts and .lts properties. """ __slots__ = () @property def gts(self): return self._args[0] @property def lts(self): return self._args[1] class _Less(_Inequality): """Not intended for general use. _Less is only used so that LessThan and StrictLessThan may subclass it for the .gts and .lts properties. """ __slots__ = () @property def gts(self): return self._args[1] @property def lts(self): return self._args[0] class GreaterThan(_Greater): """Class representations of inequalities. Extended Summary ================ The ``Than`` classes represent inequal relationships, where the left-hand side is generally bigger or smaller than the right-hand side. For example, the GreaterThan class represents an inequal relationship where the left-hand side is at least as big as the right side, if not bigger. In mathematical notation: lhs >= rhs In total, there are four ``Than`` classes, to represent the four inequalities: +-----------------+--------+ \|Class Name \| Symbol \| +=================+========+ \|GreaterThan \| (>=) \| +-----------------+--------+ \|LessThan \| (<=) \| +-----------------+--------+ \|StrictGreaterThan\| (>) \| +-----------------+--------+ \|StrictLessThan \| (<) \| +-----------------+--------+ All classes take two arguments, lhs and rhs. +----------------------------+-----------------+ \|Signature Example \| Math equivalent \| +============================+=================+ \|GreaterThan(lhs, rhs) \| lhs >= rhs \| +----------------------------+-----------------+ \|LessThan(lhs, rhs) \| lhs <= rhs \| +----------------------------+-----------------+ \|StrictGreaterThan(lhs, rhs) \| lhs > rhs \| +----------------------------+-----------------+ \|StrictLessThan(lhs, rhs) \| lhs < rhs \| +----------------------------+-----------------+ In addition to the normal .lhs and .rhs of Relations, ``Than`` inequality objects also have the .lts and .gts properties, which represent the "less than side" and "greater than side" of the operator. Use of .lts and .gts in an algorithm rather than .lhs and .rhs as an assumption of inequality direction will make more explicit the intent of a certain section of code, and will make it similarly more robust to client code changes: >>> from sympy import GreaterThan, StrictGreaterThan >>> from sympy import LessThan, StrictLessThan >>> from sympy import And, Ge, Gt, Le, Lt, Rel, S >>> from sympy.abc import x, y, z >>> from sympy.core.relational import Relational >>> e = GreaterThan(x, 1) >>> e x >= 1 >>> '%s >= %s is the same as %s <= %s' % (e.gts, e.lts, e.lts, e.gts) 'x >= 1 is the same as 1 <= x' Examples ======== One generally does not instantiate these classes directly, but uses various convenience methods: >>> for f in [Ge, Gt, Le, Lt]: # convenience wrappers ... print(f(x, 2)) x >= 2 x > 2 x <= 2 x < 2 Another option is to use the Python inequality operators (>=, >, <=, <) directly. Their main advantage over the Ge, Gt, Le, and Lt counterparts, is that one can write a more "mathematical looking" statement rather than littering the math with oddball function calls. However there are certain (minor) caveats of which to be aware (search for 'gotcha', below). >>> x >= 2 x >= 2 >>> _ == Ge(x, 2) True However, it is also perfectly valid to instantiate a ``Than`` class less succinctly and less conveniently: >>> Rel(x, 1, ">") x > 1 >>> Relational(x, 1, ">") x > 1 >>> StrictGreaterThan(x, 1) x > 1 >>> GreaterThan(x, 1) x >= 1 >>> LessThan(x, 1) x <= 1 >>> StrictLessThan(x, 1) x < 1 Notes ===== There are a couple of "gotchas" to be aware of when using Python's operators. The first is that what your write is not always what you get: >>> 1 < x x > 1 Due to the order that Python parses a statement, it may not immediately find two objects comparable. When "1 < x" is evaluated, Python recognizes that the number 1 is a native number and that x is not*. Because a native Python number does not know how to compare itself with a SymPy object Python will try the reflective operation, "x > 1" and that is the form that gets evaluated, hence returned. If the order of the statement is important (for visual output to the console, perhaps), one can work around this annoyance in a couple ways: (1) "sympify" the literal before comparison >>> S(1) < x 1 < x (2) use one of the wrappers or less succinct methods described above >>> Lt(1, x) 1 < x >>> Relational(1, x, "<") 1 < x The second gotcha involves writing equality tests between relationals when one or both sides of the test involve a literal relational: >>> e = x < 1; e x < 1 >>> e == e # neither side is a literal True >>> e == x < 1 # expecting True, too False >>> e != x < 1 # expecting False x < 1 >>> x < 1 != x < 1 # expecting False or the same thing as before Traceback (most recent call last): ... TypeError: cannot determine truth value of Relational The solution for this case is to wrap literal relationals in parentheses: >>> e == (x < 1) True >>> e != (x < 1) False >>> (x < 1) != (x < 1) False The third gotcha involves chained inequalities not involving '==' or '!='. Occasionally, one may be tempted to write: >>> e = x < y < z Traceback (most recent call last): ... TypeError: symbolic boolean expression has no truth value. Due to an implementation detail or decision of Python [1]_, there is no way for SymPy to create a chained inequality with that syntax so one must use And: >>> e = And(x < y, y < z) >>> type( e ) And >>> e (x < y) & (y < z) Although this can also be done with the '&' operator, it cannot be done with the 'and' operarator: >>> (x < y) & (y < z) (x < y) & (y < z) >>> (x < y) and (y < z) Traceback (most recent call last): ... TypeError: cannot determine truth value of Relational .. [1] This implementation detail is that Python provides no reliable method to determine that a chained inequality is being built. Chained comparison operators are evaluated pairwise, using "and" logic (see http://docs.python.org/2/reference/expressions.html#notin). This is done in an efficient way, so that each object being compared is only evaluated once and the comparison can short-circuit. For example, ``1 > 2 > 3`` is evaluated by Python as ``(1 > 2) and (2 > 3)``. The ``and`` operator coerces each side into a bool, returning the object itself when it short-circuits. The bool of the --Than operators will raise TypeError on purpose, because SymPy cannot determine the mathematical ordering of symbolic expressions. Thus, if we were to compute ``x > y > z``, with ``x``, ``y``, and ``z`` being Symbols, Python converts the statement (roughly) into these steps: (1) x > y > z (2) (x > y) and (y > z) (3) (GreaterThanObject) and (y > z) (4) (GreaterThanObject.__nonzero__()) and (y > z) (5) TypeError Because of the "and" added at step 2, the statement gets turned into a weak ternary statement, and the first object's __nonzero__ method will raise TypeError. Thus, creating a chained inequality is not possible. In Python, there is no way to override the ``and`` operator, or to control how it short circuits, so it is impossible to make something like ``x > y > z`` work. There was a PEP to change this, :pep:`335`, but it was officially closed in March, 2012. """ __slots__ = () rel_op = '>=' @classmethod def _eval_relation(cls, lhs, rhs): # We don't use the op symbol here: workaround issue #7951 return _sympify(lhs.__ge__(rhs)) Ge = GreaterThan class LessThan(_Less): __doc__ = GreaterThan.__doc__ __slots__ = () rel_op = '<=' @classmethod def _eval_relation(cls, lhs, rhs): # We don't use the op symbol here: workaround issue #7951 return _sympify(lhs.__le__(rhs)) Le = LessThan class StrictGreaterThan(_Greater): __doc__ = GreaterThan.__doc__ __slots__ = () rel_op = '>' @classmethod def _eval_relation(cls, lhs, rhs): # We don't use the op symbol here: workaround issue #7951 return _sympify(lhs.__gt__(rhs)) Gt = StrictGreaterThan class StrictLessThan(_Less): __doc__ = GreaterThan.__doc__ __slots__ = () rel_op = '<' @classmethod def _eval_relation(cls, lhs, rhs): # We don't use the op symbol here: workaround issue #7951 return _sympify(lhs.__lt__(rhs)) Lt = StrictLessThan # A class-specific (not object-specific) data item used for a minor speedup. # It is defined here, rather than directly in the class, because the classes # that it references have not been defined until now (e.g. StrictLessThan). Relational.ValidRelationOperator = { None: Equality, '==': Equality, 'eq': Equality, '!=': Unequality, '<>': Unequality, 'ne': Unequality, '>=': GreaterThan, 'ge': GreaterThan, '<=': LessThan, 'le': LessThan, '>': StrictGreaterThan, 'gt': StrictGreaterThan, '<': StrictLessThan, 'lt': StrictLessThan, }
9d26252a8879290549e9a4ee86d23a7773d323f97f5dfbe170f861e0ad224e43	from __future__ import absolute_import, print_function, division import numbers import decimal import fractions import math import re as regex from .containers import Tuple from .sympify import converter, sympify, _sympify, SympifyError, _convert_numpy_types from .singleton import S, Singleton from .expr import Expr, AtomicExpr from .evalf import pure_complex from .decorators import _sympifyit from .cache import cacheit, clear_cache from .logic import fuzzy_not from sympy.core.compatibility import ( as_int, integer_types, long, string_types, with_metaclass, HAS_GMPY, SYMPY_INTS, int_info) from sympy.core.cache import lru_cache import mpmath import mpmath.libmp as mlib from mpmath.libmp import bitcount from mpmath.libmp.backend import MPZ from mpmath.libmp import mpf_pow, mpf_pi, mpf_e, phi_fixed from mpmath.ctx_mp import mpnumeric from mpmath.libmp.libmpf import ( finf as _mpf_inf, fninf as _mpf_ninf, fnan as _mpf_nan, fzero, _normalize as mpf_normalize, prec_to_dps, fone, fnone) from sympy.utilities.misc import debug, filldedent from .evaluate import global_evaluate from sympy.utilities.exceptions import SymPyDeprecationWarning rnd = mlib.round_nearest _LOG2 = math.log(2) def comp(z1, z2, tol=None): """Return a bool indicating whether the error between z1 and z2 is <= tol. Examples ======== If ``tol`` is None then True will be returned if ``abs(z1 - z2)10p <= 5`` where ``p`` is minimum value of the decimal precision of each value. >>> from sympy.core.numbers import comp, pi >>> pi4 = pi.n(4); pi4 3.142 >>> comp(_, 3.142) True >>> comp(pi4, 3.141) False >>> comp(pi4, 3.143) False A comparison of strings will be made if ``z1`` is a Number and ``z2`` is a string or ``tol`` is ''. >>> comp(pi4, 3.1415) True >>> comp(pi4, 3.1415, '') False When ``tol`` is provided and ``z2`` is non-zero and ``\|z1\| > 1`` the error is normalized by ``\|z1\|``: >>> abs(pi4 - 3.14)/pi4 0.000509791731426756 >>> comp(pi4, 3.14, .001) # difference less than 0.1% True >>> comp(pi4, 3.14, .0005) # difference less than 0.1% False When ``\|z1\| <= 1`` the absolute error is used: >>> 1/pi4 0.3183 >>> abs(1/pi4 - 0.3183)/(1/pi4) 3.07371499106316e-5 >>> abs(1/pi4 - 0.3183) 9.78393554684764e-6 >>> comp(1/pi4, 0.3183, 1e-5) True To see if the absolute error between ``z1`` and ``z2`` is less than or equal to ``tol``, call this as ``comp(z1 - z2, 0, tol)`` or ``comp(z1 - z2, tol=tol)``: >>> abs(pi4 - 3.14) 0.00160156249999988 >>> comp(pi4 - 3.14, 0, .002) True >>> comp(pi4 - 3.14, 0, .001) False """ if type(z2) is str: z = sympify(z2) if not pure_complex(z1, or_real=True): raise ValueError('when z2 is a str z1 must be a Number') return str(z1) == z2 if not z1: z1, z2 = z2, z1 if not z1: return True if not tol: a, b = z1, z2 if tol == '': return str(a) == str(b) if tol is None: a, b = sympify(a), sympify(b) if not all(i.is_number for i in (a, b)): raise ValueError('expecting 2 numbers') fa = a.atoms(Float) fb = b.atoms(Float) if not fa and not fb: # no floats -- compare exactly return a == b # get a to be pure_complex for do in range(2): ca = pure_complex(a, or_real=True) if not ca: if fa: a = a.n(prec_to_dps(min([i._prec for i in fa]))) ca = pure_complex(a, or_real=True) break else: fa, fb = fb, fa a, b = b, a cb = pure_complex(b) if not cb and fb: b = b.n(prec_to_dps(min([i._prec for i in fb]))) cb = pure_complex(b, or_real=True) if ca and cb and (ca[1] or cb[1]): return all(comp(i, j) for i, j in zip(ca, cb)) tol = 10prec_to_dps(min(a._prec, getattr(b, '_prec', a._prec))) return int(abs(a - b)tol) <= 5 diff = abs(z1 - z2) az1 = abs(z1) if z2 and az1 > 1: return diff/az1 <= tol else: return diff <= tol def mpf_norm(mpf, prec): """Return the mpf tuple normalized appropriately for the indicated precision after doing a check to see if zero should be returned or not when the mantissa is 0. ``mpf_normlize`` always assumes that this is zero, but it may not be since the mantissa for mpf's values "+inf", "-inf" and "nan" have a mantissa of zero, too. Note: this is not intended to validate a given mpf tuple, so sending mpf tuples that were not created by mpmath may produce bad results. This is only a wrapper to ``mpf_normalize`` which provides the check for non- zero mpfs that have a 0 for the mantissa. """ sign, man, expt, bc = mpf if not man: # hack for mpf_normalize which does not do this; # it assumes that if man is zero the result is 0 # (see issue 6639) if not bc: return fzero else: # don't change anything; this should already # be a well formed mpf tuple return mpf # Necessary if mpmath is using the gmpy backend from mpmath.libmp.backend import MPZ rv = mpf_normalize(sign, MPZ(man), expt, bc, prec, rnd) return rv # TODO: we should use the warnings module _errdict = {"divide": False} def seterr(divide=False): """ Should sympy raise an exception on 0/0 or return a nan? divide == True .... raise an exception divide == False ... return nan """ if _errdict["divide"] != divide: clear_cache() _errdict["divide"] = divide def _as_integer_ratio(p): neg_pow, man, expt, bc = getattr(p, '_mpf_', mpmath.mpf(p)._mpf_) p = [1, -1][neg_pow % 2]man if expt < 0: q = 2-expt else: q = 1 p = 2expt return int(p), int(q) def _decimal_to_Rational_prec(dec): """Convert an ordinary decimal instance to a Rational.""" if not dec.is_finite(): raise TypeError("dec must be finite, got %s." % dec) s, d, e = dec.as_tuple() prec = len(d) if e >= 0: # it's an integer rv = Integer(int(dec)) else: s = (-1)s d = sum([di10i for i, di in enumerate(reversed(d))]) rv = Rational(sd, 10*-e) return rv, prec _floatpat = regex.compile(r"[-+]?((\d\.\d+)\|(\d+\.?))") def _literal_float(f): """Return True if n starts like a floating point number.""" return bool(_floatpat.match(f)) # (a,b) -> gcd(a,b) # TODO caching with decorator, but not to degrade performance @lru_cache(1024) def igcd(args): """Computes nonnegative integer greatest common divisor. The algorithm is based on the well known Euclid's algorithm. To improve speed, igcd() has its own caching mechanism implemented. Examples ======== >>> from sympy.core.numbers import igcd >>> igcd(2, 4) 2 >>> igcd(5, 10, 15) 5 """ if len(args) < 2: raise TypeError( 'igcd() takes at least 2 arguments (%s given)' % len(args)) args_temp = [abs(as_int(i)) for i in args] if 1 in args_temp: return 1 a = args_temp.pop() for b in args_temp: a = igcd2(a, b) if b else a return a try: from math import gcd as igcd2 except ImportError: def igcd2(a, b): """Compute gcd of two Python integers a and b.""" if (a.bit_length() > BIGBITS and b.bit_length() > BIGBITS): return igcd_lehmer(a, b) a, b = abs(a), abs(b) while b: a, b = b, a % b return a # Use Lehmer's algorithm only for very large numbers. # The limit could be different on Python 2.7 and 3.x. # If so, then this could be defined in compatibility.py. BIGBITS = 5000 def igcd_lehmer(a, b): """Computes greatest common divisor of two integers. Euclid's algorithm for the computation of the greatest common divisor gcd(a, b) of two (positive) integers a and b is based on the division identity a = qb + r, where the quotient q and the remainder r are integers and 0 <= r < b. Then each common divisor of a and b divides r, and it follows that gcd(a, b) == gcd(b, r). The algorithm works by constructing the sequence r0, r1, r2, ..., where r0 = a, r1 = b, and each rn is the remainder from the division of the two preceding elements. In Python, q = a // b and r = a % b are obtained by the floor division and the remainder operations, respectively. These are the most expensive arithmetic operations, especially for large a and b. Lehmer's algorithm is based on the observation that the quotients qn = r(n-1) // rn are in general small integers even when a and b are very large. Hence the quotients can be usually determined from a relatively small number of most significant bits. The efficiency of the algorithm is further enhanced by not computing each long remainder in Euclid's sequence. The remainders are linear combinations of a and b with integer coefficients derived from the quotients. The coefficients can be computed as far as the quotients can be determined from the chosen most significant parts of a and b. Only then a new pair of consecutive remainders is computed and the algorithm starts anew with this pair. References ========== .. [1] https://en.wikipedia.org/wiki/Lehmer%27s_GCD_algorithm """ a, b = abs(as_int(a)), abs(as_int(b)) if a < b: a, b = b, a # The algorithm works by using one or two digit division # whenever possible. The outer loop will replace the # pair (a, b) with a pair of shorter consecutive elements # of the Euclidean gcd sequence until a and b # fit into two Python (long) int digits. nbits = 2int_info.bits_per_digit while a.bit_length() > nbits and b != 0: # Quotients are mostly small integers that can # be determined from most significant bits. n = a.bit_length() - nbits x, y = int(a >> n), int(b >> n) # most significant bits # Elements of the Euclidean gcd sequence are linear # combinations of a and b with integer coefficients. # Compute the coefficients of consecutive pairs # a' = Aa + Bb, b' = Ca + Db # using small integer arithmetic as far as possible. A, B, C, D = 1, 0, 0, 1 # initial values while True: # The coefficients alternate in sign while looping. # The inner loop combines two steps to keep track # of the signs. # At this point we have # A > 0, B <= 0, C <= 0, D > 0, # x' = x + B <= x < x" = x + A, # y' = y + C <= y < y" = y + D, # and # x'N <= a' < x"N, y'N <= b' < y"N, # where N = 2n. # Now, if y' > 0, and x"//y' and x'//y" agree, # then their common value is equal to q = a'//b'. # In addition, # x'%y" = x' - qy" < x" - qy' = x"%y', # and # (x'%y")N < a'%b' < (x"%y')N. # On the other hand, we also have x//y == q, # and therefore # x'%y" = x + B - q(y + D) = x%y + B', # x"%y' = x + A - q(y + C) = x%y + A', # where # B' = B - qD < 0, A' = A - qC > 0. if y + C <= 0: break q = (x + A) // (y + C) # Now x'//y" <= q, and equality holds if # x' - qy" = (x - qy) + (B - qD) >= 0. # This is a minor optimization to avoid division. x_qy, B_qD = x - qy, B - qD if x_qy + B_qD < 0: break # Next step in the Euclidean sequence. x, y = y, x_qy A, B, C, D = C, D, A - qC, B_qD # At this point the signs of the coefficients # change and their roles are interchanged. # A <= 0, B > 0, C > 0, D < 0, # x' = x + A <= x < x" = x + B, # y' = y + D < y < y" = y + C. if y + D <= 0: break q = (x + B) // (y + D) x_qy, A_qC = x - qy, A - qC if x_qy + A_qC < 0: break x, y = y, x_qy A, B, C, D = C, D, A_qC, B - qD # Now the conditions on top of the loop # are again satisfied. # A > 0, B < 0, C < 0, D > 0. if B == 0: # This can only happen when y == 0 in the beginning # and the inner loop does nothing. # Long division is forced. a, b = b, a % b continue # Compute new long arguments using the coefficients. a, b = Aa + Bb, Ca + Db # Small divisors. Finish with the standard algorithm. while b: a, b = b, a % b return a def ilcm(args): """Computes integer least common multiple. Examples ======== >>> from sympy.core.numbers import ilcm >>> ilcm(5, 10) 10 >>> ilcm(7, 3) 21 >>> ilcm(5, 10, 15) 30 """ if len(args) < 2: raise TypeError( 'ilcm() takes at least 2 arguments (%s given)' % len(args)) if 0 in args: return 0 a = args[0] for b in args[1:]: a = a // igcd(a, b) b # since gcd(a,b) \| a return a def igcdex(a, b): """Returns x, y, g such that g = xa + yb = gcd(a, b). >>> from sympy.core.numbers import igcdex >>> igcdex(2, 3) (-1, 1, 1) >>> igcdex(10, 12) (-1, 1, 2) >>> x, y, g = igcdex(100, 2004) >>> x, y, g (-20, 1, 4) >>> x100 + y2004 4 """ if (not a) and (not b): return (0, 1, 0) if not a: return (0, b//abs(b), abs(b)) if not b: return (a//abs(a), 0, abs(a)) if a < 0: a, x_sign = -a, -1 else: x_sign = 1 if b < 0: b, y_sign = -b, -1 else: y_sign = 1 x, y, r, s = 1, 0, 0, 1 while b: (c, q) = (a % b, a // b) (a, b, r, s, x, y) = (b, c, x - qr, y - qs, r, s) return (xx_sign, yy_sign, a) def mod_inverse(a, m): """ Return the number c such that, (a * c) = 1 (mod m) where c has the same sign as m. If no such value exists, a ValueError is raised. Examples ======== >>> from sympy import S >>> from sympy.core.numbers import mod_inverse Suppose we wish to find multiplicative inverse x of 3 modulo 11. This is the same as finding x such that 3 * x = 1 (mod 11). One value of x that satisfies this congruence is 4. Because 3 * 4 = 12 and 12 = 1 (mod 11). This is the value return by mod_inverse: >>> mod_inverse(3, 11) 4 >>> mod_inverse(-3, 11) 7 When there is a common factor between the numerators of ``a`` and ``m`` the inverse does not exist: >>> mod_inverse(2, 4) Traceback (most recent call last): ... ValueError: inverse of 2 mod 4 does not exist >>> mod_inverse(S(2)/7, S(5)/2) 7/2 References ========== - https://en.wikipedia.org/wiki/Modular_multiplicative_inverse - https://en.wikipedia.org/wiki/Extended_Euclidean_algorithm """ c = None try: a, m = as_int(a), as_int(m) if m != 1 and m != -1: x, y, g = igcdex(a, m) if g == 1: c = x % m except ValueError: a, m = sympify(a), sympify(m) if not (a.is_number and m.is_number): raise TypeError(filldedent(''' Expected numbers for arguments; symbolic `mod_inverse` is not implemented but symbolic expressions can be handled with the similar function, sympy.polys.polytools.invert''')) big = (m > 1) if not (big is S.true or big is S.false): raise ValueError('m > 1 did not evaluate; try to simplify %s' % m) elif big: c = 1/a if c is None: raise ValueError('inverse of %s (mod %s) does not exist' % (a, m)) return c class Number(AtomicExpr): """Represents atomic numbers in SymPy. Floating point numbers are represented by the Float class. Rational numbers (of any size) are represented by the Rational class. Integer numbers (of any size) are represented by the Integer class. Float and Rational are subclasses of Number; Integer is a subclass of Rational. For example, ``2/3`` is represented as ``Rational(2, 3)`` which is a different object from the floating point number obtained with Python division ``2/3``. Even for numbers that are exactly represented in binary, there is a difference between how two forms, such as ``Rational(1, 2)`` and ``Float(0.5)``, are used in SymPy. The rational form is to be preferred in symbolic computations. Other kinds of numbers, such as algebraic numbers ``sqrt(2)`` or complex numbers ``3 + 4I``, are not instances of Number class as they are not atomic. See Also ======== Float, Integer, Rational """ is_commutative = True is_number = True is_Number = True __slots__ = [] # Used to make max(x._prec, y._prec) return x._prec when only x is a float _prec = -1 def __new__(cls, obj): if len(obj) == 1: obj = obj[0] if isinstance(obj, Number): return obj if isinstance(obj, SYMPY_INTS): return Integer(obj) if isinstance(obj, tuple) and len(obj) == 2: return Rational(obj) if isinstance(obj, (float, mpmath.mpf, decimal.Decimal)): return Float(obj) if isinstance(obj, string_types): _obj = obj.lower() # float('INF') == float('inf') if _obj == 'nan': return S.NaN elif _obj == 'inf': return S.Infinity elif _obj == '+inf': return S.Infinity elif _obj == '-inf': return S.NegativeInfinity val = sympify(obj) if isinstance(val, Number): return val else: raise ValueError('String "%s" does not denote a Number' % obj) msg = "expected str\|int\|long\|float\|Decimal\|Number object but got %r" raise TypeError(msg % type(obj).__name__) def invert(self, other, gens, *args): from sympy.polys.polytools import invert if getattr(other, 'is_number', True): return mod_inverse(self, other) return invert(self, other, gens, *args) def __divmod__(self, other): from .containers import Tuple from sympy.functions.elementary.complexes import sign try: other = Number(other) if self.is_infinite or S.NaN in (self, other): return (S.NaN, S.NaN) except TypeError: msg = "unsupported operand type(s) for divmod(): '%s' and '%s'" raise TypeError(msg % (type(self).__name__, type(other).__name__)) if not other: raise ZeroDivisionError('modulo by zero') if self.is_Integer and other.is_Integer: return Tuple(divmod(self.p, other.p)) elif isinstance(other, Float): rat = self/Rational(other) else: rat = self/other if other.is_finite: w = int(rat) if rat > 0 else int(rat) - 1 r = self - otherw else: w = 0 if not self or (sign(self) == sign(other)) else -1 r = other if w else self return Tuple(w, r) def __rdivmod__(self, other): try: other = Number(other) except TypeError: msg = "unsupported operand type(s) for divmod(): '%s' and '%s'" raise TypeError(msg % (type(other).__name__, type(self).__name__)) return divmod(other, self) def _as_mpf_val(self, prec): """Evaluation of mpf tuple accurate to at least prec bits.""" raise NotImplementedError('%s needs ._as_mpf_val() method' % (self.__class__.__name__)) def _eval_evalf(self, prec): return Float._new(self._as_mpf_val(prec), prec) def _as_mpf_op(self, prec): prec = max(prec, self._prec) return self._as_mpf_val(prec), prec def __float__(self): return mlib.to_float(self._as_mpf_val(53)) def floor(self): raise NotImplementedError('%s needs .floor() method' % (self.__class__.__name__)) def ceiling(self): raise NotImplementedError('%s needs .ceiling() method' % (self.__class__.__name__)) def __floor__(self): return self.floor() def __ceil__(self): return self.ceiling() def _eval_conjugate(self): return self def _eval_order(self, symbols): from sympy import Order # Order(5, x, y) -> Order(1,x,y) return Order(S.One, symbols) def _eval_subs(self, old, new): if old == -self: return -new return self # there is no other possibility def _eval_is_finite(self): return True @classmethod def class_key(cls): return 1, 0, 'Number' @cacheit def sort_key(self, order=None): return self.class_key(), (0, ()), (), self @_sympifyit('other', NotImplemented) def __add__(self, other): if isinstance(other, Number) and global_evaluate[0]: if other is S.NaN: return S.NaN elif other is S.Infinity: return S.Infinity elif other is S.NegativeInfinity: return S.NegativeInfinity return AtomicExpr.__add__(self, other) @_sympifyit('other', NotImplemented) def __sub__(self, other): if isinstance(other, Number) and global_evaluate[0]: if other is S.NaN: return S.NaN elif other is S.Infinity: return S.NegativeInfinity elif other is S.NegativeInfinity: return S.Infinity return AtomicExpr.__sub__(self, other) @_sympifyit('other', NotImplemented) def __mul__(self, other): if isinstance(other, Number) and global_evaluate[0]: if other is S.NaN: return S.NaN elif other is S.Infinity: if self.is_zero: return S.NaN elif self.is_positive: return S.Infinity else: return S.NegativeInfinity elif other is S.NegativeInfinity: if self.is_zero: return S.NaN elif self.is_positive: return S.NegativeInfinity else: return S.Infinity elif isinstance(other, Tuple): return NotImplemented return AtomicExpr.__mul__(self, other) @_sympifyit('other', NotImplemented) def __div__(self, other): if isinstance(other, Number) and global_evaluate[0]: if other is S.NaN: return S.NaN elif other is S.Infinity or other is S.NegativeInfinity: return S.Zero return AtomicExpr.__div__(self, other) __truediv__ = __div__ def __eq__(self, other): raise NotImplementedError('%s needs .__eq__() method' % (self.__class__.__name__)) def __ne__(self, other): raise NotImplementedError('%s needs .__ne__() method' % (self.__class__.__name__)) def __lt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s < %s" % (self, other)) raise NotImplementedError('%s needs .__lt__() method' % (self.__class__.__name__)) def __le__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s <= %s" % (self, other)) raise NotImplementedError('%s needs .__le__() method' % (self.__class__.__name__)) def __gt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) return _sympify(other).__lt__(self) def __ge__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s >= %s" % (self, other)) return _sympify(other).__le__(self) def __hash__(self): return super(Number, self).__hash__() def is_constant(self, wrt, *flags): return True def as_coeff_mul(self, deps, *kwargs): # a -> ct if self.is_Rational or not kwargs.pop('rational', True): return self, tuple() elif self.is_negative: return S.NegativeOne, (-self,) return S.One, (self,) def as_coeff_add(self, deps): # a -> c + t if self.is_Rational: return self, tuple() return S.Zero, (self,) def as_coeff_Mul(self, rational=False): """Efficiently extract the coefficient of a product. """ if rational and not self.is_Rational: return S.One, self return (self, S.One) if self else (S.One, self) def as_coeff_Add(self, rational=False): """Efficiently extract the coefficient of a summation. """ if not rational: return self, S.Zero return S.Zero, self def gcd(self, other): """Compute GCD of `self` and `other`. """ from sympy.polys import gcd return gcd(self, other) def lcm(self, other): """Compute LCM of `self` and `other`. """ from sympy.polys import lcm return lcm(self, other) def cofactors(self, other): """Compute GCD and cofactors of `self` and `other`. """ from sympy.polys import cofactors return cofactors(self, other) class Float(Number): """Represent a floating-point number of arbitrary precision. Examples ======== >>> from sympy import Float >>> Float(3.5) 3.50000000000000 >>> Float(3) 3.00000000000000 Creating Floats from strings (and Python ``int`` and ``long`` types) will give a minimum precision of 15 digits, but the precision will automatically increase to capture all digits entered. >>> Float(1) 1.00000000000000 >>> Float(1020) 100000000000000000000. >>> Float('1e20') 100000000000000000000. However, floating-point* numbers (Python ``float`` types) retain only 15 digits of precision: >>> Float(1e20) 1.00000000000000e+20 >>> Float(1.23456789123456789) 1.23456789123457 It may be preferable to enter high-precision decimal numbers as strings: Float('1.23456789123456789') 1.23456789123456789 The desired number of digits can also be specified: >>> Float('1e-3', 3) 0.00100 >>> Float(100, 4) 100.0 Float can automatically count significant figures if a null string is sent for the precision; spaces or underscores are also allowed. (Auto- counting is only allowed for strings, ints and longs). >>> Float('123 456 789.123_456', '') 123456789.123456 >>> Float('12e-3', '') 0.012 >>> Float(3, '') 3. If a number is written in scientific notation, only the digits before the exponent are considered significant if a decimal appears, otherwise the "e" signifies only how to move the decimal: >>> Float('60.e2', '') # 2 digits significant 6.0e+3 >>> Float('60e2', '') # 4 digits significant 6000. >>> Float('600e-2', '') # 3 digits significant 6.00 Notes ===== Floats are inexact by their nature unless their value is a binary-exact value. >>> approx, exact = Float(.1, 1), Float(.125, 1) For calculation purposes, evalf needs to be able to change the precision but this will not increase the accuracy of the inexact value. The following is the most accurate 5-digit approximation of a value of 0.1 that had only 1 digit of precision: >>> approx.evalf(5) 0.099609 By contrast, 0.125 is exact in binary (as it is in base 10) and so it can be passed to Float or evalf to obtain an arbitrary precision with matching accuracy: >>> Float(exact, 5) 0.12500 >>> exact.evalf(20) 0.12500000000000000000 Trying to make a high-precision Float from a float is not disallowed, but one must keep in mind that the underlying float (not the apparent decimal value) is being obtained with high precision. For example, 0.3 does not have a finite binary representation. The closest rational is the fraction 5404319552844595/254. So if you try to obtain a Float of 0.3 to 20 digits of precision you will not see the same thing as 0.3 followed by 19 zeros: >>> Float(0.3, 20) 0.29999999999999998890 If you want a 20-digit value of the decimal 0.3 (not the floating point approximation of 0.3) you should send the 0.3 as a string. The underlying representation is still binary but a higher precision than Python's float is used: >>> Float('0.3', 20) 0.30000000000000000000 Although you can increase the precision of an existing Float using Float it will not increase the accuracy -- the underlying value is not changed: >>> def show(f): # binary rep of Float ... from sympy import Mul, Pow ... s, m, e, b = f._mpf_ ... v = Mul(int(m), Pow(2, int(e), evaluate=False), evaluate=False) ... print('%s at prec=%s' % (v, f._prec)) ... >>> t = Float('0.3', 3) >>> show(t) 4915/214 at prec=13 >>> show(Float(t, 20)) # higher prec, not higher accuracy 4915/214 at prec=70 >>> show(Float(t, 2)) # lower prec 307/210 at prec=10 The same thing happens when evalf is used on a Float: >>> show(t.evalf(20)) 4915/214 at prec=70 >>> show(t.evalf(2)) 307/210 at prec=10 Finally, Floats can be instantiated with an mpf tuple (n, c, p) to produce the number (-1)*nc2p: >>> n, c, p = 1, 5, 0 >>> (-1)nc2p -5 >>> Float((1, 5, 0)) -5.00000000000000 An actual mpf tuple also contains the number of bits in c as the last element of the tuple: >>> _._mpf_ (1, 5, 0, 3) This is not needed for instantiation and is not the same thing as the precision. The mpf tuple and the precision are two separate quantities that Float tracks. In SymPy, a Float is a number that can be computed with arbitrary precision. Although floating point 'inf' and 'nan' are not such numbers, Float can create these numbers: >>> Float('-inf') -oo >>> _.is_Float False """ __slots__ = ['_mpf_', '_prec'] # A Float represents many real numbers, # both rational and irrational. is_rational = None is_irrational = None is_number = True is_real = True is_extended_real = True is_Float = True def __new__(cls, num, dps=None, prec=None, precision=None): if prec is not None: SymPyDeprecationWarning( feature="Using 'prec=XX' to denote decimal precision", useinstead="'dps=XX' for decimal precision and 'precision=XX' "\ "for binary precision", issue=12820, deprecated_since_version="1.1").warn() dps = prec del prec # avoid using this deprecated kwarg if dps is not None and precision is not None: raise ValueError('Both decimal and binary precision supplied. ' 'Supply only one. ') if isinstance(num, string_types): # Float accepts spaces as digit separators num = num.replace(' ', '').lower() # in Py 3.6 # underscores are allowed. In anticipation of that, we ignore # legally placed underscores if '_' in num: parts = num.split('_') if not (all(parts) and all(parts[i][-1].isdigit() for i in range(0, len(parts), 2)) and all(parts[i][0].isdigit() for i in range(1, len(parts), 2))): # copy Py 3.6 error raise ValueError("could not convert string to float: '%s'" % num) num = ''.join(parts) if num.startswith('.') and len(num) > 1: num = '0' + num elif num.startswith('-.') and len(num) > 2: num = '-0.' + num[2:] elif num in ('inf', '+inf'): return S.Infinity elif num == '-inf': return S.NegativeInfinity elif isinstance(num, float) and num == 0: num = '0' elif isinstance(num, float) and num == float('inf'): return S.Infinity elif isinstance(num, float) and num == float('-inf'): return S.NegativeInfinity elif isinstance(num, float) and num == float('nan'): return S.NaN elif isinstance(num, (SYMPY_INTS, Integer)): num = str(num) elif num is S.Infinity: return num elif num is S.NegativeInfinity: return num elif num is S.NaN: return num elif type(num).__module__ == 'numpy': # support for numpy datatypes num = _convert_numpy_types(num) elif isinstance(num, mpmath.mpf): if precision is None: if dps is None: precision = num.context.prec num = num._mpf_ if dps is None and precision is None: dps = 15 if isinstance(num, Float): return num if isinstance(num, string_types) and _literal_float(num): try: Num = decimal.Decimal(num) except decimal.InvalidOperation: pass else: isint = '.' not in num num, dps = _decimal_to_Rational_prec(Num) if num.is_Integer and isint: dps = max(dps, len(str(num).lstrip('-'))) dps = max(15, dps) precision = mlib.libmpf.dps_to_prec(dps) elif precision == '' and dps is None or precision is None and dps == '': if not isinstance(num, string_types): raise ValueError('The null string can only be used when ' 'the number to Float is passed as a string or an integer.') ok = None if _literal_float(num): try: Num = decimal.Decimal(num) except decimal.InvalidOperation: pass else: isint = '.' not in num num, dps = _decimal_to_Rational_prec(Num) if num.is_Integer and isint: dps = max(dps, len(str(num).lstrip('-'))) precision = mlib.libmpf.dps_to_prec(dps) ok = True if ok is None: raise ValueError('string-float not recognized: %s' % num) # decimal precision(dps) is set and maybe binary precision(precision) # as well.From here on binary precision is used to compute the Float. # Hence, if supplied use binary precision else translate from decimal # precision. if precision is None or precision == '': precision = mlib.libmpf.dps_to_prec(dps) precision = int(precision) if isinstance(num, float): _mpf_ = mlib.from_float(num, precision, rnd) elif isinstance(num, string_types): _mpf_ = mlib.from_str(num, precision, rnd) elif isinstance(num, decimal.Decimal): if num.is_finite(): _mpf_ = mlib.from_str(str(num), precision, rnd) elif num.is_nan(): return S.NaN elif num.is_infinite(): if num > 0: return S.Infinity return S.NegativeInfinity else: raise ValueError("unexpected decimal value %s" % str(num)) elif isinstance(num, tuple) and len(num) in (3, 4): if type(num[1]) is str: # it's a hexadecimal (coming from a pickled object) # assume that it is in standard form num = list(num) # If we're loading an object pickled in Python 2 into # Python 3, we may need to strip a tailing 'L' because # of a shim for int on Python 3, see issue #13470. if num[1].endswith('L'): num[1] = num[1][:-1] num[1] = MPZ(num[1], 16) _mpf_ = tuple(num) else: if len(num) == 4: # handle normalization hack return Float._new(num, precision) else: if not all(( num[0] in (0, 1), num[1] >= 0, all(type(i) in (long, int) for i in num) )): raise ValueError('malformed mpf: %s' % (num,)) # don't compute number or else it may # over/underflow return Float._new( (num[0], num[1], num[2], bitcount(num[1])), precision) else: try: _mpf_ = num._as_mpf_val(precision) except (NotImplementedError, AttributeError): _mpf_ = mpmath.mpf(num, prec=precision)._mpf_ return cls._new(_mpf_, precision, zero=False) @classmethod def _new(cls, _mpf_, _prec, zero=True): # special cases if zero and _mpf_ == fzero: return S.Zero # Float(0) -> 0.0; Float._new((0,0,0,0)) -> 0 elif _mpf_ == _mpf_nan: return S.NaN elif _mpf_ == _mpf_inf: return S.Infinity elif _mpf_ == _mpf_ninf: return S.NegativeInfinity obj = Expr.__new__(cls) obj._mpf_ = mpf_norm(_mpf_, _prec) obj._prec = _prec return obj # mpz can't be pickled def __getnewargs__(self): return (mlib.to_pickable(self._mpf_),) def __getstate__(self): return {'_prec': self._prec} def _hashable_content(self): return (self._mpf_, self._prec) def floor(self): return Integer(int(mlib.to_int( mlib.mpf_floor(self._mpf_, self._prec)))) def ceiling(self): return Integer(int(mlib.to_int( mlib.mpf_ceil(self._mpf_, self._prec)))) def __floor__(self): return self.floor() def __ceil__(self): return self.ceiling() @property def num(self): return mpmath.mpf(self._mpf_) def _as_mpf_val(self, prec): rv = mpf_norm(self._mpf_, prec) if rv != self._mpf_ and self._prec == prec: debug(self._mpf_, rv) return rv def _as_mpf_op(self, prec): return self._mpf_, max(prec, self._prec) def _eval_is_finite(self): if self._mpf_ in (_mpf_inf, _mpf_ninf): return False return True def _eval_is_infinite(self): if self._mpf_ in (_mpf_inf, _mpf_ninf): return True return False def _eval_is_integer(self): return self._mpf_ == fzero def _eval_is_negative(self): if self._mpf_ == _mpf_ninf or self._mpf_ == _mpf_inf: return False return self.num < 0 def _eval_is_positive(self): if self._mpf_ == _mpf_ninf or self._mpf_ == _mpf_inf: return False return self.num > 0 def _eval_is_extended_negative(self): if self._mpf_ == _mpf_ninf: return True if self._mpf_ == _mpf_inf: return False return self.num < 0 def _eval_is_extended_positive(self): if self._mpf_ == _mpf_inf: return True if self._mpf_ == _mpf_ninf: return False return self.num > 0 def _eval_is_zero(self): return self._mpf_ == fzero def __nonzero__(self): return self._mpf_ != fzero __bool__ = __nonzero__ def __neg__(self): return Float._new(mlib.mpf_neg(self._mpf_), self._prec) @_sympifyit('other', NotImplemented) def __add__(self, other): if isinstance(other, Number) and global_evaluate[0]: rhs, prec = other._as_mpf_op(self._prec) return Float._new(mlib.mpf_add(self._mpf_, rhs, prec, rnd), prec) return Number.__add__(self, other) @_sympifyit('other', NotImplemented) def __sub__(self, other): if isinstance(other, Number) and global_evaluate[0]: rhs, prec = other._as_mpf_op(self._prec) return Float._new(mlib.mpf_sub(self._mpf_, rhs, prec, rnd), prec) return Number.__sub__(self, other) @_sympifyit('other', NotImplemented) def __mul__(self, other): if isinstance(other, Number) and global_evaluate[0]: rhs, prec = other._as_mpf_op(self._prec) return Float._new(mlib.mpf_mul(self._mpf_, rhs, prec, rnd), prec) return Number.__mul__(self, other) @_sympifyit('other', NotImplemented) def __div__(self, other): if isinstance(other, Number) and other != 0 and global_evaluate[0]: rhs, prec = other._as_mpf_op(self._prec) return Float._new(mlib.mpf_div(self._mpf_, rhs, prec, rnd), prec) return Number.__div__(self, other) __truediv__ = __div__ @_sympifyit('other', NotImplemented) def __mod__(self, other): if isinstance(other, Rational) and other.q != 1 and global_evaluate[0]: # calculate mod with Rationals, then* round the result return Float(Rational.__mod__(Rational(self), other), precision=self._prec) if isinstance(other, Float) and global_evaluate[0]: r = self/other if r == int(r): return Float(0, precision=max(self._prec, other._prec)) if isinstance(other, Number) and global_evaluate[0]: rhs, prec = other._as_mpf_op(self._prec) return Float._new(mlib.mpf_mod(self._mpf_, rhs, prec, rnd), prec) return Number.__mod__(self, other) @_sympifyit('other', NotImplemented) def __rmod__(self, other): if isinstance(other, Float) and global_evaluate[0]: return other.__mod__(self) if isinstance(other, Number) and global_evaluate[0]: rhs, prec = other._as_mpf_op(self._prec) return Float._new(mlib.mpf_mod(rhs, self._mpf_, prec, rnd), prec) return Number.__rmod__(self, other) def _eval_power(self, expt): """ expt is symbolic object but not equal to 0, 1 (-p)*r -> exp(rlog(-p)) -> exp(r(log(p) + IPi)) -> -> p*r(sin(Pir) + cos(Pir)I) """ if self == 0: if expt.is_positive: return S.Zero if expt.is_negative: return S.Infinity if isinstance(expt, Number): if isinstance(expt, Integer): prec = self._prec return Float._new( mlib.mpf_pow_int(self._mpf_, expt.p, prec, rnd), prec) elif isinstance(expt, Rational) and \ expt.p == 1 and expt.q % 2 and self.is_negative: return Pow(S.NegativeOne, expt, evaluate=False)( -self)._eval_power(expt) expt, prec = expt._as_mpf_op(self._prec) mpfself = self._mpf_ try: y = mpf_pow(mpfself, expt, prec, rnd) return Float._new(y, prec) except mlib.ComplexResult: re, im = mlib.mpc_pow( (mpfself, fzero), (expt, fzero), prec, rnd) return Float._new(re, prec) + \ Float._new(im, prec)S.ImaginaryUnit def __abs__(self): return Float._new(mlib.mpf_abs(self._mpf_), self._prec) def __int__(self): if self._mpf_ == fzero: return 0 return int(mlib.to_int(self._mpf_)) # uses round_fast = round_down __long__ = __int__ def __eq__(self, other): try: other = _sympify(other) except SympifyError: return NotImplemented if not self: return not other if other.is_NumberSymbol: if other.is_irrational: return False return other.__eq__(self) if other.is_Float: # comparison is exact # so Float(.1, 3) != Float(.1, 33) return self._mpf_ == other._mpf_ if other.is_Rational: return other.__eq__(self) if other.is_Number: # numbers should compare at the same precision; # all _as_mpf_val routines should be sure to abide # by the request to change the prec if necessary; if # they don't, the equality test will fail since it compares # the mpf tuples ompf = other._as_mpf_val(self._prec) return bool(mlib.mpf_eq(self._mpf_, ompf)) return False # Float != non-Number def __ne__(self, other): return not self == other def _Frel(self, other, op): from sympy.core.evalf import evalf from sympy.core.numbers import prec_to_dps try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) if other.is_Rational: # test selfother.q <?> other.p without losing precision ''' >>> f = Float(.1,2) >>> i = 1234567890 >>> (fi)._mpf_ (0, 471, 18, 9) >>> mlib.mpf_mul(f._mpf_, mlib.from_int(i)) (0, 505555550955, -12, 39) ''' smpf = mlib.mpf_mul(self._mpf_, mlib.from_int(other.q)) ompf = mlib.from_int(other.p) return _sympify(bool(op(smpf, ompf))) elif other.is_Float: return _sympify(bool( op(self._mpf_, other._mpf_))) elif other.is_comparable and other not in ( S.Infinity, S.NegativeInfinity): other = other.evalf(prec_to_dps(self._prec)) if other._prec > 1: if other.is_Number: return _sympify(bool( op(self._mpf_, other._as_mpf_val(self._prec)))) def __gt__(self, other): if isinstance(other, NumberSymbol): return other.__lt__(self) rv = self._Frel(other, mlib.mpf_gt) if rv is None: return Expr.__gt__(self, other) return rv def __ge__(self, other): if isinstance(other, NumberSymbol): return other.__le__(self) rv = self._Frel(other, mlib.mpf_ge) if rv is None: return Expr.__ge__(self, other) return rv def __lt__(self, other): if isinstance(other, NumberSymbol): return other.__gt__(self) rv = self._Frel(other, mlib.mpf_lt) if rv is None: return Expr.__lt__(self, other) return rv def __le__(self, other): if isinstance(other, NumberSymbol): return other.__ge__(self) rv = self._Frel(other, mlib.mpf_le) if rv is None: return Expr.__le__(self, other) return rv def __hash__(self): return super(Float, self).__hash__() def epsilon_eq(self, other, epsilon="1e-15"): return abs(self - other) < Float(epsilon) def _sage_(self): import sage.all as sage return sage.RealNumber(str(self)) def __format__(self, format_spec): return format(decimal.Decimal(str(self)), format_spec) # Add sympify converters converter[float] = converter[decimal.Decimal] = Float # this is here to work nicely in Sage RealNumber = Float class Rational(Number): """Represents rational numbers (p/q) of any size. Examples ======== >>> from sympy import Rational, nsimplify, S, pi >>> Rational(1, 2) 1/2 Rational is unprejudiced in accepting input. If a float is passed, the underlying value of the binary representation will be returned: >>> Rational(.5) 1/2 >>> Rational(.2) 3602879701896397/18014398509481984 If the simpler representation of the float is desired then consider limiting the denominator to the desired value or convert the float to a string (which is roughly equivalent to limiting the denominator to 1012): >>> Rational(str(.2)) 1/5 >>> Rational(.2).limit_denominator(1012) 1/5 An arbitrarily precise Rational is obtained when a string literal is passed: >>> Rational("1.23") 123/100 >>> Rational('1e-2') 1/100 >>> Rational(".1") 1/10 >>> Rational('1e-2/3.2') 1/320 The conversion of other types of strings can be handled by the sympify() function, and conversion of floats to expressions or simple fractions can be handled with nsimplify: >>> S('.[3]') # repeating digits in brackets 1/3 >>> S('32/10') # general expressions 9/10 >>> nsimplify(.3) # numbers that have a simple form 3/10 But if the input does not reduce to a literal Rational, an error will be raised: >>> Rational(pi) Traceback (most recent call last): ... TypeError: invalid input: pi Low-level --------- Access numerator and denominator as .p and .q: >>> r = Rational(3, 4) >>> r 3/4 >>> r.p 3 >>> r.q 4 Note that p and q return integers (not SymPy Integers) so some care is needed when using them in expressions: >>> r.p/r.q 0.75 See Also ======== sympify, sympy.simplify.simplify.nsimplify """ is_real = True is_integer = False is_rational = True is_number = True __slots__ = ['p', 'q'] is_Rational = True @cacheit def __new__(cls, p, q=None, gcd=None): if q is None: if isinstance(p, Rational): return p if isinstance(p, SYMPY_INTS): pass else: if isinstance(p, (float, Float)): return Rational(_as_integer_ratio(p)) if not isinstance(p, string_types): try: p = sympify(p) except (SympifyError, SyntaxError): pass # error will raise below else: if p.count('/') > 1: raise TypeError('invalid input: %s' % p) p = p.replace(' ', '') pq = p.rsplit('/', 1) if len(pq) == 2: p, q = pq fp = fractions.Fraction(p) fq = fractions.Fraction(q) p = fp/fq try: p = fractions.Fraction(p) except ValueError: pass # error will raise below else: return Rational(p.numerator, p.denominator, 1) if not isinstance(p, Rational): raise TypeError('invalid input: %s' % p) q = 1 gcd = 1 else: p = Rational(p) q = Rational(q) if isinstance(q, Rational): p = q.q q = q.p if isinstance(p, Rational): q = p.q p = p.p # p and q are now integers if q == 0: if p == 0: if _errdict["divide"]: raise ValueError("Indeterminate 0/0") else: return S.NaN return S.ComplexInfinity if q < 0: q = -q p = -p if not gcd: gcd = igcd(abs(p), q) if gcd > 1: p //= gcd q //= gcd if q == 1: return Integer(p) if p == 1 and q == 2: return S.Half obj = Expr.__new__(cls) obj.p = p obj.q = q return obj def limit_denominator(self, max_denominator=1000000): """Closest Rational to self with denominator at most max_denominator. >>> from sympy import Rational >>> Rational('3.141592653589793').limit_denominator(10) 22/7 >>> Rational('3.141592653589793').limit_denominator(100) 311/99 """ f = fractions.Fraction(self.p, self.q) return Rational(f.limit_denominator(fractions.Fraction(int(max_denominator)))) def __getnewargs__(self): return (self.p, self.q) def _hashable_content(self): return (self.p, self.q) def _eval_is_positive(self): return self.p > 0 def _eval_is_zero(self): return self.p == 0 def __neg__(self): return Rational(-self.p, self.q) @_sympifyit('other', NotImplemented) def __add__(self, other): if global_evaluate[0]: if isinstance(other, Integer): return Rational(self.p + self.qother.p, self.q, 1) elif isinstance(other, Rational): #TODO: this can probably be optimized more return Rational(self.pother.q + self.qother.p, self.qother.q) elif isinstance(other, Float): return other + self else: return Number.__add__(self, other) return Number.__add__(self, other) __radd__ = __add__ @_sympifyit('other', NotImplemented) def __sub__(self, other): if global_evaluate[0]: if isinstance(other, Integer): return Rational(self.p - self.qother.p, self.q, 1) elif isinstance(other, Rational): return Rational(self.pother.q - self.qother.p, self.qother.q) elif isinstance(other, Float): return -other + self else: return Number.__sub__(self, other) return Number.__sub__(self, other) @_sympifyit('other', NotImplemented) def __rsub__(self, other): if global_evaluate[0]: if isinstance(other, Integer): return Rational(self.qother.p - self.p, self.q, 1) elif isinstance(other, Rational): return Rational(self.qother.p - self.pother.q, self.qother.q) elif isinstance(other, Float): return -self + other else: return Number.__rsub__(self, other) return Number.__rsub__(self, other) @_sympifyit('other', NotImplemented) def __mul__(self, other): if global_evaluate[0]: if isinstance(other, Integer): return Rational(self.pother.p, self.q, igcd(other.p, self.q)) elif isinstance(other, Rational): return Rational(self.pother.p, self.qother.q, igcd(self.p, other.q)igcd(self.q, other.p)) elif isinstance(other, Float): return otherself else: return Number.__mul__(self, other) return Number.__mul__(self, other) __rmul__ = __mul__ @_sympifyit('other', NotImplemented) def __div__(self, other): if global_evaluate[0]: if isinstance(other, Integer): if self.p and other.p == S.Zero: return S.ComplexInfinity else: return Rational(self.p, self.qother.p, igcd(self.p, other.p)) elif isinstance(other, Rational): return Rational(self.pother.q, self.qother.p, igcd(self.p, other.p)igcd(self.q, other.q)) elif isinstance(other, Float): return self(1/other) else: return Number.__div__(self, other) return Number.__div__(self, other) @_sympifyit('other', NotImplemented) def __rdiv__(self, other): if global_evaluate[0]: if isinstance(other, Integer): return Rational(other.pself.q, self.p, igcd(self.p, other.p)) elif isinstance(other, Rational): return Rational(other.pself.q, other.qself.p, igcd(self.p, other.p)igcd(self.q, other.q)) elif isinstance(other, Float): return other(1/self) else: return Number.__rdiv__(self, other) return Number.__rdiv__(self, other) __truediv__ = __div__ @_sympifyit('other', NotImplemented) def __mod__(self, other): if global_evaluate[0]: if isinstance(other, Rational): n = (self.pother.q) // (other.pself.q) return Rational(self.pother.q - nother.pself.q, self.qother.q) if isinstance(other, Float): # calculate mod with Rationals, then* round the answer return Float(self.__mod__(Rational(other)), precision=other._prec) return Number.__mod__(self, other) return Number.__mod__(self, other) @_sympifyit('other', NotImplemented) def __rmod__(self, other): if isinstance(other, Rational): return Rational.__mod__(other, self) return Number.__rmod__(self, other) def _eval_power(self, expt): if isinstance(expt, Number): if isinstance(expt, Float): return self._eval_evalf(expt._prec)expt if expt.is_extended_negative: # (3/4)-2 -> (4/3)2 ne = -expt if (ne is S.One): return Rational(self.q, self.p) if self.is_negative: return S.NegativeOneexptRational(self.q, -self.p)ne else: return Rational(self.q, self.p)ne if expt is S.Infinity: # -oo already caught by test for negative if self.p > self.q: # (3/2)oo -> oo return S.Infinity if self.p < -self.q: # (-3/2)oo -> oo + Ioo return S.Infinity + S.InfinityS.ImaginaryUnit return S.Zero if isinstance(expt, Integer): # (4/3)2 -> 42 / 32 return Rational(self.pexpt.p, self.qexpt.p, 1) if isinstance(expt, Rational): if self.p != 1: # (4/3)(5/6) -> 4(5/6)3(-5/6) return Integer(self.p)exptInteger(self.q)(-expt) # as the above caught negative self.p, now self is positive return Integer(self.q)Rational( expt.p(expt.q - 1), expt.q) / \ Integer(self.q)Integer(expt.p) if self.is_extended_negative and expt.is_even: return (-self)expt return def _as_mpf_val(self, prec): return mlib.from_rational(self.p, self.q, prec, rnd) def _mpmath_(self, prec, rnd): return mpmath.make_mpf(mlib.from_rational(self.p, self.q, prec, rnd)) def __abs__(self): return Rational(abs(self.p), self.q) def __int__(self): p, q = self.p, self.q if p < 0: return -int(-p//q) return int(p//q) __long__ = __int__ def floor(self): return Integer(self.p // self.q) def ceiling(self): return -Integer(-self.p // self.q) def __floor__(self): return self.floor() def __ceil__(self): return self.ceiling() def __eq__(self, other): from sympy.core.power import integer_log try: other = _sympify(other) except SympifyError: return NotImplemented if not isinstance(other, Number): # S(0) == S.false is False # S(0) == False is True return False if not self: return not other if other.is_NumberSymbol: if other.is_irrational: return False return other.__eq__(self) if other.is_Rational: # a Rational is always in reduced form so will never be 2/4 # so we can just check equivalence of args return self.p == other.p and self.q == other.q if other.is_Float: # all Floats have a denominator that is a power of 2 # so if self doesn't, it can't be equal to other if self.q & (self.q - 1): return False s, m, t = other._mpf_[:3] if s: m = -m if not t: # other is an odd integer if not self.is_Integer or self.is_even: return False return m == self.p if t > 0: # other is an even integer if not self.is_Integer: return False # does m2t == self.p return self.p and not self.p % m and \ integer_log(self.p//m, 2) == (t, True) # does non-integer sm/2*-t = p/q? if self.is_Integer: return False return m == self.p and integer_log(self.q, 2) == (-t, True) return False def __ne__(self, other): return not self == other def _Rrel(self, other, attr): # if you want self < other, pass self, other, __gt__ try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) if other.is_Number: op = None s, o = self, other if other.is_NumberSymbol: op = getattr(o, attr) elif other.is_Float: op = getattr(o, attr) elif other.is_Rational: s, o = Integer(s.po.q), Integer(s.qo.p) op = getattr(o, attr) if op: return op(s) if o.is_number and o.is_extended_real: return Integer(s.p), s.qo def __gt__(self, other): rv = self._Rrel(other, '__lt__') if rv is None: rv = self, other elif not type(rv) is tuple: return rv return Expr.__gt__(rv) def __ge__(self, other): rv = self._Rrel(other, '__le__') if rv is None: rv = self, other elif not type(rv) is tuple: return rv return Expr.__ge__(rv) def __lt__(self, other): rv = self._Rrel(other, '__gt__') if rv is None: rv = self, other elif not type(rv) is tuple: return rv return Expr.__lt__(rv) def __le__(self, other): rv = self._Rrel(other, '__ge__') if rv is None: rv = self, other elif not type(rv) is tuple: return rv return Expr.__le__(rv) def __hash__(self): return super(Rational, self).__hash__() def factors(self, limit=None, use_trial=True, use_rho=False, use_pm1=False, verbose=False, visual=False): """A wrapper to factorint which return factors of self that are smaller than limit (or cheap to compute). Special methods of factoring are disabled by default so that only trial division is used. """ from sympy.ntheory import factorrat return factorrat(self, limit=limit, use_trial=use_trial, use_rho=use_rho, use_pm1=use_pm1, verbose=verbose).copy() def numerator(self): return self.p def denominator(self): return self.q @_sympifyit('other', NotImplemented) def gcd(self, other): if isinstance(other, Rational): if other is S.Zero: return other return Rational( Integer(igcd(self.p, other.p)), Integer(ilcm(self.q, other.q))) return Number.gcd(self, other) @_sympifyit('other', NotImplemented) def lcm(self, other): if isinstance(other, Rational): return Rational( self.p // igcd(self.p, other.p) * other.p, igcd(self.q, other.q)) return Number.lcm(self, other) def as_numer_denom(self): return Integer(self.p), Integer(self.q) def _sage_(self): import sage.all as sage return sage.Integer(self.p)/sage.Integer(self.q) def as_content_primitive(self, radical=False, clear=True): """Return the tuple (R, self/R) where R is the positive Rational extracted from self. Examples ======== >>> from sympy import S >>> (S(-3)/2).as_content_primitive() (3/2, -1) See docstring of Expr.as_content_primitive for more examples. """ if self: if self.is_positive: return self, S.One return -self, S.NegativeOne return S.One, self def as_coeff_Mul(self, rational=False): """Efficiently extract the coefficient of a product. """ return self, S.One def as_coeff_Add(self, rational=False): """Efficiently extract the coefficient of a summation. """ return self, S.Zero class Integer(Rational): """Represents integer numbers of any size. Examples ======== >>> from sympy import Integer >>> Integer(3) 3 If a float or a rational is passed to Integer, the fractional part will be discarded; the effect is of rounding toward zero. >>> Integer(3.8) 3 >>> Integer(-3.8) -3 A string is acceptable input if it can be parsed as an integer: >>> Integer("9" * 20) 99999999999999999999 It is rarely needed to explicitly instantiate an Integer, because Python integers are automatically converted to Integer when they are used in SymPy expressions. """ q = 1 is_integer = True is_number = True is_Integer = True __slots__ = ['p'] def _as_mpf_val(self, prec): return mlib.from_int(self.p, prec, rnd) def _mpmath_(self, prec, rnd): return mpmath.make_mpf(self._as_mpf_val(prec)) @cacheit def __new__(cls, i): if isinstance(i, string_types): i = i.replace(' ', '') # whereas we cannot, in general, make a Rational from an # arbitrary expression, we can make an Integer unambiguously # (except when a non-integer expression happens to round to # an integer). So we proceed by taking int() of the input and # let the int routines determine whether the expression can # be made into an int or whether an error should be raised. try: ival = int(i) except TypeError: raise TypeError( "Argument of Integer should be of numeric type, got %s." % i) # We only work with well-behaved integer types. This converts, for # example, numpy.int32 instances. if ival == 1: return S.One if ival == -1: return S.NegativeOne if ival == 0: return S.Zero obj = Expr.__new__(cls) obj.p = ival return obj def __getnewargs__(self): return (self.p,) # Arithmetic operations are here for efficiency def __int__(self): return self.p __long__ = __int__ def floor(self): return Integer(self.p) def ceiling(self): return Integer(self.p) def __floor__(self): return self.floor() def __ceil__(self): return self.ceiling() def __neg__(self): return Integer(-self.p) def __abs__(self): if self.p >= 0: return self else: return Integer(-self.p) def __divmod__(self, other): from .containers import Tuple if isinstance(other, Integer) and global_evaluate[0]: return Tuple((divmod(self.p, other.p))) else: return Number.__divmod__(self, other) def __rdivmod__(self, other): from .containers import Tuple if isinstance(other, integer_types) and global_evaluate[0]: return Tuple((divmod(other, self.p))) else: try: other = Number(other) except TypeError: msg = "unsupported operand type(s) for divmod(): '%s' and '%s'" oname = type(other).__name__ sname = type(self).__name__ raise TypeError(msg % (oname, sname)) return Number.__divmod__(other, self) # TODO make it decorator + bytecodehacks? def __add__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(self.p + other) elif isinstance(other, Integer): return Integer(self.p + other.p) elif isinstance(other, Rational): return Rational(self.pother.q + other.p, other.q, 1) return Rational.__add__(self, other) else: return Add(self, other) def __radd__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(other + self.p) elif isinstance(other, Rational): return Rational(other.p + self.pother.q, other.q, 1) return Rational.__radd__(self, other) return Rational.__radd__(self, other) def __sub__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(self.p - other) elif isinstance(other, Integer): return Integer(self.p - other.p) elif isinstance(other, Rational): return Rational(self.pother.q - other.p, other.q, 1) return Rational.__sub__(self, other) return Rational.__sub__(self, other) def __rsub__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(other - self.p) elif isinstance(other, Rational): return Rational(other.p - self.pother.q, other.q, 1) return Rational.__rsub__(self, other) return Rational.__rsub__(self, other) def __mul__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(self.pother) elif isinstance(other, Integer): return Integer(self.pother.p) elif isinstance(other, Rational): return Rational(self.pother.p, other.q, igcd(self.p, other.q)) return Rational.__mul__(self, other) return Rational.__mul__(self, other) def __rmul__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(otherself.p) elif isinstance(other, Rational): return Rational(other.pself.p, other.q, igcd(self.p, other.q)) return Rational.__rmul__(self, other) return Rational.__rmul__(self, other) def __mod__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(self.p % other) elif isinstance(other, Integer): return Integer(self.p % other.p) return Rational.__mod__(self, other) return Rational.__mod__(self, other) def __rmod__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(other % self.p) elif isinstance(other, Integer): return Integer(other.p % self.p) return Rational.__rmod__(self, other) return Rational.__rmod__(self, other) def __eq__(self, other): if isinstance(other, integer_types): return (self.p == other) elif isinstance(other, Integer): return (self.p == other.p) return Rational.__eq__(self, other) def __ne__(self, other): return not self == other def __gt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) if other.is_Integer: return _sympify(self.p > other.p) return Rational.__gt__(self, other) def __lt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s < %s" % (self, other)) if other.is_Integer: return _sympify(self.p < other.p) return Rational.__lt__(self, other) def __ge__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s >= %s" % (self, other)) if other.is_Integer: return _sympify(self.p >= other.p) return Rational.__ge__(self, other) def __le__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s <= %s" % (self, other)) if other.is_Integer: return _sympify(self.p <= other.p) return Rational.__le__(self, other) def __hash__(self): return hash(self.p) def __index__(self): return self.p ######################################## def _eval_is_odd(self): return bool(self.p % 2) def _eval_power(self, expt): """ Tries to do some simplifications on selfexpt Returns None if no further simplifications can be done When exponent is a fraction (so we have for example a square root), we try to find a simpler representation by factoring the argument up to factors of 215, e.g. - sqrt(4) becomes 2 - sqrt(-4) becomes 2I - (2*(3+7)3(6+7))Rational(1,7) becomes 618(3/7) Further simplification would require a special call to factorint on the argument which is not done here for sake of speed. """ from sympy.ntheory.factor_ import perfect_power if expt is S.Infinity: if self.p > S.One: return S.Infinity # cases -1, 0, 1 are done in their respective classes return S.Infinity + S.ImaginaryUnitS.Infinity if expt is S.NegativeInfinity: return Rational(1, self)S.Infinity if not isinstance(expt, Number): # simplify when expt is even # (-2)k --> 2k if self.is_negative and expt.is_even: return (-self)expt if isinstance(expt, Float): # Rational knows how to exponentiate by a Float return super(Integer, self)._eval_power(expt) if not isinstance(expt, Rational): return if expt is S.Half and self.is_negative: # we extract I for this special case since everyone is doing so return S.ImaginaryUnitPow(-self, expt) if expt.is_negative: # invert base and change sign on exponent ne = -expt if self.is_negative: return S.NegativeOneexptRational(1, -self)ne else: return Rational(1, self.p)ne # see if base is a perfect root, sqrt(4) --> 2 x, xexact = integer_nthroot(abs(self.p), expt.q) if xexact: # if it's a perfect root we've finished result = Integer(x*abs(expt.p)) if self.is_negative: result = S.NegativeOneexpt return result # The following is an algorithm where we collect perfect roots # from the factors of base. # if it's not an nth root, it still might be a perfect power b_pos = int(abs(self.p)) p = perfect_power(b_pos) if p is not False: dict = {p[0]: p[1]} else: dict = Integer(b_pos).factors(limit=215) # now process the dict of factors out_int = 1 # integer part out_rad = 1 # extracted radicals sqr_int = 1 sqr_gcd = 0 sqr_dict = {} for prime, exponent in dict.items(): exponent = expt.p # remove multiples of expt.q: (212)(1/10) -> 2(22)(1/10) div_e, div_m = divmod(exponent, expt.q) if div_e > 0: out_int = primediv_e if div_m > 0: # see if the reduced exponent shares a gcd with e.q # (22)(1/10) -> 2(1/5) g = igcd(div_m, expt.q) if g != 1: out_rad = Pow(prime, Rational(div_m//g, expt.q//g)) else: sqr_dict[prime] = div_m # identify gcd of remaining powers for p, ex in sqr_dict.items(): if sqr_gcd == 0: sqr_gcd = ex else: sqr_gcd = igcd(sqr_gcd, ex) if sqr_gcd == 1: break for k, v in sqr_dict.items(): sqr_int = k(v//sqr_gcd) if sqr_int == b_pos and out_int == 1 and out_rad == 1: result = None else: result = out_intout_radPow(sqr_int, Rational(sqr_gcd, expt.q)) if self.is_negative: result = Pow(S.NegativeOne, expt) return result def _eval_is_prime(self): from sympy.ntheory import isprime return isprime(self) def _eval_is_composite(self): if self > 1: return fuzzy_not(self.is_prime) else: return False def as_numer_denom(self): return self, S.One def __floordiv__(self, other): if isinstance(other, Integer): return Integer(self.p // other) return Integer(divmod(self, other)[0]) def __rfloordiv__(self, other): return Integer(Integer(other).p // self.p) # Add sympify converters for i_type in integer_types: converter[i_type] = Integer class AlgebraicNumber(Expr): """Class for representing algebraic numbers in SymPy. """ __slots__ = ['rep', 'root', 'alias', 'minpoly'] is_AlgebraicNumber = True is_algebraic = True is_number = True def __new__(cls, expr, coeffs=None, alias=None, *args): """Construct a new algebraic number. """ from sympy import Poly from sympy.polys.polyclasses import ANP, DMP from sympy.polys.numberfields import minimal_polynomial from sympy.core.symbol import Symbol expr = sympify(expr) if isinstance(expr, (tuple, Tuple)): minpoly, root = expr if not minpoly.is_Poly: minpoly = Poly(minpoly) elif expr.is_AlgebraicNumber: minpoly, root = expr.minpoly, expr.root else: minpoly, root = minimal_polynomial( expr, args.get('gen'), polys=True), expr dom = minpoly.get_domain() if coeffs is not None: if not isinstance(coeffs, ANP): rep = DMP.from_sympy_list(sympify(coeffs), 0, dom) scoeffs = Tuple(coeffs) else: rep = DMP.from_list(coeffs.to_list(), 0, dom) scoeffs = Tuple(coeffs.to_list()) if rep.degree() >= minpoly.degree(): rep = rep.rem(minpoly.rep) else: rep = DMP.from_list([1, 0], 0, dom) scoeffs = Tuple(1, 0) sargs = (root, scoeffs) if alias is not None: if not isinstance(alias, Symbol): alias = Symbol(alias) sargs = sargs + (alias,) obj = Expr.__new__(cls, sargs) obj.rep = rep obj.root = root obj.alias = alias obj.minpoly = minpoly return obj def __hash__(self): return super(AlgebraicNumber, self).__hash__() def _eval_evalf(self, prec): return self.as_expr()._evalf(prec) @property def is_aliased(self): """Returns ``True`` if ``alias`` was set. """ return self.alias is not None def as_poly(self, x=None): """Create a Poly instance from ``self``. """ from sympy import Dummy, Poly, PurePoly if x is not None: return Poly.new(self.rep, x) else: if self.alias is not None: return Poly.new(self.rep, self.alias) else: return PurePoly.new(self.rep, Dummy('x')) def as_expr(self, x=None): """Create a Basic expression from ``self``. """ return self.as_poly(x or self.root).as_expr().expand() def coeffs(self): """Returns all SymPy coefficients of an algebraic number. """ return [ self.rep.dom.to_sympy(c) for c in self.rep.all_coeffs() ] def native_coeffs(self): """Returns all native coefficients of an algebraic number. """ return self.rep.all_coeffs() def to_algebraic_integer(self): """Convert ``self`` to an algebraic integer. """ from sympy import Poly f = self.minpoly if f.LC() == 1: return self coeff = f.LC()*(f.degree() - 1) poly = f.compose(Poly(f.gen/f.LC())) minpoly = polycoeff root = f.LC()self.root return AlgebraicNumber((minpoly, root), self.coeffs()) def _eval_simplify(self, kwargs): from sympy.polys import CRootOf, minpoly measure, ratio = kwargs['measure'], kwargs['ratio'] for r in [r for r in self.minpoly.all_roots() if r.func != CRootOf]: if minpoly(self.root - r).is_Symbol: # use the matching root if it's simpler if measure(r) < ratiomeasure(self.root): return AlgebraicNumber(r) return self class RationalConstant(Rational): """ Abstract base class for rationals with specific behaviors Derived classes must define class attributes p and q and should probably all be singletons. """ __slots__ = [] def __new__(cls): return AtomicExpr.__new__(cls) class IntegerConstant(Integer): __slots__ = [] def __new__(cls): return AtomicExpr.__new__(cls) class Zero(with_metaclass(Singleton, IntegerConstant)): """The number zero. Zero is a singleton, and can be accessed by ``S.Zero`` Examples ======== >>> from sympy import S, Integer, zoo >>> Integer(0) is S.Zero True >>> 1/S.Zero zoo References ========== .. [1] https://en.wikipedia.org/wiki/Zero """ p = 0 q = 1 is_positive = False is_negative = False is_zero = True is_number = True __slots__ = [] @staticmethod def __abs__(): return S.Zero @staticmethod def __neg__(): return S.Zero def _eval_power(self, expt): if expt.is_positive: return self if expt.is_negative: return S.ComplexInfinity if expt.is_extended_real is False: return S.NaN # infinities are already handled with pos and neg # tests above; now throw away leading numbers on Mul # exponent coeff, terms = expt.as_coeff_Mul() if coeff.is_negative: return S.ComplexInfinityterms if coeff is not S.One: # there is a Number to discard return selfterms def _eval_order(self, symbols): # Order(0,x) -> 0 return self def __nonzero__(self): return False __bool__ = __nonzero__ def as_coeff_Mul(self, rational=False): # XXX this routine should be deleted """Efficiently extract the coefficient of a summation. """ return S.One, self class One(with_metaclass(Singleton, IntegerConstant)): """The number one. One is a singleton, and can be accessed by ``S.One``. Examples ======== >>> from sympy import S, Integer >>> Integer(1) is S.One True References ========== .. [1] https://en.wikipedia.org/wiki/1_%28number%29 """ is_number = True p = 1 q = 1 __slots__ = [] @staticmethod def __abs__(): return S.One @staticmethod def __neg__(): return S.NegativeOne def _eval_power(self, expt): return self def _eval_order(self, symbols): return @staticmethod def factors(limit=None, use_trial=True, use_rho=False, use_pm1=False, verbose=False, visual=False): if visual: return S.One else: return {} class NegativeOne(with_metaclass(Singleton, IntegerConstant)): """The number negative one. NegativeOne is a singleton, and can be accessed by ``S.NegativeOne``. Examples ======== >>> from sympy import S, Integer >>> Integer(-1) is S.NegativeOne True See Also ======== One References ========== .. [1] https://en.wikipedia.org/wiki/%E2%88%921_%28number%29 """ is_number = True p = -1 q = 1 __slots__ = [] @staticmethod def __abs__(): return S.One @staticmethod def __neg__(): return S.One def _eval_power(self, expt): if expt.is_odd: return S.NegativeOne if expt.is_even: return S.One if isinstance(expt, Number): if isinstance(expt, Float): return Float(-1.0)expt if expt is S.NaN: return S.NaN if expt is S.Infinity or expt is S.NegativeInfinity: return S.NaN if expt is S.Half: return S.ImaginaryUnit if isinstance(expt, Rational): if expt.q == 2: return S.ImaginaryUnitInteger(expt.p) i, r = divmod(expt.p, expt.q) if i: return self*iselfRational(r, expt.q) return class Half(with_metaclass(Singleton, RationalConstant)): """The rational number 1/2. Half is a singleton, and can be accessed by ``S.Half``. Examples ======== >>> from sympy import S, Rational >>> Rational(1, 2) is S.Half True References ========== .. [1] https://en.wikipedia.org/wiki/One_half """ is_number = True p = 1 q = 2 __slots__ = [] @staticmethod def __abs__(): return S.Half class Infinity(with_metaclass(Singleton, Number)): r"""Positive infinite quantity. In real analysis the symbol `\infty` denotes an unbounded limit: `x\to\infty` means that `x` grows without bound. Infinity is often used not only to define a limit but as a value in the affinely extended real number system. Points labeled `+\infty` and `-\infty` can be added to the topological space of the real numbers, producing the two-point compactification of the real numbers. Adding algebraic properties to this gives us the extended real numbers. Infinity is a singleton, and can be accessed by ``S.Infinity``, or can be imported as ``oo``. Examples ======== >>> from sympy import oo, exp, limit, Symbol >>> 1 + oo oo >>> 42/oo 0 >>> x = Symbol('x') >>> limit(exp(x), x, oo) oo See Also ======== NegativeInfinity, NaN References ========== .. [1] https://en.wikipedia.org/wiki/Infinity """ is_commutative = True is_number = True is_complex = False is_extended_real = True is_infinite = True is_extended_positive = True is_prime = False __slots__ = [] def __new__(cls): return AtomicExpr.__new__(cls) def _latex(self, printer): return r"\infty" def _eval_subs(self, old, new): if self == old: return new @_sympifyit('other', NotImplemented) def __add__(self, other): if isinstance(other, Number): if other is S.NegativeInfinity or other is S.NaN: return S.NaN return self return NotImplemented __radd__ = __add__ @_sympifyit('other', NotImplemented) def __sub__(self, other): if isinstance(other, Number): if other is S.Infinity or other is S.NaN: return S.NaN return self return NotImplemented @_sympifyit('other', NotImplemented) def __rsub__(self, other): return (-self).__add__(other) @_sympifyit('other', NotImplemented) def __mul__(self, other): if isinstance(other, Number): if other.is_zero or other is S.NaN: return S.NaN if other.is_extended_positive: return self return S.NegativeInfinity return NotImplemented __rmul__ = __mul__ @_sympifyit('other', NotImplemented) def __div__(self, other): if isinstance(other, Number): if other is S.Infinity or \ other is S.NegativeInfinity or \ other is S.NaN: return S.NaN if other.is_extended_nonnegative: return self return S.NegativeInfinity return NotImplemented __truediv__ = __div__ def __abs__(self): return S.Infinity def __neg__(self): return S.NegativeInfinity def _eval_power(self, expt): """ ``expt`` is symbolic object but not equal to 0 or 1. ================ ======= ============================== Expression Result Notes ================ ======= ============================== ``oo nan`` ``nan`` ``oo -p`` ``0`` ``p`` is number, ``oo`` ================ ======= ============================== See Also ======== Pow NaN NegativeInfinity """ from sympy.functions import re if expt.is_extended_positive: return S.Infinity if expt.is_extended_negative: return S.Zero if expt is S.NaN: return S.NaN if expt is S.ComplexInfinity: return S.NaN if expt.is_extended_real is False and expt.is_number: expt_real = re(expt) if expt_real.is_positive: return S.ComplexInfinity if expt_real.is_negative: return S.Zero if expt_real.is_zero: return S.NaN return selfexpt.evalf() def _as_mpf_val(self, prec): return mlib.finf def _sage_(self): import sage.all as sage return sage.oo def __hash__(self): return super(Infinity, self).__hash__() def __eq__(self, other): return other is S.Infinity or other == float('inf') def __ne__(self, other): return other is not S.Infinity and other != float('inf') def __lt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s < %s" % (self, other)) if other.is_extended_real: return S.false return Expr.__lt__(self, other) def __le__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s <= %s" % (self, other)) if other.is_infinite and other.is_extended_positive: return S.true elif other.is_real or other.is_extended_nonpositive: return S.false return Expr.__le__(self, other) def __gt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) if other.is_infinite and other.is_extended_positive: return S.false elif other.is_real or other.is_extended_nonpositive: return S.true return Expr.__gt__(self, other) def __ge__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s >= %s" % (self, other)) if other.is_extended_real: return S.true return Expr.__ge__(self, other) def __mod__(self, other): return S.NaN __rmod__ = __mod__ def floor(self): return self def ceiling(self): return self oo = S.Infinity class NegativeInfinity(with_metaclass(Singleton, Number)): """Negative infinite quantity. NegativeInfinity is a singleton, and can be accessed by ``S.NegativeInfinity``. See Also ======== Infinity """ is_extended_real = True is_complex = False is_commutative = True is_infinite = True is_extended_negative = True is_number = True is_prime = False __slots__ = [] def __new__(cls): return AtomicExpr.__new__(cls) def _latex(self, printer): return r"-\infty" def _eval_subs(self, old, new): if self == old: return new @_sympifyit('other', NotImplemented) def __add__(self, other): if isinstance(other, Number): if other is S.Infinity or other is S.NaN: return S.NaN return self return NotImplemented __radd__ = __add__ @_sympifyit('other', NotImplemented) def __sub__(self, other): if isinstance(other, Number): if other is S.NegativeInfinity or other is S.NaN: return S.NaN return self return NotImplemented @_sympifyit('other', NotImplemented) def __rsub__(self, other): return (-self).__add__(other) @_sympifyit('other', NotImplemented) def __mul__(self, other): if isinstance(other, Number): if other.is_zero or other is S.NaN: return S.NaN if other.is_extended_positive: return self return S.Infinity return NotImplemented __rmul__ = __mul__ @_sympifyit('other', NotImplemented) def __div__(self, other): if isinstance(other, Number): if other is S.Infinity or \ other is S.NegativeInfinity or \ other is S.NaN: return S.NaN if other.is_extended_nonnegative: return self return S.Infinity return NotImplemented __truediv__ = __div__ def __abs__(self): return S.Infinity def __neg__(self): return S.Infinity def _eval_power(self, expt): """ ``expt`` is symbolic object but not equal to 0 or 1. ================ ======= ============================== Expression Result Notes ================ ======= ============================== ``(-oo) nan`` ``nan`` ``(-oo) oo`` ``nan`` ``(-oo) -oo`` ``nan`` ``(-oo) e`` ``oo`` ``e`` is positive even integer ``(-oo) o`` ``-oo`` ``o`` is positive odd integer ================ ======= ============================== See Also ======== Infinity Pow NaN """ if expt.is_number: if expt is S.NaN or \ expt is S.Infinity or \ expt is S.NegativeInfinity: return S.NaN if isinstance(expt, Integer) and expt.is_extended_positive: if expt.is_odd: return S.NegativeInfinity else: return S.Infinity return S.NegativeOneexptS.Infinityexpt def _as_mpf_val(self, prec): return mlib.fninf def _sage_(self): import sage.all as sage return -(sage.oo) def __hash__(self): return super(NegativeInfinity, self).__hash__() def __eq__(self, other): return other is S.NegativeInfinity or other == float('-inf') def __ne__(self, other): return other is not S.NegativeInfinity and other != float('-inf') def __lt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s < %s" % (self, other)) if other.is_infinite and other.is_extended_negative: return S.false elif other.is_real or other.is_extended_nonnegative: return S.true return Expr.__lt__(self, other) def __le__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s <= %s" % (self, other)) if other.is_extended_real: return S.true return Expr.__le__(self, other) def __gt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) if other.is_extended_real: return S.false return Expr.__gt__(self, other) def __ge__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s >= %s" % (self, other)) if other.is_infinite and other.is_extended_negative: return S.true elif other.is_real or other.is_extended_nonnegative: return S.false return Expr.__ge__(self, other) def __mod__(self, other): return S.NaN __rmod__ = __mod__ def floor(self): return self def ceiling(self): return self def as_powers_dict(self): return {S.NegativeOne: 1, S.Infinity: 1} class NaN(with_metaclass(Singleton, Number)): """ Not a Number. This serves as a place holder for numeric values that are indeterminate. Most operations on NaN, produce another NaN. Most indeterminate forms, such as ``0/0`` or ``oo - oo` produce NaN. Two exceptions are ``00`` and ``oo0``, which all produce ``1`` (this is consistent with Python's float). NaN is loosely related to floating point nan, which is defined in the IEEE 754 floating point standard, and corresponds to the Python ``float('nan')``. Differences are noted below. NaN is mathematically not equal to anything else, even NaN itself. This explains the initially counter-intuitive results with ``Eq`` and ``==`` in the examples below. NaN is not comparable so inequalities raise a TypeError. This is in contrast with floating point nan where all inequalities are false. NaN is a singleton, and can be accessed by ``S.NaN``, or can be imported as ``nan``. Examples ======== >>> from sympy import nan, S, oo, Eq >>> nan is S.NaN True >>> oo - oo nan >>> nan + 1 nan >>> Eq(nan, nan) # mathematical equality False >>> nan == nan # structural equality True References ========== .. [1] https://en.wikipedia.org/wiki/NaN """ is_commutative = True is_extended_real = None is_real = None is_rational = None is_algebraic = None is_transcendental = None is_integer = None is_comparable = False is_finite = None is_zero = None is_prime = None is_positive = None is_negative = None is_number = True __slots__ = [] def __new__(cls): return AtomicExpr.__new__(cls) def _latex(self, printer): return r"\text{NaN}" def __neg__(self): return self @_sympifyit('other', NotImplemented) def __add__(self, other): return self @_sympifyit('other', NotImplemented) def __sub__(self, other): return self @_sympifyit('other', NotImplemented) def __mul__(self, other): return self @_sympifyit('other', NotImplemented) def __div__(self, other): return self __truediv__ = __div__ def floor(self): return self def ceiling(self): return self def _as_mpf_val(self, prec): return _mpf_nan def _sage_(self): import sage.all as sage return sage.NaN def __hash__(self): return super(NaN, self).__hash__() def __eq__(self, other): # NaN is structurally equal to another NaN return other is S.NaN def __ne__(self, other): return other is not S.NaN def _eval_Eq(self, other): # NaN is not mathematically equal to anything, even NaN return S.false # Expr will _sympify and raise TypeError __gt__ = Expr.__gt__ __ge__ = Expr.__ge__ __lt__ = Expr.__lt__ __le__ = Expr.__le__ nan = S.NaN class ComplexInfinity(with_metaclass(Singleton, AtomicExpr)): r"""Complex infinity. In complex analysis the symbol `\tilde\infty`, called "complex infinity", represents a quantity with infinite magnitude, but undetermined complex phase. ComplexInfinity is a singleton, and can be accessed by ``S.ComplexInfinity``, or can be imported as ``zoo``. Examples ======== >>> from sympy import zoo, oo >>> zoo + 42 zoo >>> 42/zoo 0 >>> zoo + zoo nan >>> zoozoo zoo See Also ======== Infinity """ is_commutative = True is_infinite = True is_number = True is_prime = False is_complex = True is_extended_real = False __slots__ = [] def __new__(cls): return AtomicExpr.__new__(cls) def _latex(self, printer): return r"\tilde{\infty}" @staticmethod def __abs__(): return S.Infinity def floor(self): return self def ceiling(self): return self @staticmethod def __neg__(): return S.ComplexInfinity def _eval_power(self, expt): if expt is S.ComplexInfinity: return S.NaN if isinstance(expt, Number): if expt is S.Zero: return S.NaN else: if expt.is_positive: return S.ComplexInfinity else: return S.Zero def _sage_(self): import sage.all as sage return sage.UnsignedInfinityRing.gen() zoo = S.ComplexInfinity class NumberSymbol(AtomicExpr): is_commutative = True is_finite = True is_number = True __slots__ = [] is_NumberSymbol = True def __new__(cls): return AtomicExpr.__new__(cls) def approximation(self, number_cls): """ Return an interval with number_cls endpoints that contains the value of NumberSymbol. If not implemented, then return None. """ def _eval_evalf(self, prec): return Float._new(self._as_mpf_val(prec), prec) def __eq__(self, other): try: other = _sympify(other) except SympifyError: return NotImplemented if self is other: return True if other.is_Number and self.is_irrational: return False return False # NumberSymbol != non-(Number\|self) def __ne__(self, other): return not self == other def __le__(self, other): if self is other: return S.true return Expr.__le__(self, other) def __ge__(self, other): if self is other: return S.true return Expr.__ge__(self, other) def __int__(self): # subclass with appropriate return value raise NotImplementedError def __long__(self): return self.__int__() def __hash__(self): return super(NumberSymbol, self).__hash__() class Exp1(with_metaclass(Singleton, NumberSymbol)): r"""The `e` constant. The transcendental number `e = 2.718281828\ldots` is the base of the natural logarithm and of the exponential function, `e = \exp(1)`. Sometimes called Euler's number or Napier's constant. Exp1 is a singleton, and can be accessed by ``S.Exp1``, or can be imported as ``E``. Examples ======== >>> from sympy import exp, log, E >>> E is exp(1) True >>> log(E) 1 References ========== .. [1] https://en.wikipedia.org/wiki/E_%28mathematical_constant%29 """ is_real = True is_positive = True is_negative = False # XXX Forces is_negative/is_nonnegative is_irrational = True is_number = True is_algebraic = False is_transcendental = True __slots__ = [] def _latex(self, printer): return r"e" @staticmethod def __abs__(): return S.Exp1 def __int__(self): return 2 def _as_mpf_val(self, prec): return mpf_e(prec) def approximation_interval(self, number_cls): if issubclass(number_cls, Integer): return (Integer(2), Integer(3)) elif issubclass(number_cls, Rational): pass def _eval_power(self, expt): from sympy import exp return exp(expt) def _eval_rewrite_as_sin(self, *kwargs): from sympy import sin I = S.ImaginaryUnit return sin(I + S.Pi/2) - Isin(I) def _eval_rewrite_as_cos(self, *kwargs): from sympy import cos I = S.ImaginaryUnit return cos(I) + Icos(I + S.Pi/2) def _sage_(self): import sage.all as sage return sage.e E = S.Exp1 class Pi(with_metaclass(Singleton, NumberSymbol)): r"""The `\pi` constant. The transcendental number `\pi = 3.141592654\ldots` represents the ratio of a circle's circumference to its diameter, the area of the unit circle, the half-period of trigonometric functions, and many other things in mathematics. Pi is a singleton, and can be accessed by ``S.Pi``, or can be imported as ``pi``. Examples ======== >>> from sympy import S, pi, oo, sin, exp, integrate, Symbol >>> S.Pi pi >>> pi > 3 True >>> pi.is_irrational True >>> x = Symbol('x') >>> sin(x + 2pi) sin(x) >>> integrate(exp(-x2), (x, -oo, oo)) sqrt(pi) References ========== .. [1] https://en.wikipedia.org/wiki/Pi """ is_real = True is_positive = True is_negative = False is_irrational = True is_number = True is_algebraic = False is_transcendental = True __slots__ = [] def _latex(self, printer): return r"\pi" @staticmethod def __abs__(): return S.Pi def __int__(self): return 3 def _as_mpf_val(self, prec): return mpf_pi(prec) def approximation_interval(self, number_cls): if issubclass(number_cls, Integer): return (Integer(3), Integer(4)) elif issubclass(number_cls, Rational): return (Rational(223, 71), Rational(22, 7)) def _sage_(self): import sage.all as sage return sage.pi pi = S.Pi class GoldenRatio(with_metaclass(Singleton, NumberSymbol)): r"""The golden ratio, `\phi`. `\phi = \frac{1 + \sqrt{5}}{2}` is algebraic number. Two quantities are in the golden ratio if their ratio is the same as the ratio of their sum to the larger of the two quantities, i.e. their maximum. GoldenRatio is a singleton, and can be accessed by ``S.GoldenRatio``. Examples ======== >>> from sympy import S >>> S.GoldenRatio > 1 True >>> S.GoldenRatio.expand(func=True) 1/2 + sqrt(5)/2 >>> S.GoldenRatio.is_irrational True References ========== .. [1] https://en.wikipedia.org/wiki/Golden_ratio """ is_real = True is_positive = True is_negative = False is_irrational = True is_number = True is_algebraic = True is_transcendental = False __slots__ = [] def _latex(self, printer): return r"\phi" def __int__(self): return 1 def _as_mpf_val(self, prec): # XXX track down why this has to be increased rv = mlib.from_man_exp(phi_fixed(prec + 10), -prec - 10) return mpf_norm(rv, prec) def _eval_expand_func(self, hints): from sympy import sqrt return S.Half + S.Halfsqrt(5) def approximation_interval(self, number_cls): if issubclass(number_cls, Integer): return (S.One, Rational(2)) elif issubclass(number_cls, Rational): pass def _sage_(self): import sage.all as sage return sage.golden_ratio _eval_rewrite_as_sqrt = _eval_expand_func class TribonacciConstant(with_metaclass(Singleton, NumberSymbol)): r"""The tribonacci constant. The tribonacci numbers are like the Fibonacci numbers, but instead of starting with two predetermined terms, the sequence starts with three predetermined terms and each term afterwards is the sum of the preceding three terms. The tribonacci constant is the ratio toward which adjacent tribonacci numbers tend. It is a root of the polynomial `x^3 - x^2 - x - 1 = 0`, and also satisfies the equation `x + x^{-3} = 2`. TribonacciConstant is a singleton, and can be accessed by ``S.TribonacciConstant``. Examples ======== >>> from sympy import S >>> S.TribonacciConstant > 1 True >>> S.TribonacciConstant.expand(func=True) 1/3 + (19 - 3sqrt(33))(1/3)/3 + (3sqrt(33) + 19)(1/3)/3 >>> S.TribonacciConstant.is_irrational True >>> S.TribonacciConstant.n(20) 1.8392867552141611326 References ========== .. [1] https://en.wikipedia.org/wiki/Generalizations_of_Fibonacci_numbers#Tribonacci_numbers """ is_real = True is_positive = True is_negative = False is_irrational = True is_number = True is_algebraic = True is_transcendental = False __slots__ = [] def _latex(self, printer): return r"\text{TribonacciConstant}" def __int__(self): return 2 def _eval_evalf(self, prec): rv = self._eval_expand_func(function=True)._eval_evalf(prec + 4) return Float(rv, precision=prec) def _eval_expand_func(self, hints): from sympy import sqrt, cbrt return (1 + cbrt(19 - 3sqrt(33)) + cbrt(19 + 3sqrt(33))) / 3 def approximation_interval(self, number_cls): if issubclass(number_cls, Integer): return (S.One, Rational(2)) elif issubclass(number_cls, Rational): pass _eval_rewrite_as_sqrt = _eval_expand_func class EulerGamma(with_metaclass(Singleton, NumberSymbol)): r"""The Euler-Mascheroni constant. `\gamma = 0.5772157\ldots` (also called Euler's constant) is a mathematical constant recurring in analysis and number theory. It is defined as the limiting difference between the harmonic series and the natural logarithm: .. math:: \gamma = \lim\limits_{n\to\infty} \left(\sum\limits_{k=1}^n\frac{1}{k} - \ln n\right) EulerGamma is a singleton, and can be accessed by ``S.EulerGamma``. Examples ======== >>> from sympy import S >>> S.EulerGamma.is_irrational >>> S.EulerGamma > 0 True >>> S.EulerGamma > 1 False References ========== .. [1] https://en.wikipedia.org/wiki/Euler%E2%80%93Mascheroni_constant """ is_real = True is_positive = True is_negative = False is_irrational = None is_number = True __slots__ = [] def _latex(self, printer): return r"\gamma" def __int__(self): return 0 def _as_mpf_val(self, prec): # XXX track down why this has to be increased v = mlib.libhyper.euler_fixed(prec + 10) rv = mlib.from_man_exp(v, -prec - 10) return mpf_norm(rv, prec) def approximation_interval(self, number_cls): if issubclass(number_cls, Integer): return (S.Zero, S.One) elif issubclass(number_cls, Rational): return (S.Half, Rational(3, 5)) def _sage_(self): import sage.all as sage return sage.euler_gamma class Catalan(with_metaclass(Singleton, NumberSymbol)): r"""Catalan's constant. `K = 0.91596559\ldots` is given by the infinite series .. math:: K = \sum_{k=0}^{\infty} \frac{(-1)^k}{(2k+1)^2} Catalan is a singleton, and can be accessed by ``S.Catalan``. Examples ======== >>> from sympy import S >>> S.Catalan.is_irrational >>> S.Catalan > 0 True >>> S.Catalan > 1 False References ========== .. [1] https://en.wikipedia.org/wiki/Catalan%27s_constant """ is_real = True is_positive = True is_negative = False is_irrational = None is_number = True __slots__ = [] def __int__(self): return 0 def _as_mpf_val(self, prec): # XXX track down why this has to be increased v = mlib.catalan_fixed(prec + 10) rv = mlib.from_man_exp(v, -prec - 10) return mpf_norm(rv, prec) def approximation_interval(self, number_cls): if issubclass(number_cls, Integer): return (S.Zero, S.One) elif issubclass(number_cls, Rational): return (Rational(9, 10), S.One) def _sage_(self): import sage.all as sage return sage.catalan class ImaginaryUnit(with_metaclass(Singleton, AtomicExpr)): r"""The imaginary unit, `i = \sqrt{-1}`. I is a singleton, and can be accessed by ``S.I``, or can be imported as ``I``. Examples ======== >>> from sympy import I, sqrt >>> sqrt(-1) I >>> II -1 >>> 1/I -I References ========== .. [1] https://en.wikipedia.org/wiki/Imaginary_unit """ is_commutative = True is_imaginary = True is_finite = True is_number = True is_algebraic = True is_transcendental = False __slots__ = [] def _latex(self, printer): return printer._settings['imaginary_unit_latex'] @staticmethod def __abs__(): return S.One def _eval_evalf(self, prec): return self def _eval_conjugate(self): return -S.ImaginaryUnit def _eval_power(self, expt): """ b is I = sqrt(-1) e is symbolic object but not equal to 0, 1 Ir -> (-1)(r/2) -> exp(r/2PiI) -> sin(Pir/2) + cos(Pir/2)I, r is decimal I0 mod 4 -> 1 I1 mod 4 -> I I2 mod 4 -> -1 I3 mod 4 -> -I """ if isinstance(expt, Number): if isinstance(expt, Integer): expt = expt.p % 4 if expt == 0: return S.One if expt == 1: return S.ImaginaryUnit if expt == 2: return -S.One return -S.ImaginaryUnit return def as_base_exp(self): return S.NegativeOne, S.Half def _sage_(self): import sage.all as sage return sage.I @property def _mpc_(self): return (Float(0)._mpf_, Float(1)._mpf_) I = S.ImaginaryUnit def sympify_fractions(f): return Rational(f.numerator, f.denominator, 1) converter[fractions.Fraction] = sympify_fractions try: if HAS_GMPY == 2: import gmpy2 as gmpy elif HAS_GMPY == 1: import gmpy else: raise ImportError def sympify_mpz(x): return Integer(long(x)) def sympify_mpq(x): return Rational(long(x.numerator), long(x.denominator)) converter[type(gmpy.mpz(1))] = sympify_mpz converter[type(gmpy.mpq(1, 2))] = sympify_mpq except ImportError: pass def sympify_mpmath(x): return Expr._from_mpmath(x, x.context.prec) converter[mpnumeric] = sympify_mpmath def sympify_mpq(x): p, q = x._mpq_ return Rational(p, q, 1) converter[type(mpmath.rational.mpq(1, 2))] = sympify_mpq def sympify_complex(a): real, imag = list(map(sympify, (a.real, a.imag))) return real + S.ImaginaryUnit*imag converter[complex] = sympify_complex from .power import Pow, integer_nthroot from .mul import Mul Mul.identity = One() from .add import Add Add.identity = Zero() def _register_classes(): numbers.Number.register(Number) numbers.Real.register(Float) numbers.Rational.register(Rational) numbers.Rational.register(Integer) _register_classes()
160c4c515b0bc611215af78fb820eade24d1dcc251d2d94c473daf81b420d4d7	from __future__ import print_function, division from sympy.core.sympify import _sympify, sympify from sympy.core.basic import Basic from sympy.core.cache import cacheit from sympy.core.compatibility import ordered, range from sympy.core.logic import fuzzy_and from sympy.core.evaluate import global_evaluate from sympy.utilities.iterables import sift class AssocOp(Basic): """ Associative operations, can separate noncommutative and commutative parts. (a op b) op c == a op (b op c) == a op b op c. Base class for Add and Mul. This is an abstract base class, concrete derived classes must define the attribute `identity`. """ # for performance reason, we don't let is_commutative go to assumptions, # and keep it right here __slots__ = ['is_commutative'] @cacheit def __new__(cls, args, options): from sympy import Order args = list(map(_sympify, args)) args = [a for a in args if a is not cls.identity] evaluate = options.get('evaluate') if evaluate is None: evaluate = global_evaluate[0] if not evaluate: obj = cls._from_args(args) obj = cls._exec_constructor_postprocessors(obj) return obj if len(args) == 0: return cls.identity if len(args) == 1: return args[0] c_part, nc_part, order_symbols = cls.flatten(args) is_commutative = not nc_part obj = cls._from_args(c_part + nc_part, is_commutative) obj = cls._exec_constructor_postprocessors(obj) if order_symbols is not None: return Order(obj, order_symbols) return obj @classmethod def _from_args(cls, args, is_commutative=None): """Create new instance with already-processed args. If the args are not in canonical order, then a non-canonical result will be returned, so use with caution. The order of args may change if the sign of the args is changed.""" if len(args) == 0: return cls.identity elif len(args) == 1: return args[0] obj = super(AssocOp, cls).__new__(cls, args) if is_commutative is None: is_commutative = fuzzy_and(a.is_commutative for a in args) obj.is_commutative = is_commutative return obj def _new_rawargs(self, args, *kwargs): """Create new instance of own class with args exactly as provided by caller but returning the self class identity if args is empty. This is handy when we want to optimize things, e.g. >>> from sympy import Mul, S >>> from sympy.abc import x, y >>> e = Mul(3, x, y) >>> e.args (3, x, y) >>> Mul(e.args[1:]) xy >>> e._new_rawargs(e.args[1:]) # the same as above, but faster xy Note: use this with caution. There is no checking of arguments at all. This is best used when you are rebuilding an Add or Mul after simply removing one or more args. If, for example, modifications, result in extra 1s being inserted (as when collecting an expression's numerators and denominators) they will not show up in the result but a Mul will be returned nonetheless: >>> m = (xy)._new_rawargs(S.One, x); m x >>> m == x False >>> m.is_Mul True Another issue to be aware of is that the commutativity of the result is based on the commutativity of self. If you are rebuilding the terms that came from a commutative object then there will be no problem, but if self was non-commutative then what you are rebuilding may now be commutative. Although this routine tries to do as little as possible with the input, getting the commutativity right is important, so this level of safety is enforced: commutativity will always be recomputed if self is non-commutative and kwarg `reeval=False` has not been passed. """ if kwargs.pop('reeval', True) and self.is_commutative is False: is_commutative = None else: is_commutative = self.is_commutative return self._from_args(args, is_commutative) @classmethod def flatten(cls, seq): """Return seq so that none of the elements are of type `cls`. This is the vanilla routine that will be used if a class derived from AssocOp does not define its own flatten routine.""" # apply associativity, no commutativity property is used new_seq = [] while seq: o = seq.pop() if o.__class__ is cls: # classes must match exactly seq.extend(o.args) else: new_seq.append(o) new_seq.reverse() # c_part, nc_part, order_symbols return [], new_seq, None def _matches_commutative(self, expr, repl_dict={}, old=False): """ Matches Add/Mul "pattern" to an expression "expr". repl_dict ... a dictionary of (wild: expression) pairs, that get returned with the results This function is the main workhorse for Add/Mul. For instance: >>> from sympy import symbols, Wild, sin >>> a = Wild("a") >>> b = Wild("b") >>> c = Wild("c") >>> x, y, z = symbols("x y z") >>> (a+sin(b)c)._matches_commutative(x+sin(y)z) {a_: x, b_: y, c_: z} In the example above, "a+sin(b)c" is the pattern, and "x+sin(y)z" is the expression. The repl_dict contains parts that were already matched. For example here: >>> (x+sin(b)c)._matches_commutative(x+sin(y)z, repl_dict={a: x}) {a_: x, b_: y, c_: z} the only function of the repl_dict is to return it in the result, e.g. if you omit it: >>> (x+sin(b)c)._matches_commutative(x+sin(y)z) {b_: y, c_: z} the "a: x" is not returned in the result, but otherwise it is equivalent. """ # make sure expr is Expr if pattern is Expr from .expr import Add, Expr from sympy import Mul if isinstance(self, Expr) and not isinstance(expr, Expr): return None # handle simple patterns if self == expr: return repl_dict d = self._matches_simple(expr, repl_dict) if d is not None: return d # eliminate exact part from pattern: (2+a+w1+w2).matches(expr) -> (w1+w2).matches(expr-a-2) from .function import WildFunction from .symbol import Wild wild_part, exact_part = sift(self.args, lambda p: p.has(Wild, WildFunction) and not expr.has(p), binary=True) if not exact_part: wild_part = list(ordered(wild_part)) else: exact = self._new_rawargs(exact_part) free = expr.free_symbols if free and (exact.free_symbols - free): # there are symbols in the exact part that are not # in the expr; but if there are no free symbols, let # the matching continue return None newexpr = self._combine_inverse(expr, exact) if not old and (expr.is_Add or expr.is_Mul): if newexpr.count_ops() > expr.count_ops(): return None newpattern = self._new_rawargs(wild_part) return newpattern.matches(newexpr, repl_dict) # now to real work ;) i = 0 saw = set() while expr not in saw: saw.add(expr) expr_list = (self.identity,) + tuple(ordered(self.make_args(expr))) for last_op in reversed(expr_list): for w in reversed(wild_part): d1 = w.matches(last_op, repl_dict) if d1 is not None: d2 = self.xreplace(d1).matches(expr, d1) if d2 is not None: return d2 if i == 0: if self.is_Mul: # make e*i look like Mul if expr.is_Pow and expr.exp.is_Integer: if expr.exp > 0: expr = Mul([expr.base, expr.base*(expr.exp - 1)], evaluate=False) else: expr = Mul([1/expr.base, expr.base*(expr.exp + 1)], evaluate=False) i += 1 continue elif self.is_Add: # make ie look like Add c, e = expr.as_coeff_Mul() if abs(c) > 1: if c > 0: expr = Add([e, (c - 1)e], evaluate=False) else: expr = Add([-e, (c + 1)e], evaluate=False) i += 1 continue # try collection on non-Wild symbols from sympy.simplify.radsimp import collect was = expr did = set() for w in reversed(wild_part): c, w = w.as_coeff_mul(Wild) free = c.free_symbols - did if free: did.update(free) expr = collect(expr, free) if expr != was: i += 0 continue break # if we didn't continue, there is nothing more to do return def _has_matcher(self): """Helper for .has()""" def _ncsplit(expr): # this is not the same as args_cnc because here # we don't assume expr is a Mul -- hence deal with args -- # and always return a set. cpart, ncpart = sift(expr.args, lambda arg: arg.is_commutative is True, binary=True) return set(cpart), ncpart c, nc = _ncsplit(self) cls = self.__class__ def is_in(expr): if expr == self: return True elif not isinstance(expr, Basic): return False elif isinstance(expr, cls): _c, _nc = _ncsplit(expr) if (c & _c) == c: if not nc: return True elif len(nc) <= len(_nc): for i in range(len(_nc) - len(nc) + 1): if _nc[i:i + len(nc)] == nc: return True return False return is_in def _eval_evalf(self, prec): """ Evaluate the parts of self that are numbers; if the whole thing was a number with no functions it would have been evaluated, but it wasn't so we must judiciously extract the numbers and reconstruct the object. This is not simply replacing numbers with evaluated numbers. Numbers should be handled in the largest pure-number expression as possible. So the code below separates ``self`` into number and non-number parts and evaluates the number parts and walks the args of the non-number part recursively (doing the same thing). """ from .add import Add from .mul import Mul from .symbol import Symbol from .function import AppliedUndef if isinstance(self, (Mul, Add)): x, tail = self.as_independent(Symbol, AppliedUndef) # if x is an AssocOp Function then the _evalf below will # call _eval_evalf (here) so we must break the recursion if not (tail is self.identity or isinstance(x, AssocOp) and x.is_Function or x is self.identity and isinstance(tail, AssocOp)): # here, we have a number so we just call to _evalf with prec; # prec is not the same as n, it is the binary precision so # that's why we don't call to evalf. x = x._evalf(prec) if x is not self.identity else self.identity args = [] tail_args = tuple(self.func.make_args(tail)) for a in tail_args: # here we call to _eval_evalf since we don't know what we # are dealing with and all other _eval_evalf routines should # be doing the same thing (i.e. taking binary prec and # finding the evalf-able args) newa = a._eval_evalf(prec) if newa is None: args.append(a) else: args.append(newa) return self.func(x, args) # this is the same as above, but there were no pure-number args to # deal with args = [] for a in self.args: newa = a._eval_evalf(prec) if newa is None: args.append(a) else: args.append(newa) return self.func(args) @classmethod def make_args(cls, expr): """ Return a sequence of elements `args` such that cls(args) == expr >>> from sympy import Symbol, Mul, Add >>> x, y = map(Symbol, 'xy') >>> Mul.make_args(xy) (x, y) >>> Add.make_args(xy) (xy,) >>> set(Add.make_args(xy + y)) == set([y, xy]) True """ if isinstance(expr, cls): return expr.args else: return (sympify(expr),) class ShortCircuit(Exception): pass class LatticeOp(AssocOp): """ Join/meet operations of an algebraic lattice[1]. These binary operations are associative (op(op(a, b), c) = op(a, op(b, c))), commutative (op(a, b) = op(b, a)) and idempotent (op(a, a) = op(a) = a). Common examples are AND, OR, Union, Intersection, max or min. They have an identity element (op(identity, a) = a) and an absorbing element conventionally called zero (op(zero, a) = zero). This is an abstract base class, concrete derived classes must declare attributes zero and identity. All defining properties are then respected. >>> from sympy import Integer >>> from sympy.core.operations import LatticeOp >>> class my_join(LatticeOp): ... zero = Integer(0) ... identity = Integer(1) >>> my_join(2, 3) == my_join(3, 2) True >>> my_join(2, my_join(3, 4)) == my_join(2, 3, 4) True >>> my_join(0, 1, 4, 2, 3, 4) 0 >>> my_join(1, 2) 2 References: [1] - https://en.wikipedia.org/wiki/Lattice_%28order%29 """ is_commutative = True def __new__(cls, args, options): args = (_sympify(arg) for arg in args) try: # /!\ args is a generator and _new_args_filter # must be careful to handle as such; this # is done so short-circuiting can be done # without having to sympify all values _args = frozenset(cls._new_args_filter(args)) except ShortCircuit: return sympify(cls.zero) if not _args: return sympify(cls.identity) elif len(_args) == 1: return set(_args).pop() else: # XXX in almost every other case for __new__, _args is # passed along, but the expectation here is for _args obj = super(AssocOp, cls).__new__(cls, _args) obj._argset = _args return obj @classmethod def _new_args_filter(cls, arg_sequence, call_cls=None): """Generator filtering args""" ncls = call_cls or cls for arg in arg_sequence: if arg == ncls.zero: raise ShortCircuit(arg) elif arg == ncls.identity: continue elif arg.func == ncls: for x in arg.args: yield x else: yield arg @classmethod def make_args(cls, expr): """ Return a set of args such that cls(*arg_set) == expr. """ if isinstance(expr, cls): return expr._argset else: return frozenset([sympify(expr)]) @property @cacheit def args(self): return tuple(ordered(self._argset)) @staticmethod def _compare_pretty(a, b): return (str(a) > str(b)) - (str(a) < str(b))
11280689b9f71530152596462229d879840009aa8624459a2b161bb8063c9b49	from __future__ import print_function, division from sympy.core.assumptions import StdFactKB, _assume_defined from sympy.core.compatibility import (string_types, range, is_sequence, ordered) from .basic import Basic from .sympify import sympify from .singleton import S from .expr import Expr, AtomicExpr from .cache import cacheit from .function import FunctionClass from sympy.core.logic import fuzzy_bool from sympy.logic.boolalg import Boolean from sympy.utilities.iterables import cartes, sift from sympy.core.containers import Tuple import string import re as _re import random def _filter_assumptions(kwargs): """Split the given dict into assumptions and non-assumptions. Keys are taken as assumptions if they correspond to an entry in ``_assume_defined``. """ assumptions, nonassumptions = map(dict, sift(kwargs.items(), lambda i: i[0] in _assume_defined, binary=True)) Symbol._sanitize(assumptions) return assumptions, nonassumptions def _symbol(s, matching_symbol=None, assumptions): """Return s if s is a Symbol, else if s is a string, return either the matching_symbol if the names are the same or else a new symbol with the same assumptions as the matching symbol (or the assumptions as provided). Examples ======== >>> from sympy import Symbol, Dummy >>> from sympy.core.symbol import _symbol >>> _symbol('y') y >>> _.is_real is None True >>> _symbol('y', real=True).is_real True >>> x = Symbol('x') >>> _symbol(x, real=True) x >>> _.is_real is None # ignore attribute if s is a Symbol True Below, the variable sym has the name 'foo': >>> sym = Symbol('foo', real=True) Since 'x' is not the same as sym's name, a new symbol is created: >>> _symbol('x', sym).name 'x' It will acquire any assumptions give: >>> _symbol('x', sym, real=False).is_real False Since 'foo' is the same as sym's name, sym is returned >>> _symbol('foo', sym) foo Any assumptions given are ignored: >>> _symbol('foo', sym, real=False).is_real True NB: the symbol here may not be the same as a symbol with the same name defined elsewhere as a result of different assumptions. See Also ======== sympy.core.symbol.Symbol """ if isinstance(s, string_types): if matching_symbol and matching_symbol.name == s: return matching_symbol return Symbol(s, assumptions) elif isinstance(s, Symbol): return s else: raise ValueError('symbol must be string for symbol name or Symbol') def _uniquely_named_symbol(xname, exprs=(), compare=str, modify=None, assumptions): """Return a symbol which, when printed, will have a name unique from any other already in the expressions given. The name is made unique by prepending underscores (default) but this can be customized with the keyword 'modify'. Parameters ========== xname : a string or a Symbol (when symbol xname <- str(xname)) compare : a single arg function that takes a symbol and returns a string to be compared with xname (the default is the str function which indicates how the name will look when it is printed, e.g. this includes underscores that appear on Dummy symbols) modify : a single arg function that changes its string argument in some way (the default is to prepend underscores) Examples ======== >>> from sympy.core.symbol import _uniquely_named_symbol as usym, Dummy >>> from sympy.abc import x >>> usym('x', x) _x """ default = None if is_sequence(xname): xname, default = xname x = str(xname) if not exprs: return _symbol(x, default, assumptions) if not is_sequence(exprs): exprs = [exprs] syms = set().union([e.free_symbols for e in exprs]) if modify is None: modify = lambda s: '_' + s while any(x == compare(s) for s in syms): x = modify(x) return _symbol(x, default, assumptions) class Symbol(AtomicExpr, Boolean): """ Assumptions: commutative = True You can override the default assumptions in the constructor: >>> from sympy import symbols >>> A,B = symbols('A,B', commutative = False) >>> bool(AB != BA) True >>> bool(AB2 == 2AB) == True # multiplication by scalars is commutative True """ is_comparable = False __slots__ = ['name'] is_Symbol = True is_symbol = True @property def _diff_wrt(self): """Allow derivatives wrt Symbols. Examples ======== >>> from sympy import Symbol >>> x = Symbol('x') >>> x._diff_wrt True """ return True @staticmethod def _sanitize(assumptions, obj=None): """Remove None, covert values to bool, check commutativity in place. """ # be strict about commutativity: cannot be None is_commutative = fuzzy_bool(assumptions.get('commutative', True)) if is_commutative is None: whose = '%s ' % obj.__name__ if obj else '' raise ValueError( '%scommutativity must be True or False.' % whose) # sanitize other assumptions so 1 -> True and 0 -> False for key in list(assumptions.keys()): from collections import defaultdict from sympy.utilities.exceptions import SymPyDeprecationWarning keymap = defaultdict(lambda: None) keymap.update({'bounded': 'finite', 'unbounded': 'infinite', 'infinitesimal': 'zero'}) if keymap[key]: SymPyDeprecationWarning( feature="%s assumption" % key, useinstead="%s" % keymap[key], issue=8071, deprecated_since_version="0.7.6").warn() assumptions[keymap[key]] = assumptions[key] assumptions.pop(key) key = keymap[key] v = assumptions[key] if v is None: assumptions.pop(key) continue assumptions[key] = bool(v) def _merge(self, assumptions): base = self.assumptions0 for k in set(assumptions) & set(base): if assumptions[k] != base[k]: raise ValueError(filldedent(''' non-matching assumptions for %s: existing value is %s and new value is %s''' % ( k, base[k], assumptions[k]))) base.update(assumptions) return base def __new__(cls, name, assumptions): """Symbols are identified by name and assumptions:: >>> from sympy import Symbol >>> Symbol("x") == Symbol("x") True >>> Symbol("x", real=True) == Symbol("x", real=False) False """ cls._sanitize(assumptions, cls) return Symbol.__xnew_cached_(cls, name, assumptions) def __new_stage2__(cls, name, assumptions): if not isinstance(name, string_types): raise TypeError("name should be a string, not %s" % repr(type(name))) obj = Expr.__new__(cls) obj.name = name # TODO: Issue #8873: Forcing the commutative assumption here means # later code such as ``srepr()`` cannot tell whether the user # specified ``commutative=True`` or omitted it. To workaround this, # we keep a copy of the assumptions dict, then create the StdFactKB, # and finally overwrite its ``._generator`` with the dict copy. This # is a bit of a hack because we assume StdFactKB merely copies the # given dict as ``._generator``, but future modification might, e.g., # compute a minimal equivalent assumption set. tmp_asm_copy = assumptions.copy() # be strict about commutativity is_commutative = fuzzy_bool(assumptions.get('commutative', True)) assumptions['commutative'] = is_commutative obj._assumptions = StdFactKB(assumptions) obj._assumptions._generator = tmp_asm_copy # Issue #8873 return obj __xnew__ = staticmethod( __new_stage2__) # never cached (e.g. dummy) __xnew_cached_ = staticmethod( cacheit(__new_stage2__)) # symbols are always cached def __getnewargs__(self): return (self.name,) def __getstate__(self): return {'_assumptions': self._assumptions} def _hashable_content(self): # Note: user-specified assumptions not hashed, just derived ones return (self.name,) + tuple(sorted(self.assumptions0.items())) def _eval_subs(self, old, new): from sympy.core.power import Pow if old.is_Pow: return Pow(self, S.One, evaluate=False)._eval_subs(old, new) @property def assumptions0(self): return dict((key, value) for key, value in self._assumptions.items() if value is not None) @cacheit def sort_key(self, order=None): return self.class_key(), (1, (str(self),)), S.One.sort_key(), S.One def as_dummy(self): return Dummy(self.name) def as_real_imag(self, deep=True, hints): from sympy import im, re if hints.get('ignore') == self: return None else: return (re(self), im(self)) def _sage_(self): import sage.all as sage return sage.var(self.name) def is_constant(self, wrt, flags): if not wrt: return False return not self in wrt @property def free_symbols(self): return {self} binary_symbols = free_symbols # in this case, not always def as_set(self): return S.UniversalSet class Dummy(Symbol): """Dummy symbols are each unique, even if they have the same name: >>> from sympy import Dummy >>> Dummy("x") == Dummy("x") False If a name is not supplied then a string value of an internal count will be used. This is useful when a temporary variable is needed and the name of the variable used in the expression is not important. >>> Dummy() #doctest: +SKIP _Dummy_10 """ # In the rare event that a Dummy object needs to be recreated, both the # `name` and `dummy_index` should be passed. This is used by `srepr` for # example: # >>> d1 = Dummy() # >>> d2 = eval(srepr(d1)) # >>> d2 == d1 # True # # If a new session is started between `srepr` and `eval`, there is a very # small chance that `d2` will be equal to a previously-created Dummy. _count = 0 _prng = random.Random() _base_dummy_index = _prng.randint(106, 9106) __slots__ = ['dummy_index'] is_Dummy = True def __new__(cls, name=None, dummy_index=None, assumptions): if dummy_index is not None: assert name is not None, "If you specify a dummy_index, you must also provide a name" if name is None: name = "Dummy_" + str(Dummy._count) if dummy_index is None: dummy_index = Dummy._base_dummy_index + Dummy._count Dummy._count += 1 cls._sanitize(assumptions, cls) obj = Symbol.__xnew__(cls, name, assumptions) obj.dummy_index = dummy_index return obj def __getstate__(self): return {'_assumptions': self._assumptions, 'dummy_index': self.dummy_index} @cacheit def sort_key(self, order=None): return self.class_key(), ( 2, (str(self), self.dummy_index)), S.One.sort_key(), S.One def _hashable_content(self): return Symbol._hashable_content(self) + (self.dummy_index,) class Wild(Symbol): """ A Wild symbol matches anything, or anything without whatever is explicitly excluded. Parameters ========== name : str Name of the Wild instance. exclude : iterable, optional Instances in ``exclude`` will not be matched. properties : iterable of functions, optional Functions, each taking an expressions as input and returns a ``bool``. All functions in ``properties`` need to return ``True`` in order for the Wild instance to match the expression. Examples ======== >>> from sympy import Wild, WildFunction, cos, pi >>> from sympy.abc import x, y, z >>> a = Wild('a') >>> x.match(a) {a_: x} >>> pi.match(a) {a_: pi} >>> (3x*2).match(ax) {a_: 3x} >>> cos(x).match(a) {a_: cos(x)} >>> b = Wild('b', exclude=[x]) >>> (3x*2).match(bx) >>> b.match(a) {a_: b_} >>> A = WildFunction('A') >>> A.match(a) {a_: A_} Tips ==== When using Wild, be sure to use the exclude keyword to make the pattern more precise. Without the exclude pattern, you may get matches that are technically correct, but not what you wanted. For example, using the above without exclude: >>> from sympy import symbols >>> a, b = symbols('a b', cls=Wild) >>> (2 + 3y).match(ax + by) {a_: 2/x, b_: 3} This is technically correct, because (2/x)x + 3y == 2 + 3y, but you probably wanted it to not match at all. The issue is that you really didn't want a and b to include x and y, and the exclude parameter lets you specify exactly this. With the exclude parameter, the pattern will not match. >>> a = Wild('a', exclude=[x, y]) >>> b = Wild('b', exclude=[x, y]) >>> (2 + 3y).match(ax + by) Exclude also helps remove ambiguity from matches. >>> E = 2x*3yz >>> a, b = symbols('a b', cls=Wild) >>> E.match(ab) {a_: 2yz, b_: x*3} >>> a = Wild('a', exclude=[x, y]) >>> E.match(ab) {a_: z, b_: 2x3y} >>> a = Wild('a', exclude=[x, y, z]) >>> E.match(ab) {a_: 2, b_: x3yz} Wild also accepts a ``properties`` parameter: >>> a = Wild('a', properties=[lambda k: k.is_Integer]) >>> E.match(ab) {a_: 2, b_: x*3yz} """ is_Wild = True __slots__ = ['exclude', 'properties'] def __new__(cls, name, exclude=(), properties=(), assumptions): exclude = tuple([sympify(x) for x in exclude]) properties = tuple(properties) cls._sanitize(assumptions, cls) return Wild.__xnew__(cls, name, exclude, properties, assumptions) def __getnewargs__(self): return (self.name, self.exclude, self.properties) @staticmethod @cacheit def __xnew__(cls, name, exclude, properties, assumptions): obj = Symbol.__xnew__(cls, name, assumptions) obj.exclude = exclude obj.properties = properties return obj def _hashable_content(self): return super(Wild, self)._hashable_content() + (self.exclude, self.properties) # TODO add check against another Wild def matches(self, expr, repl_dict={}, old=False): if any(expr.has(x) for x in self.exclude): return None if any(not f(expr) for f in self.properties): return None repl_dict = repl_dict.copy() repl_dict[self] = expr return repl_dict _range = _re.compile('([0-9]:[0-9]+\|[a-zA-Z]?:[a-zA-Z])') def symbols(names, *args): r""" Transform strings into instances of :class:`Symbol` class. :func:`symbols` function returns a sequence of symbols with names taken from ``names`` argument, which can be a comma or whitespace delimited string, or a sequence of strings:: >>> from sympy import symbols, Function >>> x, y, z = symbols('x,y,z') >>> a, b, c = symbols('a b c') The type of output is dependent on the properties of input arguments:: >>> symbols('x') x >>> symbols('x,') (x,) >>> symbols('x,y') (x, y) >>> symbols(('a', 'b', 'c')) (a, b, c) >>> symbols(['a', 'b', 'c']) [a, b, c] >>> symbols({'a', 'b', 'c'}) {a, b, c} If an iterable container is needed for a single symbol, set the ``seq`` argument to ``True`` or terminate the symbol name with a comma:: >>> symbols('x', seq=True) (x,) To reduce typing, range syntax is supported to create indexed symbols. Ranges are indicated by a colon and the type of range is determined by the character to the right of the colon. If the character is a digit then all contiguous digits to the left are taken as the nonnegative starting value (or 0 if there is no digit left of the colon) and all contiguous digits to the right are taken as 1 greater than the ending value:: >>> symbols('x:10') (x0, x1, x2, x3, x4, x5, x6, x7, x8, x9) >>> symbols('x5:10') (x5, x6, x7, x8, x9) >>> symbols('x5(:2)') (x50, x51) >>> symbols('x5:10,y:5') (x5, x6, x7, x8, x9, y0, y1, y2, y3, y4) >>> symbols(('x5:10', 'y:5')) ((x5, x6, x7, x8, x9), (y0, y1, y2, y3, y4)) If the character to the right of the colon is a letter, then the single letter to the left (or 'a' if there is none) is taken as the start and all characters in the lexicographic range through* the letter to the right are used as the range:: >>> symbols('x:z') (x, y, z) >>> symbols('x:c') # null range () >>> symbols('x(:c)') (xa, xb, xc) >>> symbols(':c') (a, b, c) >>> symbols('a:d, x:z') (a, b, c, d, x, y, z) >>> symbols(('a:d', 'x:z')) ((a, b, c, d), (x, y, z)) Multiple ranges are supported; contiguous numerical ranges should be separated by parentheses to disambiguate the ending number of one range from the starting number of the next:: >>> symbols('x:2(1:3)') (x01, x02, x11, x12) >>> symbols(':3:2') # parsing is from left to right (00, 01, 10, 11, 20, 21) Only one pair of parentheses surrounding ranges are removed, so to include parentheses around ranges, double them. And to include spaces, commas, or colons, escape them with a backslash:: >>> symbols('x((a:b))') (x(a), x(b)) >>> symbols(r'x(:1\,:2)') # or r'x((:1)\,(:2))' (x(0,0), x(0,1)) All newly created symbols have assumptions set according to ``args``:: >>> a = symbols('a', integer=True) >>> a.is_integer True >>> x, y, z = symbols('x,y,z', real=True) >>> x.is_real and y.is_real and z.is_real True Despite its name, :func:`symbols` can create symbol-like objects like instances of Function or Wild classes. To achieve this, set ``cls`` keyword argument to the desired type:: >>> symbols('f,g,h', cls=Function) (f, g, h) >>> type(_[0]) <class 'sympy.core.function.UndefinedFunction'> """ result = [] if isinstance(names, string_types): marker = 0 literals = [r'\,', r'\:', r'\ '] for i in range(len(literals)): lit = literals.pop(0) if lit in names: while chr(marker) in names: marker += 1 lit_char = chr(marker) marker += 1 names = names.replace(lit, lit_char) literals.append((lit_char, lit[1:])) def literal(s): if literals: for c, l in literals: s = s.replace(c, l) return s names = names.strip() as_seq = names.endswith(',') if as_seq: names = names[:-1].rstrip() if not names: raise ValueError('no symbols given') # split on commas names = [n.strip() for n in names.split(',')] if not all(n for n in names): raise ValueError('missing symbol between commas') # split on spaces for i in range(len(names) - 1, -1, -1): names[i: i + 1] = names[i].split() cls = args.pop('cls', Symbol) seq = args.pop('seq', as_seq) for name in names: if not name: raise ValueError('missing symbol') if ':' not in name: symbol = cls(literal(name), *args) result.append(symbol) continue split = _range.split(name) # remove 1 layer of bounding parentheses around ranges for i in range(len(split) - 1): if i and ':' in split[i] and split[i] != ':' and \ split[i - 1].endswith('(') and \ split[i + 1].startswith(')'): split[i - 1] = split[i - 1][:-1] split[i + 1] = split[i + 1][1:] for i, s in enumerate(split): if ':' in s: if s[-1].endswith(':'): raise ValueError('missing end range') a, b = s.split(':') if b[-1] in string.digits: a = 0 if not a else int(a) b = int(b) split[i] = [str(c) for c in range(a, b)] else: a = a or 'a' split[i] = [string.ascii_letters[c] for c in range( string.ascii_letters.index(a), string.ascii_letters.index(b) + 1)] # inclusive if not split[i]: break else: split[i] = [s] else: seq = True if len(split) == 1: names = split[0] else: names = [''.join(s) for s in cartes(split)] if literals: result.extend([cls(literal(s), args) for s in names]) else: result.extend([cls(s, args) for s in names]) if not seq and len(result) <= 1: if not result: return () return result[0] return tuple(result) else: for name in names: result.append(symbols(name, args)) return type(names)(result) def var(names, args): """ Create symbols and inject them into the global namespace. This calls :func:`symbols` with the same arguments and puts the results into the global namespace. It's recommended not to use :func:`var` in library code, where :func:`symbols` has to be used:: Examples ======== >>> from sympy import var >>> var('x') x >>> x x >>> var('a,ab,abc') (a, ab, abc) >>> abc abc >>> var('x,y', real=True) (x, y) >>> x.is_real and y.is_real True See :func:`symbol` documentation for more details on what kinds of arguments can be passed to :func:`var`. """ def traverse(symbols, frame): """Recursively inject symbols to the global namespace. """ for symbol in symbols: if isinstance(symbol, Basic): frame.f_globals[symbol.name] = symbol elif isinstance(symbol, FunctionClass): frame.f_globals[symbol.__name__] = symbol else: traverse(symbol, frame) from inspect import currentframe frame = currentframe().f_back try: syms = symbols(names, *args) if syms is not None: if isinstance(syms, Basic): frame.f_globals[syms.name] = syms elif isinstance(syms, FunctionClass): frame.f_globals[syms.__name__] = syms else: traverse(syms, frame) finally: del frame # break cyclic dependencies as stated in inspect docs return syms def disambiguate(iter): """ Return a Tuple containing the passed expressions with symbols that appear the same when printed replaced with numerically subscripted symbols, and all Dummy symbols replaced with Symbols. Parameters ========== iter: list of symbols or expressions. Examples ======== >>> from sympy.core.symbol import disambiguate >>> from sympy import Dummy, Symbol, Tuple >>> from sympy.abc import y >>> tup = Symbol('_x'), Dummy('x'), Dummy('x') >>> disambiguate(tup) (x_2, x, x_1) >>> eqs = Tuple(Symbol('x')/y, Dummy('x')/y) >>> disambiguate(eqs) (x_1/y, x/y) >>> ix = Symbol('x', integer=True) >>> vx = Symbol('x') >>> disambiguate(vx + ix) (x + x_1,) To make your own mapping of symbols to use, pass only the free symbols of the expressions and create a dictionary: >>> free = eqs.free_symbols >>> mapping = dict(zip(free, disambiguate(free))) >>> eqs.xreplace(mapping) (x_1/y, x/y) """ new_iter = Tuple(iter) key = lambda x:tuple(sorted(x.assumptions0.items())) syms = ordered(new_iter.free_symbols, keys=key) mapping = {} for s in syms: mapping.setdefault(str(s).lstrip('_'), []).append(s) reps = {} for k in mapping: # the first or only symbol doesn't get subscripted but make # sure that it's a Symbol, not a Dummy mapk0 = Symbol("%s" % (k), mapping[k][0].assumptions0) if mapping[k][0] != mapk0: reps[mapping[k][0]] = mapk0 # the others get subscripts (and are made into Symbols) skip = 0 for i in range(1, len(mapping[k])): while True: name = "%s_%i" % (k, i + skip) if name not in mapping: break skip += 1 ki = mapping[k][i] reps[ki] = Symbol(name, ki.assumptions0) return new_iter.xreplace(reps)
d036712b6cc2a1e207b99eb1f881bff14cc60c1f5dd360d6bfe6d3e85b2ec0a1	from __future__ import print_function, division from collections import defaultdict from functools import cmp_to_key import operator from .sympify import sympify from .basic import Basic from .singleton import S from .operations import AssocOp from .cache import cacheit from .logic import fuzzy_not, _fuzzy_group from .compatibility import reduce, range from .expr import Expr from .evaluate import global_distribute # internal marker to indicate: # "there are still non-commutative objects -- don't forget to process them" class NC_Marker: is_Order = False is_Mul = False is_Number = False is_Poly = False is_commutative = False # Key for sorting commutative args in canonical order _args_sortkey = cmp_to_key(Basic.compare) def _mulsort(args): # in-place sorting of args args.sort(key=_args_sortkey) def _unevaluated_Mul(args): """Return a well-formed unevaluated Mul: Numbers are collected and put in slot 0, any arguments that are Muls will be flattened, and args are sorted. Use this when args have changed but you still want to return an unevaluated Mul. Examples ======== >>> from sympy.core.mul import _unevaluated_Mul as uMul >>> from sympy import S, sqrt, Mul >>> from sympy.abc import x >>> a = uMul([S(3.0), x, S(2)]) >>> a.args[0] 6.00000000000000 >>> a.args[1] x Two unevaluated Muls with the same arguments will always compare as equal during testing: >>> m = uMul(sqrt(2), sqrt(3)) >>> m == uMul(sqrt(3), sqrt(2)) True >>> u = Mul(sqrt(3), sqrt(2), evaluate=False) >>> m == uMul(u) True >>> m == Mul(m.args) False """ args = list(args) newargs = [] ncargs = [] co = S.One while args: a = args.pop() if a.is_Mul: c, nc = a.args_cnc() args.extend(c) if nc: ncargs.append(Mul._from_args(nc)) elif a.is_Number: co = a else: newargs.append(a) _mulsort(newargs) if co is not S.One: newargs.insert(0, co) if ncargs: newargs.append(Mul._from_args(ncargs)) return Mul._from_args(newargs) class Mul(Expr, AssocOp): __slots__ = [] is_Mul = True def __neg__(self): c, args = self.as_coeff_mul() c = -c if c is not S.One: if args[0].is_Number: args = list(args) if c is S.NegativeOne: args[0] = -args[0] else: args[0] = c else: args = (c,) + args return self._from_args(args, self.is_commutative) @classmethod def flatten(cls, seq): """Return commutative, noncommutative and order arguments by combining related terms. Notes ===== In an expression like ``abc``, python process this through sympy as ``Mul(Mul(a, b), c)``. This can have undesirable consequences. - Sometimes terms are not combined as one would like: {c.f. https://github.com/sympy/sympy/issues/4596} >>> from sympy import Mul, sqrt >>> from sympy.abc import x, y, z >>> 2(x + 1) # this is the 2-arg Mul behavior 2x + 2 >>> y(x + 1)2 2y(x + 1) >>> 2(x + 1)y # 2-arg result will be obtained first y(2x + 2) >>> Mul(2, x + 1, y) # all 3 args simultaneously processed 2y(x + 1) >>> 2((x + 1)y) # parentheses can control this behavior 2y(x + 1) Powers with compound bases may not find a single base to combine with unless all arguments are processed at once. Post-processing may be necessary in such cases. {c.f. https://github.com/sympy/sympy/issues/5728} >>> a = sqrt(xsqrt(y)) >>> a3 (xsqrt(y))*(3/2) >>> Mul(a,a,a) (xsqrt(y))*(3/2) >>> aaa xsqrt(y)sqrt(xsqrt(y)) >>> _.subs(a.base, z).subs(z, a.base) (xsqrt(y))(3/2) - If more than two terms are being multiplied then all the previous terms will be re-processed for each new argument. So if each of ``a``, ``b`` and ``c`` were :class:`Mul` expression, then ``abc`` (or building up the product with ``=``) will process all the arguments of ``a`` and ``b`` twice: once when ``ab`` is computed and again when ``c`` is multiplied. Using ``Mul(a, b, c)`` will process all arguments once. The results of Mul are cached according to arguments, so flatten will only be called once for ``Mul(a, b, c)``. If you can structure a calculation so the arguments are most likely to be repeats then this can save time in computing the answer. For example, say you had a Mul, M, that you wished to divide by ``d[i]`` and multiply by ``n[i]`` and you suspect there are many repeats in ``n``. It would be better to compute ``Mn[i]/d[i]`` rather than ``M/d[i]n[i]`` since every time n[i] is a repeat, the product, ``Mn[i]`` will be returned without flattening -- the cached value will be returned. If you divide by the ``d[i]`` first (and those are more unique than the ``n[i]``) then that will create a new Mul, ``M/d[i]`` the args of which will be traversed again when it is multiplied by ``n[i]``. {c.f. https://github.com/sympy/sympy/issues/5706} This consideration is moot if the cache is turned off. NB -- The validity of the above notes depends on the implementation details of Mul and flatten which may change at any time. Therefore, you should only consider them when your code is highly performance sensitive. Removal of 1 from the sequence is already handled by AssocOp.__new__. """ from sympy.calculus.util import AccumBounds from sympy.matrices.expressions import MatrixExpr rv = None if len(seq) == 2: a, b = seq if b.is_Rational: a, b = b, a seq = [a, b] assert not a is S.One if not a.is_zero and a.is_Rational: r, b = b.as_coeff_Mul() if b.is_Add: if r is not S.One: # 2-arg hack # leave the Mul as a Mul rv = [cls(ar, b, evaluate=False)], [], None elif global_distribute[0] and b.is_commutative: r, b = b.as_coeff_Add() bargs = [_keep_coeff(a, bi) for bi in Add.make_args(b)] _addsort(bargs) ar = ar if ar: bargs.insert(0, ar) bargs = [Add._from_args(bargs)] rv = bargs, [], None if rv: return rv # apply associativity, separate commutative part of seq c_part = [] # out: commutative factors nc_part = [] # out: non-commutative factors nc_seq = [] coeff = S.One # standalone term # e.g. 3 ... c_powers = [] # (base,exp) n # e.g. (x,n) for x num_exp = [] # (num-base, exp) y # e.g. (3, y) for ... * 3 * ... neg1e = S.Zero # exponent on -1 extracted from Number-based Pow and I pnum_rat = {} # (num-base, Rat-exp) 1/2 # e.g. (3, 1/2) for ... * 3 * ... order_symbols = None # --- PART 1 --- # # "collect powers and coeff": # # o coeff # o c_powers # o num_exp # o neg1e # o pnum_rat # # NOTE: this is optimized for all-objects-are-commutative case for o in seq: # O(x) if o.is_Order: o, order_symbols = o.as_expr_variables(order_symbols) # Mul([...]) if o.is_Mul: if o.is_commutative: seq.extend(o.args) # XXX zerocopy? else: # NCMul can have commutative parts as well for q in o.args: if q.is_commutative: seq.append(q) else: nc_seq.append(q) # append non-commutative marker, so we don't forget to # process scheduled non-commutative objects seq.append(NC_Marker) continue # 3 elif o.is_Number: if o is S.NaN or coeff is S.ComplexInfinity and o is S.Zero: # we know for sure the result will be nan return [S.NaN], [], None elif coeff.is_Number or isinstance(coeff, AccumBounds): # it could be zoo coeff = o if coeff is S.NaN: # we know for sure the result will be nan return [S.NaN], [], None continue elif isinstance(o, AccumBounds): coeff = o.__mul__(coeff) continue elif o is S.ComplexInfinity: if not coeff: # 0 zoo = NaN return [S.NaN], [], None if coeff is S.ComplexInfinity: # zoo * zoo = zoo return [S.ComplexInfinity], [], None coeff = S.ComplexInfinity continue elif o is S.ImaginaryUnit: neg1e += S.Half continue elif o.is_commutative: # e # o = b b, e = o.as_base_exp() # y # 3 if o.is_Pow: if b.is_Number: # get all the factors with numeric base so they can be # combined below, but don't combine negatives unless # the exponent is an integer if e.is_Rational: if e.is_Integer: coeff = Pow(b, e) # it is an unevaluated power continue elif e.is_negative: # also a sign of an unevaluated power seq.append(Pow(b, e)) continue elif b.is_negative: neg1e += e b = -b if b is not S.One: pnum_rat.setdefault(b, []).append(e) continue elif b.is_positive or e.is_integer: num_exp.append((b, e)) continue c_powers.append((b, e)) # NON-COMMUTATIVE # TODO: Make non-commutative exponents not combine automatically else: if o is not NC_Marker: nc_seq.append(o) # process nc_seq (if any) while nc_seq: o = nc_seq.pop(0) if not nc_part: nc_part.append(o) continue # b c b+c # try to combine last terms: a a -> a o1 = nc_part.pop() b1, e1 = o1.as_base_exp() b2, e2 = o.as_base_exp() new_exp = e1 + e2 # Only allow powers to combine if the new exponent is # not an Add. This allow things like a*2b3 == a5 # if a.is_commutative == False, but prohibits # a*xay and xaxb from combining (x,y commute). if b1 == b2 and (not new_exp.is_Add): o12 = b1 * new_exp # now o12 could be a commutative object if o12.is_commutative: seq.append(o12) continue else: nc_seq.insert(0, o12) else: nc_part.append(o1) nc_part.append(o) # We do want a combined exponent if it would not be an Add, such as # y 2y 3y # x * x -> x # We determine if two exponents have the same term by using # as_coeff_Mul. # # Unfortunately, this isn't smart enough to consider combining into # exponents that might already be adds, so things like: # z - y y # x * x will be left alone. This is because checking every possible # combination can slow things down. # gather exponents of common bases... def _gather(c_powers): common_b = {} # b:e for b, e in c_powers: co = e.as_coeff_Mul() common_b.setdefault(b, {}).setdefault( co[1], []).append(co[0]) for b, d in common_b.items(): for di, li in d.items(): d[di] = Add(li) new_c_powers = [] for b, e in common_b.items(): new_c_powers.extend([(b, ct) for t, c in e.items()]) return new_c_powers # in c_powers c_powers = _gather(c_powers) # and in num_exp num_exp = _gather(num_exp) # --- PART 2 --- # # o process collected powers (x0 -> 1; x1 -> x; otherwise Pow) # o combine collected powers (2*x 3x -> 6x) # with numeric base # ................................ # now we have: # - coeff: # - c_powers: (b, e) # - num_exp: (2, e) # - pnum_rat: {(1/3, [1/3, 2/3, 1/4])} # 0 1 # x -> 1 x -> x # this should only need to run twice; if it fails because # it needs to be run more times, perhaps this should be # changed to a "while True" loop -- the only reason it # isn't such now is to allow a less-than-perfect result to # be obtained rather than raising an error or entering an # infinite loop for i in range(2): new_c_powers = [] changed = False for b, e in c_powers: if e.is_zero: # canceling out infinities yields NaN if (b.is_Add or b.is_Mul) and any(infty in b.args for infty in (S.ComplexInfinity, S.Infinity, S.NegativeInfinity)): return [S.NaN], [], None continue if e is S.One: if b.is_Number: coeff = b continue p = b if e is not S.One: p = Pow(b, e) # check to make sure that the base doesn't change # after exponentiation; to allow for unevaluated # Pow, we only do so if b is not already a Pow if p.is_Pow and not b.is_Pow: bi = b b, e = p.as_base_exp() if b != bi: changed = True c_part.append(p) new_c_powers.append((b, e)) # there might have been a change, but unless the base # matches some other base, there is nothing to do if changed and len(set( b for b, e in new_c_powers)) != len(new_c_powers): # start over again c_part = [] c_powers = _gather(new_c_powers) else: break # x x x # 2 3 -> 6 inv_exp_dict = {} # exp:Mul(num-bases) x x # e.g. x:6 for ... * 2 * 3 * ... for b, e in num_exp: inv_exp_dict.setdefault(e, []).append(b) for e, b in inv_exp_dict.items(): inv_exp_dict[e] = cls(b) c_part.extend([Pow(b, e) for e, b in inv_exp_dict.items() if e]) # b, e -> e' = sum(e), b # {(1/5, [1/3]), (1/2, [1/12, 1/4]} -> {(1/3, [1/5, 1/2])} comb_e = {} for b, e in pnum_rat.items(): comb_e.setdefault(Add(e), []).append(b) del pnum_rat # process them, reducing exponents to values less than 1 # and updating coeff if necessary else adding them to # num_rat for further processing num_rat = [] for e, b in comb_e.items(): b = cls(b) if e.q == 1: coeff = Pow(b, e) continue if e.p > e.q: e_i, ep = divmod(e.p, e.q) coeff = Pow(b, e_i) e = Rational(ep, e.q) num_rat.append((b, e)) del comb_e # extract gcd of bases in num_rat # 2(1/3)6(1/4) -> 2(1/3+1/4)3(1/4) pnew = defaultdict(list) i = 0 # steps through num_rat which may grow while i < len(num_rat): bi, ei = num_rat[i] grow = [] for j in range(i + 1, len(num_rat)): bj, ej = num_rat[j] g = bi.gcd(bj) if g is not S.One: # 4r16r2 -> 2(r1+r2) * 2*r1 3*r2 # this might have a gcd with something else e = ei + ej if e.q == 1: coeff = Pow(g, e) else: if e.p > e.q: e_i, ep = divmod(e.p, e.q) # change e in place coeff = Pow(g, e_i) e = Rational(ep, e.q) grow.append((g, e)) # update the jth item num_rat[j] = (bj/g, ej) # update bi that we are checking with bi = bi/g if bi is S.One: break if bi is not S.One: obj = Pow(bi, ei) if obj.is_Number: coeff = obj else: # changes like sqrt(12) -> 2sqrt(3) for obj in Mul.make_args(obj): if obj.is_Number: coeff = obj else: assert obj.is_Pow bi, ei = obj.args pnew[ei].append(bi) num_rat.extend(grow) i += 1 # combine bases of the new powers for e, b in pnew.items(): pnew[e] = cls(b) # handle -1 and I if neg1e: # treat I as (-1)(1/2) and compute -1's total exponent p, q = neg1e.as_numer_denom() # if the integer part is odd, extract -1 n, p = divmod(p, q) if n % 2: coeff = -coeff # if it's a multiple of 1/2 extract I if q == 2: c_part.append(S.ImaginaryUnit) elif p: # see if there is any positive base this power of # -1 can join neg1e = Rational(p, q) for e, b in pnew.items(): if e == neg1e and b.is_positive: pnew[e] = -b break else: # keep it separate; we've already evaluated it as # much as possible so evaluate=False c_part.append(Pow(S.NegativeOne, neg1e, evaluate=False)) # add all the pnew powers c_part.extend([Pow(b, e) for e, b in pnew.items()]) # oo, -oo if (coeff is S.Infinity) or (coeff is S.NegativeInfinity): def _handle_for_oo(c_part, coeff_sign): new_c_part = [] for t in c_part: if t.is_extended_positive: continue if t.is_extended_negative: coeff_sign = -1 continue new_c_part.append(t) return new_c_part, coeff_sign c_part, coeff_sign = _handle_for_oo(c_part, 1) nc_part, coeff_sign = _handle_for_oo(nc_part, coeff_sign) coeff = coeff_sign # zoo if coeff is S.ComplexInfinity: # zoo might be # infinite_real + bounded_im # bounded_real + infinite_im # infinite_real + infinite_im # and non-zero real or imaginary will not change that status. c_part = [c for c in c_part if not (fuzzy_not(c.is_zero) and c.is_extended_real is not None)] nc_part = [c for c in nc_part if not (fuzzy_not(c.is_zero) and c.is_extended_real is not None)] # 0 elif coeff is S.Zero: # we know for sure the result will be 0 except the multiplicand # is infinity or a matrix if any(isinstance(c, MatrixExpr) for c in nc_part): return [coeff], nc_part, order_symbols if any(c.is_finite == False for c in c_part): return [S.NaN], [], order_symbols return [coeff], [], order_symbols # check for straggling Numbers that were produced _new = [] for i in c_part: if i.is_Number: coeff = i else: _new.append(i) c_part = _new # order commutative part canonically _mulsort(c_part) # current code expects coeff to be always in slot-0 if coeff is not S.One: c_part.insert(0, coeff) # we are done if (global_distribute[0] and not nc_part and len(c_part) == 2 and c_part[0].is_Number and c_part[0].is_finite and c_part[1].is_Add): # 2(1+a) -> 2 + 2 a coeff = c_part[0] c_part = [Add([coefff for f in c_part[1].args])] return c_part, nc_part, order_symbols def _eval_power(b, e): # don't break up NC terms: (AB)3 != A3B*3, it is ABABAB cargs, nc = b.args_cnc(split_1=False) if e.is_Integer: return Mul([Pow(b, e, evaluate=False) for b in cargs]) \ Pow(Mul._from_args(nc), e, evaluate=False) if e.is_Rational and e.q == 2: from sympy.core.power import integer_nthroot from sympy.functions.elementary.complexes import sign if b.is_imaginary: a = b.as_real_imag()[1] if a.is_Rational: n, d = abs(a/2).as_numer_denom() n, t = integer_nthroot(n, 2) if t: d, t = integer_nthroot(d, 2) if t: r = sympify(n)/d return _unevaluated_Mul(r*e.p, (1 + sign(a)S.ImaginaryUnit)*e.p) p = Pow(b, e, evaluate=False) if e.is_Rational or e.is_Float: return p._eval_expand_power_base() return p @classmethod def class_key(cls): return 3, 0, cls.__name__ def _eval_evalf(self, prec): c, m = self.as_coeff_Mul() if c is S.NegativeOne: if m.is_Mul: rv = -AssocOp._eval_evalf(m, prec) else: mnew = m._eval_evalf(prec) if mnew is not None: m = mnew rv = -m else: rv = AssocOp._eval_evalf(self, prec) if rv.is_number: return rv.expand() return rv @property def _mpc_(self): """ Convert self to an mpmath mpc if possible """ from sympy.core.numbers import I, Float im_part, imag_unit = self.as_coeff_Mul() if not imag_unit == I: # ValueError may seem more reasonable but since it's a @property, # we need to use AttributeError to keep from confusing things like # hasattr. raise AttributeError("Cannot convert Mul to mpc. Must be of the form NumberI") return (Float(0)._mpf_, Float(im_part)._mpf_) @cacheit def as_two_terms(self): """Return head and tail of self. This is the most efficient way to get the head and tail of an expression. - if you want only the head, use self.args[0]; - if you want to process the arguments of the tail then use self.as_coef_mul() which gives the head and a tuple containing the arguments of the tail when treated as a Mul. - if you want the coefficient when self is treated as an Add then use self.as_coeff_add()[0] >>> from sympy.abc import x, y >>> (3xy).as_two_terms() (3, xy) """ args = self.args if len(args) == 1: return S.One, self elif len(args) == 2: return args else: return args[0], self._new_rawargs(args[1:]) @cacheit def as_coefficients_dict(self): """Return a dictionary mapping terms to their coefficient. Since the dictionary is a defaultdict, inquiries about terms which were not present will return a coefficient of 0. The dictionary is considered to have a single term. Examples ======== >>> from sympy.abc import a, x >>> (3ax).as_coefficients_dict() {ax: 3} >>> _[a] 0 """ d = defaultdict(int) args = self.args if len(args) == 1 or not args[0].is_Number: d[self] = S.One else: d[self._new_rawargs(args[1:])] = args[0] return d @cacheit def as_coeff_mul(self, deps, kwargs): rational = kwargs.pop('rational', True) if deps: l1 = [] l2 = [] for f in self.args: if f.has(deps): l2.append(f) else: l1.append(f) return self._new_rawargs(l1), tuple(l2) args = self.args if args[0].is_Number: if not rational or args[0].is_Rational: return args[0], args[1:] elif args[0].is_extended_negative: return S.NegativeOne, (-args[0],) + args[1:] return S.One, args def as_coeff_Mul(self, rational=False): """Efficiently extract the coefficient of a product. """ coeff, args = self.args[0], self.args[1:] if coeff.is_Number: if not rational or coeff.is_Rational: if len(args) == 1: return coeff, args[0] else: return coeff, self._new_rawargs(args) elif coeff.is_extended_negative: return S.NegativeOne, self._new_rawargs(((-coeff,) + args)) return S.One, self def as_real_imag(self, deep=True, hints): from sympy import Abs, expand_mul, im, re other = [] coeffr = [] coeffi = [] addterms = S.One for a in self.args: r, i = a.as_real_imag() if i.is_zero: coeffr.append(r) elif r.is_zero: coeffi.append(iS.ImaginaryUnit) elif a.is_commutative: # search for complex conjugate pairs: for i, x in enumerate(other): if x == a.conjugate(): coeffr.append(Abs(x)*2) del other[i] break else: if a.is_Add: addterms = a else: other.append(a) else: other.append(a) m = self.func(other) if hints.get('ignore') == m: return if len(coeffi) % 2: imco = im(coeffi.pop(0)) # all other pairs make a real factor; they will be # put into reco below else: imco = S.Zero reco = self.func((coeffr + coeffi)) r, i = (recore(m), recoim(m)) if addterms == 1: if m == 1: if imco is S.Zero: return (reco, S.Zero) else: return (S.Zero, recoimco) if imco is S.Zero: return (r, i) return (-imcoi, imcor) addre, addim = expand_mul(addterms, deep=False).as_real_imag() if imco is S.Zero: return (raddre - iaddim, iaddre + raddim) else: r, i = -imcoi, imcor return (raddre - iaddim, raddim + iaddre) @staticmethod def _expandsums(sums): """ Helper function for _eval_expand_mul. sums must be a list of instances of Basic. """ L = len(sums) if L == 1: return sums[0].args terms = [] left = Mul._expandsums(sums[:L//2]) right = Mul._expandsums(sums[L//2:]) terms = [Mul(a, b) for a in left for b in right] added = Add(terms) return Add.make_args(added) # it may have collapsed down to one term def _eval_expand_mul(self, *hints): from sympy import fraction # Handle things like 1/(x(x + 1)), which are automatically converted # to 1/x1/(x + 1) expr = self n, d = fraction(expr) if d.is_Mul: n, d = [i._eval_expand_mul(hints) if i.is_Mul else i for i in (n, d)] expr = n/d if not expr.is_Mul: return expr plain, sums, rewrite = [], [], False for factor in expr.args: if factor.is_Add: sums.append(factor) rewrite = True else: if factor.is_commutative: plain.append(factor) else: sums.append(Basic(factor)) # Wrapper if not rewrite: return expr else: plain = self.func(plain) if sums: deep = hints.get("deep", False) terms = self.func._expandsums(sums) args = [] for term in terms: t = self.func(plain, term) if t.is_Mul and any(a.is_Add for a in t.args) and deep: t = t._eval_expand_mul() args.append(t) return Add(args) else: return plain @cacheit def _eval_derivative(self, s): args = list(self.args) terms = [] for i in range(len(args)): d = args[i].diff(s) if d: # Note: reduce is used in step of Mul as Mul is unable to # handle subtypes and operation priority: terms.append(reduce(lambda x, y: xy, (args[:i] + [d] + args[i + 1:]), S.One)) return Add.fromiter(terms) @cacheit def _eval_derivative_n_times(self, s, n): from sympy import Integer, factorial, prod, Sum, Max from sympy.ntheory.multinomial import multinomial_coefficients_iterator from .function import AppliedUndef from .symbol import Symbol, symbols, Dummy if not isinstance(s, AppliedUndef) and not isinstance(s, Symbol): # other types of s may not be well behaved, e.g. # (cos(x)sin(y)).diff([[x, y, z]]) return super(Mul, self)._eval_derivative_n_times(s, n) args = self.args m = len(args) if isinstance(n, (int, Integer)): # https://en.wikipedia.org/wiki/General_Leibniz_rule#More_than_two_factors terms = [] for kvals, c in multinomial_coefficients_iterator(m, n): p = prod([arg.diff((s, k)) for k, arg in zip(kvals, args)]) terms.append(c p) return Add(terms) kvals = symbols("k1:%i" % m, cls=Dummy) klast = n - sum(kvals) nfact = factorial(n) e, l = (# better to use the multinomial? nfact/prod(map(factorial, kvals))/factorial(klast)\ prod([args[t].diff((s, kvals[t])) for t in range(m-1)])\ args[-1].diff((s, Max(0, klast))), [(k, 0, n) for k in kvals]) return Sum(e, l) def _eval_difference_delta(self, n, step): from sympy.series.limitseq import difference_delta as dd arg0 = self.args[0] rest = Mul(self.args[1:]) return (arg0.subs(n, n + step) dd(rest, n, step) + dd(arg0, n, step) * rest) def _matches_simple(self, expr, repl_dict): # handle (w3).matches('x5') -> {w: x5/3} coeff, terms = self.as_coeff_Mul() terms = Mul.make_args(terms) if len(terms) == 1: newexpr = self.__class__._combine_inverse(expr, coeff) return terms[0].matches(newexpr, repl_dict) return def matches(self, expr, repl_dict={}, old=False): expr = sympify(expr) if self.is_commutative and expr.is_commutative: return AssocOp._matches_commutative(self, expr, repl_dict, old) elif self.is_commutative is not expr.is_commutative: return None c1, nc1 = self.args_cnc() c2, nc2 = expr.args_cnc() repl_dict = repl_dict.copy() if c1: if not c2: c2 = [1] a = self.func(c1) if isinstance(a, AssocOp): repl_dict = a._matches_commutative(self.func(c2), repl_dict, old) else: repl_dict = a.matches(self.func(c2), repl_dict) if repl_dict: a = self.func(nc1) if isinstance(a, self.func): repl_dict = a._matches(self.func(nc2), repl_dict) else: repl_dict = a.matches(self.func(nc2), repl_dict) return repl_dict or None def _matches(self, expr, repl_dict={}): # weed out negative one prefixes# from sympy import Wild sign = 1 a, b = self.as_two_terms() if a is S.NegativeOne: if b.is_Mul: sign = -sign else: # the remainder, b, is not a Mul anymore return b.matches(-expr, repl_dict) expr = sympify(expr) if expr.is_Mul and expr.args[0] is S.NegativeOne: expr = -expr sign = -sign if not expr.is_Mul: # expr can only match if it matches b and a matches +/- 1 if len(self.args) == 2: # quickly test for equality if b == expr: return a.matches(Rational(sign), repl_dict) # do more expensive match dd = b.matches(expr, repl_dict) if dd is None: return None dd = a.matches(Rational(sign), dd) return dd return None d = repl_dict.copy() # weed out identical terms pp = list(self.args) ee = list(expr.args) for p in self.args: if p in expr.args: ee.remove(p) pp.remove(p) # only one symbol left in pattern -> match the remaining expression if len(pp) == 1 and isinstance(pp[0], Wild): if len(ee) == 1: d[pp[0]] = sign ee[0] else: d[pp[0]] = sign * expr.func(ee) return d if len(ee) != len(pp): return None for p, e in zip(pp, ee): d = p.xreplace(d).matches(e, d) if d is None: return None return d @staticmethod def _combine_inverse(lhs, rhs): """ Returns lhs/rhs, but treats arguments like symbols, so things like oo/oo return 1 (instead of a nan) and ``I`` behaves like a symbol instead of sqrt(-1). """ from .symbol import Dummy if lhs == rhs: return S.One def check(l, r): if l.is_Float and r.is_comparable: # if both objects are added to 0 they will share the same "normalization" # and are more likely to compare the same. Since Add(foo, 0) will not allow # the 0 to pass, we use __add__ directly. return l.__add__(0) == r.evalf().__add__(0) return False if check(lhs, rhs) or check(rhs, lhs): return S.One if any(i.is_Pow or i.is_Mul for i in (lhs, rhs)): # gruntz and limit wants a literal I to not combine # with a power of -1 d = Dummy('I') _i = {S.ImaginaryUnit: d} i_ = {d: S.ImaginaryUnit} a = lhs.xreplace(_i).as_powers_dict() b = rhs.xreplace(_i).as_powers_dict() blen = len(b) for bi in tuple(b.keys()): if bi in a: a[bi] -= b.pop(bi) if not a[bi]: a.pop(bi) if len(b) != blen: lhs = Mul([k*v for k, v in a.items()]).xreplace(i_) rhs = Mul([k*v for k, v in b.items()]).xreplace(i_) return lhs/rhs def as_powers_dict(self): d = defaultdict(int) for term in self.args: for b, e in term.as_powers_dict().items(): d[b] += e return d def as_numer_denom(self): # don't use _from_args to rebuild the numerators and denominators # as the order is not guaranteed to be the same once they have # been separated from each other numers, denoms = list(zip([f.as_numer_denom() for f in self.args])) return self.func(numers), self.func(denoms) def as_base_exp(self): e1 = None bases = [] nc = 0 for m in self.args: b, e = m.as_base_exp() if not b.is_commutative: nc += 1 if e1 is None: e1 = e elif e != e1 or nc > 1: return self, S.One bases.append(b) return self.func(bases), e1 def _eval_is_polynomial(self, syms): return all(term._eval_is_polynomial(syms) for term in self.args) def _eval_is_rational_function(self, syms): return all(term._eval_is_rational_function(syms) for term in self.args) def _eval_is_algebraic_expr(self, syms): return all(term._eval_is_algebraic_expr(syms) for term in self.args) _eval_is_commutative = lambda self: _fuzzy_group( a.is_commutative for a in self.args) _eval_is_complex = lambda self: _fuzzy_group( (a.is_complex for a in self.args), quick_exit=True) def _eval_is_finite(self): if all(a.is_finite for a in self.args): return True if any(a.is_infinite for a in self.args): if all(a.is_zero is False for a in self.args): return False def _eval_is_infinite(self): if any(a.is_infinite for a in self.args): if any(a.is_zero for a in self.args): return S.NaN.is_infinite if any(a.is_zero is None for a in self.args): return None return True def _eval_is_rational(self): r = _fuzzy_group((a.is_rational for a in self.args), quick_exit=True) if r: return r elif r is False: return self.is_zero def _eval_is_algebraic(self): r = _fuzzy_group((a.is_algebraic for a in self.args), quick_exit=True) if r: return r elif r is False: return self.is_zero def _eval_is_zero(self): zero = infinite = False for a in self.args: z = a.is_zero if z: if infinite: return # 0oo is nan and nan.is_zero is None zero = True else: if not a.is_finite: if zero: return # 0oo is nan and nan.is_zero is None infinite = True if zero is False and z is None: # trap None zero = None return zero def _eval_is_integer(self): is_rational = self.is_rational if is_rational: n, d = self.as_numer_denom() if d is S.One: return True elif d is S(2): return n.is_even elif is_rational is False: return False def _eval_is_polar(self): has_polar = any(arg.is_polar for arg in self.args) return has_polar and \ all(arg.is_polar or arg.is_positive for arg in self.args) def _eval_is_extended_real(self): return self._eval_real_imag(True) def _eval_real_imag(self, real): zero = False t_not_re_im = None for t in self.args: if t.is_complex is False and t.is_extended_real is False: return False elif t.is_imaginary: # I real = not real elif t.is_extended_real: # 2 if not zero: z = t.is_zero if not z and zero is False: zero = z elif z: if all(a.is_finite for a in self.args): return True return elif t.is_extended_real is False: # symbolic or literal like `2 + I` or symbolic imaginary if t_not_re_im: return # complex terms might cancel t_not_re_im = t elif t.is_imaginary is False: # symbolic like `2` or `2 + I` if t_not_re_im: return # complex terms might cancel t_not_re_im = t else: return if t_not_re_im: if t_not_re_im.is_extended_real is False: if real: # like 3 return zero # 3(smthng like 2 + I or i) is not real if t_not_re_im.is_imaginary is False: # symbolic 2 or 2 + I if not real: # like I return zero # I(smthng like 2 or 2 + I) is not real elif zero is False: return real # can't be trumped by 0 elif real: return real # doesn't matter what zero is def _eval_is_imaginary(self): z = self.is_zero if z: return False elif z is False: return self._eval_real_imag(False) def _eval_is_hermitian(self): return self._eval_herm_antiherm(True) def _eval_herm_antiherm(self, real): one_nc = zero = one_neither = False for t in self.args: if not t.is_commutative: if one_nc: return one_nc = True if t.is_antihermitian: real = not real elif t.is_hermitian: if not zero: z = t.is_zero if not z and zero is False: zero = z elif z: if all(a.is_finite for a in self.args): return True return elif t.is_hermitian is False: if one_neither: return one_neither = True else: return if one_neither: if real: return zero elif zero is False or real: return real def _eval_is_antihermitian(self): z = self.is_zero if z: return False elif z is False: return self._eval_herm_antiherm(False) def _eval_is_irrational(self): for t in self.args: a = t.is_irrational if a: others = list(self.args) others.remove(t) if all((x.is_rational and fuzzy_not(x.is_zero)) is True for x in others): return True return if a is None: return return False def _eval_is_extended_positive(self): """Return True if self is positive, False if not, and None if it cannot be determined. This algorithm is non-recursive and works by keeping track of the sign which changes when a negative or nonpositive is encountered. Whether a nonpositive or nonnegative is seen is also tracked since the presence of these makes it impossible to return True, but possible to return False if the end result is nonpositive. e.g. pos neg * nonpositive -> pos or zero -> None is returned pos * neg * nonnegative -> neg or zero -> False is returned """ return self._eval_pos_neg(1) def _eval_pos_neg(self, sign): saw_NON = saw_NOT = False for t in self.args: if t.is_extended_positive: continue elif t.is_extended_negative: sign = -sign elif t.is_zero: if all(a.is_finite for a in self.args): return False return elif t.is_extended_nonpositive: sign = -sign saw_NON = True elif t.is_extended_nonnegative: saw_NON = True elif t.is_positive is False: sign = -sign if saw_NOT: return saw_NOT = True elif t.is_negative is False: if saw_NOT: return saw_NOT = True else: return if sign == 1 and saw_NON is False and saw_NOT is False: return True if sign < 0: return False def _eval_is_extended_negative(self): return self._eval_pos_neg(-1) def _eval_is_odd(self): is_integer = self.is_integer if is_integer: r, acc = True, 1 for t in self.args: if not t.is_integer: return None elif t.is_even: r = False elif t.is_integer: if r is False: pass elif acc != 1 and (acc + t).is_odd: r = False elif t.is_odd is None: r = None acc = t return r # !integer -> !odd elif is_integer is False: return False def _eval_is_even(self): is_integer = self.is_integer if is_integer: return fuzzy_not(self.is_odd) elif is_integer is False: return False def _eval_is_composite(self): """ Here we count the number of arguments that have a minimum value greater than two. If there are more than one of such a symbol then the result is composite. Else, the result cannot be determined. """ number_of_args = 0 # count of symbols with minimum value greater than one for arg in self.args: if not (arg.is_integer and arg.is_positive): return None if (arg-1).is_positive: number_of_args += 1 if number_of_args > 1: return True def _eval_subs(self, old, new): from sympy.functions.elementary.complexes import sign from sympy.ntheory.factor_ import multiplicity from sympy.simplify.powsimp import powdenest from sympy.simplify.radsimp import fraction if not old.is_Mul: return None # try keep replacement literal so -2x doesn't replace 4x if old.args[0].is_Number and old.args[0] < 0: if self.args[0].is_Number: if self.args[0] < 0: return self._subs(-old, -new) return None def base_exp(a): # if I and -1 are in a Mul, they get both end up with # a -1 base (see issue 6421); all we want here are the # true Pow or exp separated into base and exponent from sympy import exp if a.is_Pow or isinstance(a, exp): return a.as_base_exp() return a, S.One def breakup(eq): """break up powers of eq when treated as a Mul: b*(Rationale) -> be, Rational commutatives come back as a dictionary {be: Rational} noncommutatives come back as a list [(b*e, Rational)] """ (c, nc) = (defaultdict(int), list()) for a in Mul.make_args(eq): a = powdenest(a) (b, e) = base_exp(a) if e is not S.One: (co, _) = e.as_coeff_mul() b = Pow(b, e/co) e = co if a.is_commutative: c[b] += e else: nc.append([b, e]) return (c, nc) def rejoin(b, co): """ Put rational back with exponent; in general this is not ok, but since we took it from the exponent for analysis, it's ok to put it back. """ (b, e) = base_exp(b) return Pow(b, eco) def ndiv(a, b): """if b divides a in an extractive way (like 1/4 divides 1/2 but not vice versa, and 2/5 does not divide 1/3) then return the integer number of times it divides, else return 0. """ if not b.q % a.q or not a.q % b.q: return int(a/b) return 0 # give Muls in the denominator a chance to be changed (see issue 5651) # rv will be the default return value rv = None n, d = fraction(self) self2 = self if d is not S.One: self2 = n._subs(old, new)/d._subs(old, new) if not self2.is_Mul: return self2._subs(old, new) if self2 != self: rv = self2 # Now continue with regular substitution. # handle the leading coefficient and use it to decide if anything # should even be started; we always know where to find the Rational # so it's a quick test co_self = self2.args[0] co_old = old.args[0] co_xmul = None if co_old.is_Rational and co_self.is_Rational: # if coeffs are the same there will be no updating to do # below after breakup() step; so skip (and keep co_xmul=None) if co_old != co_self: co_xmul = co_self.extract_multiplicatively(co_old) elif co_old.is_Rational: return rv # break self and old into factors (c, nc) = breakup(self2) (old_c, old_nc) = breakup(old) # update the coefficients if we had an extraction # e.g. if co_self were 2(3/35x)2 and co_old = 3/5 # then co_self in c is replaced by (3/5)2 and co_residual # is 2(1/7)2 if co_xmul and co_xmul.is_Rational and abs(co_old) != 1: mult = S(multiplicity(abs(co_old), co_self)) c.pop(co_self) if co_old in c: c[co_old] += mult else: c[co_old] = mult co_residual = co_self/co_oldmult else: co_residual = 1 # do quick tests to see if we can't succeed ok = True if len(old_nc) > len(nc): # more non-commutative terms ok = False elif len(old_c) > len(c): # more commutative terms ok = False elif set(i[0] for i in old_nc).difference(set(i[0] for i in nc)): # unmatched non-commutative bases ok = False elif set(old_c).difference(set(c)): # unmatched commutative terms ok = False elif any(sign(c[b]) != sign(old_c[b]) for b in old_c): # differences in sign ok = False if not ok: return rv if not old_c: cdid = None else: rat = [] for (b, old_e) in old_c.items(): c_e = c[b] rat.append(ndiv(c_e, old_e)) if not rat[-1]: return rv cdid = min(rat) if not old_nc: ncdid = None for i in range(len(nc)): nc[i] = rejoin(nc[i]) else: ncdid = 0 # number of nc replacements we did take = len(old_nc) # how much to look at each time limit = cdid or S.Infinity # max number that we can take failed = [] # failed terms will need subs if other terms pass i = 0 while limit and i + take <= len(nc): hit = False # the bases must be equivalent in succession, and # the powers must be extractively compatible on the # first and last factor but equal in between. rat = [] for j in range(take): if nc[i + j][0] != old_nc[j][0]: break elif j == 0: rat.append(ndiv(nc[i + j][1], old_nc[j][1])) elif j == take - 1: rat.append(ndiv(nc[i + j][1], old_nc[j][1])) elif nc[i + j][1] != old_nc[j][1]: break else: rat.append(1) j += 1 else: ndo = min(rat) if ndo: if take == 1: if cdid: ndo = min(cdid, ndo) nc[i] = Pow(new, ndo)rejoin(nc[i][0], nc[i][1] - ndoold_nc[0][1]) else: ndo = 1 # the left residual l = rejoin(nc[i][0], nc[i][1] - ndo* old_nc[0][1]) # eliminate all middle terms mid = new # the right residual (which may be the same as the middle if take == 2) ir = i + take - 1 r = (nc[ir][0], nc[ir][1] - ndo* old_nc[-1][1]) if r[1]: if i + take < len(nc): nc[i:i + take] = [lmid, r] else: r = rejoin(r) nc[i:i + take] = [lmidr] else: # there was nothing left on the right nc[i:i + take] = [lmid] limit -= ndo ncdid += ndo hit = True if not hit: # do the subs on this failing factor failed.append(i) i += 1 else: if not ncdid: return rv # although we didn't fail, certain nc terms may have # failed so we rebuild them after attempting a partial # subs on them failed.extend(range(i, len(nc))) for i in failed: nc[i] = rejoin(nc[i]).subs(old, new) # rebuild the expression if cdid is None: do = ncdid elif ncdid is None: do = cdid else: do = min(ncdid, cdid) margs = [] for b in c: if b in old_c: # calculate the new exponent e = c[b] - old_c[b]do margs.append(rejoin(b, e)) else: margs.append(rejoin(b.subs(old, new), c[b])) if cdid and not ncdid: # in case we are replacing commutative with non-commutative, # we want the new term to come at the front just like the # rest of this routine margs = [Pow(new, cdid)] + margs return co_residualself2.func(margs)self2.func(nc) def _eval_nseries(self, x, n, logx): from sympy import Order, powsimp terms = [t.nseries(x, n=n, logx=logx) for t in self.args] res = powsimp(self.func(terms).expand(), combine='exp', deep=True) if res.has(Order): res += Order(x*n, x) return res def _eval_as_leading_term(self, x): return self.func([t.as_leading_term(x) for t in self.args]) def _eval_conjugate(self): return self.func([t.conjugate() for t in self.args]) def _eval_transpose(self): return self.func([t.transpose() for t in self.args[::-1]]) def _eval_adjoint(self): return self.func([t.adjoint() for t in self.args[::-1]]) def _sage_(self): s = 1 for x in self.args: s = x._sage_() return s def as_content_primitive(self, radical=False, clear=True): """Return the tuple (R, self/R) where R is the positive Rational extracted from self. Examples ======== >>> from sympy import sqrt >>> (-3sqrt(2)(2 - 2sqrt(2))).as_content_primitive() (6, -sqrt(2)(1 - sqrt(2))) See docstring of Expr.as_content_primitive for more examples. """ coef = S.One args = [] for i, a in enumerate(self.args): c, p = a.as_content_primitive(radical=radical, clear=clear) coef = c if p is not S.One: args.append(p) # don't use self._from_args here to reconstruct args # since there may be identical args now that should be combined # e.g. (2+2x)(3+3x) should be (6, (1 + x)*2) not (6, (1+x)(1+x)) return coef, self.func(args) def as_ordered_factors(self, order=None): """Transform an expression into an ordered list of factors. Examples ======== >>> from sympy import sin, cos >>> from sympy.abc import x, y >>> (2xysin(x)cos(x)).as_ordered_factors() [2, x, y, sin(x), cos(x)] """ cpart, ncpart = self.args_cnc() cpart.sort(key=lambda expr: expr.sort_key(order=order)) return cpart + ncpart @property def _sorted_args(self): return tuple(self.as_ordered_factors()) def prod(a, start=1): """Return product of elements of a. Start with int 1 so if only ints are included then an int result is returned. Examples ======== >>> from sympy import prod, S >>> prod(range(3)) 0 >>> type(_) is int True >>> prod([S(2), 3]) 6 >>> _.is_Integer True You can start the product at something other than 1: >>> prod([1, 2], 3) 6 """ return reduce(operator.mul, a, start) def _keep_coeff(coeff, factors, clear=True, sign=False): """Return ``coefffactors`` unevaluated if necessary. If ``clear`` is False, do not keep the coefficient as a factor if it can be distributed on a single factor such that one or more terms will still have integer coefficients. If ``sign`` is True, allow a coefficient of -1 to remain factored out. Examples ======== >>> from sympy.core.mul import _keep_coeff >>> from sympy.abc import x, y >>> from sympy import S >>> _keep_coeff(S.Half, x + 2) (x + 2)/2 >>> _keep_coeff(S.Half, x + 2, clear=False) x/2 + 1 >>> _keep_coeff(S.Half, (x + 2)y, clear=False) y(x + 2)/2 >>> _keep_coeff(S(-1), x + y) -x - y >>> _keep_coeff(S(-1), x + y, sign=True) -(x + y) """ if not coeff.is_Number: if factors.is_Number: factors, coeff = coeff, factors else: return coefffactors if coeff is S.One: return factors elif coeff is S.NegativeOne and not sign: return -factors elif factors.is_Add: if not clear and coeff.is_Rational and coeff.q != 1: q = S(coeff.q) for i in factors.args: c, t = i.as_coeff_Mul() r = c/q if r == int(r): return coefffactors return Mul(coeff, factors, evaluate=False) elif factors.is_Mul: margs = list(factors.args) if margs[0].is_Number: margs[0] = coeff if margs[0] == 1: margs.pop(0) else: margs.insert(0, coeff) return Mul._from_args(margs) else: return coefffactors def expand_2arg(e): from sympy.simplify.simplify import bottom_up def do(e): if e.is_Mul: c, r = e.as_coeff_Mul() if c.is_Number and r.is_Add: return _unevaluated_Add([cri for ri in r.args]) return e return bottom_up(e, do) from .numbers import Rational from .power import Pow from .add import Add, _addsort, _unevaluated_Add
6c7f0b1cf71a461e39dd0e353df11d54c47f37bdb3f51e053859be1cb7d0c19b	"""Tools for setting up printing in interactive sessions. """ from __future__ import print_function, division import sys from distutils.version import LooseVersion as V from io import BytesIO from sympy import latex as default_latex from sympy import preview from sympy.core.compatibility import integer_types from sympy.utilities.misc import debug def _init_python_printing(stringify_func, settings): """Setup printing in Python interactive session. """ import sys from sympy.core.compatibility import builtins def _displayhook(arg): """Python's pretty-printer display hook. This function was adapted from: http://www.python.org/dev/peps/pep-0217/ """ if arg is not None: builtins._ = None print(stringify_func(arg, settings)) builtins._ = arg sys.displayhook = _displayhook def _init_ipython_printing(ip, stringify_func, use_latex, euler, forecolor, backcolor, fontsize, latex_mode, print_builtin, latex_printer, scale, *settings): """Setup printing in IPython interactive session. """ try: from IPython.lib.latextools import latex_to_png except ImportError: pass preamble = "\\documentclass[varwidth,%s]{standalone}\n" \ "\\usepackage{amsmath,amsfonts}%s\\begin{document}" if euler: addpackages = '\\usepackage{euler}' else: addpackages = '' if use_latex == "svg": addpackages = addpackages + "\n\\special{color %s}" % forecolor preamble = preamble % (fontsize, addpackages) imagesize = 'tight' offset = "0cm,0cm" resolution = round(150scale) dvi = r"-T %s -D %d -bg %s -fg %s -O %s" % ( imagesize, resolution, backcolor, forecolor, offset) dvioptions = dvi.split() svg_scale = 2.1scale dvioptions_svg = ["--no-fonts", "--scale={}".format(svg_scale)] debug("init_printing: DVIOPTIONS:", dvioptions) debug("init_printing: DVIOPTIONS_SVG:", dvioptions_svg) debug("init_printing: PREAMBLE:", preamble) latex = latex_printer or default_latex def _print_plain(arg, p, cycle): """caller for pretty, for use in IPython 0.11""" if _can_print_latex(arg): p.text(stringify_func(arg)) else: p.text(IPython.lib.pretty.pretty(arg)) def _preview_wrapper(o): exprbuffer = BytesIO() try: preview(o, output='png', viewer='BytesIO', outputbuffer=exprbuffer, preamble=preamble, dvioptions=dvioptions) except Exception as e: # IPython swallows exceptions debug("png printing:", "_preview_wrapper exception raised:", repr(e)) raise return exprbuffer.getvalue() def _svg_wrapper(o): exprbuffer = BytesIO() try: preview(o, output='svg', viewer='BytesIO', outputbuffer=exprbuffer, preamble=preamble, dvioptions=dvioptions_svg) except Exception as e: # IPython swallows exceptions debug("svg printing:", "_preview_wrapper exception raised:", repr(e)) raise return exprbuffer.getvalue().decode('utf-8') def _matplotlib_wrapper(o): # mathtext does not understand certain latex flags, so we try to # replace them with suitable subs o = o.replace(r'\operatorname', '') o = o.replace(r'\overline', r'\bar') # mathtext can't render some LaTeX commands. For example, it can't # render any LaTeX environments such as array or matrix. So here we # ensure that if mathtext fails to render, we return None. try: return latex_to_png(o) except ValueError as e: debug('matplotlib exception caught:', repr(e)) return None from sympy import Basic from sympy.matrices import MatrixBase from sympy.physics.vector import Vector, Dyadic from sympy.tensor.array import NDimArray # These should all have _repr_latex_ and _repr_latex_orig. If you update # this also update printable_types below. sympy_latex_types = (Basic, MatrixBase, Vector, Dyadic, NDimArray) def _can_print_latex(o): """Return True if type o can be printed with LaTeX. If o is a container type, this is True if and only if every element of o can be printed with LaTeX. """ try: # If you're adding another type, make sure you add it to printable_types # later in this file as well builtin_types = (list, tuple, set, frozenset) if isinstance(o, builtin_types): # If the object is a custom subclass with a custom str or # repr, use that instead. if (type(o).__str__ not in (i.__str__ for i in builtin_types) or type(o).__repr__ not in (i.__repr__ for i in builtin_types)): return False return all(_can_print_latex(i) for i in o) elif isinstance(o, dict): return all(_can_print_latex(i) and _can_print_latex(o[i]) for i in o) elif isinstance(o, bool): return False # TODO : Investigate if "elif hasattr(o, '_latex')" is more useful # to use here, than these explicit imports. elif isinstance(o, sympy_latex_types): return True elif isinstance(o, (float, integer_types)) and print_builtin: return True return False except RuntimeError: return False # This is in case maximum recursion depth is reached. # Since RecursionError is for versions of Python 3.5+ # so this is to guard against RecursionError for older versions. def _print_latex_png(o): """ A function that returns a png rendered by an external latex distribution, falling back to matplotlib rendering """ if _can_print_latex(o): s = latex(o, mode=latex_mode, settings) if latex_mode == 'plain': s = '$\\displaystyle %s$' % s try: return _preview_wrapper(s) except RuntimeError as e: debug('preview failed with:', repr(e), ' Falling back to matplotlib backend') if latex_mode != 'inline': s = latex(o, mode='inline', settings) return _matplotlib_wrapper(s) def _print_latex_svg(o): """ A function that returns a svg rendered by an external latex distribution, no fallback available. """ if _can_print_latex(o): s = latex(o, mode=latex_mode, settings) if latex_mode == 'plain': s = '$\\displaystyle %s$' % s try: return _svg_wrapper(s) except RuntimeError as e: debug('preview failed with:', repr(e), ' No fallback available.') def _print_latex_matplotlib(o): """ A function that returns a png rendered by mathtext """ if _can_print_latex(o): s = latex(o, mode='inline', settings) return _matplotlib_wrapper(s) def _print_latex_text(o): """ A function to generate the latex representation of sympy expressions. """ if _can_print_latex(o): s = latex(o, mode=latex_mode, settings) if latex_mode == 'plain': return '$\\displaystyle %s$' % s return s def _result_display(self, arg): """IPython's pretty-printer display hook, for use in IPython 0.10 This function was adapted from: ipython/IPython/hooks.py:155 """ if self.rc.pprint: out = stringify_func(arg) if '\n' in out: print print(out) else: print(repr(arg)) import IPython if V(IPython.__version__) >= '0.11': from sympy.core.basic import Basic from sympy.matrices.matrices import MatrixBase from sympy.physics.vector import Vector, Dyadic from sympy.tensor.array import NDimArray printable_types = [Basic, MatrixBase, float, tuple, list, set, frozenset, dict, Vector, Dyadic, NDimArray] + list(integer_types) plaintext_formatter = ip.display_formatter.formatters['text/plain'] for cls in printable_types: plaintext_formatter.for_type(cls, _print_plain) svg_formatter = ip.display_formatter.formatters['image/svg+xml'] if use_latex in ('svg', ): debug("init_printing: using svg formatter") for cls in printable_types: svg_formatter.for_type(cls, _print_latex_svg) else: debug("init_printing: not using any svg formatter") for cls in printable_types: # Better way to set this, but currently does not work in IPython #png_formatter.for_type(cls, None) if cls in svg_formatter.type_printers: svg_formatter.type_printers.pop(cls) png_formatter = ip.display_formatter.formatters['image/png'] if use_latex in (True, 'png'): debug("init_printing: using png formatter") for cls in printable_types: png_formatter.for_type(cls, _print_latex_png) elif use_latex == 'matplotlib': debug("init_printing: using matplotlib formatter") for cls in printable_types: png_formatter.for_type(cls, _print_latex_matplotlib) else: debug("init_printing: not using any png formatter") for cls in printable_types: # Better way to set this, but currently does not work in IPython #png_formatter.for_type(cls, None) if cls in png_formatter.type_printers: png_formatter.type_printers.pop(cls) latex_formatter = ip.display_formatter.formatters['text/latex'] if use_latex in (True, 'mathjax'): debug("init_printing: using mathjax formatter") for cls in printable_types: latex_formatter.for_type(cls, _print_latex_text) for typ in sympy_latex_types: typ._repr_latex_ = typ._repr_latex_orig else: debug("init_printing: not using text/latex formatter") for cls in printable_types: # Better way to set this, but currently does not work in IPython #latex_formatter.for_type(cls, None) if cls in latex_formatter.type_printers: latex_formatter.type_printers.pop(cls) for typ in sympy_latex_types: typ._repr_latex_ = None else: ip.set_hook('result_display', _result_display) def _is_ipython(shell): """Is a shell instance an IPython shell?""" # shortcut, so we don't import IPython if we don't have to if 'IPython' not in sys.modules: return False try: from IPython.core.interactiveshell import InteractiveShell except ImportError: # IPython < 0.11 try: from IPython.iplib import InteractiveShell except ImportError: # Reaching this points means IPython has changed in a backward-incompatible way # that we don't know about. Warn? return False return isinstance(shell, InteractiveShell) # Used by the doctester to override the default for no_global NO_GLOBAL = False def init_printing(pretty_print=True, order=None, use_unicode=None, use_latex=None, wrap_line=None, num_columns=None, no_global=False, ip=None, euler=False, forecolor='Black', backcolor='Transparent', fontsize='10pt', latex_mode='plain', print_builtin=True, str_printer=None, pretty_printer=None, latex_printer=None, scale=1.0, settings): r""" Initializes pretty-printer depending on the environment. Parameters ========== pretty_print: boolean If True, use pretty_print to stringify or the provided pretty printer; if False, use sstrrepr to stringify or the provided string printer. order: string or None There are a few different settings for this parameter: lex (default), which is lexographic order; grlex, which is graded lexographic order; grevlex, which is reversed graded lexographic order; old, which is used for compatibility reasons and for long expressions; None, which sets it to lex. use_unicode: boolean or None If True, use unicode characters; if False, do not use unicode characters. use_latex: string, boolean, or None If True, use default latex rendering in GUI interfaces (png and mathjax); if False, do not use latex rendering; if 'png', enable latex rendering with an external latex compiler, falling back to matplotlib if external compilation fails; if 'matplotlib', enable latex rendering with matplotlib; if 'mathjax', enable latex text generation, for example MathJax rendering in IPython notebook or text rendering in LaTeX documents; if 'svg', enable latex rendering with an external latex compiler, no fallback wrap_line: boolean If True, lines will wrap at the end; if False, they will not wrap but continue as one line. This is only relevant if ``pretty_print`` is True. num_columns: int or None If int, number of columns before wrapping is set to num_columns; if None, number of columns before wrapping is set to terminal width. This is only relevant if ``pretty_print`` is True. no_global: boolean If True, the settings become system wide; if False, use just for this console/session. ip: An interactive console This can either be an instance of IPython, or a class that derives from code.InteractiveConsole. euler: boolean, optional, default=False Loads the euler package in the LaTeX preamble for handwritten style fonts (http://www.ctan.org/pkg/euler). forecolor: string, optional, default='Black' DVI setting for foreground color. backcolor: string, optional, default='Transparent' DVI setting for background color. fontsize: string, optional, default='10pt' A font size to pass to the LaTeX documentclass function in the preamble. latex_mode: string, optional, default='plain' The mode used in the LaTeX printer. Can be one of: {'inline'\|'plain'\|'equation'\|'equation'}. print_builtin: boolean, optional, default=True If true then floats and integers will be printed. If false the printer will only print SymPy types. str_printer: function, optional, default=None A custom string printer function. This should mimic sympy.printing.sstrrepr(). pretty_printer: function, optional, default=None A custom pretty printer. This should mimic sympy.printing.pretty(). latex_printer: function, optional, default=None A custom LaTeX printer. This should mimic sympy.printing.latex(). scale: float, optional, default=1.0 Scale the LaTeX output when using the ``png`` backend. Useful for high dpi screens. Examples ======== >>> from sympy.interactive import init_printing >>> from sympy import Symbol, sqrt >>> from sympy.abc import x, y >>> sqrt(5) sqrt(5) >>> init_printing(pretty_print=True) # doctest: +SKIP >>> sqrt(5) # doctest: +SKIP ___ \/ 5 >>> theta = Symbol('theta') # doctest: +SKIP >>> init_printing(use_unicode=True) # doctest: +SKIP >>> theta # doctest: +SKIP \u03b8 >>> init_printing(use_unicode=False) # doctest: +SKIP >>> theta # doctest: +SKIP theta >>> init_printing(order='lex') # doctest: +SKIP >>> str(y + x + y2 + x2) # doctest: +SKIP x2 + x + y2 + y >>> init_printing(order='grlex') # doctest: +SKIP >>> str(y + x + y2 + x2) # doctest: +SKIP x2 + x + y2 + y >>> init_printing(order='grevlex') # doctest: +SKIP >>> str(y * x*2 + x y2) # doctest: +SKIP x2y + xy2 >>> init_printing(order='old') # doctest: +SKIP >>> str(x2 + y2 + x + y) # doctest: +SKIP x2 + x + y2 + y >>> init_printing(num_columns=10) # doctest: +SKIP >>> x2 + x + y2 + y # doctest: +SKIP x + y + x2 + y2 """ import sys from sympy.printing.printer import Printer if pretty_print: if pretty_printer is not None: stringify_func = pretty_printer else: from sympy.printing import pretty as stringify_func else: if str_printer is not None: stringify_func = str_printer else: from sympy.printing import sstrrepr as stringify_func # Even if ip is not passed, double check that not in IPython shell in_ipython = False if ip is None: try: ip = get_ipython() except NameError: pass else: in_ipython = (ip is not None) if ip and not in_ipython: in_ipython = _is_ipython(ip) if in_ipython and pretty_print: try: import IPython # IPython 1.0 deprecates the frontend module, so we import directly # from the terminal module to prevent a deprecation message from being # shown. if V(IPython.__version__) >= '1.0': from IPython.terminal.interactiveshell import TerminalInteractiveShell else: from IPython.frontend.terminal.interactiveshell import TerminalInteractiveShell from code import InteractiveConsole except ImportError: pass else: # This will be True if we are in the qtconsole or notebook if not isinstance(ip, (InteractiveConsole, TerminalInteractiveShell)) \ and 'ipython-console' not in ''.join(sys.argv): if use_unicode is None: debug("init_printing: Setting use_unicode to True") use_unicode = True if use_latex is None: debug("init_printing: Setting use_latex to True") use_latex = True if not NO_GLOBAL and not no_global: Printer.set_global_settings(order=order, use_unicode=use_unicode, wrap_line=wrap_line, num_columns=num_columns) else: _stringify_func = stringify_func if pretty_print: stringify_func = lambda expr: \ _stringify_func(expr, order=order, use_unicode=use_unicode, wrap_line=wrap_line, num_columns=num_columns) else: stringify_func = lambda expr: _stringify_func(expr, order=order) if in_ipython: mode_in_settings = settings.pop("mode", None) if mode_in_settings: debug("init_printing: Mode is not able to be set due to internals" "of IPython printing") _init_ipython_printing(ip, stringify_func, use_latex, euler, forecolor, backcolor, fontsize, latex_mode, print_builtin, latex_printer, scale, settings) else: _init_python_printing(stringify_func, **settings)
bf4d39614e55400559dd4df8576eb4ee96139b93f9688e706b91295f50997ef2	"""Tools for setting up interactive sessions. """ from __future__ import print_function, division from distutils.version import LooseVersion as V from sympy.external import import_module from sympy.interactive.printing import init_printing preexec_source = """\ from __future__ import division from sympy import * x, y, z, t = symbols('x y z t') k, m, n = symbols('k m n', integer=True) f, g, h = symbols('f g h', cls=Function) init_printing() """ verbose_message = """\ These commands were executed: %(source)s Documentation can be found at https://docs.sympy.org/%(version)s """ no_ipython = """\ Couldn't locate IPython. Having IPython installed is greatly recommended. See http://ipython.scipy.org for more details. If you use Debian/Ubuntu, just install the 'ipython' package and start isympy again. """ def _make_message(ipython=True, quiet=False, source=None): """Create a banner for an interactive session. """ from sympy import __version__ as sympy_version from sympy.polys.domains import GROUND_TYPES from sympy.utilities.misc import ARCH from sympy import SYMPY_DEBUG import sys import os if quiet: return "" python_version = "%d.%d.%d" % sys.version_info[:3] if ipython: shell_name = "IPython" else: shell_name = "Python" info = ['ground types: %s' % GROUND_TYPES] cache = os.getenv('SYMPY_USE_CACHE') if cache is not None and cache.lower() == 'no': info.append('cache: off') if SYMPY_DEBUG: info.append('debugging: on') args = shell_name, sympy_version, python_version, ARCH, ', '.join(info) message = "%s console for SymPy %s (Python %s-%s) (%s)\n" % args if source is None: source = preexec_source _source = "" for line in source.split('\n')[:-1]: if not line: _source += '\n' else: _source += '>>> ' + line + '\n' doc_version = sympy_version if 'dev' in doc_version: doc_version = "dev" else: doc_version = "%s/" % doc_version message += '\n' + verbose_message % {'source': _source, 'version': doc_version} return message def int_to_Integer(s): """ Wrap integer literals with Integer. This is based on the decistmt example from http://docs.python.org/library/tokenize.html. Only integer literals are converted. Float literals are left alone. Examples ======== >>> from __future__ import division >>> from sympy.interactive.session import int_to_Integer >>> from sympy import Integer >>> s = '1.2 + 1/2 - 0x12 + a1' >>> int_to_Integer(s) '1.2 +Integer (1 )/Integer (2 )-Integer (0x12 )+a1 ' >>> s = 'print (1/2)' >>> int_to_Integer(s) 'print (Integer (1 )/Integer (2 ))' >>> exec(s) 0.5 >>> exec(int_to_Integer(s)) 1/2 """ from tokenize import generate_tokens, untokenize, NUMBER, NAME, OP from sympy.core.compatibility import StringIO def _is_int(num): """ Returns true if string value num (with token NUMBER) represents an integer. """ # XXX: Is there something in the standard library that will do this? if '.' in num or 'j' in num.lower() or 'e' in num.lower(): return False return True result = [] g = generate_tokens(StringIO(s).readline) # tokenize the string for toknum, tokval, _, _, _ in g: if toknum == NUMBER and _is_int(tokval): # replace NUMBER tokens result.extend([ (NAME, 'Integer'), (OP, '('), (NUMBER, tokval), (OP, ')') ]) else: result.append((toknum, tokval)) return untokenize(result) def enable_automatic_int_sympification(shell): """ Allow IPython to automatically convert integer literals to Integer. """ import ast old_run_cell = shell.run_cell def my_run_cell(cell, args, kwargs): try: # Check the cell for syntax errors. This way, the syntax error # will show the original input, not the transformed input. The # downside here is that IPython magic like %timeit will not work # with transformed input (but on the other hand, IPython magic # that doesn't expect transformed input will continue to work). ast.parse(cell) except SyntaxError: pass else: cell = int_to_Integer(cell) old_run_cell(cell, args, *kwargs) shell.run_cell = my_run_cell def enable_automatic_symbols(shell): """Allow IPython to automatically create symbols (``isympy -a``). """ # XXX: This should perhaps use tokenize, like int_to_Integer() above. # This would avoid re-executing the code, which can lead to subtle # issues. For example: # # In [1]: a = 1 # # In [2]: for i in range(10): # ...: a += 1 # ...: # # In [3]: a # Out[3]: 11 # # In [4]: a = 1 # # In [5]: for i in range(10): # ...: a += 1 # ...: print b # ...: # b # b # b # b # b # b # b # b # b # b # # In [6]: a # Out[6]: 12 # # Note how the for loop is executed again because `b` was not defined, but `a` # was already incremented once, so the result is that it is incremented # multiple times. import re re_nameerror = re.compile( "name '(?P<symbol>[A-Za-z_][A-Za-z0-9_])' is not defined") def _handler(self, etype, value, tb, tb_offset=None): """Handle :exc:`NameError` exception and allow injection of missing symbols. """ if etype is NameError and tb.tb_next and not tb.tb_next.tb_next: match = re_nameerror.match(str(value)) if match is not None: # XXX: Make sure Symbol is in scope. Otherwise you'll get infinite recursion. self.run_cell("%(symbol)s = Symbol('%(symbol)s')" % {'symbol': match.group("symbol")}, store_history=False) try: code = self.user_ns['In'][-1] except (KeyError, IndexError): pass else: self.run_cell(code, store_history=False) return None finally: self.run_cell("del %s" % match.group("symbol"), store_history=False) stb = self.InteractiveTB.structured_traceback( etype, value, tb, tb_offset=tb_offset) self._showtraceback(etype, value, stb) shell.set_custom_exc((NameError,), _handler) def init_ipython_session(shell=None, argv=[], auto_symbols=False, auto_int_to_Integer=False): """Construct new IPython session. """ import IPython if V(IPython.__version__) >= '0.11': if not shell: # use an app to parse the command line, and init config # IPython 1.0 deprecates the frontend module, so we import directly # from the terminal module to prevent a deprecation message from being # shown. if V(IPython.__version__) >= '1.0': from IPython.terminal import ipapp else: from IPython.frontend.terminal import ipapp app = ipapp.TerminalIPythonApp() # don't draw IPython banner during initialization: app.display_banner = False app.initialize(argv) shell = app.shell if auto_symbols: enable_automatic_symbols(shell) if auto_int_to_Integer: enable_automatic_int_sympification(shell) return shell else: from IPython.Shell import make_IPython return make_IPython(argv) def init_python_session(): """Construct new Python session. """ from code import InteractiveConsole class SymPyConsole(InteractiveConsole): """An interactive console with readline support. """ def __init__(self): InteractiveConsole.__init__(self) try: import readline except ImportError: pass else: import os import atexit readline.parse_and_bind('tab: complete') if hasattr(readline, 'read_history_file'): history = os.path.expanduser('~/.sympy-history') try: readline.read_history_file(history) except IOError: pass atexit.register(readline.write_history_file, history) return SymPyConsole() def init_session(ipython=None, pretty_print=True, order=None, use_unicode=None, use_latex=None, quiet=False, auto_symbols=False, auto_int_to_Integer=False, str_printer=None, pretty_printer=None, latex_printer=None, argv=[]): """ Initialize an embedded IPython or Python session. The IPython session is initiated with the --pylab option, without the numpy imports, so that matplotlib plotting can be interactive. Parameters ========== pretty_print: boolean If True, use pretty_print to stringify; if False, use sstrrepr to stringify. order: string or None There are a few different settings for this parameter: lex (default), which is lexographic order; grlex, which is graded lexographic order; grevlex, which is reversed graded lexographic order; old, which is used for compatibility reasons and for long expressions; None, which sets it to lex. use_unicode: boolean or None If True, use unicode characters; if False, do not use unicode characters. use_latex: boolean or None If True, use latex rendering if IPython GUI's; if False, do not use latex rendering. quiet: boolean If True, init_session will not print messages regarding its status; if False, init_session will print messages regarding its status. auto_symbols: boolean If True, IPython will automatically create symbols for you. If False, it will not. The default is False. auto_int_to_Integer: boolean If True, IPython will automatically wrap int literals with Integer, so that things like 1/2 give Rational(1, 2). If False, it will not. The default is False. ipython: boolean or None If True, printing will initialize for an IPython console; if False, printing will initialize for a normal console; The default is None, which automatically determines whether we are in an ipython instance or not. str_printer: function, optional, default=None A custom string printer function. This should mimic sympy.printing.sstrrepr(). pretty_printer: function, optional, default=None A custom pretty printer. This should mimic sympy.printing.pretty(). latex_printer: function, optional, default=None A custom LaTeX printer. This should mimic sympy.printing.latex() This should mimic sympy.printing.latex(). argv: list of arguments for IPython See sympy.bin.isympy for options that can be used to initialize IPython. See Also ======== sympy.interactive.printing.init_printing: for examples and the rest of the parameters. Examples ======== >>> from sympy import init_session, Symbol, sin, sqrt >>> sin(x) #doctest: +SKIP NameError: name 'x' is not defined >>> init_session() #doctest: +SKIP >>> sin(x) #doctest: +SKIP sin(x) >>> sqrt(5) #doctest: +SKIP ___ \\/ 5 >>> init_session(pretty_print=False) #doctest: +SKIP >>> sqrt(5) #doctest: +SKIP sqrt(5) >>> y + x + y2 + x2 #doctest: +SKIP x2 + x + y2 + y >>> init_session(order='grlex') #doctest: +SKIP >>> y + x + y2 + x2 #doctest: +SKIP x2 + y2 + x + y >>> init_session(order='grevlex') #doctest: +SKIP >>> y * x*2 + x y2 #doctest: +SKIP x2y + xy2 >>> init_session(order='old') #doctest: +SKIP >>> x2 + y2 + x + y #doctest: +SKIP x + y + x2 + y**2 >>> theta = Symbol('theta') #doctest: +SKIP >>> theta #doctest: +SKIP theta >>> init_session(use_unicode=True) #doctest: +SKIP >>> theta # doctest: +SKIP \u03b8 """ import sys in_ipython = False if ipython is not False: try: import IPython except ImportError: if ipython is True: raise RuntimeError("IPython is not available on this system") ip = None else: try: from IPython import get_ipython ip = get_ipython() except ImportError: ip = None in_ipython = bool(ip) if ipython is None: ipython = in_ipython if ipython is False: ip = init_python_session() mainloop = ip.interact else: ip = init_ipython_session(ip, argv=argv, auto_symbols=auto_symbols, auto_int_to_Integer=auto_int_to_Integer) if V(IPython.__version__) >= '0.11': # runsource is gone, use run_cell instead, which doesn't # take a symbol arg. The second arg is `store_history`, # and False means don't add the line to IPython's history. ip.runsource = lambda src, symbol='exec': ip.run_cell(src, False) #Enable interactive plotting using pylab. try: ip.enable_pylab(import_all=False) except Exception: # Causes an import error if matplotlib is not installed. # Causes other errors (depending on the backend) if there # is no display, or if there is some problem in the # backend, so we have a bare "except Exception" here pass if not in_ipython: mainloop = ip.mainloop if auto_symbols and (not ipython or V(IPython.__version__) < '0.11'): raise RuntimeError("automatic construction of symbols is possible only in IPython 0.11 or above") if auto_int_to_Integer and (not ipython or V(IPython.__version__) < '0.11'): raise RuntimeError("automatic int to Integer transformation is possible only in IPython 0.11 or above") _preexec_source = preexec_source ip.runsource(_preexec_source, symbol='exec') init_printing(pretty_print=pretty_print, order=order, use_unicode=use_unicode, use_latex=use_latex, ip=ip, str_printer=str_printer, pretty_printer=pretty_printer, latex_printer=latex_printer) message = _make_message(ipython, quiet, _preexec_source) if not in_ipython: print(message) mainloop() sys.exit('Exiting ...') else: print(message) import atexit atexit.register(lambda: print("Exiting ...\n"))
524584e9402eff3540d24fbab7a75fc746057138c6bc3735db79ae98a846f647	"""Algorithms for computing symbolic roots of polynomials. """ from __future__ import print_function, division import math from sympy.core import S, I, pi from sympy.core.compatibility import ordered, range, reduce from sympy.core.exprtools import factor_terms from sympy.core.function import _mexpand from sympy.core.logic import fuzzy_not from sympy.core.mul import expand_2arg, Mul from sympy.core.numbers import Rational, igcd, comp from sympy.core.power import Pow from sympy.core.relational import Eq from sympy.core.symbol import Dummy, Symbol, symbols from sympy.core.sympify import sympify from sympy.functions import exp, sqrt, im, cos, acos, Piecewise from sympy.functions.elementary.miscellaneous import root from sympy.ntheory import divisors, isprime, nextprime from sympy.polys.polyerrors import (PolynomialError, GeneratorsNeeded, DomainError) from sympy.polys.polyquinticconst import PolyQuintic from sympy.polys.polytools import Poly, cancel, factor, gcd_list, discriminant from sympy.polys.rationaltools import together from sympy.polys.specialpolys import cyclotomic_poly from sympy.simplify import simplify, powsimp from sympy.utilities import public def roots_linear(f): """Returns a list of roots of a linear polynomial.""" r = -f.nth(0)/f.nth(1) dom = f.get_domain() if not dom.is_Numerical: if dom.is_Composite: r = factor(r) else: r = simplify(r) return [r] def roots_quadratic(f): """Returns a list of roots of a quadratic polynomial. If the domain is ZZ then the roots will be sorted with negatives coming before positives. The ordering will be the same for any numerical coefficients as long as the assumptions tested are correct, otherwise the ordering will not be sorted (but will be canonical). """ a, b, c = f.all_coeffs() dom = f.get_domain() def _sqrt(d): # remove squares from square root since both will be represented # in the results; a similar thing is happening in roots() but # must be duplicated here because not all quadratics are binomials co = [] other = [] for di in Mul.make_args(d): if di.is_Pow and di.exp.is_Integer and di.exp % 2 == 0: co.append(Pow(di.base, di.exp//2)) else: other.append(di) if co: d = Mul(other) co = Mul(co) return cosqrt(d) return sqrt(d) def _simplify(expr): if dom.is_Composite: return factor(expr) else: return simplify(expr) if c is S.Zero: r0, r1 = S.Zero, -b/a if not dom.is_Numerical: r1 = _simplify(r1) elif r1.is_negative: r0, r1 = r1, r0 elif b is S.Zero: r = -c/a if not dom.is_Numerical: r = _simplify(r) R = _sqrt(r) r0 = -R r1 = R else: d = b2 - 4ac A = 2a B = -b/A if not dom.is_Numerical: d = _simplify(d) B = _simplify(B) D = factor_terms(_sqrt(d)/A) r0 = B - D r1 = B + D if a.is_negative: r0, r1 = r1, r0 elif not dom.is_Numerical: r0, r1 = [expand_2arg(i) for i in (r0, r1)] return [r0, r1] def roots_cubic(f, trig=False): """Returns a list of roots of a cubic polynomial. References ========== [1] https://en.wikipedia.org/wiki/Cubic_function, General formula for roots, (accessed November 17, 2014). """ if trig: a, b, c, d = f.all_coeffs() p = (3ac - b2)/3/a2 q = (2b3 - 9abc + 27a2d)/(27a3) D = 18abcd - 4b*3d + b*2c*2 - 4ac3 - 27a*2d*2 if (D > 0) == True: rv = [] for k in range(3): rv.append(2sqrt(-p/3)cos(acos(3q/2/psqrt(-3/p))/3 - k2pi/3)) return [i - b/3/a for i in rv] _, a, b, c = f.monic().all_coeffs() if c is S.Zero: x1, x2 = roots([1, a, b], multiple=True) return [x1, S.Zero, x2] p = b - a2/3 q = c - ab/3 + 2a3/27 pon3 = p/3 aon3 = a/3 u1 = None if p is S.Zero: if q is S.Zero: return [-aon3]3 if q.is_real: if q.is_positive: u1 = -root(q, 3) elif q.is_negative: u1 = root(-q, 3) elif q is S.Zero: y1, y2 = roots([1, 0, p], multiple=True) return [tmp - aon3 for tmp in [y1, S.Zero, y2]] elif q.is_real and q.is_negative: u1 = -root(-q/2 + sqrt(q2/4 + pon33), 3) coeff = Isqrt(3)/2 if u1 is None: u1 = S(1) u2 = -S.Half + coeff u3 = -S.Half - coeff a, b, c, d = S(1), a, b, c D0 = b2 - 3ac D1 = 2b*3 - 9abc + 27a2d C = root((D1 + sqrt(D1*2 - 4D0*3))/2, 3) return [-(b + ukC + D0/C/uk)/3/a for uk in [u1, u2, u3]] u2 = u1(-S.Half + coeff) u3 = u1(-S.Half - coeff) if p is S.Zero: return [u1 - aon3, u2 - aon3, u3 - aon3] soln = [ -u1 + pon3/u1 - aon3, -u2 + pon3/u2 - aon3, -u3 + pon3/u3 - aon3 ] return soln def _roots_quartic_euler(p, q, r, a): """ Descartes-Euler solution of the quartic equation Parameters ========== p, q, r: coefficients of ``x*4 + px*2 + qx + r`` a: shift of the roots Notes ===== This is a helper function for ``roots_quartic``. Look for solutions of the form :: ``x1 = sqrt(R) - sqrt(A + Bsqrt(R))`` ``x2 = -sqrt(R) - sqrt(A - Bsqrt(R))`` ``x3 = -sqrt(R) + sqrt(A - Bsqrt(R))`` ``x4 = sqrt(R) + sqrt(A + Bsqrt(R))`` To satisfy the quartic equation one must have ``p = -2(R + A); q = -4BR; r = (R - A)2 - B2R`` so that ``R`` must satisfy the Descartes-Euler resolvent equation ``64R3 + 32pR2 + (4p*2 - 16r)R - q2 = 0`` If the resolvent does not have a rational solution, return None; in that case it is likely that the Ferrari method gives a simpler solution. Examples ======== >>> from sympy import S >>> from sympy.polys.polyroots import _roots_quartic_euler >>> p, q, r = -S(64)/5, -S(512)/125, -S(1024)/3125 >>> _roots_quartic_euler(p, q, r, S(0))[0] -sqrt(32sqrt(5)/125 + 16/5) + 4sqrt(5)/5 """ # solve the resolvent equation x = Dummy('x') eq = 64x*3 + 32px2 + (4p*2 - 16r)x - q2 xsols = list(roots(Poly(eq, x), cubics=False).keys()) xsols = [sol for sol in xsols if sol.is_rational and sol.is_nonzero] if not xsols: return None R = max(xsols) c1 = sqrt(R) B = -qc1/(4R) A = -R - p/2 c2 = sqrt(A + B) c3 = sqrt(A - B) return [c1 - c2 - a, -c1 - c3 - a, -c1 + c3 - a, c1 + c2 - a] def roots_quartic(f): r""" Returns a list of roots of a quartic polynomial. There are many references for solving quartic expressions available [1-5]. This reviewer has found that many of them require one to select from among 2 or more possible sets of solutions and that some solutions work when one is searching for real roots but don't work when searching for complex roots (though this is not always stated clearly). The following routine has been tested and found to be correct for 0, 2 or 4 complex roots. The quasisymmetric case solution [6] looks for quartics that have the form `x4 + Ax*3 + Bx*2 + Cx + D = 0` where `(C/A)*2 = D`. Although no general solution that is always applicable for all coefficients is known to this reviewer, certain conditions are tested to determine the simplest 4 expressions that can be returned: 1) `f = c + a(a*2/8 - b/2) == 0` 2) `g = d - a(a(3a*2/256 - b/16) + c/4) = 0` 3) if `f != 0` and `g != 0` and `p = -d + ac/4 - b2/12` then a) `p == 0` b) `p != 0` Examples ======== >>> from sympy import Poly, symbols, I >>> from sympy.polys.polyroots import roots_quartic >>> r = roots_quartic(Poly('x4-6x3+17x*2-26x+20')) >>> # 4 complex roots: 1+-Isqrt(3), 2+-I >>> sorted(str(tmp.evalf(n=2)) for tmp in r) ['1.0 + 1.7I', '1.0 - 1.7I', '2.0 + 1.0I', '2.0 - 1.0I'] References ========== 1. http://mathforum.org/dr.math/faq/faq.cubic.equations.html 2. https://en.wikipedia.org/wiki/Quartic_function#Summary_of_Ferrari.27s_method 3. http://planetmath.org/encyclopedia/GaloisTheoreticDerivationOfTheQuarticFormula.html 4. http://staff.bath.ac.uk/masjhd/JHD-CA.pdf 5. http://www.albmath.org/files/Math_5713.pdf 6. http://www.statemaster.com/encyclopedia/Quartic-equation 7. eqworld.ipmnet.ru/en/solutions/ae/ae0108.pdf """ _, a, b, c, d = f.monic().all_coeffs() if not d: return [S.Zero] + roots([1, a, b, c], multiple=True) elif (c/a)2 == d: x, m = f.gen, c/a g = Poly(x2 + ax + b - 2m, x) z1, z2 = roots_quadratic(g) h1 = Poly(x2 - z1x + m, x) h2 = Poly(x*2 - z2x + m, x) r1 = roots_quadratic(h1) r2 = roots_quadratic(h2) return r1 + r2 else: a2 = a*2 e = b - 3a2/8 f = _mexpand(c + a(a2/8 - b/2)) g = _mexpand(d - a(a(3a2/256 - b/16) + c/4)) aon4 = a/4 if f is S.Zero: y1, y2 = [sqrt(tmp) for tmp in roots([1, e, g], multiple=True)] return [tmp - aon4 for tmp in [-y1, -y2, y1, y2]] if g is S.Zero: y = [S.Zero] + roots([1, 0, e, f], multiple=True) return [tmp - aon4 for tmp in y] else: # Descartes-Euler method, see [7] sols = _roots_quartic_euler(e, f, g, aon4) if sols: return sols # Ferrari method, see [1, 2] a2 = a*2 e = b - 3a2/8 f = c + a(a2/8 - b/2) g = d - a(a(3a2/256 - b/16) + c/4) p = -e2/12 - g q = -e3/108 + eg/3 - f2/8 TH = Rational(1, 3) def _ans(y): w = sqrt(e + 2y) arg1 = 3e + 2y arg2 = 2f/w ans = [] for s in [-1, 1]: root = sqrt(-(arg1 + sarg2)) for t in [-1, 1]: ans.append((sw - troot)/2 - aon4) return ans # p == 0 case y1 = -5e/6 - qTH if p.is_zero: return _ans(y1) # if p != 0 then u below is not 0 root = sqrt(q2/4 + p3/27) r = -q/2 + root # or -q/2 - root u = rTH # primary root of solve(x3 - r, x) y2 = -5e/6 + u - p/u/3 if fuzzy_not(p.is_zero): return _ans(y2) # sort it out once they know the values of the coefficients return [Piecewise((a1, Eq(p, 0)), (a2, True)) for a1, a2 in zip(_ans(y1), _ans(y2))] def roots_binomial(f): """Returns a list of roots of a binomial polynomial. If the domain is ZZ then the roots will be sorted with negatives coming before positives. The ordering will be the same for any numerical coefficients as long as the assumptions tested are correct, otherwise the ordering will not be sorted (but will be canonical). """ n = f.degree() a, b = f.nth(n), f.nth(0) base = -cancel(b/a) alpha = root(base, n) if alpha.is_number: alpha = alpha.expand(complex=True) # define some parameters that will allow us to order the roots. # If the domain is ZZ this is guaranteed to return roots sorted # with reals before non-real roots and non-real sorted according # to real part and imaginary part, e.g. -1, 1, -1 + I, 2 - I neg = base.is_negative even = n % 2 == 0 if neg: if even == True and (base + 1).is_positive: big = True else: big = False # get the indices in the right order so the computed # roots will be sorted when the domain is ZZ ks = [] imax = n//2 if even: ks.append(imax) imax -= 1 if not neg: ks.append(0) for i in range(imax, 0, -1): if neg: ks.extend([i, -i]) else: ks.extend([-i, i]) if neg: ks.append(0) if big: for i in range(0, len(ks), 2): pair = ks[i: i + 2] pair = list(reversed(pair)) # compute the roots roots, d = [], 2Ipi/n for k in ks: zeta = exp(kd).expand(complex=True) roots.append((alphazeta).expand(power_base=False)) return roots def _inv_totient_estimate(m): """ Find ``(L, U)`` such that ``L <= phi^-1(m) <= U``. Examples ======== >>> from sympy.polys.polyroots import _inv_totient_estimate >>> _inv_totient_estimate(192) (192, 840) >>> _inv_totient_estimate(400) (400, 1750) """ primes = [ d + 1 for d in divisors(m) if isprime(d + 1) ] a, b = 1, 1 for p in primes: a = p b = p - 1 L = m U = int(math.ceil(m(float(a)/b))) P = p = 2 primes = [] while P <= U: p = nextprime(p) primes.append(p) P = p P //= p b = 1 for p in primes[:-1]: b = p - 1 U = int(math.ceil(m(float(P)/b))) return L, U def roots_cyclotomic(f, factor=False): """Compute roots of cyclotomic polynomials. """ L, U = _inv_totient_estimate(f.degree()) for n in range(L, U + 1): g = cyclotomic_poly(n, f.gen, polys=True) if f == g: break else: # pragma: no cover raise RuntimeError("failed to find index of a cyclotomic polynomial") roots = [] if not factor: # get the indices in the right order so the computed # roots will be sorted h = n//2 ks = [i for i in range(1, n + 1) if igcd(i, n) == 1] ks.sort(key=lambda x: (x, -1) if x <= h else (abs(x - n), 1)) d = 2Ipi/n for k in reversed(ks): roots.append(exp(kd).expand(complex=True)) else: g = Poly(f, extension=root(-1, n)) for h, _ in ordered(g.factor_list()[1]): roots.append(-h.TC()) return roots def roots_quintic(f): """ Calculate exact roots of a solvable quintic """ result = [] coeff_5, coeff_4, p, q, r, s = f.all_coeffs() # Eqn must be of the form x^5 + px^3 + qx^2 + rx + s if coeff_4: return result if coeff_5 != 1: l = [p/coeff_5, q/coeff_5, r/coeff_5, s/coeff_5] if not all(coeff.is_Rational for coeff in l): return result f = Poly(f/coeff_5) quintic = PolyQuintic(f) # Eqn standardized. Algo for solving starts here if not f.is_irreducible: return result f20 = quintic.f20 # Check if f20 has linear factors over domain Z if f20.is_irreducible: return result # Now, we know that f is solvable for _factor in f20.factor_list()[1]: if _factor[0].is_linear: theta = _factor[0].root(0) break d = discriminant(f) delta = sqrt(d) # zeta = a fifth root of unity zeta1, zeta2, zeta3, zeta4 = quintic.zeta T = quintic.T(theta, d) tol = S(1e-10) alpha = T[1] + T[2]delta alpha_bar = T[1] - T[2]delta beta = T[3] + T[4]delta beta_bar = T[3] - T[4]delta disc = alpha2 - 4beta disc_bar = alpha_bar*2 - 4beta_bar l0 = quintic.l0(theta) l1 = _quintic_simplify((-alpha + sqrt(disc)) / S(2)) l4 = _quintic_simplify((-alpha - sqrt(disc)) / S(2)) l2 = _quintic_simplify((-alpha_bar + sqrt(disc_bar)) / S(2)) l3 = _quintic_simplify((-alpha_bar - sqrt(disc_bar)) / S(2)) order = quintic.order(theta, d) test = (orderdelta.n()) - ( (l1.n() - l4.n())(l2.n() - l3.n()) ) # Comparing floats if not comp(test, 0, tol): l2, l3 = l3, l2 # Now we have correct order of l's R1 = l0 + l1zeta1 + l2zeta2 + l3zeta3 + l4zeta4 R2 = l0 + l3zeta1 + l1zeta2 + l4zeta3 + l2zeta4 R3 = l0 + l2zeta1 + l4zeta2 + l1zeta3 + l3zeta4 R4 = l0 + l4zeta1 + l3zeta2 + l2zeta3 + l1zeta4 Res = [None, [None]5, [None]5, [None]5, [None]5] Res_n = [None, [None]5, [None]5, [None]5, [None]5] sol = Symbol('sol') # Simplifying improves performance a lot for exact expressions R1 = _quintic_simplify(R1) R2 = _quintic_simplify(R2) R3 = _quintic_simplify(R3) R4 = _quintic_simplify(R4) # Solve imported here. Causing problems if imported as 'solve' # and hence the changed name from sympy.solvers.solvers import solve as _solve a, b = symbols('a b', cls=Dummy) _sol = _solve( sol*5 - a - Ib, sol) for i in range(5): _sol[i] = factor(_sol[i]) R1 = R1.as_real_imag() R2 = R2.as_real_imag() R3 = R3.as_real_imag() R4 = R4.as_real_imag() for i, currentroot in enumerate(_sol): Res[1][i] = _quintic_simplify(currentroot.subs({ a: R1[0], b: R1[1] })) Res[2][i] = _quintic_simplify(currentroot.subs({ a: R2[0], b: R2[1] })) Res[3][i] = _quintic_simplify(currentroot.subs({ a: R3[0], b: R3[1] })) Res[4][i] = _quintic_simplify(currentroot.subs({ a: R4[0], b: R4[1] })) for i in range(1, 5): for j in range(5): Res_n[i][j] = Res[i][j].n() Res[i][j] = _quintic_simplify(Res[i][j]) r1 = Res[1][0] r1_n = Res_n[1][0] for i in range(5): if comp(im(r1_nRes_n[4][i]), 0, tol): r4 = Res[4][i] break # Now we have various Res values. Each will be a list of five # values. We have to pick one r value from those five for each Res u, v = quintic.uv(theta, d) testplus = (u + vdeltasqrt(5)).n() testminus = (u - vdeltasqrt(5)).n() # Evaluated numbers suffixed with _n # We will use evaluated numbers for calculation. Much faster. r4_n = r4.n() r2 = r3 = None for i in range(5): r2temp_n = Res_n[2][i] for j in range(5): # Again storing away the exact number and using # evaluated numbers in computations r3temp_n = Res_n[3][j] if (comp((r1_nr2temp_n*2 + r4_nr3temp_n*2 - testplus).n(), 0, tol) and comp((r3temp_nr1_n*2 + r2temp_nr4_n*2 - testminus).n(), 0, tol)): r2 = Res[2][i] r3 = Res[3][j] break if r2: break # Now, we have r's so we can get roots x1 = (r1 + r2 + r3 + r4)/5 x2 = (r1zeta4 + r2zeta3 + r3zeta2 + r4zeta1)/5 x3 = (r1zeta3 + r2zeta1 + r3zeta4 + r4zeta2)/5 x4 = (r1zeta2 + r2zeta4 + r3zeta1 + r4zeta3)/5 x5 = (r1zeta1 + r2zeta2 + r3zeta3 + r4zeta4)/5 result = [x1, x2, x3, x4, x5] # Now check if solutions are distinct saw = set() for r in result: r = r.n(2) if r in saw: # Roots were identical. Abort, return [] # and fall back to usual solve return [] saw.add(r) return result def _quintic_simplify(expr): expr = powsimp(expr) expr = cancel(expr) return together(expr) def _integer_basis(poly): """Compute coefficient basis for a polynomial over integers. Returns the integer ``div`` such that substituting ``x = divy`` ``p(x) = mq(y)`` where the coefficients of ``q`` are smaller than those of ``p``. For example ``x5 + 512x + 1024 = 0`` with ``div = 4`` becomes ``y*5 + 2y + 1 = 0`` Returns the integer ``div`` or ``None`` if there is no possible scaling. Examples ======== >>> from sympy.polys import Poly >>> from sympy.abc import x >>> from sympy.polys.polyroots import _integer_basis >>> p = Poly(x*5 + 512x + 1024, x, domain='ZZ') >>> _integer_basis(p) 4 """ monoms, coeffs = list(zip(poly.terms())) monoms, = list(zip(monoms)) coeffs = list(map(abs, coeffs)) if coeffs[0] < coeffs[-1]: coeffs = list(reversed(coeffs)) n = monoms[0] monoms = [n - i for i in reversed(monoms)] else: return None monoms = monoms[:-1] coeffs = coeffs[:-1] divs = reversed(divisors(gcd_list(coeffs))[1:]) try: div = next(divs) except StopIteration: return None while True: for monom, coeff in zip(monoms, coeffs): if coeff % div*monom != 0: try: div = next(divs) except StopIteration: return None else: break else: return div def preprocess_roots(poly): """Try to get rid of symbolic coefficients from ``poly``. """ coeff = S.One poly_func = poly.func try: _, poly = poly.clear_denoms(convert=True) except DomainError: return coeff, poly poly = poly.primitive()[1] poly = poly.retract() # TODO: This is fragile. Figure out how to make this independent of construct_domain(). if poly.get_domain().is_Poly and all(c.is_term for c in poly.rep.coeffs()): poly = poly.inject() strips = list(zip(poly.monoms())) gens = list(poly.gens[1:]) base, strips = strips[0], strips[1:] for gen, strip in zip(list(gens), strips): reverse = False if strip[0] < strip[-1]: strip = reversed(strip) reverse = True ratio = None for a, b in zip(base, strip): if not a and not b: continue elif not a or not b: break elif b % a != 0: break else: _ratio = b // a if ratio is None: ratio = _ratio elif ratio != _ratio: break else: if reverse: ratio = -ratio poly = poly.eval(gen, 1) coeff = gen(-ratio) gens.remove(gen) if gens: poly = poly.eject(gens) if poly.is_univariate and poly.get_domain().is_ZZ: basis = _integer_basis(poly) if basis is not None: n = poly.degree() def func(k, coeff): return coeff//basis*(n - k[0]) poly = poly.termwise(func) coeff = basis if not isinstance(poly, poly_func): poly = poly_func(poly) return coeff, poly @public def roots(f, gens, flags): """ Computes symbolic roots of a univariate polynomial. Given a univariate polynomial f with symbolic coefficients (or a list of the polynomial's coefficients), returns a dictionary with its roots and their multiplicities. Only roots expressible via radicals will be returned. To get a complete set of roots use RootOf class or numerical methods instead. By default cubic and quartic formulas are used in the algorithm. To disable them because of unreadable output set ``cubics=False`` or ``quartics=False`` respectively. If cubic roots are real but are expressed in terms of complex numbers (casus irreducibilis [1]) the ``trig`` flag can be set to True to have the solutions returned in terms of cosine and inverse cosine functions. To get roots from a specific domain set the ``filter`` flag with one of the following specifiers: Z, Q, R, I, C. By default all roots are returned (this is equivalent to setting ``filter='C'``). By default a dictionary is returned giving a compact result in case of multiple roots. However to get a list containing all those roots set the ``multiple`` flag to True; the list will have identical roots appearing next to each other in the result. (For a given Poly, the all_roots method will give the roots in sorted numerical order.) Examples ======== >>> from sympy import Poly, roots >>> from sympy.abc import x, y >>> roots(x2 - 1, x) {-1: 1, 1: 1} >>> p = Poly(x2-1, x) >>> roots(p) {-1: 1, 1: 1} >>> p = Poly(x2-y, x, y) >>> roots(Poly(p, x)) {-sqrt(y): 1, sqrt(y): 1} >>> roots(x2 - y, x) {-sqrt(y): 1, sqrt(y): 1} >>> roots([1, 0, -1]) {-1: 1, 1: 1} References ========== .. [1] https://en.wikipedia.org/wiki/Cubic_function#Trigonometric_.28and_hyperbolic.29_method """ from sympy.polys.polytools import to_rational_coeffs flags = dict(flags) auto = flags.pop('auto', True) cubics = flags.pop('cubics', True) trig = flags.pop('trig', False) quartics = flags.pop('quartics', True) quintics = flags.pop('quintics', False) multiple = flags.pop('multiple', False) filter = flags.pop('filter', None) predicate = flags.pop('predicate', None) if isinstance(f, list): if gens: raise ValueError('redundant generators given') x = Dummy('x') poly, i = {}, len(f) - 1 for coeff in f: poly[i], i = sympify(coeff), i - 1 f = Poly(poly, x, field=True) else: try: f = Poly(f, gens, flags) if f.length == 2 and f.degree() != 1: # check for foon factors in the constant n = f.degree() npow_bases = [] others = [] expr = f.as_expr() con = expr.as_independent(gens)[0] for p in Mul.make_args(con): if p.is_Pow and not p.exp % n: npow_bases.append(p.base(p.exp/n)) else: others.append(p) if npow_bases: b = Mul(npow_bases) B = Dummy() d = roots(Poly(expr - con + B*nMul(others), gens, *flags), gens, *flags) rv = {} for k, v in d.items(): rv[k.subs(B, b)] = v return rv except GeneratorsNeeded: if multiple: return [] else: return {} if f.is_multivariate: raise PolynomialError('multivariate polynomials are not supported') def _update_dict(result, currentroot, k): if currentroot in result: result[currentroot] += k else: result[currentroot] = k def _try_decompose(f): """Find roots using functional decomposition. """ factors, roots = f.decompose(), [] for currentroot in _try_heuristics(factors[0]): roots.append(currentroot) for currentfactor in factors[1:]: previous, roots = list(roots), [] for currentroot in previous: g = currentfactor - Poly(currentroot, f.gen) for currentroot in _try_heuristics(g): roots.append(currentroot) return roots def _try_heuristics(f): """Find roots using formulas and some tricks. """ if f.is_ground: return [] if f.is_monomial: return [S(0)]f.degree() if f.length() == 2: if f.degree() == 1: return list(map(cancel, roots_linear(f))) else: return roots_binomial(f) result = [] for i in [-1, 1]: if not f.eval(i): f = f.quo(Poly(f.gen - i, f.gen)) result.append(i) break n = f.degree() if n == 1: result += list(map(cancel, roots_linear(f))) elif n == 2: result += list(map(cancel, roots_quadratic(f))) elif f.is_cyclotomic: result += roots_cyclotomic(f) elif n == 3 and cubics: result += roots_cubic(f, trig=trig) elif n == 4 and quartics: result += roots_quartic(f) elif n == 5 and quintics: result += roots_quintic(f) return result (k,), f = f.terms_gcd() if not k: zeros = {} else: zeros = {S(0): k} coeff, f = preprocess_roots(f) if auto and f.get_domain().is_Ring: f = f.to_field() rescale_x = None translate_x = None result = {} if not f.is_ground: dom = f.get_domain() if not dom.is_Exact and dom.is_Numerical: for r in f.nroots(): _update_dict(result, r, 1) elif f.degree() == 1: result[roots_linear(f)[0]] = 1 elif f.length() == 2: roots_fun = roots_quadratic if f.degree() == 2 else roots_binomial for r in roots_fun(f): _update_dict(result, r, 1) else: _, factors = Poly(f.as_expr()).factor_list() if len(factors) == 1 and f.degree() == 2: for r in roots_quadratic(f): _update_dict(result, r, 1) else: if len(factors) == 1 and factors[0][1] == 1: if f.get_domain().is_EX: res = to_rational_coeffs(f) if res: if res[0] is None: translate_x, f = res[2:] else: rescale_x, f = res[1], res[-1] result = roots(f) if not result: for currentroot in _try_decompose(f): _update_dict(result, currentroot, 1) else: for r in _try_heuristics(f): _update_dict(result, r, 1) else: for currentroot in _try_decompose(f): _update_dict(result, currentroot, 1) else: for currentfactor, k in factors: for r in _try_heuristics(Poly(currentfactor, f.gen, field=True)): _update_dict(result, r, k) if coeff is not S.One: _result, result, = result, {} for currentroot, k in _result.items(): result[coeffcurrentroot] = k if filter not in [None, 'C']: handlers = { 'Z': lambda r: r.is_Integer, 'Q': lambda r: r.is_Rational, 'R': lambda r: r.is_extended_real, 'I': lambda r: r.is_imaginary, } try: query = handlers[filter] except KeyError: raise ValueError("Invalid filter: %s" % filter) for zero in dict(result).keys(): if not query(zero): del result[zero] if predicate is not None: for zero in dict(result).keys(): if not predicate(zero): del result[zero] if rescale_x: result1 = {} for k, v in result.items(): result1[krescale_x] = v result = result1 if translate_x: result1 = {} for k, v in result.items(): result1[k + translate_x] = v result = result1 # adding zero roots after non-trivial roots have been translated result.update(zeros) if not multiple: return result else: zeros = [] for zero in ordered(result): zeros.extend([zero]result[zero]) return zeros def root_factors(f, gens, args): """ Returns all factors of a univariate polynomial. Examples ======== >>> from sympy.abc import x, y >>> from sympy.polys.polyroots import root_factors >>> root_factors(x2 - y, x) [x - sqrt(y), x + sqrt(y)] """ args = dict(args) filter = args.pop('filter', None) F = Poly(f, gens, args) if not F.is_Poly: return [f] if F.is_multivariate: raise ValueError('multivariate polynomials are not supported') x = F.gens[0] zeros = roots(F, filter=filter) if not zeros: factors = [F] else: factors, N = [], 0 for r, n in ordered(zeros.items()): factors, N = factors + [Poly(x - r, x)]n, N + n if N < F.degree(): G = reduce(lambda p, q: p*q, factors) factors.append(F.quo(G)) if not isinstance(f, Poly): factors = [ f.as_expr() for f in factors ] return factors
771da21a7f683d228a24b36f61cc5090e22dd6ba7562bfc7e56e81eaa39d9ca5	"""Sparse polynomial rings. """ from __future__ import print_function, division from operator import add, mul, lt, le, gt, ge from types import GeneratorType from sympy.core.compatibility import is_sequence, reduce, string_types, range from sympy.core.expr import Expr from sympy.core.numbers import igcd, oo from sympy.core.symbol import Symbol, symbols as _symbols from sympy.core.sympify import CantSympify, sympify from sympy.ntheory.multinomial import multinomial_coefficients from sympy.polys.compatibility import IPolys from sympy.polys.constructor import construct_domain from sympy.polys.densebasic import dmp_to_dict, dmp_from_dict from sympy.polys.domains.domainelement import DomainElement from sympy.polys.domains.polynomialring import PolynomialRing from sympy.polys.heuristicgcd import heugcd from sympy.polys.monomials import MonomialOps from sympy.polys.orderings import lex from sympy.polys.polyerrors import ( CoercionFailed, GeneratorsError, ExactQuotientFailed, MultivariatePolynomialError) from sympy.polys.polyoptions import (Domain as DomainOpt, Order as OrderOpt, build_options) from sympy.polys.polyutils import (expr_from_dict, _dict_reorder, _parallel_dict_from_expr) from sympy.printing.defaults import DefaultPrinting from sympy.utilities import public from sympy.utilities.magic import pollute @public def ring(symbols, domain, order=lex): """Construct a polynomial ring returning ``(ring, x_1, ..., x_n)``. Parameters ========== symbols : str Symbol/Expr or sequence of str, Symbol/Expr (non-empty) domain : :class: `Domain` or coercible order : :class:, optional `Order` or coercible, optional, defaults to ``lex`` Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex >>> R, x, y, z = ring("x,y,z", ZZ, lex) >>> R Polynomial ring in x, y, z over ZZ with lex order >>> x + y + z x + y + z >>> type(_) <class 'sympy.polys.rings.PolyElement'> """ _ring = PolyRing(symbols, domain, order) return (_ring,) + _ring.gens @public def xring(symbols, domain, order=lex): """Construct a polynomial ring returning ``(ring, (x_1, ..., x_n))``. Parameters ========== symbols : str Symbol/Expr or sequence of str, Symbol/Expr (non-empty) domain : :class: `Domain` or coercible order : :class:, optional `Order` or coercible, optional, defaults to ``lex`` Examples ======== >>> from sympy.polys.rings import xring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex >>> R, (x, y, z) = xring("x,y,z", ZZ, lex) >>> R Polynomial ring in x, y, z over ZZ with lex order >>> x + y + z x + y + z >>> type(_) <class 'sympy.polys.rings.PolyElement'> """ _ring = PolyRing(symbols, domain, order) return (_ring, _ring.gens) @public def vring(symbols, domain, order=lex): """Construct a polynomial ring and inject ``x_1, ..., x_n`` into the global namespace. Parameters ========== symbols : str Symbol/Expr or sequence of str, Symbol/Expr (non-empty) domain : :class: `Domain` or coercible order : :class:, optional `Order` or coercible, optional, defaults to ``lex`` Examples ======== >>> from sympy.polys.rings import vring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex >>> vring("x,y,z", ZZ, lex) Polynomial ring in x, y, z over ZZ with lex order >>> x + y + z x + y + z >>> type(_) <class 'sympy.polys.rings.PolyElement'> """ _ring = PolyRing(symbols, domain, order) pollute([ sym.name for sym in _ring.symbols ], _ring.gens) return _ring @public def sring(exprs, symbols, options): """Construct a ring deriving generators and domain from options and input expressions. Parameters ========== exprs : :class: `Expr` or sequence of :class:`Expr` (sympifiable) symbols : sequence of :class:`Symbol`/:class:`Expr` options : keyword arguments understood by :class:`Options` Examples ======== >>> from sympy.core import symbols >>> from sympy.polys.rings import sring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex >>> x, y, z = symbols("x,y,z") >>> R, f = sring(x + 2y + 3z) >>> R Polynomial ring in x, y, z over ZZ with lex order >>> f x + 2y + 3z >>> type(_) <class 'sympy.polys.rings.PolyElement'> """ single = False if not is_sequence(exprs): exprs, single = [exprs], True exprs = list(map(sympify, exprs)) opt = build_options(symbols, options) # TODO: rewrite this so that it doesn't use expand() (see poly()). reps, opt = _parallel_dict_from_expr(exprs, opt) if opt.domain is None: # NOTE: this is inefficient because construct_domain() automatically # performs conversion to the target domain. It shouldn't do this. coeffs = sum([ list(rep.values()) for rep in reps ], []) opt.domain, _ = construct_domain(coeffs, opt=opt) _ring = PolyRing(opt.gens, opt.domain, opt.order) polys = list(map(_ring.from_dict, reps)) if single: return (_ring, polys[0]) else: return (_ring, polys) def _parse_symbols(symbols): if isinstance(symbols, string_types): return _symbols(symbols, seq=True) if symbols else () elif isinstance(symbols, Expr): return (symbols,) elif is_sequence(symbols): if all(isinstance(s, string_types) for s in symbols): return _symbols(symbols) elif all(isinstance(s, Expr) for s in symbols): return symbols raise GeneratorsError("expected a string, Symbol or expression or a non-empty sequence of strings, Symbols or expressions") _ring_cache = {} class PolyRing(DefaultPrinting, IPolys): """Multivariate distributed polynomial ring. """ def __new__(cls, symbols, domain, order=lex): symbols = tuple(_parse_symbols(symbols)) ngens = len(symbols) domain = DomainOpt.preprocess(domain) order = OrderOpt.preprocess(order) _hash_tuple = (cls.__name__, symbols, ngens, domain, order) obj = _ring_cache.get(_hash_tuple) if obj is None: if domain.is_Composite and set(symbols) & set(domain.symbols): raise GeneratorsError("polynomial ring and it's ground domain share generators") obj = object.__new__(cls) obj._hash_tuple = _hash_tuple obj._hash = hash(_hash_tuple) obj.dtype = type("PolyElement", (PolyElement,), {"ring": obj}) obj.symbols = symbols obj.ngens = ngens obj.domain = domain obj.order = order obj.zero_monom = (0,)ngens obj.gens = obj._gens() obj._gens_set = set(obj.gens) obj._one = [(obj.zero_monom, domain.one)] if ngens: # These expect monomials in at least one variable codegen = MonomialOps(ngens) obj.monomial_mul = codegen.mul() obj.monomial_pow = codegen.pow() obj.monomial_mulpow = codegen.mulpow() obj.monomial_ldiv = codegen.ldiv() obj.monomial_div = codegen.div() obj.monomial_lcm = codegen.lcm() obj.monomial_gcd = codegen.gcd() else: monunit = lambda a, b: () obj.monomial_mul = monunit obj.monomial_pow = monunit obj.monomial_mulpow = lambda a, b, c: () obj.monomial_ldiv = monunit obj.monomial_div = monunit obj.monomial_lcm = monunit obj.monomial_gcd = monunit if order is lex: obj.leading_expv = lambda f: max(f) else: obj.leading_expv = lambda f: max(f, key=order) for symbol, generator in zip(obj.symbols, obj.gens): if isinstance(symbol, Symbol): name = symbol.name if not hasattr(obj, name): setattr(obj, name, generator) _ring_cache[_hash_tuple] = obj return obj def _gens(self): """Return a list of polynomial generators. """ one = self.domain.one _gens = [] for i in range(self.ngens): expv = self.monomial_basis(i) poly = self.zero poly[expv] = one _gens.append(poly) return tuple(_gens) def __getnewargs__(self): return (self.symbols, self.domain, self.order) def __getstate__(self): state = self.__dict__.copy() del state["leading_expv"] for key, value in state.items(): if key.startswith("monomial_"): del state[key] return state def __hash__(self): return self._hash def __eq__(self, other): return isinstance(other, PolyRing) and \ (self.symbols, self.domain, self.ngens, self.order) == \ (other.symbols, other.domain, other.ngens, other.order) def __ne__(self, other): return not self == other def clone(self, symbols=None, domain=None, order=None): return self.__class__(symbols or self.symbols, domain or self.domain, order or self.order) def monomial_basis(self, i): """Return the ith-basis element. """ basis = [0]self.ngens basis[i] = 1 return tuple(basis) @property def zero(self): return self.dtype() @property def one(self): return self.dtype(self._one) def domain_new(self, element, orig_domain=None): return self.domain.convert(element, orig_domain) def ground_new(self, coeff): return self.term_new(self.zero_monom, coeff) def term_new(self, monom, coeff): coeff = self.domain_new(coeff) poly = self.zero if coeff: poly[monom] = coeff return poly def ring_new(self, element): if isinstance(element, PolyElement): if self == element.ring: return element elif isinstance(self.domain, PolynomialRing) and self.domain.ring == element.ring: return self.ground_new(element) else: raise NotImplementedError("conversion") elif isinstance(element, string_types): raise NotImplementedError("parsing") elif isinstance(element, dict): return self.from_dict(element) elif isinstance(element, list): try: return self.from_terms(element) except ValueError: return self.from_list(element) elif isinstance(element, Expr): return self.from_expr(element) else: return self.ground_new(element) __call__ = ring_new def from_dict(self, element): domain_new = self.domain_new poly = self.zero for monom, coeff in element.items(): coeff = domain_new(coeff) if coeff: poly[monom] = coeff return poly def from_terms(self, element): return self.from_dict(dict(element)) def from_list(self, element): return self.from_dict(dmp_to_dict(element, self.ngens-1, self.domain)) def _rebuild_expr(self, expr, mapping): domain = self.domain def _rebuild(expr): generator = mapping.get(expr) if generator is not None: return generator elif expr.is_Add: return reduce(add, list(map(_rebuild, expr.args))) elif expr.is_Mul: return reduce(mul, list(map(_rebuild, expr.args))) elif expr.is_Pow and expr.exp.is_Integer and expr.exp >= 0: return _rebuild(expr.base)int(expr.exp) else: return domain.convert(expr) return _rebuild(sympify(expr)) def from_expr(self, expr): mapping = dict(list(zip(self.symbols, self.gens))) try: poly = self._rebuild_expr(expr, mapping) except CoercionFailed: raise ValueError("expected an expression convertible to a polynomial in %s, got %s" % (self, expr)) else: return self.ring_new(poly) def index(self, gen): """Compute index of ``gen`` in ``self.gens``. """ if gen is None: if self.ngens: i = 0 else: i = -1 # indicate impossible choice elif isinstance(gen, int): i = gen if 0 <= i and i < self.ngens: pass elif -self.ngens <= i and i <= -1: i = -i - 1 else: raise ValueError("invalid generator index: %s" % gen) elif isinstance(gen, self.dtype): try: i = self.gens.index(gen) except ValueError: raise ValueError("invalid generator: %s" % gen) elif isinstance(gen, string_types): try: i = self.symbols.index(gen) except ValueError: raise ValueError("invalid generator: %s" % gen) else: raise ValueError("expected a polynomial generator, an integer, a string or None, got %s" % gen) return i def drop(self, gens): """Remove specified generators from this ring. """ indices = set(map(self.index, gens)) symbols = [ s for i, s in enumerate(self.symbols) if i not in indices ] if not symbols: return self.domain else: return self.clone(symbols=symbols) def __getitem__(self, key): symbols = self.symbols[key] if not symbols: return self.domain else: return self.clone(symbols=symbols) def to_ground(self): # TODO: should AlgebraicField be a Composite domain? if self.domain.is_Composite or hasattr(self.domain, 'domain'): return self.clone(domain=self.domain.domain) else: raise ValueError("%s is not a composite domain" % self.domain) def to_domain(self): return PolynomialRing(self) def to_field(self): from sympy.polys.fields import FracField return FracField(self.symbols, self.domain, self.order) @property def is_univariate(self): return len(self.gens) == 1 @property def is_multivariate(self): return len(self.gens) > 1 def add(self, objs): """ Add a sequence of polynomials or containers of polynomials. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> R, x = ring("x", ZZ) >>> R.add([ x2 + 2i + 3 for i in range(4) ]) 4x2 + 24 >>> _.factor_list() (4, [(x2 + 6, 1)]) """ p = self.zero for obj in objs: if is_sequence(obj, include=GeneratorType): p += self.add(obj) else: p += obj return p def mul(self, objs): """ Multiply a sequence of polynomials or containers of polynomials. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> R, x = ring("x", ZZ) >>> R.mul([ x2 + 2i + 3 for i in range(4) ]) x*8 + 24x*6 + 206x*4 + 744x2 + 945 >>> _.factor_list() (1, [(x2 + 3, 1), (x2 + 5, 1), (x2 + 7, 1), (x*2 + 9, 1)]) """ p = self.one for obj in objs: if is_sequence(obj, include=GeneratorType): p = self.mul(obj) else: p = obj return p def drop_to_ground(self, gens): r""" Remove specified generators from the ring and inject them into its domain. """ indices = set(map(self.index, gens)) symbols = [s for i, s in enumerate(self.symbols) if i not in indices] gens = [gen for i, gen in enumerate(self.gens) if i not in indices] if not symbols: return self else: return self.clone(symbols=symbols, domain=self.drop(gens)) def compose(self, other): """Add the generators of ``other`` to ``self``""" if self != other: syms = set(self.symbols).union(set(other.symbols)) return self.clone(symbols=list(syms)) else: return self def add_gens(self, symbols): """Add the elements of ``symbols`` as generators to ``self``""" syms = set(self.symbols).union(set(symbols)) return self.clone(symbols=list(syms)) class PolyElement(DomainElement, DefaultPrinting, CantSympify, dict): """Element of multivariate distributed polynomial ring. """ def new(self, init): return self.__class__(init) def parent(self): return self.ring.to_domain() def __getnewargs__(self): return (self.ring, list(self.iterterms())) _hash = None def __hash__(self): # XXX: This computes a hash of a dictionary, but currently we don't # protect dictionary from being changed so any use site modifications # will make hashing go wrong. Use this feature with caution until we # figure out how to make a safe API without compromising speed of this # low-level class. _hash = self._hash if _hash is None: self._hash = _hash = hash((self.ring, frozenset(self.items()))) return _hash def copy(self): """Return a copy of polynomial self. Polynomials are mutable; if one is interested in preserving a polynomial, and one plans to use inplace operations, one can copy the polynomial. This method makes a shallow copy. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> R, x, y = ring('x, y', ZZ) >>> p = (x + y)2 >>> p1 = p.copy() >>> p2 = p >>> p[R.zero_monom] = 3 >>> p x2 + 2xy + y2 + 3 >>> p1 x2 + 2xy + y2 >>> p2 x2 + 2xy + y*2 + 3 """ return self.new(self) def set_ring(self, new_ring): if self.ring == new_ring: return self elif self.ring.symbols != new_ring.symbols: terms = list(zip(_dict_reorder(self, self.ring.symbols, new_ring.symbols))) return new_ring.from_terms(terms) else: return new_ring.from_dict(self) def as_expr(self, symbols): if symbols and len(symbols) != self.ring.ngens: raise ValueError("not enough symbols, expected %s got %s" % (self.ring.ngens, len(symbols))) else: symbols = self.ring.symbols return expr_from_dict(self.as_expr_dict(), symbols) def as_expr_dict(self): to_sympy = self.ring.domain.to_sympy return {monom: to_sympy(coeff) for monom, coeff in self.iterterms()} def clear_denoms(self): domain = self.ring.domain if not domain.is_Field or not domain.has_assoc_Ring: return domain.one, self ground_ring = domain.get_ring() common = ground_ring.one lcm = ground_ring.lcm denom = domain.denom for coeff in self.values(): common = lcm(common, denom(coeff)) poly = self.new([ (k, vcommon) for k, v in self.items() ]) return common, poly def strip_zero(self): """Eliminate monomials with zero coefficient. """ for k, v in list(self.items()): if not v: del self[k] def __eq__(p1, p2): """Equality test for polynomials. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', ZZ) >>> p1 = (x + y)2 + (x - y)2 >>> p1 == 4xy False >>> p1 == 2(x2 + y2) True """ if not p2: return not p1 elif isinstance(p2, PolyElement) and p2.ring == p1.ring: return dict.__eq__(p1, p2) elif len(p1) > 1: return False else: return p1.get(p1.ring.zero_monom) == p2 def __ne__(p1, p2): return not p1 == p2 def almosteq(p1, p2, tolerance=None): """Approximate equality test for polynomials. """ ring = p1.ring if isinstance(p2, ring.dtype): if set(p1.keys()) != set(p2.keys()): return False almosteq = ring.domain.almosteq for k in p1.keys(): if not almosteq(p1[k], p2[k], tolerance): return False return True elif len(p1) > 1: return False else: try: p2 = ring.domain.convert(p2) except CoercionFailed: return False else: return ring.domain.almosteq(p1.const(), p2, tolerance) def sort_key(self): return (len(self), self.terms()) def _cmp(p1, p2, op): if isinstance(p2, p1.ring.dtype): return op(p1.sort_key(), p2.sort_key()) else: return NotImplemented def __lt__(p1, p2): return p1._cmp(p2, lt) def __le__(p1, p2): return p1._cmp(p2, le) def __gt__(p1, p2): return p1._cmp(p2, gt) def __ge__(p1, p2): return p1._cmp(p2, ge) def _drop(self, gen): ring = self.ring i = ring.index(gen) if ring.ngens == 1: return i, ring.domain else: symbols = list(ring.symbols) del symbols[i] return i, ring.clone(symbols=symbols) def drop(self, gen): i, ring = self._drop(gen) if self.ring.ngens == 1: if self.is_ground: return self.coeff(1) else: raise ValueError("can't drop %s" % gen) else: poly = ring.zero for k, v in self.items(): if k[i] == 0: K = list(k) del K[i] poly[tuple(K)] = v else: raise ValueError("can't drop %s" % gen) return poly def _drop_to_ground(self, gen): ring = self.ring i = ring.index(gen) symbols = list(ring.symbols) del symbols[i] return i, ring.clone(symbols=symbols, domain=ring[i]) def drop_to_ground(self, gen): if self.ring.ngens == 1: raise ValueError("can't drop only generator to ground") i, ring = self._drop_to_ground(gen) poly = ring.zero gen = ring.domain.gens[0] for monom, coeff in self.iterterms(): mon = monom[:i] + monom[i+1:] if not mon in poly: poly[mon] = (genmonom[i]).mul_ground(coeff) else: poly[mon] += (genmonom[i]).mul_ground(coeff) return poly def to_dense(self): return dmp_from_dict(self, self.ring.ngens-1, self.ring.domain) def to_dict(self): return dict(self) def str(self, printer, precedence, exp_pattern, mul_symbol): if not self: return printer._print(self.ring.domain.zero) prec_mul = precedence["Mul"] prec_atom = precedence["Atom"] ring = self.ring symbols = ring.symbols ngens = ring.ngens zm = ring.zero_monom sexpvs = [] for expv, coeff in self.terms(): positive = ring.domain.is_positive(coeff) sign = " + " if positive else " - " sexpvs.append(sign) if expv == zm: scoeff = printer._print(coeff) if scoeff.startswith("-"): scoeff = scoeff[1:] else: if not positive: coeff = -coeff if coeff != 1: scoeff = printer.parenthesize(coeff, prec_mul, strict=True) else: scoeff = '' sexpv = [] for i in range(ngens): exp = expv[i] if not exp: continue symbol = printer.parenthesize(symbols[i], prec_atom, strict=True) if exp != 1: if exp != int(exp) or exp < 0: sexp = printer.parenthesize(exp, prec_atom, strict=False) else: sexp = exp sexpv.append(exp_pattern % (symbol, sexp)) else: sexpv.append('%s' % symbol) if scoeff: sexpv = [scoeff] + sexpv sexpvs.append(mul_symbol.join(sexpv)) if sexpvs[0] in [" + ", " - "]: head = sexpvs.pop(0) if head == " - ": sexpvs.insert(0, "-") return "".join(sexpvs) @property def is_generator(self): return self in self.ring._gens_set @property def is_ground(self): return not self or (len(self) == 1 and self.ring.zero_monom in self) @property def is_monomial(self): return not self or (len(self) == 1 and self.LC == 1) @property def is_term(self): return len(self) <= 1 @property def is_negative(self): return self.ring.domain.is_negative(self.LC) @property def is_positive(self): return self.ring.domain.is_positive(self.LC) @property def is_nonnegative(self): return self.ring.domain.is_nonnegative(self.LC) @property def is_nonpositive(self): return self.ring.domain.is_nonpositive(self.LC) @property def is_zero(f): return not f @property def is_one(f): return f == f.ring.one @property def is_monic(f): return f.ring.domain.is_one(f.LC) @property def is_primitive(f): return f.ring.domain.is_one(f.content()) @property def is_linear(f): return all(sum(monom) <= 1 for monom in f.itermonoms()) @property def is_quadratic(f): return all(sum(monom) <= 2 for monom in f.itermonoms()) @property def is_squarefree(f): if not f.ring.ngens: return True return f.ring.dmp_sqf_p(f) @property def is_irreducible(f): if not f.ring.ngens: return True return f.ring.dmp_irreducible_p(f) @property def is_cyclotomic(f): if f.ring.is_univariate: return f.ring.dup_cyclotomic_p(f) else: raise MultivariatePolynomialError("cyclotomic polynomial") def __neg__(self): return self.new([ (monom, -coeff) for monom, coeff in self.iterterms() ]) def __pos__(self): return self def __add__(p1, p2): """Add two polynomials. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', ZZ) >>> (x + y)2 + (x - y)2 2x2 + 2y2 """ if not p2: return p1.copy() ring = p1.ring if isinstance(p2, ring.dtype): p = p1.copy() get = p.get zero = ring.domain.zero for k, v in p2.items(): v = get(k, zero) + v if v: p[k] = v else: del p[k] return p elif isinstance(p2, PolyElement): if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: pass elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: return p2.__radd__(p1) else: return NotImplemented try: cp2 = ring.domain_new(p2) except CoercionFailed: return NotImplemented else: p = p1.copy() if not cp2: return p zm = ring.zero_monom if zm not in p1.keys(): p[zm] = cp2 else: if p2 == -p[zm]: del p[zm] else: p[zm] += cp2 return p def __radd__(p1, n): p = p1.copy() if not n: return p ring = p1.ring try: n = ring.domain_new(n) except CoercionFailed: return NotImplemented else: zm = ring.zero_monom if zm not in p1.keys(): p[zm] = n else: if n == -p[zm]: del p[zm] else: p[zm] += n return p def __sub__(p1, p2): """Subtract polynomial p2 from p1. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', ZZ) >>> p1 = x + y2 >>> p2 = xy + y2 >>> p1 - p2 -xy + x """ if not p2: return p1.copy() ring = p1.ring if isinstance(p2, ring.dtype): p = p1.copy() get = p.get zero = ring.domain.zero for k, v in p2.items(): v = get(k, zero) - v if v: p[k] = v else: del p[k] return p elif isinstance(p2, PolyElement): if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: pass elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: return p2.__rsub__(p1) else: return NotImplemented try: p2 = ring.domain_new(p2) except CoercionFailed: return NotImplemented else: p = p1.copy() zm = ring.zero_monom if zm not in p1.keys(): p[zm] = -p2 else: if p2 == p[zm]: del p[zm] else: p[zm] -= p2 return p def __rsub__(p1, n): """n - p1 with n convertible to the coefficient domain. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', ZZ) >>> p = x + y >>> 4 - p -x - y + 4 """ ring = p1.ring try: n = ring.domain_new(n) except CoercionFailed: return NotImplemented else: p = ring.zero for expv in p1: p[expv] = -p1[expv] p += n return p def __mul__(p1, p2): """Multiply two polynomials. Examples ======== >>> from sympy.polys.domains import QQ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', QQ) >>> p1 = x + y >>> p2 = x - y >>> p1p2 x2 - y2 """ ring = p1.ring p = ring.zero if not p1 or not p2: return p elif isinstance(p2, ring.dtype): get = p.get zero = ring.domain.zero monomial_mul = ring.monomial_mul p2it = list(p2.items()) for exp1, v1 in p1.items(): for exp2, v2 in p2it: exp = monomial_mul(exp1, exp2) p[exp] = get(exp, zero) + v1v2 p.strip_zero() return p elif isinstance(p2, PolyElement): if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: pass elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: return p2.__rmul__(p1) else: return NotImplemented try: p2 = ring.domain_new(p2) except CoercionFailed: return NotImplemented else: for exp1, v1 in p1.items(): v = v1p2 if v: p[exp1] = v return p def __rmul__(p1, p2): """p2 p1 with p2 in the coefficient domain of p1. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', ZZ) >>> p = x + y >>> 4 * p 4x + 4y """ p = p1.ring.zero if not p2: return p try: p2 = p.ring.domain_new(p2) except CoercionFailed: return NotImplemented else: for exp1, v1 in p1.items(): v = p2v1 if v: p[exp1] = v return p def __pow__(self, n): """raise polynomial to power `n` Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', ZZ) >>> p = x + y2 >>> p3 x3 + 3x*2y*2 + 3xy4 + y6 """ ring = self.ring if not n: if self: return ring.one else: raise ValueError("00") elif len(self) == 1: monom, coeff = list(self.items())[0] p = ring.zero if coeff == 1: p[ring.monomial_pow(monom, n)] = coeff else: p[ring.monomial_pow(monom, n)] = coeffn return p # For ring series, we need negative and rational exponent support only # with monomials. n = int(n) if n < 0: raise ValueError("Negative exponent") elif n == 1: return self.copy() elif n == 2: return self.square() elif n == 3: return selfself.square() elif len(self) <= 5: # TODO: use an actual density measure return self._pow_multinomial(n) else: return self._pow_generic(n) def _pow_generic(self, n): p = self.ring.one c = self while True: if n & 1: p = pc n -= 1 if not n: break c = c.square() n = n // 2 return p def _pow_multinomial(self, n): multinomials = list(multinomial_coefficients(len(self), n).items()) monomial_mulpow = self.ring.monomial_mulpow zero_monom = self.ring.zero_monom terms = list(self.iterterms()) zero = self.ring.domain.zero poly = self.ring.zero for multinomial, multinomial_coeff in multinomials: product_monom = zero_monom product_coeff = multinomial_coeff for exp, (monom, coeff) in zip(multinomial, terms): if exp: product_monom = monomial_mulpow(product_monom, monom, exp) product_coeff = coeffexp monom = tuple(product_monom) coeff = product_coeff coeff = poly.get(monom, zero) + coeff if coeff: poly[monom] = coeff else: del poly[monom] return poly def square(self): """square of a polynomial Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring('x, y', ZZ) >>> p = x + y2 >>> p.square() x*2 + 2xy2 + y4 """ ring = self.ring p = ring.zero get = p.get keys = list(self.keys()) zero = ring.domain.zero monomial_mul = ring.monomial_mul for i in range(len(keys)): k1 = keys[i] pk = self[k1] for j in range(i): k2 = keys[j] exp = monomial_mul(k1, k2) p[exp] = get(exp, zero) + pkself[k2] p = p.imul_num(2) get = p.get for k, v in self.items(): k2 = monomial_mul(k, k) p[k2] = get(k2, zero) + v*2 p.strip_zero() return p def __divmod__(p1, p2): ring = p1.ring if not p2: raise ZeroDivisionError("polynomial division") elif isinstance(p2, ring.dtype): return p1.div(p2) elif isinstance(p2, PolyElement): if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: pass elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: return p2.__rdivmod__(p1) else: return NotImplemented try: p2 = ring.domain_new(p2) except CoercionFailed: return NotImplemented else: return (p1.quo_ground(p2), p1.rem_ground(p2)) def __rdivmod__(p1, p2): return NotImplemented def __mod__(p1, p2): ring = p1.ring if not p2: raise ZeroDivisionError("polynomial division") elif isinstance(p2, ring.dtype): return p1.rem(p2) elif isinstance(p2, PolyElement): if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: pass elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: return p2.__rmod__(p1) else: return NotImplemented try: p2 = ring.domain_new(p2) except CoercionFailed: return NotImplemented else: return p1.rem_ground(p2) def __rmod__(p1, p2): return NotImplemented def __truediv__(p1, p2): ring = p1.ring if not p2: raise ZeroDivisionError("polynomial division") elif isinstance(p2, ring.dtype): if p2.is_monomial: return p1(p2*(-1)) else: return p1.quo(p2) elif isinstance(p2, PolyElement): if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: pass elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: return p2.__rtruediv__(p1) else: return NotImplemented try: p2 = ring.domain_new(p2) except CoercionFailed: return NotImplemented else: return p1.quo_ground(p2) def __rtruediv__(p1, p2): return NotImplemented __floordiv__ = __div__ = __truediv__ __rfloordiv__ = __rdiv__ = __rtruediv__ # TODO: use // (__floordiv__) for exquo()? def _term_div(self): zm = self.ring.zero_monom domain = self.ring.domain domain_quo = domain.quo monomial_div = self.ring.monomial_div if domain.is_Field: def term_div(a_lm_a_lc, b_lm_b_lc): a_lm, a_lc = a_lm_a_lc b_lm, b_lc = b_lm_b_lc if b_lm == zm: # apparently this is a very common case monom = a_lm else: monom = monomial_div(a_lm, b_lm) if monom is not None: return monom, domain_quo(a_lc, b_lc) else: return None else: def term_div(a_lm_a_lc, b_lm_b_lc): a_lm, a_lc = a_lm_a_lc b_lm, b_lc = b_lm_b_lc if b_lm == zm: # apparently this is a very common case monom = a_lm else: monom = monomial_div(a_lm, b_lm) if not (monom is None or a_lc % b_lc): return monom, domain_quo(a_lc, b_lc) else: return None return term_div def div(self, fv): """Division algorithm, see [CLO] p64. fv array of polynomials return qv, r such that self = sum(fv[i]qv[i]) + r All polynomials are required not to be Laurent polynomials. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring('x, y', ZZ) >>> f = x3 >>> f0 = x - y2 >>> f1 = x - y >>> qv, r = f.div((f0, f1)) >>> qv[0] x*2 + xy2 + y4 >>> qv[1] 0 >>> r y*6 """ ring = self.ring ret_single = False if isinstance(fv, PolyElement): ret_single = True fv = [fv] if any(not f for f in fv): raise ZeroDivisionError("polynomial division") if not self: if ret_single: return ring.zero, ring.zero else: return [], ring.zero for f in fv: if f.ring != ring: raise ValueError('self and f must have the same ring') s = len(fv) qv = [ring.zero for i in range(s)] p = self.copy() r = ring.zero term_div = self._term_div() expvs = [fx.leading_expv() for fx in fv] while p: i = 0 divoccurred = 0 while i < s and divoccurred == 0: expv = p.leading_expv() term = term_div((expv, p[expv]), (expvs[i], fv[i][expvs[i]])) if term is not None: expv1, c = term qv[i] = qv[i]._iadd_monom((expv1, c)) p = p._iadd_poly_monom(fv[i], (expv1, -c)) divoccurred = 1 else: i += 1 if not divoccurred: expv = p.leading_expv() r = r._iadd_monom((expv, p[expv])) del p[expv] if expv == ring.zero_monom: r += p if ret_single: if not qv: return ring.zero, r else: return qv[0], r else: return qv, r def rem(self, G): f = self if isinstance(G, PolyElement): G = [G] if any(not g for g in G): raise ZeroDivisionError("polynomial division") ring = f.ring domain = ring.domain zero = domain.zero monomial_mul = ring.monomial_mul r = ring.zero term_div = f._term_div() ltf = f.LT f = f.copy() get = f.get while f: for g in G: tq = term_div(ltf, g.LT) if tq is not None: m, c = tq for mg, cg in g.iterterms(): m1 = monomial_mul(mg, m) c1 = get(m1, zero) - ccg if not c1: del f[m1] else: f[m1] = c1 ltm = f.leading_expv() if ltm is not None: ltf = ltm, f[ltm] break else: ltm, ltc = ltf if ltm in r: r[ltm] += ltc else: r[ltm] = ltc del f[ltm] ltm = f.leading_expv() if ltm is not None: ltf = ltm, f[ltm] return r def quo(f, G): return f.div(G)[0] def exquo(f, G): q, r = f.div(G) if not r: return q else: raise ExactQuotientFailed(f, G) def _iadd_monom(self, mc): """add to self the monomial coeffx0i0x1*i1... unless self is a generator -- then just return the sum of the two. mc is a tuple, (monom, coeff), where monomial is (i0, i1, ...) Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring('x, y', ZZ) >>> p = x*4 + 2y >>> m = (1, 2) >>> p1 = p._iadd_monom((m, 5)) >>> p1 x*4 + 5xy2 + 2y >>> p1 is p True >>> p = x >>> p1 = p._iadd_monom((m, 5)) >>> p1 5xy*2 + x >>> p1 is p False """ if self in self.ring._gens_set: cpself = self.copy() else: cpself = self expv, coeff = mc c = cpself.get(expv) if c is None: cpself[expv] = coeff else: c += coeff if c: cpself[expv] = c else: del cpself[expv] return cpself def _iadd_poly_monom(self, p2, mc): """add to self the product of (p)(coeffx0i0x1*i1...) unless self is a generator -- then just return the sum of the two. mc is a tuple, (monom, coeff), where monomial is (i0, i1, ...) Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y, z = ring('x, y, z', ZZ) >>> p1 = x*4 + 2y >>> p2 = y + z >>> m = (1, 2, 3) >>> p1 = p1._iadd_poly_monom(p2, (m, 3)) >>> p1 x*4 + 3xy3z*3 + 3xy2z*4 + 2y """ p1 = self if p1 in p1.ring._gens_set: p1 = p1.copy() (m, c) = mc get = p1.get zero = p1.ring.domain.zero monomial_mul = p1.ring.monomial_mul for k, v in p2.items(): ka = monomial_mul(k, m) coeff = get(ka, zero) + vc if coeff: p1[ka] = coeff else: del p1[ka] return p1 def degree(f, x=None): """ The leading degree in ``x`` or the main variable. Note that the degree of 0 is negative infinity (the SymPy object -oo). """ i = f.ring.index(x) if not f: return -oo elif i < 0: return 0 else: return max([ monom[i] for monom in f.itermonoms() ]) def degrees(f): """ A tuple containing leading degrees in all variables. Note that the degree of 0 is negative infinity (the SymPy object -oo) """ if not f: return (-oo,)f.ring.ngens else: return tuple(map(max, list(zip(f.itermonoms())))) def tail_degree(f, x=None): """ The tail degree in ``x`` or the main variable. Note that the degree of 0 is negative infinity (the SymPy object -oo) """ i = f.ring.index(x) if not f: return -oo elif i < 0: return 0 else: return min([ monom[i] for monom in f.itermonoms() ]) def tail_degrees(f): """ A tuple containing tail degrees in all variables. Note that the degree of 0 is negative infinity (the SymPy object -oo) """ if not f: return (-oo,)f.ring.ngens else: return tuple(map(min, list(zip(f.itermonoms())))) def leading_expv(self): """Leading monomial tuple according to the monomial ordering. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y, z = ring('x, y, z', ZZ) >>> p = x4 + x3y + x*2z2 + z7 >>> p.leading_expv() (4, 0, 0) """ if self: return self.ring.leading_expv(self) else: return None def _get_coeff(self, expv): return self.get(expv, self.ring.domain.zero) def coeff(self, element): """ Returns the coefficient that stands next to the given monomial. Parameters ========== element : PolyElement (with ``is_monomial = True``) or 1 Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y, z = ring("x,y,z", ZZ) >>> f = 3x2y - xyz + 7z3 + 23 >>> f.coeff(x2y) 3 >>> f.coeff(xy) 0 >>> f.coeff(1) 23 """ if element == 1: return self._get_coeff(self.ring.zero_monom) elif isinstance(element, self.ring.dtype): terms = list(element.iterterms()) if len(terms) == 1: monom, coeff = terms[0] if coeff == self.ring.domain.one: return self._get_coeff(monom) raise ValueError("expected a monomial, got %s" % element) def const(self): """Returns the constant coeffcient. """ return self._get_coeff(self.ring.zero_monom) @property def LC(self): return self._get_coeff(self.leading_expv()) @property def LM(self): expv = self.leading_expv() if expv is None: return self.ring.zero_monom else: return expv def leading_monom(self): """ Leading monomial as a polynomial element. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring('x, y', ZZ) >>> (3xy + y2).leading_monom() xy """ p = self.ring.zero expv = self.leading_expv() if expv: p[expv] = self.ring.domain.one return p @property def LT(self): expv = self.leading_expv() if expv is None: return (self.ring.zero_monom, self.ring.domain.zero) else: return (expv, self._get_coeff(expv)) def leading_term(self): """Leading term as a polynomial element. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring('x, y', ZZ) >>> (3xy + y*2).leading_term() 3xy """ p = self.ring.zero expv = self.leading_expv() if expv is not None: p[expv] = self[expv] return p def _sorted(self, seq, order): if order is None: order = self.ring.order else: order = OrderOpt.preprocess(order) if order is lex: return sorted(seq, key=lambda monom: monom[0], reverse=True) else: return sorted(seq, key=lambda monom: order(monom[0]), reverse=True) def coeffs(self, order=None): """Ordered list of polynomial coefficients. Parameters ========== order : :class:`Order` or coercible, optional Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex, grlex >>> _, x, y = ring("x, y", ZZ, lex) >>> f = xy*7 + 2x*2y*3 >>> f.coeffs() [2, 1] >>> f.coeffs(grlex) [1, 2] """ return [ coeff for _, coeff in self.terms(order) ] def monoms(self, order=None): """Ordered list of polynomial monomials. Parameters ========== order : :class:`Order` or coercible, optional Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex, grlex >>> _, x, y = ring("x, y", ZZ, lex) >>> f = xy*7 + 2x*2y*3 >>> f.monoms() [(2, 3), (1, 7)] >>> f.monoms(grlex) [(1, 7), (2, 3)] """ return [ monom for monom, _ in self.terms(order) ] def terms(self, order=None): """Ordered list of polynomial terms. Parameters ========== order : :class:`Order` or coercible, optional Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex, grlex >>> _, x, y = ring("x, y", ZZ, lex) >>> f = xy*7 + 2x*2y3 >>> f.terms() [((2, 3), 2), ((1, 7), 1)] >>> f.terms(grlex) [((1, 7), 1), ((2, 3), 2)] """ return self._sorted(list(self.items()), order) def itercoeffs(self): """Iterator over coefficients of a polynomial. """ return iter(self.values()) def itermonoms(self): """Iterator over monomials of a polynomial. """ return iter(self.keys()) def iterterms(self): """Iterator over terms of a polynomial. """ return iter(self.items()) def listcoeffs(self): """Unordered list of polynomial coefficients. """ return list(self.values()) def listmonoms(self): """Unordered list of polynomial monomials. """ return list(self.keys()) def listterms(self): """Unordered list of polynomial terms. """ return list(self.items()) def imul_num(p, c): """multiply inplace the polynomial p by an element in the coefficient ring, provided p is not one of the generators; else multiply not inplace Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring('x, y', ZZ) >>> p = x + y2 >>> p1 = p.imul_num(3) >>> p1 3x + 3y*2 >>> p1 is p True >>> p = x >>> p1 = p.imul_num(3) >>> p1 3x >>> p1 is p False """ if p in p.ring._gens_set: return pc if not c: p.clear() return for exp in p: p[exp] = c return p def content(f): """Returns GCD of polynomial's coefficients. """ domain = f.ring.domain cont = domain.zero gcd = domain.gcd for coeff in f.itercoeffs(): cont = gcd(cont, coeff) return cont def primitive(f): """Returns content and a primitive polynomial. """ cont = f.content() return cont, f.quo_ground(cont) def monic(f): """Divides all coefficients by the leading coefficient. """ if not f: return f else: return f.quo_ground(f.LC) def mul_ground(f, x): if not x: return f.ring.zero terms = [ (monom, coeffx) for monom, coeff in f.iterterms() ] return f.new(terms) def mul_monom(f, monom): monomial_mul = f.ring.monomial_mul terms = [ (monomial_mul(f_monom, monom), f_coeff) for f_monom, f_coeff in f.items() ] return f.new(terms) def mul_term(f, term): monom, coeff = term if not f or not coeff: return f.ring.zero elif monom == f.ring.zero_monom: return f.mul_ground(coeff) monomial_mul = f.ring.monomial_mul terms = [ (monomial_mul(f_monom, monom), f_coeffcoeff) for f_monom, f_coeff in f.items() ] return f.new(terms) def quo_ground(f, x): domain = f.ring.domain if not x: raise ZeroDivisionError('polynomial division') if not f or x == domain.one: return f if domain.is_Field: quo = domain.quo terms = [ (monom, quo(coeff, x)) for monom, coeff in f.iterterms() ] else: terms = [ (monom, coeff // x) for monom, coeff in f.iterterms() if not (coeff % x) ] return f.new(terms) def quo_term(f, term): monom, coeff = term if not coeff: raise ZeroDivisionError("polynomial division") elif not f: return f.ring.zero elif monom == f.ring.zero_monom: return f.quo_ground(coeff) term_div = f._term_div() terms = [ term_div(t, term) for t in f.iterterms() ] return f.new([ t for t in terms if t is not None ]) def trunc_ground(f, p): if f.ring.domain.is_ZZ: terms = [] for monom, coeff in f.iterterms(): coeff = coeff % p if coeff > p // 2: coeff = coeff - p terms.append((monom, coeff)) else: terms = [ (monom, coeff % p) for monom, coeff in f.iterterms() ] poly = f.new(terms) poly.strip_zero() return poly rem_ground = trunc_ground def extract_ground(self, g): f = self fc = f.content() gc = g.content() gcd = f.ring.domain.gcd(fc, gc) f = f.quo_ground(gcd) g = g.quo_ground(gcd) return gcd, f, g def _norm(f, norm_func): if not f: return f.ring.domain.zero else: ground_abs = f.ring.domain.abs return norm_func([ ground_abs(coeff) for coeff in f.itercoeffs() ]) def max_norm(f): return f._norm(max) def l1_norm(f): return f._norm(sum) def deflate(f, G): ring = f.ring polys = [f] + list(G) J = [0]ring.ngens for p in polys: for monom in p.itermonoms(): for i, m in enumerate(monom): J[i] = igcd(J[i], m) for i, b in enumerate(J): if not b: J[i] = 1 J = tuple(J) if all(b == 1 for b in J): return J, polys H = [] for p in polys: h = ring.zero for I, coeff in p.iterterms(): N = [ i // j for i, j in zip(I, J) ] h[tuple(N)] = coeff H.append(h) return J, H def inflate(f, J): poly = f.ring.zero for I, coeff in f.iterterms(): N = [ ij for i, j in zip(I, J) ] poly[tuple(N)] = coeff return poly def lcm(self, g): f = self domain = f.ring.domain if not domain.is_Field: fc, f = f.primitive() gc, g = g.primitive() c = domain.lcm(fc, gc) h = (fg).quo(f.gcd(g)) if not domain.is_Field: return h.mul_ground(c) else: return h.monic() def gcd(f, g): return f.cofactors(g)[0] def cofactors(f, g): if not f and not g: zero = f.ring.zero return zero, zero, zero elif not f: h, cff, cfg = f._gcd_zero(g) return h, cff, cfg elif not g: h, cfg, cff = g._gcd_zero(f) return h, cff, cfg elif len(f) == 1: h, cff, cfg = f._gcd_monom(g) return h, cff, cfg elif len(g) == 1: h, cfg, cff = g._gcd_monom(f) return h, cff, cfg J, (f, g) = f.deflate(g) h, cff, cfg = f._gcd(g) return (h.inflate(J), cff.inflate(J), cfg.inflate(J)) def _gcd_zero(f, g): one, zero = f.ring.one, f.ring.zero if g.is_nonnegative: return g, zero, one else: return -g, zero, -one def _gcd_monom(f, g): ring = f.ring ground_gcd = ring.domain.gcd ground_quo = ring.domain.quo monomial_gcd = ring.monomial_gcd monomial_ldiv = ring.monomial_ldiv mf, cf = list(f.iterterms())[0] _mgcd, _cgcd = mf, cf for mg, cg in g.iterterms(): _mgcd = monomial_gcd(_mgcd, mg) _cgcd = ground_gcd(_cgcd, cg) h = f.new([(_mgcd, _cgcd)]) cff = f.new([(monomial_ldiv(mf, _mgcd), ground_quo(cf, _cgcd))]) cfg = f.new([(monomial_ldiv(mg, _mgcd), ground_quo(cg, _cgcd)) for mg, cg in g.iterterms()]) return h, cff, cfg def _gcd(f, g): ring = f.ring if ring.domain.is_QQ: return f._gcd_QQ(g) elif ring.domain.is_ZZ: return f._gcd_ZZ(g) else: # TODO: don't use dense representation (port PRS algorithms) return ring.dmp_inner_gcd(f, g) def _gcd_ZZ(f, g): return heugcd(f, g) def _gcd_QQ(self, g): f = self ring = f.ring new_ring = ring.clone(domain=ring.domain.get_ring()) cf, f = f.clear_denoms() cg, g = g.clear_denoms() f = f.set_ring(new_ring) g = g.set_ring(new_ring) h, cff, cfg = f._gcd_ZZ(g) h = h.set_ring(ring) c, h = h.LC, h.monic() cff = cff.set_ring(ring).mul_ground(ring.domain.quo(c, cf)) cfg = cfg.set_ring(ring).mul_ground(ring.domain.quo(c, cg)) return h, cff, cfg def cancel(self, g): """ Cancel common factors in a rational function ``f/g``. Examples ======== >>> from sympy.polys import ring, ZZ >>> R, x,y = ring("x,y", ZZ) >>> (2x2 - 2).cancel(x2 - 2x + 1) (2x + 2, x - 1) """ f = self ring = f.ring if not f: return f, ring.one domain = ring.domain if not (domain.is_Field and domain.has_assoc_Ring): _, p, q = f.cofactors(g) if q.is_negative: p, q = -p, -q else: new_ring = ring.clone(domain=domain.get_ring()) cq, f = f.clear_denoms() cp, g = g.clear_denoms() f = f.set_ring(new_ring) g = g.set_ring(new_ring) _, p, q = f.cofactors(g) _, cp, cq = new_ring.domain.cofactors(cp, cq) p = p.set_ring(ring) q = q.set_ring(ring) p_neg = p.is_negative q_neg = q.is_negative if p_neg and q_neg: p, q = -p, -q elif p_neg: cp, p = -cp, -p elif q_neg: cp, q = -cp, -q p = p.mul_ground(cp) q = q.mul_ground(cq) return p, q def diff(f, x): """Computes partial derivative in ``x``. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring("x,y", ZZ) >>> p = x + x2y*3 >>> p.diff(x) 2xy3 + 1 """ ring = f.ring i = ring.index(x) m = ring.monomial_basis(i) g = ring.zero for expv, coeff in f.iterterms(): if expv[i]: e = ring.monomial_ldiv(expv, m) g[e] = ring.domain_new(coeffexpv[i]) return g def __call__(f, values): if 0 < len(values) <= f.ring.ngens: return f.evaluate(list(zip(f.ring.gens, values))) else: raise ValueError("expected at least 1 and at most %s values, got %s" % (f.ring.ngens, len(values))) def evaluate(self, x, a=None): f = self if isinstance(x, list) and a is None: (X, a), x = x[0], x[1:] f = f.evaluate(X, a) if not x: return f else: x = [ (Y.drop(X), a) for (Y, a) in x ] return f.evaluate(x) ring = f.ring i = ring.index(x) a = ring.domain.convert(a) if ring.ngens == 1: result = ring.domain.zero for (n,), coeff in f.iterterms(): result += coeffa*n return result else: poly = ring.drop(x).zero for monom, coeff in f.iterterms(): n, monom = monom[i], monom[:i] + monom[i+1:] coeff = coeffa*n if monom in poly: coeff = coeff + poly[monom] if coeff: poly[monom] = coeff else: del poly[monom] else: if coeff: poly[monom] = coeff return poly def subs(self, x, a=None): f = self if isinstance(x, list) and a is None: for X, a in x: f = f.subs(X, a) return f ring = f.ring i = ring.index(x) a = ring.domain.convert(a) if ring.ngens == 1: result = ring.domain.zero for (n,), coeff in f.iterterms(): result += coeffa*n return ring.ground_new(result) else: poly = ring.zero for monom, coeff in f.iterterms(): n, monom = monom[i], monom[:i] + (0,) + monom[i+1:] coeff = coeffa*n if monom in poly: coeff = coeff + poly[monom] if coeff: poly[monom] = coeff else: del poly[monom] else: if coeff: poly[monom] = coeff return poly def compose(f, x, a=None): ring = f.ring poly = ring.zero gens_map = dict(list(zip(ring.gens, list(range(ring.ngens))))) if a is not None: replacements = [(x, a)] else: if isinstance(x, list): replacements = list(x) elif isinstance(x, dict): replacements = sorted(list(x.items()), key=lambda k: gens_map[k[0]]) else: raise ValueError("expected a generator, value pair a sequence of such pairs") for k, (x, g) in enumerate(replacements): replacements[k] = (gens_map[x], ring.ring_new(g)) for monom, coeff in f.iterterms(): monom = list(monom) subpoly = ring.one for i, g in replacements: n, monom[i] = monom[i], 0 if n: subpoly = g**n subpoly = subpoly.mul_term((tuple(monom), coeff)) poly += subpoly return poly # TODO: following methods should point to polynomial # representation independent algorithm implementations. def pdiv(f, g): return f.ring.dmp_pdiv(f, g) def prem(f, g): return f.ring.dmp_prem(f, g) def pquo(f, g): return f.ring.dmp_quo(f, g) def pexquo(f, g): return f.ring.dmp_exquo(f, g) def half_gcdex(f, g): return f.ring.dmp_half_gcdex(f, g) def gcdex(f, g): return f.ring.dmp_gcdex(f, g) def subresultants(f, g): return f.ring.dmp_subresultants(f, g) def resultant(f, g): return f.ring.dmp_resultant(f, g) def discriminant(f): return f.ring.dmp_discriminant(f) def decompose(f): if f.ring.is_univariate: return f.ring.dup_decompose(f) else: raise MultivariatePolynomialError("polynomial decomposition") def shift(f, a): if f.ring.is_univariate: return f.ring.dup_shift(f, a) else: raise MultivariatePolynomialError("polynomial shift") def sturm(f): if f.ring.is_univariate: return f.ring.dup_sturm(f) else: raise MultivariatePolynomialError("sturm sequence") def gff_list(f): return f.ring.dmp_gff_list(f) def sqf_norm(f): return f.ring.dmp_sqf_norm(f) def sqf_part(f): return f.ring.dmp_sqf_part(f) def sqf_list(f, all=False): return f.ring.dmp_sqf_list(f, all=all) def factor_list(f): return f.ring.dmp_factor_list(f)
bdd72748461e7533a233ef34ed3168bfa30027c2797b1cb50db7479f3a5e2769	from sympy.simplify import simplify as simp, trigsimp as tsimp from sympy.core.decorators import call_highest_priority, _sympifyit from sympy.core.assumptions import StdFactKB from sympy import factor as fctr, diff as df, Integral from sympy.core import S, Add, Mul, count_ops from sympy.core.expr import Expr class BasisDependent(Expr): """ Super class containing functionality common to vectors and dyadics. Named so because the representation of these quantities in sympy.vector is dependent on the basis they are expressed in. """ @call_highest_priority('__radd__') def __add__(self, other): return self._add_func(self, other) @call_highest_priority('__add__') def __radd__(self, other): return self._add_func(other, self) @call_highest_priority('__rsub__') def __sub__(self, other): return self._add_func(self, -other) @call_highest_priority('__sub__') def __rsub__(self, other): return self._add_func(other, -self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rmul__') def __mul__(self, other): return self._mul_func(self, other) @_sympifyit('other', NotImplemented) @call_highest_priority('__mul__') def __rmul__(self, other): return self._mul_func(other, self) def __neg__(self): return self._mul_func(S(-1), self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rdiv__') def __div__(self, other): return self._div_helper(other) @call_highest_priority('__div__') def __rdiv__(self, other): return TypeError("Invalid divisor for division") __truediv__ = __div__ __rtruediv__ = __rdiv__ def evalf(self, prec=None, options): """ Implements the SymPy evalf routine for this quantity. evalf's documentation ===================== """ vec = self.zero for k, v in self.components.items(): vec += v.evalf(prec, options) * k return vec evalf.__doc__ += Expr.evalf.__doc__ n = evalf def simplify(self, kwargs): """ Implements the SymPy simplify routine for this quantity. simplify's documentation ======================== """ simp_components = [simp(v, kwargs) * k for k, v in self.components.items()] return self._add_func(simp_components) simplify.__doc__ += simp.__doc__ def trigsimp(self, opts): """ Implements the SymPy trigsimp routine, for this quantity. trigsimp's documentation ======================== """ trig_components = [tsimp(v, opts) k for k, v in self.components.items()] return self._add_func(trig_components) trigsimp.__doc__ += tsimp.__doc__ def _eval_simplify(self, kwargs): return self.simplify(kwargs) def _eval_trigsimp(self, opts): return self.trigsimp(opts) def _eval_derivative(self, wrt): return self.diff(wrt) def _eval_Integral(self, symbols, *assumptions): integral_components = [Integral(v, symbols, *assumptions) k for k, v in self.components.items()] return self._add_func(integral_components) def as_numer_denom(self): """ Returns the expression as a tuple wrt the following transformation - expression -> a/b -> a, b """ return self, S.One def factor(self, args, *kwargs): """ Implements the SymPy factor routine, on the scalar parts of a basis-dependent expression. factor's documentation ======================== """ fctr_components = [fctr(v, args, *kwargs) k for k, v in self.components.items()] return self._add_func(fctr_components) factor.__doc__ += fctr.__doc__ def as_coeff_Mul(self, rational=False): """Efficiently extract the coefficient of a product. """ return (S(1), self) def as_coeff_add(self, deps): """Efficiently extract the coefficient of a summation. """ l = [x * self.components[x] for x in self.components] return 0, tuple(l) def diff(self, args, kwargs): """ Implements the SymPy diff routine, for vectors. diff's documentation ======================== """ for x in args: if isinstance(x, BasisDependent): raise TypeError("Invalid arg for differentiation") diff_components = [df(v, args, *kwargs) k for k, v in self.components.items()] return self._add_func(diff_components) diff.__doc__ += df.__doc__ def doit(self, hints): """Calls .doit() on each term in the Dyadic""" doit_components = [self.components[x].doit(hints) x for x in self.components] return self._add_func(doit_components) class BasisDependentAdd(BasisDependent, Add): """ Denotes sum of basis dependent quantities such that they cannot be expressed as base or Mul instances. """ def __new__(cls, args, *options): components = {} # Check each arg and simultaneously learn the components for i, arg in enumerate(args): if not isinstance(arg, cls._expr_type): if isinstance(arg, Mul): arg = cls._mul_func((arg.args)) elif isinstance(arg, Add): arg = cls._add_func((arg.args)) else: raise TypeError(str(arg) + " cannot be interpreted correctly") # If argument is zero, ignore if arg == cls.zero: continue # Else, update components accordingly if hasattr(arg, "components"): for x in arg.components: components[x] = components.get(x, 0) + arg.components[x] temp = list(components.keys()) for x in temp: if components[x] == 0: del components[x] # Handle case of zero vector if len(components) == 0: return cls.zero # Build object newargs = [x components[x] for x in components] obj = super(BasisDependentAdd, cls).__new__(cls, newargs, options) if isinstance(obj, Mul): return cls._mul_func(obj.args) assumptions = {'commutative': True} obj._assumptions = StdFactKB(assumptions) obj._components = components obj._sys = (list(components.keys()))[0]._sys return obj __init__ = Add.__init__ class BasisDependentMul(BasisDependent, Mul): """ Denotes product of base- basis dependent quantity with a scalar. """ def __new__(cls, args, options): from sympy.vector import Cross, Dot, Curl, Gradient count = 0 measure_number = S(1) zeroflag = False extra_args = [] # Determine the component and check arguments # Also keep a count to ensure two vectors aren't # being multiplied for arg in args: if isinstance(arg, cls._zero_func): count += 1 zeroflag = True elif arg == S(0): zeroflag = True elif isinstance(arg, (cls._base_func, cls._mul_func)): count += 1 expr = arg._base_instance measure_number = arg._measure_number elif isinstance(arg, cls._add_func): count += 1 expr = arg elif isinstance(arg, (Cross, Dot, Curl, Gradient)): extra_args.append(arg) else: measure_number = arg # Make sure incompatible types weren't multiplied if count > 1: raise ValueError("Invalid multiplication") elif count == 0: return Mul(args, *options) # Handle zero vector case if zeroflag: return cls.zero # If one of the args was a VectorAdd, return an # appropriate VectorAdd instance if isinstance(expr, cls._add_func): newargs = [cls._mul_func(measure_number, x) for x in expr.args] return cls._add_func(newargs) obj = super(BasisDependentMul, cls).__new__(cls, measure_number, expr._base_instance, extra_args, options) if isinstance(obj, Add): return cls._add_func(obj.args) obj._base_instance = expr._base_instance obj._measure_number = measure_number assumptions = {'commutative': True} obj._assumptions = StdFactKB(assumptions) obj._components = {expr._base_instance: measure_number} obj._sys = expr._base_instance._sys return obj __init__ = Mul.__init__ def __str__(self, printer=None): measure_str = self._measure_number.__str__() if ('(' in measure_str or '-' in measure_str or '+' in measure_str): measure_str = '(' + measure_str + ')' return measure_str + '*' + self._base_instance.__str__(printer) __repr__ = __str__ _sympystr = __str__ class BasisDependentZero(BasisDependent): """ Class to denote a zero basis dependent instance. """ components = {} def __new__(cls): obj = super(BasisDependentZero, cls).__new__(cls) # Pre-compute a specific hash value for the zero vector # Use the same one always obj._hash = tuple([S(0), cls]).__hash__() return obj def __hash__(self): return self._hash @call_highest_priority('__req__') def __eq__(self, other): return isinstance(other, self._zero_func) __req__ = __eq__ @call_highest_priority('__radd__') def __add__(self, other): if isinstance(other, self._expr_type): return other else: raise TypeError("Invalid argument types for addition") @call_highest_priority('__add__') def __radd__(self, other): if isinstance(other, self._expr_type): return other else: raise TypeError("Invalid argument types for addition") @call_highest_priority('__rsub__') def __sub__(self, other): if isinstance(other, self._expr_type): return -other else: raise TypeError("Invalid argument types for subtraction") @call_highest_priority('__sub__') def __rsub__(self, other): if isinstance(other, self._expr_type): return other else: raise TypeError("Invalid argument types for subtraction") def __neg__(self): return self def normalize(self): """ Returns the normalized version of this vector. """ return self def __str__(self, printer=None): return '0' __repr__ = __str__ _sympystr = __str__
7eefac7d77bdf29867a4e55ca2b714e235e906af0c2bcec3a2578513a189748e	from sympy.vector.coordsysrect import CoordSys3D from sympy.vector.deloperator import Del from sympy.vector.scalar import BaseScalar from sympy.vector.vector import Vector, BaseVector from sympy.vector.operators import gradient, curl, divergence from sympy import diff, integrate, S, simplify from sympy.core import sympify from sympy.vector.dyadic import Dyadic def express(expr, system, system2=None, variables=False): """ Global function for 'express' functionality. Re-expresses a Vector, Dyadic or scalar(sympyfiable) in the given coordinate system. If 'variables' is True, then the coordinate variables (base scalars) of other coordinate systems present in the vector/scalar field or dyadic are also substituted in terms of the base scalars of the given system. Parameters ========== expr : Vector/Dyadic/scalar(sympyfiable) The expression to re-express in CoordSys3D 'system' system: CoordSys3D The coordinate system the expr is to be expressed in system2: CoordSys3D The other coordinate system required for re-expression (only for a Dyadic Expr) variables : boolean Specifies whether to substitute the coordinate variables present in expr, in terms of those of parameter system Examples ======== >>> from sympy.vector import CoordSys3D >>> from sympy import Symbol, cos, sin >>> N = CoordSys3D('N') >>> q = Symbol('q') >>> B = N.orient_new_axis('B', q, N.k) >>> from sympy.vector import express >>> express(B.i, N) (cos(q))N.i + (sin(q))N.j >>> express(N.x, B, variables=True) B.xcos(q) - B.ysin(q) >>> d = N.i.outer(N.i) >>> express(d, B, N) == (cos(q))(B.i\|N.i) + (-sin(q))(B.j\|N.i) True """ if expr == 0 or expr == Vector.zero: return expr if not isinstance(system, CoordSys3D): raise TypeError("system should be a CoordSys3D \ instance") if isinstance(expr, Vector): if system2 is not None: raise ValueError("system2 should not be provided for \ Vectors") # Given expr is a Vector if variables: # If variables attribute is True, substitute # the coordinate variables in the Vector system_list = [] for x in expr.atoms(BaseScalar, BaseVector): if x.system != system: system_list.append(x.system) system_list = set(system_list) subs_dict = {} for f in system_list: subs_dict.update(f.scalar_map(system)) expr = expr.subs(subs_dict) # Re-express in this coordinate system outvec = Vector.zero parts = expr.separate() for x in parts: if x != system: temp = system.rotation_matrix(x) * parts[x].to_matrix(x) outvec += matrix_to_vector(temp, system) else: outvec += parts[x] return outvec elif isinstance(expr, Dyadic): if system2 is None: system2 = system if not isinstance(system2, CoordSys3D): raise TypeError("system2 should be a CoordSys3D \ instance") outdyad = Dyadic.zero var = variables for k, v in expr.components.items(): outdyad += (express(v, system, variables=var) * (express(k.args[0], system, variables=var) \| express(k.args[1], system2, variables=var))) return outdyad else: if system2 is not None: raise ValueError("system2 should not be provided for \ Vectors") if variables: # Given expr is a scalar field system_set = set([]) expr = sympify(expr) # Substitute all the coordinate variables for x in expr.atoms(BaseScalar): if x.system != system: system_set.add(x.system) subs_dict = {} for f in system_set: subs_dict.update(f.scalar_map(system)) return expr.subs(subs_dict) return expr def directional_derivative(field, direction_vector): """ Returns the directional derivative of a scalar or vector field computed along a given vector in coordinate system which parameters are expressed. Parameters ========== field : Vector or Scalar The scalar or vector field to compute the directional derivative of direction_vector : Vector The vector to calculated directional derivative along them. Examples ======== >>> from sympy.vector import CoordSys3D, directional_derivative >>> R = CoordSys3D('R') >>> f1 = R.xR.yR.z >>> v1 = 3R.i + 4R.j + R.k >>> directional_derivative(f1, v1) R.xR.y + 4R.xR.z + 3R.yR.z >>> f2 = 5R.x*2R.z >>> directional_derivative(f2, v1) 5R.x2 + 30R.xR.z """ from sympy.vector.operators import _get_coord_sys_from_expr coord_sys = _get_coord_sys_from_expr(field) if len(coord_sys) > 0: # TODO: This gets a random coordinate system in case of multiple ones: coord_sys = next(iter(coord_sys)) field = express(field, coord_sys, variables=True) i, j, k = coord_sys.base_vectors() x, y, z = coord_sys.base_scalars() out = Vector.dot(direction_vector, i) diff(field, x) out += Vector.dot(direction_vector, j) * diff(field, y) out += Vector.dot(direction_vector, k) * diff(field, z) if out == 0 and isinstance(field, Vector): out = Vector.zero return out elif isinstance(field, Vector): return Vector.zero else: return S(0) def laplacian(expr): """ Return the laplacian of the given field computed in terms of the base scalars of the given coordinate system. Parameters ========== expr : SymPy Expr or Vector expr denotes a scalar or vector field. Examples ======== >>> from sympy.vector import CoordSys3D, laplacian >>> R = CoordSys3D('R') >>> f = R.x*2R.y*5R.z >>> laplacian(f) 20R.x2R.y*3R.z + 2R.y5R.z >>> f = R.x*2R.i + R.y*3R.j + R.z*4R.k >>> laplacian(f) 2R.i + 6R.yR.j + 12R.z*2R.k """ delop = Del() if expr.is_Vector: return (gradient(divergence(expr)) - curl(curl(expr))).doit() return delop.dot(delop(expr)).doit() def is_conservative(field): """ Checks if a field is conservative. Parameters ========== field : Vector The field to check for conservative property Examples ======== >>> from sympy.vector import CoordSys3D >>> from sympy.vector import is_conservative >>> R = CoordSys3D('R') >>> is_conservative(R.yR.zR.i + R.xR.zR.j + R.xR.yR.k) True >>> is_conservative(R.zR.j) False """ # Field is conservative irrespective of system # Take the first coordinate system in the result of the # separate method of Vector if not isinstance(field, Vector): raise TypeError("field should be a Vector") if field == Vector.zero: return True return curl(field).simplify() == Vector.zero def is_solenoidal(field): """ Checks if a field is solenoidal. Parameters ========== field : Vector The field to check for solenoidal property Examples ======== >>> from sympy.vector import CoordSys3D >>> from sympy.vector import is_solenoidal >>> R = CoordSys3D('R') >>> is_solenoidal(R.yR.zR.i + R.xR.zR.j + R.xR.yR.k) True >>> is_solenoidal(R.y R.j) False """ # Field is solenoidal irrespective of system # Take the first coordinate system in the result of the # separate method in Vector if not isinstance(field, Vector): raise TypeError("field should be a Vector") if field == Vector.zero: return True return divergence(field).simplify() == S(0) def scalar_potential(field, coord_sys): """ Returns the scalar potential function of a field in a given coordinate system (without the added integration constant). Parameters ========== field : Vector The vector field whose scalar potential function is to be calculated coord_sys : CoordSys3D The coordinate system to do the calculation in Examples ======== >>> from sympy.vector import CoordSys3D >>> from sympy.vector import scalar_potential, gradient >>> R = CoordSys3D('R') >>> scalar_potential(R.k, R) == R.z True >>> scalar_field = 2R.x2R.yR.z >>> grad_field = gradient(scalar_field) >>> scalar_potential(grad_field, R) 2R.x*2R.yR.z """ # Check whether field is conservative if not is_conservative(field): raise ValueError("Field is not conservative") if field == Vector.zero: return S(0) # Express the field exntirely in coord_sys # Substitute coordinate variables also if not isinstance(coord_sys, CoordSys3D): raise TypeError("coord_sys must be a CoordSys3D") field = express(field, coord_sys, variables=True) dimensions = coord_sys.base_vectors() scalars = coord_sys.base_scalars() # Calculate scalar potential function temp_function = integrate(field.dot(dimensions[0]), scalars[0]) for i, dim in enumerate(dimensions[1:]): partial_diff = diff(temp_function, scalars[i + 1]) partial_diff = field.dot(dim) - partial_diff temp_function += integrate(partial_diff, scalars[i + 1]) return temp_function def scalar_potential_difference(field, coord_sys, point1, point2): """ Returns the scalar potential difference between two points in a certain coordinate system, wrt a given field. If a scalar field is provided, its values at the two points are considered. If a conservative vector field is provided, the values of its scalar potential function at the two points are used. Returns (potential at point2) - (potential at point1) The position vectors of the two Points are calculated wrt the origin of the coordinate system provided. Parameters ========== field : Vector/Expr The field to calculate wrt coord_sys : CoordSys3D The coordinate system to do the calculations in point1 : Point The initial Point in given coordinate system position2 : Point The second Point in the given coordinate system Examples ======== >>> from sympy.vector import CoordSys3D, Point >>> from sympy.vector import scalar_potential_difference >>> R = CoordSys3D('R') >>> P = R.origin.locate_new('P', R.xR.i + R.yR.j + R.zR.k) >>> vectfield = 4R.xR.yR.i + 2R.x*2R.j >>> scalar_potential_difference(vectfield, R, R.origin, P) 2R.x2R.y >>> Q = R.origin.locate_new('O', 3R.i + R.j + 2R.k) >>> scalar_potential_difference(vectfield, R, P, Q) -2R.x2R.y + 18 """ if not isinstance(coord_sys, CoordSys3D): raise TypeError("coord_sys must be a CoordSys3D") if isinstance(field, Vector): # Get the scalar potential function scalar_fn = scalar_potential(field, coord_sys) else: # Field is a scalar scalar_fn = field # Express positions in required coordinate system origin = coord_sys.origin position1 = express(point1.position_wrt(origin), coord_sys, variables=True) position2 = express(point2.position_wrt(origin), coord_sys, variables=True) # Get the two positions as substitution dicts for coordinate variables subs_dict1 = {} subs_dict2 = {} scalars = coord_sys.base_scalars() for i, x in enumerate(coord_sys.base_vectors()): subs_dict1[scalars[i]] = x.dot(position1) subs_dict2[scalars[i]] = x.dot(position2) return scalar_fn.subs(subs_dict2) - scalar_fn.subs(subs_dict1) def matrix_to_vector(matrix, system): """ Converts a vector in matrix form to a Vector instance. It is assumed that the elements of the Matrix represent the measure numbers of the components of the vector along basis vectors of 'system'. Parameters ========== matrix : SymPy Matrix, Dimensions: (3, 1) The matrix to be converted to a vector system : CoordSys3D The coordinate system the vector is to be defined in Examples ======== >>> from sympy import ImmutableMatrix as Matrix >>> m = Matrix([1, 2, 3]) >>> from sympy.vector import CoordSys3D, matrix_to_vector >>> C = CoordSys3D('C') >>> v = matrix_to_vector(m, C) >>> v C.i + 2C.j + 3C.k >>> v.to_matrix(C) == m True """ outvec = Vector.zero vects = system.base_vectors() for i, x in enumerate(matrix): outvec += x * vects[i] return outvec def _path(from_object, to_object): """ Calculates the 'path' of objects starting from 'from_object' to 'to_object', along with the index of the first common ancestor in the tree. Returns (index, list) tuple. """ if from_object._root != to_object._root: raise ValueError("No connecting path found between " + str(from_object) + " and " + str(to_object)) other_path = [] obj = to_object while obj._parent is not None: other_path.append(obj) obj = obj._parent other_path.append(obj) object_set = set(other_path) from_path = [] obj = from_object while obj not in object_set: from_path.append(obj) obj = obj._parent index = len(from_path) i = other_path.index(obj) while i >= 0: from_path.append(other_path[i]) i -= 1 return index, from_path def orthogonalize(vlist, kwargs): """ Takes a sequence of independent vectors and orthogonalizes them using the Gram - Schmidt process. Returns a list of orthogonal or orthonormal vectors. Parameters ========== vlist : sequence of independent vectors to be made orthogonal. orthonormal : Optional parameter Set to True if the vectors returned should be orthonormal. Default: False Examples ======== >>> from sympy.vector.coordsysrect import CoordSys3D >>> from sympy.vector.vector import Vector, BaseVector >>> from sympy.vector.functions import orthogonalize >>> C = CoordSys3D('C') >>> i, j, k = C.base_vectors() >>> v1 = i + 2j >>> v2 = 2i + 3j >>> orthogonalize(v1, v2) [C.i + 2C.j, 2/5C.i + (-1/5)*C.j] References ========== .. [1] https://en.wikipedia.org/wiki/Gram-Schmidt_process """ orthonormal = kwargs.get('orthonormal', False) if not all(isinstance(vec, Vector) for vec in vlist): raise TypeError('Each element must be of Type Vector') ortho_vlist = [] for i, term in enumerate(vlist): for j in range(i): term -= ortho_vlist[j].projection(vlist[i]) # TODO : The following line introduces a performance issue # and needs to be changed once a good solution for issue #10279 is # found. if simplify(term).equals(Vector.zero): raise ValueError("Vector set not linearly independent") ortho_vlist.append(term) if orthonormal: ortho_vlist = [vec.normalize() for vec in ortho_vlist] return ortho_vlist
2f92572010381bcd08bba00d4f084cc9dd1253904aa91b9a9481a8eb4b2bf0c5	"""The definition of the base geometrical entity with attributes common to all derived geometrical entities. Contains ======== GeometryEntity GeometricSet Notes ===== A GeometryEntity is any object that has special geometric properties. A GeometrySet is a superclass of any GeometryEntity that can also be viewed as a sympy.sets.Set. In particular, points are the only GeometryEntity not considered a Set. Rn is a GeometrySet representing n-dimensional Euclidean space. R2 and R3 are currently the only ambient spaces implemented. """ from __future__ import division, print_function from sympy.core.basic import Basic from sympy.core.compatibility import is_sequence from sympy.core.containers import Tuple from sympy.core.sympify import sympify from sympy.functions import cos, sin from sympy.matrices import eye from sympy.multipledispatch import dispatch from sympy.sets import Set from sympy.sets.handlers.intersection import intersection_sets from sympy.sets.handlers.union import union_sets from sympy.utilities.misc import func_name # How entities are ordered; used by __cmp__ in GeometryEntity ordering_of_classes = [ "Point2D", "Point3D", "Point", "Segment2D", "Ray2D", "Line2D", "Segment3D", "Line3D", "Ray3D", "Segment", "Ray", "Line", "Plane", "Triangle", "RegularPolygon", "Polygon", "Circle", "Ellipse", "Curve", "Parabola" ] class GeometryEntity(Basic): """The base class for all geometrical entities. This class doesn't represent any particular geometric entity, it only provides the implementation of some methods common to all subclasses. """ def __cmp__(self, other): """Comparison of two GeometryEntities.""" n1 = self.__class__.__name__ n2 = other.__class__.__name__ c = (n1 > n2) - (n1 < n2) if not c: return 0 i1 = -1 for cls in self.__class__.__mro__: try: i1 = ordering_of_classes.index(cls.__name__) break except ValueError: i1 = -1 if i1 == -1: return c i2 = -1 for cls in other.__class__.__mro__: try: i2 = ordering_of_classes.index(cls.__name__) break except ValueError: i2 = -1 if i2 == -1: return c return (i1 > i2) - (i1 < i2) def __contains__(self, other): """Subclasses should implement this method for anything more complex than equality.""" if type(self) == type(other): return self == other raise NotImplementedError() def __getnewargs__(self): """Returns a tuple that will be passed to __new__ on unpickling.""" return tuple(self.args) def __ne__(self, o): """Test inequality of two geometrical entities.""" return not self == o def __new__(cls, args, kwargs): # Points are sequences, but they should not # be converted to Tuples, so use this detection function instead. def is_seq_and_not_point(a): # we cannot use isinstance(a, Point) since we cannot import Point if hasattr(a, 'is_Point') and a.is_Point: return False return is_sequence(a) args = [Tuple(a) if is_seq_and_not_point(a) else sympify(a) for a in args] return Basic.__new__(cls, args) def __radd__(self, a): """Implementation of reverse add method.""" return a.__add__(self) def __rdiv__(self, a): """Implementation of reverse division method.""" return a.__div__(self) def __repr__(self): """String representation of a GeometryEntity that can be evaluated by sympy.""" return type(self).__name__ + repr(self.args) def __rmul__(self, a): """Implementation of reverse multiplication method.""" return a.__mul__(self) def __rsub__(self, a): """Implementation of reverse subtraction method.""" return a.__sub__(self) def __str__(self): """String representation of a GeometryEntity.""" from sympy.printing import sstr return type(self).__name__ + sstr(self.args) def _eval_subs(self, old, new): from sympy.geometry.point import Point, Point3D if is_sequence(old) or is_sequence(new): if isinstance(self, Point3D): old = Point3D(old) new = Point3D(new) else: old = Point(old) new = Point(new) return self._subs(old, new) def _repr_svg_(self): """SVG representation of a GeometryEntity suitable for IPython""" from sympy.core.evalf import N try: bounds = self.bounds except (NotImplementedError, TypeError): # if we have no SVG representation, return None so IPython # will fall back to the next representation return None svg_top = '''<svg xmlns="http://www.w3.org/2000/svg" xmlns:xlink="http://www.w3.org/1999/xlink" width="{1}" height="{2}" viewBox="{0}" preserveAspectRatio="xMinYMin meet"> <defs> <marker id="markerCircle" markerWidth="8" markerHeight="8" refx="5" refy="5" markerUnits="strokeWidth"> <circle cx="5" cy="5" r="1.5" style="stroke: none; fill:#000000;"/> </marker> <marker id="markerArrow" markerWidth="13" markerHeight="13" refx="2" refy="4" orient="auto" markerUnits="strokeWidth"> <path d="M2,2 L2,6 L6,4" style="fill: #000000;" /> </marker> <marker id="markerReverseArrow" markerWidth="13" markerHeight="13" refx="6" refy="4" orient="auto" markerUnits="strokeWidth"> <path d="M6,2 L6,6 L2,4" style="fill: #000000;" /> </marker> </defs>''' # Establish SVG canvas that will fit all the data + small space xmin, ymin, xmax, ymax = map(N, bounds) if xmin == xmax and ymin == ymax: # This is a point; buffer using an arbitrary size xmin, ymin, xmax, ymax = xmin - .5, ymin -.5, xmax + .5, ymax + .5 else: # Expand bounds by a fraction of the data ranges expand = 0.1 # or 10%; this keeps arrowheads in view (R plots use 4%) widest_part = max([xmax - xmin, ymax - ymin]) expand_amount = widest_part expand xmin -= expand_amount ymin -= expand_amount xmax += expand_amount ymax += expand_amount dx = xmax - xmin dy = ymax - ymin width = min([max([100., dx]), 300]) height = min([max([100., dy]), 300]) scale_factor = 1. if max(width, height) == 0 else max(dx, dy) / max(width, height) try: svg = self._svg(scale_factor) except (NotImplementedError, TypeError): # if we have no SVG representation, return None so IPython # will fall back to the next representation return None view_box = "{0} {1} {2} {3}".format(xmin, ymin, dx, dy) transform = "matrix(1,0,0,-1,0,{0})".format(ymax + ymin) svg_top = svg_top.format(view_box, width, height) return svg_top + ( '<g transform="{0}">{1}</g></svg>' ).format(transform, svg) def _svg(self, scale_factor=1., fill_color="#66cc99"): """Returns SVG path element for the GeometryEntity. Parameters ========== scale_factor : float Multiplication factor for the SVG stroke-width. Default is 1. fill_color : str, optional Hex string for fill color. Default is "#66cc99". """ raise NotImplementedError() def _sympy_(self): return self @property def ambient_dimension(self): """What is the dimension of the space that the object is contained in?""" raise NotImplementedError() @property def bounds(self): """Return a tuple (xmin, ymin, xmax, ymax) representing the bounding rectangle for the geometric figure. """ raise NotImplementedError() def encloses(self, o): """ Return True if o is inside (not on or outside) the boundaries of self. The object will be decomposed into Points and individual Entities need only define an encloses_point method for their class. See Also ======== sympy.geometry.ellipse.Ellipse.encloses_point sympy.geometry.polygon.Polygon.encloses_point Examples ======== >>> from sympy import RegularPolygon, Point, Polygon >>> t = Polygon(RegularPolygon(Point(0, 0), 1, 3).vertices) >>> t2 = Polygon(RegularPolygon(Point(0, 0), 2, 3).vertices) >>> t2.encloses(t) True >>> t.encloses(t2) False """ from sympy.geometry.point import Point from sympy.geometry.line import Segment, Ray, Line from sympy.geometry.ellipse import Ellipse from sympy.geometry.polygon import Polygon, RegularPolygon if isinstance(o, Point): return self.encloses_point(o) elif isinstance(o, Segment): return all(self.encloses_point(x) for x in o.points) elif isinstance(o, Ray) or isinstance(o, Line): return False elif isinstance(o, Ellipse): return self.encloses_point(o.center) and \ self.encloses_point( Point(o.center.x + o.hradius, o.center.y)) and \ not self.intersection(o) elif isinstance(o, Polygon): if isinstance(o, RegularPolygon): if not self.encloses_point(o.center): return False return all(self.encloses_point(v) for v in o.vertices) raise NotImplementedError() def equals(self, o): return self == o def intersection(self, o): """ Returns a list of all of the intersections of self with o. Notes ===== An entity is not required to implement this method. If two different types of entities can intersect, the item with higher index in ordering_of_classes should implement intersections with anything having a lower index. See Also ======== sympy.geometry.util.intersection """ raise NotImplementedError() def is_similar(self, other): """Is this geometrical entity similar to another geometrical entity? Two entities are similar if a uniform scaling (enlarging or shrinking) of one of the entities will allow one to obtain the other. Notes ===== This method is not intended to be used directly but rather through the `are_similar` function found in util.py. An entity is not required to implement this method. If two different types of entities can be similar, it is only required that one of them be able to determine this. See Also ======== scale """ raise NotImplementedError() def reflect(self, line): """ Reflects an object across a line. Parameters ========== line: Line Examples ======== >>> from sympy import pi, sqrt, Line, RegularPolygon >>> l = Line((0, pi), slope=sqrt(2)) >>> pent = RegularPolygon((1, 2), 1, 5) >>> rpent = pent.reflect(l) >>> rpent RegularPolygon(Point2D(-2sqrt(2)pi/3 - 1/3 + 4sqrt(2)/3, 2/3 + 2sqrt(2)/3 + 2pi/3), -1, 5, -atan(2sqrt(2)) + 3pi/5) >>> from sympy import pi, Line, Circle, Point >>> l = Line((0, pi), slope=1) >>> circ = Circle(Point(0, 0), 5) >>> rcirc = circ.reflect(l) >>> rcirc Circle(Point2D(-pi, pi), -5) """ from sympy import atan, Point, Dummy, oo g = self l = line o = Point(0, 0) if l.slope == 0: y = l.args[0].y if not y: # x-axis return g.scale(y=-1) reps = [(p, p.translate(y=2(y - p.y))) for p in g.atoms(Point)] elif l.slope == oo: x = l.args[0].x if not x: # y-axis return g.scale(x=-1) reps = [(p, p.translate(x=2(x - p.x))) for p in g.atoms(Point)] else: if not hasattr(g, 'reflect') and not all( isinstance(arg, Point) for arg in g.args): raise NotImplementedError( 'reflect undefined or non-Point args in %s' % g) a = atan(l.slope) c = l.coefficients d = -c[-1]/c[1] # y-intercept # apply the transform to a single point x, y = Dummy(), Dummy() xf = Point(x, y) xf = xf.translate(y=-d).rotate(-a, o).scale(y=-1 ).rotate(a, o).translate(y=d) # replace every point using that transform reps = [(p, xf.xreplace({x: p.x, y: p.y})) for p in g.atoms(Point)] return g.xreplace(dict(reps)) def rotate(self, angle, pt=None): """Rotate ``angle`` radians counterclockwise about Point ``pt``. The default pt is the origin, Point(0, 0) See Also ======== scale, translate Examples ======== >>> from sympy import Point, RegularPolygon, Polygon, pi >>> t = Polygon(RegularPolygon(Point(0, 0), 1, 3).vertices) >>> t # vertex on x axis Triangle(Point2D(1, 0), Point2D(-1/2, sqrt(3)/2), Point2D(-1/2, -sqrt(3)/2)) >>> t.rotate(pi/2) # vertex on y axis now Triangle(Point2D(0, 1), Point2D(-sqrt(3)/2, -1/2), Point2D(sqrt(3)/2, -1/2)) """ newargs = [] for a in self.args: if isinstance(a, GeometryEntity): newargs.append(a.rotate(angle, pt)) else: newargs.append(a) return type(self)(newargs) def scale(self, x=1, y=1, pt=None): """Scale the object by multiplying the x,y-coordinates by x and y. If pt is given, the scaling is done relative to that point; the object is shifted by -pt, scaled, and shifted by pt. See Also ======== rotate, translate Examples ======== >>> from sympy import RegularPolygon, Point, Polygon >>> t = Polygon(RegularPolygon(Point(0, 0), 1, 3).vertices) >>> t Triangle(Point2D(1, 0), Point2D(-1/2, sqrt(3)/2), Point2D(-1/2, -sqrt(3)/2)) >>> t.scale(2) Triangle(Point2D(2, 0), Point2D(-1, sqrt(3)/2), Point2D(-1, -sqrt(3)/2)) >>> t.scale(2, 2) Triangle(Point2D(2, 0), Point2D(-1, sqrt(3)), Point2D(-1, -sqrt(3))) """ from sympy.geometry.point import Point if pt: pt = Point(pt, dim=2) return self.translate((-pt).args).scale(x, y).translate(pt.args) return type(self)([a.scale(x, y) for a in self.args]) # if this fails, override this class def translate(self, x=0, y=0): """Shift the object by adding to the x,y-coordinates the values x and y. See Also ======== rotate, scale Examples ======== >>> from sympy import RegularPolygon, Point, Polygon >>> t = Polygon(RegularPolygon(Point(0, 0), 1, 3).vertices) >>> t Triangle(Point2D(1, 0), Point2D(-1/2, sqrt(3)/2), Point2D(-1/2, -sqrt(3)/2)) >>> t.translate(2) Triangle(Point2D(3, 0), Point2D(3/2, sqrt(3)/2), Point2D(3/2, -sqrt(3)/2)) >>> t.translate(2, 2) Triangle(Point2D(3, 2), Point2D(3/2, sqrt(3)/2 + 2), Point2D(3/2, 2 - sqrt(3)/2)) """ newargs = [] for a in self.args: if isinstance(a, GeometryEntity): newargs.append(a.translate(x, y)) else: newargs.append(a) return self.func(newargs) def parameter_value(self, other, t): """Return the parameter corresponding to the given point. Evaluating an arbitrary point of the entity at this parameter value will return the given point. Examples ======== >>> from sympy import Line, Point >>> from sympy.abc import t >>> a = Point(0, 0) >>> b = Point(2, 2) >>> Line(a, b).parameter_value((1, 1), t) {t: 1/2} >>> Line(a, b).arbitrary_point(t).subs(_) Point2D(1, 1) """ from sympy.geometry.point import Point from sympy.core.symbol import Dummy from sympy.solvers.solvers import solve if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if not isinstance(other, Point): raise ValueError("other must be a point") T = Dummy('t', real=True) sol = solve(self.arbitrary_point(T) - other, T, dict=True) if not sol: raise ValueError("Given point is not on %s" % func_name(self)) return {t: sol[0][T]} class GeometrySet(GeometryEntity, Set): """Parent class of all GeometryEntity that are also Sets (compatible with sympy.sets) """ def _contains(self, other): """sympy.sets uses the _contains method, so include it for compatibility.""" if isinstance(other, Set) and other.is_FiniteSet: return all(self.__contains__(i) for i in other) return self.__contains__(other) @dispatch(GeometrySet, Set) def union_sets(self, o): """ Returns the union of self and o for use with sympy.sets.Set, if possible. """ from sympy.sets import Union, FiniteSet # if its a FiniteSet, merge any points # we contain and return a union with the rest if o.is_FiniteSet: other_points = [p for p in o if not self._contains(p)] if len(other_points) == len(o): return None return Union(self, FiniteSet(other_points)) if self._contains(o): return self return None @dispatch(GeometrySet, Set) def intersection_sets(self, o): """ Returns a sympy.sets.Set of intersection objects, if possible. """ from sympy.sets import Set, FiniteSet, Union from sympy.geometry import Point try: # if o is a FiniteSet, find the intersection directly # to avoid infinite recursion if o.is_FiniteSet: inter = FiniteSet((p for p in o if self.contains(p))) else: inter = self.intersection(o) except NotImplementedError: # sympy.sets.Set.reduce expects None if an object # doesn't know how to simplify return None # put the points in a FiniteSet points = FiniteSet([p for p in inter if isinstance(p, Point)]) non_points = [p for p in inter if not isinstance(p, Point)] return Union((non_points + [points])) def translate(x, y): """Return the matrix to translate a 2-D point by x and y.""" rv = eye(3) rv[2, 0] = x rv[2, 1] = y return rv def scale(x, y, pt=None): """Return the matrix to multiply a 2-D point's coordinates by x and y. If pt is given, the scaling is done relative to that point.""" rv = eye(3) rv[0, 0] = x rv[1, 1] = y if pt: from sympy.geometry.point import Point pt = Point(pt, dim=2) tr1 = translate((-pt).args) tr2 = translate(pt.args) return tr1rvtr2 return rv def rotate(th): """Return the matrix to rotate a 2-D point about the origin by ``angle``. The angle is measured in radians. To Point a point about a point other then the origin, translate the Point, do the rotation, and translate it back: >>> from sympy.geometry.entity import rotate, translate >>> from sympy import Point, pi >>> rot_about_11 = translate(-1, -1)rotate(pi/2)translate(1, 1) >>> Point(1, 1).transform(rot_about_11) Point2D(1, 1) >>> Point(0, 0).transform(rot_about_11) Point2D(2, 0) """ s = sin(th) rv = eye(3)cos(th) rv[0, 1] = s rv[1, 0] = -s rv[2, 2] = 1 return rv
72afc33ca6a50d0bcf078d7c4b36ff3a8749d65c02bbd57ca1714e4c4fd3602e	"""Utility functions for geometrical entities. Contains ======== intersection convex_hull closest_points farthest_points are_coplanar are_similar """ from __future__ import division, print_function from sympy import Function, Symbol, solve from sympy.core.compatibility import ( is_sequence, range, string_types, ordered) from sympy.core.containers import OrderedSet from .point import Point, Point2D def find(x, equation): """ Checks whether the parameter 'x' is present in 'equation' or not. If it is present then it returns the passed parameter 'x' as a free symbol, else, it returns a ValueError. """ free = equation.free_symbols xs = [i for i in free if (i.name if isinstance(x, string_types) else i) == x] if not xs: raise ValueError('could not find %s' % x) if len(xs) != 1: raise ValueError('ambiguous %s' % x) return xs[0] def _ordered_points(p): """Return the tuple of points sorted numerically according to args""" return tuple(sorted(p, key=lambda x: x.args)) def are_coplanar(e): """ Returns True if the given entities are coplanar otherwise False Parameters ========== e: entities to be checked for being coplanar Returns ======= Boolean Examples ======== >>> from sympy import Point3D, Line3D >>> from sympy.geometry.util import are_coplanar >>> a = Line3D(Point3D(5, 0, 0), Point3D(1, -1, 1)) >>> b = Line3D(Point3D(0, -2, 0), Point3D(3, 1, 1)) >>> c = Line3D(Point3D(0, -1, 0), Point3D(5, -1, 9)) >>> are_coplanar(a, b, c) False """ from sympy.geometry.line import LinearEntity3D from sympy.geometry.point import Point3D from sympy.geometry.plane import Plane # XXX update tests for coverage e = set(e) # first work with a Plane if present for i in list(e): if isinstance(i, Plane): e.remove(i) return all(p.is_coplanar(i) for p in e) if all(isinstance(i, Point3D) for i in e): if len(e) < 3: return False # remove pts that are collinear with 2 pts a, b = e.pop(), e.pop() for i in list(e): if Point3D.are_collinear(a, b, i): e.remove(i) if not e: return False else: # define a plane p = Plane(a, b, e.pop()) for i in e: if i not in p: return False return True else: pt3d = [] for i in e: if isinstance(i, Point3D): pt3d.append(i) elif isinstance(i, LinearEntity3D): pt3d.extend(i.args) elif isinstance(i, GeometryEntity): # XXX we should have a GeometryEntity3D class so we can tell the difference between 2D and 3D -- here we just want to deal with 2D objects; if new 3D objects are encountered that we didn't handle above, an error should be raised # all 2D objects have some Point that defines them; so convert those points to 3D pts by making z=0 for p in i.args: if isinstance(p, Point): pt3d.append(Point3D((p.args + (0,)))) return are_coplanar(pt3d) def are_similar(e1, e2): """Are two geometrical entities similar. Can one geometrical entity be uniformly scaled to the other? Parameters ========== e1 : GeometryEntity e2 : GeometryEntity Returns ======= are_similar : boolean Raises ====== GeometryError When `e1` and `e2` cannot be compared. Notes ===== If the two objects are equal then they are similar. See Also ======== sympy.geometry.entity.GeometryEntity.is_similar Examples ======== >>> from sympy import Point, Circle, Triangle, are_similar >>> c1, c2 = Circle(Point(0, 0), 4), Circle(Point(1, 4), 3) >>> t1 = Triangle(Point(0, 0), Point(1, 0), Point(0, 1)) >>> t2 = Triangle(Point(0, 0), Point(2, 0), Point(0, 2)) >>> t3 = Triangle(Point(0, 0), Point(3, 0), Point(0, 1)) >>> are_similar(t1, t2) True >>> are_similar(t1, t3) False """ from .exceptions import GeometryError if e1 == e2: return True is_similar1 = getattr(e1, 'is_similar', None) if is_similar1: return is_similar1(e2) is_similar2 = getattr(e2, 'is_similar', None) if is_similar2: return is_similar2(e1) n1 = e1.__class__.__name__ n2 = e2.__class__.__name__ raise GeometryError( "Cannot test similarity between %s and %s" % (n1, n2)) def centroid(args): """Find the centroid (center of mass) of the collection containing only Points, Segments or Polygons. The centroid is the weighted average of the individual centroid where the weights are the lengths (of segments) or areas (of polygons). Overlapping regions will add to the weight of that region. If there are no objects (or a mixture of objects) then None is returned. See Also ======== sympy.geometry.point.Point, sympy.geometry.line.Segment, sympy.geometry.polygon.Polygon Examples ======== >>> from sympy import Point, Segment, Polygon >>> from sympy.geometry.util import centroid >>> p = Polygon((0, 0), (10, 0), (10, 10)) >>> q = p.translate(0, 20) >>> p.centroid, q.centroid (Point2D(20/3, 10/3), Point2D(20/3, 70/3)) >>> centroid(p, q) Point2D(20/3, 40/3) >>> p, q = Segment((0, 0), (2, 0)), Segment((0, 0), (2, 2)) >>> centroid(p, q) Point2D(1, 2 - sqrt(2)) >>> centroid(Point(0, 0), Point(2, 0)) Point2D(1, 0) Stacking 3 polygons on top of each other effectively triples the weight of that polygon: >>> p = Polygon((0, 0), (1, 0), (1, 1), (0, 1)) >>> q = Polygon((1, 0), (3, 0), (3, 1), (1, 1)) >>> centroid(p, q) Point2D(3/2, 1/2) >>> centroid(p, p, p, q) # centroid x-coord shifts left Point2D(11/10, 1/2) Stacking the squares vertically above and below p has the same effect: >>> centroid(p, p.translate(0, 1), p.translate(0, -1), q) Point2D(11/10, 1/2) """ from sympy.geometry import Polygon, Segment, Point if args: if all(isinstance(g, Point) for g in args): c = Point(0, 0) for g in args: c += g den = len(args) elif all(isinstance(g, Segment) for g in args): c = Point(0, 0) L = 0 for g in args: l = g.length c += g.midpointl L += l den = L elif all(isinstance(g, Polygon) for g in args): c = Point(0, 0) A = 0 for g in args: a = g.area c += g.centroida A += a den = A c /= den return c.func([i.simplify() for i in c.args]) def closest_points(args): """Return the subset of points from a set of points that were the closest to each other in the 2D plane. Parameters ========== args : a collection of Points on 2D plane. Notes ===== This can only be performed on a set of points whose coordinates can be ordered on the number line. If there are no ties then a single pair of Points will be in the set. References ========== [1] http://www.cs.mcgill.ca/~cs251/ClosestPair/ClosestPairPS.html [2] Sweep line algorithm https://en.wikipedia.org/wiki/Sweep_line_algorithm Examples ======== >>> from sympy.geometry import closest_points, Point2D, Triangle >>> Triangle(sss=(3, 4, 5)).args (Point2D(0, 0), Point2D(3, 0), Point2D(3, 4)) >>> closest_points(_) {(Point2D(0, 0), Point2D(3, 0))} """ from collections import deque from math import hypot, sqrt as _sqrt from sympy.functions.elementary.miscellaneous import sqrt p = [Point2D(i) for i in set(args)] if len(p) < 2: raise ValueError('At least 2 distinct points must be given.') try: p.sort(key=lambda x: x.args) except TypeError: raise ValueError("The points could not be sorted.") if any(not i.is_Rational for j in p for i in j.args): def hypot(x, y): arg = xx + yy if arg.is_Rational: return _sqrt(arg) return sqrt(arg) rv = [(0, 1)] best_dist = hypot(p[1].x - p[0].x, p[1].y - p[0].y) i = 2 left = 0 box = deque([0, 1]) while i < len(p): while left < i and p[i][0] - p[left][0] > best_dist: box.popleft() left += 1 for j in box: d = hypot(p[i].x - p[j].x, p[i].y - p[j].y) if d < best_dist: rv = [(j, i)] elif d == best_dist: rv.append((j, i)) else: continue best_dist = d box.append(i) i += 1 return {tuple([p[i] for i in pair]) for pair in rv} def convex_hull(args, *kwargs): """The convex hull surrounding the Points contained in the list of entities. Parameters ========== args : a collection of Points, Segments and/or Polygons Returns ======= convex_hull : Polygon if ``polygon`` is True else as a tuple `(U, L)` where ``L`` and ``U`` are the lower and upper hulls, respectively. Notes ===== This can only be performed on a set of points whose coordinates can be ordered on the number line. References ========== [1] https://en.wikipedia.org/wiki/Graham_scan [2] Andrew's Monotone Chain Algorithm (A.M. Andrew, "Another Efficient Algorithm for Convex Hulls in Two Dimensions", 1979) http://geomalgorithms.com/a10-_hull-1.html See Also ======== sympy.geometry.point.Point, sympy.geometry.polygon.Polygon Examples ======== >>> from sympy.geometry import Point, convex_hull >>> points = [(1, 1), (1, 2), (3, 1), (-5, 2), (15, 4)] >>> convex_hull(points) Polygon(Point2D(-5, 2), Point2D(1, 1), Point2D(3, 1), Point2D(15, 4)) >>> convex_hull(points, dict(polygon=False)) ([Point2D(-5, 2), Point2D(15, 4)], [Point2D(-5, 2), Point2D(1, 1), Point2D(3, 1), Point2D(15, 4)]) """ from .entity import GeometryEntity from .point import Point from .line import Segment from .polygon import Polygon polygon = kwargs.get('polygon', True) p = OrderedSet() for e in args: if not isinstance(e, GeometryEntity): try: e = Point(e) except NotImplementedError: raise ValueError('%s is not a GeometryEntity and cannot be made into Point' % str(e)) if isinstance(e, Point): p.add(e) elif isinstance(e, Segment): p.update(e.points) elif isinstance(e, Polygon): p.update(e.vertices) else: raise NotImplementedError( 'Convex hull for %s not implemented.' % type(e)) # make sure all our points are of the same dimension if any(len(x) != 2 for x in p): raise ValueError('Can only compute the convex hull in two dimensions') p = list(p) if len(p) == 1: return p[0] if polygon else (p[0], None) elif len(p) == 2: s = Segment(p[0], p[1]) return s if polygon else (s, None) def _orientation(p, q, r): '''Return positive if p-q-r are clockwise, neg if ccw, zero if collinear.''' return (q.y - p.y)(r.x - p.x) - (q.x - p.x)(r.y - p.y) # scan to find upper and lower convex hulls of a set of 2d points. U = [] L = [] try: p.sort(key=lambda x: x.args) except TypeError: raise ValueError("The points could not be sorted.") for p_i in p: while len(U) > 1 and _orientation(U[-2], U[-1], p_i) <= 0: U.pop() while len(L) > 1 and _orientation(L[-2], L[-1], p_i) >= 0: L.pop() U.append(p_i) L.append(p_i) U.reverse() convexHull = tuple(L + U[1:-1]) if len(convexHull) == 2: s = Segment(convexHull[0], convexHull[1]) return s if polygon else (s, None) if polygon: return Polygon(convexHull) else: U.reverse() return (U, L) def farthest_points(args): """Return the subset of points from a set of points that were the furthest apart from each other in the 2D plane. Parameters ========== args : a collection of Points on 2D plane. Notes ===== This can only be performed on a set of points whose coordinates can be ordered on the number line. If there are no ties then a single pair of Points will be in the set. References ========== [1] http://code.activestate.com/recipes/117225-convex-hull-and-diameter-of-2d-point-sets/ [2] Rotating Callipers Technique https://en.wikipedia.org/wiki/Rotating_calipers Examples ======== >>> from sympy.geometry import farthest_points, Point2D, Triangle >>> Triangle(sss=(3, 4, 5)).args (Point2D(0, 0), Point2D(3, 0), Point2D(3, 4)) >>> farthest_points(_) {(Point2D(0, 0), Point2D(3, 4))} """ from math import hypot, sqrt as _sqrt def rotatingCalipers(Points): U, L = convex_hull(Points, dict(polygon=False)) if L is None: if isinstance(U, Point): raise ValueError('At least two distinct points must be given.') yield U.args else: i = 0 j = len(L) - 1 while i < len(U) - 1 or j > 0: yield U[i], L[j] # if all the way through one side of hull, advance the other side if i == len(U) - 1: j -= 1 elif j == 0: i += 1 # still points left on both lists, compare slopes of next hull edges # being careful to avoid divide-by-zero in slope calculation elif (U[i+1].y - U[i].y) (L[j].x - L[j-1].x) > \ (L[j].y - L[j-1].y) * (U[i+1].x - U[i].x): i += 1 else: j -= 1 p = [Point2D(i) for i in set(args)] if any(not i.is_Rational for j in p for i in j.args): def hypot(x, y): arg = xx + yy if arg.is_Rational: return _sqrt(arg) return sqrt(arg) rv = [] diam = 0 for pair in rotatingCalipers(args): h, q = _ordered_points(pair) d = hypot(h.x - q.x, h.y - q.y) if d > diam: rv = [(h, q)] elif d == diam: rv.append((h, q)) else: continue diam = d return set(rv) def idiff(eq, y, x, n=1): """Return ``dy/dx`` assuming that ``eq == 0``. Parameters ========== y : the dependent variable or a list of dependent variables (with y first) x : the variable that the derivative is being taken with respect to n : the order of the derivative (default is 1) Examples ======== >>> from sympy.abc import x, y, a >>> from sympy.geometry.util import idiff >>> circ = x2 + y2 - 4 >>> idiff(circ, y, x) -x/y >>> idiff(circ, y, x, 2).simplify() -(x2 + y2)/y*3 Here, ``a`` is assumed to be independent of ``x``: >>> idiff(x + a + y, y, x) -1 Now the x-dependence of ``a`` is made explicit by listing ``a`` after ``y`` in a list. >>> idiff(x + a + y, [y, a], x) -Derivative(a, x) - 1 See Also ======== sympy.core.function.Derivative: represents unevaluated derivatives sympy.core.function.diff: explicitly differentiates wrt symbols """ if is_sequence(y): dep = set(y) y = y[0] elif isinstance(y, Symbol): dep = {y} elif isinstance(y, Function): pass else: raise ValueError("expecting x-dependent symbol(s) or function(s) but got: %s" % y) f = {s: Function(s.name)(x) for s in eq.free_symbols if s != x and s in dep} if isinstance(y, Symbol): dydx = Function(y.name)(x).diff(x) else: dydx = y.diff(x) eq = eq.subs(f) derivs = {} for i in range(n): yp = solve(eq.diff(x), dydx)[0].subs(derivs) if i == n - 1: return yp.subs([(v, k) for k, v in f.items()]) derivs[dydx] = yp eq = dydx - yp dydx = dydx.diff(x) def intersection(entities, **kwargs): """The intersection of a collection of GeometryEntity instances. Parameters ========== entities : sequence of GeometryEntity pairwise (keyword argument) : Can be either True or False Returns ======= intersection : list of GeometryEntity Raises ====== NotImplementedError When unable to calculate intersection. Notes ===== The intersection of any geometrical entity with itself should return a list with one item: the entity in question. An intersection requires two or more entities. If only a single entity is given then the function will return an empty list. It is possible for `intersection` to miss intersections that one knows exists because the required quantities were not fully simplified internally. Reals should be converted to Rationals, e.g. Rational(str(real_num)) or else failures due to floating point issues may result. Case 1: When the keyword argument 'pairwise' is False (default value): In this case, the function returns a list of intersections common to all entities. Case 2: When the keyword argument 'pairwise' is True: In this case, the functions returns a list intersections that occur between any pair of entities. See Also ======== sympy.geometry.entity.GeometryEntity.intersection Examples ======== >>> from sympy.geometry import Ray, Circle, intersection >>> c = Circle((0, 1), 1) >>> intersection(c, c.center) [] >>> right = Ray((0, 0), (1, 0)) >>> up = Ray((0, 0), (0, 1)) >>> intersection(c, right, up) [Point2D(0, 0)] >>> intersection(c, right, up, pairwise=True) [Point2D(0, 0), Point2D(0, 2)] >>> left = Ray((1, 0), (0, 0)) >>> intersection(right, left) [Segment2D(Point2D(0, 0), Point2D(1, 0))] """ from .entity import GeometryEntity from .point import Point pairwise = kwargs.pop('pairwise', False) if len(entities) <= 1: return [] # entities may be an immutable tuple entities = list(entities) for i, e in enumerate(entities): if not isinstance(e, GeometryEntity): entities[i] = Point(e) if not pairwise: # find the intersection common to all objects res = entities[0].intersection(entities[1]) for entity in entities[2:]: newres = [] for x in res: newres.extend(x.intersection(entity)) res = newres return res # find all pairwise intersections ans = [] for j in range(0, len(entities)): for k in range(j + 1, len(entities)): ans.extend(intersection(entities[j], entities[k])) return list(ordered(set(ans)))
5ff737fb0d5427a1f507e52c60f089f096b2270d7ff105ddb9a2f63d2e75d5cc	"""Line-like geometrical entities. Contains ======== LinearEntity Line Ray Segment LinearEntity2D Line2D Ray2D Segment2D LinearEntity3D Line3D Ray3D Segment3D """ from __future__ import division, print_function from sympy import Expr from sympy.core import S, sympify from sympy.core.compatibility import ordered from sympy.core.numbers import Rational, oo from sympy.core.relational import Eq from sympy.core.symbol import _symbol, Dummy from sympy.functions.elementary.trigonometric import (_pi_coeff as pi_coeff, acos, tan, atan2) from sympy.functions.elementary.piecewise import Piecewise from sympy.logic.boolalg import And from sympy.simplify.simplify import simplify from sympy.geometry.exceptions import GeometryError from sympy.core.containers import Tuple from sympy.core.decorators import deprecated from sympy.sets import Intersection from sympy.matrices import Matrix from sympy.solvers.solveset import linear_coeffs from .entity import GeometryEntity, GeometrySet from .point import Point, Point3D from sympy.utilities.misc import Undecidable, filldedent from sympy.utilities.exceptions import SymPyDeprecationWarning class LinearEntity(GeometrySet): """A base class for all linear entities (Line, Ray and Segment) in n-dimensional Euclidean space. Attributes ========== ambient_dimension direction length p1 p2 points Notes ===== This is an abstract class and is not meant to be instantiated. See Also ======== sympy.geometry.entity.GeometryEntity """ def __new__(cls, p1, p2=None, kwargs): p1, p2 = Point._normalize_dimension(p1, p2) if p1 == p2: # sometimes we return a single point if we are not given two unique # points. This is done in the specific subclass raise ValueError( "%s.__new__ requires two unique Points." % cls.__name__) if len(p1) != len(p2): raise ValueError( "%s.__new__ requires two Points of equal dimension." % cls.__name__) return GeometryEntity.__new__(cls, p1, p2, kwargs) def __contains__(self, other): """Return a definitive answer or else raise an error if it cannot be determined that other is on the boundaries of self.""" result = self.contains(other) if result is not None: return result else: raise Undecidable( "can't decide whether '%s' contains '%s'" % (self, other)) def _span_test(self, other): """Test whether the point `other` lies in the positive span of `self`. A point x is 'in front' of a point y if x.dot(y) >= 0. Return -1 if `other` is behind `self.p1`, 0 if `other` is `self.p1` and and 1 if `other` is in front of `self.p1`.""" if self.p1 == other: return 0 rel_pos = other - self.p1 d = self.direction if d.dot(rel_pos) > 0: return 1 return -1 @property def ambient_dimension(self): """A property method that returns the dimension of LinearEntity object. Parameters ========== p1 : LinearEntity Returns ======= dimension : integer Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(1, 1) >>> l1 = Line(p1, p2) >>> l1.ambient_dimension 2 >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0, 0), Point(1, 1, 1) >>> l1 = Line(p1, p2) >>> l1.ambient_dimension 3 """ return len(self.p1) def angle_between(l1, l2): """Return the non-reflex angle formed by rays emanating from the origin with directions the same as the direction vectors of the linear entities. Parameters ========== l1 : LinearEntity l2 : LinearEntity Returns ======= angle : angle in radians Notes ===== From the dot product of vectors v1 and v2 it is known that: ``dot(v1, v2) = \|v1\|\|v2\|cos(A)`` where A is the angle formed between the two vectors. We can get the directional vectors of the two lines and readily find the angle between the two using the above formula. See Also ======== is_perpendicular, Ray2D.closing_angle Examples ======== >>> from sympy import Point, Line, pi >>> e = Line((0, 0), (1, 0)) >>> ne = Line((0, 0), (1, 1)) >>> sw = Line((1, 1), (0, 0)) >>> ne.angle_between(e) pi/4 >>> sw.angle_between(e) 3pi/4 To obtain the non-obtuse angle at the intersection of lines, use the ``smallest_angle_between`` method: >>> sw.smallest_angle_between(e) pi/4 >>> from sympy import Point3D, Line3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(-1, 2, 0) >>> l1, l2 = Line3D(p1, p2), Line3D(p2, p3) >>> l1.angle_between(l2) acos(-sqrt(2)/3) >>> l1.smallest_angle_between(l2) acos(sqrt(2)/3) """ if not isinstance(l1, LinearEntity) and not isinstance(l2, LinearEntity): raise TypeError('Must pass only LinearEntity objects') v1, v2 = l1.direction, l2.direction return acos(v1.dot(v2)/(abs(v1)abs(v2))) def smallest_angle_between(l1, l2): """Return the smallest angle formed at the intersection of the lines containing the linear entities. Parameters ========== l1 : LinearEntity l2 : LinearEntity Returns ======= angle : angle in radians See Also ======== angle_between, is_perpendicular, Ray2D.closing_angle Examples ======== >>> from sympy import Point, Line, pi >>> p1, p2, p3 = Point(0, 0), Point(0, 4), Point(2, -2) >>> l1, l2 = Line(p1, p2), Line(p1, p3) >>> l1.smallest_angle_between(l2) pi/4 See Also ======== angle_between, Ray2D.closing_angle """ if not isinstance(l1, LinearEntity) and not isinstance(l2, LinearEntity): raise TypeError('Must pass only LinearEntity objects') v1, v2 = l1.direction, l2.direction return acos(abs(v1.dot(v2))/(abs(v1)abs(v2))) def arbitrary_point(self, parameter='t'): """A parameterized point on the Line. Parameters ========== parameter : str, optional The name of the parameter which will be used for the parametric point. The default value is 't'. When this parameter is 0, the first point used to define the line will be returned, and when it is 1 the second point will be returned. Returns ======= point : Point Raises ====== ValueError When ``parameter`` already appears in the Line's definition. See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(1, 0), Point(5, 3) >>> l1 = Line(p1, p2) >>> l1.arbitrary_point() Point2D(4t + 1, 3t) >>> from sympy import Point3D, Line3D >>> p1, p2 = Point3D(1, 0, 0), Point3D(5, 3, 1) >>> l1 = Line3D(p1, p2) >>> l1.arbitrary_point() Point3D(4t + 1, 3t, t) """ t = _symbol(parameter, real=True) if t.name in (f.name for f in self.free_symbols): raise ValueError(filldedent(''' Symbol %s already appears in object and cannot be used as a parameter. ''' % t.name)) # multiply on the right so the variable gets # combined with the coordinates of the point return self.p1 + (self.p2 - self.p1)t @staticmethod def are_concurrent(lines): """Is a sequence of linear entities concurrent? Two or more linear entities are concurrent if they all intersect at a single point. Parameters ========== lines : a sequence of linear entities. Returns ======= True : if the set of linear entities intersect in one point False : otherwise. See Also ======== sympy.geometry.util.intersection Examples ======== >>> from sympy import Point, Line, Line3D >>> p1, p2 = Point(0, 0), Point(3, 5) >>> p3, p4 = Point(-2, -2), Point(0, 2) >>> l1, l2, l3 = Line(p1, p2), Line(p1, p3), Line(p1, p4) >>> Line.are_concurrent(l1, l2, l3) True >>> l4 = Line(p2, p3) >>> Line.are_concurrent(l2, l3, l4) False >>> from sympy import Point3D, Line3D >>> p1, p2 = Point3D(0, 0, 0), Point3D(3, 5, 2) >>> p3, p4 = Point3D(-2, -2, -2), Point3D(0, 2, 1) >>> l1, l2, l3 = Line3D(p1, p2), Line3D(p1, p3), Line3D(p1, p4) >>> Line3D.are_concurrent(l1, l2, l3) True >>> l4 = Line3D(p2, p3) >>> Line3D.are_concurrent(l2, l3, l4) False """ common_points = Intersection(lines) if common_points.is_FiniteSet and len(common_points) == 1: return True return False def contains(self, other): """Subclasses should implement this method and should return True if other is on the boundaries of self; False if not on the boundaries of self; None if a determination cannot be made.""" raise NotImplementedError() @property def direction(self): """The direction vector of the LinearEntity. Returns ======= p : a Point; the ray from the origin to this point is the direction of `self` Examples ======== >>> from sympy.geometry import Line >>> a, b = (1, 1), (1, 3) >>> Line(a, b).direction Point2D(0, 2) >>> Line(b, a).direction Point2D(0, -2) This can be reported so the distance from the origin is 1: >>> Line(b, a).direction.unit Point2D(0, -1) See Also ======== sympy.geometry.point.Point.unit """ return self.p2 - self.p1 def intersection(self, other): """The intersection with another geometrical entity. Parameters ========== o : Point or LinearEntity Returns ======= intersection : list of geometrical entities See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Line, Segment >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(7, 7) >>> l1 = Line(p1, p2) >>> l1.intersection(p3) [Point2D(7, 7)] >>> p4, p5 = Point(5, 0), Point(0, 3) >>> l2 = Line(p4, p5) >>> l1.intersection(l2) [Point2D(15/8, 15/8)] >>> p6, p7 = Point(0, 5), Point(2, 6) >>> s1 = Segment(p6, p7) >>> l1.intersection(s1) [] >>> from sympy import Point3D, Line3D, Segment3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(7, 7, 7) >>> l1 = Line3D(p1, p2) >>> l1.intersection(p3) [Point3D(7, 7, 7)] >>> l1 = Line3D(Point3D(4,19,12), Point3D(5,25,17)) >>> l2 = Line3D(Point3D(-3, -15, -19), direction_ratio=[2,8,8]) >>> l1.intersection(l2) [Point3D(1, 1, -3)] >>> p6, p7 = Point3D(0, 5, 2), Point3D(2, 6, 3) >>> s1 = Segment3D(p6, p7) >>> l1.intersection(s1) [] """ def intersect_parallel_rays(ray1, ray2): if ray1.direction.dot(ray2.direction) > 0: # rays point in the same direction # so return the one that is "in front" return [ray2] if ray1._span_test(ray2.p1) >= 0 else [ray1] else: # rays point in opposite directions st = ray1._span_test(ray2.p1) if st < 0: return [] elif st == 0: return [ray2.p1] return [Segment(ray1.p1, ray2.p1)] def intersect_parallel_ray_and_segment(ray, seg): st1, st2 = ray._span_test(seg.p1), ray._span_test(seg.p2) if st1 < 0 and st2 < 0: return [] elif st1 >= 0 and st2 >= 0: return [seg] elif st1 >= 0: # st2 < 0: return [Segment(ray.p1, seg.p1)] elif st2 >= 0: # st1 < 0: return [Segment(ray.p1, seg.p2)] def intersect_parallel_segments(seg1, seg2): if seg1.contains(seg2): return [seg2] if seg2.contains(seg1): return [seg1] # direct the segments so they're oriented the same way if seg1.direction.dot(seg2.direction) < 0: seg2 = Segment(seg2.p2, seg2.p1) # order the segments so seg1 is "behind" seg2 if seg1._span_test(seg2.p1) < 0: seg1, seg2 = seg2, seg1 if seg2._span_test(seg1.p2) < 0: return [] return [Segment(seg2.p1, seg1.p2)] if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if other.is_Point: if self.contains(other): return [other] else: return [] elif isinstance(other, LinearEntity): # break into cases based on whether # the lines are parallel, non-parallel intersecting, or skew pts = Point._normalize_dimension(self.p1, self.p2, other.p1, other.p2) rank = Point.affine_rank(pts) if rank == 1: # we're collinear if isinstance(self, Line): return [other] if isinstance(other, Line): return [self] if isinstance(self, Ray) and isinstance(other, Ray): return intersect_parallel_rays(self, other) if isinstance(self, Ray) and isinstance(other, Segment): return intersect_parallel_ray_and_segment(self, other) if isinstance(self, Segment) and isinstance(other, Ray): return intersect_parallel_ray_and_segment(other, self) if isinstance(self, Segment) and isinstance(other, Segment): return intersect_parallel_segments(self, other) elif rank == 2: # we're in the same plane l1 = Line(pts[:2]) l2 = Line(pts[2:]) # check to see if we're parallel. If we are, we can't # be intersecting, since the collinear case was already # handled if l1.direction.is_scalar_multiple(l2.direction): return [] # find the intersection as if everything were lines # by solving the equation td + p1 == sd' + p1' m = Matrix([l1.direction, -l2.direction]).transpose() v = Matrix([l2.p1 - l1.p1]).transpose() # we cannot use m.solve(v) because that only works for square matrices m_rref, pivots = m.col_insert(2, v).rref(simplify=True) # rank == 2 ensures we have 2 pivots, but let's check anyway if len(pivots) != 2: raise GeometryError("Failed when solving Mx=b when M={} and b={}".format(m, v)) coeff = m_rref[0, 2] line_intersection = l1.directioncoeff + self.p1 # if we're both lines, we can skip a containment check if isinstance(self, Line) and isinstance(other, Line): return [line_intersection] if ((isinstance(self, Line) or self.contains(line_intersection)) and other.contains(line_intersection)): return [line_intersection] return [] else: # we're skew return [] return other.intersection(self) def is_parallel(l1, l2): """Are two linear entities parallel? Parameters ========== l1 : LinearEntity l2 : LinearEntity Returns ======= True : if l1 and l2 are parallel, False : otherwise. See Also ======== coefficients Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(1, 1) >>> p3, p4 = Point(3, 4), Point(6, 7) >>> l1, l2 = Line(p1, p2), Line(p3, p4) >>> Line.is_parallel(l1, l2) True >>> p5 = Point(6, 6) >>> l3 = Line(p3, p5) >>> Line.is_parallel(l1, l3) False >>> from sympy import Point3D, Line3D >>> p1, p2 = Point3D(0, 0, 0), Point3D(3, 4, 5) >>> p3, p4 = Point3D(2, 1, 1), Point3D(8, 9, 11) >>> l1, l2 = Line3D(p1, p2), Line3D(p3, p4) >>> Line3D.is_parallel(l1, l2) True >>> p5 = Point3D(6, 6, 6) >>> l3 = Line3D(p3, p5) >>> Line3D.is_parallel(l1, l3) False """ if not isinstance(l1, LinearEntity) and not isinstance(l2, LinearEntity): raise TypeError('Must pass only LinearEntity objects') return l1.direction.is_scalar_multiple(l2.direction) def is_perpendicular(l1, l2): """Are two linear entities perpendicular? Parameters ========== l1 : LinearEntity l2 : LinearEntity Returns ======= True : if l1 and l2 are perpendicular, False : otherwise. See Also ======== coefficients Examples ======== >>> from sympy import Point, Line >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(-1, 1) >>> l1, l2 = Line(p1, p2), Line(p1, p3) >>> l1.is_perpendicular(l2) True >>> p4 = Point(5, 3) >>> l3 = Line(p1, p4) >>> l1.is_perpendicular(l3) False >>> from sympy import Point3D, Line3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(-1, 2, 0) >>> l1, l2 = Line3D(p1, p2), Line3D(p2, p3) >>> l1.is_perpendicular(l2) False >>> p4 = Point3D(5, 3, 7) >>> l3 = Line3D(p1, p4) >>> l1.is_perpendicular(l3) False """ if not isinstance(l1, LinearEntity) and not isinstance(l2, LinearEntity): raise TypeError('Must pass only LinearEntity objects') return S.Zero.equals(l1.direction.dot(l2.direction)) def is_similar(self, other): """ Return True if self and other are contained in the same line. Examples ======== >>> from sympy import Point, Line >>> p1, p2, p3 = Point(0, 1), Point(3, 4), Point(2, 3) >>> l1 = Line(p1, p2) >>> l2 = Line(p1, p3) >>> l1.is_similar(l2) True """ l = Line(self.p1, self.p2) return l.contains(other) @property def length(self): """ The length of the line. Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(3, 5) >>> l1 = Line(p1, p2) >>> l1.length oo """ return S.Infinity @property def p1(self): """The first defining point of a linear entity. See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(5, 3) >>> l = Line(p1, p2) >>> l.p1 Point2D(0, 0) """ return self.args[0] @property def p2(self): """The second defining point of a linear entity. See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(5, 3) >>> l = Line(p1, p2) >>> l.p2 Point2D(5, 3) """ return self.args[1] def parallel_line(self, p): """Create a new Line parallel to this linear entity which passes through the point `p`. Parameters ========== p : Point Returns ======= line : Line See Also ======== is_parallel Examples ======== >>> from sympy import Point, Line >>> p1, p2, p3 = Point(0, 0), Point(2, 3), Point(-2, 2) >>> l1 = Line(p1, p2) >>> l2 = l1.parallel_line(p3) >>> p3 in l2 True >>> l1.is_parallel(l2) True >>> from sympy import Point3D, Line3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(2, 3, 4), Point3D(-2, 2, 0) >>> l1 = Line3D(p1, p2) >>> l2 = l1.parallel_line(p3) >>> p3 in l2 True >>> l1.is_parallel(l2) True """ p = Point(p, dim=self.ambient_dimension) return Line(p, p + self.direction) def perpendicular_line(self, p): """Create a new Line perpendicular to this linear entity which passes through the point `p`. Parameters ========== p : Point Returns ======= line : Line See Also ======== is_perpendicular, perpendicular_segment Examples ======== >>> from sympy import Point, Line >>> p1, p2, p3 = Point(0, 0), Point(2, 3), Point(-2, 2) >>> l1 = Line(p1, p2) >>> l2 = l1.perpendicular_line(p3) >>> p3 in l2 True >>> l1.is_perpendicular(l2) True >>> from sympy import Point3D, Line3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(2, 3, 4), Point3D(-2, 2, 0) >>> l1 = Line3D(p1, p2) >>> l2 = l1.perpendicular_line(p3) >>> p3 in l2 True >>> l1.is_perpendicular(l2) True """ p = Point(p, dim=self.ambient_dimension) if p in self: p = p + self.direction.orthogonal_direction return Line(p, self.projection(p)) def perpendicular_segment(self, p): """Create a perpendicular line segment from `p` to this line. The enpoints of the segment are ``p`` and the closest point in the line containing self. (If self is not a line, the point might not be in self.) Parameters ========== p : Point Returns ======= segment : Segment Notes ===== Returns `p` itself if `p` is on this linear entity. See Also ======== perpendicular_line Examples ======== >>> from sympy import Point, Line >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(0, 2) >>> l1 = Line(p1, p2) >>> s1 = l1.perpendicular_segment(p3) >>> l1.is_perpendicular(s1) True >>> p3 in s1 True >>> l1.perpendicular_segment(Point(4, 0)) Segment2D(Point2D(4, 0), Point2D(2, 2)) >>> from sympy import Point3D, Line3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(0, 2, 0) >>> l1 = Line3D(p1, p2) >>> s1 = l1.perpendicular_segment(p3) >>> l1.is_perpendicular(s1) True >>> p3 in s1 True >>> l1.perpendicular_segment(Point3D(4, 0, 0)) Segment3D(Point3D(4, 0, 0), Point3D(4/3, 4/3, 4/3)) """ p = Point(p, dim=self.ambient_dimension) if p in self: return p l = self.perpendicular_line(p) # The intersection should be unique, so unpack the singleton p2, = Intersection(Line(self.p1, self.p2), l) return Segment(p, p2) @property def points(self): """The two points used to define this linear entity. Returns ======= points : tuple of Points See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(5, 11) >>> l1 = Line(p1, p2) >>> l1.points (Point2D(0, 0), Point2D(5, 11)) """ return (self.p1, self.p2) def projection(self, other): """Project a point, line, ray, or segment onto this linear entity. Parameters ========== other : Point or LinearEntity (Line, Ray, Segment) Returns ======= projection : Point or LinearEntity (Line, Ray, Segment) The return type matches the type of the parameter ``other``. Raises ====== GeometryError When method is unable to perform projection. Notes ===== A projection involves taking the two points that define the linear entity and projecting those points onto a Line and then reforming the linear entity using these projections. A point P is projected onto a line L by finding the point on L that is closest to P. This point is the intersection of L and the line perpendicular to L that passes through P. See Also ======== sympy.geometry.point.Point, perpendicular_line Examples ======== >>> from sympy import Point, Line, Segment, Rational >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(Rational(1, 2), 0) >>> l1 = Line(p1, p2) >>> l1.projection(p3) Point2D(1/4, 1/4) >>> p4, p5 = Point(10, 0), Point(12, 1) >>> s1 = Segment(p4, p5) >>> l1.projection(s1) Segment2D(Point2D(5, 5), Point2D(13/2, 13/2)) >>> p1, p2, p3 = Point(0, 0, 1), Point(1, 1, 2), Point(2, 0, 1) >>> l1 = Line(p1, p2) >>> l1.projection(p3) Point3D(2/3, 2/3, 5/3) >>> p4, p5 = Point(10, 0, 1), Point(12, 1, 3) >>> s1 = Segment(p4, p5) >>> l1.projection(s1) Segment3D(Point3D(10/3, 10/3, 13/3), Point3D(5, 5, 6)) """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) def proj_point(p): return Point.project(p - self.p1, self.direction) + self.p1 if isinstance(other, Point): return proj_point(other) elif isinstance(other, LinearEntity): p1, p2 = proj_point(other.p1), proj_point(other.p2) # test to see if we're degenerate if p1 == p2: return p1 projected = other.__class__(p1, p2) projected = Intersection(self, projected) # if we happen to have intersected in only a point, return that if projected.is_FiniteSet and len(projected) == 1: # projected is a set of size 1, so unpack it in `a` a, = projected return a # order args so projection is in the same direction as self if self.direction.dot(projected.direction) < 0: p1, p2 = projected.args projected = projected.func(p2, p1) return projected raise GeometryError( "Do not know how to project %s onto %s" % (other, self)) def random_point(self, seed=None): """A random point on a LinearEntity. Returns ======= point : Point See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Line, Ray, Segment >>> p1, p2 = Point(0, 0), Point(5, 3) >>> line = Line(p1, p2) >>> r = line.random_point(seed=42) # seed value is optional >>> r.n(3) Point2D(-0.72, -0.432) >>> r in line True >>> Ray(p1, p2).random_point(seed=42).n(3) Point2D(0.72, 0.432) >>> Segment(p1, p2).random_point(seed=42).n(3) Point2D(3.2, 1.92) """ import random if seed is not None: rng = random.Random(seed) else: rng = random t = Dummy() pt = self.arbitrary_point(t) if isinstance(self, Ray): v = abs(rng.gauss(0, 1)) elif isinstance(self, Segment): v = rng.random() elif isinstance(self, Line): v = rng.gauss(0, 1) else: raise NotImplementedError('unhandled line type') return pt.subs(t, Rational(v)) class Line(LinearEntity): """An infinite line in space. A 2D line is declared with two distinct points, point and slope, or an equation. A 3D line may be defined with a point and a direction ratio. Parameters ========== p1 : Point p2 : Point slope : sympy expression direction_ratio : list equation : equation of a line Notes ===== `Line` will automatically subclass to `Line2D` or `Line3D` based on the dimension of `p1`. The `slope` argument is only relevant for `Line2D` and the `direction_ratio` argument is only relevant for `Line3D`. See Also ======== sympy.geometry.point.Point sympy.geometry.line.Line2D sympy.geometry.line.Line3D Examples ======== >>> from sympy import Point, Eq >>> from sympy.geometry import Line, Segment >>> from sympy.abc import x, y, a, b >>> L = Line(Point(2,3), Point(3,5)) >>> L Line2D(Point2D(2, 3), Point2D(3, 5)) >>> L.points (Point2D(2, 3), Point2D(3, 5)) >>> L.equation() -2x + y + 1 >>> L.coefficients (-2, 1, 1) Instantiate with keyword ``slope``: >>> Line(Point(0, 0), slope=0) Line2D(Point2D(0, 0), Point2D(1, 0)) Instantiate with another linear object >>> s = Segment((0, 0), (0, 1)) >>> Line(s).equation() x The line corresponding to an equation in the for `ax + by + c = 0`, can be entered: >>> Line(3x + y + 18) Line2D(Point2D(0, -18), Point2D(1, -21)) If `x` or `y` has a different name, then they can be specified, too, as a string (to match the name) or symbol: >>> Line(Eq(3a + b, -18), x='a', y=b) Line2D(Point2D(0, -18), Point2D(1, -21)) """ def __new__(cls, args, kwargs): from sympy.geometry.util import find if len(args) == 1 and isinstance(args[0], Expr): x = kwargs.get('x', 'x') y = kwargs.get('y', 'y') equation = args[0] if isinstance(equation, Eq): equation = equation.lhs - equation.rhs xin, yin = x, y x = find(x, equation) or Dummy() y = find(y, equation) or Dummy() a, b, c = linear_coeffs(equation, x, y) if b: return Line((0, -c/b), slope=-a/b) if a: return Line((-c/a, 0), slope=oo) raise ValueError('neither %s nor %s were found in the equation' % (xin, yin)) else: if len(args) > 0: p1 = args[0] if len(args) > 1: p2 = args[1] else: p2=None if isinstance(p1, LinearEntity): if p2: raise ValueError('If p1 is a LinearEntity, p2 must be None.') dim = len(p1.p1) else: p1 = Point(p1) dim = len(p1) if p2 is not None or isinstance(p2, Point) and p2.ambient_dimension != dim: p2 = Point(p2) if dim == 2: return Line2D(p1, p2, kwargs) elif dim == 3: return Line3D(p1, p2, kwargs) return LinearEntity.__new__(cls, p1, p2, kwargs) def contains(self, other): """ Return True if `other` is on this Line, or False otherwise. Examples ======== >>> from sympy import Line,Point >>> p1, p2 = Point(0, 1), Point(3, 4) >>> l = Line(p1, p2) >>> l.contains(p1) True >>> l.contains((0, 1)) True >>> l.contains((0, 0)) False >>> a = (0, 0, 0) >>> b = (1, 1, 1) >>> c = (2, 2, 2) >>> l1 = Line(a, b) >>> l2 = Line(b, a) >>> l1 == l2 False >>> l1 in l2 True """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if isinstance(other, Point): return Point.is_collinear(other, self.p1, self.p2) if isinstance(other, LinearEntity): return Point.is_collinear(self.p1, self.p2, other.p1, other.p2) return False def distance(self, other): """ Finds the shortest distance between a line and a point. Raises ====== NotImplementedError is raised if `other` is not a Point Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(1, 1) >>> s = Line(p1, p2) >>> s.distance(Point(-1, 1)) sqrt(2) >>> s.distance((-1, 2)) 3sqrt(2)/2 >>> p1, p2 = Point(0, 0, 0), Point(1, 1, 1) >>> s = Line(p1, p2) >>> s.distance(Point(-1, 1, 1)) 2sqrt(6)/3 >>> s.distance((-1, 1, 1)) 2sqrt(6)/3 """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if self.contains(other): return S.Zero return self.perpendicular_segment(other).length @deprecated(useinstead="equals", issue=12860, deprecated_since_version="1.0") def equal(self, other): return self.equals(other) def equals(self, other): """Returns True if self and other are the same mathematical entities""" if not isinstance(other, Line): return False return Point.is_collinear(self.p1, other.p1, self.p2, other.p2) def plot_interval(self, parameter='t'): """The plot interval for the default geometric plot of line. Gives values that will produce a line that is +/- 5 units long (where a unit is the distance between the two points that define the line). Parameters ========== parameter : str, optional Default value is 't'. Returns ======= plot_interval : list (plot interval) [parameter, lower_bound, upper_bound] Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(5, 3) >>> l1 = Line(p1, p2) >>> l1.plot_interval() [t, -5, 5] """ t = _symbol(parameter, real=True) return [t, -5, 5] class Ray(LinearEntity): """A Ray is a semi-line in the space with a source point and a direction. Parameters ========== p1 : Point The source of the Ray p2 : Point or radian value This point determines the direction in which the Ray propagates. If given as an angle it is interpreted in radians with the positive direction being ccw. Attributes ========== source See Also ======== sympy.geometry.line.Ray2D sympy.geometry.line.Ray3D sympy.geometry.point.Point sympy.geometry.line.Line Notes ===== `Ray` will automatically subclass to `Ray2D` or `Ray3D` based on the dimension of `p1`. Examples ======== >>> from sympy import Point, pi >>> from sympy.geometry import Ray >>> r = Ray(Point(2, 3), Point(3, 5)) >>> r Ray2D(Point2D(2, 3), Point2D(3, 5)) >>> r.points (Point2D(2, 3), Point2D(3, 5)) >>> r.source Point2D(2, 3) >>> r.xdirection oo >>> r.ydirection oo >>> r.slope 2 >>> Ray(Point(0, 0), angle=pi/4).slope 1 """ def __new__(cls, p1, p2=None, kwargs): p1 = Point(p1) if p2 is not None: p1, p2 = Point._normalize_dimension(p1, Point(p2)) dim = len(p1) if dim == 2: return Ray2D(p1, p2, kwargs) elif dim == 3: return Ray3D(p1, p2, kwargs) return LinearEntity.__new__(cls, p1, pts, *kwargs) def _svg(self, scale_factor=1., fill_color="#66cc99"): """Returns SVG path element for the LinearEntity. Parameters ========== scale_factor : float Multiplication factor for the SVG stroke-width. Default is 1. fill_color : str, optional Hex string for fill color. Default is "#66cc99". """ from sympy.core.evalf import N verts = (N(self.p1), N(self.p2)) coords = ["{0},{1}".format(p.x, p.y) for p in verts] path = "M {0} L {1}".format(coords[0], " L ".join(coords[1:])) return ( '<path fill-rule="evenodd" fill="{2}" stroke="#555555" ' 'stroke-width="{0}" opacity="0.6" d="{1}" ' 'marker-start="url(#markerCircle)" marker-end="url(#markerArrow)"/>' ).format(2. scale_factor, path, fill_color) def contains(self, other): """ Is other GeometryEntity contained in this Ray? Examples ======== >>> from sympy import Ray,Point,Segment >>> p1, p2 = Point(0, 0), Point(4, 4) >>> r = Ray(p1, p2) >>> r.contains(p1) True >>> r.contains((1, 1)) True >>> r.contains((1, 3)) False >>> s = Segment((1, 1), (2, 2)) >>> r.contains(s) True >>> s = Segment((1, 2), (2, 5)) >>> r.contains(s) False >>> r1 = Ray((2, 2), (3, 3)) >>> r.contains(r1) True >>> r1 = Ray((2, 2), (3, 5)) >>> r.contains(r1) False """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if isinstance(other, Point): if Point.is_collinear(self.p1, self.p2, other): # if we're in the direction of the ray, our # direction vector dot the ray's direction vector # should be non-negative return bool((self.p2 - self.p1).dot(other - self.p1) >= S.Zero) return False elif isinstance(other, Ray): if Point.is_collinear(self.p1, self.p2, other.p1, other.p2): return bool((self.p2 - self.p1).dot(other.p2 - other.p1) > S.Zero) return False elif isinstance(other, Segment): return other.p1 in self and other.p2 in self # No other known entity can be contained in a Ray return False def distance(self, other): """ Finds the shortest distance between the ray and a point. Raises ====== NotImplementedError is raised if `other` is not a Point Examples ======== >>> from sympy import Point, Ray >>> p1, p2 = Point(0, 0), Point(1, 1) >>> s = Ray(p1, p2) >>> s.distance(Point(-1, -1)) sqrt(2) >>> s.distance((-1, 2)) 3sqrt(2)/2 >>> p1, p2 = Point(0, 0, 0), Point(1, 1, 2) >>> s = Ray(p1, p2) >>> s Ray3D(Point3D(0, 0, 0), Point3D(1, 1, 2)) >>> s.distance(Point(-1, -1, 2)) 4sqrt(3)/3 >>> s.distance((-1, -1, 2)) 4sqrt(3)/3 """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if self.contains(other): return S.Zero proj = Line(self.p1, self.p2).projection(other) if self.contains(proj): return abs(other - proj) else: return abs(other - self.source) def equals(self, other): """Returns True if self and other are the same mathematical entities""" if not isinstance(other, Ray): return False return self.source == other.source and other.p2 in self def plot_interval(self, parameter='t'): """The plot interval for the default geometric plot of the Ray. Gives values that will produce a ray that is 10 units long (where a unit is the distance between the two points that define the ray). Parameters ========== parameter : str, optional Default value is 't'. Returns ======= plot_interval : list [parameter, lower_bound, upper_bound] Examples ======== >>> from sympy import Ray, pi >>> r = Ray((0, 0), angle=pi/4) >>> r.plot_interval() [t, 0, 10] """ t = _symbol(parameter, real=True) return [t, 0, 10] @property def source(self): """The point from which the ray emanates. See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Ray >>> p1, p2 = Point(0, 0), Point(4, 1) >>> r1 = Ray(p1, p2) >>> r1.source Point2D(0, 0) >>> p1, p2 = Point(0, 0, 0), Point(4, 1, 5) >>> r1 = Ray(p2, p1) >>> r1.source Point3D(4, 1, 5) """ return self.p1 class Segment(LinearEntity): """A line segment in space. Parameters ========== p1 : Point p2 : Point Attributes ========== length : number or sympy expression midpoint : Point See Also ======== sympy.geometry.line.Segment2D sympy.geometry.line.Segment3D sympy.geometry.point.Point sympy.geometry.line.Line Notes ===== If 2D or 3D points are used to define `Segment`, it will be automatically subclassed to `Segment2D` or `Segment3D`. Examples ======== >>> from sympy import Point >>> from sympy.geometry import Segment >>> Segment((1, 0), (1, 1)) # tuples are interpreted as pts Segment2D(Point2D(1, 0), Point2D(1, 1)) >>> s = Segment(Point(4, 3), Point(1, 1)) >>> s.points (Point2D(4, 3), Point2D(1, 1)) >>> s.slope 2/3 >>> s.length sqrt(13) >>> s.midpoint Point2D(5/2, 2) >>> Segment((1, 0, 0), (1, 1, 1)) # tuples are interpreted as pts Segment3D(Point3D(1, 0, 0), Point3D(1, 1, 1)) >>> s = Segment(Point(4, 3, 9), Point(1, 1, 7)); s Segment3D(Point3D(4, 3, 9), Point3D(1, 1, 7)) >>> s.points (Point3D(4, 3, 9), Point3D(1, 1, 7)) >>> s.length sqrt(17) >>> s.midpoint Point3D(5/2, 2, 8) """ def __new__(cls, p1, p2, kwargs): p1, p2 = Point._normalize_dimension(Point(p1), Point(p2)) dim = len(p1) if dim == 2: return Segment2D(p1, p2, kwargs) elif dim == 3: return Segment3D(p1, p2, kwargs) return LinearEntity.__new__(cls, p1, p2, kwargs) def contains(self, other): """ Is the other GeometryEntity contained within this Segment? Examples ======== >>> from sympy import Point, Segment >>> p1, p2 = Point(0, 1), Point(3, 4) >>> s = Segment(p1, p2) >>> s2 = Segment(p2, p1) >>> s.contains(s2) True >>> from sympy import Point3D, Segment3D >>> p1, p2 = Point3D(0, 1, 1), Point3D(3, 4, 5) >>> s = Segment3D(p1, p2) >>> s2 = Segment3D(p2, p1) >>> s.contains(s2) True >>> s.contains((p1 + p2) / 2) True """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if isinstance(other, Point): if Point.is_collinear(other, self.p1, self.p2): if isinstance(self, Segment2D): # if it is collinear and is in the bounding box of the # segment then it must be on the segment vert = (1/self.slope).equals(0) if vert is False: isin = (self.p1.x - other.x)(self.p2.x - other.x) <= 0 if isin in (True, False): return isin if vert is True: isin = (self.p1.y - other.y)(self.p2.y - other.y) <= 0 if isin in (True, False): return isin # use the triangle inequality d1, d2 = other - self.p1, other - self.p2 d = self.p2 - self.p1 # without the call to simplify, sympy cannot tell that an expression # like (a+b)(a/2+b/2) is always non-negative. If it cannot be # determined, raise an Undecidable error try: # the triangle inequality says that \|d1\|+\|d2\| >= \|d\| and is strict # only if other lies in the line segment return bool(simplify(Eq(abs(d1) + abs(d2) - abs(d), 0))) except TypeError: raise Undecidable("Cannot determine if {} is in {}".format(other, self)) if isinstance(other, Segment): return other.p1 in self and other.p2 in self return False def equals(self, other): """Returns True if self and other are the same mathematical entities""" return isinstance(other, self.func) and list( ordered(self.args)) == list(ordered(other.args)) def distance(self, other): """ Finds the shortest distance between a line segment and a point. Raises ====== NotImplementedError is raised if `other` is not a Point Examples ======== >>> from sympy import Point, Segment >>> p1, p2 = Point(0, 1), Point(3, 4) >>> s = Segment(p1, p2) >>> s.distance(Point(10, 15)) sqrt(170) >>> s.distance((0, 12)) sqrt(73) >>> from sympy import Point3D, Segment3D >>> p1, p2 = Point3D(0, 0, 3), Point3D(1, 1, 4) >>> s = Segment3D(p1, p2) >>> s.distance(Point3D(10, 15, 12)) sqrt(341) >>> s.distance((10, 15, 12)) sqrt(341) """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if isinstance(other, Point): vp1 = other - self.p1 vp2 = other - self.p2 dot_prod_sign_1 = self.direction.dot(vp1) >= 0 dot_prod_sign_2 = self.direction.dot(vp2) <= 0 if dot_prod_sign_1 and dot_prod_sign_2: return Line(self.p1, self.p2).distance(other) if dot_prod_sign_1 and not dot_prod_sign_2: return abs(vp2) if not dot_prod_sign_1 and dot_prod_sign_2: return abs(vp1) raise NotImplementedError() @property def length(self): """The length of the line segment. See Also ======== sympy.geometry.point.Point.distance Examples ======== >>> from sympy import Point, Segment >>> p1, p2 = Point(0, 0), Point(4, 3) >>> s1 = Segment(p1, p2) >>> s1.length 5 >>> from sympy import Point3D, Segment3D >>> p1, p2 = Point3D(0, 0, 0), Point3D(4, 3, 3) >>> s1 = Segment3D(p1, p2) >>> s1.length sqrt(34) """ return Point.distance(self.p1, self.p2) @property def midpoint(self): """The midpoint of the line segment. See Also ======== sympy.geometry.point.Point.midpoint Examples ======== >>> from sympy import Point, Segment >>> p1, p2 = Point(0, 0), Point(4, 3) >>> s1 = Segment(p1, p2) >>> s1.midpoint Point2D(2, 3/2) >>> from sympy import Point3D, Segment3D >>> p1, p2 = Point3D(0, 0, 0), Point3D(4, 3, 3) >>> s1 = Segment3D(p1, p2) >>> s1.midpoint Point3D(2, 3/2, 3/2) """ return Point.midpoint(self.p1, self.p2) def perpendicular_bisector(self, p=None): """The perpendicular bisector of this segment. If no point is specified or the point specified is not on the bisector then the bisector is returned as a Line. Otherwise a Segment is returned that joins the point specified and the intersection of the bisector and the segment. Parameters ========== p : Point Returns ======= bisector : Line or Segment See Also ======== LinearEntity.perpendicular_segment Examples ======== >>> from sympy import Point, Segment >>> p1, p2, p3 = Point(0, 0), Point(6, 6), Point(5, 1) >>> s1 = Segment(p1, p2) >>> s1.perpendicular_bisector() Line2D(Point2D(3, 3), Point2D(-3, 9)) >>> s1.perpendicular_bisector(p3) Segment2D(Point2D(5, 1), Point2D(3, 3)) """ l = self.perpendicular_line(self.midpoint) if p is not None: p2 = Point(p, dim=self.ambient_dimension) if p2 in l: return Segment(p2, self.midpoint) return l def plot_interval(self, parameter='t'): """The plot interval for the default geometric plot of the Segment gives values that will produce the full segment in a plot. Parameters ========== parameter : str, optional Default value is 't'. Returns ======= plot_interval : list [parameter, lower_bound, upper_bound] Examples ======== >>> from sympy import Point, Segment >>> p1, p2 = Point(0, 0), Point(5, 3) >>> s1 = Segment(p1, p2) >>> s1.plot_interval() [t, 0, 1] """ t = _symbol(parameter, real=True) return [t, 0, 1] class LinearEntity2D(LinearEntity): """A base class for all linear entities (line, ray and segment) in a 2-dimensional Euclidean space. Attributes ========== p1 p2 coefficients slope points Notes ===== This is an abstract class and is not meant to be instantiated. See Also ======== sympy.geometry.entity.GeometryEntity """ @property def bounds(self): """Return a tuple (xmin, ymin, xmax, ymax) representing the bounding rectangle for the geometric figure. """ verts = self.points xs = [p.x for p in verts] ys = [p.y for p in verts] return (min(xs), min(ys), max(xs), max(ys)) def perpendicular_line(self, p): """Create a new Line perpendicular to this linear entity which passes through the point `p`. Parameters ========== p : Point Returns ======= line : Line See Also ======== is_perpendicular, perpendicular_segment Examples ======== >>> from sympy import Point, Line >>> p1, p2, p3 = Point(0, 0), Point(2, 3), Point(-2, 2) >>> l1 = Line(p1, p2) >>> l2 = l1.perpendicular_line(p3) >>> p3 in l2 True >>> l1.is_perpendicular(l2) True """ p = Point(p, dim=self.ambient_dimension) # any two lines in R^2 intersect, so blindly making # a line through p in an orthogonal direction will work return Line(p, p + self.direction.orthogonal_direction) @property def slope(self): """The slope of this linear entity, or infinity if vertical. Returns ======= slope : number or sympy expression See Also ======== coefficients Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(3, 5) >>> l1 = Line(p1, p2) >>> l1.slope 5/3 >>> p3 = Point(0, 4) >>> l2 = Line(p1, p3) >>> l2.slope oo """ d1, d2 = (self.p1 - self.p2).args if d1 == 0: return S.Infinity return simplify(d2/d1) class Line2D(LinearEntity2D, Line): """An infinite line in space 2D. A line is declared with two distinct points or a point and slope as defined using keyword `slope`. Parameters ========== p1 : Point pt : Point slope : sympy expression See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point >>> from sympy.abc import L >>> from sympy.geometry import Line, Segment >>> L = Line(Point(2,3), Point(3,5)) >>> L Line2D(Point2D(2, 3), Point2D(3, 5)) >>> L.points (Point2D(2, 3), Point2D(3, 5)) >>> L.equation() -2x + y + 1 >>> L.coefficients (-2, 1, 1) Instantiate with keyword ``slope``: >>> Line(Point(0, 0), slope=0) Line2D(Point2D(0, 0), Point2D(1, 0)) Instantiate with another linear object >>> s = Segment((0, 0), (0, 1)) >>> Line(s).equation() x """ def __new__(cls, p1, pt=None, slope=None, kwargs): if isinstance(p1, LinearEntity): if pt is not None: raise ValueError('When p1 is a LinearEntity, pt should be None') p1, pt = Point._normalize_dimension(p1.args, dim=2) else: p1 = Point(p1, dim=2) if pt is not None and slope is None: try: p2 = Point(pt, dim=2) except (NotImplementedError, TypeError, ValueError): raise ValueError(filldedent(''' The 2nd argument was not a valid Point. If it was a slope, enter it with keyword "slope". ''')) elif slope is not None and pt is None: slope = sympify(slope) if slope.is_finite is False: # when infinite slope, don't change x dx = 0 dy = 1 else: # go over 1 up slope dx = 1 dy = slope # XXX avoiding simplification by adding to coords directly p2 = Point(p1.x + dx, p1.y + dy, evaluate=False) else: raise ValueError('A 2nd Point or keyword "slope" must be used.') return LinearEntity2D.__new__(cls, p1, p2, *kwargs) def _svg(self, scale_factor=1., fill_color="#66cc99"): """Returns SVG path element for the LinearEntity. Parameters ========== scale_factor : float Multiplication factor for the SVG stroke-width. Default is 1. fill_color : str, optional Hex string for fill color. Default is "#66cc99". """ from sympy.core.evalf import N verts = (N(self.p1), N(self.p2)) coords = ["{0},{1}".format(p.x, p.y) for p in verts] path = "M {0} L {1}".format(coords[0], " L ".join(coords[1:])) return ( '<path fill-rule="evenodd" fill="{2}" stroke="#555555" ' 'stroke-width="{0}" opacity="0.6" d="{1}" ' 'marker-start="url(#markerReverseArrow)" marker-end="url(#markerArrow)"/>' ).format(2. scale_factor, path, fill_color) @property def coefficients(self): """The coefficients (`a`, `b`, `c`) for `ax + by + c = 0`. See Also ======== sympy.geometry.line.Line.equation Examples ======== >>> from sympy import Point, Line >>> from sympy.abc import x, y >>> p1, p2 = Point(0, 0), Point(5, 3) >>> l = Line(p1, p2) >>> l.coefficients (-3, 5, 0) >>> p3 = Point(x, y) >>> l2 = Line(p1, p3) >>> l2.coefficients (-y, x, 0) """ p1, p2 = self.points if p1.x == p2.x: return (S.One, S.Zero, -p1.x) elif p1.y == p2.y: return (S.Zero, S.One, -p1.y) return tuple([simplify(i) for i in (self.p1.y - self.p2.y, self.p2.x - self.p1.x, self.p1.xself.p2.y - self.p1.yself.p2.x)]) def equation(self, x='x', y='y'): """The equation of the line: ax + by + c. Parameters ========== x : str, optional The name to use for the x-axis, default value is 'x'. y : str, optional The name to use for the y-axis, default value is 'y'. Returns ======= equation : sympy expression See Also ======== LinearEntity.coefficients Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(1, 0), Point(5, 3) >>> l1 = Line(p1, p2) >>> l1.equation() -3x + 4y + 3 """ x = _symbol(x, real=True) y = _symbol(y, real=True) p1, p2 = self.points if p1.x == p2.x: return x - p1.x elif p1.y == p2.y: return y - p1.y a, b, c = self.coefficients return ax + by + c class Ray2D(LinearEntity2D, Ray): """ A Ray is a semi-line in the space with a source point and a direction. Parameters ========== p1 : Point The source of the Ray p2 : Point or radian value This point determines the direction in which the Ray propagates. If given as an angle it is interpreted in radians with the positive direction being ccw. Attributes ========== source xdirection ydirection See Also ======== sympy.geometry.point.Point, Line Examples ======== >>> from sympy import Point, pi >>> from sympy.geometry import Ray >>> r = Ray(Point(2, 3), Point(3, 5)) >>> r Ray2D(Point2D(2, 3), Point2D(3, 5)) >>> r.points (Point2D(2, 3), Point2D(3, 5)) >>> r.source Point2D(2, 3) >>> r.xdirection oo >>> r.ydirection oo >>> r.slope 2 >>> Ray(Point(0, 0), angle=pi/4).slope 1 """ def __new__(cls, p1, pt=None, angle=None, *kwargs): p1 = Point(p1, dim=2) if pt is not None and angle is None: try: p2 = Point(pt, dim=2) except (NotImplementedError, TypeError, ValueError): from sympy.utilities.misc import filldedent raise ValueError(filldedent(''' The 2nd argument was not a valid Point; if it was meant to be an angle it should be given with keyword "angle".''')) if p1 == p2: raise ValueError('A Ray requires two distinct points.') elif angle is not None and pt is None: # we need to know if the angle is an odd multiple of pi/2 c = pi_coeff(sympify(angle)) p2 = None if c is not None: if c.is_Rational: if c.q == 2: if c.p == 1: p2 = p1 + Point(0, 1) elif c.p == 3: p2 = p1 + Point(0, -1) elif c.q == 1: if c.p == 0: p2 = p1 + Point(1, 0) elif c.p == 1: p2 = p1 + Point(-1, 0) if p2 is None: c = S.Pi else: c = angle % (2S.Pi) if not p2: m = 2c/S.Pi left = And(1 < m, m < 3) # is it in quadrant 2 or 3? x = Piecewise((-1, left), (Piecewise((0, Eq(m % 1, 0)), (1, True)), True)) y = Piecewise((-tan(c), left), (Piecewise((1, Eq(m, 1)), (-1, Eq(m, 3)), (tan(c), True)), True)) p2 = p1 + Point(x, y) else: raise ValueError('A 2nd point or keyword "angle" must be used.') return LinearEntity2D.__new__(cls, p1, p2, *kwargs) @property def xdirection(self): """The x direction of the ray. Positive infinity if the ray points in the positive x direction, negative infinity if the ray points in the negative x direction, or 0 if the ray is vertical. See Also ======== ydirection Examples ======== >>> from sympy import Point, Ray >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(0, -1) >>> r1, r2 = Ray(p1, p2), Ray(p1, p3) >>> r1.xdirection oo >>> r2.xdirection 0 """ if self.p1.x < self.p2.x: return S.Infinity elif self.p1.x == self.p2.x: return S.Zero else: return S.NegativeInfinity @property def ydirection(self): """The y direction of the ray. Positive infinity if the ray points in the positive y direction, negative infinity if the ray points in the negative y direction, or 0 if the ray is horizontal. See Also ======== xdirection Examples ======== >>> from sympy import Point, Ray >>> p1, p2, p3 = Point(0, 0), Point(-1, -1), Point(-1, 0) >>> r1, r2 = Ray(p1, p2), Ray(p1, p3) >>> r1.ydirection -oo >>> r2.ydirection 0 """ if self.p1.y < self.p2.y: return S.Infinity elif self.p1.y == self.p2.y: return S.Zero else: return S.NegativeInfinity def closing_angle(r1, r2): """Return the angle by which r2 must be rotated so it faces the same direction as r1. Parameters ========== r1 : Ray2D r2 : Ray2D Returns ======= angle : angle in radians (ccw angle is positive) See Also ======== LinearEntity.angle_between Examples ======== >>> from sympy import Ray, pi >>> r1 = Ray((0, 0), (1, 0)) >>> r2 = r1.rotate(-pi/2) >>> angle = r1.closing_angle(r2); angle pi/2 >>> r2.rotate(angle).direction.unit == r1.direction.unit True >>> r2.closing_angle(r1) -pi/2 """ if not all(isinstance(r, Ray2D) for r in (r1, r2)): # although the direction property is defined for # all linear entities, only the Ray is truly a # directed object raise TypeError('Both arguments must be Ray2D objects.') a1 = atan2(list(reversed(r1.direction.args))) a2 = atan2(list(reversed(r2.direction.args))) if a1a2 < 0: a1 = 2S.Pi + a1 if a1 < 0 else a1 a2 = 2S.Pi + a2 if a2 < 0 else a2 return a1 - a2 class Segment2D(LinearEntity2D, Segment): """A line segment in 2D space. Parameters ========== p1 : Point p2 : Point Attributes ========== length : number or sympy expression midpoint : Point See Also ======== sympy.geometry.point.Point, Line Examples ======== >>> from sympy import Point >>> from sympy.geometry import Segment >>> Segment((1, 0), (1, 1)) # tuples are interpreted as pts Segment2D(Point2D(1, 0), Point2D(1, 1)) >>> s = Segment(Point(4, 3), Point(1, 1)); s Segment2D(Point2D(4, 3), Point2D(1, 1)) >>> s.points (Point2D(4, 3), Point2D(1, 1)) >>> s.slope 2/3 >>> s.length sqrt(13) >>> s.midpoint Point2D(5/2, 2) """ def __new__(cls, p1, p2, kwargs): p1 = Point(p1, dim=2) p2 = Point(p2, dim=2) if p1 == p2: return p1 return LinearEntity2D.__new__(cls, p1, p2, kwargs) def _svg(self, scale_factor=1., fill_color="#66cc99"): """Returns SVG path element for the LinearEntity. Parameters ========== scale_factor : float Multiplication factor for the SVG stroke-width. Default is 1. fill_color : str, optional Hex string for fill color. Default is "#66cc99". """ from sympy.core.evalf import N verts = (N(self.p1), N(self.p2)) coords = ["{0},{1}".format(p.x, p.y) for p in verts] path = "M {0} L {1}".format(coords[0], " L ".join(coords[1:])) return ( '<path fill-rule="evenodd" fill="{2}" stroke="#555555" ' 'stroke-width="{0}" opacity="0.6" d="{1}" />' ).format(2. * scale_factor, path, fill_color) class LinearEntity3D(LinearEntity): """An base class for all linear entities (line, ray and segment) in a 3-dimensional Euclidean space. Attributes ========== p1 p2 direction_ratio direction_cosine points Notes ===== This is a base class and is not meant to be instantiated. """ def __new__(cls, p1, p2, kwargs): p1 = Point3D(p1, dim=3) p2 = Point3D(p2, dim=3) if p1 == p2: # if it makes sense to return a Point, handle in subclass raise ValueError( "%s.__new__ requires two unique Points." % cls.__name__) return GeometryEntity.__new__(cls, p1, p2, kwargs) ambient_dimension = 3 @property def direction_ratio(self): """The direction ratio of a given line in 3D. See Also ======== sympy.geometry.line.Line.equation Examples ======== >>> from sympy import Point3D, Line3D >>> p1, p2 = Point3D(0, 0, 0), Point3D(5, 3, 1) >>> l = Line3D(p1, p2) >>> l.direction_ratio [5, 3, 1] """ p1, p2 = self.points return p1.direction_ratio(p2) @property def direction_cosine(self): """The normalized direction ratio of a given line in 3D. See Also ======== sympy.geometry.line.Line.equation Examples ======== >>> from sympy import Point3D, Line3D >>> p1, p2 = Point3D(0, 0, 0), Point3D(5, 3, 1) >>> l = Line3D(p1, p2) >>> l.direction_cosine [sqrt(35)/7, 3sqrt(35)/35, sqrt(35)/35] >>> sum(i2 for i in _) 1 """ p1, p2 = self.points return p1.direction_cosine(p2) class Line3D(LinearEntity3D, Line): """An infinite 3D line in space. A line is declared with two distinct points or a point and direction_ratio as defined using keyword `direction_ratio`. Parameters ========== p1 : Point3D pt : Point3D direction_ratio : list See Also ======== sympy.geometry.point.Point3D sympy.geometry.line.Line sympy.geometry.line.Line2D Examples ======== >>> from sympy import Point3D >>> from sympy.geometry import Line3D, Segment3D >>> L = Line3D(Point3D(2, 3, 4), Point3D(3, 5, 1)) >>> L Line3D(Point3D(2, 3, 4), Point3D(3, 5, 1)) >>> L.points (Point3D(2, 3, 4), Point3D(3, 5, 1)) """ def __new__(cls, p1, pt=None, direction_ratio=[], kwargs): if isinstance(p1, LinearEntity3D): if pt is not None: raise ValueError('if p1 is a LinearEntity, pt must be None.') p1, pt = p1.args else: p1 = Point(p1, dim=3) if pt is not None and len(direction_ratio) == 0: pt = Point(pt, dim=3) elif len(direction_ratio) == 3 and pt is None: pt = Point3D(p1.x + direction_ratio[0], p1.y + direction_ratio[1], p1.z + direction_ratio[2]) else: raise ValueError('A 2nd Point or keyword "direction_ratio" must ' 'be used.') return LinearEntity3D.__new__(cls, p1, pt, kwargs) def equation(self, x='x', y='y', z='z', k=None): """Return the equations that define the line in 3D. Parameters ========== x : str, optional The name to use for the x-axis, default value is 'x'. y : str, optional The name to use for the y-axis, default value is 'y'. z : str, optional The name to use for the z-axis, default value is 'z'. Returns ======= equation : Tuple of simultaneous equations Examples ======== >>> from sympy import Point3D, Line3D, solve >>> from sympy.abc import x, y, z >>> p1, p2 = Point3D(1, 0, 0), Point3D(5, 3, 0) >>> l1 = Line3D(p1, p2) >>> eq = l1.equation(x, y, z); eq (-3x + 4y + 3, z) >>> solve(eq.subs(z, 0), (x, y, z)) {x: 4y/3 + 1} """ if k is not None: SymPyDeprecationWarning( feature="equation() no longer needs 'k'", issue=13742, deprecated_since_version="1.2").warn() from sympy import solve x, y, z, k = [_symbol(i, real=True) for i in (x, y, z, 'k')] p1, p2 = self.points d1, d2, d3 = p1.direction_ratio(p2) x1, y1, z1 = p1 v = (x, y, z) eqs = [-d1k + x - x1, -d2k + y - y1, -d3k + z - z1] # eliminate k from equations by solving first eq with k for k for i, e in enumerate(eqs): if e.has(k): kk = solve(eqs[i], k)[0] eqs.pop(i) break return Tuple([i.subs(k, kk).as_numer_denom()[0] for i in eqs]) class Ray3D(LinearEntity3D, Ray): """ A Ray is a semi-line in the space with a source point and a direction. Parameters ========== p1 : Point3D The source of the Ray p2 : Point or a direction vector direction_ratio: Determines the direction in which the Ray propagates. Attributes ========== source xdirection ydirection zdirection See Also ======== sympy.geometry.point.Point3D, Line3D Examples ======== >>> from sympy import Point3D >>> from sympy.geometry import Ray3D >>> r = Ray3D(Point3D(2, 3, 4), Point3D(3, 5, 0)) >>> r Ray3D(Point3D(2, 3, 4), Point3D(3, 5, 0)) >>> r.points (Point3D(2, 3, 4), Point3D(3, 5, 0)) >>> r.source Point3D(2, 3, 4) >>> r.xdirection oo >>> r.ydirection oo >>> r.direction_ratio [1, 2, -4] """ def __new__(cls, p1, pt=None, direction_ratio=[], kwargs): from sympy.utilities.misc import filldedent if isinstance(p1, LinearEntity3D): if pt is not None: raise ValueError('If p1 is a LinearEntity, pt must be None') p1, pt = p1.args else: p1 = Point(p1, dim=3) if pt is not None and len(direction_ratio) == 0: pt = Point(pt, dim=3) elif len(direction_ratio) == 3 and pt is None: pt = Point3D(p1.x + direction_ratio[0], p1.y + direction_ratio[1], p1.z + direction_ratio[2]) else: raise ValueError(filldedent(''' A 2nd Point or keyword "direction_ratio" must be used. ''')) return LinearEntity3D.__new__(cls, p1, pt, kwargs) @property def xdirection(self): """The x direction of the ray. Positive infinity if the ray points in the positive x direction, negative infinity if the ray points in the negative x direction, or 0 if the ray is vertical. See Also ======== ydirection Examples ======== >>> from sympy import Point3D, Ray3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(0, -1, 0) >>> r1, r2 = Ray3D(p1, p2), Ray3D(p1, p3) >>> r1.xdirection oo >>> r2.xdirection 0 """ if self.p1.x < self.p2.x: return S.Infinity elif self.p1.x == self.p2.x: return S.Zero else: return S.NegativeInfinity @property def ydirection(self): """The y direction of the ray. Positive infinity if the ray points in the positive y direction, negative infinity if the ray points in the negative y direction, or 0 if the ray is horizontal. See Also ======== xdirection Examples ======== >>> from sympy import Point3D, Ray3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(-1, -1, -1), Point3D(-1, 0, 0) >>> r1, r2 = Ray3D(p1, p2), Ray3D(p1, p3) >>> r1.ydirection -oo >>> r2.ydirection 0 """ if self.p1.y < self.p2.y: return S.Infinity elif self.p1.y == self.p2.y: return S.Zero else: return S.NegativeInfinity @property def zdirection(self): """The z direction of the ray. Positive infinity if the ray points in the positive z direction, negative infinity if the ray points in the negative z direction, or 0 if the ray is horizontal. See Also ======== xdirection Examples ======== >>> from sympy import Point3D, Ray3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(-1, -1, -1), Point3D(-1, 0, 0) >>> r1, r2 = Ray3D(p1, p2), Ray3D(p1, p3) >>> r1.ydirection -oo >>> r2.ydirection 0 >>> r2.zdirection 0 """ if self.p1.z < self.p2.z: return S.Infinity elif self.p1.z == self.p2.z: return S.Zero else: return S.NegativeInfinity class Segment3D(LinearEntity3D, Segment): """A line segment in a 3D space. Parameters ========== p1 : Point3D p2 : Point3D Attributes ========== length : number or sympy expression midpoint : Point3D See Also ======== sympy.geometry.point.Point3D, Line3D Examples ======== >>> from sympy import Point3D >>> from sympy.geometry import Segment3D >>> Segment3D((1, 0, 0), (1, 1, 1)) # tuples are interpreted as pts Segment3D(Point3D(1, 0, 0), Point3D(1, 1, 1)) >>> s = Segment3D(Point3D(4, 3, 9), Point3D(1, 1, 7)); s Segment3D(Point3D(4, 3, 9), Point3D(1, 1, 7)) >>> s.points (Point3D(4, 3, 9), Point3D(1, 1, 7)) >>> s.length sqrt(17) >>> s.midpoint Point3D(5/2, 2, 8) """ def __new__(cls, p1, p2, kwargs): p1 = Point(p1, dim=3) p2 = Point(p2, dim=3) if p1 == p2: return p1 return LinearEntity3D.__new__(cls, p1, p2, kwargs)
f89ecc91349d43196d88a1534c7f1ee6c098c85fde9aee2f1bd6c2ce9ed9b8df	""" This module implements Holonomic Functions and various operations on them. """ from __future__ import print_function, division from sympy import (Symbol, S, Dummy, Order, rf, meijerint, I, solve, limit, Float, nsimplify, gamma) from sympy.core.compatibility import range, ordered, string_types from sympy.core.numbers import NaN, Infinity, NegativeInfinity from sympy.core.sympify import sympify from sympy.functions.combinatorial.factorials import binomial, factorial from sympy.functions.elementary.exponential import exp_polar, exp from sympy.functions.special.hyper import hyper, meijerg from sympy.matrices import Matrix from sympy.polys.rings import PolyElement from sympy.polys.fields import FracElement from sympy.polys.domains import QQ, RR from sympy.polys.polyclasses import DMF from sympy.polys.polyroots import roots from sympy.polys.polytools import Poly from sympy.printing import sstr from sympy.simplify.hyperexpand import hyperexpand from .linearsolver import NewMatrix from .recurrence import HolonomicSequence, RecurrenceOperator, RecurrenceOperators from .holonomicerrors import (NotPowerSeriesError, NotHyperSeriesError, SingularityError, NotHolonomicError) def DifferentialOperators(base, generator): r""" This function is used to create annihilators using ``Dx``. Returns an Algebra of Differential Operators also called Weyl Algebra and the operator for differentiation i.e. the ``Dx`` operator. Parameters ========== base: Base polynomial ring for the algebra. The base polynomial ring is the ring of polynomials in :math:`x` that will appear as coefficients in the operators. generator: Generator of the algebra which can be either a noncommutative ``Symbol`` or a string. e.g. "Dx" or "D". Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.abc import x >>> from sympy.holonomic.holonomic import DifferentialOperators >>> R, Dx = DifferentialOperators(ZZ.old_poly_ring(x), 'Dx') >>> R Univariate Differential Operator Algebra in intermediate Dx over the base ring ZZ[x] >>> Dxx (1) + (x)Dx """ ring = DifferentialOperatorAlgebra(base, generator) return (ring, ring.derivative_operator) class DifferentialOperatorAlgebra(object): r""" An Ore Algebra is a set of noncommutative polynomials in the intermediate ``Dx`` and coefficients in a base polynomial ring :math:`A`. It follows the commutation rule: .. math :: Dxa = \sigma(a)Dx + \delta(a) for :math:`a \subset A`. Where :math:`\sigma: A --> A` is an endomorphism and :math:`\delta: A --> A` is a skew-derivation i.e. :math:`\delta(ab) = \delta(a) * b + \sigma(a) * \delta(b)`. If one takes the sigma as identity map and delta as the standard derivation then it becomes the algebra of Differential Operators also called a Weyl Algebra i.e. an algebra whose elements are Differential Operators. This class represents a Weyl Algebra and serves as the parent ring for Differential Operators. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy import symbols >>> from sympy.holonomic.holonomic import DifferentialOperators >>> x = symbols('x') >>> R, Dx = DifferentialOperators(ZZ.old_poly_ring(x), 'Dx') >>> R Univariate Differential Operator Algebra in intermediate Dx over the base ring ZZ[x] See Also ======== DifferentialOperator """ def __init__(self, base, generator): # the base polynomial ring for the algebra self.base = base # the operator representing differentiation i.e. `Dx` self.derivative_operator = DifferentialOperator( [base.zero, base.one], self) if generator is None: self.gen_symbol = Symbol('Dx', commutative=False) else: if isinstance(generator, string_types): self.gen_symbol = Symbol(generator, commutative=False) elif isinstance(generator, Symbol): self.gen_symbol = generator def __str__(self): string = 'Univariate Differential Operator Algebra in intermediate '\ + sstr(self.gen_symbol) + ' over the base ring ' + \ (self.base).__str__() return string __repr__ = __str__ def __eq__(self, other): if self.base == other.base and self.gen_symbol == other.gen_symbol: return True else: return False class DifferentialOperator(object): """ Differential Operators are elements of Weyl Algebra. The Operators are defined by a list of polynomials in the base ring and the parent ring of the Operator i.e. the algebra it belongs to. Takes a list of polynomials for each power of ``Dx`` and the parent ring which must be an instance of DifferentialOperatorAlgebra. A Differential Operator can be created easily using the operator ``Dx``. See examples below. Examples ======== >>> from sympy.holonomic.holonomic import DifferentialOperator, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(ZZ.old_poly_ring(x),'Dx') >>> DifferentialOperator([0, 1, x*2], R) (1)Dx + (x*2)Dx*2 >>> (xDxx + 1 - Dx2)2 (2x*2 + 2x + 1) + (4x3 + 2x*2 - 4)Dx + (x*4 - 6x - 2)Dx2 + (-2x*2)Dx*3 + (1)Dx*4 See Also ======== DifferentialOperatorAlgebra """ _op_priority = 20 def __init__(self, list_of_poly, parent): """ Parameters ========== list_of_poly: List of polynomials belonging to the base ring of the algebra. parent: Parent algebra of the operator. """ # the parent ring for this operator # must be an DifferentialOperatorAlgebra object self.parent = parent base = self.parent.base self.x = base.gens[0] if isinstance(base.gens[0], Symbol) else base.gens[0][0] # sequence of polynomials in x for each power of Dx # the list should not have trailing zeroes # represents the operator # convert the expressions into ring elements using from_sympy for i, j in enumerate(list_of_poly): if not isinstance(j, base.dtype): list_of_poly[i] = base.from_sympy(sympify(j)) else: list_of_poly[i] = base.from_sympy(base.to_sympy(j)) self.listofpoly = list_of_poly # highest power of `Dx` self.order = len(self.listofpoly) - 1 def __mul__(self, other): """ Multiplies two DifferentialOperator and returns another DifferentialOperator instance using the commutation rule Dxa = aDx + a' """ listofself = self.listofpoly if not isinstance(other, DifferentialOperator): if not isinstance(other, self.parent.base.dtype): listofother = [self.parent.base.from_sympy(sympify(other))] else: listofother = [other] else: listofother = other.listofpoly # multiplies a polynomial `b` with a list of polynomials def _mul_dmp_diffop(b, listofother): if isinstance(listofother, list): sol = [] for i in listofother: sol.append(i b) return sol else: return [b * listofother] sol = _mul_dmp_diffop(listofself[0], listofother) # compute Dx^i * b def _mul_Dxi_b(b): sol1 = [self.parent.base.zero] sol2 = [] if isinstance(b, list): for i in b: sol1.append(i) sol2.append(i.diff()) else: sol1.append(self.parent.base.from_sympy(b)) sol2.append(self.parent.base.from_sympy(b).diff()) return _add_lists(sol1, sol2) for i in range(1, len(listofself)): # find Dx^i * b in ith iteration listofother = _mul_Dxi_b(listofother) # solution = solution + listofself[i] * (Dx^i * b) sol = _add_lists(sol, _mul_dmp_diffop(listofself[i], listofother)) return DifferentialOperator(sol, self.parent) def __rmul__(self, other): if not isinstance(other, DifferentialOperator): if not isinstance(other, self.parent.base.dtype): other = (self.parent.base).from_sympy(sympify(other)) sol = [] for j in self.listofpoly: sol.append(other * j) return DifferentialOperator(sol, self.parent) def __add__(self, other): if isinstance(other, DifferentialOperator): sol = _add_lists(self.listofpoly, other.listofpoly) return DifferentialOperator(sol, self.parent) else: list_self = self.listofpoly if not isinstance(other, self.parent.base.dtype): list_other = [((self.parent).base).from_sympy(sympify(other))] else: list_other = [other] sol = [] sol.append(list_self[0] + list_other[0]) sol += list_self[1:] return DifferentialOperator(sol, self.parent) __radd__ = __add__ def __sub__(self, other): return self + (-1) * other def __rsub__(self, other): return (-1) * self + other def __neg__(self): return -1 * self def __div__(self, other): return self * (S.One / other) def __truediv__(self, other): return self.__div__(other) def __pow__(self, n): if n == 1: return self if n == 0: return DifferentialOperator([self.parent.base.one], self.parent) # if self is `Dx` if self.listofpoly == self.parent.derivative_operator.listofpoly: sol = [] for i in range(0, n): sol.append(self.parent.base.zero) sol.append(self.parent.base.one) return DifferentialOperator(sol, self.parent) # the general case else: if n % 2 == 1: powreduce = self*(n - 1) return powreduce self elif n % 2 == 0: powreduce = self*(n / 2) return powreduce powreduce def __str__(self): listofpoly = self.listofpoly print_str = '' for i, j in enumerate(listofpoly): if j == self.parent.base.zero: continue if i == 0: print_str += '(' + sstr(j) + ')' continue if print_str: print_str += ' + ' if i == 1: print_str += '(' + sstr(j) + ')%s' %(self.parent.gen_symbol) continue print_str += '(' + sstr(j) + ')' + '%s' %(self.parent.gen_symbol) + sstr(i) return print_str __repr__ = __str__ def __eq__(self, other): if isinstance(other, DifferentialOperator): if self.listofpoly == other.listofpoly and self.parent == other.parent: return True else: return False else: if self.listofpoly[0] == other: for i in self.listofpoly[1:]: if i is not self.parent.base.zero: return False return True else: return False def is_singular(self, x0): """ Checks if the differential equation is singular at x0. """ base = self.parent.base return x0 in roots(base.to_sympy(self.listofpoly[-1]), self.x) class HolonomicFunction(object): r""" A Holonomic Function is a solution to a linear homogeneous ordinary differential equation with polynomial coefficients. This differential equation can also be represented by an annihilator i.e. a Differential Operator ``L`` such that :math:`L.f = 0`. For uniqueness of these functions, initial conditions can also be provided along with the annihilator. Holonomic functions have closure properties and thus forms a ring. Given two Holonomic Functions f and g, their sum, product, integral and derivative is also a Holonomic Function. For ordinary points initial condition should be a vector of values of the derivatives i.e. :math:`[y(x_0), y'(x_0), y''(x_0) ... ]`. For regular singular points initial conditions can also be provided in this format: :math:`{s0: [C_0, C_1, ...], s1: [C^1_0, C^1_1, ...], ...}` where s0, s1, ... are the roots of indicial equation and vectors :math:`[C_0, C_1, ...], [C^0_0, C^0_1, ...], ...` are the corresponding initial terms of the associated power series. See Examples below. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols, S >>> x = symbols('x') >>> R, Dx = DifferentialOperators(QQ.old_poly_ring(x),'Dx') >>> p = HolonomicFunction(Dx - 1, x, 0, [1]) # e^x >>> q = HolonomicFunction(Dx2 + 1, x, 0, [0, 1]) # sin(x) >>> p + q # annihilator of e^x + sin(x) HolonomicFunction((-1) + (1)Dx + (-1)Dx*2 + (1)Dx*3, x, 0, [1, 2, 1]) >>> p q # annihilator of e^x * sin(x) HolonomicFunction((2) + (-2)Dx + (1)Dx*2, x, 0, [0, 1]) An example of initial conditions for regular singular points, the indicial equation has only one root `1/2`. >>> HolonomicFunction(-S(1)/2 + xDx, x, 0, {S(1)/2: [1]}) HolonomicFunction((-1/2) + (x)Dx, x, 0, {1/2: [1]}) >>> HolonomicFunction(-S(1)/2 + xDx, x, 0, {S(1)/2: [1]}).to_expr() sqrt(x) To plot a Holonomic Function, one can use `.evalf()` for numerical computation. Here's an example on `sin(x)2/x` using numpy and matplotlib. >>> import sympy.holonomic # doctest: +SKIP >>> from sympy import var, sin # doctest: +SKIP >>> import matplotlib.pyplot as plt # doctest: +SKIP >>> import numpy as np # doctest: +SKIP >>> var("x") # doctest: +SKIP >>> r = np.linspace(1, 5, 100) # doctest: +SKIP >>> y = sympy.holonomic.expr_to_holonomic(sin(x)2/x, x0=1).evalf(r) # doctest: +SKIP >>> plt.plot(r, y, label="holonomic function") # doctest: +SKIP >>> plt.show() # doctest: +SKIP """ _op_priority = 20 def __init__(self, annihilator, x, x0=0, y0=None): """ Parameters ========== annihilator: Annihilator of the Holonomic Function, represented by a `DifferentialOperator` object. x: Variable of the function. x0: The point at which initial conditions are stored. Generally an integer. y0: The initial condition. The proper format for the initial condition is described in class docstring. To make the function unique, length of the vector `y0` should be equal to or greater than the order of differential equation. """ # initial condition self.y0 = y0 # the point for initial conditions, default is zero. self.x0 = x0 # differential operator L such that L.f = 0 self.annihilator = annihilator self.x = x def __str__(self): if self._have_init_cond(): str_sol = 'HolonomicFunction(%s, %s, %s, %s)' % (str(self.annihilator),\ sstr(self.x), sstr(self.x0), sstr(self.y0)) else: str_sol = 'HolonomicFunction(%s, %s)' % (str(self.annihilator),\ sstr(self.x)) return str_sol __repr__ = __str__ def unify(self, other): """ Unifies the base polynomial ring of a given two Holonomic Functions. """ R1 = self.annihilator.parent.base R2 = other.annihilator.parent.base dom1 = R1.dom dom2 = R2.dom if R1 == R2: return (self, other) R = (dom1.unify(dom2)).old_poly_ring(self.x) newparent, _ = DifferentialOperators(R, str(self.annihilator.parent.gen_symbol)) sol1 = [R1.to_sympy(i) for i in self.annihilator.listofpoly] sol2 = [R2.to_sympy(i) for i in other.annihilator.listofpoly] sol1 = DifferentialOperator(sol1, newparent) sol2 = DifferentialOperator(sol2, newparent) sol1 = HolonomicFunction(sol1, self.x, self.x0, self.y0) sol2 = HolonomicFunction(sol2, other.x, other.x0, other.y0) return (sol1, sol2) def is_singularics(self): """ Returns True if the function have singular initial condition in the dictionary format. Returns False if the function have ordinary initial condition in the list format. Returns None for all other cases. """ if isinstance(self.y0, dict): return True elif isinstance(self.y0, list): return False def _have_init_cond(self): """ Checks if the function have initial condition. """ return bool(self.y0) def _singularics_to_ord(self): """ Converts a singular initial condition to ordinary if possible. """ a = list(self.y0)[0] b = self.y0[a] if len(self.y0) == 1 and a == int(a) and a > 0: y0 = [] a = int(a) for i in range(a): y0.append(S(0)) y0 += [j * factorial(a + i) for i, j in enumerate(b)] return HolonomicFunction(self.annihilator, self.x, self.x0, y0) def __add__(self, other): # if the ground domains are different if self.annihilator.parent.base != other.annihilator.parent.base: a, b = self.unify(other) return a + b deg1 = self.annihilator.order deg2 = other.annihilator.order dim = max(deg1, deg2) R = self.annihilator.parent.base K = R.get_field() rowsself = [self.annihilator] rowsother = [other.annihilator] gen = self.annihilator.parent.derivative_operator # constructing annihilators up to order dim for i in range(dim - deg1): diff1 = (gen * rowsself[-1]) rowsself.append(diff1) for i in range(dim - deg2): diff2 = (gen * rowsother[-1]) rowsother.append(diff2) row = rowsself + rowsother # constructing the matrix of the ansatz r = [] for expr in row: p = [] for i in range(dim + 1): if i >= len(expr.listofpoly): p.append(0) else: p.append(K.new(expr.listofpoly[i].rep)) r.append(p) r = NewMatrix(r).transpose() homosys = [[S(0) for q in range(dim + 1)]] homosys = NewMatrix(homosys).transpose() # solving the linear system using gauss jordan solver solcomp = r.gauss_jordan_solve(homosys) sol = solcomp[0] # if a solution is not obtained then increasing the order by 1 in each # iteration while sol.is_zero: dim += 1 diff1 = (gen * rowsself[-1]) rowsself.append(diff1) diff2 = (gen * rowsother[-1]) rowsother.append(diff2) row = rowsself + rowsother r = [] for expr in row: p = [] for i in range(dim + 1): if i >= len(expr.listofpoly): p.append(S(0)) else: p.append(K.new(expr.listofpoly[i].rep)) r.append(p) r = NewMatrix(r).transpose() homosys = [[S(0) for q in range(dim + 1)]] homosys = NewMatrix(homosys).transpose() solcomp = r.gauss_jordan_solve(homosys) sol = solcomp[0] # taking only the coefficients needed to multiply with `self` # can be also be done the other way by taking R.H.S and multiplying with # `other` sol = sol[:dim + 1 - deg1] sol1 = _normalize(sol, self.annihilator.parent) # annihilator of the solution sol = sol1 * (self.annihilator) sol = _normalize(sol.listofpoly, self.annihilator.parent, negative=False) if not (self._have_init_cond() and other._have_init_cond()): return HolonomicFunction(sol, self.x) # both the functions have ordinary initial conditions if self.is_singularics() == False and other.is_singularics() == False: # directly add the corresponding value if self.x0 == other.x0: # try to extended the initial conditions # using the annihilator y1 = _extend_y0(self, sol.order) y2 = _extend_y0(other, sol.order) y0 = [a + b for a, b in zip(y1, y2)] return HolonomicFunction(sol, self.x, self.x0, y0) else: # change the intiial conditions to a same point selfat0 = self.annihilator.is_singular(0) otherat0 = other.annihilator.is_singular(0) if self.x0 == 0 and not selfat0 and not otherat0: return self + other.change_ics(0) elif other.x0 == 0 and not selfat0 and not otherat0: return self.change_ics(0) + other else: selfatx0 = self.annihilator.is_singular(self.x0) otheratx0 = other.annihilator.is_singular(self.x0) if not selfatx0 and not otheratx0: return self + other.change_ics(self.x0) else: return self.change_ics(other.x0) + other if self.x0 != other.x0: return HolonomicFunction(sol, self.x) # if the functions have singular_ics y1 = None y2 = None if self.is_singularics() == False and other.is_singularics() == True: # convert the ordinary initial condition to singular. _y0 = [j / factorial(i) for i, j in enumerate(self.y0)] y1 = {S(0): _y0} y2 = other.y0 elif self.is_singularics() == True and other.is_singularics() == False: _y0 = [j / factorial(i) for i, j in enumerate(other.y0)] y1 = self.y0 y2 = {S(0): _y0} elif self.is_singularics() == True and other.is_singularics() == True: y1 = self.y0 y2 = other.y0 # computing singular initial condition for the result # taking union of the series terms of both functions y0 = {} for i in y1: # add corresponding initial terms if the power # on `x` is same if i in y2: y0[i] = [a + b for a, b in zip(y1[i], y2[i])] else: y0[i] = y1[i] for i in y2: if not i in y1: y0[i] = y2[i] return HolonomicFunction(sol, self.x, self.x0, y0) def integrate(self, limits, initcond=False): """ Integrates the given holonomic function. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(QQ.old_poly_ring(x),'Dx') >>> HolonomicFunction(Dx - 1, x, 0, [1]).integrate((x, 0, x)) # e^x - 1 HolonomicFunction((-1)Dx + (1)Dx2, x, 0, [0, 1]) >>> HolonomicFunction(Dx2 + 1, x, 0, [1, 0]).integrate((x, 0, x)) HolonomicFunction((1)Dx + (1)Dx*3, x, 0, [0, 1, 0]) """ # to get the annihilator, just multiply by Dx from right D = self.annihilator.parent.derivative_operator # if the function have initial conditions of the series format if self.is_singularics() == True: r = self._singularics_to_ord() if r: return r.integrate(limits, initcond=initcond) # computing singular initial condition for the function # produced after integration. y0 = {} for i in self.y0: c = self.y0[i] c2 = [] for j in range(len(c)): if c[j] == 0: c2.append(S(0)) # if power on `x` is -1, the integration becomes log(x) # TODO: Implement this case elif i + j + 1 == 0: raise NotImplementedError("logarithmic terms in the series are not supported") else: c2.append(c[j] / S(i + j + 1)) y0[i + 1] = c2 if hasattr(limits, "__iter__"): raise NotImplementedError("Definite integration for singular initial conditions") return HolonomicFunction(self.annihilator D, self.x, self.x0, y0) # if no initial conditions are available for the function if not self._have_init_cond(): if initcond: return HolonomicFunction(self.annihilator * D, self.x, self.x0, [S(0)]) return HolonomicFunction(self.annihilator * D, self.x) # definite integral # initial conditions for the answer will be stored at point `a`, # where `a` is the lower limit of the integrand if hasattr(limits, "__iter__"): if len(limits) == 3 and limits[0] == self.x: x0 = self.x0 a = limits[1] b = limits[2] definite = True else: definite = False y0 = [S(0)] y0 += self.y0 indefinite_integral = HolonomicFunction(self.annihilator * D, self.x, self.x0, y0) if not definite: return indefinite_integral # use evalf to get the values at `a` if x0 != a: try: indefinite_expr = indefinite_integral.to_expr() except (NotHyperSeriesError, NotPowerSeriesError): indefinite_expr = None if indefinite_expr: lower = indefinite_expr.subs(self.x, a) if isinstance(lower, NaN): lower = indefinite_expr.limit(self.x, a) else: lower = indefinite_integral.evalf(a) if b == self.x: y0[0] = y0[0] - lower return HolonomicFunction(self.annihilator * D, self.x, x0, y0) elif S(b).is_Number: if indefinite_expr: upper = indefinite_expr.subs(self.x, b) if isinstance(upper, NaN): upper = indefinite_expr.limit(self.x, b) else: upper = indefinite_integral.evalf(b) return upper - lower # if the upper limit is `x`, the answer will be a function if b == self.x: return HolonomicFunction(self.annihilator * D, self.x, a, y0) # if the upper limits is a Number, a numerical value will be returned elif S(b).is_Number: try: s = HolonomicFunction(self.annihilator * D, self.x, a,\ y0).to_expr() indefinite = s.subs(self.x, b) if not isinstance(indefinite, NaN): return indefinite else: return s.limit(self.x, b) except (NotHyperSeriesError, NotPowerSeriesError): return HolonomicFunction(self.annihilator * D, self.x, a, y0).evalf(b) return HolonomicFunction(self.annihilator * D, self.x) def diff(self, args, kwargs): r""" Differentiation of the given Holonomic function. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(ZZ.old_poly_ring(x),'Dx') >>> HolonomicFunction(Dx2 + 1, x, 0, [0, 1]).diff().to_expr() cos(x) >>> HolonomicFunction(Dx - 2, x, 0, [1]).diff().to_expr() 2exp(2x) See Also ======== .integrate() """ kwargs.setdefault('evaluate', True) if args: if args[0] != self.x: return S(0) elif len(args) == 2: sol = self for i in range(args[1]): sol = sol.diff(args[0]) return sol ann = self.annihilator # if the function is constant. if ann.listofpoly[0] == ann.parent.base.zero and ann.order == 1: return S(0) # if the coefficient of y in the differential equation is zero. # a shifting is done to compute the answer in this case. elif ann.listofpoly[0] == ann.parent.base.zero: sol = DifferentialOperator(ann.listofpoly[1:], ann.parent) if self._have_init_cond(): # if ordinary initial condition if self.is_singularics() == False: return HolonomicFunction(sol, self.x, self.x0, self.y0[1:]) # TODO: support for singular initial condition return HolonomicFunction(sol, self.x) else: return HolonomicFunction(sol, self.x) # the general algorithm R = ann.parent.base K = R.get_field() seq_dmf = [K.new(i.rep) for i in ann.listofpoly] # -y = a1y'/a0 + a2y''/a0 ... + any^n/a0 rhs = [i / seq_dmf[0] for i in seq_dmf[1:]] rhs.insert(0, K.zero) # differentiate both lhs and rhs sol = _derivate_diff_eq(rhs) # add the term y' in lhs to rhs sol = _add_lists(sol, [K.zero, K.one]) sol = _normalize(sol[1:], self.annihilator.parent, negative=False) if not self._have_init_cond() or self.is_singularics() == True: return HolonomicFunction(sol, self.x) y0 = _extend_y0(self, sol.order + 1)[1:] return HolonomicFunction(sol, self.x, self.x0, y0) def __eq__(self, other): if self.annihilator == other.annihilator: if self.x == other.x: if self._have_init_cond() and other._have_init_cond(): if self.x0 == other.x0 and self.y0 == other.y0: return True else: return False else: return True else: return False else: return False def __mul__(self, other): ann_self = self.annihilator if not isinstance(other, HolonomicFunction): other = sympify(other) if other.has(self.x): raise NotImplementedError(" Can't multiply a HolonomicFunction and expressions/functions.") if not self._have_init_cond(): return self else: y0 = _extend_y0(self, ann_self.order) y1 = [] for j in y0: y1.append((Poly.new(j, self.x) * other).rep) return HolonomicFunction(ann_self, self.x, self.x0, y1) if self.annihilator.parent.base != other.annihilator.parent.base: a, b = self.unify(other) return a * b ann_other = other.annihilator list_self = [] list_other = [] a = ann_self.order b = ann_other.order R = ann_self.parent.base K = R.get_field() for j in ann_self.listofpoly: list_self.append(K.new(j.rep)) for j in ann_other.listofpoly: list_other.append(K.new(j.rep)) # will be used to reduce the degree self_red = [-list_self[i] / list_self[a] for i in range(a)] other_red = [-list_other[i] / list_other[b] for i in range(b)] # coeff_mull[i][j] is the coefficient of Dx^i(f).Dx^j(g) coeff_mul = [[S(0) for i in range(b + 1)] for j in range(a + 1)] coeff_mul[0][0] = S(1) # making the ansatz lin_sys = [[coeff_mul[i][j] for i in range(a) for j in range(b)]] homo_sys = [[S(0) for q in range(a * b)]] homo_sys = NewMatrix(homo_sys).transpose() sol = (NewMatrix(lin_sys).transpose()).gauss_jordan_solve(homo_sys) # until a non trivial solution is found while sol[0].is_zero: # updating the coefficients Dx^i(f).Dx^j(g) for next degree for i in range(a - 1, -1, -1): for j in range(b - 1, -1, -1): coeff_mul[i][j + 1] += coeff_mul[i][j] coeff_mul[i + 1][j] += coeff_mul[i][j] if isinstance(coeff_mul[i][j], K.dtype): coeff_mul[i][j] = DMFdiff(coeff_mul[i][j]) else: coeff_mul[i][j] = coeff_mul[i][j].diff(self.x) # reduce the terms to lower power using annihilators of f, g for i in range(a + 1): if not coeff_mul[i][b] == S(0): for j in range(b): coeff_mul[i][j] += other_red[j] * \ coeff_mul[i][b] coeff_mul[i][b] = S(0) # not d2 + 1, as that is already covered in previous loop for j in range(b): if not coeff_mul[a][j] == 0: for i in range(a): coeff_mul[i][j] += self_red[i] * \ coeff_mul[a][j] coeff_mul[a][j] = S(0) lin_sys.append([coeff_mul[i][j] for i in range(a) for j in range(b)]) sol = (NewMatrix(lin_sys).transpose()).gauss_jordan_solve(homo_sys) sol_ann = _normalize(sol[0][0:], self.annihilator.parent, negative=False) if not (self._have_init_cond() and other._have_init_cond()): return HolonomicFunction(sol_ann, self.x) if self.is_singularics() == False and other.is_singularics() == False: # if both the conditions are at same point if self.x0 == other.x0: # try to find more initial conditions y0_self = _extend_y0(self, sol_ann.order) y0_other = _extend_y0(other, sol_ann.order) # h(x0) = f(x0) * g(x0) y0 = [y0_self[0] * y0_other[0]] # coefficient of Dx^j(f)Dx^i(g) in Dx^i(fg) for i in range(1, min(len(y0_self), len(y0_other))): coeff = [[0 for i in range(i + 1)] for j in range(i + 1)] for j in range(i + 1): for k in range(i + 1): if j + k == i: coeff[j][k] = binomial(i, j) sol = 0 for j in range(i + 1): for k in range(i + 1): sol += coeff[j][k] y0_self[j] * y0_other[k] y0.append(sol) return HolonomicFunction(sol_ann, self.x, self.x0, y0) # if the points are different, consider one else: selfat0 = self.annihilator.is_singular(0) otherat0 = other.annihilator.is_singular(0) if self.x0 == 0 and not selfat0 and not otherat0: return self * other.change_ics(0) elif other.x0 == 0 and not selfat0 and not otherat0: return self.change_ics(0) * other else: selfatx0 = self.annihilator.is_singular(self.x0) otheratx0 = other.annihilator.is_singular(self.x0) if not selfatx0 and not otheratx0: return self * other.change_ics(self.x0) else: return self.change_ics(other.x0) * other if self.x0 != other.x0: return HolonomicFunction(sol_ann, self.x) # if the functions have singular_ics y1 = None y2 = None if self.is_singularics() == False and other.is_singularics() == True: _y0 = [j / factorial(i) for i, j in enumerate(self.y0)] y1 = {S(0): _y0} y2 = other.y0 elif self.is_singularics() == True and other.is_singularics() == False: _y0 = [j / factorial(i) for i, j in enumerate(other.y0)] y1 = self.y0 y2 = {S(0): _y0} elif self.is_singularics() == True and other.is_singularics() == True: y1 = self.y0 y2 = other.y0 y0 = {} # multiply every possible pair of the series terms for i in y1: for j in y2: k = min(len(y1[i]), len(y2[j])) c = [] for a in range(k): s = S(0) for b in range(a + 1): s += y1[i][b] * y2[j][a - b] c.append(s) if not i + j in y0: y0[i + j] = c else: y0[i + j] = [a + b for a, b in zip(c, y0[i + j])] return HolonomicFunction(sol_ann, self.x, self.x0, y0) __rmul__ = __mul__ def __sub__(self, other): return self + other * -1 def __rsub__(self, other): return self * -1 + other def __neg__(self): return -1 * self def __div__(self, other): return self * (S.One / other) def __truediv__(self, other): return self.__div__(other) def __pow__(self, n): if self.annihilator.order <= 1: ann = self.annihilator parent = ann.parent if self.y0 is None: y0 = None else: y0 = [list(self.y0)[0] ** n] p0 = ann.listofpoly[0] p1 = ann.listofpoly[1] p0 = (Poly.new(p0, self.x) * n).rep sol = [parent.base.to_sympy(i) for i in [p0, p1]] dd = DifferentialOperator(sol, parent) return HolonomicFunction(dd, self.x, self.x0, y0) if n < 0: raise NotHolonomicError("Negative Power on a Holonomic Function") if n == 0: Dx = self.annihilator.parent.derivative_operator return HolonomicFunction(Dx, self.x, S(0), [S(1)]) if n == 1: return self else: if n % 2 == 1: powreduce = self*(n - 1) return powreduce self elif n % 2 == 0: powreduce = self*(n / 2) return powreduce powreduce def degree(self): """ Returns the highest power of `x` in the annihilator. """ sol = [i.degree() for i in self.annihilator.listofpoly] return max(sol) def composition(self, expr, args, kwargs): """ Returns function after composition of a holonomic function with an algebraic function. The method can't compute initial conditions for the result by itself, so they can be also be provided. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(QQ.old_poly_ring(x),'Dx') >>> HolonomicFunction(Dx - 1, x).composition(x2, 0, [1]) # e^(x2) HolonomicFunction((-2x) + (1)Dx, x, 0, [1]) >>> HolonomicFunction(Dx2 + 1, x).composition(x2 - 1, 1, [1, 0]) HolonomicFunction((4x*3) + (-1)Dx + (x)Dx2, x, 1, [1, 0]) See Also ======== from_hyper() """ R = self.annihilator.parent a = self.annihilator.order diff = expr.diff(self.x) listofpoly = self.annihilator.listofpoly for i, j in enumerate(listofpoly): if isinstance(j, self.annihilator.parent.base.dtype): listofpoly[i] = self.annihilator.parent.base.to_sympy(j) r = listofpoly[a].subs({self.x:expr}) subs = [-listofpoly[i].subs({self.x:expr}) / r for i in range (a)] coeffs = [S(0) for i in range(a)] # coeffs[i] == coeff of (D^i f)(a) in D^k (f(a)) coeffs[0] = S(1) system = [coeffs] homogeneous = Matrix([[S(0) for i in range(a)]]).transpose() sol = S(0) while sol.is_zero: coeffs_next = [p.diff(self.x) for p in coeffs] for i in range(a - 1): coeffs_next[i + 1] += (coeffs[i] diff) for i in range(a): coeffs_next[i] += (coeffs[-1] * subs[i] * diff) coeffs = coeffs_next # check for linear relations system.append(coeffs) sol, taus = (Matrix(system).transpose() ).gauss_jordan_solve(homogeneous) tau = list(taus)[0] sol = sol.subs(tau, 1) sol = _normalize(sol[0:], R, negative=False) # if initial conditions are given for the resulting function if args: return HolonomicFunction(sol, self.x, args[0], args[1]) return HolonomicFunction(sol, self.x) def to_sequence(self, lb=True): r""" Finds recurrence relation for the coefficients in the series expansion of the function about :math:`x_0`, where :math:`x_0` is the point at which the initial condition is stored. If the point :math:`x_0` is ordinary, solution of the form :math:`[(R, n_0)]` is returned. Where :math:`R` is the recurrence relation and :math:`n_0` is the smallest ``n`` for which the recurrence holds true. If the point :math:`x_0` is regular singular, a list of solutions in the format :math:`(R, p, n_0)` is returned, i.e. `[(R, p, n_0), ... ]`. Each tuple in this vector represents a recurrence relation :math:`R` associated with a root of the indicial equation ``p``. Conditions of a different format can also be provided in this case, see the docstring of HolonomicFunction class. If it's not possible to numerically compute a initial condition, it is returned as a symbol :math:`C_j`, denoting the coefficient of :math:`(x - x_0)^j` in the power series about :math:`x_0`. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols, S >>> x = symbols('x') >>> R, Dx = DifferentialOperators(QQ.old_poly_ring(x),'Dx') >>> HolonomicFunction(Dx - 1, x, 0, [1]).to_sequence() [(HolonomicSequence((-1) + (n + 1)Sn, n), u(0) = 1, 0)] >>> HolonomicFunction((1 + x)Dx2 + Dx, x, 0, [0, 1]).to_sequence() [(HolonomicSequence((n2) + (n2 + n)Sn, n), u(0) = 0, u(1) = 1, u(2) = -1/2, 2)] >>> HolonomicFunction(-S(1)/2 + xDx, x, 0, {S(1)/2: [1]}).to_sequence() [(HolonomicSequence((n), n), u(0) = 1, 1/2, 1)] See Also ======== HolonomicFunction.series() References ========== .. [1] https://hal.inria.fr/inria-00070025/document .. [2] http://www.risc.jku.at/publications/download/risc_2244/DIPLFORM.pdf """ if self.x0 != 0: return self.shift_x(self.x0).to_sequence() # check whether a power series exists if the point is singular if self.annihilator.is_singular(self.x0): return self._frobenius(lb=lb) dict1 = {} n = Symbol('n', integer=True) dom = self.annihilator.parent.base.dom R, _ = RecurrenceOperators(dom.old_poly_ring(n), 'Sn') # substituting each term of the form `x^k Dx^j` in the # annihilator, according to the formula below: # x^k Dx^j = Sum(rf(n + 1 - k, j) * a(n + j - k) * x^n, (n, k, oo)) # for explanation see [2]. for i, j in enumerate(self.annihilator.listofpoly): listofdmp = j.all_coeffs() degree = len(listofdmp) - 1 for k in range(degree + 1): coeff = listofdmp[degree - k] if coeff == 0: continue if (i - k, k) in dict1: dict1[(i - k, k)] += (dom.to_sympy(coeff) * rf(n - k + 1, i)) else: dict1[(i - k, k)] = (dom.to_sympy(coeff) * rf(n - k + 1, i)) sol = [] keylist = [i[0] for i in dict1] lower = min(keylist) upper = max(keylist) degree = self.degree() # the recurrence relation holds for all values of # n greater than smallest_n, i.e. n >= smallest_n smallest_n = lower + degree dummys = {} eqs = [] unknowns = [] # an appropriate shift of the recurrence for j in range(lower, upper + 1): if j in keylist: temp = S(0) for k in dict1.keys(): if k[0] == j: temp += dict1[k].subs(n, n - lower) sol.append(temp) else: sol.append(S(0)) # the recurrence relation sol = RecurrenceOperator(sol, R) # computing the initial conditions for recurrence order = sol.order all_roots = roots(R.base.to_sympy(sol.listofpoly[-1]), n, filter='Z') all_roots = all_roots.keys() if all_roots: max_root = max(all_roots) + 1 smallest_n = max(max_root, smallest_n) order += smallest_n y0 = _extend_y0(self, order) u0 = [] # u(n) = y^n(0)/factorial(n) for i, j in enumerate(y0): u0.append(j / factorial(i)) # if sufficient conditions can't be computed then # try to use the series method i.e. # equate the coefficients of x^k in the equation formed by # substituting the series in differential equation, to zero. if len(u0) < order: for i in range(degree): eq = S(0) for j in dict1: if i + j[0] < 0: dummys[i + j[0]] = S(0) elif i + j[0] < len(u0): dummys[i + j[0]] = u0[i + j[0]] elif not i + j[0] in dummys: dummys[i + j[0]] = Symbol('C_%s' %(i + j[0])) unknowns.append(dummys[i + j[0]]) if j[1] <= i: eq += dict1[j].subs(n, i) * dummys[i + j[0]] eqs.append(eq) # solve the system of equations formed soleqs = solve(eqs, unknowns) if isinstance(soleqs, dict): for i in range(len(u0), order): if i not in dummys: dummys[i] = Symbol('C_%s' %i) if dummys[i] in soleqs: u0.append(soleqs[dummys[i]]) else: u0.append(dummys[i]) if lb: return [(HolonomicSequence(sol, u0), smallest_n)] return [HolonomicSequence(sol, u0)] for i in range(len(u0), order): if i not in dummys: dummys[i] = Symbol('C_%s' %i) s = False for j in soleqs: if dummys[i] in j: u0.append(j[dummys[i]]) s = True if not s: u0.append(dummys[i]) if lb: return [(HolonomicSequence(sol, u0), smallest_n)] return [HolonomicSequence(sol, u0)] def _frobenius(self, lb=True): # compute the roots of indicial equation indicialroots = self._indicial() reals = [] compl = [] for i in ordered(indicialroots.keys()): if i.is_real: reals.extend([i] indicialroots[i]) else: a, b = i.as_real_imag() compl.extend([(i, a, b)] * indicialroots[i]) # sort the roots for a fixed ordering of solution compl.sort(key=lambda x : x[1]) compl.sort(key=lambda x : x[2]) reals.sort() # grouping the roots, roots differ by an integer are put in the same group. grp = [] for i in reals: intdiff = False if len(grp) == 0: grp.append([i]) continue for j in grp: if int(j[0] - i) == j[0] - i: j.append(i) intdiff = True break if not intdiff: grp.append([i]) # True if none of the roots differ by an integer i.e. # each element in group have only one member independent = True if all(len(i) == 1 for i in grp) else False allpos = all(i >= 0 for i in reals) allint = all(int(i) == i for i in reals) # if initial conditions are provided # then use them. if self.is_singularics() == True: rootstoconsider = [] for i in ordered(self.y0.keys()): for j in ordered(indicialroots.keys()): if j == i: rootstoconsider.append(i) elif allpos and allint: rootstoconsider = [min(reals)] elif independent: rootstoconsider = [i[0] for i in grp] + [j[0] for j in compl] elif not allint: rootstoconsider = [] for i in reals: if not int(i) == i: rootstoconsider.append(i) elif not allpos: if not self._have_init_cond() or S(self.y0[0]).is_finite == False: rootstoconsider = [min(reals)] else: posroots = [] for i in reals: if i >= 0: posroots.append(i) rootstoconsider = [min(posroots)] n = Symbol('n', integer=True) dom = self.annihilator.parent.base.dom R, _ = RecurrenceOperators(dom.old_poly_ring(n), 'Sn') finalsol = [] char = ord('C') for p in rootstoconsider: dict1 = {} for i, j in enumerate(self.annihilator.listofpoly): listofdmp = j.all_coeffs() degree = len(listofdmp) - 1 for k in range(degree + 1): coeff = listofdmp[degree - k] if coeff == 0: continue if (i - k, k - i) in dict1: dict1[(i - k, k - i)] += (dom.to_sympy(coeff) * rf(n - k + 1 + p, i)) else: dict1[(i - k, k - i)] = (dom.to_sympy(coeff) * rf(n - k + 1 + p, i)) sol = [] keylist = [i[0] for i in dict1] lower = min(keylist) upper = max(keylist) degree = max([i[1] for i in dict1]) degree2 = min([i[1] for i in dict1]) smallest_n = lower + degree dummys = {} eqs = [] unknowns = [] for j in range(lower, upper + 1): if j in keylist: temp = S(0) for k in dict1.keys(): if k[0] == j: temp += dict1[k].subs(n, n - lower) sol.append(temp) else: sol.append(S(0)) # the recurrence relation sol = RecurrenceOperator(sol, R) # computing the initial conditions for recurrence order = sol.order all_roots = roots(R.base.to_sympy(sol.listofpoly[-1]), n, filter='Z') all_roots = all_roots.keys() if all_roots: max_root = max(all_roots) + 1 smallest_n = max(max_root, smallest_n) order += smallest_n u0 = [] if self.is_singularics() == True: u0 = self.y0[p] elif self.is_singularics() == False and p >= 0 and int(p) == p and len(rootstoconsider) == 1: y0 = _extend_y0(self, order + int(p)) # u(n) = y^n(0)/factorial(n) if len(y0) > int(p): for i in range(int(p), len(y0)): u0.append(y0[i] / factorial(i)) if len(u0) < order: for i in range(degree2, degree): eq = S(0) for j in dict1: if i + j[0] < 0: dummys[i + j[0]] = S(0) elif i + j[0] < len(u0): dummys[i + j[0]] = u0[i + j[0]] elif not i + j[0] in dummys: letter = chr(char) + '_%s' %(i + j[0]) dummys[i + j[0]] = Symbol(letter) unknowns.append(dummys[i + j[0]]) if j[1] <= i: eq += dict1[j].subs(n, i) * dummys[i + j[0]] eqs.append(eq) # solve the system of equations formed soleqs = solve(eqs, unknowns) if isinstance(soleqs, dict): for i in range(len(u0), order): if i not in dummys: letter = chr(char) + '_%s' %i dummys[i] = Symbol(letter) if dummys[i] in soleqs: u0.append(soleqs[dummys[i]]) else: u0.append(dummys[i]) if lb: finalsol.append((HolonomicSequence(sol, u0), p, smallest_n)) continue else: finalsol.append((HolonomicSequence(sol, u0), p)) continue for i in range(len(u0), order): if i not in dummys: letter = chr(char) + '_%s' %i dummys[i] = Symbol(letter) s = False for j in soleqs: if dummys[i] in j: u0.append(j[dummys[i]]) s = True if not s: u0.append(dummys[i]) if lb: finalsol.append((HolonomicSequence(sol, u0), p, smallest_n)) else: finalsol.append((HolonomicSequence(sol, u0), p)) char += 1 return finalsol def series(self, n=6, coefficient=False, order=True, _recur=None): r""" Finds the power series expansion of given holonomic function about :math:`x_0`. A list of series might be returned if :math:`x_0` is a regular point with multiple roots of the indicial equation. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(QQ.old_poly_ring(x),'Dx') >>> HolonomicFunction(Dx - 1, x, 0, [1]).series() # e^x 1 + x + x2/2 + x3/6 + x4/24 + x5/120 + O(x6) >>> HolonomicFunction(Dx2 + 1, x, 0, [0, 1]).series(n=8) # sin(x) x - x3/6 + x5/120 - x7/5040 + O(x8) See Also ======== HolonomicFunction.to_sequence() """ if _recur is None: recurrence = self.to_sequence() else: recurrence = _recur if isinstance(recurrence, tuple) and len(recurrence) == 2: recurrence = recurrence[0] constantpower = 0 elif isinstance(recurrence, tuple) and len(recurrence) == 3: constantpower = recurrence[1] recurrence = recurrence[0] elif len(recurrence) == 1 and len(recurrence[0]) == 2: recurrence = recurrence[0][0] constantpower = 0 elif len(recurrence) == 1 and len(recurrence[0]) == 3: constantpower = recurrence[0][1] recurrence = recurrence[0][0] else: sol = [] for i in recurrence: sol.append(self.series(_recur=i)) return sol n = n - int(constantpower) l = len(recurrence.u0) - 1 k = recurrence.recurrence.order x = self.x x0 = self.x0 seq_dmp = recurrence.recurrence.listofpoly R = recurrence.recurrence.parent.base K = R.get_field() seq = [] for i, j in enumerate(seq_dmp): seq.append(K.new(j.rep)) sub = [-seq[i] / seq[k] for i in range(k)] sol = [i for i in recurrence.u0] if l + 1 >= n: pass else: # use the initial conditions to find the next term for i in range(l + 1 - k, n - k): coeff = S(0) for j in range(k): if i + j >= 0: coeff += DMFsubs(sub[j], i) sol[i + j] sol.append(coeff) if coefficient: return sol ser = S(0) for i, j in enumerate(sol): ser += x*(i + constantpower) j if order: ser += Order(x*(n + int(constantpower)), x) if x0 != 0: return ser.subs(x, x - x0) return ser def _indicial(self): """ Computes roots of the Indicial equation. """ if self.x0 != 0: return self.shift_x(self.x0)._indicial() list_coeff = self.annihilator.listofpoly R = self.annihilator.parent.base x = self.x s = R.zero y = R.one def _pole_degree(poly): root_all = roots(R.to_sympy(poly), x, filter='Z') if 0 in root_all.keys(): return root_all[0] else: return 0 degree = [j.degree() for j in list_coeff] degree = max(degree) inf = 10 (max(1, degree) + max(1, self.annihilator.order)) deg = lambda q: inf if q.is_zero else _pole_degree(q) b = deg(list_coeff[0]) for j in range(1, len(list_coeff)): b = min(b, deg(list_coeff[j]) - j) for i, j in enumerate(list_coeff): listofdmp = j.all_coeffs() degree = len(listofdmp) - 1 if - i - b <= 0 and degree - i - b >= 0: s = s + listofdmp[degree - i - b] * y y = x - i return roots(R.to_sympy(s), x) def evalf(self, points, method='RK4', h=0.05, derivatives=False): r""" Finds numerical value of a holonomic function using numerical methods. (RK4 by default). A set of points (real or complex) must be provided which will be the path for the numerical integration. The path should be given as a list :math:`[x_1, x_2, ... x_n]`. The numerical values will be computed at each point in this order :math:`x_1 --> x_2 --> x_3 ... --> x_n`. Returns values of the function at :math:`x_1, x_2, ... x_n` in a list. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(QQ.old_poly_ring(x),'Dx') A straight line on the real axis from (0 to 1) >>> r = [0.1, 0.2, 0.3, 0.4, 0.5, 0.6, 0.7, 0.8, 0.9, 1] Runge-Kutta 4th order on e^x from 0.1 to 1. Exact solution at 1 is 2.71828182845905 >>> HolonomicFunction(Dx - 1, x, 0, [1]).evalf(r) [1.10517083333333, 1.22140257085069, 1.34985849706254, 1.49182424008069, 1.64872063859684, 1.82211796209193, 2.01375162659678, 2.22553956329232, 2.45960141378007, 2.71827974413517] Euler's method for the same >>> HolonomicFunction(Dx - 1, x, 0, [1]).evalf(r, method='Euler') [1.1, 1.21, 1.331, 1.4641, 1.61051, 1.771561, 1.9487171, 2.14358881, 2.357947691, 2.5937424601] One can also observe that the value obtained using Runge-Kutta 4th order is much more accurate than Euler's method. """ from sympy.holonomic.numerical import _evalf lp = False # if a point `b` is given instead of a mesh if not hasattr(points, "__iter__"): lp = True b = S(points) if self.x0 == b: return _evalf(self, [b], method=method, derivatives=derivatives)[-1] if not b.is_Number: raise NotImplementedError a = self.x0 if a > b: h = -h n = int((b - a) / h) points = [a + h] for i in range(n - 1): points.append(points[-1] + h) for i in roots(self.annihilator.parent.base.to_sympy(self.annihilator.listofpoly[-1]), self.x): if i == self.x0 or i in points: raise SingularityError(self, i) if lp: return _evalf(self, points, method=method, derivatives=derivatives)[-1] return _evalf(self, points, method=method, derivatives=derivatives) def change_x(self, z): """ Changes only the variable of Holonomic Function, for internal purposes. For composition use HolonomicFunction.composition() """ dom = self.annihilator.parent.base.dom R = dom.old_poly_ring(z) parent, _ = DifferentialOperators(R, 'Dx') sol = [] for j in self.annihilator.listofpoly: sol.append(R(j.rep)) sol = DifferentialOperator(sol, parent) return HolonomicFunction(sol, z, self.x0, self.y0) def shift_x(self, a): """ Substitute `x + a` for `x`. """ x = self.x listaftershift = self.annihilator.listofpoly base = self.annihilator.parent.base sol = [base.from_sympy(base.to_sympy(i).subs(x, x + a)) for i in listaftershift] sol = DifferentialOperator(sol, self.annihilator.parent) x0 = self.x0 - a if not self._have_init_cond(): return HolonomicFunction(sol, x) return HolonomicFunction(sol, x, x0, self.y0) def to_hyper(self, as_list=False, _recur=None): r""" Returns a hypergeometric function (or linear combination of them) representing the given holonomic function. Returns an answer of the form: `a_1 \cdot x^{b_1} \cdot{hyper()} + a_2 \cdot x^{b_2} \cdot{hyper()} ...` This is very useful as one can now use ``hyperexpand`` to find the symbolic expressions/functions. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(ZZ.old_poly_ring(x),'Dx') >>> # sin(x) >>> HolonomicFunction(Dx2 + 1, x, 0, [0, 1]).to_hyper() xhyper((), (3/2,), -x*2/4) >>> # exp(x) >>> HolonomicFunction(Dx - 1, x, 0, [1]).to_hyper() hyper((), (), x) See Also ======== from_hyper, from_meijerg """ if _recur is None: recurrence = self.to_sequence() else: recurrence = _recur if isinstance(recurrence, tuple) and len(recurrence) == 2: smallest_n = recurrence[1] recurrence = recurrence[0] constantpower = 0 elif isinstance(recurrence, tuple) and len(recurrence) == 3: smallest_n = recurrence[2] constantpower = recurrence[1] recurrence = recurrence[0] elif len(recurrence) == 1 and len(recurrence[0]) == 2: smallest_n = recurrence[0][1] recurrence = recurrence[0][0] constantpower = 0 elif len(recurrence) == 1 and len(recurrence[0]) == 3: smallest_n = recurrence[0][2] constantpower = recurrence[0][1] recurrence = recurrence[0][0] else: sol = self.to_hyper(as_list=as_list, _recur=recurrence[0]) for i in recurrence[1:]: sol += self.to_hyper(as_list=as_list, _recur=i) return sol u0 = recurrence.u0 r = recurrence.recurrence x = self.x x0 = self.x0 # order of the recurrence relation m = r.order # when no recurrence exists, and the power series have finite terms if m == 0: nonzeroterms = roots(r.parent.base.to_sympy(r.listofpoly[0]), recurrence.n, filter='R') sol = S(0) for j, i in enumerate(nonzeroterms): if i < 0 or int(i) != i: continue i = int(i) if i < len(u0): if isinstance(u0[i], (PolyElement, FracElement)): u0[i] = u0[i].as_expr() sol += u0[i] x*i else: sol += Symbol('C_%s' %j) x*i if isinstance(sol, (PolyElement, FracElement)): sol = sol.as_expr() x*constantpower else: sol = sol x*constantpower if as_list: if x0 != 0: return [(sol.subs(x, x - x0), )] return [(sol, )] if x0 != 0: return sol.subs(x, x - x0) return sol if smallest_n + m > len(u0): raise NotImplementedError("Can't compute sufficient Initial Conditions") # check if the recurrence represents a hypergeometric series is_hyper = True for i in range(1, len(r.listofpoly)-1): if r.listofpoly[i] != r.parent.base.zero: is_hyper = False break if not is_hyper: raise NotHyperSeriesError(self, self.x0) a = r.listofpoly[0] b = r.listofpoly[-1] # the constant multiple of argument of hypergeometric function if isinstance(a.rep[0], (PolyElement, FracElement)): c = - (S(a.rep[0].as_expr()) m*(a.degree())) / (S(b.rep[0].as_expr()) m*(b.degree())) else: c = - (S(a.rep[0]) m*(a.degree())) / (S(b.rep[0]) m*(b.degree())) sol = 0 arg1 = roots(r.parent.base.to_sympy(a), recurrence.n) arg2 = roots(r.parent.base.to_sympy(b), recurrence.n) # iterate through the initial conditions to find # the hypergeometric representation of the given # function. # The answer will be a linear combination # of different hypergeometric series which satisfies # the recurrence. if as_list: listofsol = [] for i in range(smallest_n + m): # if the recurrence relation doesn't hold for `n = i`, # then a Hypergeometric representation doesn't exist. # add the algebraic term a x*i to the solution, # where a is u0[i] if i < smallest_n: if as_list: listofsol.append(((S(u0[i]) x*(i+constantpower)).subs(x, x-x0), )) else: sol += S(u0[i]) xi continue # if the coefficient u0[i] is zero, then the # independent hypergeomtric series starting with # xi is not a part of the answer. if S(u0[i]) == 0: continue ap = [] bq = [] # substitute m * n + i for n for k in ordered(arg1.keys()): ap.extend([nsimplify((i - k) / m)] * arg1[k]) for k in ordered(arg2.keys()): bq.extend([nsimplify((i - k) / m)] * arg2[k]) # convention of (k + 1) in the denominator if 1 in bq: bq.remove(1) else: ap.append(1) if as_list: listofsol.append(((S(u0[i])x(i+constantpower)).subs(x, x-x0), (hyper(ap, bq, cx*m)).subs(x, x-x0))) else: sol += S(u0[i]) hyper(ap, bq, c * x*m) x*i if as_list: return listofsol sol = sol xconstantpower if x0 != 0: return sol.subs(x, x - x0) return sol def to_expr(self): """ Converts a Holonomic Function back to elementary functions. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols, S >>> x = symbols('x') >>> R, Dx = DifferentialOperators(ZZ.old_poly_ring(x),'Dx') >>> HolonomicFunction(x2Dx2 + xDx + (x*2 - 1), x, 0, [0, S(1)/2]).to_expr() besselj(1, x) >>> HolonomicFunction((1 + x)Dx3 + Dx2, x, 0, [1, 1, 1]).to_expr() xlog(x + 1) + log(x + 1) + 1 """ return hyperexpand(self.to_hyper()).simplify() def change_ics(self, b, lenics=None): """ Changes the point `x0` to `b` for initial conditions. Examples ======== >>> from sympy.holonomic import expr_to_holonomic >>> from sympy import symbols, sin, cos, exp >>> x = symbols('x') >>> expr_to_holonomic(sin(x)).change_ics(1) HolonomicFunction((1) + (1)Dx*2, x, 1, [sin(1), cos(1)]) >>> expr_to_holonomic(exp(x)).change_ics(2) HolonomicFunction((-1) + (1)Dx, x, 2, [exp(2)]) """ symbolic = True if lenics is None and len(self.y0) > self.annihilator.order: lenics = len(self.y0) dom = self.annihilator.parent.base.domain try: sol = expr_to_holonomic(self.to_expr(), x=self.x, x0=b, lenics=lenics, domain=dom) except (NotPowerSeriesError, NotHyperSeriesError): symbolic = False if symbolic and sol.x0 == b: return sol y0 = self.evalf(b, derivatives=True) return HolonomicFunction(self.annihilator, self.x, b, y0) def to_meijerg(self): """ Returns a linear combination of Meijer G-functions. Examples ======== >>> from sympy.holonomic import expr_to_holonomic >>> from sympy import sin, cos, hyperexpand, log, symbols >>> x = symbols('x') >>> hyperexpand(expr_to_holonomic(cos(x) + sin(x)).to_meijerg()) sin(x) + cos(x) >>> hyperexpand(expr_to_holonomic(log(x)).to_meijerg()).simplify() log(x) See Also ======== to_hyper() """ # convert to hypergeometric first rep = self.to_hyper(as_list=True) sol = S(0) for i in rep: if len(i) == 1: sol += i[0] elif len(i) == 2: sol += i[0] * _hyper_to_meijerg(i[1]) return sol def from_hyper(func, x0=0, evalf=False): r""" Converts a hypergeometric function to holonomic. ``func`` is the Hypergeometric Function and ``x0`` is the point at which initial conditions are required. Examples ======== >>> from sympy.holonomic.holonomic import from_hyper, DifferentialOperators >>> from sympy import symbols, hyper, S >>> x = symbols('x') >>> from_hyper(hyper([], [S(3)/2], x*2/4)) HolonomicFunction((-x) + (2)Dx + (x)Dx2, x, 1, [sinh(1), -sinh(1) + cosh(1)]) """ a = func.ap b = func.bq z = func.args[2] x = z.atoms(Symbol).pop() R, Dx = DifferentialOperators(QQ.old_poly_ring(x), 'Dx') # generalized hypergeometric differential equation r1 = 1 for i in range(len(a)): r1 = r1 (x * Dx + a[i]) r2 = Dx for i in range(len(b)): r2 = r2 * (x * Dx + b[i] - 1) sol = r1 - r2 simp = hyperexpand(func) if isinstance(simp, Infinity) or isinstance(simp, NegativeInfinity): return HolonomicFunction(sol, x).composition(z) def _find_conditions(simp, x, x0, order, evalf=False): y0 = [] for i in range(order): if evalf: val = simp.subs(x, x0).evalf() else: val = simp.subs(x, x0) # return None if it is Infinite or NaN if val.is_finite is False or isinstance(val, NaN): return None y0.append(val) simp = simp.diff(x) return y0 # if the function is known symbolically if not isinstance(simp, hyper): y0 = _find_conditions(simp, x, x0, sol.order) while not y0: # if values don't exist at 0, then try to find initial # conditions at 1. If it doesn't exist at 1 too then # try 2 and so on. x0 += 1 y0 = _find_conditions(simp, x, x0, sol.order) return HolonomicFunction(sol, x).composition(z, x0, y0) if isinstance(simp, hyper): x0 = 1 # use evalf if the function can't be simplified y0 = _find_conditions(simp, x, x0, sol.order, evalf) while not y0: x0 += 1 y0 = _find_conditions(simp, x, x0, sol.order, evalf) return HolonomicFunction(sol, x).composition(z, x0, y0) return HolonomicFunction(sol, x).composition(z) def from_meijerg(func, x0=0, evalf=False, initcond=True, domain=QQ): """ Converts a Meijer G-function to Holonomic. ``func`` is the G-Function and ``x0`` is the point at which initial conditions are required. Examples ======== >>> from sympy.holonomic.holonomic import from_meijerg, DifferentialOperators >>> from sympy import symbols, meijerg, S >>> x = symbols('x') >>> from_meijerg(meijerg(([], []), ([S(1)/2], [0]), x*2/4)) HolonomicFunction((1) + (1)Dx2, x, 0, [0, 1/sqrt(pi)]) """ a = func.ap b = func.bq n = len(func.an) m = len(func.bm) p = len(a) z = func.args[2] x = z.atoms(Symbol).pop() R, Dx = DifferentialOperators(domain.old_poly_ring(x), 'Dx') # compute the differential equation satisfied by the # Meijer G-function. mnp = (-1)(m + n - p) r1 = x * mnp for i in range(len(a)): r1 = x Dx + 1 - a[i] r2 = 1 for i in range(len(b)): r2 = x Dx - b[i] sol = r1 - r2 if not initcond: return HolonomicFunction(sol, x).composition(z) simp = hyperexpand(func) if isinstance(simp, Infinity) or isinstance(simp, NegativeInfinity): return HolonomicFunction(sol, x).composition(z) def _find_conditions(simp, x, x0, order, evalf=False): y0 = [] for i in range(order): if evalf: val = simp.subs(x, x0).evalf() else: val = simp.subs(x, x0) if val.is_finite is False or isinstance(val, NaN): return None y0.append(val) simp = simp.diff(x) return y0 # computing initial conditions if not isinstance(simp, meijerg): y0 = _find_conditions(simp, x, x0, sol.order) while not y0: x0 += 1 y0 = _find_conditions(simp, x, x0, sol.order) return HolonomicFunction(sol, x).composition(z, x0, y0) if isinstance(simp, meijerg): x0 = 1 y0 = _find_conditions(simp, x, x0, sol.order, evalf) while not y0: x0 += 1 y0 = _find_conditions(simp, x, x0, sol.order, evalf) return HolonomicFunction(sol, x).composition(z, x0, y0) return HolonomicFunction(sol, x).composition(z) x_1 = Dummy('x_1') _lookup_table = None domain_for_table = None from sympy.integrals.meijerint import _mytype def expr_to_holonomic(func, x=None, x0=0, y0=None, lenics=None, domain=None, initcond=True): """ Converts a function or an expression to a holonomic function. Parameters ========== func: The expression to be converted. x: variable for the function. x0: point at which initial condition must be computed. y0: One can optionally provide initial condition if the method isn't able to do it automatically. lenics: Number of terms in the initial condition. By default it is equal to the order of the annihilator. domain: Ground domain for the polynomials in `x` appearing as coefficients in the annihilator. initcond: Set it false if you don't want the initial conditions to be computed. Examples ======== >>> from sympy.holonomic.holonomic import expr_to_holonomic >>> from sympy import sin, exp, symbols >>> x = symbols('x') >>> expr_to_holonomic(sin(x)) HolonomicFunction((1) + (1)Dx2, x, 0, [0, 1]) >>> expr_to_holonomic(exp(x)) HolonomicFunction((-1) + (1)Dx, x, 0, [1]) See Also ======== meijerint._rewrite1, _convert_poly_rat_alg, _create_table """ func = sympify(func) syms = func.free_symbols if not x: if len(syms) == 1: x= syms.pop() else: raise ValueError("Specify the variable for the function") elif x in syms: syms.remove(x) extra_syms = list(syms) if domain is None: if func.has(Float): domain = RR else: domain = QQ if len(extra_syms) != 0: domain = domain[extra_syms].get_field() # try to convert if the function is polynomial or rational solpoly = _convert_poly_rat_alg(func, x, x0=x0, y0=y0, lenics=lenics, domain=domain, initcond=initcond) if solpoly: return solpoly # create the lookup table global _lookup_table, domain_for_table if not _lookup_table: domain_for_table = domain _lookup_table = {} _create_table(_lookup_table, domain=domain) elif domain != domain_for_table: domain_for_table = domain _lookup_table = {} _create_table(_lookup_table, domain=domain) # use the table directly to convert to Holonomic if func.is_Function: f = func.subs(x, x_1) t = _mytype(f, x_1) if t in _lookup_table: l = _lookup_table[t] sol = l[0][1].change_x(x) else: sol = _convert_meijerint(func, x, initcond=False, domain=domain) if not sol: raise NotImplementedError if y0: sol.y0 = y0 if y0 or not initcond: sol.x0 = x0 return sol if not lenics: lenics = sol.annihilator.order _y0 = _find_conditions(func, x, x0, lenics) while not _y0: x0 += 1 _y0 = _find_conditions(func, x, x0, lenics) return HolonomicFunction(sol.annihilator, x, x0, _y0) if y0 or not initcond: sol = sol.composition(func.args[0]) if y0: sol.y0 = y0 sol.x0 = x0 return sol if not lenics: lenics = sol.annihilator.order _y0 = _find_conditions(func, x, x0, lenics) while not _y0: x0 += 1 _y0 = _find_conditions(func, x, x0, lenics) return sol.composition(func.args[0], x0, _y0) # iterate through the expression recursively args = func.args f = func.func from sympy.core import Add, Mul, Pow sol = expr_to_holonomic(args[0], x=x, initcond=False, domain=domain) if f is Add: for i in range(1, len(args)): sol += expr_to_holonomic(args[i], x=x, initcond=False, domain=domain) elif f is Mul: for i in range(1, len(args)): sol = expr_to_holonomic(args[i], x=x, initcond=False, domain=domain) elif f is Pow: sol = solargs[1] sol.x0 = x0 if not sol: raise NotImplementedError if y0: sol.y0 = y0 if y0 or not initcond: return sol if sol.y0: return sol if not lenics: lenics = sol.annihilator.order if sol.annihilator.is_singular(x0): r = sol._indicial() l = list(r) if len(r) == 1 and r[l[0]] == S(1): r = l[0] g = func / (x - x0)r singular_ics = _find_conditions(g, x, x0, lenics) singular_ics = [j / factorial(i) for i, j in enumerate(singular_ics)] y0 = {r:singular_ics} return HolonomicFunction(sol.annihilator, x, x0, y0) _y0 = _find_conditions(func, x, x0, lenics) while not _y0: x0 += 1 _y0 = _find_conditions(func, x, x0, lenics) return HolonomicFunction(sol.annihilator, x, x0, _y0) ## Some helper functions ## def _normalize(list_of, parent, negative=True): """ Normalize a given annihilator """ num = [] denom = [] base = parent.base K = base.get_field() lcm_denom = base.from_sympy(S(1)) list_of_coeff = [] # convert polynomials to the elements of associated # fraction field for i, j in enumerate(list_of): if isinstance(j, base.dtype): list_of_coeff.append(K.new(j.rep)) elif not isinstance(j, K.dtype): list_of_coeff.append(K.from_sympy(sympify(j))) else: list_of_coeff.append(j) # corresponding numerators of the sequence of polynomials num.append(list_of_coeff[i].numer()) # corresponding denominators denom.append(list_of_coeff[i].denom()) # lcm of denominators in the coefficients for i in denom: lcm_denom = i.lcm(lcm_denom) if negative: lcm_denom = -lcm_denom lcm_denom = K.new(lcm_denom.rep) # multiply the coefficients with lcm for i, j in enumerate(list_of_coeff): list_of_coeff[i] = j lcm_denom gcd_numer = base((list_of_coeff[-1].numer() / list_of_coeff[-1].denom()).rep) # gcd of numerators in the coefficients for i in num: gcd_numer = i.gcd(gcd_numer) gcd_numer = K.new(gcd_numer.rep) # divide all the coefficients by the gcd for i, j in enumerate(list_of_coeff): frac_ans = j / gcd_numer list_of_coeff[i] = base((frac_ans.numer() / frac_ans.denom()).rep) return DifferentialOperator(list_of_coeff, parent) def _derivate_diff_eq(listofpoly): """ Let a differential equation a0(x)y(x) + a1(x)y'(x) + ... = 0 where a0, a1,... are polynomials or rational functions. The function returns b0, b1, b2... such that the differential equation b0(x)y(x) + b1(x)y'(x) +... = 0 is formed after differentiating the former equation. """ sol = [] a = len(listofpoly) - 1 sol.append(DMFdiff(listofpoly[0])) for i, j in enumerate(listofpoly[1:]): sol.append(DMFdiff(j) + listofpoly[i]) sol.append(listofpoly[a]) return sol def _hyper_to_meijerg(func): """ Converts a `hyper` to meijerg. """ ap = func.ap bq = func.bq ispoly = any(i <= 0 and int(i) == i for i in ap) if ispoly: return hyperexpand(func) z = func.args[2] # parameters of the `meijerg` function. an = (1 - i for i in ap) anp = () bm = (S(0), ) bmq = (1 - i for i in bq) k = S(1) for i in bq: k = k * gamma(i) for i in ap: k = k / gamma(i) return k * meijerg(an, anp, bm, bmq, -z) def _add_lists(list1, list2): """Takes polynomial sequences of two annihilators a and b and returns the list of polynomials of sum of a and b. """ if len(list1) <= len(list2): sol = [a + b for a, b in zip(list1, list2)] + list2[len(list1):] else: sol = [a + b for a, b in zip(list1, list2)] + list1[len(list2):] return sol def _extend_y0(Holonomic, n): """ Tries to find more initial conditions by substituting the initial value point in the differential equation. """ if Holonomic.annihilator.is_singular(Holonomic.x0) or Holonomic.is_singularics() == True: return Holonomic.y0 annihilator = Holonomic.annihilator a = annihilator.order listofpoly = [] y0 = Holonomic.y0 R = annihilator.parent.base K = R.get_field() for i, j in enumerate(annihilator.listofpoly): if isinstance(j, annihilator.parent.base.dtype): listofpoly.append(K.new(j.rep)) if len(y0) < a or n <= len(y0): return y0 else: list_red = [-listofpoly[i] / listofpoly[a] for i in range(a)] if len(y0) > a: y1 = [y0[i] for i in range(a)] else: y1 = [i for i in y0] for i in range(n - a): sol = 0 for a, b in zip(y1, list_red): r = DMFsubs(b, Holonomic.x0) if not getattr(r, 'is_finite', True): return y0 if isinstance(r, (PolyElement, FracElement)): r = r.as_expr() sol += a * r y1.append(sol) list_red = _derivate_diff_eq(list_red) return y0 + y1[len(y0):] def DMFdiff(frac): # differentiate a DMF object represented as p/q if not isinstance(frac, DMF): return frac.diff() K = frac.ring p = K.numer(frac) q = K.denom(frac) sol_num = - p * q.diff() + q * p.diff() sol_denom = q*2 return K((sol_num.rep, sol_denom.rep)) def DMFsubs(frac, x0, mpm=False): # substitute the point x0 in DMF object of the form p/q if not isinstance(frac, DMF): return frac p = frac.num q = frac.den sol_p = S(0) sol_q = S(0) if mpm: from mpmath import mp for i, j in enumerate(reversed(p)): if mpm: j = sympify(j)._to_mpmath(mp.prec) sol_p += j x0*i for i, j in enumerate(reversed(q)): if mpm: j = sympify(j)._to_mpmath(mp.prec) sol_q += j x0*i if isinstance(sol_p, (PolyElement, FracElement)): sol_p = sol_p.as_expr() if isinstance(sol_q, (PolyElement, FracElement)): sol_q = sol_q.as_expr() return sol_p / sol_q def _convert_poly_rat_alg(func, x, x0=0, y0=None, lenics=None, domain=QQ, initcond=True): """ Converts polynomials, rationals and algebraic functions to holonomic. """ ispoly = func.is_polynomial() if not ispoly: israt = func.is_rational_function() else: israt = True if not (ispoly or israt): basepoly, ratexp = func.as_base_exp() if basepoly.is_polynomial() and ratexp.is_Number: if isinstance(ratexp, Float): ratexp = nsimplify(ratexp) m, n = ratexp.p, ratexp.q is_alg = True else: is_alg = False else: is_alg = True if not (ispoly or israt or is_alg): return None R = domain.old_poly_ring(x) _, Dx = DifferentialOperators(R, 'Dx') # if the function is constant if not func.has(x): return HolonomicFunction(Dx, x, 0, [func]) if ispoly: # differential equation satisfied by polynomial sol = func Dx - func.diff(x) sol = _normalize(sol.listofpoly, sol.parent, negative=False) is_singular = sol.is_singular(x0) # try to compute the conditions for singular points if y0 is None and x0 == 0 and is_singular: rep = R.from_sympy(func).rep for i, j in enumerate(reversed(rep)): if j == 0: continue else: coeff = list(reversed(rep))[i:] indicial = i break for i, j in enumerate(coeff): if isinstance(j, (PolyElement, FracElement)): coeff[i] = j.as_expr() y0 = {indicial: S(coeff)} elif israt: p, q = func.as_numer_denom() # differential equation satisfied by rational sol = p * q * Dx + p * q.diff(x) - q * p.diff(x) sol = _normalize(sol.listofpoly, sol.parent, negative=False) elif is_alg: sol = n * (x / m) * Dx - 1 sol = HolonomicFunction(sol, x).composition(basepoly).annihilator is_singular = sol.is_singular(x0) # try to compute the conditions for singular points if y0 is None and x0 == 0 and is_singular and \ (lenics is None or lenics <= 1): rep = R.from_sympy(basepoly).rep for i, j in enumerate(reversed(rep)): if j == 0: continue if isinstance(j, (PolyElement, FracElement)): j = j.as_expr() coeff = S(j)*ratexp indicial = S(i) ratexp break if isinstance(coeff, (PolyElement, FracElement)): coeff = coeff.as_expr() y0 = {indicial: S([coeff])} if y0 or not initcond: return HolonomicFunction(sol, x, x0, y0) if not lenics: lenics = sol.order if sol.is_singular(x0): r = HolonomicFunction(sol, x, x0)._indicial() l = list(r) if len(r) == 1 and r[l[0]] == S(1): r = l[0] g = func / (x - x0)*r singular_ics = _find_conditions(g, x, x0, lenics) singular_ics = [j / factorial(i) for i, j in enumerate(singular_ics)] y0 = {r:singular_ics} return HolonomicFunction(sol, x, x0, y0) y0 = _find_conditions(func, x, x0, lenics) while not y0: x0 += 1 y0 = _find_conditions(func, x, x0, lenics) return HolonomicFunction(sol, x, x0, y0) def _convert_meijerint(func, x, initcond=True, domain=QQ): args = meijerint._rewrite1(func, x) if args: fac, po, g, _ = args else: return None # lists for sum of meijerg functions fac_list = [fac i[0] for i in g] t = po.as_base_exp() s = t[1] if t[0] is x else S(0) po_list = [s + i[1] for i in g] G_list = [i[2] for i in g] # finds meijerg representation of x*s meijerg(a1 ... ap, b1 ... bq, z) def _shift(func, s): z = func.args[-1] if z.has(I): z = z.subs(exp_polar, exp) d = z.collect(x, evaluate=False) b = list(d)[0] a = d[b] t = b.as_base_exp() b = t[1] if t[0] is x else S(0) r = s / b an = (i + r for i in func.args[0][0]) ap = (i + r for i in func.args[0][1]) bm = (i + r for i in func.args[1][0]) bq = (i + r for i in func.args[1][1]) return a*-r, meijerg((an, ap), (bm, bq), z) coeff, m = _shift(G_list[0], po_list[0]) sol = fac_list[0] coeff * from_meijerg(m, initcond=initcond, domain=domain) # add all the meijerg functions after converting to holonomic for i in range(1, len(G_list)): coeff, m = _shift(G_list[i], po_list[i]) sol += fac_list[i] * coeff * from_meijerg(m, initcond=initcond, domain=domain) return sol def _create_table(table, domain=QQ): """ Creates the look-up table. For a similar implementation see meijerint._create_lookup_table. """ def add(formula, annihilator, arg, x0=0, y0=[]): """ Adds a formula in the dictionary """ table.setdefault(_mytype(formula, x_1), []).append((formula, HolonomicFunction(annihilator, arg, x0, y0))) R = domain.old_poly_ring(x_1) _, Dx = DifferentialOperators(R, 'Dx') from sympy import (sin, cos, exp, log, erf, sqrt, pi, sinh, cosh, sinc, erfc, Si, Ci, Shi, erfi) # add some basic functions add(sin(x_1), Dx2 + 1, x_1, 0, [0, 1]) add(cos(x_1), Dx2 + 1, x_1, 0, [1, 0]) add(exp(x_1), Dx - 1, x_1, 0, 1) add(log(x_1), Dx + x_1Dx2, x_1, 1, [0, 1]) add(erf(x_1), 2x_1Dx + Dx2, x_1, 0, [0, 2/sqrt(pi)]) add(erfc(x_1), 2x_1Dx + Dx2, x_1, 0, [1, -2/sqrt(pi)]) add(erfi(x_1), -2x_1Dx + Dx2, x_1, 0, [0, 2/sqrt(pi)]) add(sinh(x_1), Dx2 - 1, x_1, 0, [0, 1]) add(cosh(x_1), Dx2 - 1, x_1, 0, [1, 0]) add(sinc(x_1), x_1 + 2Dx + x_1Dx2, x_1) add(Si(x_1), x_1Dx + 2Dx2 + x_1Dx*3, x_1) add(Ci(x_1), x_1Dx + 2Dx2 + x_1Dx*3, x_1) add(Shi(x_1), -x_1Dx + 2Dx2 + x_1Dx**3, x_1) def _find_conditions(func, x, x0, order): y0 = [] for i in range(order): val = func.subs(x, x0) if isinstance(val, NaN): val = limit(func, x, x0) if val.is_finite is False or isinstance(val, NaN): return None y0.append(val) func = func.diff(x) return y0
f50189591d47709ac6ea1d7c601025d4c7332b9ade7936498d5e66e3d52221ce	"""Known matrices related to physics""" from __future__ import print_function, division from sympy import Matrix, I, pi, sqrt from sympy.functions import exp from sympy.core.compatibility import range def msigma(i): r"""Returns a Pauli matrix `\sigma_i` with `i=1,2,3` References ========== .. [1] https://en.wikipedia.org/wiki/Pauli_matrices Examples ======== >>> from sympy.physics.matrices import msigma >>> msigma(1) Matrix([ [0, 1], [1, 0]]) """ if i == 1: mat = ( ( (0, 1), (1, 0) ) ) elif i == 2: mat = ( ( (0, -I), (I, 0) ) ) elif i == 3: mat = ( ( (1, 0), (0, -1) ) ) else: raise IndexError("Invalid Pauli index") return Matrix(mat) def pat_matrix(m, dx, dy, dz): """Returns the Parallel Axis Theorem matrix to translate the inertia matrix a distance of `(dx, dy, dz)` for a body of mass m. Examples ======== To translate a body having a mass of 2 units a distance of 1 unit along the `x`-axis we get: >>> from sympy.physics.matrices import pat_matrix >>> pat_matrix(2, 1, 0, 0) Matrix([ [0, 0, 0], [0, 2, 0], [0, 0, 2]]) """ dxdy = -dxdy dydz = -dydz dzdx = -dzdx dxdx = dx2 dydy = dy2 dzdz = dz2 mat = ((dydy + dzdz, dxdy, dzdx), (dxdy, dxdx + dzdz, dydz), (dzdx, dydz, dydy + dxdx)) return mMatrix(mat) def mgamma(mu, lower=False): r"""Returns a Dirac gamma matrix `\gamma^\mu` in the standard (Dirac) representation. If you want `\gamma_\mu`, use ``gamma(mu, True)``. We use a convention: `\gamma^5 = i \cdot \gamma^0 \cdot \gamma^1 \cdot \gamma^2 \cdot \gamma^3` `\gamma_5 = i \cdot \gamma_0 \cdot \gamma_1 \cdot \gamma_2 \cdot \gamma_3 = - \gamma^5` References ========== .. [1] https://en.wikipedia.org/wiki/Gamma_matrices Examples ======== >>> from sympy.physics.matrices import mgamma >>> mgamma(1) Matrix([ [ 0, 0, 0, 1], [ 0, 0, 1, 0], [ 0, -1, 0, 0], [-1, 0, 0, 0]]) """ if not mu in [0, 1, 2, 3, 5]: raise IndexError("Invalid Dirac index") if mu == 0: mat = ( (1, 0, 0, 0), (0, 1, 0, 0), (0, 0, -1, 0), (0, 0, 0, -1) ) elif mu == 1: mat = ( (0, 0, 0, 1), (0, 0, 1, 0), (0, -1, 0, 0), (-1, 0, 0, 0) ) elif mu == 2: mat = ( (0, 0, 0, -I), (0, 0, I, 0), (0, I, 0, 0), (-I, 0, 0, 0) ) elif mu == 3: mat = ( (0, 0, 1, 0), (0, 0, 0, -1), (-1, 0, 0, 0), (0, 1, 0, 0) ) elif mu == 5: mat = ( (0, 0, 1, 0), (0, 0, 0, 1), (1, 0, 0, 0), (0, 1, 0, 0) ) m = Matrix(mat) if lower: if mu in [1, 2, 3, 5]: m = -m return m #Minkowski tensor using the convention (+,-,-,-) used in the Quantum Field #Theory minkowski_tensor = Matrix( ( (1, 0, 0, 0), (0, -1, 0, 0), (0, 0, -1, 0), (0, 0, 0, -1) )) def mdft(n): r""" Returns an expression of a discrete Fourier transform as a matrix multiplication. It is an n X n matrix. References ========== .. [1] https://en.wikipedia.org/wiki/DFT_matrix Examples ======== >>> from sympy.physics.matrices import mdft >>> mdft(3) Matrix([ [sqrt(3)/3, sqrt(3)/3, sqrt(3)/3], [sqrt(3)/3, sqrt(3)exp(-2Ipi/3)/3, sqrt(3)exp(2Ipi/3)/3], [sqrt(3)/3, sqrt(3)exp(2Ipi/3)/3, sqrt(3)exp(-2Ipi/3)/3]]) """ mat = [[None for x in range(n)] for y in range(n)] base = exp(-2piI/n) mat[0] = [1]n for i in range(n): mat[i][0] = 1 for i in range(1, n): for j in range(i, n): mat[i][j] = mat[j][i] = base(ij) return (1/sqrt(n))*Matrix(mat)
cc93e1c5e4456c7852d69d153f181e273af39c2afe5f6b1a0b5f74d4648faec4	""" Second quantization operators and states for bosons. This follow the formulation of Fetter and Welecka, "Quantum Theory of Many-Particle Systems." """ from __future__ import print_function, division from collections import defaultdict from sympy import (Add, Basic, cacheit, Dummy, Expr, Function, I, KroneckerDelta, Mul, Pow, S, sqrt, Symbol, sympify, Tuple, zeros) from sympy.printing.str import StrPrinter from sympy.core.compatibility import range from sympy.utilities.iterables import has_dups from sympy.utilities import default_sort_key __all__ = [ 'Dagger', 'KroneckerDelta', 'BosonicOperator', 'AnnihilateBoson', 'CreateBoson', 'AnnihilateFermion', 'CreateFermion', 'FockState', 'FockStateBra', 'FockStateKet', 'FockStateBosonKet', 'FockStateBosonBra', 'BBra', 'BKet', 'FBra', 'FKet', 'F', 'Fd', 'B', 'Bd', 'apply_operators', 'InnerProduct', 'BosonicBasis', 'VarBosonicBasis', 'FixedBosonicBasis', 'Commutator', 'matrix_rep', 'contraction', 'wicks', 'NO', 'evaluate_deltas', 'AntiSymmetricTensor', 'substitute_dummies', 'PermutationOperator', 'simplify_index_permutations', ] class SecondQuantizationError(Exception): pass class AppliesOnlyToSymbolicIndex(SecondQuantizationError): pass class ContractionAppliesOnlyToFermions(SecondQuantizationError): pass class ViolationOfPauliPrinciple(SecondQuantizationError): pass class SubstitutionOfAmbigousOperatorFailed(SecondQuantizationError): pass class WicksTheoremDoesNotApply(SecondQuantizationError): pass class Dagger(Expr): """ Hermitian conjugate of creation/annihilation operators. Examples ======== >>> from sympy import I >>> from sympy.physics.secondquant import Dagger, B, Bd >>> Dagger(2I) -2I >>> Dagger(B(0)) CreateBoson(0) >>> Dagger(Bd(0)) AnnihilateBoson(0) """ def __new__(cls, arg): arg = sympify(arg) r = cls.eval(arg) if isinstance(r, Basic): return r obj = Basic.__new__(cls, arg) return obj @classmethod def eval(cls, arg): """ Evaluates the Dagger instance. Examples ======== >>> from sympy import I >>> from sympy.physics.secondquant import Dagger, B, Bd >>> Dagger(2I) -2I >>> Dagger(B(0)) CreateBoson(0) >>> Dagger(Bd(0)) AnnihilateBoson(0) The eval() method is called automatically. """ dagger = getattr(arg, '_dagger_', None) if dagger is not None: return dagger() if isinstance(arg, Basic): if arg.is_Add: return Add(tuple(map(Dagger, arg.args))) if arg.is_Mul: return Mul(tuple(map(Dagger, reversed(arg.args)))) if arg.is_Number: return arg if arg.is_Pow: return Pow(Dagger(arg.args[0]), arg.args[1]) if arg == I: return -arg else: return None def _dagger_(self): return self.args[0] class TensorSymbol(Expr): is_commutative = True class AntiSymmetricTensor(TensorSymbol): """Stores upper and lower indices in separate Tuple's. Each group of indices is assumed to be antisymmetric. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import AntiSymmetricTensor >>> i, j = symbols('i j', below_fermi=True) >>> a, b = symbols('a b', above_fermi=True) >>> AntiSymmetricTensor('v', (a, i), (b, j)) AntiSymmetricTensor(v, (a, i), (b, j)) >>> AntiSymmetricTensor('v', (i, a), (b, j)) -AntiSymmetricTensor(v, (a, i), (b, j)) As you can see, the indices are automatically sorted to a canonical form. """ def __new__(cls, symbol, upper, lower): try: upper, signu = _sort_anticommuting_fermions( upper, key=cls._sortkey) lower, signl = _sort_anticommuting_fermions( lower, key=cls._sortkey) except ViolationOfPauliPrinciple: return S.Zero symbol = sympify(symbol) upper = Tuple(upper) lower = Tuple(lower) if (signu + signl) % 2: return -TensorSymbol.__new__(cls, symbol, upper, lower) else: return TensorSymbol.__new__(cls, symbol, upper, lower) @classmethod def _sortkey(cls, index): """Key for sorting of indices. particle < hole < general FIXME: This is a bottle-neck, can we do it faster? """ h = hash(index) label = str(index) if isinstance(index, Dummy): if index.assumptions0.get('above_fermi'): return (20, label, h) elif index.assumptions0.get('below_fermi'): return (21, label, h) else: return (22, label, h) if index.assumptions0.get('above_fermi'): return (10, label, h) elif index.assumptions0.get('below_fermi'): return (11, label, h) else: return (12, label, h) def _latex(self, printer): return "%s^{%s}_{%s}" % ( self.symbol, "".join([ i.name for i in self.args[1]]), "".join([ i.name for i in self.args[2]]) ) @property def symbol(self): """ Returns the symbol of the tensor. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import AntiSymmetricTensor >>> i, j = symbols('i,j', below_fermi=True) >>> a, b = symbols('a,b', above_fermi=True) >>> AntiSymmetricTensor('v', (a, i), (b, j)) AntiSymmetricTensor(v, (a, i), (b, j)) >>> AntiSymmetricTensor('v', (a, i), (b, j)).symbol v """ return self.args[0] @property def upper(self): """ Returns the upper indices. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import AntiSymmetricTensor >>> i, j = symbols('i,j', below_fermi=True) >>> a, b = symbols('a,b', above_fermi=True) >>> AntiSymmetricTensor('v', (a, i), (b, j)) AntiSymmetricTensor(v, (a, i), (b, j)) >>> AntiSymmetricTensor('v', (a, i), (b, j)).upper (a, i) """ return self.args[1] @property def lower(self): """ Returns the lower indices. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import AntiSymmetricTensor >>> i, j = symbols('i,j', below_fermi=True) >>> a, b = symbols('a,b', above_fermi=True) >>> AntiSymmetricTensor('v', (a, i), (b, j)) AntiSymmetricTensor(v, (a, i), (b, j)) >>> AntiSymmetricTensor('v', (a, i), (b, j)).lower (b, j) """ return self.args[2] def __str__(self): return "%s(%s,%s)" % self.args def doit(self, kw_args): """ Returns self. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import AntiSymmetricTensor >>> i, j = symbols('i,j', below_fermi=True) >>> a, b = symbols('a,b', above_fermi=True) >>> AntiSymmetricTensor('v', (a, i), (b, j)).doit() AntiSymmetricTensor(v, (a, i), (b, j)) """ return self class SqOperator(Expr): """ Base class for Second Quantization operators. """ op_symbol = 'sq' is_commutative = False def __new__(cls, k): obj = Basic.__new__(cls, sympify(k)) return obj @property def state(self): """ Returns the state index related to this operator. >>> from sympy import Symbol >>> from sympy.physics.secondquant import F, Fd, B, Bd >>> p = Symbol('p') >>> F(p).state p >>> Fd(p).state p >>> B(p).state p >>> Bd(p).state p """ return self.args[0] @property def is_symbolic(self): """ Returns True if the state is a symbol (as opposed to a number). >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> p = Symbol('p') >>> F(p).is_symbolic True >>> F(1).is_symbolic False """ if self.state.is_Integer: return False else: return True def doit(self, kw_args): """ FIXME: hack to prevent crash further up... """ return self def __repr__(self): return NotImplemented def __str__(self): return "%s(%r)" % (self.op_symbol, self.state) def apply_operator(self, state): """ Applies an operator to itself. """ raise NotImplementedError('implement apply_operator in a subclass') class BosonicOperator(SqOperator): pass class Annihilator(SqOperator): pass class Creator(SqOperator): pass class AnnihilateBoson(BosonicOperator, Annihilator): """ Bosonic annihilation operator. Examples ======== >>> from sympy.physics.secondquant import B >>> from sympy.abc import x >>> B(x) AnnihilateBoson(x) """ op_symbol = 'b' def _dagger_(self): return CreateBoson(self.state) def apply_operator(self, state): """ Apply state to self if self is not symbolic and state is a FockStateKet, else multiply self by state. Examples ======== >>> from sympy.physics.secondquant import B, BKet >>> from sympy.abc import x, y, n >>> B(x).apply_operator(y) yAnnihilateBoson(x) >>> B(0).apply_operator(BKet((n,))) sqrt(n)FockStateBosonKet((n - 1,)) """ if not self.is_symbolic and isinstance(state, FockStateKet): element = self.state amp = sqrt(state[element]) return ampstate.down(element) else: return Mul(self, state) def __repr__(self): return "AnnihilateBoson(%s)" % self.state def _latex(self, printer): return "b_{%s}" % self.state.name class CreateBoson(BosonicOperator, Creator): """ Bosonic creation operator. """ op_symbol = 'b+' def _dagger_(self): return AnnihilateBoson(self.state) def apply_operator(self, state): """ Apply state to self if self is not symbolic and state is a FockStateKet, else multiply self by state. Examples ======== >>> from sympy.physics.secondquant import B, Dagger, BKet >>> from sympy.abc import x, y, n >>> Dagger(B(x)).apply_operator(y) yCreateBoson(x) >>> B(0).apply_operator(BKet((n,))) sqrt(n)FockStateBosonKet((n - 1,)) """ if not self.is_symbolic and isinstance(state, FockStateKet): element = self.state amp = sqrt(state[element] + 1) return ampstate.up(element) else: return Mul(self, state) def __repr__(self): return "CreateBoson(%s)" % self.state def _latex(self, printer): return "b^\\dagger_{%s}" % self.state.name B = AnnihilateBoson Bd = CreateBoson class FermionicOperator(SqOperator): @property def is_restricted(self): """ Is this FermionicOperator restricted with respect to fermi level? Return values: 1 : restricted to orbits above fermi 0 : no restriction -1 : restricted to orbits below fermi >>> from sympy import Symbol >>> from sympy.physics.secondquant import F, Fd >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_restricted 1 >>> Fd(a).is_restricted 1 >>> F(i).is_restricted -1 >>> Fd(i).is_restricted -1 >>> F(p).is_restricted 0 >>> Fd(p).is_restricted 0 """ ass = self.args[0].assumptions0 if ass.get("below_fermi"): return -1 if ass.get("above_fermi"): return 1 return 0 @property def is_above_fermi(self): """ Does the index of this FermionicOperator allow values above fermi? >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_above_fermi True >>> F(i).is_above_fermi False >>> F(p).is_above_fermi True The same applies to creation operators Fd """ return not self.args[0].assumptions0.get("below_fermi") @property def is_below_fermi(self): """ Does the index of this FermionicOperator allow values below fermi? >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_below_fermi False >>> F(i).is_below_fermi True >>> F(p).is_below_fermi True The same applies to creation operators Fd """ return not self.args[0].assumptions0.get("above_fermi") @property def is_only_below_fermi(self): """ Is the index of this FermionicOperator restricted to values below fermi? >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_only_below_fermi False >>> F(i).is_only_below_fermi True >>> F(p).is_only_below_fermi False The same applies to creation operators Fd """ return self.is_below_fermi and not self.is_above_fermi @property def is_only_above_fermi(self): """ Is the index of this FermionicOperator restricted to values above fermi? >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_only_above_fermi True >>> F(i).is_only_above_fermi False >>> F(p).is_only_above_fermi False The same applies to creation operators Fd """ return self.is_above_fermi and not self.is_below_fermi def _sortkey(self): h = hash(self) label = str(self.args[0]) if self.is_only_q_creator: return 1, label, h if self.is_only_q_annihilator: return 4, label, h if isinstance(self, Annihilator): return 3, label, h if isinstance(self, Creator): return 2, label, h class AnnihilateFermion(FermionicOperator, Annihilator): """ Fermionic annihilation operator. """ op_symbol = 'f' def _dagger_(self): return CreateFermion(self.state) def apply_operator(self, state): """ Apply state to self if self is not symbolic and state is a FockStateKet, else multiply self by state. Examples ======== >>> from sympy.physics.secondquant import B, Dagger, BKet >>> from sympy.abc import x, y, n >>> Dagger(B(x)).apply_operator(y) yCreateBoson(x) >>> B(0).apply_operator(BKet((n,))) sqrt(n)FockStateBosonKet((n - 1,)) """ if isinstance(state, FockStateFermionKet): element = self.state return state.down(element) elif isinstance(state, Mul): c_part, nc_part = state.args_cnc() if isinstance(nc_part[0], FockStateFermionKet): element = self.state return Mul((c_part + [nc_part[0].down(element)] + nc_part[1:])) else: return Mul(self, state) else: return Mul(self, state) @property def is_q_creator(self): """ Can we create a quasi-particle? (create hole or create particle) If so, would that be above or below the fermi surface? >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_q_creator 0 >>> F(i).is_q_creator -1 >>> F(p).is_q_creator -1 """ if self.is_below_fermi: return -1 return 0 @property def is_q_annihilator(self): """ Can we destroy a quasi-particle? (annihilate hole or annihilate particle) If so, would that be above or below the fermi surface? >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=1) >>> i = Symbol('i', below_fermi=1) >>> p = Symbol('p') >>> F(a).is_q_annihilator 1 >>> F(i).is_q_annihilator 0 >>> F(p).is_q_annihilator 1 """ if self.is_above_fermi: return 1 return 0 @property def is_only_q_creator(self): """ Always create a quasi-particle? (create hole or create particle) >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_only_q_creator False >>> F(i).is_only_q_creator True >>> F(p).is_only_q_creator False """ return self.is_only_below_fermi @property def is_only_q_annihilator(self): """ Always destroy a quasi-particle? (annihilate hole or annihilate particle) >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_only_q_annihilator True >>> F(i).is_only_q_annihilator False >>> F(p).is_only_q_annihilator False """ return self.is_only_above_fermi def __repr__(self): return "AnnihilateFermion(%s)" % self.state def _latex(self, printer): return "a_{%s}" % self.state.name class CreateFermion(FermionicOperator, Creator): """ Fermionic creation operator. """ op_symbol = 'f+' def _dagger_(self): return AnnihilateFermion(self.state) def apply_operator(self, state): """ Apply state to self if self is not symbolic and state is a FockStateKet, else multiply self by state. Examples ======== >>> from sympy.physics.secondquant import B, Dagger, BKet >>> from sympy.abc import x, y, n >>> Dagger(B(x)).apply_operator(y) yCreateBoson(x) >>> B(0).apply_operator(BKet((n,))) sqrt(n)FockStateBosonKet((n - 1,)) """ if isinstance(state, FockStateFermionKet): element = self.state return state.up(element) elif isinstance(state, Mul): c_part, nc_part = state.args_cnc() if isinstance(nc_part[0], FockStateFermionKet): element = self.state return Mul((c_part + [nc_part[0].up(element)] + nc_part[1:])) return Mul(self, state) @property def is_q_creator(self): """ Can we create a quasi-particle? (create hole or create particle) If so, would that be above or below the fermi surface? >>> from sympy import Symbol >>> from sympy.physics.secondquant import Fd >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> Fd(a).is_q_creator 1 >>> Fd(i).is_q_creator 0 >>> Fd(p).is_q_creator 1 """ if self.is_above_fermi: return 1 return 0 @property def is_q_annihilator(self): """ Can we destroy a quasi-particle? (annihilate hole or annihilate particle) If so, would that be above or below the fermi surface? >>> from sympy import Symbol >>> from sympy.physics.secondquant import Fd >>> a = Symbol('a', above_fermi=1) >>> i = Symbol('i', below_fermi=1) >>> p = Symbol('p') >>> Fd(a).is_q_annihilator 0 >>> Fd(i).is_q_annihilator -1 >>> Fd(p).is_q_annihilator -1 """ if self.is_below_fermi: return -1 return 0 @property def is_only_q_creator(self): """ Always create a quasi-particle? (create hole or create particle) >>> from sympy import Symbol >>> from sympy.physics.secondquant import Fd >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> Fd(a).is_only_q_creator True >>> Fd(i).is_only_q_creator False >>> Fd(p).is_only_q_creator False """ return self.is_only_above_fermi @property def is_only_q_annihilator(self): """ Always destroy a quasi-particle? (annihilate hole or annihilate particle) >>> from sympy import Symbol >>> from sympy.physics.secondquant import Fd >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> Fd(a).is_only_q_annihilator False >>> Fd(i).is_only_q_annihilator True >>> Fd(p).is_only_q_annihilator False """ return self.is_only_below_fermi def __repr__(self): return "CreateFermion(%s)" % self.state def _latex(self, printer): return "a^\\dagger_{%s}" % self.state.name Fd = CreateFermion F = AnnihilateFermion class FockState(Expr): """ Many particle Fock state with a sequence of occupation numbers. Anywhere you can have a FockState, you can also have S.Zero. All code must check for this! Base class to represent FockStates. """ is_commutative = False def __new__(cls, occupations): """ occupations is a list with two possible meanings: - For bosons it is a list of occupation numbers. Element i is the number of particles in state i. - For fermions it is a list of occupied orbits. Element 0 is the state that was occupied first, element i is the i'th occupied state. """ occupations = list(map(sympify, occupations)) obj = Basic.__new__(cls, Tuple(occupations)) return obj def __getitem__(self, i): i = int(i) return self.args[0][i] def __repr__(self): return ("FockState(%r)") % (self.args) def __str__(self): return "%s%r%s" % (self.lbracket, self._labels(), self.rbracket) def _labels(self): return self.args[0] def __len__(self): return len(self.args[0]) class BosonState(FockState): """ Base class for FockStateBoson(Ket/Bra). """ def up(self, i): """ Performs the action of a creation operator. Examples ======== >>> from sympy.physics.secondquant import BBra >>> b = BBra([1, 2]) >>> b FockStateBosonBra((1, 2)) >>> b.up(1) FockStateBosonBra((1, 3)) """ i = int(i) new_occs = list(self.args[0]) new_occs[i] = new_occs[i] + S.One return self.__class__(new_occs) def down(self, i): """ Performs the action of an annihilation operator. Examples ======== >>> from sympy.physics.secondquant import BBra >>> b = BBra([1, 2]) >>> b FockStateBosonBra((1, 2)) >>> b.down(1) FockStateBosonBra((1, 1)) """ i = int(i) new_occs = list(self.args[0]) if new_occs[i] == S.Zero: return S.Zero else: new_occs[i] = new_occs[i] - S.One return self.__class__(new_occs) class FermionState(FockState): """ Base class for FockStateFermion(Ket/Bra). """ fermi_level = 0 def __new__(cls, occupations, fermi_level=0): occupations = list(map(sympify, occupations)) if len(occupations) > 1: try: (occupations, sign) = _sort_anticommuting_fermions( occupations, key=hash) except ViolationOfPauliPrinciple: return S.Zero else: sign = 0 cls.fermi_level = fermi_level if cls._count_holes(occupations) > fermi_level: return S.Zero if sign % 2: return S.NegativeOneFockState.__new__(cls, occupations) else: return FockState.__new__(cls, occupations) def up(self, i): """ Performs the action of a creation operator. If below fermi we try to remove a hole, if above fermi we try to create a particle. if general index p we return Kronecker(p,i)self where i is a new symbol with restriction above or below. >>> from sympy import Symbol >>> from sympy.physics.secondquant import FKet >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> FKet([]).up(a) FockStateFermionKet((a,)) A creator acting on vacuum below fermi vanishes >>> FKet([]).up(i) 0 """ present = i in self.args[0] if self._only_above_fermi(i): if present: return S.Zero else: return self._add_orbit(i) elif self._only_below_fermi(i): if present: return self._remove_orbit(i) else: return S.Zero else: if present: hole = Dummy("i", below_fermi=True) return KroneckerDelta(i, hole)self._remove_orbit(i) else: particle = Dummy("a", above_fermi=True) return KroneckerDelta(i, particle)self._add_orbit(i) def down(self, i): """ Performs the action of an annihilation operator. If below fermi we try to create a hole, if above fermi we try to remove a particle. if general index p we return Kronecker(p,i)self where i is a new symbol with restriction above or below. >>> from sympy import Symbol >>> from sympy.physics.secondquant import FKet >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') An annihilator acting on vacuum above fermi vanishes >>> FKet([]).down(a) 0 Also below fermi, it vanishes, unless we specify a fermi level > 0 >>> FKet([]).down(i) 0 >>> FKet([],4).down(i) FockStateFermionKet((i,)) """ present = i in self.args[0] if self._only_above_fermi(i): if present: return self._remove_orbit(i) else: return S.Zero elif self._only_below_fermi(i): if present: return S.Zero else: return self._add_orbit(i) else: if present: hole = Dummy("i", below_fermi=True) return KroneckerDelta(i, hole)self._add_orbit(i) else: particle = Dummy("a", above_fermi=True) return KroneckerDelta(i, particle)self._remove_orbit(i) @classmethod def _only_below_fermi(cls, i): """ Tests if given orbit is only below fermi surface. If nothing can be concluded we return a conservative False. """ if i.is_number: return i <= cls.fermi_level if i.assumptions0.get('below_fermi'): return True return False @classmethod def _only_above_fermi(cls, i): """ Tests if given orbit is only above fermi surface. If fermi level has not been set we return True. If nothing can be concluded we return a conservative False. """ if i.is_number: return i > cls.fermi_level if i.assumptions0.get('above_fermi'): return True return not cls.fermi_level def _remove_orbit(self, i): """ Removes particle/fills hole in orbit i. No input tests performed here. """ new_occs = list(self.args[0]) pos = new_occs.index(i) del new_occs[pos] if (pos) % 2: return S.NegativeOneself.__class__(new_occs, self.fermi_level) else: return self.__class__(new_occs, self.fermi_level) def _add_orbit(self, i): """ Adds particle/creates hole in orbit i. No input tests performed here. """ return self.__class__((i,) + self.args[0], self.fermi_level) @classmethod def _count_holes(cls, list): """ returns number of identified hole states in list. """ return len([i for i in list if cls._only_below_fermi(i)]) def _negate_holes(self, list): return tuple([-i if i <= self.fermi_level else i for i in list]) def __repr__(self): if self.fermi_level: return "FockStateKet(%r, fermi_level=%s)" % (self.args[0], self.fermi_level) else: return "FockStateKet(%r)" % (self.args[0],) def _labels(self): return self._negate_holes(self.args[0]) class FockStateKet(FockState): """ Representation of a ket. """ lbracket = '\|' rbracket = '>' class FockStateBra(FockState): """ Representation of a bra. """ lbracket = '<' rbracket = '\|' def __mul__(self, other): if isinstance(other, FockStateKet): return InnerProduct(self, other) else: return Expr.__mul__(self, other) class FockStateBosonKet(BosonState, FockStateKet): """ Many particle Fock state with a sequence of occupation numbers. Occupation numbers can be any integer >= 0. Examples ======== >>> from sympy.physics.secondquant import BKet >>> BKet([1, 2]) FockStateBosonKet((1, 2)) """ def _dagger_(self): return FockStateBosonBra(self.args) class FockStateBosonBra(BosonState, FockStateBra): """ Describes a collection of BosonBra particles. Examples ======== >>> from sympy.physics.secondquant import BBra >>> BBra([1, 2]) FockStateBosonBra((1, 2)) """ def _dagger_(self): return FockStateBosonKet(self.args) class FockStateFermionKet(FermionState, FockStateKet): """ Many-particle Fock state with a sequence of occupied orbits. Each state can only have one particle, so we choose to store a list of occupied orbits rather than a tuple with occupation numbers (zeros and ones). states below fermi level are holes, and are represented by negative labels in the occupation list. For symbolic state labels, the fermi_level caps the number of allowed hole- states. Examples ======== >>> from sympy.physics.secondquant import FKet >>> FKet([1, 2]) #doctest: +SKIP FockStateFermionKet((1, 2)) """ def _dagger_(self): return FockStateFermionBra(self.args) class FockStateFermionBra(FermionState, FockStateBra): """ See Also ======== FockStateFermionKet Examples ======== >>> from sympy.physics.secondquant import FBra >>> FBra([1, 2]) #doctest: +SKIP FockStateFermionBra((1, 2)) """ def _dagger_(self): return FockStateFermionKet(self.args) BBra = FockStateBosonBra BKet = FockStateBosonKet FBra = FockStateFermionBra FKet = FockStateFermionKet def _apply_Mul(m): """ Take a Mul instance with operators and apply them to states. This method applies all operators with integer state labels to the actual states. For symbolic state labels, nothing is done. When inner products of FockStates are encountered (like <a\|b>), they are converted to instances of InnerProduct. This does not currently work on double inner products like, <a\|b><c\|d>. If the argument is not a Mul, it is simply returned as is. """ if not isinstance(m, Mul): return m c_part, nc_part = m.args_cnc() n_nc = len(nc_part) if n_nc == 0 or n_nc == 1: return m else: last = nc_part[-1] next_to_last = nc_part[-2] if isinstance(last, FockStateKet): if isinstance(next_to_last, SqOperator): if next_to_last.is_symbolic: return m else: result = next_to_last.apply_operator(last) if result == 0: return S.Zero else: return _apply_Mul(Mul((c_part + nc_part[:-2] + [result]))) elif isinstance(next_to_last, Pow): if isinstance(next_to_last.base, SqOperator) and \ next_to_last.exp.is_Integer: if next_to_last.base.is_symbolic: return m else: result = last for i in range(next_to_last.exp): result = next_to_last.base.apply_operator(result) if result == 0: break if result == 0: return S.Zero else: return _apply_Mul(Mul((c_part + nc_part[:-2] + [result]))) else: return m elif isinstance(next_to_last, FockStateBra): result = InnerProduct(next_to_last, last) if result == 0: return S.Zero else: return _apply_Mul(Mul((c_part + nc_part[:-2] + [result]))) else: return m else: return m def apply_operators(e): """ Take a sympy expression with operators and states and apply the operators. Examples ======== >>> from sympy.physics.secondquant import apply_operators >>> from sympy import sympify >>> apply_operators(sympify(3)+4) 7 """ e = e.expand() muls = e.atoms(Mul) subs_list = [(m, _apply_Mul(m)) for m in iter(muls)] return e.subs(subs_list) class InnerProduct(Basic): """ An unevaluated inner product between a bra and ket. Currently this class just reduces things to a product of Kronecker Deltas. In the future, we could introduce abstract states like ``\|a>`` and ``\|b>``, and leave the inner product unevaluated as ``<a\|b>``. """ is_commutative = True def __new__(cls, bra, ket): if not isinstance(bra, FockStateBra): raise TypeError("must be a bra") if not isinstance(ket, FockStateKet): raise TypeError("must be a key") return cls.eval(bra, ket) @classmethod def eval(cls, bra, ket): result = S.One for i, j in zip(bra.args[0], ket.args[0]): result = KroneckerDelta(i, j) if result == 0: break return result @property def bra(self): """Returns the bra part of the state""" return self.args[0] @property def ket(self): """Returns the ket part of the state""" return self.args[1] def __repr__(self): sbra = repr(self.bra) sket = repr(self.ket) return "%s\|%s" % (sbra[:-1], sket[1:]) def __str__(self): return self.__repr__() def matrix_rep(op, basis): """ Find the representation of an operator in a basis. Examples ======== >>> from sympy.physics.secondquant import VarBosonicBasis, B, matrix_rep >>> b = VarBosonicBasis(5) >>> o = B(0) >>> matrix_rep(o, b) Matrix([ [0, 1, 0, 0, 0], [0, 0, sqrt(2), 0, 0], [0, 0, 0, sqrt(3), 0], [0, 0, 0, 0, 2], [0, 0, 0, 0, 0]]) """ a = zeros(len(basis)) for i in range(len(basis)): for j in range(len(basis)): a[i, j] = apply_operators(Dagger(basis[i])opbasis[j]) return a class BosonicBasis(object): """ Base class for a basis set of bosonic Fock states. """ pass class VarBosonicBasis(object): """ A single state, variable particle number basis set. Examples ======== >>> from sympy.physics.secondquant import VarBosonicBasis >>> b = VarBosonicBasis(5) >>> b [FockState((0,)), FockState((1,)), FockState((2,)), FockState((3,)), FockState((4,))] """ def __init__(self, n_max): self.n_max = n_max self._build_states() def _build_states(self): self.basis = [] for i in range(self.n_max): self.basis.append(FockStateBosonKet([i])) self.n_basis = len(self.basis) def index(self, state): """ Returns the index of state in basis. Examples ======== >>> from sympy.physics.secondquant import VarBosonicBasis >>> b = VarBosonicBasis(3) >>> state = b.state(1) >>> b [FockState((0,)), FockState((1,)), FockState((2,))] >>> state FockStateBosonKet((1,)) >>> b.index(state) 1 """ return self.basis.index(state) def state(self, i): """ The state of a single basis. Examples ======== >>> from sympy.physics.secondquant import VarBosonicBasis >>> b = VarBosonicBasis(5) >>> b.state(3) FockStateBosonKet((3,)) """ return self.basis[i] def __getitem__(self, i): return self.state(i) def __len__(self): return len(self.basis) def __repr__(self): return repr(self.basis) class FixedBosonicBasis(BosonicBasis): """ Fixed particle number basis set. Examples ======== >>> from sympy.physics.secondquant import FixedBosonicBasis >>> b = FixedBosonicBasis(2, 2) >>> state = b.state(1) >>> b [FockState((2, 0)), FockState((1, 1)), FockState((0, 2))] >>> state FockStateBosonKet((1, 1)) >>> b.index(state) 1 """ def __init__(self, n_particles, n_levels): self.n_particles = n_particles self.n_levels = n_levels self._build_particle_locations() self._build_states() def _build_particle_locations(self): tup = ["i%i" % i for i in range(self.n_particles)] first_loop = "for i0 in range(%i)" % self.n_levels other_loops = '' for cur, prev in zip(tup[1:], tup): temp = "for %s in range(%s + 1) " % (cur, prev) other_loops = other_loops + temp tup_string = "(%s)" % ", ".join(tup) list_comp = "[%s %s %s]" % (tup_string, first_loop, other_loops) result = eval(list_comp) if self.n_particles == 1: result = [(item,) for item in result] self.particle_locations = result def _build_states(self): self.basis = [] for tuple_of_indices in self.particle_locations: occ_numbers = self.n_levels[0] for level in tuple_of_indices: occ_numbers[level] += 1 self.basis.append(FockStateBosonKet(occ_numbers)) self.n_basis = len(self.basis) def index(self, state): """Returns the index of state in basis. Examples ======== >>> from sympy.physics.secondquant import FixedBosonicBasis >>> b = FixedBosonicBasis(2, 3) >>> b.index(b.state(3)) 3 """ return self.basis.index(state) def state(self, i): """Returns the state that lies at index i of the basis Examples ======== >>> from sympy.physics.secondquant import FixedBosonicBasis >>> b = FixedBosonicBasis(2, 3) >>> b.state(3) FockStateBosonKet((1, 0, 1)) """ return self.basis[i] def __getitem__(self, i): return self.state(i) def __len__(self): return len(self.basis) def __repr__(self): return repr(self.basis) class Commutator(Function): """ The Commutator: [A, B] = AB - BA The arguments are ordered according to .__cmp__() >>> from sympy import symbols >>> from sympy.physics.secondquant import Commutator >>> A, B = symbols('A,B', commutative=False) >>> Commutator(B, A) -Commutator(A, B) Evaluate the commutator with .doit() >>> comm = Commutator(A,B); comm Commutator(A, B) >>> comm.doit() AB - BA For two second quantization operators the commutator is evaluated immediately: >>> from sympy.physics.secondquant import Fd, F >>> a = symbols('a', above_fermi=True) >>> i = symbols('i', below_fermi=True) >>> p,q = symbols('p,q') >>> Commutator(Fd(a),Fd(i)) 2NO(CreateFermion(a)CreateFermion(i)) But for more complicated expressions, the evaluation is triggered by a call to .doit() >>> comm = Commutator(Fd(p)Fd(q),F(i)); comm Commutator(CreateFermion(p)CreateFermion(q), AnnihilateFermion(i)) >>> comm.doit(wicks=True) -KroneckerDelta(i, p)CreateFermion(q) + KroneckerDelta(i, q)CreateFermion(p) """ is_commutative = False @classmethod def eval(cls, a, b): """ The Commutator [A,B] is on canonical form if A < B. Examples ======== >>> from sympy.physics.secondquant import Commutator, F, Fd >>> from sympy.abc import x >>> c1 = Commutator(F(x), Fd(x)) >>> c2 = Commutator(Fd(x), F(x)) >>> Commutator.eval(c1, c2) 0 """ if not (a and b): return S.Zero if a == b: return S.Zero if a.is_commutative or b.is_commutative: return S.Zero # # [A+B,C] -> [A,C] + [B,C] # a = a.expand() if isinstance(a, Add): return Add([cls(term, b) for term in a.args]) b = b.expand() if isinstance(b, Add): return Add([cls(a, term) for term in b.args]) # # [xA,yB] -> xy[A,B] # ca, nca = a.args_cnc() cb, ncb = b.args_cnc() c_part = list(ca) + list(cb) if c_part: return Mul(Mul(c_part), cls(Mul._from_args(nca), Mul._from_args(ncb))) # # single second quantization operators # if isinstance(a, BosonicOperator) and isinstance(b, BosonicOperator): if isinstance(b, CreateBoson) and isinstance(a, AnnihilateBoson): return KroneckerDelta(a.state, b.state) if isinstance(a, CreateBoson) and isinstance(b, AnnihilateBoson): return S.NegativeOneKroneckerDelta(a.state, b.state) else: return S.Zero if isinstance(a, FermionicOperator) and isinstance(b, FermionicOperator): return wicks(ab) - wicks(ba) # # Canonical ordering of arguments # if a.sort_key() > b.sort_key(): return S.NegativeOnecls(b, a) def doit(self, *hints): """ Enables the computation of complex expressions. Examples ======== >>> from sympy.physics.secondquant import Commutator, F, Fd >>> from sympy import symbols >>> i, j = symbols('i,j', below_fermi=True) >>> a, b = symbols('a,b', above_fermi=True) >>> c = Commutator(Fd(a)F(i),Fd(b)F(j)) >>> c.doit(wicks=True) 0 """ a = self.args[0] b = self.args[1] if hints.get("wicks"): a = a.doit(hints) b = b.doit(hints) try: return wicks(ab) - wicks(ba) except ContractionAppliesOnlyToFermions: pass except WicksTheoremDoesNotApply: pass return (ab - ba).doit(hints) def __repr__(self): return "Commutator(%s,%s)" % (self.args[0], self.args[1]) def __str__(self): return "[%s,%s]" % (self.args[0], self.args[1]) def _latex(self, printer): return "\\left[%s,%s\\right]" % tuple([ printer._print(arg) for arg in self.args]) class NO(Expr): """ This Object is used to represent normal ordering brackets. i.e. {abcd} sometimes written :abcd: Applying the function NO(arg) to an argument means that all operators in the argument will be assumed to anticommute, and have vanishing contractions. This allows an immediate reordering to canonical form upon object creation. >>> from sympy import symbols >>> from sympy.physics.secondquant import NO, F, Fd >>> p,q = symbols('p,q') >>> NO(Fd(p)F(q)) NO(CreateFermion(p)AnnihilateFermion(q)) >>> NO(F(q)Fd(p)) -NO(CreateFermion(p)AnnihilateFermion(q)) Note: If you want to generate a normal ordered equivalent of an expression, you should use the function wicks(). This class only indicates that all operators inside the brackets anticommute, and have vanishing contractions. Nothing more, nothing less. """ is_commutative = False def __new__(cls, arg): """ Use anticommutation to get canonical form of operators. Employ associativity of normal ordered product: {ab{cd}} = {abcd} but note that {ab}{cd} /= {abcd}. We also employ distributivity: {ab + cd} = {ab} + {cd}. Canonical form also implies expand() {ab(c+d)} = {abc} + {abd}. """ # {ab + cd} = {ab} + {cd} arg = sympify(arg) arg = arg.expand() if arg.is_Add: return Add([ cls(term) for term in arg.args]) if arg.is_Mul: # take coefficient outside of normal ordering brackets c_part, seq = arg.args_cnc() if c_part: coeff = Mul(c_part) if not seq: return coeff else: coeff = S.One # {ab{cd}} = {abcd} newseq = [] foundit = False for fac in seq: if isinstance(fac, NO): newseq.extend(fac.args) foundit = True else: newseq.append(fac) if foundit: return coeffcls(Mul(newseq)) # We assume that the user don't mix B and F operators if isinstance(seq[0], BosonicOperator): raise NotImplementedError try: newseq, sign = _sort_anticommuting_fermions(seq) except ViolationOfPauliPrinciple: return S.Zero if sign % 2: return (S.NegativeOnecoeff)cls(Mul(newseq)) elif sign: return coeffcls(Mul(newseq)) else: pass # since sign==0, no permutations was necessary # if we couldn't do anything with Mul object, we just # mark it as normal ordered if coeff != S.One: return coeffcls(Mul(newseq)) return Expr.__new__(cls, Mul(newseq)) if isinstance(arg, NO): return arg # if object was not Mul or Add, normal ordering does not apply return arg @property def has_q_creators(self): """ Return 0 if the leftmost argument of the first argument is a not a q_creator, else 1 if it is above fermi or -1 if it is below fermi. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import NO, F, Fd >>> a = symbols('a', above_fermi=True) >>> i = symbols('i', below_fermi=True) >>> NO(Fd(a)Fd(i)).has_q_creators 1 >>> NO(F(i)F(a)).has_q_creators -1 >>> NO(Fd(i)F(a)).has_q_creators #doctest: +SKIP 0 """ return self.args[0].args[0].is_q_creator @property def has_q_annihilators(self): """ Return 0 if the rightmost argument of the first argument is a not a q_annihilator, else 1 if it is above fermi or -1 if it is below fermi. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import NO, F, Fd >>> a = symbols('a', above_fermi=True) >>> i = symbols('i', below_fermi=True) >>> NO(Fd(a)Fd(i)).has_q_annihilators -1 >>> NO(F(i)F(a)).has_q_annihilators 1 >>> NO(Fd(a)F(i)).has_q_annihilators 0 """ return self.args[0].args[-1].is_q_annihilator def doit(self, kw_args): """ Either removes the brackets or enables complex computations in its arguments. Examples ======== >>> from sympy.physics.secondquant import NO, Fd, F >>> from textwrap import fill >>> from sympy import symbols, Dummy >>> p,q = symbols('p,q', cls=Dummy) >>> print(fill(str(NO(Fd(p)F(q)).doit()))) KroneckerDelta(_a, _p)KroneckerDelta(_a, _q)CreateFermion(_a)AnnihilateFermion(_a) + KroneckerDelta(_a, _p)KroneckerDelta(_i, _q)CreateFermion(_a)AnnihilateFermion(_i) - KroneckerDelta(_a, _q)KroneckerDelta(_i, _p)AnnihilateFermion(_a)CreateFermion(_i) - KroneckerDelta(_i, _p)KroneckerDelta(_i, _q)AnnihilateFermion(_i)CreateFermion(_i) """ if kw_args.get("remove_brackets", True): return self._remove_brackets() else: return self.__new__(type(self), self.args[0].doit(kw_args)) def _remove_brackets(self): """ Returns the sorted string without normal order brackets. The returned string have the property that no nonzero contractions exist. """ # check if any creator is also an annihilator subslist = [] for i in self.iter_q_creators(): if self[i].is_q_annihilator: assume = self[i].state.assumptions0 # only operators with a dummy index can be split in two terms if isinstance(self[i].state, Dummy): # create indices with fermi restriction assume.pop("above_fermi", None) assume["below_fermi"] = True below = Dummy('i', assume) assume.pop("below_fermi", None) assume["above_fermi"] = True above = Dummy('a', *assume) cls = type(self[i]) split = ( self[i].__new__(cls, below) KroneckerDelta(below, self[i].state) + self[i].__new__(cls, above) * KroneckerDelta(above, self[i].state) ) subslist.append((self[i], split)) else: raise SubstitutionOfAmbigousOperatorFailed(self[i]) if subslist: result = NO(self.subs(subslist)) if isinstance(result, Add): return Add([term.doit() for term in result.args]) else: return self.args[0] def _expand_operators(self): """ Returns a sum of NO objects that contain no ambiguous q-operators. If an index q has range both above and below fermi, the operator F(q) is ambiguous in the sense that it can be both a q-creator and a q-annihilator. If q is dummy, it is assumed to be a summation variable and this method rewrites it into a sum of NO terms with unambiguous operators: {Fd(p)F(q)} = {Fd(a)F(b)} + {Fd(a)F(i)} + {Fd(j)F(b)} -{F(i)Fd(j)} where a,b are above and i,j are below fermi level. """ return NO(self._remove_brackets) def __getitem__(self, i): if isinstance(i, slice): indices = i.indices(len(self)) return [self.args[0].args[i] for i in range(indices)] else: return self.args[0].args[i] def __len__(self): return len(self.args[0].args) def iter_q_annihilators(self): """ Iterates over the annihilation operators. Examples ======== >>> from sympy import symbols >>> i, j = symbols('i j', below_fermi=True) >>> a, b = symbols('a b', above_fermi=True) >>> from sympy.physics.secondquant import NO, F, Fd >>> no = NO(Fd(a)F(i)F(b)Fd(j)) >>> no.iter_q_creators() <generator object... at 0x...> >>> list(no.iter_q_creators()) [0, 1] >>> list(no.iter_q_annihilators()) [3, 2] """ ops = self.args[0].args iter = range(len(ops) - 1, -1, -1) for i in iter: if ops[i].is_q_annihilator: yield i else: break def iter_q_creators(self): """ Iterates over the creation operators. Examples ======== >>> from sympy import symbols >>> i, j = symbols('i j', below_fermi=True) >>> a, b = symbols('a b', above_fermi=True) >>> from sympy.physics.secondquant import NO, F, Fd >>> no = NO(Fd(a)F(i)F(b)Fd(j)) >>> no.iter_q_creators() <generator object... at 0x...> >>> list(no.iter_q_creators()) [0, 1] >>> list(no.iter_q_annihilators()) [3, 2] """ ops = self.args[0].args iter = range(0, len(ops)) for i in iter: if ops[i].is_q_creator: yield i else: break def get_subNO(self, i): """ Returns a NO() without FermionicOperator at index i. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import F, NO >>> p,q,r = symbols('p,q,r') >>> NO(F(p)F(q)F(r)).get_subNO(1) # doctest: +SKIP NO(AnnihilateFermion(p)AnnihilateFermion(r)) """ arg0 = self.args[0] # it's a Mul by definition of how it's created mul = arg0._new_rawargs(arg0.args[:i] + arg0.args[i + 1:]) return NO(mul) def _latex(self, printer): return "\\left\\{%s\\right\\}" % printer._print(self.args[0]) def __repr__(self): return "NO(%s)" % self.args[0] def __str__(self): return ":%s:" % self.args[0] def contraction(a, b): """ Calculates contraction of Fermionic operators a and b. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import F, Fd, contraction >>> p, q = symbols('p,q') >>> a, b = symbols('a,b', above_fermi=True) >>> i, j = symbols('i,j', below_fermi=True) A contraction is non-zero only if a quasi-creator is to the right of a quasi-annihilator: >>> contraction(F(a),Fd(b)) KroneckerDelta(a, b) >>> contraction(Fd(i),F(j)) KroneckerDelta(i, j) For general indices a non-zero result restricts the indices to below/above the fermi surface: >>> contraction(Fd(p),F(q)) KroneckerDelta(_i, q)KroneckerDelta(p, q) >>> contraction(F(p),Fd(q)) KroneckerDelta(_a, q)KroneckerDelta(p, q) Two creators or two annihilators always vanishes: >>> contraction(F(p),F(q)) 0 >>> contraction(Fd(p),Fd(q)) 0 """ if isinstance(b, FermionicOperator) and isinstance(a, FermionicOperator): if isinstance(a, AnnihilateFermion) and isinstance(b, CreateFermion): if b.state.assumptions0.get("below_fermi"): return S.Zero if a.state.assumptions0.get("below_fermi"): return S.Zero if b.state.assumptions0.get("above_fermi"): return KroneckerDelta(a.state, b.state) if a.state.assumptions0.get("above_fermi"): return KroneckerDelta(a.state, b.state) return (KroneckerDelta(a.state, b.state)* KroneckerDelta(b.state, Dummy('a', above_fermi=True))) if isinstance(b, AnnihilateFermion) and isinstance(a, CreateFermion): if b.state.assumptions0.get("above_fermi"): return S.Zero if a.state.assumptions0.get("above_fermi"): return S.Zero if b.state.assumptions0.get("below_fermi"): return KroneckerDelta(a.state, b.state) if a.state.assumptions0.get("below_fermi"): return KroneckerDelta(a.state, b.state) return (KroneckerDelta(a.state, b.state)* KroneckerDelta(b.state, Dummy('i', below_fermi=True))) # vanish if 2xAnnihilator or 2xCreator return S.Zero else: #not fermion operators t = ( isinstance(i, FermionicOperator) for i in (a, b) ) raise ContractionAppliesOnlyToFermions(t) def _sqkey(sq_operator): """Generates key for canonical sorting of SQ operators.""" return sq_operator._sortkey() def _sort_anticommuting_fermions(string1, key=_sqkey): """Sort fermionic operators to canonical order, assuming all pairs anticommute. Uses a bidirectional bubble sort. Items in string1 are not referenced so in principle they may be any comparable objects. The sorting depends on the operators '>' and '=='. If the Pauli principle is violated, an exception is raised. Returns ======= tuple (sorted_str, sign) sorted_str: list containing the sorted operators sign: int telling how many times the sign should be changed (if sign==0 the string was already sorted) """ verified = False sign = 0 rng = list(range(len(string1) - 1)) rev = list(range(len(string1) - 3, -1, -1)) keys = list(map(key, string1)) key_val = dict(list(zip(keys, string1))) while not verified: verified = True for i in rng: left = keys[i] right = keys[i + 1] if left == right: raise ViolationOfPauliPrinciple([left, right]) if left > right: verified = False keys[i:i + 2] = [right, left] sign = sign + 1 if verified: break for i in rev: left = keys[i] right = keys[i + 1] if left == right: raise ViolationOfPauliPrinciple([left, right]) if left > right: verified = False keys[i:i + 2] = [right, left] sign = sign + 1 string1 = [ key_val[k] for k in keys ] return (string1, sign) def evaluate_deltas(e): """ We evaluate KroneckerDelta symbols in the expression assuming Einstein summation. If one index is repeated it is summed over and in effect substituted with the other one. If both indices are repeated we substitute according to what is the preferred index. this is determined by KroneckerDelta.preferred_index and KroneckerDelta.killable_index. In case there are no possible substitutions or if a substitution would imply a loss of information, nothing is done. In case an index appears in more than one KroneckerDelta, the resulting substitution depends on the order of the factors. Since the ordering is platform dependent, the literal expression resulting from this function may be hard to predict. Examples ======== We assume the following: >>> from sympy import symbols, Function, Dummy, KroneckerDelta >>> from sympy.physics.secondquant import evaluate_deltas >>> i,j = symbols('i j', below_fermi=True, cls=Dummy) >>> a,b = symbols('a b', above_fermi=True, cls=Dummy) >>> p,q = symbols('p q', cls=Dummy) >>> f = Function('f') >>> t = Function('t') The order of preference for these indices according to KroneckerDelta is (a, b, i, j, p, q). Trivial cases: >>> evaluate_deltas(KroneckerDelta(i,j)f(i)) # d_ij f(i) -> f(j) f(_j) >>> evaluate_deltas(KroneckerDelta(i,j)f(j)) # d_ij f(j) -> f(i) f(_i) >>> evaluate_deltas(KroneckerDelta(i,p)f(p)) # d_ip f(p) -> f(i) f(_i) >>> evaluate_deltas(KroneckerDelta(q,p)f(p)) # d_qp f(p) -> f(q) f(_q) >>> evaluate_deltas(KroneckerDelta(q,p)f(q)) # d_qp f(q) -> f(p) f(_p) More interesting cases: >>> evaluate_deltas(KroneckerDelta(i,p)t(a,i)f(p,q)) f(_i, _q)t(_a, _i) >>> evaluate_deltas(KroneckerDelta(a,p)t(a,i)f(p,q)) f(_a, _q)t(_a, _i) >>> evaluate_deltas(KroneckerDelta(p,q)f(p,q)) f(_p, _p) Finally, here are some cases where nothing is done, because that would imply a loss of information: >>> evaluate_deltas(KroneckerDelta(i,p)f(q)) f(_q)KroneckerDelta(_i, _p) >>> evaluate_deltas(KroneckerDelta(i,p)f(i)) f(_i)KroneckerDelta(_i, _p) """ # We treat Deltas only in mul objects # for general function objects we don't evaluate KroneckerDeltas in arguments, # but here we hard code exceptions to this rule accepted_functions = ( Add, ) if isinstance(e, accepted_functions): return e.func([evaluate_deltas(arg) for arg in e.args]) elif isinstance(e, Mul): # find all occurrences of delta function and count each index present in # expression. deltas = [] indices = {} for i in e.args: for s in i.free_symbols: if s in indices: indices[s] += 1 else: indices[s] = 0 # geek counting simplifies logic below if isinstance(i, KroneckerDelta): deltas.append(i) for d in deltas: # If we do something, and there are more deltas, we should recurse # to treat the resulting expression properly if d.killable_index.is_Symbol and indices[d.killable_index]: e = e.subs(d.killable_index, d.preferred_index) if len(deltas) > 1: return evaluate_deltas(e) elif (d.preferred_index.is_Symbol and indices[d.preferred_index] and d.indices_contain_equal_information): e = e.subs(d.preferred_index, d.killable_index) if len(deltas) > 1: return evaluate_deltas(e) else: pass return e # nothing to do, maybe we hit a Symbol or a number else: return e def substitute_dummies(expr, new_indices=False, pretty_indices={}): """ Collect terms by substitution of dummy variables. This routine allows simplification of Add expressions containing terms which differ only due to dummy variables. The idea is to substitute all dummy variables consistently depending on the structure of the term. For each term, we obtain a sequence of all dummy variables, where the order is determined by the index range, what factors the index belongs to and its position in each factor. See _get_ordered_dummies() for more information about the sorting of dummies. The index sequence is then substituted consistently in each term. Examples ======== >>> from sympy import symbols, Function, Dummy >>> from sympy.physics.secondquant import substitute_dummies >>> a,b,c,d = symbols('a b c d', above_fermi=True, cls=Dummy) >>> i,j = symbols('i j', below_fermi=True, cls=Dummy) >>> f = Function('f') >>> expr = f(a,b) + f(c,d); expr f(_a, _b) + f(_c, _d) Since a, b, c and d are equivalent summation indices, the expression can be simplified to a single term (for which the dummy indices are still summed over) >>> substitute_dummies(expr) 2f(_a, _b) Controlling output: By default the dummy symbols that are already present in the expression will be reused in a different permutation. However, if new_indices=True, new dummies will be generated and inserted. The keyword 'pretty_indices' can be used to control this generation of new symbols. By default the new dummies will be generated on the form i_1, i_2, a_1, etc. If you supply a dictionary with key:value pairs in the form: { index_group: string_of_letters } The letters will be used as labels for the new dummy symbols. The index_groups must be one of 'above', 'below' or 'general'. >>> expr = f(a,b,i,j) >>> my_dummies = { 'above':'st', 'below':'uv' } >>> substitute_dummies(expr, new_indices=True, pretty_indices=my_dummies) f(_s, _t, _u, _v) If we run out of letters, or if there is no keyword for some index_group the default dummy generator will be used as a fallback: >>> p,q = symbols('p q', cls=Dummy) # general indices >>> expr = f(p,q) >>> substitute_dummies(expr, new_indices=True, pretty_indices=my_dummies) f(_p_0, _p_1) """ # setup the replacing dummies if new_indices: letters_above = pretty_indices.get('above', "") letters_below = pretty_indices.get('below', "") letters_general = pretty_indices.get('general', "") len_above = len(letters_above) len_below = len(letters_below) len_general = len(letters_general) def _i(number): try: return letters_below[number] except IndexError: return 'i_' + str(number - len_below) def _a(number): try: return letters_above[number] except IndexError: return 'a_' + str(number - len_above) def _p(number): try: return letters_general[number] except IndexError: return 'p_' + str(number - len_general) aboves = [] belows = [] generals = [] dummies = expr.atoms(Dummy) if not new_indices: dummies = sorted(dummies, key=default_sort_key) # generate lists with the dummies we will insert a = i = p = 0 for d in dummies: assum = d.assumptions0 if assum.get("above_fermi"): if new_indices: sym = _a(a) a += 1 l1 = aboves elif assum.get("below_fermi"): if new_indices: sym = _i(i) i += 1 l1 = belows else: if new_indices: sym = _p(p) p += 1 l1 = generals if new_indices: l1.append(Dummy(sym, assum)) else: l1.append(d) expr = expr.expand() terms = Add.make_args(expr) new_terms = [] for term in terms: i = iter(belows) a = iter(aboves) p = iter(generals) ordered = _get_ordered_dummies(term) subsdict = {} for d in ordered: if d.assumptions0.get('below_fermi'): subsdict[d] = next(i) elif d.assumptions0.get('above_fermi'): subsdict[d] = next(a) else: subsdict[d] = next(p) subslist = [] final_subs = [] for k, v in subsdict.items(): if k == v: continue if v in subsdict: # We check if the sequence of substitutions end quickly. In # that case, we can avoid temporary symbols if we ensure the # correct substitution order. if subsdict[v] in subsdict: # (x, y) -> (y, x), we need a temporary variable x = Dummy('x') subslist.append((k, x)) final_subs.append((x, v)) else: # (x, y) -> (y, a), x->y must be done last # but before temporary variables are resolved final_subs.insert(0, (k, v)) else: subslist.append((k, v)) subslist.extend(final_subs) new_terms.append(term.subs(subslist)) return Add(new_terms) class KeyPrinter(StrPrinter): """Printer for which only equal objects are equal in print""" def _print_Dummy(self, expr): return "(%s_%i)" % (expr.name, expr.dummy_index) def __kprint(expr): p = KeyPrinter() return p.doprint(expr) def _get_ordered_dummies(mul, verbose=False): """Returns all dummies in the mul sorted in canonical order The purpose of the canonical ordering is that dummies can be substituted consistently across terms with the result that equivalent terms can be simplified. It is not possible to determine if two terms are equivalent based solely on the dummy order. However, a consistent substitution guided by the ordered dummies should lead to trivially (non-)equivalent terms, thereby revealing the equivalence. This also means that if two terms have identical sequences of dummies, the (non-)equivalence should already be apparent. Strategy -------- The canoncial order is given by an arbitrary sorting rule. A sort key is determined for each dummy as a tuple that depends on all factors where the index is present. The dummies are thereby sorted according to the contraction structure of the term, instead of sorting based solely on the dummy symbol itself. After all dummies in the term has been assigned a key, we check for identical keys, i.e. unorderable dummies. If any are found, we call a specialized method, _determine_ambiguous(), that will determine a unique order based on recursive calls to _get_ordered_dummies(). Key description --------------- A high level description of the sort key: 1. Range of the dummy index 2. Relation to external (non-dummy) indices 3. Position of the index in the first factor 4. Position of the index in the second factor The sort key is a tuple with the following components: 1. A single character indicating the range of the dummy (above, below or general.) 2. A list of strings with fully masked string representations of all factors where the dummy is present. By masked, we mean that dummies are represented by a symbol to indicate either below fermi, above or general. No other information is displayed about the dummies at this point. The list is sorted stringwise. 3. An integer number indicating the position of the index, in the first factor as sorted in 2. 4. An integer number indicating the position of the index, in the second factor as sorted in 2. If a factor is either of type AntiSymmetricTensor or SqOperator, the index position in items 3 and 4 is indicated as 'upper' or 'lower' only. (Creation operators are considered upper and annihilation operators lower.) If the masked factors are identical, the two factors cannot be ordered unambiguously in item 2. In this case, items 3, 4 are left out. If several indices are contracted between the unorderable factors, it will be handled by _determine_ambiguous() """ # setup dicts to avoid repeated calculations in key() args = Mul.make_args(mul) fac_dum = dict([ (fac, fac.atoms(Dummy)) for fac in args] ) fac_repr = dict([ (fac, __kprint(fac)) for fac in args] ) all_dums = set().union(fac_dum.values()) mask = {} for d in all_dums: if d.assumptions0.get('below_fermi'): mask[d] = '0' elif d.assumptions0.get('above_fermi'): mask[d] = '1' else: mask[d] = '2' dum_repr = {d: __kprint(d) for d in all_dums} def _key(d): dumstruct = [ fac for fac in fac_dum if d in fac_dum[fac] ] other_dums = set().union([fac_dum[fac] for fac in dumstruct]) fac = dumstruct[-1] if other_dums is fac_dum[fac]: other_dums = fac_dum[fac].copy() other_dums.remove(d) masked_facs = [ fac_repr[fac] for fac in dumstruct ] for d2 in other_dums: masked_facs = [ fac.replace(dum_repr[d2], mask[d2]) for fac in masked_facs ] all_masked = [ fac.replace(dum_repr[d], mask[d]) for fac in masked_facs ] masked_facs = dict(list(zip(dumstruct, masked_facs))) # dummies for which the ordering cannot be determined if has_dups(all_masked): all_masked.sort() return mask[d], tuple(all_masked) # positions are ambiguous # sort factors according to fully masked strings keydict = dict(list(zip(dumstruct, all_masked))) dumstruct.sort(key=lambda x: keydict[x]) all_masked.sort() pos_val = [] for fac in dumstruct: if isinstance(fac, AntiSymmetricTensor): if d in fac.upper: pos_val.append('u') if d in fac.lower: pos_val.append('l') elif isinstance(fac, Creator): pos_val.append('u') elif isinstance(fac, Annihilator): pos_val.append('l') elif isinstance(fac, NO): ops = [ op for op in fac if op.has(d) ] for op in ops: if isinstance(op, Creator): pos_val.append('u') else: pos_val.append('l') else: # fallback to position in string representation facpos = -1 while 1: facpos = masked_facs[fac].find(dum_repr[d], facpos + 1) if facpos == -1: break pos_val.append(facpos) return (mask[d], tuple(all_masked), pos_val[0], pos_val[-1]) dumkey = dict(list(zip(all_dums, list(map(_key, all_dums))))) result = sorted(all_dums, key=lambda x: dumkey[x]) if has_dups(iter(dumkey.values())): # We have ambiguities unordered = defaultdict(set) for d, k in dumkey.items(): unordered[k].add(d) for k in [ k for k in unordered if len(unordered[k]) < 2 ]: del unordered[k] unordered = [ unordered[k] for k in sorted(unordered) ] result = _determine_ambiguous(mul, result, unordered) return result def _determine_ambiguous(term, ordered, ambiguous_groups): # We encountered a term for which the dummy substitution is ambiguous. # This happens for terms with 2 or more contractions between factors that # cannot be uniquely ordered independent of summation indices. For # example: # # Sum(p, q) v^{p, .}_{q, .}v^{q, .}_{p, .} # # Assuming that the indices represented by . are dummies with the # same range, the factors cannot be ordered, and there is no # way to determine a consistent ordering of p and q. # # The strategy employed here, is to relabel all unambiguous dummies with # non-dummy symbols and call _get_ordered_dummies again. This procedure is # applied to the entire term so there is a possibility that # _determine_ambiguous() is called again from a deeper recursion level. # break recursion if there are no ordered dummies all_ambiguous = set() for dummies in ambiguous_groups: all_ambiguous \|= dummies all_ordered = set(ordered) - all_ambiguous if not all_ordered: # FIXME: If we arrive here, there are no ordered dummies. A method to # handle this needs to be implemented. In order to return something # useful nevertheless, we choose arbitrarily the first dummy and # determine the rest from this one. This method is dependent on the # actual dummy labels which violates an assumption for the # canonicalization procedure. A better implementation is needed. group = [ d for d in ordered if d in ambiguous_groups[0] ] d = group[0] all_ordered.add(d) ambiguous_groups[0].remove(d) stored_counter = _symbol_factory._counter subslist = [] for d in [ d for d in ordered if d in all_ordered ]: nondum = _symbol_factory._next() subslist.append((d, nondum)) newterm = term.subs(subslist) neworder = _get_ordered_dummies(newterm) _symbol_factory._set_counter(stored_counter) # update ordered list with new information for group in ambiguous_groups: ordered_group = [ d for d in neworder if d in group ] ordered_group.reverse() result = [] for d in ordered: if d in group: result.append(ordered_group.pop()) else: result.append(d) ordered = result return ordered class _SymbolFactory(object): def __init__(self, label): self._counterVar = 0 self._label = label def _set_counter(self, value): """ Sets counter to value. """ self._counterVar = value @property def _counter(self): """ What counter is currently at. """ return self._counterVar def _next(self): """ Generates the next symbols and increments counter by 1. """ s = Symbol("%s%i" % (self._label, self._counterVar)) self._counterVar += 1 return s _symbol_factory = _SymbolFactory('_]"]_') # most certainly a unique label @cacheit def _get_contractions(string1, keep_only_fully_contracted=False): """ Returns Add-object with contracted terms. Uses recursion to find all contractions. -- Internal helper function -- Will find nonzero contractions in string1 between indices given in leftrange and rightrange. """ # Should we store current level of contraction? if keep_only_fully_contracted and string1: result = [] else: result = [NO(Mul(string1))] for i in range(len(string1) - 1): for j in range(i + 1, len(string1)): c = contraction(string1[i], string1[j]) if c: sign = (j - i + 1) % 2 if sign: coeff = S.NegativeOnec else: coeff = c # # Call next level of recursion # ============================ # # We now need to find more contractions among operators # # oplist = string1[:i]+ string1[i+1:j] + string1[j+1:] # # To prevent overcounting, we don't allow contractions # we have already encountered. i.e. contractions between # string1[:i] <---> string1[i+1:j] # and string1[:i] <---> string1[j+1:]. # # This leaves the case: oplist = string1[i + 1:j] + string1[j + 1:] if oplist: result.append(coeffNO( Mul(string1[:i])_get_contractions( oplist, keep_only_fully_contracted=keep_only_fully_contracted))) else: result.append(coeffNO( Mul(string1[:i]))) if keep_only_fully_contracted: break # next iteration over i leaves leftmost operator string1[0] uncontracted return Add(result) def wicks(e, *kw_args): """ Returns the normal ordered equivalent of an expression using Wicks Theorem. Examples ======== >>> from sympy import symbols, Function, Dummy >>> from sympy.physics.secondquant import wicks, F, Fd, NO >>> p,q,r = symbols('p,q,r') >>> wicks(Fd(p)F(q)) # doctest: +SKIP d(p, q)d(q, _i) + NO(CreateFermion(p)AnnihilateFermion(q)) By default, the expression is expanded: >>> wicks(F(p)(F(q)+F(r))) # doctest: +SKIP NO(AnnihilateFermion(p)AnnihilateFermion(q)) + NO( AnnihilateFermion(p)AnnihilateFermion(r)) With the keyword 'keep_only_fully_contracted=True', only fully contracted terms are returned. By request, the result can be simplified in the following order: -- KroneckerDelta functions are evaluated -- Dummy variables are substituted consistently across terms >>> p, q, r = symbols('p q r', cls=Dummy) >>> wicks(Fd(p)(F(q)+F(r)), keep_only_fully_contracted=True) # doctest: +SKIP KroneckerDelta(_i, _q)KroneckerDelta( _p, _q) + KroneckerDelta(_i, _r)KroneckerDelta(_p, _r) """ if not e: return S.Zero opts = { 'simplify_kronecker_deltas': False, 'expand': True, 'simplify_dummies': False, 'keep_only_fully_contracted': False } opts.update(kw_args) # check if we are already normally ordered if isinstance(e, NO): if opts['keep_only_fully_contracted']: return S.Zero else: return e elif isinstance(e, FermionicOperator): if opts['keep_only_fully_contracted']: return S.Zero else: return e # break up any NO-objects, and evaluate commutators e = e.doit(wicks=True) # make sure we have only one term to consider e = e.expand() if isinstance(e, Add): if opts['simplify_dummies']: return substitute_dummies(Add([ wicks(term, kw_args) for term in e.args])) else: return Add([ wicks(term, *kw_args) for term in e.args]) # For Mul-objects we can actually do something if isinstance(e, Mul): # we don't want to mess around with commuting part of Mul # so we factorize it out before starting recursion c_part = [] string1 = [] for factor in e.args: if factor.is_commutative: c_part.append(factor) else: string1.append(factor) n = len(string1) # catch trivial cases if n == 0: result = e elif n == 1: if opts['keep_only_fully_contracted']: return S.Zero else: result = e else: # non-trivial if isinstance(string1[0], BosonicOperator): raise NotImplementedError string1 = tuple(string1) # recursion over higher order contractions result = _get_contractions(string1, keep_only_fully_contracted=opts['keep_only_fully_contracted'] ) result = Mul(c_part)result if opts['expand']: result = result.expand() if opts['simplify_kronecker_deltas']: result = evaluate_deltas(result) return result # there was nothing to do return e class PermutationOperator(Expr): """ Represents the index permutation operator P(ij). P(ij)f(i)g(j) = f(i)g(j) - f(j)g(i) """ is_commutative = True def __new__(cls, i, j): i, j = sorted(map(sympify, (i, j)), key=default_sort_key) obj = Basic.__new__(cls, i, j) return obj def get_permuted(self, expr): """ Returns -expr with permuted indices. >>> from sympy import symbols, Function >>> from sympy.physics.secondquant import PermutationOperator >>> p,q = symbols('p,q') >>> f = Function('f') >>> PermutationOperator(p,q).get_permuted(f(p,q)) -f(q, p) """ i = self.args[0] j = self.args[1] if expr.has(i) and expr.has(j): tmp = Dummy() expr = expr.subs(i, tmp) expr = expr.subs(j, i) expr = expr.subs(tmp, j) return S.NegativeOneexpr else: return expr def _latex(self, printer): return "P(%s%s)" % self.args def simplify_index_permutations(expr, permutation_operators): """ Performs simplification by introducing PermutationOperators where appropriate. Schematically: [abij] - [abji] - [baij] + [baji] -> P(ab)P(ij)[abij] permutation_operators is a list of PermutationOperators to consider. If permutation_operators=[P(ab),P(ij)] we will try to introduce the permutation operators P(ij) and P(ab) in the expression. If there are other possible simplifications, we ignore them. >>> from sympy import symbols, Function >>> from sympy.physics.secondquant import simplify_index_permutations >>> from sympy.physics.secondquant import PermutationOperator >>> p,q,r,s = symbols('p,q,r,s') >>> f = Function('f') >>> g = Function('g') >>> expr = f(p)g(q) - f(q)g(p); expr f(p)g(q) - f(q)g(p) >>> simplify_index_permutations(expr,[PermutationOperator(p,q)]) f(p)g(q)PermutationOperator(p, q) >>> PermutList = [PermutationOperator(p,q),PermutationOperator(r,s)] >>> expr = f(p,r)g(q,s) - f(q,r)g(p,s) + f(q,s)g(p,r) - f(p,s)g(q,r) >>> simplify_index_permutations(expr,PermutList) f(p, r)g(q, s)PermutationOperator(p, q)PermutationOperator(r, s) """ def _get_indices(expr, ind): """ Collects indices recursively in predictable order. """ result = [] for arg in expr.args: if arg in ind: result.append(arg) else: if arg.args: result.extend(_get_indices(arg, ind)) return result def _choose_one_to_keep(a, b, ind): # we keep the one where indices in ind are in order ind[0] < ind[1] return min(a, b, key=lambda x: default_sort_key(_get_indices(x, ind))) expr = expr.expand() if isinstance(expr, Add): terms = set(expr.args) for P in permutation_operators: new_terms = set([]) on_hold = set([]) while terms: term = terms.pop() permuted = P.get_permuted(term) if permuted in terms \| on_hold: try: terms.remove(permuted) except KeyError: on_hold.remove(permuted) keep = _choose_one_to_keep(term, permuted, P.args) new_terms.add(Pkeep) else: # Some terms must get a second chance because the permuted # term may already have canonical dummy ordering. Then # substitute_dummies() does nothing. However, the other # term, if it exists, will be able to match with us. permuted1 = permuted permuted = substitute_dummies(permuted) if permuted1 == permuted: on_hold.add(term) elif permuted in terms \| on_hold: try: terms.remove(permuted) except KeyError: on_hold.remove(permuted) keep = _choose_one_to_keep(term, permuted, P.args) new_terms.add(Pkeep) else: new_terms.add(term) terms = new_terms \| on_hold return Add(terms) return expr
f94fb4a65cd4c3d655626a24fa75d9d3767eb752c3d3372420ebf20814f55dc9	""" This module defines tensors with abstract index notation. The abstract index notation has been first formalized by Penrose. Tensor indices are formal objects, with a tensor type; there is no notion of index range, it is only possible to assign the dimension, used to trace the Kronecker delta; the dimension can be a Symbol. The Einstein summation convention is used. The covariant indices are indicated with a minus sign in front of the index. For instance the tensor ``t = p(a)A(b,c)q(-c)`` has the index ``c`` contracted. A tensor expression ``t`` can be called; called with its indices in sorted order it is equal to itself: in the above example ``t(a, b) == t``; one can call ``t`` with different indices; ``t(c, d) == p(c)A(d,a)q(-a)``. The contracted indices are dummy indices, internally they have no name, the indices being represented by a graph-like structure. Tensors are put in canonical form using ``canon_bp``, which uses the Butler-Portugal algorithm for canonicalization using the monoterm symmetries of the tensors. If there is a (anti)symmetric metric, the indices can be raised and lowered when the tensor is put in canonical form. """ from __future__ import print_function, division from collections import defaultdict import operator import itertools from sympy import Rational, prod, Integer from sympy.combinatorics.tensor_can import get_symmetric_group_sgs, \ bsgs_direct_product, canonicalize, riemann_bsgs from sympy.core import Basic, Expr, sympify, Add, Mul, S from sympy.core.compatibility import string_types, reduce, range, SYMPY_INTS from sympy.core.containers import Tuple, Dict from sympy.core.decorators import deprecated from sympy.core.symbol import Symbol, symbols from sympy.core.sympify import CantSympify, _sympify from sympy.core.operations import AssocOp from sympy.matrices import eye from sympy.utilities.exceptions import SymPyDeprecationWarning import warnings @deprecated(useinstead=".replace_with_arrays", issue=15276, deprecated_since_version="1.4") def deprecate_data(): pass class _IndexStructure(CantSympify): """ This class handles the indices (free and dummy ones). It contains the algorithms to manage the dummy indices replacements and contractions of free indices under multiplications of tensor expressions, as well as stuff related to canonicalization sorting, getting the permutation of the expression and so on. It also includes tools to get the ``TensorIndex`` objects corresponding to the given index structure. """ def __init__(self, free, dum, index_types, indices, canon_bp=False): self.free = free self.dum = dum self.index_types = index_types self.indices = indices self._ext_rank = len(self.free) + 2len(self.dum) self.dum.sort(key=lambda x: x[0]) @staticmethod def from_indices(indices): """ Create a new ``_IndexStructure`` object from a list of ``indices`` ``indices`` ``TensorIndex`` objects, the indices. Contractions are detected upon construction. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, _IndexStructure >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2, m3 = tensor_indices('m0,m1,m2,m3', Lorentz) >>> _IndexStructure.from_indices(m0, m1, -m1, m3) _IndexStructure([(m0, 0), (m3, 3)], [(1, 2)], [Lorentz, Lorentz, Lorentz, Lorentz]) """ free, dum = _IndexStructure._free_dum_from_indices(indices) index_types = [i.tensor_index_type for i in indices] indices = _IndexStructure._replace_dummy_names(indices, free, dum) return _IndexStructure(free, dum, index_types, indices) @staticmethod def from_components_free_dum(components, free, dum): index_types = [] for component in components: index_types.extend(component.index_types) indices = _IndexStructure.generate_indices_from_free_dum_index_types(free, dum, index_types) return _IndexStructure(free, dum, index_types, indices) @staticmethod def _free_dum_from_indices(indices): """ Convert ``indices`` into ``free``, ``dum`` for single component tensor ``free`` list of tuples ``(index, pos, 0)``, where ``pos`` is the position of index in the list of indices formed by the component tensors ``dum`` list of tuples ``(pos_contr, pos_cov, 0, 0)`` Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, \ _IndexStructure >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2, m3 = tensor_indices('m0,m1,m2,m3', Lorentz) >>> _IndexStructure._free_dum_from_indices(m0, m1, -m1, m3) ([(m0, 0), (m3, 3)], [(1, 2)]) """ n = len(indices) if n == 1: return [(indices[0], 0)], [] # find the positions of the free indices and of the dummy indices free = [True]len(indices) index_dict = {} dum = [] for i, index in enumerate(indices): name = index._name typ = index.tensor_index_type contr = index._is_up if (name, typ) in index_dict: # found a pair of dummy indices is_contr, pos = index_dict[(name, typ)] # check consistency and update free if is_contr: if contr: raise ValueError('two equal contravariant indices in slots %d and %d' %(pos, i)) else: free[pos] = False free[i] = False else: if contr: free[pos] = False free[i] = False else: raise ValueError('two equal covariant indices in slots %d and %d' %(pos, i)) if contr: dum.append((i, pos)) else: dum.append((pos, i)) else: index_dict[(name, typ)] = index._is_up, i free = [(index, i) for i, index in enumerate(indices) if free[i]] free.sort() return free, dum def get_indices(self): """ Get a list of indices, creating new tensor indices to complete dummy indices. """ return self.indices[:] @staticmethod def generate_indices_from_free_dum_index_types(free, dum, index_types): indices = [None](len(free)+2len(dum)) for idx, pos in free: indices[pos] = idx generate_dummy_name = _IndexStructure._get_generator_for_dummy_indices(free) for pos1, pos2 in dum: typ1 = index_types[pos1] indname = generate_dummy_name(typ1) indices[pos1] = TensorIndex(indname, typ1, True) indices[pos2] = TensorIndex(indname, typ1, False) return _IndexStructure._replace_dummy_names(indices, free, dum) @staticmethod def _get_generator_for_dummy_indices(free): cdt = defaultdict(int) # if the free indices have names with dummy_fmt, start with an # index higher than those for the dummy indices # to avoid name collisions for indx, ipos in free: if indx._name.split('_')[0] == indx.tensor_index_type.dummy_fmt[:-3]: cdt[indx.tensor_index_type] = max(cdt[indx.tensor_index_type], int(indx._name.split('_')[1]) + 1) def dummy_fmt_gen(tensor_index_type): fmt = tensor_index_type.dummy_fmt nd = cdt[tensor_index_type] cdt[tensor_index_type] += 1 return fmt % nd return dummy_fmt_gen @staticmethod def _replace_dummy_names(indices, free, dum): dum.sort(key=lambda x: x[0]) new_indices = [ind for ind in indices] assert len(indices) == len(free) + 2len(dum) generate_dummy_name = _IndexStructure._get_generator_for_dummy_indices(free) for ipos1, ipos2 in dum: typ1 = new_indices[ipos1].tensor_index_type indname = generate_dummy_name(typ1) new_indices[ipos1] = TensorIndex(indname, typ1, True) new_indices[ipos2] = TensorIndex(indname, typ1, False) return new_indices def get_free_indices(self): """ Get a list of free indices. """ # get sorted indices according to their position: free = sorted(self.free, key=lambda x: x[1]) return [i[0] for i in free] def __str__(self): return "_IndexStructure({0}, {1}, {2})".format(self.free, self.dum, self.index_types) def __repr__(self): return self.__str__() def _get_sorted_free_indices_for_canon(self): sorted_free = self.free[:] sorted_free.sort(key=lambda x: x[0]) return sorted_free def _get_sorted_dum_indices_for_canon(self): return sorted(self.dum, key=lambda x: x[0]) def _get_lexicographically_sorted_index_types(self): permutation = self.indices_canon_args()[0] index_types = [None]self._ext_rank for i, it in enumerate(self.index_types): index_types[permutation(i)] = it return index_types def _get_lexicographically_sorted_indices(self): permutation = self.indices_canon_args()[0] indices = [None]self._ext_rank for i, it in enumerate(self.indices): indices[permutation(i)] = it return indices def perm2tensor(self, g, is_canon_bp=False): """ Returns a ``_IndexStructure`` instance corresponding to the permutation ``g`` ``g`` permutation corresponding to the tensor in the representation used in canonicalization ``is_canon_bp`` if True, then ``g`` is the permutation corresponding to the canonical form of the tensor """ sorted_free = [i[0] for i in self._get_sorted_free_indices_for_canon()] lex_index_types = self._get_lexicographically_sorted_index_types() lex_indices = self._get_lexicographically_sorted_indices() nfree = len(sorted_free) rank = self._ext_rank dum = [[None]2 for i in range((rank - nfree)//2)] free = [] index_types = [None]rank indices = [None]rank for i in range(rank): gi = g[i] index_types[i] = lex_index_types[gi] indices[i] = lex_indices[gi] if gi < nfree: ind = sorted_free[gi] assert index_types[i] == sorted_free[gi].tensor_index_type free.append((ind, i)) else: j = gi - nfree idum, cov = divmod(j, 2) if cov: dum[idum][1] = i else: dum[idum][0] = i dum = [tuple(x) for x in dum] return _IndexStructure(free, dum, index_types, indices) def indices_canon_args(self): """ Returns ``(g, dummies, msym, v)``, the entries of ``canonicalize`` see ``canonicalize`` in ``tensor_can.py`` in combinatorics module """ # to be called after sorted_components from sympy.combinatorics.permutations import _af_new n = self._ext_rank g = [None]n + [n, n+1] # ordered indices: first the free indices, ordered by types # then the dummy indices, ordered by types and contravariant before # covariant # g[position in tensor] = position in ordered indices for i, (indx, ipos) in enumerate(self._get_sorted_free_indices_for_canon()): g[ipos] = i pos = len(self.free) j = len(self.free) dummies = [] prev = None a = [] msym = [] for ipos1, ipos2 in self._get_sorted_dum_indices_for_canon(): g[ipos1] = j g[ipos2] = j + 1 j += 2 typ = self.index_types[ipos1] if typ != prev: if a: dummies.append(a) a = [pos, pos + 1] prev = typ msym.append(typ.metric_antisym) else: a.extend([pos, pos + 1]) pos += 2 if a: dummies.append(a) return _af_new(g), dummies, msym def components_canon_args(components): numtyp = [] prev = None for t in components: if t == prev: numtyp[-1][1] += 1 else: prev = t numtyp.append([prev, 1]) v = [] for h, n in numtyp: if h._comm == 0 or h._comm == 1: comm = h._comm else: comm = TensorManager.get_comm(h._comm, h._comm) v.append((h._symmetry.base, h._symmetry.generators, n, comm)) return v class _TensorDataLazyEvaluator(CantSympify): """ EXPERIMENTAL: do not rely on this class, it may change without deprecation warnings in future versions of SymPy. This object contains the logic to associate components data to a tensor expression. Components data are set via the ``.data`` property of tensor expressions, is stored inside this class as a mapping between the tensor expression and the ``ndarray``. Computations are executed lazily: whereas the tensor expressions can have contractions, tensor products, and additions, components data are not computed until they are accessed by reading the ``.data`` property associated to the tensor expression. """ _substitutions_dict = dict() _substitutions_dict_tensmul = dict() def __getitem__(self, key): dat = self._get(key) if dat is None: return None from .array import NDimArray if not isinstance(dat, NDimArray): return dat if dat.rank() == 0: return dat[()] elif dat.rank() == 1 and len(dat) == 1: return dat[0] return dat def _get(self, key): """ Retrieve ``data`` associated with ``key``. This algorithm looks into ``self._substitutions_dict`` for all ``TensorHead`` in the ``TensExpr`` (or just ``TensorHead`` if key is a TensorHead instance). It reconstructs the components data that the tensor expression should have by performing on components data the operations that correspond to the abstract tensor operations applied. Metric tensor is handled in a different manner: it is pre-computed in ``self._substitutions_dict_tensmul``. """ if key in self._substitutions_dict: return self._substitutions_dict[key] if isinstance(key, TensorHead): return None if isinstance(key, Tensor): # special case to handle metrics. Metric tensors cannot be # constructed through contraction by the metric, their # components show if they are a matrix or its inverse. signature = tuple([i.is_up for i in key.get_indices()]) srch = (key.component,) + signature if srch in self._substitutions_dict_tensmul: return self._substitutions_dict_tensmul[srch] array_list = [self.data_from_tensor(key)] return self.data_contract_dum(array_list, key.dum, key.ext_rank) if isinstance(key, TensMul): tensmul_args = key.args if len(tensmul_args) == 1 and len(tensmul_args[0].components) == 1: # special case to handle metrics. Metric tensors cannot be # constructed through contraction by the metric, their # components show if they are a matrix or its inverse. signature = tuple([i.is_up for i in tensmul_args[0].get_indices()]) srch = (tensmul_args[0].components[0],) + signature if srch in self._substitutions_dict_tensmul: return self._substitutions_dict_tensmul[srch] #data_list = [self.data_from_tensor(i) for i in tensmul_args if isinstance(i, TensExpr)] data_list = [self.data_from_tensor(i) if isinstance(i, Tensor) else i.data for i in tensmul_args if isinstance(i, TensExpr)] coeff = prod([i for i in tensmul_args if not isinstance(i, TensExpr)]) if all([i is None for i in data_list]): return None if any([i is None for i in data_list]): raise ValueError("Mixing tensors with associated components "\ "data with tensors without components data") data_result = self.data_contract_dum(data_list, key.dum, key.ext_rank) return coeffdata_result if isinstance(key, TensAdd): data_list = [] free_args_list = [] for arg in key.args: if isinstance(arg, TensExpr): data_list.append(arg.data) free_args_list.append([x[0] for x in arg.free]) else: data_list.append(arg) free_args_list.append([]) if all([i is None for i in data_list]): return None if any([i is None for i in data_list]): raise ValueError("Mixing tensors with associated components "\ "data with tensors without components data") sum_list = [] from .array import permutedims for data, free_args in zip(data_list, free_args_list): if len(free_args) < 2: sum_list.append(data) else: free_args_pos = {y: x for x, y in enumerate(free_args)} axes = [free_args_pos[arg] for arg in key.free_args] sum_list.append(permutedims(data, axes)) return reduce(lambda x, y: x+y, sum_list) return None @staticmethod def data_contract_dum(ndarray_list, dum, ext_rank): from .array import tensorproduct, tensorcontraction, MutableDenseNDimArray arrays = list(map(MutableDenseNDimArray, ndarray_list)) prodarr = tensorproduct(arrays) return tensorcontraction(prodarr, dum) def data_tensorhead_from_tensmul(self, data, tensmul, tensorhead): """ This method is used when assigning components data to a ``TensMul`` object, it converts components data to a fully contravariant ndarray, which is then stored according to the ``TensorHead`` key. """ if data is None: return None return self._correct_signature_from_indices( data, tensmul.get_indices(), tensmul.free, tensmul.dum, True) def data_from_tensor(self, tensor): """ This method corrects the components data to the right signature (covariant/contravariant) using the metric associated with each ``TensorIndexType``. """ tensorhead = tensor.component if tensorhead.data is None: return None return self._correct_signature_from_indices( tensorhead.data, tensor.get_indices(), tensor.free, tensor.dum) def _assign_data_to_tensor_expr(self, key, data): if isinstance(key, TensAdd): raise ValueError('cannot assign data to TensAdd') # here it is assumed that `key` is a `TensMul` instance. if len(key.components) != 1: raise ValueError('cannot assign data to TensMul with multiple components') tensorhead = key.components[0] newdata = self.data_tensorhead_from_tensmul(data, key, tensorhead) return tensorhead, newdata def _check_permutations_on_data(self, tens, data): from .array import permutedims if isinstance(tens, TensorHead): rank = tens.rank generators = tens.symmetry.generators elif isinstance(tens, Tensor): rank = tens.rank generators = tens.components[0].symmetry.generators elif isinstance(tens, TensorIndexType): rank = tens.metric.rank generators = tens.metric.symmetry.generators # Every generator is a permutation, check that by permuting the array # by that permutation, the array will be the same, except for a # possible sign change if the permutation admits it. for gener in generators: sign_change = +1 if (gener(rank) == rank) else -1 data_swapped = data last_data = data permute_axes = list(map(gener, list(range(rank)))) # the order of a permutation is the number of times to get the # identity by applying that permutation. for i in range(gener.order()-1): data_swapped = permutedims(data_swapped, permute_axes) # if any value in the difference array is non-zero, raise an error: if any(last_data - sign_changedata_swapped): raise ValueError("Component data symmetry structure error") last_data = data_swapped def __setitem__(self, key, value): """ Set the components data of a tensor object/expression. Components data are transformed to the all-contravariant form and stored with the corresponding ``TensorHead`` object. If a ``TensorHead`` object cannot be uniquely identified, it will raise an error. """ data = _TensorDataLazyEvaluator.parse_data(value) self._check_permutations_on_data(key, data) # TensorHead and TensorIndexType can be assigned data directly, while # TensMul must first convert data to a fully contravariant form, and # assign it to its corresponding TensorHead single component. if not isinstance(key, (TensorHead, TensorIndexType)): key, data = self._assign_data_to_tensor_expr(key, data) if isinstance(key, TensorHead): for dim, indextype in zip(data.shape, key.index_types): if indextype.data is None: raise ValueError("index type {} has no components data"\ " associated (needed to raise/lower index)".format(indextype)) if indextype.dim is None: continue if dim != indextype.dim: raise ValueError("wrong dimension of ndarray") self._substitutions_dict[key] = data def __delitem__(self, key): del self._substitutions_dict[key] def __contains__(self, key): return key in self._substitutions_dict def add_metric_data(self, metric, data): """ Assign data to the ``metric`` tensor. The metric tensor behaves in an anomalous way when raising and lowering indices. A fully covariant metric is the inverse transpose of the fully contravariant metric (it is meant matrix inverse). If the metric is symmetric, the transpose is not necessary and mixed covariant/contravariant metrics are Kronecker deltas. """ # hard assignment, data should not be added to `TensorHead` for metric: # the problem with `TensorHead` is that the metric is anomalous, i.e. # raising and lowering the index means considering the metric or its # inverse, this is not the case for other tensors. self._substitutions_dict_tensmul[metric, True, True] = data inverse_transpose = self.inverse_transpose_matrix(data) # in symmetric spaces, the transpose is the same as the original matrix, # the full covariant metric tensor is the inverse transpose, so this # code will be able to handle non-symmetric metrics. self._substitutions_dict_tensmul[metric, False, False] = inverse_transpose # now mixed cases, these are identical to the unit matrix if the metric # is symmetric. m = data.tomatrix() invt = inverse_transpose.tomatrix() self._substitutions_dict_tensmul[metric, True, False] = m * invt self._substitutions_dict_tensmul[metric, False, True] = invt * m @staticmethod def _flip_index_by_metric(data, metric, pos): from .array import tensorproduct, tensorcontraction mdim = metric.rank() ddim = data.rank() if pos == 0: data = tensorcontraction( tensorproduct( metric, data ), (1, mdim+pos) ) else: data = tensorcontraction( tensorproduct( data, metric ), (pos, ddim) ) return data @staticmethod def inverse_matrix(ndarray): m = ndarray.tomatrix().inv() return _TensorDataLazyEvaluator.parse_data(m) @staticmethod def inverse_transpose_matrix(ndarray): m = ndarray.tomatrix().inv().T return _TensorDataLazyEvaluator.parse_data(m) @staticmethod def _correct_signature_from_indices(data, indices, free, dum, inverse=False): """ Utility function to correct the values inside the components data ndarray according to whether indices are covariant or contravariant. It uses the metric matrix to lower values of covariant indices. """ # change the ndarray values according covariantness/contravariantness of the indices # use the metric for i, indx in enumerate(indices): if not indx.is_up and not inverse: data = _TensorDataLazyEvaluator._flip_index_by_metric(data, indx.tensor_index_type.data, i) elif not indx.is_up and inverse: data = _TensorDataLazyEvaluator._flip_index_by_metric( data, _TensorDataLazyEvaluator.inverse_matrix(indx.tensor_index_type.data), i ) return data @staticmethod def _sort_data_axes(old, new): from .array import permutedims new_data = old.data.copy() old_free = [i[0] for i in old.free] new_free = [i[0] for i in new.free] for i in range(len(new_free)): for j in range(i, len(old_free)): if old_free[j] == new_free[i]: old_free[i], old_free[j] = old_free[j], old_free[i] new_data = permutedims(new_data, (i, j)) break return new_data @staticmethod def add_rearrange_tensmul_parts(new_tensmul, old_tensmul): def sorted_compo(): return _TensorDataLazyEvaluator._sort_data_axes(old_tensmul, new_tensmul) _TensorDataLazyEvaluator._substitutions_dict[new_tensmul] = sorted_compo() @staticmethod def parse_data(data): """ Transform ``data`` to array. The parameter ``data`` may contain data in various formats, e.g. nested lists, sympy ``Matrix``, and so on. Examples ======== >>> from sympy.tensor.tensor import _TensorDataLazyEvaluator >>> _TensorDataLazyEvaluator.parse_data([1, 3, -6, 12]) [1, 3, -6, 12] >>> _TensorDataLazyEvaluator.parse_data([[1, 2], [4, 7]]) [[1, 2], [4, 7]] """ from .array import MutableDenseNDimArray if not isinstance(data, MutableDenseNDimArray): if len(data) == 2 and hasattr(data[0], '__call__'): data = MutableDenseNDimArray(data[0], data[1]) else: data = MutableDenseNDimArray(data) return data _tensor_data_substitution_dict = _TensorDataLazyEvaluator() class _TensorManager(object): """ Class to manage tensor properties. Notes ===== Tensors belong to tensor commutation groups; each group has a label ``comm``; there are predefined labels: ``0`` tensors commuting with any other tensor ``1`` tensors anticommuting among themselves ``2`` tensors not commuting, apart with those with ``comm=0`` Other groups can be defined using ``set_comm``; tensors in those groups commute with those with ``comm=0``; by default they do not commute with any other group. """ def __init__(self): self._comm_init() def _comm_init(self): self._comm = [{} for i in range(3)] for i in range(3): self._comm[0][i] = 0 self._comm[i][0] = 0 self._comm[1][1] = 1 self._comm[2][1] = None self._comm[1][2] = None self._comm_symbols2i = {0:0, 1:1, 2:2} self._comm_i2symbol = {0:0, 1:1, 2:2} @property def comm(self): return self._comm def comm_symbols2i(self, i): """ get the commutation group number corresponding to ``i`` ``i`` can be a symbol or a number or a string If ``i`` is not already defined its commutation group number is set. """ if i not in self._comm_symbols2i: n = len(self._comm) self._comm.append({}) self._comm[n][0] = 0 self._comm[0][n] = 0 self._comm_symbols2i[i] = n self._comm_i2symbol[n] = i return n return self._comm_symbols2i[i] def comm_i2symbol(self, i): """ Returns the symbol corresponding to the commutation group number. """ return self._comm_i2symbol[i] def set_comm(self, i, j, c): """ set the commutation parameter ``c`` for commutation groups ``i, j`` Parameters ========== i, j : symbols representing commutation groups c : group commutation number Notes ===== ``i, j`` can be symbols, strings or numbers, apart from ``0, 1`` and ``2`` which are reserved respectively for commuting, anticommuting tensors and tensors not commuting with any other group apart with the commuting tensors. For the remaining cases, use this method to set the commutation rules; by default ``c=None``. The group commutation number ``c`` is assigned in correspondence to the group commutation symbols; it can be 0 commuting 1 anticommuting None no commutation property Examples ======== ``G`` and ``GH`` do not commute with themselves and commute with each other; A is commuting. >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead, TensorManager >>> Lorentz = TensorIndexType('Lorentz') >>> i0,i1,i2,i3,i4 = tensor_indices('i0:5', Lorentz) >>> A = tensorhead('A', [Lorentz], [[1]]) >>> G = tensorhead('G', [Lorentz], [[1]], 'Gcomm') >>> GH = tensorhead('GH', [Lorentz], [[1]], 'GHcomm') >>> TensorManager.set_comm('Gcomm', 'GHcomm', 0) >>> (GH(i1)G(i0)).canon_bp() G(i0)GH(i1) >>> (G(i1)G(i0)).canon_bp() G(i1)G(i0) >>> (G(i1)A(i0)).canon_bp() A(i0)G(i1) """ if c not in (0, 1, None): raise ValueError('`c` can assume only the values 0, 1 or None') if i not in self._comm_symbols2i: n = len(self._comm) self._comm.append({}) self._comm[n][0] = 0 self._comm[0][n] = 0 self._comm_symbols2i[i] = n self._comm_i2symbol[n] = i if j not in self._comm_symbols2i: n = len(self._comm) self._comm.append({}) self._comm[0][n] = 0 self._comm[n][0] = 0 self._comm_symbols2i[j] = n self._comm_i2symbol[n] = j ni = self._comm_symbols2i[i] nj = self._comm_symbols2i[j] self._comm[ni][nj] = c self._comm[nj][ni] = c def set_comms(self, args): """ set the commutation group numbers ``c`` for symbols ``i, j`` Parameters ========== args : sequence of ``(i, j, c)`` """ for i, j, c in args: self.set_comm(i, j, c) def get_comm(self, i, j): """ Return the commutation parameter for commutation group numbers ``i, j`` see ``_TensorManager.set_comm`` """ return self._comm[i].get(j, 0 if i == 0 or j == 0 else None) def clear(self): """ Clear the TensorManager. """ self._comm_init() TensorManager = _TensorManager() class TensorIndexType(Basic): """ A TensorIndexType is characterized by its name and its metric. Parameters ========== name : name of the tensor type metric : metric symmetry or metric object or ``None`` dim : dimension, it can be a symbol or an integer or ``None`` eps_dim : dimension of the epsilon tensor dummy_fmt : name of the head of dummy indices Attributes ========== ``name`` ``metric_name`` : it is 'metric' or metric.name ``metric_antisym`` ``metric`` : the metric tensor ``delta`` : ``Kronecker delta`` ``epsilon`` : the ``Levi-Civita epsilon`` tensor ``dim`` ``eps_dim`` ``dummy_fmt`` ``data`` : (deprecated) a property to add ``ndarray`` values, to work in a specified basis. Notes ===== The ``metric`` parameter can be: ``metric = False`` symmetric metric (in Riemannian geometry) ``metric = True`` antisymmetric metric (for spinor calculus) ``metric = None`` there is no metric ``metric`` can be an object having ``name`` and ``antisym`` attributes. If there is a metric the metric is used to raise and lower indices. In the case of antisymmetric metric, the following raising and lowering conventions will be adopted: ``psi(a) = g(a, b)psi(-b); chi(-a) = chi(b)g(-b, -a)`` ``g(-a, b) = delta(-a, b); g(b, -a) = -delta(a, -b)`` where ``delta(-a, b) = delta(b, -a)`` is the ``Kronecker delta`` (see ``TensorIndex`` for the conventions on indices). If there is no metric it is not possible to raise or lower indices; e.g. the index of the defining representation of ``SU(N)`` is 'covariant' and the conjugate representation is 'contravariant'; for ``N > 2`` they are linearly independent. ``eps_dim`` is by default equal to ``dim``, if the latter is an integer; else it can be assigned (for use in naive dimensional regularization); if ``eps_dim`` is not an integer ``epsilon`` is ``None``. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> Lorentz.metric metric(Lorentz,Lorentz) """ def __new__(cls, name, metric=False, dim=None, eps_dim=None, dummy_fmt=None): if isinstance(name, string_types): name = Symbol(name) obj = Basic.__new__(cls, name, S.One if metric else S.Zero) obj._name = str(name) if not dummy_fmt: obj._dummy_fmt = '%s_%%d' % obj.name else: obj._dummy_fmt = '%s_%%d' % dummy_fmt if metric is None: obj.metric_antisym = None obj.metric = None else: if metric in (True, False, 0, 1): metric_name = 'metric' obj.metric_antisym = metric else: metric_name = metric.name obj.metric_antisym = metric.antisym sym2 = TensorSymmetry(get_symmetric_group_sgs(2, obj.metric_antisym)) S2 = TensorType([obj]2, sym2) obj.metric = S2(metric_name) obj._dim = dim obj._delta = obj.get_kronecker_delta() obj._eps_dim = eps_dim if eps_dim else dim obj._epsilon = obj.get_epsilon() obj._autogenerated = [] return obj @property @deprecated(useinstead="TensorIndex", issue=12857, deprecated_since_version="1.1") def auto_right(self): if not hasattr(self, '_auto_right'): self._auto_right = TensorIndex("auto_right", self) return self._auto_right @property @deprecated(useinstead="TensorIndex", issue=12857, deprecated_since_version="1.1") def auto_left(self): if not hasattr(self, '_auto_left'): self._auto_left = TensorIndex("auto_left", self) return self._auto_left @property @deprecated(useinstead="TensorIndex", issue=12857, deprecated_since_version="1.1") def auto_index(self): if not hasattr(self, '_auto_index'): self._auto_index = TensorIndex("auto_index", self) return self._auto_index @property def data(self): deprecate_data() return _tensor_data_substitution_dict[self] @data.setter def data(self, data): deprecate_data() # This assignment is a bit controversial, should metric components be assigned # to the metric only or also to the TensorIndexType object? The advantage here # is the ability to assign a 1D array and transform it to a 2D diagonal array. from .array import MutableDenseNDimArray data = _TensorDataLazyEvaluator.parse_data(data) if data.rank() > 2: raise ValueError("data have to be of rank 1 (diagonal metric) or 2.") if data.rank() == 1: if self.dim is not None: nda_dim = data.shape[0] if nda_dim != self.dim: raise ValueError("Dimension mismatch") dim = data.shape[0] newndarray = MutableDenseNDimArray.zeros(dim, dim) for i, val in enumerate(data): newndarray[i, i] = val data = newndarray dim1, dim2 = data.shape if dim1 != dim2: raise ValueError("Non-square matrix tensor.") if self.dim is not None: if self.dim != dim1: raise ValueError("Dimension mismatch") _tensor_data_substitution_dict[self] = data _tensor_data_substitution_dict.add_metric_data(self.metric, data) delta = self.get_kronecker_delta() i1 = TensorIndex('i1', self) i2 = TensorIndex('i2', self) delta(i1, -i2).data = _TensorDataLazyEvaluator.parse_data(eye(dim1)) @data.deleter def data(self): deprecate_data() if self in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self] if self.metric in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self.metric] def _get_matrix_fmt(self, number): return ("m" + self.dummy_fmt) % (number) @property def name(self): return self._name @property def dim(self): return self._dim @property def delta(self): return self._delta @property def eps_dim(self): return self._eps_dim @property def epsilon(self): return self._epsilon @property def dummy_fmt(self): return self._dummy_fmt def get_kronecker_delta(self): sym2 = TensorSymmetry(get_symmetric_group_sgs(2)) S2 = TensorType([self]2, sym2) delta = S2('KD') return delta def get_epsilon(self): if not isinstance(self._eps_dim, (SYMPY_INTS, Integer)): return None sym = TensorSymmetry(get_symmetric_group_sgs(self._eps_dim, 1)) Sdim = TensorType([self]self._eps_dim, sym) epsilon = Sdim('Eps') return epsilon def __lt__(self, other): return self.name < other.name def __str__(self): return self.name __repr__ = __str__ def _components_data_full_destroy(self): """ EXPERIMENTAL: do not rely on this API method. This destroys components data associated to the ``TensorIndexType``, if any, specifically: * metric tensor data * Kronecker tensor data """ if self in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self] def delete_tensmul_data(key): if key in _tensor_data_substitution_dict._substitutions_dict_tensmul: del _tensor_data_substitution_dict._substitutions_dict_tensmul[key] # delete metric data: delete_tensmul_data((self.metric, True, True)) delete_tensmul_data((self.metric, True, False)) delete_tensmul_data((self.metric, False, True)) delete_tensmul_data((self.metric, False, False)) # delete delta tensor data: delta = self.get_kronecker_delta() if delta in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[delta] class TensorIndex(Basic): """ Represents a tensor index Parameters ========== name : name of the index, or ``True`` if you want it to be automatically assigned tensortype : ``TensorIndexType`` of the index is_up : flag for contravariant index (is_up=True by default) Attributes ========== ``name`` ``tensortype`` ``is_up`` Notes ===== Tensor indices are contracted with the Einstein summation convention. An index can be in contravariant or in covariant form; in the latter case it is represented prepending a ``-`` to the index name. Adding ``-`` to a covariant (is_up=False) index makes it contravariant. Dummy indices have a name with head given by ``tensortype._dummy_fmt`` Similar to ``symbols`` multiple contravariant indices can be created at once using ``tensor_indices(s, typ)``, where ``s`` is a string of names. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, TensorIndex, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> mu = TensorIndex('mu', Lorentz, is_up=False) >>> nu, rho = tensor_indices('nu, rho', Lorentz) >>> A = tensorhead('A', [Lorentz, Lorentz]) >>> A(mu, nu) A(-mu, nu) >>> A(-mu, -rho) A(mu, -rho) >>> A(mu, -mu) A(-L_0, L_0) """ def __new__(cls, name, tensortype, is_up=True): if isinstance(name, string_types): name_symbol = Symbol(name) elif isinstance(name, Symbol): name_symbol = name elif name is True: name = "_i{0}".format(len(tensortype._autogenerated)) name_symbol = Symbol(name) tensortype._autogenerated.append(name_symbol) else: raise ValueError("invalid name") is_up = sympify(is_up) obj = Basic.__new__(cls, name_symbol, tensortype, is_up) obj._name = str(name) obj._tensor_index_type = tensortype obj._is_up = is_up return obj @property def name(self): return self._name @property @deprecated(useinstead="tensor_index_type", issue=12857, deprecated_since_version="1.1") def tensortype(self): return self.tensor_index_type @property def tensor_index_type(self): return self._tensor_index_type @property def is_up(self): return self._is_up def _print(self): s = self._name if not self._is_up: s = '-%s' % s return s def __lt__(self, other): return (self.tensor_index_type, self._name) < (other.tensor_index_type, other._name) def __neg__(self): t1 = TensorIndex(self.name, self.tensor_index_type, (not self.is_up)) return t1 def tensor_indices(s, typ): """ Returns list of tensor indices given their names and their types Parameters ========== s : string of comma separated names of indices typ : ``TensorIndexType`` of the indices Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> a, b, c, d = tensor_indices('a,b,c,d', Lorentz) """ if isinstance(s, string_types): a = [x.name for x in symbols(s, seq=True)] else: raise ValueError('expecting a string') tilist = [TensorIndex(i, typ) for i in a] if len(tilist) == 1: return tilist[0] return tilist class TensorSymmetry(Basic): """ Monoterm symmetry of a tensor (i.e. any symmetric or anti-symmetric index permutation). For the relevant terminology see ``tensor_can.py`` section of the combinatorics module. Parameters ========== bsgs : tuple ``(base, sgs)`` BSGS of the symmetry of the tensor Attributes ========== ``base`` : base of the BSGS ``generators`` : generators of the BSGS ``rank`` : rank of the tensor Notes ===== A tensor can have an arbitrary monoterm symmetry provided by its BSGS. Multiterm symmetries, like the cyclic symmetry of the Riemann tensor (Bianchi identity), are not covered See Also ======== sympy.combinatorics.tensor_can.get_symmetric_group_sgs Examples ======== Define a symmetric tensor >>> from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, TensorType, get_symmetric_group_sgs >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> sym2 = TensorSymmetry(get_symmetric_group_sgs(2)) >>> S2 = TensorType([Lorentz]2, sym2) >>> V = S2('V') """ def __new__(cls, args, *kw_args): if len(args) == 1: base, generators = args[0] elif len(args) == 2: base, generators = args else: raise TypeError("bsgs required, either two separate parameters or one tuple") if not isinstance(base, Tuple): base = Tuple(base) if not isinstance(generators, Tuple): generators = Tuple(generators) obj = Basic.__new__(cls, base, generators, kw_args) return obj @property def base(self): return self.args[0] @property def generators(self): return self.args[1] @property def rank(self): return self.args[1][0].size - 2 def tensorsymmetry(args): """ Return a ``TensorSymmetry`` object. One can represent a tensor with any monoterm slot symmetry group using a BSGS. ``args`` can be a BSGS ``args[0]`` base ``args[1]`` sgs Usually tensors are in (direct products of) representations of the symmetric group; ``args`` can be a list of lists representing the shapes of Young tableaux Notes ===== For instance: ``[[1]]`` vector ``[[1]n]`` symmetric tensor of rank ``n`` ``[[n]]`` antisymmetric tensor of rank ``n`` ``[[2, 2]]`` monoterm slot symmetry of the Riemann tensor ``[[1],[1]]`` vectorvector ``[[2],[1],[1]`` (antisymmetric tensor)vectorvector Notice that with the shape ``[2, 2]`` we associate only the monoterm symmetries of the Riemann tensor; this is an abuse of notation, since the shape ``[2, 2]`` corresponds usually to the irreducible representation characterized by the monoterm symmetries and by the cyclic symmetry. Examples ======== Symmetric tensor using a Young tableau >>> from sympy.tensor.tensor import TensorIndexType, TensorType, tensorsymmetry >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> sym2 = tensorsymmetry([1, 1]) >>> S2 = TensorType([Lorentz]2, sym2) >>> V = S2('V') Symmetric tensor using a ``BSGS`` (base, strong generator set) >>> from sympy.tensor.tensor import get_symmetric_group_sgs >>> sym2 = tensorsymmetry(get_symmetric_group_sgs(2)) >>> S2 = TensorType([Lorentz]2, sym2) >>> V = S2('V') """ from sympy.combinatorics import Permutation def tableau2bsgs(a): if len(a) == 1: # antisymmetric vector n = a[0] bsgs = get_symmetric_group_sgs(n, 1) else: if all(x == 1 for x in a): # symmetric vector n = len(a) bsgs = get_symmetric_group_sgs(n) elif a == [2, 2]: bsgs = riemann_bsgs else: raise NotImplementedError return bsgs if not args: return TensorSymmetry(Tuple(), Tuple(Permutation(1))) if len(args) == 2 and isinstance(args[1][0], Permutation): return TensorSymmetry(args) base, sgs = tableau2bsgs(args[0]) for a in args[1:]: basex, sgsx = tableau2bsgs(a) base, sgs = bsgs_direct_product(base, sgs, basex, sgsx) return TensorSymmetry(Tuple(base, sgs)) class TensorType(Basic): """ Class of tensor types. Parameters ========== index_types : list of ``TensorIndexType`` of the tensor indices symmetry : ``TensorSymmetry`` of the tensor Attributes ========== ``index_types`` ``symmetry`` ``types`` : list of ``TensorIndexType`` without repetitions Examples ======== Define a symmetric tensor >>> from sympy.tensor.tensor import TensorIndexType, tensorsymmetry, TensorType >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> sym2 = tensorsymmetry([1, 1]) >>> S2 = TensorType([Lorentz]2, sym2) >>> V = S2('V') """ is_commutative = False def __new__(cls, index_types, symmetry, *kw_args): assert symmetry.rank == len(index_types) obj = Basic.__new__(cls, Tuple(index_types), symmetry, *kw_args) return obj @property def index_types(self): return self.args[0] @property def symmetry(self): return self.args[1] @property def types(self): return sorted(set(self.index_types), key=lambda x: x.name) def __str__(self): return 'TensorType(%s)' % ([str(x) for x in self.index_types]) def __call__(self, s, comm=0): """ Return a TensorHead object or a list of TensorHead objects. ``s`` name or string of names ``comm``: commutation group number see ``_TensorManager.set_comm`` Examples ======== Define symmetric tensors ``V``, ``W`` and ``G``, respectively commuting, anticommuting and with no commutation symmetry >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorsymmetry, TensorType, canon_bp >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> a, b = tensor_indices('a,b', Lorentz) >>> sym2 = tensorsymmetry([1]2) >>> S2 = TensorType([Lorentz]2, sym2) >>> V = S2('V') >>> W = S2('W', 1) >>> G = S2('G', 2) >>> canon_bp(V(a, b)V(-b, -a)) V(L_0, L_1)V(-L_0, -L_1) >>> canon_bp(W(a, b)W(-b, -a)) 0 """ if isinstance(s, string_types): names = [x.name for x in symbols(s, seq=True)] else: raise ValueError('expecting a string') if len(names) == 1: return TensorHead(names[0], self, comm) else: return [TensorHead(name, self, comm) for name in names] def tensorhead(name, typ, sym=None, comm=0): """ Function generating tensorhead(s). Parameters ========== name : name or sequence of names (as in ``symbols``) typ : index types sym : same as ``args`` in ``tensorsymmetry`` comm : commutation group number see ``_TensorManager.set_comm`` Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> a, b = tensor_indices('a,b', Lorentz) >>> A = tensorhead('A', [Lorentz]2, [[1]2]) >>> A(a, -b) A(a, -b) If no symmetry parameter is provided, assume there are no index symmetries: >>> B = tensorhead('B', [Lorentz, Lorentz]) >>> B(a, -b) B(a, -b) """ if sym is None: sym = [[1] for i in range(len(typ))] sym = tensorsymmetry(sym) S = TensorType(typ, sym) th = S(name, comm) return th class TensorHead(Basic): """ Tensor head of the tensor Parameters ========== name : name of the tensor typ : list of TensorIndexType comm : commutation group number Attributes ========== ``name`` ``index_types`` ``rank`` ``types`` : equal to ``typ.types`` ``symmetry`` : equal to ``typ.symmetry`` ``comm`` : commutation group Notes ===== Similar to ``symbols`` multiple TensorHeads can be created using ``tensorhead(s, typ, sym=None, comm=0)`` function, where ``s`` is the string of names and ``sym`` is the monoterm tensor symmetry (see ``tensorsymmetry``). A ``TensorHead`` belongs to a commutation group, defined by a symbol on number ``comm`` (see ``_TensorManager.set_comm``); tensors in a commutation group have the same commutation properties; by default ``comm`` is ``0``, the group of the commuting tensors. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensorhead, tensor_indices >>> from sympy import diag >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i0, i1 = tensor_indices('i0:2', Lorentz) Specify a replacement dictionary to keep track of the arrays to use for replacements in the tensorial expression. The ``TensorIndexType`` is associated to the metric used for contractions (in fully covariant form): >>> repl = {Lorentz: diag(1, -1, -1, -1)} Let's see some examples of working with components with the electromagnetic tensor: >>> from sympy import symbols >>> Ex, Ey, Ez, Bx, By, Bz = symbols('E_x E_y E_z B_x B_y B_z') >>> c = symbols('c', positive=True) Let's define `F`, an antisymmetric tensor, we have to assign an antisymmetric matrix to it, because `[[2]]` stands for the Young tableau representation of an antisymmetric set of two elements: >>> F = tensorhead('F', [Lorentz, Lorentz], [[2]]) Let's update the dictionary to contain the matrix to use in the replacements: >>> repl.update({F(-i0, -i1): [ ... [0, Ex/c, Ey/c, Ez/c], ... [-Ex/c, 0, -Bz, By], ... [-Ey/c, Bz, 0, -Bx], ... [-Ez/c, -By, Bx, 0]]}) Now it is possible to retrieve the contravariant form of the Electromagnetic tensor: >>> F(i0, i1).replace_with_arrays(repl, [i0, i1]) [[0, -E_x/c, -E_y/c, -E_z/c], [E_x/c, 0, -B_z, B_y], [E_y/c, B_z, 0, -B_x], [E_z/c, -B_y, B_x, 0]] and the mixed contravariant-covariant form: >>> F(i0, -i1).replace_with_arrays(repl, [i0, -i1]) [[0, E_x/c, E_y/c, E_z/c], [E_x/c, 0, B_z, -B_y], [E_y/c, -B_z, 0, B_x], [E_z/c, B_y, -B_x, 0]] Energy-momentum of a particle may be represented as: >>> from sympy import symbols >>> P = tensorhead('P', [Lorentz], [[1]]) >>> E, px, py, pz = symbols('E p_x p_y p_z', positive=True) >>> repl.update({P(i0): [E, px, py, pz]}) The contravariant and covariant components are, respectively: >>> P(i0).replace_with_arrays(repl, [i0]) [E, p_x, p_y, p_z] >>> P(-i0).replace_with_arrays(repl, [-i0]) [E, -p_x, -p_y, -p_z] The contraction of a 1-index tensor by itself: >>> expr = P(i0)P(-i0) >>> expr.replace_with_arrays(repl, []) E2 - p_x2 - p_y2 - p_z2 """ is_commutative = False def __new__(cls, name, typ, comm=0, kw_args): if isinstance(name, string_types): name_symbol = Symbol(name) elif isinstance(name, Symbol): name_symbol = name else: raise ValueError("invalid name") comm2i = TensorManager.comm_symbols2i(comm) obj = Basic.__new__(cls, name_symbol, typ, kw_args) obj._name = obj.args[0].name obj._rank = len(obj.index_types) obj._symmetry = typ.symmetry obj._comm = comm2i return obj @property def name(self): return self._name @property def rank(self): return self._rank @property def symmetry(self): return self._symmetry @property def typ(self): return self.args[1] @property def comm(self): return self._comm @property def types(self): return self.args[1].types[:] @property def index_types(self): return self.args[1].index_types[:] def __lt__(self, other): return (self.name, self.index_types) < (other.name, other.index_types) def commutes_with(self, other): """ Returns ``0`` if ``self`` and ``other`` commute, ``1`` if they anticommute. Returns ``None`` if ``self`` and ``other`` neither commute nor anticommute. """ r = TensorManager.get_comm(self._comm, other._comm) return r def _print(self): return '%s(%s)' %(self.name, ','.join([str(x) for x in self.index_types])) def __call__(self, indices, *kw_args): """ Returns a tensor with indices. There is a special behavior in case of indices denoted by ``True``, they are considered auto-matrix indices, their slots are automatically filled, and confer to the tensor the behavior of a matrix or vector upon multiplication with another tensor containing auto-matrix indices of the same ``TensorIndexType``. This means indices get summed over the same way as in matrix multiplication. For matrix behavior, define two auto-matrix indices, for vector behavior define just one. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> a, b = tensor_indices('a,b', Lorentz) >>> A = tensorhead('A', [Lorentz]2, [[1]2]) >>> t = A(a, -b) >>> t A(a, -b) """ tensor = Tensor(self, indices, kw_args) return tensor.doit() def __pow__(self, other): with warnings.catch_warnings(): warnings.filterwarnings("ignore", category=SymPyDeprecationWarning) if self.data is None: raise ValueError("No power on abstract tensors.") deprecate_data() from .array import tensorproduct, tensorcontraction metrics = [_.data for _ in self.args[1].args[0]] marray = self.data marraydim = marray.rank() for metric in metrics: marray = tensorproduct(marray, metric, marray) marray = tensorcontraction(marray, (0, marraydim), (marraydim+1, marraydim+2)) return marray * (Rational(1, 2) * other) @property def data(self): deprecate_data() return _tensor_data_substitution_dict[self] @data.setter def data(self, data): deprecate_data() _tensor_data_substitution_dict[self] = data @data.deleter def data(self): deprecate_data() if self in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self] def __iter__(self): deprecate_data() return self.data.__iter__() def _components_data_full_destroy(self): """ EXPERIMENTAL: do not rely on this API method. Destroy components data associated to the ``TensorHead`` object, this checks for attached components data, and destroys components data too. """ # do not garbage collect Kronecker tensor (it should be done by # ``TensorIndexType`` garbage collection) if self.name == "KD": return # the data attached to a tensor must be deleted only by the TensorHead # destructor. If the TensorHead is deleted, it means that there are no # more instances of that tensor anywhere. if self in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self] def _get_argtree_pos(expr, pos): for p in pos: expr = expr.args[p] return expr class TensExpr(Expr): """ Abstract base class for tensor expressions Notes ===== A tensor expression is an expression formed by tensors; currently the sums of tensors are distributed. A ``TensExpr`` can be a ``TensAdd`` or a ``TensMul``. ``TensMul`` objects are formed by products of component tensors, and include a coefficient, which is a SymPy expression. In the internal representation contracted indices are represented by ``(ipos1, ipos2, icomp1, icomp2)``, where ``icomp1`` is the position of the component tensor with contravariant index, ``ipos1`` is the slot which the index occupies in that component tensor. Contracted indices are therefore nameless in the internal representation. """ _op_priority = 12.0 is_commutative = False def __neg__(self): return selfS.NegativeOne def __abs__(self): raise NotImplementedError def __add__(self, other): return TensAdd(self, other).doit() def __radd__(self, other): return TensAdd(other, self).doit() def __sub__(self, other): return TensAdd(self, -other).doit() def __rsub__(self, other): return TensAdd(other, -self).doit() def __mul__(self, other): """ Multiply two tensors using Einstein summation convention. If the two tensors have an index in common, one contravariant and the other covariant, in their product the indices are summed Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2 = tensor_indices('m0,m1,m2', Lorentz) >>> g = Lorentz.metric >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> t1 = p(m0) >>> t2 = q(-m0) >>> t1t2 p(L_0)q(-L_0) """ return TensMul(self, other).doit() def __rmul__(self, other): return TensMul(other, self).doit() def __div__(self, other): other = _sympify(other) if isinstance(other, TensExpr): raise ValueError('cannot divide by a tensor') return TensMul(self, S.One/other).doit() def __rdiv__(self, other): raise ValueError('cannot divide by a tensor') def __pow__(self, other): with warnings.catch_warnings(): warnings.filterwarnings("ignore", category=SymPyDeprecationWarning) if self.data is None: raise ValueError("No power without ndarray data.") deprecate_data() from .array import tensorproduct, tensorcontraction free = self.free marray = self.data mdim = marray.rank() for metric in free: marray = tensorcontraction( tensorproduct( marray, metric[0].tensor_index_type.data, marray), (0, mdim), (mdim+1, mdim+2) ) return marray * (Rational(1, 2) * other) def __rpow__(self, other): raise NotImplementedError __truediv__ = __div__ __rtruediv__ = __rdiv__ def fun_eval(self, index_tuples): """ Return a tensor with free indices substituted according to ``index_tuples`` ``index_types`` list of tuples ``(old_index, new_index)`` Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i, j, k, l = tensor_indices('i,j,k,l', Lorentz) >>> A, B = tensorhead('A,B', [Lorentz]2, [[1]2]) >>> t = A(i, k)B(-k, -j); t A(i, L_0)B(-L_0, -j) >>> t.fun_eval((i, k),(-j, l)) A(k, L_0)B(-L_0, l) """ expr = self.xreplace(dict(index_tuples)) expr = expr.replace(lambda x: isinstance(x, Tensor), lambda x: x.args[0](x.args[1])) # For some reason, `TensMul` gets replaced by `Mul`, correct it: expr = expr.replace(lambda x: isinstance(x, (Mul, TensMul)), lambda x: TensMul(x.args).doit()) return expr def get_matrix(self): """ DEPRECATED: do not use. Returns ndarray components data as a matrix, if components data are available and ndarray dimension does not exceed 2. """ from sympy import Matrix deprecate_data() if 0 < self.rank <= 2: rows = self.data.shape[0] columns = self.data.shape[1] if self.rank == 2 else 1 if self.rank == 2: mat_list = [] * rows for i in range(rows): mat_list.append([]) for j in range(columns): mat_list[i].append(self[i, j]) else: mat_list = [None] * rows for i in range(rows): mat_list[i] = self[i] return Matrix(mat_list) else: raise NotImplementedError( "missing multidimensional reduction to matrix.") @staticmethod def _get_indices_permutation(indices1, indices2): return [indices1.index(i) for i in indices2] def expand(self, hints): return _expand(self, hints).doit() def _expand(self, *kwargs): return self def _get_free_indices_set(self): indset = set([]) for arg in self.args: if isinstance(arg, TensExpr): indset.update(arg._get_free_indices_set()) return indset def _get_dummy_indices_set(self): indset = set([]) for arg in self.args: if isinstance(arg, TensExpr): indset.update(arg._get_dummy_indices_set()) return indset def _get_indices_set(self): indset = set([]) for arg in self.args: if isinstance(arg, TensExpr): indset.update(arg._get_indices_set()) return indset @property def _iterate_dummy_indices(self): dummy_set = self._get_dummy_indices_set() def recursor(expr, pos): if isinstance(expr, TensorIndex): if expr in dummy_set: yield (expr, pos) elif isinstance(expr, (Tuple, TensExpr)): for p, arg in enumerate(expr.args): for i in recursor(arg, pos+(p,)): yield i return recursor(self, ()) @property def _iterate_free_indices(self): free_set = self._get_free_indices_set() def recursor(expr, pos): if isinstance(expr, TensorIndex): if expr in free_set: yield (expr, pos) elif isinstance(expr, (Tuple, TensExpr)): for p, arg in enumerate(expr.args): for i in recursor(arg, pos+(p,)): yield i return recursor(self, ()) @property def _iterate_indices(self): def recursor(expr, pos): if isinstance(expr, TensorIndex): yield (expr, pos) elif isinstance(expr, (Tuple, TensExpr)): for p, arg in enumerate(expr.args): for i in recursor(arg, pos+(p,)): yield i return recursor(self, ()) @staticmethod def _match_indices_with_other_tensor(array, free_ind1, free_ind2, replacement_dict): from .array import tensorcontraction, tensorproduct, permutedims index_types1 = [i.tensor_index_type for i in free_ind1] # Check if variance of indices needs to be fixed: pos2up = [] pos2down = [] free2remaining = free_ind2[:] for pos1, index1 in enumerate(free_ind1): if index1 in free2remaining: pos2 = free2remaining.index(index1) free2remaining[pos2] = None continue if -index1 in free2remaining: pos2 = free2remaining.index(-index1) free2remaining[pos2] = None free_ind2[pos2] = index1 if index1.is_up: pos2up.append(pos2) else: pos2down.append(pos2) else: index2 = free2remaining[pos1] if index2 is None: raise ValueError("incompatible indices: %s and %s" % (free_ind1, free_ind2)) free2remaining[pos1] = None free_ind2[pos1] = index1 if index1.is_up ^ index2.is_up: if index1.is_up: pos2up.append(pos1) else: pos2down.append(pos1) if len(set(free_ind1) & set(free_ind2)) < len(free_ind1): raise ValueError("incompatible indices: %s and %s" % (free_ind1, free_ind2)) # TODO: add possibility of metric after (spinors) def contract_and_permute(metric, array, pos): array = tensorcontraction(tensorproduct(metric, array), (1, 2+pos)) permu = list(range(len(free_ind1))) permu[0], permu[pos] = permu[pos], permu[0] return permutedims(array, permu) # Raise indices: for pos in pos2up: metric = replacement_dict[index_types1[pos]] metric_inverse = _TensorDataLazyEvaluator.inverse_matrix(metric) array = contract_and_permute(metric_inverse, array, pos) # Lower indices: for pos in pos2down: metric = replacement_dict[index_types1[pos]] array = contract_and_permute(metric, array, pos) if free_ind1: permutation = TensExpr._get_indices_permutation(free_ind2, free_ind1) array = permutedims(array, permutation) if hasattr(array, "rank") and array.rank() == 0: array = array[()] return free_ind2, array def replace_with_arrays(self, replacement_dict, indices=None): """ Replace the tensorial expressions with arrays. The final array will correspond to the N-dimensional array with indices arranged according to ``indices``. Parameters ========== replacement_dict dictionary containing the replacement rules for tensors. indices the index order with respect to which the array is read. The original index order will be used if no value is passed. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices >>> from sympy.tensor.tensor import tensorhead >>> from sympy import symbols, diag >>> L = TensorIndexType("L") >>> i, j = tensor_indices("i j", L) >>> A = tensorhead("A", [L], [[1]]) >>> A(i).replace_with_arrays({A(i): [1, 2]}, [i]) [1, 2] Since 'indices' is optional, we can also call replace_with_arrays by this way if no specific index order is needed: >>> A(i).replace_with_arrays({A(i): [1, 2]}) [1, 2] >>> expr = A(i)A(j) >>> expr.replace_with_arrays({A(i): [1, 2]}) [[1, 2], [2, 4]] For contractions, specify the metric of the ``TensorIndexType``, which in this case is ``L``, in its covariant form: >>> expr = A(i)A(-i) >>> expr.replace_with_arrays({A(i): [1, 2], L: diag(1, -1)}) -3 Symmetrization of an array: >>> H = tensorhead("H", [L, L], [[1], [1]]) >>> a, b, c, d = symbols("a b c d") >>> expr = H(i, j)/2 + H(j, i)/2 >>> expr.replace_with_arrays({H(i, j): [[a, b], [c, d]]}) [[a, b/2 + c/2], [b/2 + c/2, d]] Anti-symmetrization of an array: >>> expr = H(i, j)/2 - H(j, i)/2 >>> repl = {H(i, j): [[a, b], [c, d]]} >>> expr.replace_with_arrays(repl) [[0, b/2 - c/2], [-b/2 + c/2, 0]] The same expression can be read as the transpose by inverting ``i`` and ``j``: >>> expr.replace_with_arrays(repl, [j, i]) [[0, -b/2 + c/2], [b/2 - c/2, 0]] """ from .array import Array indices = indices or [] replacement_dict = {tensor: Array(array) for tensor, array in replacement_dict.items()} # Check dimensions of replaced arrays: for tensor, array in replacement_dict.items(): if isinstance(tensor, TensorIndexType): expected_shape = [tensor.dim for i in range(2)] else: expected_shape = [index_type.dim for index_type in tensor.index_types] if len(expected_shape) != array.rank() or (not all([dim1 == dim2 if dim1 is not None else True for dim1, dim2 in zip(expected_shape, array.shape)])): raise ValueError("shapes for tensor %s expected to be %s, "\ "replacement array shape is %s" % (tensor, expected_shape, array.shape)) ret_indices, array = self._extract_data(replacement_dict) last_indices, array = self._match_indices_with_other_tensor(array, indices, ret_indices, replacement_dict) #permutation = self._get_indices_permutation(indices, ret_indices) #if not hasattr(array, "rank"): #return array #if array.rank() == 0: #array = array[()] #return array #array = permutedims(array, permutation) return array def _check_add_Sum(self, expr, index_symbols): from sympy import Sum indices = self.get_indices() dum = self.dum sum_indices = [ (index_symbols[i], 0, indices[i].tensor_index_type.dim-1) for i, j in dum] if sum_indices: expr = Sum(expr, sum_indices) return expr class TensAdd(TensExpr, AssocOp): """ Sum of tensors Parameters ========== free_args : list of the free indices Attributes ========== ``args`` : tuple of addends ``rank`` : rank of the tensor ``free_args`` : list of the free indices in sorted order Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensorhead, tensor_indices >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> a, b = tensor_indices('a,b', Lorentz) >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> t = p(a) + q(a); t p(a) + q(a) >>> t(b) p(b) + q(b) Examples with components data added to the tensor expression: >>> from sympy import symbols, diag >>> x, y, z, t = symbols("x y z t") >>> repl = {} >>> repl[Lorentz] = diag(1, -1, -1, -1) >>> repl[p(a)] = [1, 2, 3, 4] >>> repl[q(a)] = [x, y, z, t] The following are: 22 - 32 - 22 - 72 ==> -58 >>> expr = p(a) + q(a) >>> expr.replace_with_arrays(repl, [a]) [x + 1, y + 2, z + 3, t + 4] """ def __new__(cls, args, kw_args): args = [_sympify(x) for x in args if x] args = TensAdd._tensAdd_flatten(args) obj = Basic.__new__(cls, args, kw_args) return obj def doit(self, kwargs): deep = kwargs.get('deep', True) if deep: args = [arg.doit(*kwargs) for arg in self.args] else: args = self.args if not args: return S.Zero if len(args) == 1 and not isinstance(args[0], TensExpr): return args[0] # now check that all addends have the same indices: TensAdd._tensAdd_check(args) # if TensAdd has only 1 element in its `args`: if len(args) == 1: # and isinstance(args[0], TensMul): return args[0] # Remove zeros: args = [x for x in args if x] # if there are no more args (i.e. have cancelled out), # just return zero: if not args: return S.Zero if len(args) == 1: return args[0] # Collect terms appearing more than once, differing by their coefficients: args = TensAdd._tensAdd_collect_terms(args) # collect canonicalized terms def sort_key(t): x = get_index_structure(t) if not isinstance(t, TensExpr): return ([], [], []) return (t.components, x.free, x.dum) args.sort(key=sort_key) if not args: return S.Zero # it there is only a component tensor return it if len(args) == 1: return args[0] obj = self.func(args) return obj @staticmethod def _tensAdd_flatten(args): # flatten TensAdd, coerce terms which are not tensors to tensors a = [] for x in args: if isinstance(x, (Add, TensAdd)): a.extend(list(x.args)) else: a.append(x) args = [x for x in a if x.coeff] return args @staticmethod def _tensAdd_check(args): # check that all addends have the same free indices indices0 = set([x[0] for x in get_index_structure(args[0]).free]) list_indices = [set([y[0] for y in get_index_structure(x).free]) for x in args[1:]] if not all(x == indices0 for x in list_indices): raise ValueError('all tensors must have the same indices') @staticmethod def _tensAdd_collect_terms(args): # collect TensMul terms differing at most by their coefficient terms_dict = defaultdict(list) scalars = S.Zero if isinstance(args[0], TensExpr): free_indices = set(args[0].get_free_indices()) else: free_indices = set([]) for arg in args: if not isinstance(arg, TensExpr): if free_indices != set([]): raise ValueError("wrong valence") scalars += arg continue if free_indices != set(arg.get_free_indices()): raise ValueError("wrong valence") # TODO: what is the part which is not a coeff? # needs an implementation similar to .as_coeff_Mul() terms_dict[arg.nocoeff].append(arg.coeff) new_args = [TensMul(Add(coeff), t).doit() for t, coeff in terms_dict.items() if Add(coeff) != 0] if isinstance(scalars, Add): new_args = list(scalars.args) + new_args elif scalars != 0: new_args = [scalars] + new_args return new_args def get_indices(self): indices = [] for arg in self.args: indices.extend([i for i in get_indices(arg) if i not in indices]) return indices @property def rank(self): return self.args[0].rank @property def free_args(self): return self.args[0].free_args def _expand(self, *hints): return TensAdd([_expand(i, *hints) for i in self.args]) def __call__(self, indices): """Returns tensor with ordered free indices replaced by ``indices`` Parameters ========== indices Examples ======== >>> from sympy import Symbol >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> D = Symbol('D') >>> Lorentz = TensorIndexType('Lorentz', dim=D, dummy_fmt='L') >>> i0,i1,i2,i3,i4 = tensor_indices('i0:5', Lorentz) >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> g = Lorentz.metric >>> t = p(i0)p(i1) + g(i0,i1)q(i2)q(-i2) >>> t(i0,i2) metric(i0, i2)q(L_0)q(-L_0) + p(i0)p(i2) >>> from sympy.tensor.tensor import canon_bp >>> canon_bp(t(i0,i1) - t(i1,i0)) 0 """ free_args = self.free_args indices = list(indices) if [x.tensor_index_type for x in indices] != [x.tensor_index_type for x in free_args]: raise ValueError('incompatible types') if indices == free_args: return self index_tuples = list(zip(free_args, indices)) a = [x.func(x.fun_eval(index_tuples).args) for x in self.args] res = TensAdd(a).doit() return res def canon_bp(self): """ Canonicalize using the Butler-Portugal algorithm for canonicalization under monoterm symmetries. """ expr = self.expand() args = [canon_bp(x) for x in expr.args] res = TensAdd(args).doit() return res def equals(self, other): other = _sympify(other) if isinstance(other, TensMul) and other._coeff == 0: return all(x._coeff == 0 for x in self.args) if isinstance(other, TensExpr): if self.rank != other.rank: return False if isinstance(other, TensAdd): if set(self.args) != set(other.args): return False else: return True t = self - other if not isinstance(t, TensExpr): return t == 0 else: if isinstance(t, TensMul): return t._coeff == 0 else: return all(x._coeff == 0 for x in t.args) def __getitem__(self, item): deprecate_data() return self.data[item] def contract_delta(self, delta): args = [x.contract_delta(delta) for x in self.args] t = TensAdd(args).doit() return canon_bp(t) def contract_metric(self, g): """ Raise or lower indices with the metric ``g`` Parameters ========== g : metric contract_all : if True, eliminate all ``g`` which are contracted Notes ===== see the ``TensorIndexType`` docstring for the contraction conventions """ args = [contract_metric(x, g) for x in self.args] t = TensAdd(args).doit() return canon_bp(t) def fun_eval(self, index_tuples): """ Return a tensor with free indices substituted according to ``index_tuples`` Parameters ========== index_types : list of tuples ``(old_index, new_index)`` Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i, j, k, l = tensor_indices('i,j,k,l', Lorentz) >>> A, B = tensorhead('A,B', [Lorentz]2, [[1]2]) >>> t = A(i, k)B(-k, -j) + A(i, -j) >>> t.fun_eval((i, k),(-j, l)) A(k, L_0)B(-L_0, l) + A(k, l) """ args = self.args args1 = [] for x in args: y = x.fun_eval(index_tuples) args1.append(y) return TensAdd(args1).doit() def substitute_indices(self, index_tuples): """ Return a tensor with free indices substituted according to ``index_tuples`` Parameters ========== index_types : list of tuples ``(old_index, new_index)`` Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i, j, k, l = tensor_indices('i,j,k,l', Lorentz) >>> A, B = tensorhead('A,B', [Lorentz]2, [[1]2]) >>> t = A(i, k)B(-k, -j); t A(i, L_0)B(-L_0, -j) >>> t.substitute_indices((i,j), (j, k)) A(j, L_0)B(-L_0, -k) """ args = self.args args1 = [] for x in args: y = x.substitute_indices(index_tuples) args1.append(y) return TensAdd(args1).doit() def _print(self): a = [] args = self.args for x in args: a.append(str(x)) a.sort() s = ' + '.join(a) s = s.replace('+ -', '- ') return s def _extract_data(self, replacement_dict): from sympy.tensor.array import Array, permutedims args_indices, arrays = zip([ arg._extract_data(replacement_dict) if isinstance(arg, TensExpr) else ([], arg) for arg in self.args ]) arrays = [Array(i) for i in arrays] ref_indices = args_indices[0] for i in range(1, len(args_indices)): indices = args_indices[i] array = arrays[i] permutation = TensMul._get_indices_permutation(indices, ref_indices) arrays[i] = permutedims(array, permutation) return ref_indices, sum(arrays, Array.zeros(array.shape)) @property def data(self): deprecate_data() return _tensor_data_substitution_dict[self.expand()] @data.setter def data(self, data): deprecate_data() _tensor_data_substitution_dict[self] = data @data.deleter def data(self): deprecate_data() if self in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self] def __iter__(self): deprecate_data() if not self.data: raise ValueError("No iteration on abstract tensors") return self.data.flatten().__iter__() def _eval_rewrite_as_Indexed(self, args): return Add.fromiter(args) class Tensor(TensExpr): """ Base tensor class, i.e. this represents a tensor, the single unit to be put into an expression. This object is usually created from a ``TensorHead``, by attaching indices to it. Indices preceded by a minus sign are considered contravariant, otherwise covariant. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType("Lorentz", dummy_fmt="L") >>> mu, nu = tensor_indices('mu nu', Lorentz) >>> A = tensorhead("A", [Lorentz, Lorentz], [[1], [1]]) >>> A(mu, -nu) A(mu, -nu) >>> A(mu, -mu) A(L_0, -L_0) It is also possible to use symbols instead of inidices (appropriate indices are then generated automatically). >>> from sympy import Symbol >>> x = Symbol('x') >>> A(x, mu) A(x, mu) >>> A(x, -x) A(L_0, -L_0) """ is_commutative = False def __new__(cls, tensor_head, indices, *kw_args): is_canon_bp = kw_args.pop('is_canon_bp', False) indices = cls._parse_indices(tensor_head, indices) obj = Basic.__new__(cls, tensor_head, Tuple(indices), *kw_args) obj._index_structure = _IndexStructure.from_indices(indices) obj._free_indices_set = set(obj._index_structure.get_free_indices()) if tensor_head.rank != len(indices): raise ValueError("wrong number of indices") obj._indices = indices obj._is_canon_bp = is_canon_bp obj._index_map = Tensor._build_index_map(indices, obj._index_structure) return obj @staticmethod def _build_index_map(indices, index_structure): index_map = {} for idx in indices: index_map[idx] = (indices.index(idx),) return index_map def doit(self, *kwargs): args, indices, free, dum = TensMul._tensMul_contract_indices([self]) return args[0] @staticmethod def _parse_indices(tensor_head, indices): if not isinstance(indices, (tuple, list, Tuple)): raise TypeError("indices should be an array, got %s" % type(indices)) indices = list(indices) for i, index in enumerate(indices): if isinstance(index, Symbol): indices[i] = TensorIndex(index, tensor_head.index_types[i], True) elif isinstance(index, Mul): c, e = index.as_coeff_Mul() if c == -1 and isinstance(e, Symbol): indices[i] = TensorIndex(e, tensor_head.index_types[i], False) else: raise ValueError("index not understood: %s" % index) elif not isinstance(index, TensorIndex): raise TypeError("wrong type for index: %s is %s" % (index, type(index))) return indices def _set_new_index_structure(self, im, is_canon_bp=False): indices = im.get_indices() return self._set_indices(indices, is_canon_bp=is_canon_bp) def _set_indices(self, indices, kw_args): if len(indices) != self.ext_rank: raise ValueError("indices length mismatch") return self.func(self.args[0], indices, is_canon_bp=kw_args.pop('is_canon_bp', False)).doit() def _get_free_indices_set(self): return set([i[0] for i in self._index_structure.free]) def _get_dummy_indices_set(self): dummy_pos = set(itertools.chain(self._index_structure.dum)) return set(idx for i, idx in enumerate(self.args[1]) if i in dummy_pos) def _get_indices_set(self): return set(self.args[1].args) @property def is_canon_bp(self): return self._is_canon_bp @property def indices(self): return self._indices @property def free(self): return self._index_structure.free[:] @property def free_in_args(self): return [(ind, pos, 0) for ind, pos in self.free] @property def dum(self): return self._index_structure.dum[:] @property def dum_in_args(self): return [(p1, p2, 0, 0) for p1, p2 in self.dum] @property def rank(self): return len(self.free) @property def ext_rank(self): return self._index_structure._ext_rank @property def free_args(self): return sorted([x[0] for x in self.free]) def commutes_with(self, other): """ :param other: :return: 0 commute 1 anticommute None neither commute nor anticommute """ if not isinstance(other, TensExpr): return 0 elif isinstance(other, Tensor): return self.component.commutes_with(other.component) return NotImplementedError def perm2tensor(self, g, is_canon_bp=False): """ Returns the tensor corresponding to the permutation ``g`` For further details, see the method in ``TIDS`` with the same name. """ return perm2tensor(self, g, is_canon_bp) def canon_bp(self): if self._is_canon_bp: return self expr = self.expand() g, dummies, msym = expr._index_structure.indices_canon_args() v = components_canon_args([expr.component]) can = canonicalize(g, dummies, msym, v) if can == 0: return S.Zero tensor = self.perm2tensor(can, True) return tensor @property def index_types(self): return list(self.component.index_types) @property def coeff(self): return S.One @property def nocoeff(self): return self @property def component(self): return self.args[0] @property def components(self): return [self.args[0]] def split(self): return [self] def _expand(self, kwargs): return self def sorted_components(self): return self def get_indices(self): """ Get a list of indices, corresponding to those of the tensor. """ return list(self.args[1]) def get_free_indices(self): """ Get a list of free indices, corresponding to those of the tensor. """ return self._index_structure.get_free_indices() def as_base_exp(self): return self, S.One def substitute_indices(self, index_tuples): return substitute_indices(self, index_tuples) def __call__(self, indices): """Returns tensor with ordered free indices replaced by ``indices`` Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i0,i1,i2,i3,i4 = tensor_indices('i0:5', Lorentz) >>> A = tensorhead('A', [Lorentz]5, [[1]5]) >>> t = A(i2, i1, -i2, -i3, i4) >>> t A(L_0, i1, -L_0, -i3, i4) >>> t(i1, i2, i3) A(L_0, i1, -L_0, i2, i3) """ free_args = self.free_args indices = list(indices) if [x.tensor_index_type for x in indices] != [x.tensor_index_type for x in free_args]: raise ValueError('incompatible types') if indices == free_args: return self t = self.fun_eval(list(zip(free_args, indices))) # object is rebuilt in order to make sure that all contracted indices # get recognized as dummies, but only if there are contracted indices. if len(set(i if i.is_up else -i for i in indices)) != len(indices): return t.func(t.args) return t # TODO: put this into TensExpr? def __iter__(self): deprecate_data() return self.data.__iter__() # TODO: put this into TensExpr? def __getitem__(self, item): deprecate_data() return self.data[item] def _extract_data(self, replacement_dict): from .array import Array for k, v in replacement_dict.items(): if isinstance(k, Tensor) and k.args[0] == self.args[0]: other = k array = v break else: raise ValueError("%s not found in %s" % (self, replacement_dict)) # TODO: inefficient, this should be done at root level only: replacement_dict = {k: Array(v) for k, v in replacement_dict.items()} array = Array(array) dum1 = self.dum dum2 = other.dum if len(dum2) > 0: for pair in dum2: # allow `dum2` if the contained values are also in `dum1`. if pair not in dum1: raise NotImplementedError("%s with contractions is not implemented" % other) # Remove elements in `dum2` from `dum1`: dum1 = [pair for pair in dum1 if pair not in dum2] if len(dum1) > 0: indices2 = other.get_indices() repl = {} for p1, p2 in dum1: repl[indices2[p2]] = -indices2[p1] other = other.xreplace(repl).doit() array = _TensorDataLazyEvaluator.data_contract_dum([array], dum1, len(indices2)) free_ind1 = self.get_free_indices() free_ind2 = other.get_free_indices() return self._match_indices_with_other_tensor(array, free_ind1, free_ind2, replacement_dict) @property def data(self): deprecate_data() return _tensor_data_substitution_dict[self] @data.setter def data(self, data): deprecate_data() # TODO: check data compatibility with properties of tensor. _tensor_data_substitution_dict[self] = data @data.deleter def data(self): deprecate_data() if self in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self] if self.metric in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self.metric] def _print(self): indices = [str(ind) for ind in self.indices] component = self.component if component.rank > 0: return ('%s(%s)' % (component.name, ', '.join(indices))) else: return ('%s' % component.name) def equals(self, other): if other == 0: return self.coeff == 0 other = _sympify(other) if not isinstance(other, TensExpr): assert not self.components return S.One == other def _get_compar_comp(self): t = self.canon_bp() r = (t.coeff, tuple(t.components), \ tuple(sorted(t.free)), tuple(sorted(t.dum))) return r return _get_compar_comp(self) == _get_compar_comp(other) def contract_metric(self, g): # if metric is not the same, ignore this step: if self.component != g: return self # in case there are free components, do not perform anything: if len(self.free) != 0: return self antisym = g.index_types[0].metric_antisym sign = S.One typ = g.index_types[0] if not antisym: # g(i, -i) if typ._dim is None: raise ValueError('dimension not assigned') sign = signtyp._dim else: # g(i, -i) if typ._dim is None: raise ValueError('dimension not assigned') sign = signtyp._dim dp0, dp1 = self.dum[0] if dp0 < dp1: # g(i, -i) = -D with antisymmetric metric sign = -sign return sign def contract_delta(self, metric): return self.contract_metric(metric) def _eval_rewrite_as_Indexed(self, tens, indices): from sympy import Indexed # TODO: replace .args[0] with .name: index_symbols = [i.args[0] for i in self.get_indices()] expr = Indexed(tens.args[0], index_symbols) return self._check_add_Sum(expr, index_symbols) class TensMul(TensExpr, AssocOp): """ Product of tensors Parameters ========== coeff : SymPy coefficient of the tensor args Attributes ========== ``components`` : list of ``TensorHead`` of the component tensors ``types`` : list of nonrepeated ``TensorIndexType`` ``free`` : list of ``(ind, ipos, icomp)``, see Notes ``dum`` : list of ``(ipos1, ipos2, icomp1, icomp2)``, see Notes ``ext_rank`` : rank of the tensor counting the dummy indices ``rank`` : rank of the tensor ``coeff`` : SymPy coefficient of the tensor ``free_args`` : list of the free indices in sorted order ``is_canon_bp`` : ``True`` if the tensor in in canonical form Notes ===== ``args[0]`` list of ``TensorHead`` of the component tensors. ``args[1]`` list of ``(ind, ipos, icomp)`` where ``ind`` is a free index, ``ipos`` is the slot position of ``ind`` in the ``icomp``-th component tensor. ``args[2]`` list of tuples representing dummy indices. ``(ipos1, ipos2, icomp1, icomp2)`` indicates that the contravariant dummy index is the ``ipos1``-th slot position in the ``icomp1``-th component tensor; the corresponding covariant index is in the ``ipos2`` slot position in the ``icomp2``-th component tensor. """ identity = S.One def __new__(cls, args, *kw_args): is_canon_bp = kw_args.get('is_canon_bp', False) args = list(map(_sympify, args)) # Flatten: args = [i for arg in args for i in (arg.args if isinstance(arg, (TensMul, Mul)) else [arg])] args, indices, free, dum = TensMul._tensMul_contract_indices(args, replace_indices=False) # Data for indices: index_types = [i.tensor_index_type for i in indices] index_structure = _IndexStructure(free, dum, index_types, indices, canon_bp=is_canon_bp) obj = TensExpr.__new__(cls, args) obj._indices = indices obj._index_types = index_types obj._index_structure = index_structure obj._ext_rank = len(obj._index_structure.free) + 2len(obj._index_structure.dum) obj._coeff = S.One obj._is_canon_bp = is_canon_bp return obj @staticmethod def _indices_to_free_dum(args_indices): free2pos1 = {} free2pos2 = {} dummy_data = [] indices = [] # Notation for positions (to better understand the code): # `pos1`: position in the `args`. # `pos2`: position in the indices. # Example: # A(i, j)B(k, m, n)C(p) # `pos1` of `n` is 1 because it's in `B` (second `args` of TensMul). # `pos2` of `n` is 4 because it's the fifth overall index. # Counter for the index position wrt the whole expression: pos2 = 0 for pos1, arg_indices in enumerate(args_indices): for index_pos, index in enumerate(arg_indices): if not isinstance(index, TensorIndex): raise TypeError("expected TensorIndex") if -index in free2pos1: # Dummy index detected: other_pos1 = free2pos1.pop(-index) other_pos2 = free2pos2.pop(-index) if index.is_up: dummy_data.append((index, pos1, other_pos1, pos2, other_pos2)) else: dummy_data.append((-index, other_pos1, pos1, other_pos2, pos2)) indices.append(index) elif index in free2pos1: raise ValueError("Repeated index: %s" % index) else: free2pos1[index] = pos1 free2pos2[index] = pos2 indices.append(index) pos2 += 1 free = [(i, p) for (i, p) in free2pos2.items()] free_names = [i.name for i in free2pos2.keys()] dummy_data.sort(key=lambda x: x[3]) return indices, free, free_names, dummy_data @staticmethod def _dummy_data_to_dum(dummy_data): return [(p2a, p2b) for (i, p1a, p1b, p2a, p2b) in dummy_data] @staticmethod def _tensMul_contract_indices(args, replace_indices=True): replacements = [{} for _ in args] #_index_order = all([_has_index_order(arg) for arg in args]) args_indices = [get_indices(arg) for arg in args] indices, free, free_names, dummy_data = TensMul._indices_to_free_dum(args_indices) cdt = defaultdict(int) def dummy_fmt_gen(tensor_index_type): fmt = tensor_index_type.dummy_fmt nd = cdt[tensor_index_type] cdt[tensor_index_type] += 1 return fmt % nd if replace_indices: for old_index, pos1cov, pos1contra, pos2cov, pos2contra in dummy_data: index_type = old_index.tensor_index_type while True: dummy_name = dummy_fmt_gen(index_type) if dummy_name not in free_names: break dummy = TensorIndex(dummy_name, index_type, True) replacements[pos1cov][old_index] = dummy replacements[pos1contra][-old_index] = -dummy indices[pos2cov] = dummy indices[pos2contra] = -dummy args = [arg.xreplace(repl) for arg, repl in zip(args, replacements)] dum = TensMul._dummy_data_to_dum(dummy_data) return args, indices, free, dum @staticmethod def _get_components_from_args(args): """ Get a list of ``Tensor`` objects having the same ``TIDS`` if multiplied by one another. """ components = [] for arg in args: if not isinstance(arg, TensExpr): continue if isinstance(arg, TensAdd): continue components.extend(arg.components) return components @staticmethod def _rebuild_tensors_list(args, index_structure): indices = index_structure.get_indices() #tensors = [None for i in components] # pre-allocate list ind_pos = 0 for i, arg in enumerate(args): if not isinstance(arg, TensExpr): continue prev_pos = ind_pos ind_pos += arg.ext_rank args[i] = Tensor(arg.component, indices[prev_pos:ind_pos]) def doit(self, kwargs): is_canon_bp = self._is_canon_bp deep = kwargs.get('deep', True) if deep: args = [arg.doit(kwargs) for arg in self.args] else: args = self.args args = [arg for arg in args if arg != self.identity] # Extract non-tensor coefficients: coeff = reduce(lambda a, b: ab, [arg for arg in args if not isinstance(arg, TensExpr)], S.One) args = [arg for arg in args if isinstance(arg, TensExpr)] if len(args) == 0: return coeff if coeff != self.identity: args = [coeff] + args if coeff == 0: return S.Zero if len(args) == 1: return args[0] args, indices, free, dum = TensMul._tensMul_contract_indices(args) # Data for indices: index_types = [i.tensor_index_type for i in indices] index_structure = _IndexStructure(free, dum, index_types, indices, canon_bp=is_canon_bp) obj = self.func(args) obj._index_types = index_types obj._index_structure = index_structure obj._ext_rank = len(obj._index_structure.free) + 2len(obj._index_structure.dum) obj._coeff = coeff obj._is_canon_bp = is_canon_bp return obj # TODO: this method should be private # TODO: should this method be renamed _from_components_free_dum ? @staticmethod def from_data(coeff, components, free, dum, *kw_args): return TensMul(coeff, TensMul._get_tensors_from_components_free_dum(components, free, dum), *kw_args).doit() @staticmethod def _get_tensors_from_components_free_dum(components, free, dum): """ Get a list of ``Tensor`` objects by distributing ``free`` and ``dum`` indices on the ``components``. """ index_structure = _IndexStructure.from_components_free_dum(components, free, dum) indices = index_structure.get_indices() tensors = [None for i in components] # pre-allocate list # distribute indices on components to build a list of tensors: ind_pos = 0 for i, component in enumerate(components): prev_pos = ind_pos ind_pos += component.rank tensors[i] = Tensor(component, indices[prev_pos:ind_pos]) return tensors def _get_free_indices_set(self): return set([i[0] for i in self.free]) def _get_dummy_indices_set(self): dummy_pos = set(itertools.chain(self.dum)) return set(idx for i, idx in enumerate(self._index_structure.get_indices()) if i in dummy_pos) def _get_position_offset_for_indices(self): arg_offset = [None for i in range(self.ext_rank)] counter = 0 for i, arg in enumerate(self.args): if not isinstance(arg, TensExpr): continue for j in range(arg.ext_rank): arg_offset[j + counter] = counter counter += arg.ext_rank return arg_offset @property def free_args(self): return sorted([x[0] for x in self.free]) @property def components(self): return self._get_components_from_args(self.args) @property def free(self): return self._index_structure.free[:] @property def free_in_args(self): arg_offset = self._get_position_offset_for_indices() argpos = self._get_indices_to_args_pos() return [(ind, pos-arg_offset[pos], argpos[pos]) for (ind, pos) in self.free] @property def coeff(self): return self._coeff @property def nocoeff(self): return self.func([t for t in self.args if isinstance(t, TensExpr)]).doit() @property def dum(self): return self._index_structure.dum[:] @property def dum_in_args(self): arg_offset = self._get_position_offset_for_indices() argpos = self._get_indices_to_args_pos() return [(p1-arg_offset[p1], p2-arg_offset[p2], argpos[p1], argpos[p2]) for p1, p2 in self.dum] @property def rank(self): return len(self.free) @property def ext_rank(self): return self._ext_rank @property def index_types(self): return self._index_types[:] def equals(self, other): if other == 0: return self.coeff == 0 other = _sympify(other) if not isinstance(other, TensExpr): assert not self.components return self._coeff == other return self.canon_bp() == other.canon_bp() def get_indices(self): """ Returns the list of indices of the tensor The indices are listed in the order in which they appear in the component tensors. The dummy indices are given a name which does not collide with the names of the free indices. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2 = tensor_indices('m0,m1,m2', Lorentz) >>> g = Lorentz.metric >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> t = p(m1)g(m0,m2) >>> t.get_indices() [m1, m0, m2] >>> t2 = p(m1)g(-m1, m2) >>> t2.get_indices() [L_0, -L_0, m2] """ return self._indices def get_free_indices(self): """ Returns the list of free indices of the tensor The indices are listed in the order in which they appear in the component tensors. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2 = tensor_indices('m0,m1,m2', Lorentz) >>> g = Lorentz.metric >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> t = p(m1)g(m0,m2) >>> t.get_free_indices() [m1, m0, m2] >>> t2 = p(m1)g(-m1, m2) >>> t2.get_free_indices() [m2] """ return self._index_structure.get_free_indices() def split(self): """ Returns a list of tensors, whose product is ``self`` Dummy indices contracted among different tensor components become free indices with the same name as the one used to represent the dummy indices. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> a, b, c, d = tensor_indices('a,b,c,d', Lorentz) >>> A, B = tensorhead('A,B', [Lorentz]2, [[1]2]) >>> t = A(a,b)B(-b,c) >>> t A(a, L_0)B(-L_0, c) >>> t.split() [A(a, L_0), B(-L_0, c)] """ if self.args == (): return [self] splitp = [] res = 1 for arg in self.args: if isinstance(arg, Tensor): splitp.append(resarg) res = 1 else: res = arg return splitp def _expand(self, hints): # TODO: temporary solution, in the future this should be linked to # `Expr.expand`. args = [_expand(arg, hints) for arg in self.args] args1 = [arg.args if isinstance(arg, (Add, TensAdd)) else (arg,) for arg in args] return TensAdd([ TensMul(i) for i in itertools.product(args1)] ) def __neg__(self): return TensMul(S.NegativeOne, self, is_canon_bp=self._is_canon_bp).doit() def __getitem__(self, item): deprecate_data() return self.data[item] def _get_args_for_traditional_printer(self): args = list(self.args) if (self.coeff < 0) == True: # expressions like "-A(a)" sign = "-" if self.coeff == S.NegativeOne: args = args[1:] else: args[0] = -args[0] else: sign = "" return sign, args def _sort_args_for_sorted_components(self): """ Returns the ``args`` sorted according to the components commutation properties. The sorting is done taking into account the commutation group of the component tensors. """ cv = [arg for arg in self.args if isinstance(arg, TensExpr)] sign = 1 n = len(cv) - 1 for i in range(n): for j in range(n, i, -1): c = cv[j-1].commutes_with(cv[j]) # if `c` is `None`, it does neither commute nor anticommute, skip: if c not in [0, 1]: continue if (cv[j-1].component.types, cv[j-1].component.name) > \ (cv[j].component.types, cv[j].component.name): cv[j-1], cv[j] = cv[j], cv[j-1] # if `c` is 1, the anticommute, so change sign: if c: sign = -sign coeff = sign * self.coeff if coeff != 1: return [coeff] + cv return cv def sorted_components(self): """ Returns a tensor product with sorted components. """ return TensMul(self._sort_args_for_sorted_components()).doit() def perm2tensor(self, g, is_canon_bp=False): """ Returns the tensor corresponding to the permutation ``g`` For further details, see the method in ``TIDS`` with the same name. """ return perm2tensor(self, g, is_canon_bp=is_canon_bp) def canon_bp(self): """ Canonicalize using the Butler-Portugal algorithm for canonicalization under monoterm symmetries. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2 = tensor_indices('m0,m1,m2', Lorentz) >>> A = tensorhead('A', [Lorentz]2, [[2]]) >>> t = A(m0,-m1)A(m1,-m0) >>> t.canon_bp() -A(L_0, L_1)A(-L_0, -L_1) >>> t = A(m0,-m1)A(m1,-m2)A(m2,-m0) >>> t.canon_bp() 0 """ if self._is_canon_bp: return self expr = self.expand() if isinstance(expr, TensAdd): return expr.canon_bp() if not expr.components: return expr t = expr.sorted_components() g, dummies, msym = t._index_structure.indices_canon_args() v = components_canon_args(t.components) can = canonicalize(g, dummies, msym, v) if can == 0: return S.Zero tmul = t.perm2tensor(can, True) return tmul def contract_delta(self, delta): t = self.contract_metric(delta) return t def _get_indices_to_args_pos(self): """ Get a dict mapping the index position to TensMul's argument number. """ pos_map = dict() pos_counter = 0 for arg_i, arg in enumerate(self.args): if not isinstance(arg, TensExpr): continue assert isinstance(arg, Tensor) for i in range(arg.ext_rank): pos_map[pos_counter] = arg_i pos_counter += 1 return pos_map def contract_metric(self, g): """ Raise or lower indices with the metric ``g`` Parameters ========== g : metric Notes ===== see the ``TensorIndexType`` docstring for the contraction conventions Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2 = tensor_indices('m0,m1,m2', Lorentz) >>> g = Lorentz.metric >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> t = p(m0)q(m1)g(-m0, -m1) >>> t.canon_bp() metric(L_0, L_1)p(-L_0)q(-L_1) >>> t.contract_metric(g).canon_bp() p(L_0)q(-L_0) """ expr = self.expand() if self != expr: expr = expr.canon_bp() return expr.contract_metric(g) pos_map = self._get_indices_to_args_pos() args = list(self.args) antisym = g.index_types[0].metric_antisym # list of positions of the metric ``g`` inside ``args`` gpos = [i for i, x in enumerate(self.args) if isinstance(x, Tensor) and x.component == g] if not gpos: return self # Sign is either 1 or -1, to correct the sign after metric contraction # (for spinor indices). sign = 1 dum = self.dum[:] free = self.free[:] elim = set() for gposx in gpos: if gposx in elim: continue free1 = [x for x in free if pos_map[x[1]] == gposx] dum1 = [x for x in dum if pos_map[x[0]] == gposx or pos_map[x[1]] == gposx] if not dum1: continue elim.add(gposx) # subs with the multiplication neutral element, that is, remove it: args[gposx] = 1 if len(dum1) == 2: if not antisym: dum10, dum11 = dum1 if pos_map[dum10[1]] == gposx: # the index with pos p0 contravariant p0 = dum10[0] else: # the index with pos p0 is covariant p0 = dum10[1] if pos_map[dum11[1]] == gposx: # the index with pos p1 is contravariant p1 = dum11[0] else: # the index with pos p1 is covariant p1 = dum11[1] dum.append((p0, p1)) else: dum10, dum11 = dum1 # change the sign to bring the indices of the metric to contravariant # form; change the sign if dum10 has the metric index in position 0 if pos_map[dum10[1]] == gposx: # the index with pos p0 is contravariant p0 = dum10[0] if dum10[1] == 1: sign = -sign else: # the index with pos p0 is covariant p0 = dum10[1] if dum10[0] == 0: sign = -sign if pos_map[dum11[1]] == gposx: # the index with pos p1 is contravariant p1 = dum11[0] sign = -sign else: # the index with pos p1 is covariant p1 = dum11[1] dum.append((p0, p1)) elif len(dum1) == 1: if not antisym: dp0, dp1 = dum1[0] if pos_map[dp0] == pos_map[dp1]: # g(i, -i) typ = g.index_types[0] if typ._dim is None: raise ValueError('dimension not assigned') sign = signtyp._dim else: # g(i0, i1)p(-i1) if pos_map[dp0] == gposx: p1 = dp1 else: p1 = dp0 ind, p = free1[0] free.append((ind, p1)) else: dp0, dp1 = dum1[0] if pos_map[dp0] == pos_map[dp1]: # g(i, -i) typ = g.index_types[0] if typ._dim is None: raise ValueError('dimension not assigned') sign = signtyp._dim if dp0 < dp1: # g(i, -i) = -D with antisymmetric metric sign = -sign else: # g(i0, i1)p(-i1) if pos_map[dp0] == gposx: p1 = dp1 if dp0 == 0: sign = -sign else: p1 = dp0 ind, p = free1[0] free.append((ind, p1)) dum = [x for x in dum if x not in dum1] free = [x for x in free if x not in free1] # shift positions: shift = 0 shifts = [0]len(args) for i in range(len(args)): if i in elim: shift += 2 continue shifts[i] = shift free = [(ind, p - shifts[pos_map[p]]) for (ind, p) in free if pos_map[p] not in elim] dum = [(p0 - shifts[pos_map[p0]], p1 - shifts[pos_map[p1]]) for i, (p0, p1) in enumerate(dum) if pos_map[p0] not in elim and pos_map[p1] not in elim] res = signTensMul(args).doit() if not isinstance(res, TensExpr): return res im = _IndexStructure.from_components_free_dum(res.components, free, dum) return res._set_new_index_structure(im) def _set_new_index_structure(self, im, is_canon_bp=False): indices = im.get_indices() return self._set_indices(indices, is_canon_bp=is_canon_bp) def _set_indices(self, indices, kw_args): if len(indices) != self.ext_rank: raise ValueError("indices length mismatch") args = list(self.args)[:] pos = 0 is_canon_bp = kw_args.pop('is_canon_bp', False) for i, arg in enumerate(args): if not isinstance(arg, TensExpr): continue assert isinstance(arg, Tensor) ext_rank = arg.ext_rank args[i] = arg._set_indices(indices[pos:pos+ext_rank]) pos += ext_rank return TensMul(args, is_canon_bp=is_canon_bp).doit() @staticmethod def _index_replacement_for_contract_metric(args, free, dum): for arg in args: if not isinstance(arg, TensExpr): continue assert isinstance(arg, Tensor) def substitute_indices(self, index_tuples): return substitute_indices(self, index_tuples) def __call__(self, indices): """Returns tensor product with ordered free indices replaced by ``indices`` Examples ======== >>> from sympy import Symbol >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> D = Symbol('D') >>> Lorentz = TensorIndexType('Lorentz', dim=D, dummy_fmt='L') >>> i0,i1,i2,i3,i4 = tensor_indices('i0:5', Lorentz) >>> g = Lorentz.metric >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> t = p(i0)q(i1)q(-i1) >>> t(i1) p(i1)q(L_0)q(-L_0) """ free_args = self.free_args indices = list(indices) if [x.tensor_index_type for x in indices] != [x.tensor_index_type for x in free_args]: raise ValueError('incompatible types') if indices == free_args: return self t = self.fun_eval(list(zip(free_args, indices))) # object is rebuilt in order to make sure that all contracted indices # get recognized as dummies, but only if there are contracted indices. if len(set(i if i.is_up else -i for i in indices)) != len(indices): return t.func(t.args) return t def _extract_data(self, replacement_dict): args_indices, arrays = zip([arg._extract_data(replacement_dict) for arg in self.args if isinstance(arg, TensExpr)]) coeff = reduce(operator.mul, [a for a in self.args if not isinstance(a, TensExpr)], S.One) indices, free, free_names, dummy_data = TensMul._indices_to_free_dum(args_indices) dum = TensMul._dummy_data_to_dum(dummy_data) ext_rank = self.ext_rank free.sort(key=lambda x: x[1]) free_indices = [i[0] for i in free] return free_indices, coeff_TensorDataLazyEvaluator.data_contract_dum(arrays, dum, ext_rank) @property def data(self): deprecate_data() dat = _tensor_data_substitution_dict[self.expand()] return dat @data.setter def data(self, data): deprecate_data() raise ValueError("Not possible to set component data to a tensor expression") @data.deleter def data(self): deprecate_data() raise ValueError("Not possible to delete component data to a tensor expression") def __iter__(self): deprecate_data() if self.data is None: raise ValueError("No iteration on abstract tensors") return self.data.__iter__() def _eval_rewrite_as_Indexed(self, args): from sympy import Sum index_symbols = [i.args[0] for i in self.get_indices()] args = [arg.args[0] if isinstance(arg, Sum) else arg for arg in args] expr = Mul.fromiter(args) return self._check_add_Sum(expr, index_symbols) class TensorElement(TensExpr): """ Tensor with evaluated components. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensorhead >>> from sympy import symbols >>> L = TensorIndexType("L") >>> i, j, k = symbols("i j k") >>> A = tensorhead("A", [L, L], [[1], [1]]) >>> A(i, j).get_free_indices() [i, j] If we want to set component ``i`` to a specific value, use the ``TensorElement`` class: >>> from sympy.tensor.tensor import TensorElement >>> te = TensorElement(A(i, j), {i: 2}) As index ``i`` has been accessed (``{i: 2}`` is the evaluation of its 3rd element), the free indices will only contain ``j``: >>> te.get_free_indices() [j] """ def __new__(cls, expr, index_map): if not isinstance(expr, Tensor): # remap if not isinstance(expr, TensExpr): raise TypeError("%s is not a tensor expression" % expr) return expr.func([TensorElement(arg, index_map) for arg in expr.args]) expr_free_indices = expr.get_free_indices() name_translation = {i.args[0]: i for i in expr_free_indices} index_map = {name_translation.get(index, index): value for index, value in index_map.items()} index_map = {index: value for index, value in index_map.items() if index in expr_free_indices} if len(index_map) == 0: return expr free_indices = [i for i in expr_free_indices if i not in index_map.keys()] index_map = Dict(index_map) obj = TensExpr.__new__(cls, expr, index_map) obj._free_indices = free_indices return obj @property def free(self): return [(index, i) for i, index in enumerate(self.get_free_indices())] @property def dum(self): # TODO: inherit dummies from expr return [] @property def expr(self): return self._args[0] @property def index_map(self): return self._args[1] def get_free_indices(self): return self._free_indices def get_indices(self): return self.get_free_indices() def _extract_data(self, replacement_dict): ret_indices, array = self.expr._extract_data(replacement_dict) index_map = self.index_map slice_tuple = tuple(index_map.get(i, slice(None)) for i in ret_indices) ret_indices = [i for i in ret_indices if i not in index_map] array = array.__getitem__(slice_tuple) return ret_indices, array def canon_bp(p): """ Butler-Portugal canonicalization. See ``tensor_can.py`` from the combinatorics module for the details. """ if isinstance(p, TensExpr): return p.canon_bp() return p def tensor_mul(a): """ product of tensors """ if not a: return TensMul.from_data(S.One, [], [], []) t = a[0] for tx in a[1:]: t = ttx return t def riemann_cyclic_replace(t_r): """ replace Riemann tensor with an equivalent expression ``R(m,n,p,q) -> 2/3R(m,n,p,q) - 1/3R(m,q,n,p) + 1/3R(m,p,n,q)`` """ free = sorted(t_r.free, key=lambda x: x[1]) m, n, p, q = [x[0] for x in free] t0 = S(2)/3t_r t1 = - S(1)/3t_r.substitute_indices((m,m),(n,q),(p,n),(q,p)) t2 = S(1)/3t_r.substitute_indices((m,m),(n,p),(p,n),(q,q)) t3 = t0 + t1 + t2 return t3 def riemann_cyclic(t2): """ replace each Riemann tensor with an equivalent expression satisfying the cyclic identity. This trick is discussed in the reference guide to Cadabra. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead, riemann_cyclic >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i, j, k, l = tensor_indices('i,j,k,l', Lorentz) >>> R = tensorhead('R', [Lorentz]4, [[2, 2]]) >>> t = R(i,j,k,l)(R(-i,-j,-k,-l) - 2R(-i,-k,-j,-l)) >>> riemann_cyclic(t) 0 """ t2 = t2.expand() if isinstance(t2, (TensMul, Tensor)): args = [t2] else: args = t2.args a1 = [x.split() for x in args] a2 = [[riemann_cyclic_replace(tx) for tx in y] for y in a1] a3 = [tensor_mul(v) for v in a2] t3 = TensAdd(a3).doit() if not t3: return t3 else: return canon_bp(t3) def get_lines(ex, index_type): """ returns ``(lines, traces, rest)`` for an index type, where ``lines`` is the list of list of positions of a matrix line, ``traces`` is the list of list of traced matrix lines, ``rest`` is the rest of the elements ot the tensor. """ def _join_lines(a): i = 0 while i < len(a): x = a[i] xend = x[-1] xstart = x[0] hit = True while hit: hit = False for j in range(i + 1, len(a)): if j >= len(a): break if a[j][0] == xend: hit = True x.extend(a[j][1:]) xend = x[-1] a.pop(j) continue if a[j][0] == xstart: hit = True a[i] = reversed(a[j][1:]) + x x = a[i] xstart = a[i][0] a.pop(j) continue if a[j][-1] == xend: hit = True x.extend(reversed(a[j][:-1])) xend = x[-1] a.pop(j) continue if a[j][-1] == xstart: hit = True a[i] = a[j][:-1] + x x = a[i] xstart = x[0] a.pop(j) continue i += 1 return a arguments = ex.args dt = {} for c in ex.args: if not isinstance(c, TensExpr): continue if c in dt: continue index_types = c.index_types a = [] for i in range(len(index_types)): if index_types[i] is index_type: a.append(i) if len(a) > 2: raise ValueError('at most two indices of type %s allowed' % index_type) if len(a) == 2: dt[c] = a #dum = ex.dum lines = [] traces = [] traces1 = [] #indices_to_args_pos = ex._get_indices_to_args_pos() # TODO: add a dum_to_components_map ? for p0, p1, c0, c1 in ex.dum_in_args: if arguments[c0] not in dt: continue if c0 == c1: traces.append([c0]) continue ta0 = dt[arguments[c0]] ta1 = dt[arguments[c1]] if p0 not in ta0: continue if ta0.index(p0) == ta1.index(p1): # case gamma(i,s0,-s1) in c0, gamma(j,-s0,s2) in c1; # to deal with this case one could add to the position # a flag for transposition; # one could write [(c0, False), (c1, True)] raise NotImplementedError # if p0 == ta0[1] then G in pos c0 is mult on the right by G in c1 # if p0 == ta0[0] then G in pos c1 is mult on the right by G in c0 ta0 = dt[arguments[c0]] b0, b1 = (c0, c1) if p0 == ta0[1] else (c1, c0) lines1 = lines[:] for line in lines: if line[-1] == b0: if line[0] == b1: n = line.index(min(line)) traces1.append(line) traces.append(line[n:] + line[:n]) else: line.append(b1) break elif line[0] == b1: line.insert(0, b0) break else: lines1.append([b0, b1]) lines = [x for x in lines1 if x not in traces1] lines = _join_lines(lines) rest = [] for line in lines: for y in line: rest.append(y) for line in traces: for y in line: rest.append(y) rest = [x for x in range(len(arguments)) if x not in rest] return lines, traces, rest def get_free_indices(t): if not isinstance(t, TensExpr): return () return t.get_free_indices() def get_indices(t): if not isinstance(t, TensExpr): return () return t.get_indices() def get_index_structure(t): if isinstance(t, TensExpr): return t._index_structure return _IndexStructure([], [], [], []) def get_coeff(t): if isinstance(t, Tensor): return S.One if isinstance(t, TensMul): return t.coeff if isinstance(t, TensExpr): raise ValueError("no coefficient associated to this tensor expression") return t def contract_metric(t, g): if isinstance(t, TensExpr): return t.contract_metric(g) return t def perm2tensor(t, g, is_canon_bp=False): """ Returns the tensor corresponding to the permutation ``g`` For further details, see the method in ``TIDS`` with the same name. """ if not isinstance(t, TensExpr): return t elif isinstance(t, (Tensor, TensMul)): nim = get_index_structure(t).perm2tensor(g, is_canon_bp=is_canon_bp) res = t._set_new_index_structure(nim, is_canon_bp=is_canon_bp) if g[-1] != len(g) - 1: return -res return res raise NotImplementedError() def substitute_indices(t, index_tuples): """ Return a tensor with free indices substituted according to ``index_tuples`` ``index_types`` list of tuples ``(old_index, new_index)`` Note: this method will neither raise or lower the indices, it will just replace their symbol. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i, j, k, l = tensor_indices('i,j,k,l', Lorentz) >>> A, B = tensorhead('A,B', [Lorentz]2, [[1]2]) >>> t = A(i, k)B(-k, -j); t A(i, L_0)B(-L_0, -j) >>> t.substitute_indices((i,j), (j, k)) A(j, L_0)B(-L_0, -k) """ if not isinstance(t, TensExpr): return t free = t.free free1 = [] for j, ipos in free: for i, v in index_tuples: if i._name == j._name and i.tensor_index_type == j.tensor_index_type: if i._is_up == j._is_up: free1.append((v, ipos)) else: free1.append((-v, ipos)) break else: free1.append((j, ipos)) t = TensMul.from_data(t.coeff, t.components, free1, t.dum) return t def _expand(expr, kwargs): if isinstance(expr, TensExpr): return expr._expand(kwargs) else: return expr.expand(*kwargs)
6f8904be13733681d202b928fc62c6971bd6522fb607014c3b590825608970a2	"""Module with functions operating on IndexedBase, Indexed and Idx objects - Check shape conformance - Determine indices in resulting expression etc. Methods in this module could be implemented by calling methods on Expr objects instead. When things stabilize this could be a useful refactoring. """ from __future__ import print_function, division from sympy.core.compatibility import reduce from sympy.core.function import Function from sympy.functions import exp, Piecewise from sympy.tensor.indexed import Idx, Indexed from sympy.utilities import sift from collections import OrderedDict class IndexConformanceException(Exception): pass def _unique_and_repeated(inds): """ Returns the unique and repeated indices. Also note, from the examples given below that the order of indices is maintained as given in the input. Examples ======== >>> from sympy.tensor.index_methods import _unique_and_repeated >>> _unique_and_repeated([2, 3, 1, 3, 0, 4, 0]) ([2, 1, 4], [3, 0]) """ uniq = OrderedDict() for i in inds: if i in uniq: uniq[i] = 0 else: uniq[i] = 1 return sift(uniq, lambda x: uniq[x], binary=True) def _remove_repeated(inds): """ Removes repeated objects from sequences Returns a set of the unique objects and a tuple of all that have been removed. Examples ======== >>> from sympy.tensor.index_methods import _remove_repeated >>> l1 = [1, 2, 3, 2] >>> _remove_repeated(l1) ({1, 3}, (2,)) """ u, r = _unique_and_repeated(inds) return set(u), tuple(r) def _get_indices_Mul(expr, return_dummies=False): """Determine the outer indices of a Mul object. Examples ======== >>> from sympy.tensor.index_methods import _get_indices_Mul >>> from sympy.tensor.indexed import IndexedBase, Idx >>> i, j, k = map(Idx, ['i', 'j', 'k']) >>> x = IndexedBase('x') >>> y = IndexedBase('y') >>> _get_indices_Mul(x[i, k]y[j, k]) ({i, j}, {}) >>> _get_indices_Mul(x[i, k]y[j, k], return_dummies=True) ({i, j}, {}, (k,)) """ inds = list(map(get_indices, expr.args)) inds, syms = list(zip(inds)) inds = list(map(list, inds)) inds = list(reduce(lambda x, y: x + y, inds)) inds, dummies = _remove_repeated(inds) symmetry = {} for s in syms: for pair in s: if pair in symmetry: symmetry[pair] = s[pair] else: symmetry[pair] = s[pair] if return_dummies: return inds, symmetry, dummies else: return inds, symmetry def _get_indices_Pow(expr): """Determine outer indices of a power or an exponential. A power is considered a universal function, so that the indices of a Pow is just the collection of indices present in the expression. This may be viewed as a bit inconsistent in the special case: x[i]*2 = x[i]x[i] (1) The above expression could have been interpreted as the contraction of x[i] with itself, but we choose instead to interpret it as a function lambda y: y*2 applied to each element of x (a universal function in numpy terms). In order to allow an interpretation of (1) as a contraction, we need contravariant and covariant Idx subclasses. (FIXME: this is not yet implemented) Expressions in the base or exponent are subject to contraction as usual, but an index that is present in the exponent, will not be considered contractable with its own base. Note however, that indices in the same exponent can be contracted with each other. Examples ======== >>> from sympy.tensor.index_methods import _get_indices_Pow >>> from sympy import Pow, exp, IndexedBase, Idx >>> A = IndexedBase('A') >>> x = IndexedBase('x') >>> i, j, k = map(Idx, ['i', 'j', 'k']) >>> _get_indices_Pow(exp(A[i, j]x[j])) ({i}, {}) >>> _get_indices_Pow(Pow(x[i], x[i])) ({i}, {}) >>> _get_indices_Pow(Pow(A[i, j]x[j], x[i])) ({i}, {}) """ base, exp = expr.as_base_exp() binds, bsyms = get_indices(base) einds, esyms = get_indices(exp) inds = binds \| einds # FIXME: symmetries from power needs to check special cases, else nothing symmetries = {} return inds, symmetries def _get_indices_Add(expr): """Determine outer indices of an Add object. In a sum, each term must have the same set of outer indices. A valid expression could be x(i)y(j) - x(j)y(i) But we do not allow expressions like: x(i)y(j) - z(j)z(j) FIXME: Add support for Numpy broadcasting Examples ======== >>> from sympy.tensor.index_methods import _get_indices_Add >>> from sympy.tensor.indexed import IndexedBase, Idx >>> i, j, k = map(Idx, ['i', 'j', 'k']) >>> x = IndexedBase('x') >>> y = IndexedBase('y') >>> _get_indices_Add(x[i] + x[k]y[i, k]) ({i}, {}) """ inds = list(map(get_indices, expr.args)) inds, syms = list(zip(inds)) # allow broadcast of scalars non_scalars = [x for x in inds if x != set()] if not non_scalars: return set(), {} if not all([x == non_scalars[0] for x in non_scalars[1:]]): raise IndexConformanceException("Indices are not consistent: %s" % expr) if not reduce(lambda x, y: x != y or y, syms): symmetries = syms[0] else: # FIXME: search for symmetries symmetries = {} return non_scalars[0], symmetries def get_indices(expr): """Determine the outer indices of expression ``expr`` By outer* we mean indices that are not summation indices. Returns a set and a dict. The set contains outer indices and the dict contains information about index symmetries. Examples ======== >>> from sympy.tensor.index_methods import get_indices >>> from sympy import symbols >>> from sympy.tensor import IndexedBase, Idx >>> x, y, A = map(IndexedBase, ['x', 'y', 'A']) >>> i, j, a, z = symbols('i j a z', integer=True) The indices of the total expression is determined, Repeated indices imply a summation, for instance the trace of a matrix A: >>> get_indices(A[i, i]) (set(), {}) In the case of many terms, the terms are required to have identical outer indices. Else an IndexConformanceException is raised. >>> get_indices(x[i] + A[i, j]y[j]) ({i}, {}) :Exceptions: An IndexConformanceException means that the terms ar not compatible, e.g. >>> get_indices(x[i] + y[j]) #doctest: +SKIP (...) IndexConformanceException: Indices are not consistent: x(i) + y(j) .. warning:: The concept of outer* indices applies recursively, starting on the deepest level. This implies that dummies inside parenthesis are assumed to be summed first, so that the following expression is handled gracefully: >>> get_indices((x[i] + A[i, j]y[j])x[j]) ({i, j}, {}) This is correct and may appear convenient, but you need to be careful with this as SymPy will happily .expand() the product, if requested. The resulting expression would mix the outer ``j`` with the dummies inside the parenthesis, which makes it a different expression. To be on the safe side, it is best to avoid such ambiguities by using unique indices for all contractions that should be held separate. """ # We call ourself recursively to determine indices of sub expressions. # break recursion if isinstance(expr, Indexed): c = expr.indices inds, dummies = _remove_repeated(c) return inds, {} elif expr is None: return set(), {} elif isinstance(expr, Idx): return {expr}, {} elif expr.is_Atom: return set(), {} # recurse via specialized functions else: if expr.is_Mul: return _get_indices_Mul(expr) elif expr.is_Add: return _get_indices_Add(expr) elif expr.is_Pow or isinstance(expr, exp): return _get_indices_Pow(expr) elif isinstance(expr, Piecewise): # FIXME: No support for Piecewise yet return set(), {} elif isinstance(expr, Function): # Support ufunc like behaviour by returning indices from arguments. # Functions do not interpret repeated indices across argumnts # as summation ind0 = set() for arg in expr.args: ind, sym = get_indices(arg) ind0 \|= ind return ind0, sym # this test is expensive, so it should be at the end elif not expr.has(Indexed): return set(), {} raise NotImplementedError( "FIXME: No specialized handling of type %s" % type(expr)) def get_contraction_structure(expr): """Determine dummy indices of ``expr`` and describe its structure By dummy we mean indices that are summation indices. The structure of the expression is determined and described as follows: 1) A conforming summation of Indexed objects is described with a dict where the keys are summation indices and the corresponding values are sets containing all terms for which the summation applies. All Add objects in the SymPy expression tree are described like this. 2) For all nodes in the SymPy expression tree that are not of type Add, the following applies: If a node discovers contractions in one of its arguments, the node itself will be stored as a key in the dict. For that key, the corresponding value is a list of dicts, each of which is the result of a recursive call to get_contraction_structure(). The list contains only dicts for the non-trivial deeper contractions, omitting dicts with None as the one and only key. .. Note:: The presence of expressions among the dictionary keys indicates multiple levels of index contractions. A nested dict displays nested contractions and may itself contain dicts from a deeper level. In practical calculations the summation in the deepest nested level must be calculated first so that the outer expression can access the resulting indexed object. Examples ======== >>> from sympy.tensor.index_methods import get_contraction_structure >>> from sympy import symbols, default_sort_key >>> from sympy.tensor import IndexedBase, Idx >>> x, y, A = map(IndexedBase, ['x', 'y', 'A']) >>> i, j, k, l = map(Idx, ['i', 'j', 'k', 'l']) >>> get_contraction_structure(x[i]y[i] + A[j, j]) {(i,): {x[i]y[i]}, (j,): {A[j, j]}} >>> get_contraction_structure(x[i]y[j]) {None: {x[i]y[j]}} A multiplication of contracted factors results in nested dicts representing the internal contractions. >>> d = get_contraction_structure(x[i, i]y[j, j]) >>> sorted(d.keys(), key=default_sort_key) [None, x[i, i]y[j, j]] In this case, the product has no contractions: >>> d[None] {x[i, i]y[j, j]} Factors are contracted "first": >>> sorted(d[x[i, i]y[j, j]], key=default_sort_key) [{(i,): {x[i, i]}}, {(j,): {y[j, j]}}] A parenthesized Add object is also returned as a nested dictionary. The term containing the parenthesis is a Mul with a contraction among the arguments, so it will be found as a key in the result. It stores the dictionary resulting from a recursive call on the Add expression. >>> d = get_contraction_structure(x[i](y[i] + A[i, j]x[j])) >>> sorted(d.keys(), key=default_sort_key) [(A[i, j]x[j] + y[i])x[i], (i,)] >>> d[(i,)] {(A[i, j]x[j] + y[i])x[i]} >>> d[x[i](A[i, j]x[j] + y[i])] [{None: {y[i]}, (j,): {A[i, j]x[j]}}] Powers with contractions in either base or exponent will also be found as keys in the dictionary, mapping to a list of results from recursive calls: >>> d = get_contraction_structure(A[j, j]A[i, i]) >>> d[None] {A[j, j]A[i, i]} >>> nested_contractions = d[A[j, j]*A[i, i]] >>> nested_contractions[0] {(j,): {A[j, j]}} >>> nested_contractions[1] {(i,): {A[i, i]}} The description of the contraction structure may appear complicated when represented with a string in the above examples, but it is easy to iterate over: >>> from sympy import Expr >>> for key in d: ... if isinstance(key, Expr): ... continue ... for term in d[key]: ... if term in d: ... # treat deepest contraction first ... pass ... # treat outermost contactions here """ # We call ourself recursively to inspect sub expressions. if isinstance(expr, Indexed): junk, key = _remove_repeated(expr.indices) return {key or None: {expr}} elif expr.is_Atom: return {None: {expr}} elif expr.is_Mul: junk, junk, key = _get_indices_Mul(expr, return_dummies=True) result = {key or None: {expr}} # recurse on every factor nested = [] for fac in expr.args: facd = get_contraction_structure(fac) if not (None in facd and len(facd) == 1): nested.append(facd) if nested: result[expr] = nested return result elif expr.is_Pow or isinstance(expr, exp): # recurse in base and exp separately. If either has internal # contractions we must include ourselves as a key in the returned dict b, e = expr.as_base_exp() dbase = get_contraction_structure(b) dexp = get_contraction_structure(e) dicts = [] for d in dbase, dexp: if not (None in d and len(d) == 1): dicts.append(d) result = {None: {expr}} if dicts: result[expr] = dicts return result elif expr.is_Add: # Note: we just collect all terms with identical summation indices, We # do nothing to identify equivalent terms here, as this would require # substitutions or pattern matching in expressions of unknown # complexity. result = {} for term in expr.args: # recurse on every term d = get_contraction_structure(term) for key in d: if key in result: result[key] \|= d[key] else: result[key] = d[key] return result elif isinstance(expr, Piecewise): # FIXME: No support for Piecewise yet return {None: expr} elif isinstance(expr, Function): # Collect non-trivial contraction structures in each argument # We do not report repeated indices in separate arguments as a # contraction deeplist = [] for arg in expr.args: deep = get_contraction_structure(arg) if not (None in deep and len(deep) == 1): deeplist.append(deep) d = {None: {expr}} if deeplist: d[expr] = deeplist return d # this test is expensive, so it should be at the end elif not expr.has(Indexed): return {None: {expr}} raise NotImplementedError( "FIXME: No specialized handling of type %s" % type(expr))
c904cf01cd9997961b7965d27e4c8be0fac160999d5bc4a5a951a0dc5650fa22	""" Boolean algebra module for SymPy """ from __future__ import print_function, division from collections import defaultdict from itertools import combinations, product from sympy.core.add import Add from sympy.core.basic import Basic from sympy.core.cache import cacheit from sympy.core.compatibility import (ordered, range, with_metaclass, as_int) from sympy.core.function import Application, Derivative, count_ops from sympy.core.numbers import Number from sympy.core.operations import LatticeOp from sympy.core.singleton import Singleton, S from sympy.core.sympify import converter, _sympify, sympify from sympy.utilities.iterables import sift, ibin from sympy.utilities.misc import filldedent def as_Boolean(e): """Like bool, return the Boolean value of an expression, e, which can be any instance of Boolean or bool. Examples ======== >>> from sympy import true, false, nan >>> from sympy.logic.boolalg import as_Boolean >>> from sympy.abc import x >>> as_Boolean(1) is true True >>> as_Boolean(x) x >>> as_Boolean(2) Traceback (most recent call last): ... TypeError: expecting bool or Boolean, not `2`. """ from sympy.core.symbol import Symbol if e == True: return S.true if e == False: return S.false if isinstance(e, Symbol): z = e.is_zero if z is None: return e return S.false if z else S.true if isinstance(e, Boolean): return e raise TypeError('expecting bool or Boolean, not `%s`.' % e) class Boolean(Basic): """A boolean object is an object for which logic operations make sense.""" __slots__ = [] def __and__(self, other): """Overloading for & operator""" return And(self, other) __rand__ = __and__ def __or__(self, other): """Overloading for \|""" return Or(self, other) __ror__ = __or__ def __invert__(self): """Overloading for ~""" return Not(self) def __rshift__(self, other): """Overloading for >>""" return Implies(self, other) def __lshift__(self, other): """Overloading for <<""" return Implies(other, self) __rrshift__ = __lshift__ __rlshift__ = __rshift__ def __xor__(self, other): return Xor(self, other) __rxor__ = __xor__ def equals(self, other): """ Returns True if the given formulas have the same truth table. For two formulas to be equal they must have the same literals. Examples ======== >>> from sympy.abc import A, B, C >>> from sympy.logic.boolalg import And, Or, Not >>> (A >> B).equals(~B >> ~A) True >>> Not(And(A, B, C)).equals(And(Not(A), Not(B), Not(C))) False >>> Not(And(A, Not(A))).equals(Or(B, Not(B))) False """ from sympy.logic.inference import satisfiable from sympy.core.relational import Relational if self.has(Relational) or other.has(Relational): raise NotImplementedError('handling of relationals') return self.atoms() == other.atoms() and \ not satisfiable(Not(Equivalent(self, other))) def to_nnf(self, simplify=True): # override where necessary return self def as_set(self): """ Rewrites Boolean expression in terms of real sets. Examples ======== >>> from sympy import Symbol, Eq, Or, And >>> x = Symbol('x', real=True) >>> Eq(x, 0).as_set() {0} >>> (x > 0).as_set() Interval.open(0, oo) >>> And(-2 < x, x < 2).as_set() Interval.open(-2, 2) >>> Or(x < -2, 2 < x).as_set() Union(Interval.open(-oo, -2), Interval.open(2, oo)) """ from sympy.calculus.util import periodicity from sympy.core.relational import Relational free = self.free_symbols if len(free) == 1: x = free.pop() reps = {} for r in self.atoms(Relational): if periodicity(r, x) not in (0, None): s = r._eval_as_set() if s in (S.EmptySet, S.UniversalSet, S.Reals): reps[r] = s.as_relational(x) continue raise NotImplementedError(filldedent(''' as_set is not implemented for relationals with periodic solutions ''')) return self.subs(reps)._eval_as_set() else: raise NotImplementedError("Sorry, as_set has not yet been" " implemented for multivariate" " expressions") @property def binary_symbols(self): from sympy.core.relational import Eq, Ne return set().union([i.binary_symbols for i in self.args if i.is_Boolean or i.is_Symbol or isinstance(i, (Eq, Ne))]) class BooleanAtom(Boolean): """ Base class of BooleanTrue and BooleanFalse. """ is_Boolean = True is_Atom = True _op_priority = 11 # higher than Expr def simplify(self, a, *kw): return self def expand(self, a, *kw): return self @property def canonical(self): return self def _noop(self, other=None): raise TypeError('BooleanAtom not allowed in this context.') __add__ = _noop __radd__ = _noop __sub__ = _noop __rsub__ = _noop __mul__ = _noop __rmul__ = _noop __pow__ = _noop __rpow__ = _noop __rdiv__ = _noop __truediv__ = _noop __div__ = _noop __rtruediv__ = _noop __mod__ = _noop __rmod__ = _noop _eval_power = _noop # /// drop when Py2 is no longer supported def __lt__(self, other): from sympy.utilities.misc import filldedent raise TypeError(filldedent(''' A Boolean argument can only be used in Eq and Ne; all other relationals expect real expressions. ''')) __le__ = __lt__ __gt__ = __lt__ __ge__ = __lt__ # \\\ class BooleanTrue(with_metaclass(Singleton, BooleanAtom)): """ SymPy version of True, a singleton that can be accessed via S.true. This is the SymPy version of True, for use in the logic module. The primary advantage of using true instead of True is that shorthand boolean operations like ~ and >> will work as expected on this class, whereas with True they act bitwise on 1. Functions in the logic module will return this class when they evaluate to true. Notes ===== There is liable to be some confusion as to when ``True`` should be used and when ``S.true`` should be used in various contexts throughout SymPy. An important thing to remember is that ``sympify(True)`` returns ``S.true``. This means that for the most part, you can just use ``True`` and it will automatically be converted to ``S.true`` when necessary, similar to how you can generally use 1 instead of ``S.One``. The rule of thumb is: "If the boolean in question can be replaced by an arbitrary symbolic ``Boolean``, like ``Or(x, y)`` or ``x > 1``, use ``S.true``. Otherwise, use ``True``" In other words, use ``S.true`` only on those contexts where the boolean is being used as a symbolic representation of truth. For example, if the object ends up in the ``.args`` of any expression, then it must necessarily be ``S.true`` instead of ``True``, as elements of ``.args`` must be ``Basic``. On the other hand, ``==`` is not a symbolic operation in SymPy, since it always returns ``True`` or ``False``, and does so in terms of structural equality rather than mathematical, so it should return ``True``. The assumptions system should use ``True`` and ``False``. Aside from not satisfying the above rule of thumb, the assumptions system uses a three-valued logic (``True``, ``False``, ``None``), whereas ``S.true`` and ``S.false`` represent a two-valued logic. When in doubt, use ``True``. "``S.true == True is True``." While "``S.true is True``" is ``False``, "``S.true == True``" is ``True``, so if there is any doubt over whether a function or expression will return ``S.true`` or ``True``, just use ``==`` instead of ``is`` to do the comparison, and it will work in either case. Finally, for boolean flags, it's better to just use ``if x`` instead of ``if x is True``. To quote PEP 8: Don't compare boolean values to ``True`` or ``False`` using ``==``. Yes: ``if greeting:`` * No: ``if greeting == True:`` * Worse: ``if greeting is True:`` Examples ======== >>> from sympy import sympify, true, false, Or >>> sympify(True) True >>> _ is True, _ is true (False, True) >>> Or(true, false) True >>> _ is true True Python operators give a boolean result for true but a bitwise result for True >>> ~true, ~True (False, -2) >>> true >> true, True >> True (True, 0) Python operators give a boolean result for true but a bitwise result for True >>> ~true, ~True (False, -2) >>> true >> true, True >> True (True, 0) See Also ======== sympy.logic.boolalg.BooleanFalse """ def __nonzero__(self): return True __bool__ = __nonzero__ def __hash__(self): return hash(True) @property def negated(self): return S.false def as_set(self): """ Rewrite logic operators and relationals in terms of real sets. Examples ======== >>> from sympy import true >>> true.as_set() UniversalSet """ return S.UniversalSet class BooleanFalse(with_metaclass(Singleton, BooleanAtom)): """ SymPy version of False, a singleton that can be accessed via S.false. This is the SymPy version of False, for use in the logic module. The primary advantage of using false instead of False is that shorthand boolean operations like ~ and >> will work as expected on this class, whereas with False they act bitwise on 0. Functions in the logic module will return this class when they evaluate to false. Notes ====== See note in :py:class`sympy.logic.boolalg.BooleanTrue` Examples ======== >>> from sympy import sympify, true, false, Or >>> sympify(False) False >>> _ is False, _ is false (False, True) >>> Or(true, false) True >>> _ is true True Python operators give a boolean result for false but a bitwise result for False >>> ~false, ~False (True, -1) >>> false >> false, False >> False (True, 0) See Also ======== sympy.logic.boolalg.BooleanTrue """ def __nonzero__(self): return False __bool__ = __nonzero__ def __hash__(self): return hash(False) @property def negated(self): return S.true def as_set(self): """ Rewrite logic operators and relationals in terms of real sets. Examples ======== >>> from sympy import false >>> false.as_set() EmptySet() """ return S.EmptySet true = BooleanTrue() false = BooleanFalse() # We want S.true and S.false to work, rather than S.BooleanTrue and # S.BooleanFalse, but making the class and instance names the same causes some # major issues (like the inability to import the class directly from this # file). S.true = true S.false = false converter[bool] = lambda x: S.true if x else S.false class BooleanFunction(Application, Boolean): """Boolean function is a function that lives in a boolean space It is used as base class for And, Or, Not, etc. """ is_Boolean = True def _eval_simplify(self, *kwargs): rv = self.func([ a._eval_simplify(kwargs) for a in self.args]) return simplify_logic(rv) def simplify(self, kwargs): from sympy.simplify.simplify import simplify return simplify(self, *kwargs) # /// drop when Py2 is no longer supported def __lt__(self, other): from sympy.utilities.misc import filldedent raise TypeError(filldedent(''' A Boolean argument can only be used in Eq and Ne; all other relationals expect real expressions. ''')) __le__ = __lt__ __ge__ = __lt__ __gt__ = __lt__ # \\\ @classmethod def binary_check_and_simplify(self, args): from sympy.core.relational import Relational, Eq, Ne args = [as_Boolean(i) for i in args] bin = set().union([i.binary_symbols for i in args]) rel = set().union([i.atoms(Relational) for i in args]) reps = {} for x in bin: for r in rel: if x in bin and x in r.free_symbols: if isinstance(r, (Eq, Ne)): if not ( S.true in r.args or S.false in r.args): reps[r] = S.false else: raise TypeError(filldedent(''' Incompatible use of binary symbol `%s` as a real variable in `%s` ''' % (x, r))) return [i.subs(reps) for i in args] def to_nnf(self, simplify=True): return self._to_nnf(self.args, simplify=simplify) @classmethod def _to_nnf(cls, args, *kwargs): simplify = kwargs.get('simplify', True) argset = set([]) for arg in args: if not is_literal(arg): arg = arg.to_nnf(simplify) if simplify: if isinstance(arg, cls): arg = arg.args else: arg = (arg,) for a in arg: if Not(a) in argset: return cls.zero argset.add(a) else: argset.add(arg) return cls(argset) # the diff method below is copied from Expr class def diff(self, symbols, assumptions): assumptions.setdefault("evaluate", True) return Derivative(self, symbols, *assumptions) def _eval_derivative(self, x): from sympy.core.relational import Eq from sympy.functions.elementary.piecewise import Piecewise if x in self.binary_symbols: return Piecewise( (0, Eq(self.subs(x, 0), self.subs(x, 1))), (1, True)) elif x in self.free_symbols: # not implemented, see https://www.encyclopediaofmath.org/ # index.php/Boolean_differential_calculus pass else: return S.Zero def _apply_patternbased_simplification(self, rv, patterns, measure, dominatingvalue, replacementvalue=None): """ Replace patterns of Relational Parameters ========== rv : Expr Boolean expression patterns : tuple Tuple of tuples, with (pattern to simplify, simplified pattern) measure : function Simplification measure dominatingvalue : boolean or None The dominating value for the function of consideration. For example, for And S.false is dominating. As soon as one expression is S.false in And, the whole expression is S.false. replacementvalue : boolean or None, optional The resulting value for the whole expression if one argument evaluates to dominatingvalue. For example, for Nand S.false is dominating, but in this case the resulting value is S.true. Default is None. If replacementvalue is None and dominatingvalue is not None, replacementvalue = dominatingvalue """ from sympy.core.relational import Relational, _canonical if replacementvalue is None and dominatingvalue is not None: replacementvalue = dominatingvalue # Use replacement patterns for Relationals changed = True Rel, nonRel = sift(rv.args, lambda i: isinstance(i, Relational), binary=True) if len(Rel) <= 1: return rv Rel, nonRealRel = sift(rv.args, lambda i: all(s.is_real is not False for s in i.free_symbols), binary=True) Rel = [i.canonical for i in Rel] while changed and len(Rel) >= 2: changed = False # Sort based on ordered Rel = list(ordered(Rel)) # Create a list of possible replacements results = [] # Try all combinations for ((i, pi), (j, pj)) in combinations(enumerate(Rel), 2): for k, (pattern, simp) in enumerate(patterns): res = [] # use SymPy matching oldexpr = rv.func(pi, pj) tmpres = oldexpr.match(pattern) if tmpres: res.append((tmpres, oldexpr)) # Try reversing first relational # This and the rest should not be required with a better # canonical oldexpr = rv.func(pi.reversed, pj) tmpres = oldexpr.match(pattern) if tmpres: res.append((tmpres, oldexpr)) # Try reversing second relational oldexpr = rv.func(pi, pj.reversed) tmpres = oldexpr.match(pattern) if tmpres: res.append((tmpres, oldexpr)) # Try reversing both relationals oldexpr = rv.func(pi.reversed, pj.reversed) tmpres = oldexpr.match(pattern) if tmpres: res.append((tmpres, oldexpr)) if res: for tmpres, oldexpr in res: # we have a matching, compute replacement np = simp.subs(tmpres) if np == dominatingvalue: # if dominatingvalue, the whole expression # will be replacementvalue return replacementvalue # add replacement if not isinstance(np, ITE): # We only want to use ITE replacements if # they simplify to a relational costsaving = measure(oldexpr) - measure(np) if costsaving > 0: results.append((costsaving, (i, j, np))) if results: # Sort results based on complexity results = list(reversed(sorted(results, key=lambda pair: pair[0]))) # Replace the one providing most simplification cost, replacement = results[0] i, j, newrel = replacement # Remove the old relationals del Rel[j] del Rel[i] if dominatingvalue is None or newrel != ~dominatingvalue: # Insert the new one (no need to insert a value that will # not affect the result) Rel.append(newrel) # We did change something so try again changed = True rv = rv.func(([_canonical(i) for i in ordered(Rel)] + nonRel + nonRealRel)) return rv class And(LatticeOp, BooleanFunction): """ Logical AND function. It evaluates its arguments in order, giving False immediately if any of them are False, and True if they are all True. Examples ======== >>> from sympy.core import symbols >>> from sympy.abc import x, y >>> from sympy.logic.boolalg import And >>> x & y x & y Notes ===== The ``&`` operator is provided as a convenience, but note that its use here is different from its normal use in Python, which is bitwise and. Hence, ``And(a, b)`` and ``a & b`` will return different things if ``a`` and ``b`` are integers. >>> And(x, y).subs(x, 1) y """ zero = false identity = true nargs = None @classmethod def _new_args_filter(cls, args): newargs = [] rel = [] args = BooleanFunction.binary_check_and_simplify(args) for x in reversed(args): if x.is_Relational: c = x.canonical if c in rel: continue nc = c.negated.canonical if any(r == nc for r in rel): return [S.false] rel.append(c) newargs.append(x) return LatticeOp._new_args_filter(newargs, And) def _eval_simplify(self, kwargs): from sympy.core.relational import Equality, Relational from sympy.solvers.solveset import linear_coeffs # standard simplify rv = super(And, self)._eval_simplify(kwargs) if not isinstance(rv, And): return rv # simplify args that are equalities involving # symbols so x == 0 & x == y -> x==0 & y == 0 Rel, nonRel = sift(rv.args, lambda i: isinstance(i, Relational), binary=True) if not Rel: return rv eqs, other = sift(Rel, lambda i: isinstance(i, Equality), binary=True) if not eqs: return rv measure, ratio = kwargs['measure'], kwargs['ratio'] reps = {} sifted = {} if eqs: # group by length of free symbols sifted = sift(ordered([ (i.free_symbols, i) for i in eqs]), lambda x: len(x[0])) eqs = [] while 1 in sifted: for free, e in sifted.pop(1): x = free.pop() if e.lhs != x or x in e.rhs.free_symbols: try: m, b = linear_coeffs( e.rewrite(Add, evaluate=False), x) enew = e.func(x, -b/m) if measure(enew) <= ratiomeasure(e): e = enew else: eqs.append(e) continue except ValueError: pass if x in reps: eqs.append(e.func(e.rhs, reps[x])) else: reps[x] = e.rhs eqs.append(e) resifted = defaultdict(list) for k in sifted: for f, e in sifted[k]: e = e.subs(reps) f = e.free_symbols resifted[len(f)].append((f, e)) sifted = resifted for k in sifted: eqs.extend([e for f, e in sifted[k]]) other = [ei.subs(reps) for ei in other] rv = rv.func(([i.canonical for i in (eqs + other)] + nonRel)) patterns = simplify_patterns_and() return self._apply_patternbased_simplification(rv, patterns, measure, False) def _eval_as_set(self): from sympy.sets.sets import Intersection return Intersection([arg.as_set() for arg in self.args]) def _eval_rewrite_as_Nor(self, args, kwargs): return Nor([Not(arg) for arg in self.args]) class Or(LatticeOp, BooleanFunction): """ Logical OR function It evaluates its arguments in order, giving True immediately if any of them are True, and False if they are all False. Examples ======== >>> from sympy.core import symbols >>> from sympy.abc import x, y >>> from sympy.logic.boolalg import Or >>> x \| y x \| y Notes ===== The ``\|`` operator is provided as a convenience, but note that its use here is different from its normal use in Python, which is bitwise or. Hence, ``Or(a, b)`` and ``a \| b`` will return different things if ``a`` and ``b`` are integers. >>> Or(x, y).subs(x, 0) y """ zero = true identity = false @classmethod def _new_args_filter(cls, args): newargs = [] rel = [] args = BooleanFunction.binary_check_and_simplify(args) for x in args: if x.is_Relational: c = x.canonical if c in rel: continue nc = c.negated.canonical if any(r == nc for r in rel): return [S.true] rel.append(c) newargs.append(x) return LatticeOp._new_args_filter(newargs, Or) def _eval_as_set(self): from sympy.sets.sets import Union return Union([arg.as_set() for arg in self.args]) def _eval_rewrite_as_Nand(self, args, kwargs): return Nand([Not(arg) for arg in self.args]) def _eval_simplify(self, kwargs): # standard simplify rv = super(Or, self)._eval_simplify(kwargs) if not isinstance(rv, Or): return rv patterns = simplify_patterns_or() return self._apply_patternbased_simplification(rv, patterns, kwargs['measure'], S.true) class Not(BooleanFunction): """ Logical Not function (negation) Returns True if the statement is False Returns False if the statement is True Examples ======== >>> from sympy.logic.boolalg import Not, And, Or >>> from sympy.abc import x, A, B >>> Not(True) False >>> Not(False) True >>> Not(And(True, False)) True >>> Not(Or(True, False)) False >>> Not(And(And(True, x), Or(x, False))) ~x >>> ~x ~x >>> Not(And(Or(A, B), Or(~A, ~B))) ~((A \| B) & (~A \| ~B)) Notes ===== - The ``~`` operator is provided as a convenience, but note that its use here is different from its normal use in Python, which is bitwise not. In particular, ``~a`` and ``Not(a)`` will be different if ``a`` is an integer. Furthermore, since bools in Python subclass from ``int``, ``~True`` is the same as ``~1`` which is ``-2``, which has a boolean value of True. To avoid this issue, use the SymPy boolean types ``true`` and ``false``. >>> from sympy import true >>> ~True -2 >>> ~true False """ is_Not = True @classmethod def eval(cls, arg): from sympy import ( Equality, GreaterThan, LessThan, StrictGreaterThan, StrictLessThan, Unequality) if isinstance(arg, Number) or arg in (True, False): return false if arg else true if arg.is_Not: return arg.args[0] # Simplify Relational objects. if isinstance(arg, Equality): return Unequality(arg.args) if isinstance(arg, Unequality): return Equality(arg.args) if isinstance(arg, StrictLessThan): return GreaterThan(arg.args) if isinstance(arg, StrictGreaterThan): return LessThan(arg.args) if isinstance(arg, LessThan): return StrictGreaterThan(arg.args) if isinstance(arg, GreaterThan): return StrictLessThan(arg.args) def _eval_as_set(self): """ Rewrite logic operators and relationals in terms of real sets. Examples ======== >>> from sympy import Not, Symbol >>> x = Symbol('x') >>> Not(x > 0).as_set() Interval(-oo, 0) """ return self.args[0].as_set().complement(S.Reals) def to_nnf(self, simplify=True): if is_literal(self): return self expr = self.args[0] func, args = expr.func, expr.args if func == And: return Or._to_nnf([~arg for arg in args], simplify=simplify) if func == Or: return And._to_nnf([~arg for arg in args], simplify=simplify) if func == Implies: a, b = args return And._to_nnf(a, ~b, simplify=simplify) if func == Equivalent: return And._to_nnf(Or(args), Or([~arg for arg in args]), simplify=simplify) if func == Xor: result = [] for i in range(1, len(args)+1, 2): for neg in combinations(args, i): clause = [~s if s in neg else s for s in args] result.append(Or(clause)) return And._to_nnf(result, simplify=simplify) if func == ITE: a, b, c = args return And._to_nnf(Or(a, ~c), Or(~a, ~b), simplify=simplify) raise ValueError("Illegal operator %s in expression" % func) class Xor(BooleanFunction): """ Logical XOR (exclusive OR) function. Returns True if an odd number of the arguments are True and the rest are False. Returns False if an even number of the arguments are True and the rest are False. Examples ======== >>> from sympy.logic.boolalg import Xor >>> from sympy import symbols >>> x, y = symbols('x y') >>> Xor(True, False) True >>> Xor(True, True) False >>> Xor(True, False, True, True, False) True >>> Xor(True, False, True, False) False >>> x ^ y Xor(x, y) Notes ===== The ``^`` operator is provided as a convenience, but note that its use here is different from its normal use in Python, which is bitwise xor. In particular, ``a ^ b`` and ``Xor(a, b)`` will be different if ``a`` and ``b`` are integers. >>> Xor(x, y).subs(y, 0) x """ def __new__(cls, args, kwargs): argset = set([]) obj = super(Xor, cls).__new__(cls, args, *kwargs) for arg in obj._args: if isinstance(arg, Number) or arg in (True, False): if arg: arg = true else: continue if isinstance(arg, Xor): for a in arg.args: argset.remove(a) if a in argset else argset.add(a) elif arg in argset: argset.remove(arg) else: argset.add(arg) rel = [(r, r.canonical, r.negated.canonical) for r in argset if r.is_Relational] odd = False # is number of complimentary pairs odd? start 0 -> False remove = [] for i, (r, c, nc) in enumerate(rel): for j in range(i + 1, len(rel)): rj, cj = rel[j][:2] if cj == nc: odd = ~odd break elif cj == c: break else: continue remove.append((r, rj)) if odd: argset.remove(true) if true in argset else argset.add(true) for a, b in remove: argset.remove(a) argset.remove(b) if len(argset) == 0: return false elif len(argset) == 1: return argset.pop() elif True in argset: argset.remove(True) return Not(Xor(argset)) else: obj._args = tuple(ordered(argset)) obj._argset = frozenset(argset) return obj @property @cacheit def args(self): return tuple(ordered(self._argset)) def to_nnf(self, simplify=True): args = [] for i in range(0, len(self.args)+1, 2): for neg in combinations(self.args, i): clause = [~s if s in neg else s for s in self.args] args.append(Or(clause)) return And._to_nnf(args, simplify=simplify) def _eval_rewrite_as_Or(self, args, kwargs): a = self.args return Or([_convert_to_varsSOP(x, self.args) for x in _get_odd_parity_terms(len(a))]) def _eval_rewrite_as_And(self, args, kwargs): a = self.args return And([_convert_to_varsPOS(x, self.args) for x in _get_even_parity_terms(len(a))]) def _eval_simplify(self, *kwargs): # as standard simplify uses simplify_logic which writes things as # And and Or, we only simplify the partial expressions before using # patterns rv = self.func([a._eval_simplify(*kwargs) for a in self.args]) if not isinstance(rv, Xor): # This shouldn't really happen here return rv patterns = simplify_patterns_xor() return self._apply_patternbased_simplification(rv, patterns, kwargs['measure'], None) class Nand(BooleanFunction): """ Logical NAND function. It evaluates its arguments in order, giving True immediately if any of them are False, and False if they are all True. Returns True if any of the arguments are False Returns False if all arguments are True Examples ======== >>> from sympy.logic.boolalg import Nand >>> from sympy import symbols >>> x, y = symbols('x y') >>> Nand(False, True) True >>> Nand(True, True) False >>> Nand(x, y) ~(x & y) """ @classmethod def eval(cls, args): return Not(And(args)) class Nor(BooleanFunction): """ Logical NOR function. It evaluates its arguments in order, giving False immediately if any of them are True, and True if they are all False. Returns False if any argument is True Returns True if all arguments are False Examples ======== >>> from sympy.logic.boolalg import Nor >>> from sympy import symbols >>> x, y = symbols('x y') >>> Nor(True, False) False >>> Nor(True, True) False >>> Nor(False, True) False >>> Nor(False, False) True >>> Nor(x, y) ~(x \| y) """ @classmethod def eval(cls, args): return Not(Or(args)) class Xnor(BooleanFunction): """ Logical XNOR function. Returns False if an odd number of the arguments are True and the rest are False. Returns True if an even number of the arguments are True and the rest are False. Examples ======== >>> from sympy.logic.boolalg import Xnor >>> from sympy import symbols >>> x, y = symbols('x y') >>> Xnor(True, False) False >>> Xnor(True, True) True >>> Xnor(True, False, True, True, False) False >>> Xnor(True, False, True, False) True """ @classmethod def eval(cls, args): return Not(Xor(args)) class Implies(BooleanFunction): """ Logical implication. A implies B is equivalent to !A v B Accepts two Boolean arguments; A and B. Returns False if A is True and B is False Returns True otherwise. Examples ======== >>> from sympy.logic.boolalg import Implies >>> from sympy import symbols >>> x, y = symbols('x y') >>> Implies(True, False) False >>> Implies(False, False) True >>> Implies(True, True) True >>> Implies(False, True) True >>> x >> y Implies(x, y) >>> y << x Implies(x, y) Notes ===== The ``>>`` and ``<<`` operators are provided as a convenience, but note that their use here is different from their normal use in Python, which is bit shifts. Hence, ``Implies(a, b)`` and ``a >> b`` will return different things if ``a`` and ``b`` are integers. In particular, since Python considers ``True`` and ``False`` to be integers, ``True >> True`` will be the same as ``1 >> 1``, i.e., 0, which has a truth value of False. To avoid this issue, use the SymPy objects ``true`` and ``false``. >>> from sympy import true, false >>> True >> False 1 >>> true >> false False """ @classmethod def eval(cls, args): try: newargs = [] for x in args: if isinstance(x, Number) or x in (0, 1): newargs.append(True if x else False) else: newargs.append(x) A, B = newargs except ValueError: raise ValueError( "%d operand(s) used for an Implies " "(pairs are required): %s" % (len(args), str(args))) if A == True or A == False or B == True or B == False: return Or(Not(A), B) elif A == B: return S.true elif A.is_Relational and B.is_Relational: if A.canonical == B.canonical: return S.true if A.negated.canonical == B.canonical: return B else: return Basic.__new__(cls, args) def to_nnf(self, simplify=True): a, b = self.args return Or._to_nnf(~a, b, simplify=simplify) class Equivalent(BooleanFunction): """ Equivalence relation. Equivalent(A, B) is True iff A and B are both True or both False Returns True if all of the arguments are logically equivalent. Returns False otherwise. Examples ======== >>> from sympy.logic.boolalg import Equivalent, And >>> from sympy.abc import x, y >>> Equivalent(False, False, False) True >>> Equivalent(True, False, False) False >>> Equivalent(x, And(x, True)) True """ def __new__(cls, args, *options): from sympy.core.relational import Relational args = [_sympify(arg) for arg in args] argset = set(args) for x in args: if isinstance(x, Number) or x in [True, False]: # Includes 0, 1 argset.discard(x) argset.add(True if x else False) rel = [] for r in argset: if isinstance(r, Relational): rel.append((r, r.canonical, r.negated.canonical)) remove = [] for i, (r, c, nc) in enumerate(rel): for j in range(i + 1, len(rel)): rj, cj = rel[j][:2] if cj == nc: return false elif cj == c: remove.append((r, rj)) break for a, b in remove: argset.remove(a) argset.remove(b) argset.add(True) if len(argset) <= 1: return true if True in argset: argset.discard(True) return And(argset) if False in argset: argset.discard(False) return And([~arg for arg in argset]) _args = frozenset(argset) obj = super(Equivalent, cls).__new__(cls, _args) obj._argset = _args return obj @property @cacheit def args(self): return tuple(ordered(self._argset)) def to_nnf(self, simplify=True): args = [] for a, b in zip(self.args, self.args[1:]): args.append(Or(~a, b)) args.append(Or(~self.args[-1], self.args[0])) return And._to_nnf(args, simplify=simplify) class ITE(BooleanFunction): """ If then else clause. ITE(A, B, C) evaluates and returns the result of B if A is true else it returns the result of C. All args must be Booleans. Examples ======== >>> from sympy.logic.boolalg import ITE, And, Xor, Or >>> from sympy.abc import x, y, z >>> ITE(True, False, True) False >>> ITE(Or(True, False), And(True, True), Xor(True, True)) True >>> ITE(x, y, z) ITE(x, y, z) >>> ITE(True, x, y) x >>> ITE(False, x, y) y >>> ITE(x, y, y) y Trying to use non-Boolean args will generate a TypeError: >>> ITE(True, [], ()) Traceback (most recent call last): ... TypeError: expecting bool, Boolean or ITE, not `[]` """ def __new__(cls, args, kwargs): from sympy.core.relational import Eq, Ne if len(args) != 3: raise ValueError('expecting exactly 3 args') a, b, c = args # check use of binary symbols if isinstance(a, (Eq, Ne)): # in this context, we can evaluate the Eq/Ne # if one arg is a binary symbol and the other # is true/false b, c = map(as_Boolean, (b, c)) bin = set().union([i.binary_symbols for i in (b, c)]) if len(set(a.args) - bin) == 1: # one arg is a binary_symbols _a = a if a.lhs is S.true: a = a.rhs elif a.rhs is S.true: a = a.lhs elif a.lhs is S.false: a = ~a.rhs elif a.rhs is S.false: a = ~a.lhs else: # binary can only equal True or False a = S.false if isinstance(_a, Ne): a = ~a else: a, b, c = BooleanFunction.binary_check_and_simplify( a, b, c) rv = None if kwargs.get('evaluate', True): rv = cls.eval(a, b, c) if rv is None: rv = BooleanFunction.__new__(cls, a, b, c, evaluate=False) return rv @classmethod def eval(cls, args): from sympy.core.relational import Eq, Ne # do the args give a singular result? a, b, c = args if isinstance(a, (Ne, Eq)): _a = a if S.true in a.args: a = a.lhs if a.rhs is S.true else a.rhs elif S.false in a.args: a = ~a.lhs if a.rhs is S.false else ~a.rhs else: _a = None if _a is not None and isinstance(_a, Ne): a = ~a if a is S.true: return b if a is S.false: return c if b == c: return b else: # or maybe the results allow the answer to be expressed # in terms of the condition if b is S.true and c is S.false: return a if b is S.false and c is S.true: return Not(a) if [a, b, c] != args: return cls(a, b, c, evaluate=False) def to_nnf(self, simplify=True): a, b, c = self.args return And._to_nnf(Or(~a, b), Or(a, c), simplify=simplify) def _eval_as_set(self): return self.to_nnf().as_set() def _eval_rewrite_as_Piecewise(self, args, *kwargs): from sympy.functions import Piecewise return Piecewise((args[1], args[0]), (args[2], True)) # end class definitions. Some useful methods def conjuncts(expr): """Return a list of the conjuncts in the expr s. Examples ======== >>> from sympy.logic.boolalg import conjuncts >>> from sympy.abc import A, B >>> conjuncts(A & B) frozenset({A, B}) >>> conjuncts(A \| B) frozenset({A \| B}) """ return And.make_args(expr) def disjuncts(expr): """Return a list of the disjuncts in the sentence s. Examples ======== >>> from sympy.logic.boolalg import disjuncts >>> from sympy.abc import A, B >>> disjuncts(A \| B) frozenset({A, B}) >>> disjuncts(A & B) frozenset({A & B}) """ return Or.make_args(expr) def distribute_and_over_or(expr): """ Given a sentence s consisting of conjunctions and disjunctions of literals, return an equivalent sentence in CNF. Examples ======== >>> from sympy.logic.boolalg import distribute_and_over_or, And, Or, Not >>> from sympy.abc import A, B, C >>> distribute_and_over_or(Or(A, And(Not(B), Not(C)))) (A \| ~B) & (A \| ~C) """ return _distribute((expr, And, Or)) def distribute_or_over_and(expr): """ Given a sentence s consisting of conjunctions and disjunctions of literals, return an equivalent sentence in DNF. Note that the output is NOT simplified. Examples ======== >>> from sympy.logic.boolalg import distribute_or_over_and, And, Or, Not >>> from sympy.abc import A, B, C >>> distribute_or_over_and(And(Or(Not(A), B), C)) (B & C) \| (C & ~A) """ return _distribute((expr, Or, And)) def _distribute(info): """ Distributes info[1] over info[2] with respect to info[0]. """ if isinstance(info[0], info[2]): for arg in info[0].args: if isinstance(arg, info[1]): conj = arg break else: return info[0] rest = info[2]([a for a in info[0].args if a is not conj]) return info[1](list(map(_distribute, [(info[2](c, rest), info[1], info[2]) for c in conj.args]))) elif isinstance(info[0], info[1]): return info[1](list(map(_distribute, [(x, info[1], info[2]) for x in info[0].args]))) else: return info[0] def to_nnf(expr, simplify=True): """ Converts expr to Negation Normal Form. A logical expression is in Negation Normal Form (NNF) if it contains only And, Or and Not, and Not is applied only to literals. If simplify is True, the result contains no redundant clauses. Examples ======== >>> from sympy.abc import A, B, C, D >>> from sympy.logic.boolalg import Not, Equivalent, to_nnf >>> to_nnf(Not((~A & ~B) \| (C & D))) (A \| B) & (~C \| ~D) >>> to_nnf(Equivalent(A >> B, B >> A)) (A \| ~B \| (A & ~B)) & (B \| ~A \| (B & ~A)) """ if is_nnf(expr, simplify): return expr return expr.to_nnf(simplify) def to_cnf(expr, simplify=False): """ Convert a propositional logical sentence s to conjunctive normal form. That is, of the form ((A \| ~B \| ...) & (B \| C \| ...) & ...) If simplify is True, the expr is evaluated to its simplest CNF form using the Quine-McCluskey algorithm. Examples ======== >>> from sympy.logic.boolalg import to_cnf >>> from sympy.abc import A, B, D >>> to_cnf(~(A \| B) \| D) (D \| ~A) & (D \| ~B) >>> to_cnf((A \| B) & (A \| ~A), True) A \| B """ expr = sympify(expr) if not isinstance(expr, BooleanFunction): return expr if simplify: return simplify_logic(expr, 'cnf', True) # Don't convert unless we have to if is_cnf(expr): return expr expr = eliminate_implications(expr) return distribute_and_over_or(expr) def to_dnf(expr, simplify=False): """ Convert a propositional logical sentence s to disjunctive normal form. That is, of the form ((A & ~B & ...) \| (B & C & ...) \| ...) If simplify is True, the expr is evaluated to its simplest DNF form using the Quine-McCluskey algorithm. Examples ======== >>> from sympy.logic.boolalg import to_dnf >>> from sympy.abc import A, B, C >>> to_dnf(B & (A \| C)) (A & B) \| (B & C) >>> to_dnf((A & B) \| (A & ~B) \| (B & C) \| (~B & C), True) A \| C """ expr = sympify(expr) if not isinstance(expr, BooleanFunction): return expr if simplify: return simplify_logic(expr, 'dnf', True) # Don't convert unless we have to if is_dnf(expr): return expr expr = eliminate_implications(expr) return distribute_or_over_and(expr) def is_nnf(expr, simplified=True): """ Checks if expr is in Negation Normal Form. A logical expression is in Negation Normal Form (NNF) if it contains only And, Or and Not, and Not is applied only to literals. If simplified is True, checks if result contains no redundant clauses. Examples ======== >>> from sympy.abc import A, B, C >>> from sympy.logic.boolalg import Not, is_nnf >>> is_nnf(A & B \| ~C) True >>> is_nnf((A \| ~A) & (B \| C)) False >>> is_nnf((A \| ~A) & (B \| C), False) True >>> is_nnf(Not(A & B) \| C) False >>> is_nnf((A >> B) & (B >> A)) False """ expr = sympify(expr) if is_literal(expr): return True stack = [expr] while stack: expr = stack.pop() if expr.func in (And, Or): if simplified: args = expr.args for arg in args: if Not(arg) in args: return False stack.extend(expr.args) elif not is_literal(expr): return False return True def is_cnf(expr): """ Test whether or not an expression is in conjunctive normal form. Examples ======== >>> from sympy.logic.boolalg import is_cnf >>> from sympy.abc import A, B, C >>> is_cnf(A \| B \| C) True >>> is_cnf(A & B & C) True >>> is_cnf((A & B) \| C) False """ return _is_form(expr, And, Or) def is_dnf(expr): """ Test whether or not an expression is in disjunctive normal form. Examples ======== >>> from sympy.logic.boolalg import is_dnf >>> from sympy.abc import A, B, C >>> is_dnf(A \| B \| C) True >>> is_dnf(A & B & C) True >>> is_dnf((A & B) \| C) True >>> is_dnf(A & (B \| C)) False """ return _is_form(expr, Or, And) def _is_form(expr, function1, function2): """ Test whether or not an expression is of the required form. """ expr = sympify(expr) # Special case of an Atom if expr.is_Atom: return True # Special case of a single expression of function2 if isinstance(expr, function2): for lit in expr.args: if isinstance(lit, Not): if not lit.args[0].is_Atom: return False else: if not lit.is_Atom: return False return True # Special case of a single negation if isinstance(expr, Not): if not expr.args[0].is_Atom: return False if not isinstance(expr, function1): return False for cls in expr.args: if cls.is_Atom: continue if isinstance(cls, Not): if not cls.args[0].is_Atom: return False elif not isinstance(cls, function2): return False for lit in cls.args: if isinstance(lit, Not): if not lit.args[0].is_Atom: return False else: if not lit.is_Atom: return False return True def eliminate_implications(expr): """ Change >>, <<, and Equivalent into &, \|, and ~. That is, return an expression that is equivalent to s, but has only &, \|, and ~ as logical operators. Examples ======== >>> from sympy.logic.boolalg import Implies, Equivalent, \ eliminate_implications >>> from sympy.abc import A, B, C >>> eliminate_implications(Implies(A, B)) B \| ~A >>> eliminate_implications(Equivalent(A, B)) (A \| ~B) & (B \| ~A) >>> eliminate_implications(Equivalent(A, B, C)) (A \| ~C) & (B \| ~A) & (C \| ~B) """ return to_nnf(expr, simplify=False) def is_literal(expr): """ Returns True if expr is a literal, else False. Examples ======== >>> from sympy import Or, Q >>> from sympy.abc import A, B >>> from sympy.logic.boolalg import is_literal >>> is_literal(A) True >>> is_literal(~A) True >>> is_literal(Q.zero(A)) True >>> is_literal(A + B) True >>> is_literal(Or(A, B)) False """ if isinstance(expr, Not): return not isinstance(expr.args[0], BooleanFunction) else: return not isinstance(expr, BooleanFunction) def to_int_repr(clauses, symbols): """ Takes clauses in CNF format and puts them into an integer representation. Examples ======== >>> from sympy.logic.boolalg import to_int_repr >>> from sympy.abc import x, y >>> to_int_repr([x \| y, y], [x, y]) == [{1, 2}, {2}] True """ # Convert the symbol list into a dict symbols = dict(list(zip(symbols, list(range(1, len(symbols) + 1))))) def append_symbol(arg, symbols): if isinstance(arg, Not): return -symbols[arg.args[0]] else: return symbols[arg] return [set(append_symbol(arg, symbols) for arg in Or.make_args(c)) for c in clauses] def term_to_integer(term): """ Return an integer corresponding to the base-2 digits given by ``term``. Parameters ========== term : a string or list of ones and zeros Examples ======== >>> from sympy.logic.boolalg import term_to_integer >>> term_to_integer([1, 0, 0]) 4 >>> term_to_integer('100') 4 """ return int(''.join(list(map(str, list(term)))), 2) def integer_to_term(k, n_bits=None): """ Return a list of the base-2 digits in the integer, ``k``. Parameters ========== k : int n_bits : int If ``n_bits`` is given and the number of digits in the binary representation of ``k`` is smaller than ``n_bits`` then left-pad the list with 0s. Examples ======== >>> from sympy.logic.boolalg import integer_to_term >>> integer_to_term(4) [1, 0, 0] >>> integer_to_term(4, 6) [0, 0, 0, 1, 0, 0] """ s = '{0:0{1}b}'.format(abs(as_int(k)), as_int(abs(n_bits or 0))) return list(map(int, s)) def truth_table(expr, variables, input=True): """ Return a generator of all possible configurations of the input variables, and the result of the boolean expression for those values. Parameters ========== expr : string or boolean expression variables : list of variables input : boolean (default True) indicates whether to return the input combinations. Examples ======== >>> from sympy.logic.boolalg import truth_table >>> from sympy.abc import x,y >>> table = truth_table(x >> y, [x, y]) >>> for t in table: ... print('{0} -> {1}'.format(t)) [0, 0] -> True [0, 1] -> True [1, 0] -> False [1, 1] -> True >>> table = truth_table(x \| y, [x, y]) >>> list(table) [([0, 0], False), ([0, 1], True), ([1, 0], True), ([1, 1], True)] If input is false, truth_table returns only a list of truth values. In this case, the corresponding input values of variables can be deduced from the index of a given output. >>> from sympy.logic.boolalg import integer_to_term >>> vars = [y, x] >>> values = truth_table(x >> y, vars, input=False) >>> values = list(values) >>> values [True, False, True, True] >>> for i, value in enumerate(values): ... print('{0} -> {1}'.format(list(zip( ... vars, integer_to_term(i, len(vars)))), value)) [(y, 0), (x, 0)] -> True [(y, 0), (x, 1)] -> False [(y, 1), (x, 0)] -> True [(y, 1), (x, 1)] -> True """ variables = [sympify(v) for v in variables] expr = sympify(expr) if not isinstance(expr, BooleanFunction) and not is_literal(expr): return table = product([0, 1], repeat=len(variables)) for term in table: term = list(term) value = expr.xreplace(dict(zip(variables, term))) if input: yield term, value else: yield value def _check_pair(minterm1, minterm2): """ Checks if a pair of minterms differs by only one bit. If yes, returns index, else returns -1. """ index = -1 for x, (i, j) in enumerate(zip(minterm1, minterm2)): if i != j: if index == -1: index = x else: return -1 return index def _convert_to_varsSOP(minterm, variables): """ Converts a term in the expansion of a function from binary to its variable form (for SOP). """ temp = [] for i, m in enumerate(minterm): if m == 0: temp.append(Not(variables[i])) elif m == 1: temp.append(variables[i]) else: pass # ignore the 3s return And(temp) def _convert_to_varsPOS(maxterm, variables): """ Converts a term in the expansion of a function from binary to its variable form (for POS). """ temp = [] for i, m in enumerate(maxterm): if m == 1: temp.append(Not(variables[i])) elif m == 0: temp.append(variables[i]) else: pass # ignore the 3s return Or(temp) def _get_odd_parity_terms(n): """ Returns a list of lists, with all possible combinations of n zeros and ones with an odd number of ones. """ op = [] for i in range(1, 2n): e = ibin(i, n) if sum(e) % 2 == 1: op.append(e) return op def _get_even_parity_terms(n): """ Returns a list of lists, with all possible combinations of n zeros and ones with an even number of ones. """ op = [] for i in range(2n): e = ibin(i, n) if sum(e) % 2 == 0: op.append(e) return op def _simplified_pairs(terms): """ Reduces a set of minterms, if possible, to a simplified set of minterms with one less variable in the terms using QM method. """ simplified_terms = [] todo = list(range(len(terms))) for i, ti in enumerate(terms[:-1]): for j_i, tj in enumerate(terms[(i + 1):]): index = _check_pair(ti, tj) if index != -1: todo[i] = todo[j_i + i + 1] = None newterm = ti[:] newterm[index] = 3 if newterm not in simplified_terms: simplified_terms.append(newterm) simplified_terms.extend( [terms[i] for i in [_ for _ in todo if _ is not None]]) return simplified_terms def _compare_term(minterm, term): """ Return True if a binary term is satisfied by the given term. Used for recognizing prime implicants. """ for i, x in enumerate(term): if x != 3 and x != minterm[i]: return False return True def _rem_redundancy(l1, terms): """ After the truth table has been sufficiently simplified, use the prime implicant table method to recognize and eliminate redundant pairs, and return the essential arguments. """ if len(terms): # Create dominating matrix dommatrix = [[0]len(l1) for n in range(len(terms))] for primei, prime in enumerate(l1): for termi, term in enumerate(terms): if _compare_term(term, prime): dommatrix[termi][primei] = 1 # Non-dominated prime implicants, dominated set to None ndprimeimplicants = list(range(len(l1))) # Non-dominated terms, dominated set to None ndterms = list(range(len(terms))) # Mark dominated rows and columns oldndterms = None oldndprimeimplicants = None while ndterms != oldndterms or \ ndprimeimplicants != oldndprimeimplicants: oldndterms = ndterms[:] oldndprimeimplicants = ndprimeimplicants[:] for rowi, row in enumerate(dommatrix): if ndterms[rowi] is not None: row = [row[i] for i in [_ for _ in ndprimeimplicants if _ is not None]] for row2i, row2 in enumerate(dommatrix): if rowi != row2i and ndterms[row2i] is not None: row2 = [row2[i] for i in [_ for _ in ndprimeimplicants if _ is not None]] if all(a >= b for (a, b) in zip(row2, row)): # row2 dominating row, keep row ndterms[row2i] = None for coli in range(len(l1)): if ndprimeimplicants[coli] is not None: col = [dommatrix[a][coli] for a in range(len(terms))] col = [col[i] for i in [_ for _ in oldndterms if _ is not None]] for col2i in range(len(l1)): if coli != col2i and \ ndprimeimplicants[col2i] is not None: col2 = [dommatrix[a][col2i] for a in range(len(terms))] col2 = [col2[i] for i in [_ for _ in oldndterms if _ is not None]] if all(a >= b for (a, b) in zip(col, col2)): # col dominating col2, keep col ndprimeimplicants[col2i] = None l1 = [l1[i] for i in [_ for _ in ndprimeimplicants if _ is not None]] return l1 else: return [] def _input_to_binlist(inputlist, variables): binlist = [] bits = len(variables) for val in inputlist: if isinstance(val, int): binlist.append(ibin(val, bits)) elif isinstance(val, dict): nonspecvars = list(variables) for key in val.keys(): nonspecvars.remove(key) for t in product([0, 1], repeat=len(nonspecvars)): d = dict(zip(nonspecvars, t)) d.update(val) binlist.append([d[v] for v in variables]) elif isinstance(val, (list, tuple)): if len(val) != bits: raise ValueError("Each term must contain {} bits as there are" "\n{} variables (or be an integer)." "".format(bits, bits)) binlist.append(list(val)) else: raise TypeError("A term list can only contain lists," " ints or dicts.") return binlist def SOPform(variables, minterms, dontcares=None): """ The SOPform function uses simplified_pairs and a redundant group- eliminating algorithm to convert the list of all input combos that generate '1' (the minterms) into the smallest Sum of Products form. The variables must be given as the first argument. Return a logical Or function (i.e., the "sum of products" or "SOP" form) that gives the desired outcome. If there are inputs that can be ignored, pass them as a list, too. The result will be one of the (perhaps many) functions that satisfy the conditions. Examples ======== >>> from sympy.logic import SOPform >>> from sympy import symbols >>> w, x, y, z = symbols('w x y z') >>> minterms = [[0, 0, 0, 1], [0, 0, 1, 1], ... [0, 1, 1, 1], [1, 0, 1, 1], [1, 1, 1, 1]] >>> dontcares = [[0, 0, 0, 0], [0, 0, 1, 0], [0, 1, 0, 1]] >>> SOPform([w, x, y, z], minterms, dontcares) (y & z) \| (z & ~w) The terms can also be represented as integers: >>> minterms = [1, 3, 7, 11, 15] >>> dontcares = [0, 2, 5] >>> SOPform([w, x, y, z], minterms, dontcares) (y & z) \| (z & ~w) They can also be specified using dicts, which does not have to be fully specified: >>> minterms = [{w: 0, x: 1}, {y: 1, z: 1, x: 0}] >>> SOPform([w, x, y, z], minterms) (x & ~w) \| (y & z & ~x) Or a combination: >>> minterms = [4, 7, 11, [1, 1, 1, 1]] >>> dontcares = [{w : 0, x : 0, y: 0}, 5] >>> SOPform([w, x, y, z], minterms, dontcares) (w & y & z) \| (x & y & z) \| (~w & ~y) References ========== .. [1] https://en.wikipedia.org/wiki/Quine-McCluskey_algorithm """ variables = [sympify(v) for v in variables] if minterms == []: return false minterms = _input_to_binlist(minterms, variables) dontcares = _input_to_binlist((dontcares or []), variables) for d in dontcares: if d in minterms: raise ValueError('%s in minterms is also in dontcares' % d) old = None new = minterms + dontcares while new != old: old = new new = _simplified_pairs(old) essential = _rem_redundancy(new, minterms) return Or([_convert_to_varsSOP(x, variables) for x in essential]) def POSform(variables, minterms, dontcares=None): """ The POSform function uses simplified_pairs and a redundant-group eliminating algorithm to convert the list of all input combinations that generate '1' (the minterms) into the smallest Product of Sums form. The variables must be given as the first argument. Return a logical And function (i.e., the "product of sums" or "POS" form) that gives the desired outcome. If there are inputs that can be ignored, pass them as a list, too. The result will be one of the (perhaps many) functions that satisfy the conditions. Examples ======== >>> from sympy.logic import POSform >>> from sympy import symbols >>> w, x, y, z = symbols('w x y z') >>> minterms = [[0, 0, 0, 1], [0, 0, 1, 1], [0, 1, 1, 1], ... [1, 0, 1, 1], [1, 1, 1, 1]] >>> dontcares = [[0, 0, 0, 0], [0, 0, 1, 0], [0, 1, 0, 1]] >>> POSform([w, x, y, z], minterms, dontcares) z & (y \| ~w) The terms can also be represented as integers: >>> minterms = [1, 3, 7, 11, 15] >>> dontcares = [0, 2, 5] >>> POSform([w, x, y, z], minterms, dontcares) z & (y \| ~w) They can also be specified using dicts, which does not have to be fully specified: >>> minterms = [{w: 0, x: 1}, {y: 1, z: 1, x: 0}] >>> POSform([w, x, y, z], minterms) (x \| y) & (x \| z) & (~w \| ~x) Or a combination: >>> minterms = [4, 7, 11, [1, 1, 1, 1]] >>> dontcares = [{w : 0, x : 0, y: 0}, 5] >>> POSform([w, x, y, z], minterms, dontcares) (w \| x) & (y \| ~w) & (z \| ~y) References ========== .. [1] https://en.wikipedia.org/wiki/Quine-McCluskey_algorithm """ variables = [sympify(v) for v in variables] if minterms == []: return false minterms = _input_to_binlist(minterms, variables) dontcares = _input_to_binlist((dontcares or []), variables) for d in dontcares: if d in minterms: raise ValueError('%s in minterms is also in dontcares' % d) maxterms = [] for t in product([0, 1], repeat=len(variables)): t = list(t) if (t not in minterms) and (t not in dontcares): maxterms.append(t) old = None new = maxterms + dontcares while new != old: old = new new = _simplified_pairs(old) essential = _rem_redundancy(new, maxterms) return And([_convert_to_varsPOS(x, variables) for x in essential]) def _find_predicates(expr): """Helper to find logical predicates in BooleanFunctions. A logical predicate is defined here as anything within a BooleanFunction that is not a BooleanFunction itself. """ if not isinstance(expr, BooleanFunction): return {expr} return set().union((_find_predicates(i) for i in expr.args)) def simplify_logic(expr, form=None, deep=True, force=False): """ This function simplifies a boolean function to its simplified version in SOP or POS form. The return type is an Or or And object in SymPy. Parameters ========== expr : string or boolean expression form : string ('cnf' or 'dnf') or None (default). If 'cnf' or 'dnf', the simplest expression in the corresponding normal form is returned; if None, the answer is returned according to the form with fewest args (in CNF by default). deep : boolean (default True) Indicates whether to recursively simplify any non-boolean functions contained within the input. force : boolean (default False) As the simplifications require exponential time in the number of variables, there is by default a limit on expressions with 8 variables. When the expression has more than 8 variables only symbolical simplification (controlled by ``deep``) is made. By setting force to ``True``, this limit is removed. Be aware that this can lead to very long simplification times. Examples ======== >>> from sympy.logic import simplify_logic >>> from sympy.abc import x, y, z >>> from sympy import S >>> b = (~x & ~y & ~z) \| ( ~x & ~y & z) >>> simplify_logic(b) ~x & ~y >>> S(b) (z & ~x & ~y) \| (~x & ~y & ~z) >>> simplify_logic(_) ~x & ~y """ if form not in (None, 'cnf', 'dnf'): raise ValueError("form can be cnf or dnf only") expr = sympify(expr) if deep: variables = _find_predicates(expr) from sympy.simplify.simplify import simplify s = [simplify(v) for v in variables] expr = expr.xreplace(dict(zip(variables, s))) if not isinstance(expr, BooleanFunction): return expr # get variables in case not deep or after doing # deep simplification since they may have changed variables = _find_predicates(expr) if not force and len(variables) > 8: return expr # group into constants and variable values c, v = sift(variables, lambda x: x in (True, False), binary=True) variables = c + v truthtable = [] # standardize constants to be 1 or 0 in keeping with truthtable c = [1 if i == True else 0 for i in c] for t in product([0, 1], repeat=len(v)): if expr.xreplace(dict(zip(v, t))) == True: truthtable.append(c + list(t)) big = len(truthtable) >= (2 * (len(variables) - 1)) if form == 'dnf' or form is None and big: return SOPform(variables, truthtable) return POSform(variables, truthtable) def _finger(eq): """ Assign a 5-item fingerprint to each symbol in the equation: [ # of times it appeared as a Symbol; # of times it appeared as a Not(symbol); # of times it appeared as a Symbol in an And or Or; # of times it appeared as a Not(Symbol) in an And or Or; a sorted tuple of tuples, (i, j, k), where i is the number of arguments in an And or Or with which it appeared as a Symbol, and j is the number of arguments that were Not(Symbol); k is the number of times that (i, j) was seen. ] Examples ======== >>> from sympy.logic.boolalg import _finger as finger >>> from sympy import And, Or, Not, Xor, to_cnf, symbols >>> from sympy.abc import a, b, x, y >>> eq = Or(And(Not(y), a), And(Not(y), b), And(x, y)) >>> dict(finger(eq)) {(0, 0, 1, 0, ((2, 0, 1),)): [x], (0, 0, 1, 0, ((2, 1, 1),)): [a, b], (0, 0, 1, 2, ((2, 0, 1),)): [y]} >>> dict(finger(x & ~y)) {(0, 1, 0, 0, ()): [y], (1, 0, 0, 0, ()): [x]} In the following, the (5, 2, 6) means that there were 6 Or functions in which a symbol appeared as itself amongst 5 arguments in which there were also 2 negated symbols, e.g. ``(a0 \| a1 \| a2 \| ~a3 \| ~a4)`` is counted once for a0, a1 and a2. >>> dict(finger(to_cnf(Xor(symbols('a:5'))))) {(0, 0, 8, 8, ((5, 0, 1), (5, 2, 6), (5, 4, 1))): [a0, a1, a2, a3, a4]} The equation must not have more than one level of nesting: >>> dict(finger(And(Or(x, y), y))) {(0, 0, 1, 0, ((2, 0, 1),)): [x], (1, 0, 1, 0, ((2, 0, 1),)): [y]} >>> dict(finger(And(Or(x, And(a, x)), y))) Traceback (most recent call last): ... NotImplementedError: unexpected level of nesting So y and x have unique fingerprints, but a and b do not. """ f = eq.free_symbols d = dict(list(zip(f, [[0]4 + [defaultdict(int)] for fi in f]))) for a in eq.args: if a.is_Symbol: d[a][0] += 1 elif a.is_Not: d[a.args[0]][1] += 1 else: o = len(a.args), sum(isinstance(ai, Not) for ai in a.args) for ai in a.args: if ai.is_Symbol: d[ai][2] += 1 d[ai][-1][o] += 1 elif ai.is_Not: d[ai.args[0]][3] += 1 else: raise NotImplementedError('unexpected level of nesting') inv = defaultdict(list) for k, v in ordered(iter(d.items())): v[-1] = tuple(sorted([i + (j,) for i, j in v[-1].items()])) inv[tuple(v)].append(k) return inv def bool_map(bool1, bool2): """ Return the simplified version of bool1, and the mapping of variables that makes the two expressions bool1 and bool2 represent the same logical behaviour for some correspondence between the variables of each. If more than one mappings of this sort exist, one of them is returned. For example, And(x, y) is logically equivalent to And(a, b) for the mapping {x: a, y:b} or {x: b, y:a}. If no such mapping exists, return False. Examples ======== >>> from sympy import SOPform, bool_map, Or, And, Not, Xor >>> from sympy.abc import w, x, y, z, a, b, c, d >>> function1 = SOPform([x, z, y],[[1, 0, 1], [0, 0, 1]]) >>> function2 = SOPform([a, b, c],[[1, 0, 1], [1, 0, 0]]) >>> bool_map(function1, function2) (y & ~z, {y: a, z: b}) The results are not necessarily unique, but they are canonical. Here, ``(w, z)`` could be ``(a, d)`` or ``(d, a)``: >>> eq = Or(And(Not(y), w), And(Not(y), z), And(x, y)) >>> eq2 = Or(And(Not(c), a), And(Not(c), d), And(b, c)) >>> bool_map(eq, eq2) ((x & y) \| (w & ~y) \| (z & ~y), {w: a, x: b, y: c, z: d}) >>> eq = And(Xor(a, b), c, And(c,d)) >>> bool_map(eq, eq.subs(c, x)) (c & d & (a \| b) & (~a \| ~b), {a: a, b: b, c: d, d: x}) """ def match(function1, function2): """Return the mapping that equates variables between two simplified boolean expressions if possible. By "simplified" we mean that a function has been denested and is either an And (or an Or) whose arguments are either symbols (x), negated symbols (Not(x)), or Or (or an And) whose arguments are only symbols or negated symbols. For example, And(x, Not(y), Or(w, Not(z))). Basic.match is not robust enough (see issue 4835) so this is a workaround that is valid for simplified boolean expressions """ # do some quick checks if function1.__class__ != function2.__class__: return None # maybe simplification makes them the same? if len(function1.args) != len(function2.args): return None # maybe simplification makes them the same? if function1.is_Symbol: return {function1: function2} # get the fingerprint dictionaries f1 = _finger(function1) f2 = _finger(function2) # more quick checks if len(f1) != len(f2): return False # assemble the match dictionary if possible matchdict = {} for k in f1.keys(): if k not in f2: return False if len(f1[k]) != len(f2[k]): return False for i, x in enumerate(f1[k]): matchdict[x] = f2[k][i] return matchdict a = simplify_logic(bool1) b = simplify_logic(bool2) m = match(a, b) if m: return a, m return m def simplify_patterns_and(): from sympy.functions.elementary.miscellaneous import Min, Max from sympy.core import Wild from sympy.core.relational import Eq, Ne, Ge, Gt, Le, Lt a = Wild('a') b = Wild('b') c = Wild('c') # With a better canonical fewer results are required _matchers_and = ((And(Eq(a, b), Ge(a, b)), Eq(a, b)), (And(Eq(a, b), Gt(a, b)), S.false), (And(Eq(a, b), Le(a, b)), Eq(a, b)), (And(Eq(a, b), Lt(a, b)), S.false), (And(Ge(a, b), Gt(a, b)), Gt(a, b)), (And(Ge(a, b), Le(a, b)), Eq(a, b)), (And(Ge(a, b), Lt(a, b)), S.false), (And(Ge(a, b), Ne(a, b)), Gt(a, b)), (And(Gt(a, b), Le(a, b)), S.false), (And(Gt(a, b), Lt(a, b)), S.false), (And(Gt(a, b), Ne(a, b)), Gt(a, b)), (And(Le(a, b), Lt(a, b)), Lt(a, b)), (And(Le(a, b), Ne(a, b)), Lt(a, b)), (And(Lt(a, b), Ne(a, b)), Lt(a, b)), # Min/max (And(Ge(a, b), Ge(a, c)), Ge(a, Max(b, c))), (And(Ge(a, b), Gt(a, c)), ITE(b > c, Ge(a, b), Gt(a, c))), (And(Gt(a, b), Gt(a, c)), Gt(a, Max(b, c))), (And(Le(a, b), Le(a, c)), Le(a, Min(b, c))), (And(Le(a, b), Lt(a, c)), ITE(b < c, Le(a, b), Lt(a, c))), (And(Lt(a, b), Lt(a, c)), Lt(a, Min(b, c))), # Sign (And(Eq(a, b), Eq(a, -b)), And(Eq(a, S(0)), Eq(b, S(0)))), ) return _matchers_and def simplify_patterns_or(): from sympy.functions.elementary.miscellaneous import Min, Max from sympy.core import Wild from sympy.core.relational import Eq, Ne, Ge, Gt, Le, Lt a = Wild('a') b = Wild('b') c = Wild('c') _matchers_or = ((Or(Eq(a, b), Ge(a, b)), Ge(a, b)), (Or(Eq(a, b), Gt(a, b)), Ge(a, b)), (Or(Eq(a, b), Le(a, b)), Le(a, b)), (Or(Eq(a, b), Lt(a, b)), Le(a, b)), (Or(Ge(a, b), Gt(a, b)), Ge(a, b)), (Or(Ge(a, b), Le(a, b)), S.true), (Or(Ge(a, b), Lt(a, b)), S.true), (Or(Ge(a, b), Ne(a, b)), S.true), (Or(Gt(a, b), Le(a, b)), S.true), (Or(Gt(a, b), Lt(a, b)), Ne(a, b)), (Or(Gt(a, b), Ne(a, b)), Ne(a, b)), (Or(Le(a, b), Lt(a, b)), Le(a, b)), (Or(Le(a, b), Ne(a, b)), S.true), (Or(Lt(a, b), Ne(a, b)), Ne(a, b)), # Min/max (Or(Ge(a, b), Ge(a, c)), Ge(a, Min(b, c))), (Or(Ge(a, b), Gt(a, c)), ITE(b > c, Gt(a, c), Ge(a, b))), (Or(Gt(a, b), Gt(a, c)), Gt(a, Min(b, c))), (Or(Le(a, b), Le(a, c)), Le(a, Max(b, c))), (Or(Le(a, b), Lt(a, c)), ITE(b >= c, Le(a, b), Lt(a, c))), (Or(Lt(a, b), Lt(a, c)), Lt(a, Max(b, c))), ) return _matchers_or def simplify_patterns_xor(): from sympy.functions.elementary.miscellaneous import Min, Max from sympy.core import Wild from sympy.core.relational import Eq, Ne, Ge, Gt, Le, Lt a = Wild('a') b = Wild('b') c = Wild('c') _matchers_xor = ((Xor(Eq(a, b), Ge(a, b)), Gt(a, b)), (Xor(Eq(a, b), Gt(a, b)), Ge(a, b)), (Xor(Eq(a, b), Le(a, b)), Lt(a, b)), (Xor(Eq(a, b), Lt(a, b)), Le(a, b)), (Xor(Ge(a, b), Gt(a, b)), Eq(a, b)), (Xor(Ge(a, b), Le(a, b)), Ne(a, b)), (Xor(Ge(a, b), Lt(a, b)), S.true), (Xor(Ge(a, b), Ne(a, b)), Le(a, b)), (Xor(Gt(a, b), Le(a, b)), S.true), (Xor(Gt(a, b), Lt(a, b)), Ne(a, b)), (Xor(Gt(a, b), Ne(a, b)), Lt(a, b)), (Xor(Le(a, b), Lt(a, b)), Eq(a, b)), (Xor(Le(a, b), Ne(a, b)), Ge(a, b)), (Xor(Lt(a, b), Ne(a, b)), Gt(a, b)), # Min/max (Xor(Ge(a, b), Ge(a, c)), And(Ge(a, Min(b, c)), Lt(a, Max(b, c)))), (Xor(Ge(a, b), Gt(a, c)), ITE(b > c, And(Gt(a, c), Lt(a, b)), And(Ge(a, b), Le(a, c)))), (Xor(Gt(a, b), Gt(a, c)), And(Gt(a, Min(b, c)), Le(a, Max(b, c)))), (Xor(Le(a, b), Le(a, c)), And(Le(a, Max(b, c)), Gt(a, Min(b, c)))), (Xor(Le(a, b), Lt(a, c)), ITE(b < c, And(Lt(a, c), Gt(a, b)), And(Le(a, b), Ge(a, c)))), (Xor(Lt(a, b), Lt(a, c)), And(Lt(a, Max(b, c)), Ge(a, Min(b, c)))), ) return _matchers_xor
4785e63128ece116617de28f7851c6851c69ba81d7783438c30b66eab829d98b	"""Inference in propositional logic""" from __future__ import print_function, division from sympy.logic.boolalg import And, Not, conjuncts, to_cnf from sympy.core.compatibility import ordered from sympy.core.sympify import sympify def literal_symbol(literal): """ The symbol in this literal (without the negation). Examples ======== >>> from sympy.abc import A >>> from sympy.logic.inference import literal_symbol >>> literal_symbol(A) A >>> literal_symbol(~A) A """ if literal is True or literal is False: return literal try: if literal.is_Symbol: return literal if literal.is_Not: return literal_symbol(literal.args[0]) else: raise ValueError except (AttributeError, ValueError): raise ValueError("Argument must be a boolean literal.") def satisfiable(expr, algorithm="dpll2", all_models=False): """ Check satisfiability of a propositional sentence. Returns a model when it succeeds. Returns {true: true} for trivially true expressions. On setting all_models to True, if given expr is satisfiable then returns a generator of models. However, if expr is unsatisfiable then returns a generator containing the single element False. Examples ======== >>> from sympy.abc import A, B >>> from sympy.logic.inference import satisfiable >>> satisfiable(A & ~B) {A: True, B: False} >>> satisfiable(A & ~A) False >>> satisfiable(True) {True: True} >>> next(satisfiable(A & ~A, all_models=True)) False >>> models = satisfiable((A >> B) & B, all_models=True) >>> next(models) {A: False, B: True} >>> next(models) {A: True, B: True} >>> def use_models(models): ... for model in models: ... if model: ... # Do something with the model. ... print(model) ... else: ... # Given expr is unsatisfiable. ... print("UNSAT") >>> use_models(satisfiable(A >> ~A, all_models=True)) {A: False} >>> use_models(satisfiable(A ^ A, all_models=True)) UNSAT """ expr = to_cnf(expr) if algorithm == "dpll": from sympy.logic.algorithms.dpll import dpll_satisfiable return dpll_satisfiable(expr) elif algorithm == "dpll2": from sympy.logic.algorithms.dpll2 import dpll_satisfiable return dpll_satisfiable(expr, all_models) raise NotImplementedError def valid(expr): """ Check validity of a propositional sentence. A valid propositional sentence is True under every assignment. Examples ======== >>> from sympy.abc import A, B >>> from sympy.logic.inference import valid >>> valid(A \| ~A) True >>> valid(A \| B) False References ========== .. [1] https://en.wikipedia.org/wiki/Validity """ return not satisfiable(Not(expr)) def pl_true(expr, model={}, deep=False): """ Returns whether the given assignment is a model or not. If the assignment does not specify the value for every proposition, this may return None to indicate 'not obvious'. Parameters ========== model : dict, optional, default: {} Mapping of symbols to boolean values to indicate assignment. deep: boolean, optional, default: False Gives the value of the expression under partial assignments correctly. May still return None to indicate 'not obvious'. Examples ======== >>> from sympy.abc import A, B, C >>> from sympy.logic.inference import pl_true >>> pl_true( A & B, {A: True, B: True}) True >>> pl_true(A & B, {A: False}) False >>> pl_true(A & B, {A: True}) >>> pl_true(A & B, {A: True}, deep=True) >>> pl_true(A >> (B >> A)) >>> pl_true(A >> (B >> A), deep=True) True >>> pl_true(A & ~A) >>> pl_true(A & ~A, deep=True) False >>> pl_true(A & B & (~A \| ~B), {A: True}) >>> pl_true(A & B & (~A \| ~B), {A: True}, deep=True) False """ from sympy.core.symbol import Symbol from sympy.logic.boolalg import BooleanFunction boolean = (True, False) def _validate(expr): if isinstance(expr, Symbol) or expr in boolean: return True if not isinstance(expr, BooleanFunction): return False return all(_validate(arg) for arg in expr.args) if expr in boolean: return expr expr = sympify(expr) if not _validate(expr): raise ValueError("%s is not a valid boolean expression" % expr) model = dict((k, v) for k, v in model.items() if v in boolean) result = expr.subs(model) if result in boolean: return bool(result) if deep: model = dict((k, True) for k in result.atoms()) if pl_true(result, model): if valid(result): return True else: if not satisfiable(result): return False return None def entails(expr, formula_set={}): """ Check whether the given expr_set entail an expr. If formula_set is empty then it returns the validity of expr. Examples ======== >>> from sympy.abc import A, B, C >>> from sympy.logic.inference import entails >>> entails(A, [A >> B, B >> C]) False >>> entails(C, [A >> B, B >> C, A]) True >>> entails(A >> B) False >>> entails(A >> (B >> A)) True References ========== .. [1] https://en.wikipedia.org/wiki/Logical_consequence """ formula_set = list(formula_set) formula_set.append(Not(expr)) return not satisfiable(And(*formula_set)) class KB(object): """Base class for all knowledge bases""" def __init__(self, sentence=None): self.clauses_ = set() if sentence: self.tell(sentence) def tell(self, sentence): raise NotImplementedError def ask(self, query): raise NotImplementedError def retract(self, sentence): raise NotImplementedError @property def clauses(self): return list(ordered(self.clauses_)) class PropKB(KB): """A KB for Propositional Logic. Inefficient, with no indexing.""" def tell(self, sentence): """Add the sentence's clauses to the KB Examples ======== >>> from sympy.logic.inference import PropKB >>> from sympy.abc import x, y >>> l = PropKB() >>> l.clauses [] >>> l.tell(x \| y) >>> l.clauses [x \| y] >>> l.tell(y) >>> l.clauses [y, x \| y] """ for c in conjuncts(to_cnf(sentence)): self.clauses_.add(c) def ask(self, query): """Checks if the query is true given the set of clauses. Examples ======== >>> from sympy.logic.inference import PropKB >>> from sympy.abc import x, y >>> l = PropKB() >>> l.tell(x & ~y) >>> l.ask(x) True >>> l.ask(y) False """ return entails(query, self.clauses_) def retract(self, sentence): """Remove the sentence's clauses from the KB Examples ======== >>> from sympy.logic.inference import PropKB >>> from sympy.abc import x, y >>> l = PropKB() >>> l.clauses [] >>> l.tell(x \| y) >>> l.clauses [x \| y] >>> l.retract(x \| y) >>> l.clauses [] """ for c in conjuncts(to_cnf(sentence)): self.clauses_.discard(c)
3c7e3b458605c1eceee044ec2052fca4d35405571ebbc16dfb875e528a47ab5b	""" Basic methods common to all matrices to be used when creating more advanced matrices (e.g., matrices over rings, etc.). """ from __future__ import division, print_function from collections import defaultdict from inspect import isfunction from sympy.assumptions.refine import refine from sympy.core.basic import Atom from sympy.core.compatibility import ( Iterable, as_int, is_sequence, range, reduce) from sympy.core.decorators import call_highest_priority from sympy.core.expr import Expr from sympy.core.function import count_ops from sympy.core.singleton import S from sympy.core.symbol import Symbol from sympy.core.sympify import sympify from sympy.functions import Abs from sympy.simplify import simplify as _simplify from sympy.utilities.exceptions import SymPyDeprecationWarning from sympy.utilities.iterables import flatten from sympy.utilities.misc import filldedent class MatrixError(Exception): pass class ShapeError(ValueError, MatrixError): """Wrong matrix shape""" pass class NonSquareMatrixError(ShapeError): pass class NonInvertibleMatrixError(ValueError, MatrixError): """The matrix in not invertible (division by multidimensional zero error).""" pass class NonPositiveDefiniteMatrixError(ValueError, MatrixError): """The matrix is not a positive-definite matrix.""" pass class MatrixRequired(object): """All subclasses of matrix objects must implement the required matrix properties listed here.""" rows = None cols = None shape = None _simplify = None @classmethod def _new(cls, args, kwargs): """`_new` must, at minimum, be callable as `_new(rows, cols, mat) where mat is a flat list of the elements of the matrix.""" raise NotImplementedError("Subclasses must implement this.") def __eq__(self, other): raise NotImplementedError("Subclasses must implement this.") def __getitem__(self, key): """Implementations of __getitem__ should accept ints, in which case the matrix is indexed as a flat list, tuples (i,j) in which case the (i,j) entry is returned, slices, or mixed tuples (a,b) where a and b are any combintion of slices and integers.""" raise NotImplementedError("Subclasses must implement this.") def __len__(self): """The total number of entries in the matrix.""" raise NotImplementedError("Subclasses must implement this.") class MatrixShaping(MatrixRequired): """Provides basic matrix shaping and extracting of submatrices""" def _eval_col_del(self, col): def entry(i, j): return self[i, j] if j < col else self[i, j + 1] return self._new(self.rows, self.cols - 1, entry) def _eval_col_insert(self, pos, other): cols = self.cols def entry(i, j): if j < pos: return self[i, j] elif pos <= j < pos + other.cols: return other[i, j - pos] return self[i, j - other.cols] return self._new(self.rows, self.cols + other.cols, lambda i, j: entry(i, j)) def _eval_col_join(self, other): rows = self.rows def entry(i, j): if i < rows: return self[i, j] return other[i - rows, j] return classof(self, other)._new(self.rows + other.rows, self.cols, lambda i, j: entry(i, j)) def _eval_extract(self, rowsList, colsList): mat = list(self) cols = self.cols indices = (i cols + j for i in rowsList for j in colsList) return self._new(len(rowsList), len(colsList), list(mat[i] for i in indices)) def _eval_get_diag_blocks(self): sub_blocks = [] def recurse_sub_blocks(M): i = 1 while i <= M.shape[0]: if i == 1: to_the_right = M[0, i:] to_the_bottom = M[i:, 0] else: to_the_right = M[:i, i:] to_the_bottom = M[i:, :i] if any(to_the_right) or any(to_the_bottom): i += 1 continue else: sub_blocks.append(M[:i, :i]) if M.shape == M[:i, :i].shape: return else: recurse_sub_blocks(M[i:, i:]) return recurse_sub_blocks(self) return sub_blocks def _eval_row_del(self, row): def entry(i, j): return self[i, j] if i < row else self[i + 1, j] return self._new(self.rows - 1, self.cols, entry) def _eval_row_insert(self, pos, other): entries = list(self) insert_pos = pos * self.cols entries[insert_pos:insert_pos] = list(other) return self._new(self.rows + other.rows, self.cols, entries) def _eval_row_join(self, other): cols = self.cols def entry(i, j): if j < cols: return self[i, j] return other[i, j - cols] return classof(self, other)._new(self.rows, self.cols + other.cols, lambda i, j: entry(i, j)) def _eval_tolist(self): return [list(self[i,:]) for i in range(self.rows)] def _eval_vec(self): rows = self.rows def entry(n, _): # we want to read off the columns first j = n // rows i = n - j * rows return self[i, j] return self._new(len(self), 1, entry) def col_del(self, col): """Delete the specified column.""" if col < 0: col += self.cols if not 0 <= col < self.cols: raise ValueError("Column {} out of range.".format(col)) return self._eval_col_del(col) def col_insert(self, pos, other): """Insert one or more columns at the given column position. Examples ======== >>> from sympy import zeros, ones >>> M = zeros(3) >>> V = ones(3, 1) >>> M.col_insert(1, V) Matrix([ [0, 1, 0, 0], [0, 1, 0, 0], [0, 1, 0, 0]]) See Also ======== col row_insert """ # Allows you to build a matrix even if it is null matrix if not self: return type(self)(other) pos = as_int(pos) if pos < 0: pos = self.cols + pos if pos < 0: pos = 0 elif pos > self.cols: pos = self.cols if self.rows != other.rows: raise ShapeError( "`self` and `other` must have the same number of rows.") return self._eval_col_insert(pos, other) def col_join(self, other): """Concatenates two matrices along self's last and other's first row. Examples ======== >>> from sympy import zeros, ones >>> M = zeros(3) >>> V = ones(1, 3) >>> M.col_join(V) Matrix([ [0, 0, 0], [0, 0, 0], [0, 0, 0], [1, 1, 1]]) See Also ======== col row_join """ # A null matrix can always be stacked (see #10770) if self.rows == 0 and self.cols != other.cols: return self._new(0, other.cols, []).col_join(other) if self.cols != other.cols: raise ShapeError( "`self` and `other` must have the same number of columns.") return self._eval_col_join(other) def col(self, j): """Elementary column selector. Examples ======== >>> from sympy import eye >>> eye(2).col(0) Matrix([ [1], [0]]) See Also ======== row col_op col_swap col_del col_join col_insert """ return self[:, j] def extract(self, rowsList, colsList): """Return a submatrix by specifying a list of rows and columns. Negative indices can be given. All indices must be in the range -n <= i < n where n is the number of rows or columns. Examples ======== >>> from sympy import Matrix >>> m = Matrix(4, 3, range(12)) >>> m Matrix([ [0, 1, 2], [3, 4, 5], [6, 7, 8], [9, 10, 11]]) >>> m.extract([0, 1, 3], [0, 1]) Matrix([ [0, 1], [3, 4], [9, 10]]) Rows or columns can be repeated: >>> m.extract([0, 0, 1], [-1]) Matrix([ [2], [2], [5]]) Every other row can be taken by using range to provide the indices: >>> m.extract(range(0, m.rows, 2), [-1]) Matrix([ [2], [8]]) RowsList or colsList can also be a list of booleans, in which case the rows or columns corresponding to the True values will be selected: >>> m.extract([0, 1, 2, 3], [True, False, True]) Matrix([ [0, 2], [3, 5], [6, 8], [9, 11]]) """ if not is_sequence(rowsList) or not is_sequence(colsList): raise TypeError("rowsList and colsList must be iterable") # ensure rowsList and colsList are lists of integers if rowsList and all(isinstance(i, bool) for i in rowsList): rowsList = [index for index, item in enumerate(rowsList) if item] if colsList and all(isinstance(i, bool) for i in colsList): colsList = [index for index, item in enumerate(colsList) if item] # ensure everything is in range rowsList = [a2idx(k, self.rows) for k in rowsList] colsList = [a2idx(k, self.cols) for k in colsList] return self._eval_extract(rowsList, colsList) def get_diag_blocks(self): """Obtains the square sub-matrices on the main diagonal of a square matrix. Useful for inverting symbolic matrices or solving systems of linear equations which may be decoupled by having a block diagonal structure. Examples ======== >>> from sympy import Matrix >>> from sympy.abc import x, y, z >>> A = Matrix([[1, 3, 0, 0], [y, zz, 0, 0], [0, 0, x, 0], [0, 0, 0, 0]]) >>> a1, a2, a3 = A.get_diag_blocks() >>> a1 Matrix([ [1, 3], [y, z2]]) >>> a2 Matrix([[x]]) >>> a3 Matrix([[0]]) """ return self._eval_get_diag_blocks() @classmethod def hstack(cls, args): """Return a matrix formed by joining args horizontally (i.e. by repeated application of row_join). Examples ======== >>> from sympy.matrices import Matrix, eye >>> Matrix.hstack(eye(2), 2eye(2)) Matrix([ [1, 0, 2, 0], [0, 1, 0, 2]]) """ if len(args) == 0: return cls._new() kls = type(args[0]) return reduce(kls.row_join, args) def reshape(self, rows, cols): """Reshape the matrix. Total number of elements must remain the same. Examples ======== >>> from sympy import Matrix >>> m = Matrix(2, 3, lambda i, j: 1) >>> m Matrix([ [1, 1, 1], [1, 1, 1]]) >>> m.reshape(1, 6) Matrix([[1, 1, 1, 1, 1, 1]]) >>> m.reshape(3, 2) Matrix([ [1, 1], [1, 1], [1, 1]]) """ if self.rows self.cols != rows * cols: raise ValueError("Invalid reshape parameters %d %d" % (rows, cols)) return self._new(rows, cols, lambda i, j: self[i * cols + j]) def row_del(self, row): """Delete the specified row.""" if row < 0: row += self.rows if not 0 <= row < self.rows: raise ValueError("Row {} out of range.".format(row)) return self._eval_row_del(row) def row_insert(self, pos, other): """Insert one or more rows at the given row position. Examples ======== >>> from sympy import zeros, ones >>> M = zeros(3) >>> V = ones(1, 3) >>> M.row_insert(1, V) Matrix([ [0, 0, 0], [1, 1, 1], [0, 0, 0], [0, 0, 0]]) See Also ======== row col_insert """ # Allows you to build a matrix even if it is null matrix if not self: return self._new(other) pos = as_int(pos) if pos < 0: pos = self.rows + pos if pos < 0: pos = 0 elif pos > self.rows: pos = self.rows if self.cols != other.cols: raise ShapeError( "`self` and `other` must have the same number of columns.") return self._eval_row_insert(pos, other) def row_join(self, other): """Concatenates two matrices along self's last and rhs's first column Examples ======== >>> from sympy import zeros, ones >>> M = zeros(3) >>> V = ones(3, 1) >>> M.row_join(V) Matrix([ [0, 0, 0, 1], [0, 0, 0, 1], [0, 0, 0, 1]]) See Also ======== row col_join """ # A null matrix can always be stacked (see #10770) if self.cols == 0 and self.rows != other.rows: return self._new(other.rows, 0, []).row_join(other) if self.rows != other.rows: raise ShapeError( "`self` and `rhs` must have the same number of rows.") return self._eval_row_join(other) def diagonal(self, k=0): """Returns the kth diagonal of self. The main diagonal corresponds to `k=0`; diagonals above and below correspond to `k > 0` and `k < 0`, respectively. The values of `self[i, j]` for which `j - i = k`, are returned in order of increasing `i + j`, starting with `i + j = \|k\|`. Examples ======== >>> from sympy import Matrix, SparseMatrix >>> m = Matrix(3, 3, lambda i, j: j - i); m Matrix([ [ 0, 1, 2], [-1, 0, 1], [-2, -1, 0]]) >>> _.diagonal() Matrix([[0, 0, 0]]) >>> m.diagonal(1) Matrix([[1, 1]]) >>> m.diagonal(-2) Matrix([[-2]]) Even though the diagonal is returned as a Matrix, the element retrieval can be done with a single index: >>> Matrix.diag(1, 2, 3).diagonal()[1] # instead of [0, 1] 2 See Also ======== diag - to create a diagonal matrix """ rv = [] k = as_int(k) r = 0 if k > 0 else -k c = 0 if r else k while True: if r == self.rows or c == self.cols: break rv.append(self[r, c]) r += 1 c += 1 if not rv: raise ValueError(filldedent(''' The %s diagonal is out of range [%s, %s]''' % ( k, 1 - self.rows, self.cols - 1))) return self._new(1, len(rv), rv) def row(self, i): """Elementary row selector. Examples ======== >>> from sympy import eye >>> eye(2).row(0) Matrix([[1, 0]]) See Also ======== col row_op row_swap row_del row_join row_insert """ return self[i, :] @property def shape(self): """The shape (dimensions) of the matrix as the 2-tuple (rows, cols). Examples ======== >>> from sympy.matrices import zeros >>> M = zeros(2, 3) >>> M.shape (2, 3) >>> M.rows 2 >>> M.cols 3 """ return (self.rows, self.cols) def tolist(self): """Return the Matrix as a nested Python list. Examples ======== >>> from sympy import Matrix, ones >>> m = Matrix(3, 3, range(9)) >>> m Matrix([ [0, 1, 2], [3, 4, 5], [6, 7, 8]]) >>> m.tolist() [[0, 1, 2], [3, 4, 5], [6, 7, 8]] >>> ones(3, 0).tolist() [[], [], []] When there are no rows then it will not be possible to tell how many columns were in the original matrix: >>> ones(0, 3).tolist() [] """ if not self.rows: return [] if not self.cols: return [[] for i in range(self.rows)] return self._eval_tolist() def vec(self): """Return the Matrix converted into a one column matrix by stacking columns Examples ======== >>> from sympy import Matrix >>> m=Matrix([[1, 3], [2, 4]]) >>> m Matrix([ [1, 3], [2, 4]]) >>> m.vec() Matrix([ [1], [2], [3], [4]]) See Also ======== vech """ return self._eval_vec() @classmethod def vstack(cls, args): """Return a matrix formed by joining args vertically (i.e. by repeated application of col_join). Examples ======== >>> from sympy.matrices import Matrix, eye >>> Matrix.vstack(eye(2), 2eye(2)) Matrix([ [1, 0], [0, 1], [2, 0], [0, 2]]) """ if len(args) == 0: return cls._new() kls = type(args[0]) return reduce(kls.col_join, args) class MatrixSpecial(MatrixRequired): """Construction of special matrices""" @classmethod def _eval_diag(cls, rows, cols, diag_dict): """diag_dict is a defaultdict containing all the entries of the diagonal matrix.""" def entry(i, j): return diag_dict[(i, j)] return cls._new(rows, cols, entry) @classmethod def _eval_eye(cls, rows, cols): def entry(i, j): return cls.one if i == j else cls.zero return cls._new(rows, cols, entry) @classmethod def _eval_jordan_block(cls, rows, cols, eigenvalue, band='upper'): if band == 'lower': def entry(i, j): if i == j: return eigenvalue elif j + 1 == i: return cls.one return cls.zero else: def entry(i, j): if i == j: return eigenvalue elif i + 1 == j: return cls.one return cls.zero return cls._new(rows, cols, entry) @classmethod def _eval_ones(cls, rows, cols): def entry(i, j): return cls.one return cls._new(rows, cols, entry) @classmethod def _eval_zeros(cls, rows, cols): def entry(i, j): return cls.zero return cls._new(rows, cols, entry) @classmethod def diag(kls, args, kwargs): """Returns a matrix with the specified diagonal. If matrices are passed, a block-diagonal matrix is created (i.e. the "direct sum" of the matrices). kwargs ====== rows : rows of the resulting matrix; computed if not given. cols : columns of the resulting matrix; computed if not given. cls : class for the resulting matrix unpack : bool which, when True (default), unpacks a single sequence rather than interpreting it as a Matrix. strict : bool which, when False (default), allows Matrices to have variable-length rows. Examples ======== >>> from sympy.matrices import Matrix >>> Matrix.diag(1, 2, 3) Matrix([ [1, 0, 0], [0, 2, 0], [0, 0, 3]]) The current default is to unpack a single sequence. If this is not desired, set `unpack=False` and it will be interpreted as a matrix. >>> Matrix.diag([1, 2, 3]) == Matrix.diag(1, 2, 3) True When more than one element is passed, each is interpreted as something to put on the diagonal. Lists are converted to matricecs. Filling of the diagonal always continues from the bottom right hand corner of the previous item: this will create a block-diagonal matrix whether the matrices are square or not. >>> col = [1, 2, 3] >>> row = [[4, 5]] >>> Matrix.diag(col, row) Matrix([ [1, 0, 0], [2, 0, 0], [3, 0, 0], [0, 4, 5]]) When `unpack` is False, elements within a list need not all be of the same length. Setting `strict` to True would raise a ValueError for the following: >>> Matrix.diag([[1, 2, 3], [4, 5], [6]], unpack=False) Matrix([ [1, 2, 3], [4, 5, 0], [6, 0, 0]]) The type of the returned matrix can be set with the ``cls`` keyword. >>> from sympy.matrices import ImmutableMatrix >>> from sympy.utilities.misc import func_name >>> func_name(Matrix.diag(1, cls=ImmutableMatrix)) 'ImmutableDenseMatrix' A zero dimension matrix can be used to position the start of the filling at the start of an arbitrary row or column: >>> from sympy import ones >>> r2 = ones(0, 2) >>> Matrix.diag(r2, 1, 2) Matrix([ [0, 0, 1, 0], [0, 0, 0, 2]]) See Also ======== eye diagonal - to extract a diagonal .dense.diag .expressions.blockmatrix.BlockMatrix """ from sympy.matrices.matrices import MatrixBase from sympy.matrices.dense import Matrix from sympy.matrices.sparse import SparseMatrix klass = kwargs.get('cls', kls) strict = kwargs.get('strict', False) # lists -> Matrices unpack = kwargs.get('unpack', True) # unpack single sequence if unpack and len(args) == 1 and is_sequence(args[0]) and \ not isinstance(args[0], MatrixBase): args = args[0] # fill a default dict with the diagonal entries diag_entries = defaultdict(int) rmax = cmax = 0 # keep track of the biggest index seen for m in args: if isinstance(m, list): if strict: # if malformed, Matrix will raise an error _ = Matrix(m) r, c = _.shape m = _.tolist() else: m = SparseMatrix(m) for (i, j), _ in m._smat.items(): diag_entries[(i + rmax, j + cmax)] = _ r, c = m.shape m = [] # to skip process below elif hasattr(m, 'shape'): # a Matrix # convert to list of lists r, c = m.shape m = m.tolist() else: # in this case, we're a single value diag_entries[(rmax, cmax)] = m rmax += 1 cmax += 1 continue # process list of lists for i in range(len(m)): for j, _ in enumerate(m[i]): diag_entries[(i + rmax, j + cmax)] = _ rmax += r cmax += c rows = kwargs.get('rows', None) cols = kwargs.get('cols', None) if rows is None: rows, cols = cols, rows if rows is None: rows, cols = rmax, cmax else: cols = rows if cols is None else cols if rows < rmax or cols < cmax: raise ValueError(filldedent(''' The constructed matrix is {} x {} but a size of {} x {} was specified.'''.format(rmax, cmax, rows, cols))) return klass._eval_diag(rows, cols, diag_entries) @classmethod def eye(kls, rows, cols=None, kwargs): """Returns an identity matrix. Args ==== rows : rows of the matrix cols : cols of the matrix (if None, cols=rows) kwargs ====== cls : class of the returned matrix """ if cols is None: cols = rows klass = kwargs.get('cls', kls) rows, cols = as_int(rows), as_int(cols) return klass._eval_eye(rows, cols) @classmethod def jordan_block(kls, size=None, eigenvalue=None, kwargs): """Returns a Jordan block Parameters ========== size : Integer, optional Specifies the shape of the Jordan block matrix. eigenvalue : Number or Symbol Specifies the value for the main diagonal of the matrix. .. note:: The keyword ``eigenval`` is also specified as an alias of this keyword, but it is not recommended to use. We may deprecate the alias in later release. band : 'upper' or 'lower', optional Specifies the position of the off-diagonal to put `1` s on. cls : Matrix, optional Specifies the matrix class of the output form. If it is not specified, the class type where the method is being executed on will be returned. rows, cols : Integer, optional Specifies the shape of the Jordan block matrix. See Notes section for the details of how these key works. .. note:: This feature will be deprecated in the future. Returns ======= Matrix A Jordan block matrix. Raises ====== ValueError If insufficient arguments are given for matrix size specification, or no eigenvalue is given. Examples ======== Creating a default Jordan block: >>> from sympy import Matrix >>> from sympy.abc import x >>> Matrix.jordan_block(4, x) Matrix([ [x, 1, 0, 0], [0, x, 1, 0], [0, 0, x, 1], [0, 0, 0, x]]) Creating an alternative Jordan block matrix where `1` is on lower off-diagonal: >>> Matrix.jordan_block(4, x, band='lower') Matrix([ [x, 0, 0, 0], [1, x, 0, 0], [0, 1, x, 0], [0, 0, 1, x]]) Creating a Jordan block with keyword arguments >>> Matrix.jordan_block(size=4, eigenvalue=x) Matrix([ [x, 1, 0, 0], [0, x, 1, 0], [0, 0, x, 1], [0, 0, 0, x]]) Notes ===== .. note:: This feature will be deprecated in the future. The keyword arguments ``size``, ``rows``, ``cols`` relates to the Jordan block size specifications. If you want to create a square Jordan block, specify either one of the three arguments. If you want to create a rectangular Jordan block, specify ``rows`` and ``cols`` individually. +--------------------------------+---------------------+ \| Arguments Given \| Matrix Shape \| +----------+----------+----------+----------+----------+ \| size \| rows \| cols \| rows \| cols \| +==========+==========+==========+==========+==========+ \| size \| Any \| size \| size \| +----------+----------+----------+----------+----------+ \| \| None \| ValueError \| \| +----------+----------+----------+----------+ \| None \| rows \| None \| rows \| rows \| \| +----------+----------+----------+----------+ \| \| None \| cols \| cols \| cols \| + +----------+----------+----------+----------+ \| \| rows \| cols \| rows \| cols \| +----------+----------+----------+----------+----------+ References ========== .. [1] https://en.wikipedia.org/wiki/Jordan_matrix """ if 'rows' in kwargs or 'cols' in kwargs: SymPyDeprecationWarning( feature="Keyword arguments 'rows' or 'cols'", issue=16102, useinstead="a more generic banded matrix constructor", deprecated_since_version="1.4" ).warn() klass = kwargs.pop('cls', kls) band = kwargs.pop('band', 'upper') rows = kwargs.pop('rows', None) cols = kwargs.pop('cols', None) eigenval = kwargs.get('eigenval', None) if eigenvalue is None and eigenval is None: raise ValueError("Must supply an eigenvalue") elif eigenvalue != eigenval and None not in (eigenval, eigenvalue): raise ValueError( "Inconsistent values are given: 'eigenval'={}, " "'eigenvalue'={}".format(eigenval, eigenvalue)) else: if eigenval is not None: eigenvalue = eigenval if (size, rows, cols) == (None, None, None): raise ValueError("Must supply a matrix size") if size is not None: rows, cols = size, size elif rows is not None and cols is None: cols = rows elif cols is not None and rows is None: rows = cols rows, cols = as_int(rows), as_int(cols) return klass._eval_jordan_block(rows, cols, eigenvalue, band) @classmethod def ones(kls, rows, cols=None, kwargs): """Returns a matrix of ones. Args ==== rows : rows of the matrix cols : cols of the matrix (if None, cols=rows) kwargs ====== cls : class of the returned matrix """ if cols is None: cols = rows klass = kwargs.get('cls', kls) rows, cols = as_int(rows), as_int(cols) return klass._eval_ones(rows, cols) @classmethod def zeros(kls, rows, cols=None, kwargs): """Returns a matrix of zeros. Args ==== rows : rows of the matrix cols : cols of the matrix (if None, cols=rows) kwargs ====== cls : class of the returned matrix """ if cols is None: cols = rows klass = kwargs.get('cls', kls) rows, cols = as_int(rows), as_int(cols) return klass._eval_zeros(rows, cols) class MatrixProperties(MatrixRequired): """Provides basic properties of a matrix.""" def _eval_atoms(self, types): result = set() for i in self: result.update(i.atoms(types)) return result def _eval_free_symbols(self): return set().union((i.free_symbols for i in self)) def _eval_has(self, patterns): return any(a.has(patterns) for a in self) def _eval_is_anti_symmetric(self, simpfunc): if not all(simpfunc(self[i, j] + self[j, i]).is_zero for i in range(self.rows) for j in range(self.cols)): return False return True def _eval_is_diagonal(self): for i in range(self.rows): for j in range(self.cols): if i != j and self[i, j]: return False return True # _eval_is_hermitian is called by some general sympy # routines and has a different args signature. Make # sure the names don't clash by adding `_matrix_` in name. def _eval_is_matrix_hermitian(self, simpfunc): mat = self._new(self.rows, self.cols, lambda i, j: simpfunc(self[i, j] - self[j, i].conjugate())) return mat.is_zero def _eval_is_Identity(self): def dirac(i, j): if i == j: return 1 return 0 return all(self[i, j] == dirac(i, j) for i in range(self.rows) for j in range(self.cols)) def _eval_is_lower_hessenberg(self): return all(self[i, j].is_zero for i in range(self.rows) for j in range(i + 2, self.cols)) def _eval_is_lower(self): return all(self[i, j].is_zero for i in range(self.rows) for j in range(i + 1, self.cols)) def _eval_is_symbolic(self): return self.has(Symbol) def _eval_is_symmetric(self, simpfunc): mat = self._new(self.rows, self.cols, lambda i, j: simpfunc(self[i, j] - self[j, i])) return mat.is_zero def _eval_is_zero(self): if any(i.is_zero == False for i in self): return False if any(i.is_zero is None for i in self): return None return True def _eval_is_upper_hessenberg(self): return all(self[i, j].is_zero for i in range(2, self.rows) for j in range(min(self.cols, (i - 1)))) def _eval_values(self): return [i for i in self if not i.is_zero] def atoms(self, types): """Returns the atoms that form the current object. Examples ======== >>> from sympy.abc import x, y >>> from sympy.matrices import Matrix >>> Matrix([[x]]) Matrix([[x]]) >>> _.atoms() {x} """ types = tuple(t if isinstance(t, type) else type(t) for t in types) if not types: types = (Atom,) return self._eval_atoms(types) @property def free_symbols(self): """Returns the free symbols within the matrix. Examples ======== >>> from sympy.abc import x >>> from sympy.matrices import Matrix >>> Matrix([[x], [1]]).free_symbols {x} """ return self._eval_free_symbols() def has(self, patterns): """Test whether any subexpression matches any of the patterns. Examples ======== >>> from sympy import Matrix, SparseMatrix, Float >>> from sympy.abc import x, y >>> A = Matrix(((1, x), (0.2, 3))) >>> B = SparseMatrix(((1, x), (0.2, 3))) >>> A.has(x) True >>> A.has(y) False >>> A.has(Float) True >>> B.has(x) True >>> B.has(y) False >>> B.has(Float) True """ return self._eval_has(patterns) def is_anti_symmetric(self, simplify=True): """Check if matrix M is an antisymmetric matrix, that is, M is a square matrix with all M[i, j] == -M[j, i]. When ``simplify=True`` (default), the sum M[i, j] + M[j, i] is simplified before testing to see if it is zero. By default, the SymPy simplify function is used. To use a custom function set simplify to a function that accepts a single argument which returns a simplified expression. To skip simplification, set simplify to False but note that although this will be faster, it may induce false negatives. Examples ======== >>> from sympy import Matrix, symbols >>> m = Matrix(2, 2, [0, 1, -1, 0]) >>> m Matrix([ [ 0, 1], [-1, 0]]) >>> m.is_anti_symmetric() True >>> x, y = symbols('x y') >>> m = Matrix(2, 3, [0, 0, x, -y, 0, 0]) >>> m Matrix([ [ 0, 0, x], [-y, 0, 0]]) >>> m.is_anti_symmetric() False >>> from sympy.abc import x, y >>> m = Matrix(3, 3, [0, x2 + 2x + 1, y, ... -(x + 1)*2 , 0, xy, ... -y, -xy, 0]) Simplification of matrix elements is done by default so even though two elements which should be equal and opposite wouldn't pass an equality test, the matrix is still reported as anti-symmetric: >>> m[0, 1] == -m[1, 0] False >>> m.is_anti_symmetric() True If 'simplify=False' is used for the case when a Matrix is already simplified, this will speed things up. Here, we see that without simplification the matrix does not appear anti-symmetric: >>> m.is_anti_symmetric(simplify=False) False But if the matrix were already expanded, then it would appear anti-symmetric and simplification in the is_anti_symmetric routine is not needed: >>> m = m.expand() >>> m.is_anti_symmetric(simplify=False) True """ # accept custom simplification simpfunc = simplify if not isfunction(simplify): simpfunc = _simplify if simplify else lambda x: x if not self.is_square: return False return self._eval_is_anti_symmetric(simpfunc) def is_diagonal(self): """Check if matrix is diagonal, that is matrix in which the entries outside the main diagonal are all zero. Examples ======== >>> from sympy import Matrix, diag >>> m = Matrix(2, 2, [1, 0, 0, 2]) >>> m Matrix([ [1, 0], [0, 2]]) >>> m.is_diagonal() True >>> m = Matrix(2, 2, [1, 1, 0, 2]) >>> m Matrix([ [1, 1], [0, 2]]) >>> m.is_diagonal() False >>> m = diag(1, 2, 3) >>> m Matrix([ [1, 0, 0], [0, 2, 0], [0, 0, 3]]) >>> m.is_diagonal() True See Also ======== is_lower is_upper is_diagonalizable diagonalize """ return self._eval_is_diagonal() @property def is_hermitian(self, simplify=True): """Checks if the matrix is Hermitian. In a Hermitian matrix element i,j is the complex conjugate of element j,i. Examples ======== >>> from sympy.matrices import Matrix >>> from sympy import I >>> from sympy.abc import x >>> a = Matrix([[1, I], [-I, 1]]) >>> a Matrix([ [ 1, I], [-I, 1]]) >>> a.is_hermitian True >>> a[0, 0] = 2I >>> a.is_hermitian False >>> a[0, 0] = x >>> a.is_hermitian >>> a[0, 1] = a[1, 0]I >>> a.is_hermitian False """ if not self.is_square: return False simpfunc = simplify if not isfunction(simplify): simpfunc = _simplify if simplify else lambda x: x return self._eval_is_matrix_hermitian(simpfunc) @property def is_Identity(self): if not self.is_square: return False return self._eval_is_Identity() @property def is_lower_hessenberg(self): r"""Checks if the matrix is in the lower-Hessenberg form. The lower hessenberg matrix has zero entries above the first superdiagonal. Examples ======== >>> from sympy.matrices import Matrix >>> a = Matrix([[1, 2, 0, 0], [5, 2, 3, 0], [3, 4, 3, 7], [5, 6, 1, 1]]) >>> a Matrix([ [1, 2, 0, 0], [5, 2, 3, 0], [3, 4, 3, 7], [5, 6, 1, 1]]) >>> a.is_lower_hessenberg True See Also ======== is_upper_hessenberg is_lower """ return self._eval_is_lower_hessenberg() @property def is_lower(self): """Check if matrix is a lower triangular matrix. True can be returned even if the matrix is not square. Examples ======== >>> from sympy import Matrix >>> m = Matrix(2, 2, [1, 0, 0, 1]) >>> m Matrix([ [1, 0], [0, 1]]) >>> m.is_lower True >>> m = Matrix(4, 3, [0, 0, 0, 2, 0, 0, 1, 4 , 0, 6, 6, 5]) >>> m Matrix([ [0, 0, 0], [2, 0, 0], [1, 4, 0], [6, 6, 5]]) >>> m.is_lower True >>> from sympy.abc import x, y >>> m = Matrix(2, 2, [x2 + y, y2 + x, 0, x + y]) >>> m Matrix([ [x2 + y, x + y2], [ 0, x + y]]) >>> m.is_lower False See Also ======== is_upper is_diagonal is_lower_hessenberg """ return self._eval_is_lower() @property def is_square(self): """Checks if a matrix is square. A matrix is square if the number of rows equals the number of columns. The empty matrix is square by definition, since the number of rows and the number of columns are both zero. Examples ======== >>> from sympy import Matrix >>> a = Matrix([[1, 2, 3], [4, 5, 6]]) >>> b = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) >>> c = Matrix([]) >>> a.is_square False >>> b.is_square True >>> c.is_square True """ return self.rows == self.cols def is_symbolic(self): """Checks if any elements contain Symbols. Examples ======== >>> from sympy.matrices import Matrix >>> from sympy.abc import x, y >>> M = Matrix([[x, y], [1, 0]]) >>> M.is_symbolic() True """ return self._eval_is_symbolic() def is_symmetric(self, simplify=True): """Check if matrix is symmetric matrix, that is square matrix and is equal to its transpose. By default, simplifications occur before testing symmetry. They can be skipped using 'simplify=False'; while speeding things a bit, this may however induce false negatives. Examples ======== >>> from sympy import Matrix >>> m = Matrix(2, 2, [0, 1, 1, 2]) >>> m Matrix([ [0, 1], [1, 2]]) >>> m.is_symmetric() True >>> m = Matrix(2, 2, [0, 1, 2, 0]) >>> m Matrix([ [0, 1], [2, 0]]) >>> m.is_symmetric() False >>> m = Matrix(2, 3, [0, 0, 0, 0, 0, 0]) >>> m Matrix([ [0, 0, 0], [0, 0, 0]]) >>> m.is_symmetric() False >>> from sympy.abc import x, y >>> m = Matrix(3, 3, [1, x2 + 2x + 1, y, (x + 1)2 , 2, 0, y, 0, 3]) >>> m Matrix([ [ 1, x2 + 2x + 1, y], [(x + 1)2, 2, 0], [ y, 0, 3]]) >>> m.is_symmetric() True If the matrix is already simplified, you may speed-up is_symmetric() test by using 'simplify=False'. >>> bool(m.is_symmetric(simplify=False)) False >>> m1 = m.expand() >>> m1.is_symmetric(simplify=False) True """ simpfunc = simplify if not isfunction(simplify): simpfunc = _simplify if simplify else lambda x: x if not self.is_square: return False return self._eval_is_symmetric(simpfunc) @property def is_upper_hessenberg(self): """Checks if the matrix is the upper-Hessenberg form. The upper hessenberg matrix has zero entries below the first subdiagonal. Examples ======== >>> from sympy.matrices import Matrix >>> a = Matrix([[1, 4, 2, 3], [3, 4, 1, 7], [0, 2, 3, 4], [0, 0, 1, 3]]) >>> a Matrix([ [1, 4, 2, 3], [3, 4, 1, 7], [0, 2, 3, 4], [0, 0, 1, 3]]) >>> a.is_upper_hessenberg True See Also ======== is_lower_hessenberg is_upper """ return self._eval_is_upper_hessenberg() @property def is_upper(self): """Check if matrix is an upper triangular matrix. True can be returned even if the matrix is not square. Examples ======== >>> from sympy import Matrix >>> m = Matrix(2, 2, [1, 0, 0, 1]) >>> m Matrix([ [1, 0], [0, 1]]) >>> m.is_upper True >>> m = Matrix(4, 3, [5, 1, 9, 0, 4 , 6, 0, 0, 5, 0, 0, 0]) >>> m Matrix([ [5, 1, 9], [0, 4, 6], [0, 0, 5], [0, 0, 0]]) >>> m.is_upper True >>> m = Matrix(2, 3, [4, 2, 5, 6, 1, 1]) >>> m Matrix([ [4, 2, 5], [6, 1, 1]]) >>> m.is_upper False See Also ======== is_lower is_diagonal is_upper_hessenberg """ return all(self[i, j].is_zero for i in range(1, self.rows) for j in range(min(i, self.cols))) @property def is_zero(self): """Checks if a matrix is a zero matrix. A matrix is zero if every element is zero. A matrix need not be square to be considered zero. The empty matrix is zero by the principle of vacuous truth. For a matrix that may or may not be zero (e.g. contains a symbol), this will be None Examples ======== >>> from sympy import Matrix, zeros >>> from sympy.abc import x >>> a = Matrix([[0, 0], [0, 0]]) >>> b = zeros(3, 4) >>> c = Matrix([[0, 1], [0, 0]]) >>> d = Matrix([]) >>> e = Matrix([[x, 0], [0, 0]]) >>> a.is_zero True >>> b.is_zero True >>> c.is_zero False >>> d.is_zero True >>> e.is_zero """ return self._eval_is_zero() def values(self): """Return non-zero values of self.""" return self._eval_values() class MatrixOperations(MatrixRequired): """Provides basic matrix shape and elementwise operations. Should not be instantiated directly.""" def _eval_adjoint(self): return self.transpose().conjugate() def _eval_applyfunc(self, f): out = self._new(self.rows, self.cols, [f(x) for x in self]) return out def _eval_as_real_imag(self): from sympy.functions.elementary.complexes import re, im return (self.applyfunc(re), self.applyfunc(im)) def _eval_conjugate(self): return self.applyfunc(lambda x: x.conjugate()) def _eval_permute_cols(self, perm): # apply the permutation to a list mapping = list(perm) def entry(i, j): return self[i, mapping[j]] return self._new(self.rows, self.cols, entry) def _eval_permute_rows(self, perm): # apply the permutation to a list mapping = list(perm) def entry(i, j): return self[mapping[i], j] return self._new(self.rows, self.cols, entry) def _eval_trace(self): return sum(self[i, i] for i in range(self.rows)) def _eval_transpose(self): return self._new(self.cols, self.rows, lambda i, j: self[j, i]) def adjoint(self): """Conjugate transpose or Hermitian conjugation.""" return self._eval_adjoint() def applyfunc(self, f): """Apply a function to each element of the matrix. Examples ======== >>> from sympy import Matrix >>> m = Matrix(2, 2, lambda i, j: i2+j) >>> m Matrix([ [0, 1], [2, 3]]) >>> m.applyfunc(lambda i: 2i) Matrix([ [0, 2], [4, 6]]) """ if not callable(f): raise TypeError("`f` must be callable.") return self._eval_applyfunc(f) def as_real_imag(self): """Returns a tuple containing the (real, imaginary) part of matrix.""" return self._eval_as_real_imag() def conjugate(self): """Return the by-element conjugation. Examples ======== >>> from sympy.matrices import SparseMatrix >>> from sympy import I >>> a = SparseMatrix(((1, 2 + I), (3, 4), (I, -I))) >>> a Matrix([ [1, 2 + I], [3, 4], [I, -I]]) >>> a.C Matrix([ [ 1, 2 - I], [ 3, 4], [-I, I]]) See Also ======== transpose: Matrix transposition H: Hermite conjugation D: Dirac conjugation """ return self._eval_conjugate() def doit(self, kwargs): return self.applyfunc(lambda x: x.doit()) def evalf(self, prec=None, options): """Apply evalf() to each element of self.""" return self.applyfunc(lambda i: i.evalf(prec, options)) def expand(self, deep=True, modulus=None, power_base=True, power_exp=True, mul=True, log=True, multinomial=True, basic=True, hints): """Apply core.function.expand to each entry of the matrix. Examples ======== >>> from sympy.abc import x >>> from sympy.matrices import Matrix >>> Matrix(1, 1, [x(x+1)]) Matrix([[x(x + 1)]]) >>> _.expand() Matrix([[x2 + x]]) """ return self.applyfunc(lambda x: x.expand( deep, modulus, power_base, power_exp, mul, log, multinomial, basic, hints)) @property def H(self): """Return Hermite conjugate. Examples ======== >>> from sympy import Matrix, I >>> m = Matrix((0, 1 + I, 2, 3)) >>> m Matrix([ [ 0], [1 + I], [ 2], [ 3]]) >>> m.H Matrix([[0, 1 - I, 2, 3]]) See Also ======== conjugate: By-element conjugation D: Dirac conjugation """ return self.T.C def permute(self, perm, orientation='rows', direction='forward'): """Permute the rows or columns of a matrix by the given list of swaps. Parameters ========== perm : a permutation. This may be a list swaps (e.g., `[[1, 2], [0, 3]]`), or any valid input to the `Permutation` constructor, including a `Permutation()` itself. If `perm` is given explicitly as a list of indices or a `Permutation`, `direction` has no effect. orientation : ('rows' or 'cols') whether to permute the rows or the columns direction : ('forward', 'backward') whether to apply the permutations from the start of the list first, or from the back of the list first Examples ======== >>> from sympy.matrices import eye >>> M = eye(3) >>> M.permute([[0, 1], [0, 2]], orientation='rows', direction='forward') Matrix([ [0, 0, 1], [1, 0, 0], [0, 1, 0]]) >>> from sympy.matrices import eye >>> M = eye(3) >>> M.permute([[0, 1], [0, 2]], orientation='rows', direction='backward') Matrix([ [0, 1, 0], [0, 0, 1], [1, 0, 0]]) """ # allow british variants and `columns` if direction == 'forwards': direction = 'forward' if direction == 'backwards': direction = 'backward' if orientation == 'columns': orientation = 'cols' if direction not in ('forward', 'backward'): raise TypeError("direction='{}' is an invalid kwarg. " "Try 'forward' or 'backward'".format(direction)) if orientation not in ('rows', 'cols'): raise TypeError("orientation='{}' is an invalid kwarg. " "Try 'rows' or 'cols'".format(orientation)) # ensure all swaps are in range max_index = self.rows if orientation == 'rows' else self.cols if not all(0 <= t <= max_index for t in flatten(list(perm))): raise IndexError("`swap` indices out of range.") # see if we are a list of pairs try: assert len(perm[0]) == 2 # we are a list of swaps, so `direction` matters if direction == 'backward': perm = reversed(perm) # since Permutation doesn't let us have non-disjoint cycles, # we'll construct the explicit mapping ourselves XXX Bug #12479 mapping = list(range(max_index)) for (i, j) in perm: mapping[i], mapping[j] = mapping[j], mapping[i] perm = mapping except (TypeError, AssertionError, IndexError): pass from sympy.combinatorics import Permutation perm = Permutation(perm, size=max_index) if orientation == 'rows': return self._eval_permute_rows(perm) if orientation == 'cols': return self._eval_permute_cols(perm) def permute_cols(self, swaps, direction='forward'): """Alias for `self.permute(swaps, orientation='cols', direction=direction)` See Also ======== permute """ return self.permute(swaps, orientation='cols', direction=direction) def permute_rows(self, swaps, direction='forward'): """Alias for `self.permute(swaps, orientation='rows', direction=direction)` See Also ======== permute """ return self.permute(swaps, orientation='rows', direction=direction) def refine(self, assumptions=True): """Apply refine to each element of the matrix. Examples ======== >>> from sympy import Symbol, Matrix, Abs, sqrt, Q >>> x = Symbol('x') >>> Matrix([[Abs(x)2, sqrt(x2)],[sqrt(x2), Abs(x)2]]) Matrix([ [ Abs(x)2, sqrt(x2)], [sqrt(x2), Abs(x)2]]) >>> _.refine(Q.real(x)) Matrix([ [ x2, Abs(x)], [Abs(x), x2]]) """ return self.applyfunc(lambda x: refine(x, assumptions)) def replace(self, F, G, map=False): """Replaces Function F in Matrix entries with Function G. Examples ======== >>> from sympy import symbols, Function, Matrix >>> F, G = symbols('F, G', cls=Function) >>> M = Matrix(2, 2, lambda i, j: F(i+j)) ; M Matrix([ [F(0), F(1)], [F(1), F(2)]]) >>> N = M.replace(F,G) >>> N Matrix([ [G(0), G(1)], [G(1), G(2)]]) """ return self.applyfunc(lambda x: x.replace(F, G, map)) def simplify(self, kwargs): """Apply simplify to each element of the matrix. Examples ======== >>> from sympy.abc import x, y >>> from sympy import sin, cos >>> from sympy.matrices import SparseMatrix >>> SparseMatrix(1, 1, [xsin(y)*2 + xcos(y)*2]) Matrix([[xsin(y)*2 + xcos(y)2]]) >>> _.simplify() Matrix([[x]]) """ return self.applyfunc(lambda x: x.simplify(kwargs)) def subs(self, args, kwargs): # should mirror core.basic.subs """Return a new matrix with subs applied to each entry. Examples ======== >>> from sympy.abc import x, y >>> from sympy.matrices import SparseMatrix, Matrix >>> SparseMatrix(1, 1, [x]) Matrix([[x]]) >>> _.subs(x, y) Matrix([[y]]) >>> Matrix(_).subs(y, x) Matrix([[x]]) """ return self.applyfunc(lambda x: x.subs(args, kwargs)) def trace(self): """ Returns the trace of a square matrix i.e. the sum of the diagonal elements. Examples ======== >>> from sympy import Matrix >>> A = Matrix(2, 2, [1, 2, 3, 4]) >>> A.trace() 5 """ if self.rows != self.cols: raise NonSquareMatrixError() return self._eval_trace() def transpose(self): """ Returns the transpose of the matrix. Examples ======== >>> from sympy import Matrix >>> A = Matrix(2, 2, [1, 2, 3, 4]) >>> A.transpose() Matrix([ [1, 3], [2, 4]]) >>> from sympy import Matrix, I >>> m=Matrix(((1, 2+I), (3, 4))) >>> m Matrix([ [1, 2 + I], [3, 4]]) >>> m.transpose() Matrix([ [ 1, 3], [2 + I, 4]]) >>> m.T == m.transpose() True See Also ======== conjugate: By-element conjugation """ return self._eval_transpose() T = property(transpose, None, None, "Matrix transposition.") C = property(conjugate, None, None, "By-element conjugation.") n = evalf def xreplace(self, rule): # should mirror core.basic.xreplace """Return a new matrix with xreplace applied to each entry. Examples ======== >>> from sympy.abc import x, y >>> from sympy.matrices import SparseMatrix, Matrix >>> SparseMatrix(1, 1, [x]) Matrix([[x]]) >>> _.xreplace({x: y}) Matrix([[y]]) >>> Matrix(_).xreplace({y: x}) Matrix([[x]]) """ return self.applyfunc(lambda x: x.xreplace(rule)) _eval_simplify = simplify def _eval_trigsimp(self, opts): from sympy.simplify import trigsimp return self.applyfunc(lambda x: trigsimp(x, *opts)) class MatrixArithmetic(MatrixRequired): """Provides basic matrix arithmetic operations. Should not be instantiated directly.""" _op_priority = 10.01 def _eval_Abs(self): return self._new(self.rows, self.cols, lambda i, j: Abs(self[i, j])) def _eval_add(self, other): return self._new(self.rows, self.cols, lambda i, j: self[i, j] + other[i, j]) def _eval_matrix_mul(self, other): def entry(i, j): try: return sum(self[i,k]other[k,j] for k in range(self.cols)) except TypeError: # Block matrices don't work with `sum` or `Add` (ISSUE #11599) # They don't work with `sum` because `sum` tries to add `0` # initially, and for a matrix, that is a mix of a scalar and # a matrix, which raises a TypeError. Fall back to a # block-matrix-safe way to multiply if the `sum` fails. ret = self[i, 0]other[0, j] for k in range(1, self.cols): ret += self[i, k]other[k, j] return ret return self._new(self.rows, other.cols, entry) def _eval_matrix_mul_elementwise(self, other): return self._new(self.rows, self.cols, lambda i, j: self[i,j]other[i,j]) def _eval_matrix_rmul(self, other): def entry(i, j): return sum(other[i,k]self[k,j] for k in range(other.cols)) return self._new(other.rows, self.cols, entry) def _eval_pow_by_recursion(self, num): if num == 1: return self if num % 2 == 1: return self * self._eval_pow_by_recursion(num - 1) ret = self._eval_pow_by_recursion(num // 2) return ret * ret def _eval_scalar_mul(self, other): return self._new(self.rows, self.cols, lambda i, j: self[i,j]other) def _eval_scalar_rmul(self, other): return self._new(self.rows, self.cols, lambda i, j: otherself[i,j]) def _eval_Mod(self, other): from sympy import Mod return self._new(self.rows, self.cols, lambda i, j: Mod(self[i, j], other)) # python arithmetic functions def __abs__(self): """Returns a new matrix with entry-wise absolute values.""" return self._eval_Abs() @call_highest_priority('__radd__') def __add__(self, other): """Return self + other, raising ShapeError if shapes don't match.""" other = _matrixify(other) # matrix-like objects can have shapes. This is # our first sanity check. if hasattr(other, 'shape'): if self.shape != other.shape: raise ShapeError("Matrix size mismatch: %s + %s" % ( self.shape, other.shape)) # honest sympy matrices defer to their class's routine if getattr(other, 'is_Matrix', False): # call the highest-priority class's _eval_add a, b = self, other if a.__class__ != classof(a, b): b, a = a, b return a._eval_add(b) # Matrix-like objects can be passed to CommonMatrix routines directly. if getattr(other, 'is_MatrixLike', False): return MatrixArithmetic._eval_add(self, other) raise TypeError('cannot add %s and %s' % (type(self), type(other))) @call_highest_priority('__rdiv__') def __div__(self, other): return self * (self.one / other) @call_highest_priority('__rmatmul__') def __matmul__(self, other): other = _matrixify(other) if not getattr(other, 'is_Matrix', False) and not getattr(other, 'is_MatrixLike', False): return NotImplemented return self.__mul__(other) def __mod__(self, other): return self.applyfunc(lambda x: x % other) @call_highest_priority('__rmul__') def __mul__(self, other): """Return selfother where other is either a scalar or a matrix of compatible dimensions. Examples ======== >>> from sympy.matrices import Matrix >>> A = Matrix([[1, 2, 3], [4, 5, 6]]) >>> 2A == A2 == Matrix([[2, 4, 6], [8, 10, 12]]) True >>> B = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) >>> AB Matrix([ [30, 36, 42], [66, 81, 96]]) >>> BA Traceback (most recent call last): ... ShapeError: Matrices size mismatch. >>> See Also ======== matrix_multiply_elementwise """ other = _matrixify(other) # matrix-like objects can have shapes. This is # our first sanity check. if hasattr(other, 'shape') and len(other.shape) == 2: if self.shape[1] != other.shape[0]: raise ShapeError("Matrix size mismatch: %s %s." % ( self.shape, other.shape)) # honest sympy matrices defer to their class's routine if getattr(other, 'is_Matrix', False): return self._eval_matrix_mul(other) # Matrix-like objects can be passed to CommonMatrix routines directly. if getattr(other, 'is_MatrixLike', False): return MatrixArithmetic._eval_matrix_mul(self, other) # if 'other' is not iterable then scalar multiplication. if not isinstance(other, Iterable): try: return self._eval_scalar_mul(other) except TypeError: pass return NotImplemented def __neg__(self): return self._eval_scalar_mul(-1) @call_highest_priority('__rpow__') def __pow__(self, exp): if self.rows != self.cols: raise NonSquareMatrixError() a = self jordan_pow = getattr(a, '_matrix_pow_by_jordan_blocks', None) exp = sympify(exp) if exp.is_zero: return a._new(a.rows, a.cols, lambda i, j: int(i == j)) if exp == 1: return a diagonal = getattr(a, 'is_diagonal', None) if diagonal is not None and diagonal(): return a._new(a.rows, a.cols, lambda i, j: a[i,j]exp if i == j else 0) if exp.is_Number and exp % 1 == 0: if a.rows == 1: return a._new([[a[0]exp]]) if exp < 0: exp = -exp a = a.inv() # When certain conditions are met, # Jordan block algorithm is faster than # computation by recursion. elif a.rows == 2 and exp > 100000 and jordan_pow is not None: try: return jordan_pow(exp) except MatrixError: pass return a._eval_pow_by_recursion(exp) if jordan_pow: try: return jordan_pow(exp) except NonInvertibleMatrixError: # Raised by jordan_pow on zero determinant matrix unless exp is # definitely known to be a non-negative integer. # Here we raise if n is definitely not a non-negative integer # but otherwise we can leave this as an unevaluated MatPow. if exp.is_integer is False or exp.is_nonnegative is False: raise from sympy.matrices.expressions import MatPow return MatPow(a, exp) @call_highest_priority('__add__') def __radd__(self, other): return self + other @call_highest_priority('__matmul__') def __rmatmul__(self, other): other = _matrixify(other) if not getattr(other, 'is_Matrix', False) and not getattr(other, 'is_MatrixLike', False): return NotImplemented return self.__rmul__(other) @call_highest_priority('__mul__') def __rmul__(self, other): other = _matrixify(other) # matrix-like objects can have shapes. This is # our first sanity check. if hasattr(other, 'shape') and len(other.shape) == 2: if self.shape[0] != other.shape[1]: raise ShapeError("Matrix size mismatch.") # honest sympy matrices defer to their class's routine if getattr(other, 'is_Matrix', False): return other._new(other.as_mutable() * self) # Matrix-like objects can be passed to CommonMatrix routines directly. if getattr(other, 'is_MatrixLike', False): return MatrixArithmetic._eval_matrix_rmul(self, other) # if 'other' is not iterable then scalar multiplication. if not isinstance(other, Iterable): try: return self._eval_scalar_rmul(other) except TypeError: pass return NotImplemented @call_highest_priority('__sub__') def __rsub__(self, a): return (-self) + a @call_highest_priority('__rsub__') def __sub__(self, a): return self + (-a) @call_highest_priority('__rtruediv__') def __truediv__(self, other): return self.__div__(other) def multiply_elementwise(self, other): """Return the Hadamard product (elementwise product) of A and B Examples ======== >>> from sympy.matrices import Matrix >>> A = Matrix([[0, 1, 2], [3, 4, 5]]) >>> B = Matrix([[1, 10, 100], [100, 10, 1]]) >>> A.multiply_elementwise(B) Matrix([ [ 0, 10, 200], [300, 40, 5]]) See Also ======== cross dot multiply """ if self.shape != other.shape: raise ShapeError("Matrix shapes must agree {} != {}".format(self.shape, other.shape)) return self._eval_matrix_mul_elementwise(other) class MatrixCommon(MatrixArithmetic, MatrixOperations, MatrixProperties, MatrixSpecial, MatrixShaping): """All common matrix operations including basic arithmetic, shaping, and special matrices like `zeros`, and `eye`.""" _diff_wrt = True class _MinimalMatrix(object): """Class providing the minimum functionality for a matrix-like object and implementing every method required for a `MatrixRequired`. This class does not have everything needed to become a full-fledged SymPy object, but it will satisfy the requirements of anything inheriting from `MatrixRequired`. If you wish to make a specialized matrix type, make sure to implement these methods and properties with the exception of `__init__` and `__repr__` which are included for convenience.""" is_MatrixLike = True _sympify = staticmethod(sympify) _class_priority = 3 zero = S.Zero one = S.One is_Matrix = True is_MatrixExpr = False @classmethod def _new(cls, args, kwargs): return cls(args, *kwargs) def __init__(self, rows, cols=None, mat=None): if isfunction(mat): # if we passed in a function, use that to populate the indices mat = list(mat(i, j) for i in range(rows) for j in range(cols)) if cols is None and mat is None: mat = rows rows, cols = getattr(mat, 'shape', (rows, cols)) try: # if we passed in a list of lists, flatten it and set the size if cols is None and mat is None: mat = rows cols = len(mat[0]) rows = len(mat) mat = [x for l in mat for x in l] except (IndexError, TypeError): pass self.mat = tuple(self._sympify(x) for x in mat) self.rows, self.cols = rows, cols if self.rows is None or self.cols is None: raise NotImplementedError("Cannot initialize matrix with given parameters") def __getitem__(self, key): def _normalize_slices(row_slice, col_slice): """Ensure that row_slice and col_slice don't have `None` in their arguments. Any integers are converted to slices of length 1""" if not isinstance(row_slice, slice): row_slice = slice(row_slice, row_slice + 1, None) row_slice = slice(row_slice.indices(self.rows)) if not isinstance(col_slice, slice): col_slice = slice(col_slice, col_slice + 1, None) col_slice = slice(col_slice.indices(self.cols)) return (row_slice, col_slice) def _coord_to_index(i, j): """Return the index in _mat corresponding to the (i,j) position in the matrix. """ return i self.cols + j if isinstance(key, tuple): i, j = key if isinstance(i, slice) or isinstance(j, slice): # if the coordinates are not slices, make them so # and expand the slices so they don't contain `None` i, j = _normalize_slices(i, j) rowsList, colsList = list(range(self.rows))[i], \ list(range(self.cols))[j] indices = (i * self.cols + j for i in rowsList for j in colsList) return self._new(len(rowsList), len(colsList), list(self.mat[i] for i in indices)) # if the key is a tuple of ints, change # it to an array index key = _coord_to_index(i, j) return self.mat[key] def __eq__(self, other): try: classof(self, other) except TypeError: return False return ( self.shape == other.shape and list(self) == list(other)) def __len__(self): return self.rows*self.cols def __repr__(self): return "_MinimalMatrix({}, {}, {})".format(self.rows, self.cols, self.mat) @property def shape(self): return (self.rows, self.cols) class _MatrixWrapper(object): """Wrapper class providing the minimum functionality for a matrix-like object: .rows, .cols, .shape, indexability, and iterability. CommonMatrix math operations should work on matrix-like objects. For example, wrapping a numpy matrix in a MatrixWrapper allows it to be passed to CommonMatrix. """ is_MatrixLike = True def __init__(self, mat, shape=None): self.mat = mat self.rows, self.cols = mat.shape if shape is None else shape def __getattr__(self, attr): """Most attribute access is passed straight through to the stored matrix""" return getattr(self.mat, attr) def __getitem__(self, key): return self.mat.__getitem__(key) def _matrixify(mat): """If `mat` is a Matrix or is matrix-like, return a Matrix or MatrixWrapper object. Otherwise `mat` is passed through without modification.""" if getattr(mat, 'is_Matrix', False): return mat if hasattr(mat, 'shape'): if len(mat.shape) == 2: return _MatrixWrapper(mat) return mat def a2idx(j, n=None): """Return integer after making positive and validating against n.""" if type(j) is not int: jindex = getattr(j, '__index__', None) if jindex is not None: j = jindex() else: raise IndexError("Invalid index a[%r]" % (j,)) if n is not None: if j < 0: j += n if not (j >= 0 and j < n): raise IndexError("Index out of range: a[%s]" % (j,)) return int(j) def classof(A, B): """ Get the type of the result when combining matrices of different types. Currently the strategy is that immutability is contagious. Examples ======== >>> from sympy import Matrix, ImmutableMatrix >>> from sympy.matrices.common import classof >>> M = Matrix([[1, 2], [3, 4]]) # a Mutable Matrix >>> IM = ImmutableMatrix([[1, 2], [3, 4]]) >>> classof(M, IM) <class 'sympy.matrices.immutable.ImmutableDenseMatrix'> """ priority_A = getattr(A, '_class_priority', None) priority_B = getattr(B, '_class_priority', None) if None not in (priority_A, priority_B): if A._class_priority > B._class_priority: return A.__class__ else: return B.__class__ try: import numpy except ImportError: pass else: if isinstance(A, numpy.ndarray): return B.__class__ if isinstance(B, numpy.ndarray): return A.__class__ raise TypeError("Incompatible classes %s, %s" % (A.__class__, B.__class__))
36a52de3b875748c6042092832d2171e67f7b34cf73fd72da2b0474ecec0a26f	from __future__ import division, print_function import random from sympy.core import SympifyError from sympy.core.basic import Basic from sympy.core.compatibility import is_sequence, range, reduce from sympy.core.expr import Expr from sympy.core.function import count_ops, expand_mul from sympy.core.singleton import S from sympy.core.symbol import Symbol from sympy.core.sympify import sympify from sympy.functions.elementary.miscellaneous import sqrt from sympy.functions.elementary.trigonometric import cos, sin from sympy.matrices.common import \ a2idx, classof, ShapeError, NonPositiveDefiniteMatrixError from sympy.matrices.matrices import MatrixBase from sympy.simplify import simplify as _simplify from sympy.utilities.decorator import doctest_depends_on from sympy.utilities.misc import filldedent def _iszero(x): """Returns True if x is zero.""" return x.is_zero def _compare_sequence(a, b): """Compares the elements of a list/tuple `a` and a list/tuple `b`. `_compare_sequence((1,2), [1, 2])` is True, whereas `(1,2) == [1, 2]` is False""" if type(a) is type(b): # if they are the same type, compare directly return a == b # there is no overhead for calling `tuple` on a # tuple return tuple(a) == tuple(b) class DenseMatrix(MatrixBase): is_MatrixExpr = False _op_priority = 10.01 _class_priority = 4 def __eq__(self, other): other = sympify(other) self_shape = getattr(self, 'shape', None) other_shape = getattr(other, 'shape', None) if None in (self_shape, other_shape): return False if self_shape != other_shape: return False if isinstance(other, Matrix): return _compare_sequence(self._mat, other._mat) elif isinstance(other, MatrixBase): return _compare_sequence(self._mat, Matrix(other)._mat) def __getitem__(self, key): """Return portion of self defined by key. If the key involves a slice then a list will be returned (if key is a single slice) or a matrix (if key was a tuple involving a slice). Examples ======== >>> from sympy import Matrix, I >>> m = Matrix([ ... [1, 2 + I], ... [3, 4 ]]) If the key is a tuple that doesn't involve a slice then that element is returned: >>> m[1, 0] 3 When a tuple key involves a slice, a matrix is returned. Here, the first column is selected (all rows, column 0): >>> m[:, 0] Matrix([ [1], [3]]) If the slice is not a tuple then it selects from the underlying list of elements that are arranged in row order and a list is returned if a slice is involved: >>> m[0] 1 >>> m[::2] [1, 3] """ if isinstance(key, tuple): i, j = key try: i, j = self.key2ij(key) return self._mat[iself.cols + j] except (TypeError, IndexError): if (isinstance(i, Expr) and not i.is_number) or (isinstance(j, Expr) and not j.is_number): if ((j < 0) is True) or ((j >= self.shape[1]) is True) or\ ((i < 0) is True) or ((i >= self.shape[0]) is True): raise ValueError("index out of boundary") from sympy.matrices.expressions.matexpr import MatrixElement return MatrixElement(self, i, j) if isinstance(i, slice): # XXX remove list() when PY2 support is dropped i = list(range(self.rows))[i] elif is_sequence(i): pass else: i = [i] if isinstance(j, slice): # XXX remove list() when PY2 support is dropped j = list(range(self.cols))[j] elif is_sequence(j): pass else: j = [j] return self.extract(i, j) else: # row-wise decomposition of matrix if isinstance(key, slice): return self._mat[key] return self._mat[a2idx(key)] def __setitem__(self, key, value): raise NotImplementedError() def _cholesky(self, hermitian=True): """Helper function of cholesky. Without the error checks. To be used privately. Implements the Cholesky-Banachiewicz algorithm. Returns L such that LL.H == self if hermitian flag is True, or LL.T == self if hermitian is False. """ L = zeros(self.rows, self.rows) if hermitian: for i in range(self.rows): for j in range(i): L[i, j] = (1 / L[j, j])expand_mul(self[i, j] - sum(L[i, k]L[j, k].conjugate() for k in range(j))) Lii2 = expand_mul(self[i, i] - sum(L[i, k]L[i, k].conjugate() for k in range(i))) if Lii2.is_positive is False: raise NonPositiveDefiniteMatrixError( "Matrix must be positive-definite") L[i, i] = sqrt(Lii2) else: for i in range(self.rows): for j in range(i): L[i, j] = (1 / L[j, j])(self[i, j] - sum(L[i, k]L[j, k] for k in range(j))) L[i, i] = sqrt(self[i, i] - sum(L[i, k]*2 for k in range(i))) return self._new(L) def _diagonal_solve(self, rhs): """Helper function of function diagonal_solve, without the error checks, to be used privately. """ return self._new(rhs.rows, rhs.cols, lambda i, j: rhs[i, j] / self[i, i]) def _eval_add(self, other): # we assume both arguments are dense matrices since # sparse matrices have a higher priority mat = [a + b for a,b in zip(self._mat, other._mat)] return classof(self, other)._new(self.rows, self.cols, mat, copy=False) def _eval_extract(self, rowsList, colsList): mat = self._mat cols = self.cols indices = (i cols + j for i in rowsList for j in colsList) return self._new(len(rowsList), len(colsList), list(mat[i] for i in indices), copy=False) def _eval_matrix_mul(self, other): from sympy import Add # cache attributes for faster access self_rows, self_cols = self.rows, self.cols other_rows, other_cols = other.rows, other.cols other_len = other_rows * other_cols new_mat_rows = self.rows new_mat_cols = other.cols # preallocate the array new_mat = [self.zero]new_mat_rowsnew_mat_cols # if we multiply an n x 0 with a 0 x m, the # expected behavior is to produce an n x m matrix of zeros if self.cols != 0 and other.rows != 0: # cache self._mat and other._mat for performance mat = self._mat other_mat = other._mat for i in range(len(new_mat)): row, col = i // new_mat_cols, i % new_mat_cols row_indices = range(self_colsrow, self_cols(row+1)) col_indices = range(col, other_len, other_cols) vec = (mat[a]other_mat[b] for a,b in zip(row_indices, col_indices)) try: new_mat[i] = Add(vec) except (TypeError, SympifyError): # Block matrices don't work with `sum` or `Add` (ISSUE #11599) # They don't work with `sum` because `sum` tries to add `0` # initially, and for a matrix, that is a mix of a scalar and # a matrix, which raises a TypeError. Fall back to a # block-matrix-safe way to multiply if the `sum` fails. vec = (mat[a]other_mat[b] for a,b in zip(row_indices, col_indices)) new_mat[i] = reduce(lambda a,b: a + b, vec) return classof(self, other)._new(new_mat_rows, new_mat_cols, new_mat, copy=False) def _eval_matrix_mul_elementwise(self, other): mat = [ab for a,b in zip(self._mat, other._mat)] return classof(self, other)._new(self.rows, self.cols, mat, copy=False) def _eval_inverse(self, *kwargs): """Return the matrix inverse using the method indicated (default is Gauss elimination). kwargs ====== method : ('GE', 'LU', or 'ADJ') iszerofunc try_block_diag Notes ===== According to the ``method`` keyword, it calls the appropriate method: GE .... inverse_GE(); default LU .... inverse_LU() ADJ ... inverse_ADJ() According to the ``try_block_diag`` keyword, it will try to form block diagonal matrices using the method get_diag_blocks(), invert these individually, and then reconstruct the full inverse matrix. Note, the GE and LU methods may require the matrix to be simplified before it is inverted in order to properly detect zeros during pivoting. In difficult cases a custom zero detection function can be provided by setting the ``iszerosfunc`` argument to a function that should return True if its argument is zero. The ADJ routine computes the determinant and uses that to detect singular matrices in addition to testing for zeros on the diagonal. See Also ======== inverse_LU inverse_GE inverse_ADJ """ from sympy.matrices import diag method = kwargs.get('method', 'GE') iszerofunc = kwargs.get('iszerofunc', _iszero) if kwargs.get('try_block_diag', False): blocks = self.get_diag_blocks() r = [] for block in blocks: r.append(block.inv(method=method, iszerofunc=iszerofunc)) return diag(r) M = self.as_mutable() if method == "GE": rv = M.inverse_GE(iszerofunc=iszerofunc) elif method == "LU": rv = M.inverse_LU(iszerofunc=iszerofunc) elif method == "ADJ": rv = M.inverse_ADJ(iszerofunc=iszerofunc) else: # make sure to add an invertibility check (as in inverse_LU) # if a new method is added. raise ValueError("Inversion method unrecognized") return self._new(rv) def _eval_scalar_mul(self, other): mat = [othera for a in self._mat] return self._new(self.rows, self.cols, mat, copy=False) def _eval_scalar_rmul(self, other): mat = [aother for a in self._mat] return self._new(self.rows, self.cols, mat, copy=False) def _eval_tolist(self): mat = list(self._mat) cols = self.cols return [mat[icols:(i + 1)cols] for i in range(self.rows)] def _LDLdecomposition(self, hermitian=True): """Helper function of LDLdecomposition. Without the error checks. To be used privately. Returns L and D such that LDL.H == self if hermitian flag is True, or LDL.T == self if hermitian is False. """ # https://en.wikipedia.org/wiki/Cholesky_decomposition#LDL_decomposition_2 D = zeros(self.rows, self.rows) L = eye(self.rows) if hermitian: for i in range(self.rows): for j in range(i): L[i, j] = (1 / D[j, j])expand_mul(self[i, j] - sum( L[i, k]L[j, k].conjugate()D[k, k] for k in range(j))) D[i, i] = expand_mul(self[i, i] - sum(L[i, k]L[i, k].conjugate()D[k, k] for k in range(i))) if D[i, i].is_positive is False: raise NonPositiveDefiniteMatrixError( "Matrix must be positive-definite") else: for i in range(self.rows): for j in range(i): L[i, j] = (1 / D[j, j])(self[i, j] - sum( L[i, k]L[j, k]D[k, k] for k in range(j))) D[i, i] = self[i, i] - sum(L[i, k]*2D[k, k] for k in range(i)) return self._new(L), self._new(D) def _lower_triangular_solve(self, rhs): """Helper function of function lower_triangular_solve. Without the error checks. To be used privately. """ X = zeros(self.rows, rhs.cols) for j in range(rhs.cols): for i in range(self.rows): if self[i, i] == 0: raise TypeError("Matrix must be non-singular.") X[i, j] = (rhs[i, j] - sum(self[i, k]X[k, j] for k in range(i))) / self[i, i] return self._new(X) def _upper_triangular_solve(self, rhs): """Helper function of function upper_triangular_solve. Without the error checks, to be used privately. """ X = zeros(self.rows, rhs.cols) for j in range(rhs.cols): for i in reversed(range(self.rows)): if self[i, i] == 0: raise ValueError("Matrix must be non-singular.") X[i, j] = (rhs[i, j] - sum(self[i, k]X[k, j] for k in range(i + 1, self.rows))) / self[i, i] return self._new(X) def as_immutable(self): """Returns an Immutable version of this Matrix """ from .immutable import ImmutableDenseMatrix as cls if self.rows and self.cols: return cls._new(self.tolist()) return cls._new(self.rows, self.cols, []) def as_mutable(self): """Returns a mutable version of this matrix Examples ======== >>> from sympy import ImmutableMatrix >>> X = ImmutableMatrix([[1, 2], [3, 4]]) >>> Y = X.as_mutable() >>> Y[1, 1] = 5 # Can set values in Y >>> Y Matrix([ [1, 2], [3, 5]]) """ return Matrix(self) def equals(self, other, failing_expression=False): """Applies ``equals`` to corresponding elements of the matrices, trying to prove that the elements are equivalent, returning True if they are, False if any pair is not, and None (or the first failing expression if failing_expression is True) if it cannot be decided if the expressions are equivalent or not. This is, in general, an expensive operation. Examples ======== >>> from sympy.matrices import Matrix >>> from sympy.abc import x >>> from sympy import cos >>> A = Matrix([x(x - 1), 0]) >>> B = Matrix([x2 - x, 0]) >>> A == B False >>> A.simplify() == B.simplify() True >>> A.equals(B) True >>> A.equals(2) False See Also ======== sympy.core.expr.equals """ self_shape = getattr(self, 'shape', None) other_shape = getattr(other, 'shape', None) if None in (self_shape, other_shape): return False if self_shape != other_shape: return False rv = True for i in range(self.rows): for j in range(self.cols): ans = self[i, j].equals(other[i, j], failing_expression) if ans is False: return False elif ans is not True and rv is True: rv = ans return rv def _force_mutable(x): """Return a matrix as a Matrix, otherwise return x.""" if getattr(x, 'is_Matrix', False): return x.as_mutable() elif isinstance(x, Basic): return x elif hasattr(x, '__array__'): a = x.__array__() if len(a.shape) == 0: return sympify(a) return Matrix(x) return x class MutableDenseMatrix(DenseMatrix, MatrixBase): def __new__(cls, args, *kwargs): return cls._new(args, *kwargs) @classmethod def _new(cls, args, *kwargs): # if the `copy` flag is set to False, the input # was rows, cols, [list]. It should be used directly # without creating a copy. if kwargs.get('copy', True) is False: if len(args) != 3: raise TypeError("'copy=False' requires a matrix be initialized as rows,cols,[list]") rows, cols, flat_list = args else: rows, cols, flat_list = cls._handle_creation_inputs(args, *kwargs) flat_list = list(flat_list) # create a shallow copy self = object.__new__(cls) self.rows = rows self.cols = cols self._mat = flat_list return self def __setitem__(self, key, value): """ Examples ======== >>> from sympy import Matrix, I, zeros, ones >>> m = Matrix(((1, 2+I), (3, 4))) >>> m Matrix([ [1, 2 + I], [3, 4]]) >>> m[1, 0] = 9 >>> m Matrix([ [1, 2 + I], [9, 4]]) >>> m[1, 0] = [[0, 1]] To replace row r you assign to position rm where m is the number of columns: >>> M = zeros(4) >>> m = M.cols >>> M[3m] = ones(1, m)2; M Matrix([ [0, 0, 0, 0], [0, 0, 0, 0], [0, 0, 0, 0], [2, 2, 2, 2]]) And to replace column c you can assign to position c: >>> M[2] = ones(m, 1)4; M Matrix([ [0, 0, 4, 0], [0, 0, 4, 0], [0, 0, 4, 0], [2, 2, 4, 2]]) """ rv = self._setitem(key, value) if rv is not None: i, j, value = rv self._mat[iself.cols + j] = value def as_mutable(self): return self.copy() def col_del(self, i): """Delete the given column. Examples ======== >>> from sympy.matrices import eye >>> M = eye(3) >>> M.col_del(1) >>> M Matrix([ [1, 0], [0, 0], [0, 1]]) See Also ======== col row_del """ if i < -self.cols or i >= self.cols: raise IndexError("Index out of range: 'i=%s', valid -%s <= i < %s" % (i, self.cols, self.cols)) for j in range(self.rows - 1, -1, -1): del self._mat[i + jself.cols] self.cols -= 1 def col_op(self, j, f): """In-place operation on col j using two-arg functor whose args are interpreted as (self[i, j], i). Examples ======== >>> from sympy.matrices import eye >>> M = eye(3) >>> M.col_op(1, lambda v, i: v + 2M[i, 0]); M Matrix([ [1, 2, 0], [0, 1, 0], [0, 0, 1]]) See Also ======== col row_op """ self._mat[j::self.cols] = [f(t) for t in list(zip(self._mat[j::self.cols], list(range(self.rows))))] def col_swap(self, i, j): """Swap the two given columns of the matrix in-place. Examples ======== >>> from sympy.matrices import Matrix >>> M = Matrix([[1, 0], [1, 0]]) >>> M Matrix([ [1, 0], [1, 0]]) >>> M.col_swap(0, 1) >>> M Matrix([ [0, 1], [0, 1]]) See Also ======== col row_swap """ for k in range(0, self.rows): self[k, i], self[k, j] = self[k, j], self[k, i] def copyin_list(self, key, value): """Copy in elements from a list. Parameters ========== key : slice The section of this matrix to replace. value : iterable The iterable to copy values from. Examples ======== >>> from sympy.matrices import eye >>> I = eye(3) >>> I[:2, 0] = [1, 2] # col >>> I Matrix([ [1, 0, 0], [2, 1, 0], [0, 0, 1]]) >>> I[1, :2] = [[3, 4]] >>> I Matrix([ [1, 0, 0], [3, 4, 0], [0, 0, 1]]) See Also ======== copyin_matrix """ if not is_sequence(value): raise TypeError("`value` must be an ordered iterable, not %s." % type(value)) return self.copyin_matrix(key, Matrix(value)) def copyin_matrix(self, key, value): """Copy in values from a matrix into the given bounds. Parameters ========== key : slice The section of this matrix to replace. value : Matrix The matrix to copy values from. Examples ======== >>> from sympy.matrices import Matrix, eye >>> M = Matrix([[0, 1], [2, 3], [4, 5]]) >>> I = eye(3) >>> I[:3, :2] = M >>> I Matrix([ [0, 1, 0], [2, 3, 0], [4, 5, 1]]) >>> I[0, 1] = M >>> I Matrix([ [0, 0, 1], [2, 2, 3], [4, 4, 5]]) See Also ======== copyin_list """ rlo, rhi, clo, chi = self.key2bounds(key) shape = value.shape dr, dc = rhi - rlo, chi - clo if shape != (dr, dc): raise ShapeError(filldedent("The Matrix `value` doesn't have the " "same dimensions " "as the in sub-Matrix given by `key`.")) for i in range(value.rows): for j in range(value.cols): self[i + rlo, j + clo] = value[i, j] def fill(self, value): """Fill the matrix with the scalar value. See Also ======== zeros ones """ self._mat = [value]len(self) def row_del(self, i): """Delete the given row. Examples ======== >>> from sympy.matrices import eye >>> M = eye(3) >>> M.row_del(1) >>> M Matrix([ [1, 0, 0], [0, 0, 1]]) See Also ======== row col_del """ if i < -self.rows or i >= self.rows: raise IndexError("Index out of range: 'i = %s', valid -%s <= i" " < %s" % (i, self.rows, self.rows)) if i < 0: i += self.rows del self._mat[iself.cols:(i+1)self.cols] self.rows -= 1 def row_op(self, i, f): """In-place operation on row ``i`` using two-arg functor whose args are interpreted as ``(self[i, j], j)``. Examples ======== >>> from sympy.matrices import eye >>> M = eye(3) >>> M.row_op(1, lambda v, j: v + 2M[0, j]); M Matrix([ [1, 0, 0], [2, 1, 0], [0, 0, 1]]) See Also ======== row zip_row_op col_op """ i0 = iself.cols ri = self._mat[i0: i0 + self.cols] self._mat[i0: i0 + self.cols] = [f(x, j) for x, j in zip(ri, list(range(self.cols)))] def row_swap(self, i, j): """Swap the two given rows of the matrix in-place. Examples ======== >>> from sympy.matrices import Matrix >>> M = Matrix([[0, 1], [1, 0]]) >>> M Matrix([ [0, 1], [1, 0]]) >>> M.row_swap(0, 1) >>> M Matrix([ [1, 0], [0, 1]]) See Also ======== row col_swap """ for k in range(0, self.cols): self[i, k], self[j, k] = self[j, k], self[i, k] def simplify(self, kwargs): """Applies simplify to the elements of a matrix in place. This is a shortcut for M.applyfunc(lambda x: simplify(x, ratio, measure)) See Also ======== sympy.simplify.simplify.simplify """ for i in range(len(self._mat)): self._mat[i] = _simplify(self._mat[i], kwargs) def zip_row_op(self, i, k, f): """In-place operation on row ``i`` using two-arg functor whose args are interpreted as ``(self[i, j], self[k, j])``. Examples ======== >>> from sympy.matrices import eye >>> M = eye(3) >>> M.zip_row_op(1, 0, lambda v, u: v + 2u); M Matrix([ [1, 0, 0], [2, 1, 0], [0, 0, 1]]) See Also ======== row row_op col_op """ i0 = iself.cols k0 = kself.cols ri = self._mat[i0: i0 + self.cols] rk = self._mat[k0: k0 + self.cols] self._mat[i0: i0 + self.cols] = [f(x, y) for x, y in zip(ri, rk)] # Utility functions MutableMatrix = Matrix = MutableDenseMatrix ########### # Numpy Utility Functions: # list2numpy, matrix2numpy, symmarray, rot_axis[123] ########### def list2numpy(l, dtype=object): # pragma: no cover """Converts python list of SymPy expressions to a NumPy array. See Also ======== matrix2numpy """ from numpy import empty a = empty(len(l), dtype) for i, s in enumerate(l): a[i] = s return a def matrix2numpy(m, dtype=object): # pragma: no cover """Converts SymPy's matrix to a NumPy array. See Also ======== list2numpy """ from numpy import empty a = empty(m.shape, dtype) for i in range(m.rows): for j in range(m.cols): a[i, j] = m[i, j] return a def rot_axis3(theta): """Returns a rotation matrix for a rotation of theta (in radians) about the 3-axis. Examples ======== >>> from sympy import pi >>> from sympy.matrices import rot_axis3 A rotation of pi/3 (60 degrees): >>> theta = pi/3 >>> rot_axis3(theta) Matrix([ [ 1/2, sqrt(3)/2, 0], [-sqrt(3)/2, 1/2, 0], [ 0, 0, 1]]) If we rotate by pi/2 (90 degrees): >>> rot_axis3(pi/2) Matrix([ [ 0, 1, 0], [-1, 0, 0], [ 0, 0, 1]]) See Also ======== rot_axis1: Returns a rotation matrix for a rotation of theta (in radians) about the 1-axis rot_axis2: Returns a rotation matrix for a rotation of theta (in radians) about the 2-axis """ ct = cos(theta) st = sin(theta) lil = ((ct, st, 0), (-st, ct, 0), (0, 0, 1)) return Matrix(lil) def rot_axis2(theta): """Returns a rotation matrix for a rotation of theta (in radians) about the 2-axis. Examples ======== >>> from sympy import pi >>> from sympy.matrices import rot_axis2 A rotation of pi/3 (60 degrees): >>> theta = pi/3 >>> rot_axis2(theta) Matrix([ [ 1/2, 0, -sqrt(3)/2], [ 0, 1, 0], [sqrt(3)/2, 0, 1/2]]) If we rotate by pi/2 (90 degrees): >>> rot_axis2(pi/2) Matrix([ [0, 0, -1], [0, 1, 0], [1, 0, 0]]) See Also ======== rot_axis1: Returns a rotation matrix for a rotation of theta (in radians) about the 1-axis rot_axis3: Returns a rotation matrix for a rotation of theta (in radians) about the 3-axis """ ct = cos(theta) st = sin(theta) lil = ((ct, 0, -st), (0, 1, 0), (st, 0, ct)) return Matrix(lil) def rot_axis1(theta): """Returns a rotation matrix for a rotation of theta (in radians) about the 1-axis. Examples ======== >>> from sympy import pi >>> from sympy.matrices import rot_axis1 A rotation of pi/3 (60 degrees): >>> theta = pi/3 >>> rot_axis1(theta) Matrix([ [1, 0, 0], [0, 1/2, sqrt(3)/2], [0, -sqrt(3)/2, 1/2]]) If we rotate by pi/2 (90 degrees): >>> rot_axis1(pi/2) Matrix([ [1, 0, 0], [0, 0, 1], [0, -1, 0]]) See Also ======== rot_axis2: Returns a rotation matrix for a rotation of theta (in radians) about the 2-axis rot_axis3: Returns a rotation matrix for a rotation of theta (in radians) about the 3-axis """ ct = cos(theta) st = sin(theta) lil = ((1, 0, 0), (0, ct, st), (0, -st, ct)) return Matrix(lil) @doctest_depends_on(modules=('numpy',)) def symarray(prefix, shape, kwargs): # pragma: no cover r"""Create a numpy ndarray of symbols (as an object array). The created symbols are named ``prefix_i1_i2_``... You should thus provide a non-empty prefix if you want your symbols to be unique for different output arrays, as SymPy symbols with identical names are the same object. Parameters ---------- prefix : string A prefix prepended to the name of every symbol. shape : int or tuple Shape of the created array. If an int, the array is one-dimensional; for more than one dimension the shape must be a tuple. \\kwargs : dict keyword arguments passed on to Symbol Examples ======== These doctests require numpy. >>> from sympy import symarray >>> symarray('', 3) [_0 _1 _2] If you want multiple symarrays to contain distinct symbols, you must* provide unique prefixes: >>> a = symarray('', 3) >>> b = symarray('', 3) >>> a[0] == b[0] True >>> a = symarray('a', 3) >>> b = symarray('b', 3) >>> a[0] == b[0] False Creating symarrays with a prefix: >>> symarray('a', 3) [a_0 a_1 a_2] For more than one dimension, the shape must be given as a tuple: >>> symarray('a', (2, 3)) [[a_0_0 a_0_1 a_0_2] [a_1_0 a_1_1 a_1_2]] >>> symarray('a', (2, 3, 2)) [[[a_0_0_0 a_0_0_1] [a_0_1_0 a_0_1_1] [a_0_2_0 a_0_2_1]] <BLANKLINE> [[a_1_0_0 a_1_0_1] [a_1_1_0 a_1_1_1] [a_1_2_0 a_1_2_1]]] For setting assumptions of the underlying Symbols: >>> [s.is_real for s in symarray('a', 2, real=True)] [True, True] """ from numpy import empty, ndindex arr = empty(shape, dtype=object) for index in ndindex(shape): arr[index] = Symbol('%s_%s' % (prefix, '_'.join(map(str, index))), kwargs) return arr ############### # Functions ############### def casoratian(seqs, n, zero=True): """Given linear difference operator L of order 'k' and homogeneous equation Ly = 0 we want to compute kernel of L, which is a set of 'k' sequences: a(n), b(n), ... z(n). Solutions of L are linearly independent iff their Casoratian, denoted as C(a, b, ..., z), do not vanish for n = 0. Casoratian is defined by k x k determinant:: + a(n) b(n) . . . z(n) + \| a(n+1) b(n+1) . . . z(n+1) \| \| . . . . \| \| . . . . \| \| . . . . \| + a(n+k-1) b(n+k-1) . . . z(n+k-1) + It proves very useful in rsolve_hyper() where it is applied to a generating set of a recurrence to factor out linearly dependent solutions and return a basis: >>> from sympy import Symbol, casoratian, factorial >>> n = Symbol('n', integer=True) Exponential and factorial are linearly independent: >>> casoratian([2n, factorial(n)], n) != 0 True """ seqs = list(map(sympify, seqs)) if not zero: f = lambda i, j: seqs[j].subs(n, n + i) else: f = lambda i, j: seqs[j].subs(n, i) k = len(seqs) return Matrix(k, k, f).det() def eye(args, kwargs): """Create square identity matrix n x n See Also ======== diag zeros ones """ return Matrix.eye(args, *kwargs) def diag(values, *kwargs): """Returns a matrix with the provided values placed on the diagonal. If non-square matrices are included, they will produce a block-diagonal matrix. Examples ======== This version of diag is a thin wrapper to Matrix.diag that differs in that it treats all lists like matrices -- even when a single list is given. If this is not desired, either put a `` before the list or set `unpack=True`. >>> from sympy import diag >>> diag([1, 2, 3], unpack=True) # = diag(1,2,3) or diag([1,2,3]) Matrix([ [1, 0, 0], [0, 2, 0], [0, 0, 3]]) >>> diag([1, 2, 3]) # a column vector Matrix([ [1], [2], [3]]) See Also ======== .common.MatrixCommon.eye .common.MatrixCommon.diagonal - to extract a diagonal .common.MatrixCommon.diag .expressions.blockmatrix.BlockMatrix """ # Extract any setting so we don't duplicate keywords sent # as named parameters: kw = kwargs.copy() strict = kw.pop('strict', True) # lists will be converted to Matrices unpack = kw.pop('unpack', False) return Matrix.diag(values, strict=strict, unpack=unpack, *kw) def GramSchmidt(vlist, orthonormal=False): """Apply the Gram-Schmidt process to a set of vectors. Parameters ========== vlist : List of Matrix Vectors to be orthogonalized for. orthonormal : Bool, optional If true, return an orthonormal basis. Returns ======= vlist : List of Matrix Orthogonalized vectors Notes ===== This routine is mostly duplicate from ``Matrix.orthogonalize``, except for some difference that this always raises error when linearly dependent vectors are found, and the keyword ``normalize`` has been named as ``orthonormal`` in this function. See Also ======== .matrices.MatrixSubspaces.orthogonalize References ========== .. [1] https://en.wikipedia.org/wiki/Gram%E2%80%93Schmidt_process """ return MutableDenseMatrix.orthogonalize( vlist, normalize=orthonormal, rankcheck=True ) def hessian(f, varlist, constraints=[]): """Compute Hessian matrix for a function f wrt parameters in varlist which may be given as a sequence or a row/column vector. A list of constraints may optionally be given. Examples ======== >>> from sympy import Function, hessian, pprint >>> from sympy.abc import x, y >>> f = Function('f')(x, y) >>> g1 = Function('g')(x, y) >>> g2 = x*2 + 3y >>> pprint(hessian(f, (x, y), [g1, g2])) [ d d ] [ 0 0 --(g(x, y)) --(g(x, y)) ] [ dx dy ] [ ] [ 0 0 2x 3 ] [ ] [ 2 2 ] [d d d ] [--(g(x, y)) 2x ---(f(x, y)) -----(f(x, y))] [dx 2 dy dx ] [ dx ] [ ] [ 2 2 ] [d d d ] [--(g(x, y)) 3 -----(f(x, y)) ---(f(x, y)) ] [dy dy dx 2 ] [ dy ] References ========== https://en.wikipedia.org/wiki/Hessian_matrix See Also ======== sympy.matrices.mutable.Matrix.jacobian wronskian """ # f is the expression representing a function f, return regular matrix if isinstance(varlist, MatrixBase): if 1 not in varlist.shape: raise ShapeError("`varlist` must be a column or row vector.") if varlist.cols == 1: varlist = varlist.T varlist = varlist.tolist()[0] if is_sequence(varlist): n = len(varlist) if not n: raise ShapeError("`len(varlist)` must not be zero.") else: raise ValueError("Improper variable list in hessian function") if not getattr(f, 'diff'): # check differentiability raise ValueError("Function `f` (%s) is not differentiable" % f) m = len(constraints) N = m + n out = zeros(N) for k, g in enumerate(constraints): if not getattr(g, 'diff'): # check differentiability raise ValueError("Function `f` (%s) is not differentiable" % f) for i in range(n): out[k, i + m] = g.diff(varlist[i]) for i in range(n): for j in range(i, n): out[i + m, j + m] = f.diff(varlist[i]).diff(varlist[j]) for i in range(N): for j in range(i + 1, N): out[j, i] = out[i, j] return out def jordan_cell(eigenval, n): """ Create a Jordan block: Examples ======== >>> from sympy.matrices import jordan_cell >>> from sympy.abc import x >>> jordan_cell(x, 4) Matrix([ [x, 1, 0, 0], [0, x, 1, 0], [0, 0, x, 1], [0, 0, 0, x]]) """ return Matrix.jordan_block(size=n, eigenvalue=eigenval) def matrix_multiply_elementwise(A, B): """Return the Hadamard product (elementwise product) of A and B >>> from sympy.matrices import matrix_multiply_elementwise >>> from sympy.matrices import Matrix >>> A = Matrix([[0, 1, 2], [3, 4, 5]]) >>> B = Matrix([[1, 10, 100], [100, 10, 1]]) >>> matrix_multiply_elementwise(A, B) Matrix([ [ 0, 10, 200], [300, 40, 5]]) See Also ======== __mul__ """ return A.multiply_elementwise(B) def ones(args, kwargs): """Returns a matrix of ones with ``rows`` rows and ``cols`` columns; if ``cols`` is omitted a square matrix will be returned. See Also ======== zeros eye diag """ if 'c' in kwargs: kwargs['cols'] = kwargs.pop('c') return Matrix.ones(args, *kwargs) def randMatrix(r, c=None, min=0, max=99, seed=None, symmetric=False, percent=100, prng=None): """Create random matrix with dimensions ``r`` x ``c``. If ``c`` is omitted the matrix will be square. If ``symmetric`` is True the matrix must be square. If ``percent`` is less than 100 then only approximately the given percentage of elements will be non-zero. The pseudo-random number generator used to generate matrix is chosen in the following way. If ``prng`` is supplied, it will be used as random number generator. It should be an instance of :class:`random.Random`, or at least have ``randint`` and ``shuffle`` methods with same signatures. * if ``prng`` is not supplied but ``seed`` is supplied, then new :class:`random.Random` with given ``seed`` will be created; * otherwise, a new :class:`random.Random` with default seed will be used. Examples ======== >>> from sympy.matrices import randMatrix >>> randMatrix(3) # doctest:+SKIP [25, 45, 27] [44, 54, 9] [23, 96, 46] >>> randMatrix(3, 2) # doctest:+SKIP [87, 29] [23, 37] [90, 26] >>> randMatrix(3, 3, 0, 2) # doctest:+SKIP [0, 2, 0] [2, 0, 1] [0, 0, 1] >>> randMatrix(3, symmetric=True) # doctest:+SKIP [85, 26, 29] [26, 71, 43] [29, 43, 57] >>> A = randMatrix(3, seed=1) >>> B = randMatrix(3, seed=2) >>> A == B # doctest:+SKIP False >>> A == randMatrix(3, seed=1) True >>> randMatrix(3, symmetric=True, percent=50) # doctest:+SKIP [77, 70, 0], [70, 0, 0], [ 0, 0, 88] """ if c is None: c = r # Note that ``Random()`` is equivalent to ``Random(None)`` prng = prng or random.Random(seed) if not symmetric: m = Matrix._new(r, c, lambda i, j: prng.randint(min, max)) if percent == 100: return m z = int(rc(100 - percent) // 100) m._mat[:z] = [S.Zero]z prng.shuffle(m._mat) return m # Symmetric case if r != c: raise ValueError('For symmetric matrices, r must equal c, but %i != %i' % (r, c)) m = zeros(r) ij = [(i, j) for i in range(r) for j in range(i, r)] if percent != 100: ij = prng.sample(ij, int(len(ij)percent // 100)) for i, j in ij: value = prng.randint(min, max) m[i, j] = m[j, i] = value return m def wronskian(functions, var, method='bareiss'): """ Compute Wronskian for [] of functions :: \| f1 f2 ... fn \| \| f1' f2' ... fn' \| \| . . . . \| W(f1, ..., fn) = \| . . . . \| \| . . . . \| \| (n) (n) (n) \| \| D (f1) D (f2) ... D (fn) \| see: https://en.wikipedia.org/wiki/Wronskian See Also ======== sympy.matrices.mutable.Matrix.jacobian hessian """ for index in range(0, len(functions)): functions[index] = sympify(functions[index]) n = len(functions) if n == 0: return 1 W = Matrix(n, n, lambda i, j: functions[i].diff(var, j)) return W.det(method) def zeros(args, kwargs): """Returns a matrix of zeros with ``rows`` rows and ``cols`` columns; if ``cols`` is omitted a square matrix will be returned. See Also ======== ones eye diag """ if 'c' in kwargs: kwargs['cols'] = kwargs.pop('c') return Matrix.zeros(args, **kwargs)
185701c1d060c9dd66bcc1471c46a1d9010b34dfa11d5b40d6055a5509e227d7	from __future__ import division, print_function import copy from collections import defaultdict from sympy.core.compatibility import Callable, as_int, is_sequence, range from sympy.core.containers import Dict from sympy.core.expr import Expr from sympy.core.singleton import S from sympy.functions import Abs from sympy.functions.elementary.miscellaneous import sqrt from sympy.utilities.iterables import uniq from sympy.utilities.misc import filldedent from .common import a2idx from .dense import Matrix from .matrices import MatrixBase, ShapeError class SparseMatrix(MatrixBase): """ A sparse matrix (a matrix with a large number of zero elements). Examples ======== >>> from sympy.matrices import SparseMatrix, ones >>> SparseMatrix(2, 2, range(4)) Matrix([ [0, 1], [2, 3]]) >>> SparseMatrix(2, 2, {(1, 1): 2}) Matrix([ [0, 0], [0, 2]]) A SparseMatrix can be instantiated from a ragged list of lists: >>> SparseMatrix([[1, 2, 3], [1, 2], [1]]) Matrix([ [1, 2, 3], [1, 2, 0], [1, 0, 0]]) For safety, one may include the expected size and then an error will be raised if the indices of any element are out of range or (for a flat list) if the total number of elements does not match the expected shape: >>> SparseMatrix(2, 2, [1, 2]) Traceback (most recent call last): ... ValueError: List length (2) != rowscolumns (4) Here, an error is not raised because the list is not flat and no element is out of range: >>> SparseMatrix(2, 2, [[1, 2]]) Matrix([ [1, 2], [0, 0]]) But adding another element to the first (and only) row will cause an error to be raised: >>> SparseMatrix(2, 2, [[1, 2, 3]]) Traceback (most recent call last): ... ValueError: The location (0, 2) is out of designated range: (1, 1) To autosize the matrix, pass None for rows: >>> SparseMatrix(None, [[1, 2, 3]]) Matrix([[1, 2, 3]]) >>> SparseMatrix(None, {(1, 1): 1, (3, 3): 3}) Matrix([ [0, 0, 0, 0], [0, 1, 0, 0], [0, 0, 0, 0], [0, 0, 0, 3]]) Values that are themselves a Matrix are automatically expanded: >>> SparseMatrix(4, 4, {(1, 1): ones(2)}) Matrix([ [0, 0, 0, 0], [0, 1, 1, 0], [0, 1, 1, 0], [0, 0, 0, 0]]) A ValueError is raised if the expanding matrix tries to overwrite a different element already present: >>> SparseMatrix(3, 3, {(0, 0): ones(2), (1, 1): 2}) Traceback (most recent call last): ... ValueError: collision at (1, 1) See Also ======== sympy.matrices.common.diag sympy.matrices.dense.Matrix """ def __new__(cls, args, *kwargs): self = object.__new__(cls) if len(args) == 1 and isinstance(args[0], SparseMatrix): self.rows = args[0].rows self.cols = args[0].cols self._smat = dict(args[0]._smat) return self self._smat = {} # autosizing if len(args) == 2 and args[0] is None: args = (None,) + args if len(args) == 3: r, c = args[:2] if r is c is None: self.rows = self.cols = None elif None in (r, c): raise ValueError( 'Pass rows=None and no cols for autosizing.') else: self.rows, self.cols = map(as_int, args[:2]) if isinstance(args[2], Callable): op = args[2] for i in range(self.rows): for j in range(self.cols): value = self._sympify( op(self._sympify(i), self._sympify(j))) if value: self._smat[i, j] = value elif isinstance(args[2], (dict, Dict)): def update(i, j, v): # update self._smat and make sure there are # no collisions if v: if (i, j) in self._smat and v != self._smat[i, j]: raise ValueError('collision at %s' % ((i, j),)) self._smat[i, j] = v # manual copy, copy.deepcopy() doesn't work for key, v in args[2].items(): r, c = key if isinstance(v, SparseMatrix): for (i, j), vij in v._smat.items(): update(r + i, c + j, vij) else: if isinstance(v, (Matrix, list, tuple)): v = SparseMatrix(v) for i, j in v._smat: update(r + i, c + j, v[i, j]) else: v = self._sympify(v) update(r, c, self._sympify(v)) elif is_sequence(args[2]): flat = not any(is_sequence(i) for i in args[2]) if not flat: s = SparseMatrix(args[2]) self._smat = s._smat else: if len(args[2]) != self.rowsself.cols: raise ValueError( 'Flat list length (%s) != rowscolumns (%s)' % (len(args[2]), self.rowsself.cols)) flat_list = args[2] for i in range(self.rows): for j in range(self.cols): value = self._sympify(flat_list[iself.cols + j]) if value: self._smat[i, j] = value if self.rows is None: # autosizing k = self._smat.keys() self.rows = max([i[0] for i in k]) + 1 if k else 0 self.cols = max([i[1] for i in k]) + 1 if k else 0 else: for i, j in self._smat.keys(): if i and i >= self.rows or j and j >= self.cols: r, c = self.shape raise ValueError(filldedent(''' The location %s is out of designated range: %s''' % ((i, j), (r - 1, c - 1)))) else: if (len(args) == 1 and isinstance(args[0], (list, tuple))): # list of values or lists v = args[0] c = 0 for i, row in enumerate(v): if not isinstance(row, (list, tuple)): row = [row] for j, vij in enumerate(row): if vij: self._smat[i, j] = self._sympify(vij) c = max(c, len(row)) self.rows = len(v) if c else 0 self.cols = c else: # handle full matrix forms with _handle_creation_inputs r, c, _list = Matrix._handle_creation_inputs(args) self.rows = r self.cols = c for i in range(self.rows): for j in range(self.cols): value = _list[self.colsi + j] if value: self._smat[i, j] = value return self def __eq__(self, other): self_shape = getattr(self, 'shape', None) other_shape = getattr(other, 'shape', None) if None in (self_shape, other_shape): return False if self_shape != other_shape: return False if isinstance(other, SparseMatrix): return self._smat == other._smat elif isinstance(other, MatrixBase): return self._smat == MutableSparseMatrix(other)._smat def __getitem__(self, key): if isinstance(key, tuple): i, j = key try: i, j = self.key2ij(key) return self._smat.get((i, j), S.Zero) except (TypeError, IndexError): if isinstance(i, slice): # XXX remove list() when PY2 support is dropped i = list(range(self.rows))[i] elif is_sequence(i): pass elif isinstance(i, Expr) and not i.is_number: from sympy.matrices.expressions.matexpr import MatrixElement return MatrixElement(self, i, j) else: if i >= self.rows: raise IndexError('Row index out of bounds') i = [i] if isinstance(j, slice): # XXX remove list() when PY2 support is dropped j = list(range(self.cols))[j] elif is_sequence(j): pass elif isinstance(j, Expr) and not j.is_number: from sympy.matrices.expressions.matexpr import MatrixElement return MatrixElement(self, i, j) else: if j >= self.cols: raise IndexError('Col index out of bounds') j = [j] return self.extract(i, j) # check for single arg, like M[:] or M[3] if isinstance(key, slice): lo, hi = key.indices(len(self))[:2] L = [] for i in range(lo, hi): m, n = divmod(i, self.cols) L.append(self._smat.get((m, n), S.Zero)) return L i, j = divmod(a2idx(key, len(self)), self.cols) return self._smat.get((i, j), S.Zero) def __setitem__(self, key, value): raise NotImplementedError() def _cholesky_solve(self, rhs): # for speed reasons, this is not uncommented, but if you are # having difficulties, try uncommenting to make sure that the # input matrix is symmetric #assert self.is_symmetric() L = self._cholesky_sparse() Y = L._lower_triangular_solve(rhs) rv = L.T._upper_triangular_solve(Y) return rv def _cholesky_sparse(self): """Algorithm for numeric Cholesky factorization of a sparse matrix.""" Crowstruc = self.row_structure_symbolic_cholesky() C = self.zeros(self.rows) for i in range(len(Crowstruc)): for j in Crowstruc[i]: if i != j: C[i, j] = self[i, j] summ = 0 for p1 in Crowstruc[i]: if p1 < j: for p2 in Crowstruc[j]: if p2 < j: if p1 == p2: summ += C[i, p1]C[j, p1] else: break else: break C[i, j] -= summ C[i, j] /= C[j, j] else: C[j, j] = self[j, j] summ = 0 for k in Crowstruc[j]: if k < j: summ += C[j, k]2 else: break C[j, j] -= summ C[j, j] = sqrt(C[j, j]) return C def _diagonal_solve(self, rhs): "Diagonal solve." return self._new(self.rows, 1, lambda i, j: rhs[i, 0] / self[i, i]) def _eval_inverse(self, kwargs): """Return the matrix inverse using Cholesky or LDL (default) decomposition as selected with the ``method`` keyword: 'CH' or 'LDL', respectively. Examples ======== >>> from sympy import SparseMatrix, Matrix >>> A = SparseMatrix([ ... [ 2, -1, 0], ... [-1, 2, -1], ... [ 0, 0, 2]]) >>> A.inv('CH') Matrix([ [2/3, 1/3, 1/6], [1/3, 2/3, 1/3], [ 0, 0, 1/2]]) >>> A.inv(method='LDL') # use of 'method=' is optional Matrix([ [2/3, 1/3, 1/6], [1/3, 2/3, 1/3], [ 0, 0, 1/2]]) >>> A * _ Matrix([ [1, 0, 0], [0, 1, 0], [0, 0, 1]]) """ sym = self.is_symmetric() M = self.as_mutable() I = M.eye(M.rows) if not sym: t = M.T r1 = M[0, :] M = tM I = tI method = kwargs.get('method', 'LDL') if method in "LDL": solve = M._LDL_solve elif method == "CH": solve = M._cholesky_solve else: raise NotImplementedError( 'Method may be "CH" or "LDL", not %s.' % method) rv = M.hstack([solve(I[:, i]) for i in range(I.cols)]) if not sym: scale = (r1rv[:, 0])[0, 0] rv /= scale return self._new(rv) def _eval_Abs(self): return self.applyfunc(lambda x: Abs(x)) def _eval_add(self, other): """If `other` is a SparseMatrix, add efficiently. Otherwise, do standard addition.""" if not isinstance(other, SparseMatrix): return self + self._new(other) smat = {} zero = self._sympify(0) for key in set().union(self._smat.keys(), other._smat.keys()): sum = self._smat.get(key, zero) + other._smat.get(key, zero) if sum != 0: smat[key] = sum return self._new(self.rows, self.cols, smat) def _eval_col_insert(self, icol, other): if not isinstance(other, SparseMatrix): other = SparseMatrix(other) new_smat = {} # make room for the new rows for key, val in self._smat.items(): row, col = key if col >= icol: col += other.cols new_smat[row, col] = val # add other's keys for key, val in other._smat.items(): row, col = key new_smat[row, col + icol] = val return self._new(self.rows, self.cols + other.cols, new_smat) def _eval_conjugate(self): smat = {key: val.conjugate() for key,val in self._smat.items()} return self._new(self.rows, self.cols, smat) def _eval_extract(self, rowsList, colsList): urow = list(uniq(rowsList)) ucol = list(uniq(colsList)) smat = {} if len(urow)len(ucol) < len(self._smat): # there are fewer elements requested than there are elements in the matrix for i, r in enumerate(urow): for j, c in enumerate(ucol): smat[i, j] = self._smat.get((r, c), 0) else: # most of the request will be zeros so check all of self's entries, # keeping only the ones that are desired for rk, ck in self._smat: if rk in urow and ck in ucol: smat[urow.index(rk), ucol.index(ck)] = self._smat[rk, ck] rv = self._new(len(urow), len(ucol), smat) # rv is nominally correct but there might be rows/cols # which require duplication if len(rowsList) != len(urow): for i, r in enumerate(rowsList): i_previous = rowsList.index(r) if i_previous != i: rv = rv.row_insert(i, rv.row(i_previous)) if len(colsList) != len(ucol): for i, c in enumerate(colsList): i_previous = colsList.index(c) if i_previous != i: rv = rv.col_insert(i, rv.col(i_previous)) return rv @classmethod def _eval_eye(cls, rows, cols): entries = {(i,i): S.One for i in range(min(rows, cols))} return cls._new(rows, cols, entries) def _eval_has(self, patterns): # if the matrix has any zeros, see if S.Zero # has the pattern. If _smat is full length, # the matrix has no zeros. zhas = S.Zero.has(patterns) if len(self._smat) == self.rowsself.cols: zhas = False return any(self[key].has(patterns) for key in self._smat) or zhas def _eval_is_Identity(self): if not all(self[i, i] == 1 for i in range(self.rows)): return False return len(self._smat) == self.rows def _eval_is_symmetric(self, simpfunc): diff = (self - self.T).applyfunc(simpfunc) return len(diff.values()) == 0 def _eval_matrix_mul(self, other): """Fast multiplication exploiting the sparsity of the matrix.""" if not isinstance(other, SparseMatrix): return selfself._new(other) # if we made it here, we're both sparse matrices # create quick lookups for rows and cols row_lookup = defaultdict(dict) for (i,j), val in self._smat.items(): row_lookup[i][j] = val col_lookup = defaultdict(dict) for (i,j), val in other._smat.items(): col_lookup[j][i] = val smat = {} for row in row_lookup.keys(): for col in col_lookup.keys(): # find the common indices of non-zero entries. # these are the only things that need to be multiplied. indices = set(col_lookup[col].keys()) & set(row_lookup[row].keys()) if indices: val = sum(row_lookup[row][k]col_lookup[col][k] for k in indices) smat[row, col] = val return self._new(self.rows, other.cols, smat) def _eval_row_insert(self, irow, other): if not isinstance(other, SparseMatrix): other = SparseMatrix(other) new_smat = {} # make room for the new rows for key, val in self._smat.items(): row, col = key if row >= irow: row += other.rows new_smat[row, col] = val # add other's keys for key, val in other._smat.items(): row, col = key new_smat[row + irow, col] = val return self._new(self.rows + other.rows, self.cols, new_smat) def _eval_scalar_mul(self, other): return self.applyfunc(lambda x: xother) def _eval_scalar_rmul(self, other): return self.applyfunc(lambda x: otherx) def _eval_transpose(self): """Returns the transposed SparseMatrix of this SparseMatrix. Examples ======== >>> from sympy.matrices import SparseMatrix >>> a = SparseMatrix(((1, 2), (3, 4))) >>> a Matrix([ [1, 2], [3, 4]]) >>> a.T Matrix([ [1, 3], [2, 4]]) """ smat = {(j,i): val for (i,j),val in self._smat.items()} return self._new(self.cols, self.rows, smat) def _eval_values(self): return [v for k,v in self._smat.items() if not v.is_zero] @classmethod def _eval_zeros(cls, rows, cols): return cls._new(rows, cols, {}) def _LDL_solve(self, rhs): # for speed reasons, this is not uncommented, but if you are # having difficulties, try uncommenting to make sure that the # input matrix is symmetric #assert self.is_symmetric() L, D = self._LDL_sparse() Z = L._lower_triangular_solve(rhs) Y = D._diagonal_solve(Z) return L.T._upper_triangular_solve(Y) def _LDL_sparse(self): """Algorithm for numeric LDL factorization, exploiting sparse structure. """ Lrowstruc = self.row_structure_symbolic_cholesky() L = self.eye(self.rows) D = self.zeros(self.rows, self.cols) for i in range(len(Lrowstruc)): for j in Lrowstruc[i]: if i != j: L[i, j] = self[i, j] summ = 0 for p1 in Lrowstruc[i]: if p1 < j: for p2 in Lrowstruc[j]: if p2 < j: if p1 == p2: summ += L[i, p1]L[j, p1]D[p1, p1] else: break else: break L[i, j] -= summ L[i, j] /= D[j, j] else: # i == j D[i, i] = self[i, i] summ = 0 for k in Lrowstruc[i]: if k < i: summ += L[i, k]2D[k, k] else: break D[i, i] -= summ return L, D def _lower_triangular_solve(self, rhs): """Fast algorithm for solving a lower-triangular system, exploiting the sparsity of the given matrix. """ rows = [[] for i in range(self.rows)] for i, j, v in self.row_list(): if i > j: rows[i].append((j, v)) X = rhs.copy() for i in range(self.rows): for j, v in rows[i]: X[i, 0] -= vX[j, 0] X[i, 0] /= self[i, i] return self._new(X) @property def _mat(self): """Return a list of matrix elements. Some routines in DenseMatrix use `_mat` directly to speed up operations.""" return list(self) def _upper_triangular_solve(self, rhs): """Fast algorithm for solving an upper-triangular system, exploiting the sparsity of the given matrix. """ rows = [[] for i in range(self.rows)] for i, j, v in self.row_list(): if i < j: rows[i].append((j, v)) X = rhs.copy() for i in range(self.rows - 1, -1, -1): rows[i].reverse() for j, v in rows[i]: X[i, 0] -= vX[j, 0] X[i, 0] /= self[i, i] return self._new(X) def applyfunc(self, f): """Apply a function to each element of the matrix. Examples ======== >>> from sympy.matrices import SparseMatrix >>> m = SparseMatrix(2, 2, lambda i, j: i2+j) >>> m Matrix([ [0, 1], [2, 3]]) >>> m.applyfunc(lambda i: 2i) Matrix([ [0, 2], [4, 6]]) """ if not callable(f): raise TypeError("`f` must be callable.") out = self.copy() for k, v in self._smat.items(): fv = f(v) if fv: out._smat[k] = fv else: out._smat.pop(k, None) return out def as_immutable(self): """Returns an Immutable version of this Matrix.""" from .immutable import ImmutableSparseMatrix return ImmutableSparseMatrix(self) def as_mutable(self): """Returns a mutable version of this matrix. Examples ======== >>> from sympy import ImmutableMatrix >>> X = ImmutableMatrix([[1, 2], [3, 4]]) >>> Y = X.as_mutable() >>> Y[1, 1] = 5 # Can set values in Y >>> Y Matrix([ [1, 2], [3, 5]]) """ return MutableSparseMatrix(self) def cholesky(self): """ Returns the Cholesky decomposition L of a matrix A such that L * L.T = A A must be a square, symmetric, positive-definite and non-singular matrix Examples ======== >>> from sympy.matrices import SparseMatrix >>> A = SparseMatrix(((25,15,-5),(15,18,0),(-5,0,11))) >>> A.cholesky() Matrix([ [ 5, 0, 0], [ 3, 3, 0], [-1, 1, 3]]) >>> A.cholesky() * A.cholesky().T == A True """ from sympy.core.numbers import nan, oo if not self.is_symmetric(): raise ValueError('Cholesky decomposition applies only to ' 'symmetric matrices.') M = self.as_mutable()._cholesky_sparse() if M.has(nan) or M.has(oo): raise ValueError('Cholesky decomposition applies only to ' 'positive-definite matrices') return self._new(M) def col_list(self): """Returns a column-sorted list of non-zero elements of the matrix. Examples ======== >>> from sympy.matrices import SparseMatrix >>> a=SparseMatrix(((1, 2), (3, 4))) >>> a Matrix([ [1, 2], [3, 4]]) >>> a.CL [(0, 0, 1), (1, 0, 3), (0, 1, 2), (1, 1, 4)] See Also ======== col_op row_list """ return [tuple(k + (self[k],)) for k in sorted(list(self._smat.keys()), key=lambda k: list(reversed(k)))] def copy(self): return self._new(self.rows, self.cols, self._smat) def LDLdecomposition(self): """ Returns the LDL Decomposition (matrices ``L`` and ``D``) of matrix ``A``, such that ``L * D * L.T == A``. ``A`` must be a square, symmetric, positive-definite and non-singular. This method eliminates the use of square root and ensures that all the diagonal entries of L are 1. Examples ======== >>> from sympy.matrices import SparseMatrix >>> A = SparseMatrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) >>> L, D = A.LDLdecomposition() >>> L Matrix([ [ 1, 0, 0], [ 3/5, 1, 0], [-1/5, 1/3, 1]]) >>> D Matrix([ [25, 0, 0], [ 0, 9, 0], [ 0, 0, 9]]) >>> L * D * L.T == A True """ from sympy.core.numbers import nan, oo if not self.is_symmetric(): raise ValueError('LDL decomposition applies only to ' 'symmetric matrices.') L, D = self.as_mutable()._LDL_sparse() if L.has(nan) or L.has(oo) or D.has(nan) or D.has(oo): raise ValueError('LDL decomposition applies only to ' 'positive-definite matrices') return self._new(L), self._new(D) def liupc(self): """Liu's algorithm, for pre-determination of the Elimination Tree of the given matrix, used in row-based symbolic Cholesky factorization. Examples ======== >>> from sympy.matrices import SparseMatrix >>> S = SparseMatrix([ ... [1, 0, 3, 2], ... [0, 0, 1, 0], ... [4, 0, 0, 5], ... [0, 6, 7, 0]]) >>> S.liupc() ([[0], [], [0], [1, 2]], [4, 3, 4, 4]) References ========== Symbolic Sparse Cholesky Factorization using Elimination Trees, Jeroen Van Grondelle (1999) http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.39.7582 """ # Algorithm 2.4, p 17 of reference # get the indices of the elements that are non-zero on or below diag R = [[] for r in range(self.rows)] for r, c, _ in self.row_list(): if c <= r: R[r].append(c) inf = len(R) # nothing will be this large parent = [inf]self.rows virtual = [inf]self.rows for r in range(self.rows): for c in R[r][:-1]: while virtual[c] < r: t = virtual[c] virtual[c] = r c = t if virtual[c] == inf: parent[c] = virtual[c] = r return R, parent def nnz(self): """Returns the number of non-zero elements in Matrix.""" return len(self._smat) def row_list(self): """Returns a row-sorted list of non-zero elements of the matrix. Examples ======== >>> from sympy.matrices import SparseMatrix >>> a = SparseMatrix(((1, 2), (3, 4))) >>> a Matrix([ [1, 2], [3, 4]]) >>> a.RL [(0, 0, 1), (0, 1, 2), (1, 0, 3), (1, 1, 4)] See Also ======== row_op col_list """ return [tuple(k + (self[k],)) for k in sorted(list(self._smat.keys()), key=lambda k: list(k))] def row_structure_symbolic_cholesky(self): """Symbolic cholesky factorization, for pre-determination of the non-zero structure of the Cholesky factororization. Examples ======== >>> from sympy.matrices import SparseMatrix >>> S = SparseMatrix([ ... [1, 0, 3, 2], ... [0, 0, 1, 0], ... [4, 0, 0, 5], ... [0, 6, 7, 0]]) >>> S.row_structure_symbolic_cholesky() [[0], [], [0], [1, 2]] References ========== Symbolic Sparse Cholesky Factorization using Elimination Trees, Jeroen Van Grondelle (1999) http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.39.7582 """ R, parent = self.liupc() inf = len(R) # this acts as infinity Lrow = copy.deepcopy(R) for k in range(self.rows): for j in R[k]: while j != inf and j != k: Lrow[k].append(j) j = parent[j] Lrow[k] = list(sorted(set(Lrow[k]))) return Lrow def scalar_multiply(self, scalar): "Scalar element-wise multiplication" M = self.zeros(self.shape) if scalar: for i in self._smat: v = scalarself._smat[i] if v: M._smat[i] = v else: M._smat.pop(i, None) return M def solve_least_squares(self, rhs, method='LDL'): """Return the least-square fit to the data. By default the cholesky_solve routine is used (method='CH'); other methods of matrix inversion can be used. To find out which are available, see the docstring of the .inv() method. Examples ======== >>> from sympy.matrices import SparseMatrix, Matrix, ones >>> A = Matrix([1, 2, 3]) >>> B = Matrix([2, 3, 4]) >>> S = SparseMatrix(A.row_join(B)) >>> S Matrix([ [1, 2], [2, 3], [3, 4]]) If each line of S represent coefficients of Ax + By and x and y are [2, 3] then Sxy is: >>> r = SMatrix([2, 3]); r Matrix([ [ 8], [13], [18]]) But let's add 1 to the middle value and then solve for the least-squares value of xy: >>> xy = S.solve_least_squares(Matrix([8, 14, 18])); xy Matrix([ [ 5/3], [10/3]]) The error is given by Sxy - r: >>> Sxy - r Matrix([ [1/3], [1/3], [1/3]]) >>> _.norm().n(2) 0.58 If a different xy is used, the norm will be higher: >>> xy += ones(2, 1)/10 >>> (Sxy - r).norm().n(2) 1.5 """ t = self.T return (tself).inv(method=method)trhs def solve(self, rhs, method='LDL'): """Return solution to selfsoln = rhs using given inversion method. For a list of possible inversion methods, see the .inv() docstring. """ if not self.is_square: if self.rows < self.cols: raise ValueError('Under-determined system.') elif self.rows > self.cols: raise ValueError('For over-determined system, M, having ' 'more rows than columns, try M.solve_least_squares(rhs).') else: return self.inv(method=method)rhs RL = property(row_list, None, None, "Alternate faster representation") CL = property(col_list, None, None, "Alternate faster representation") class MutableSparseMatrix(SparseMatrix, MatrixBase): @classmethod def _new(cls, args, kwargs): return cls(args) def __setitem__(self, key, value): """Assign value to position designated by key. Examples ======== >>> from sympy.matrices import SparseMatrix, ones >>> M = SparseMatrix(2, 2, {}) >>> M[1] = 1; M Matrix([ [0, 1], [0, 0]]) >>> M[1, 1] = 2; M Matrix([ [0, 1], [0, 2]]) >>> M = SparseMatrix(2, 2, {}) >>> M[:, 1] = [1, 1]; M Matrix([ [0, 1], [0, 1]]) >>> M = SparseMatrix(2, 2, {}) >>> M[1, :] = [[1, 1]]; M Matrix([ [0, 0], [1, 1]]) To replace row r you assign to position rm where m is the number of columns: >>> M = SparseMatrix(4, 4, {}) >>> m = M.cols >>> M[3m] = ones(1, m)2; M Matrix([ [0, 0, 0, 0], [0, 0, 0, 0], [0, 0, 0, 0], [2, 2, 2, 2]]) And to replace column c you can assign to position c: >>> M[2] = ones(m, 1)4; M Matrix([ [0, 0, 4, 0], [0, 0, 4, 0], [0, 0, 4, 0], [2, 2, 4, 2]]) """ rv = self._setitem(key, value) if rv is not None: i, j, value = rv if value: self._smat[i, j] = value elif (i, j) in self._smat: del self._smat[i, j] def as_mutable(self): return self.copy() __hash__ = None def col_del(self, k): """Delete the given column of the matrix. Examples ======== >>> from sympy.matrices import SparseMatrix >>> M = SparseMatrix([[0, 0], [0, 1]]) >>> M Matrix([ [0, 0], [0, 1]]) >>> M.col_del(0) >>> M Matrix([ [0], [1]]) See Also ======== row_del """ newD = {} k = a2idx(k, self.cols) for (i, j) in self._smat: if j == k: pass elif j > k: newD[i, j - 1] = self._smat[i, j] else: newD[i, j] = self._smat[i, j] self._smat = newD self.cols -= 1 def col_join(self, other): """Returns B augmented beneath A (row-wise joining):: [A] [B] Examples ======== >>> from sympy import SparseMatrix, Matrix, ones >>> A = SparseMatrix(ones(3)) >>> A Matrix([ [1, 1, 1], [1, 1, 1], [1, 1, 1]]) >>> B = SparseMatrix.eye(3) >>> B Matrix([ [1, 0, 0], [0, 1, 0], [0, 0, 1]]) >>> C = A.col_join(B); C Matrix([ [1, 1, 1], [1, 1, 1], [1, 1, 1], [1, 0, 0], [0, 1, 0], [0, 0, 1]]) >>> C == A.col_join(Matrix(B)) True Joining along columns is the same as appending rows at the end of the matrix: >>> C == A.row_insert(A.rows, Matrix(B)) True """ # A null matrix can always be stacked (see #10770) if self.rows == 0 and self.cols != other.cols: return self._new(0, other.cols, []).col_join(other) A, B = self, other if not A.cols == B.cols: raise ShapeError() A = A.copy() if not isinstance(B, SparseMatrix): k = 0 b = B._mat for i in range(B.rows): for j in range(B.cols): v = b[k] if v: A._smat[i + A.rows, j] = v k += 1 else: for (i, j), v in B._smat.items(): A._smat[i + A.rows, j] = v A.rows += B.rows return A def col_op(self, j, f): """In-place operation on col j using two-arg functor whose args are interpreted as (self[i, j], i) for i in range(self.rows). Examples ======== >>> from sympy.matrices import SparseMatrix >>> M = SparseMatrix.eye(3)2 >>> M[1, 0] = -1 >>> M.col_op(1, lambda v, i: v + 2M[i, 0]); M Matrix([ [ 2, 4, 0], [-1, 0, 0], [ 0, 0, 2]]) """ for i in range(self.rows): v = self._smat.get((i, j), S.Zero) fv = f(v, i) if fv: self._smat[i, j] = fv elif v: self._smat.pop((i, j)) def col_swap(self, i, j): """Swap, in place, columns i and j. Examples ======== >>> from sympy.matrices import SparseMatrix >>> S = SparseMatrix.eye(3); S[2, 1] = 2 >>> S.col_swap(1, 0); S Matrix([ [0, 1, 0], [1, 0, 0], [2, 0, 1]]) """ if i > j: i, j = j, i rows = self.col_list() temp = [] for ii, jj, v in rows: if jj == i: self._smat.pop((ii, jj)) temp.append((ii, v)) elif jj == j: self._smat.pop((ii, jj)) self._smat[ii, i] = v elif jj > j: break for k, v in temp: self._smat[k, j] = v def copyin_list(self, key, value): if not is_sequence(value): raise TypeError("`value` must be of type list or tuple.") self.copyin_matrix(key, Matrix(value)) def copyin_matrix(self, key, value): # include this here because it's not part of BaseMatrix rlo, rhi, clo, chi = self.key2bounds(key) shape = value.shape dr, dc = rhi - rlo, chi - clo if shape != (dr, dc): raise ShapeError( "The Matrix `value` doesn't have the same dimensions " "as the in sub-Matrix given by `key`.") if not isinstance(value, SparseMatrix): for i in range(value.rows): for j in range(value.cols): self[i + rlo, j + clo] = value[i, j] else: if (rhi - rlo)(chi - clo) < len(self): for i in range(rlo, rhi): for j in range(clo, chi): self._smat.pop((i, j), None) else: for i, j, v in self.row_list(): if rlo <= i < rhi and clo <= j < chi: self._smat.pop((i, j), None) for k, v in value._smat.items(): i, j = k self[i + rlo, j + clo] = value[i, j] def fill(self, value): """Fill self with the given value. Notes ===== Unless many values are going to be deleted (i.e. set to zero) this will create a matrix that is slower than a dense matrix in operations. Examples ======== >>> from sympy.matrices import SparseMatrix >>> M = SparseMatrix.zeros(3); M Matrix([ [0, 0, 0], [0, 0, 0], [0, 0, 0]]) >>> M.fill(1); M Matrix([ [1, 1, 1], [1, 1, 1], [1, 1, 1]]) """ if not value: self._smat = {} else: v = self._sympify(value) self._smat = {(i, j): v for i in range(self.rows) for j in range(self.cols)} def row_del(self, k): """Delete the given row of the matrix. Examples ======== >>> from sympy.matrices import SparseMatrix >>> M = SparseMatrix([[0, 0], [0, 1]]) >>> M Matrix([ [0, 0], [0, 1]]) >>> M.row_del(0) >>> M Matrix([[0, 1]]) See Also ======== col_del """ newD = {} k = a2idx(k, self.rows) for (i, j) in self._smat: if i == k: pass elif i > k: newD[i - 1, j] = self._smat[i, j] else: newD[i, j] = self._smat[i, j] self._smat = newD self.rows -= 1 def row_join(self, other): """Returns B appended after A (column-wise augmenting):: [A B] Examples ======== >>> from sympy import SparseMatrix, Matrix >>> A = SparseMatrix(((1, 0, 1), (0, 1, 0), (1, 1, 0))) >>> A Matrix([ [1, 0, 1], [0, 1, 0], [1, 1, 0]]) >>> B = SparseMatrix(((1, 0, 0), (0, 1, 0), (0, 0, 1))) >>> B Matrix([ [1, 0, 0], [0, 1, 0], [0, 0, 1]]) >>> C = A.row_join(B); C Matrix([ [1, 0, 1, 1, 0, 0], [0, 1, 0, 0, 1, 0], [1, 1, 0, 0, 0, 1]]) >>> C == A.row_join(Matrix(B)) True Joining at row ends is the same as appending columns at the end of the matrix: >>> C == A.col_insert(A.cols, B) True """ # A null matrix can always be stacked (see #10770) if self.cols == 0 and self.rows != other.rows: return self._new(other.rows, 0, []).row_join(other) A, B = self, other if not A.rows == B.rows: raise ShapeError() A = A.copy() if not isinstance(B, SparseMatrix): k = 0 b = B._mat for i in range(B.rows): for j in range(B.cols): v = b[k] if v: A._smat[i, j + A.cols] = v k += 1 else: for (i, j), v in B._smat.items(): A._smat[i, j + A.cols] = v A.cols += B.cols return A def row_op(self, i, f): """In-place operation on row ``i`` using two-arg functor whose args are interpreted as ``(self[i, j], j)``. Examples ======== >>> from sympy.matrices import SparseMatrix >>> M = SparseMatrix.eye(3)2 >>> M[0, 1] = -1 >>> M.row_op(1, lambda v, j: v + 2M[0, j]); M Matrix([ [2, -1, 0], [4, 0, 0], [0, 0, 2]]) See Also ======== row zip_row_op col_op """ for j in range(self.cols): v = self._smat.get((i, j), S.Zero) fv = f(v, j) if fv: self._smat[i, j] = fv elif v: self._smat.pop((i, j)) def row_swap(self, i, j): """Swap, in place, columns i and j. Examples ======== >>> from sympy.matrices import SparseMatrix >>> S = SparseMatrix.eye(3); S[2, 1] = 2 >>> S.row_swap(1, 0); S Matrix([ [0, 1, 0], [1, 0, 0], [0, 2, 1]]) """ if i > j: i, j = j, i rows = self.row_list() temp = [] for ii, jj, v in rows: if ii == i: self._smat.pop((ii, jj)) temp.append((jj, v)) elif ii == j: self._smat.pop((ii, jj)) self._smat[i, jj] = v elif ii > j: break for k, v in temp: self._smat[j, k] = v def zip_row_op(self, i, k, f): """In-place operation on row ``i`` using two-arg functor whose args are interpreted as ``(self[i, j], self[k, j])``. Examples ======== >>> from sympy.matrices import SparseMatrix >>> M = SparseMatrix.eye(3)2 >>> M[0, 1] = -1 >>> M.zip_row_op(1, 0, lambda v, u: v + 2*u); M Matrix([ [2, -1, 0], [4, 0, 0], [0, 0, 2]]) See Also ======== row row_op col_op """ self.row_op(i, lambda v, j: f(v, self[k, j]))
0ee558f787523135e80c0294392208996fbd0f7070cc56cf303537a671c21ce2	from __future__ import division, print_function from types import FunctionType from mpmath.libmp.libmpf import prec_to_dps from sympy.core.add import Add from sympy.core.basic import Basic from sympy.core.compatibility import ( Callable, NotIterable, as_int, default_sort_key, is_sequence, range, reduce, string_types) from sympy.core.decorators import deprecated from sympy.core.expr import Expr from sympy.core.function import expand_mul from sympy.core.logic import fuzzy_and, fuzzy_or from sympy.core.numbers import Float, Integer, mod_inverse from sympy.core.power import Pow from sympy.core.singleton import S from sympy.core.symbol import Dummy, Symbol, _uniquely_named_symbol, symbols from sympy.core.sympify import sympify from sympy.functions import exp, factorial from sympy.functions.elementary.miscellaneous import Max, Min, sqrt from sympy.functions.special.tensor_functions import KroneckerDelta from sympy.polys import PurePoly, cancel, roots from sympy.printing import sstr from sympy.simplify import nsimplify from sympy.simplify import simplify as _simplify from sympy.utilities.exceptions import SymPyDeprecationWarning from sympy.utilities.iterables import flatten, numbered_symbols from sympy.utilities.misc import filldedent from .common import ( MatrixCommon, MatrixError, NonSquareMatrixError, NonInvertibleMatrixError, ShapeError, NonPositiveDefiniteMatrixError) def _iszero(x): """Returns True if x is zero.""" return getattr(x, 'is_zero', None) def _is_zero_after_expand_mul(x): """Tests by expand_mul only, suitable for polynomials and rational functions.""" return expand_mul(x) == 0 class DeferredVector(Symbol, NotIterable): """A vector whose components are deferred (e.g. for use with lambdify) Examples ======== >>> from sympy import DeferredVector, lambdify >>> X = DeferredVector( 'X' ) >>> X X >>> expr = (X[0] + 2, X[2] + 3) >>> func = lambdify( X, expr) >>> func( [1, 2, 3] ) (3, 6) """ def __getitem__(self, i): if i == -0: i = 0 if i < 0: raise IndexError('DeferredVector index out of range') component_name = '%s[%d]' % (self.name, i) return Symbol(component_name) def __str__(self): return sstr(self) def __repr__(self): return "DeferredVector('%s')" % self.name class MatrixDeterminant(MatrixCommon): """Provides basic matrix determinant operations. Should not be instantiated directly.""" def _eval_berkowitz_toeplitz_matrix(self): """Return (A,T) where T the Toeplitz matrix used in the Berkowitz algorithm corresponding to ``self`` and A is the first principal submatrix.""" # the 0 x 0 case is trivial if self.rows == 0 and self.cols == 0: return self._new(1,1, [self.one]) # # Partition self = [ a_11 R ] # [ C A ] # a, R = self[0,0], self[0, 1:] C, A = self[1:, 0], self[1:,1:] # # The Toeplitz matrix looks like # # [ 1 ] # [ -a 1 ] # [ -RC -a 1 ] # [ -RAC -RC -a 1 ] # [ -RA*2C -RAC -RC -a 1 ] # etc. # Compute the diagonal entries. # Because multiplying matrix times vector is so much # more efficient than matrix times matrix, recursively # compute -R A*n C. diags = [C] for i in range(self.rows - 2): diags.append(A * diags[i]) diags = [(-Rd)[0, 0] for d in diags] diags = [self.one, -a] + diags def entry(i,j): if j > i: return self.zero return diags[i - j] toeplitz = self._new(self.cols + 1, self.rows, entry) return (A, toeplitz) def _eval_berkowitz_vector(self): """ Run the Berkowitz algorithm and return a vector whose entries are the coefficients of the characteristic polynomial of ``self``. Given N x N matrix, efficiently compute coefficients of characteristic polynomials of ``self`` without division in the ground domain. This method is particularly useful for computing determinant, principal minors and characteristic polynomial when ``self`` has complicated coefficients e.g. polynomials. Semi-direct usage of this algorithm is also important in computing efficiently sub-resultant PRS. Assuming that M is a square matrix of dimension N x N and I is N x N identity matrix, then the Berkowitz vector is an N x 1 vector whose entries are coefficients of the polynomial charpoly(M) = det(tI - M) As a consequence, all polynomials generated by Berkowitz algorithm are monic. For more information on the implemented algorithm refer to: [1] S.J. Berkowitz, On computing the determinant in small parallel time using a small number of processors, ACM, Information Processing Letters 18, 1984, pp. 147-150 [2] M. Keber, Division-Free computation of sub-resultants using Bezout matrices, Tech. Report MPI-I-2006-1-006, Saarbrucken, 2006 """ # handle the trivial cases if self.rows == 0 and self.cols == 0: return self._new(1, 1, [self.one]) elif self.rows == 1 and self.cols == 1: return self._new(2, 1, [self.one, -self[0,0]]) submat, toeplitz = self._eval_berkowitz_toeplitz_matrix() return toeplitz * submat._eval_berkowitz_vector() def _eval_det_bareiss(self, iszerofunc=_is_zero_after_expand_mul): """Compute matrix determinant using Bareiss' fraction-free algorithm which is an extension of the well known Gaussian elimination method. This approach is best suited for dense symbolic matrices and will result in a determinant with minimal number of fractions. It means that less term rewriting is needed on resulting formulae. TODO: Implement algorithm for sparse matrices (SFF), http://www.eecis.udel.edu/~saunders/papers/sffge/it5.ps. """ # Recursively implemented Bareiss' algorithm as per Deanna Richelle Leggett's # thesis http://www.math.usm.edu/perry/Research/Thesis_DRL.pdf def bareiss(mat, cumm=1): if mat.rows == 0: return mat.one elif mat.rows == 1: return mat[0, 0] # find a pivot and extract the remaining matrix # With the default iszerofunc, _find_reasonable_pivot slows down # the computation by the factor of 2.5 in one test. # Relevant issues: #10279 and #13877. pivot_pos, pivot_val, _, _ = _find_reasonable_pivot(mat[:, 0], iszerofunc=iszerofunc) if pivot_pos is None: return mat.zero # if we have a valid pivot, we'll do a "row swap", so keep the # sign of the det sign = (-1) ** (pivot_pos % 2) # we want every row but the pivot row and every column rows = list(i for i in range(mat.rows) if i != pivot_pos) cols = list(range(mat.cols)) tmp_mat = mat.extract(rows, cols) def entry(i, j): ret = (pivot_valtmp_mat[i, j + 1] - mat[pivot_pos, j + 1]tmp_mat[i, 0]) / cumm if not ret.is_Atom: return cancel(ret) return ret return signbareiss(self._new(mat.rows - 1, mat.cols - 1, entry), pivot_val) return cancel(bareiss(self)) def _eval_det_berkowitz(self): """ Use the Berkowitz algorithm to compute the determinant.""" berk_vector = self._eval_berkowitz_vector() return (-1)(len(berk_vector) - 1) berk_vector[-1] def _eval_det_lu(self, iszerofunc=_iszero, simpfunc=None): """ Computes the determinant of a matrix from its LU decomposition. This function uses the LU decomposition computed by LUDecomposition_Simple(). The keyword arguments iszerofunc and simpfunc are passed to LUDecomposition_Simple(). iszerofunc is a callable that returns a boolean indicating if its input is zero, or None if it cannot make the determination. simpfunc is a callable that simplifies its input. The default is simpfunc=None, which indicate that the pivot search algorithm should not attempt to simplify any candidate pivots. If simpfunc fails to simplify its input, then it must return its input instead of a copy.""" if self.rows == 0: return self.one # sympy/matrices/tests/test_matrices.py contains a test that # suggests that the determinant of a 0 x 0 matrix is one, by # convention. lu, row_swaps = self.LUdecomposition_Simple(iszerofunc=iszerofunc, simpfunc=None) # PA = LU => det(A) = det(L)det(U)/det(P) = det(P)det(U). # Lower triangular factor L encoded in lu has unit diagonal => det(L) = 1. # P is a permutation matrix => det(P) in {-1, 1} => 1/det(P) = det(P). # LUdecomposition_Simple() returns a list of row exchange index pairs, rather # than a permutation matrix, but det(P) = (-1)*len(row_swaps). # Avoid forming the potentially time consuming product of U's diagonal entries # if the product is zero. # Bottom right entry of U is 0 => det(A) = 0. # It may be impossible to determine if this entry of U is zero when it is symbolic. if iszerofunc(lu[lu.rows-1, lu.rows-1]): return self.zero # Compute det(P) det = -self.one if len(row_swaps)%2 else self.one # Compute det(U) by calculating the product of U's diagonal entries. # The upper triangular portion of lu is the upper triangular portion of the # U factor in the LU decomposition. for k in range(lu.rows): det = lu[k, k] # return det(P)det(U) return det def _eval_determinant(self): """Assumed to exist by matrix expressions; If we subclass MatrixDeterminant, we can fully evaluate determinants.""" return self.det() def adjugate(self, method="berkowitz"): """Returns the adjugate, or classical adjoint, of a matrix. That is, the transpose of the matrix of cofactors. https://en.wikipedia.org/wiki/Adjugate See Also ======== cofactor_matrix transpose """ return self.cofactor_matrix(method).transpose() def charpoly(self, x='lambda', simplify=_simplify): """Computes characteristic polynomial det(xI - self) where I is the identity matrix. A PurePoly is returned, so using different variables for ``x`` does not affect the comparison or the polynomials: Examples ======== >>> from sympy import Matrix >>> from sympy.abc import x, y >>> A = Matrix([[1, 3], [2, 0]]) >>> A.charpoly(x) == A.charpoly(y) True Specifying ``x`` is optional; a symbol named ``lambda`` is used by default (which looks good when pretty-printed in unicode): >>> A.charpoly().as_expr() lambda2 - lambda - 6 And if ``x`` clashes with an existing symbol, underscores will be prepended to the name to make it unique: >>> A = Matrix([[1, 2], [x, 0]]) >>> A.charpoly(x).as_expr() _x2 - _x - 2x Whether you pass a symbol or not, the generator can be obtained with the gen attribute since it may not be the same as the symbol that was passed: >>> A.charpoly(x).gen _x >>> A.charpoly(x).gen == x False Notes ===== The Samuelson-Berkowitz algorithm is used to compute the characteristic polynomial efficiently and without any division operations. Thus the characteristic polynomial over any commutative ring without zero divisors can be computed. See Also ======== det """ if not self.is_square: raise NonSquareMatrixError() berk_vector = self._eval_berkowitz_vector() x = _uniquely_named_symbol(x, berk_vector) return PurePoly([simplify(a) for a in berk_vector], x) def cofactor(self, i, j, method="berkowitz"): """Calculate the cofactor of an element. See Also ======== cofactor_matrix minor minor_submatrix """ if not self.is_square or self.rows < 1: raise NonSquareMatrixError() return (-1)((i + j) % 2) self.minor(i, j, method) def cofactor_matrix(self, method="berkowitz"): """Return a matrix containing the cofactor of each element. See Also ======== cofactor minor minor_submatrix adjugate """ if not self.is_square or self.rows < 1: raise NonSquareMatrixError() return self._new(self.rows, self.cols, lambda i, j: self.cofactor(i, j, method)) def det(self, method="bareiss", iszerofunc=None): """Computes the determinant of a matrix. Parameters ========== method : string, optional Specifies the algorithm used for computing the matrix determinant. If the matrix is at most 3x3, a hard-coded formula is used and the specified method is ignored. Otherwise, it defaults to ``'bareiss'``. If it is set to ``'bareiss'``, Bareiss' fraction-free algorithm will be used. If it is set to ``'berkowitz'``, Berkowitz' algorithm will be used. Otherwise, if it is set to ``'lu'``, LU decomposition will be used. .. note:: For backward compatibility, legacy keys like "bareis" and "det_lu" can still be used to indicate the corresponding methods. And the keys are also case-insensitive for now. However, it is suggested to use the precise keys for specifying the method. iszerofunc : FunctionType or None, optional If it is set to ``None``, it will be defaulted to ``_iszero`` if the method is set to ``'bareiss'``, and ``_is_zero_after_expand_mul`` if the method is set to ``'lu'``. It can also accept any user-specified zero testing function, if it is formatted as a function which accepts a single symbolic argument and returns ``True`` if it is tested as zero and ``False`` if it tested as non-zero, and also ``None`` if it is undecidable. Returns ======= det : Basic Result of determinant. Raises ====== ValueError If unrecognized keys are given for ``method`` or ``iszerofunc``. NonSquareMatrixError If attempted to calculate determinant from a non-square matrix. """ # sanitize `method` method = method.lower() if method == "bareis": method = "bareiss" if method == "det_lu": method = "lu" if method not in ("bareiss", "berkowitz", "lu"): raise ValueError("Determinant method '%s' unrecognized" % method) if iszerofunc is None: if method == "bareiss": iszerofunc = _is_zero_after_expand_mul elif method == "lu": iszerofunc = _iszero elif not isinstance(iszerofunc, FunctionType): raise ValueError("Zero testing method '%s' unrecognized" % iszerofunc) # if methods were made internal and all determinant calculations # passed through here, then these lines could be factored out of # the method routines if not self.is_square: raise NonSquareMatrixError() n = self.rows if n == 0: return self.one elif n == 1: return self[0,0] elif n == 2: return self[0, 0] * self[1, 1] - self[0, 1] * self[1, 0] elif n == 3: return (self[0, 0] * self[1, 1] * self[2, 2] + self[0, 1] * self[1, 2] * self[2, 0] + self[0, 2] * self[1, 0] * self[2, 1] - self[0, 2] * self[1, 1] * self[2, 0] - self[0, 0] * self[1, 2] * self[2, 1] - self[0, 1] * self[1, 0] * self[2, 2]) if method == "bareiss": return self._eval_det_bareiss(iszerofunc=iszerofunc) elif method == "berkowitz": return self._eval_det_berkowitz() elif method == "lu": return self._eval_det_lu(iszerofunc=iszerofunc) def minor(self, i, j, method="berkowitz"): """Return the (i,j) minor of ``self``. That is, return the determinant of the matrix obtained by deleting the `i`th row and `j`th column from ``self``. See Also ======== minor_submatrix cofactor det """ if not self.is_square or self.rows < 1: raise NonSquareMatrixError() return self.minor_submatrix(i, j).det(method=method) def minor_submatrix(self, i, j): """Return the submatrix obtained by removing the `i`th row and `j`th column from ``self``. See Also ======== minor cofactor """ if i < 0: i += self.rows if j < 0: j += self.cols if not 0 <= i < self.rows or not 0 <= j < self.cols: raise ValueError("`i` and `j` must satisfy 0 <= i < ``self.rows`` " "(%d)" % self.rows + "and 0 <= j < ``self.cols`` (%d)." % self.cols) rows = [a for a in range(self.rows) if a != i] cols = [a for a in range(self.cols) if a != j] return self.extract(rows, cols) class MatrixReductions(MatrixDeterminant): """Provides basic matrix row/column operations. Should not be instantiated directly.""" def _eval_col_op_swap(self, col1, col2): def entry(i, j): if j == col1: return self[i, col2] elif j == col2: return self[i, col1] return self[i, j] return self._new(self.rows, self.cols, entry) def _eval_col_op_multiply_col_by_const(self, col, k): def entry(i, j): if j == col: return k * self[i, j] return self[i, j] return self._new(self.rows, self.cols, entry) def _eval_col_op_add_multiple_to_other_col(self, col, k, col2): def entry(i, j): if j == col: return self[i, j] + k * self[i, col2] return self[i, j] return self._new(self.rows, self.cols, entry) def _eval_row_op_swap(self, row1, row2): def entry(i, j): if i == row1: return self[row2, j] elif i == row2: return self[row1, j] return self[i, j] return self._new(self.rows, self.cols, entry) def _eval_row_op_multiply_row_by_const(self, row, k): def entry(i, j): if i == row: return k * self[i, j] return self[i, j] return self._new(self.rows, self.cols, entry) def _eval_row_op_add_multiple_to_other_row(self, row, k, row2): def entry(i, j): if i == row: return self[i, j] + k * self[row2, j] return self[i, j] return self._new(self.rows, self.cols, entry) def _eval_echelon_form(self, iszerofunc, simpfunc): """Returns (mat, swaps) where ``mat`` is a row-equivalent matrix in echelon form and ``swaps`` is a list of row-swaps performed.""" reduced, pivot_cols, swaps = self._row_reduce(iszerofunc, simpfunc, normalize_last=True, normalize=False, zero_above=False) return reduced, pivot_cols, swaps def _eval_is_echelon(self, iszerofunc): if self.rows <= 0 or self.cols <= 0: return True zeros_below = all(iszerofunc(t) for t in self[1:, 0]) if iszerofunc(self[0, 0]): return zeros_below and self[:, 1:]._eval_is_echelon(iszerofunc) return zeros_below and self[1:, 1:]._eval_is_echelon(iszerofunc) def _eval_rref(self, iszerofunc, simpfunc, normalize_last=True): reduced, pivot_cols, swaps = self._row_reduce(iszerofunc, simpfunc, normalize_last, normalize=True, zero_above=True) return reduced, pivot_cols def _normalize_op_args(self, op, col, k, col1, col2, error_str="col"): """Validate the arguments for a row/column operation. ``error_str`` can be one of "row" or "col" depending on the arguments being parsed.""" if op not in ["n->kn", "n<->m", "n->n+km"]: raise ValueError("Unknown {} operation '{}'. Valid col operations " "are 'n->kn', 'n<->m', 'n->n+km'".format(error_str, op)) # normalize and validate the arguments if op == "n->kn": col = col if col is not None else col1 if col is None or k is None: raise ValueError("For a {0} operation 'n->kn' you must provide the " "kwargs `{0}` and `k`".format(error_str)) if not 0 <= col <= self.cols: raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col)) if op == "n<->m": # we need two cols to swap. It doesn't matter # how they were specified, so gather them together and # remove `None` cols = set((col, k, col1, col2)).difference([None]) if len(cols) > 2: # maybe the user left `k` by mistake? cols = set((col, col1, col2)).difference([None]) if len(cols) != 2: raise ValueError("For a {0} operation 'n<->m' you must provide the " "kwargs `{0}1` and `{0}2`".format(error_str)) col1, col2 = cols if not 0 <= col1 <= self.cols: raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col1)) if not 0 <= col2 <= self.cols: raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col2)) if op == "n->n+km": col = col1 if col is None else col col2 = col1 if col2 is None else col2 if col is None or col2 is None or k is None: raise ValueError("For a {0} operation 'n->n+km' you must provide the " "kwargs `{0}`, `k`, and `{0}2`".format(error_str)) if col == col2: raise ValueError("For a {0} operation 'n->n+km' `{0}` and `{0}2` must " "be different.".format(error_str)) if not 0 <= col <= self.cols: raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col)) if not 0 <= col2 <= self.cols: raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col2)) return op, col, k, col1, col2 def _permute_complexity_right(self, iszerofunc): """Permute columns with complicated elements as far right as they can go. Since the ``sympy`` row reduction algorithms start on the left, having complexity right-shifted speeds things up. Returns a tuple (mat, perm) where perm is a permutation of the columns to perform to shift the complex columns right, and mat is the permuted matrix.""" def complexity(i): # the complexity of a column will be judged by how many # element's zero-ness cannot be determined return sum(1 if iszerofunc(e) is None else 0 for e in self[:, i]) complex = [(complexity(i), i) for i in range(self.cols)] perm = [j for (i, j) in sorted(complex)] return (self.permute(perm, orientation='cols'), perm) def _row_reduce(self, iszerofunc, simpfunc, normalize_last=True, normalize=True, zero_above=True): """Row reduce ``self`` and return a tuple (rref_matrix, pivot_cols, swaps) where pivot_cols are the pivot columns and swaps are any row swaps that were used in the process of row reduction. Parameters ========== iszerofunc : determines if an entry can be used as a pivot simpfunc : used to simplify elements and test if they are zero if ``iszerofunc`` returns `None` normalize_last : indicates where all row reduction should happen in a fraction-free manner and then the rows are normalized (so that the pivots are 1), or whether rows should be normalized along the way (like the naive row reduction algorithm) normalize : whether pivot rows should be normalized so that the pivot value is 1 zero_above : whether entries above the pivot should be zeroed. If ``zero_above=False``, an echelon matrix will be returned. """ rows, cols = self.rows, self.cols mat = list(self) def get_col(i): return mat[i::cols] def row_swap(i, j): mat[icols:(i + 1)cols], mat[jcols:(j + 1)cols] = \ mat[jcols:(j + 1)cols], mat[icols:(i + 1)cols] def cross_cancel(a, i, b, j): """Does the row op row[i] = arow[i] - brow[j]""" q = (j - i)cols for p in range(icols, (i + 1)cols): mat[p] = amat[p] - bmat[p + q] piv_row, piv_col = 0, 0 pivot_cols = [] swaps = [] # use a fraction free method to zero above and below each pivot while piv_col < cols and piv_row < rows: pivot_offset, pivot_val, \ assumed_nonzero, newly_determined = _find_reasonable_pivot( get_col(piv_col)[piv_row:], iszerofunc, simpfunc) # _find_reasonable_pivot may have simplified some things # in the process. Let's not let them go to waste for (offset, val) in newly_determined: offset += piv_row mat[offsetcols + piv_col] = val if pivot_offset is None: piv_col += 1 continue pivot_cols.append(piv_col) if pivot_offset != 0: row_swap(piv_row, pivot_offset + piv_row) swaps.append((piv_row, pivot_offset + piv_row)) # if we aren't normalizing last, we normalize # before we zero the other rows if normalize_last is False: i, j = piv_row, piv_col mat[icols + j] = self.one for p in range(icols + j + 1, (i + 1)cols): mat[p] = mat[p] / pivot_val # after normalizing, the pivot value is 1 pivot_val = self.one # zero above and below the pivot for row in range(rows): # don't zero our current row if row == piv_row: continue # don't zero above the pivot unless we're told. if zero_above is False and row < piv_row: continue # if we're already a zero, don't do anything val = mat[rowcols + piv_col] if iszerofunc(val): continue cross_cancel(pivot_val, row, val, piv_row) piv_row += 1 # normalize each row if normalize_last is True and normalize is True: for piv_i, piv_j in enumerate(pivot_cols): pivot_val = mat[piv_icols + piv_j] mat[piv_icols + piv_j] = self.one for p in range(piv_icols + piv_j + 1, (piv_i + 1)cols): mat[p] = mat[p] / pivot_val return self._new(self.rows, self.cols, mat), tuple(pivot_cols), tuple(swaps) def echelon_form(self, iszerofunc=_iszero, simplify=False, with_pivots=False): """Returns a matrix row-equivalent to ``self`` that is in echelon form. Note that echelon form of a matrix is not unique, however, properties like the row space and the null space are preserved.""" simpfunc = simplify if isinstance( simplify, FunctionType) else _simplify mat, pivots, swaps = self._eval_echelon_form(iszerofunc, simpfunc) if with_pivots: return mat, pivots return mat def elementary_col_op(self, op="n->kn", col=None, k=None, col1=None, col2=None): """Performs the elementary column operation `op`. `op` may be one of * "n->kn" (column n goes to kn) "n<->m" (swap column n and column m) * "n->n+km" (column n goes to column n + kcolumn m) Parameters ========== op : string; the elementary row operation col : the column to apply the column operation k : the multiple to apply in the column operation col1 : one column of a column swap col2 : second column of a column swap or column "m" in the column operation "n->n+km" """ op, col, k, col1, col2 = self._normalize_op_args(op, col, k, col1, col2, "col") # now that we've validated, we're all good to dispatch if op == "n->kn": return self._eval_col_op_multiply_col_by_const(col, k) if op == "n<->m": return self._eval_col_op_swap(col1, col2) if op == "n->n+km": return self._eval_col_op_add_multiple_to_other_col(col, k, col2) def elementary_row_op(self, op="n->kn", row=None, k=None, row1=None, row2=None): """Performs the elementary row operation `op`. `op` may be one of "n->kn" (row n goes to kn) "n<->m" (swap row n and row m) * "n->n+km" (row n goes to row n + krow m) Parameters ========== op : string; the elementary row operation row : the row to apply the row operation k : the multiple to apply in the row operation row1 : one row of a row swap row2 : second row of a row swap or row "m" in the row operation "n->n+km" """ op, row, k, row1, row2 = self._normalize_op_args(op, row, k, row1, row2, "row") # now that we've validated, we're all good to dispatch if op == "n->kn": return self._eval_row_op_multiply_row_by_const(row, k) if op == "n<->m": return self._eval_row_op_swap(row1, row2) if op == "n->n+km": return self._eval_row_op_add_multiple_to_other_row(row, k, row2) @property def is_echelon(self, iszerofunc=_iszero): """Returns `True` if the matrix is in echelon form. That is, all rows of zeros are at the bottom, and below each leading non-zero in a row are exclusively zeros.""" return self._eval_is_echelon(iszerofunc) def rank(self, iszerofunc=_iszero, simplify=False): """ Returns the rank of a matrix >>> from sympy import Matrix >>> from sympy.abc import x >>> m = Matrix([[1, 2], [x, 1 - 1/x]]) >>> m.rank() 2 >>> n = Matrix(3, 3, range(1, 10)) >>> n.rank() 2 """ simpfunc = simplify if isinstance( simplify, FunctionType) else _simplify # for small matrices, we compute the rank explicitly # if is_zero on elements doesn't answer the question # for small matrices, we fall back to the full routine. if self.rows <= 0 or self.cols <= 0: return 0 if self.rows <= 1 or self.cols <= 1: zeros = [iszerofunc(x) for x in self] if False in zeros: return 1 if self.rows == 2 and self.cols == 2: zeros = [iszerofunc(x) for x in self] if not False in zeros and not None in zeros: return 0 det = self.det() if iszerofunc(det) and False in zeros: return 1 if iszerofunc(det) is False: return 2 mat, _ = self._permute_complexity_right(iszerofunc=iszerofunc) echelon_form, pivots, swaps = mat._eval_echelon_form(iszerofunc=iszerofunc, simpfunc=simpfunc) return len(pivots) def rref(self, iszerofunc=_iszero, simplify=False, pivots=True, normalize_last=True): """Return reduced row-echelon form of matrix and indices of pivot vars. Parameters ========== iszerofunc : Function A function used for detecting whether an element can act as a pivot. ``lambda x: x.is_zero`` is used by default. simplify : Function A function used to simplify elements when looking for a pivot. By default SymPy's ``simplify`` is used. pivots : True or False If ``True``, a tuple containing the row-reduced matrix and a tuple of pivot columns is returned. If ``False`` just the row-reduced matrix is returned. normalize_last : True or False If ``True``, no pivots are normalized to `1` until after all entries above and below each pivot are zeroed. This means the row reduction algorithm is fraction free until the very last step. If ``False``, the naive row reduction procedure is used where each pivot is normalized to be `1` before row operations are used to zero above and below the pivot. Notes ===== The default value of ``normalize_last=True`` can provide significant speedup to row reduction, especially on matrices with symbols. However, if you depend on the form row reduction algorithm leaves entries of the matrix, set ``noramlize_last=False`` Examples ======== >>> from sympy import Matrix >>> from sympy.abc import x >>> m = Matrix([[1, 2], [x, 1 - 1/x]]) >>> m.rref() (Matrix([ [1, 0], [0, 1]]), (0, 1)) >>> rref_matrix, rref_pivots = m.rref() >>> rref_matrix Matrix([ [1, 0], [0, 1]]) >>> rref_pivots (0, 1) """ simpfunc = simplify if isinstance( simplify, FunctionType) else _simplify ret, pivot_cols = self._eval_rref(iszerofunc=iszerofunc, simpfunc=simpfunc, normalize_last=normalize_last) if pivots: ret = (ret, pivot_cols) return ret class MatrixSubspaces(MatrixReductions): """Provides methods relating to the fundamental subspaces of a matrix. Should not be instantiated directly.""" def columnspace(self, simplify=False): """Returns a list of vectors (Matrix objects) that span columnspace of ``self`` Examples ======== >>> from sympy.matrices import Matrix >>> m = Matrix(3, 3, [1, 3, 0, -2, -6, 0, 3, 9, 6]) >>> m Matrix([ [ 1, 3, 0], [-2, -6, 0], [ 3, 9, 6]]) >>> m.columnspace() [Matrix([ [ 1], [-2], [ 3]]), Matrix([ [0], [0], [6]])] See Also ======== nullspace rowspace """ reduced, pivots = self.echelon_form(simplify=simplify, with_pivots=True) return [self.col(i) for i in pivots] def nullspace(self, simplify=False, iszerofunc=_iszero): """Returns list of vectors (Matrix objects) that span nullspace of ``self`` Examples ======== >>> from sympy.matrices import Matrix >>> m = Matrix(3, 3, [1, 3, 0, -2, -6, 0, 3, 9, 6]) >>> m Matrix([ [ 1, 3, 0], [-2, -6, 0], [ 3, 9, 6]]) >>> m.nullspace() [Matrix([ [-3], [ 1], [ 0]])] See Also ======== columnspace rowspace """ reduced, pivots = self.rref(iszerofunc=iszerofunc, simplify=simplify) free_vars = [i for i in range(self.cols) if i not in pivots] basis = [] for free_var in free_vars: # for each free variable, we will set it to 1 and all others # to 0. Then, we will use back substitution to solve the system vec = [self.zero]self.cols vec[free_var] = self.one for piv_row, piv_col in enumerate(pivots): vec[piv_col] -= reduced[piv_row, free_var] basis.append(vec) return [self._new(self.cols, 1, b) for b in basis] def rowspace(self, simplify=False): """Returns a list of vectors that span the row space of ``self``.""" reduced, pivots = self.echelon_form(simplify=simplify, with_pivots=True) return [reduced.row(i) for i in range(len(pivots))] @classmethod def orthogonalize(cls, vecs, kwargs): """Apply the Gram-Schmidt orthogonalization procedure to vectors supplied in ``vecs``. Parameters ========== vecs vectors to be made orthogonal normalize : bool If ``True``, return an orthonormal basis. rankcheck : bool If ``True``, the computation does not stop when encountering linearly dependent vectors. If ``False``, it will raise ``ValueError`` when any zero or linearly dependent vectors are found. Returns ======= list List of orthogonal (or orthonormal) basis vectors. See Also ======== MatrixBase.QRdecomposition References ========== .. [1] https://en.wikipedia.org/wiki/Gram%E2%80%93Schmidt_process """ normalize = kwargs.get('normalize', False) rankcheck = kwargs.get('rankcheck', False) def project(a, b): return b (a.dot(b) / b.dot(b)) def perp_to_subspace(vec, basis): """projects vec onto the subspace given by the orthogonal basis ``basis``""" components = [project(vec, b) for b in basis] if len(basis) == 0: return vec return vec - reduce(lambda a, b: a + b, components) ret = [] # make sure we start with a non-zero vector vecs = list(vecs) while len(vecs) > 0 and vecs[0].is_zero: if rankcheck is False: del vecs[0] else: raise ValueError( "GramSchmidt: vector set not linearly independent") for vec in vecs: perp = perp_to_subspace(vec, ret) if not perp.is_zero: ret.append(perp) elif rankcheck is True: raise ValueError( "GramSchmidt: vector set not linearly independent") if normalize: ret = [vec / vec.norm() for vec in ret] return ret class MatrixEigen(MatrixSubspaces): """Provides basic matrix eigenvalue/vector operations. Should not be instantiated directly.""" def diagonalize(self, reals_only=False, sort=False, normalize=False): """ Return (P, D), where D is diagonal and D = P^-1 * M * P where M is current matrix. Parameters ========== reals_only : bool. Whether to throw an error if complex numbers are need to diagonalize. (Default: False) sort : bool. Sort the eigenvalues along the diagonal. (Default: False) normalize : bool. If True, normalize the columns of P. (Default: False) Examples ======== >>> from sympy import Matrix >>> m = Matrix(3, 3, [1, 2, 0, 0, 3, 0, 2, -4, 2]) >>> m Matrix([ [1, 2, 0], [0, 3, 0], [2, -4, 2]]) >>> (P, D) = m.diagonalize() >>> D Matrix([ [1, 0, 0], [0, 2, 0], [0, 0, 3]]) >>> P Matrix([ [-1, 0, -1], [ 0, 0, -1], [ 2, 1, 2]]) >>> P.inv() * m * P Matrix([ [1, 0, 0], [0, 2, 0], [0, 0, 3]]) See Also ======== is_diagonal is_diagonalizable """ if not self.is_square: raise NonSquareMatrixError() if not self.is_diagonalizable(reals_only=reals_only): raise MatrixError("Matrix is not diagonalizable") eigenvecs = self.eigenvects(simplify=True) if sort: eigenvecs = sorted(eigenvecs, key=default_sort_key) p_cols, diag = [], [] for val, mult, basis in eigenvecs: diag += [val] * mult p_cols += basis if normalize: p_cols = [v / v.norm() for v in p_cols] return self.hstack(p_cols), self.diag(diag) def eigenvals(self, error_when_incomplete=True, flags): r"""Return eigenvalues using the Berkowitz agorithm to compute the characteristic polynomial. Parameters ========== error_when_incomplete : bool, optional If it is set to ``True``, it will raise an error if not all eigenvalues are computed. This is caused by ``roots`` not returning a full list of eigenvalues. simplify : bool or function, optional If it is set to ``True``, it attempts to return the most simplified form of expressions returned by applying default simplification method in every routine. If it is set to ``False``, it will skip simplification in this particular routine to save computation resources. If a function is passed to, it will attempt to apply the particular function as simplification method. rational : bool, optional If it is set to ``True``, every floating point numbers would be replaced with rationals before computation. It can solve some issues of ``roots`` routine not working well with floats. multiple : bool, optional If it is set to ``True``, the result will be in the form of a list. If it is set to ``False``, the result will be in the form of a dictionary. Returns ======= eigs : list or dict Eigenvalues of a matrix. The return format would be specified by the key ``multiple``. Raises ====== MatrixError If not enough roots had got computed. NonSquareMatrixError If attempted to compute eigenvalues from a non-square matrix. See Also ======== MatrixDeterminant.charpoly eigenvects Notes ===== Eigenvalues of a matrix `A` can be computed by solving a matrix equation `\det(A - \lambda I) = 0` """ simplify = flags.get('simplify', False) # Collect simplify flag before popped up, to reuse later in the routine. multiple = flags.get('multiple', False) # Collect multiple flag to decide whether return as a dict or list. rational = flags.pop('rational', True) mat = self if not mat: return {} if rational: mat = mat.applyfunc( lambda x: nsimplify(x, rational=True) if x.has(Float) else x) if mat.is_upper or mat.is_lower: if not self.is_square: raise NonSquareMatrixError() diagonal_entries = [mat[i, i] for i in range(mat.rows)] if multiple: eigs = diagonal_entries else: eigs = {} for diagonal_entry in diagonal_entries: if diagonal_entry not in eigs: eigs[diagonal_entry] = 0 eigs[diagonal_entry] += 1 else: flags.pop('simplify', None) # pop unsupported flag if isinstance(simplify, FunctionType): eigs = roots(mat.charpoly(x=Dummy('x'), simplify=simplify), flags) else: eigs = roots(mat.charpoly(x=Dummy('x')), flags) # make sure the algebraic multiplicity sums to the # size of the matrix if error_when_incomplete and (sum(eigs.values()) if isinstance(eigs, dict) else len(eigs)) != self.cols: raise MatrixError("Could not compute eigenvalues for {}".format(self)) # Since 'simplify' flag is unsupported in roots() # simplify() function will be applied once at the end of the routine. if not simplify: return eigs if not isinstance(simplify, FunctionType): simplify = _simplify # With 'multiple' flag set true, simplify() will be mapped for the list # Otherwise, simplify() will be mapped for the keys of the dictionary if not multiple: return {simplify(key): value for key, value in eigs.items()} else: return [simplify(value) for value in eigs] def eigenvects(self, error_when_incomplete=True, iszerofunc=_iszero, flags): """Return list of triples (eigenval, multiplicity, eigenspace). Parameters ========== error_when_incomplete : bool, optional Raise an error when not all eigenvalues are computed. This is caused by ``roots`` not returning a full list of eigenvalues. iszerofunc : function, optional Specifies a zero testing function to be used in ``rref``. Default value is ``_iszero``, which uses SymPy's naive and fast default assumption handler. It can also accept any user-specified zero testing function, if it is formatted as a function which accepts a single symbolic argument and returns ``True`` if it is tested as zero and ``False`` if it is tested as non-zero, and ``None`` if it is undecidable. simplify : bool or function, optional If ``True``, ``as_content_primitive()`` will be used to tidy up normalization artifacts. It will also be used by the ``nullspace`` routine. chop : bool or positive number, optional If the matrix contains any Floats, they will be changed to Rationals for computation purposes, but the answers will be returned after being evaluated with evalf. The ``chop`` flag is passed to ``evalf``. When ``chop=True`` a default precision will be used; a number will be interpreted as the desired level of precision. Returns ======= ret : [(eigenval, multiplicity, eigenspace), ...] A ragged list containing tuples of data obtained by ``eigenvals`` and ``nullspace``. ``eigenspace`` is a list containing the ``eigenvector`` for each eigenvalue. ``eigenvector`` is a vector in the form of a ``Matrix``. e.g. a vector of length 3 is returned as ``Matrix([a_1, a_2, a_3])``. Raises ====== NotImplementedError If failed to compute nullspace. See Also ======== eigenvals MatrixSubspaces.nullspace """ from sympy.matrices import eye simplify = flags.get('simplify', True) if not isinstance(simplify, FunctionType): simpfunc = _simplify if simplify else lambda x: x primitive = flags.get('simplify', False) chop = flags.pop('chop', False) flags.pop('multiple', None) # remove this if it's there mat = self # roots doesn't like Floats, so replace them with Rationals has_floats = self.has(Float) if has_floats: mat = mat.applyfunc(lambda x: nsimplify(x, rational=True)) def eigenspace(eigenval): """Get a basis for the eigenspace for a particular eigenvalue""" m = mat - self.eye(mat.rows) * eigenval ret = m.nullspace(iszerofunc=iszerofunc) # the nullspace for a real eigenvalue should be # non-trivial. If we didn't find an eigenvector, try once # more a little harder if len(ret) == 0 and simplify: ret = m.nullspace(iszerofunc=iszerofunc, simplify=True) if len(ret) == 0: raise NotImplementedError( "Can't evaluate eigenvector for eigenvalue %s" % eigenval) return ret eigenvals = mat.eigenvals(rational=False, error_when_incomplete=error_when_incomplete, flags) ret = [(val, mult, eigenspace(val)) for val, mult in sorted(eigenvals.items(), key=default_sort_key)] if primitive: # if the primitive flag is set, get rid of any common # integer denominators def denom_clean(l): from sympy import gcd return [(v / gcd(list(v))).applyfunc(simpfunc) for v in l] ret = [(val, mult, denom_clean(es)) for val, mult, es in ret] if has_floats: # if we had floats to start with, turn the eigenvectors to floats ret = [(val.evalf(chop=chop), mult, [v.evalf(chop=chop) for v in es]) for val, mult, es in ret] return ret def is_diagonalizable(self, reals_only=False, kwargs): """Returns true if a matrix is diagonalizable. Parameters ========== reals_only : bool. If reals_only=True, determine whether the matrix can be diagonalized without complex numbers. (Default: False) kwargs ====== clear_cache : bool. If True, clear the result of any computations when finished. (Default: True) Examples ======== >>> from sympy import Matrix >>> m = Matrix(3, 3, [1, 2, 0, 0, 3, 0, 2, -4, 2]) >>> m Matrix([ [1, 2, 0], [0, 3, 0], [2, -4, 2]]) >>> m.is_diagonalizable() True >>> m = Matrix(2, 2, [0, 1, 0, 0]) >>> m Matrix([ [0, 1], [0, 0]]) >>> m.is_diagonalizable() False >>> m = Matrix(2, 2, [0, 1, -1, 0]) >>> m Matrix([ [ 0, 1], [-1, 0]]) >>> m.is_diagonalizable() True >>> m.is_diagonalizable(reals_only=True) False See Also ======== is_diagonal diagonalize """ if 'clear_cache' in kwargs: SymPyDeprecationWarning( feature='clear_cache', deprecated_since_version=1.4, issue=15887 ).warn() if 'clear_subproducts' in kwargs: SymPyDeprecationWarning( feature='clear_subproducts', deprecated_since_version=1.4, issue=15887 ).warn() if not self.is_square: return False if all(e.is_real for e in self) and self.is_symmetric(): # every real symmetric matrix is real diagonalizable return True eigenvecs = self.eigenvects(simplify=True) ret = True for val, mult, basis in eigenvecs: # if we have a complex eigenvalue if reals_only and not val.is_real: ret = False # if the geometric multiplicity doesn't equal the algebraic if mult != len(basis): ret = False return ret def _eval_is_positive_definite(self, method="eigen"): """Algorithm dump for computing positive-definiteness of a matrix. Parameters ========== method : str, optional Specifies the method for computing positive-definiteness of a matrix. If ``'eigen'``, it computes the full eigenvalues and decides if the matrix is positive-definite. If ``'CH'``, it attempts computing the Cholesky decomposition to detect the definitiveness. If ``'LDL'``, it attempts computing the LDL decomposition to detect the definitiveness. """ if self.is_hermitian: if method == 'eigen': eigen = self.eigenvals() args = [x.is_positive for x in eigen.keys()] return fuzzy_and(args) elif method == 'CH': try: self.cholesky(hermitian=True) except NonPositiveDefiniteMatrixError: return False return True elif method == 'LDL': try: self.LDLdecomposition(hermitian=True) except NonPositiveDefiniteMatrixError: return False return True else: raise NotImplementedError() elif self.is_square: M_H = (self + self.H) / 2 return M_H._eval_is_positive_definite(method=method) def is_positive_definite(self): return self._eval_is_positive_definite() def is_positive_semidefinite(self): if self.is_hermitian: eigen = self.eigenvals() args = [x.is_nonnegative for x in eigen.keys()] return fuzzy_and(args) elif self.is_square: return ((self + self.H) / 2).is_positive_semidefinite def is_negative_definite(self): if self.is_hermitian: eigen = self.eigenvals() args = [x.is_negative for x in eigen.keys()] return fuzzy_and(args) elif self.is_square: return ((self + self.H) / 2).is_negative_definite def is_negative_semidefinite(self): if self.is_hermitian: eigen = self.eigenvals() args = [x.is_nonpositive for x in eigen.keys()] return fuzzy_and(args) elif self.is_square: return ((self + self.H) / 2).is_negative_semidefinite def is_indefinite(self): if self.is_hermitian: eigen = self.eigenvals() args1 = [x.is_positive for x in eigen.keys()] any_positive = fuzzy_or(args1) args2 = [x.is_negative for x in eigen.keys()] any_negative = fuzzy_or(args2) return fuzzy_and([any_positive, any_negative]) elif self.is_square: return ((self + self.H) / 2).is_indefinite _doc_positive_definite = \ r"""Finds out the definiteness of a matrix. Examples ======== An example of numeric positive definite matrix: >>> from sympy import Matrix >>> A = Matrix([[1, -2], [-2, 6]]) >>> A.is_positive_definite True >>> A.is_positive_semidefinite True >>> A.is_negative_definite False >>> A.is_negative_semidefinite False >>> A.is_indefinite False An example of numeric negative definite matrix: >>> A = Matrix([[-1, 2], [2, -6]]) >>> A.is_positive_definite False >>> A.is_positive_semidefinite False >>> A.is_negative_definite True >>> A.is_negative_semidefinite True >>> A.is_indefinite False An example of numeric indefinite matrix: >>> A = Matrix([[1, 2], [2, 1]]) >>> A.is_positive_definite False >>> A.is_positive_semidefinite False >>> A.is_negative_definite True >>> A.is_negative_semidefinite True >>> A.is_indefinite False Notes ===== Definitiveness is not very commonly discussed for non-hermitian matrices. However, computing the definitiveness of a matrix can be generalized over any real matrix by taking the symmetric part: `A_S = 1/2 (A + A^{T})` Or over any complex matrix by taking the hermitian part: `A_H = 1/2 (A + A^{H})` And computing the eigenvalues. References ========== .. [1] https://en.wikipedia.org/wiki/Definiteness_of_a_matrix#Eigenvalues .. [2] http://mathworld.wolfram.com/PositiveDefiniteMatrix.html .. [3] Johnson, C. R. "Positive Definite Matrices." Amer. Math. Monthly 77, 259-264 1970. """ is_positive_definite = \ property(fget=is_positive_definite, doc=_doc_positive_definite) is_positive_semidefinite = \ property(fget=is_positive_semidefinite, doc=_doc_positive_definite) is_negative_definite = \ property(fget=is_negative_definite, doc=_doc_positive_definite) is_negative_semidefinite = \ property(fget=is_negative_semidefinite, doc=_doc_positive_definite) is_indefinite = \ property(fget=is_indefinite, doc=_doc_positive_definite) def jordan_form(self, calc_transform=True, *kwargs): """Return ``(P, J)`` where `J` is a Jordan block matrix and `P` is a matrix such that ``self == PJP-1`` Parameters ========== calc_transform : bool If ``False``, then only `J` is returned. chop : bool All matrices are converted to exact types when computing eigenvalues and eigenvectors. As a result, there may be approximation errors. If ``chop==True``, these errors will be truncated. Examples ======== >>> from sympy import Matrix >>> m = Matrix([[ 6, 5, -2, -3], [-3, -1, 3, 3], [ 2, 1, -2, -3], [-1, 1, 5, 5]]) >>> P, J = m.jordan_form() >>> J Matrix([ [2, 1, 0, 0], [0, 2, 0, 0], [0, 0, 2, 1], [0, 0, 0, 2]]) See Also ======== jordan_block """ if not self.is_square: raise NonSquareMatrixError("Only square matrices have Jordan forms") chop = kwargs.pop('chop', False) mat = self has_floats = self.has(Float) if has_floats: try: max_prec = max(term._prec for term in self._mat if isinstance(term, Float)) except ValueError: # if no term in the matrix is explicitly a Float calling max() # will throw a error so setting max_prec to default value of 53 max_prec = 53 # setting minimum max_dps to 15 to prevent loss of precision in # matrix containing non evaluated expressions max_dps = max(prec_to_dps(max_prec), 15) def restore_floats(args): """If ``has_floats`` is `True`, cast all ``args`` as matrices of floats.""" if has_floats: args = [m.evalf(prec=max_dps, chop=chop) for m in args] if len(args) == 1: return args[0] return args # cache calculations for some speedup mat_cache = {} def eig_mat(val, pow): """Cache computations of ``(self - valI)pow`` for quick retrieval""" if (val, pow) in mat_cache: return mat_cache[(val, pow)] if (val, pow - 1) in mat_cache: mat_cache[(val, pow)] = mat_cache[(val, pow - 1)] mat_cache[(val, 1)] else: mat_cache[(val, pow)] = (mat - valself.eye(self.rows))pow return mat_cache[(val, pow)] # helper functions def nullity_chain(val, algebraic_multiplicity): """Calculate the sequence [0, nullity(E), nullity(E2), ...] until it is constant where ``E = self - valI``""" # mat.rank() is faster than computing the null space, # so use the rank-nullity theorem cols = self.cols ret = [0] nullity = cols - eig_mat(val, 1).rank() i = 2 while nullity != ret[-1]: ret.append(nullity) if nullity == algebraic_multiplicity: break nullity = cols - eig_mat(val, i).rank() i += 1 # Due to issues like #7146 and #15872, SymPy sometimes # gives the wrong rank. In this case, raise an error # instead of returning an incorrect matrix if nullity < ret[-1] or nullity > algebraic_multiplicity: raise MatrixError( "SymPy had encountered an inconsistent " "result while computing Jordan block: " "{}".format(self)) return ret def blocks_from_nullity_chain(d): """Return a list of the size of each Jordan block. If d_n is the nullity of E*n, then the number of Jordan blocks of size n is 2d_n - d_(n-1) - d_(n+1)""" # d[0] is always the number of columns, so skip past it mid = [2d[n] - d[n - 1] - d[n + 1] for n in range(1, len(d) - 1)] # d is assumed to plateau with "d[ len(d) ] == d[-1]", so # 2d_n - d_(n-1) - d_(n+1) == d_n - d_(n-1) end = [d[-1] - d[-2]] if len(d) > 1 else [d[0]] return mid + end def pick_vec(small_basis, big_basis): """Picks a vector from big_basis that isn't in the subspace spanned by small_basis""" if len(small_basis) == 0: return big_basis[0] for v in big_basis: _, pivots = self.hstack((small_basis + [v])).echelon_form(with_pivots=True) if pivots[-1] == len(small_basis): return v # roots doesn't like Floats, so replace them with Rationals if has_floats: mat = mat.applyfunc(lambda x: nsimplify(x, rational=True)) # first calculate the jordan block structure eigs = mat.eigenvals() # make sure that we found all the roots by counting # the algebraic multiplicity if sum(m for m in eigs.values()) != mat.cols: raise MatrixError("Could not compute eigenvalues for {}".format(mat)) # most matrices have distinct eigenvalues # and so are diagonalizable. In this case, don't # do extra work! if len(eigs.keys()) == mat.cols: blocks = list(sorted(eigs.keys(), key=default_sort_key)) jordan_mat = mat.diag(blocks) if not calc_transform: return restore_floats(jordan_mat) jordan_basis = [eig_mat(eig, 1).nullspace()[0] for eig in blocks] basis_mat = mat.hstack(jordan_basis) return restore_floats(basis_mat, jordan_mat) block_structure = [] for eig in sorted(eigs.keys(), key=default_sort_key): algebraic_multiplicity = eigs[eig] chain = nullity_chain(eig, algebraic_multiplicity) block_sizes = blocks_from_nullity_chain(chain) # if block_sizes == [a, b, c, ...], then the number of # Jordan blocks of size 1 is a, of size 2 is b, etc. # create an array that has (eig, block_size) with one # entry for each block size_nums = [(i+1, num) for i, num in enumerate(block_sizes)] # we expect larger Jordan blocks to come earlier size_nums.reverse() block_structure.extend( (eig, size) for size, num in size_nums for _ in range(num)) jordan_form_size = sum(size for eig, size in block_structure) if jordan_form_size != self.rows: raise MatrixError( "SymPy had encountered an inconsistent result while " "computing Jordan block. : {}".format(self)) blocks = (mat.jordan_block(size=size, eigenvalue=eig) for eig, size in block_structure) jordan_mat = mat.diag(blocks) if not calc_transform: return restore_floats(jordan_mat) # For each generalized eigenspace, calculate a basis. # We start by looking for a vector in null( (A - eigI)n ) # which isn't in null( (A - eigI)*(n-1) ) where n is # the size of the Jordan block # # Ideally we'd just loop through block_structure and # compute each generalized eigenspace. However, this # causes a lot of unneeded computation. Instead, we # go through the eigenvalues separately, since we know # their generalized eigenspaces must have bases that # are linearly independent. jordan_basis = [] for eig in sorted(eigs.keys(), key=default_sort_key): eig_basis = [] for block_eig, size in block_structure: if block_eig != eig: continue null_big = (eig_mat(eig, size)).nullspace() null_small = (eig_mat(eig, size - 1)).nullspace() # we want to pick something that is in the big basis # and not the small, but also something that is independent # of any other generalized eigenvectors from a different # generalized eigenspace sharing the same eigenvalue. vec = pick_vec(null_small + eig_basis, null_big) new_vecs = [(eig_mat(eig, i))vec for i in range(size)] eig_basis.extend(new_vecs) jordan_basis.extend(reversed(new_vecs)) basis_mat = mat.hstack(jordan_basis) return restore_floats(basis_mat, jordan_mat) def left_eigenvects(self, flags): """Returns left eigenvectors and eigenvalues. This function returns the list of triples (eigenval, multiplicity, basis) for the left eigenvectors. Options are the same as for eigenvects(), i.e. the ``flags`` arguments gets passed directly to eigenvects(). Examples ======== >>> from sympy import Matrix >>> M = Matrix([[0, 1, 1], [1, 0, 0], [1, 1, 1]]) >>> M.eigenvects() [(-1, 1, [Matrix([ [-1], [ 1], [ 0]])]), (0, 1, [Matrix([ [ 0], [-1], [ 1]])]), (2, 1, [Matrix([ [2/3], [1/3], [ 1]])])] >>> M.left_eigenvects() [(-1, 1, [Matrix([[-2, 1, 1]])]), (0, 1, [Matrix([[-1, -1, 1]])]), (2, 1, [Matrix([[1, 1, 1]])])] """ eigs = self.transpose().eigenvects(flags) return [(val, mult, [l.transpose() for l in basis]) for val, mult, basis in eigs] def singular_values(self): """Compute the singular values of a Matrix Examples ======== >>> from sympy import Matrix, Symbol >>> x = Symbol('x', real=True) >>> A = Matrix([[0, 1, 0], [0, x, 0], [-1, 0, 0]]) >>> A.singular_values() [sqrt(x2 + 1), 1, 0] See Also ======== condition_number """ mat = self if self.rows >= self.cols: valmultpairs = (mat.H mat).eigenvals() else: valmultpairs = (mat * mat.H).eigenvals() # Expands result from eigenvals into a simple list vals = [] for k, v in valmultpairs.items(): vals += [sqrt(k)] * v # dangerous! same k in several spots! # Pad with zeros if singular values are computed in reverse way, # to give consistent format. if len(vals) < self.cols: vals += [self.zero] * (self.cols - len(vals)) # sort them in descending order vals.sort(reverse=True, key=default_sort_key) return vals class MatrixCalculus(MatrixCommon): """Provides calculus-related matrix operations.""" def diff(self, args, kwargs): """Calculate the derivative of each element in the matrix. ``args`` will be passed to the ``integrate`` function. Examples ======== >>> from sympy.matrices import Matrix >>> from sympy.abc import x, y >>> M = Matrix([[x, y], [1, 0]]) >>> M.diff(x) Matrix([ [1, 0], [0, 0]]) See Also ======== integrate limit """ # XXX this should be handled here rather than in Derivative from sympy import Derivative kwargs.setdefault('evaluate', True) deriv = Derivative(self, args, evaluate=True) if not isinstance(self, Basic): return deriv.as_mutable() else: return deriv def _eval_derivative(self, arg): return self.applyfunc(lambda x: x.diff(arg)) def _accept_eval_derivative(self, s): return s._visit_eval_derivative_array(self) def _visit_eval_derivative_scalar(self, base): # Types are (base: scalar, self: matrix) return self.applyfunc(lambda x: base.diff(x)) def _visit_eval_derivative_array(self, base): # Types are (base: array/matrix, self: matrix) from sympy import derive_by_array return derive_by_array(base, self) def integrate(self, args): """Integrate each element of the matrix. ``args`` will be passed to the ``integrate`` function. Examples ======== >>> from sympy.matrices import Matrix >>> from sympy.abc import x, y >>> M = Matrix([[x, y], [1, 0]]) >>> M.integrate((x, )) Matrix([ [x2/2, xy], [ x, 0]]) >>> M.integrate((x, 0, 2)) Matrix([ [2, 2y], [2, 0]]) See Also ======== limit diff """ return self.applyfunc(lambda x: x.integrate(args)) def jacobian(self, X): """Calculates the Jacobian matrix (derivative of a vector-valued function). Parameters ========== ``self`` : vector of expressions representing functions f_i(x_1, ..., x_n). X : set of x_i's in order, it can be a list or a Matrix Both ``self`` and X can be a row or a column matrix in any order (i.e., jacobian() should always work). Examples ======== >>> from sympy import sin, cos, Matrix >>> from sympy.abc import rho, phi >>> X = Matrix([rhocos(phi), rhosin(phi), rho*2]) >>> Y = Matrix([rho, phi]) >>> X.jacobian(Y) Matrix([ [cos(phi), -rhosin(phi)], [sin(phi), rhocos(phi)], [ 2rho, 0]]) >>> X = Matrix([rhocos(phi), rhosin(phi)]) >>> X.jacobian(Y) Matrix([ [cos(phi), -rhosin(phi)], [sin(phi), rhocos(phi)]]) See Also ======== hessian wronskian """ if not isinstance(X, MatrixBase): X = self._new(X) # Both X and ``self`` can be a row or a column matrix, so we need to make # sure all valid combinations work, but everything else fails: if self.shape[0] == 1: m = self.shape[1] elif self.shape[1] == 1: m = self.shape[0] else: raise TypeError("``self`` must be a row or a column matrix") if X.shape[0] == 1: n = X.shape[1] elif X.shape[1] == 1: n = X.shape[0] else: raise TypeError("X must be a row or a column matrix") # m is the number of functions and n is the number of variables # computing the Jacobian is now easy: return self._new(m, n, lambda j, i: self[j].diff(X[i])) def limit(self, args): """Calculate the limit of each element in the matrix. ``args`` will be passed to the ``limit`` function. Examples ======== >>> from sympy.matrices import Matrix >>> from sympy.abc import x, y >>> M = Matrix([[x, y], [1, 0]]) >>> M.limit(x, 2) Matrix([ [2, y], [1, 0]]) See Also ======== integrate diff """ return self.applyfunc(lambda x: x.limit(args)) # https://github.com/sympy/sympy/pull/12854 class MatrixDeprecated(MatrixCommon): """A class to house deprecated matrix methods.""" def _legacy_array_dot(self, b): """Compatibility function for deprecated behavior of ``matrix.dot(vector)`` """ from .dense import Matrix if not isinstance(b, MatrixBase): if is_sequence(b): if len(b) != self.cols and len(b) != self.rows: raise ShapeError( "Dimensions incorrect for dot product: %s, %s" % ( self.shape, len(b))) return self.dot(Matrix(b)) else: raise TypeError( "`b` must be an ordered iterable or Matrix, not %s." % type(b)) mat = self if mat.cols == b.rows: if b.cols != 1: mat = mat.T b = b.T prod = flatten((mat * b).tolist()) return prod if mat.cols == b.cols: return mat.dot(b.T) elif mat.rows == b.rows: return mat.T.dot(b) else: raise ShapeError("Dimensions incorrect for dot product: %s, %s" % ( self.shape, b.shape)) def berkowitz_charpoly(self, x=Dummy('lambda'), simplify=_simplify): return self.charpoly(x=x) def berkowitz_det(self): """Computes determinant using Berkowitz method. See Also ======== det berkowitz """ return self.det(method='berkowitz') def berkowitz_eigenvals(self, flags): """Computes eigenvalues of a Matrix using Berkowitz method. See Also ======== berkowitz """ return self.eigenvals(flags) def berkowitz_minors(self): """Computes principal minors using Berkowitz method. See Also ======== berkowitz """ sign, minors = self.one, [] for poly in self.berkowitz(): minors.append(sign * poly[-1]) sign = -sign return tuple(minors) def berkowitz(self): from sympy.matrices import zeros berk = ((1,),) if not self: return berk if not self.is_square: raise NonSquareMatrixError() A, N = self, self.rows transforms = [0] * (N - 1) for n in range(N, 1, -1): T, k = zeros(n + 1, n), n - 1 R, C = -A[k, :k], A[:k, k] A, a = A[:k, :k], -A[k, k] items = [C] for i in range(0, n - 2): items.append(A * items[i]) for i, B in enumerate(items): items[i] = (R * B)[0, 0] items = [self.one, a] + items for i in range(n): T[i:, i] = items[:n - i + 1] transforms[k - 1] = T polys = [self._new([self.one, -A[0, 0]])] for i, T in enumerate(transforms): polys.append(T * polys[i]) return berk + tuple(map(tuple, polys)) def cofactorMatrix(self, method="berkowitz"): return self.cofactor_matrix(method=method) def det_bareis(self): return self.det(method='bareiss') def det_bareiss(self): """Compute matrix determinant using Bareiss' fraction-free algorithm which is an extension of the well known Gaussian elimination method. This approach is best suited for dense symbolic matrices and will result in a determinant with minimal number of fractions. It means that less term rewriting is needed on resulting formulae. TODO: Implement algorithm for sparse matrices (SFF), http://www.eecis.udel.edu/~saunders/papers/sffge/it5.ps. See Also ======== det berkowitz_det """ return self.det(method='bareiss') def det_LU_decomposition(self): """Compute matrix determinant using LU decomposition Note that this method fails if the LU decomposition itself fails. In particular, if the matrix has no inverse this method will fail. TODO: Implement algorithm for sparse matrices (SFF), http://www.eecis.udel.edu/~saunders/papers/sffge/it5.ps. See Also ======== det det_bareiss berkowitz_det """ return self.det(method='lu') def jordan_cell(self, eigenval, n): return self.jordan_block(size=n, eigenvalue=eigenval) def jordan_cells(self, calc_transformation=True): P, J = self.jordan_form() return P, J.get_diag_blocks() def minorEntry(self, i, j, method="berkowitz"): return self.minor(i, j, method=method) def minorMatrix(self, i, j): return self.minor_submatrix(i, j) def permuteBkwd(self, perm): """Permute the rows of the matrix with the given permutation in reverse.""" return self.permute_rows(perm, direction='backward') def permuteFwd(self, perm): """Permute the rows of the matrix with the given permutation.""" return self.permute_rows(perm, direction='forward') class MatrixBase(MatrixDeprecated, MatrixCalculus, MatrixEigen, MatrixCommon): """Base class for matrix objects.""" # Added just for numpy compatibility __array_priority__ = 11 is_Matrix = True _class_priority = 3 _sympify = staticmethod(sympify) zero = S.Zero one = S.One __hash__ = None # Mutable # Defined here the same as on Basic. # We don't define _repr_png_ here because it would add a large amount of # data to any notebook containing SymPy expressions, without adding # anything useful to the notebook. It can still enabled manually, e.g., # for the qtconsole, with init_printing(). def _repr_latex_(self): """ IPython/Jupyter LaTeX printing To change the behavior of this (e.g., pass in some settings to LaTeX), use init_printing(). init_printing() will also enable LaTeX printing for built in numeric types like ints and container types that contain SymPy objects, like lists and dictionaries of expressions. """ from sympy.printing.latex import latex s = latex(self, mode='plain') return "$\\displaystyle %s$" % s _repr_latex_orig = _repr_latex_ def __array__(self, dtype=object): from .dense import matrix2numpy return matrix2numpy(self, dtype=dtype) def __getattr__(self, attr): if attr in ('diff', 'integrate', 'limit'): def doit(args): item_doit = lambda item: getattr(item, attr)(args) return self.applyfunc(item_doit) return doit else: raise AttributeError( "%s has no attribute %s." % (self.__class__.__name__, attr)) def __len__(self): """Return the number of elements of ``self``. Implemented mainly so bool(Matrix()) == False. """ return self.rows * self.cols def __mathml__(self): mml = "" for i in range(self.rows): mml += "<matrixrow>" for j in range(self.cols): mml += self[i, j].__mathml__() mml += "</matrixrow>" return "<matrix>" + mml + "</matrix>" # needed for python 2 compatibility def __ne__(self, other): return not self == other def _matrix_pow_by_jordan_blocks(self, num): from sympy.matrices import diag, MutableMatrix from sympy import binomial def jordan_cell_power(jc, n): N = jc.shape[0] l = jc[0,0] if l.is_zero: if N == 1 and n.is_nonnegative: jc[0,0] = ln elif not (n.is_integer and n.is_nonnegative): raise NonInvertibleMatrixError("Non-invertible matrix can only be raised to a nonnegative integer") else: for i in range(N): jc[0,i] = KroneckerDelta(i, n) else: for i in range(N): bn = binomial(n, i) if isinstance(bn, binomial): bn = bn._eval_expand_func() jc[0,i] = l(n-i)bn for i in range(N): for j in range(1, N-i): jc[j,i+j] = jc [j-1,i+j-1] P, J = self.jordan_form() jordan_cells = J.get_diag_blocks() # Make sure jordan_cells matrices are mutable: jordan_cells = [MutableMatrix(j) for j in jordan_cells] for j in jordan_cells: jordan_cell_power(j, num) return self._new(Pdiag(jordan_cells)P.inv()) def __repr__(self): return sstr(self) def __str__(self): if self.rows == 0 or self.cols == 0: return 'Matrix(%s, %s, [])' % (self.rows, self.cols) return "Matrix(%s)" % str(self.tolist()) def _format_str(self, printer=None): if not printer: from sympy.printing.str import StrPrinter printer = StrPrinter() # Handle zero dimensions: if self.rows == 0 or self.cols == 0: return 'Matrix(%s, %s, [])' % (self.rows, self.cols) if self.rows == 1: return "Matrix([%s])" % self.table(printer, rowsep=',\n') return "Matrix([\n%s])" % self.table(printer, rowsep=',\n') @classmethod def irregular(cls, ntop, matrices, kwargs): """Return a matrix filled by the given matrices which are listed in order of appearance from left to right, top to bottom as they first appear in the matrix. They must fill the matrix completely. Examples ======== >>> from sympy import ones, Matrix >>> Matrix.irregular(3, ones(2,1), ones(3,3)2, ones(2,2)3, ... ones(1,1)4, ones(2,2)5, ones(1,2)6, ones(1,2)7) Matrix([ [1, 2, 2, 2, 3, 3], [1, 2, 2, 2, 3, 3], [4, 2, 2, 2, 5, 5], [6, 6, 7, 7, 5, 5]]) """ from sympy.core.compatibility import as_int ntop = as_int(ntop) # make sure we are working with explicit matrices b = [i.as_explicit() if hasattr(i, 'as_explicit') else i for i in matrices] q = list(range(len(b))) dat = [i.rows for i in b] active = [q.pop(0) for _ in range(ntop)] cols = sum([b[i].cols for i in active]) rows = [] while any(dat): r = [] for a, j in enumerate(active): r.extend(b[j][-dat[j], :]) dat[j] -= 1 if dat[j] == 0 and q: active[a] = q.pop(0) if len(r) != cols: raise ValueError(filldedent(''' Matrices provided do not appear to fill the space completely.''')) rows.append(r) return cls._new(rows) @classmethod def _handle_creation_inputs(cls, args, *kwargs): """Return the number of rows, cols and flat matrix elements. Examples ======== >>> from sympy import Matrix, I Matrix can be constructed as follows: from a nested list of iterables >>> Matrix( ((1, 2+I), (3, 4)) ) Matrix([ [1, 2 + I], [3, 4]]) * from un-nested iterable (interpreted as a column) >>> Matrix( [1, 2] ) Matrix([ [1], [2]]) * from un-nested iterable with dimensions >>> Matrix(1, 2, [1, 2] ) Matrix([[1, 2]]) * from no arguments (a 0 x 0 matrix) >>> Matrix() Matrix(0, 0, []) * from a rule >>> Matrix(2, 2, lambda i, j: i/(j + 1) ) Matrix([ [0, 0], [1, 1/2]]) See Also ======== irregular - filling a matrix with irregular blocks """ from sympy.matrices.sparse import SparseMatrix from sympy.matrices.expressions.matexpr import MatrixSymbol from sympy.matrices.expressions.blockmatrix import BlockMatrix from sympy.utilities.iterables import reshape flat_list = None if len(args) == 1: # Matrix(SparseMatrix(...)) if isinstance(args[0], SparseMatrix): return args[0].rows, args[0].cols, flatten(args[0].tolist()) # Matrix(Matrix(...)) elif isinstance(args[0], MatrixBase): return args[0].rows, args[0].cols, args[0]._mat # Matrix(MatrixSymbol('X', 2, 2)) elif isinstance(args[0], Basic) and args[0].is_Matrix: return args[0].rows, args[0].cols, args[0].as_explicit()._mat # Matrix(numpy.ones((2, 2))) elif hasattr(args[0], "__array__"): # NumPy array or matrix or some other object that implements # __array__. So let's first use this method to get a # numpy.array() and then make a python list out of it. arr = args[0].__array__() if len(arr.shape) == 2: rows, cols = arr.shape[0], arr.shape[1] flat_list = [cls._sympify(i) for i in arr.ravel()] return rows, cols, flat_list elif len(arr.shape) == 1: rows, cols = arr.shape[0], 1 flat_list = [cls.zero] * rows for i in range(len(arr)): flat_list[i] = cls._sympify(arr[i]) return rows, cols, flat_list else: raise NotImplementedError( "SymPy supports just 1D and 2D matrices") # Matrix([1, 2, 3]) or Matrix([[1, 2], [3, 4]]) elif is_sequence(args[0]) \ and not isinstance(args[0], DeferredVector): dat = list(args[0]) ismat = lambda i: isinstance(i, MatrixBase) and ( evaluate or isinstance(i, BlockMatrix) or isinstance(i, MatrixSymbol)) raw = lambda i: is_sequence(i) and not ismat(i) evaluate = kwargs.get('evaluate', True) if evaluate: def do(x): # make Block and Symbol explicit if isinstance(x, (list, tuple)): return type(x)([do(i) for i in x]) if isinstance(x, BlockMatrix) or \ isinstance(x, MatrixSymbol) and \ all(_.is_Integer for _ in x.shape): return x.as_explicit() return x dat = do(dat) if dat == [] or dat == [[]]: rows = cols = 0 flat_list = [] elif not any(raw(i) or ismat(i) for i in dat): # a column as a list of values flat_list = [cls._sympify(i) for i in dat] rows = len(flat_list) cols = 1 if rows else 0 elif evaluate and all(ismat(i) for i in dat): # a column as a list of matrices ncol = set(i.cols for i in dat if any(i.shape)) if ncol: if len(ncol) != 1: raise ValueError('mismatched dimensions') flat_list = [_ for i in dat for r in i.tolist() for _ in r] cols = ncol.pop() rows = len(flat_list)//cols else: rows = cols = 0 flat_list = [] elif evaluate and any(ismat(i) for i in dat): ncol = set() flat_list = [] for i in dat: if ismat(i): flat_list.extend( [k for j in i.tolist() for k in j]) if any(i.shape): ncol.add(i.cols) elif raw(i): if i: ncol.add(len(i)) flat_list.extend(i) else: ncol.add(1) flat_list.append(i) if len(ncol) > 1: raise ValueError('mismatched dimensions') cols = ncol.pop() rows = len(flat_list)//cols else: # list of lists; each sublist is a logical row # which might consist of many rows if the values in # the row are matrices flat_list = [] ncol = set() rows = cols = 0 for row in dat: if not is_sequence(row) and \ not getattr(row, 'is_Matrix', False): raise ValueError('expecting list of lists') if not row: continue if evaluate and all(ismat(i) for i in row): r, c, flatT = cls._handle_creation_inputs( [i.T for i in row]) T = reshape(flatT, [c]) flat = [T[i][j] for j in range(c) for i in range(r)] r, c = c, r else: r = 1 if getattr(row, 'is_Matrix', False): c = 1 flat = [row] else: c = len(row) flat = [cls._sympify(i) for i in row] ncol.add(c) if len(ncol) > 1: raise ValueError('mismatched dimensions') flat_list.extend(flat) rows += r cols = ncol.pop() if ncol else 0 elif len(args) == 3: rows = as_int(args[0]) cols = as_int(args[1]) if rows < 0 or cols < 0: raise ValueError("Cannot create a {} x {} matrix. " "Both dimensions must be positive".format(rows, cols)) # Matrix(2, 2, lambda i, j: i+j) if len(args) == 3 and isinstance(args[2], Callable): op = args[2] flat_list = [] for i in range(rows): flat_list.extend( [cls._sympify(op(cls._sympify(i), cls._sympify(j))) for j in range(cols)]) # Matrix(2, 2, [1, 2, 3, 4]) elif len(args) == 3 and is_sequence(args[2]): flat_list = args[2] if len(flat_list) != rows * cols: raise ValueError( 'List length should be equal to rowscolumns') flat_list = [cls._sympify(i) for i in flat_list] # Matrix() elif len(args) == 0: # Empty Matrix rows = cols = 0 flat_list = [] if flat_list is None: raise TypeError(filldedent(''' Data type not understood; expecting list of lists or lists of values.''')) return rows, cols, flat_list def _setitem(self, key, value): """Helper to set value at location given by key. Examples ======== >>> from sympy import Matrix, I, zeros, ones >>> m = Matrix(((1, 2+I), (3, 4))) >>> m Matrix([ [1, 2 + I], [3, 4]]) >>> m[1, 0] = 9 >>> m Matrix([ [1, 2 + I], [9, 4]]) >>> m[1, 0] = [[0, 1]] To replace row r you assign to position rm where m is the number of columns: >>> M = zeros(4) >>> m = M.cols >>> M[3m] = ones(1, m)2; M Matrix([ [0, 0, 0, 0], [0, 0, 0, 0], [0, 0, 0, 0], [2, 2, 2, 2]]) And to replace column c you can assign to position c: >>> M[2] = ones(m, 1)4; M Matrix([ [0, 0, 4, 0], [0, 0, 4, 0], [0, 0, 4, 0], [2, 2, 4, 2]]) """ from .dense import Matrix is_slice = isinstance(key, slice) i, j = key = self.key2ij(key) is_mat = isinstance(value, MatrixBase) if type(i) is slice or type(j) is slice: if is_mat: self.copyin_matrix(key, value) return if not isinstance(value, Expr) and is_sequence(value): self.copyin_list(key, value) return raise ValueError('unexpected value: %s' % value) else: if (not is_mat and not isinstance(value, Basic) and is_sequence(value)): value = Matrix(value) is_mat = True if is_mat: if is_slice: key = (slice(divmod(i, self.cols)), slice(divmod(j, self.cols))) else: key = (slice(i, i + value.rows), slice(j, j + value.cols)) self.copyin_matrix(key, value) else: return i, j, self._sympify(value) return def add(self, b): """Return self + b """ return self + b def cholesky_solve(self, rhs): """Solves ``Ax = B`` using Cholesky decomposition, for a general square non-singular matrix. For a non-square matrix with rows > cols, the least squares solution is returned. See Also ======== lower_triangular_solve upper_triangular_solve gauss_jordan_solve diagonal_solve LDLsolve LUsolve QRsolve pinv_solve """ hermitian = True if self.is_symmetric(): hermitian = False L = self._cholesky(hermitian=hermitian) elif self.is_hermitian: L = self._cholesky(hermitian=hermitian) elif self.rows >= self.cols: L = (self.H self)._cholesky(hermitian=hermitian) rhs = self.H * rhs else: raise NotImplementedError('Under-determined System. ' 'Try M.gauss_jordan_solve(rhs)') Y = L._lower_triangular_solve(rhs) if hermitian: return (L.H)._upper_triangular_solve(Y) else: return (L.T)._upper_triangular_solve(Y) def cholesky(self, hermitian=True): """Returns the Cholesky-type decomposition L of a matrix A such that L * L.H == A if hermitian flag is True, or L * L.T == A if hermitian is False. A must be a Hermitian positive-definite matrix if hermitian is True, or a symmetric matrix if it is False. Examples ======== >>> from sympy.matrices import Matrix >>> A = Matrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) >>> A.cholesky() Matrix([ [ 5, 0, 0], [ 3, 3, 0], [-1, 1, 3]]) >>> A.cholesky() * A.cholesky().T Matrix([ [25, 15, -5], [15, 18, 0], [-5, 0, 11]]) The matrix can have complex entries: >>> from sympy import I >>> A = Matrix(((9, 3I), (-3I, 5))) >>> A.cholesky() Matrix([ [ 3, 0], [-I, 2]]) >>> A.cholesky() * A.cholesky().H Matrix([ [ 9, 3I], [-3I, 5]]) Non-hermitian Cholesky-type decomposition may be useful when the matrix is not positive-definite. >>> A = Matrix([[1, 2], [2, 1]]) >>> L = A.cholesky(hermitian=False) >>> L Matrix([ [1, 0], [2, sqrt(3)I]]) >>> LL.T == A True See Also ======== LDLdecomposition LUdecomposition QRdecomposition """ if not self.is_square: raise NonSquareMatrixError("Matrix must be square.") if hermitian and not self.is_hermitian: raise ValueError("Matrix must be Hermitian.") if not hermitian and not self.is_symmetric(): raise ValueError("Matrix must be symmetric.") return self._cholesky(hermitian=hermitian) def condition_number(self): """Returns the condition number of a matrix. This is the maximum singular value divided by the minimum singular value Examples ======== >>> from sympy import Matrix, S >>> A = Matrix([[1, 0, 0], [0, 10, 0], [0, 0, S.One/10]]) >>> A.condition_number() 100 See Also ======== singular_values """ if not self: return self.zero singularvalues = self.singular_values() return Max(singularvalues) / Min(singularvalues) def copy(self): """ Returns the copy of a matrix. Examples ======== >>> from sympy import Matrix >>> A = Matrix(2, 2, [1, 2, 3, 4]) >>> A.copy() Matrix([ [1, 2], [3, 4]]) """ return self._new(self.rows, self.cols, self._mat) def cross(self, b): r""" Return the cross product of ``self`` and ``b`` relaxing the condition of compatible dimensions: if each has 3 elements, a matrix of the same type and shape as ``self`` will be returned. If ``b`` has the same shape as ``self`` then common identities for the cross product (like `a \times b = - b \times a`) will hold. Parameters ========== b : 3x1 or 1x3 Matrix See Also ======== dot multiply multiply_elementwise """ if not is_sequence(b): raise TypeError( "`b` must be an ordered iterable or Matrix, not %s." % type(b)) if not (self.rows * self.cols == b.rows * b.cols == 3): raise ShapeError("Dimensions incorrect for cross product: %s x %s" % ((self.rows, self.cols), (b.rows, b.cols))) else: return self._new(self.rows, self.cols, ( (self[1] * b[2] - self[2] * b[1]), (self[2] * b[0] - self[0] * b[2]), (self[0] * b[1] - self[1] * b[0]))) @property def D(self): """Return Dirac conjugate (if ``self.rows == 4``). Examples ======== >>> from sympy import Matrix, I, eye >>> m = Matrix((0, 1 + I, 2, 3)) >>> m.D Matrix([[0, 1 - I, -2, -3]]) >>> m = (eye(4) + Ieye(4)) >>> m[0, 3] = 2 >>> m.D Matrix([ [1 - I, 0, 0, 0], [ 0, 1 - I, 0, 0], [ 0, 0, -1 + I, 0], [ 2, 0, 0, -1 + I]]) If the matrix does not have 4 rows an AttributeError will be raised because this property is only defined for matrices with 4 rows. >>> Matrix(eye(2)).D Traceback (most recent call last): ... AttributeError: Matrix has no attribute D. See Also ======== conjugate: By-element conjugation H: Hermite conjugation """ from sympy.physics.matrices import mgamma if self.rows != 4: # In Python 3.2, properties can only return an AttributeError # so we can't raise a ShapeError -- see commit which added the # first line of this inline comment. Also, there is no need # for a message since MatrixBase will raise the AttributeError raise AttributeError return self.H mgamma(0) def diagonal_solve(self, rhs): """Solves ``Ax = B`` efficiently, where A is a diagonal Matrix, with non-zero diagonal entries. Examples ======== >>> from sympy.matrices import Matrix, eye >>> A = eye(2)2 >>> B = Matrix([[1, 2], [3, 4]]) >>> A.diagonal_solve(B) == B/2 True See Also ======== lower_triangular_solve upper_triangular_solve gauss_jordan_solve cholesky_solve LDLsolve LUsolve QRsolve pinv_solve """ if not self.is_diagonal(): raise TypeError("Matrix should be diagonal") if rhs.rows != self.rows: raise TypeError("Size mis-match") return self._diagonal_solve(rhs) def dot(self, b, hermitian=None, conjugate_convention=None): """Return the dot or inner product of two vectors of equal length. Here ``self`` must be a ``Matrix`` of size 1 x n or n x 1, and ``b`` must be either a matrix of size 1 x n, n x 1, or a list/tuple of length n. A scalar is returned. By default, ``dot`` does not conjugate ``self`` or ``b``, even if there are complex entries. Set ``hermitian=True`` (and optionally a ``conjugate_convention``) to compute the hermitian inner product. Possible kwargs are ``hermitian`` and ``conjugate_convention``. If ``conjugate_convention`` is ``"left"``, ``"math"`` or ``"maths"``, the conjugate of the first vector (``self``) is used. If ``"right"`` or ``"physics"`` is specified, the conjugate of the second vector ``b`` is used. Examples ======== >>> from sympy import Matrix >>> M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) >>> v = Matrix([1, 1, 1]) >>> M.row(0).dot(v) 6 >>> M.col(0).dot(v) 12 >>> v = [3, 2, 1] >>> M.row(0).dot(v) 10 >>> from sympy import I >>> q = Matrix([1I, 1I, 1I]) >>> q.dot(q, hermitian=False) -3 >>> q.dot(q, hermitian=True) 3 >>> q1 = Matrix([1, 1, 1I]) >>> q.dot(q1, hermitian=True, conjugate_convention="maths") 1 - 2I >>> q.dot(q1, hermitian=True, conjugate_convention="physics") 1 + 2I See Also ======== cross multiply multiply_elementwise """ from .dense import Matrix if not isinstance(b, MatrixBase): if is_sequence(b): if len(b) != self.cols and len(b) != self.rows: raise ShapeError( "Dimensions incorrect for dot product: %s, %s" % ( self.shape, len(b))) return self.dot(Matrix(b)) else: raise TypeError( "`b` must be an ordered iterable or Matrix, not %s." % type(b)) mat = self if (1 not in mat.shape) or (1 not in b.shape) : SymPyDeprecationWarning( feature="Dot product of non row/column vectors", issue=13815, deprecated_since_version="1.2", useinstead=" to take matrix products").warn() return mat._legacy_array_dot(b) if len(mat) != len(b): raise ShapeError("Dimensions incorrect for dot product: %s, %s" % (self.shape, b.shape)) n = len(mat) if mat.shape != (1, n): mat = mat.reshape(1, n) if b.shape != (n, 1): b = b.reshape(n, 1) # Now ``mat`` is a row vector and ``b`` is a column vector. # If it so happens that only conjugate_convention is passed # then automatically set hermitian to True. If only hermitian # is true but no conjugate_convention is not passed then # automatically set it to ``"maths"`` if conjugate_convention is not None and hermitian is None: hermitian = True if hermitian and conjugate_convention is None: conjugate_convention = "maths" if hermitian == True: if conjugate_convention in ("maths", "left", "math"): mat = mat.conjugate() elif conjugate_convention in ("physics", "right"): b = b.conjugate() else: raise ValueError("Unknown conjugate_convention was entered." " conjugate_convention must be one of the" " following: math, maths, left, physics or right.") return (mat * b)[0] def dual(self): """Returns the dual of a matrix, which is: ``(1/2)levicivita(i, j, k, l)M(k, l)`` summed over indices `k` and `l` Since the levicivita method is anti_symmetric for any pairwise exchange of indices, the dual of a symmetric matrix is the zero matrix. Strictly speaking the dual defined here assumes that the 'matrix' `M` is a contravariant anti_symmetric second rank tensor, so that the dual is a covariant second rank tensor. """ from sympy import LeviCivita from sympy.matrices import zeros M, n = self[:, :], self.rows work = zeros(n) if self.is_symmetric(): return work for i in range(1, n): for j in range(1, n): acum = 0 for k in range(1, n): acum += LeviCivita(i, j, 0, k) * M[0, k] work[i, j] = acum work[j, i] = -acum for l in range(1, n): acum = 0 for a in range(1, n): for b in range(1, n): acum += LeviCivita(0, l, a, b) * M[a, b] acum /= 2 work[0, l] = -acum work[l, 0] = acum return work def _eval_matrix_exp_jblock(self): """A helper function to compute an exponential of a Jordan block matrix Examples ======== >>> from sympy import Symbol, Matrix >>> l = Symbol('lamda') A trivial example of 11 Jordan block: >>> m = Matrix.jordan_block(1, l) >>> m._eval_matrix_exp_jblock() Matrix([[exp(lamda)]]) An example of 33 Jordan block: >>> m = Matrix.jordan_block(3, l) >>> m._eval_matrix_exp_jblock() Matrix([ [exp(lamda), exp(lamda), exp(lamda)/2], [ 0, exp(lamda), exp(lamda)], [ 0, 0, exp(lamda)]]) References ========== .. [1] https://en.wikipedia.org/wiki/Matrix_function#Jordan_decomposition """ size = self.rows l = self[0, 0] exp_l = exp(l) bands = {i: exp_l / factorial(i) for i in range(size)} from .sparsetools import banded return self.__class__(banded(size, bands)) def exp(self): """Return the exponentiation of a square matrix.""" if not self.is_square: raise NonSquareMatrixError( "Exponentiation is valid only for square matrices") try: P, J = self.jordan_form() cells = J.get_diag_blocks() except MatrixError: raise NotImplementedError( "Exponentiation is implemented only for matrices for which the Jordan normal form can be computed") blocks = [cell._eval_matrix_exp_jblock() for cell in cells] from sympy.matrices import diag from sympy import re eJ = diag(blocks) # n = self.rows ret = P eJ * P.inv() if all(value.is_real for value in self.values()): return type(self)(re(ret)) else: return type(self)(ret) def gauss_jordan_solve(self, B, freevar=False): """ Solves ``Ax = B`` using Gauss Jordan elimination. There may be zero, one, or infinite solutions. If one solution exists, it will be returned. If infinite solutions exist, it will be returned parametrically. If no solutions exist, It will throw ValueError. Parameters ========== B : Matrix The right hand side of the equation to be solved for. Must have the same number of rows as matrix A. freevar : List If the system is underdetermined (e.g. A has more columns than rows), infinite solutions are possible, in terms of arbitrary values of free variables. Then the index of the free variables in the solutions (column Matrix) will be returned by freevar, if the flag `freevar` is set to `True`. Returns ======= x : Matrix The matrix that will satisfy ``Ax = B``. Will have as many rows as matrix A has columns, and as many columns as matrix B. params : Matrix If the system is underdetermined (e.g. A has more columns than rows), infinite solutions are possible, in terms of arbitrary parameters. These arbitrary parameters are returned as params Matrix. Examples ======== >>> from sympy import Matrix >>> A = Matrix([[1, 2, 1, 1], [1, 2, 2, -1], [2, 4, 0, 6]]) >>> B = Matrix([7, 12, 4]) >>> sol, params = A.gauss_jordan_solve(B) >>> sol Matrix([ [-2tau0 - 3tau1 + 2], [ tau0], [ 2tau1 + 5], [ tau1]]) >>> params Matrix([ [tau0], [tau1]]) >>> taus_zeroes = { tau:0 for tau in params } >>> sol_unique = sol.xreplace(taus_zeroes) >>> sol_unique Matrix([ [2], [0], [5], [0]]) >>> A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 10]]) >>> B = Matrix([3, 6, 9]) >>> sol, params = A.gauss_jordan_solve(B) >>> sol Matrix([ [-1], [ 2], [ 0]]) >>> params Matrix(0, 1, []) >>> A = Matrix([[2, -7], [-1, 4]]) >>> B = Matrix([[-21, 3], [12, -2]]) >>> sol, params = A.gauss_jordan_solve(B) >>> sol Matrix([ [0, -2], [3, -1]]) >>> params Matrix(0, 2, []) See Also ======== lower_triangular_solve upper_triangular_solve cholesky_solve diagonal_solve LDLsolve LUsolve QRsolve pinv References ========== .. [1] https://en.wikipedia.org/wiki/Gaussian_elimination """ from sympy.matrices import Matrix, zeros aug = self.hstack(self.copy(), B.copy()) B_cols = B.cols row, col = aug[:, :-B_cols].shape # solve by reduced row echelon form A, pivots = aug.rref(simplify=True) A, v = A[:, :-B_cols], A[:, -B_cols:] pivots = list(filter(lambda p: p < col, pivots)) rank = len(pivots) # Bring to block form permutation = Matrix(range(col)).T for i, c in enumerate(pivots): permutation.col_swap(i, c) # check for existence of solutions # rank of aug Matrix should be equal to rank of coefficient matrix if not v[rank:, :].is_zero: raise ValueError("Linear system has no solution") # Get index of free symbols (free parameters) free_var_index = permutation[ len(pivots):] # non-pivots columns are free variables # Free parameters # what are current unnumbered free symbol names? name = _uniquely_named_symbol('tau', aug, compare=lambda i: str(i).rstrip('1234567890')).name gen = numbered_symbols(name) tau = Matrix([next(gen) for k in range((col - rank)B_cols)]).reshape( col - rank, B_cols) # Full parametric solution V = A[:rank,:] for c in reversed(pivots): V.col_del(c) vt = v[:rank, :] free_sol = tau.vstack(vt - V * tau, tau) # Undo permutation sol = zeros(col, B_cols) for k in range(col): sol[permutation[k], :] = free_sol[k,:] if freevar: return sol, tau, free_var_index else: return sol, tau def inv_mod(self, m): r""" Returns the inverse of the matrix `K` (mod `m`), if it exists. Method to find the matrix inverse of `K` (mod `m`) implemented in this function: * Compute `\mathrm{adj}(K) = \mathrm{cof}(K)^t`, the adjoint matrix of `K`. * Compute `r = 1/\mathrm{det}(K) \pmod m`. * `K^{-1} = r\cdot \mathrm{adj}(K) \pmod m`. Examples ======== >>> from sympy import Matrix >>> A = Matrix(2, 2, [1, 2, 3, 4]) >>> A.inv_mod(5) Matrix([ [3, 1], [4, 2]]) >>> A.inv_mod(3) Matrix([ [1, 1], [0, 1]]) """ if not self.is_square: raise NonSquareMatrixError() N = self.cols det_K = self.det() det_inv = None try: det_inv = mod_inverse(det_K, m) except ValueError: raise NonInvertibleMatrixError('Matrix is not invertible (mod %d)' % m) K_adj = self.adjugate() K_inv = self.__class__(N, N, [det_inv * K_adj[i, j] % m for i in range(N) for j in range(N)]) return K_inv def inverse_ADJ(self, iszerofunc=_iszero): """Calculates the inverse using the adjugate matrix and a determinant. See Also ======== inv inverse_LU inverse_GE """ if not self.is_square: raise NonSquareMatrixError("A Matrix must be square to invert.") d = self.det(method='berkowitz') zero = d.equals(0) if zero is None: # if equals() can't decide, will rref be able to? ok = self.rref(simplify=True)[0] zero = any(iszerofunc(ok[j, j]) for j in range(ok.rows)) if zero: raise NonInvertibleMatrixError("Matrix det == 0; not invertible.") return self.adjugate() / d def inverse_GE(self, iszerofunc=_iszero): """Calculates the inverse using Gaussian elimination. See Also ======== inv inverse_LU inverse_ADJ """ from .dense import Matrix if not self.is_square: raise NonSquareMatrixError("A Matrix must be square to invert.") big = Matrix.hstack(self.as_mutable(), Matrix.eye(self.rows)) red = big.rref(iszerofunc=iszerofunc, simplify=True)[0] if any(iszerofunc(red[j, j]) for j in range(red.rows)): raise NonInvertibleMatrixError("Matrix det == 0; not invertible.") return self._new(red[:, big.rows:]) def inverse_LU(self, iszerofunc=_iszero): """Calculates the inverse using LU decomposition. See Also ======== inv inverse_GE inverse_ADJ """ if not self.is_square: raise NonSquareMatrixError() ok = self.rref(simplify=True)[0] if any(iszerofunc(ok[j, j]) for j in range(ok.rows)): raise NonInvertibleMatrixError("Matrix det == 0; not invertible.") return self.LUsolve(self.eye(self.rows), iszerofunc=_iszero) def inv(self, method=None, kwargs): """ Return the inverse of a matrix. CASE 1: If the matrix is a dense matrix. Return the matrix inverse using the method indicated (default is Gauss elimination). Parameters ========== method : ('GE', 'LU', or 'ADJ') Notes ===== According to the ``method`` keyword, it calls the appropriate method: GE .... inverse_GE(); default LU .... inverse_LU() ADJ ... inverse_ADJ() See Also ======== inverse_LU inverse_GE inverse_ADJ Raises ------ ValueError If the determinant of the matrix is zero. CASE 2: If the matrix is a sparse matrix. Return the matrix inverse using Cholesky or LDL (default). kwargs ====== method : ('CH', 'LDL') Notes ===== According to the ``method`` keyword, it calls the appropriate method: LDL ... inverse_LDL(); default CH .... inverse_CH() Raises ------ ValueError If the determinant of the matrix is zero. """ if not self.is_square: raise NonSquareMatrixError() if method is not None: kwargs['method'] = method return self._eval_inverse(kwargs) def is_nilpotent(self): """Checks if a matrix is nilpotent. A matrix B is nilpotent if for some integer k, Bk is a zero matrix. Examples ======== >>> from sympy import Matrix >>> a = Matrix([[0, 0, 0], [1, 0, 0], [1, 1, 0]]) >>> a.is_nilpotent() True >>> a = Matrix([[1, 0, 1], [1, 0, 0], [1, 1, 0]]) >>> a.is_nilpotent() False """ if not self: return True if not self.is_square: raise NonSquareMatrixError( "Nilpotency is valid only for square matrices") x = _uniquely_named_symbol('x', self) p = self.charpoly(x) if p.args[0] == x self.rows: return True return False def key2bounds(self, keys): """Converts a key with potentially mixed types of keys (integer and slice) into a tuple of ranges and raises an error if any index is out of ``self``'s range. See Also ======== key2ij """ from sympy.matrices.common import a2idx as a2idx_ # Remove this line after deprecation of a2idx from matrices.py islice, jslice = [isinstance(k, slice) for k in keys] if islice: if not self.rows: rlo = rhi = 0 else: rlo, rhi = keys[0].indices(self.rows)[:2] else: rlo = a2idx_(keys[0], self.rows) rhi = rlo + 1 if jslice: if not self.cols: clo = chi = 0 else: clo, chi = keys[1].indices(self.cols)[:2] else: clo = a2idx_(keys[1], self.cols) chi = clo + 1 return rlo, rhi, clo, chi def key2ij(self, key): """Converts key into canonical form, converting integers or indexable items into valid integers for ``self``'s range or returning slices unchanged. See Also ======== key2bounds """ from sympy.matrices.common import a2idx as a2idx_ # Remove this line after deprecation of a2idx from matrices.py if is_sequence(key): if not len(key) == 2: raise TypeError('key must be a sequence of length 2') return [a2idx_(i, n) if not isinstance(i, slice) else i for i, n in zip(key, self.shape)] elif isinstance(key, slice): return key.indices(len(self))[:2] else: return divmod(a2idx_(key, len(self)), self.cols) def LDLdecomposition(self, hermitian=True): """Returns the LDL Decomposition (L, D) of matrix A, such that L * D * L.H == A if hermitian flag is True, or L * D * L.T == A if hermitian is False. This method eliminates the use of square root. Further this ensures that all the diagonal entries of L are 1. A must be a Hermitian positive-definite matrix if hermitian is True, or a symmetric matrix otherwise. Examples ======== >>> from sympy.matrices import Matrix, eye >>> A = Matrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) >>> L, D = A.LDLdecomposition() >>> L Matrix([ [ 1, 0, 0], [ 3/5, 1, 0], [-1/5, 1/3, 1]]) >>> D Matrix([ [25, 0, 0], [ 0, 9, 0], [ 0, 0, 9]]) >>> L * D * L.T * A.inv() == eye(A.rows) True The matrix can have complex entries: >>> from sympy import I >>> A = Matrix(((9, 3I), (-3I, 5))) >>> L, D = A.LDLdecomposition() >>> L Matrix([ [ 1, 0], [-I/3, 1]]) >>> D Matrix([ [9, 0], [0, 4]]) >>> LDL.H == A True See Also ======== cholesky LUdecomposition QRdecomposition """ if not self.is_square: raise NonSquareMatrixError("Matrix must be square.") if hermitian and not self.is_hermitian: raise ValueError("Matrix must be Hermitian.") if not hermitian and not self.is_symmetric(): raise ValueError("Matrix must be symmetric.") return self._LDLdecomposition(hermitian=hermitian) def LDLsolve(self, rhs): """Solves ``Ax = B`` using LDL decomposition, for a general square and non-singular matrix. For a non-square matrix with rows > cols, the least squares solution is returned. Examples ======== >>> from sympy.matrices import Matrix, eye >>> A = eye(2)2 >>> B = Matrix([[1, 2], [3, 4]]) >>> A.LDLsolve(B) == B/2 True See Also ======== LDLdecomposition lower_triangular_solve upper_triangular_solve gauss_jordan_solve cholesky_solve diagonal_solve LUsolve QRsolve pinv_solve """ hermitian = True if self.is_symmetric(): hermitian = False L, D = self.LDLdecomposition(hermitian=hermitian) elif self.is_hermitian: L, D = self.LDLdecomposition(hermitian=hermitian) elif self.rows >= self.cols: L, D = (self.H self).LDLdecomposition(hermitian=hermitian) rhs = self.H * rhs else: raise NotImplementedError('Under-determined System. ' 'Try M.gauss_jordan_solve(rhs)') Y = L._lower_triangular_solve(rhs) Z = D._diagonal_solve(Y) if hermitian: return (L.H)._upper_triangular_solve(Z) else: return (L.T)._upper_triangular_solve(Z) def lower_triangular_solve(self, rhs): """Solves ``Ax = B``, where A is a lower triangular matrix. See Also ======== upper_triangular_solve gauss_jordan_solve cholesky_solve diagonal_solve LDLsolve LUsolve QRsolve pinv_solve """ if not self.is_square: raise NonSquareMatrixError("Matrix must be square.") if rhs.rows != self.rows: raise ShapeError("Matrices size mismatch.") if not self.is_lower: raise ValueError("Matrix must be lower triangular.") return self._lower_triangular_solve(rhs) def LUdecomposition(self, iszerofunc=_iszero, simpfunc=None, rankcheck=False): """Returns (L, U, perm) where L is a lower triangular matrix with unit diagonal, U is an upper triangular matrix, and perm is a list of row swap index pairs. If A is the original matrix, then A = (LU).permuteBkwd(perm), and the row permutation matrix P such that PA = LU can be computed by P=eye(A.row).permuteFwd(perm). See documentation for LUCombined for details about the keyword argument rankcheck, iszerofunc, and simpfunc. Examples ======== >>> from sympy import Matrix >>> a = Matrix([[4, 3], [6, 3]]) >>> L, U, _ = a.LUdecomposition() >>> L Matrix([ [ 1, 0], [3/2, 1]]) >>> U Matrix([ [4, 3], [0, -3/2]]) See Also ======== cholesky LDLdecomposition QRdecomposition LUdecomposition_Simple LUdecompositionFF LUsolve """ combined, p = self.LUdecomposition_Simple(iszerofunc=iszerofunc, simpfunc=simpfunc, rankcheck=rankcheck) # L is lower triangular ``self.rows x self.rows`` # U is upper triangular ``self.rows x self.cols`` # L has unit diagonal. For each column in combined, the subcolumn # below the diagonal of combined is shared by L. # If L has more columns than combined, then the remaining subcolumns # below the diagonal of L are zero. # The upper triangular portion of L and combined are equal. def entry_L(i, j): if i < j: # Super diagonal entry return self.zero elif i == j: return self.one elif j < combined.cols: return combined[i, j] # Subdiagonal entry of L with no corresponding # entry in combined return self.zero def entry_U(i, j): return self.zero if i > j else combined[i, j] L = self._new(combined.rows, combined.rows, entry_L) U = self._new(combined.rows, combined.cols, entry_U) return L, U, p def LUdecomposition_Simple(self, iszerofunc=_iszero, simpfunc=None, rankcheck=False): """Compute an lu decomposition of m x n matrix A, where PA = LU L is m x m lower triangular with unit diagonal * U is m x n upper triangular * P is an m x m permutation matrix Returns an m x n matrix lu, and an m element list perm where each element of perm is a pair of row exchange indices. The factors L and U are stored in lu as follows: The subdiagonal elements of L are stored in the subdiagonal elements of lu, that is lu[i, j] = L[i, j] whenever i > j. The elements on the diagonal of L are all 1, and are not explicitly stored. U is stored in the upper triangular portion of lu, that is lu[i ,j] = U[i, j] whenever i <= j. The output matrix can be visualized as: Matrix([ [u, u, u, u], [l, u, u, u], [l, l, u, u], [l, l, l, u]]) where l represents a subdiagonal entry of the L factor, and u represents an entry from the upper triangular entry of the U factor. perm is a list row swap index pairs such that if A is the original matrix, then A = (LU).permuteBkwd(perm), and the row permutation matrix P such that ``PA = LU`` can be computed by ``P=eye(A.row).permuteFwd(perm)``. The keyword argument rankcheck determines if this function raises a ValueError when passed a matrix whose rank is strictly less than min(num rows, num cols). The default behavior is to decompose a rank deficient matrix. Pass rankcheck=True to raise a ValueError instead. (This mimics the previous behavior of this function). The keyword arguments iszerofunc and simpfunc are used by the pivot search algorithm. iszerofunc is a callable that returns a boolean indicating if its input is zero, or None if it cannot make the determination. simpfunc is a callable that simplifies its input. The default is simpfunc=None, which indicate that the pivot search algorithm should not attempt to simplify any candidate pivots. If simpfunc fails to simplify its input, then it must return its input instead of a copy. When a matrix contains symbolic entries, the pivot search algorithm differs from the case where every entry can be categorized as zero or nonzero. The algorithm searches column by column through the submatrix whose top left entry coincides with the pivot position. If it exists, the pivot is the first entry in the current search column that iszerofunc guarantees is nonzero. If no such candidate exists, then each candidate pivot is simplified if simpfunc is not None. The search is repeated, with the difference that a candidate may be the pivot if ``iszerofunc()`` cannot guarantee that it is nonzero. In the second search the pivot is the first candidate that iszerofunc can guarantee is nonzero. If no such candidate exists, then the pivot is the first candidate for which iszerofunc returns None. If no such candidate exists, then the search is repeated in the next column to the right. The pivot search algorithm differs from the one in ``rref()``, which relies on ``_find_reasonable_pivot()``. Future versions of ``LUdecomposition_simple()`` may use ``_find_reasonable_pivot()``. See Also ======== LUdecomposition LUdecompositionFF LUsolve """ if rankcheck: # https://github.com/sympy/sympy/issues/9796 pass if self.rows == 0 or self.cols == 0: # Define LU decomposition of a matrix with no entries as a matrix # of the same dimensions with all zero entries. return self.zeros(self.rows, self.cols), [] lu = self.as_mutable() row_swaps = [] pivot_col = 0 for pivot_row in range(0, lu.rows - 1): # Search for pivot. Prefer entry that iszeropivot determines # is nonzero, over entry that iszeropivot cannot guarantee # is zero. # XXX ``_find_reasonable_pivot`` uses slow zero testing. Blocked by bug #10279 # Future versions of LUdecomposition_simple can pass iszerofunc and simpfunc # to _find_reasonable_pivot(). # In pass 3 of _find_reasonable_pivot(), the predicate in ``if x.equals(S.Zero):`` # calls sympy.simplify(), and not the simplification function passed in via # the keyword argument simpfunc. iszeropivot = True while pivot_col != self.cols and iszeropivot: sub_col = (lu[r, pivot_col] for r in range(pivot_row, self.rows)) pivot_row_offset, pivot_value, is_assumed_non_zero, ind_simplified_pairs =\ _find_reasonable_pivot_naive(sub_col, iszerofunc, simpfunc) iszeropivot = pivot_value is None if iszeropivot: # All candidate pivots in this column are zero. # Proceed to next column. pivot_col += 1 if rankcheck and pivot_col != pivot_row: # All entries including and below the pivot position are # zero, which indicates that the rank of the matrix is # strictly less than min(num rows, num cols) # Mimic behavior of previous implementation, by throwing a # ValueError. raise ValueError("Rank of matrix is strictly less than" " number of rows or columns." " Pass keyword argument" " rankcheck=False to compute" " the LU decomposition of this matrix.") candidate_pivot_row = None if pivot_row_offset is None else pivot_row + pivot_row_offset if candidate_pivot_row is None and iszeropivot: # If candidate_pivot_row is None and iszeropivot is True # after pivot search has completed, then the submatrix # below and to the right of (pivot_row, pivot_col) is # all zeros, indicating that Gaussian elimination is # complete. return lu, row_swaps # Update entries simplified during pivot search. for offset, val in ind_simplified_pairs: lu[pivot_row + offset, pivot_col] = val if pivot_row != candidate_pivot_row: # Row swap book keeping: # Record which rows were swapped. # Update stored portion of L factor by multiplying L on the # left and right with the current permutation. # Swap rows of U. row_swaps.append([pivot_row, candidate_pivot_row]) # Update L. lu[pivot_row, 0:pivot_row], lu[candidate_pivot_row, 0:pivot_row] = \ lu[candidate_pivot_row, 0:pivot_row], lu[pivot_row, 0:pivot_row] # Swap pivot row of U with candidate pivot row. lu[pivot_row, pivot_col:lu.cols], lu[candidate_pivot_row, pivot_col:lu.cols] = \ lu[candidate_pivot_row, pivot_col:lu.cols], lu[pivot_row, pivot_col:lu.cols] # Introduce zeros below the pivot by adding a multiple of the # pivot row to a row under it, and store the result in the # row under it. # Only entries in the target row whose index is greater than # start_col may be nonzero. start_col = pivot_col + 1 for row in range(pivot_row + 1, lu.rows): # Store factors of L in the subcolumn below # (pivot_row, pivot_row). lu[row, pivot_row] =\ lu[row, pivot_col]/lu[pivot_row, pivot_col] # Form the linear combination of the pivot row and the current # row below the pivot row that zeros the entries below the pivot. # Employing slicing instead of a loop here raises # NotImplementedError: Cannot add Zero to MutableSparseMatrix # in sympy/matrices/tests/test_sparse.py. # c = pivot_row + 1 if pivot_row == pivot_col else pivot_col for c in range(start_col, lu.cols): lu[row, c] = lu[row, c] - lu[row, pivot_row]lu[pivot_row, c] if pivot_row != pivot_col: # matrix rank < min(num rows, num cols), # so factors of L are not stored directly below the pivot. # These entries are zero by construction, so don't bother # computing them. for row in range(pivot_row + 1, lu.rows): lu[row, pivot_col] = self.zero pivot_col += 1 if pivot_col == lu.cols: # All candidate pivots are zero implies that Gaussian # elimination is complete. return lu, row_swaps if rankcheck: if iszerofunc( lu[Min(lu.rows, lu.cols) - 1, Min(lu.rows, lu.cols) - 1]): raise ValueError("Rank of matrix is strictly less than" " number of rows or columns." " Pass keyword argument" " rankcheck=False to compute" " the LU decomposition of this matrix.") return lu, row_swaps def LUdecompositionFF(self): """Compute a fraction-free LU decomposition. Returns 4 matrices P, L, D, U such that PA = L D-1 U. If the elements of the matrix belong to some integral domain I, then all elements of L, D and U are guaranteed to belong to I. Reference** - W. Zhou & D.J. Jeffrey, "Fraction-free matrix factors: new forms for LU and QR factors". Frontiers in Computer Science in China, Vol 2, no. 1, pp. 67-80, 2008. See Also ======== LUdecomposition LUdecomposition_Simple LUsolve """ from sympy.matrices import SparseMatrix zeros = SparseMatrix.zeros eye = SparseMatrix.eye n, m = self.rows, self.cols U, L, P = self.as_mutable(), eye(n), eye(n) DD = zeros(n, n) oldpivot = 1 for k in range(n - 1): if U[k, k] == 0: for kpivot in range(k + 1, n): if U[kpivot, k]: break else: raise ValueError("Matrix is not full rank") U[k, k:], U[kpivot, k:] = U[kpivot, k:], U[k, k:] L[k, :k], L[kpivot, :k] = L[kpivot, :k], L[k, :k] P[k, :], P[kpivot, :] = P[kpivot, :], P[k, :] L[k, k] = Ukk = U[k, k] DD[k, k] = oldpivot * Ukk for i in range(k + 1, n): L[i, k] = Uik = U[i, k] for j in range(k + 1, m): U[i, j] = (Ukk * U[i, j] - U[k, j] * Uik) / oldpivot U[i, k] = 0 oldpivot = Ukk DD[n - 1, n - 1] = oldpivot return P, L, DD, U def LUsolve(self, rhs, iszerofunc=_iszero): """Solve the linear system ``Ax = rhs`` for ``x`` where ``A = self``. This is for symbolic matrices, for real or complex ones use mpmath.lu_solve or mpmath.qr_solve. See Also ======== lower_triangular_solve upper_triangular_solve gauss_jordan_solve cholesky_solve diagonal_solve LDLsolve QRsolve pinv_solve LUdecomposition """ if rhs.rows != self.rows: raise ShapeError( "``self`` and ``rhs`` must have the same number of rows.") m = self.rows n = self.cols if m < n: raise NotImplementedError("Underdetermined systems not supported.") try: A, perm = self.LUdecomposition_Simple( iszerofunc=_iszero, rankcheck=True) except ValueError: raise NotImplementedError("Underdetermined systems not supported.") b = rhs.permute_rows(perm).as_mutable() # forward substitution, all diag entries are scaled to 1 for i in range(m): for j in range(min(i, n)): scale = A[i, j] b.zip_row_op(i, j, lambda x, y: x - y * scale) # consistency check for overdetermined systems if m > n: for i in range(n, m): for j in range(b.cols): if not iszerofunc(b[i, j]): raise ValueError("The system is inconsistent.") b = b[0:n, :] # truncate zero rows if consistent # backward substitution for i in range(n - 1, -1, -1): for j in range(i + 1, n): scale = A[i, j] b.zip_row_op(i, j, lambda x, y: x - y * scale) scale = A[i, i] b.row_op(i, lambda x, _: x / scale) return rhs.__class__(b) def multiply(self, b): """Returns ``selfb`` See Also ======== dot cross multiply_elementwise """ return self b def normalized(self, iszerofunc=_iszero): """Return the normalized version of ``self``. Parameters ========== iszerofunc : Function, optional A function to determine whether ``self`` is a zero vector. The default ``_iszero`` tests to see if each element is exactly zero. Returns ======= Matrix Normalized vector form of ``self``. It has the same length as a unit vector. However, a zero vector will be returned for a vector with norm 0. Raises ====== ShapeError If the matrix is not in a vector form. See Also ======== norm """ if self.rows != 1 and self.cols != 1: raise ShapeError("A Matrix must be a vector to normalize.") norm = self.norm() if iszerofunc(norm): out = self.zeros(self.rows, self.cols) else: out = self.applyfunc(lambda i: i / norm) return out def norm(self, ord=None): """Return the Norm of a Matrix or Vector. In the simplest case this is the geometric size of the vector Other norms can be specified by the ord parameter ===== ============================ ========================== ord norm for matrices norm for vectors ===== ============================ ========================== None Frobenius norm 2-norm 'fro' Frobenius norm - does not exist inf maximum row sum max(abs(x)) -inf -- min(abs(x)) 1 maximum column sum as below -1 -- as below 2 2-norm (largest sing. value) as below -2 smallest singular value as below other - does not exist sum(abs(x)ord)(1./ord) ===== ============================ ========================== Examples ======== >>> from sympy import Matrix, Symbol, trigsimp, cos, sin, oo >>> x = Symbol('x', real=True) >>> v = Matrix([cos(x), sin(x)]) >>> trigsimp( v.norm() ) 1 >>> v.norm(10) (sin(x)10 + cos(x)10)*(1/10) >>> A = Matrix([[1, 1], [1, 1]]) >>> A.norm(1) # maximum sum of absolute values of A is 2 2 >>> A.norm(2) # Spectral norm (max of \|Ax\|/\|x\| under 2-vector-norm) 2 >>> A.norm(-2) # Inverse spectral norm (smallest singular value) 0 >>> A.norm() # Frobenius Norm 2 >>> A.norm(oo) # Infinity Norm 2 >>> Matrix([1, -2]).norm(oo) 2 >>> Matrix([-1, 2]).norm(-oo) 1 See Also ======== normalized """ # Row or Column Vector Norms vals = list(self.values()) or [0] if self.rows == 1 or self.cols == 1: if ord == 2 or ord is None: # Common case sqrt(<x, x>) return sqrt(Add((abs(i) ** 2 for i in vals))) elif ord == 1: # sum(abs(x)) return Add((abs(i) for i in vals)) elif ord == S.Infinity: # max(abs(x)) return Max([abs(i) for i in vals]) elif ord == S.NegativeInfinity: # min(abs(x)) return Min([abs(i) for i in vals]) # Otherwise generalize the 2-norm, Sum(x_iord)(1/ord) # Note that while useful this is not mathematically a norm try: return Pow(Add((abs(i) ** ord for i in vals)), S(1) / ord) except (NotImplementedError, TypeError): raise ValueError("Expected order to be Number, Symbol, oo") # Matrix Norms else: if ord == 1: # Maximum column sum m = self.applyfunc(abs) return Max([sum(m.col(i)) for i in range(m.cols)]) elif ord == 2: # Spectral Norm # Maximum singular value return Max(self.singular_values()) elif ord == -2: # Minimum singular value return Min(self.singular_values()) elif ord == S.Infinity: # Infinity Norm - Maximum row sum m = self.applyfunc(abs) return Max([sum(m.row(i)) for i in range(m.rows)]) elif (ord is None or isinstance(ord, string_types) and ord.lower() in ['f', 'fro', 'frobenius', 'vector']): # Reshape as vector and send back to norm function return self.vec().norm(ord=2) else: raise NotImplementedError("Matrix Norms under development") def pinv_solve(self, B, arbitrary_matrix=None): """Solve ``Ax = B`` using the Moore-Penrose pseudoinverse. There may be zero, one, or infinite solutions. If one solution exists, it will be returned. If infinite solutions exist, one will be returned based on the value of arbitrary_matrix. If no solutions exist, the least-squares solution is returned. Parameters ========== B : Matrix The right hand side of the equation to be solved for. Must have the same number of rows as matrix A. arbitrary_matrix : Matrix If the system is underdetermined (e.g. A has more columns than rows), infinite solutions are possible, in terms of an arbitrary matrix. This parameter may be set to a specific matrix to use for that purpose; if so, it must be the same shape as x, with as many rows as matrix A has columns, and as many columns as matrix B. If left as None, an appropriate matrix containing dummy symbols in the form of ``wn_m`` will be used, with n and m being row and column position of each symbol. Returns ======= x : Matrix The matrix that will satisfy ``Ax = B``. Will have as many rows as matrix A has columns, and as many columns as matrix B. Examples ======== >>> from sympy import Matrix >>> A = Matrix([[1, 2, 3], [4, 5, 6]]) >>> B = Matrix([7, 8]) >>> A.pinv_solve(B) Matrix([ [ _w0_0/6 - _w1_0/3 + _w2_0/6 - 55/18], [-_w0_0/3 + 2_w1_0/3 - _w2_0/3 + 1/9], [ _w0_0/6 - _w1_0/3 + _w2_0/6 + 59/18]]) >>> A.pinv_solve(B, arbitrary_matrix=Matrix([0, 0, 0])) Matrix([ [-55/18], [ 1/9], [ 59/18]]) See Also ======== lower_triangular_solve upper_triangular_solve gauss_jordan_solve cholesky_solve diagonal_solve LDLsolve LUsolve QRsolve pinv Notes ===== This may return either exact solutions or least squares solutions. To determine which, check ``A A.pinv() * B == B``. It will be True if exact solutions exist, and False if only a least-squares solution exists. Be aware that the left hand side of that equation may need to be simplified to correctly compare to the right hand side. References ========== .. [1] https://en.wikipedia.org/wiki/Moore-Penrose_pseudoinverse#Obtaining_all_solutions_of_a_linear_system """ from sympy.matrices import eye A = self A_pinv = self.pinv() if arbitrary_matrix is None: rows, cols = A.cols, B.cols w = symbols('w:{0}_:{1}'.format(rows, cols), cls=Dummy) arbitrary_matrix = self.__class__(cols, rows, w).T return A_pinv * B + (eye(A.cols) - A_pinv * A) * arbitrary_matrix def _eval_pinv_full_rank(self): """Subroutine for full row or column rank matrices. For full row rank matrices, inverse of ``A * A.H`` Exists. For full column rank matrices, inverse of ``A.H * A`` Exists. This routine can apply for both cases by checking the shape and have small decision. """ if self.is_zero: return self.H if self.rows >= self.cols: return (self.H * self).inv() * self.H else: return self.H * (self * self.H).inv() def _eval_pinv_rank_decomposition(self): """Subroutine for rank decomposition With rank decompositions, `A` can be decomposed into two full- rank matrices, and each matrix can take pseudoinverse individually. """ if self.is_zero: return self.H B, C = self.rank_decomposition() Bp = B._eval_pinv_full_rank() Cp = C._eval_pinv_full_rank() return Cp * Bp def _eval_pinv_diagonalization(self): """Subroutine using diagonalization This routine can sometimes fail if SymPy's eigenvalue computation is not reliable. """ if self.is_zero: return self.H A = self AH = self.H try: if self.rows >= self.cols: P, D = (AH * A).diagonalize(normalize=True) D_pinv = D.applyfunc(lambda x: 0 if _iszero(x) else 1 / x) return P * D_pinv * P.H * AH else: P, D = (A * AH).diagonalize(normalize=True) D_pinv = D.applyfunc(lambda x: 0 if _iszero(x) else 1 / x) return AH * P * D_pinv * P.H except MatrixError: raise NotImplementedError( 'pinv for rank-deficient matrices where ' 'diagonalization of A.HA fails is not supported yet.') def pinv(self, method='RD'): """Calculate the Moore-Penrose pseudoinverse of the matrix. The Moore-Penrose pseudoinverse exists and is unique for any matrix. If the matrix is invertible, the pseudoinverse is the same as the inverse. Parameters ========== method : String, optional Specifies the method for computing the pseudoinverse. If ``'RD'``, Rank-Decomposition will be used. If ``'ED'``, Diagonalization will be used. Examples ======== Computing pseudoinverse by rank decomposition : >>> from sympy import Matrix >>> A = Matrix([[1, 2, 3], [4, 5, 6]]) >>> A.pinv() Matrix([ [-17/18, 4/9], [ -1/9, 1/9], [ 13/18, -2/9]]) Computing pseudoinverse by diagonalization : >>> B = A.pinv(method='ED') >>> B.simplify() >>> B Matrix([ [-17/18, 4/9], [ -1/9, 1/9], [ 13/18, -2/9]]) See Also ======== inv pinv_solve References ========== .. [1] https://en.wikipedia.org/wiki/Moore-Penrose_pseudoinverse """ # Trivial case: pseudoinverse of all-zero matrix is its transpose. if self.is_zero: return self.H if method == 'RD': return self._eval_pinv_rank_decomposition() elif method == 'ED': return self._eval_pinv_diagonalization() else: raise ValueError() def print_nonzero(self, symb="X"): """Shows location of non-zero entries for fast shape lookup. Examples ======== >>> from sympy.matrices import Matrix, eye >>> m = Matrix(2, 3, lambda i, j: i3+j) >>> m Matrix([ [0, 1, 2], [3, 4, 5]]) >>> m.print_nonzero() [ XX] [XXX] >>> m = eye(4) >>> m.print_nonzero("x") [x ] [ x ] [ x ] [ x] """ s = [] for i in range(self.rows): line = [] for j in range(self.cols): if self[i, j] == 0: line.append(" ") else: line.append(str(symb)) s.append("[%s]" % ''.join(line)) print('\n'.join(s)) def project(self, v): """Return the projection of ``self`` onto the line containing ``v``. Examples ======== >>> from sympy import Matrix, S, sqrt >>> V = Matrix([sqrt(3)/2, S.Half]) >>> x = Matrix([[1, 0]]) >>> V.project(x) Matrix([[sqrt(3)/2, 0]]) >>> V.project(-x) Matrix([[sqrt(3)/2, 0]]) """ return v * (self.dot(v) / v.dot(v)) def QRdecomposition(self): """Return Q, R where A = QR, Q is orthogonal and R is upper triangular. Examples ======== This is the example from wikipedia: >>> from sympy import Matrix >>> A = Matrix([[12, -51, 4], [6, 167, -68], [-4, 24, -41]]) >>> Q, R = A.QRdecomposition() >>> Q Matrix([ [ 6/7, -69/175, -58/175], [ 3/7, 158/175, 6/175], [-2/7, 6/35, -33/35]]) >>> R Matrix([ [14, 21, -14], [ 0, 175, -70], [ 0, 0, 35]]) >>> A == QR True QR factorization of an identity matrix: >>> A = Matrix([[1, 0, 0], [0, 1, 0], [0, 0, 1]]) >>> Q, R = A.QRdecomposition() >>> Q Matrix([ [1, 0, 0], [0, 1, 0], [0, 0, 1]]) >>> R Matrix([ [1, 0, 0], [0, 1, 0], [0, 0, 1]]) See Also ======== cholesky LDLdecomposition LUdecomposition QRsolve """ cls = self.__class__ mat = self.as_mutable() n = mat.rows m = mat.cols ranked = list() # Pad with additional rows to make wide matrices square # nOrig keeps track of original size so zeros can be trimmed from Q if n < m: nOrig = n n = m mat = mat.col_join(mat.zeros(n - nOrig, m)) else: nOrig = n Q, R = mat.zeros(n, m), mat.zeros(m) for j in range(m): # for each column vector tmp = mat[:, j] # take original v for i in range(j): # subtract the project of mat on new vector R[i, j] = Q[:, i].dot(mat[:, j]) tmp -= Q[:, i] * R[i, j] tmp.expand() # normalize it R[j, j] = tmp.norm() if not R[j, j].is_zero: ranked.append(j) Q[:, j] = tmp / R[j, j] if len(ranked) != 0: return ( cls(Q.extract(range(nOrig), ranked)), cls(R.extract(ranked, range(R.cols))) ) else: # Trivial case handling for zero-rank matrix # Force Q as matrix containing standard basis vectors for i in range(Min(nOrig, m)): Q[i, i] = 1 return ( cls(Q.extract(range(nOrig), range(Min(nOrig, m)))), cls(R.extract(range(Min(nOrig, m)), range(R.cols))) ) def QRsolve(self, b): """Solve the linear system ``Ax = b``. ``self`` is the matrix ``A``, the method argument is the vector ``b``. The method returns the solution vector ``x``. If ``b`` is a matrix, the system is solved for each column of ``b`` and the return value is a matrix of the same shape as ``b``. This method is slower (approximately by a factor of 2) but more stable for floating-point arithmetic than the LUsolve method. However, LUsolve usually uses an exact arithmetic, so you don't need to use QRsolve. This is mainly for educational purposes and symbolic matrices, for real (or complex) matrices use mpmath.qr_solve. See Also ======== lower_triangular_solve upper_triangular_solve gauss_jordan_solve cholesky_solve diagonal_solve LDLsolve LUsolve pinv_solve QRdecomposition """ Q, R = self.as_mutable().QRdecomposition() y = Q.T * b # back substitution to solve Rx = y: # We build up the result "backwards" in the vector 'x' and reverse it # only in the end. x = [] n = R.rows for j in range(n - 1, -1, -1): tmp = y[j, :] for k in range(j + 1, n): tmp -= R[j, k] x[n - 1 - k] x.append(tmp / R[j, j]) return self._new([row._mat for row in reversed(x)]) def rank_decomposition(self, iszerofunc=_iszero, simplify=False): r"""Returns a pair of matrices (`C`, `F`) with matching rank such that `A = C F`. Parameters ========== iszerofunc : Function, optional A function used for detecting whether an element can act as a pivot. ``lambda x: x.is_zero`` is used by default. simplify : Bool or Function, optional A function used to simplify elements when looking for a pivot. By default SymPy's ``simplify`` is used. Returns ======= (C, F) : Matrices `C` and `F` are full-rank matrices with rank as same as `A`, whose product gives `A`. See Notes for additional mathematical details. Examples ======== >>> from sympy.matrices import Matrix >>> A = Matrix([ ... [1, 3, 1, 4], ... [2, 7, 3, 9], ... [1, 5, 3, 1], ... [1, 2, 0, 8] ... ]) >>> C, F = A.rank_decomposition() >>> C Matrix([ [1, 3, 4], [2, 7, 9], [1, 5, 1], [1, 2, 8]]) >>> F Matrix([ [1, 0, -2, 0], [0, 1, 1, 0], [0, 0, 0, 1]]) >>> C * F == A True Notes ===== Obtaining `F`, an RREF of `A`, is equivalent to creating a product .. math:: E_n E_{n-1} ... E_1 A = F where `E_n, E_{n-1}, ... , E_1` are the elimination matrices or permutation matrices equivalent to each row-reduction step. The inverse of the same product of elimination matrices gives `C`: .. math:: C = (E_n E_{n-1} ... E_1)^{-1} It is not necessary, however, to actually compute the inverse: the columns of `C` are those from the original matrix with the same column indices as the indices of the pivot columns of `F`. References ========== .. [1] https://en.wikipedia.org/wiki/Rank_factorization .. [2] Piziak, R.; Odell, P. L. (1 June 1999). "Full Rank Factorization of Matrices". Mathematics Magazine. 72 (3): 193. doi:10.2307/2690882 See Also ======== rref """ (F, pivot_cols) = self.rref( simplify=simplify, iszerofunc=iszerofunc, pivots=True) rank = len(pivot_cols) C = self.extract(range(self.rows), pivot_cols) F = F[:rank, :] return (C, F) def solve_least_squares(self, rhs, method='CH'): """Return the least-square fit to the data. Parameters ========== rhs : Matrix Vector representing the right hand side of the linear equation. method : string or boolean, optional If set to ``'CH'``, ``cholesky_solve`` routine will be used. If set to ``'LDL'``, ``LDLsolve`` routine will be used. If set to ``'QR'``, ``QRsolve`` routine will be used. If set to ``'PINV'``, ``pinv_solve`` routine will be used. Otherwise, the conjugate of ``self`` will be used to create a system of equations that is passed to ``solve`` along with the hint defined by ``method``. Returns ======= solutions : Matrix Vector representing the solution. Examples ======== >>> from sympy.matrices import Matrix, ones >>> A = Matrix([1, 2, 3]) >>> B = Matrix([2, 3, 4]) >>> S = Matrix(A.row_join(B)) >>> S Matrix([ [1, 2], [2, 3], [3, 4]]) If each line of S represent coefficients of Ax + By and x and y are [2, 3] then Sxy is: >>> r = SMatrix([2, 3]); r Matrix([ [ 8], [13], [18]]) But let's add 1 to the middle value and then solve for the least-squares value of xy: >>> xy = S.solve_least_squares(Matrix([8, 14, 18])); xy Matrix([ [ 5/3], [10/3]]) The error is given by Sxy - r: >>> Sxy - r Matrix([ [1/3], [1/3], [1/3]]) >>> _.norm().n(2) 0.58 If a different xy is used, the norm will be higher: >>> xy += ones(2, 1)/10 >>> (Sxy - r).norm().n(2) 1.5 """ if method == 'CH': return self.cholesky_solve(rhs) elif method == 'QR': return self.QRsolve(rhs) elif method == 'LDL': return self.LDLsolve(rhs) elif method == 'PINV': return self.pinv_solve(rhs) else: t = self.H return (t self).solve(t * rhs, method=method) def solve(self, rhs, method='GJ'): """Solves linear equation where the unique solution exists. Parameters ========== rhs : Matrix Vector representing the right hand side of the linear equation. method : string, optional If set to ``'GJ'``, the Gauss-Jordan elimination will be used, which is implemented in the routine ``gauss_jordan_solve``. If set to ``'LU'``, ``LUsolve`` routine will be used. If set to ``'QR'``, ``QRsolve`` routine will be used. If set to ``'PINV'``, ``pinv_solve`` routine will be used. It also supports the methods available for special linear systems For positive definite systems: If set to ``'CH'``, ``cholesky_solve`` routine will be used. If set to ``'LDL'``, ``LDLsolve`` routine will be used. To use a different method and to compute the solution via the inverse, use a method defined in the .inv() docstring. Returns ======= solutions : Matrix Vector representing the solution. Raises ====== ValueError If there is not a unique solution then a ``ValueError`` will be raised. If ``self`` is not square, a ``ValueError`` and a different routine for solving the system will be suggested. """ if method == 'GJ': try: soln, param = self.gauss_jordan_solve(rhs) if param: raise NonInvertibleMatrixError("Matrix det == 0; not invertible. " "Try ``self.gauss_jordan_solve(rhs)`` to obtain a parametric solution.") except ValueError: # raise same error as in inv: self.zeros(1).inv() return soln elif method == 'LU': return self.LUsolve(rhs) elif method == 'CH': return self.cholesky_solve(rhs) elif method == 'QR': return self.QRsolve(rhs) elif method == 'LDL': return self.LDLsolve(rhs) elif method == 'PINV': return self.pinv_solve(rhs) else: return self.inv(method=method)rhs def table(self, printer, rowstart='[', rowend=']', rowsep='\n', colsep=', ', align='right'): r""" String form of Matrix as a table. ``printer`` is the printer to use for on the elements (generally something like StrPrinter()) ``rowstart`` is the string used to start each row (by default '['). ``rowend`` is the string used to end each row (by default ']'). ``rowsep`` is the string used to separate rows (by default a newline). ``colsep`` is the string used to separate columns (by default ', '). ``align`` defines how the elements are aligned. Must be one of 'left', 'right', or 'center'. You can also use '<', '>', and '^' to mean the same thing, respectively. This is used by the string printer for Matrix. Examples ======== >>> from sympy import Matrix >>> from sympy.printing.str import StrPrinter >>> M = Matrix([[1, 2], [-33, 4]]) >>> printer = StrPrinter() >>> M.table(printer) '[ 1, 2]\n[-33, 4]' >>> print(M.table(printer)) [ 1, 2] [-33, 4] >>> print(M.table(printer, rowsep=',\n')) [ 1, 2], [-33, 4] >>> print('[%s]' % M.table(printer, rowsep=',\n')) [[ 1, 2], [-33, 4]] >>> print(M.table(printer, colsep=' ')) [ 1 2] [-33 4] >>> print(M.table(printer, align='center')) [ 1 , 2] [-33, 4] >>> print(M.table(printer, rowstart='{', rowend='}')) { 1, 2} {-33, 4} """ # Handle zero dimensions: if self.rows == 0 or self.cols == 0: return '[]' # Build table of string representations of the elements res = [] # Track per-column max lengths for pretty alignment maxlen = [0] self.cols for i in range(self.rows): res.append([]) for j in range(self.cols): s = printer._print(self[i, j]) res[-1].append(s) maxlen[j] = max(len(s), maxlen[j]) # Patch strings together align = { 'left': 'ljust', 'right': 'rjust', 'center': 'center', '<': 'ljust', '>': 'rjust', '^': 'center', }[align] for i, row in enumerate(res): for j, elem in enumerate(row): row[j] = getattr(elem, align)(maxlen[j]) res[i] = rowstart + colsep.join(row) + rowend return rowsep.join(res) def upper_triangular_solve(self, rhs): """Solves ``Ax = B``, where A is an upper triangular matrix. See Also ======== lower_triangular_solve gauss_jordan_solve cholesky_solve diagonal_solve LDLsolve LUsolve QRsolve pinv_solve """ if not self.is_square: raise NonSquareMatrixError("Matrix must be square.") if rhs.rows != self.rows: raise TypeError("Matrix size mismatch.") if not self.is_upper: raise TypeError("Matrix is not upper triangular.") return self._upper_triangular_solve(rhs) def vech(self, diagonal=True, check_symmetry=True): """Return the unique elements of a symmetric Matrix as a one column matrix by stacking the elements in the lower triangle. Arguments: diagonal -- include the diagonal cells of ``self`` or not check_symmetry -- checks symmetry of ``self`` but not completely reliably Examples ======== >>> from sympy import Matrix >>> m=Matrix([[1, 2], [2, 3]]) >>> m Matrix([ [1, 2], [2, 3]]) >>> m.vech() Matrix([ [1], [2], [3]]) >>> m.vech(diagonal=False) Matrix([[2]]) See Also ======== vec """ from sympy.matrices import zeros c = self.cols if c != self.rows: raise ShapeError("Matrix must be square") if check_symmetry: self.simplify() if self != self.transpose(): raise ValueError( "Matrix appears to be asymmetric; consider check_symmetry=False") count = 0 if diagonal: v = zeros(c * (c + 1) // 2, 1) for j in range(c): for i in range(j, c): v[count] = self[i, j] count += 1 else: v = zeros(c * (c - 1) // 2, 1) for j in range(c): for i in range(j + 1, c): v[count] = self[i, j] count += 1 return v @deprecated( issue=15109, useinstead="from sympy.matrices.common import classof", deprecated_since_version="1.3") def classof(A, B): from sympy.matrices.common import classof as classof_ return classof_(A, B) @deprecated( issue=15109, deprecated_since_version="1.3", useinstead="from sympy.matrices.common import a2idx") def a2idx(j, n=None): from sympy.matrices.common import a2idx as a2idx_ return a2idx_(j, n) def _find_reasonable_pivot(col, iszerofunc=_iszero, simpfunc=_simplify): """ Find the lowest index of an item in ``col`` that is suitable for a pivot. If ``col`` consists only of Floats, the pivot with the largest norm is returned. Otherwise, the first element where ``iszerofunc`` returns False is used. If ``iszerofunc`` doesn't return false, items are simplified and retested until a suitable pivot is found. Returns a 4-tuple (pivot_offset, pivot_val, assumed_nonzero, newly_determined) where pivot_offset is the index of the pivot, pivot_val is the (possibly simplified) value of the pivot, assumed_nonzero is True if an assumption that the pivot was non-zero was made without being proved, and newly_determined are elements that were simplified during the process of pivot finding.""" newly_determined = [] col = list(col) # a column that contains a mix of floats and integers # but at least one float is considered a numerical # column, and so we do partial pivoting if all(isinstance(x, (Float, Integer)) for x in col) and any( isinstance(x, Float) for x in col): col_abs = [abs(x) for x in col] max_value = max(col_abs) if iszerofunc(max_value): # just because iszerofunc returned True, doesn't # mean the value is numerically zero. Make sure # to replace all entries with numerical zeros if max_value != 0: newly_determined = [(i, 0) for i, x in enumerate(col) if x != 0] return (None, None, False, newly_determined) index = col_abs.index(max_value) return (index, col[index], False, newly_determined) # PASS 1 (iszerofunc directly) possible_zeros = [] for i, x in enumerate(col): is_zero = iszerofunc(x) # is someone wrote a custom iszerofunc, it may return # BooleanFalse or BooleanTrue instead of True or False, # so use == for comparison instead of `is` if is_zero == False: # we found something that is definitely not zero return (i, x, False, newly_determined) possible_zeros.append(is_zero) # by this point, we've found no certain non-zeros if all(possible_zeros): # if everything is definitely zero, we have # no pivot return (None, None, False, newly_determined) # PASS 2 (iszerofunc after simplify) # we haven't found any for-sure non-zeros, so # go through the elements iszerofunc couldn't # make a determination about and opportunistically # simplify to see if we find something for i, x in enumerate(col): if possible_zeros[i] is not None: continue simped = simpfunc(x) is_zero = iszerofunc(simped) if is_zero == True or is_zero == False: newly_determined.append((i, simped)) if is_zero == False: return (i, simped, False, newly_determined) possible_zeros[i] = is_zero # after simplifying, some things that were recognized # as zeros might be zeros if all(possible_zeros): # if everything is definitely zero, we have # no pivot return (None, None, False, newly_determined) # PASS 3 (.equals(0)) # some expressions fail to simplify to zero, but # ``.equals(0)`` evaluates to True. As a last-ditch # attempt, apply ``.equals`` to these expressions for i, x in enumerate(col): if possible_zeros[i] is not None: continue if x.equals(S.Zero): # ``.iszero`` may return False with # an implicit assumption (e.g., ``x.equals(0)`` # when ``x`` is a symbol), so only treat it # as proved when ``.equals(0)`` returns True possible_zeros[i] = True newly_determined.append((i, S.Zero)) if all(possible_zeros): return (None, None, False, newly_determined) # at this point there is nothing that could definitely # be a pivot. To maintain compatibility with existing # behavior, we'll assume that an illdetermined thing is # non-zero. We should probably raise a warning in this case i = possible_zeros.index(None) return (i, col[i], True, newly_determined) def _find_reasonable_pivot_naive(col, iszerofunc=_iszero, simpfunc=None): """ Helper that computes the pivot value and location from a sequence of contiguous matrix column elements. As a side effect of the pivot search, this function may simplify some of the elements of the input column. A list of these simplified entries and their indices are also returned. This function mimics the behavior of _find_reasonable_pivot(), but does less work trying to determine if an indeterminate candidate pivot simplifies to zero. This more naive approach can be much faster, with the trade-off that it may erroneously return a pivot that is zero. ``col`` is a sequence of contiguous column entries to be searched for a suitable pivot. ``iszerofunc`` is a callable that returns a Boolean that indicates if its input is zero, or None if no such determination can be made. ``simpfunc`` is a callable that simplifies its input. It must return its input if it does not simplify its input. Passing in ``simpfunc=None`` indicates that the pivot search should not attempt to simplify any candidate pivots. Returns a 4-tuple: (pivot_offset, pivot_val, assumed_nonzero, newly_determined) ``pivot_offset`` is the sequence index of the pivot. ``pivot_val`` is the value of the pivot. pivot_val and col[pivot_index] are equivalent, but will be different when col[pivot_index] was simplified during the pivot search. ``assumed_nonzero`` is a boolean indicating if the pivot cannot be guaranteed to be zero. If assumed_nonzero is true, then the pivot may or may not be non-zero. If assumed_nonzero is false, then the pivot is non-zero. ``newly_determined`` is a list of index-value pairs of pivot candidates that were simplified during the pivot search. """ # indeterminates holds the index-value pairs of each pivot candidate # that is neither zero or non-zero, as determined by iszerofunc(). # If iszerofunc() indicates that a candidate pivot is guaranteed # non-zero, or that every candidate pivot is zero then the contents # of indeterminates are unused. # Otherwise, the only viable candidate pivots are symbolic. # In this case, indeterminates will have at least one entry, # and all but the first entry are ignored when simpfunc is None. indeterminates = [] for i, col_val in enumerate(col): col_val_is_zero = iszerofunc(col_val) if col_val_is_zero == False: # This pivot candidate is non-zero. return i, col_val, False, [] elif col_val_is_zero is None: # The candidate pivot's comparison with zero # is indeterminate. indeterminates.append((i, col_val)) if len(indeterminates) == 0: # All candidate pivots are guaranteed to be zero, i.e. there is # no pivot. return None, None, False, [] if simpfunc is None: # Caller did not pass in a simplification function that might # determine if an indeterminate pivot candidate is guaranteed # to be nonzero, so assume the first indeterminate candidate # is non-zero. return indeterminates[0][0], indeterminates[0][1], True, [] # newly_determined holds index-value pairs of candidate pivots # that were simplified during the search for a non-zero pivot. newly_determined = [] for i, col_val in indeterminates: tmp_col_val = simpfunc(col_val) if id(col_val) != id(tmp_col_val): # simpfunc() simplified this candidate pivot. newly_determined.append((i, tmp_col_val)) if iszerofunc(tmp_col_val) == False: # Candidate pivot simplified to a guaranteed non-zero value. return i, tmp_col_val, False, newly_determined return indeterminates[0][0], indeterminates[0][1], True, newly_determined
b8af9506182f9be9b422f95405630768f66094e58208309d90553a26797ba17d	from __future__ import print_function, division from sympy.core.basic import Basic from sympy.core.compatibility import as_int, with_metaclass, range, PY3 from sympy.core.expr import Expr from sympy.core.function import Lambda from sympy.core.numbers import oo from sympy.core.relational import Eq from sympy.core.singleton import Singleton, S from sympy.core.symbol import Dummy, symbols from sympy.core.sympify import _sympify, sympify, converter from sympy.logic.boolalg import And, Or from sympy.sets.sets import (Set, Interval, Union, FiniteSet, ProductSet, Intersection) from sympy.sets.contains import Contains from sympy.sets.conditionset import ConditionSet from sympy.utilities.iterables import flatten from sympy.utilities.misc import filldedent class Rationals(with_metaclass(Singleton, Set)): """ Represents the rational numbers. This set is also available as the Singleton, S.Rationals. Examples ======== >>> from sympy import S >>> S.Half in S.Rationals True >>> iterable = iter(S.Rationals) >>> [next(iterable) for i in range(12)] [0, 1, -1, 1/2, 2, -1/2, -2, 1/3, 3, -1/3, -3, 2/3] """ is_iterable = True _inf = S.NegativeInfinity _sup = S.Infinity def _contains(self, other): if not isinstance(other, Expr): return False if other.is_Number: return other.is_Rational return other.is_rational def __iter__(self): from sympy.core.numbers import igcd, Rational yield S.Zero yield S.One yield S.NegativeOne d = 2 while True: for n in range(d): if igcd(n, d) == 1: yield Rational(n, d) yield Rational(d, n) yield Rational(-n, d) yield Rational(-d, n) d += 1 @property def _boundary(self): return self class Naturals(with_metaclass(Singleton, Set)): """ Represents the natural numbers (or counting numbers) which are all positive integers starting from 1. This set is also available as the Singleton, S.Naturals. Examples ======== >>> from sympy import S, Interval, pprint >>> 5 in S.Naturals True >>> iterable = iter(S.Naturals) >>> next(iterable) 1 >>> next(iterable) 2 >>> next(iterable) 3 >>> pprint(S.Naturals.intersect(Interval(0, 10))) {1, 2, ..., 10} See Also ======== Naturals0 : non-negative integers (i.e. includes 0, too) Integers : also includes negative integers """ is_iterable = True _inf = S.One _sup = S.Infinity def _contains(self, other): if not isinstance(other, Expr): return False elif other.is_positive and other.is_integer: return True elif other.is_integer is False or other.is_positive is False: return False def __iter__(self): i = self._inf while True: yield i i = i + 1 @property def _boundary(self): return self def as_relational(self, x): from sympy.functions.elementary.integers import floor return And(Eq(floor(x), x), x >= self.inf, x < oo) class Naturals0(Naturals): """Represents the whole numbers which are all the non-negative integers, inclusive of zero. See Also ======== Naturals : positive integers; does not include 0 Integers : also includes the negative integers """ _inf = S.Zero def _contains(self, other): if not isinstance(other, Expr): return S.false elif other.is_integer and other.is_nonnegative: return S.true elif other.is_integer is False or other.is_nonnegative is False: return S.false class Integers(with_metaclass(Singleton, Set)): """ Represents all integers: positive, negative and zero. This set is also available as the Singleton, S.Integers. Examples ======== >>> from sympy import S, Interval, pprint >>> 5 in S.Naturals True >>> iterable = iter(S.Integers) >>> next(iterable) 0 >>> next(iterable) 1 >>> next(iterable) -1 >>> next(iterable) 2 >>> pprint(S.Integers.intersect(Interval(-4, 4))) {-4, -3, ..., 4} See Also ======== Naturals0 : non-negative integers Integers : positive and negative integers and zero """ is_iterable = True def _contains(self, other): if not isinstance(other, Expr): return S.false return other.is_integer def __iter__(self): yield S.Zero i = S.One while True: yield i yield -i i = i + 1 @property def _inf(self): return -S.Infinity @property def _sup(self): return S.Infinity @property def _boundary(self): return self def as_relational(self, x): from sympy.functions.elementary.integers import floor return And(Eq(floor(x), x), -oo < x, x < oo) class Reals(with_metaclass(Singleton, Interval)): """ Represents all real numbers from negative infinity to positive infinity, including all integer, rational and irrational numbers. This set is also available as the Singleton, S.Reals. Examples ======== >>> from sympy import S, Interval, Rational, pi, I >>> 5 in S.Reals True >>> Rational(-1, 2) in S.Reals True >>> pi in S.Reals True >>> 3I in S.Reals False >>> S.Reals.contains(pi) True See Also ======== ComplexRegion """ def __new__(cls): return Interval.__new__(cls, -S.Infinity, S.Infinity) def __eq__(self, other): return other == Interval(-S.Infinity, S.Infinity) def __hash__(self): return hash(Interval(-S.Infinity, S.Infinity)) class ImageSet(Set): """ Image of a set under a mathematical function. The transformation must be given as a Lambda function which has as many arguments as the elements of the set upon which it operates, e.g. 1 argument when acting on the set of integers or 2 arguments when acting on a complex region. This function is not normally called directly, but is called from `imageset`. Examples ======== >>> from sympy import Symbol, S, pi, Dummy, Lambda >>> from sympy.sets.sets import FiniteSet, Interval >>> from sympy.sets.fancysets import ImageSet >>> x = Symbol('x') >>> N = S.Naturals >>> squares = ImageSet(Lambda(x, x2), N) # {x2 for x in N} >>> 4 in squares True >>> 5 in squares False >>> FiniteSet(0, 1, 2, 3, 4, 5, 6, 7, 9, 10).intersect(squares) {1, 4, 9} >>> square_iterable = iter(squares) >>> for i in range(4): ... next(square_iterable) 1 4 9 16 If you want to get value for `x` = 2, 1/2 etc. (Please check whether the `x` value is in `base_set` or not before passing it as args) >>> squares.lamda(2) 4 >>> squares.lamda(S(1)/2) 1/4 >>> n = Dummy('n') >>> solutions = ImageSet(Lambda(n, npi), S.Integers) # solutions of sin(x) = 0 >>> dom = Interval(-1, 1) >>> dom.intersect(solutions) {0} See Also ======== sympy.sets.sets.imageset """ def __new__(cls, flambda, sets): if not isinstance(flambda, Lambda): raise ValueError('first argument must be a Lambda') if flambda is S.IdentityFunction: if len(sets) != 1: raise ValueError('identify function requires a single set') return sets[0] if not set(flambda.variables) & flambda.expr.free_symbols: return FiniteSet(flambda.expr) return Basic.__new__(cls, flambda, sets) lamda = property(lambda self: self.args[0]) base_set = property(lambda self: ProductSet(self.args[1:])) def __iter__(self): already_seen = set() for i in self.base_set: val = self.lamda(i) if val in already_seen: continue else: already_seen.add(val) yield val def _is_multivariate(self): return len(self.lamda.variables) > 1 def _contains(self, other): from sympy.matrices import Matrix from sympy.solvers.solveset import solveset, linsolve from sympy.solvers.solvers import solve from sympy.utilities.iterables import is_sequence, iterable, cartes L = self.lamda if is_sequence(other) != is_sequence(L.expr): return False elif is_sequence(other) and len(L.expr) != len(other): return False if self._is_multivariate(): if not is_sequence(L.expr): # exprs -> (numer, denom) and check again # XXX this is a bad idea -- make the user # remap self to desired form return other.as_numer_denom() in self.func( Lambda(L.variables, L.expr.as_numer_denom()), self.base_set) eqs = [expr - val for val, expr in zip(other, L.expr)] variables = L.variables free = set(variables) if all(i.is_number for i in list(Matrix(eqs).jacobian(variables))): solns = list(linsolve([e - val for e, val in zip(L.expr, other)], variables)) else: try: syms = [e.free_symbols & free for e in eqs] solns = {} for i, (e, s, v) in enumerate(zip(eqs, syms, other)): if not s: if e != v: return S.false solns[vars[i]] = [v] continue elif len(s) == 1: sy = s.pop() sol = solveset(e, sy) if sol is S.EmptySet: return S.false elif isinstance(sol, FiniteSet): solns[sy] = list(sol) else: raise NotImplementedError else: # if there is more than 1 symbol from # variables in expr than this is a # coupled system raise NotImplementedError solns = cartes([solns[s] for s in variables]) except NotImplementedError: solns = solve([e - val for e, val in zip(L.expr, other)], variables, set=True) if solns: _v, solns = solns # watch for infinite solutions like solving # for x, y and getting (x, 0), (0, y), (0, 0) solns = [i for i in solns if not any( s in i for s in variables)] if not solns: return False else: # not sure if [] means no solution or # couldn't find one return else: x = L.variables[0] if isinstance(L.expr, Expr): # scalar -> scalar mapping solnsSet = solveset(L.expr - other, x) if solnsSet.is_FiniteSet: solns = list(solnsSet) else: msgset = solnsSet else: # scalar -> vector # note: it is not necessary for components of other # to be in the corresponding base set unless the # computed component is always in the corresponding # domain. e.g. 1/2 is in imageset(x, x/2, Integers) # while it cannot be in imageset(x, x + 2, Integers). # So when the base set is comprised of integers or reals # perhaps a pre-check could be done to see if the computed # values are still in the set. dom = self.base_set for e, o in zip(L.expr, other): msgset = dom other = e - o dom = dom.intersection(solveset(e - o, x, domain=dom)) if not dom: # there is no solution in common return False return not isinstance(dom, Intersection) for soln in solns: try: if soln in self.base_set: return True except TypeError: return return S.false @property def is_iterable(self): return self.base_set.is_iterable def doit(self, kwargs): from sympy.sets.setexpr import SetExpr f = self.lamda base_set = self.base_set return SetExpr(base_set)._eval_func(f).set class Range(Set): """ Represents a range of integers. Can be called as Range(stop), Range(start, stop), or Range(start, stop, step); when stop is not given it defaults to 1. `Range(stop)` is the same as `Range(0, stop, 1)` and the stop value (juse as for Python ranges) is not included in the Range values. >>> from sympy import Range >>> list(Range(3)) [0, 1, 2] The step can also be negative: >>> list(Range(10, 0, -2)) [10, 8, 6, 4, 2] The stop value is made canonical so equivalent ranges always have the same args: >>> Range(0, 10, 3) Range(0, 12, 3) Infinite ranges are allowed. ``oo`` and ``-oo`` are never included in the set (``Range`` is always a subset of ``Integers``). If the starting point is infinite, then the final value is ``stop - step``. To iterate such a range, it needs to be reversed: >>> from sympy import oo >>> r = Range(-oo, 1) >>> r[-1] 0 >>> next(iter(r)) Traceback (most recent call last): ... ValueError: Cannot iterate over Range with infinite start >>> next(iter(r.reversed)) 0 Although Range is a set (and supports the normal set operations) it maintains the order of the elements and can be used in contexts where `range` would be used. >>> from sympy import Interval >>> Range(0, 10, 2).intersect(Interval(3, 7)) Range(4, 8, 2) >>> list(_) [4, 6] Although slicing of a Range will always return a Range -- possibly empty -- an empty set will be returned from any intersection that is empty: >>> Range(3)[:0] Range(0, 0, 1) >>> Range(3).intersect(Interval(4, oo)) EmptySet() >>> Range(3).intersect(Range(4, oo)) EmptySet() """ is_iterable = True def __new__(cls, args): from sympy.functions.elementary.integers import ceiling if len(args) == 1: if isinstance(args[0], range if PY3 else xrange): args = args[0].__reduce__()[1] # use pickle method # expand range slc = slice(args) if slc.step == 0: raise ValueError("step cannot be 0") start, stop, step = slc.start or 0, slc.stop, slc.step or 1 try: start, stop, step = [ w if w in [S.NegativeInfinity, S.Infinity] else sympify(as_int(w)) for w in (start, stop, step)] except ValueError: raise ValueError(filldedent(''' Finite arguments to Range must be integers; `imageset` can define other cases, e.g. use `imageset(i, i/10, Range(3))` to give [0, 1/10, 1/5].''')) if not step.is_Integer: raise ValueError(filldedent(''' Ranges must have a literal integer step.''')) if all(i.is_infinite for i in (start, stop)): if start == stop: # canonical null handled below start = stop = S.One else: raise ValueError(filldedent(''' Either the start or end value of the Range must be finite.''')) if start.is_infinite: if step(stop - start) < 0: start = stop = S.One else: end = stop if not start.is_infinite: ref = start if start.is_finite else stop n = ceiling((stop - ref)/step) if n <= 0: # null Range start = end = S.Zero step = S.One else: end = ref + nstep return Basic.__new__(cls, start, end, step) start = property(lambda self: self.args[0]) stop = property(lambda self: self.args[1]) step = property(lambda self: self.args[2]) @property def reversed(self): """Return an equivalent Range in the opposite order. Examples ======== >>> from sympy import Range >>> Range(10).reversed Range(9, -1, -1) """ if not self: return self return self.func( self.stop - self.step, self.start - self.step, -self.step) def _contains(self, other): if not self: return S.false if other.is_infinite: return S.false if not other.is_integer: return other.is_integer ref = self.start if self.start.is_finite else self.stop if (ref - other) % self.step: # off sequence return S.false return _sympify(other >= self.inf and other <= self.sup) def __iter__(self): if self.start in [S.NegativeInfinity, S.Infinity]: raise ValueError("Cannot iterate over Range with infinite start") elif self: i = self.start step = self.step while True: if (step > 0 and not (self.start <= i < self.stop)) or \ (step < 0 and not (self.stop < i <= self.start)): break yield i i += step def __len__(self): if not self: return 0 dif = self.stop - self.start if dif.is_infinite: raise ValueError( "Use .size to get the length of an infinite Range") return abs(dif//self.step) @property def size(self): try: return _sympify(len(self)) except ValueError: return S.Infinity def __nonzero__(self): return self.start != self.stop __bool__ = __nonzero__ def __getitem__(self, i): from sympy.functions.elementary.integers import ceiling ooslice = "cannot slice from the end with an infinite value" zerostep = "slice step cannot be zero" # if we had to take every other element in the following # oo, ..., 6, 4, 2, 0 # we might get oo, ..., 4, 0 or oo, ..., 6, 2 ambiguous = "cannot unambiguously re-stride from the end " + \ "with an infinite value" if isinstance(i, slice): if self.size.is_finite: start, stop, step = i.indices(self.size) n = ceiling((stop - start)/step) if n <= 0: return Range(0) canonical_stop = start + nstep end = canonical_stop - step ss = stepself.step return Range(self[start], self[end] + ss, ss) else: # infinite Range start = i.start stop = i.stop if i.step == 0: raise ValueError(zerostep) step = i.step or 1 ss = stepself.step #--------------------- # handle infinite on right # e.g. Range(0, oo) or Range(0, -oo, -1) # -------------------- if self.stop.is_infinite: # start and stop are not interdependent -- # they only depend on step --so we use the # equivalent reversed values return self.reversed[ stop if stop is None else -stop + 1: start if start is None else -start: step].reversed #--------------------- # handle infinite on the left # e.g. Range(oo, 0, -1) or Range(-oo, 0) # -------------------- # consider combinations of # start/stop {== None, < 0, == 0, > 0} and # step {< 0, > 0} if start is None: if stop is None: if step < 0: return Range(self[-1], self.start, ss) elif step > 1: raise ValueError(ambiguous) else: # == 1 return self elif stop < 0: if step < 0: return Range(self[-1], self[stop], ss) else: # > 0 return Range(self.start, self[stop], ss) elif stop == 0: if step > 0: return Range(0) else: # < 0 raise ValueError(ooslice) elif stop == 1: if step > 0: raise ValueError(ooslice) # infinite singleton else: # < 0 raise ValueError(ooslice) else: # > 1 raise ValueError(ooslice) elif start < 0: if stop is None: if step < 0: return Range(self[start], self.start, ss) else: # > 0 return Range(self[start], self.stop, ss) elif stop < 0: return Range(self[start], self[stop], ss) elif stop == 0: if step < 0: raise ValueError(ooslice) else: # > 0 return Range(0) elif stop > 0: raise ValueError(ooslice) elif start == 0: if stop is None: if step < 0: raise ValueError(ooslice) # infinite singleton elif step > 1: raise ValueError(ambiguous) else: # == 1 return self elif stop < 0: if step > 1: raise ValueError(ambiguous) elif step == 1: return Range(self.start, self[stop], ss) else: # < 0 return Range(0) else: # >= 0 raise ValueError(ooslice) elif start > 0: raise ValueError(ooslice) else: if not self: raise IndexError('Range index out of range') if i == 0: return self.start if i == -1 or i is S.Infinity: return self.stop - self.step rv = (self.stop if i < 0 else self.start) + iself.step if rv.is_infinite: raise ValueError(ooslice) if rv < self.inf or rv > self.sup: raise IndexError("Range index out of range") return rv @property def _inf(self): if not self: raise NotImplementedError if self.step > 0: return self.start else: return self.stop - self.step @property def _sup(self): if not self: raise NotImplementedError if self.step > 0: return self.stop - self.step else: return self.start @property def _boundary(self): return self def as_relational(self, x): """Rewrite a Range in terms of equalities and logic operators. """ from sympy.functions.elementary.integers import floor i = (x - (self.inf if self.inf.is_finite else self.sup))/self.step return And( Eq(i, floor(i)), x >= self.inf if self.inf in self else x > self.inf, x <= self.sup if self.sup in self else x < self.sup) if PY3: converter[range] = Range else: converter[xrange] = Range def normalize_theta_set(theta): """ Normalize a Real Set `theta` in the Interval [0, 2pi). It returns a normalized value of theta in the Set. For Interval, a maximum of one cycle [0, 2pi], is returned i.e. for theta equal to [0, 10pi], returned normalized value would be [0, 2pi). As of now intervals with end points as non-multiples of `pi` is not supported. Raises ====== NotImplementedError The algorithms for Normalizing theta Set are not yet implemented. ValueError The input is not valid, i.e. the input is not a real set. RuntimeError It is a bug, please report to the github issue tracker. Examples ======== >>> from sympy.sets.fancysets import normalize_theta_set >>> from sympy import Interval, FiniteSet, pi >>> normalize_theta_set(Interval(9pi/2, 5pi)) Interval(pi/2, pi) >>> normalize_theta_set(Interval(-3pi/2, pi/2)) Interval.Ropen(0, 2pi) >>> normalize_theta_set(Interval(-pi/2, pi/2)) Union(Interval(0, pi/2), Interval.Ropen(3pi/2, 2pi)) >>> normalize_theta_set(Interval(-4pi, 3pi)) Interval.Ropen(0, 2pi) >>> normalize_theta_set(Interval(-3pi/2, -pi/2)) Interval(pi/2, 3pi/2) >>> normalize_theta_set(FiniteSet(0, pi, 3pi)) {0, pi} """ from sympy.functions.elementary.trigonometric import _pi_coeff as coeff if theta.is_Interval: interval_len = theta.measure # one complete circle if interval_len >= 2S.Pi: if interval_len == 2S.Pi and theta.left_open and theta.right_open: k = coeff(theta.start) return Union(Interval(0, kS.Pi, False, True), Interval(kS.Pi, 2S.Pi, True, True)) return Interval(0, 2S.Pi, False, True) k_start, k_end = coeff(theta.start), coeff(theta.end) if k_start is None or k_end is None: raise NotImplementedError("Normalizing theta without pi as coefficient is " "not yet implemented") new_start = k_startS.Pi new_end = k_endS.Pi if new_start > new_end: return Union(Interval(S.Zero, new_end, False, theta.right_open), Interval(new_start, 2S.Pi, theta.left_open, True)) else: return Interval(new_start, new_end, theta.left_open, theta.right_open) elif theta.is_FiniteSet: new_theta = [] for element in theta: k = coeff(element) if k is None: raise NotImplementedError('Normalizing theta without pi as ' 'coefficient, is not Implemented.') else: new_theta.append(kS.Pi) return FiniteSet(new_theta) elif theta.is_Union: return Union([normalize_theta_set(interval) for interval in theta.args]) elif theta.is_subset(S.Reals): raise NotImplementedError("Normalizing theta when, it is of type %s is not " "implemented" % type(theta)) else: raise ValueError(" %s is not a real set" % (theta)) class ComplexRegion(Set): """ Represents the Set of all Complex Numbers. It can represent a region of Complex Plane in both the standard forms Polar and Rectangular coordinates. Polar Form Input is in the form of the ProductSet or Union of ProductSets of the intervals of r and theta, & use the flag polar=True. Z = {z in C \| z = r[cos(theta) + Isin(theta)], r in [r], theta in [theta]} * Rectangular Form Input is in the form of the ProductSet or Union of ProductSets of interval of x and y the of the Complex numbers in a Plane. Default input type is in rectangular form. Z = {z in C \| z = x + Iy, x in [Re(z)], y in [Im(z)]} Examples ======== >>> from sympy.sets.fancysets import ComplexRegion >>> from sympy.sets import Interval >>> from sympy import S, I, Union >>> a = Interval(2, 3) >>> b = Interval(4, 6) >>> c = Interval(1, 8) >>> c1 = ComplexRegion(ab) # Rectangular Form >>> c1 ComplexRegion(Interval(2, 3) x Interval(4, 6), False) * c1 represents the rectangular region in complex plane surrounded by the coordinates (2, 4), (3, 4), (3, 6) and (2, 6), of the four vertices. >>> c2 = ComplexRegion(Union(ab, bc)) >>> c2 ComplexRegion(Union(Interval(2, 3) x Interval(4, 6), Interval(4, 6) x Interval(1, 8)), False) * c2 represents the Union of two rectangular regions in complex plane. One of them surrounded by the coordinates of c1 and other surrounded by the coordinates (4, 1), (6, 1), (6, 8) and (4, 8). >>> 2.5 + 4.5I in c1 True >>> 2.5 + 6.5I in c1 False >>> r = Interval(0, 1) >>> theta = Interval(0, 2S.Pi) >>> c2 = ComplexRegion(rtheta, polar=True) # Polar Form >>> c2 # unit Disk ComplexRegion(Interval(0, 1) x Interval.Ropen(0, 2pi), True) c2 represents the region in complex plane inside the Unit Disk centered at the origin. >>> 0.5 + 0.5I in c2 True >>> 1 + 2I in c2 False >>> unit_disk = ComplexRegion(Interval(0, 1)Interval(0, 2S.Pi), polar=True) >>> upper_half_unit_disk = ComplexRegion(Interval(0, 1)Interval(0, S.Pi), polar=True) >>> intersection = unit_disk.intersect(upper_half_unit_disk) >>> intersection ComplexRegion(Interval(0, 1) x Interval(0, pi), True) >>> intersection == upper_half_unit_disk True See Also ======== Reals """ is_ComplexRegion = True def __new__(cls, sets, polar=False): from sympy import sin, cos x, y, r, theta = symbols('x, y, r, theta', cls=Dummy) I = S.ImaginaryUnit polar = sympify(polar) # Rectangular Form if polar == False: if all(_a.is_FiniteSet for _a in sets.args) and (len(sets.args) == 2): # * ProductSet of FiniteSets in the Complex Plane. ** # For Cases like ComplexRegion({2, 4}{3}), It # would return {2 + 3I, 4 + 3I} complex_num = [] for x in sets.args[0]: for y in sets.args[1]: complex_num.append(x + Iy) obj = FiniteSet(complex_num) else: obj = ImageSet.__new__(cls, Lambda((x, y), x + Iy), sets) obj._variables = (x, y) obj._expr = x + Iy # Polar Form elif polar == True: new_sets = [] # sets is Union of ProductSets if not sets.is_ProductSet: for k in sets.args: new_sets.append(k) # sets is ProductSets else: new_sets.append(sets) # Normalize input theta for k, v in enumerate(new_sets): new_sets[k] = ProductSet(v.args[0], normalize_theta_set(v.args[1])) sets = Union(new_sets) obj = ImageSet.__new__(cls, Lambda((r, theta), r(cos(theta) + Isin(theta))), sets) obj._variables = (r, theta) obj._expr = r(cos(theta) + Isin(theta)) else: raise ValueError("polar should be either True or False") obj._sets = sets obj._polar = polar return obj @property def sets(self): """ Return raw input sets to the self. Examples ======== >>> from sympy import Interval, ComplexRegion, Union >>> a = Interval(2, 3) >>> b = Interval(4, 5) >>> c = Interval(1, 7) >>> C1 = ComplexRegion(ab) >>> C1.sets Interval(2, 3) x Interval(4, 5) >>> C2 = ComplexRegion(Union(ab, bc)) >>> C2.sets Union(Interval(2, 3) x Interval(4, 5), Interval(4, 5) x Interval(1, 7)) """ return self._sets @property def args(self): return (self._sets, self._polar) @property def variables(self): return self._variables @property def expr(self): return self._expr @property def psets(self): """ Return a tuple of sets (ProductSets) input of the self. Examples ======== >>> from sympy import Interval, ComplexRegion, Union >>> a = Interval(2, 3) >>> b = Interval(4, 5) >>> c = Interval(1, 7) >>> C1 = ComplexRegion(ab) >>> C1.psets (Interval(2, 3) x Interval(4, 5),) >>> C2 = ComplexRegion(Union(ab, bc)) >>> C2.psets (Interval(2, 3) x Interval(4, 5), Interval(4, 5) x Interval(1, 7)) """ if self.sets.is_ProductSet: psets = () psets = psets + (self.sets, ) else: psets = self.sets.args return psets @property def a_interval(self): """ Return the union of intervals of `x` when, self is in rectangular form, or the union of intervals of `r` when self is in polar form. Examples ======== >>> from sympy import Interval, ComplexRegion, Union >>> a = Interval(2, 3) >>> b = Interval(4, 5) >>> c = Interval(1, 7) >>> C1 = ComplexRegion(ab) >>> C1.a_interval Interval(2, 3) >>> C2 = ComplexRegion(Union(ab, bc)) >>> C2.a_interval Union(Interval(2, 3), Interval(4, 5)) """ a_interval = [] for element in self.psets: a_interval.append(element.args[0]) a_interval = Union(a_interval) return a_interval @property def b_interval(self): """ Return the union of intervals of `y` when, self is in rectangular form, or the union of intervals of `theta` when self is in polar form. Examples ======== >>> from sympy import Interval, ComplexRegion, Union >>> a = Interval(2, 3) >>> b = Interval(4, 5) >>> c = Interval(1, 7) >>> C1 = ComplexRegion(ab) >>> C1.b_interval Interval(4, 5) >>> C2 = ComplexRegion(Union(ab, bc)) >>> C2.b_interval Interval(1, 7) """ b_interval = [] for element in self.psets: b_interval.append(element.args[1]) b_interval = Union(b_interval) return b_interval @property def polar(self): """ Returns True if self is in polar form. Examples ======== >>> from sympy import Interval, ComplexRegion, Union, S >>> a = Interval(2, 3) >>> b = Interval(4, 5) >>> theta = Interval(0, 2S.Pi) >>> C1 = ComplexRegion(ab) >>> C1.polar False >>> C2 = ComplexRegion(atheta, polar=True) >>> C2.polar True """ return self._polar @property def _measure(self): """ The measure of self.sets. Examples ======== >>> from sympy import Interval, ComplexRegion, S >>> a, b = Interval(2, 5), Interval(4, 8) >>> c = Interval(0, 2S.Pi) >>> c1 = ComplexRegion(ab) >>> c1.measure 12 >>> c2 = ComplexRegion(ac, polar=True) >>> c2.measure 6pi """ return self.sets._measure @classmethod def from_real(cls, sets): """ Converts given subset of real numbers to a complex region. Examples ======== >>> from sympy import Interval, ComplexRegion >>> unit = Interval(0,1) >>> ComplexRegion.from_real(unit) ComplexRegion(Interval(0, 1) x {0}, False) """ if not sets.is_subset(S.Reals): raise ValueError("sets must be a subset of the real line") return cls(sets FiniteSet(0)) def _contains(self, other): from sympy.functions import arg, Abs from sympy.core.containers import Tuple other = sympify(other) isTuple = isinstance(other, Tuple) if isTuple and len(other) != 2: raise ValueError('expecting Tuple of length 2') # If the other is not an Expression, and neither a Tuple if not isinstance(other, Expr) and not isinstance(other, Tuple): return S.false # self in rectangular form if not self.polar: re, im = other if isTuple else other.as_real_imag() for element in self.psets: if And(element.args[0]._contains(re), element.args[1]._contains(im)): return True return False # self in polar form elif self.polar: if isTuple: r, theta = other elif other.is_zero: r, theta = S.Zero, S.Zero else: r, theta = Abs(other), arg(other) for element in self.psets: if And(element.args[0]._contains(r), element.args[1]._contains(theta)): return True return False class Complexes(with_metaclass(Singleton, ComplexRegion)): def __new__(cls): return ComplexRegion.__new__(cls, S.RealsS.Reals) def __eq__(self, other): return other == ComplexRegion(S.RealsS.Reals) def __hash__(self): return hash(ComplexRegion(S.Reals*S.Reals)) def __str__(self): return "S.Complexes" def __repr__(self): return "S.Complexes"
8474e1cf77624cf9b97c92a6dfc155dd7d4c24ddb46718ab0d68f84c3962bace	from sympy import (S, Symbol, symbols, Interval, FallingFactorial, Eq, cos, And, Tuple, integrate, oo, sin, Sum, Basic, DiracDelta, log, pi) from sympy.core.compatibility import range from sympy.core.numbers import comp from sympy.stats import (Die, Normal, Exponential, FiniteRV, P, E, H, variance, density, given, independent, dependent, where, pspace, factorial_moment, random_symbols, sample, Geometric, Binomial, Poisson, Hypergeometric) from sympy.stats.frv_types import BernoulliDistribution from sympy.stats.rv import (IndependentProductPSpace, rs_swap, Density, NamedArgsMixin, RandomSymbol, PSpace) from sympy.utilities.pytest import raises def test_where(): X, Y = Die('X'), Die('Y') Z = Normal('Z', 0, 1) assert where(Z2 <= 1).set == Interval(-1, 1) assert where( Z2 <= 1).as_boolean() == Interval(-1, 1).as_relational(Z.symbol) assert where(And(X > Y, Y > 4)).as_boolean() == And( Eq(X.symbol, 6), Eq(Y.symbol, 5)) assert len(where(X < 3).set) == 2 assert 1 in where(X < 3).set X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) assert where(And(X2 <= 1, X >= 0)).set == Interval(0, 1) XX = given(X, And(X2 <= 1, X >= 0)) assert XX.pspace.domain.set == Interval(0, 1) assert XX.pspace.domain.as_boolean() == \ And(0 <= X.symbol, X.symbol*2 <= 1, -oo < X.symbol, X.symbol < oo) with raises(TypeError): XX = given(X, X + 3) def test_random_symbols(): X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) assert set(random_symbols(2X + 1)) == set((X,)) assert set(random_symbols(2X + Y)) == set((X, Y)) assert set(random_symbols(2X + Y.symbol)) == set((X,)) assert set(random_symbols(2)) == set() def test_pspace(): X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) x = Symbol('x') raises(ValueError, lambda: pspace(5 + 3)) raises(ValueError, lambda: pspace(x < 1)) assert pspace(X) == X.pspace assert pspace(2X + 1) == X.pspace assert pspace(2X + Y) == IndependentProductPSpace(Y.pspace, X.pspace) def test_rs_swap(): X = Normal('x', 0, 1) Y = Exponential('y', 1) XX = Normal('x', 0, 2) YY = Normal('y', 0, 3) expr = 2X + Y assert expr.subs(rs_swap((X, Y), (YY, XX))) == 2XX + YY def test_RandomSymbol(): X = Normal('x', 0, 1) Y = Normal('x', 0, 2) assert X.symbol == Y.symbol assert X != Y assert X.name == X.symbol.name X = Normal('lambda', 0, 1) # make sure we can use protected terms X = Normal('Lambda', 0, 1) # make sure we can use SymPy terms def test_RandomSymbol_diff(): X = Normal('x', 0, 1) assert (2X).diff(X) def test_random_symbol_no_pspace(): x = RandomSymbol(Symbol('x')) assert x.pspace == PSpace() def test_overlap(): X = Normal('x', 0, 1) Y = Normal('x', 0, 2) raises(ValueError, lambda: P(X > Y)) def test_IndependentProductPSpace(): X = Normal('X', 0, 1) Y = Normal('Y', 0, 1) px = X.pspace py = Y.pspace assert pspace(X + Y) == IndependentProductPSpace(px, py) assert pspace(X + Y) == IndependentProductPSpace(py, px) def test_E(): assert E(5) == 5 def test_H(): X = Normal('X', 0, 1) D = Die('D', sides = 4) G = Geometric('G', 0.5) assert H(X, X > 0) == -log(2)/2 + S(1)/2 + log(pi)/2 assert H(D, D > 2) == log(2) assert comp(H(G).evalf().round(2), 1.39) def test_Sample(): X = Die('X', 6) Y = Normal('Y', 0, 1) z = Symbol('z') assert sample(X) in [1, 2, 3, 4, 5, 6] assert sample(X + Y).is_Float P(X + Y > 0, Y < 0, numsamples=10).is_number assert E(X + Y, numsamples=10).is_number assert variance(X + Y, numsamples=10).is_number raises(ValueError, lambda: P(Y > z, numsamples=5)) assert P(sin(Y) <= 1, numsamples=10) == 1 assert P(sin(Y) <= 1, cos(Y) < 1, numsamples=10) == 1 # Make sure this doesn't raise an error E(Sum(1/zY, (z, 1, oo)), Y > 2, numsamples=3) assert all(i in range(1, 7) for i in density(X, numsamples=10)) assert all(i in range(4, 7) for i in density(X, X>3, numsamples=10)) def test_given(): X = Normal('X', 0, 1) Y = Normal('Y', 0, 1) A = given(X, True) B = given(X, Y > 2) assert X == A == B def test_factorial_moment(): X = Poisson('X', 2) Y = Binomial('Y', 2, S.Half) Z = Hypergeometric('Z', 4, 2, 2) assert factorial_moment(X, 2) == 4 assert factorial_moment(Y, 2) == S(1)/2 assert factorial_moment(Z, 2) == S(1)/3 x, y, z, l = symbols('x y z l') Y = Binomial('Y', 2, y) Z = Hypergeometric('Z', 10, 2, 3) assert factorial_moment(Y, l) == y2FallingFactorial( 2, l) + 2y(1 - y)FallingFactorial(1, l) + (1 - y)2\ FallingFactorial(0, l) assert factorial_moment(Z, l) == 7FallingFactorial(0, l)/\ 15 + 7FallingFactorial(1, l)/15 + FallingFactorial(2, l)/15 def test_dependence(): X, Y = Die('X'), Die('Y') assert independent(X, 2Y) assert not dependent(X, 2Y) X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) assert independent(X, Y) assert dependent(X, 2*X) # Create a dependency XX, YY = given(Tuple(X, Y), Eq(X + Y, 3)) assert dependent(XX, YY) def test_dependent_finite(): X, Y = Die('X'), Die('Y') # Dependence testing requires symbolic conditions which currently break # finite random variables assert dependent(X, Y + X) XX, YY = given(Tuple(X, Y), X + Y > 5) # Create a dependency assert dependent(XX, YY) def test_normality(): X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) x = Symbol('x', real=True, finite=True) z = Symbol('z', real=True, finite=True) dens = density(X - Y, Eq(X + Y, z)) assert integrate(dens(x), (x, -oo, oo)) == 1 def test_Density(): X = Die('X', 6) d = Density(X) assert d.doit() == density(X) def test_NamedArgsMixin(): class Foo(Basic, NamedArgsMixin): _argnames = 'foo', 'bar' a = Foo(1, 2) assert a.foo == 1 assert a.bar == 2 raises(AttributeError, lambda: a.baz) class Bar(Basic, NamedArgsMixin): pass raises(AttributeError, lambda: Bar(1, 2).foo) def test_density_constant(): assert density(3)(2) == 0 assert density(3)(3) == DiracDelta(0) def test_real(): x = Normal('x', 0, 1) assert x.is_real def test_issue_10052(): X = Exponential('X', 3) assert P(X < oo) == 1 assert P(X > oo) == 0 assert P(X < 2, X > oo) == 0 assert P(X < oo, X > oo) == 0 assert P(X < oo, X > 2) == 1 assert P(X < 3, X == 2) == 0 raises(ValueError, lambda: P(1)) raises(ValueError, lambda: P(X < 1, 2)) def test_issue_11934(): density = {0: .5, 1: .5} X = FiniteRV('X', density) assert E(X) == 0.5 assert P( X>= 2) == 0 def test_issue_8129(): X = Exponential('X', 4) assert P(X >= X) == 1 assert P(X > X) == 0 assert P(X > X+1) == 0 def test_issue_12237(): X = Normal('X', 0, 1) Y = Normal('Y', 0, 1) U = P(X > 0, X) V = P(Y < 0, X) W = P(X + Y > 0, X) assert W == P(X + Y > 0, X) assert U == BernoulliDistribution(S(1)/2, S(0), S(1)) assert V == S(1)/2
d876d2150042ab7dbb915187fe4d7d8c75cb8a0dc43a8a8ecf40c8ee338deb30	from sympy import (FiniteSet, S, Symbol, sqrt, nan, beta, symbols, simplify, Eq, cos, And, Tuple, Or, Dict, sympify, binomial, cancel, exp, I, Piecewise, Sum, Dummy) from sympy.core.compatibility import range from sympy.matrices import Matrix from sympy.stats import (DiscreteUniform, Die, Bernoulli, Coin, Binomial, BetaBinomial, Hypergeometric, Rademacher, P, E, variance, covariance, skewness, sample, density, where, FiniteRV, pspace, cdf, correlation, moment, cmoment, smoment, characteristic_function, moment_generating_function, quantile, kurtosis) from sympy.stats.frv_types import DieDistribution, BinomialDistribution, \ HypergeometricDistribution from sympy.stats.rv import Density from sympy.utilities.pytest import raises oo = S.Infinity def BayesTest(A, B): assert P(A, B) == P(And(A, B)) / P(B) assert P(A, B) == P(B, A) * P(A) / P(B) def test_discreteuniform(): # Symbolic a, b, c, t = symbols('a b c t') X = DiscreteUniform('X', [a, b, c]) assert E(X) == (a + b + c)/3 assert simplify(variance(X) - ((a2 + b2 + c2)/3 - (a/3 + b/3 + c/3)2)) == 0 assert P(Eq(X, a)) == P(Eq(X, b)) == P(Eq(X, c)) == S('1/3') Y = DiscreteUniform('Y', range(-5, 5)) # Numeric assert E(Y) == S('-1/2') assert variance(Y) == S('33/4') for x in range(-5, 5): assert P(Eq(Y, x)) == S('1/10') assert P(Y <= x) == S(x + 6)/10 assert P(Y >= x) == S(5 - x)/10 assert dict(density(Die('D', 6)).items()) == \ dict(density(DiscreteUniform('U', range(1, 7))).items()) assert characteristic_function(X)(t) == exp(Iat)/3 + exp(Ibt)/3 + exp(Ict)/3 assert moment_generating_function(X)(t) == exp(at)/3 + exp(bt)/3 + exp(ct)/3 def test_dice(): # TODO: Make iid method! X, Y, Z = Die('X', 6), Die('Y', 6), Die('Z', 6) a, b, t, p = symbols('a b t p') assert E(X) == 3 + S.Half assert variance(X) == S(35)/12 assert E(X + Y) == 7 assert E(X + X) == 7 assert E(aX + b) == aE(X) + b assert variance(X + Y) == variance(X) + variance(Y) == cmoment(X + Y, 2) assert variance(X + X) == 4 variance(X) == cmoment(X + X, 2) assert cmoment(X, 0) == 1 assert cmoment(4X, 3) == 64cmoment(X, 3) assert covariance(X, Y) == S.Zero assert covariance(X, X + Y) == variance(X) assert density(Eq(cos(XS.Pi), 1))[True] == S.Half assert correlation(X, Y) == 0 assert correlation(X, Y) == correlation(Y, X) assert smoment(X + Y, 3) == skewness(X + Y) assert smoment(X + Y, 4) == kurtosis(X + Y) assert smoment(X, 0) == 1 assert P(X > 3) == S.Half assert P(2X > 6) == S.Half assert P(X > Y) == S(5)/12 assert P(Eq(X, Y)) == P(Eq(X, 1)) assert E(X, X > 3) == 5 == moment(X, 1, 0, X > 3) assert E(X, Y > 3) == E(X) == moment(X, 1, 0, Y > 3) assert E(X + Y, Eq(X, Y)) == E(2X) assert moment(X, 0) == 1 assert moment(5X, 2) == 25moment(X, 2) assert quantile(X)(p) == Piecewise((nan, (p > S.One) \| (p < S(0))),\ (S.One, p <= S(1)/6), (S(2), p <= S(1)/3), (S(3), p <= S.Half),\ (S(4), p <= S(2)/3), (S(5), p <= S(5)/6), (S(6), p <= S.One)) assert P(X > 3, X > 3) == S.One assert P(X > Y, Eq(Y, 6)) == S.Zero assert P(Eq(X + Y, 12)) == S.One/36 assert P(Eq(X + Y, 12), Eq(X, 6)) == S.One/6 assert density(X + Y) == density(Y + Z) != density(X + X) d = density(2X + Y*Z) assert d[S(22)] == S.One/108 and d[S(4100)] == S.One/216 and S(3130) not in d assert pspace(X).domain.as_boolean() == Or( [Eq(X.symbol, i) for i in [1, 2, 3, 4, 5, 6]]) assert where(X > 3).set == FiniteSet(4, 5, 6) assert characteristic_function(X)(t) == exp(6It)/6 + exp(5It)/6 + exp(4It)/6 + exp(3It)/6 + exp(2It)/6 + exp(It)/6 assert moment_generating_function(X)(t) == exp(6t)/6 + exp(5t)/6 + exp(4t)/6 + exp(3t)/6 + exp(2t)/6 + exp(t)/6 # Bayes test for die BayesTest(X > 3, X + Y < 5) BayesTest(Eq(X - Y, Z), Z > Y) BayesTest(X > 3, X > 2) # arg test for die raises(ValueError, lambda: Die('X', -1)) # issue 8105: negative sides. raises(ValueError, lambda: Die('X', 0)) raises(ValueError, lambda: Die('X', 1.5)) # issue 8103: non integer sides. # symbolic test for die n, k = symbols('n, k', positive=True) D = Die('D', n) dens = density(D).dict assert dens == Density(DieDistribution(n)) assert set(dens.subs(n, 4).doit().keys()) == set([1, 2, 3, 4]) assert set(dens.subs(n, 4).doit().values()) == set([S(1)/4]) k = Dummy('k', integer=True) assert E(D).dummy_eq( Sum(Piecewise((k/n, (k >= 1) & (k <= n)), (0, True)), (k, 1, n))) assert variance(D).subs(n, 6).doit() == S(35)/12 ki = Dummy('ki') cumuf = cdf(D)(k) assert cumuf.dummy_eq( Sum(Piecewise((1/n, (ki >= 1) & (ki <= n)), (0, True)), (ki, 1, k))) assert cumuf.subs({n: 6, k: 2}).doit() == S(1)/3 t = Dummy('t') cf = characteristic_function(D)(t) assert cf.dummy_eq( Sum(Piecewise((exp(kiIt)/n, (ki >= 1) & (ki <= n)), (0, True)), (ki, 1, n))) assert cf.subs(n, 3).doit() == exp(3It)/3 + exp(2It)/3 + exp(It)/3 mgf = moment_generating_function(D)(t) assert mgf.dummy_eq( Sum(Piecewise((exp(kit)/n, (ki >= 1) & (ki <= n)), (0, True)), (ki, 1, n))) assert mgf.subs(n, 3).doit() == exp(3t)/3 + exp(2t)/3 + exp(t)/3 def test_given(): X = Die('X', 6) assert density(X, X > 5) == {S(6): S(1)} assert where(X > 2, X > 5).as_boolean() == Eq(X.symbol, 6) assert sample(X, X > 5) == 6 def test_domains(): X, Y = Die('x', 6), Die('y', 6) x, y = X.symbol, Y.symbol # Domains d = where(X > Y) assert d.condition == (x > y) d = where(And(X > Y, Y > 3)) assert d.as_boolean() == Or(And(Eq(x, 5), Eq(y, 4)), And(Eq(x, 6), Eq(y, 5)), And(Eq(x, 6), Eq(y, 4))) assert len(d.elements) == 3 assert len(pspace(X + Y).domain.elements) == 36 Z = Die('x', 4) raises(ValueError, lambda: P(X > Z)) # Two domains with same internal symbol assert pspace(X + Y).domain.set == FiniteSet(1, 2, 3, 4, 5, 6)*2 assert where(X > 3).set == FiniteSet(4, 5, 6) assert X.pspace.domain.dict == FiniteSet( [Dict({X.symbol: i}) for i in range(1, 7)]) assert where(X > Y).dict == FiniteSet([Dict({X.symbol: i, Y.symbol: j}) for i in range(1, 7) for j in range(1, 7) if i > j]) def test_bernoulli(): p, a, b, t = symbols('p a b t') X = Bernoulli('B', p, a, b) assert E(X) == ap + b(-p + 1) assert density(X)[a] == p assert density(X)[b] == 1 - p assert characteristic_function(X)(t) == p exp(I * a * t) + (-p + 1) * exp(I * b * t) assert moment_generating_function(X)(t) == p * exp(a * t) + (-p + 1) * exp(b * t) X = Bernoulli('B', p, 1, 0) z = Symbol("z") assert E(X) == p assert simplify(variance(X)) == p(1 - p) assert E(aX + b) == aE(X) + b assert simplify(variance(aX + b)) == simplify(a*2 variance(X)) assert quantile(X)(z) == Piecewise((nan, (z > 1) \| (z < 0)), (0, z <= 1 - p), (1, z <= 1)) raises(ValueError, lambda: Bernoulli('B', 1.5)) raises(ValueError, lambda: Bernoulli('B', -0.5)) def test_cdf(): D = Die('D', 6) o = S.One assert cdf( D) == sympify({1: o/6, 2: o/3, 3: o/2, 4: 2o/3, 5: 5o/6, 6: o}) def test_coins(): C, D = Coin('C'), Coin('D') H, T = symbols('H, T') assert P(Eq(C, D)) == S.Half assert density(Tuple(C, D)) == {(H, H): S.One/4, (H, T): S.One/4, (T, H): S.One/4, (T, T): S.One/4} assert dict(density(C).items()) == {H: S.Half, T: S.Half} F = Coin('F', S.One/10) assert P(Eq(F, H)) == S(1)/10 d = pspace(C).domain assert d.as_boolean() == Or(Eq(C.symbol, H), Eq(C.symbol, T)) raises(ValueError, lambda: P(C > D)) # Can't intelligently compare H to T def test_binomial_verify_parameters(): raises(ValueError, lambda: Binomial('b', .2, .5)) raises(ValueError, lambda: Binomial('b', 3, 1.5)) def test_binomial_numeric(): nvals = range(5) pvals = [0, S(1)/4, S.Half, S(3)/4, 1] for n in nvals: for p in pvals: X = Binomial('X', n, p) assert E(X) == np assert variance(X) == np(1 - p) if n > 0 and 0 < p < 1: assert skewness(X) == (1 - 2p)/sqrt(np(1 - p)) assert kurtosis(X) == 3 + (1 - 6p(1 - p))/(np(1 - p)) for k in range(n + 1): assert P(Eq(X, k)) == binomial(n, k)pk(1 - p)*(n - k) def test_binomial_quantile(): X = Binomial('X', 50, S.Half) assert quantile(X)(0.95) == S(31) X = Binomial('X', 5, S(1)/2) p = Symbol("p", positive=True) assert quantile(X)(p) == Piecewise((nan, p > S(1)), (S(0), p <= S(1)/32),\ (S(1), p <= S(3)/16), (S(2), p <= S(1)/2), (S(3), p <= S(13)/16),\ (S(4), p <= S(31)/32), (S(5), p <= S(1))) def test_binomial_symbolic(): n = 2 p = symbols('p', positive=True) X = Binomial('X', n, p) t = Symbol('t') assert simplify(E(X)) == np == simplify(moment(X, 1)) assert simplify(variance(X)) == np(1 - p) == simplify(cmoment(X, 2)) assert cancel((skewness(X) - (1 - 2p)/sqrt(np(1 - p)))) == 0 assert cancel((kurtosis(X)) - (3 + (1 - 6p(1 - p))/(np(1 - p)))) == 0 assert characteristic_function(X)(t) == p * 2 * exp(2 * I * t) + 2 * p * (-p + 1) * exp(I * t) + (-p + 1) 2 assert moment_generating_function(X)(t) == p 2 * exp(2 * t) + 2 * p * (-p + 1) * exp(t) + (-p + 1) ** 2 # Test ability to change success/failure winnings H, T = symbols('H T') Y = Binomial('Y', n, p, succ=H, fail=T) assert simplify(E(Y) - (n(Hp + T(1 - p)))) == 0 # test symbolic dimensions n = symbols('n') B = Binomial('B', n, p) raises(NotImplementedError, lambda: P(B > 2)) assert density(B).dict == Density(BinomialDistribution(n, p, 1, 0)) assert set(density(B).dict.subs(n, 4).doit().keys()) == \ set([S(0), S(1), S(2), S(3), S(4)]) assert set(density(B).dict.subs(n, 4).doit().values()) == \ set([(1 - p)4, 4p(1 - p)3, 6p*2(1 - p)*2, 4p*3(1 - p), p*4]) k = Dummy('k', integer=True) assert E(B > 2).dummy_eq( Sum(Piecewise((kp*k(1 - p)*(-k + n)binomial(n, k), (k >= 0) & (k <= n) & (k > 2)), (0, True)), (k, 0, n))) def test_beta_binomial(): # verify parameters raises(ValueError, lambda: BetaBinomial('b', .2, 1, 2)) raises(ValueError, lambda: BetaBinomial('b', 2, -1, 2)) raises(ValueError, lambda: BetaBinomial('b', 2, 1, -2)) assert BetaBinomial('b', 2, 1, 1) # test numeric values nvals = range(1,5) alphavals = [S(1)/4, S.Half, S(3)/4, 1, 10] betavals = [S(1)/4, S.Half, S(3)/4, 1, 10] for n in nvals: for a in alphavals: for b in betavals: X = BetaBinomial('X', n, a, b) assert E(X) == moment(X, 1) assert variance(X) == cmoment(X, 2) # test symbolic n, a, b = symbols('a b n') assert BetaBinomial('x', n, a, b) n = 2 # Because we're using for loops, can't do symbolic n a, b = symbols('a b', positive=True) X = BetaBinomial('X', n, a, b) t = Symbol('t') assert E(X).expand() == moment(X, 1).expand() assert variance(X).expand() == cmoment(X, 2).expand() assert skewness(X) == smoment(X, 3) assert characteristic_function(X)(t) == exp(2It)beta(a + 2, b)/beta(a, b) +\ 2exp(It)beta(a + 1, b + 1)/beta(a, b) + beta(a, b + 2)/beta(a, b) assert moment_generating_function(X)(t) == exp(2t)beta(a + 2, b)/beta(a, b) +\ 2exp(t)beta(a + 1, b + 1)/beta(a, b) + beta(a, b + 2)/beta(a, b) def test_hypergeometric_numeric(): for N in range(1, 5): for m in range(0, N + 1): for n in range(1, N + 1): X = Hypergeometric('X', N, m, n) N, m, n = map(sympify, (N, m, n)) assert sum(density(X).values()) == 1 assert E(X) == n * m / N if N > 1: assert variance(X) == n(m/N)(N - m)/N(N - n)/(N - 1) # Only test for skewness when defined if N > 2 and 0 < m < N and n < N: assert skewness(X) == simplify((N - 2m)sqrt(N - 1)(N - 2n) / (sqrt(nm(N - m)(N - n))(N - 2))) def test_hypergeometric_symbolic(): N, m, n = symbols('N, m, n') H = Hypergeometric('H', N, m, n) dens = density(H).dict expec = E(H > 2) assert dens == Density(HypergeometricDistribution(N, m, n)) assert dens.subs(N, 5).doit() == Density(HypergeometricDistribution(5, m, n)) assert set(dens.subs({N: 3, m: 2, n: 1}).doit().keys()) == set([S(0), S(1)]) assert set(dens.subs({N: 3, m: 2, n: 1}).doit().values()) == set([S(1)/3, S(2)/3]) k = Dummy('k', integer=True) assert expec.dummy_eq( Sum(Piecewise((kbinomial(m, k)binomial(N - m, -k + n) /binomial(N, n), k > 2), (0, True)), (k, 0, n))) def test_rademacher(): X = Rademacher('X') t = Symbol('t') assert E(X) == 0 assert variance(X) == 1 assert density(X)[-1] == S.Half assert density(X)[1] == S.Half assert characteristic_function(X)(t) == exp(It)/2 + exp(-It)/2 assert moment_generating_function(X)(t) == exp(t) / 2 + exp(-t) / 2 def test_FiniteRV(): F = FiniteRV('F', {1: S.Half, 2: S.One/4, 3: S.One/4}) p = Symbol("p", positive=True) assert dict(density(F).items()) == {S(1): S.Half, S(2): S.One/4, S(3): S.One/4} assert P(F >= 2) == S.Half assert quantile(F)(p) == Piecewise((nan, p > S.One), (S.One, p <= S.Half),\ (S(2), p <= S(3)/4),(S(3), True)) assert pspace(F).domain.as_boolean() == Or( [Eq(F.symbol, i) for i in [1, 2, 3]]) raises(ValueError, lambda: FiniteRV('F', {1: S.Half, 2: S.Half, 3: S.Half})) raises(ValueError, lambda: FiniteRV('F', {1: S.Half, 2: S(-1)/2, 3: S.One})) raises(ValueError, lambda: FiniteRV('F', {1: S.One, 2: S(3)/2, 3: S.Zero,\ 4: S(-1)/2, 5: S(-3)/4, 6: S(-1)/4})) def test_density_call(): from sympy.abc import p x = Bernoulli('x', p) d = density(x) assert d(0) == 1 - p assert d(S.Zero) == 1 - p assert d(5) == 0 assert 0 in d assert 5 not in d assert d(S(0)) == d[S(0)] def test_DieDistribution(): from sympy.abc import x X = DieDistribution(6) assert X.pmf(S(1)/2) == S.Zero assert X.pmf(x).subs({x: 1}).doit() == S(1)/6 assert X.pmf(x).subs({x: 7}).doit() == 0 assert X.pmf(x).subs({x: -1}).doit() == 0 assert X.pmf(x).subs({x: S(1)/3}).doit() == 0 raises(ValueError, lambda: X.pmf(Matrix([0, 0]))) raises(ValueError, lambda: X.pmf(x**2 - 1)) def test_FinitePSpace(): X = Die('X', 6) space = pspace(X) assert space.density == DieDistribution(6) def test_symbolic_conditions(): B = Bernoulli('B', S(1)/4) D = Die('D', 4) b, n = symbols('b, n') Y = P(Eq(B, b)) Z = E(D > n) assert Y == \ Piecewise((S(1)/4, Eq(b, 1)), (0, True)) + \ Piecewise((S(3)/4, Eq(b, 0)), (0, True)) assert Z == \ Piecewise((S(1)/4, n < 1), (0, True)) + Piecewise((S(1)/2, n < 2), (0, True)) + \ Piecewise((S(3)/4, n < 3), (0, True)) + Piecewise((S(1), n < 4), (0, True))
fb60e82cf46576451448a5fa39dc4a5631c092cec84b2fc0f060ddcfd6257f06	from sympy import (symbols, pi, oo, S, exp, sqrt, besselk, Indexed, Sum, simplify, Rational, factorial, gamma, Piecewise, Eq, Product, IndexedBase, RisingFactorial) from sympy.core.numbers import comp from sympy.integrals.integrals import integrate from sympy.matrices import Matrix from sympy.stats import density from sympy.stats.crv_types import Normal from sympy.stats.joint_rv import marginal_distribution from sympy.stats.joint_rv_types import JointRV from sympy.utilities.pytest import raises, XFAIL x, y, z, a, b = symbols('x y z a b') def test_Normal(): m = Normal('A', [1, 2], [[1, 0], [0, 1]]) assert density(m)(1, 2) == 1/(2pi) raises (ValueError, lambda:m[2]) raises (ValueError,\ lambda: Normal('M',[1, 2], [[0, 0], [0, 1]])) n = Normal('B', [1, 2, 3], [[1, 0, 0], [0, 1, 0], [0, 0, 1]]) p = Normal('C', Matrix([1, 2]), Matrix([[1, 0], [0, 1]])) assert density(m)(x, y) == density(p)(x, y) assert marginal_distribution(n, 0, 1)(1, 2) == 1/(2pi) assert integrate(density(m)(x, y), (x, -oo, oo), (y, -oo, oo)).evalf() == 1 N = Normal('N', [1, 2], [[x, 0], [0, y]]) assert density(N)(0, 0) == exp(-2/y - 1/(2x))/(2pisqrt(xy)) raises (ValueError, lambda: Normal('M', [1, 2], [[1, 1], [1, -1]])) def test_MultivariateTDist(): from sympy.stats.joint_rv_types import MultivariateT t1 = MultivariateT('T', [0, 0], [[1, 0], [0, 1]], 2) assert(density(t1))(1, 1) == 1/(8pi) assert integrate(density(t1)(x, y), (x, -oo, oo), \ (y, -oo, oo)).evalf() == 1 raises(ValueError, lambda: MultivariateT('T', [1, 2], [[1, 1], [1, -1]], 1)) t2 = MultivariateT('t2', [1, 2], [[x, 0], [0, y]], 1) assert density(t2)(1, 2) == 1/(2pisqrt(xy)) def test_multivariate_laplace(): from sympy.stats.crv_types import Laplace raises(ValueError, lambda: Laplace('T', [1, 2], [[1, 2], [2, 1]])) L = Laplace('L', [1, 0], [[1, 2], [0, 1]]) assert density(L)(2, 3) == exp(2)besselk(0, sqrt(3))/pi L1 = Laplace('L1', [1, 2], [[x, 0], [0, y]]) assert density(L1)(0, 1) == \ exp(2/y)besselk(0, sqrt((2 + 4/y + 1/x)/y))/(pisqrt(xy)) def test_NormalGamma(): from sympy.stats.joint_rv_types import NormalGamma from sympy import gamma ng = NormalGamma('G', 1, 2, 3, 4) assert density(ng)(1, 1) == 32exp(-4)/sqrt(pi) raises(ValueError, lambda:NormalGamma('G', 1, 2, 3, -1)) assert marginal_distribution(ng, 0)(1) == \ 3sqrt(10)gamma(S(7)/4)/(10sqrt(pi)gamma(S(5)/4)) assert marginal_distribution(ng, y)(1) == exp(-S(1)/4)/128 def test_GeneralizedMultivariateLogGammaDistribution(): from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGammaOmega as GMVLGO from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGamma as GMVLG h = S.Half omega = Matrix([[1, h, h, h], [h, 1, h, h], [h, h, 1, h], [h, h, h, 1]]) v, l, mu = (4, [1, 2, 3, 4], [1, 2, 3, 4]) y_1, y_2, y_3, y_4 = symbols('y_1:5', real=True) delta = symbols('d', positive=True) G = GMVLGO('G', omega, v, l, mu) Gd = GMVLG('Gd', delta, v, l, mu) dend = ("d4Sum(424(-n - 4)(1 - d)*nexp((n + 4)(y_1 + 2y_2 + 3y_3 " "+ 4y_4) - exp(y_1) - exp(2y_2)/2 - exp(3y_3)/3 - exp(4y_4)/4)/" "(gamma(n + 1)gamma(n + 4)*3), (n, 0, oo))") assert str(density(Gd)(y_1, y_2, y_3, y_4)) == dend den = ("52*(2/3)5*(1/3)Sum(424(-n - 4)(-2*(2/3)5(1/3)/4 + 1)n" "exp((n + 4)(y_1 + 2y_2 + 3y_3 + 4y_4) - exp(y_1) - exp(2y_2)/2 - " "exp(3y_3)/3 - exp(4y_4)/4)/(gamma(n + 1)gamma(n + 4)3), (n, 0, oo))/64") assert str(density(G)(y_1, y_2, y_3, y_4)) == den marg = ("52*(2/3)5*(1/3)exp(4y_1)exp(-exp(y_1))Integral(exp(-exp(4G[3])" "/4)exp(16G[3])Integral(exp(-exp(3G[2])/3)exp(12G[2])Integral(exp(" "-exp(2G[1])/2)exp(8G[1])Sum((-1/4)n24*(-n)(-4 + 2*(2/3)5(1/3" "))nexp(ny_1)exp(2nG[1])exp(3nG[2])exp(4nG[3])/(gamma(n + 1)" "gamma(n + 4)3), (n, 0, oo)), (G[1], -oo, oo)), (G[2], -oo, oo)), (G[3]" ", -oo, oo))/5308416") assert str(marginal_distribution(G, G[0])(y_1)) == marg omega_f1 = Matrix([[1, h, h]]) omega_f2 = Matrix([[1, h, h, h], [h, 1, 2, h], [h, h, 1, h], [h, h, h, 1]]) omega_f3 = Matrix([[6, h, h, h], [h, 1, 2, h], [h, h, 1, h], [h, h, h, 1]]) v_f = symbols("v_f", positive=False, real=True) l_f = [1, 2, v_f, 4] m_f = [v_f, 2, 3, 4] omega_f4 = Matrix([[1, h, h, h, h], [h, 1, h, h, h], [h, h, 1, h, h], [h, h, h, 1, h], [h, h, h, h, 1]]) l_f1 = [1, 2, 3, 4, 5] omega_f5 = Matrix([[1]]) mu_f5 = l_f5 = [1] raises(ValueError, lambda: GMVLGO('G', omega_f1, v, l, mu)) raises(ValueError, lambda: GMVLGO('G', omega_f2, v, l, mu)) raises(ValueError, lambda: GMVLGO('G', omega_f3, v, l, mu)) raises(ValueError, lambda: GMVLGO('G', omega, v_f, l, mu)) raises(ValueError, lambda: GMVLGO('G', omega, v, l_f, mu)) raises(ValueError, lambda: GMVLGO('G', omega, v, l, m_f)) raises(ValueError, lambda: GMVLGO('G', omega_f4, v, l, mu)) raises(ValueError, lambda: GMVLGO('G', omega, v, l_f1, mu)) raises(ValueError, lambda: GMVLGO('G', omega_f5, v, l_f5, mu_f5)) raises(ValueError, lambda: GMVLG('G', Rational(3, 2), v, l, mu)) def test_MultivariateBeta(): from sympy.stats.joint_rv_types import MultivariateBeta from sympy import gamma a1, a2 = symbols('a1, a2', positive=True) a1_f, a2_f = symbols('a1, a2', positive=False, real=True) mb = MultivariateBeta('B', [a1, a2]) mb_c = MultivariateBeta('C', a1, a2) assert density(mb)(1, 2) == S(2)(a2 - 1)gamma(a1 + a2)/\ (gamma(a1)gamma(a2)) assert marginal_distribution(mb_c, 0)(3) == S(3)*(a1 - 1)gamma(a1 + a2)/\ (a2gamma(a1)gamma(a2)) raises(ValueError, lambda: MultivariateBeta('b1', [a1_f, a2])) raises(ValueError, lambda: MultivariateBeta('b2', [a1, a2_f])) raises(ValueError, lambda: MultivariateBeta('b3', [0, 0])) raises(ValueError, lambda: MultivariateBeta('b4', [a1_f, a2_f])) def test_MultivariateEwens(): from sympy.stats.joint_rv_types import MultivariateEwens n, theta, i = symbols('n theta i', positive=True) # tests for integer dimensions theta_f = symbols('t_f', negative=True) a = symbols('a_1:4', positive = True, integer = True) ed = MultivariateEwens('E', 3, theta) assert density(ed)(a[0], a[1], a[2]) == Piecewise((62(-a[1])3*(-a[2]) theta*a[0]theta*a[1]theta*a[2]/ (theta(theta + 1)(theta + 2) factorial(a[0])factorial(a[1]) factorial(a[2])), Eq(a[0] + 2a[1] + 3a[2], 3)), (0, True)) assert marginal_distribution(ed, ed[1])(a[1]) == Piecewise((62(-a[1]) theta*a[1]/((theta + 1) (theta + 2)factorial(a[1])), Eq(2a[1] + 1, 3)), (0, True)) raises(ValueError, lambda: MultivariateEwens('e1', 5, theta_f)) # tests for symbolic dimensions eds = MultivariateEwens('E', n, theta) a = IndexedBase('a') j, k = symbols('j, k') den = Piecewise((factorial(n)Product(thetaa[j](j + 1)*(-a[j])/ factorial(a[j]), (j, 0, n - 1))/RisingFactorial(theta, n), Eq(n, Sum((k + 1)a[k], (k, 0, n - 1)))), (0, True)) assert density(eds)(a).dummy_eq(den) def test_Multinomial(): from sympy.stats.joint_rv_types import Multinomial n, x1, x2, x3, x4 = symbols('n, x1, x2, x3, x4', nonnegative=True, integer=True) p1, p2, p3, p4 = symbols('p1, p2, p3, p4', positive=True) p1_f, n_f = symbols('p1_f, n_f', negative=True) M = Multinomial('M', n, [p1, p2, p3, p4]) C = Multinomial('C', 3, p1, p2, p3) f = factorial assert density(M)(x1, x2, x3, x4) == Piecewise((p1*x1p2*x2p3*x3p4*x4 f(n)/(f(x1)f(x2)f(x3)f(x4)), Eq(n, x1 + x2 + x3 + x4)), (0, True)) assert marginal_distribution(C, C[0])(x1).subs(x1, 1) ==\ 3p1p22 +\ 6p1p2p3 +\ 3p1p32 raises(ValueError, lambda: Multinomial('b1', 5, [p1, p2, p3, p1_f])) raises(ValueError, lambda: Multinomial('b2', n_f, [p1, p2, p3, p4])) raises(ValueError, lambda: Multinomial('b3', n, 0.5, 0.4, 0.3, 0.1)) def test_NegativeMultinomial(): from sympy.stats.joint_rv_types import NegativeMultinomial k0, x1, x2, x3, x4 = symbols('k0, x1, x2, x3, x4', nonnegative=True, integer=True) p1, p2, p3, p4 = symbols('p1, p2, p3, p4', positive=True) p1_f = symbols('p1_f', negative=True) N = NegativeMultinomial('N', 4, [p1, p2, p3, p4]) C = NegativeMultinomial('C', 4, 0.1, 0.2, 0.3) g = gamma f = factorial assert simplify(density(N)(x1, x2, x3, x4) - p1x1p2x2p3*x3p4*x4(-p1 - p2 - p3 - p4 + 1)*4g(x1 + x2 + x3 + x4 + 4)/(6f(x1)f(x2)f(x3)f(x4))) == S(0) assert comp(marginal_distribution(C, C[0])(1).evalf(), 0.33, .01) raises(ValueError, lambda: NegativeMultinomial('b1', 5, [p1, p2, p3, p1_f])) raises(ValueError, lambda: NegativeMultinomial('b2', k0, 0.5, 0.4, 0.3, 0.4)) def test_JointPSpace_marginal_distribution(): from sympy.stats.joint_rv_types import MultivariateT from sympy import polar_lift T = MultivariateT('T', [0, 0], [[1, 0], [0, 1]], 2) assert marginal_distribution(T, T[1])(x) == sqrt(2)(x2 + 2)/( 8polar_lift(x2/2 + 1)(S(5)/2)) assert integrate(marginal_distribution(T, 1)(x), (x, -oo, oo)) == 1 t = MultivariateT('T', [0, 0, 0], [[1, 0, 0], [0, 1, 0], [0, 0, 1]], 3) assert comp(marginal_distribution(t, 0)(1).evalf(), 0.2, .01) def test_JointRV(): from sympy.stats.joint_rv import JointDistributionHandmade x1, x2 = (Indexed('x', i) for i in (1, 2)) pdf = exp(-x12/2 + x1 - x22/2 - S(1)/2)/(2pi) X = JointRV('x', pdf) assert density(X)(1, 2) == exp(-2)/(2pi) assert isinstance(X.pspace.distribution, JointDistributionHandmade) assert marginal_distribution(X, 0)(2) == sqrt(2)exp(-S(1)/2)/(2sqrt(pi)) def test_expectation(): from sympy import simplify from sympy.stats import E m = Normal('A', [x, y], [[1, 0], [0, 1]]) assert simplify(E(m[1])) == y @XFAIL def test_joint_vector_expectation(): from sympy.stats import E m = Normal('A', [x, y], [[1, 0], [0, 1]]) assert E(m) == (x, y)
017b0a5002dfda53f17054e80ba62c258a397f80863da56efbb540dafaa94f47	from sympy import (S, symbols, FiniteSet, Eq, Matrix, MatrixSymbol, Float, And, ImmutableMatrix, Ne, Lt, Gt, exp, Not) from sympy.stats import (DiscreteMarkovChain, P, TransitionMatrixOf, E, StochasticStateSpaceOf, variance, ContinuousMarkovChain) from sympy.stats.joint_rv import JointDistribution from sympy.stats.rv import RandomIndexedSymbol from sympy.stats.symbolic_probability import Probability, Expectation from sympy.utilities.pytest import raises def test_DiscreteMarkovChain(): # pass only the name X = DiscreteMarkovChain("X") assert X.state_space == S.Reals assert X.index_set == S.Naturals0 assert X.transition_probabilities == None t = symbols('t', positive=True, integer=True) assert isinstance(X[t], RandomIndexedSymbol) assert E(X[0]) == Expectation(X[0]) raises(TypeError, lambda: DiscreteMarkovChain(1)) raises(NotImplementedError, lambda: X(t)) # pass name and state_space Y = DiscreteMarkovChain("Y", [1, 2, 3]) assert Y.transition_probabilities == None assert Y.state_space == FiniteSet(1, 2, 3) assert P(Eq(Y[2], 1), Eq(Y[0], 2)) == Probability(Eq(Y[2], 1), Eq(Y[0], 2)) assert E(X[0]) == Expectation(X[0]) raises(TypeError, lambda: DiscreteMarkovChain("Y", dict((1, 1)))) # pass name, state_space and transition_probabilities T = Matrix([[0.5, 0.2, 0.3],[0.2, 0.5, 0.3],[0.2, 0.3, 0.5]]) TS = MatrixSymbol('T', 3, 3) Y = DiscreteMarkovChain("Y", [0, 1, 2], T) YS = DiscreteMarkovChain("Y", [0, 1, 2], TS) assert YS._transient2transient() == None assert YS._transient2absorbing() == None assert Y.joint_distribution(1, Y[2], 3) == JointDistribution(Y[1], Y[2], Y[3]) raises(ValueError, lambda: Y.joint_distribution(Y[1].symbol, Y[2].symbol)) assert P(Eq(Y[3], 2), Eq(Y[1], 1)).round(2) == Float(0.36, 2) assert str(P(Eq(YS[3], 2), Eq(YS[1], 1))) == \ "T[0, 2]T[1, 0] + T[1, 1]T[1, 2] + T[1, 2]T[2, 2]" assert P(Eq(YS[1], 1), Eq(YS[2], 2)) == Probability(Eq(YS[1], 1)) assert P(Eq(YS[3], 3), Eq(YS[1], 1)) == S.Zero TO = Matrix([[0.25, 0.75, 0],[0, 0.25, 0.75],[0.75, 0, 0.25]]) assert P(Eq(Y[3], 2), Eq(Y[1], 1) & TransitionMatrixOf(Y, TO)).round(3) == Float(0.375, 3) assert E(Y[3], evaluate=False) == Expectation(Y[3]) assert E(Y[3], Eq(Y[2], 1)).round(2) == Float(1.1, 3) TSO = MatrixSymbol('T', 4, 4) raises(ValueError, lambda: str(P(Eq(YS[3], 2), Eq(YS[1], 1) & TransitionMatrixOf(YS, TSO)))) raises(TypeError, lambda: DiscreteMarkovChain("Z", [0, 1, 2], symbols('M'))) raises(ValueError, lambda: DiscreteMarkovChain("Z", [0, 1, 2], MatrixSymbol('T', 3, 4))) raises(ValueError, lambda: E(Y[3], Eq(Y[2], 6))) raises(ValueError, lambda: E(Y[2], Eq(Y[3], 1))) # extended tests for probability queries TO1 = Matrix([[S(1)/4, S(3)/4, 0],[S(1)/3, S(1)/3, S(1)/3],[0, S(1)/4, S(3)/4]]) assert P(And(Eq(Y[2], 1), Eq(Y[1], 1), Eq(Y[0], 0)), Eq(Probability(Eq(Y[0], 0)), S(1)/4) & TransitionMatrixOf(Y, TO1)) == S(1)/16 assert P(And(Eq(Y[2], 1), Eq(Y[1], 1), Eq(Y[0], 0)), TransitionMatrixOf(Y, TO1)) == \ Probability(Eq(Y[0], 0))/4 assert P(Lt(X[1], 2) & Gt(X[1], 0), Eq(X[0], 2) & StochasticStateSpaceOf(X, [0, 1, 2]) & TransitionMatrixOf(X, TO1)) == S(1)/4 assert P(Ne(X[1], 2) & Ne(X[1], 1), Eq(X[0], 2) & StochasticStateSpaceOf(X, [0, 1, 2]) & TransitionMatrixOf(X, TO1)) == S(0) assert P(And(Eq(Y[2], 1), Eq(Y[1], 1), Eq(Y[0], 0)), Eq(Y[1], 1)) == 0.1Probability(Eq(Y[0], 0)) # testing properties of Markov chain TO2 = Matrix([[S(1), 0, 0],[S(1)/3, S(1)/3, S(1)/3],[0, S(1)/4, S(3)/4]]) TO3 = Matrix([[S(1)/4, S(3)/4, 0],[S(1)/3, S(1)/3, S(1)/3],[0, S(1)/4, S(3)/4]]) Y2 = DiscreteMarkovChain('Y', trans_probs=TO2) Y3 = DiscreteMarkovChain('Y', trans_probs=TO3) assert Y3._transient2absorbing() == None raises (ValueError, lambda: Y3.fundamental_matrix()) assert Y2.is_absorbing_chain() == True assert Y3.is_absorbing_chain() == False TO4 = Matrix([[S(1)/5, S(2)/5, S(2)/5], [S(1)/10, S(1)/2, S(2)/5], [S(3)/5, S(3)/10, S(1)/10]]) Y4 = DiscreteMarkovChain('Y', trans_probs=TO4) w = ImmutableMatrix([[S(11)/39, S(16)/39, S(4)/13]]) assert Y4.limiting_distribution == w assert Y4.is_regular() == True TS1 = MatrixSymbol('T', 3, 3) Y5 = DiscreteMarkovChain('Y', trans_probs=TS1) assert Y5.limiting_distribution(w, TO4).doit() == True TO6 = Matrix([[S(1), 0, 0, 0, 0],[S(1)/2, 0, S(1)/2, 0, 0],[0, S(1)/2, 0, S(1)/2, 0], [0, 0, S(1)/2, 0, S(1)/2], [0, 0, 0, 0, 1]]) Y6 = DiscreteMarkovChain('Y', trans_probs=TO6) assert Y6._transient2absorbing() == ImmutableMatrix([[S(1)/2, 0], [0, 0], [0, S(1)/2]]) assert Y6._transient2transient() == ImmutableMatrix([[0, S(1)/2, 0], [S(1)/2, 0, S(1)/2], [0, S(1)/2, 0]]) assert Y6.fundamental_matrix() == ImmutableMatrix([[S(3)/2, S(1), S(1)/2], [S(1), S(2), S(1)], [S(1)/2, S(1), S(3)/2]]) assert Y6.absorbing_probabilites() == ImmutableMatrix([[S(3)/4, S(1)/4], [S(1)/2, S(1)/2], [S(1)/4, S(3)/4]]) # testing miscellaneous queries T = Matrix([[S(1)/2, S(1)/4, S(1)/4], [S(1)/3, 0, S(2)/3], [S(1)/2, S(1)/2, 0]]) X = DiscreteMarkovChain('X', [0, 1, 2], T) assert P(Eq(X[1], 2) & Eq(X[2], 1) & Eq(X[3], 0), Eq(P(Eq(X[1], 0)), S(1)/4) & Eq(P(Eq(X[1], 1)), S(1)/4)) == S(1)/12 assert P(Eq(X[2], 1) \| Eq(X[2], 2), Eq(X[1], 1)) == S(2)/3 assert P(Eq(X[2], 1) & Eq(X[2], 2), Eq(X[1], 1)) == S(0) assert P(Ne(X[2], 2), Eq(X[1], 1)) == S(1)/3 assert E(X[1]*2, Eq(X[0], 1)) == S(8)/3 assert variance(X[1], Eq(X[0], 1)) == S(8)/9 raises(ValueError, lambda: E(X[1], Eq(X[2], 1))) def test_ContinuousMarkovChain(): T1 = Matrix([[S(-2), S(2), S(0)], [S(0), S(-1), S(1)], [S(3)/2, S(3)/2, S(-3)]]) C1 = ContinuousMarkovChain('C', [0, 1, 2], T1) assert C1.limiting_distribution() == ImmutableMatrix([[S(3)/19, S(12)/19, S(4)/19]]) T2 = Matrix([[-S(1), S(1), S(0)], [S(1), -S(1), S(0)], [S(0), S(1), -S(1)]]) C2 = ContinuousMarkovChain('C', [0, 1, 2], T2) A, t = C2.generator_matrix, symbols('t', positive=True) assert C2.transition_probabilities(A)(t) == Matrix([[S(1)/2 + exp(-2t)/2, S(1)/2 - exp(-2t)/2, 0], [S(1)/2 - exp(-2t)/2, S(1)/2 + exp(-2t)/2, 0], [S(1)/2 - exp(-t) + exp(-2t)/2, S(1)/2 - exp(-2t)/2, exp(-t)]]) assert P(Eq(C2(1), 1), Eq(C2(0), 1), evaluate=False) == Probability(Eq(C2(1), 1)) assert P(Eq(C2(1), 1), Eq(C2(0), 1)) == exp(-2)/2 + S(1)/2 assert P(Eq(C2(1), 0) & Eq(C2(2), 1) & Eq(C2(3), 1), Eq(P(Eq(C2(1), 0)), S(1)/2)) == (S(1)/4 - exp(-2)/4)(exp(-2)/2 + S(1)/2) assert P(Not(Eq(C2(1), 0) & Eq(C2(2), 1) & Eq(C2(3), 2)) \| (Eq(C2(1), 0) & Eq(C2(2), 1) & Eq(C2(3), 2)), Eq(P(Eq(C2(1), 0)), S(1)/4) & Eq(P(Eq(C2(1), 1)), S(1)/4)) == S(1) assert E(C2(S(3)/2), Eq(C2(0), 2)) == -exp(-3)/2 + 2exp(-S(3)/2) + S(1)/2 assert variance(C2(S(3)/2), Eq(C2(0), 1)) == ((S(1)/2 - exp(-3)/2)2(exp(-3)/2 + S(1)/2) + (-S(1)/2 - exp(-3)/2)*2(S(1)/2 - exp(-3)/2)) raises(KeyError, lambda: P(Eq(C2(1), 0), Eq(P(Eq(C2(1), 1)), S(1)/2))) assert P(Eq(C2(1), 0), Eq(P(Eq(C2(5), 1)), S(1)/2)) == Probability(Eq(C2(1), 0)) TS1 = MatrixSymbol('G', 3, 3) CS1 = ContinuousMarkovChain('C', [0, 1, 2], TS1) A = CS1.generator_matrix assert CS1.transition_probabilities(A)(t) == exp(t*A)
3ad31f23f63ab52cffbe02f7258697913c02ec753bc10d14fe01e4a303f7a7af	from sympy import (S, Symbol, Sum, I, lambdify, re, im, log, simplify, sqrt, zeta, pi, besseli) from sympy.core.relational import Eq, Ne from sympy.functions.elementary.exponential import exp from sympy.logic.boolalg import Or from sympy.sets.fancysets import Range from sympy.stats import (P, E, variance, density, characteristic_function, cdf, where, moment_generating_function, skewness) from sympy.stats.drv_types import (PoissonDistribution, GeometricDistribution, Poisson, Geometric, Logarithmic, NegativeBinomial, Skellam, YuleSimon, Zeta) from sympy.stats.rv import sample from sympy.utilities.pytest import slow, raises x = Symbol('x') def test_PoissonDistribution(): l = 3 p = PoissonDistribution(l) assert abs(p.cdf(10).evalf() - 1) < .001 assert p.expectation(x, x) == l assert p.expectation(x2, x) - p.expectation(x, x)2 == l def test_Poisson(): l = 3 x = Poisson('x', l) assert E(x) == l assert variance(x) == l assert density(x) == PoissonDistribution(l) assert isinstance(E(x, evaluate=False), Sum) assert isinstance(E(2x, evaluate=False), Sum) def test_GeometricDistribution(): p = S.One / 5 d = GeometricDistribution(p) assert d.expectation(x, x) == 1/p assert d.expectation(x2, x) - d.expectation(x, x)2 == (1-p)/p2 assert abs(d.cdf(20000).evalf() - 1) < .001 def test_Logarithmic(): p = S.One / 2 x = Logarithmic('x', p) assert E(x) == -p / ((1 - p) log(1 - p)) assert variance(x) == -1/log(2)*2 + 2/log(2) assert E(2x*2 + 3x + 4) == 4 + 7 / log(2) assert isinstance(E(x, evaluate=False), Sum) def test_negative_binomial(): r = 5 p = S(1) / 3 x = NegativeBinomial('x', r, p) assert E(x) == pr / (1-p) assert variance(x) == pr / (1-p)2 assert E(x5 + 2x + 3) == S(9207)/4 assert isinstance(E(x, evaluate=False), Sum) def test_skellam(): mu1 = Symbol('mu1') mu2 = Symbol('mu2') z = Symbol('z') X = Skellam('x', mu1, mu2) assert density(X)(z) == (mu1/mu2)(z/2) \ exp(-mu1 - mu2)besseli(z, 2sqrt(mu1mu2)) assert skewness(X).expand() == mu1/(mu1sqrt(mu1 + mu2) + mu2 * sqrt(mu1 + mu2)) - mu2/(mu1sqrt(mu1 + mu2) + mu2sqrt(mu1 + mu2)) assert variance(X).expand() == mu1 + mu2 assert E(X) == mu1 - mu2 assert characteristic_function(X)(z) == exp( mu1exp(Iz) - mu1 - mu2 + mu2exp(-Iz)) assert moment_generating_function(X)(z) == exp( mu1exp(z) - mu1 - mu2 + mu2exp(-z)) def test_yule_simon(): rho = S(3) x = YuleSimon('x', rho) assert simplify(E(x)) == rho / (rho - 1) assert simplify(variance(x)) == rho2 / ((rho - 1)2 * (rho - 2)) assert isinstance(E(x, evaluate=False), Sum) def test_zeta(): s = S(5) x = Zeta('x', s) assert E(x) == zeta(s-1) / zeta(s) assert simplify(variance(x)) == ( zeta(s) * zeta(s-2) - zeta(s-1)2) / zeta(s)2 @slow def test_sample_discrete(): X, Y, Z = Geometric('X', S(1)/2), Poisson('Y', 4), Poisson('Z', 1000) W = Poisson('W', S(1)/100) assert sample(X) in X.pspace.domain.set assert sample(Y) in Y.pspace.domain.set assert sample(Z) in Z.pspace.domain.set assert sample(W) in W.pspace.domain.set def test_discrete_probability(): X = Geometric('X', S(1)/5) Y = Poisson('Y', 4) G = Geometric('e', x) assert P(Eq(X, 3)) == S(16)/125 assert P(X < 3) == S(9)/25 assert P(X > 3) == S(64)/125 assert P(X >= 3) == S(16)/25 assert P(X <= 3) == S(61)/125 assert P(Ne(X, 3)) == S(109)/125 assert P(Eq(Y, 3)) == 32exp(-4)/3 assert P(Y < 3) == 13exp(-4) assert P(Y > 3).equals(32(-S(71)/32 + 3exp(4)/32)exp(-4)/3) assert P(Y >= 3).equals(32(-S(39)/32 + 3exp(4)/32)exp(-4)/3) assert P(Y <= 3) == 71exp(-4)/3 assert P(Ne(Y, 3)).equals( 13exp(-4) + 32(-S(71)/32 + 3exp(4)/32)exp(-4)/3) assert P(X < S.Infinity) is S.One assert P(X > S.Infinity) is S.Zero assert P(G < 3) == x(-x + 1) + x assert P(Eq(G, 3)) == x(-x + 1)2 def test_precomputed_characteristic_functions(): import mpmath def test_cf(dist, support_lower_limit, support_upper_limit): pdf = density(dist) t = S('t') x = S('x') # first function is the hardcoded CF of the distribution cf1 = lambdify([t], characteristic_function(dist)(t), 'mpmath') # second function is the Fourier transform of the density function f = lambdify([x, t], pdf(x)exp(Ixt), 'mpmath') cf2 = lambda t: mpmath.nsum(lambda x: f(x, t), [ support_lower_limit, support_upper_limit], maxdegree=10) # compare the two functions at various points for test_point in [2, 5, 8, 11]: n1 = cf1(test_point) n2 = cf2(test_point) assert abs(re(n1) - re(n2)) < 1e-12 assert abs(im(n1) - im(n2)) < 1e-12 test_cf(Geometric('g', S(1)/3), 1, mpmath.inf) test_cf(Logarithmic('l', S(1)/5), 1, mpmath.inf) test_cf(NegativeBinomial('n', 5, S(1)/7), 0, mpmath.inf) test_cf(Poisson('p', 5), 0, mpmath.inf) test_cf(YuleSimon('y', 5), 1, mpmath.inf) test_cf(Zeta('z', 5), 1, mpmath.inf) def test_moment_generating_functions(): t = S('t') geometric_mgf = moment_generating_function(Geometric('g', S(1)/2))(t) assert geometric_mgf.diff(t).subs(t, 0) == 2 logarithmic_mgf = moment_generating_function(Logarithmic('l', S(1)/2))(t) assert logarithmic_mgf.diff(t).subs(t, 0) == 1/log(2) negative_binomial_mgf = moment_generating_function( NegativeBinomial('n', 5, S(1)/3))(t) assert negative_binomial_mgf.diff(t).subs(t, 0) == S(5)/2 poisson_mgf = moment_generating_function(Poisson('p', 5))(t) assert poisson_mgf.diff(t).subs(t, 0) == 5 skellam_mgf = moment_generating_function(Skellam('s', 1, 1))(t) assert skellam_mgf.diff(t).subs( t, 2) == (-exp(-2) + exp(2))exp(-2 + exp(-2) + exp(2)) yule_simon_mgf = moment_generating_function(YuleSimon('y', 3))(t) assert simplify(yule_simon_mgf.diff(t).subs(t, 0)) == S(3)/2 zeta_mgf = moment_generating_function(Zeta('z', 5))(t) assert zeta_mgf.diff(t).subs(t, 0) == pi4/(90zeta(5)) def test_Or(): X = Geometric('X', S(1)/2) P(Or(X < 3, X > 4)) == S(13)/16 P(Or(X > 2, X > 1)) == P(X > 1) P(Or(X >= 3, X < 3)) == 1 def test_where(): X = Geometric('X', S(1)/5) Y = Poisson('Y', 4) assert where(X2 > 4).set == Range(3, S.Infinity, 1) assert where(X2 >= 4).set == Range(2, S.Infinity, 1) assert where(Y2 < 9).set == Range(0, 3, 1) assert where(Y2 <= 9).set == Range(0, 4, 1) def test_conditional(): X = Geometric('X', S(2)/3) Y = Poisson('Y', 3) assert P(X > 2, X > 3) == 1 assert P(X > 3, X > 2) == S(1)/3 assert P(Y > 2, Y < 2) == 0 assert P(Eq(Y, 3), Y >= 0) == 9exp(-3)/2 assert P(Eq(Y, 3), Eq(Y, 2)) == 0 assert P(X < 2, Eq(X, 2)) == 0 assert P(X > 2, Eq(X, 3)) == 1 def test_product_spaces(): X1 = Geometric('X1', S(1)/2) X2 = Geometric('X2', S(1)/3) assert str(P(X1 + X2 < 3, evaluate=False)) == """Sum(Piecewise((2(X2 - n - 2)(2/3)(X2 - 1)/6, """\ + """(-X2 + n + 3 >= 1) & (-X2 + n + 3 < oo)), (0, True)), (X2, 1, oo), (n, -oo, -1))""" assert str(P(X1 + X2 > 3)) == """Sum(Piecewise((2(X2 - n - 2)(2/3)(X2 - 1)/6, """ +\ """(-X2 + n + 3 >= 1) & (-X2 + n + 3 < oo)), (0, True)), (X2, 1, oo), (n, 1, oo))""" assert str(P(Eq(X1 + X2, 3))) == """Sum(Piecewise((2(X2 - 2)(2/3)**(X2 - 1)/6, """ +\ """X2 <= 2), (0, True)), (X2, 1, oo))"""

e2c4f7c26adcc5f150c067fec7389dcaf3f38769b7f861cf168ebb5698cf70d2

from sympy import Set, symbols, exp, log, S, Wild, Dummy, oo from sympy.core import Expr, Add from sympy.core.function import Lambda, _coeff_isneg, FunctionClass from sympy.core.mod import Mod from sympy.logic.boolalg import true from sympy.multipledispatch import dispatch from sympy.sets import (imageset, Interval, FiniteSet, Union, ImageSet, EmptySet, Intersection, Range) from sympy.sets.fancysets import Integers, Naturals, Reals _x, _y = symbols("x y") FunctionUnion = (FunctionClass, Lambda) @dispatch(FunctionClass, Set) def _set_function(f, x): return None @dispatch(FunctionUnion, FiniteSet) def _set_function(f, x): return FiniteSet(*map(f, x)) @dispatch(Lambda, Interval) def _set_function(f, x): from sympy.functions.elementary.miscellaneous import Min, Max from sympy.solvers.solveset import solveset from sympy.core.function import diff, Lambda from sympy.series import limit from sympy.calculus.singularities import singularities from sympy.sets import Complement # TODO: handle functions with infinitely many solutions (eg, sin, tan) # TODO: handle multivariate functions expr = f.expr if len(expr.free_symbols) > 1 or len(f.variables) != 1: return var = f.variables[0] if not var.is_real: if expr.subs(var, Dummy(real=True)).is_real is False: return if expr.is_Piecewise: result = S.EmptySet domain_set = x for (p_expr, p_cond) in expr.args: if p_cond is true: intrvl = domain_set else: intrvl = p_cond.as_set() intrvl = Intersection(domain_set, intrvl) if p_expr.is_Number: image = FiniteSet(p_expr) else: image = imageset(Lambda(var, p_expr), intrvl) result = Union(result, image) # remove the part which has been `imaged` domain_set = Complement(domain_set, intrvl) if domain_set is S.EmptySet: break return result if not x.start.is_comparable or not x.end.is_comparable: return try: sing = [i for i in singularities(expr, var) if i.is_real and i in x] except NotImplementedError: return if x.left_open: _start = limit(expr, var, x.start, dir="+") elif x.start not in sing: _start = f(x.start) if x.right_open: _end = limit(expr, var, x.end, dir="-") elif x.end not in sing: _end = f(x.end) if len(sing) == 0: solns = list(solveset(diff(expr, var), var)) extr = [_start, _end] + [f(i) for i in solns if i.is_real and i in x] start, end = Min(*extr), Max(*extr) left_open, right_open = False, False if _start <= _end: # the minimum or maximum value can occur simultaneously # on both the edge of the interval and in some interior # point if start == _start and start not in solns: left_open = x.left_open if end == _end and end not in solns: right_open = x.right_open else: if start == _end and start not in solns: left_open = x.right_open if end == _start and end not in solns: right_open = x.left_open return Interval(start, end, left_open, right_open) else: return imageset(f, Interval(x.start, sing[0], x.left_open, True)) + \ Union(*[imageset(f, Interval(sing[i], sing[i + 1], True, True)) for i in range(0, len(sing) - 1)]) + \ imageset(f, Interval(sing[-1], x.end, True, x.right_open)) @dispatch(FunctionClass, Interval) def _set_function(f, x): if f == exp: return Interval(exp(x.start), exp(x.end), x.left_open, x.right_open) elif f == log: return Interval(log(x.start), log(x.end), x.left_open, x.right_open) return ImageSet(Lambda(_x, f(_x)), x) @dispatch(FunctionUnion, Union) def _set_function(f, x): return Union(*(imageset(f, arg) for arg in x.args)) @dispatch(FunctionUnion, Intersection) def _set_function(f, x): from sympy.sets.sets import is_function_invertible_in_set # If the function is invertible, intersect the maps of the sets. if is_function_invertible_in_set(f, x): return Intersection(*(imageset(f, arg) for arg in x.args)) else: return ImageSet(Lambda(_x, f(_x)), x) @dispatch(FunctionUnion, EmptySet) def _set_function(f, x): return x @dispatch(FunctionUnion, Set) def _set_function(f, x): return ImageSet(Lambda(_x, f(_x)), x) @dispatch(FunctionUnion, Range) def _set_function(f, self): from sympy.core.function import expand_mul if not self: return S.EmptySet if not isinstance(f.expr, Expr): return if self.size == 1: return FiniteSet(f(self[0])) if f is S.IdentityFunction: return self x = f.variables[0] expr = f.expr # handle f that is linear in f's variable if x not in expr.free_symbols or x in expr.diff(x).free_symbols: return if self.start.is_finite: F = f(self.step*x + self.start) # for i in range(len(self)) else: F = f(-self.step*x + self[-1]) F = expand_mul(F) if F != expr: return imageset(x, F, Range(self.size)) @dispatch(FunctionUnion, Integers) def _set_function(f, self): expr = f.expr if not isinstance(expr, Expr): return n = f.variables[0] if expr == abs(n): return S.Naturals0 # f(x) + c and f(-x) + c cover the same integers # so choose the form that has the fewest negatives c = f(0) fx = f(n) - c f_x = f(-n) - c neg_count = lambda e: sum(_coeff_isneg(_) for _ in Add.make_args(e)) if neg_count(f_x) < neg_count(fx): expr = f_x + c a = Wild('a', exclude=[n]) b = Wild('b', exclude=[n]) match = expr.match(a*n + b) if match and match[a]: # canonical shift b = match[b] if abs(match[a]) == 1: nonint = [] for bi in Add.make_args(b): if not bi.is_integer: nonint.append(bi) b = Add(*nonint) if b.is_number and match[a].is_real: mod = b % match[a] reps = dict([(m, m.args[0]) for m in mod.atoms(Mod) if not m.args[0].is_real]) mod = mod.xreplace(reps) expr = match[a]*n + mod else: expr = match[a]*n + b if expr != f.expr: return ImageSet(Lambda(n, expr), S.Integers) @dispatch(FunctionUnion, Naturals) def _set_function(f, self): expr = f.expr if not isinstance(expr, Expr): return x = f.variables[0] if not expr.free_symbols - {x}: if expr == abs(x): if self is S.Naturals: return self return S.Naturals0 step = expr.coeff(x) c = expr.subs(x, 0) if c.is_Integer and step.is_Integer and expr == step*x + c: if self is S.Naturals: c += step if step > 0: if step == 1: if c == 0: return S.Naturals0 elif c == 1: return S.Naturals return Range(c, oo, step) return Range(c, -oo, step) @dispatch(FunctionUnion, Reals) def _set_function(f, self): expr = f.expr if not isinstance(expr, Expr): return return _set_function(f, Interval(-oo, oo))

78ace0808eae9e13b87c73244ef9294eabec296ef8a256519f73da76b42eabd9

from sympy.sets import (ConditionSet, Intersection, FiniteSet, EmptySet, Union) from sympy import (Symbol, Eq, S, Abs, sin, pi, Interval, And, Mod, oo, Function) from sympy.utilities.pytest import raises w = Symbol('w') x = Symbol('x') y = Symbol('y') z = Symbol('z') L = Symbol('lambda') f = Function('f') def test_CondSet(): sin_sols_principal = ConditionSet(x, Eq(sin(x), 0), Interval(0, 2*pi, False, True)) assert pi in sin_sols_principal assert pi/2 not in sin_sols_principal assert 3*pi not in sin_sols_principal assert 5 in ConditionSet(x, x**2 > 4, S.Reals) assert 1 not in ConditionSet(x, x**2 > 4, S.Reals) # in this case, 0 is not part of the base set so # it can't be in any subset selected by the condition assert 0 not in ConditionSet(x, y > 5, Interval(1, 7)) # since 'in' requires a true/false, the following raises # an error because the given value provides no information # for the condition to evaluate (since the condition does # not depend on the dummy symbol): the result is `y > 5`. # In this case, ConditionSet is just acting like # Piecewise((Interval(1, 7), y > 5), (S.EmptySet, True)). raises(TypeError, lambda: 6 in ConditionSet(x, y > 5, Interval(1, 7))) assert isinstance(ConditionSet(x, x < 1, {x, y}).base_set, FiniteSet) raises(TypeError, lambda: ConditionSet(x, x + 1, {x, y})) raises(TypeError, lambda: ConditionSet(x, x, 1)) I = S.Integers C = ConditionSet assert C(x, x < 1, C(x, x < 2, I) ) == C(x, (x < 1) & (x < 2), I) assert C(y, y < 1, C(x, y < 2, I) ) == C(x, (x < 1) & (y < 2), I) assert C(y, y < 1, C(x, x < 2, I) ) == C(y, (y < 1) & (y < 2), I) assert C(y, y < 1, C(x, y < x, I) ) == C(x, (x < 1) & (y < x), I) assert C(y, x < 1, C(x, y < x, I) ) == C(L, (x < 1) & (y < L), I) c = C(y, x < 1, C(x, L < y, I)) assert c == C(c.sym, (L < y) & (x < 1), I) assert c.sym not in (x, y, L) c = C(y, x < 1, C(x, y < x, FiniteSet(L))) assert c == C(L, And(x < 1, y < L), FiniteSet(L)) def test_CondSet_intersect(): input_conditionset = ConditionSet(x, x**2 > 4, Interval(1, 4, False, False)) other_domain = Interval(0, 3, False, False) output_conditionset = ConditionSet(x, x**2 > 4, Interval(1, 3, False, False)) assert Intersection(input_conditionset, other_domain) == output_conditionset def test_issue_9849(): assert ConditionSet(x, Eq(x, x), S.Naturals) == S.Naturals assert ConditionSet(x, Eq(Abs(sin(x)), -1), S.Naturals) == S.EmptySet def test_simplified_FiniteSet_in_CondSet(): assert ConditionSet(x, And(x < 1, x > -3), FiniteSet(0, 1, 2)) == FiniteSet(0) assert ConditionSet(x, x < 0, FiniteSet(0, 1, 2)) == EmptySet() assert ConditionSet(x, And(x < -3), EmptySet()) == EmptySet() y = Symbol('y') assert (ConditionSet(x, And(x > 0), FiniteSet(-1, 0, 1, y)) == Union(FiniteSet(1), ConditionSet(x, And(x > 0), FiniteSet(y)))) assert (ConditionSet(x, Eq(Mod(x, 3), 1), FiniteSet(1, 4, 2, y)) == Union(FiniteSet(1, 4), ConditionSet(x, Eq(Mod(x, 3), 1), FiniteSet(y)))) def test_free_symbols(): assert ConditionSet(x, Eq(y, 0), FiniteSet(z) ).free_symbols == {y, z} assert ConditionSet(x, Eq(x, 0), FiniteSet(z) ).free_symbols == {z} assert ConditionSet(x, Eq(x, 0), FiniteSet(x, z) ).free_symbols == {x, z} def test_subs_CondSet(): s = FiniteSet(z, y) c = ConditionSet(x, x < 2, s) # you can only replace sym with a symbol that is not in # the free symbols assert c.subs(x, 1) == c assert c.subs(x, y) == ConditionSet(y, y < 2, s) # double subs needed to change dummy if the base set # also contains the dummy orig = ConditionSet(y, y < 2, s) base = orig.subs(y, w) and_dummy = base.subs(y, w) assert base == ConditionSet(y, y < 2, {w, z}) assert and_dummy == ConditionSet(w, w < 2, {w, z}) assert c.subs(x, w) == ConditionSet(w, w < 2, s) assert ConditionSet(x, x < y, s ).subs(y, w) == ConditionSet(x, x < w, s.subs(y, w)) # if the user uses assumptions that cause the condition # to evaluate, that can't be helped from SymPy's end n = Symbol('n', negative=True) assert ConditionSet(n, 0 < n, S.Integers) is S.EmptySet p = Symbol('p', positive=True) assert ConditionSet(n, n < y, S.Integers ).subs(n, x) == ConditionSet(x, x < y, S.Integers) nc = Symbol('nc', commutative=False) raises(ValueError, lambda: ConditionSet( x, x < p, S.Integers).subs(x, nc)) raises(ValueError, lambda: ConditionSet( x, x < p, S.Integers).subs(x, n)) raises(ValueError, lambda: ConditionSet( x + 1, x < 1, S.Integers)) raises(ValueError, lambda: ConditionSet( x + 1, x < 1, s)) assert ConditionSet( n, n < x, Interval(0, oo)).subs(x, p) == Interval(0, oo) assert ConditionSet( n, n < x, Interval(-oo, 0)).subs(x, p) == S.EmptySet assert ConditionSet(f(x), f(x) < 1, {w, z} ).subs(f(x), y) == ConditionSet(y, y < 1, {w, z}) def test_subs_CondSet_tebr(): # to eventually be removed c = ConditionSet((x, y), {x + 1, x + y}, S.Reals) assert c.subs(x, z) == c def test_dummy_eq(): C = ConditionSet I = S.Integers c = C(x, x < 1, I) assert c.dummy_eq(C(y, y < 1, I)) assert c.dummy_eq(1) == False assert c.dummy_eq(C(x, x < 1, S.Reals)) == False raises(ValueError, lambda: c.dummy_eq(C(x, x < 1, S.Reals), z)) # to eventually be removed c1 = ConditionSet((x, y), {x + 1, x + y}, S.Reals) c2 = ConditionSet((x, y), {x + 1, x + y}, S.Reals) c3 = ConditionSet((x, y), {x + 1, x + y}, S.Complexes) assert c1.dummy_eq(c2) assert c1.dummy_eq(c3) is False assert c.dummy_eq(c1) is False assert c1.dummy_eq(c) is False def test_contains(): assert 6 in ConditionSet(x, x > 5, Interval(1, 7)) assert (8 in ConditionSet(x, y > 5, Interval(1, 7))) is False # `in` should give True or False; in this case there is not # enough information for that result raises(TypeError, lambda: 6 in ConditionSet(x, y > 5, Interval(1, 7))) assert ConditionSet(x, y > 5, Interval(1, 7) ).contains(6) == (y > 5) assert ConditionSet(x, y > 5, Interval(1, 7) ).contains(8) is S.false assert ConditionSet(x, y > 5, Interval(1, 7) ).contains(w) == And(S(1) <= w, w <= 7, y > 5) assert 0 not in ConditionSet(x, 1/x >= 0, S.Reals)

ccc0985c7b854ad91574b4a8541cde759a3afb8ebd7104ccec168618add5dd22

from sympy import Symbol, Contains, S, Interval, FiniteSet, oo, Eq from sympy.core.expr import unchanged from sympy.utilities.pytest import raises def test_contains_basic(): raises(TypeError, lambda: Contains(S.Integers, 1)) assert Contains(2, S.Integers) is S.true assert Contains(-2, S.Naturals) is S.false i = Symbol('i', integer=True) assert Contains(i, S.Naturals) == Contains(i, S.Naturals, evaluate=False) def test_issue_6194(): x = Symbol('x') assert unchanged(Contains, x, Interval(0, 1)) assert Interval(0, 1).contains(x) == (S(0) <= x) & (x <= 1) assert Contains(x, FiniteSet(0)) != S.false assert Contains(x, Interval(1, 1)) != S.false assert Contains(x, S.Integers) != S.false def test_issue_10326(): assert Contains(oo, Interval(-oo, oo)) == False assert Contains(-oo, Interval(-oo, oo)) == False def test_binary_symbols(): x = Symbol('x') y = Symbol('y') z = Symbol('z') assert Contains(x, FiniteSet(y, Eq(z, True)) ).binary_symbols == set([y, z]) def test_as_set(): x = Symbol('x') y = Symbol('y') # Contains is a BooleanFunction whose value depends on an arg's # containment in a Set -- rewriting as a Set is not yet implemented raises(NotImplementedError, lambda: Contains(x, FiniteSet(y)).as_set())

bbc6a908137e077a5cd03907b1f6ee6a8f638dc42c7fb19547d3b85141d347d3

from sympy.core.compatibility import range, PY3 from sympy.sets.fancysets import (ImageSet, Range, normalize_theta_set, ComplexRegion) from sympy.sets.sets import (FiniteSet, Interval, imageset, Union, Intersection, ProductSet, Contains) from sympy.simplify.simplify import simplify from sympy import (S, Symbol, Lambda, symbols, cos, sin, pi, oo, Basic, Rational, sqrt, tan, log, exp, Abs, I, Tuple, eye, Dummy, floor, And, Eq) from sympy.utilities.iterables import cartes from sympy.utilities.pytest import XFAIL, raises from sympy.abc import x, y, t import itertools def test_naturals(): N = S.Naturals assert 5 in N assert -5 not in N assert 5.5 not in N ni = iter(N) a, b, c, d = next(ni), next(ni), next(ni), next(ni) assert (a, b, c, d) == (1, 2, 3, 4) assert isinstance(a, Basic) assert N.intersect(Interval(-5, 5)) == Range(1, 6) assert N.intersect(Interval(-5, 5, True, True)) == Range(1, 5) assert N.boundary == N assert N.inf == 1 assert N.sup == oo assert not N.contains(oo) for s in (S.Naturals0, S.Naturals): assert s.intersection(S.Reals) is s assert s.is_subset(S.Reals) assert N.as_relational(x) == And(Eq(floor(x), x), x >= S.One, x < oo) def test_naturals0(): N = S.Naturals0 assert 0 in N assert -1 not in N assert next(iter(N)) == 0 assert not N.contains(oo) assert N.contains(sin(x)) == Contains(sin(x), N) def test_integers(): Z = S.Integers assert 5 in Z assert -5 in Z assert 5.5 not in Z assert not Z.contains(oo) assert not Z.contains(-oo) zi = iter(Z) a, b, c, d = next(zi), next(zi), next(zi), next(zi) assert (a, b, c, d) == (0, 1, -1, 2) assert isinstance(a, Basic) assert Z.intersect(Interval(-5, 5)) == Range(-5, 6) assert Z.intersect(Interval(-5, 5, True, True)) == Range(-4, 5) assert Z.intersect(Interval(5, S.Infinity)) == Range(5, S.Infinity) assert Z.intersect(Interval.Lopen(5, S.Infinity)) == Range(6, S.Infinity) assert Z.inf == -oo assert Z.sup == oo assert Z.boundary == Z assert Z.as_relational(x) == And(Eq(floor(x), x), -oo < x, x < oo) def test_ImageSet(): raises(ValueError, lambda: ImageSet(x, S.Integers)) assert ImageSet(Lambda(x, 1), S.Integers) == FiniteSet(1) assert ImageSet(Lambda(x, y), S.Integers ) == {y} squares = ImageSet(Lambda(x, x**2), S.Naturals) assert 4 in squares assert 5 not in squares assert FiniteSet(*range(10)).intersect(squares) == FiniteSet(1, 4, 9) assert 16 not in squares.intersect(Interval(0, 10)) si = iter(squares) a, b, c, d = next(si), next(si), next(si), next(si) assert (a, b, c, d) == (1, 4, 9, 16) harmonics = ImageSet(Lambda(x, 1/x), S.Naturals) assert Rational(1, 5) in harmonics assert Rational(.25) in harmonics assert 0.25 not in harmonics assert Rational(.3) not in harmonics assert (1, 2) not in harmonics assert harmonics.is_iterable assert imageset(x, -x, Interval(0, 1)) == Interval(-1, 0) assert ImageSet(Lambda(x, x**2), Interval(0, 2)).doit() == Interval(0, 4) c = ComplexRegion(Interval(1, 3)*Interval(1, 3)) assert Tuple(2, 6) in ImageSet(Lambda((x, y), (x, 2*y)), c) assert Tuple(2, S.Half) in ImageSet(Lambda((x, y), (x, 1/y)), c) assert Tuple(2, -2) not in ImageSet(Lambda((x, y), (x, y**2)), c) assert Tuple(2, -2) in ImageSet(Lambda((x, y), (x, -2)), c) c3 = Interval(3, 7)*Interval(8, 11)*Interval(5, 9) assert Tuple(8, 3, 9) in ImageSet(Lambda((t, y, x), (y, t, x)), c3) assert Tuple(S(1)/8, 3, 9) in ImageSet(Lambda((t, y, x), (1/y, t, x)), c3) assert 2/pi not in ImageSet(Lambda((x, y), 2/x), c) assert 2/S(100) not in ImageSet(Lambda((x, y), 2/x), c) assert 2/S(3) in ImageSet(Lambda((x, y), 2/x), c) assert imageset(lambda x, y: x + y, S.Integers, S.Naturals ).base_set == ProductSet(S.Integers, S.Naturals) def test_image_is_ImageSet(): assert isinstance(imageset(x, sqrt(sin(x)), Range(5)), ImageSet) def test_halfcircle(): # This test sometimes works and sometimes doesn't. # It may be an issue with solve? Maybe with using Lambdas/dummys? # I believe the code within fancysets is correct r, th = symbols('r, theta', real=True) L = Lambda((r, th), (r*cos(th), r*sin(th))) halfcircle = ImageSet(L, Interval(0, 1)*Interval(0, pi)) assert (r, 0) in halfcircle assert (1, 0) in halfcircle assert (0, -1) not in halfcircle assert (r, 2*pi) not in halfcircle assert (0, 0) in halfcircle assert not halfcircle.is_iterable def test_ImageSet_iterator_not_injective(): L = Lambda(x, x - x % 2) # produces 0, 2, 2, 4, 4, 6, 6, ... evens = ImageSet(L, S.Naturals) i = iter(evens) # No repeats here assert (next(i), next(i), next(i), next(i)) == (0, 2, 4, 6) def test_inf_Range_len(): raises(ValueError, lambda: len(Range(0, oo, 2))) assert Range(0, oo, 2).size is S.Infinity assert Range(0, -oo, -2).size is S.Infinity assert Range(oo, 0, -2).size is S.Infinity assert Range(-oo, 0, 2).size is S.Infinity def test_Range_set(): empty = Range(0) assert Range(5) == Range(0, 5) == Range(0, 5, 1) r = Range(10, 20, 2) assert 12 in r assert 8 not in r assert 11 not in r assert 30 not in r assert list(Range(0, 5)) == list(range(5)) assert list(Range(5, 0, -1)) == list(range(5, 0, -1)) assert Range(5, 15).sup == 14 assert Range(5, 15).inf == 5 assert Range(15, 5, -1).sup == 15 assert Range(15, 5, -1).inf == 6 assert Range(10, 67, 10).sup == 60 assert Range(60, 7, -10).inf == 10 assert len(Range(10, 38, 10)) == 3 assert Range(0, 0, 5) == empty assert Range(oo, oo, 1) == empty assert Range(oo, 1, 1) == empty assert Range(-oo, 1, -1) == empty assert Range(1, oo, -1) == empty assert Range(1, -oo, 1) == empty raises(ValueError, lambda: Range(1, 4, oo)) raises(ValueError, lambda: Range(-oo, oo)) raises(ValueError, lambda: Range(oo, -oo, -1)) raises(ValueError, lambda: Range(-oo, oo, 2)) raises(ValueError, lambda: Range(0, pi, 1)) raises(ValueError, lambda: Range(1, 10, 0)) assert 5 in Range(0, oo, 5) assert -5 in Range(-oo, 0, 5) assert oo not in Range(0, oo) ni = symbols('ni', integer=False) assert ni not in Range(oo) u = symbols('u', integer=None) assert Range(oo).contains(u) is not False inf = symbols('inf', infinite=True) assert inf not in Range(oo) inf = symbols('inf', infinite=True) assert inf not in Range(oo) assert Range(0, oo, 2)[-1] == oo assert Range(-oo, 1, 1)[-1] is S.Zero assert Range(oo, 1, -1)[-1] == 2 assert Range(0, -oo, -2)[-1] == -oo assert Range(1, 10, 1)[-1] == 9 assert all(i.is_Integer for i in Range(0, -1, 1)) it = iter(Range(-oo, 0, 2)) raises(ValueError, lambda: next(it)) assert empty.intersect(S.Integers) == empty assert Range(-1, 10, 1).intersect(S.Integers) == Range(-1, 10, 1) assert Range(-1, 10, 1).intersect(S.Naturals) == Range(1, 10, 1) assert Range(-1, 10, 1).intersect(S.Naturals0) == Range(0, 10, 1) # test slicing assert Range(1, 10, 1)[5] == 6 assert Range(1, 12, 2)[5] == 11 assert Range(1, 10, 1)[-1] == 9 assert Range(1, 10, 3)[-1] == 7 raises(ValueError, lambda: Range(oo,0,-1)[1:3:0]) raises(ValueError, lambda: Range(oo,0,-1)[:1]) raises(ValueError, lambda: Range(1, oo)[-2]) raises(ValueError, lambda: Range(-oo, 1)[2]) raises(IndexError, lambda: Range(10)[-20]) raises(IndexError, lambda: Range(10)[20]) raises(ValueError, lambda: Range(2, -oo, -2)[2:2:0]) assert Range(2, -oo, -2)[2:2:2] == empty assert Range(2, -oo, -2)[:2:2] == Range(2, -2, -4) raises(ValueError, lambda: Range(-oo, 4, 2)[:2:2]) assert Range(-oo, 4, 2)[::-2] == Range(2, -oo, -4) raises(ValueError, lambda: Range(-oo, 4, 2)[::2]) assert Range(oo, 2, -2)[::] == Range(oo, 2, -2) assert Range(-oo, 4, 2)[:-2:-2] == Range(2, 0, -4) assert Range(-oo, 4, 2)[:-2:2] == Range(-oo, 0, 4) raises(ValueError, lambda: Range(-oo, 4, 2)[:0:-2]) raises(ValueError, lambda: Range(-oo, 4, 2)[:2:-2]) assert Range(-oo, 4, 2)[-2::-2] == Range(0, -oo, -4) raises(ValueError, lambda: Range(-oo, 4, 2)[-2:0:-2]) raises(ValueError, lambda: Range(-oo, 4, 2)[0::2]) assert Range(oo, 2, -2)[0::] == Range(oo, 2, -2) raises(ValueError, lambda: Range(-oo, 4, 2)[0:-2:2]) assert Range(oo, 2, -2)[0:-2:] == Range(oo, 6, -2) raises(ValueError, lambda: Range(oo, 2, -2)[0:2:]) raises(ValueError, lambda: Range(-oo, 4, 2)[2::-1]) assert Range(-oo, 4, 2)[-2::2] == Range(0, 4, 4) assert Range(oo, 0, -2)[-10:0:2] == empty raises(ValueError, lambda: Range(oo, 0, -2)[-10:10:2]) raises(ValueError, lambda: Range(oo, 0, -2)[0::-2]) assert Range(oo, 0, -2)[0:-4:-2] == empty assert Range(oo, 0, -2)[:0:2] == empty raises(ValueError, lambda: Range(oo, 0, -2)[:1:-1]) # test empty Range assert empty.reversed == empty assert 0 not in empty assert list(empty) == [] assert len(empty) == 0 assert empty.size is S.Zero assert empty.intersect(FiniteSet(0)) is S.EmptySet assert bool(empty) is False raises(IndexError, lambda: empty[0]) assert empty[:0] == empty raises(NotImplementedError, lambda: empty.inf) raises(NotImplementedError, lambda: empty.sup) AB = [None] + list(range(12)) for R in [ Range(1, 10), Range(1, 10, 2), ]: r = list(R) for a, b, c in cartes(AB, AB, [-3, -1, None, 1, 3]): for reverse in range(2): r = list(reversed(r)) R = R.reversed result = list(R[a:b:c]) ans = r[a:b:c] txt = ('\n%s[%s:%s:%s] = %s -> %s' % ( R, a, b, c, result, ans)) check = ans == result assert check, txt assert Range(1, 10, 1).boundary == Range(1, 10, 1) for r in (Range(1, 10, 2), Range(1, oo, 2)): rev = r.reversed assert r.inf == rev.inf and r.sup == rev.sup assert r.step == -rev.step # Make sure to use range in Python 3 and xrange in Python 2 (regardless of # compatibility imports above) if PY3: builtin_range = range else: builtin_range = xrange assert Range(builtin_range(10)) == Range(10) assert Range(builtin_range(1, 10)) == Range(1, 10) assert Range(builtin_range(1, 10, 2)) == Range(1, 10, 2) if PY3: assert Range(builtin_range(1000000000000)) == \ Range(1000000000000) def test_range_range_intersection(): for a, b, r in [ (Range(0), Range(1), S.EmptySet), (Range(3), Range(4, oo), S.EmptySet), (Range(3), Range(-3, -1), S.EmptySet), (Range(1, 3), Range(0, 3), Range(1, 3)), (Range(1, 3), Range(1, 4), Range(1, 3)), (Range(1, oo, 2), Range(2, oo, 2), S.EmptySet), (Range(0, oo, 2), Range(oo), Range(0, oo, 2)), (Range(0, oo, 2), Range(100), Range(0, 100, 2)), (Range(2, oo, 2), Range(oo), Range(2, oo, 2)), (Range(0, oo, 2), Range(5, 6), S.EmptySet), (Range(2, 80, 1), Range(55, 71, 4), Range(55, 71, 4)), (Range(0, 6, 3), Range(-oo, 5, 3), S.EmptySet), (Range(0, oo, 2), Range(5, oo, 3), Range(8, oo, 6)), (Range(4, 6, 2), Range(2, 16, 7), S.EmptySet),]: assert a.intersect(b) == r assert a.intersect(b.reversed) == r assert a.reversed.intersect(b) == r assert a.reversed.intersect(b.reversed) == r a, b = b, a assert a.intersect(b) == r assert a.intersect(b.reversed) == r assert a.reversed.intersect(b) == r assert a.reversed.intersect(b.reversed) == r def test_range_interval_intersection(): p = symbols('p', positive=True) assert isinstance(Range(3).intersect(Interval(p, p + 2)), Intersection) assert Range(4).intersect(Interval(0, 3)) == Range(4) assert Range(4).intersect(Interval(-oo, oo)) == Range(4) assert Range(4).intersect(Interval(1, oo)) == Range(1, 4) assert Range(4).intersect(Interval(1.1, oo)) == Range(2, 4) assert Range(4).intersect(Interval(0.1, 3)) == Range(1, 4) assert Range(4).intersect(Interval(0.1, 3.1)) == Range(1, 4) assert Range(4).intersect(Interval.open(0, 3)) == Range(1, 3) assert Range(4).intersect(Interval.open(0.1, 0.5)) is S.EmptySet # Null Range intersections assert Range(0).intersect(Interval(0.2, 0.8)) is S.EmptySet assert Range(0).intersect(Interval(-oo, oo)) is S.EmptySet def test_Integers_eval_imageset(): ans = ImageSet(Lambda(x, 2*x + S(3)/7), S.Integers) im = imageset(Lambda(x, -2*x + S(3)/7), S.Integers) assert im == ans im = imageset(Lambda(x, -2*x - S(11)/7), S.Integers) assert im == ans y = Symbol('y') L = imageset(x, 2*x + y, S.Integers) assert y + 4 in L _x = symbols('x', negative=True) eq = _x**2 - _x + 1 assert imageset(_x, eq, S.Integers).lamda.expr == _x**2 + _x + 1 eq = 3*_x - 1 assert imageset(_x, eq, S.Integers).lamda.expr == 3*_x + 2 assert imageset(x, (x, 1/x), S.Integers) == \ ImageSet(Lambda(x, (x, 1/x)), S.Integers) def test_Range_eval_imageset(): a, b, c = symbols('a b c') assert imageset(x, a*(x + b) + c, Range(3)) == \ imageset(x, a*x + a*b + c, Range(3)) eq = (x + 1)**2 assert imageset(x, eq, Range(3)).lamda.expr == eq eq = a*(x + b) + c r = Range(3, -3, -2) imset = imageset(x, eq, r) assert imset.lamda.expr != eq assert list(imset) == [eq.subs(x, i).expand() for i in list(r)] def test_fun(): assert (FiniteSet(*ImageSet(Lambda(x, sin(pi*x/4)), Range(-10, 11))) == FiniteSet(-1, -sqrt(2)/2, 0, sqrt(2)/2, 1)) def test_Reals(): assert 5 in S.Reals assert S.Pi in S.Reals assert -sqrt(2) in S.Reals assert (2, 5) not in S.Reals assert sqrt(-1) not in S.Reals assert S.Reals == Interval(-oo, oo) assert S.Reals != Interval(0, oo) assert S.Reals.is_subset(Interval(-oo, oo)) def test_Complex(): assert 5 in S.Complexes assert 5 + 4*I in S.Complexes assert S.Pi in S.Complexes assert -sqrt(2) in S.Complexes assert -I in S.Complexes assert sqrt(-1) in S.Complexes assert S.Complexes.intersect(S.Reals) == S.Reals assert S.Complexes.union(S.Reals) == S.Complexes assert S.Complexes == ComplexRegion(S.Reals*S.Reals) assert (S.Complexes == ComplexRegion(Interval(1, 2)*Interval(3, 4))) == False assert str(S.Complexes) == "S.Complexes" assert repr(S.Complexes) == "S.Complexes" def take(n, iterable): "Return first n items of the iterable as a list" return list(itertools.islice(iterable, n)) def test_intersections(): assert S.Integers.intersect(S.Reals) == S.Integers assert 5 in S.Integers.intersect(S.Reals) assert 5 in S.Integers.intersect(S.Reals) assert -5 not in S.Naturals.intersect(S.Reals) assert 5.5 not in S.Integers.intersect(S.Reals) assert 5 in S.Integers.intersect(Interval(3, oo)) assert -5 in S.Integers.intersect(Interval(-oo, 3)) assert all(x.is_Integer for x in take(10, S.Integers.intersect(Interval(3, oo)) )) def test_infinitely_indexed_set_1(): from sympy.abc import n, m, t assert imageset(Lambda(n, n), S.Integers) == imageset(Lambda(m, m), S.Integers) assert imageset(Lambda(n, 2*n), S.Integers).intersect( imageset(Lambda(m, 2*m + 1), S.Integers)) is S.EmptySet assert imageset(Lambda(n, 2*n), S.Integers).intersect( imageset(Lambda(n, 2*n + 1), S.Integers)) is S.EmptySet assert imageset(Lambda(m, 2*m), S.Integers).intersect( imageset(Lambda(n, 3*n), S.Integers)) == \ ImageSet(Lambda(t, 6*t), S.Integers) assert imageset(x, x/2 + S(1)/3, S.Integers).intersect(S.Integers) is S.EmptySet assert imageset(x, x/2 + S.Half, S.Integers).intersect(S.Integers) is S.Integers def test_infinitely_indexed_set_2(): from sympy.abc import n a = Symbol('a', integer=True) assert imageset(Lambda(n, n), S.Integers) == \ imageset(Lambda(n, n + a), S.Integers) assert imageset(Lambda(n, n + pi), S.Integers) == \ imageset(Lambda(n, n + a + pi), S.Integers) assert imageset(Lambda(n, n), S.Integers) == \ imageset(Lambda(n, -n + a), S.Integers) assert imageset(Lambda(n, -6*n), S.Integers) == \ ImageSet(Lambda(n, 6*n), S.Integers) assert imageset(Lambda(n, 2*n + pi), S.Integers) == \ ImageSet(Lambda(n, 2*n + pi - 2), S.Integers) def test_imageset_intersect_real(): from sympy import I from sympy.abc import n assert imageset(Lambda(n, n + (n - 1)*(n + 1)*I), S.Integers).intersect(S.Reals) == \ FiniteSet(-1, 1) s = ImageSet( Lambda(n, -I*(I*(2*pi*n - pi/4) + log(Abs(sqrt(-I))))), S.Integers) # s is unevaluated, but after intersection the result # should be canonical assert s.intersect(S.Reals) == imageset( Lambda(n, 2*n*pi - pi/4), S.Integers) == ImageSet( Lambda(n, 2*pi*n + 7*pi/4), S.Integers) def test_imageset_intersect_interval(): from sympy.abc import n f1 = ImageSet(Lambda(n, n*pi), S.Integers) f2 = ImageSet(Lambda(n, 2*n), Interval(0, pi)) f3 = ImageSet(Lambda(n, 2*n*pi + pi/2), S.Integers) # complex expressions f4 = ImageSet(Lambda(n, n*I*pi), S.Integers) f5 = ImageSet(Lambda(n, 2*I*n*pi + pi/2), S.Integers) # non-linear expressions f6 = ImageSet(Lambda(n, log(n)), S.Integers) f7 = ImageSet(Lambda(n, n**2), S.Integers) f8 = ImageSet(Lambda(n, Abs(n)), S.Integers) f9 = ImageSet(Lambda(n, exp(n)), S.Naturals0) assert f1.intersect(Interval(-1, 1)) == FiniteSet(0) assert f1.intersect(Interval(0, 2*pi, False, True)) == FiniteSet(0, pi) assert f2.intersect(Interval(1, 2)) == Interval(1, 2) assert f3.intersect(Interval(-1, 1)) == S.EmptySet assert f3.intersect(Interval(-5, 5)) == FiniteSet(-3*pi/2, pi/2) assert f4.intersect(Interval(-1, 1)) == FiniteSet(0) assert f4.intersect(Interval(1, 2)) == S.EmptySet assert f5.intersect(Interval(0, 1)) == S.EmptySet assert f6.intersect(Interval(0, 1)) == FiniteSet(S.Zero, log(2)) assert f7.intersect(Interval(0, 10)) == Intersection(f7, Interval(0, 10)) assert f8.intersect(Interval(0, 2)) == Intersection(f8, Interval(0, 2)) assert f9.intersect(Interval(1, 2)) == Intersection(f9, Interval(1, 2)) def test_infinitely_indexed_set_3(): from sympy.abc import n, m, t assert imageset(Lambda(m, 2*pi*m), S.Integers).intersect( imageset(Lambda(n, 3*pi*n), S.Integers)) == \ ImageSet(Lambda(t, 6*pi*t), S.Integers) assert imageset(Lambda(n, 2*n + 1), S.Integers) == \ imageset(Lambda(n, 2*n - 1), S.Integers) assert imageset(Lambda(n, 3*n + 2), S.Integers) == \ imageset(Lambda(n, 3*n - 1), S.Integers) def test_ImageSet_simplification(): from sympy.abc import n, m assert imageset(Lambda(n, n), S.Integers) == S.Integers assert imageset(Lambda(n, sin(n)), imageset(Lambda(m, tan(m)), S.Integers)) == \ imageset(Lambda(m, sin(tan(m))), S.Integers) assert imageset(n, 1 + 2*n, S.Naturals) == Range(3, oo, 2) assert imageset(n, 1 + 2*n, S.Naturals0) == Range(1, oo, 2) assert imageset(n, 1 - 2*n, S.Naturals) == Range(-1, -oo, -2) def test_ImageSet_contains(): from sympy.abc import x assert (2, S.Half) in imageset(x, (x, 1/x), S.Integers) assert imageset(x, x + I*3, S.Integers).intersection(S.Reals) is S.EmptySet i = Dummy(integer=True) q = imageset(x, x + I*y, S.Integers).intersection(S.Reals) assert q.subs(y, I*i).intersection(S.Integers) is S.Integers q = imageset(x, x + I*y/x, S.Integers).intersection(S.Reals) assert q.subs(y, 0) is S.Integers assert q.subs(y, I*i*x).intersection(S.Integers) is S.Integers z = cos(1)**2 + sin(1)**2 - 1 q = imageset(x, x + I*z, S.Integers).intersection(S.Reals) assert q is not S.EmptySet def test_ComplexRegion_contains(): # contains in ComplexRegion a = Interval(2, 3) b = Interval(4, 6) c = Interval(7, 9) c1 = ComplexRegion(a*b) c2 = ComplexRegion(Union(a*b, c*a)) assert 2.5 + 4.5*I in c1 assert 2 + 4*I in c1 assert 3 + 4*I in c1 assert 8 + 2.5*I in c2 assert 2.5 + 6.1*I not in c1 assert 4.5 + 3.2*I not in c1 r1 = Interval(0, 1) theta1 = Interval(0, 2*S.Pi) c3 = ComplexRegion(r1*theta1, polar=True) assert (0.5 + 6*I/10) in c3 assert (S.Half + 6*I/10) in c3 assert (S.Half + .6*I) in c3 assert (0.5 + .6*I) in c3 assert I in c3 assert 1 in c3 assert 0 in c3 assert 1 + I not in c3 assert 1 - I not in c3 raises(ValueError, lambda: ComplexRegion(r1*theta1, polar=2)) def test_ComplexRegion_intersect(): # Polar form X_axis = ComplexRegion(Interval(0, oo)*FiniteSet(0, S.Pi), polar=True) unit_disk = ComplexRegion(Interval(0, 1)*Interval(0, 2*S.Pi), polar=True) upper_half_unit_disk = ComplexRegion(Interval(0, 1)*Interval(0, S.Pi), polar=True) upper_half_disk = ComplexRegion(Interval(0, oo)*Interval(0, S.Pi), polar=True) lower_half_disk = ComplexRegion(Interval(0, oo)*Interval(S.Pi, 2*S.Pi), polar=True) right_half_disk = ComplexRegion(Interval(0, oo)*Interval(-S.Pi/2, S.Pi/2), polar=True) first_quad_disk = ComplexRegion(Interval(0, oo)*Interval(0, S.Pi/2), polar=True) assert upper_half_disk.intersect(unit_disk) == upper_half_unit_disk assert right_half_disk.intersect(first_quad_disk) == first_quad_disk assert upper_half_disk.intersect(right_half_disk) == first_quad_disk assert upper_half_disk.intersect(lower_half_disk) == X_axis c1 = ComplexRegion(Interval(0, 4)*Interval(0, 2*S.Pi), polar=True) assert c1.intersect(Interval(1, 5)) == Interval(1, 4) assert c1.intersect(Interval(4, 9)) == FiniteSet(4) assert c1.intersect(Interval(5, 12)) is S.EmptySet # Rectangular form X_axis = ComplexRegion(Interval(-oo, oo)*FiniteSet(0)) unit_square = ComplexRegion(Interval(-1, 1)*Interval(-1, 1)) upper_half_unit_square = ComplexRegion(Interval(-1, 1)*Interval(0, 1)) upper_half_plane = ComplexRegion(Interval(-oo, oo)*Interval(0, oo)) lower_half_plane = ComplexRegion(Interval(-oo, oo)*Interval(-oo, 0)) right_half_plane = ComplexRegion(Interval(0, oo)*Interval(-oo, oo)) first_quad_plane = ComplexRegion(Interval(0, oo)*Interval(0, oo)) assert upper_half_plane.intersect(unit_square) == upper_half_unit_square assert right_half_plane.intersect(first_quad_plane) == first_quad_plane assert upper_half_plane.intersect(right_half_plane) == first_quad_plane assert upper_half_plane.intersect(lower_half_plane) == X_axis c1 = ComplexRegion(Interval(-5, 5)*Interval(-10, 10)) assert c1.intersect(Interval(2, 7)) == Interval(2, 5) assert c1.intersect(Interval(5, 7)) == FiniteSet(5) assert c1.intersect(Interval(6, 9)) is S.EmptySet # unevaluated object C1 = ComplexRegion(Interval(0, 1)*Interval(0, 2*S.Pi), polar=True) C2 = ComplexRegion(Interval(-1, 1)*Interval(-1, 1)) assert C1.intersect(C2) == Intersection(C1, C2, evaluate=False) def test_ComplexRegion_union(): # Polar form c1 = ComplexRegion(Interval(0, 1)*Interval(0, 2*S.Pi), polar=True) c2 = ComplexRegion(Interval(0, 1)*Interval(0, S.Pi), polar=True) c3 = ComplexRegion(Interval(0, oo)*Interval(0, S.Pi), polar=True) c4 = ComplexRegion(Interval(0, oo)*Interval(S.Pi, 2*S.Pi), polar=True) p1 = Union(Interval(0, 1)*Interval(0, 2*S.Pi), Interval(0, 1)*Interval(0, S.Pi)) p2 = Union(Interval(0, oo)*Interval(0, S.Pi), Interval(0, oo)*Interval(S.Pi, 2*S.Pi)) assert c1.union(c2) == ComplexRegion(p1, polar=True) assert c3.union(c4) == ComplexRegion(p2, polar=True) # Rectangular form c5 = ComplexRegion(Interval(2, 5)*Interval(6, 9)) c6 = ComplexRegion(Interval(4, 6)*Interval(10, 12)) c7 = ComplexRegion(Interval(0, 10)*Interval(-10, 0)) c8 = ComplexRegion(Interval(12, 16)*Interval(14, 20)) p3 = Union(Interval(2, 5)*Interval(6, 9), Interval(4, 6)*Interval(10, 12)) p4 = Union(Interval(0, 10)*Interval(-10, 0), Interval(12, 16)*Interval(14, 20)) assert c5.union(c6) == ComplexRegion(p3) assert c7.union(c8) == ComplexRegion(p4) assert c1.union(Interval(2, 4)) == Union(c1, Interval(2, 4), evaluate=False) assert c5.union(Interval(2, 4)) == Union(c5, ComplexRegion.from_real(Interval(2, 4))) def test_ComplexRegion_from_real(): c1 = ComplexRegion(Interval(0, 1) * Interval(0, 2 * S.Pi), polar=True) raises(ValueError, lambda: c1.from_real(c1)) assert c1.from_real(Interval(-1, 1)) == ComplexRegion(Interval(-1, 1) * FiniteSet(0), False) def test_ComplexRegion_measure(): a, b = Interval(2, 5), Interval(4, 8) theta1, theta2 = Interval(0, 2*S.Pi), Interval(0, S.Pi) c1 = ComplexRegion(a*b) c2 = ComplexRegion(Union(a*theta1, b*theta2), polar=True) assert c1.measure == 12 assert c2.measure == 9*pi def test_normalize_theta_set(): # Interval assert normalize_theta_set(Interval(pi, 2*pi)) == \ Union(FiniteSet(0), Interval.Ropen(pi, 2*pi)) assert normalize_theta_set(Interval(9*pi/2, 5*pi)) == Interval(pi/2, pi) assert normalize_theta_set(Interval(-3*pi/2, pi/2)) == Interval.Ropen(0, 2*pi) assert normalize_theta_set(Interval.open(-3*pi/2, pi/2)) == \ Union(Interval.Ropen(0, pi/2), Interval.open(pi/2, 2*pi)) assert normalize_theta_set(Interval.open(-7*pi/2, -3*pi/2)) == \ Union(Interval.Ropen(0, pi/2), Interval.open(pi/2, 2*pi)) assert normalize_theta_set(Interval(-pi/2, pi/2)) == \ Union(Interval(0, pi/2), Interval.Ropen(3*pi/2, 2*pi)) assert normalize_theta_set(Interval.open(-pi/2, pi/2)) == \ Union(Interval.Ropen(0, pi/2), Interval.open(3*pi/2, 2*pi)) assert normalize_theta_set(Interval(-4*pi, 3*pi)) == Interval.Ropen(0, 2*pi) assert normalize_theta_set(Interval(-3*pi/2, -pi/2)) == Interval(pi/2, 3*pi/2) assert normalize_theta_set(Interval.open(0, 2*pi)) == Interval.open(0, 2*pi) assert normalize_theta_set(Interval.Ropen(-pi/2, pi/2)) == \ Union(Interval.Ropen(0, pi/2), Interval.Ropen(3*pi/2, 2*pi)) assert normalize_theta_set(Interval.Lopen(-pi/2, pi/2)) == \ Union(Interval(0, pi/2), Interval.open(3*pi/2, 2*pi)) assert normalize_theta_set(Interval(-pi/2, pi/2)) == \ Union(Interval(0, pi/2), Interval.Ropen(3*pi/2, 2*pi)) assert normalize_theta_set(Interval.open(4*pi, 9*pi/2)) == Interval.open(0, pi/2) assert normalize_theta_set(Interval.Lopen(4*pi, 9*pi/2)) == Interval.Lopen(0, pi/2) assert normalize_theta_set(Interval.Ropen(4*pi, 9*pi/2)) == Interval.Ropen(0, pi/2) assert normalize_theta_set(Interval.open(3*pi, 5*pi)) == \ Union(Interval.Ropen(0, pi), Interval.open(pi, 2*pi)) # FiniteSet assert normalize_theta_set(FiniteSet(0, pi, 3*pi)) == FiniteSet(0, pi) assert normalize_theta_set(FiniteSet(0, pi/2, pi, 2*pi)) == FiniteSet(0, pi/2, pi) assert normalize_theta_set(FiniteSet(0, -pi/2, -pi, -2*pi)) == FiniteSet(0, pi, 3*pi/2) assert normalize_theta_set(FiniteSet(-3*pi/2, pi/2)) == \ FiniteSet(pi/2) assert normalize_theta_set(FiniteSet(2*pi)) == FiniteSet(0) # Unions assert normalize_theta_set(Union(Interval(0, pi/3), Interval(pi/2, pi))) == \ Union(Interval(0, pi/3), Interval(pi/2, pi)) assert normalize_theta_set(Union(Interval(0, pi), Interval(2*pi, 7*pi/3))) == \ Interval(0, pi) # ValueError for non-real sets raises(ValueError, lambda: normalize_theta_set(S.Complexes)) # NotImplementedError for subset of reals raises(NotImplementedError, lambda: normalize_theta_set(Interval(0, 1))) # NotImplementedError without pi as coefficient raises(NotImplementedError, lambda: normalize_theta_set(Interval(1, 2*pi))) raises(NotImplementedError, lambda: normalize_theta_set(Interval(2*pi, 10))) raises(NotImplementedError, lambda: normalize_theta_set(FiniteSet(0, 3, 3*pi))) def test_ComplexRegion_FiniteSet(): x, y, z, a, b, c = symbols('x y z a b c') # Issue #9669 assert ComplexRegion(FiniteSet(a, b, c)*FiniteSet(x, y, z)) == \ FiniteSet(a + I*x, a + I*y, a + I*z, b + I*x, b + I*y, b + I*z, c + I*x, c + I*y, c + I*z) assert ComplexRegion(FiniteSet(2)*FiniteSet(3)) == FiniteSet(2 + 3*I) def test_union_RealSubSet(): assert (S.Complexes).union(Interval(1, 2)) == S.Complexes assert (S.Complexes).union(S.Integers) == S.Complexes def test_issue_9980(): c1 = ComplexRegion(Interval(1, 2)*Interval(2, 3)) c2 = ComplexRegion(Interval(1, 5)*Interval(1, 3)) R = Union(c1, c2) assert simplify(R) == ComplexRegion(Union(Interval(1, 2)*Interval(2, 3), \ Interval(1, 5)*Interval(1, 3)), False) assert c1.func(*c1.args) == c1 assert R.func(*R.args) == R def test_issue_11732(): interval12 = Interval(1, 2) finiteset1234 = FiniteSet(1, 2, 3, 4) pointComplex = Tuple(1, 5) assert (interval12 in S.Naturals) == False assert (interval12 in S.Naturals0) == False assert (interval12 in S.Integers) == False assert (interval12 in S.Complexes) == False assert (finiteset1234 in S.Naturals) == False assert (finiteset1234 in S.Naturals0) == False assert (finiteset1234 in S.Integers) == False assert (finiteset1234 in S.Complexes) == False assert (pointComplex in S.Naturals) == False assert (pointComplex in S.Naturals0) == False assert (pointComplex in S.Integers) == False assert (pointComplex in S.Complexes) == True def test_issue_11730(): unit = Interval(0, 1) square = ComplexRegion(unit ** 2) assert Union(S.Complexes, FiniteSet(oo)) != S.Complexes assert Union(S.Complexes, FiniteSet(eye(4))) != S.Complexes assert Union(unit, square) == square assert Intersection(S.Reals, square) == unit def test_issue_11938(): unit = Interval(0, 1) ival = Interval(1, 2) cr1 = ComplexRegion(ival * unit) assert Intersection(cr1, S.Reals) == ival assert Intersection(cr1, unit) == FiniteSet(1) arg1 = Interval(0, S.Pi) arg2 = FiniteSet(S.Pi) arg3 = Interval(S.Pi / 4, 3 * S.Pi / 4) cp1 = ComplexRegion(unit * arg1, polar=True) cp2 = ComplexRegion(unit * arg2, polar=True) cp3 = ComplexRegion(unit * arg3, polar=True) assert Intersection(cp1, S.Reals) == Interval(-1, 1) assert Intersection(cp2, S.Reals) == Interval(-1, 0) assert Intersection(cp3, S.Reals) == FiniteSet(0) def test_issue_11914(): a, b = Interval(0, 1), Interval(0, pi) c, d = Interval(2, 3), Interval(pi, 3 * pi / 2) cp1 = ComplexRegion(a * b, polar=True) cp2 = ComplexRegion(c * d, polar=True) assert -3 in cp1.union(cp2) assert -3 in cp2.union(cp1) assert -5 not in cp1.union(cp2) def test_issue_9543(): assert ImageSet(Lambda(x, x**2), S.Naturals).is_subset(S.Reals) def test_issue_16871(): assert ImageSet(Lambda(x, x), FiniteSet(1)) == {1} assert ImageSet(Lambda(x, x - 3), S.Integers ).intersection(S.Integers) is S.Integers @XFAIL def test_issue_16871b(): assert ImageSet(Lambda(x, x - 3), S.Integers).is_subset(S.Integers) def test_no_mod_on_imaginary(): assert imageset(Lambda(x, 2*x + 3*I), S.Integers ) == ImageSet(Lambda(x, 2*x + I), S.Integers) def test_Rationals(): assert S.Integers.is_subset(S.Rationals) assert S.Naturals.is_subset(S.Rationals) assert S.Naturals0.is_subset(S.Rationals) assert S.Rationals.is_subset(S.Reals) assert S.Rationals.inf == -oo assert S.Rationals.sup == oo it = iter(S.Rationals) assert [next(it) for i in range(12)] == [ 0, 1, -1, S(1)/2, 2, -S(1)/2, -2, S(1)/3, 3, -S(1)/3, -3, S(2)/3] assert Basic() not in S.Rationals assert S.Half in S.Rationals assert 1.0 not in S.Rationals assert 2 in S.Rationals r = symbols('r', rational=True) assert r in S.Rationals raises(TypeError, lambda: x in S.Rationals) assert S.Rationals.boundary == S.Rationals def test_imageset_intersection(): n = Dummy() s = ImageSet(Lambda(n, -I*(I*(2*pi*n - pi/4) + log(Abs(sqrt(-I))))), S.Integers) assert s.intersect(S.Reals) == ImageSet( Lambda(n, 2*pi*n + 7*pi/4), S.Integers)

2898ca6fca9cb0173636ff60887c10335c1920d0410ccf775ffc4e962f270f00

from sympy import (Symbol, Set, Union, Interval, oo, S, sympify, nan, GreaterThan, LessThan, Max, Min, And, Or, Eq, Ge, Le, Gt, Lt, Float, FiniteSet, Intersection, imageset, I, true, false, ProductSet, E, sqrt, Complement, EmptySet, sin, cos, Lambda, ImageSet, pi, Eq, Pow, Contains, Sum, rootof, SymmetricDifference, Piecewise, Matrix, signsimp, Range, Add, symbols, zoo) from mpmath import mpi from sympy.core.compatibility import range from sympy.utilities.pytest import raises, XFAIL from sympy.abc import x, y, z, m, n def test_imageset(): ints = S.Integers assert imageset(x, x - 1, S.Naturals) is S.Naturals0 assert imageset(x, x + 1, S.Naturals0) is S.Naturals assert imageset(x, abs(x), S.Naturals0) is S.Naturals0 assert imageset(x, abs(x), S.Naturals) is S.Naturals assert imageset(x, abs(x), S.Integers) is S.Naturals0 # issue 16878a r = symbols('r', real=True) assert (1, r) in imageset(x, (x, x), S.Reals) != False assert (r, r) in imageset(x, (x, x), S.Reals) assert 1 + I in imageset(x, x + I, S.Reals) assert {1} not in imageset(x, (x,), S.Reals) assert (1, 1) not in imageset(x, (x,) , S.Reals) raises(TypeError, lambda: imageset(x, ints)) raises(ValueError, lambda: imageset(x, y, z, ints)) raises(ValueError, lambda: imageset(Lambda(x, cos(x)), y)) raises(ValueError, lambda: imageset(Lambda(x, x), ints, ints)) assert imageset(cos, ints) == ImageSet(Lambda(x, cos(x)), ints) def f(x): return cos(x) assert imageset(f, ints) == imageset(x, cos(x), ints) f = lambda x: cos(x) assert imageset(f, ints) == ImageSet(Lambda(x, cos(x)), ints) assert imageset(x, 1, ints) == FiniteSet(1) assert imageset(x, y, ints) == {y} assert imageset((x, y), (1, z), ints*S.Reals) == {(1, z)} clash = Symbol('x', integer=true) assert (str(imageset(lambda x: x + clash, Interval(-2, 1)).lamda.expr) in ('_x + x', 'x + _x')) x1, x2 = symbols("x1, x2") assert imageset(lambda x,y: Add(x,y), Interval(1,2), Interval(2, 3)) == \ ImageSet(Lambda((x1, x2), x1+x2), Interval(1,2), Interval(2,3)) def test_interval_arguments(): assert Interval(0, oo) == Interval(0, oo, False, True) assert Interval(0, oo).right_open is true assert Interval(-oo, 0) == Interval(-oo, 0, True, False) assert Interval(-oo, 0).left_open is true assert Interval(oo, -oo) == S.EmptySet assert Interval(oo, oo) == S.EmptySet assert Interval(-oo, -oo) == S.EmptySet assert isinstance(Interval(1, 1), FiniteSet) e = Sum(x, (x, 1, 3)) assert isinstance(Interval(e, e), FiniteSet) assert Interval(1, 0) == S.EmptySet assert Interval(1, 1).measure == 0 assert Interval(1, 1, False, True) == S.EmptySet assert Interval(1, 1, True, False) == S.EmptySet assert Interval(1, 1, True, True) == S.EmptySet assert isinstance(Interval(0, Symbol('a')), Interval) assert Interval(Symbol('a', real=True, positive=True), 0) == S.EmptySet raises(ValueError, lambda: Interval(0, S.ImaginaryUnit)) raises(ValueError, lambda: Interval(0, Symbol('z', extended_real=False))) raises(NotImplementedError, lambda: Interval(0, 1, And(x, y))) raises(NotImplementedError, lambda: Interval(0, 1, False, And(x, y))) raises(NotImplementedError, lambda: Interval(0, 1, z, And(x, y))) def test_interval_symbolic_end_points(): a = Symbol('a', real=True) assert Union(Interval(0, a), Interval(0, 3)).sup == Max(a, 3) assert Union(Interval(a, 0), Interval(-3, 0)).inf == Min(-3, a) assert Interval(0, a).contains(1) == LessThan(1, a) def test_union(): assert Union(Interval(1, 2), Interval(2, 3)) == Interval(1, 3) assert Union(Interval(1, 2), Interval(2, 3, True)) == Interval(1, 3) assert Union(Interval(1, 3), Interval(2, 4)) == Interval(1, 4) assert Union(Interval(1, 2), Interval(1, 3)) == Interval(1, 3) assert Union(Interval(1, 3), Interval(1, 2)) == Interval(1, 3) assert Union(Interval(1, 3, False, True), Interval(1, 2)) == \ Interval(1, 3, False, True) assert Union(Interval(1, 3), Interval(1, 2, False, True)) == Interval(1, 3) assert Union(Interval(1, 2, True), Interval(1, 3)) == Interval(1, 3) assert Union(Interval(1, 2, True), Interval(1, 3, True)) == \ Interval(1, 3, True) assert Union(Interval(1, 2, True), Interval(1, 3, True, True)) == \ Interval(1, 3, True, True) assert Union(Interval(1, 2, True, True), Interval(1, 3, True)) == \ Interval(1, 3, True) assert Union(Interval(1, 3), Interval(2, 3)) == Interval(1, 3) assert Union(Interval(1, 3, False, True), Interval(2, 3)) == \ Interval(1, 3) assert Union(Interval(1, 2, False, True), Interval(2, 3, True)) != \ Interval(1, 3) assert Union(Interval(1, 2), S.EmptySet) == Interval(1, 2) assert Union(S.EmptySet) == S.EmptySet assert Union(Interval(0, 1), *[FiniteSet(1.0/n) for n in range(1, 10)]) == \ Interval(0, 1) assert Interval(1, 2).union(Interval(2, 3)) == \ Interval(1, 2) + Interval(2, 3) assert Interval(1, 2).union(Interval(2, 3)) == Interval(1, 3) assert Union(Set()) == Set() assert FiniteSet(1) + FiniteSet(2) + FiniteSet(3) == FiniteSet(1, 2, 3) assert FiniteSet('ham') + FiniteSet('eggs') == FiniteSet('ham', 'eggs') assert FiniteSet(1, 2, 3) + S.EmptySet == FiniteSet(1, 2, 3) assert FiniteSet(1, 2, 3) & FiniteSet(2, 3, 4) == FiniteSet(2, 3) assert FiniteSet(1, 2, 3) | FiniteSet(2, 3, 4) == FiniteSet(1, 2, 3, 4) x = Symbol("x") y = Symbol("y") z = Symbol("z") assert S.EmptySet | FiniteSet(x, FiniteSet(y, z)) == \ FiniteSet(x, FiniteSet(y, z)) # Test that Intervals and FiniteSets play nicely assert Interval(1, 3) + FiniteSet(2) == Interval(1, 3) assert Interval(1, 3, True, True) + FiniteSet(3) == \ Interval(1, 3, True, False) X = Interval(1, 3) + FiniteSet(5) Y = Interval(1, 2) + FiniteSet(3) XandY = X.intersect(Y) assert 2 in X and 3 in X and 3 in XandY assert XandY.is_subset(X) and XandY.is_subset(Y) raises(TypeError, lambda: Union(1, 2, 3)) assert X.is_iterable is False # issue 7843 assert Union(S.EmptySet, FiniteSet(-sqrt(-I), sqrt(-I))) == \ FiniteSet(-sqrt(-I), sqrt(-I)) assert Union(S.Reals, S.Integers) == S.Reals def test_union_iter(): # Use Range because it is ordered u = Union(Range(3), Range(5), Range(4), evaluate=False) # Round robin assert list(u) == [0, 0, 0, 1, 1, 1, 2, 2, 2, 3, 3, 4] def test_difference(): assert Interval(1, 3) - Interval(1, 2) == Interval(2, 3, True) assert Interval(1, 3) - Interval(2, 3) == Interval(1, 2, False, True) assert Interval(1, 3, True) - Interval(2, 3) == Interval(1, 2, True, True) assert Interval(1, 3, True) - Interval(2, 3, True) == \ Interval(1, 2, True, False) assert Interval(0, 2) - FiniteSet(1) == \ Union(Interval(0, 1, False, True), Interval(1, 2, True, False)) assert FiniteSet(1, 2, 3) - FiniteSet(2) == FiniteSet(1, 3) assert FiniteSet('ham', 'eggs') - FiniteSet('eggs') == FiniteSet('ham') assert FiniteSet(1, 2, 3, 4) - Interval(2, 10, True, False) == \ FiniteSet(1, 2) assert FiniteSet(1, 2, 3, 4) - S.EmptySet == FiniteSet(1, 2, 3, 4) assert Union(Interval(0, 2), FiniteSet(2, 3, 4)) - Interval(1, 3) == \ Union(Interval(0, 1, False, True), FiniteSet(4)) assert -1 in S.Reals - S.Naturals def test_Complement(): assert Complement(Interval(1, 3), Interval(1, 2)) == Interval(2, 3, True) assert Complement(FiniteSet(1, 3, 4), FiniteSet(3, 4)) == FiniteSet(1) assert Complement(Union(Interval(0, 2), FiniteSet(2, 3, 4)), Interval(1, 3)) == \ Union(Interval(0, 1, False, True), FiniteSet(4)) assert not 3 in Complement(Interval(0, 5), Interval(1, 4), evaluate=False) assert -1 in Complement(S.Reals, S.Naturals, evaluate=False) assert not 1 in Complement(S.Reals, S.Naturals, evaluate=False) assert Complement(S.Integers, S.UniversalSet) == EmptySet() assert S.UniversalSet.complement(S.Integers) == EmptySet() assert (not 0 in S.Reals.intersect(S.Integers - FiniteSet(0))) assert S.EmptySet - S.Integers == S.EmptySet assert (S.Integers - FiniteSet(0)) - FiniteSet(1) == S.Integers - FiniteSet(0, 1) assert S.Reals - Union(S.Naturals, FiniteSet(pi)) == \ Intersection(S.Reals - S.Naturals, S.Reals - FiniteSet(pi)) # issue 12712 assert Complement(FiniteSet(x, y, 2), Interval(-10, 10)) == \ Complement(FiniteSet(x, y), Interval(-10, 10)) def test_complement(): assert Interval(0, 1).complement(S.Reals) == \ Union(Interval(-oo, 0, True, True), Interval(1, oo, True, True)) assert Interval(0, 1, True, False).complement(S.Reals) == \ Union(Interval(-oo, 0, True, False), Interval(1, oo, True, True)) assert Interval(0, 1, False, True).complement(S.Reals) == \ Union(Interval(-oo, 0, True, True), Interval(1, oo, False, True)) assert Interval(0, 1, True, True).complement(S.Reals) == \ Union(Interval(-oo, 0, True, False), Interval(1, oo, False, True)) assert S.UniversalSet.complement(S.EmptySet) == S.EmptySet assert S.UniversalSet.complement(S.Reals) == S.EmptySet assert S.UniversalSet.complement(S.UniversalSet) == S.EmptySet assert S.EmptySet.complement(S.Reals) == S.Reals assert Union(Interval(0, 1), Interval(2, 3)).complement(S.Reals) == \ Union(Interval(-oo, 0, True, True), Interval(1, 2, True, True), Interval(3, oo, True, True)) assert FiniteSet(0).complement(S.Reals) == \ Union(Interval(-oo, 0, True, True), Interval(0, oo, True, True)) assert (FiniteSet(5) + Interval(S.NegativeInfinity, 0)).complement(S.Reals) == \ Interval(0, 5, True, True) + Interval(5, S.Infinity, True, True) assert FiniteSet(1, 2, 3).complement(S.Reals) == \ Interval(S.NegativeInfinity, 1, True, True) + \ Interval(1, 2, True, True) + Interval(2, 3, True, True) +\ Interval(3, S.Infinity, True, True) assert FiniteSet(x).complement(S.Reals) == Complement(S.Reals, FiniteSet(x)) assert FiniteSet(0, x).complement(S.Reals) == Complement(Interval(-oo, 0, True, True) + Interval(0, oo, True, True) ,FiniteSet(x), evaluate=False) square = Interval(0, 1) * Interval(0, 1) notsquare = square.complement(S.Reals*S.Reals) assert all(pt in square for pt in [(0, 0), (.5, .5), (1, 0), (1, 1)]) assert not any( pt in notsquare for pt in [(0, 0), (.5, .5), (1, 0), (1, 1)]) assert not any(pt in square for pt in [(-1, 0), (1.5, .5), (10, 10)]) assert all(pt in notsquare for pt in [(-1, 0), (1.5, .5), (10, 10)]) def test_intersect1(): assert all(S.Integers.intersection(i) is i for i in (S.Naturals, S.Naturals0)) assert all(i.intersection(S.Integers) is i for i in (S.Naturals, S.Naturals0)) s = S.Naturals0 assert S.Naturals.intersection(s) is S.Naturals assert s.intersection(S.Naturals) is S.Naturals x = Symbol('x') assert Interval(0, 2).intersect(Interval(1, 2)) == Interval(1, 2) assert Interval(0, 2).intersect(Interval(1, 2, True)) == \ Interval(1, 2, True) assert Interval(0, 2, True).intersect(Interval(1, 2)) == \ Interval(1, 2, False, False) assert Interval(0, 2, True, True).intersect(Interval(1, 2)) == \ Interval(1, 2, False, True) assert Interval(0, 2).intersect(Union(Interval(0, 1), Interval(2, 3))) == \ Union(Interval(0, 1), Interval(2, 2)) assert FiniteSet(1, 2).intersect(FiniteSet(1, 2, 3)) == FiniteSet(1, 2) assert FiniteSet(1, 2, x).intersect(FiniteSet(x)) == FiniteSet(x) assert FiniteSet('ham', 'eggs').intersect(FiniteSet('ham')) == \ FiniteSet('ham') assert FiniteSet(1, 2, 3, 4, 5).intersect(S.EmptySet) == S.EmptySet assert Interval(0, 5).intersect(FiniteSet(1, 3)) == FiniteSet(1, 3) assert Interval(0, 1, True, True).intersect(FiniteSet(1)) == S.EmptySet assert Union(Interval(0, 1), Interval(2, 3)).intersect(Interval(1, 2)) == \ Union(Interval(1, 1), Interval(2, 2)) assert Union(Interval(0, 1), Interval(2, 3)).intersect(Interval(0, 2)) == \ Union(Interval(0, 1), Interval(2, 2)) assert Union(Interval(0, 1), Interval(2, 3)).intersect(Interval(1, 2, True, True)) == \ S.EmptySet assert Union(Interval(0, 1), Interval(2, 3)).intersect(S.EmptySet) == \ S.EmptySet assert Union(Interval(0, 5), FiniteSet('ham')).intersect(FiniteSet(2, 3, 4, 5, 6)) == \ Union(FiniteSet(2, 3, 4, 5), Intersection(FiniteSet(6), Union(Interval(0, 5), FiniteSet('ham')))) # issue 8217 assert Intersection(FiniteSet(x), FiniteSet(y)) == \ Intersection(FiniteSet(x), FiniteSet(y), evaluate=False) assert FiniteSet(x).intersect(S.Reals) == \ Intersection(S.Reals, FiniteSet(x), evaluate=False) # tests for the intersection alias assert Interval(0, 5).intersection(FiniteSet(1, 3)) == FiniteSet(1, 3) assert Interval(0, 1, True, True).intersection(FiniteSet(1)) == S.EmptySet assert Union(Interval(0, 1), Interval(2, 3)).intersection(Interval(1, 2)) == \ Union(Interval(1, 1), Interval(2, 2)) def test_intersection(): # iterable i = Intersection(FiniteSet(1, 2, 3), Interval(2, 5), evaluate=False) assert i.is_iterable assert set(i) == {S(2), S(3)} # challenging intervals x = Symbol('x', real=True) i = Intersection(Interval(0, 3), Interval(x, 6)) assert (5 in i) is False raises(TypeError, lambda: 2 in i) # Singleton special cases assert Intersection(Interval(0, 1), S.EmptySet) == S.EmptySet assert Intersection(Interval(-oo, oo), Interval(-oo, x)) == Interval(-oo, x) # Products line = Interval(0, 5) i = Intersection(line**2, line**3, evaluate=False) assert (2, 2) not in i assert (2, 2, 2) not in i raises(ValueError, lambda: list(i)) a = Intersection(Intersection(S.Integers, S.Naturals, evaluate=False), S.Reals, evaluate=False) assert a._argset == frozenset([Intersection(S.Naturals, S.Integers, evaluate=False), S.Reals]) assert Intersection(S.Complexes, FiniteSet(S.ComplexInfinity)) == S.EmptySet # issue 12178 assert Intersection() == S.UniversalSet # issue 16987 assert Intersection({1}, {1}, {x}) == Intersection({1}, {x}) def test_issue_9623(): n = Symbol('n') a = S.Reals b = Interval(0, oo) c = FiniteSet(n) assert Intersection(a, b, c) == Intersection(b, c) assert Intersection(Interval(1, 2), Interval(3, 4), FiniteSet(n)) == EmptySet() def test_is_disjoint(): assert Interval(0, 2).is_disjoint(Interval(1, 2)) == False assert Interval(0, 2).is_disjoint(Interval(3, 4)) == True def test_ProductSet_of_single_arg_is_arg(): assert ProductSet(Interval(0, 1)) == Interval(0, 1) def test_interval_subs(): a = Symbol('a', real=True) assert Interval(0, a).subs(a, 2) == Interval(0, 2) assert Interval(a, 0).subs(a, 2) == S.EmptySet def test_interval_to_mpi(): assert Interval(0, 1).to_mpi() == mpi(0, 1) assert Interval(0, 1, True, False).to_mpi() == mpi(0, 1) assert type(Interval(0, 1).to_mpi()) == type(mpi(0, 1)) def test_measure(): a = Symbol('a', real=True) assert Interval(1, 3).measure == 2 assert Interval(0, a).measure == a assert Interval(1, a).measure == a - 1 assert Union(Interval(1, 2), Interval(3, 4)).measure == 2 assert Union(Interval(1, 2), Interval(3, 4), FiniteSet(5, 6, 7)).measure \ == 2 assert FiniteSet(1, 2, oo, a, -oo, -5).measure == 0 assert S.EmptySet.measure == 0 square = Interval(0, 10) * Interval(0, 10) offsetsquare = Interval(5, 15) * Interval(5, 15) band = Interval(-oo, oo) * Interval(2, 4) assert square.measure == offsetsquare.measure == 100 assert (square + offsetsquare).measure == 175 # there is some overlap assert (square - offsetsquare).measure == 75 assert (square * FiniteSet(1, 2, 3)).measure == 0 assert (square.intersect(band)).measure == 20 assert (square + band).measure == oo assert (band * FiniteSet(1, 2, 3)).measure == nan def test_is_subset(): assert Interval(0, 1).is_subset(Interval(0, 2)) is True assert Interval(0, 3).is_subset(Interval(0, 2)) is False assert FiniteSet(1, 2).is_subset(FiniteSet(1, 2, 3, 4)) assert FiniteSet(4, 5).is_subset(FiniteSet(1, 2, 3, 4)) is False assert FiniteSet(1).is_subset(Interval(0, 2)) assert FiniteSet(1, 2).is_subset(Interval(0, 2, True, True)) is False assert (Interval(1, 2) + FiniteSet(3)).is_subset( (Interval(0, 2, False, True) + FiniteSet(2, 3))) assert Interval(3, 4).is_subset(Union(Interval(0, 1), Interval(2, 5))) is True assert Interval(3, 6).is_subset(Union(Interval(0, 1), Interval(2, 5))) is False assert FiniteSet(1, 2, 3, 4).is_subset(Interval(0, 5)) is True assert S.EmptySet.is_subset(FiniteSet(1, 2, 3)) is True assert Interval(0, 1).is_subset(S.EmptySet) is False assert S.EmptySet.is_subset(S.EmptySet) is True raises(ValueError, lambda: S.EmptySet.is_subset(1)) # tests for the issubset alias assert FiniteSet(1, 2, 3, 4).issubset(Interval(0, 5)) is True assert S.EmptySet.issubset(FiniteSet(1, 2, 3)) is True assert S.Naturals.is_subset(S.Integers) assert S.Naturals0.is_subset(S.Integers) def test_is_proper_subset(): assert Interval(0, 1).is_proper_subset(Interval(0, 2)) is True assert Interval(0, 3).is_proper_subset(Interval(0, 2)) is False assert S.EmptySet.is_proper_subset(FiniteSet(1, 2, 3)) is True raises(ValueError, lambda: Interval(0, 1).is_proper_subset(0)) def test_is_superset(): assert Interval(0, 1).is_superset(Interval(0, 2)) == False assert Interval(0, 3).is_superset(Interval(0, 2)) assert FiniteSet(1, 2).is_superset(FiniteSet(1, 2, 3, 4)) == False assert FiniteSet(4, 5).is_superset(FiniteSet(1, 2, 3, 4)) == False assert FiniteSet(1).is_superset(Interval(0, 2)) == False assert FiniteSet(1, 2).is_superset(Interval(0, 2, True, True)) == False assert (Interval(1, 2) + FiniteSet(3)).is_superset( (Interval(0, 2, False, True) + FiniteSet(2, 3))) == False assert Interval(3, 4).is_superset(Union(Interval(0, 1), Interval(2, 5))) == False assert FiniteSet(1, 2, 3, 4).is_superset(Interval(0, 5)) == False assert S.EmptySet.is_superset(FiniteSet(1, 2, 3)) == False assert Interval(0, 1).is_superset(S.EmptySet) == True assert S.EmptySet.is_superset(S.EmptySet) == True raises(ValueError, lambda: S.EmptySet.is_superset(1)) # tests for the issuperset alias assert Interval(0, 1).issuperset(S.EmptySet) == True assert S.EmptySet.issuperset(S.EmptySet) == True def test_is_proper_superset(): assert Interval(0, 1).is_proper_superset(Interval(0, 2)) is False assert Interval(0, 3).is_proper_superset(Interval(0, 2)) is True assert FiniteSet(1, 2, 3).is_proper_superset(S.EmptySet) is True raises(ValueError, lambda: Interval(0, 1).is_proper_superset(0)) def test_contains(): assert Interval(0, 2).contains(1) is S.true assert Interval(0, 2).contains(3) is S.false assert Interval(0, 2, True, False).contains(0) is S.false assert Interval(0, 2, True, False).contains(2) is S.true assert Interval(0, 2, False, True).contains(0) is S.true assert Interval(0, 2, False, True).contains(2) is S.false assert Interval(0, 2, True, True).contains(0) is S.false assert Interval(0, 2, True, True).contains(2) is S.false assert (Interval(0, 2) in Interval(0, 2)) is False assert FiniteSet(1, 2, 3).contains(2) is S.true assert FiniteSet(1, 2, Symbol('x')).contains(Symbol('x')) is S.true # issue 8197 from sympy.abc import a, b assert isinstance(FiniteSet(b).contains(-a), Contains) assert isinstance(FiniteSet(b).contains(a), Contains) assert isinstance(FiniteSet(a).contains(1), Contains) raises(TypeError, lambda: 1 in FiniteSet(a)) # issue 8209 rad1 = Pow(Pow(2, S(1)/3) - 1, S(1)/3) rad2 = Pow(S(1)/9, S(1)/3) - Pow(S(2)/9, S(1)/3) + Pow(S(4)/9, S(1)/3) s1 = FiniteSet(rad1) s2 = FiniteSet(rad2) assert s1 - s2 == S.EmptySet items = [1, 2, S.Infinity, S('ham'), -1.1] fset = FiniteSet(*items) assert all(item in fset for item in items) assert all(fset.contains(item) is S.true for item in items) assert Union(Interval(0, 1), Interval(2, 5)).contains(3) is S.true assert Union(Interval(0, 1), Interval(2, 5)).contains(6) is S.false assert Union(Interval(0, 1), FiniteSet(2, 5)).contains(3) is S.false assert S.EmptySet.contains(1) is S.false assert FiniteSet(rootof(x**3 + x - 1, 0)).contains(S.Infinity) is S.false assert rootof(x**5 + x**3 + 1, 0) in S.Reals assert not rootof(x**5 + x**3 + 1, 1) in S.Reals # non-bool results assert Union(Interval(1, 2), Interval(3, 4)).contains(x) == \ Or(And(S(1) <= x, x <= 2), And(S(3) <= x, x <= 4)) assert Intersection(Interval(1, x), Interval(2, 3)).contains(y) == \ And(y <= 3, y <= x, S(1) <= y, S(2) <= y) assert (S.Complexes).contains(S.ComplexInfinity) == S.false def test_interval_symbolic(): x = Symbol('x') e = Interval(0, 1) assert e.contains(x) == And(S(0) <= x, x <= 1) raises(TypeError, lambda: x in e) e = Interval(0, 1, True, True) assert e.contains(x) == And(S(0) < x, x < 1) def test_union_contains(): x = Symbol('x') i1 = Interval(0, 1) i2 = Interval(2, 3) i3 = Union(i1, i2) assert i3.as_relational(x) == Or(And(S(0) <= x, x <= 1), And(S(2) <= x, x <= 3)) raises(TypeError, lambda: x in i3) e = i3.contains(x) assert e == i3.as_relational(x) assert e.subs(x, -0.5) is false assert e.subs(x, 0.5) is true assert e.subs(x, 1.5) is false assert e.subs(x, 2.5) is true assert e.subs(x, 3.5) is false U = Interval(0, 2, True, True) + Interval(10, oo) + FiniteSet(-1, 2, 5, 6) assert all(el not in U for el in [0, 4, -oo]) assert all(el in U for el in [2, 5, 10]) def test_is_number(): assert Interval(0, 1).is_number is False assert Set().is_number is False def test_Interval_is_left_unbounded(): assert Interval(3, 4).is_left_unbounded is False assert Interval(-oo, 3).is_left_unbounded is True assert Interval(Float("-inf"), 3).is_left_unbounded is True def test_Interval_is_right_unbounded(): assert Interval(3, 4).is_right_unbounded is False assert Interval(3, oo).is_right_unbounded is True assert Interval(3, Float("+inf")).is_right_unbounded is True def test_Interval_as_relational(): x = Symbol('x') assert Interval(-1, 2, False, False).as_relational(x) == \ And(Le(-1, x), Le(x, 2)) assert Interval(-1, 2, True, False).as_relational(x) == \ And(Lt(-1, x), Le(x, 2)) assert Interval(-1, 2, False, True).as_relational(x) == \ And(Le(-1, x), Lt(x, 2)) assert Interval(-1, 2, True, True).as_relational(x) == \ And(Lt(-1, x), Lt(x, 2)) assert Interval(-oo, 2, right_open=False).as_relational(x) == And(Lt(-oo, x), Le(x, 2)) assert Interval(-oo, 2, right_open=True).as_relational(x) == And(Lt(-oo, x), Lt(x, 2)) assert Interval(-2, oo, left_open=False).as_relational(x) == And(Le(-2, x), Lt(x, oo)) assert Interval(-2, oo, left_open=True).as_relational(x) == And(Lt(-2, x), Lt(x, oo)) assert Interval(-oo, oo).as_relational(x) == And(Lt(-oo, x), Lt(x, oo)) x = Symbol('x', real=True) y = Symbol('y', real=True) assert Interval(x, y).as_relational(x) == (x <= y) assert Interval(y, x).as_relational(x) == (y <= x) def test_Finite_as_relational(): x = Symbol('x') y = Symbol('y') assert FiniteSet(1, 2).as_relational(x) == Or(Eq(x, 1), Eq(x, 2)) assert FiniteSet(y, -5).as_relational(x) == Or(Eq(x, y), Eq(x, -5)) def test_Union_as_relational(): x = Symbol('x') assert (Interval(0, 1) + FiniteSet(2)).as_relational(x) == \ Or(And(Le(0, x), Le(x, 1)), Eq(x, 2)) assert (Interval(0, 1, True, True) + FiniteSet(1)).as_relational(x) == \ And(Lt(0, x), Le(x, 1)) def test_Intersection_as_relational(): x = Symbol('x') assert (Intersection(Interval(0, 1), FiniteSet(2), evaluate=False).as_relational(x) == And(And(Le(0, x), Le(x, 1)), Eq(x, 2))) def test_EmptySet(): assert S.EmptySet.as_relational(Symbol('x')) is S.false assert S.EmptySet.intersect(S.UniversalSet) == S.EmptySet assert S.EmptySet.boundary == S.EmptySet def test_finite_basic(): x = Symbol('x') A = FiniteSet(1, 2, 3) B = FiniteSet(3, 4, 5) AorB = Union(A, B) AandB = A.intersect(B) assert A.is_subset(AorB) and B.is_subset(AorB) assert AandB.is_subset(A) assert AandB == FiniteSet(3) assert A.inf == 1 and A.sup == 3 assert AorB.inf == 1 and AorB.sup == 5 assert FiniteSet(x, 1, 5).sup == Max(x, 5) assert FiniteSet(x, 1, 5).inf == Min(x, 1) # issue 7335 assert FiniteSet(S.EmptySet) != S.EmptySet assert FiniteSet(FiniteSet(1, 2, 3)) != FiniteSet(1, 2, 3) assert FiniteSet((1, 2, 3)) != FiniteSet(1, 2, 3) # Ensure a variety of types can exist in a FiniteSet s = FiniteSet((1, 2), Float, A, -5, x, 'eggs', x**2, Interval) assert (A > B) is False assert (A >= B) is False assert (A < B) is False assert (A <= B) is False assert AorB > A and AorB > B assert AorB >= A and AorB >= B assert A >= A and A <= A assert A >= AandB and B >= AandB assert A > AandB and B > AandB assert FiniteSet(1.0) == FiniteSet(1) def test_powerset(): # EmptySet A = FiniteSet() pset = A.powerset() assert len(pset) == 1 assert pset == FiniteSet(S.EmptySet) # FiniteSets A = FiniteSet(1, 2) pset = A.powerset() assert len(pset) == 2**len(A) assert pset == FiniteSet(FiniteSet(), FiniteSet(1), FiniteSet(2), A) # Not finite sets I = Interval(0, 1) raises(NotImplementedError, I.powerset) def test_product_basic(): H, T = 'H', 'T' unit_line = Interval(0, 1) d6 = FiniteSet(1, 2, 3, 4, 5, 6) d4 = FiniteSet(1, 2, 3, 4) coin = FiniteSet(H, T) square = unit_line * unit_line assert (0, 0) in square assert 0 not in square assert (H, T) in coin ** 2 assert (.5, .5, .5) in square * unit_line assert (H, 3, 3) in coin * d6* d6 HH, TT = sympify(H), sympify(T) assert set(coin**2) == set(((HH, HH), (HH, TT), (TT, HH), (TT, TT))) assert (d4*d4).is_subset(d6*d6) assert square.complement(Interval(-oo, oo)*Interval(-oo, oo)) == Union( (Interval(-oo, 0, True, True) + Interval(1, oo, True, True))*Interval(-oo, oo), Interval(-oo, oo)*(Interval(-oo, 0, True, True) + Interval(1, oo, True, True))) assert (Interval(-5, 5)**3).is_subset(Interval(-10, 10)**3) assert not (Interval(-10, 10)**3).is_subset(Interval(-5, 5)**3) assert not (Interval(-5, 5)**2).is_subset(Interval(-10, 10)**3) assert (Interval(.2, .5)*FiniteSet(.5)).is_subset(square) # segment in square assert len(coin*coin*coin) == 8 assert len(S.EmptySet*S.EmptySet) == 0 assert len(S.EmptySet*coin) == 0 raises(TypeError, lambda: len(coin*Interval(0, 2))) def test_real(): x = Symbol('x', real=True, finite=True) I = Interval(0, 5) J = Interval(10, 20) A = FiniteSet(1, 2, 30, x, S.Pi) B = FiniteSet(-4, 0) C = FiniteSet(100) D = FiniteSet('Ham', 'Eggs') assert all(s.is_subset(S.Reals) for s in [I, J, A, B, C]) assert not D.is_subset(S.Reals) assert all((a + b).is_subset(S.Reals) for a in [I, J, A, B, C] for b in [I, J, A, B, C]) assert not any((a + D).is_subset(S.Reals) for a in [I, J, A, B, C, D]) assert not (I + A + D).is_subset(S.Reals) def test_supinf(): x = Symbol('x', real=True) y = Symbol('y', real=True) assert (Interval(0, 1) + FiniteSet(2)).sup == 2 assert (Interval(0, 1) + FiniteSet(2)).inf == 0 assert (Interval(0, 1) + FiniteSet(x)).sup == Max(1, x) assert (Interval(0, 1) + FiniteSet(x)).inf == Min(0, x) assert FiniteSet(5, 1, x).sup == Max(5, x) assert FiniteSet(5, 1, x).inf == Min(1, x) assert FiniteSet(5, 1, x, y).sup == Max(5, x, y) assert FiniteSet(5, 1, x, y).inf == Min(1, x, y) assert FiniteSet(5, 1, x, y, S.Infinity, S.NegativeInfinity).sup == \ S.Infinity assert FiniteSet(5, 1, x, y, S.Infinity, S.NegativeInfinity).inf == \ S.NegativeInfinity assert FiniteSet('Ham', 'Eggs').sup == Max('Ham', 'Eggs') def test_universalset(): U = S.UniversalSet x = Symbol('x') assert U.as_relational(x) is S.true assert U.union(Interval(2, 4)) == U assert U.intersect(Interval(2, 4)) == Interval(2, 4) assert U.measure == S.Infinity assert U.boundary == S.EmptySet assert U.contains(0) is S.true def test_Union_of_ProductSets_shares(): line = Interval(0, 2) points = FiniteSet(0, 1, 2) assert Union(line * line, line * points) == line * line def test_Interval_free_symbols(): # issue 6211 assert Interval(0, 1).free_symbols == set() x = Symbol('x', real=True) assert Interval(0, x).free_symbols == {x} def test_image_interval(): from sympy.core.numbers import Rational x = Symbol('x', real=True) a = Symbol('a', real=True) assert imageset(x, 2*x, Interval(-2, 1)) == Interval(-4, 2) assert imageset(x, 2*x, Interval(-2, 1, True, False)) == \ Interval(-4, 2, True, False) assert imageset(x, x**2, Interval(-2, 1, True, False)) == \ Interval(0, 4, False, True) assert imageset(x, x**2, Interval(-2, 1)) == Interval(0, 4) assert imageset(x, x**2, Interval(-2, 1, True, False)) == \ Interval(0, 4, False, True) assert imageset(x, x**2, Interval(-2, 1, True, True)) == \ Interval(0, 4, False, True) assert imageset(x, (x - 2)**2, Interval(1, 3)) == Interval(0, 1) assert imageset(x, 3*x**4 - 26*x**3 + 78*x**2 - 90*x, Interval(0, 4)) == \ Interval(-35, 0) # Multiple Maxima assert imageset(x, x + 1/x, Interval(-oo, oo)) == Interval(-oo, -2) \ + Interval(2, oo) # Single Infinite discontinuity assert imageset(x, 1/x + 1/(x-1)**2, Interval(0, 2, True, False)) == \ Interval(Rational(3, 2), oo, False) # Multiple Infinite discontinuities # Test for Python lambda assert imageset(lambda x: 2*x, Interval(-2, 1)) == Interval(-4, 2) assert imageset(Lambda(x, a*x), Interval(0, 1)) == \ ImageSet(Lambda(x, a*x), Interval(0, 1)) assert imageset(Lambda(x, sin(cos(x))), Interval(0, 1)) == \ ImageSet(Lambda(x, sin(cos(x))), Interval(0, 1)) def test_image_piecewise(): f = Piecewise((x, x <= -1), (1/x**2, x <= 5), (x**3, True)) f1 = Piecewise((0, x <= 1), (1, x <= 2), (2, True)) assert imageset(x, f, Interval(-5, 5)) == Union(Interval(-5, -1), Interval(S(1)/25, oo)) assert imageset(x, f1, Interval(1, 2)) == FiniteSet(0, 1) @XFAIL # See: https://github.com/sympy/sympy/pull/2723#discussion_r8659826 def test_image_Intersection(): x = Symbol('x', real=True) y = Symbol('y', real=True) assert imageset(x, x**2, Interval(-2, 0).intersect(Interval(x, y))) == \ Interval(0, 4).intersect(Interval(Min(x**2, y**2), Max(x**2, y**2))) def test_image_FiniteSet(): x = Symbol('x', real=True) assert imageset(x, 2*x, FiniteSet(1, 2, 3)) == FiniteSet(2, 4, 6) def test_image_Union(): x = Symbol('x', real=True) assert imageset(x, x**2, Interval(-2, 0) + FiniteSet(1, 2, 3)) == \ (Interval(0, 4) + FiniteSet(9)) def test_image_EmptySet(): x = Symbol('x', real=True) assert imageset(x, 2*x, S.EmptySet) == S.EmptySet def test_issue_5724_7680(): assert I not in S.Reals # issue 7680 assert Interval(-oo, oo).contains(I) is S.false def test_boundary(): assert FiniteSet(1).boundary == FiniteSet(1) assert all(Interval(0, 1, left_open, right_open).boundary == FiniteSet(0, 1) for left_open in (true, false) for right_open in (true, false)) def test_boundary_Union(): assert (Interval(0, 1) + Interval(2, 3)).boundary == FiniteSet(0, 1, 2, 3) assert ((Interval(0, 1, False, True) + Interval(1, 2, True, False)).boundary == FiniteSet(0, 1, 2)) assert (Interval(0, 1) + FiniteSet(2)).boundary == FiniteSet(0, 1, 2) assert Union(Interval(0, 10), Interval(5, 15), evaluate=False).boundary \ == FiniteSet(0, 15) assert Union(Interval(0, 10), Interval(0, 1), evaluate=False).boundary \ == FiniteSet(0, 10) assert Union(Interval(0, 10, True, True), Interval(10, 15, True, True), evaluate=False).boundary \ == FiniteSet(0, 10, 15) @XFAIL def test_union_boundary_of_joining_sets(): """ Testing the boundary of unions is a hard problem """ assert Union(Interval(0, 10), Interval(10, 15), evaluate=False).boundary \ == FiniteSet(0, 15) def test_boundary_ProductSet(): open_square = Interval(0, 1, True, True) ** 2 assert open_square.boundary == (FiniteSet(0, 1) * Interval(0, 1) + Interval(0, 1) * FiniteSet(0, 1)) second_square = Interval(1, 2, True, True) * Interval(0, 1, True, True) assert (open_square + second_square).boundary == ( FiniteSet(0, 1) * Interval(0, 1) + FiniteSet(1, 2) * Interval(0, 1) + Interval(0, 1) * FiniteSet(0, 1) + Interval(1, 2) * FiniteSet(0, 1)) def test_boundary_ProductSet_line(): line_in_r2 = Interval(0, 1) * FiniteSet(0) assert line_in_r2.boundary == line_in_r2 def test_is_open(): assert not Interval(0, 1, False, False).is_open assert not Interval(0, 1, True, False).is_open assert Interval(0, 1, True, True).is_open assert not FiniteSet(1, 2, 3).is_open def test_is_closed(): assert Interval(0, 1, False, False).is_closed assert not Interval(0, 1, True, False).is_closed assert FiniteSet(1, 2, 3).is_closed def test_closure(): assert Interval(0, 1, False, True).closure == Interval(0, 1, False, False) def test_interior(): assert Interval(0, 1, False, True).interior == Interval(0, 1, True, True) def test_issue_7841(): raises(TypeError, lambda: x in S.Reals) def test_Eq(): assert Eq(Interval(0, 1), Interval(0, 1)) assert Eq(Interval(0, 1), Interval(0, 2)) == False s1 = FiniteSet(0, 1) s2 = FiniteSet(1, 2) assert Eq(s1, s1) assert Eq(s1, s2) == False assert Eq(s1*s2, s1*s2) assert Eq(s1*s2, s2*s1) == False def test_SymmetricDifference(): assert SymmetricDifference(FiniteSet(0, 1, 2, 3, 4, 5), \ FiniteSet(2, 4, 6, 8, 10)) == FiniteSet(0, 1, 3, 5, 6, 8, 10) assert SymmetricDifference(FiniteSet(2, 3, 4), FiniteSet(2, 3 ,4 ,5 )) \ == FiniteSet(5) assert FiniteSet(1, 2, 3, 4, 5) ^ FiniteSet(1, 2, 5, 6) == \ FiniteSet(3, 4, 6) assert Set(1, 2 ,3) ^ Set(2, 3, 4) == Union(Set(1, 2, 3) - Set(2, 3, 4), \ Set(2, 3, 4) - Set(1, 2, 3)) assert Interval(0, 4) ^ Interval(2, 5) == Union(Interval(0, 4) - \ Interval(2, 5), Interval(2, 5) - Interval(0, 4)) def test_issue_9536(): from sympy.functions.elementary.exponential import log a = Symbol('a', real=True) assert FiniteSet(log(a)).intersect(S.Reals) == Intersection(S.Reals, FiniteSet(log(a))) def test_issue_9637(): n = Symbol('n') a = FiniteSet(n) b = FiniteSet(2, n) assert Complement(S.Reals, a) == Complement(S.Reals, a, evaluate=False) assert Complement(Interval(1, 3), a) == Complement(Interval(1, 3), a, evaluate=False) assert Complement(Interval(1, 3), b) == \ Complement(Union(Interval(1, 2, False, True), Interval(2, 3, True, False)), a) assert Complement(a, S.Reals) == Complement(a, S.Reals, evaluate=False) assert Complement(a, Interval(1, 3)) == Complement(a, Interval(1, 3), evaluate=False) @XFAIL def test_issue_9808(): # See https://github.com/sympy/sympy/issues/16342 assert Complement(FiniteSet(y), FiniteSet(1)) == Complement(FiniteSet(y), FiniteSet(1), evaluate=False) assert Complement(FiniteSet(1, 2, x), FiniteSet(x, y, 2, 3)) == \ Complement(FiniteSet(1), FiniteSet(y), evaluate=False) def test_issue_9956(): assert Union(Interval(-oo, oo), FiniteSet(1)) == Interval(-oo, oo) assert Interval(-oo, oo).contains(1) is S.true def test_issue_Symbol_inter(): i = Interval(0, oo) r = S.Reals mat = Matrix([0, 0, 0]) assert Intersection(r, i, FiniteSet(m), FiniteSet(m, n)) == \ Intersection(i, FiniteSet(m)) assert Intersection(FiniteSet(1, m, n), FiniteSet(m, n, 2), i) == \ Intersection(i, FiniteSet(m, n)) assert Intersection(FiniteSet(m, n, x), FiniteSet(m, z), r) == \ Intersection(r, FiniteSet(m, z), FiniteSet(n, x)) assert Intersection(FiniteSet(m, n, 3), FiniteSet(m, n, x), r) == \ Intersection(r, FiniteSet(3, m, n), evaluate=False) assert Intersection(FiniteSet(m, n, 3), FiniteSet(m, n, 2, 3), r) == \ Union(FiniteSet(3), Intersection(r, FiniteSet(m, n))) assert Intersection(r, FiniteSet(mat, 2, n), FiniteSet(0, mat, n)) == \ Intersection(r, FiniteSet(n)) assert Intersection(FiniteSet(sin(x), cos(x)), FiniteSet(sin(x), cos(x), 1), r) == \ Intersection(r, FiniteSet(sin(x), cos(x))) assert Intersection(FiniteSet(x**2, 1, sin(x)), FiniteSet(x**2, 2, sin(x)), r) == \ Intersection(r, FiniteSet(x**2, sin(x))) def test_issue_11827(): assert S.Naturals0**4 def test_issue_10113(): f = x**2/(x**2 - 4) assert imageset(x, f, S.Reals) == Union(Interval(-oo, 0), Interval(1, oo, True, True)) assert imageset(x, f, Interval(-2, 2)) == Interval(-oo, 0) assert imageset(x, f, Interval(-2, 3)) == Union(Interval(-oo, 0), Interval(S(9)/5, oo)) def test_issue_10248(): assert list(Intersection(S.Reals, FiniteSet(x))) == [ (-oo < x) & (x < oo)] def test_issue_9447(): a = Interval(0, 1) + Interval(2, 3) assert Complement(S.UniversalSet, a) == Complement( S.UniversalSet, Union(Interval(0, 1), Interval(2, 3)), evaluate=False) assert Complement(S.Naturals, a) == Complement( S.Naturals, Union(Interval(0, 1), Interval(2, 3)), evaluate=False) def test_issue_10337(): assert (FiniteSet(2) == 3) is False assert (FiniteSet(2) != 3) is True raises(TypeError, lambda: FiniteSet(2) < 3) raises(TypeError, lambda: FiniteSet(2) <= 3) raises(TypeError, lambda: FiniteSet(2) > 3) raises(TypeError, lambda: FiniteSet(2) >= 3) def test_issue_10326(): bad = [ EmptySet(), FiniteSet(1), Interval(1, 2), S.ComplexInfinity, S.ImaginaryUnit, S.Infinity, S.NaN, S.NegativeInfinity, ] interval = Interval(0, 5) for i in bad: assert i not in interval x = Symbol('x', real=True) nr = Symbol('nr', extended_real=False) assert x + 1 in Interval(x, x + 4) assert nr not in Interval(x, x + 4) assert Interval(1, 2) in FiniteSet(Interval(0, 5), Interval(1, 2)) assert Interval(-oo, oo).contains(oo) is S.false assert Interval(-oo, oo).contains(-oo) is S.false def test_issue_2799(): U = S.UniversalSet a = Symbol('a', real=True) inf_interval = Interval(a, oo) R = S.Reals assert U + inf_interval == inf_interval + U assert U + R == R + U assert R + inf_interval == inf_interval + R def test_issue_9706(): assert Interval(-oo, 0).closure == Interval(-oo, 0, True, False) assert Interval(0, oo).closure == Interval(0, oo, False, True) assert Interval(-oo, oo).closure == Interval(-oo, oo) def test_issue_8257(): reals_plus_infinity = Union(Interval(-oo, oo), FiniteSet(oo)) reals_plus_negativeinfinity = Union(Interval(-oo, oo), FiniteSet(-oo)) assert Interval(-oo, oo) + FiniteSet(oo) == reals_plus_infinity assert FiniteSet(oo) + Interval(-oo, oo) == reals_plus_infinity assert Interval(-oo, oo) + FiniteSet(-oo) == reals_plus_negativeinfinity assert FiniteSet(-oo) + Interval(-oo, oo) == reals_plus_negativeinfinity def test_issue_10931(): assert S.Integers - S.Integers == EmptySet() assert S.Integers - S.Reals == EmptySet() def test_issue_11174(): soln = Intersection(Interval(-oo, oo), FiniteSet(-x), evaluate=False) assert Intersection(FiniteSet(-x), S.Reals) == soln soln = Intersection(S.Reals, FiniteSet(x), evaluate=False) assert Intersection(FiniteSet(x), S.Reals) == soln def test_finite_set_intersection(): # The following should not produce recursion errors # Note: some of these are not completely correct. See # https://github.com/sympy/sympy/issues/16342. assert Intersection(FiniteSet(-oo, x), FiniteSet(x)) == FiniteSet(x) assert Intersection._handle_finite_sets([FiniteSet(-oo, x), FiniteSet(0, x)]) == FiniteSet(x) assert Intersection._handle_finite_sets([FiniteSet(-oo, x), FiniteSet(x)]) == FiniteSet(x) assert Intersection._handle_finite_sets([FiniteSet(2, 3, x, y), FiniteSet(1, 2, x)]) == \ Intersection._handle_finite_sets([FiniteSet(1, 2, x), FiniteSet(2, 3, x, y)]) == \ Intersection(FiniteSet(1, 2, x), FiniteSet(2, 3, x, y)) == \ FiniteSet(1, 2, x) def test_union_intersection_constructor(): # The actual exception does not matter here, so long as these fail sets = [FiniteSet(1), FiniteSet(2)] raises(Exception, lambda: Union(sets)) raises(Exception, lambda: Intersection(sets)) raises(Exception, lambda: Union(tuple(sets))) raises(Exception, lambda: Intersection(tuple(sets))) raises(Exception, lambda: Union(i for i in sets)) raises(Exception, lambda: Intersection(i for i in sets)) # Python sets are treated the same as FiniteSet # The union of a single set (of sets) is the set (of sets) itself assert Union(set(sets)) == FiniteSet(*sets) assert Intersection(set(sets)) == FiniteSet(*sets) assert Union({1}, {2}) == FiniteSet(1, 2) assert Intersection({1, 2}, {2, 3}) == FiniteSet(2) def test_Union_contains(): assert zoo not in Union( Interval.open(-oo, 0), Interval.open(0, oo)) @XFAIL def test_issue_16878b(): # in intersection_sets for (ImageSet, Set) there is no code # that handles the base_set of S.Reals like there is # for Integers assert imageset(x, (x, x), S.Reals).is_subset(S.Reals**2) is True

4896089e77597e6d2d6bb8867a57b2ad824d90ad7801b8910fbbb1d7a3877559

from __future__ import print_function, division from sympy.core.compatibility import clock import pyglet.gl as pgl from sympy.plotting.pygletplot.managed_window import ManagedWindow from sympy.plotting.pygletplot.plot_camera import PlotCamera from sympy.plotting.pygletplot.plot_controller import PlotController class PlotWindow(ManagedWindow): def __init__(self, plot, antialiasing=True, ortho=False, invert_mouse_zoom=False, linewidth=1.5, caption="SymPy Plot", **kwargs): """ Named Arguments =============== antialiasing = True True OR False ortho = False True OR False invert_mouse_zoom = False True OR False """ self.plot = plot self.camera = None self._calculating = False self.antialiasing = antialiasing self.ortho = ortho self.invert_mouse_zoom = invert_mouse_zoom self.linewidth = linewidth self.title = caption self.last_caption_update = 0 self.caption_update_interval = 0.2 self.drawing_first_object = True super(PlotWindow, self).__init__(**kwargs) def setup(self): self.camera = PlotCamera(self, ortho=self.ortho) self.controller = PlotController(self, invert_mouse_zoom=self.invert_mouse_zoom) self.push_handlers(self.controller) pgl.glClearColor(1.0, 1.0, 1.0, 0.0) pgl.glClearDepth(1.0) pgl.glDepthFunc(pgl.GL_LESS) pgl.glEnable(pgl.GL_DEPTH_TEST) pgl.glEnable(pgl.GL_LINE_SMOOTH) pgl.glShadeModel(pgl.GL_SMOOTH) pgl.glLineWidth(self.linewidth) pgl.glEnable(pgl.GL_BLEND) pgl.glBlendFunc(pgl.GL_SRC_ALPHA, pgl.GL_ONE_MINUS_SRC_ALPHA) if self.antialiasing: pgl.glHint(pgl.GL_LINE_SMOOTH_HINT, pgl.GL_NICEST) pgl.glHint(pgl.GL_POLYGON_SMOOTH_HINT, pgl.GL_NICEST) self.camera.setup_projection() def on_resize(self, w, h): super(PlotWindow, self).on_resize(w, h) if self.camera is not None: self.camera.setup_projection() def update(self, dt): self.controller.update(dt) def draw(self): self.plot._render_lock.acquire() self.camera.apply_transformation() calc_verts_pos, calc_verts_len = 0, 0 calc_cverts_pos, calc_cverts_len = 0, 0 should_update_caption = (clock() - self.last_caption_update > self.caption_update_interval) if len(self.plot._functions.values()) == 0: self.drawing_first_object = True try: dict.iteritems except AttributeError: # Python 3 iterfunctions = iter(self.plot._functions.values()) else: # Python 2 iterfunctions = self.plot._functions.itervalues() for r in iterfunctions: if self.drawing_first_object: self.camera.set_rot_preset(r.default_rot_preset) self.drawing_first_object = False pgl.glPushMatrix() r._draw() pgl.glPopMatrix() # might as well do this while we are # iterating and have the lock rather # than locking and iterating twice # per frame: if should_update_caption: try: if r.calculating_verts: calc_verts_pos += r.calculating_verts_pos calc_verts_len += r.calculating_verts_len if r.calculating_cverts: calc_cverts_pos += r.calculating_cverts_pos calc_cverts_len += r.calculating_cverts_len except ValueError: pass for r in self.plot._pobjects: pgl.glPushMatrix() r._draw() pgl.glPopMatrix() if should_update_caption: self.update_caption(calc_verts_pos, calc_verts_len, calc_cverts_pos, calc_cverts_len) self.last_caption_update = clock() if self.plot._screenshot: self.plot._screenshot._execute_saving() self.plot._render_lock.release() def update_caption(self, calc_verts_pos, calc_verts_len, calc_cverts_pos, calc_cverts_len): caption = self.title if calc_verts_len or calc_cverts_len: caption += " (calculating" if calc_verts_len > 0: p = (calc_verts_pos / calc_verts_len) * 100 caption += " vertices %i%%" % (p) if calc_cverts_len > 0: p = (calc_cverts_pos / calc_cverts_len) * 100 caption += " colors %i%%" % (p) caption += ")" if self.caption != caption: self.set_caption(caption)

99835a3f1b5fec644778225005b210dc27b2dbc343f917aec9da852f7f40e064

#!/usr/bin/env python """Distutils based setup script for SymPy. This uses Distutils (https://python.org/sigs/distutils-sig/) the standard python mechanism for installing packages. Optionally, you can use Setuptools (https://setuptools.readthedocs.io/en/latest/) to automatically handle dependencies. For the easiest installation just type the command (you'll probably need root privileges for that): python setup.py install This will install the library in the default location. For instructions on how to customize the install procedure read the output of: python setup.py --help install In addition, there are some other commands: python setup.py clean -> will clean all trash (*.pyc and stuff) python setup.py test -> will run the complete test suite python setup.py bench -> will run the complete benchmark suite python setup.py audit -> will run pyflakes checker on source code To get a full list of available commands, read the output of: python setup.py --help-commands Or, if all else fails, feel free to write to the sympy list at [email protected] and ask for help. """ import sys import os import shutil import glob min_mpmath_version = '0.19' # This directory dir_setup = os.path.dirname(os.path.realpath(__file__)) extra_kwargs = {} try: from setuptools import setup, Command extra_kwargs['zip_safe'] = False extra_kwargs['entry_points'] = { 'console_scripts': [ 'isympy = isympy:main', ] } except ImportError: from distutils.core import setup, Command extra_kwargs['scripts'] = ['bin/isympy'] # handle mpmath deps in the hard way: from distutils.version import LooseVersion try: import mpmath if mpmath.__version__ < LooseVersion(min_mpmath_version): raise ImportError except ImportError: print("Please install the mpmath package with a version >= %s" % min_mpmath_version) sys.exit(-1) PY3 = sys.version_info[0] > 2 # Make sure I have the right Python version. if ((sys.version_info[0] == 2 and sys.version_info[1] < 7) or (sys.version_info[0] == 3 and sys.version_info[1] < 4)): print("SymPy requires Python 2.7 or 3.4 or newer. Python %d.%d detected" % sys.version_info[:2]) sys.exit(-1) # Check that this list is uptodate against the result of the command: # python bin/generate_module_list.py modules = [ 'sympy.algebras', 'sympy.assumptions', 'sympy.assumptions.handlers', 'sympy.benchmarks', 'sympy.calculus', 'sympy.categories', 'sympy.codegen', 'sympy.combinatorics', 'sympy.concrete', 'sympy.core', 'sympy.core.benchmarks', 'sympy.crypto', 'sympy.deprecated', 'sympy.diffgeom', 'sympy.discrete', 'sympy.external', 'sympy.functions', 'sympy.functions.combinatorial', 'sympy.functions.elementary', 'sympy.functions.elementary.benchmarks', 'sympy.functions.special', 'sympy.functions.special.benchmarks', 'sympy.geometry', 'sympy.holonomic', 'sympy.integrals', 'sympy.integrals.benchmarks', 'sympy.integrals.rubi', 'sympy.integrals.rubi.parsetools', 'sympy.integrals.rubi.rubi_tests', 'sympy.integrals.rubi.rules', 'sympy.interactive', 'sympy.liealgebras', 'sympy.logic', 'sympy.logic.algorithms', 'sympy.logic.utilities', 'sympy.matrices', 'sympy.matrices.benchmarks', 'sympy.matrices.expressions', 'sympy.multipledispatch', 'sympy.ntheory', 'sympy.parsing', 'sympy.parsing.autolev', 'sympy.parsing.autolev._antlr', 'sympy.parsing.autolev.test-examples', 'sympy.parsing.autolev.test-examples.pydy-example-repo', 'sympy.parsing.latex', 'sympy.parsing.latex._antlr', 'sympy.physics', 'sympy.physics.continuum_mechanics', 'sympy.physics.hep', 'sympy.physics.mechanics', 'sympy.physics.optics', 'sympy.physics.quantum', 'sympy.physics.units', 'sympy.physics.units.systems', 'sympy.physics.vector', 'sympy.plotting', 'sympy.plotting.intervalmath', 'sympy.plotting.pygletplot', 'sympy.polys', 'sympy.polys.agca', 'sympy.polys.benchmarks', 'sympy.polys.domains', 'sympy.printing', 'sympy.printing.pretty', 'sympy.sandbox', 'sympy.series', 'sympy.series.benchmarks', 'sympy.sets', 'sympy.sets.handlers', 'sympy.simplify', 'sympy.solvers', 'sympy.solvers.benchmarks', 'sympy.stats', 'sympy.strategies', 'sympy.strategies.branch', 'sympy.tensor', 'sympy.tensor.array', 'sympy.unify', 'sympy.utilities', 'sympy.utilities._compilation', 'sympy.utilities.mathml', 'sympy.vector', ] class audit(Command): """Audits SymPy's source code for following issues: - Names which are used but not defined or used before they are defined. - Names which are redefined without having been used. """ description = "Audit SymPy source with PyFlakes" user_options = [] def initialize_options(self): self.all = None def finalize_options(self): pass def run(self): import os try: import pyflakes.scripts.pyflakes as flakes except ImportError: print("In order to run the audit, you need to have PyFlakes installed.") sys.exit(-1) dirs = (os.path.join(*d) for d in (m.split('.') for m in modules)) warns = 0 for dir in dirs: for filename in os.listdir(dir): if filename.endswith('.py') and filename != '__init__.py': warns += flakes.checkPath(os.path.join(dir, filename)) if warns > 0: print("Audit finished with total %d warnings" % warns) class clean(Command): """Cleans *.pyc and debian trashs, so you should get the same copy as is in the VCS. """ description = "remove build files" user_options = [("all", "a", "the same")] def initialize_options(self): self.all = None def finalize_options(self): pass def run(self): curr_dir = os.getcwd() for root, dirs, files in os.walk(dir_setup): for file in files: if file.endswith('.pyc') and os.path.isfile: os.remove(os.path.join(root, file)) os.chdir(dir_setup) names = ["python-build-stamp-2.4", "MANIFEST", "build", "dist", "doc/_build", "sample.tex"] for f in names: if os.path.isfile(f): os.remove(f) elif os.path.isdir(f): shutil.rmtree(f) for name in glob.glob(os.path.join(dir_setup, "doc", "src", "modules", "physics", "vector", "*.pdf")): if os.path.isfile(name): os.remove(name) os.chdir(curr_dir) class test_sympy(Command): """Runs all tests under the sympy/ folder """ description = "run all tests and doctests; also see bin/test and bin/doctest" user_options = [] # distutils complains if this is not here. def __init__(self, *args): self.args = args[0] # so we can pass it to other classes Command.__init__(self, *args) def initialize_options(self): # distutils wants this pass def finalize_options(self): # this too pass def run(self): from sympy.utilities import runtests runtests.run_all_tests() class run_benchmarks(Command): """Runs all SymPy benchmarks""" description = "run all benchmarks" user_options = [] # distutils complains if this is not here. def __init__(self, *args): self.args = args[0] # so we can pass it to other classes Command.__init__(self, *args) def initialize_options(self): # distutils wants this pass def finalize_options(self): # this too pass # we use py.test like architecture: # # o collector -- collects benchmarks # o runner -- executes benchmarks # o presenter -- displays benchmarks results # # this is done in sympy.utilities.benchmarking on top of py.test def run(self): from sympy.utilities import benchmarking benchmarking.main(['sympy']) class antlr(Command): """Generate code with antlr4""" description = "generate parser code from antlr grammars" user_options = [] # distutils complains if this is not here. def __init__(self, *args): self.args = args[0] # so we can pass it to other classes Command.__init__(self, *args) def initialize_options(self): # distutils wants this pass def finalize_options(self): # this too pass def run(self): from sympy.parsing.latex._build_latex_antlr import build_parser if not build_parser(): sys.exit(-1) # Check that this list is uptodate against the result of the command: # python bin/generate_test_list.py tests = [ 'sympy.algebras.tests', 'sympy.assumptions.tests', 'sympy.calculus.tests', 'sympy.categories.tests', 'sympy.codegen.tests', 'sympy.combinatorics.tests', 'sympy.concrete.tests', 'sympy.core.tests', 'sympy.crypto.tests', 'sympy.deprecated.tests', 'sympy.diffgeom.tests', 'sympy.discrete.tests', 'sympy.external.tests', 'sympy.functions.combinatorial.tests', 'sympy.functions.elementary.tests', 'sympy.functions.special.tests', 'sympy.geometry.tests', 'sympy.holonomic.tests', 'sympy.integrals.rubi.parsetools.tests', 'sympy.integrals.rubi.rubi_tests.tests', 'sympy.integrals.rubi.tests', 'sympy.integrals.tests', 'sympy.interactive.tests', 'sympy.liealgebras.tests', 'sympy.logic.tests', 'sympy.matrices.expressions.tests', 'sympy.matrices.tests', 'sympy.multipledispatch.tests', 'sympy.ntheory.tests', 'sympy.parsing.tests', 'sympy.physics.continuum_mechanics.tests', 'sympy.physics.hep.tests', 'sympy.physics.mechanics.tests', 'sympy.physics.optics.tests', 'sympy.physics.quantum.tests', 'sympy.physics.tests', 'sympy.physics.units.tests', 'sympy.physics.vector.tests', 'sympy.plotting.intervalmath.tests', 'sympy.plotting.pygletplot.tests', 'sympy.plotting.tests', 'sympy.polys.agca.tests', 'sympy.polys.domains.tests', 'sympy.polys.tests', 'sympy.printing.pretty.tests', 'sympy.printing.tests', 'sympy.sandbox.tests', 'sympy.series.tests', 'sympy.sets.tests', 'sympy.simplify.tests', 'sympy.solvers.tests', 'sympy.stats.tests', 'sympy.strategies.branch.tests', 'sympy.strategies.tests', 'sympy.tensor.array.tests', 'sympy.tensor.tests', 'sympy.unify.tests', 'sympy.utilities._compilation.tests', 'sympy.utilities.tests', 'sympy.vector.tests', ] long_description = '''SymPy is a Python library for symbolic mathematics. It aims to become a full-featured computer algebra system (CAS) while keeping the code as simple as possible in order to be comprehensible and easily extensible. SymPy is written entirely in Python.''' with open(os.path.join(dir_setup, 'sympy', 'release.py')) as f: # Defines __version__ exec(f.read()) with open(os.path.join(dir_setup, 'sympy', '__init__.py')) as f: long_description = f.read().split('"""')[1] if __name__ == '__main__': setup(name='sympy', version=__version__, description='Computer algebra system (CAS) in Python', long_description=long_description, author='SymPy development team', author_email='[email protected]', license='BSD', keywords="Math CAS", url='https://sympy.org', py_modules=['isympy'], packages=['sympy'] + modules + tests, ext_modules=[], package_data={ 'sympy.utilities.mathml': ['data/*.xsl'], 'sympy.logic.benchmarks': ['input/*.cnf'], 'sympy.parsing.autolev': ['*.g4'], 'sympy.parsing.autolev.test-examples': ['*.al'], 'sympy.parsing.autolev.test-examples.pydy-example-repo': ['*.al'], 'sympy.parsing.latex': ['*.txt', '*.g4'], 'sympy.integrals.rubi.parsetools': ['header.py.txt'], }, data_files=[('share/man/man1', ['doc/man/isympy.1'])], cmdclass={'test': test_sympy, 'bench': run_benchmarks, 'clean': clean, 'audit': audit, 'antlr': antlr, }, classifiers=[ 'License :: OSI Approved :: BSD License', 'Operating System :: OS Independent', 'Programming Language :: Python', 'Topic :: Scientific/Engineering', 'Topic :: Scientific/Engineering :: Mathematics', 'Topic :: Scientific/Engineering :: Physics', 'Programming Language :: Python :: 2', 'Programming Language :: Python :: 2.7', 'Programming Language :: Python :: 3', 'Programming Language :: Python :: 3.4', 'Programming Language :: Python :: 3.5', 'Programming Language :: Python :: 3.6', 'Programming Language :: Python :: Implementation :: CPython', 'Programming Language :: Python :: Implementation :: PyPy', ], install_requires=[ 'mpmath>=%s' % min_mpmath_version, ], **extra_kwargs )

b6aa73551b6b0d9b93ffcce582094e1ba8a94a906ee0b9aa2a0a00a94811410d

""" SymPy is a Python library for symbolic mathematics. It aims to become a full-featured computer algebra system (CAS) while keeping the code as simple as possible in order to be comprehensible and easily extensible. SymPy is written entirely in Python. It depends on mpmath, and other external libraries may be optionally for things like plotting support. See the webpage for more information and documentation: https://sympy.org """ from __future__ import absolute_import, print_function del absolute_import, print_function try: import mpmath except ImportError: raise ImportError("SymPy now depends on mpmath as an external library. " "See https://docs.sympy.org/latest/install.html#mpmath for more information.") del mpmath from sympy.release import __version__ if 'dev' in __version__: def enable_warnings(): import warnings warnings.filterwarnings('default', '.*', DeprecationWarning, module='sympy.*') del warnings enable_warnings() del enable_warnings import sys if ((sys.version_info[0] == 2 and sys.version_info[1] < 7) or (sys.version_info[0] == 3 and sys.version_info[1] < 4)): raise ImportError("Python version 2.7 or 3.4 or above " "is required for SymPy.") del sys def __sympy_debug(): # helper function so we don't import os globally import os debug_str = os.getenv('SYMPY_DEBUG', 'False') if debug_str in ('True', 'False'): return eval(debug_str) else: raise RuntimeError("unrecognized value for SYMPY_DEBUG: %s" % debug_str) SYMPY_DEBUG = __sympy_debug() from .core import * from .logic import * from .assumptions import * from .polys import * from .series import * from .functions import * from .ntheory import * from .concrete import * from .discrete import * from .simplify import * from .sets import * from .solvers import * from .matrices import * from .geometry import * from .utilities import * from .integrals import * from .tensor import * from .parsing import * from .calculus import * from .algebras import * # This module causes conflicts with other modules: # from .stats import * # Adds about .04-.05 seconds of import time # from combinatorics import * # This module is slow to import: #from physics import units from .plotting import plot, textplot, plot_backends, plot_implicit, plot_parametric from .printing import * from .interactive import init_session, init_printing evalf._create_evalf_table() # This is slow to import: #import abc from .deprecated import *

4b621eb7d983746128f0d4fb214506e491cf6df1904d873e5a8826540936f5dc

""" Utility functions for plotting sympy functions. See examples\mplot2d.py and examples\mplot3d.py for usable 2d and 3d graphing functions using matplotlib. """ from sympy.core.sympify import sympify, SympifyError from sympy.external import import_module np = import_module('numpy') def sample2d(f, x_args): """ Samples a 2d function f over specified intervals and returns two arrays (X, Y) suitable for plotting with matlab (matplotlib) syntax. See examples\mplot2d.py. f is a function of one variable, such as x**2. x_args is an interval given in the form (var, min, max, n) """ try: f = sympify(f) except SympifyError: raise ValueError("f could not be interpreted as a SymPy function") try: x, x_min, x_max, x_n = x_args except (TypeError, IndexError): raise ValueError("x_args must be a tuple of the form (var, min, max, n)") x_l = float(x_max - x_min) x_d = x_l/float(x_n) X = np.arange(float(x_min), float(x_max) + x_d, x_d) Y = np.empty(len(X)) for i in range(len(X)): try: Y[i] = float(f.subs(x, X[i])) except TypeError: Y[i] = None return X, Y def sample3d(f, x_args, y_args): """ Samples a 3d function f over specified intervals and returns three 2d arrays (X, Y, Z) suitable for plotting with matlab (matplotlib) syntax. See examples\mplot3d.py. f is a function of two variables, such as x**2 + y**2. x_args and y_args are intervals given in the form (var, min, max, n) """ x, x_min, x_max, x_n = None, None, None, None y, y_min, y_max, y_n = None, None, None, None try: f = sympify(f) except SympifyError: raise ValueError("f could not be interpreted as a SymPy function") try: x, x_min, x_max, x_n = x_args y, y_min, y_max, y_n = y_args except (TypeError, IndexError): raise ValueError("x_args and y_args must be tuples of the form (var, min, max, intervals)") x_l = float(x_max - x_min) x_d = x_l/float(x_n) x_a = np.arange(float(x_min), float(x_max) + x_d, x_d) y_l = float(y_max - y_min) y_d = y_l/float(y_n) y_a = np.arange(float(y_min), float(y_max) + y_d, y_d) def meshgrid(x, y): """ Taken from matplotlib.mlab.meshgrid. """ x = np.array(x) y = np.array(y) numRows, numCols = len(y), len(x) x.shape = 1, numCols X = np.repeat(x, numRows, 0) y.shape = numRows, 1 Y = np.repeat(y, numCols, 1) return X, Y X, Y = np.meshgrid(x_a, y_a) Z = np.ndarray((len(X), len(X[0]))) for j in range(len(X)): for k in range(len(X[0])): try: Z[j][k] = float(f.subs(x, X[j][k]).subs(y, Y[j][k])) except (TypeError, NotImplementedError): Z[j][k] = 0 return X, Y, Z def sample(f, *var_args): """ Samples a 2d or 3d function over specified intervals and returns a dataset suitable for plotting with matlab (matplotlib) syntax. Wrapper for sample2d and sample3d. f is a function of one or two variables, such as x**2. var_args are intervals for each variable given in the form (var, min, max, n) """ if len(var_args) == 1: return sample2d(f, var_args[0]) elif len(var_args) == 2: return sample3d(f, var_args[0], var_args[1]) else: raise ValueError("Only 2d and 3d sampling are supported at this time.")

7e2add5e64e9ca05a98e65e9a8df6709397e3128f59ae1294419b27be0d41599

""" Continuous Random Variables - Prebuilt variables Contains ======== Arcsin Benini Beta BetaNoncentral BetaPrime Cauchy Chi ChiNoncentral ChiSquared Dagum Erlang ExGaussian Exponential ExponentialPower FDistribution FisherZ Frechet Gamma GammaInverse Gumbel Gompertz Kumaraswamy Laplace Logistic LogLogistic LogNormal Maxwell Nakagami Normal Pareto QuadraticU RaisedCosine Rayleigh ShiftedGompertz StudentT Trapezoidal Triangular Uniform UniformSum VonMises Weibull WignerSemicircle """ from __future__ import print_function, division import random from sympy import beta as beta_fn from sympy import cos, sin, tan, atan, exp, besseli, besselj, besselk from sympy import (log, sqrt, pi, S, Dummy, Interval, sympify, gamma, sign, Piecewise, And, Eq, binomial, factorial, Sum, floor, Abs, Lambda, Basic, lowergamma, erf, erfc, erfi, erfinv, I, hyper, uppergamma, sinh, Ne, expint) from sympy.external import import_module from sympy.matrices import MatrixBase from sympy.stats.crv import (SingleContinuousPSpace, SingleContinuousDistribution, ContinuousDistributionHandmade) from sympy.stats.joint_rv import JointPSpace, CompoundDistribution from sympy.stats.joint_rv_types import multivariate_rv from sympy.stats.rv import _value_check, RandomSymbol oo = S.Infinity __all__ = ['ContinuousRV', 'Arcsin', 'Benini', 'Beta', 'BetaNoncentral', 'BetaPrime', 'Cauchy', 'Chi', 'ChiNoncentral', 'ChiSquared', 'Dagum', 'Erlang', 'ExGaussian', 'Exponential', 'ExponentialPower', 'FDistribution', 'FisherZ', 'Frechet', 'Gamma', 'GammaInverse', 'Gompertz', 'Gumbel', 'Kumaraswamy', 'Laplace', 'Logistic', 'LogLogistic', 'LogNormal', 'Maxwell', 'Nakagami', 'Normal', 'GaussianInverse', 'Pareto', 'QuadraticU', 'RaisedCosine', 'Rayleigh', 'StudentT', 'ShiftedGompertz', 'Trapezoidal', 'Triangular', 'Uniform', 'UniformSum', 'VonMises', 'Weibull', 'WignerSemicircle' ] def ContinuousRV(symbol, density, set=Interval(-oo, oo)): """ Create a Continuous Random Variable given the following: -- a symbol -- a probability density function -- set on which the pdf is valid (defaults to entire real line) Returns a RandomSymbol. Many common continuous random variable types are already implemented. This function should be necessary only very rarely. Examples ======== >>> from sympy import Symbol, sqrt, exp, pi >>> from sympy.stats import ContinuousRV, P, E >>> x = Symbol("x") >>> pdf = sqrt(2)*exp(-x**2/2)/(2*sqrt(pi)) # Normal distribution >>> X = ContinuousRV(x, pdf) >>> E(X) 0 >>> P(X>0) 1/2 """ pdf = Piecewise((density, set.as_relational(symbol)), (0, True)) pdf = Lambda(symbol, pdf) dist = ContinuousDistributionHandmade(pdf, set) return SingleContinuousPSpace(symbol, dist).value def rv(symbol, cls, args): args = list(map(sympify, args)) dist = cls(*args) dist.check(*args) pspace = SingleContinuousPSpace(symbol, dist) if any(isinstance(arg, RandomSymbol) for arg in args): pspace = JointPSpace(symbol, CompoundDistribution(dist)) return pspace.value ######################################## # Continuous Probability Distributions # ######################################## #------------------------------------------------------------------------------- # Arcsin distribution ---------------------------------------------------------- class ArcsinDistribution(SingleContinuousDistribution): _argnames = ('a', 'b') def set(self): return Interval(self.a, self.b) def pdf(self, x): return 1/(pi*sqrt((x - self.a)*(self.b - x))) def _cdf(self, x): from sympy import asin a, b = self.a, self.b return Piecewise( (S.Zero, x < a), (2*asin(sqrt((x - a)/(b - a)))/pi, x <= b), (S.One, True)) def Arcsin(name, a=0, b=1): r""" Create a Continuous Random Variable with an arcsin distribution. The density of the arcsin distribution is given by .. math:: f(x) := \frac{1}{\pi\sqrt{(x-a)(b-x)}} with :math:`x \in (a,b)`. It must hold that :math:`-\infty < a < b < \infty`. Parameters ========== a : Real number, the left interval boundary b : Real number, the right interval boundary Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Arcsin, density, cdf >>> from sympy import Symbol, simplify >>> a = Symbol("a", real=True) >>> b = Symbol("b", real=True) >>> z = Symbol("z") >>> X = Arcsin("x", a, b) >>> density(X)(z) 1/(pi*sqrt((-a + z)*(b - z))) >>> cdf(X)(z) Piecewise((0, a > z), (2*asin(sqrt((-a + z)/(-a + b)))/pi, b >= z), (1, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Arcsine_distribution """ return rv(name, ArcsinDistribution, (a, b)) #------------------------------------------------------------------------------- # Benini distribution ---------------------------------------------------------- class BeniniDistribution(SingleContinuousDistribution): _argnames = ('alpha', 'beta', 'sigma') @staticmethod def check(alpha, beta, sigma): _value_check(alpha > 0, "Shape parameter Alpha must be positive.") _value_check(beta > 0, "Shape parameter Beta must be positive.") _value_check(sigma > 0, "Scale parameter Sigma must be positive.") @property def set(self): return Interval(self.sigma, oo) def pdf(self, x): alpha, beta, sigma = self.alpha, self.beta, self.sigma return (exp(-alpha*log(x/sigma) - beta*log(x/sigma)**2) *(alpha/x + 2*beta*log(x/sigma)/x)) def _moment_generating_function(self, t): raise NotImplementedError('The moment generating function of the ' 'Benini distribution does not exist.') def Benini(name, alpha, beta, sigma): r""" Create a Continuous Random Variable with a Benini distribution. The density of the Benini distribution is given by .. math:: f(x) := e^{-\alpha\log{\frac{x}{\sigma}} -\beta\log^2\left[{\frac{x}{\sigma}}\right]} \left(\frac{\alpha}{x}+\frac{2\beta\log{\frac{x}{\sigma}}}{x}\right) This is a heavy-tailed distribution and is also known as the log-Rayleigh distribution. Parameters ========== alpha : Real number, `\alpha > 0`, a shape beta : Real number, `\beta > 0`, a shape sigma : Real number, `\sigma > 0`, a scale Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Benini, density, cdf >>> from sympy import Symbol, simplify, pprint >>> alpha = Symbol("alpha", positive=True) >>> beta = Symbol("beta", positive=True) >>> sigma = Symbol("sigma", positive=True) >>> z = Symbol("z") >>> X = Benini("x", alpha, beta, sigma) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) / / z \\ / z \ 2/ z \ | 2*beta*log|-----|| - alpha*log|-----| - beta*log |-----| |alpha \sigma/| \sigma/ \sigma/ |----- + -----------------|*e \ z z / >>> cdf(X)(z) Piecewise((1 - exp(-alpha*log(z/sigma) - beta*log(z/sigma)**2), sigma <= z), (0, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Benini_distribution .. [2] http://reference.wolfram.com/legacy/v8/ref/BeniniDistribution.html """ return rv(name, BeniniDistribution, (alpha, beta, sigma)) #------------------------------------------------------------------------------- # Beta distribution ------------------------------------------------------------ class BetaDistribution(SingleContinuousDistribution): _argnames = ('alpha', 'beta') set = Interval(0, 1) @staticmethod def check(alpha, beta): _value_check(alpha > 0, "Shape parameter Alpha must be positive.") _value_check(beta > 0, "Shape parameter Beta must be positive.") def pdf(self, x): alpha, beta = self.alpha, self.beta return x**(alpha - 1) * (1 - x)**(beta - 1) / beta_fn(alpha, beta) def sample(self): return random.betavariate(self.alpha, self.beta) def _characteristic_function(self, t): return hyper((self.alpha,), (self.alpha + self.beta,), I*t) def _moment_generating_function(self, t): return hyper((self.alpha,), (self.alpha + self.beta,), t) def Beta(name, alpha, beta): r""" Create a Continuous Random Variable with a Beta distribution. The density of the Beta distribution is given by .. math:: f(x) := \frac{x^{\alpha-1}(1-x)^{\beta-1}} {\mathrm{B}(\alpha,\beta)} with :math:`x \in [0,1]`. Parameters ========== alpha : Real number, `\alpha > 0`, a shape beta : Real number, `\beta > 0`, a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Beta, density, E, variance >>> from sympy import Symbol, simplify, pprint, factor >>> alpha = Symbol("alpha", positive=True) >>> beta = Symbol("beta", positive=True) >>> z = Symbol("z") >>> X = Beta("x", alpha, beta) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) alpha - 1 beta - 1 z *(1 - z) -------------------------- B(alpha, beta) >>> simplify(E(X)) alpha/(alpha + beta) >>> factor(simplify(variance(X))) #doctest: +SKIP alpha*beta/((alpha + beta)**2*(alpha + beta + 1)) References ========== .. [1] https://en.wikipedia.org/wiki/Beta_distribution .. [2] http://mathworld.wolfram.com/BetaDistribution.html """ return rv(name, BetaDistribution, (alpha, beta)) #------------------------------------------------------------------------------- # Noncentral Beta distribution ------------------------------------------------------------ class BetaNoncentralDistribution(SingleContinuousDistribution): _argnames = ('alpha', 'beta', 'lamda') set = Interval(0, 1) @staticmethod def check(alpha, beta, lamda): _value_check(alpha > 0, "Shape parameter Alpha must be positive.") _value_check(beta > 0, "Shape parameter Beta must be positive.") _value_check(lamda >= 0, "Noncentrality parameter Lambda must be positive") def pdf(self, x): alpha, beta, lamda = self.alpha, self.beta, self.lamda k = Dummy("k") return Sum(exp(-lamda / 2) * (lamda / 2)**k * x**(alpha + k - 1) *( 1 - x)**(beta - 1) / (factorial(k) * beta_fn(alpha + k, beta)), (k, 0, oo)) def BetaNoncentral(name, alpha, beta, lamda): r""" Create a Continuous Random Variable with a Type I Noncentral Beta distribution. The density of the Noncentral Beta distribution is given by .. math:: f(x) := \sum_{k=0}^\infty e^{-\lambda/2}\frac{(\lambda/2)^k}{k!} \frac{x^{\alpha+k-1}(1-x)^{\beta-1}}{\mathrm{B}(\alpha+k,\beta)} with :math:`x \in [0,1]`. Parameters ========== alpha : Real number, `\alpha > 0`, a shape beta : Real number, `\beta > 0`, a shape lamda: Real number, `\lambda >= 0`, noncentrality parameter Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import BetaNoncentral, density, cdf >>> from sympy import Symbol, pprint >>> alpha = Symbol("alpha", positive=True) >>> beta = Symbol("beta", positive=True) >>> lamda = Symbol("lamda", nonnegative=True) >>> z = Symbol("z") >>> X = BetaNoncentral("x", alpha, beta, lamda) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) oo _____ \ ` \ -lamda \ k ------- \ k + alpha - 1 /lamda\ beta - 1 2 ) z *|-----| *(1 - z) *e / \ 2 / / ------------------------------------------------ / B(k + alpha, beta)*k! /____, k = 0 Compute cdf with specific 'x', 'alpha', 'beta' and 'lamda' values as follows : >>> cdf(BetaNoncentral("x", 1, 1, 1), evaluate=False)(2).doit() exp(-1/2)*Integral(Sum(2**(-_k)*_x**_k/(beta(_k + 1, 1)*factorial(_k)), (_k, 0, oo)), (_x, 0, 2)) The argument evaluate=False prevents an attempt at evaluation of the sum for general x, before the argument 2 is passed. References ========== .. [1] https://en.wikipedia.org/wiki/Noncentral_beta_distribution .. [2] https://reference.wolfram.com/language/ref/NoncentralBetaDistribution.html """ return rv(name, BetaNoncentralDistribution, (alpha, beta, lamda)) #------------------------------------------------------------------------------- # Beta prime distribution ------------------------------------------------------ class BetaPrimeDistribution(SingleContinuousDistribution): _argnames = ('alpha', 'beta') @staticmethod def check(alpha, beta): _value_check(alpha > 0, "Shape parameter Alpha must be positive.") _value_check(beta > 0, "Shape parameter Beta must be positive.") set = Interval(0, oo) def pdf(self, x): alpha, beta = self.alpha, self.beta return x**(alpha - 1)*(1 + x)**(-alpha - beta)/beta_fn(alpha, beta) def BetaPrime(name, alpha, beta): r""" Create a continuous random variable with a Beta prime distribution. The density of the Beta prime distribution is given by .. math:: f(x) := \frac{x^{\alpha-1} (1+x)^{-\alpha -\beta}}{B(\alpha,\beta)} with :math:`x > 0`. Parameters ========== alpha : Real number, `\alpha > 0`, a shape beta : Real number, `\beta > 0`, a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import BetaPrime, density >>> from sympy import Symbol, pprint >>> alpha = Symbol("alpha", positive=True) >>> beta = Symbol("beta", positive=True) >>> z = Symbol("z") >>> X = BetaPrime("x", alpha, beta) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) alpha - 1 -alpha - beta z *(z + 1) ------------------------------- B(alpha, beta) References ========== .. [1] https://en.wikipedia.org/wiki/Beta_prime_distribution .. [2] http://mathworld.wolfram.com/BetaPrimeDistribution.html """ return rv(name, BetaPrimeDistribution, (alpha, beta)) #------------------------------------------------------------------------------- # Cauchy distribution ---------------------------------------------------------- class CauchyDistribution(SingleContinuousDistribution): _argnames = ('x0', 'gamma') @staticmethod def check(x0, gamma): _value_check(gamma > 0, "Scale parameter Gamma must be positive.") def pdf(self, x): return 1/(pi*self.gamma*(1 + ((x - self.x0)/self.gamma)**2)) def _cdf(self, x): x0, gamma = self.x0, self.gamma return (1/pi)*atan((x - x0)/gamma) + S.Half def _characteristic_function(self, t): return exp(self.x0 * I * t - self.gamma * Abs(t)) def _moment_generating_function(self, t): raise NotImplementedError("The moment generating function for the " "Cauchy distribution does not exist.") def _quantile(self, p): return self.x0 + self.gamma*tan(pi*(p - S.Half)) def Cauchy(name, x0, gamma): r""" Create a continuous random variable with a Cauchy distribution. The density of the Cauchy distribution is given by .. math:: f(x) := \frac{1}{\pi \gamma [1 + {(\frac{x-x_0}{\gamma})}^2]} Parameters ========== x0 : Real number, the location gamma : Real number, `\gamma > 0`, a scale Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Cauchy, density >>> from sympy import Symbol >>> x0 = Symbol("x0") >>> gamma = Symbol("gamma", positive=True) >>> z = Symbol("z") >>> X = Cauchy("x", x0, gamma) >>> density(X)(z) 1/(pi*gamma*(1 + (-x0 + z)**2/gamma**2)) References ========== .. [1] https://en.wikipedia.org/wiki/Cauchy_distribution .. [2] http://mathworld.wolfram.com/CauchyDistribution.html """ return rv(name, CauchyDistribution, (x0, gamma)) #------------------------------------------------------------------------------- # Chi distribution ------------------------------------------------------------- class ChiDistribution(SingleContinuousDistribution): _argnames = ('k',) @staticmethod def check(k): _value_check(k > 0, "Number of degrees of freedom (k) must be positive.") _value_check(k.is_integer, "Number of degrees of freedom (k) must be an integer.") set = Interval(0, oo) def pdf(self, x): return 2**(1 - self.k/2)*x**(self.k - 1)*exp(-x**2/2)/gamma(self.k/2) def _characteristic_function(self, t): k = self.k part_1 = hyper((k/2,), (S(1)/2,), -t**2/2) part_2 = I*t*sqrt(2)*gamma((k+1)/2)/gamma(k/2) part_3 = hyper(((k+1)/2,), (S(3)/2,), -t**2/2) return part_1 + part_2*part_3 def _moment_generating_function(self, t): k = self.k part_1 = hyper((k / 2,), (S(1) / 2,), t ** 2 / 2) part_2 = t * sqrt(2) * gamma((k + 1) / 2) / gamma(k / 2) part_3 = hyper(((k + 1) / 2,), (S(3) / 2,), t ** 2 / 2) return part_1 + part_2 * part_3 def Chi(name, k): r""" Create a continuous random variable with a Chi distribution. The density of the Chi distribution is given by .. math:: f(x) := \frac{2^{1-k/2}x^{k-1}e^{-x^2/2}}{\Gamma(k/2)} with :math:`x \geq 0`. Parameters ========== k : Positive integer, The number of degrees of freedom Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Chi, density, E >>> from sympy import Symbol, simplify >>> k = Symbol("k", integer=True) >>> z = Symbol("z") >>> X = Chi("x", k) >>> density(X)(z) 2**(1 - k/2)*z**(k - 1)*exp(-z**2/2)/gamma(k/2) >>> simplify(E(X)) sqrt(2)*gamma(k/2 + 1/2)/gamma(k/2) References ========== .. [1] https://en.wikipedia.org/wiki/Chi_distribution .. [2] http://mathworld.wolfram.com/ChiDistribution.html """ return rv(name, ChiDistribution, (k,)) #------------------------------------------------------------------------------- # Non-central Chi distribution ------------------------------------------------- class ChiNoncentralDistribution(SingleContinuousDistribution): _argnames = ('k', 'l') @staticmethod def check(k, l): _value_check(k > 0, "Number of degrees of freedom (k) must be positive.") _value_check(k.is_integer, "Number of degrees of freedom (k) must be an integer.") _value_check(l > 0, "Shift parameter Lambda must be positive.") set = Interval(0, oo) def pdf(self, x): k, l = self.k, self.l return exp(-(x**2+l**2)/2)*x**k*l / (l*x)**(k/2) * besseli(k/2-1, l*x) def ChiNoncentral(name, k, l): r""" Create a continuous random variable with a non-central Chi distribution. The density of the non-central Chi distribution is given by .. math:: f(x) := \frac{e^{-(x^2+\lambda^2)/2} x^k\lambda} {(\lambda x)^{k/2}} I_{k/2-1}(\lambda x) with `x \geq 0`. Here, `I_\nu (x)` is the :ref:`modified Bessel function of the first kind <besseli>`. Parameters ========== k : A positive Integer, `k > 0`, the number of degrees of freedom lambda : Real number, `\lambda > 0`, Shift parameter Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import ChiNoncentral, density >>> from sympy import Symbol >>> k = Symbol("k", integer=True) >>> l = Symbol("l") >>> z = Symbol("z") >>> X = ChiNoncentral("x", k, l) >>> density(X)(z) l*z**k*(l*z)**(-k/2)*exp(-l**2/2 - z**2/2)*besseli(k/2 - 1, l*z) References ========== .. [1] https://en.wikipedia.org/wiki/Noncentral_chi_distribution """ return rv(name, ChiNoncentralDistribution, (k, l)) #------------------------------------------------------------------------------- # Chi squared distribution ----------------------------------------------------- class ChiSquaredDistribution(SingleContinuousDistribution): _argnames = ('k',) @staticmethod def check(k): _value_check(k > 0, "Number of degrees of freedom (k) must be positive.") _value_check(k.is_integer, "Number of degrees of freedom (k) must be an integer.") set = Interval(0, oo) def pdf(self, x): k = self.k return 1/(2**(k/2)*gamma(k/2))*x**(k/2 - 1)*exp(-x/2) def _cdf(self, x): k = self.k return Piecewise( (S.One/gamma(k/2)*lowergamma(k/2, x/2), x >= 0), (0, True) ) def _characteristic_function(self, t): return (1 - 2*I*t)**(-self.k/2) def _moment_generating_function(self, t): return (1 - 2*t)**(-self.k/2) def ChiSquared(name, k): r""" Create a continuous random variable with a Chi-squared distribution. The density of the Chi-squared distribution is given by .. math:: f(x) := \frac{1}{2^{\frac{k}{2}}\Gamma\left(\frac{k}{2}\right)} x^{\frac{k}{2}-1} e^{-\frac{x}{2}} with :math:`x \geq 0`. Parameters ========== k : Positive integer, The number of degrees of freedom Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import ChiSquared, density, E, variance, moment >>> from sympy import Symbol >>> k = Symbol("k", integer=True, positive=True) >>> z = Symbol("z") >>> X = ChiSquared("x", k) >>> density(X)(z) 2**(-k/2)*z**(k/2 - 1)*exp(-z/2)/gamma(k/2) >>> E(X) k >>> variance(X) 2*k >>> moment(X, 3) k**3 + 6*k**2 + 8*k References ========== .. [1] https://en.wikipedia.org/wiki/Chi_squared_distribution .. [2] http://mathworld.wolfram.com/Chi-SquaredDistribution.html """ return rv(name, ChiSquaredDistribution, (k, )) #------------------------------------------------------------------------------- # Dagum distribution ----------------------------------------------------------- class DagumDistribution(SingleContinuousDistribution): _argnames = ('p', 'a', 'b') set = Interval(0, oo) @staticmethod def check(p, a, b): _value_check(p > 0, "Shape parameter p must be positive.") _value_check(a > 0, "Shape parameter a must be positive.") _value_check(b > 0, "Scale parameter b must be positive.") def pdf(self, x): p, a, b = self.p, self.a, self.b return a*p/x*((x/b)**(a*p)/(((x/b)**a + 1)**(p + 1))) def _cdf(self, x): p, a, b = self.p, self.a, self.b return Piecewise(((S.One + (S(x)/b)**-a)**-p, x>=0), (S.Zero, True)) def Dagum(name, p, a, b): r""" Create a continuous random variable with a Dagum distribution. The density of the Dagum distribution is given by .. math:: f(x) := \frac{a p}{x} \left( \frac{\left(\tfrac{x}{b}\right)^{a p}} {\left(\left(\tfrac{x}{b}\right)^a + 1 \right)^{p+1}} \right) with :math:`x > 0`. Parameters ========== p : Real number, `p > 0`, a shape a : Real number, `a > 0`, a shape b : Real number, `b > 0`, a scale Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Dagum, density, cdf >>> from sympy import Symbol >>> p = Symbol("p", positive=True) >>> a = Symbol("a", positive=True) >>> b = Symbol("b", positive=True) >>> z = Symbol("z") >>> X = Dagum("x", p, a, b) >>> density(X)(z) a*p*(z/b)**(a*p)*((z/b)**a + 1)**(-p - 1)/z >>> cdf(X)(z) Piecewise(((1 + (z/b)**(-a))**(-p), z >= 0), (0, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Dagum_distribution """ return rv(name, DagumDistribution, (p, a, b)) #------------------------------------------------------------------------------- # Erlang distribution ---------------------------------------------------------- def Erlang(name, k, l): r""" Create a continuous random variable with an Erlang distribution. The density of the Erlang distribution is given by .. math:: f(x) := \frac{\lambda^k x^{k-1} e^{-\lambda x}}{(k-1)!} with :math:`x \in [0,\infty]`. Parameters ========== k : Positive integer l : Real number, `\lambda > 0`, the rate Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Erlang, density, cdf, E, variance >>> from sympy import Symbol, simplify, pprint >>> k = Symbol("k", integer=True, positive=True) >>> l = Symbol("l", positive=True) >>> z = Symbol("z") >>> X = Erlang("x", k, l) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) k k - 1 -l*z l *z *e --------------- Gamma(k) >>> C = cdf(X)(z) >>> pprint(C, use_unicode=False) /lowergamma(k, l*z) |------------------ for z > 0 < Gamma(k) | \ 0 otherwise >>> E(X) k/l >>> simplify(variance(X)) k/l**2 References ========== .. [1] https://en.wikipedia.org/wiki/Erlang_distribution .. [2] http://mathworld.wolfram.com/ErlangDistribution.html """ return rv(name, GammaDistribution, (k, S.One/l)) # ------------------------------------------------------------------------------- # ExGaussian distribution ----------------------------------------------------- class ExGaussianDistribution(SingleContinuousDistribution): _argnames = ('mean', 'std', 'rate') set = Interval(-oo, oo) @staticmethod def check(mean, std, rate): _value_check( std > 0, "Standard deviation of ExGaussian must be positive.") _value_check(rate > 0, "Rate of ExGaussian must be positive.") def pdf(self, x): mean, std, rate = self.mean, self.std, self.rate term1 = rate/2 term2 = exp(rate * (2 * mean + rate * std**2 - 2*x)/2) term3 = erfc((mean + rate*std**2 - x)/(sqrt(2)*std)) return term1*term2*term3 def _cdf(self, x): from sympy.stats import cdf mean, std, rate = self.mean, self.std, self.rate u = rate*(x - mean) v = rate*std GaussianCDF1 = cdf(Normal('x', 0, v))(u) GaussianCDF2 = cdf(Normal('x', v**2, v))(u) return GaussianCDF1 - exp(-u + (v**2/2) + log(GaussianCDF2)) def _characteristic_function(self, t): mean, std, rate = self.mean, self.std, self.rate term1 = (1 - I*t/rate)**(-1) term2 = exp(I*mean*t - std**2*t**2/2) return term1 * term2 def _moment_generating_function(self, t): mean, std, rate = self.mean, self.std, self.rate term1 = (1 - t/rate)**(-1) term2 = exp(mean*t + std**2*t**2/2) return term1*term2 def ExGaussian(name, mean, std, rate): r""" Create a continuous random variable with an Exponentially modified Gaussian (EMG) distribution. The density of the exponentially modified Gaussian distribution is given by .. math:: f(x) := \frac{\lambda}{2}e^{\frac{\lambda}{2}(2\mu+\lambda\sigma^2-2x)} \text{erfc}(\frac{\mu + \lambda\sigma^2 - x}{\sqrt{2}\sigma}) with `x > 0`. Note that the expected value is `1/\lambda`. Parameters ========== mu : A Real number, the mean of Gaussian component std: A positive Real number, :math: `\sigma^2 > 0` the variance of Gaussian component lambda: A positive Real number, :math: `\lambda > 0` the rate of Exponential component Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import ExGaussian, density, cdf, E >>> from sympy.stats import variance, skewness >>> from sympy import Symbol, pprint, simplify >>> mean = Symbol("mu") >>> std = Symbol("sigma", positive=True) >>> rate = Symbol("lamda", positive=True) >>> z = Symbol("z") >>> X = ExGaussian("x", mean, std, rate) >>> pprint(density(X)(z), use_unicode=False) / 2 \ lamda*\lamda*sigma + 2*mu - 2*z/ --------------------------------- / ___ / 2 \\ 2 |\/ 2 *\lamda*sigma + mu - z/| lamda*e *erfc|-----------------------------| \ 2*sigma / ---------------------------------------------------------------------------- 2 >>> cdf(X)(z) -(erf(sqrt(2)*(-lamda**2*sigma**2 + lamda*(-mu + z))/(2*lamda*sigma))/2 + 1/2)*exp(lamda**2*sigma**2/2 - lamda*(-mu + z)) + erf(sqrt(2)*(-mu + z)/(2*sigma))/2 + 1/2 >>> E(X) (lamda*mu + 1)/lamda >>> simplify(variance(X)) sigma**2 + lamda**(-2) >>> simplify(skewness(X)) 2/(lamda**2*sigma**2 + 1)**(3/2) References ========== .. [1] https://en.wikipedia.org/wiki/Exponentially_modified_Gaussian_distribution """ return rv(name, ExGaussianDistribution, (mean, std, rate)) #------------------------------------------------------------------------------- # Exponential distribution ----------------------------------------------------- class ExponentialDistribution(SingleContinuousDistribution): _argnames = ('rate',) set = Interval(0, oo) @staticmethod def check(rate): _value_check(rate > 0, "Rate must be positive.") def pdf(self, x): return self.rate * exp(-self.rate*x) def sample(self): return random.expovariate(self.rate) def _cdf(self, x): return Piecewise( (S.One - exp(-self.rate*x), x >= 0), (0, True), ) def _characteristic_function(self, t): rate = self.rate return rate / (rate - I*t) def _moment_generating_function(self, t): rate = self.rate return rate / (rate - t) def _quantile(self, p): return -log(1-p)/self.rate def Exponential(name, rate): r""" Create a continuous random variable with an Exponential distribution. The density of the exponential distribution is given by .. math:: f(x) := \lambda \exp(-\lambda x) with `x > 0`. Note that the expected value is `1/\lambda`. Parameters ========== rate : A positive Real number, `\lambda > 0`, the rate (or inverse scale/inverse mean) Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Exponential, density, cdf, E >>> from sympy.stats import variance, std, skewness, quantile >>> from sympy import Symbol >>> l = Symbol("lambda", positive=True) >>> z = Symbol("z") >>> p = Symbol("p") >>> X = Exponential("x", l) >>> density(X)(z) lambda*exp(-lambda*z) >>> cdf(X)(z) Piecewise((1 - exp(-lambda*z), z >= 0), (0, True)) >>> quantile(X)(p) -log(1 - p)/lambda >>> E(X) 1/lambda >>> variance(X) lambda**(-2) >>> skewness(X) 2 >>> X = Exponential('x', 10) >>> density(X)(z) 10*exp(-10*z) >>> E(X) 1/10 >>> std(X) 1/10 References ========== .. [1] https://en.wikipedia.org/wiki/Exponential_distribution .. [2] http://mathworld.wolfram.com/ExponentialDistribution.html """ return rv(name, ExponentialDistribution, (rate, )) # ------------------------------------------------------------------------------- # Exponential Power distribution ----------------------------------------------------- class ExponentialPowerDistribution(SingleContinuousDistribution): _argnames = ('mu', 'alpha', 'beta') set = Interval(-oo, oo) @staticmethod def check(mu, alpha, beta): _value_check(alpha > 0, "Scale parameter alpha must be positive.") _value_check(beta > 0, "Shape parameter beta must be positive.") def pdf(self, x): mu, alpha, beta = self.mu, self.alpha, self.beta num = beta*exp(-(Abs(x - mu)/alpha)**beta) den = 2*alpha*gamma(1/beta) return num/den def _cdf(self, x): mu, alpha, beta = self.mu, self.alpha, self.beta num = lowergamma(1/beta, (Abs(x - mu) / alpha)**beta) den = 2*gamma(1/beta) return sign(x - mu)*num/den + S.Half def ExponentialPower(name, mu, alpha, beta): r""" Create a Continuous Random Variable with Exponential Power distribution. This distribution is known also as Generalized Normal distribution version 1 The density of the Exponential Power distribution is given by .. math:: f(x) := \frac{\beta}{2\alpha\Gamma(\frac{1}{\beta})} e^{{-(\frac{|x - \mu|}{\alpha})^{\beta}}} with :math:`x \in [ - \infty, \infty ]`. Parameters ========== mu : Real number, 'mu' is a location alpha : Real number, 'alpha > 0' is a scale beta : Real number, 'beta > 0' is a shape Returns ======= A RandomSymbol Examples ======== >>> from sympy.stats import ExponentialPower, density, E, variance, cdf >>> from sympy import Symbol, simplify, pprint >>> z = Symbol("z") >>> mu = Symbol("mu") >>> alpha = Symbol("alpha", positive=True) >>> beta = Symbol("beta", positive=True) >>> X = ExponentialPower("x", mu, alpha, beta) >>> pprint(density(X)(z), use_unicode=False) beta /|mu - z|\ -|--------| \ alpha / beta*e --------------------- / 1 \ 2*alpha*Gamma|----| \beta/ >>> cdf(X)(z) 1/2 + lowergamma(1/beta, (Abs(mu - z)/alpha)**beta)*sign(-mu + z)/(2*gamma(1/beta)) References ========== .. [1] https://reference.wolfram.com/language/ref/ExponentialPowerDistribution.html .. [2] https://en.wikipedia.org/wiki/Generalized_normal_distribution#Version_1 """ return rv(name, ExponentialPowerDistribution, (mu, alpha, beta)) #------------------------------------------------------------------------------- # F distribution --------------------------------------------------------------- class FDistributionDistribution(SingleContinuousDistribution): _argnames = ('d1', 'd2') set = Interval(0, oo) @staticmethod def check(d1, d2): _value_check((d1 > 0, d1.is_integer), "Degrees of freedom d1 must be positive integer.") _value_check((d2 > 0, d2.is_integer), "Degrees of freedom d2 must be positive integer.") def pdf(self, x): d1, d2 = self.d1, self.d2 return (sqrt((d1*x)**d1*d2**d2 / (d1*x+d2)**(d1+d2)) / (x * beta_fn(d1/2, d2/2))) def _moment_generating_function(self, t): raise NotImplementedError('The moment generating function for the ' 'F-distribution does not exist.') def FDistribution(name, d1, d2): r""" Create a continuous random variable with a F distribution. The density of the F distribution is given by .. math:: f(x) := \frac{\sqrt{\frac{(d_1 x)^{d_1} d_2^{d_2}} {(d_1 x + d_2)^{d_1 + d_2}}}} {x \mathrm{B} \left(\frac{d_1}{2}, \frac{d_2}{2}\right)} with :math:`x > 0`. Parameters ========== d1 : `d_1 > 0`, where d_1 is the degrees of freedom (n_1 - 1) d2 : `d_2 > 0`, where d_2 is the degrees of freedom (n_2 - 1) Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import FDistribution, density >>> from sympy import Symbol, simplify, pprint >>> d1 = Symbol("d1", positive=True) >>> d2 = Symbol("d2", positive=True) >>> z = Symbol("z") >>> X = FDistribution("x", d1, d2) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) d2 -- ______________________________ 2 / d1 -d1 - d2 d2 *\/ (d1*z) *(d1*z + d2) -------------------------------------- /d1 d2\ z*B|--, --| \2 2 / References ========== .. [1] https://en.wikipedia.org/wiki/F-distribution .. [2] http://mathworld.wolfram.com/F-Distribution.html """ return rv(name, FDistributionDistribution, (d1, d2)) #------------------------------------------------------------------------------- # Fisher Z distribution -------------------------------------------------------- class FisherZDistribution(SingleContinuousDistribution): _argnames = ('d1', 'd2') set = Interval(-oo, oo) @staticmethod def check(d1, d2): _value_check(d1 > 0, "Degree of freedom d1 must be positive.") _value_check(d2 > 0, "Degree of freedom d2 must be positive.") def pdf(self, x): d1, d2 = self.d1, self.d2 return (2*d1**(d1/2)*d2**(d2/2) / beta_fn(d1/2, d2/2) * exp(d1*x) / (d1*exp(2*x)+d2)**((d1+d2)/2)) def FisherZ(name, d1, d2): r""" Create a Continuous Random Variable with an Fisher's Z distribution. The density of the Fisher's Z distribution is given by .. math:: f(x) := \frac{2d_1^{d_1/2} d_2^{d_2/2}} {\mathrm{B}(d_1/2, d_2/2)} \frac{e^{d_1z}}{\left(d_1e^{2z}+d_2\right)^{\left(d_1+d_2\right)/2}} .. TODO - What is the difference between these degrees of freedom? Parameters ========== d1 : `d_1 > 0`, degree of freedom d2 : `d_2 > 0`, degree of freedom Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import FisherZ, density >>> from sympy import Symbol, simplify, pprint >>> d1 = Symbol("d1", positive=True) >>> d2 = Symbol("d2", positive=True) >>> z = Symbol("z") >>> X = FisherZ("x", d1, d2) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) d1 d2 d1 d2 - -- - -- -- -- 2 2 2 2 / 2*z \ d1*z 2*d1 *d2 *\d1*e + d2/ *e ----------------------------------------- /d1 d2\ B|--, --| \2 2 / References ========== .. [1] https://en.wikipedia.org/wiki/Fisher%27s_z-distribution .. [2] http://mathworld.wolfram.com/Fishersz-Distribution.html """ return rv(name, FisherZDistribution, (d1, d2)) #------------------------------------------------------------------------------- # Frechet distribution --------------------------------------------------------- class FrechetDistribution(SingleContinuousDistribution): _argnames = ('a', 's', 'm') set = Interval(0, oo) @staticmethod def check(a, s, m): _value_check(a > 0, "Shape parameter alpha must be positive.") _value_check(s > 0, "Scale parameter s must be positive.") def __new__(cls, a, s=1, m=0): a, s, m = list(map(sympify, (a, s, m))) return Basic.__new__(cls, a, s, m) def pdf(self, x): a, s, m = self.a, self.s, self.m return a/s * ((x-m)/s)**(-1-a) * exp(-((x-m)/s)**(-a)) def _cdf(self, x): a, s, m = self.a, self.s, self.m return Piecewise((exp(-((x-m)/s)**(-a)), x >= m), (S.Zero, True)) def Frechet(name, a, s=1, m=0): r""" Create a continuous random variable with a Frechet distribution. The density of the Frechet distribution is given by .. math:: f(x) := \frac{\alpha}{s} \left(\frac{x-m}{s}\right)^{-1-\alpha} e^{-(\frac{x-m}{s})^{-\alpha}} with :math:`x \geq m`. Parameters ========== a : Real number, :math:`a \in \left(0, \infty\right)` the shape s : Real number, :math:`s \in \left(0, \infty\right)` the scale m : Real number, :math:`m \in \left(-\infty, \infty\right)` the minimum Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Frechet, density, E, std, cdf >>> from sympy import Symbol, simplify >>> a = Symbol("a", positive=True) >>> s = Symbol("s", positive=True) >>> m = Symbol("m", real=True) >>> z = Symbol("z") >>> X = Frechet("x", a, s, m) >>> density(X)(z) a*((-m + z)/s)**(-a - 1)*exp(-((-m + z)/s)**(-a))/s >>> cdf(X)(z) Piecewise((exp(-((-m + z)/s)**(-a)), m <= z), (0, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Fr%C3%A9chet_distribution """ return rv(name, FrechetDistribution, (a, s, m)) #------------------------------------------------------------------------------- # Gamma distribution ----------------------------------------------------------- class GammaDistribution(SingleContinuousDistribution): _argnames = ('k', 'theta') set = Interval(0, oo) @staticmethod def check(k, theta): _value_check(k > 0, "k must be positive") _value_check(theta > 0, "Theta must be positive") def pdf(self, x): k, theta = self.k, self.theta return x**(k - 1) * exp(-x/theta) / (gamma(k)*theta**k) def sample(self): return random.gammavariate(self.k, self.theta) def _cdf(self, x): k, theta = self.k, self.theta return Piecewise( (lowergamma(k, S(x)/theta)/gamma(k), x > 0), (S.Zero, True)) def _characteristic_function(self, t): return (1 - self.theta*I*t)**(-self.k) def _moment_generating_function(self, t): return (1- self.theta*t)**(-self.k) def Gamma(name, k, theta): r""" Create a continuous random variable with a Gamma distribution. The density of the Gamma distribution is given by .. math:: f(x) := \frac{1}{\Gamma(k) \theta^k} x^{k - 1} e^{-\frac{x}{\theta}} with :math:`x \in [0,1]`. Parameters ========== k : Real number, `k > 0`, a shape theta : Real number, `\theta > 0`, a scale Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Gamma, density, cdf, E, variance >>> from sympy import Symbol, pprint, simplify >>> k = Symbol("k", positive=True) >>> theta = Symbol("theta", positive=True) >>> z = Symbol("z") >>> X = Gamma("x", k, theta) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) -z ----- -k k - 1 theta theta *z *e --------------------- Gamma(k) >>> C = cdf(X, meijerg=True)(z) >>> pprint(C, use_unicode=False) / / z \ |k*lowergamma|k, -----| | \ theta/ <---------------------- for z >= 0 | Gamma(k + 1) | \ 0 otherwise >>> E(X) k*theta >>> V = simplify(variance(X)) >>> pprint(V, use_unicode=False) 2 k*theta References ========== .. [1] https://en.wikipedia.org/wiki/Gamma_distribution .. [2] http://mathworld.wolfram.com/GammaDistribution.html """ return rv(name, GammaDistribution, (k, theta)) #------------------------------------------------------------------------------- # Inverse Gamma distribution --------------------------------------------------- class GammaInverseDistribution(SingleContinuousDistribution): _argnames = ('a', 'b') set = Interval(0, oo) @staticmethod def check(a, b): _value_check(a > 0, "alpha must be positive") _value_check(b > 0, "beta must be positive") def pdf(self, x): a, b = self.a, self.b return b**a/gamma(a) * x**(-a-1) * exp(-b/x) def _cdf(self, x): a, b = self.a, self.b return Piecewise((uppergamma(a,b/x)/gamma(a), x > 0), (S.Zero, True)) def sample(self): scipy = import_module('scipy') if scipy: from scipy.stats import invgamma return invgamma.rvs(float(self.a), 0, float(self.b)) else: raise NotImplementedError('Sampling the Inverse Gamma Distribution requires Scipy.') def _characteristic_function(self, t): a, b = self.a, self.b return 2 * (-I*b*t)**(a/2) * besselk(sqrt(-4*I*b*t)) / gamma(a) def _moment_generating_function(self, t): raise NotImplementedError('The moment generating function for the ' 'gamma inverse distribution does not exist.') def GammaInverse(name, a, b): r""" Create a continuous random variable with an inverse Gamma distribution. The density of the inverse Gamma distribution is given by .. math:: f(x) := \frac{\beta^\alpha}{\Gamma(\alpha)} x^{-\alpha - 1} \exp\left(\frac{-\beta}{x}\right) with :math:`x > 0`. Parameters ========== a : Real number, `a > 0` a shape b : Real number, `b > 0` a scale Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import GammaInverse, density, cdf, E, variance >>> from sympy import Symbol, pprint >>> a = Symbol("a", positive=True) >>> b = Symbol("b", positive=True) >>> z = Symbol("z") >>> X = GammaInverse("x", a, b) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) -b --- a -a - 1 z b *z *e --------------- Gamma(a) >>> cdf(X)(z) Piecewise((uppergamma(a, b/z)/gamma(a), z > 0), (0, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Inverse-gamma_distribution """ return rv(name, GammaInverseDistribution, (a, b)) #------------------------------------------------------------------------------- # Gumbel distribution (Maximum and Minimum) -------------------------------------------------------- class GumbelDistribution(SingleContinuousDistribution): _argnames = ('beta', 'mu', 'minimum') set = Interval(-oo, oo) @staticmethod def check(beta, mu, minimum): _value_check(beta > 0, "Scale parameter beta must be positive.") def pdf(self, x): beta, mu = self.beta, self.mu z = (x - mu)/beta f_max = (1/beta)*exp(-z - exp(-z)) f_min = (1/beta)*exp(z - exp(z)) return Piecewise((f_min, self.minimum), (f_max, not self.minimum)) def _cdf(self, x): beta, mu = self.beta, self.mu z = (x - mu)/beta F_max = exp(-exp(-z)) F_min = 1 - exp(-exp(z)) return Piecewise((F_min, self.minimum), (F_max, not self.minimum)) def _characteristic_function(self, t): cf_max = gamma(1 - I*self.beta*t) * exp(I*self.mu*t) cf_min = gamma(1 + I*self.beta*t) * exp(I*self.mu*t) return Piecewise((cf_min, self.minimum), (cf_max, not self.minimum)) def _moment_generating_function(self, t): mgf_max = gamma(1 - self.beta*t) * exp(self.mu*t) mgf_min = gamma(1 + self.beta*t) * exp(self.mu*t) return Piecewise((mgf_min, self.minimum), (mgf_max, not self.minimum)) def Gumbel(name, beta, mu, minimum=False): r""" Create a Continuous Random Variable with Gumbel distribution. The density of the Gumbel distribution is given by For Maximum .. math:: f(x) := \dfrac{1}{\beta} \exp \left( -\dfrac{x-\mu}{\beta} - \exp \left( -\dfrac{x - \mu}{\beta} \right) \right) with :math:`x \in [ - \infty, \infty ]`. For Minimum .. math:: f(x) := \frac{e^{- e^{\frac{- \mu + x}{\beta}} + \frac{- \mu + x}{\beta}}}{\beta} with :math:`x \in [ - \infty, \infty ]`. Parameters ========== mu : Real number, 'mu' is a location beta : Real number, 'beta > 0' is a scale minimum : Boolean, by default, False, set to True for enabling minimum distribution Returns ======= A RandomSymbol Examples ======== >>> from sympy.stats import Gumbel, density, E, variance, cdf >>> from sympy import Symbol, simplify, pprint >>> x = Symbol("x") >>> mu = Symbol("mu") >>> beta = Symbol("beta", positive=True) >>> X = Gumbel("x", beta, mu) >>> density(X)(x) exp(-exp(-(-mu + x)/beta) - (-mu + x)/beta)/beta >>> cdf(X)(x) exp(-exp(-(-mu + x)/beta)) References ========== .. [1] http://mathworld.wolfram.com/GumbelDistribution.html .. [2] https://en.wikipedia.org/wiki/Gumbel_distribution .. [3] http://www.mathwave.com/help/easyfit/html/analyses/distributions/gumbel_max.html .. [4] http://www.mathwave.com/help/easyfit/html/analyses/distributions/gumbel_min.html """ return rv(name, GumbelDistribution, (beta, mu, minimum)) #------------------------------------------------------------------------------- # Gompertz distribution -------------------------------------------------------- class GompertzDistribution(SingleContinuousDistribution): _argnames = ('b', 'eta') set = Interval(0, oo) @staticmethod def check(b, eta): _value_check(b > 0, "b must be positive") _value_check(eta > 0, "eta must be positive") def pdf(self, x): eta, b = self.eta, self.b return b*eta*exp(b*x)*exp(eta)*exp(-eta*exp(b*x)) def _cdf(self, x): eta, b = self.eta, self.b return 1 - exp(eta)*exp(-eta*exp(b*x)) def _moment_generating_function(self, t): eta, b = self.eta, self.b return eta * exp(eta) * expint(t/b, eta) def Gompertz(name, b, eta): r""" Create a Continuous Random Variable with Gompertz distribution. The density of the Gompertz distribution is given by .. math:: f(x) := b \eta e^{b x} e^{\eta} \exp \left(-\eta e^{bx} \right) with :math: 'x \in [0, \inf)'. Parameters ========== b: Real number, 'b > 0' a scale eta: Real number, 'eta > 0' a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Gompertz, density, E, variance >>> from sympy import Symbol, simplify, pprint >>> b = Symbol("b", positive=True) >>> eta = Symbol("eta", positive=True) >>> z = Symbol("z") >>> X = Gompertz("x", b, eta) >>> density(X)(z) b*eta*exp(eta)*exp(b*z)*exp(-eta*exp(b*z)) References ========== .. [1] https://en.wikipedia.org/wiki/Gompertz_distribution """ return rv(name, GompertzDistribution, (b, eta)) #------------------------------------------------------------------------------- # Kumaraswamy distribution ----------------------------------------------------- class KumaraswamyDistribution(SingleContinuousDistribution): _argnames = ('a', 'b') set = Interval(0, oo) @staticmethod def check(a, b): _value_check(a > 0, "a must be positive") _value_check(b > 0, "b must be positive") def pdf(self, x): a, b = self.a, self.b return a * b * x**(a-1) * (1-x**a)**(b-1) def _cdf(self, x): a, b = self.a, self.b return Piecewise( (S.Zero, x < S.Zero), (1 - (1 - x**a)**b, x <= S.One), (S.One, True)) def Kumaraswamy(name, a, b): r""" Create a Continuous Random Variable with a Kumaraswamy distribution. The density of the Kumaraswamy distribution is given by .. math:: f(x) := a b x^{a-1} (1-x^a)^{b-1} with :math:`x \in [0,1]`. Parameters ========== a : Real number, `a > 0` a shape b : Real number, `b > 0` a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Kumaraswamy, density, E, variance, cdf >>> from sympy import Symbol, simplify, pprint >>> a = Symbol("a", positive=True) >>> b = Symbol("b", positive=True) >>> z = Symbol("z") >>> X = Kumaraswamy("x", a, b) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) b - 1 a - 1 / a\ a*b*z *\1 - z / >>> cdf(X)(z) Piecewise((0, z < 0), (1 - (1 - z**a)**b, z <= 1), (1, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Kumaraswamy_distribution """ return rv(name, KumaraswamyDistribution, (a, b)) #------------------------------------------------------------------------------- # Laplace distribution --------------------------------------------------------- class LaplaceDistribution(SingleContinuousDistribution): _argnames = ('mu', 'b') set = Interval(-oo, oo) @staticmethod def check(mu, b): _value_check(b > 0, "Scale parameter b must be positive.") _value_check(mu.is_real, "Location parameter mu should be real") def pdf(self, x): mu, b = self.mu, self.b return 1/(2*b)*exp(-Abs(x - mu)/b) def _cdf(self, x): mu, b = self.mu, self.b return Piecewise( (S.Half*exp((x - mu)/b), x < mu), (S.One - S.Half*exp(-(x - mu)/b), x >= mu) ) def _characteristic_function(self, t): return exp(self.mu*I*t) / (1 + self.b**2*t**2) def _moment_generating_function(self, t): return exp(self.mu*t) / (1 - self.b**2*t**2) def Laplace(name, mu, b): r""" Create a continuous random variable with a Laplace distribution. The density of the Laplace distribution is given by .. math:: f(x) := \frac{1}{2 b} \exp \left(-\frac{|x-\mu|}b \right) Parameters ========== mu : Real number or a list/matrix, the location (mean) or the location vector b : Real number or a positive definite matrix, representing a scale or the covariance matrix. Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Laplace, density, cdf >>> from sympy import Symbol, pprint >>> mu = Symbol("mu") >>> b = Symbol("b", positive=True) >>> z = Symbol("z") >>> X = Laplace("x", mu, b) >>> density(X)(z) exp(-Abs(mu - z)/b)/(2*b) >>> cdf(X)(z) Piecewise((exp((-mu + z)/b)/2, mu > z), (1 - exp((mu - z)/b)/2, True)) >>> L = Laplace('L', [1, 2], [[1, 0], [0, 1]]) >>> pprint(density(L)(1, 2), use_unicode=False) 5 / ____\ e *besselk\0, \/ 35 / --------------------- pi References ========== .. [1] https://en.wikipedia.org/wiki/Laplace_distribution .. [2] http://mathworld.wolfram.com/LaplaceDistribution.html """ if isinstance(mu, (list, MatrixBase)) and\ isinstance(b, (list, MatrixBase)): from sympy.stats.joint_rv_types import MultivariateLaplaceDistribution return multivariate_rv( MultivariateLaplaceDistribution, name, mu, b) return rv(name, LaplaceDistribution, (mu, b)) #------------------------------------------------------------------------------- # Logistic distribution -------------------------------------------------------- class LogisticDistribution(SingleContinuousDistribution): _argnames = ('mu', 's') set = Interval(-oo, oo) @staticmethod def check(mu, s): _value_check(s > 0, "Scale parameter s must be positive.") def pdf(self, x): mu, s = self.mu, self.s return exp(-(x - mu)/s)/(s*(1 + exp(-(x - mu)/s))**2) def _cdf(self, x): mu, s = self.mu, self.s return S.One/(1 + exp(-(x - mu)/s)) def _characteristic_function(self, t): return Piecewise((exp(I*t*self.mu) * pi*self.s*t / sinh(pi*self.s*t), Ne(t, 0)), (S.One, True)) def _moment_generating_function(self, t): return exp(self.mu*t) * beta_fn(1 - self.s*t, 1 + self.s*t) def _quantile(self, p): return self.mu - self.s*log(-S.One + S.One/p) def Logistic(name, mu, s): r""" Create a continuous random variable with a logistic distribution. The density of the logistic distribution is given by .. math:: f(x) := \frac{e^{-(x-\mu)/s}} {s\left(1+e^{-(x-\mu)/s}\right)^2} Parameters ========== mu : Real number, the location (mean) s : Real number, `s > 0` a scale Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Logistic, density, cdf >>> from sympy import Symbol >>> mu = Symbol("mu", real=True) >>> s = Symbol("s", positive=True) >>> z = Symbol("z") >>> X = Logistic("x", mu, s) >>> density(X)(z) exp((mu - z)/s)/(s*(exp((mu - z)/s) + 1)**2) >>> cdf(X)(z) 1/(exp((mu - z)/s) + 1) References ========== .. [1] https://en.wikipedia.org/wiki/Logistic_distribution .. [2] http://mathworld.wolfram.com/LogisticDistribution.html """ return rv(name, LogisticDistribution, (mu, s)) #------------------------------------------------------------------------------- # Log-logistic distribution -------------------------------------------------------- class LogLogisticDistribution(SingleContinuousDistribution): _argnames = ('alpha', 'beta') set = Interval(0, oo) @staticmethod def check(alpha, beta): _value_check(alpha > 0, "Scale parameter Alpha must be positive.") _value_check(beta > 0, "Shape parameter Beta must be positive.") def pdf(self, x): a, b = self.alpha, self.beta return ((b/a)*(x/a)**(b - 1))/(1 + (x/a)**b)**2 def _cdf(self, x): a, b = self.alpha, self.beta return 1/(1 + (x/a)**(-b)) def _quantile(self, p): a, b = self.alpha, self.beta return a*((p/(1 - p))**(1/b)) def expectation(self, expr, var, **kwargs): a, b = self.args return Piecewise((S.NaN, b <= 1), (pi*a/(b*sin(pi/b)), True)) def LogLogistic(name, alpha, beta): r""" Create a continuous random variable with a log-logistic distribution. The distribution is unimodal when `beta > 1`. The density of the log-logistic distribution is given by .. math:: f(x) := \frac{(\frac{\beta}{\alpha})(\frac{x}{\alpha})^{\beta - 1}} {(1 + (\frac{x}{\alpha})^{\beta})^2} Parameters ========== alpha : Real number, `\alpha > 0`, scale parameter and median of distribution beta : Real number, `\beta > 0` a shape parameter Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import LogLogistic, density, cdf, quantile >>> from sympy import Symbol, pprint >>> alpha = Symbol("alpha", real=True, positive=True) >>> beta = Symbol("beta", real=True, positive=True) >>> p = Symbol("p") >>> z = Symbol("z", positive=True) >>> X = LogLogistic("x", alpha, beta) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) beta - 1 / z \ beta*|-----| \alpha/ ------------------------ 2 / beta \ |/ z \ | alpha*||-----| + 1| \\alpha/ / >>> cdf(X)(z) 1/(1 + (z/alpha)**(-beta)) >>> quantile(X)(p) alpha*(p/(1 - p))**(1/beta) References ========== .. [1] https://en.wikipedia.org/wiki/Log-logistic_distribution """ return rv(name, LogLogisticDistribution, (alpha, beta)) #------------------------------------------------------------------------------- # Log Normal distribution ------------------------------------------------------ class LogNormalDistribution(SingleContinuousDistribution): _argnames = ('mean', 'std') set = Interval(0, oo) @staticmethod def check(mean, std): _value_check(std > 0, "Parameter std must be positive.") def pdf(self, x): mean, std = self.mean, self.std return exp(-(log(x) - mean)**2 / (2*std**2)) / (x*sqrt(2*pi)*std) def sample(self): return random.lognormvariate(self.mean, self.std) def _cdf(self, x): mean, std = self.mean, self.std return Piecewise( (S.Half + S.Half*erf((log(x) - mean)/sqrt(2)/std), x > 0), (S.Zero, True) ) def _moment_generating_function(self, t): raise NotImplementedError('Moment generating function of the log-normal distribution is not defined.') def LogNormal(name, mean, std): r""" Create a continuous random variable with a log-normal distribution. The density of the log-normal distribution is given by .. math:: f(x) := \frac{1}{x\sqrt{2\pi\sigma^2}} e^{-\frac{\left(\ln x-\mu\right)^2}{2\sigma^2}} with :math:`x \geq 0`. Parameters ========== mu : Real number, the log-scale sigma : Real number, :math:`\sigma^2 > 0` a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import LogNormal, density >>> from sympy import Symbol, simplify, pprint >>> mu = Symbol("mu", real=True) >>> sigma = Symbol("sigma", positive=True) >>> z = Symbol("z") >>> X = LogNormal("x", mu, sigma) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) 2 -(-mu + log(z)) ----------------- 2 ___ 2*sigma \/ 2 *e ------------------------ ____ 2*\/ pi *sigma*z >>> X = LogNormal('x', 0, 1) # Mean 0, standard deviation 1 >>> density(X)(z) sqrt(2)*exp(-log(z)**2/2)/(2*sqrt(pi)*z) References ========== .. [1] https://en.wikipedia.org/wiki/Lognormal .. [2] http://mathworld.wolfram.com/LogNormalDistribution.html """ return rv(name, LogNormalDistribution, (mean, std)) #------------------------------------------------------------------------------- # Maxwell distribution --------------------------------------------------------- class MaxwellDistribution(SingleContinuousDistribution): _argnames = ('a',) set = Interval(0, oo) @staticmethod def check(a): _value_check(a > 0, "Parameter a must be positive.") def pdf(self, x): a = self.a return sqrt(2/pi)*x**2*exp(-x**2/(2*a**2))/a**3 def _cdf(self, x): a = self.a return erf(sqrt(2)*x/(2*a)) - sqrt(2)*x*exp(-x**2/(2*a**2))/(sqrt(pi)*a) def Maxwell(name, a): r""" Create a continuous random variable with a Maxwell distribution. The density of the Maxwell distribution is given by .. math:: f(x) := \sqrt{\frac{2}{\pi}} \frac{x^2 e^{-x^2/(2a^2)}}{a^3} with :math:`x \geq 0`. .. TODO - what does the parameter mean? Parameters ========== a : Real number, `a > 0` Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Maxwell, density, E, variance >>> from sympy import Symbol, simplify >>> a = Symbol("a", positive=True) >>> z = Symbol("z") >>> X = Maxwell("x", a) >>> density(X)(z) sqrt(2)*z**2*exp(-z**2/(2*a**2))/(sqrt(pi)*a**3) >>> E(X) 2*sqrt(2)*a/sqrt(pi) >>> simplify(variance(X)) a**2*(-8 + 3*pi)/pi References ========== .. [1] https://en.wikipedia.org/wiki/Maxwell_distribution .. [2] http://mathworld.wolfram.com/MaxwellDistribution.html """ return rv(name, MaxwellDistribution, (a, )) #------------------------------------------------------------------------------- # Nakagami distribution -------------------------------------------------------- class NakagamiDistribution(SingleContinuousDistribution): _argnames = ('mu', 'omega') set = Interval(0, oo) @staticmethod def check(mu, omega): _value_check(mu >= S.Half, "Shape parameter mu must be greater than equal to 1/2.") _value_check(omega > 0, "Spread parameter omega must be positive.") def pdf(self, x): mu, omega = self.mu, self.omega return 2*mu**mu/(gamma(mu)*omega**mu)*x**(2*mu - 1)*exp(-mu/omega*x**2) def _cdf(self, x): mu, omega = self.mu, self.omega return Piecewise( (lowergamma(mu, (mu/omega)*x**2)/gamma(mu), x > 0), (S.Zero, True)) def Nakagami(name, mu, omega): r""" Create a continuous random variable with a Nakagami distribution. The density of the Nakagami distribution is given by .. math:: f(x) := \frac{2\mu^\mu}{\Gamma(\mu)\omega^\mu} x^{2\mu-1} \exp\left(-\frac{\mu}{\omega}x^2 \right) with :math:`x > 0`. Parameters ========== mu : Real number, `\mu \geq \frac{1}{2}` a shape omega : Real number, `\omega > 0`, the spread Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Nakagami, density, E, variance, cdf >>> from sympy import Symbol, simplify, pprint >>> mu = Symbol("mu", positive=True) >>> omega = Symbol("omega", positive=True) >>> z = Symbol("z") >>> X = Nakagami("x", mu, omega) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) 2 -mu*z ------- mu -mu 2*mu - 1 omega 2*mu *omega *z *e ---------------------------------- Gamma(mu) >>> simplify(E(X)) sqrt(mu)*sqrt(omega)*gamma(mu + 1/2)/gamma(mu + 1) >>> V = simplify(variance(X)) >>> pprint(V, use_unicode=False) 2 omega*Gamma (mu + 1/2) omega - ----------------------- Gamma(mu)*Gamma(mu + 1) >>> cdf(X)(z) Piecewise((lowergamma(mu, mu*z**2/omega)/gamma(mu), z > 0), (0, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Nakagami_distribution """ return rv(name, NakagamiDistribution, (mu, omega)) #------------------------------------------------------------------------------- # Normal distribution ---------------------------------------------------------- class NormalDistribution(SingleContinuousDistribution): _argnames = ('mean', 'std') @staticmethod def check(mean, std): _value_check(std > 0, "Standard deviation must be positive") def pdf(self, x): return exp(-(x - self.mean)**2 / (2*self.std**2)) / (sqrt(2*pi)*self.std) def sample(self): return random.normalvariate(self.mean, self.std) def _cdf(self, x): mean, std = self.mean, self.std return erf(sqrt(2)*(-mean + x)/(2*std))/2 + S.Half def _characteristic_function(self, t): mean, std = self.mean, self.std return exp(I*mean*t - std**2*t**2/2) def _moment_generating_function(self, t): mean, std = self.mean, self.std return exp(mean*t + std**2*t**2/2) def _quantile(self, p): mean, std = self.mean, self.std return mean + std*sqrt(2)*erfinv(2*p - 1) def Normal(name, mean, std): r""" Create a continuous random variable with a Normal distribution. The density of the Normal distribution is given by .. math:: f(x) := \frac{1}{\sigma\sqrt{2\pi}} e^{ -\frac{(x-\mu)^2}{2\sigma^2} } Parameters ========== mu : Real number or a list representing the mean or the mean vector sigma : Real number or a positive definite square matrix, :math:`\sigma^2 > 0` the variance Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Normal, density, E, std, cdf, skewness, quantile >>> from sympy import Symbol, simplify, pprint, factor, together, factor_terms >>> mu = Symbol("mu") >>> sigma = Symbol("sigma", positive=True) >>> z = Symbol("z") >>> y = Symbol("y") >>> p = Symbol("p") >>> X = Normal("x", mu, sigma) >>> density(X)(z) sqrt(2)*exp(-(-mu + z)**2/(2*sigma**2))/(2*sqrt(pi)*sigma) >>> C = simplify(cdf(X))(z) # it needs a little more help... >>> pprint(C, use_unicode=False) / ___ \ |\/ 2 *(-mu + z)| erf|---------------| \ 2*sigma / 1 -------------------- + - 2 2 >>> quantile(X)(p) mu + sqrt(2)*sigma*erfinv(2*p - 1) >>> simplify(skewness(X)) 0 >>> X = Normal("x", 0, 1) # Mean 0, standard deviation 1 >>> density(X)(z) sqrt(2)*exp(-z**2/2)/(2*sqrt(pi)) >>> E(2*X + 1) 1 >>> simplify(std(2*X + 1)) 2 >>> m = Normal('X', [1, 2], [[2, 1], [1, 2]]) >>> from sympy.stats.joint_rv import marginal_distribution >>> pprint(density(m)(y, z), use_unicode=False) /1 y\ /2*y z\ / z\ / y 2*z \ |- - -|*|--- - -| + |1 - -|*|- - + --- - 1| ___ \2 2/ \ 3 3/ \ 2/ \ 3 3 / \/ 3 *e -------------------------------------------------- 6*pi >>> marginal_distribution(m, m[0])(1) 1/(2*sqrt(pi)) References ========== .. [1] https://en.wikipedia.org/wiki/Normal_distribution .. [2] http://mathworld.wolfram.com/NormalDistributionFunction.html """ if isinstance(mean, (list, MatrixBase)) and\ isinstance(std, (list, MatrixBase)): from sympy.stats.joint_rv_types import MultivariateNormalDistribution return multivariate_rv( MultivariateNormalDistribution, name, mean, std) return rv(name, NormalDistribution, (mean, std)) #------------------------------------------------------------------------------- # Inverse Gaussian distribution ---------------------------------------------------------- class GaussianInverseDistribution(SingleContinuousDistribution): _argnames = ('mean', 'shape') @property def set(self): return Interval(0, oo) @staticmethod def check(mean, shape): _value_check(shape > 0, "Shape parameter must be positive") _value_check(mean > 0, "Mean must be positive") def pdf(self, x): mu, s = self.mean, self.shape return exp(-s*(x - mu)**2 / (2*x*mu**2)) * sqrt(s/((2*pi*x**3))) def sample(self): scipy = import_module('scipy') if scipy: from scipy.stats import invgauss return invgauss.rvs(float(self.mean/self.shape), 0, float(self.shape)) else: raise NotImplementedError( 'Sampling the Inverse Gaussian Distribution requires Scipy.') def _cdf(self, x): from sympy.stats import cdf mu, s = self.mean, self.shape stdNormalcdf = cdf(Normal('x', 0, 1)) first_term = stdNormalcdf(sqrt(s/x) * ((x/mu) - S.One)) second_term = exp(2*s/mu) * stdNormalcdf(-sqrt(s/x)*(x/mu + S.One)) return first_term + second_term def _characteristic_function(self, t): mu, s = self.mean, self.shape return exp((s/mu)*(1 - sqrt(1 - (2*mu**2*I*t)/s))) def _moment_generating_function(self, t): mu, s = self.mean, self.shape return exp((s/mu)*(1 - sqrt(1 - (2*mu**2*t)/s))) def GaussianInverse(name, mean, shape): r""" Create a continuous random variable with an Inverse Gaussian distribution. Inverse Gaussian distribution is also known as Wald distribution. The density of the Inverse Gaussian distribution is given by .. math:: f(x) := \sqrt{\frac{\lambda}{2\pi x^3}} e^{-\frac{\lambda(x-\mu)^2}{2x\mu^2}} Parameters ========== mu : Positive number representing the mean lambda : Positive number representing the shape parameter Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import GaussianInverse, density, cdf, E, std, skewness >>> from sympy import Symbol, pprint >>> mu = Symbol("mu", positive=True) >>> lamda = Symbol("lambda", positive=True) >>> z = Symbol("z", positive=True) >>> X = GaussianInverse("x", mu, lamda) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) 2 -lambda*(-mu + z) ------------------- 2 ___ ________ 2*mu *z \/ 2 *\/ lambda *e ------------------------------------- ____ 3/2 2*\/ pi *z >>> E(X) mu >>> std(X).expand() mu**(3/2)/sqrt(lambda) >>> skewness(X).expand() 3*sqrt(mu)/sqrt(lambda) References ========== .. [1] https://en.wikipedia.org/wiki/Inverse_Gaussian_distribution .. [2] http://mathworld.wolfram.com/InverseGaussianDistribution.html """ return rv(name, GaussianInverseDistribution, (mean, shape)) Wald = GaussianInverse #------------------------------------------------------------------------------- # Pareto distribution ---------------------------------------------------------- class ParetoDistribution(SingleContinuousDistribution): _argnames = ('xm', 'alpha') @property def set(self): return Interval(self.xm, oo) @staticmethod def check(xm, alpha): _value_check(xm > 0, "Xm must be positive") _value_check(alpha > 0, "Alpha must be positive") def pdf(self, x): xm, alpha = self.xm, self.alpha return alpha * xm**alpha / x**(alpha + 1) def sample(self): return random.paretovariate(self.alpha) def _cdf(self, x): xm, alpha = self.xm, self.alpha return Piecewise( (S.One - xm**alpha/x**alpha, x>=xm), (0, True), ) def _moment_generating_function(self, t): xm, alpha = self.xm, self.alpha return alpha * (-xm*t)**alpha * uppergamma(-alpha, -xm*t) def _characteristic_function(self, t): xm, alpha = self.xm, self.alpha return alpha * (-I * xm * t) ** alpha * uppergamma(-alpha, -I * xm * t) def Pareto(name, xm, alpha): r""" Create a continuous random variable with the Pareto distribution. The density of the Pareto distribution is given by .. math:: f(x) := \frac{\alpha\,x_m^\alpha}{x^{\alpha+1}} with :math:`x \in [x_m,\infty]`. Parameters ========== xm : Real number, `x_m > 0`, a scale alpha : Real number, `\alpha > 0`, a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Pareto, density >>> from sympy import Symbol >>> xm = Symbol("xm", positive=True) >>> beta = Symbol("beta", positive=True) >>> z = Symbol("z") >>> X = Pareto("x", xm, beta) >>> density(X)(z) beta*xm**beta*z**(-beta - 1) References ========== .. [1] https://en.wikipedia.org/wiki/Pareto_distribution .. [2] http://mathworld.wolfram.com/ParetoDistribution.html """ return rv(name, ParetoDistribution, (xm, alpha)) #------------------------------------------------------------------------------- # QuadraticU distribution ------------------------------------------------------ class QuadraticUDistribution(SingleContinuousDistribution): _argnames = ('a', 'b') @property def set(self): return Interval(self.a, self.b) @staticmethod def check(a, b): _value_check(b > a, "Parameter b must be in range (%s, oo)."%(a)) def pdf(self, x): a, b = self.a, self.b alpha = 12 / (b-a)**3 beta = (a+b) / 2 return Piecewise( (alpha * (x-beta)**2, And(a<=x, x<=b)), (S.Zero, True)) def _moment_generating_function(self, t): a, b = self.a, self.b return -3 * (exp(a*t) * (4 + (a**2 + 2*a*(-2 + b) + b**2) * t) - exp(b*t) * (4 + (-4*b + (a + b)**2) * t)) / ((a-b)**3 * t**2) def _characteristic_function(self, t): def _moment_generating_function(self, t): a, b = self.a, self.b return -3*I*(exp(I*a*t*exp(I*b*t)) * (4*I - (-4*b + (a+b)**2)*t)) / ((a-b)**3 * t**2) def QuadraticU(name, a, b): r""" Create a Continuous Random Variable with a U-quadratic distribution. The density of the U-quadratic distribution is given by .. math:: f(x) := \alpha (x-\beta)^2 with :math:`x \in [a,b]`. Parameters ========== a : Real number b : Real number, :math:`a < b` Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import QuadraticU, density, E, variance >>> from sympy import Symbol, simplify, factor, pprint >>> a = Symbol("a", real=True) >>> b = Symbol("b", real=True) >>> z = Symbol("z") >>> X = QuadraticU("x", a, b) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) / 2 | / a b \ |12*|- - - - + z| | \ 2 2 / <----------------- for And(b >= z, a <= z) | 3 | (-a + b) | \ 0 otherwise References ========== .. [1] https://en.wikipedia.org/wiki/U-quadratic_distribution """ return rv(name, QuadraticUDistribution, (a, b)) #------------------------------------------------------------------------------- # RaisedCosine distribution ---------------------------------------------------- class RaisedCosineDistribution(SingleContinuousDistribution): _argnames = ('mu', 's') @property def set(self): return Interval(self.mu - self.s, self.mu + self.s) @staticmethod def check(mu, s): _value_check(s > 0, "s must be positive") def pdf(self, x): mu, s = self.mu, self.s return Piecewise( ((1+cos(pi*(x-mu)/s)) / (2*s), And(mu-s<=x, x<=mu+s)), (S.Zero, True)) def _characteristic_function(self, t): mu, s = self.mu, self.s return Piecewise((exp(-I*pi*mu/s)/2, Eq(t, -pi/s)), (exp(I*pi*mu/s)/2, Eq(t, pi/s)), (pi**2*sin(s*t)*exp(I*mu*t) / (s*t*(pi**2 - s**2*t**2)), True)) def _moment_generating_function(self, t): mu, s = self.mu, self.s return pi**2 * sinh(s*t) * exp(mu*t) / (s*t*(pi**2 + s**2*t**2)) def RaisedCosine(name, mu, s): r""" Create a Continuous Random Variable with a raised cosine distribution. The density of the raised cosine distribution is given by .. math:: f(x) := \frac{1}{2s}\left(1+\cos\left(\frac{x-\mu}{s}\pi\right)\right) with :math:`x \in [\mu-s,\mu+s]`. Parameters ========== mu : Real number s : Real number, `s > 0` Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import RaisedCosine, density, E, variance >>> from sympy import Symbol, simplify, pprint >>> mu = Symbol("mu", real=True) >>> s = Symbol("s", positive=True) >>> z = Symbol("z") >>> X = RaisedCosine("x", mu, s) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) / /pi*(-mu + z)\ |cos|------------| + 1 | \ s / <--------------------- for And(z >= mu - s, z <= mu + s) | 2*s | \ 0 otherwise References ========== .. [1] https://en.wikipedia.org/wiki/Raised_cosine_distribution """ return rv(name, RaisedCosineDistribution, (mu, s)) #------------------------------------------------------------------------------- # Rayleigh distribution -------------------------------------------------------- class RayleighDistribution(SingleContinuousDistribution): _argnames = ('sigma',) set = Interval(0, oo) @staticmethod def check(sigma): _value_check(sigma > 0, "Scale parameter sigma must be positive.") def pdf(self, x): sigma = self.sigma return x/sigma**2*exp(-x**2/(2*sigma**2)) def _cdf(self, x): sigma = self.sigma return 1 - exp(-(x**2/(2*sigma**2))) def _characteristic_function(self, t): sigma = self.sigma return 1 - sigma*t*exp(-sigma**2*t**2/2) * sqrt(pi/2) * (erfi(sigma*t/sqrt(2)) - I) def _moment_generating_function(self, t): sigma = self.sigma return 1 + sigma*t*exp(sigma**2*t**2/2) * sqrt(pi/2) * (erf(sigma*t/sqrt(2)) + 1) def Rayleigh(name, sigma): r""" Create a continuous random variable with a Rayleigh distribution. The density of the Rayleigh distribution is given by .. math :: f(x) := \frac{x}{\sigma^2} e^{-x^2/2\sigma^2} with :math:`x > 0`. Parameters ========== sigma : Real number, `\sigma > 0` Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Rayleigh, density, E, variance >>> from sympy import Symbol, simplify >>> sigma = Symbol("sigma", positive=True) >>> z = Symbol("z") >>> X = Rayleigh("x", sigma) >>> density(X)(z) z*exp(-z**2/(2*sigma**2))/sigma**2 >>> E(X) sqrt(2)*sqrt(pi)*sigma/2 >>> variance(X) -pi*sigma**2/2 + 2*sigma**2 References ========== .. [1] https://en.wikipedia.org/wiki/Rayleigh_distribution .. [2] http://mathworld.wolfram.com/RayleighDistribution.html """ return rv(name, RayleighDistribution, (sigma, )) #------------------------------------------------------------------------------- # Shifted Gompertz distribution ------------------------------------------------ class ShiftedGompertzDistribution(SingleContinuousDistribution): _argnames = ('b', 'eta') set = Interval(0, oo) @staticmethod def check(b, eta): _value_check(b > 0, "b must be positive") _value_check(eta > 0, "eta must be positive") def pdf(self, x): b, eta = self.b, self.eta return b*exp(-b*x)*exp(-eta*exp(-b*x))*(1+eta*(1-exp(-b*x))) def ShiftedGompertz(name, b, eta): r""" Create a continuous random variable with a Shifted Gompertz distribution. The density of the Shifted Gompertz distribution is given by .. math:: f(x) := b e^{-b x} e^{-\eta \exp(-b x)} \left[1 + \eta(1 - e^(-bx)) \right] with :math: 'x \in [0, \inf)'. Parameters ========== b: Real number, 'b > 0' a scale eta: Real number, 'eta > 0' a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import ShiftedGompertz, density, E, variance >>> from sympy import Symbol >>> b = Symbol("b", positive=True) >>> eta = Symbol("eta", positive=True) >>> x = Symbol("x") >>> X = ShiftedGompertz("x", b, eta) >>> density(X)(x) b*(eta*(1 - exp(-b*x)) + 1)*exp(-b*x)*exp(-eta*exp(-b*x)) References ========== .. [1] https://en.wikipedia.org/wiki/Shifted_Gompertz_distribution """ return rv(name, ShiftedGompertzDistribution, (b, eta)) #------------------------------------------------------------------------------- # StudentT distribution -------------------------------------------------------- class StudentTDistribution(SingleContinuousDistribution): _argnames = ('nu',) set = Interval(-oo, oo) @staticmethod def check(nu): _value_check(nu > 0, "Degrees of freedom nu must be positive.") def pdf(self, x): nu = self.nu return 1/(sqrt(nu)*beta_fn(S(1)/2, nu/2))*(1 + x**2/nu)**(-(nu + 1)/2) def _cdf(self, x): nu = self.nu return S.Half + x*gamma((nu+1)/2)*hyper((S.Half, (nu+1)/2), (S(3)/2,), -x**2/nu)/(sqrt(pi*nu)*gamma(nu/2)) def _moment_generating_function(self, t): raise NotImplementedError('The moment generating function for the Student-T distribution is undefined.') def StudentT(name, nu): r""" Create a continuous random variable with a student's t distribution. The density of the student's t distribution is given by .. math:: f(x) := \frac{\Gamma \left(\frac{\nu+1}{2} \right)} {\sqrt{\nu\pi}\Gamma \left(\frac{\nu}{2} \right)} \left(1+\frac{x^2}{\nu} \right)^{-\frac{\nu+1}{2}} Parameters ========== nu : Real number, `\nu > 0`, the degrees of freedom Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import StudentT, density, E, variance, cdf >>> from sympy import Symbol, simplify, pprint >>> nu = Symbol("nu", positive=True) >>> z = Symbol("z") >>> X = StudentT("x", nu) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) nu 1 - -- - - 2 2 / 2\ | z | |1 + --| \ nu/ ----------------- ____ / nu\ \/ nu *B|1/2, --| \ 2 / >>> cdf(X)(z) 1/2 + z*gamma(nu/2 + 1/2)*hyper((1/2, nu/2 + 1/2), (3/2,), -z**2/nu)/(sqrt(pi)*sqrt(nu)*gamma(nu/2)) References ========== .. [1] https://en.wikipedia.org/wiki/Student_t-distribution .. [2] http://mathworld.wolfram.com/Studentst-Distribution.html """ return rv(name, StudentTDistribution, (nu, )) #------------------------------------------------------------------------------- # Trapezoidal distribution ------------------------------------------------------ class TrapezoidalDistribution(SingleContinuousDistribution): _argnames = ('a', 'b', 'c', 'd') @property def set(self): return Interval(self.a, self.d) @staticmethod def check(a, b, c, d): _value_check(a < d, "Lower bound parameter a < %s. a = %s"%(d, a)) _value_check((a <= b, b < c), "Level start parameter b must be in range [%s, %s). b = %s"%(a, c, b)) _value_check((b < c, c <= d), "Level end parameter c must be in range (%s, %s]. c = %s"%(b, d, c)) _value_check(d >= c, "Upper bound parameter d > %s. d = %s"%(c, d)) def pdf(self, x): a, b, c, d = self.a, self.b, self.c, self.d return Piecewise( (2*(x-a) / ((b-a)*(d+c-a-b)), And(a <= x, x < b)), (2 / (d+c-a-b), And(b <= x, x < c)), (2*(d-x) / ((d-c)*(d+c-a-b)), And(c <= x, x <= d)), (S.Zero, True)) def Trapezoidal(name, a, b, c, d): r""" Create a continuous random variable with a trapezoidal distribution. The density of the trapezoidal distribution is given by .. math:: f(x) := \begin{cases} 0 & \mathrm{for\ } x < a, \\ \frac{2(x-a)}{(b-a)(d+c-a-b)} & \mathrm{for\ } a \le x < b, \\ \frac{2}{d+c-a-b} & \mathrm{for\ } b \le x < c, \\ \frac{2(d-x)}{(d-c)(d+c-a-b)} & \mathrm{for\ } c \le x < d, \\ 0 & \mathrm{for\ } d < x. \end{cases} Parameters ========== a : Real number, :math:`a < d` b : Real number, :math:`a <= b < c` c : Real number, :math:`b < c <= d` d : Real number Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Trapezoidal, density, E >>> from sympy import Symbol, pprint >>> a = Symbol("a") >>> b = Symbol("b") >>> c = Symbol("c") >>> d = Symbol("d") >>> z = Symbol("z") >>> X = Trapezoidal("x", a,b,c,d) >>> pprint(density(X)(z), use_unicode=False) / -2*a + 2*z |------------------------- for And(a <= z, b > z) |(-a + b)*(-a - b + c + d) | | 2 | -------------- for And(b <= z, c > z) < -a - b + c + d | | 2*d - 2*z |------------------------- for And(d >= z, c <= z) |(-c + d)*(-a - b + c + d) | \ 0 otherwise References ========== .. [1] https://en.wikipedia.org/wiki/Trapezoidal_distribution """ return rv(name, TrapezoidalDistribution, (a, b, c, d)) #------------------------------------------------------------------------------- # Triangular distribution ------------------------------------------------------ class TriangularDistribution(SingleContinuousDistribution): _argnames = ('a', 'b', 'c') @property def set(self): return Interval(self.a, self.b) @staticmethod def check(a, b, c): _value_check(b > a, "Parameter b > %s. b = %s"%(a, b)) _value_check((a <= c, c <= b), "Parameter c must be in range [%s, %s]. c = %s"%(a, b, c)) def pdf(self, x): a, b, c = self.a, self.b, self.c return Piecewise( (2*(x - a)/((b - a)*(c - a)), And(a <= x, x < c)), (2/(b - a), Eq(x, c)), (2*(b - x)/((b - a)*(b - c)), And(c < x, x <= b)), (S.Zero, True)) def _characteristic_function(self, t): a, b, c = self.a, self.b, self.c return -2 *((b-c) * exp(I*a*t) - (b-a) * exp(I*c*t) + (c-a) * exp(I*b*t)) / ((b-a)*(c-a)*(b-c)*t**2) def _moment_generating_function(self, t): a, b, c = self.a, self.b, self.c return 2 * ((b - c) * exp(a * t) - (b - a) * exp(c * t) + (c - a) * exp(b * t)) / ( (b - a) * (c - a) * (b - c) * t ** 2) def Triangular(name, a, b, c): r""" Create a continuous random variable with a triangular distribution. The density of the triangular distribution is given by .. math:: f(x) := \begin{cases} 0 & \mathrm{for\ } x < a, \\ \frac{2(x-a)}{(b-a)(c-a)} & \mathrm{for\ } a \le x < c, \\ \frac{2}{b-a} & \mathrm{for\ } x = c, \\ \frac{2(b-x)}{(b-a)(b-c)} & \mathrm{for\ } c < x \le b, \\ 0 & \mathrm{for\ } b < x. \end{cases} Parameters ========== a : Real number, :math:`a \in \left(-\infty, \infty\right)` b : Real number, :math:`a < b` c : Real number, :math:`a \leq c \leq b` Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Triangular, density, E >>> from sympy import Symbol, pprint >>> a = Symbol("a") >>> b = Symbol("b") >>> c = Symbol("c") >>> z = Symbol("z") >>> X = Triangular("x", a,b,c) >>> pprint(density(X)(z), use_unicode=False) / -2*a + 2*z |----------------- for And(a <= z, c > z) |(-a + b)*(-a + c) | | 2 | ------ for c = z < -a + b | | 2*b - 2*z |---------------- for And(b >= z, c < z) |(-a + b)*(b - c) | \ 0 otherwise References ========== .. [1] https://en.wikipedia.org/wiki/Triangular_distribution .. [2] http://mathworld.wolfram.com/TriangularDistribution.html """ return rv(name, TriangularDistribution, (a, b, c)) #------------------------------------------------------------------------------- # Uniform distribution --------------------------------------------------------- class UniformDistribution(SingleContinuousDistribution): _argnames = ('left', 'right') @property def set(self): return Interval(self.left, self.right) @staticmethod def check(left, right): _value_check(left < right, "Lower limit should be less than Upper limit.") def pdf(self, x): left, right = self.left, self.right return Piecewise( (S.One/(right - left), And(left <= x, x <= right)), (S.Zero, True) ) def _cdf(self, x): left, right = self.left, self.right return Piecewise( (S.Zero, x < left), ((x - left)/(right - left), x <= right), (S.One, True) ) def _characteristic_function(self, t): left, right = self.left, self.right return Piecewise(((exp(I*t*right) - exp(I*t*left)) / (I*t*(right - left)), Ne(t, 0)), (S.One, True)) def _moment_generating_function(self, t): left, right = self.left, self.right return Piecewise(((exp(t*right) - exp(t*left)) / (t * (right - left)), Ne(t, 0)), (S.One, True)) def expectation(self, expr, var, **kwargs): from sympy import Max, Min kwargs['evaluate'] = True result = SingleContinuousDistribution.expectation(self, expr, var, **kwargs) result = result.subs({Max(self.left, self.right): self.right, Min(self.left, self.right): self.left}) return result def sample(self): return random.uniform(self.left, self.right) def Uniform(name, left, right): r""" Create a continuous random variable with a uniform distribution. The density of the uniform distribution is given by .. math:: f(x) := \begin{cases} \frac{1}{b - a} & \text{for } x \in [a,b] \\ 0 & \text{otherwise} \end{cases} with :math:`x \in [a,b]`. Parameters ========== a : Real number, :math:`-\infty < a` the left boundary b : Real number, :math:`a < b < \infty` the right boundary Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Uniform, density, cdf, E, variance, skewness >>> from sympy import Symbol, simplify >>> a = Symbol("a", negative=True) >>> b = Symbol("b", positive=True) >>> z = Symbol("z") >>> X = Uniform("x", a, b) >>> density(X)(z) Piecewise((1/(-a + b), (b >= z) & (a <= z)), (0, True)) >>> cdf(X)(z) # doctest: +SKIP -a/(-a + b) + z/(-a + b) >>> simplify(E(X)) a/2 + b/2 >>> simplify(variance(X)) a**2/12 - a*b/6 + b**2/12 References ========== .. [1] https://en.wikipedia.org/wiki/Uniform_distribution_%28continuous%29 .. [2] http://mathworld.wolfram.com/UniformDistribution.html """ return rv(name, UniformDistribution, (left, right)) #------------------------------------------------------------------------------- # UniformSum distribution ------------------------------------------------------ class UniformSumDistribution(SingleContinuousDistribution): _argnames = ('n',) @property def set(self): return Interval(0, self.n) @staticmethod def check(n): _value_check((n > 0, n.is_integer), "Parameter n must be positive integer.") def pdf(self, x): n = self.n k = Dummy("k") return 1/factorial( n - 1)*Sum((-1)**k*binomial(n, k)*(x - k)**(n - 1), (k, 0, floor(x))) def _cdf(self, x): n = self.n k = Dummy("k") return Piecewise((S.Zero, x < 0), (1/factorial(n)*Sum((-1)**k*binomial(n, k)*(x - k)**(n), (k, 0, floor(x))), x <= n), (S.One, True)) def _characteristic_function(self, t): return ((exp(I*t) - 1) / (I*t))**self.n def _moment_generating_function(self, t): return ((exp(t) - 1) / t)**self.n def UniformSum(name, n): r""" Create a continuous random variable with an Irwin-Hall distribution. The probability distribution function depends on a single parameter `n` which is an integer. The density of the Irwin-Hall distribution is given by .. math :: f(x) := \frac{1}{(n-1)!}\sum_{k=0}^{\left\lfloor x\right\rfloor}(-1)^k \binom{n}{k}(x-k)^{n-1} Parameters ========== n : A positive Integer, `n > 0` Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import UniformSum, density, cdf >>> from sympy import Symbol, pprint >>> n = Symbol("n", integer=True) >>> z = Symbol("z") >>> X = UniformSum("x", n) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) floor(z) ___ \ ` \ k n - 1 /n\ ) (-1) *(-k + z) *| | / \k/ /__, k = 0 -------------------------------- (n - 1)! >>> cdf(X)(z) Piecewise((0, z < 0), (Sum((-1)**_k*(-_k + z)**n*binomial(n, _k), (_k, 0, floor(z)))/factorial(n), n >= z), (1, True)) Compute cdf with specific 'x' and 'n' values as follows : >>> cdf(UniformSum("x", 5), evaluate=False)(2).doit() 9/40 The argument evaluate=False prevents an attempt at evaluation of the sum for general n, before the argument 2 is passed. References ========== .. [1] https://en.wikipedia.org/wiki/Uniform_sum_distribution .. [2] http://mathworld.wolfram.com/UniformSumDistribution.html """ return rv(name, UniformSumDistribution, (n, )) #------------------------------------------------------------------------------- # VonMises distribution -------------------------------------------------------- class VonMisesDistribution(SingleContinuousDistribution): _argnames = ('mu', 'k') set = Interval(0, 2*pi) @staticmethod def check(mu, k): _value_check(k > 0, "k must be positive") def pdf(self, x): mu, k = self.mu, self.k return exp(k*cos(x-mu)) / (2*pi*besseli(0, k)) def VonMises(name, mu, k): r""" Create a Continuous Random Variable with a von Mises distribution. The density of the von Mises distribution is given by .. math:: f(x) := \frac{e^{\kappa\cos(x-\mu)}}{2\pi I_0(\kappa)} with :math:`x \in [0,2\pi]`. Parameters ========== mu : Real number, measure of location k : Real number, measure of concentration Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import VonMises, density, E, variance >>> from sympy import Symbol, simplify, pprint >>> mu = Symbol("mu") >>> k = Symbol("k", positive=True) >>> z = Symbol("z") >>> X = VonMises("x", mu, k) >>> D = density(X)(z) >>> pprint(D, use_unicode=False) k*cos(mu - z) e ------------------ 2*pi*besseli(0, k) References ========== .. [1] https://en.wikipedia.org/wiki/Von_Mises_distribution .. [2] http://mathworld.wolfram.com/vonMisesDistribution.html """ return rv(name, VonMisesDistribution, (mu, k)) #------------------------------------------------------------------------------- # Weibull distribution --------------------------------------------------------- class WeibullDistribution(SingleContinuousDistribution): _argnames = ('alpha', 'beta') set = Interval(0, oo) @staticmethod def check(alpha, beta): _value_check(alpha > 0, "Alpha must be positive") _value_check(beta > 0, "Beta must be positive") def pdf(self, x): alpha, beta = self.alpha, self.beta return beta * (x/alpha)**(beta - 1) * exp(-(x/alpha)**beta) / alpha def sample(self): return random.weibullvariate(self.alpha, self.beta) def Weibull(name, alpha, beta): r""" Create a continuous random variable with a Weibull distribution. The density of the Weibull distribution is given by .. math:: f(x) := \begin{cases} \frac{k}{\lambda}\left(\frac{x}{\lambda}\right)^{k-1} e^{-(x/\lambda)^{k}} & x\geq0\\ 0 & x<0 \end{cases} Parameters ========== lambda : Real number, :math:`\lambda > 0` a scale k : Real number, `k > 0` a shape Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Weibull, density, E, variance >>> from sympy import Symbol, simplify >>> l = Symbol("lambda", positive=True) >>> k = Symbol("k", positive=True) >>> z = Symbol("z") >>> X = Weibull("x", l, k) >>> density(X)(z) k*(z/lambda)**(k - 1)*exp(-(z/lambda)**k)/lambda >>> simplify(E(X)) lambda*gamma(1 + 1/k) >>> simplify(variance(X)) lambda**2*(-gamma(1 + 1/k)**2 + gamma(1 + 2/k)) References ========== .. [1] https://en.wikipedia.org/wiki/Weibull_distribution .. [2] http://mathworld.wolfram.com/WeibullDistribution.html """ return rv(name, WeibullDistribution, (alpha, beta)) #------------------------------------------------------------------------------- # Wigner semicircle distribution ----------------------------------------------- class WignerSemicircleDistribution(SingleContinuousDistribution): _argnames = ('R',) @property def set(self): return Interval(-self.R, self.R) @staticmethod def check(R): _value_check(R > 0, "Radius R must be positive.") def pdf(self, x): R = self.R return 2/(pi*R**2)*sqrt(R**2 - x**2) def _characteristic_function(self, t): return Piecewise((2 * besselj(1, self.R*t) / (self.R*t), Ne(t, 0)), (S.One, True)) def _moment_generating_function(self, t): return Piecewise((2 * besseli(1, self.R*t) / (self.R*t), Ne(t, 0)), (S.One, True)) def WignerSemicircle(name, R): r""" Create a continuous random variable with a Wigner semicircle distribution. The density of the Wigner semicircle distribution is given by .. math:: f(x) := \frac2{\pi R^2}\,\sqrt{R^2-x^2} with :math:`x \in [-R,R]`. Parameters ========== R : Real number, `R > 0`, the radius Returns ======= A `RandomSymbol`. Examples ======== >>> from sympy.stats import WignerSemicircle, density, E >>> from sympy import Symbol, simplify >>> R = Symbol("R", positive=True) >>> z = Symbol("z") >>> X = WignerSemicircle("x", R) >>> density(X)(z) 2*sqrt(R**2 - z**2)/(pi*R**2) >>> E(X) 0 References ========== .. [1] https://en.wikipedia.org/wiki/Wigner_semicircle_distribution .. [2] http://mathworld.wolfram.com/WignersSemicircleLaw.html """ return rv(name, WignerSemicircleDistribution, (R,))

d9015895ff22f15160eb38950d5a1b18fe753304d4424f4c499e2f7a20f1a8b0

""" Finite Discrete Random Variables - Prebuilt variable types Contains ======== FiniteRV DiscreteUniform Die Bernoulli Coin Binomial BetaBinomial Hypergeometric Rademacher """ from __future__ import print_function, division from sympy import (S, sympify, Rational, binomial, cacheit, Integer, Dummy, Eq, Intersection, Interval, Symbol, Lambda, Piecewise, Or, Gt, Lt, Ge, Le, Contains) from sympy import beta as beta_fn from sympy.core.compatibility import range from sympy.stats.frv import (SingleFiniteDistribution, SingleFinitePSpace) from sympy.stats.rv import _value_check, Density, RandomSymbol __all__ = ['FiniteRV', 'DiscreteUniform', 'Die', 'Bernoulli', 'Coin', 'Binomial', 'BetaBinomial', 'Hypergeometric', 'Rademacher' ] def rv(name, cls, *args): args = list(map(sympify, args)) dist = cls(*args) dist.check(*args) return SingleFinitePSpace(name, dist).value class FiniteDistributionHandmade(SingleFiniteDistribution): @property def dict(self): return self.args[0] def pmf(self, x): x = Symbol('x') return Lambda(x, Piecewise(*( [(v, Eq(k, x)) for k, v in self.dict.items()] + [(0, True)]))) @property def set(self): return set(self.dict.keys()) @staticmethod def check(density): for p in density.values(): _value_check((p >= 0, p <= 1), "Probability at a point must be between 0 and 1.") _value_check(Eq(sum(density.values()), 1), "Total Probability must be 1.") def FiniteRV(name, density): """ Create a Finite Random Variable given a dict representing the density. Returns a RandomSymbol. >>> from sympy.stats import FiniteRV, P, E >>> density = {0: .1, 1: .2, 2: .3, 3: .4} >>> X = FiniteRV('X', density) >>> E(X) 2.00000000000000 >>> P(X >= 2) 0.700000000000000 """ return rv(name, FiniteDistributionHandmade, density) class DiscreteUniformDistribution(SingleFiniteDistribution): @property def p(self): return Rational(1, len(self.args)) @property @cacheit def dict(self): return dict((k, self.p) for k in self.set) @property def set(self): return set(self.args) def pmf(self, x): if x in self.args: return self.p else: return S.Zero def DiscreteUniform(name, items): """ Create a Finite Random Variable representing a uniform distribution over the input set. Returns a RandomSymbol. Examples ======== >>> from sympy.stats import DiscreteUniform, density >>> from sympy import symbols >>> X = DiscreteUniform('X', symbols('a b c')) # equally likely over a, b, c >>> density(X).dict {a: 1/3, b: 1/3, c: 1/3} >>> Y = DiscreteUniform('Y', list(range(5))) # distribution over a range >>> density(Y).dict {0: 1/5, 1: 1/5, 2: 1/5, 3: 1/5, 4: 1/5} References ========== .. [1] https://en.wikipedia.org/wiki/Discrete_uniform_distribution .. [2] http://mathworld.wolfram.com/DiscreteUniformDistribution.html """ return rv(name, DiscreteUniformDistribution, *items) class DieDistribution(SingleFiniteDistribution): _argnames = ('sides',) @staticmethod def check(sides): _value_check((sides.is_positive, sides.is_integer), "number of sides must be a positive integer.") @property def is_symbolic(self): return not self.sides.is_number @property def high(self): return self.sides @property def low(self): return S(1) @property def set(self): if self.is_symbolic: return Intersection(S.Naturals0, Interval(0, self.sides)) return set(map(Integer, list(range(1, self.sides + 1)))) def pmf(self, x): x = sympify(x) if not (x.is_number or x.is_Symbol or isinstance(x, RandomSymbol)): raise ValueError("'x' expected as an argument of type 'number' or 'Symbol' or , " "'RandomSymbol' not %s" % (type(x))) cond = Ge(x, 1) & Le(x, self.sides) & Contains(x, S.Integers) return Piecewise((S(1)/self.sides, cond), (S.Zero, True)) def Die(name, sides=6): """ Create a Finite Random Variable representing a fair die. Returns a RandomSymbol. Examples ======== >>> from sympy.stats import Die, density >>> from sympy import Symbol >>> D6 = Die('D6', 6) # Six sided Die >>> density(D6).dict {1: 1/6, 2: 1/6, 3: 1/6, 4: 1/6, 5: 1/6, 6: 1/6} >>> D4 = Die('D4', 4) # Four sided Die >>> density(D4).dict {1: 1/4, 2: 1/4, 3: 1/4, 4: 1/4} >>> n = Symbol('n', positive=True, integer=True) >>> Dn = Die('Dn', n) # n sided Die >>> density(Dn).dict Density(DieDistribution(n)) >>> density(Dn).dict.subs(n, 4).doit() {1: 1/4, 2: 1/4, 3: 1/4, 4: 1/4} """ return rv(name, DieDistribution, sides) class BernoulliDistribution(SingleFiniteDistribution): _argnames = ('p', 'succ', 'fail') @staticmethod def check(p, succ, fail): _value_check((p >= 0, p <= 1), "p should be in range [0, 1].") @property def set(self): return set([self.succ, self.fail]) def pmf(self, x): return Piecewise((self.p, x == self.succ), (1 - self.p, x == self.fail), (0, True)) def Bernoulli(name, p, succ=1, fail=0): """ Create a Finite Random Variable representing a Bernoulli process. Returns a RandomSymbol Examples ======== >>> from sympy.stats import Bernoulli, density >>> from sympy import S >>> X = Bernoulli('X', S(3)/4) # 1-0 Bernoulli variable, probability = 3/4 >>> density(X).dict {0: 1/4, 1: 3/4} >>> X = Bernoulli('X', S.Half, 'Heads', 'Tails') # A fair coin toss >>> density(X).dict {Heads: 1/2, Tails: 1/2} References ========== .. [1] https://en.wikipedia.org/wiki/Bernoulli_distribution .. [2] http://mathworld.wolfram.com/BernoulliDistribution.html """ return rv(name, BernoulliDistribution, p, succ, fail) def Coin(name, p=S.Half): """ Create a Finite Random Variable representing a Coin toss. Probability p is the chance of gettings "Heads." Half by default Returns a RandomSymbol. Examples ======== >>> from sympy.stats import Coin, density >>> from sympy import Rational >>> C = Coin('C') # A fair coin toss >>> density(C).dict {H: 1/2, T: 1/2} >>> C2 = Coin('C2', Rational(3, 5)) # An unfair coin >>> density(C2).dict {H: 3/5, T: 2/5} See Also ======== sympy.stats.Binomial References ========== .. [1] https://en.wikipedia.org/wiki/Coin_flipping """ return rv(name, BernoulliDistribution, p, 'H', 'T') class BinomialDistribution(SingleFiniteDistribution): _argnames = ('n', 'p', 'succ', 'fail') @staticmethod def check(n, p, succ, fail): _value_check((n.is_integer, n.is_nonnegative), "'n' must be nonnegative integer.") _value_check((p <= 1, p >= 0), "p should be in range [0, 1].") @property def high(self): return self.n @property def low(self): return S(0) @property def is_symbolic(self): return not self.n.is_number @property def set(self): if self.is_symbolic: return Intersection(S.Naturals0, Interval(0, self.n)) return set(self.dict.keys()) def pmf(self, x): n, p = self.n, self.p x = sympify(x) if not (x.is_number or x.is_Symbol or isinstance(x, RandomSymbol)): raise ValueError("'x' expected as an argument of type 'number' or 'Symbol' or , " "'RandomSymbol' not %s" % (type(x))) cond = Ge(x, 0) & Le(x, n) & Contains(x, S.Integers) return Piecewise((binomial(n, x) * p**x * (1 - p)**(n - x), cond), (S.Zero, True)) @property @cacheit def dict(self): if self.is_symbolic: return Density(self) return dict((k*self.succ + (self.n-k)*self.fail, self.pmf(k)) for k in range(0, self.n + 1)) def Binomial(name, n, p, succ=1, fail=0): """ Create a Finite Random Variable representing a binomial distribution. Returns a RandomSymbol. Examples ======== >>> from sympy.stats import Binomial, density >>> from sympy import S, Symbol >>> X = Binomial('X', 4, S.Half) # Four "coin flips" >>> density(X).dict {0: 1/16, 1: 1/4, 2: 3/8, 3: 1/4, 4: 1/16} >>> n = Symbol('n', positive=True, integer=True) >>> p = Symbol('p', positive=True) >>> X = Binomial('X', n, S.Half) # n "coin flips" >>> density(X).dict Density(BinomialDistribution(n, 1/2, 1, 0)) >>> density(X).dict.subs(n, 4).doit() {0: 1/16, 1: 1/4, 2: 3/8, 3: 1/4, 4: 1/16} References ========== .. [1] https://en.wikipedia.org/wiki/Binomial_distribution .. [2] http://mathworld.wolfram.com/BinomialDistribution.html """ return rv(name, BinomialDistribution, n, p, succ, fail) #------------------------------------------------------------------------------- # Beta-binomial distribution ---------------------------------------------------------- class BetaBinomialDistribution(SingleFiniteDistribution): _argnames = ('n', 'alpha', 'beta') @staticmethod def check(n, alpha, beta): _value_check((n.is_integer, n.is_nonnegative), "'n' must be nonnegative integer. n = %s." % str(n)) _value_check((alpha > 0), "'alpha' must be: alpha > 0 . alpha = %s" % str(alpha)) _value_check((beta > 0), "'beta' must be: beta > 0 . beta = %s" % str(beta)) @property def high(self): return self.n @property def low(self): return S(0) @property def is_symbolic(self): return not self.n.is_number @property def set(self): if self.is_symbolic: return Intersection(S.Naturals0, Interval(0, self.n)) return set(map(Integer, list(range(0, self.n + 1)))) def pmf(self, k): n, a, b = self.n, self.alpha, self.beta return binomial(n, k) * beta_fn(k + a, n - k + b) / beta_fn(a, b) def BetaBinomial(name, n, alpha, beta): """ Create a Finite Random Variable representing a Beta-binomial distribution. Returns a RandomSymbol. Examples ======== >>> from sympy.stats import BetaBinomial, density >>> from sympy import S >>> X = BetaBinomial('X', 2, 1, 1) >>> density(X).dict {0: beta(1, 3)/beta(1, 1), 1: 2*beta(2, 2)/beta(1, 1), 2: beta(3, 1)/beta(1, 1)} References ========== .. [1] https://en.wikipedia.org/wiki/Beta-binomial_distribution .. [2] http://mathworld.wolfram.com/BetaBinomialDistribution.html """ return rv(name, BetaBinomialDistribution, n, alpha, beta) class HypergeometricDistribution(SingleFiniteDistribution): _argnames = ('N', 'm', 'n') @property def is_symbolic(self): return any(not x.is_number for x in (self.N, self.m, self.n)) @property def high(self): return Piecewise((self.n, Lt(self.n, self.m) != False), (self.m, True)) @property def low(self): return Piecewise((0, Gt(0, self.n + self.m - self.N) != False), (self.n + self.m - self.N, True)) @property def set(self): N, m, n = self.N, self.m, self.n if self.is_symbolic: return Intersection(S.Naturals0, Interval(self.low, self.high)) return set([i for i in range(max(0, n + m - N), min(n, m) + 1)]) def pmf(self, k): N, m, n = self.N, self.m, self.n return S(binomial(m, k) * binomial(N - m, n - k))/binomial(N, n) def Hypergeometric(name, N, m, n): """ Create a Finite Random Variable representing a hypergeometric distribution. Returns a RandomSymbol. Examples ======== >>> from sympy.stats import Hypergeometric, density >>> from sympy import S >>> X = Hypergeometric('X', 10, 5, 3) # 10 marbles, 5 white (success), 3 draws >>> density(X).dict {0: 1/12, 1: 5/12, 2: 5/12, 3: 1/12} References ========== .. [1] https://en.wikipedia.org/wiki/Hypergeometric_distribution .. [2] http://mathworld.wolfram.com/HypergeometricDistribution.html """ return rv(name, HypergeometricDistribution, N, m, n) class RademacherDistribution(SingleFiniteDistribution): @property def set(self): return set([-1, 1]) @property def pmf(self): k = Dummy('k') return Lambda(k, Piecewise((S.Half, Or(Eq(k, -1), Eq(k, 1))), (0, True))) def Rademacher(name): """ Create a Finite Random Variable representing a Rademacher distribution. Return a RandomSymbol. Examples ======== >>> from sympy.stats import Rademacher, density >>> X = Rademacher('X') >>> density(X).dict {-1: 1/2, 1: 1/2} See Also ======== sympy.stats.Bernoulli References ========== .. [1] https://en.wikipedia.org/wiki/Rademacher_distribution """ return rv(name, RademacherDistribution)

a370abe68cecdea50d60d52e2929fb4350e5c0d6530e8a3cf65e592ceb3298cd

from __future__ import print_function, division from sympy import (Symbol, Matrix, MatrixSymbol, S, Indexed, Basic, Set, And, Tuple, Eq, FiniteSet, ImmutableMatrix, nsimplify, Lambda, Mul, Sum, Dummy, Lt, IndexedBase, linsolve, Piecewise, eye, Or, Ne, Not, Intersection, Union, Expr, Function, sympify, Le, exp, cacheit, Gt, Ge) from sympy.core.relational import Relational from sympy.logic.boolalg import Boolean from sympy.stats.joint_rv import JointDistributionHandmade, JointDistribution from sympy.stats.rv import (RandomIndexedSymbol, random_symbols, RandomSymbol, _symbol_converter) from sympy.stats.stochastic_process import StochasticPSpace from sympy.stats.symbolic_probability import Probability, Expectation __all__ = [ 'StochasticProcess', 'DiscreteTimeStochasticProcess', 'DiscreteMarkovChain', 'TransitionMatrixOf', 'StochasticStateSpaceOf', 'GeneratorMatrixOf', 'ContinuousMarkovChain' ] def _set_converter(itr): """ Helper function for converting list/tuple/set to Set. If parameter is not an instance of list/tuple/set then no operation is performed. Returns ======= Set The argument converted to Set. Raises ====== TypeError If the argument is not an instance of list/tuple/set. """ if isinstance(itr, (list, tuple, set)): itr = FiniteSet(*itr) if not isinstance(itr, Set): raise TypeError("%s is not an instance of list/tuple/set."%(itr)) return itr def _matrix_checks(matrix): if not isinstance(matrix, (Matrix, MatrixSymbol, ImmutableMatrix)): raise TypeError("Transition probabilities either should " "be a Matrix or a MatrixSymbol.") if matrix.shape[0] != matrix.shape[1]: raise ValueError("%s is not a square matrix"%(matrix)) if isinstance(matrix, Matrix): matrix = ImmutableMatrix(matrix.tolist()) return matrix class StochasticProcess(Basic): """ Base class for all the stochastic processes whether discrete or continuous. Parameters ========== sym: Symbol or string_types state_space: Set The state space of the stochastic process, by default S.Reals. For discrete sets it is zero indexed. See Also ======== DiscreteTimeStochasticProcess """ index_set = S.Reals def __new__(cls, sym, state_space=S.Reals, **kwargs): sym = _symbol_converter(sym) state_space = _set_converter(state_space) return Basic.__new__(cls, sym, state_space) @property def symbol(self): return self.args[0] @property def state_space(self): return self.args[1] def __call__(self, time): """ Overridden in ContinuousTimeStochasticProcess. """ raise NotImplementedError("Use [] for indexing discrete time stochastic process.") def __getitem__(self, time): """ Overridden in DiscreteTimeStochasticProcess. """ raise NotImplementedError("Use () for indexing continuous time stochastic process.") def probability(self, condition): raise NotImplementedError() def joint_distribution(self, *args): """ Computes the joint distribution of the random indexed variables. Parameters ========== args: iterable The finite list of random indexed variables/the key of a stochastic process whose joint distribution has to be computed. Returns ======= JointDistribution The joint distribution of the list of random indexed variables. An unevaluated object is returned if it is not possible to compute the joint distribution. Raises ====== ValueError: When the arguments passed are not of type RandomIndexSymbol or Number. """ args = list(args) for i, arg in enumerate(args): if S(arg).is_Number: if self.index_set.is_subset(S.Integers): args[i] = self.__getitem__(arg) else: args[i] = self.__call__(arg) elif not isinstance(arg, RandomIndexedSymbol): raise ValueError("Expected a RandomIndexedSymbol or " "key not %s"%(type(arg))) if args[0].pspace.distribution == None: # checks if there is any distribution available return JointDistribution(*args) # TODO: Add tests for the below part of the method, when implementation of Bernoulli Process # is completed pdf = Lambda(*[arg.name for arg in args], expr=Mul.fromiter(arg.pspace.distribution.pdf(arg) for arg in args)) return JointDistributionHandmade(pdf) def expectation(self, condition, given_condition): raise NotImplementedError("Abstract method for expectation queries.") class DiscreteTimeStochasticProcess(StochasticProcess): """ Base class for all discrete stochastic processes. """ def __getitem__(self, time): """ For indexing discrete time stochastic processes. Returns ======= RandomIndexedSymbol """ if time not in self.index_set: raise IndexError("%s is not in the index set of %s"%(time, self.symbol)) idx_obj = Indexed(self.symbol, time) pspace_obj = StochasticPSpace(self.symbol, self) return RandomIndexedSymbol(idx_obj, pspace_obj) class ContinuousTimeStochasticProcess(StochasticProcess): """ Base class for all continuous time stochastic process. """ def __call__(self, time): """ For indexing continuous time stochastic processes. Returns ======= RandomIndexedSymbol """ if time not in self.index_set: raise IndexError("%s is not in the index set of %s"%(time, self.symbol)) func_obj = Function(self.symbol)(time) pspace_obj = StochasticPSpace(self.symbol, self) return RandomIndexedSymbol(func_obj, pspace_obj) class TransitionMatrixOf(Boolean): """ Assumes that the matrix is the transition matrix of the process. """ def __new__(cls, process, matrix): if not isinstance(process, DiscreteMarkovChain): raise ValueError("Currently only DiscreteMarkovChain " "support TransitionMatrixOf.") matrix = _matrix_checks(matrix) return Basic.__new__(cls, process, matrix) process = property(lambda self: self.args[0]) matrix = property(lambda self: self.args[1]) class GeneratorMatrixOf(TransitionMatrixOf): """ Assumes that the matrix is the generator matrix of the process. """ def __new__(cls, process, matrix): if not isinstance(process, ContinuousMarkovChain): raise ValueError("Currently only ContinuousMarkovChain " "support GeneratorMatrixOf.") matrix = _matrix_checks(matrix) return Basic.__new__(cls, process, matrix) class StochasticStateSpaceOf(Boolean): def __new__(cls, process, state_space): if not isinstance(process, (DiscreteMarkovChain, ContinuousMarkovChain)): raise ValueError("Currently only DiscreteMarkovChain and ContinuousMarkovChain " "support StochasticStateSpaceOf.") state_space = _set_converter(state_space) return Basic.__new__(cls, process, state_space) process = property(lambda self: self.args[0]) state_space = property(lambda self: self.args[1]) class MarkovProcess(StochasticProcess): """ Contains methods that handle queries common to Markov processes. """ def _extract_information(self, given_condition): """ Helper function to extract information, like, transition matrix/generator matrix, state space, etc. """ if isinstance(self, DiscreteMarkovChain): trans_probs = self.transition_probabilities elif isinstance(self, ContinuousMarkovChain): trans_probs = self.generator_matrix state_space = self.state_space if isinstance(given_condition, And): gcs = given_condition.args given_condition = S.true for gc in gcs: if isinstance(gc, TransitionMatrixOf): trans_probs = gc.matrix if isinstance(gc, StochasticStateSpaceOf): state_space = gc.state_space if isinstance(gc, Relational): given_condition = given_condition & gc if isinstance(given_condition, TransitionMatrixOf): trans_probs = given_condition.matrix given_condition = S.true if isinstance(given_condition, StochasticStateSpaceOf): state_space = given_condition.state_space given_condition = S.true return trans_probs, state_space, given_condition def _check_trans_probs(self, trans_probs, row_sum=1): """ Helper function for checking the validity of transition probabilities. """ if not isinstance(trans_probs, MatrixSymbol): rows = trans_probs.tolist() for row in rows: if (sum(row) - row_sum) != 0: raise ValueError("Values in a row must sum to %s. " "If you are using Float or floats then please use Rational."%(row_sum)) def _work_out_state_space(self, state_space, given_condition, trans_probs): """ Helper function to extract state space if there is a random symbol in the given condition. """ # if given condition is None, then there is no need to work out # state_space from random variables if given_condition != None: rand_var = list(given_condition.atoms(RandomSymbol) - given_condition.atoms(RandomIndexedSymbol)) if len(rand_var) == 1: state_space = rand_var[0].pspace.set if not FiniteSet(*[i for i in range(trans_probs.shape[0])]).is_subset(state_space): raise ValueError("state space is not compatible with the transition probabilites.") state_space = FiniteSet(*[i for i in range(trans_probs.shape[0])]) return state_space @cacheit def _preprocess(self, given_condition, evaluate): """ Helper function for pre-processing the information. """ is_insufficient = False if not evaluate: # avoid pre-processing if the result is not to be evaluated return (True, None, None, None) # extracting transition matrix and state space trans_probs, state_space, given_condition = self._extract_information(given_condition) # given_condition does not have sufficient information # for computations if trans_probs == None or \ given_condition == None: is_insufficient = True else: # checking transition probabilities if isinstance(self, DiscreteMarkovChain): self._check_trans_probs(trans_probs, row_sum=1) elif isinstance(self, ContinuousMarkovChain): self._check_trans_probs(trans_probs, row_sum=0) # working out state space state_space = self._work_out_state_space(state_space, given_condition, trans_probs) return is_insufficient, trans_probs, state_space, given_condition def probability(self, condition, given_condition=None, evaluate=True, **kwargs): """ Handles probability queries for Markov process. Parameters ========== condition: Relational given_condition: Relational/And Returns ======= Probability If the information is not sufficient. Expr In all other cases. Note ==== Any information passed at the time of query overrides any information passed at the time of object creation like transition probabilities, state space. Pass the transition matrix using TransitionMatrixOf, generator matrix using GeneratorMatrixOf and state space using StochasticStateSpaceOf in given_condition using & or And. """ check, mat, state_space, new_given_condition = \ self._preprocess(given_condition, evaluate) if check: return Probability(condition, new_given_condition) if isinstance(self, ContinuousMarkovChain): trans_probs = self.transition_probabilities(mat) elif isinstance(self, DiscreteMarkovChain): trans_probs = mat if isinstance(condition, Relational): rv, states = (list(condition.atoms(RandomIndexedSymbol))[0], condition.as_set()) if isinstance(new_given_condition, And): gcs = new_given_condition.args else: gcs = (new_given_condition, ) grvs = new_given_condition.atoms(RandomIndexedSymbol) min_key_rv = None for grv in grvs: if grv.key <= rv.key: min_key_rv = grv if min_key_rv == None: return Probability(condition) prob, gstate = dict(), None for gc in gcs: if gc.has(min_key_rv): if gc.has(Probability): p, gp = (gc.rhs, gc.lhs) if isinstance(gc.lhs, Probability) \ else (gc.lhs, gc.rhs) gr = gp.args[0] gset = Intersection(gr.as_set(), state_space) gstate = list(gset)[0] prob[gset] = p else: _, gstate = (gc.lhs.key, gc.rhs) if isinstance(gc.lhs, RandomIndexedSymbol) \ else (gc.rhs.key, gc.lhs) if any((k not in self.index_set) for k in (rv.key, min_key_rv.key)): raise IndexError("The timestamps of the process are not in it's index set.") states = Intersection(states, state_space) for state in Union(states, FiniteSet(gstate)): if Ge(state, mat.shape[0]) == True: raise IndexError("No information is available for (%s, %s) in " "transition probabilities of shape, (%s, %s). " "State space is zero indexed." %(gstate, state, mat.shape[0], mat.shape[1])) if prob: gstates = Union(*prob.keys()) if len(gstates) == 1: gstate = list(gstates)[0] gprob = list(prob.values())[0] prob[gstates] = gprob elif len(gstates) == len(state_space) - 1: gstate = list(state_space - gstates)[0] gprob = S(1) - sum(prob.values()) prob[state_space - gstates] = gprob else: raise ValueError("Conflicting information.") else: gprob = S(1) if min_key_rv == rv: return sum([prob[FiniteSet(state)] for state in states]) if isinstance(self, ContinuousMarkovChain): return gprob * sum([trans_probs(rv.key - min_key_rv.key).__getitem__((gstate, state)) for state in states]) if isinstance(self, DiscreteMarkovChain): return gprob * sum([(trans_probs**(rv.key - min_key_rv.key)).__getitem__((gstate, state)) for state in states]) if isinstance(condition, Not): expr = condition.args[0] return S(1) - self.probability(expr, given_condition, evaluate, **kwargs) if isinstance(condition, And): compute_later, state2cond, conds = [], dict(), condition.args for expr in conds: if isinstance(expr, Relational): ris = list(expr.atoms(RandomIndexedSymbol))[0] if state2cond.get(ris, None) is None: state2cond[ris] = S.true state2cond[ris] &= expr else: compute_later.append(expr) ris = [] for ri in state2cond: ris.append(ri) cset = Intersection(state2cond[ri].as_set(), state_space) if len(cset) == 0: return S.Zero state2cond[ri] = cset.as_relational(ri) sorted_ris = sorted(ris, key=lambda ri: ri.key) prod = self.probability(state2cond[sorted_ris[0]], given_condition, evaluate, **kwargs) for i in range(1, len(sorted_ris)): ri, prev_ri = sorted_ris[i], sorted_ris[i-1] if not isinstance(state2cond[ri], Eq): raise ValueError("The process is in multiple states at %s, unable to determine the probability."%(ri)) mat_of = TransitionMatrixOf(self, mat) if isinstance(self, DiscreteMarkovChain) else GeneratorMatrixOf(self, mat) prod *= self.probability(state2cond[ri], state2cond[prev_ri] & mat_of & StochasticStateSpaceOf(self, state_space), evaluate, **kwargs) for expr in compute_later: prod *= self.probability(expr, given_condition, evaluate, **kwargs) return prod if isinstance(condition, Or): return sum([self.probability(expr, given_condition, evaluate, **kwargs) for expr in condition.args]) raise NotImplementedError("Mechanism for handling (%s, %s) queries hasn't been " "implemented yet."%(expr, condition)) def expectation(self, expr, condition=None, evaluate=True, **kwargs): """ Handles expectation queries for markov process. Parameters ========== expr: RandomIndexedSymbol, Relational, Logic Condition for which expectation has to be computed. Must contain a RandomIndexedSymbol of the process. condition: Relational, Logic The given conditions under which computations should be done. Returns ======= Expectation Unevaluated object if computations cannot be done due to insufficient information. Expr In all other cases when the computations are successful. Note ==== Any information passed at the time of query overrides any information passed at the time of object creation like transition probabilities, state space. Pass the transition matrix using TransitionMatrixOf, generator matrix using GeneratorMatrixOf and state space using StochasticStateSpaceOf in given_condition using & or And. """ check, mat, state_space, condition = \ self._preprocess(condition, evaluate) if check: return Expectation(expr, condition) if isinstance(self, ContinuousMarkovChain): trans_probs = self.transition_probabilities(mat) elif isinstance(self, DiscreteMarkovChain): trans_probs = mat rvs = random_symbols(expr) if isinstance(expr, Expr) and isinstance(condition, Eq) \ and len(rvs) == 1: # handle queries similar to E(f(X[i]), Eq(X[i-m], <some-state>)) rv = list(rvs)[0] lhsg, rhsg = condition.lhs, condition.rhs if not isinstance(lhsg, RandomIndexedSymbol): lhsg, rhsg = (rhsg, lhsg) if rhsg not in self.state_space: raise ValueError("%s state is not in the state space."%(rhsg)) if rv.key < lhsg.key: raise ValueError("Incorrect given condition is given, expectation " "time %s < time %s"%(rv.key, rv.key)) mat_of = TransitionMatrixOf(self, mat) if isinstance(self, DiscreteMarkovChain) else GeneratorMatrixOf(self, mat) cond = condition & mat_of & \ StochasticStateSpaceOf(self, state_space) s = Dummy('s') func = lambda s: self.probability(Eq(rv, s), cond)*expr.subs(rv, s) return sum([func(s) for s in state_space]) raise NotImplementedError("Mechanism for handling (%s, %s) queries hasn't been " "implemented yet."%(expr, condition)) class DiscreteMarkovChain(DiscreteTimeStochasticProcess, MarkovProcess): """ Represents discrete time Markov chain. Parameters ========== sym: Symbol/string_types state_space: Set Optional, by default, S.Reals trans_probs: Matrix/ImmutableMatrix/MatrixSymbol Optional, by default, None Examples ======== >>> from sympy.stats import DiscreteMarkovChain, TransitionMatrixOf >>> from sympy import Matrix, MatrixSymbol, Eq >>> from sympy.stats import P >>> T = Matrix([[0.5, 0.2, 0.3],[0.2, 0.5, 0.3],[0.2, 0.3, 0.5]]) >>> Y = DiscreteMarkovChain("Y", [0, 1, 2], T) >>> YS = DiscreteMarkovChain("Y") >>> Y.state_space {0, 1, 2} >>> Y.transition_probabilities Matrix([ [0.5, 0.2, 0.3], [0.2, 0.5, 0.3], [0.2, 0.3, 0.5]]) >>> TS = MatrixSymbol('T', 3, 3) >>> P(Eq(YS[3], 2), Eq(YS[1], 1) & TransitionMatrixOf(YS, TS)) T[0, 2]*T[1, 0] + T[1, 1]*T[1, 2] + T[1, 2]*T[2, 2] >>> P(Eq(Y[3], 2), Eq(Y[1], 1)).round(2) 0.36 References ========== .. [1] https://en.wikipedia.org/wiki/Markov_chain#Discrete-time_Markov_chain .. [2] https://www.dartmouth.edu/~chance/teaching_aids/books_articles/probability_book/Chapter11.pdf """ index_set = S.Naturals0 def __new__(cls, sym, state_space=S.Reals, trans_probs=None): sym = _symbol_converter(sym) state_space = _set_converter(state_space) if trans_probs != None: trans_probs = _matrix_checks(trans_probs) return Basic.__new__(cls, sym, state_space, trans_probs) @property def transition_probabilities(self): """ Transition probabilities of discrete Markov chain, either an instance of Matrix or MatrixSymbol. """ return self.args[2] def _transient2transient(self): """ Computes the one step probabilities of transient states to transient states. Used in finding fundamental matrix, absorbing probabilties. """ trans_probs = self.transition_probabilities if not isinstance(trans_probs, ImmutableMatrix): return None m = trans_probs.shape[0] trans_states = [i for i in range(m) if trans_probs[i, i] != 1] t2t = [[trans_probs[si, sj] for sj in trans_states] for si in trans_states] return ImmutableMatrix(t2t) def _transient2absorbing(self): """ Computes the one step probabilities of transient states to absorbing states. Used in finding fundamental matrix, absorbing probabilties. """ trans_probs = self.transition_probabilities if not isinstance(trans_probs, ImmutableMatrix): return None m, trans_states, absorb_states = \ trans_probs.shape[0], [], [] for i in range(m): if trans_probs[i, i] == 1: absorb_states.append(i) else: trans_states.append(i) if not absorb_states or not trans_states: return None t2a = [[trans_probs[si, sj] for sj in absorb_states] for si in trans_states] return ImmutableMatrix(t2a) def fundamental_matrix(self): Q = self._transient2transient() if Q == None: return None I = eye(Q.shape[0]) if (I - Q).det() == 0: raise ValueError("Fundamental matrix doesn't exists.") return ImmutableMatrix((I - Q).inv().tolist()) def absorbing_probabilites(self): """ Computes the absorbing probabilities, i.e., the ij-th entry of the matrix denotes the probability of Markov chain being absorbed in state j starting from state i. """ R = self._transient2absorbing() N = self.fundamental_matrix() if R == None or N == None: return None return N*R def is_regular(self): w = self.fixed_row_vector() if w is None or isinstance(w, (Lambda)): return None return all((wi > 0) == True for wi in w.row(0)) def is_absorbing_state(self, state): trans_probs = self.transition_probabilities if isinstance(trans_probs, ImmutableMatrix) and \ state < trans_probs.shape[0]: return S(trans_probs[state, state]) == S.One def is_absorbing_chain(self): trans_probs = self.transition_probabilities return any(self.is_absorbing_state(state) == True for state in range(trans_probs.shape[0])) def fixed_row_vector(self): trans_probs = self.transition_probabilities if trans_probs == None: return None if isinstance(trans_probs, MatrixSymbol): wm = MatrixSymbol('wm', 1, trans_probs.shape[0]) return Lambda((wm, trans_probs), Eq(wm*trans_probs, wm)) w = IndexedBase('w') wi = [w[i] for i in range(trans_probs.shape[0])] wm = Matrix([wi]) eqs = (wm*trans_probs - wm).tolist()[0] eqs.append(sum(wi) - 1) soln = list(linsolve(eqs, wi))[0] return ImmutableMatrix([[sol for sol in soln]]) @property def limiting_distribution(self): """ The fixed row vector is the limiting distribution of a discrete Markov chain. """ return self.fixed_row_vector() class ContinuousMarkovChain(ContinuousTimeStochasticProcess, MarkovProcess): """ Represents continuous time Markov chain. Parameters ========== sym: Symbol/string_types state_space: Set Optional, by default, S.Reals gen_mat: Matrix/ImmutableMatrix/MatrixSymbol Optional, by default, None Examples ======== >>> from sympy.stats import ContinuousMarkovChain >>> from sympy import Matrix, S, MatrixSymbol >>> G = Matrix([[-S(1), S(1)], [S(1), -S(1)]]) >>> C = ContinuousMarkovChain('C', state_space=[0, 1], gen_mat=G) >>> C.limiting_distribution() Matrix([[1/2, 1/2]]) References ========== .. [1] https://en.wikipedia.org/wiki/Markov_chain#Continuous-time_Markov_chain .. [2] http://u.math.biu.ac.il/~amirgi/CTMCnotes.pdf """ index_set = S.Reals def __new__(cls, sym, state_space=S.Reals, gen_mat=None): sym = _symbol_converter(sym) state_space = _set_converter(state_space) if gen_mat != None: gen_mat = _matrix_checks(gen_mat) return Basic.__new__(cls, sym, state_space, gen_mat) @property def generator_matrix(self): return self.args[2] @cacheit def transition_probabilities(self, gen_mat=None): t = Dummy('t') if isinstance(gen_mat, (Matrix, ImmutableMatrix)) and \ gen_mat.is_diagonalizable(): # for faster computation use diagonalized generator matrix Q, D = gen_mat.diagonalize() return Lambda(t, Q*exp(t*D)*Q.inv()) if gen_mat != None: return Lambda(t, exp(t*gen_mat)) def limiting_distribution(self): gen_mat = self.generator_matrix if gen_mat == None: return None if isinstance(gen_mat, MatrixSymbol): wm = MatrixSymbol('wm', 1, gen_mat.shape[0]) return Lambda((wm, gen_mat), Eq(wm*gen_mat, wm)) w = IndexedBase('w') wi = [w[i] for i in range(gen_mat.shape[0])] wm = Matrix([wi]) eqs = (wm*gen_mat).tolist()[0] eqs.append(sum(wi) - 1) soln = list(linsolve(eqs, wi))[0] return ImmutableMatrix([[sol for sol in soln]])

96e0131cbdaeafcee4329622c73637fd1e2b702e53d0f8088adfa68b5483ebba

""" SymPy statistics module Introduces a random variable type into the SymPy language. Random variables may be declared using prebuilt functions such as Normal, Exponential, Coin, Die, etc... or built with functions like FiniteRV. Queries on random expressions can be made using the functions ========================= ============================= Expression Meaning ------------------------- ----------------------------- ``P(condition)`` Probability ``E(expression)`` Expected value ``H(expression)`` Entropy ``variance(expression)`` Variance ``density(expression)`` Probability Density Function ``sample(expression)`` Produce a realization ``where(condition)`` Where the condition is true ========================= ============================= Examples ======== >>> from sympy.stats import P, E, variance, Die, Normal >>> from sympy import Eq, simplify >>> X, Y = Die('X', 6), Die('Y', 6) # Define two six sided dice >>> Z = Normal('Z', 0, 1) # Declare a Normal random variable with mean 0, std 1 >>> P(X>3) # Probability X is greater than 3 1/2 >>> E(X+Y) # Expectation of the sum of two dice 7 >>> variance(X+Y) # Variance of the sum of two dice 35/6 >>> simplify(P(Z>1)) # Probability of Z being greater than 1 1/2 - erf(sqrt(2)/2)/2 """ __all__ = [] from . import rv_interface from .rv_interface import ( cdf, characteristic_function, covariance, density, dependent, E, given, independent, P, pspace, random_symbols, sample, sample_iter, skewness, kurtosis, std, variance, where, factorial_moment, correlation, moment, cmoment, smoment, sampling_density, moment_generating_function, entropy, H, quantile ) __all__.extend(rv_interface.__all__) from . import frv_types from .frv_types import ( Bernoulli, Binomial, BetaBinomial, Coin, Die, DiscreteUniform, FiniteRV, Hypergeometric, Rademacher, ) __all__.extend(frv_types.__all__) from . import crv_types from .crv_types import ( ContinuousRV, Arcsin, Benini, Beta, BetaNoncentral, BetaPrime, Cauchy, Chi, ChiNoncentral, ChiSquared, Dagum, Erlang, ExGaussian, Exponential, ExponentialPower, FDistribution, FisherZ, Frechet, Gamma, GammaInverse, Gumbel, Gompertz, Kumaraswamy, Laplace, Logistic, LogLogistic, LogNormal, Maxwell, Nakagami, Normal, GaussianInverse, Pareto, QuadraticU, RaisedCosine, Rayleigh, ShiftedGompertz, StudentT, Trapezoidal, Triangular, Uniform, UniformSum, VonMises, Weibull, WignerSemicircle, Wald ) __all__.extend(crv_types.__all__) from . import drv_types from .drv_types import (Geometric, Logarithmic, NegativeBinomial, Poisson, Skellam, YuleSimon, Zeta) __all__.extend(drv_types.__all__) from . import joint_rv_types from .joint_rv_types import ( JointRV, Dirichlet, GeneralizedMultivariateLogGamma, GeneralizedMultivariateLogGammaOmega, Multinomial, MultivariateBeta, MultivariateEwens, MultivariateT, NegativeMultinomial, NormalGamma ) __all__.extend(joint_rv_types.__all__) from . import stochastic_process_types from .stochastic_process_types import ( StochasticProcess, ContinuousTimeStochasticProcess, DiscreteTimeStochasticProcess, DiscreteMarkovChain, TransitionMatrixOf, StochasticStateSpaceOf, ContinuousMarkovChain, GeneratorMatrixOf ) __all__.extend(stochastic_process_types.__all__) from . import random_matrix_models from .random_matrix_models import ( GaussianEnsemble, GaussianUnitaryEnsemble, GaussianOrthogonalEnsemble, GaussianSymplecticEnsemble, joint_eigen_distribution, level_spacing_distribution ) __all__.extend(random_matrix_models.__all__) from . import symbolic_probability from .symbolic_probability import Probability, Expectation, Variance, Covariance __all__.extend(symbolic_probability.__all__)

00dc485626ad27568e0a08907be2a691189c999e0551c18692d1784dae2dde90

from sympy import (sympify, S, pi, sqrt, exp, Lambda, Indexed, besselk, gamma, Interval, Range, factorial, Mul, Integer, Add, rf, Eq, Piecewise, ones, Symbol, Pow, Rational, Sum, Intersection, Matrix, symbols, Product, IndexedBase) from sympy.matrices import ImmutableMatrix from sympy.matrices.expressions.determinant import det from sympy.stats.joint_rv import (JointDistribution, JointPSpace, JointDistributionHandmade, MarginalDistribution) from sympy.stats.rv import _value_check, random_symbols __all__ = ['JointRV', 'Dirichlet', 'GeneralizedMultivariateLogGamma', 'GeneralizedMultivariateLogGammaOmega', 'Multinomial', 'MultivariateBeta', 'MultivariateEwens', 'MultivariateT', 'NegativeMultinomial', 'NormalGamma' ] def multivariate_rv(cls, sym, *args): args = list(map(sympify, args)) dist = cls(*args) args = dist.args dist.check(*args) return JointPSpace(sym, dist).value def JointRV(symbol, pdf, _set=None): """ Create a Joint Random Variable where each of its component is conitinuous, given the following: -- a symbol -- a PDF in terms of indexed symbols of the symbol given as the first argument NOTE: As of now, the set for each component for a `JointRV` is equal to the set of all integers, which can not be changed. Returns a RandomSymbol. Examples ======== >>> from sympy import symbols, exp, pi, Indexed, S >>> from sympy.stats import density >>> from sympy.stats.joint_rv_types import JointRV >>> x1, x2 = (Indexed('x', i) for i in (1, 2)) >>> pdf = exp(-x1**2/2 + x1 - x2**2/2 - S(1)/2)/(2*pi) >>> N1 = JointRV('x', pdf) #Multivariate Normal distribution >>> density(N1)(1, 2) exp(-2)/(2*pi) """ #TODO: Add support for sets provided by the user symbol = sympify(symbol) syms = list(i for i in pdf.free_symbols if isinstance(i, Indexed) and i.base == IndexedBase(symbol)) syms.sort(key = lambda index: index.args[1]) _set = S.Reals**len(syms) pdf = Lambda(syms, pdf) dist = JointDistributionHandmade(pdf, _set) jrv = JointPSpace(symbol, dist).value rvs = random_symbols(pdf) if len(rvs) != 0: dist = MarginalDistribution(dist, (jrv,)) return JointPSpace(symbol, dist).value return jrv #------------------------------------------------------------------------------- # Multivariate Normal distribution --------------------------------------------------------- class MultivariateNormalDistribution(JointDistribution): _argnames = ['mu', 'sigma'] is_Continuous=True @property def set(self): k = len(self.mu) return S.Reals**k @staticmethod def check(mu, sigma): _value_check(len(mu) == len(sigma.col(0)), "Size of the mean vector and covariance matrix are incorrect.") #check if covariance matrix is positive definite or not. _value_check((i > 0 for i in sigma.eigenvals().keys()), "The covariance matrix must be positive definite. ") def pdf(self, *args): mu, sigma = self.mu, self.sigma k = len(mu) args = ImmutableMatrix(args) x = args - mu return S(1)/sqrt((2*pi)**(k)*det(sigma))*exp( -S(1)/2*x.transpose()*(sigma.inv()*\ x))[0] def marginal_distribution(self, indices, sym): sym = ImmutableMatrix([Indexed(sym, i) for i in indices]) _mu, _sigma = self.mu, self.sigma k = len(self.mu) for i in range(k): if i not in indices: _mu = _mu.row_del(i) _sigma = _sigma.col_del(i) _sigma = _sigma.row_del(i) return Lambda(sym, S(1)/sqrt((2*pi)**(len(_mu))*det(_sigma))*exp( -S(1)/2*(_mu - sym).transpose()*(_sigma.inv()*\ (_mu - sym)))[0]) #------------------------------------------------------------------------------- # Multivariate Laplace distribution --------------------------------------------------------- class MultivariateLaplaceDistribution(JointDistribution): _argnames = ['mu', 'sigma'] is_Continuous=True @property def set(self): k = len(self.mu) return S.Reals**k @staticmethod def check(mu, sigma): _value_check(len(mu) == len(sigma.col(0)), "Size of the mean vector and covariance matrix are incorrect.") #check if covariance matrix is positive definite or not. _value_check((i > 0 for i in sigma.eigenvals().keys()), "The covariance matrix must be positive definite. ") def pdf(self, *args): mu, sigma = self.mu, self.sigma mu_T = mu.transpose() k = S(len(mu)) sigma_inv = sigma.inv() args = ImmutableMatrix(args) args_T = args.transpose() x = (mu_T*sigma_inv*mu)[0] y = (args_T*sigma_inv*args)[0] v = 1 - k/2 return S(2)/((2*pi)**(S(k)/2)*sqrt(det(sigma)))\ *(y/(2 + x))**(S(v)/2)*besselk(v, sqrt((2 + x)*(y)))\ *exp((args_T*sigma_inv*mu)[0]) #------------------------------------------------------------------------------- # Multivariate StudentT distribution --------------------------------------------------------- class MultivariateTDistribution(JointDistribution): _argnames = ['mu', 'shape_mat', 'dof'] is_Continuous=True @property def set(self): k = len(self.mu) return S.Reals**k @staticmethod def check(mu, sigma, v): _value_check(len(mu) == len(sigma.col(0)), "Size of the location vector and shape matrix are incorrect.") #check if covariance matrix is positive definite or not. _value_check((i > 0 for i in sigma.eigenvals().keys()), "The shape matrix must be positive definite. ") def pdf(self, *args): mu, sigma = self.mu, self.shape_mat v = S(self.dof) k = S(len(mu)) sigma_inv = sigma.inv() args = ImmutableMatrix(args) x = args - mu return gamma((k + v)/2)/(gamma(v/2)*(v*pi)**(k/2)*sqrt(det(sigma)))\ *(1 + 1/v*(x.transpose()*sigma_inv*x)[0])**((-v - k)/2) def MultivariateT(syms, mu, sigma, v): """ Creates a joint random variable with multivariate T-distribution. Parameters ========== syms: list/tuple/set of symbols for identifying each component mu: A list/tuple/set consisting of k means,represents a k dimensional location vector sigma: The shape matrix for the distribution Returns ======= A random symbol """ return multivariate_rv(MultivariateTDistribution, syms, mu, sigma, v) #------------------------------------------------------------------------------- # Multivariate Normal Gamma distribution --------------------------------------------------------- class NormalGammaDistribution(JointDistribution): _argnames = ['mu', 'lamda', 'alpha', 'beta'] is_Continuous=True @staticmethod def check(mu, lamda, alpha, beta): _value_check(mu.is_real, "Location must be real.") _value_check(lamda > 0, "Lambda must be positive") _value_check(alpha > 0, "alpha must be positive") _value_check(beta > 0, "beta must be positive") @property def set(self): return S.Reals*Interval(0, S.Infinity) def pdf(self, x, tau): beta, alpha, lamda = self.beta, self.alpha, self.lamda mu = self.mu return beta**alpha*sqrt(lamda)/(gamma(alpha)*sqrt(2*pi))*\ tau**(alpha - S(1)/2)*exp(-1*beta*tau)*\ exp(-1*(lamda*tau*(x - mu)**2)/S(2)) def marginal_distribution(self, indices, *sym): if len(indices) == 2: return self.pdf(*sym) if indices[0] == 0: #For marginal over `x`, return non-standardized Student-T's #distribution x = sym[0] v, mu, sigma = self.alpha - S(1)/2, self.mu, \ S(self.beta)/(self.lamda * self.alpha) return Lambda(sym, gamma((v + 1)/2)/(gamma(v/2)*sqrt(pi*v)*sigma)*\ (1 + 1/v*((x - mu)/sigma)**2)**((-v -1)/2)) #For marginal over `tau`, return Gamma distribution as per construction from sympy.stats.crv_types import GammaDistribution return Lambda(sym, GammaDistribution(self.alpha, self.beta)(sym[0])) def NormalGamma(syms, mu, lamda, alpha, beta): """ Creates a bivariate joint random variable with multivariate Normal gamma distribution. Parameters ========== syms: list/tuple/set of two symbols for identifying each component mu: A real number, as the mean of the normal distribution alpha: a positive integer beta: a positive integer lamda: a positive integer Returns ======= A random symbol """ return multivariate_rv(NormalGammaDistribution, syms, mu, lamda, alpha, beta) #------------------------------------------------------------------------------- # Multivariate Beta/Dirichlet distribution --------------------------------------------------------- class MultivariateBetaDistribution(JointDistribution): _argnames = ['alpha'] is_Continuous = True @staticmethod def check(alpha): _value_check(len(alpha) >= 2, "At least two categories should be passed.") for a_k in alpha: _value_check((a_k > 0) != False, "Each concentration parameter" " should be positive.") @property def set(self): k = len(self.alpha) return Interval(0, 1)**k def pdf(self, *syms): alpha = self.alpha B = Mul.fromiter(map(gamma, alpha))/gamma(Add(*alpha)) return Mul.fromiter([sym**(a_k - 1) for a_k, sym in zip(alpha, syms)])/B def MultivariateBeta(syms, *alpha): """ Creates a continuous random variable with Dirichlet/Multivariate Beta Distribution. The density of the dirichlet distribution can be found at [1]. Parameters ========== alpha: positive real numbers signifying concentration numbers. Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import density >>> from sympy.stats.joint_rv import marginal_distribution >>> from sympy.stats.joint_rv_types import MultivariateBeta >>> from sympy import Symbol >>> a1 = Symbol('a1', positive=True) >>> a2 = Symbol('a2', positive=True) >>> B = MultivariateBeta('B', [a1, a2]) >>> C = MultivariateBeta('C', a1, a2) >>> x = Symbol('x') >>> y = Symbol('y') >>> density(B)(x, y) x**(a1 - 1)*y**(a2 - 1)*gamma(a1 + a2)/(gamma(a1)*gamma(a2)) >>> marginal_distribution(C, C[0])(x) x**(a1 - 1)*gamma(a1 + a2)/(a2*gamma(a1)*gamma(a2)) References ========== .. [1] https://en.wikipedia.org/wiki/Dirichlet_distribution .. [2] http://mathworld.wolfram.com/DirichletDistribution.html """ if not isinstance(alpha[0], list): alpha = (list(alpha),) return multivariate_rv(MultivariateBetaDistribution, syms, alpha[0]) Dirichlet = MultivariateBeta #------------------------------------------------------------------------------- # Multivariate Ewens distribution --------------------------------------------------------- class MultivariateEwensDistribution(JointDistribution): _argnames = ['n', 'theta'] is_Discrete = True is_Continuous = False @staticmethod def check(n, theta): _value_check((n > 0), "sample size should be positive integer.") _value_check(theta.is_positive, "mutation rate should be positive.") @property def set(self): if not isinstance(self.n, Integer): i = Symbol('i', integer=True, positive=True) return Product(Intersection(S.Naturals0, Interval(0, self.n//i)), (i, 1, self.n)) prod_set = Range(0, self.n + 1) for i in range(2, self.n + 1): prod_set *= Range(0, self.n//i + 1) return prod_set def pdf(self, *syms): n, theta = self.n, self.theta condi = isinstance(self.n, Integer) if not (isinstance(syms[0], IndexedBase) or condi): raise ValueError("Please use IndexedBase object for syms as " "the dimension is symbolic") term_1 = factorial(n)/rf(theta, n) if condi: term_2 = Mul.fromiter([theta**syms[j]/((j+1)**syms[j]*factorial(syms[j])) for j in range(n)]) cond = Eq(sum([(k + 1)*syms[k] for k in range(n)]), n) return Piecewise((term_1 * term_2, cond), (0, True)) syms = syms[0] j, k = symbols('j, k', positive=True, integer=True) term_2 = Product(theta**syms[j]/((j+1)**syms[j]*factorial(syms[j])), (j, 0, n - 1)) cond = Eq(Sum((k + 1)*syms[k], (k, 0, n - 1)), n) return Piecewise((term_1 * term_2, cond), (0, True)) def MultivariateEwens(syms, n, theta): """ Creates a discrete random variable with Multivariate Ewens Distribution. The density of the said distribution can be found at [1]. Parameters ========== n: positive integer of class Integer, size of the sample or the integer whose partitions are considered theta: mutation rate, must be positive real number. Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import density >>> from sympy.stats.joint_rv import marginal_distribution >>> from sympy.stats.joint_rv_types import MultivariateEwens >>> from sympy import Symbol >>> a1 = Symbol('a1', positive=True) >>> a2 = Symbol('a2', positive=True) >>> ed = MultivariateEwens('E', 2, 1) >>> density(ed)(a1, a2) Piecewise((2**(-a2)/(factorial(a1)*factorial(a2)), Eq(a1 + 2*a2, 2)), (0, True)) >>> marginal_distribution(ed, ed[0])(a1) Piecewise((1/factorial(a1), Eq(a1, 2)), (0, True)) References ========== .. [1] https://en.wikipedia.org/wiki/Ewens%27s_sampling_formula .. [2] http://www.stat.rutgers.edu/home/hcrane/Papers/STS529.pdf """ return multivariate_rv(MultivariateEwensDistribution, syms, n, theta) #------------------------------------------------------------------------------- # Generalized Multivariate Log Gamma distribution --------------------------------------------------------- class GeneralizedMultivariateLogGammaDistribution(JointDistribution): _argnames = ['delta', 'v', 'lamda', 'mu'] is_Continuous=True def check(self, delta, v, l, mu): _value_check((delta >= 0, delta <= 1), "delta must be in range [0, 1].") _value_check((v > 0), "v must be positive") for lk in l: _value_check((lk > 0), "lamda must be a positive vector.") for muk in mu: _value_check((muk > 0), "mu must be a positive vector.") _value_check(len(l) > 1,"the distribution should have at least" " two random variables.") @property def set(self): return S.Reals**len(self.lamda) def pdf(self, *y): from sympy.functions.special.gamma_functions import gamma d, v, l, mu = self.delta, self.v, self.lamda, self.mu n = Symbol('n', negative=False, integer=True) k = len(l) sterm1 = Pow((1 - d), n)/\ ((gamma(v + n)**(k - 1))*gamma(v)*gamma(n + 1)) sterm2 = Mul.fromiter([mui*li**(-v - n) for mui, li in zip(mu, l)]) term1 = sterm1 * sterm2 sterm3 = (v + n) * sum([mui * yi for mui, yi in zip(mu, y)]) sterm4 = sum([exp(mui * yi)/li for (mui, yi, li) in zip(mu, y, l)]) term2 = exp(sterm3 - sterm4) return Pow(d, v) * Sum(term1 * term2, (n, 0, S.Infinity)) def GeneralizedMultivariateLogGamma(syms, delta, v, lamda, mu): """ Creates a joint random variable with generalized multivariate log gamma distribution. The joint pdf can be found at [1]. Parameters ========== syms: list/tuple/set of symbols for identifying each component delta: A constant in range [0, 1] v: positive real lamda: a list of positive reals mu: a list of positive reals Returns ======= A Random Symbol Examples ======== >>> from sympy.stats import density >>> from sympy.stats.joint_rv import marginal_distribution >>> from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGamma >>> from sympy import symbols, S >>> v = 1 >>> l, mu = [1, 1, 1], [1, 1, 1] >>> d = S.Half >>> y = symbols('y_1:4', positive=True) >>> Gd = GeneralizedMultivariateLogGamma('G', d, v, l, mu) >>> density(Gd)(y[0], y[1], y[2]) Sum(2**(-n)*exp((n + 1)*(y_1 + y_2 + y_3) - exp(y_1) - exp(y_2) - exp(y_3))/gamma(n + 1)**3, (n, 0, oo))/2 References ========== .. [1] https://en.wikipedia.org/wiki/Generalized_multivariate_log-gamma_distribution .. [2] https://www.researchgate.net/publication/234137346_On_a_multivariate_log-gamma_distribution_and_the_use_of_the_distribution_in_the_Bayesian_analysis Note ==== If the GeneralizedMultivariateLogGamma is too long to type use, `from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGamma as GMVLG` If you want to pass the matrix omega instead of the constant delta, then use, GeneralizedMultivariateLogGammaOmega. """ return multivariate_rv(GeneralizedMultivariateLogGammaDistribution, syms, delta, v, lamda, mu) def GeneralizedMultivariateLogGammaOmega(syms, omega, v, lamda, mu): """ Extends GeneralizedMultivariateLogGamma. Parameters ========== syms: list/tuple/set of symbols for identifying each component omega: A square matrix Every element of square matrix must be absolute value of square root of correlation coefficient v: positive real lamda: a list of positive reals mu: a list of positive reals Returns ======= A Random Symbol Examples ======== >>> from sympy.stats import density >>> from sympy.stats.joint_rv import marginal_distribution >>> from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGammaOmega >>> from sympy import Matrix, symbols, S >>> omega = Matrix([[1, S.Half, S.Half], [S.Half, 1, S.Half], [S.Half, S.Half, 1]]) >>> v = 1 >>> l, mu = [1, 1, 1], [1, 1, 1] >>> G = GeneralizedMultivariateLogGammaOmega('G', omega, v, l, mu) >>> y = symbols('y_1:4', positive=True) >>> density(G)(y[0], y[1], y[2]) sqrt(2)*Sum((1 - sqrt(2)/2)**n*exp((n + 1)*(y_1 + y_2 + y_3) - exp(y_1) - exp(y_2) - exp(y_3))/gamma(n + 1)**3, (n, 0, oo))/2 References ========== See references of GeneralizedMultivariateLogGamma. Notes ===== If the GeneralizedMultivariateLogGammaOmega is too long to type use, `from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGammaOmega as GMVLGO` """ _value_check((omega.is_square, isinstance(omega, Matrix)), "omega must be a" " square matrix") for val in omega.values(): _value_check((val >= 0, val <= 1), "all values in matrix must be between 0 and 1(both inclusive).") _value_check(omega.diagonal().equals(ones(1, omega.shape[0])), "all the elements of diagonal should be 1.") _value_check((omega.shape[0] == len(lamda), len(lamda) == len(mu)), "lamda, mu should be of same length and omega should " " be of shape (length of lamda, length of mu)") _value_check(len(lamda) > 1,"the distribution should have at least" " two random variables.") delta = Pow(Rational(omega.det()), Rational(1, len(lamda) - 1)) return GeneralizedMultivariateLogGamma(syms, delta, v, lamda, mu) #------------------------------------------------------------------------------- # Multinomial distribution --------------------------------------------------------- class MultinomialDistribution(JointDistribution): _argnames = ['n', 'p'] is_Continuous=False is_Discrete = True @staticmethod def check(n, p): _value_check(n > 0, "number of trials must be a positive integer") for p_k in p: _value_check((p_k >= 0, p_k <= 1), "probability must be in range [0, 1]") _value_check(Eq(sum(p), 1), "probabilities must sum to 1") @property def set(self): return Intersection(S.Naturals0, Interval(0, self.n))**len(self.p) def pdf(self, *x): n, p = self.n, self.p term_1 = factorial(n)/Mul.fromiter([factorial(x_k) for x_k in x]) term_2 = Mul.fromiter([p_k**x_k for p_k, x_k in zip(p, x)]) return Piecewise((term_1 * term_2, Eq(sum(x), n)), (0, True)) def Multinomial(syms, n, *p): """ Creates a discrete random variable with Multinomial Distribution. The density of the said distribution can be found at [1]. Parameters ========== n: positive integer of class Integer, number of trials p: event probabilites, >= 0 and <= 1 Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import density >>> from sympy.stats.joint_rv import marginal_distribution >>> from sympy.stats.joint_rv_types import Multinomial >>> from sympy import symbols >>> x1, x2, x3 = symbols('x1, x2, x3', nonnegative=True, integer=True) >>> p1, p2, p3 = symbols('p1, p2, p3', positive=True) >>> M = Multinomial('M', 3, p1, p2, p3) >>> density(M)(x1, x2, x3) Piecewise((6*p1**x1*p2**x2*p3**x3/(factorial(x1)*factorial(x2)*factorial(x3)), Eq(x1 + x2 + x3, 3)), (0, True)) >>> marginal_distribution(M, M[0])(x1).subs(x1, 1) 3*p1*p2**2 + 6*p1*p2*p3 + 3*p1*p3**2 References ========== .. [1] https://en.wikipedia.org/wiki/Multinomial_distribution .. [2] http://mathworld.wolfram.com/MultinomialDistribution.html """ if not isinstance(p[0], list): p = (list(p), ) return multivariate_rv(MultinomialDistribution, syms, n, p[0]) #------------------------------------------------------------------------------- # Negative Multinomial Distribution --------------------------------------------------------- class NegativeMultinomialDistribution(JointDistribution): _argnames = ['k0', 'p'] is_Continuous=False is_Discrete = True @staticmethod def check(k0, p): _value_check(k0 > 0, "number of failures must be a positive integer") for p_k in p: _value_check((p_k >= 0, p_k <= 1), "probability must be in range [0, 1].") _value_check(sum(p) <= 1, "success probabilities must not be greater than 1.") @property def set(self): return Range(0, S.Infinity)**len(self.p) def pdf(self, *k): k0, p = self.k0, self.p term_1 = (gamma(k0 + sum(k))*(1 - sum(p))**k0)/gamma(k0) term_2 = Mul.fromiter([pi**ki/factorial(ki) for pi, ki in zip(p, k)]) return term_1 * term_2 def NegativeMultinomial(syms, k0, *p): """ Creates a discrete random variable with Negative Multinomial Distribution. The density of the said distribution can be found at [1]. Parameters ========== k0: positive integer of class Integer, number of failures before the experiment is stopped p: event probabilites, >= 0 and <= 1 Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import density >>> from sympy.stats.joint_rv import marginal_distribution >>> from sympy.stats.joint_rv_types import NegativeMultinomial >>> from sympy import symbols >>> x1, x2, x3 = symbols('x1, x2, x3', nonnegative=True, integer=True) >>> p1, p2, p3 = symbols('p1, p2, p3', positive=True) >>> N = NegativeMultinomial('M', 3, p1, p2, p3) >>> N_c = NegativeMultinomial('M', 3, 0.1, 0.1, 0.1) >>> density(N)(x1, x2, x3) p1**x1*p2**x2*p3**x3*(-p1 - p2 - p3 + 1)**3*gamma(x1 + x2 + x3 + 3)/(2*factorial(x1)*factorial(x2)*factorial(x3)) >>> marginal_distribution(N_c, N_c[0])(1).evalf().round(2) 0.25 References ========== .. [1] https://en.wikipedia.org/wiki/Negative_multinomial_distribution .. [2] http://mathworld.wolfram.com/NegativeBinomialDistribution.html """ if not isinstance(p[0], list): p = (list(p), ) return multivariate_rv(NegativeMultinomialDistribution, syms, k0, p[0])

f10d7b70679a460e9dc4cea47b2c3ed4b368a8b274870730876d499591a284d7

from __future__ import print_function, division from sympy import Basic, MatrixSymbol from sympy.stats.rv import PSpace, _symbol_converter, RandomMatrixSymbol class RandomMatrixPSpace(PSpace): """ Represents probability space for random matrices. It contains the mechanics for handling the API calls for random matrices. """ def __new__(cls, sym, model=None): sym = _symbol_converter(sym) return Basic.__new__(cls, sym, model) model = property(lambda self: self.args[1]) def compute_density(self, expr, *args): rms = expr.atoms(RandomMatrixSymbol) if len(rms) > 2 or (not isinstance(expr, RandomMatrixSymbol)): raise NotImplementedError("Currently, no algorithm has been " "implemented to handle general expressions containing " "multiple random matrices.") return self.model.density(expr)

27b8cfa173c13dc13acb014aa340f4e764cf003f8baa9cbc6495fb65c32990dc

"""Tools for arithmetic error propagation.""" from __future__ import print_function, division from itertools import repeat, combinations from sympy import S, Symbol, Add, Mul, simplify, Pow, exp from sympy.stats.symbolic_probability import RandomSymbol, Variance, Covariance _arg0_or_var = lambda var: var.args[0] if len(var.args) > 0 else var def variance_prop(expr, consts=(), include_covar=False): r"""Symbolically propagates variance (`\sigma^2`) for expressions. This is computed as as seen in [1]_. Parameters ========== expr : Expr A sympy expression to compute the variance for. consts : sequence of Symbols, optional Represents symbols that are known constants in the expr, and thus have zero variance. All symbols not in consts are assumed to be variant. include_covar : bool, optional Flag for whether or not to include covariances, default=False. Returns ======= var_expr : Expr An expression for the total variance of the expr. The variance for the original symbols (e.g. x) are represented via instance of the Variance symbol (e.g. Variance(x)). Examples ======== >>> from sympy import symbols, exp >>> from sympy.stats.error_prop import variance_prop >>> x, y = symbols('x y') >>> variance_prop(x + y) Variance(x) + Variance(y) >>> variance_prop(x * y) x**2*Variance(y) + y**2*Variance(x) >>> variance_prop(exp(2*x)) 4*exp(4*x)*Variance(x) References ========== .. [1] https://en.wikipedia.org/wiki/Propagation_of_uncertainty """ args = expr.args if len(args) == 0: if expr in consts: return S(0) elif isinstance(expr, RandomSymbol): return Variance(expr).doit() elif isinstance(expr, Symbol): return Variance(RandomSymbol(expr)).doit() else: return S(0) nargs = len(args) var_args = list(map(variance_prop, args, repeat(consts, nargs), repeat(include_covar, nargs))) if isinstance(expr, Add): var_expr = Add(*var_args) if include_covar: terms = [2 * Covariance(_arg0_or_var(x), _arg0_or_var(y)).doit() \ for x, y in combinations(var_args, 2)] var_expr += Add(*terms) elif isinstance(expr, Mul): terms = [v/a**2 for a, v in zip(args, var_args)] var_expr = simplify(expr**2 * Add(*terms)) if include_covar: terms = [2*Covariance(_arg0_or_var(x), _arg0_or_var(y)).doit()/(a*b) \ for (a, b), (x, y) in zip(combinations(args, 2), combinations(var_args, 2))] var_expr += Add(*terms) elif isinstance(expr, Pow): b = args[1] v = var_args[0] * (expr * b / args[0])**2 var_expr = simplify(v) elif isinstance(expr, exp): var_expr = simplify(var_args[0] * expr**2) else: # unknown how to proceed, return variance of whole expr. var_expr = Variance(expr) return var_expr

e786a7f6ad602c4ae9d6cbfc556657ef57df1532792105c5edf7df0da74539c0

""" Contains ======== Geometric Logarithmic NegativeBinomial Poisson Skellam YuleSimon Zeta """ from __future__ import print_function, division import random from sympy import (factorial, exp, S, sympify, I, zeta, polylog, log, beta, hyper, binomial, Piecewise, floor, besseli, sqrt) from sympy.stats import density from sympy.stats.drv import SingleDiscreteDistribution, SingleDiscretePSpace from sympy.stats.joint_rv import JointPSpace, CompoundDistribution from sympy.stats.rv import _value_check, RandomSymbol __all__ = ['Geometric', 'Logarithmic', 'NegativeBinomial', 'Poisson', 'Skellam', 'YuleSimon', 'Zeta' ] def rv(symbol, cls, *args): args = list(map(sympify, args)) dist = cls(*args) dist.check(*args) pspace = SingleDiscretePSpace(symbol, dist) if any(isinstance(arg, RandomSymbol) for arg in args): pspace = JointPSpace(symbol, CompoundDistribution(dist)) return pspace.value #------------------------------------------------------------------------------- # Geometric distribution ------------------------------------------------------------ class GeometricDistribution(SingleDiscreteDistribution): _argnames = ('p',) set = S.Naturals @staticmethod def check(p): _value_check((0 < p, p <= 1), "p must be between 0 and 1") def pdf(self, k): return (1 - self.p)**(k - 1) * self.p def _characteristic_function(self, t): p = self.p return p * exp(I*t) / (1 - (1 - p)*exp(I*t)) def _moment_generating_function(self, t): p = self.p return p * exp(t) / (1 - (1 - p) * exp(t)) def Geometric(name, p): r""" Create a discrete random variable with a Geometric distribution. The density of the Geometric distribution is given by .. math:: f(k) := p (1 - p)^{k - 1} Parameters ========== p: A probability between 0 and 1 Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Geometric, density, E, variance >>> from sympy import Symbol, S >>> p = S.One / 5 >>> z = Symbol("z") >>> X = Geometric("x", p) >>> density(X)(z) (4/5)**(z - 1)/5 >>> E(X) 5 >>> variance(X) 20 References ========== .. [1] https://en.wikipedia.org/wiki/Geometric_distribution .. [2] http://mathworld.wolfram.com/GeometricDistribution.html """ return rv(name, GeometricDistribution, p) #------------------------------------------------------------------------------- # Logarithmic distribution ------------------------------------------------------------ class LogarithmicDistribution(SingleDiscreteDistribution): _argnames = ('p',) set = S.Naturals @staticmethod def check(p): _value_check((p > 0, p < 1), "p should be between 0 and 1") def pdf(self, k): p = self.p return (-1) * p**k / (k * log(1 - p)) def _characteristic_function(self, t): p = self.p return log(1 - p * exp(I*t)) / log(1 - p) def _moment_generating_function(self, t): p = self.p return log(1 - p * exp(t)) / log(1 - p) def sample(self): ### TODO raise NotImplementedError("Sampling of %s is not implemented" % density(self)) def Logarithmic(name, p): r""" Create a discrete random variable with a Logarithmic distribution. The density of the Logarithmic distribution is given by .. math:: f(k) := \frac{-p^k}{k \ln{(1 - p)}} Parameters ========== p: A value between 0 and 1 Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Logarithmic, density, E, variance >>> from sympy import Symbol, S >>> p = S.One / 5 >>> z = Symbol("z") >>> X = Logarithmic("x", p) >>> density(X)(z) -5**(-z)/(z*log(4/5)) >>> E(X) -1/(-4*log(5) + 8*log(2)) >>> variance(X) -1/((-4*log(5) + 8*log(2))*(-2*log(5) + 4*log(2))) + 1/(-64*log(2)*log(5) + 64*log(2)**2 + 16*log(5)**2) - 10/(-32*log(5) + 64*log(2)) References ========== .. [1] https://en.wikipedia.org/wiki/Logarithmic_distribution .. [2] http://mathworld.wolfram.com/LogarithmicDistribution.html """ return rv(name, LogarithmicDistribution, p) #------------------------------------------------------------------------------- # Negative binomial distribution ------------------------------------------------------------ class NegativeBinomialDistribution(SingleDiscreteDistribution): _argnames = ('r', 'p') set = S.Naturals0 @staticmethod def check(r, p): _value_check(r > 0, 'r should be positive') _value_check((p > 0, p < 1), 'p should be between 0 and 1') def pdf(self, k): r = self.r p = self.p return binomial(k + r - 1, k) * (1 - p)**r * p**k def _characteristic_function(self, t): r = self.r p = self.p return ((1 - p) / (1 - p * exp(I*t)))**r def _moment_generating_function(self, t): r = self.r p = self.p return ((1 - p) / (1 - p * exp(t)))**r def sample(self): ### TODO raise NotImplementedError("Sampling of %s is not implemented" % density(self)) def NegativeBinomial(name, r, p): r""" Create a discrete random variable with a Negative Binomial distribution. The density of the Negative Binomial distribution is given by .. math:: f(k) := \binom{k + r - 1}{k} (1 - p)^r p^k Parameters ========== r: A positive value p: A value between 0 and 1 Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import NegativeBinomial, density, E, variance >>> from sympy import Symbol, S >>> r = 5 >>> p = S.One / 5 >>> z = Symbol("z") >>> X = NegativeBinomial("x", r, p) >>> density(X)(z) 1024*5**(-z)*binomial(z + 4, z)/3125 >>> E(X) 5/4 >>> variance(X) 25/16 References ========== .. [1] https://en.wikipedia.org/wiki/Negative_binomial_distribution .. [2] http://mathworld.wolfram.com/NegativeBinomialDistribution.html """ return rv(name, NegativeBinomialDistribution, r, p) #------------------------------------------------------------------------------- # Poisson distribution ------------------------------------------------------------ class PoissonDistribution(SingleDiscreteDistribution): _argnames = ('lamda',) set = S.Naturals0 @staticmethod def check(lamda): _value_check(lamda > 0, "Lambda must be positive") def pdf(self, k): return self.lamda**k / factorial(k) * exp(-self.lamda) def sample(self): def search(x, y, u): while x < y: mid = (x + y)//2 if u <= self.cdf(mid): y = mid else: x = mid + 1 return x u = random.uniform(0, 1) if u <= self.cdf(S.Zero): return S.Zero n = S.One while True: if u > self.cdf(2*n): n *= 2 else: return search(n, 2*n, u) def _characteristic_function(self, t): return exp(self.lamda * (exp(I*t) - 1)) def _moment_generating_function(self, t): return exp(self.lamda * (exp(t) - 1)) def Poisson(name, lamda): r""" Create a discrete random variable with a Poisson distribution. The density of the Poisson distribution is given by .. math:: f(k) := \frac{\lambda^{k} e^{- \lambda}}{k!} Parameters ========== lamda: Positive number, a rate Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Poisson, density, E, variance >>> from sympy import Symbol, simplify >>> rate = Symbol("lambda", positive=True) >>> z = Symbol("z") >>> X = Poisson("x", rate) >>> density(X)(z) lambda**z*exp(-lambda)/factorial(z) >>> E(X) lambda >>> simplify(variance(X)) lambda References ========== .. [1] https://en.wikipedia.org/wiki/Poisson_distribution .. [2] http://mathworld.wolfram.com/PoissonDistribution.html """ return rv(name, PoissonDistribution, lamda) # ----------------------------------------------------------------------------- # Skellam distribution -------------------------------------------------------- class SkellamDistribution(SingleDiscreteDistribution): _argnames = ('mu1', 'mu2') set = S.Integers @staticmethod def check(mu1, mu2): _value_check(mu1 >= 0, 'Parameter mu1 must be >= 0') _value_check(mu2 >= 0, 'Parameter mu2 must be >= 0') def pdf(self, k): (mu1, mu2) = (self.mu1, self.mu2) term1 = exp(-(mu1 + mu2)) * (mu1 / mu2) ** (k / 2) term2 = besseli(k, 2 * sqrt(mu1 * mu2)) return term1 * term2 def _cdf(self, x): raise NotImplementedError( "Skellam doesn't have closed form for the CDF.") def _characteristic_function(self, t): (mu1, mu2) = (self.mu1, self.mu2) return exp(-(mu1 + mu2) + mu1 * exp(I * t) + mu2 * exp(-I * t)) def _moment_generating_function(self, t): (mu1, mu2) = (self.mu1, self.mu2) return exp(-(mu1 + mu2) + mu1 * exp(t) + mu2 * exp(-t)) def Skellam(name, mu1, mu2): r""" Create a discrete random variable with a Skellam distribution. The Skellam is the distribution of the difference N1 - N2 of two statistically independent random variables N1 and N2 each Poisson-distributed with respective expected values mu1 and mu2. The density of the Skellam distribution is given by .. math:: f(k) := e^{-(\mu_1+\mu_2)}(\frac{\mu_1}{\mu_2})^{k/2}I_k(2\sqrt{\mu_1\mu_2}) Parameters ========== mu1: A non-negative value mu2: A non-negative value Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Skellam, density, E, variance >>> from sympy import Symbol, simplify, pprint >>> z = Symbol("z", integer=True) >>> mu1 = Symbol("mu1", positive=True) >>> mu2 = Symbol("mu2", positive=True) >>> X = Skellam("x", mu1, mu2) >>> pprint(density(X)(z), use_unicode=False) z - 2 /mu1\ -mu1 - mu2 / _____ _____\ |---| *e *besseli\z, 2*\/ mu1 *\/ mu2 / \mu2/ >>> E(X) mu1 - mu2 >>> variance(X).expand() mu1 + mu2 References ========== .. [1] https://en.wikipedia.org/wiki/Skellam_distribution """ return rv(name, SkellamDistribution, mu1, mu2) #------------------------------------------------------------------------------- # Yule-Simon distribution ------------------------------------------------------------ class YuleSimonDistribution(SingleDiscreteDistribution): _argnames = ('rho',) set = S.Naturals @staticmethod def check(rho): _value_check(rho > 0, 'rho should be positive') def pdf(self, k): rho = self.rho return rho * beta(k, rho + 1) def _cdf(self, x): return Piecewise((1 - floor(x) * beta(floor(x), self.rho + 1), x >= 1), (0, True)) def _characteristic_function(self, t): rho = self.rho return rho * hyper((1, 1), (rho + 2,), exp(I*t)) * exp(I*t) / (rho + 1) def _moment_generating_function(self, t): rho = self.rho return rho * hyper((1, 1), (rho + 2,), exp(t)) * exp(t) / (rho + 1) def sample(self): ### TODO raise NotImplementedError("Sampling of %s is not implemented" % density(self)) def YuleSimon(name, rho): r""" Create a discrete random variable with a Yule-Simon distribution. The density of the Yule-Simon distribution is given by .. math:: f(k) := \rho B(k, \rho + 1) Parameters ========== rho: A positive value Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import YuleSimon, density, E, variance >>> from sympy import Symbol, simplify >>> p = 5 >>> z = Symbol("z") >>> X = YuleSimon("x", p) >>> density(X)(z) 5*beta(z, 6) >>> simplify(E(X)) 5/4 >>> simplify(variance(X)) 25/48 References ========== .. [1] https://en.wikipedia.org/wiki/Yule%E2%80%93Simon_distribution """ return rv(name, YuleSimonDistribution, rho) #------------------------------------------------------------------------------- # Zeta distribution ------------------------------------------------------------ class ZetaDistribution(SingleDiscreteDistribution): _argnames = ('s',) set = S.Naturals @staticmethod def check(s): _value_check(s > 1, 's should be greater than 1') def pdf(self, k): s = self.s return 1 / (k**s * zeta(s)) def _characteristic_function(self, t): return polylog(self.s, exp(I*t)) / zeta(self.s) def _moment_generating_function(self, t): return polylog(self.s, exp(t)) / zeta(self.s) def sample(self): ### TODO raise NotImplementedError("Sampling of %s is not implemented" % density(self)) def Zeta(name, s): r""" Create a discrete random variable with a Zeta distribution. The density of the Zeta distribution is given by .. math:: f(k) := \frac{1}{k^s \zeta{(s)}} Parameters ========== s: A value greater than 1 Returns ======= A RandomSymbol. Examples ======== >>> from sympy.stats import Zeta, density, E, variance >>> from sympy import Symbol >>> s = 5 >>> z = Symbol("z") >>> X = Zeta("x", s) >>> density(X)(z) 1/(z**5*zeta(5)) >>> E(X) pi**4/(90*zeta(5)) >>> variance(X) -pi**8/(8100*zeta(5)**2) + zeta(3)/zeta(5) References ========== .. [1] https://en.wikipedia.org/wiki/Zeta_distribution """ return rv(name, ZetaDistribution, s)

45d742abe6ac894c4aaf3f2e6c5eb0f98c9aff973b5ef6cbb246a0bba3b2abae

from __future__ import print_function, division from sympy import sqrt, Symbol, log, exp, FallingFactorial from .rv import (probability, expectation, density, where, given, pspace, cdf, characteristic_function, sample, sample_iter, random_symbols, independent, dependent, sampling_density, moment_generating_function, quantile) __all__ = ['P', 'E', 'H', 'density', 'where', 'given', 'sample', 'cdf', 'characteristic_function', 'pspace', 'sample_iter', 'variance', 'std', 'skewness', 'kurtosis', 'covariance', 'dependent', 'independent', 'random_symbols', 'correlation', 'factorial_moment', 'moment', 'cmoment', 'sampling_density', 'moment_generating_function', 'quantile'] def moment(X, n, c=0, condition=None, **kwargs): """ Return the nth moment of a random expression about c i.e. E((X-c)**n) Default value of c is 0. Examples ======== >>> from sympy.stats import Die, moment, E >>> X = Die('X', 6) >>> moment(X, 1, 6) -5/2 >>> moment(X, 2) 91/6 >>> moment(X, 1) == E(X) True """ return expectation((X - c)**n, condition, **kwargs) def variance(X, condition=None, **kwargs): """ Variance of a random expression Expectation of (X-E(X))**2 Examples ======== >>> from sympy.stats import Die, E, Bernoulli, variance >>> from sympy import simplify, Symbol >>> X = Die('X', 6) >>> p = Symbol('p') >>> B = Bernoulli('B', p, 1, 0) >>> variance(2*X) 35/3 >>> simplify(variance(B)) p*(1 - p) """ return cmoment(X, 2, condition, **kwargs) def standard_deviation(X, condition=None, **kwargs): """ Standard Deviation of a random expression Square root of the Expectation of (X-E(X))**2 Examples ======== >>> from sympy.stats import Bernoulli, std >>> from sympy import Symbol, simplify >>> p = Symbol('p') >>> B = Bernoulli('B', p, 1, 0) >>> simplify(std(B)) sqrt(p*(1 - p)) """ return sqrt(variance(X, condition, **kwargs)) std = standard_deviation def entropy(expr, condition=None, **kwargs): """ Calculuates entropy of a probability distribution Parameters ========== expression : the random expression whose entropy is to be calculated condition : optional, to specify conditions on random expression b: base of the logarithm, optional By default, it is taken as Euler's number Returns ======= result : Entropy of the expression, a constant Examples ======== >>> from sympy.stats import Normal, Die, entropy >>> X = Normal('X', 0, 1) >>> entropy(X) log(2)/2 + 1/2 + log(pi)/2 >>> D = Die('D', 4) >>> entropy(D) log(4) References ========== .. [1] https://en.wikipedia.org/wiki/Entropy_(information_theory) .. [2] https://www.crmarsh.com/static/pdf/Charles_Marsh_Continuous_Entropy.pdf .. [3] http://www.math.uconn.edu/~kconrad/blurbs/analysis/entropypost.pdf """ pdf = density(expr, condition, **kwargs) base = kwargs.get('b', exp(1)) if hasattr(pdf, 'dict'): return sum([-prob*log(prob, base) for prob in pdf.dict.values()]) return expectation(-log(pdf(expr), base)) def covariance(X, Y, condition=None, **kwargs): """ Covariance of two random expressions The expectation that the two variables will rise and fall together Covariance(X,Y) = E( (X-E(X)) * (Y-E(Y)) ) Examples ======== >>> from sympy.stats import Exponential, covariance >>> from sympy import Symbol >>> rate = Symbol('lambda', positive=True, real=True, finite=True) >>> X = Exponential('X', rate) >>> Y = Exponential('Y', rate) >>> covariance(X, X) lambda**(-2) >>> covariance(X, Y) 0 >>> covariance(X, Y + rate*X) 1/lambda """ return expectation( (X - expectation(X, condition, **kwargs)) * (Y - expectation(Y, condition, **kwargs)), condition, **kwargs) def correlation(X, Y, condition=None, **kwargs): """ Correlation of two random expressions, also known as correlation coefficient or Pearson's correlation The normalized expectation that the two variables will rise and fall together Correlation(X,Y) = E( (X-E(X)) * (Y-E(Y)) / (sigma(X) * sigma(Y)) ) Examples ======== >>> from sympy.stats import Exponential, correlation >>> from sympy import Symbol >>> rate = Symbol('lambda', positive=True, real=True, finite=True) >>> X = Exponential('X', rate) >>> Y = Exponential('Y', rate) >>> correlation(X, X) 1 >>> correlation(X, Y) 0 >>> correlation(X, Y + rate*X) 1/sqrt(1 + lambda**(-2)) """ return covariance(X, Y, condition, **kwargs)/(std(X, condition, **kwargs) * std(Y, condition, **kwargs)) def cmoment(X, n, condition=None, **kwargs): """ Return the nth central moment of a random expression about its mean i.e. E((X - E(X))**n) Examples ======== >>> from sympy.stats import Die, cmoment, variance >>> X = Die('X', 6) >>> cmoment(X, 3) 0 >>> cmoment(X, 2) 35/12 >>> cmoment(X, 2) == variance(X) True """ mu = expectation(X, condition, **kwargs) return moment(X, n, mu, condition, **kwargs) def smoment(X, n, condition=None, **kwargs): """ Return the nth Standardized moment of a random expression i.e. E(((X - mu)/sigma(X))**n) Examples ======== >>> from sympy.stats import skewness, Exponential, smoment >>> from sympy import Symbol >>> rate = Symbol('lambda', positive=True, real=True, finite=True) >>> Y = Exponential('Y', rate) >>> smoment(Y, 4) 9 >>> smoment(Y, 4) == smoment(3*Y, 4) True >>> smoment(Y, 3) == skewness(Y) True """ sigma = std(X, condition, **kwargs) return (1/sigma)**n*cmoment(X, n, condition, **kwargs) def skewness(X, condition=None, **kwargs): """ Measure of the asymmetry of the probability distribution. Positive skew indicates that most of the values lie to the right of the mean. skewness(X) = E(((X - E(X))/sigma)**3) Parameters ========== condition : Expr containing RandomSymbols A conditional expression. skewness(X, X>0) is skewness of X given X > 0 Examples ======== >>> from sympy.stats import skewness, Exponential, Normal >>> from sympy import Symbol >>> X = Normal('X', 0, 1) >>> skewness(X) 0 >>> skewness(X, X > 0) # find skewness given X > 0 (-sqrt(2)/sqrt(pi) + 4*sqrt(2)/pi**(3/2))/(1 - 2/pi)**(3/2) >>> rate = Symbol('lambda', positive=True, real=True, finite=True) >>> Y = Exponential('Y', rate) >>> skewness(Y) 2 """ return smoment(X, 3, condition=condition, **kwargs) def kurtosis(X, condition=None, **kwargs): """ Characterizes the tails/outliers of a probability distribution. Kurtosis of any univariate normal distribution is 3. Kurtosis less than 3 means that the distribution produces fewer and less extreme outliers than the normal distribution. kurtosis(X) = E(((X - E(X))/sigma)**4) Parameters ========== condition : Expr containing RandomSymbols A conditional expression. kurtosis(X, X>0) is kurtosis of X given X > 0 Examples ======== >>> from sympy.stats import kurtosis, Exponential, Normal >>> from sympy import Symbol >>> X = Normal('X', 0, 1) >>> kurtosis(X) 3 >>> kurtosis(X, X > 0) # find kurtosis given X > 0 (-4/pi - 12/pi**2 + 3)/(1 - 2/pi)**2 >>> rate = Symbol('lamda', positive=True, real=True, finite=True) >>> Y = Exponential('Y', rate) >>> kurtosis(Y) 9 References ========== .. [1] https://en.wikipedia.org/wiki/Kurtosis .. [2] http://mathworld.wolfram.com/Kurtosis.html """ return smoment(X, 4, condition=condition, **kwargs) def factorial_moment(X, n, condition=None, **kwargs): """ The factorial moment is a mathematical quantity defined as the expectation or average of the falling factorial of a random variable. factorial_moment(X, n) = E(X*(X - 1)*(X - 2)*...*(X - n + 1)) Parameters ========== n: A natural number, n-th factorial moment. condition : Expr containing RandomSymbols A conditional expression. Examples ======== >>> from sympy.stats import factorial_moment, Poisson, Binomial >>> from sympy import Symbol, S >>> lamda = Symbol('lamda') >>> X = Poisson('X', lamda) >>> factorial_moment(X, 2) lamda**2 >>> Y = Binomial('Y', 2, S.Half) >>> factorial_moment(Y, 2) 1/2 >>> factorial_moment(Y, 2, Y > 1) # find factorial moment for Y > 1 2 References ========== .. [1] https://en.wikipedia.org/wiki/Factorial_moment .. [2] http://mathworld.wolfram.com/FactorialMoment.html """ return expectation(FallingFactorial(X, n), condition=condition, **kwargs) P = probability E = expectation H = entropy

ab88753cc6e15fbed250cbd8a3b213aaa6582bfa914412b0beb1cb67b3bf2397

""" Main Random Variables Module Defines abstract random variable type. Contains interfaces for probability space object (PSpace) as well as standard operators, P, E, sample, density, where, quantile See Also ======== sympy.stats.crv sympy.stats.frv sympy.stats.rv_interface """ from __future__ import print_function, division from sympy import (Basic, S, Expr, Symbol, Tuple, And, Add, Eq, lambdify, Equality, Lambda, sympify, Dummy, Ne, KroneckerDelta, DiracDelta, Mul, Indexed, MatrixSymbol, Function) from sympy.core.compatibility import string_types from sympy.core.relational import Relational from sympy.core.sympify import _sympify from sympy.logic.boolalg import Boolean from sympy.sets.sets import FiniteSet, ProductSet, Intersection from sympy.solvers.solveset import solveset x = Symbol('x') class RandomDomain(Basic): """ Represents a set of variables and the values which they can take See Also ======== sympy.stats.crv.ContinuousDomain sympy.stats.frv.FiniteDomain """ is_ProductDomain = False is_Finite = False is_Continuous = False is_Discrete = False def __new__(cls, symbols, *args): symbols = FiniteSet(*symbols) return Basic.__new__(cls, symbols, *args) @property def symbols(self): return self.args[0] @property def set(self): return self.args[1] def __contains__(self, other): raise NotImplementedError() def compute_expectation(self, expr): raise NotImplementedError() class SingleDomain(RandomDomain): """ A single variable and its domain See Also ======== sympy.stats.crv.SingleContinuousDomain sympy.stats.frv.SingleFiniteDomain """ def __new__(cls, symbol, set): assert symbol.is_Symbol return Basic.__new__(cls, symbol, set) @property def symbol(self): return self.args[0] @property def symbols(self): return FiniteSet(self.symbol) def __contains__(self, other): if len(other) != 1: return False sym, val = tuple(other)[0] return self.symbol == sym and val in self.set class ConditionalDomain(RandomDomain): """ A RandomDomain with an attached condition See Also ======== sympy.stats.crv.ConditionalContinuousDomain sympy.stats.frv.ConditionalFiniteDomain """ def __new__(cls, fulldomain, condition): condition = condition.xreplace(dict((rs, rs.symbol) for rs in random_symbols(condition))) return Basic.__new__(cls, fulldomain, condition) @property def symbols(self): return self.fulldomain.symbols @property def fulldomain(self): return self.args[0] @property def condition(self): return self.args[1] @property def set(self): raise NotImplementedError("Set of Conditional Domain not Implemented") def as_boolean(self): return And(self.fulldomain.as_boolean(), self.condition) class PSpace(Basic): """ A Probability Space Probability Spaces encode processes that equal different values probabilistically. These underly Random Symbols which occur in SymPy expressions and contain the mechanics to evaluate statistical statements. See Also ======== sympy.stats.crv.ContinuousPSpace sympy.stats.frv.FinitePSpace """ is_Finite = None is_Continuous = None is_Discrete = None is_real = None @property def domain(self): return self.args[0] @property def density(self): return self.args[1] @property def values(self): return frozenset(RandomSymbol(sym, self) for sym in self.symbols) @property def symbols(self): return self.domain.symbols def where(self, condition): raise NotImplementedError() def compute_density(self, expr): raise NotImplementedError() def sample(self): raise NotImplementedError() def probability(self, condition): raise NotImplementedError() def compute_expectation(self, expr): raise NotImplementedError() class SinglePSpace(PSpace): """ Represents the probabilities of a set of random events that can be attributed to a single variable/symbol. """ def __new__(cls, s, distribution): if isinstance(s, string_types): s = Symbol(s) if not isinstance(s, Symbol): raise TypeError("s should have been string or Symbol") return Basic.__new__(cls, s, distribution) @property def value(self): return RandomSymbol(self.symbol, self) @property def symbol(self): return self.args[0] @property def distribution(self): return self.args[1] @property def pdf(self): return self.distribution.pdf(self.symbol) class RandomSymbol(Expr): """ Random Symbols represent ProbabilitySpaces in SymPy Expressions In principle they can take on any value that their symbol can take on within the associated PSpace with probability determined by the PSpace Density. Random Symbols contain pspace and symbol properties. The pspace property points to the represented Probability Space The symbol is a standard SymPy Symbol that is used in that probability space for example in defining a density. You can form normal SymPy expressions using RandomSymbols and operate on those expressions with the Functions E - Expectation of a random expression P - Probability of a condition density - Probability Density of an expression given - A new random expression (with new random symbols) given a condition An object of the RandomSymbol type should almost never be created by the user. They tend to be created instead by the PSpace class's value method. Traditionally a user doesn't even do this but instead calls one of the convenience functions Normal, Exponential, Coin, Die, FiniteRV, etc.... """ def __new__(cls, symbol, pspace=None): from sympy.stats.joint_rv import JointRandomSymbol if pspace is None: # Allow single arg, representing pspace == PSpace() pspace = PSpace() if not isinstance(symbol, Symbol): raise TypeError("symbol should be of type Symbol") if not isinstance(pspace, PSpace): raise TypeError("pspace variable should be of type PSpace") if cls == JointRandomSymbol and isinstance(pspace, SinglePSpace): cls = RandomSymbol return Basic.__new__(cls, symbol, pspace) is_finite = True is_symbol = True is_Atom = True _diff_wrt = True pspace = property(lambda self: self.args[1]) symbol = property(lambda self: self.args[0]) name = property(lambda self: self.symbol.name) def _eval_is_positive(self): return self.symbol.is_positive def _eval_is_integer(self): return self.symbol.is_integer def _eval_is_real(self): return self.symbol.is_real or self.pspace.is_real @property def is_commutative(self): return self.symbol.is_commutative @property def free_symbols(self): return {self} class RandomIndexedSymbol(RandomSymbol): def __new__(cls, idx_obj, pspace=None): if not isinstance(idx_obj, (Indexed, Function)): raise TypeError("An Function or Indexed object is expected not %s"%(idx_obj)) return Basic.__new__(cls, idx_obj, pspace) symbol = property(lambda self: self.args[0]) name = property(lambda self: str(self.args[0])) @property def key(self): if isinstance(self.symbol, Indexed): return self.symbol.args[1] elif isinstance(self.symbol, Function): return self.symbol.args[0] class RandomMatrixSymbol(MatrixSymbol): def __new__(cls, symbol, n, m, pspace=None): from sympy.stats.random_matrix import RandomMatrixPSpace n, m = _sympify(n), _sympify(m) symbol = _symbol_converter(symbol) return Basic.__new__(cls, symbol, n, m, pspace) symbol = property(lambda self: self.args[0]) pspace = property(lambda self: self.args[3]) class ProductPSpace(PSpace): """ Abstract class for representing probability spaces with multiple random variables. See Also ======== sympy.stats.rv.IndependentProductPSpace sympy.stats.joint_rv.JointPSpace """ pass class IndependentProductPSpace(ProductPSpace): """ A probability space resulting from the merger of two independent probability spaces. Often created using the function, pspace """ def __new__(cls, *spaces): rs_space_dict = {} for space in spaces: for value in space.values: rs_space_dict[value] = space symbols = FiniteSet(*[val.symbol for val in rs_space_dict.keys()]) # Overlapping symbols from sympy.stats.joint_rv import MarginalDistribution, CompoundDistribution if len(symbols) < sum(len(space.symbols) for space in spaces if not isinstance(space.distribution, ( CompoundDistribution, MarginalDistribution))): raise ValueError("Overlapping Random Variables") if all(space.is_Finite for space in spaces): from sympy.stats.frv import ProductFinitePSpace cls = ProductFinitePSpace obj = Basic.__new__(cls, *FiniteSet(*spaces)) return obj @property def pdf(self): p = Mul(*[space.pdf for space in self.spaces]) return p.subs(dict((rv, rv.symbol) for rv in self.values)) @property def rs_space_dict(self): d = {} for space in self.spaces: for value in space.values: d[value] = space return d @property def symbols(self): return FiniteSet(*[val.symbol for val in self.rs_space_dict.keys()]) @property def spaces(self): return FiniteSet(*self.args) @property def values(self): return sumsets(space.values for space in self.spaces) def compute_expectation(self, expr, rvs=None, evaluate=False, **kwargs): rvs = rvs or self.values rvs = frozenset(rvs) for space in self.spaces: expr = space.compute_expectation(expr, rvs & space.values, evaluate=False, **kwargs) if evaluate and hasattr(expr, 'doit'): return expr.doit(**kwargs) return expr @property def domain(self): return ProductDomain(*[space.domain for space in self.spaces]) @property def density(self): raise NotImplementedError("Density not available for ProductSpaces") def sample(self): return {k: v for space in self.spaces for k, v in space.sample().items()} def probability(self, condition, **kwargs): cond_inv = False if isinstance(condition, Ne): condition = Eq(condition.args[0], condition.args[1]) cond_inv = True expr = condition.lhs - condition.rhs rvs = random_symbols(expr) z = Dummy('z', real=True, Finite=True) dens = self.compute_density(expr) if any([pspace(rv).is_Continuous for rv in rvs]): from sympy.stats.crv import (ContinuousDistributionHandmade, SingleContinuousPSpace) if expr in self.values: # Marginalize all other random symbols out of the density randomsymbols = tuple(set(self.values) - frozenset([expr])) symbols = tuple(rs.symbol for rs in randomsymbols) pdf = self.domain.integrate(self.pdf, symbols, **kwargs) return Lambda(expr.symbol, pdf) dens = ContinuousDistributionHandmade(dens) space = SingleContinuousPSpace(z, dens) result = space.probability(condition.__class__(space.value, 0)) else: from sympy.stats.drv import (DiscreteDistributionHandmade, SingleDiscretePSpace) dens = DiscreteDistributionHandmade(dens) space = SingleDiscretePSpace(z, dens) result = space.probability(condition.__class__(space.value, 0)) return result if not cond_inv else S.One - result def compute_density(self, expr, **kwargs): z = Dummy('z', real=True, finite=True) rvs = random_symbols(expr) if any(pspace(rv).is_Continuous for rv in rvs): expr = self.compute_expectation(DiracDelta(expr - z), **kwargs) else: expr = self.compute_expectation(KroneckerDelta(expr, z), **kwargs) return Lambda(z, expr) def compute_cdf(self, expr, **kwargs): raise ValueError("CDF not well defined on multivariate expressions") def conditional_space(self, condition, normalize=True, **kwargs): rvs = random_symbols(condition) condition = condition.xreplace(dict((rv, rv.symbol) for rv in self.values)) if any([pspace(rv).is_Continuous for rv in rvs]): from sympy.stats.crv import (ConditionalContinuousDomain, ContinuousPSpace) space = ContinuousPSpace domain = ConditionalContinuousDomain(self.domain, condition) elif any([pspace(rv).is_Discrete for rv in rvs]): from sympy.stats.drv import (ConditionalDiscreteDomain, DiscretePSpace) space = DiscretePSpace domain = ConditionalDiscreteDomain(self.domain, condition) elif all([pspace(rv).is_Finite for rv in rvs]): from sympy.stats.frv import FinitePSpace return FinitePSpace.conditional_space(self, condition) if normalize: replacement = {rv: Dummy(str(rv)) for rv in self.symbols} norm = domain.compute_expectation(self.pdf, **kwargs) pdf = self.pdf / norm.xreplace(replacement) density = Lambda(domain.symbols, pdf) return space(domain, density) class ProductDomain(RandomDomain): """ A domain resulting from the merger of two independent domains See Also ======== sympy.stats.crv.ProductContinuousDomain sympy.stats.frv.ProductFiniteDomain """ is_ProductDomain = True def __new__(cls, *domains): # Flatten any product of products domains2 = [] for domain in domains: if not domain.is_ProductDomain: domains2.append(domain) else: domains2.extend(domain.domains) domains2 = FiniteSet(*domains2) if all(domain.is_Finite for domain in domains2): from sympy.stats.frv import ProductFiniteDomain cls = ProductFiniteDomain if all(domain.is_Continuous for domain in domains2): from sympy.stats.crv import ProductContinuousDomain cls = ProductContinuousDomain if all(domain.is_Discrete for domain in domains2): from sympy.stats.drv import ProductDiscreteDomain cls = ProductDiscreteDomain return Basic.__new__(cls, *domains2) @property def sym_domain_dict(self): return dict((symbol, domain) for domain in self.domains for symbol in domain.symbols) @property def symbols(self): return FiniteSet(*[sym for domain in self.domains for sym in domain.symbols]) @property def domains(self): return self.args @property def set(self): return ProductSet(domain.set for domain in self.domains) def __contains__(self, other): # Split event into each subdomain for domain in self.domains: # Collect the parts of this event which associate to this domain elem = frozenset([item for item in other if sympify(domain.symbols.contains(item[0])) is S.true]) # Test this sub-event if elem not in domain: return False # All subevents passed return True def as_boolean(self): return And(*[domain.as_boolean() for domain in self.domains]) def random_symbols(expr): """ Returns all RandomSymbols within a SymPy Expression. """ atoms = getattr(expr, 'atoms', None) if atoms is not None: comp = lambda rv: rv.symbol.name l = list(atoms(RandomSymbol)) return sorted(l, key=comp) else: return [] def pspace(expr): """ Returns the underlying Probability Space of a random expression. For internal use. Examples ======== >>> from sympy.stats import pspace, Normal >>> from sympy.stats.rv import IndependentProductPSpace >>> X = Normal('X', 0, 1) >>> pspace(2*X + 1) == X.pspace True """ expr = sympify(expr) if isinstance(expr, RandomSymbol) and expr.pspace is not None: return expr.pspace if expr.has(RandomMatrixSymbol): rm = list(expr.atoms(RandomMatrixSymbol))[0] return rm.pspace rvs = random_symbols(expr) if not rvs: raise ValueError("Expression containing Random Variable expected, not %s" % (expr)) # If only one space present if all(rv.pspace == rvs[0].pspace for rv in rvs): return rvs[0].pspace # Otherwise make a product space return IndependentProductPSpace(*[rv.pspace for rv in rvs]) def sumsets(sets): """ Union of sets """ return frozenset().union(*sets) def rs_swap(a, b): """ Build a dictionary to swap RandomSymbols based on their underlying symbol. i.e. if ``X = ('x', pspace1)`` and ``Y = ('x', pspace2)`` then ``X`` and ``Y`` match and the key, value pair ``{X:Y}`` will appear in the result Inputs: collections a and b of random variables which share common symbols Output: dict mapping RVs in a to RVs in b """ d = {} for rsa in a: d[rsa] = [rsb for rsb in b if rsa.symbol == rsb.symbol][0] return d def given(expr, condition=None, **kwargs): r""" Conditional Random Expression From a random expression and a condition on that expression creates a new probability space from the condition and returns the same expression on that conditional probability space. Examples ======== >>> from sympy.stats import given, density, Die >>> X = Die('X', 6) >>> Y = given(X, X > 3) >>> density(Y).dict {4: 1/3, 5: 1/3, 6: 1/3} Following convention, if the condition is a random symbol then that symbol is considered fixed. >>> from sympy.stats import Normal >>> from sympy import pprint >>> from sympy.abc import z >>> X = Normal('X', 0, 1) >>> Y = Normal('Y', 0, 1) >>> pprint(density(X + Y, Y)(z), use_unicode=False) 2 -(-Y + z) ----------- ___ 2 \/ 2 *e ------------------ ____ 2*\/ pi """ if not random_symbols(condition) or pspace_independent(expr, condition): return expr if isinstance(condition, RandomSymbol): condition = Eq(condition, condition.symbol) condsymbols = random_symbols(condition) if (isinstance(condition, Equality) and len(condsymbols) == 1 and not isinstance(pspace(expr).domain, ConditionalDomain)): rv = tuple(condsymbols)[0] results = solveset(condition, rv) if isinstance(results, Intersection) and S.Reals in results.args: results = list(results.args[1]) sums = 0 for res in results: temp = expr.subs(rv, res) if temp == True: return True if temp != False: sums += expr.subs(rv, res) if sums == 0: return False return sums # Get full probability space of both the expression and the condition fullspace = pspace(Tuple(expr, condition)) # Build new space given the condition space = fullspace.conditional_space(condition, **kwargs) # Dictionary to swap out RandomSymbols in expr with new RandomSymbols # That point to the new conditional space swapdict = rs_swap(fullspace.values, space.values) # Swap random variables in the expression expr = expr.xreplace(swapdict) return expr def expectation(expr, condition=None, numsamples=None, evaluate=True, **kwargs): """ Returns the expected value of a random expression Parameters ========== expr : Expr containing RandomSymbols The expression of which you want to compute the expectation value given : Expr containing RandomSymbols A conditional expression. E(X, X>0) is expectation of X given X > 0 numsamples : int Enables sampling and approximates the expectation with this many samples evalf : Bool (defaults to True) If sampling return a number rather than a complex expression evaluate : Bool (defaults to True) In case of continuous systems return unevaluated integral Examples ======== >>> from sympy.stats import E, Die >>> X = Die('X', 6) >>> E(X) 7/2 >>> E(2*X + 1) 8 >>> E(X, X > 3) # Expectation of X given that it is above 3 5 """ if not random_symbols(expr): # expr isn't random? return expr if numsamples: # Computing by monte carlo sampling? return sampling_E(expr, condition, numsamples=numsamples) if expr.has(RandomIndexedSymbol): return pspace(expr).compute_expectation(expr, condition, evaluate, **kwargs) # Create new expr and recompute E if condition is not None: # If there is a condition return expectation(given(expr, condition), evaluate=evaluate) # A few known statements for efficiency if expr.is_Add: # We know that E is Linear return Add(*[expectation(arg, evaluate=evaluate) for arg in expr.args]) # Otherwise case is simple, pass work off to the ProbabilitySpace result = pspace(expr).compute_expectation(expr, evaluate=evaluate, **kwargs) if evaluate and hasattr(result, 'doit'): return result.doit(**kwargs) else: return result def probability(condition, given_condition=None, numsamples=None, evaluate=True, **kwargs): """ Probability that a condition is true, optionally given a second condition Parameters ========== condition : Combination of Relationals containing RandomSymbols The condition of which you want to compute the probability given_condition : Combination of Relationals containing RandomSymbols A conditional expression. P(X > 1, X > 0) is expectation of X > 1 given X > 0 numsamples : int Enables sampling and approximates the probability with this many samples evaluate : Bool (defaults to True) In case of continuous systems return unevaluated integral Examples ======== >>> from sympy.stats import P, Die >>> from sympy import Eq >>> X, Y = Die('X', 6), Die('Y', 6) >>> P(X > 3) 1/2 >>> P(Eq(X, 5), X > 2) # Probability that X == 5 given that X > 2 1/4 >>> P(X > Y) 5/12 """ condition = sympify(condition) given_condition = sympify(given_condition) if condition.has(RandomIndexedSymbol): return pspace(condition).probability(condition, given_condition, evaluate, **kwargs) if isinstance(given_condition, RandomSymbol): condrv = random_symbols(condition) if len(condrv) == 1 and condrv[0] == given_condition: from sympy.stats.frv_types import BernoulliDistribution return BernoulliDistribution(probability(condition), 0, 1) if any([dependent(rv, given_condition) for rv in condrv]): from sympy.stats.symbolic_probability import Probability return Probability(condition, given_condition) else: return probability(condition) if given_condition is not None and \ not isinstance(given_condition, (Relational, Boolean)): raise ValueError("%s is not a relational or combination of relationals" % (given_condition)) if given_condition == False: return S.Zero if not isinstance(condition, (Relational, Boolean)): raise ValueError("%s is not a relational or combination of relationals" % (condition)) if condition is S.true: return S.One if condition is S.false: return S.Zero if numsamples: return sampling_P(condition, given_condition, numsamples=numsamples, **kwargs) if given_condition is not None: # If there is a condition # Recompute on new conditional expr return probability(given(condition, given_condition, **kwargs), **kwargs) # Otherwise pass work off to the ProbabilitySpace result = pspace(condition).probability(condition, **kwargs) if evaluate and hasattr(result, 'doit'): return result.doit() else: return result class Density(Basic): expr = property(lambda self: self.args[0]) @property def condition(self): if len(self.args) > 1: return self.args[1] else: return None def doit(self, evaluate=True, **kwargs): from sympy.stats.joint_rv import JointPSpace from sympy.stats.frv import SingleFiniteDistribution from sympy.stats.random_matrix_models import RandomMatrixPSpace expr, condition = self.expr, self.condition if _sympify(expr).has(RandomMatrixSymbol): return pspace(expr).compute_density(expr) if isinstance(expr, SingleFiniteDistribution): return expr.dict if condition is not None: # Recompute on new conditional expr expr = given(expr, condition, **kwargs) if isinstance(expr, RandomSymbol) and \ isinstance(expr.pspace, JointPSpace): return expr.pspace.distribution if not random_symbols(expr): return Lambda(x, DiracDelta(x - expr)) if (isinstance(expr, RandomSymbol) and hasattr(expr.pspace, 'distribution') and isinstance(pspace(expr), (SinglePSpace))): return expr.pspace.distribution result = pspace(expr).compute_density(expr, **kwargs) if evaluate and hasattr(result, 'doit'): return result.doit() else: return result def density(expr, condition=None, evaluate=True, numsamples=None, **kwargs): """ Probability density of a random expression, optionally given a second condition. This density will take on different forms for different types of probability spaces. Discrete variables produce Dicts. Continuous variables produce Lambdas. Parameters ========== expr : Expr containing RandomSymbols The expression of which you want to compute the density value condition : Relational containing RandomSymbols A conditional expression. density(X > 1, X > 0) is density of X > 1 given X > 0 numsamples : int Enables sampling and approximates the density with this many samples Examples ======== >>> from sympy.stats import density, Die, Normal >>> from sympy import Symbol >>> x = Symbol('x') >>> D = Die('D', 6) >>> X = Normal(x, 0, 1) >>> density(D).dict {1: 1/6, 2: 1/6, 3: 1/6, 4: 1/6, 5: 1/6, 6: 1/6} >>> density(2*D).dict {2: 1/6, 4: 1/6, 6: 1/6, 8: 1/6, 10: 1/6, 12: 1/6} >>> density(X)(x) sqrt(2)*exp(-x**2/2)/(2*sqrt(pi)) """ if numsamples: return sampling_density(expr, condition, numsamples=numsamples, **kwargs) return Density(expr, condition).doit(evaluate=evaluate, **kwargs) def cdf(expr, condition=None, evaluate=True, **kwargs): """ Cumulative Distribution Function of a random expression. optionally given a second condition This density will take on different forms for different types of probability spaces. Discrete variables produce Dicts. Continuous variables produce Lambdas. Examples ======== >>> from sympy.stats import density, Die, Normal, cdf >>> D = Die('D', 6) >>> X = Normal('X', 0, 1) >>> density(D).dict {1: 1/6, 2: 1/6, 3: 1/6, 4: 1/6, 5: 1/6, 6: 1/6} >>> cdf(D) {1: 1/6, 2: 1/3, 3: 1/2, 4: 2/3, 5: 5/6, 6: 1} >>> cdf(3*D, D > 2) {9: 1/4, 12: 1/2, 15: 3/4, 18: 1} >>> cdf(X) Lambda(_z, erf(sqrt(2)*_z/2)/2 + 1/2) """ if condition is not None: # If there is a condition # Recompute on new conditional expr return cdf(given(expr, condition, **kwargs), **kwargs) # Otherwise pass work off to the ProbabilitySpace result = pspace(expr).compute_cdf(expr, **kwargs) if evaluate and hasattr(result, 'doit'): return result.doit() else: return result def characteristic_function(expr, condition=None, evaluate=True, **kwargs): """ Characteristic function of a random expression, optionally given a second condition Returns a Lambda Examples ======== >>> from sympy.stats import Normal, DiscreteUniform, Poisson, characteristic_function >>> X = Normal('X', 0, 1) >>> characteristic_function(X) Lambda(_t, exp(-_t**2/2)) >>> Y = DiscreteUniform('Y', [1, 2, 7]) >>> characteristic_function(Y) Lambda(_t, exp(7*_t*I)/3 + exp(2*_t*I)/3 + exp(_t*I)/3) >>> Z = Poisson('Z', 2) >>> characteristic_function(Z) Lambda(_t, exp(2*exp(_t*I) - 2)) """ if condition is not None: return characteristic_function(given(expr, condition, **kwargs), **kwargs) result = pspace(expr).compute_characteristic_function(expr, **kwargs) if evaluate and hasattr(result, 'doit'): return result.doit() else: return result def moment_generating_function(expr, condition=None, evaluate=True, **kwargs): if condition is not None: return moment_generating_function(given(expr, condition, **kwargs), **kwargs) result = pspace(expr).compute_moment_generating_function(expr, **kwargs) if evaluate and hasattr(result, 'doit'): return result.doit() else: return result def where(condition, given_condition=None, **kwargs): """ Returns the domain where a condition is True. Examples ======== >>> from sympy.stats import where, Die, Normal >>> from sympy import symbols, And >>> D1, D2 = Die('a', 6), Die('b', 6) >>> a, b = D1.symbol, D2.symbol >>> X = Normal('x', 0, 1) >>> where(X**2<1) Domain: (-1 < x) & (x < 1) >>> where(X**2<1).set Interval.open(-1, 1) >>> where(And(D1<=D2 , D2<3)) Domain: (Eq(a, 1) & Eq(b, 1)) | (Eq(a, 1) & Eq(b, 2)) | (Eq(a, 2) & Eq(b, 2)) """ if given_condition is not None: # If there is a condition # Recompute on new conditional expr return where(given(condition, given_condition, **kwargs), **kwargs) # Otherwise pass work off to the ProbabilitySpace return pspace(condition).where(condition, **kwargs) def sample(expr, condition=None, **kwargs): """ A realization of the random expression Examples ======== >>> from sympy.stats import Die, sample >>> X, Y, Z = Die('X', 6), Die('Y', 6), Die('Z', 6) >>> die_roll = sample(X + Y + Z) # A random realization of three dice """ return next(sample_iter(expr, condition, numsamples=1)) def sample_iter(expr, condition=None, numsamples=S.Infinity, **kwargs): """ Returns an iterator of realizations from the expression given a condition Parameters ========== expr: Expr Random expression to be realized condition: Expr, optional A conditional expression numsamples: integer, optional Length of the iterator (defaults to infinity) Examples ======== >>> from sympy.stats import Normal, sample_iter >>> X = Normal('X', 0, 1) >>> expr = X*X + 3 >>> iterator = sample_iter(expr, numsamples=3) >>> list(iterator) # doctest: +SKIP [12, 4, 7] See Also ======== sample sampling_P sampling_E sample_iter_lambdify sample_iter_subs """ # lambdify is much faster but not as robust try: return sample_iter_lambdify(expr, condition, numsamples, **kwargs) # use subs when lambdify fails except TypeError: return sample_iter_subs(expr, condition, numsamples, **kwargs) def quantile(expr, evaluate=True, **kwargs): r""" Return the :math:`p^{th}` order quantile of a probability distribution. Quantile is defined as the value at which the probability of the random variable is less than or equal to the given probability. ..math:: Q(p) = inf{x \in (-\infty, \infty) such that p <= F(x)} Examples ======== >>> from sympy.stats import quantile, Die, Exponential >>> from sympy import Symbol, pprint >>> p = Symbol("p") >>> l = Symbol("lambda", positive=True) >>> X = Exponential("x", l) >>> quantile(X)(p) -log(1 - p)/lambda >>> D = Die("d", 6) >>> pprint(quantile(D)(p), use_unicode=False) /nan for Or(p > 1, p < 0) | | 1 for p <= 1/6 | | 2 for p <= 1/3 | < 3 for p <= 1/2 | | 4 for p <= 2/3 | | 5 for p <= 5/6 | \ 6 for p <= 1 """ result = pspace(expr).compute_quantile(expr, **kwargs) if evaluate and hasattr(result, 'doit'): return result.doit() else: return result def sample_iter_lambdify(expr, condition=None, numsamples=S.Infinity, **kwargs): """ See sample_iter Uses lambdify for computation. This is fast but does not always work. """ if condition: ps = pspace(Tuple(expr, condition)) else: ps = pspace(expr) rvs = list(ps.values) fn = lambdify(rvs, expr, **kwargs) if condition: given_fn = lambdify(rvs, condition, **kwargs) # Check that lambdify can handle the expression # Some operations like Sum can prove difficult try: d = ps.sample() # a dictionary that maps RVs to values args = [d[rv] for rv in rvs] fn(*args) if condition: given_fn(*args) except Exception: raise TypeError("Expr/condition too complex for lambdify") def return_generator(): count = 0 while count < numsamples: d = ps.sample() # a dictionary that maps RVs to values args = [d[rv] for rv in rvs] if condition: # Check that these values satisfy the condition gd = given_fn(*args) if gd != True and gd != False: raise ValueError( "Conditions must not contain free symbols") if not gd: # If the values don't satisfy then try again continue yield fn(*args) count += 1 return return_generator() def sample_iter_subs(expr, condition=None, numsamples=S.Infinity, **kwargs): """ See sample_iter Uses subs for computation. This is slow but almost always works. """ if condition is not None: ps = pspace(Tuple(expr, condition)) else: ps = pspace(expr) count = 0 while count < numsamples: d = ps.sample() # a dictionary that maps RVs to values if condition is not None: # Check that these values satisfy the condition gd = condition.xreplace(d) if gd != True and gd != False: raise ValueError("Conditions must not contain free symbols") if not gd: # If the values don't satisfy then try again continue yield expr.xreplace(d) count += 1 def sampling_P(condition, given_condition=None, numsamples=1, evalf=True, **kwargs): """ Sampling version of P See Also ======== P sampling_E sampling_density """ count_true = 0 count_false = 0 samples = sample_iter(condition, given_condition, numsamples=numsamples, **kwargs) for sample in samples: if sample != True and sample != False: raise ValueError("Conditions must not contain free symbols") if sample: count_true += 1 else: count_false += 1 result = S(count_true) / numsamples if evalf: return result.evalf() else: return result def sampling_E(expr, given_condition=None, numsamples=1, evalf=True, **kwargs): """ Sampling version of E See Also ======== P sampling_P sampling_density """ samples = sample_iter(expr, given_condition, numsamples=numsamples, **kwargs) result = Add(*list(samples)) / numsamples if evalf: return result.evalf() else: return result def sampling_density(expr, given_condition=None, numsamples=1, **kwargs): """ Sampling version of density See Also ======== density sampling_P sampling_E """ results = {} for result in sample_iter(expr, given_condition, numsamples=numsamples, **kwargs): results[result] = results.get(result, 0) + 1 return results def dependent(a, b): """ Dependence of two random expressions Two expressions are independent if knowledge of one does not change computations on the other. Examples ======== >>> from sympy.stats import Normal, dependent, given >>> from sympy import Tuple, Eq >>> X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) >>> dependent(X, Y) False >>> dependent(2*X + Y, -Y) True >>> X, Y = given(Tuple(X, Y), Eq(X + Y, 3)) >>> dependent(X, Y) True See Also ======== independent """ if pspace_independent(a, b): return False z = Symbol('z', real=True) # Dependent if density is unchanged when one is given information about # the other return (density(a, Eq(b, z)) != density(a) or density(b, Eq(a, z)) != density(b)) def independent(a, b): """ Independence of two random expressions Two expressions are independent if knowledge of one does not change computations on the other. Examples ======== >>> from sympy.stats import Normal, independent, given >>> from sympy import Tuple, Eq >>> X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) >>> independent(X, Y) True >>> independent(2*X + Y, -Y) False >>> X, Y = given(Tuple(X, Y), Eq(X + Y, 3)) >>> independent(X, Y) False See Also ======== dependent """ return not dependent(a, b) def pspace_independent(a, b): """ Tests for independence between a and b by checking if their PSpaces have overlapping symbols. This is a sufficient but not necessary condition for independence and is intended to be used internally. Notes ===== pspace_independent(a, b) implies independent(a, b) independent(a, b) does not imply pspace_independent(a, b) """ a_symbols = set(pspace(b).symbols) b_symbols = set(pspace(a).symbols) if len(set(random_symbols(a)).intersection(random_symbols(b))) != 0: return False if len(a_symbols.intersection(b_symbols)) == 0: return True return None def rv_subs(expr, symbols=None): """ Given a random expression replace all random variables with their symbols. If symbols keyword is given restrict the swap to only the symbols listed. """ if symbols is None: symbols = random_symbols(expr) if not symbols: return expr swapdict = {rv: rv.symbol for rv in symbols} return expr.subs(swapdict) class NamedArgsMixin(object): _argnames = () def __getattr__(self, attr): try: return self.args[self._argnames.index(attr)] except ValueError: raise AttributeError("'%s' object has no attribute '%s'" % ( type(self).__name__, attr)) def _value_check(condition, message): """ Raise a ValueError with message if condition is False, else return True if all conditions were True, else False. Examples ======== >>> from sympy.stats.rv import _value_check >>> from sympy.abc import a, b, c >>> from sympy import And, Dummy >>> _value_check(2 < 3, '') True Here, the condition is not False, but it doesn't evaluate to True so False is returned (but no error is raised). So checking if the return value is True or False will tell you if all conditions were evaluated. >>> _value_check(a < b, '') False In this case the condition is False so an error is raised: >>> r = Dummy(real=True) >>> _value_check(r < r - 1, 'condition is not true') Traceback (most recent call last): ... ValueError: condition is not true If no condition of many conditions must be False, they can be checked by passing them as an iterable: >>> _value_check((a < 0, b < 0, c < 0), '') False The iterable can be a generator, too: >>> _value_check((i < 0 for i in (a, b, c)), '') False The following are equivalent to the above but do not pass an iterable: >>> all(_value_check(i < 0, '') for i in (a, b, c)) False >>> _value_check(And(a < 0, b < 0, c < 0), '') False """ from sympy.core.compatibility import iterable from sympy.core.logic import fuzzy_and if not iterable(condition): condition = [condition] truth = fuzzy_and(condition) if truth == False: raise ValueError(message) return truth == True def _symbol_converter(sym): """ Casts the parameter to Symbol if it is of string_types otherwise no operation is performed on it. Parameters ========== sym The parameter to be converted. Returns ======= Symbol the parameter converted to Symbol. Raises ====== TypeError If the parameter is not an instance of both string_types and Symbol. Examples ======== >>> from sympy import Symbol >>> from sympy.stats.rv import _symbol_converter >>> s = _symbol_converter('s') >>> isinstance(s, Symbol) True >>> _symbol_converter(1) Traceback (most recent call last): ... TypeError: 1 is neither a Symbol nor a string >>> r = Symbol('r') >>> isinstance(r, Symbol) True """ if isinstance(sym, string_types): sym = Symbol(sym) if not isinstance(sym, Symbol): raise TypeError("%s is neither a Symbol nor a string"%(sym)) return sym

5d7ff17e79635ce3b34a7a32511b83299f6d04561bcd673c674aafeb4477a63d

""" Joint Random Variables Module See Also ======== sympy.stats.rv sympy.stats.frv sympy.stats.crv sympy.stats.drv """ from __future__ import print_function, division from sympy import (Basic, Lambda, sympify, Indexed, Symbol, ProductSet, S, Dummy) from sympy.concrete.products import Product from sympy.concrete.summations import Sum, summation from sympy.core.compatibility import string_types, iterable from sympy.core.containers import Tuple from sympy.integrals.integrals import Integral, integrate from sympy.matrices import ImmutableMatrix from sympy.stats.crv import (ContinuousDistribution, SingleContinuousDistribution, SingleContinuousPSpace) from sympy.stats.drv import (DiscreteDistribution, SingleDiscreteDistribution, SingleDiscretePSpace) from sympy.stats.rv import (ProductPSpace, NamedArgsMixin, ProductDomain, RandomSymbol, random_symbols, SingleDomain) from sympy.utilities.misc import filldedent # __all__ = ['marginal_distribution'] class JointPSpace(ProductPSpace): """ Represents a joint probability space. Represented using symbols for each component and a distribution. """ def __new__(cls, sym, dist): if isinstance(dist, SingleContinuousDistribution): return SingleContinuousPSpace(sym, dist) if isinstance(dist, SingleDiscreteDistribution): return SingleDiscretePSpace(sym, dist) if isinstance(sym, string_types): sym = Symbol(sym) if not isinstance(sym, Symbol): raise TypeError("s should have been string or Symbol") return Basic.__new__(cls, sym, dist) @property def set(self): return self.domain.set @property def symbol(self): return self.args[0] @property def distribution(self): return self.args[1] @property def value(self): return JointRandomSymbol(self.symbol, self) @property def component_count(self): _set = self.distribution.set if isinstance(_set, ProductSet): return S(len(_set.args)) elif isinstance(_set, Product): return _set.limits[0][-1] return S(1) @property def pdf(self): sym = [Indexed(self.symbol, i) for i in range(self.component_count)] return self.distribution(*sym) @property def domain(self): rvs = random_symbols(self.distribution) if not rvs: return SingleDomain(self.symbol, self.distribution.set) return ProductDomain(*[rv.pspace.domain for rv in rvs]) def component_domain(self, index): return self.set.args[index] def marginal_distribution(self, *indices): count = self.component_count if count.atoms(Symbol): raise ValueError("Marginal distributions cannot be computed " "for symbolic dimensions. It is a work under progress.") orig = [Indexed(self.symbol, i) for i in range(count)] all_syms = [Symbol(str(i)) for i in orig] replace_dict = dict(zip(all_syms, orig)) sym = [Symbol(str(Indexed(self.symbol, i))) for i in indices] limits = list([i,] for i in all_syms if i not in sym) index = 0 for i in range(count): if i not in indices: limits[index].append(self.distribution.set.args[i]) limits[index] = tuple(limits[index]) index += 1 if self.distribution.is_Continuous: f = Lambda(sym, integrate(self.distribution(*all_syms), *limits)) elif self.distribution.is_Discrete: f = Lambda(sym, summation(self.distribution(*all_syms), *limits)) return f.xreplace(replace_dict) def compute_expectation(self, expr, rvs=None, evaluate=False, **kwargs): syms = tuple(self.value[i] for i in range(self.component_count)) rvs = rvs or syms if not any([i in rvs for i in syms]): return expr expr = expr*self.pdf for rv in rvs: if isinstance(rv, Indexed): expr = expr.xreplace({rv: Indexed(str(rv.base), rv.args[1])}) elif isinstance(rv, RandomSymbol): expr = expr.xreplace({rv: rv.symbol}) if self.value in random_symbols(expr): raise NotImplementedError(filldedent(''' Expectations of expression with unindexed joint random symbols cannot be calculated yet.''')) limits = tuple((Indexed(str(rv.base),rv.args[1]), self.distribution.set.args[rv.args[1]]) for rv in syms) return Integral(expr, *limits) def where(self, condition): raise NotImplementedError() def compute_density(self, expr): raise NotImplementedError() def sample(self): raise NotImplementedError() def probability(self, condition): raise NotImplementedError() class JointDistribution(Basic, NamedArgsMixin): """ Represented by the random variables part of the joint distribution. Contains methods for PDF, CDF, sampling, marginal densities, etc. """ _argnames = ('pdf', ) def __new__(cls, *args): args = list(map(sympify, args)) for i in range(len(args)): if isinstance(args[i], list): args[i] = ImmutableMatrix(args[i]) return Basic.__new__(cls, *args) @property def domain(self): return ProductDomain(self.symbols) @property def pdf(self, *args): return self.density.args[1] def cdf(self, other): if not isinstance(other, dict): raise ValueError("%s should be of type dict, got %s"%(other, type(other))) rvs = other.keys() _set = self.domain.set.sets expr = self.pdf(tuple(i.args[0] for i in self.symbols)) for i in range(len(other)): if rvs[i].is_Continuous: density = Integral(expr, (rvs[i], _set[i].inf, other[rvs[i]])) elif rvs[i].is_Discrete: density = Sum(expr, (rvs[i], _set[i].inf, other[rvs[i]])) return density def __call__(self, *args): return self.pdf(*args) class JointRandomSymbol(RandomSymbol): """ Representation of random symbols with joint probability distributions to allow indexing." """ def __getitem__(self, key): if isinstance(self.pspace, JointPSpace): if (self.pspace.component_count <= key) == True: raise ValueError("Index keys for %s can only up to %s." % (self.name, self.pspace.component_count - 1)) return Indexed(self, key) class JointDistributionHandmade(JointDistribution, NamedArgsMixin): _argnames = ('pdf',) is_Continuous = True @property def set(self): return self.args[1] def marginal_distribution(rv, *indices): """ Marginal distribution function of a joint random variable. Parameters ========== rv: A random variable with a joint probability distribution. indices: component indices or the indexed random symbol for whom the joint distribution is to be calculated Returns ======= A Lambda expression n `sym`. Examples ======== >>> from sympy.stats.crv_types import Normal >>> from sympy.stats.joint_rv import marginal_distribution >>> m = Normal('X', [1, 2], [[2, 1], [1, 2]]) >>> marginal_distribution(m, m[0])(1) 1/(2*sqrt(pi)) """ indices = list(indices) for i in range(len(indices)): if isinstance(indices[i], Indexed): indices[i] = indices[i].args[1] prob_space = rv.pspace if not indices: raise ValueError( "At least one component for marginal density is needed.") if hasattr(prob_space.distribution, 'marginal_distribution'): return prob_space.distribution.marginal_distribution(indices, rv.symbol) return prob_space.marginal_distribution(*indices) class CompoundDistribution(Basic, NamedArgsMixin): """ Represents a compound probability distribution. Constructed using a single probability distribution with a parameter distributed according to some given distribution. """ def __new__(cls, dist): if not isinstance(dist, (ContinuousDistribution, DiscreteDistribution)): raise ValueError(filldedent('''CompoundDistribution can only be initialized from ContinuousDistribution or DiscreteDistribution ''')) _args = dist.args if not any([isinstance(i, RandomSymbol) for i in _args]): return dist return Basic.__new__(cls, dist) @property def latent_distributions(self): return random_symbols(self.args[0]) def pdf(self, *x): dist = self.args[0] z = Dummy('z') if isinstance(dist, ContinuousDistribution): rv = SingleContinuousPSpace(z, dist).value elif isinstance(dist, DiscreteDistribution): rv = SingleDiscretePSpace(z, dist).value return MarginalDistribution(self, (rv,)).pdf(*x) def set(self): return self.args[0].set def __call__(self, *args): return self.pdf(*args) class MarginalDistribution(Basic): """ Represents the marginal distribution of a joint probability space. Initialised using a probability distribution and random variables(or their indexed components) which should be a part of the resultant distribution. """ def __new__(cls, dist, *rvs): if len(rvs) == 1 and iterable(rvs[0]): rvs = tuple(rvs[0]) if not all([isinstance(rv, (Indexed, RandomSymbol))] for rv in rvs): raise ValueError(filldedent('''Marginal distribution can be intitialised only in terms of random variables or indexed random variables''')) rvs = Tuple.fromiter(rv for rv in rvs) if not isinstance(dist, JointDistribution) and len(random_symbols(dist)) == 0: return dist return Basic.__new__(cls, dist, rvs) def check(self): pass @property def set(self): rvs = [i for i in self.args[1] if isinstance(i, RandomSymbol)] return ProductSet(*[rv.pspace.set for rv in rvs]) @property def symbols(self): rvs = self.args[1] return set([rv.pspace.symbol for rv in rvs]) def pdf(self, *x): expr, rvs = self.args[0], self.args[1] marginalise_out = [i for i in random_symbols(expr) if i not in rvs] if isinstance(expr, CompoundDistribution): syms = Dummy('x', real=True) expr = expr.args[0].pdf(syms) elif isinstance(expr, JointDistribution): count = len(expr.domain.args) x = Dummy('x', real=True, finite=True) syms = [Indexed(x, i) for i in count] expr = expr.pdf(syms) else: syms = [rv.pspace.symbol if isinstance(rv, RandomSymbol) else rv.args[0] for rv in rvs] return Lambda(syms, self.compute_pdf(expr, marginalise_out))(*x) def compute_pdf(self, expr, rvs): for rv in rvs: lpdf = 1 if isinstance(rv, RandomSymbol): lpdf = rv.pspace.pdf expr = self.marginalise_out(expr*lpdf, rv) return expr def marginalise_out(self, expr, rv): from sympy.concrete.summations import Sum if isinstance(rv, RandomSymbol): dom = rv.pspace.set elif isinstance(rv, Indexed): dom = rv.base.component_domain( rv.pspace.component_domain(rv.args[1])) expr = expr.xreplace({rv: rv.pspace.symbol}) if rv.pspace.is_Continuous: #TODO: Modify to support integration #for all kinds of sets. expr = Integral(expr, (rv.pspace.symbol, dom)) elif rv.pspace.is_Discrete: #incorporate this into `Sum`/`summation` if dom in (S.Integers, S.Naturals, S.Naturals0): dom = (dom.inf, dom.sup) expr = Sum(expr, (rv.pspace.symbol, dom)) return expr def __call__(self, *args): return self.pdf(*args)

a1ca9d968f7023d18f5bb6dcb08a3662daec70e4e693e82be0d0d9c11cce9942

from __future__ import print_function, division from sympy import (Basic, sympify, symbols, Dummy, Lambda, summation, Piecewise, S, cacheit, Sum, exp, I, Ne, Eq, poly, series, factorial, And) from sympy.polys.polyerrors import PolynomialError from sympy.solvers.solveset import solveset from sympy.stats.crv import reduce_rational_inequalities_wrap from sympy.stats.rv import (NamedArgsMixin, SinglePSpace, SingleDomain, random_symbols, PSpace, ConditionalDomain, RandomDomain, ProductDomain) from sympy.stats.symbolic_probability import Probability from sympy.functions.elementary.integers import floor from sympy.sets.fancysets import Range, FiniteSet from sympy.sets.sets import Union from sympy.sets.contains import Contains from sympy.utilities import filldedent import random class DiscreteDistribution(Basic): def __call__(self, *args): return self.pdf(*args) class SingleDiscreteDistribution(DiscreteDistribution, NamedArgsMixin): """ Discrete distribution of a single variable Serves as superclass for PoissonDistribution etc.... Provides methods for pdf, cdf, and sampling See Also: sympy.stats.crv_types.* """ set = S.Integers def __new__(cls, *args): args = list(map(sympify, args)) return Basic.__new__(cls, *args) @staticmethod def check(*args): pass def sample(self): """ A random realization from the distribution """ icdf = self._inverse_cdf_expression() while True: sample_ = floor(list(icdf(random.uniform(0, 1)))[0]) if sample_ >= self.set.inf: return sample_ @cacheit def _inverse_cdf_expression(self): """ Inverse of the CDF Used by sample """ x = symbols('x', positive=True, integer=True, cls=Dummy) z = symbols('z', positive=True, cls=Dummy) cdf_temp = self.cdf(x) # Invert CDF try: inverse_cdf = solveset(cdf_temp - z, x, domain=S.Reals) except NotImplementedError: inverse_cdf = None if not inverse_cdf or len(inverse_cdf.free_symbols) != 1: raise NotImplementedError("Could not invert CDF") return Lambda(z, inverse_cdf) @cacheit def compute_cdf(self, **kwargs): """ Compute the CDF from the PDF Returns a Lambda """ x, z = symbols('x, z', integer=True, finite=True, cls=Dummy) left_bound = self.set.inf # CDF is integral of PDF from left bound to z pdf = self.pdf(x) cdf = summation(pdf, (x, left_bound, z), **kwargs) # CDF Ensure that CDF left of left_bound is zero cdf = Piecewise((cdf, z >= left_bound), (0, True)) return Lambda(z, cdf) def _cdf(self, x): return None def cdf(self, x, **kwargs): """ Cumulative density function """ if not kwargs: cdf = self._cdf(x) if cdf is not None: return cdf return self.compute_cdf(**kwargs)(x) @cacheit def compute_characteristic_function(self, **kwargs): """ Compute the characteristic function from the PDF Returns a Lambda """ x, t = symbols('x, t', real=True, finite=True, cls=Dummy) pdf = self.pdf(x) cf = summation(exp(I*t*x)*pdf, (x, self.set.inf, self.set.sup)) return Lambda(t, cf) def _characteristic_function(self, t): return None def characteristic_function(self, t, **kwargs): """ Characteristic function """ if not kwargs: cf = self._characteristic_function(t) if cf is not None: return cf return self.compute_characteristic_function(**kwargs)(t) @cacheit def compute_moment_generating_function(self, **kwargs): x, t = symbols('x, t', real=True, finite=True, cls=Dummy) pdf = self.pdf(x) mgf = summation(exp(t*x)*pdf, (x, self.set.inf, self.set.sup)) return Lambda(t, mgf) def _moment_generating_function(self, t): return None def moment_generating_function(self, t, **kwargs): if not kwargs: mgf = self._moment_generating_function(t) if mgf is not None: return mgf return self.compute_moment_generating_function(**kwargs)(t) @cacheit def compute_quantile(self, **kwargs): """ Compute the Quantile from the PDF Returns a Lambda """ x = symbols('x', integer=True, finite=True, cls=Dummy) p = symbols('p', real=True, finite=True, cls=Dummy) left_bound = self.set.inf pdf = self.pdf(x) cdf = summation(pdf, (x, left_bound, x), **kwargs) set = ((x, p <= cdf), ) return Lambda(p, Piecewise(*set)) def _quantile(self, x): return None def quantile(self, x, **kwargs): """ Cumulative density function """ if not kwargs: quantile = self._quantile(x) if quantile is not None: return quantile return self.compute_quantile(**kwargs)(x) def expectation(self, expr, var, evaluate=True, **kwargs): """ Expectation of expression over distribution """ # TODO: support discrete sets with non integer stepsizes if evaluate: try: p = poly(expr, var) t = Dummy('t', real=True) mgf = self.moment_generating_function(t) deg = p.degree() taylor = poly(series(mgf, t, 0, deg + 1).removeO(), t) result = 0 for k in range(deg+1): result += p.coeff_monomial(var ** k) * taylor.coeff_monomial(t ** k) * factorial(k) return result except PolynomialError: return summation(expr * self.pdf(var), (var, self.set.inf, self.set.sup), **kwargs) else: return Sum(expr * self.pdf(var), (var, self.set.inf, self.set.sup), **kwargs) def __call__(self, *args): return self.pdf(*args) class DiscreteDistributionHandmade(SingleDiscreteDistribution): _argnames = ('pdf',) @property def set(self): return self.args[1] def __new__(cls, pdf, set=S.Integers): return Basic.__new__(cls, pdf, set) class DiscreteDomain(RandomDomain): """ A domain with discrete support with step size one. Represented using symbols and Range. """ is_Discrete = True class SingleDiscreteDomain(DiscreteDomain, SingleDomain): def as_boolean(self): return Contains(self.symbol, self.set) class ConditionalDiscreteDomain(DiscreteDomain, ConditionalDomain): """ Domain with discrete support of step size one, that is restricted by some condition. """ @property def set(self): rv = self.symbols if len(self.symbols) > 1: raise NotImplementedError(filldedent(''' Multivariate conditional domains are not yet implemented.''')) rv = list(rv)[0] return reduce_rational_inequalities_wrap(self.condition, rv).intersect(self.fulldomain.set) class DiscretePSpace(PSpace): is_real = True is_Discrete = True @property def pdf(self): return self.density(*self.symbols) def where(self, condition): rvs = random_symbols(condition) assert all(r.symbol in self.symbols for r in rvs) if len(rvs) > 1: raise NotImplementedError(filldedent('''Multivariate discrete random variables are not yet supported.''')) conditional_domain = reduce_rational_inequalities_wrap(condition, rvs[0]) conditional_domain = conditional_domain.intersect(self.domain.set) return SingleDiscreteDomain(rvs[0].symbol, conditional_domain) def probability(self, condition): complement = isinstance(condition, Ne) if complement: condition = Eq(condition.args[0], condition.args[1]) try: _domain = self.where(condition).set if condition == False or _domain is S.EmptySet: return S.Zero if condition == True or _domain == self.domain.set: return S.One prob = self.eval_prob(_domain) except NotImplementedError: from sympy.stats.rv import density expr = condition.lhs - condition.rhs dens = density(expr) if not isinstance(dens, DiscreteDistribution): dens = DiscreteDistributionHandmade(dens) z = Dummy('z', real = True) space = SingleDiscretePSpace(z, dens) prob = space.probability(condition.__class__(space.value, 0)) if prob is None: prob = Probability(condition) return prob if not complement else S.One - prob def eval_prob(self, _domain): sym = list(self.symbols)[0] if isinstance(_domain, Range): n = symbols('n', integer=True, finite=True) inf, sup, step = (r for r in _domain.args) summand = ((self.pdf).replace( sym, n*step)) rv = summation(summand, (n, inf/step, (sup)/step - 1)).doit() return rv elif isinstance(_domain, FiniteSet): pdf = Lambda(sym, self.pdf) rv = sum(pdf(x) for x in _domain) return rv elif isinstance(_domain, Union): rv = sum(self.eval_prob(x) for x in _domain.args) return rv def conditional_space(self, condition): density = Lambda(self.symbols, self.pdf/self.probability(condition)) condition = condition.xreplace(dict((rv, rv.symbol) for rv in self.values)) domain = ConditionalDiscreteDomain(self.domain, condition) return DiscretePSpace(domain, density) class ProductDiscreteDomain(ProductDomain, DiscreteDomain): def as_boolean(self): return And(*[domain.as_boolean for domain in self.domains]) class SingleDiscretePSpace(DiscretePSpace, SinglePSpace): """ Discrete probability space over a single univariate variable """ is_real = True @property def set(self): return self.distribution.set @property def domain(self): return SingleDiscreteDomain(self.symbol, self.set) def sample(self): """ Internal sample method Returns dictionary mapping RandomSymbol to realization value. """ return {self.value: self.distribution.sample()} def compute_expectation(self, expr, rvs=None, evaluate=True, **kwargs): rvs = rvs or (self.value,) if self.value not in rvs: return expr expr = expr.xreplace(dict((rv, rv.symbol) for rv in rvs)) x = self.value.symbol try: return self.distribution.expectation(expr, x, evaluate=evaluate, **kwargs) except NotImplementedError: return Sum(expr * self.pdf, (x, self.set.inf, self.set.sup), **kwargs) def compute_cdf(self, expr, **kwargs): if expr == self.value: x = symbols("x", real=True, cls=Dummy) return Lambda(x, self.distribution.cdf(x, **kwargs)) else: raise NotImplementedError() def compute_density(self, expr, **kwargs): if expr == self.value: return self.distribution raise NotImplementedError() def compute_characteristic_function(self, expr, **kwargs): if expr == self.value: t = symbols("t", real=True, cls=Dummy) return Lambda(t, self.distribution.characteristic_function(t, **kwargs)) else: raise NotImplementedError() def compute_moment_generating_function(self, expr, **kwargs): if expr == self.value: t = symbols("t", real=True, cls=Dummy) return Lambda(t, self.distribution.moment_generating_function(t, **kwargs)) else: raise NotImplementedError() def compute_quantile(self, expr, **kwargs): if expr == self.value: p = symbols("p", real=True, finite=True, cls=Dummy) return Lambda(p, self.distribution.quantile(p, **kwargs)) else: raise NotImplementedError()

1e47cdf1829c7cac6c3cf62230fa76c0cfef96ad718b7ba4e6bbd9faba0d75c5

from __future__ import print_function, division from sympy import (Basic, exp, pi, Lambda, Trace, S, MatrixSymbol, Integral, gamma, Product, Dummy, Sum, Abs, IndexedBase) from sympy.core.sympify import _sympify from sympy.multipledispatch import dispatch from sympy.stats.rv import _symbol_converter, Density, RandomMatrixSymbol from sympy.stats.random_matrix import RandomMatrixPSpace from sympy.tensor.array import ArrayComprehension __all__ = [ 'GaussianEnsemble', 'GaussianUnitaryEnsemble', 'GaussianOrthogonalEnsemble', 'GaussianSymplecticEnsemble', 'joint_eigen_distribution', 'level_spacing_distribution' ] class RandomMatrixEnsemble(Basic): """ Abstract class for random matrix ensembles. It acts as an umbrella for all the ensembles defined in sympy.stats.random_matrix_models. """ pass class GaussianEnsemble(RandomMatrixEnsemble): """ Abstract class for Gaussian ensembles. Contains the properties common to all the gaussian ensembles. References ========== .. [1] https://en.wikipedia.org/wiki/Random_matrix#Gaussian_ensembles .. [2] https://arxiv.org/pdf/1712.07903.pdf """ def __new__(cls, sym, dim=None): sym, dim = _symbol_converter(sym), _sympify(dim) if dim.is_integer == False: raise ValueError("Dimension of the random matrices must be " "integers, received %s instead."%(dim)) self = Basic.__new__(cls, sym, dim) rmp = RandomMatrixPSpace(sym, model=self) return RandomMatrixSymbol(sym, dim, dim, pspace=rmp) symbol = property(lambda self: self.args[0]) dimension = property(lambda self: self.args[1]) def density(self, expr): return Density(expr) def _compute_normalization_constant(self, beta, n): """ Helper function for computing normalization constant for joint probability density of eigen values of Gaussian ensembles. References ========== .. [1] https://en.wikipedia.org/wiki/Selberg_integral#Mehta's_integral """ n = S(n) prod_term = lambda j: gamma(1 + beta*S(j)/2)/gamma(S(1) + beta/S(2)) j = Dummy('j', integer=True, positive=True) term1 = Product(prod_term(j), (j, 1, n)).doit() term2 = (2/(beta*n))**(beta*n*(n - 1)/4 + n/2) term3 = (2*pi)**(n/2) return term1 * term2 * term3 def _compute_joint_eigen_dsitribution(self, beta): """ Helper function for computing the joint probability distribution of eigen values of the random matrix. """ n = self.dimension Zbn = self._compute_normalization_constant(beta, n) l = IndexedBase('l') i = Dummy('i', integer=True, positive=True) j = Dummy('j', integer=True, positive=True) k = Dummy('k', integer=True, positive=True) term1 = exp((-S(n)/2) * Sum(l[k]**2, (k, 1, n)).doit()) sub_term = Lambda(i, Product(Abs(l[j] - l[i])**beta, (j, i + 1, n))) term2 = Product(sub_term(i).doit(), (i, 1, n - 1)).doit() syms = ArrayComprehension(l[k], (k, 1, n)).doit() return Lambda(syms, (term1 * term2)/Zbn) class GaussianUnitaryEnsemble(GaussianEnsemble): """ Represents Gaussian Unitary Ensembles. Examples ======== >>> from sympy.stats import GaussianUnitaryEnsemble as GUE, density >>> G = GUE('U', 2) >>> density(G) Lambda(H, exp(-Trace(H**2))/(2*pi**2)) """ @property def normalization_constant(self): n = self.dimension return 2**(S(n)/2) * pi**(S(n**2)/2) def density(self, expr): n, ZGUE = self.dimension, self.normalization_constant h_pspace = RandomMatrixPSpace('P', model=self) H = RandomMatrixSymbol('H', n, n, pspace=h_pspace) return Lambda(H, exp(-S(n)/2 * Trace(H**2))/ZGUE) def joint_eigen_distribution(self): return self._compute_joint_eigen_dsitribution(2) def level_spacing_distribution(self): s = Dummy('s') f = (32/pi**2)*(s**2)*exp((-4/pi)*s**2) return Lambda(s, f) class GaussianOrthogonalEnsemble(GaussianEnsemble): """ Represents Gaussian Orthogonal Ensembles. Examples ======== >>> from sympy.stats import GaussianOrthogonalEnsemble as GOE, density >>> G = GOE('U', 2) >>> density(G) Lambda(H, exp(-Trace(H**2)/2)/Integral(exp(-Trace(_H**2)/2), _H)) """ @property def normalization_constant(self): n = self.dimension _H = MatrixSymbol('_H', n, n) return Integral(exp(-S(n)/4 * Trace(_H**2))) def density(self, expr): n, ZGOE = self.dimension, self.normalization_constant h_pspace = RandomMatrixPSpace('P', model=self) H = RandomMatrixSymbol('H', n, n, pspace=h_pspace) return Lambda(H, exp(-S(n)/4 * Trace(H**2))/ZGOE) def joint_eigen_distribution(self): return self._compute_joint_eigen_dsitribution(1) def level_spacing_distribution(self): s = Dummy('s') f = (pi/2)*s*exp((-pi/4)*s**2) return Lambda(s, f) class GaussianSymplecticEnsemble(GaussianEnsemble): """ Represents Gaussian Symplectic Ensembles. Examples ======== >>> from sympy.stats import GaussianSymplecticEnsemble as GSE, density >>> G = GSE('U', 2) >>> density(G) Lambda(H, exp(-2*Trace(H**2))/Integral(exp(-2*Trace(_H**2)), _H)) """ @property def normalization_constant(self): n = self.dimension _H = MatrixSymbol('_H', n, n) return Integral(exp(-S(n) * Trace(_H**2))) def density(self, expr): n, ZGSE = self.dimension, self.normalization_constant h_pspace = RandomMatrixPSpace('P', model=self) H = RandomMatrixSymbol('H', n, n, pspace=h_pspace) return Lambda(H, exp(-S(n) * Trace(H**2))/ZGSE) def joint_eigen_distribution(self): return self._compute_joint_eigen_dsitribution(4) def level_spacing_distribution(self): s = Dummy('s') f = ((S(2)**18)/((S(3)**6)*(pi**3)))*(s**4)*exp((-64/(9*pi))*s**2) return Lambda(s, f) @dispatch(RandomMatrixSymbol) def joint_eigen_distribution(mat): """ For obtaining joint probability distribution of eigen values of random matrix. Parameters ========== mat: RandomMatrixSymbol The matrix symbol whose eigen values are to be considered. Returns ======= Lambda Examples ======== >>> from sympy.stats import GaussianUnitaryEnsemble as GUE >>> from sympy.stats import joint_eigen_distribution >>> U = GUE('U', 2) >>> joint_eigen_dsitribution(U) Lambda((l[1], l[2]), exp(-l[1]**2 - l[2]**2)*Product(Abs(l[_i] - l[_j])**2, (_j, _i + 1, 2), (_i, 1, 1))/pi) """ return mat.pspace.model.joint_eigen_distribution() def level_spacing_distribution(mat): """ For obtaining distribution of level spacings. Parameters ========== mat: RandomMatrixSymbol The random matrix symbol whose eigen values are to be considered for finding the level spacings. Returns ======= Lambda Examples ======== >>> from sympy.stats import GaussianUnitaryEnsemble as GUE >>> from sympy.stats import level_spacing_distribution >>> U = GUE('U', 2) >>> level_spacing_distribution(U) Lambda(_s, 32*_s**2*exp(-4*_s**2/pi)/pi**2) References ========== .. [1] https://en.wikipedia.org/wiki/Random_matrix#Distribution_of_level_spacings """ return mat.pspace.model.level_spacing_distribution()

dc835f8774a0bc8aeec5e2564f779310c6be5f9bca262796204867df64aeba28

""" Finite Discrete Random Variables Module See Also ======== sympy.stats.frv_types sympy.stats.rv sympy.stats.crv """ from __future__ import print_function, division import random from itertools import product from sympy import (Basic, Symbol, symbols, cacheit, sympify, Mul, And, Or, Tuple, Piecewise, Eq, Lambda, exp, I, Dummy, nan, Sum, Intersection) from sympy.core.containers import Dict from sympy.core.logic import Logic from sympy.core.relational import Relational from sympy.sets.sets import FiniteSet from sympy.stats.rv import (RandomDomain, ProductDomain, ConditionalDomain, PSpace, IndependentProductPSpace, SinglePSpace, random_symbols, sumsets, rv_subs, NamedArgsMixin, Density) class FiniteDensity(dict): """ A domain with Finite Density. """ def __call__(self, item): """ Make instance of a class callable. If item belongs to current instance of a class, return it. Otherwise, return 0. """ item = sympify(item) if item in self: return self[item] else: return 0 @property def dict(self): """ Return item as dictionary. """ return dict(self) class FiniteDomain(RandomDomain): """ A domain with discrete finite support Represented using a FiniteSet. """ is_Finite = True @property def symbols(self): return FiniteSet(sym for sym, val in self.elements) @property def elements(self): return self.args[0] @property def dict(self): return FiniteSet(*[Dict(dict(el)) for el in self.elements]) def __contains__(self, other): return other in self.elements def __iter__(self): return self.elements.__iter__() def as_boolean(self): return Or(*[And(*[Eq(sym, val) for sym, val in item]) for item in self]) class SingleFiniteDomain(FiniteDomain): """ A FiniteDomain over a single symbol/set Example: The possibilities of a *single* die roll. """ def __new__(cls, symbol, set): if not isinstance(set, FiniteSet) and \ not isinstance(set, Intersection): set = FiniteSet(*set) return Basic.__new__(cls, symbol, set) @property def symbol(self): return self.args[0] @property def symbols(self): return FiniteSet(self.symbol) @property def set(self): return self.args[1] @property def elements(self): return FiniteSet(*[frozenset(((self.symbol, elem), )) for elem in self.set]) def __iter__(self): return (frozenset(((self.symbol, elem),)) for elem in self.set) def __contains__(self, other): sym, val = tuple(other)[0] return sym == self.symbol and val in self.set class ProductFiniteDomain(ProductDomain, FiniteDomain): """ A Finite domain consisting of several other FiniteDomains Example: The possibilities of the rolls of three independent dice """ def __iter__(self): proditer = product(*self.domains) return (sumsets(items) for items in proditer) @property def elements(self): return FiniteSet(*self) class ConditionalFiniteDomain(ConditionalDomain, ProductFiniteDomain): """ A FiniteDomain that has been restricted by a condition Example: The possibilities of a die roll under the condition that the roll is even. """ def __new__(cls, domain, condition): """ Create a new instance of ConditionalFiniteDomain class """ if condition is True: return domain cond = rv_subs(condition) return Basic.__new__(cls, domain, cond) def _test(self, elem): """ Test the value. If value is boolean, return it. If value is equality relational (two objects are equal), return it with left-hand side being equal to right-hand side. Otherwise, raise ValueError exception. """ val = self.condition.xreplace(dict(elem)) if val in [True, False]: return val elif val.is_Equality: return val.lhs == val.rhs raise ValueError("Undecidable if %s" % str(val)) def __contains__(self, other): return other in self.fulldomain and self._test(other) def __iter__(self): return (elem for elem in self.fulldomain if self._test(elem)) @property def set(self): if isinstance(self.fulldomain, SingleFiniteDomain): return FiniteSet(*[elem for elem in self.fulldomain.set if frozenset(((self.fulldomain.symbol, elem),)) in self]) else: raise NotImplementedError( "Not implemented on multi-dimensional conditional domain") def as_boolean(self): return FiniteDomain.as_boolean(self) class SingleFiniteDistribution(Basic, NamedArgsMixin): def __new__(cls, *args): args = list(map(sympify, args)) return Basic.__new__(cls, *args) @staticmethod def check(*args): pass @property @cacheit def dict(self): if self.is_symbolic: return Density(self) return dict((k, self.pmf(k)) for k in self.set) def pmf(self, *args): # to be overridden by specific distribution raise NotImplementedError() @property def set(self): # to be overridden by specific distribution raise NotImplementedError() values = property(lambda self: self.dict.values) items = property(lambda self: self.dict.items) is_symbolic = property(lambda self: False) __iter__ = property(lambda self: self.dict.__iter__) __getitem__ = property(lambda self: self.dict.__getitem__) def __call__(self, *args): return self.pmf(*args) def __contains__(self, other): return other in self.set #============================================= #========= Probability Space =============== #============================================= class FinitePSpace(PSpace): """ A Finite Probability Space Represents the probabilities of a finite number of events. """ is_Finite = True def __new__(cls, domain, density): density = dict((sympify(key), sympify(val)) for key, val in density.items()) public_density = Dict(density) obj = PSpace.__new__(cls, domain, public_density) obj._density = density return obj def prob_of(self, elem): elem = sympify(elem) density = self._density if isinstance(list(density.keys())[0], FiniteSet): return density.get(elem, 0) return density.get(tuple(elem)[0][1], 0) def where(self, condition): assert all(r.symbol in self.symbols for r in random_symbols(condition)) return ConditionalFiniteDomain(self.domain, condition) def compute_density(self, expr): expr = rv_subs(expr, self.values) d = FiniteDensity() for elem in self.domain: val = expr.xreplace(dict(elem)) prob = self.prob_of(elem) d[val] = d.get(val, 0) + prob return d @cacheit def compute_cdf(self, expr): d = self.compute_density(expr) cum_prob = 0 cdf = [] for key in sorted(d): prob = d[key] cum_prob += prob cdf.append((key, cum_prob)) return dict(cdf) @cacheit def sorted_cdf(self, expr, python_float=False): cdf = self.compute_cdf(expr) items = list(cdf.items()) sorted_items = sorted(items, key=lambda val_cumprob: val_cumprob[1]) if python_float: sorted_items = [(v, float(cum_prob)) for v, cum_prob in sorted_items] return sorted_items @cacheit def compute_characteristic_function(self, expr): d = self.compute_density(expr) t = Dummy('t', real=True) return Lambda(t, sum(exp(I*k*t)*v for k,v in d.items())) @cacheit def compute_moment_generating_function(self, expr): d = self.compute_density(expr) t = Dummy('t', real=True) return Lambda(t, sum(exp(k*t)*v for k,v in d.items())) def compute_expectation(self, expr, rvs=None, **kwargs): rvs = rvs or self.values expr = rv_subs(expr, rvs) probs = [self.prob_of(elem) for elem in self.domain] if isinstance(expr, (Logic, Relational)): parse_domain = [tuple(elem)[0][1] for elem in self.domain] bools = [expr.xreplace(dict(elem)) for elem in self.domain] else: parse_domain = [expr.xreplace(dict(elem)) for elem in self.domain] bools = [True for elem in self.domain] return sum([Piecewise((prob * elem, blv), (0, True)) for prob, elem, blv in zip(probs, parse_domain, bools)]) def compute_quantile(self, expr): cdf = self.compute_cdf(expr) p = symbols('p', real=True, finite=True, cls=Dummy) set = ((nan, (p < 0) | (p > 1)),) for key, value in cdf.items(): set = set + ((key, p <= value), ) return Lambda(p, Piecewise(*set)) def probability(self, condition): cond_symbols = frozenset(rs.symbol for rs in random_symbols(condition)) cond = rv_subs(condition) if not cond_symbols.issubset(self.symbols): raise ValueError("Cannot compare foreign random symbols, %s" %(str(cond_symbols - self.symbols))) if isinstance(condition, Relational) and \ (not cond.free_symbols.issubset(self.domain.free_symbols)): rv = condition.lhs if isinstance(condition.rhs, Symbol) else condition.rhs return sum(Piecewise( (self.prob_of(elem), condition.subs(rv, list(elem)[0][1])), (0, True)) for elem in self.domain) return sum(self.prob_of(elem) for elem in self.where(condition)) def conditional_space(self, condition): domain = self.where(condition) prob = self.probability(condition) density = dict((key, val / prob) for key, val in self._density.items() if domain._test(key)) return FinitePSpace(domain, density) def sample(self): """ Internal sample method Returns dictionary mapping RandomSymbol to realization value. """ expr = Tuple(*self.values) cdf = self.sorted_cdf(expr, python_float=True) x = random.uniform(0, 1) # Find first occurrence with cumulative probability less than x # This should be replaced with binary search for value, cum_prob in cdf: if x < cum_prob: # return dictionary mapping RandomSymbols to values return dict(list(zip(expr, value))) assert False, "We should never have gotten to this point" class SingleFinitePSpace(SinglePSpace, FinitePSpace): """ A single finite probability space Represents the probabilities of a set of random events that can be attributed to a single variable/symbol. This class is implemented by many of the standard FiniteRV types such as Die, Bernoulli, Coin, etc.... """ @property def domain(self): return SingleFiniteDomain(self.symbol, self.distribution.set) @property def _is_symbolic(self): """ Helper property to check if the distribution of the random variable is having symbolic dimension. """ return self.distribution.is_symbolic @property def distribution(self): return self.args[1] def pmf(self, expr): return self.distribution.pmf(expr) @property @cacheit def _density(self): return dict((FiniteSet((self.symbol, val)), prob) for val, prob in self.distribution.dict.items()) @cacheit def compute_characteristic_function(self, expr): if self._is_symbolic: d = self.compute_density(expr) t = Dummy('t', real=True) ki = Dummy('ki') return Lambda(t, Sum(d(ki)*exp(I*ki*t), (ki, self.args[1].low, self.args[1].high))) expr = rv_subs(expr, self.values) return FinitePSpace(self.domain, self.distribution).compute_characteristic_function(expr) @cacheit def compute_moment_generating_function(self, expr): if self._is_symbolic: d = self.compute_density(expr) t = Dummy('t', real=True) ki = Dummy('ki') return Lambda(t, Sum(d(ki)*exp(ki*t), (ki, self.args[1].low, self.args[1].high))) expr = rv_subs(expr, self.values) return FinitePSpace(self.domain, self.distribution).compute_moment_generating_function(expr) def compute_quantile(self, expr): if self._is_symbolic: raise NotImplementedError("Computing quantile for random variables " "with symbolic dimension because the bounds of searching the required " "value is undetermined.") expr = rv_subs(expr, self.values) return FinitePSpace(self.domain, self.distribution).compute_quantile(expr) def compute_density(self, expr): if self._is_symbolic: rv = list(random_symbols(expr))[0] k = Dummy('k', integer=True) cond = True if not isinstance(expr, (Relational, Logic)) \ else expr.subs(rv, k) return Lambda(k, Piecewise((self.pmf(k), And(k >= self.args[1].low, k <= self.args[1].high, cond)), (0, True))) expr = rv_subs(expr, self.values) return FinitePSpace(self.domain, self.distribution).compute_density(expr) def compute_cdf(self, expr): if self._is_symbolic: d = self.compute_density(expr) k = Dummy('k') ki = Dummy('ki') return Lambda(k, Sum(d(ki), (ki, self.args[1].low, k))) expr = rv_subs(expr, self.values) return FinitePSpace(self.domain, self.distribution).compute_cdf(expr) def compute_expectation(self, expr, rvs=None, **kwargs): if self._is_symbolic: rv = random_symbols(expr)[0] k = Dummy('k', integer=True) expr = expr.subs(rv, k) cond = True if not isinstance(expr, (Relational, Logic)) \ else expr func = self.pmf(k) * k if cond != True else self.pmf(k) * expr return Sum(Piecewise((func, cond), (0, True)), (k, self.distribution.low, self.distribution.high)).doit() expr = rv_subs(expr, rvs) return FinitePSpace(self.domain, self.distribution).compute_expectation(expr, rvs, **kwargs) def probability(self, condition): if self._is_symbolic: #TODO: Implement the mechanism for handling queries for symbolic sized distributions. raise NotImplementedError("Currently, probability queries are not " "supported for random variables with symbolic sized distributions.") condition = rv_subs(condition) return FinitePSpace(self.domain, self.distribution).probability(condition) def conditional_space(self, condition): """ This method is used for transferring the computation to probability method because conditional space of random variables with symbolic dimensions is currently not possible. """ if self._is_symbolic: self domain = self.where(condition) prob = self.probability(condition) density = dict((key, val / prob) for key, val in self._density.items() if domain._test(key)) return FinitePSpace(domain, density) class ProductFinitePSpace(IndependentProductPSpace, FinitePSpace): """ A collection of several independent finite probability spaces """ @property def domain(self): return ProductFiniteDomain(*[space.domain for space in self.spaces]) @property @cacheit def _density(self): proditer = product(*[iter(space._density.items()) for space in self.spaces]) d = {} for items in proditer: elems, probs = list(zip(*items)) elem = sumsets(elems) prob = Mul(*probs) d[elem] = d.get(elem, 0) + prob return Dict(d) @property @cacheit def density(self): return Dict(self._density) def probability(self, condition): return FinitePSpace.probability(self, condition) def compute_density(self, expr): return FinitePSpace.compute_density(self, expr)

a3b38e1965a0e7594b3ac8ace573e9890d432dde0fb7c75910648c622f12619b

from __future__ import print_function, division from sympy import Basic from sympy.stats.joint_rv import ProductPSpace from sympy.stats.rv import ProductDomain, _symbol_converter class StochasticPSpace(ProductPSpace): """ Represents probability space of stochastic processes and their random variables. Contains mechanics to do computations for queries of stochastic processes. Initialized by symbol, the specific process and distribution(optional) if the random indexed symbols of the process follows any specific distribution, like, in Bernoulli Process, each random indexed symbol follows Bernoulli distribution. For processes with memory, this parameter should not be passed. """ def __new__(cls, sym, process, distribution=None): sym = _symbol_converter(sym) from sympy.stats.stochastic_process_types import StochasticProcess if not isinstance(process, StochasticProcess): raise TypeError("`process` must be an instance of StochasticProcess.") return Basic.__new__(cls, sym, process, distribution) @property def process(self): """ The associated stochastic process. """ return self.args[1] @property def domain(self): return ProductDomain(self.process.index_set, self.process.state_space) @property def symbol(self): return self.args[0] @property def distribution(self): return self.args[2] def probability(self, condition, given_condition=None, evaluate=True, **kwargs): """ Transfers the task of handling queries to the specific stochastic process because every process has their own logic of handling such queries. """ return self.process.probability(condition, given_condition, evaluate, **kwargs) def compute_expectation(self, expr, condition=None, evaluate=True, **kwargs): """ Transfers the task of handling queries to the specific stochastic process because every process has their own logic of handling such queries. """ return self.process.expectation(expr, condition, evaluate, **kwargs)

f5edf66de76370b893600cadf60bf00a5447488ea8caeaed9ab426a6f0d0da1c

from __future__ import print_function, division from random import randrange, choice from math import log from sympy.ntheory import primefactors from sympy import multiplicity, factorint from sympy.combinatorics import Permutation from sympy.combinatorics.permutations import (_af_commutes_with, _af_invert, _af_rmul, _af_rmuln, _af_pow, Cycle) from sympy.combinatorics.util import (_check_cycles_alt_sym, _distribute_gens_by_base, _orbits_transversals_from_bsgs, _handle_precomputed_bsgs, _base_ordering, _strong_gens_from_distr, _strip, _strip_af) from sympy.core import Basic from sympy.core.compatibility import range from sympy.functions.combinatorial.factorials import factorial from sympy.ntheory import sieve from sympy.utilities.iterables import has_variety, is_sequence, uniq from sympy.utilities.randtest import _randrange from itertools import islice rmul = Permutation.rmul_with_af _af_new = Permutation._af_new class PermutationGroup(Basic): """The class defining a Permutation group. PermutationGroup([p1, p2, ..., pn]) returns the permutation group generated by the list of permutations. This group can be supplied to Polyhedron if one desires to decorate the elements to which the indices of the permutation refer. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.permutations import Cycle >>> from sympy.combinatorics.polyhedron import Polyhedron >>> from sympy.combinatorics.perm_groups import PermutationGroup The permutations corresponding to motion of the front, right and bottom face of a 2x2 Rubik's cube are defined: >>> F = Permutation(2, 19, 21, 8)(3, 17, 20, 10)(4, 6, 7, 5) >>> R = Permutation(1, 5, 21, 14)(3, 7, 23, 12)(8, 10, 11, 9) >>> D = Permutation(6, 18, 14, 10)(7, 19, 15, 11)(20, 22, 23, 21) These are passed as permutations to PermutationGroup: >>> G = PermutationGroup(F, R, D) >>> G.order() 3674160 The group can be supplied to a Polyhedron in order to track the objects being moved. An example involving the 2x2 Rubik's cube is given there, but here is a simple demonstration: >>> a = Permutation(2, 1) >>> b = Permutation(1, 0) >>> G = PermutationGroup(a, b) >>> P = Polyhedron(list('ABC'), pgroup=G) >>> P.corners (A, B, C) >>> P.rotate(0) # apply permutation 0 >>> P.corners (A, C, B) >>> P.reset() >>> P.corners (A, B, C) Or one can make a permutation as a product of selected permutations and apply them to an iterable directly: >>> P10 = G.make_perm([0, 1]) >>> P10('ABC') ['C', 'A', 'B'] See Also ======== sympy.combinatorics.polyhedron.Polyhedron, sympy.combinatorics.permutations.Permutation References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of Computational Group Theory" .. [2] Seress, A. "Permutation Group Algorithms" .. [3] https://en.wikipedia.org/wiki/Schreier_vector .. [4] https://en.wikipedia.org/wiki/Nielsen_transformation#Product_replacement_algorithm .. [5] Frank Celler, Charles R.Leedham-Green, Scott H.Murray, Alice C.Niemeyer, and E.A.O'Brien. "Generating Random Elements of a Finite Group" .. [6] https://en.wikipedia.org/wiki/Block_%28permutation_group_theory%29 .. [7] http://www.algorithmist.com/index.php/Union_Find .. [8] https://en.wikipedia.org/wiki/Multiply_transitive_group#Multiply_transitive_groups .. [9] https://en.wikipedia.org/wiki/Center_%28group_theory%29 .. [10] https://en.wikipedia.org/wiki/Centralizer_and_normalizer .. [11] http://groupprops.subwiki.org/wiki/Derived_subgroup .. [12] https://en.wikipedia.org/wiki/Nilpotent_group .. [13] http://www.math.colostate.edu/~hulpke/CGT/cgtnotes.pdf .. [14] https://www.gap-system.org/Manuals/doc/ref/manual.pdf """ is_group = True def __new__(cls, *args, **kwargs): """The default constructor. Accepts Cycle and Permutation forms. Removes duplicates unless ``dups`` keyword is ``False``. """ if not args: args = [Permutation()] else: args = list(args[0] if is_sequence(args[0]) else args) if not args: args = [Permutation()] if any(isinstance(a, Cycle) for a in args): args = [Permutation(a) for a in args] if has_variety(a.size for a in args): degree = kwargs.pop('degree', None) if degree is None: degree = max(a.size for a in args) for i in range(len(args)): if args[i].size != degree: args[i] = Permutation(args[i], size=degree) if kwargs.pop('dups', True): args = list(uniq([_af_new(list(a)) for a in args])) if len(args) > 1: args = [g for g in args if not g.is_identity] obj = Basic.__new__(cls, *args, **kwargs) obj._generators = args obj._order = None obj._center = [] obj._is_abelian = None obj._is_transitive = None obj._is_sym = None obj._is_alt = None obj._is_primitive = None obj._is_nilpotent = None obj._is_solvable = None obj._is_trivial = None obj._transitivity_degree = None obj._max_div = None obj._is_perfect = None obj._is_cyclic = None obj._r = len(obj._generators) obj._degree = obj._generators[0].size # these attributes are assigned after running schreier_sims obj._base = [] obj._strong_gens = [] obj._strong_gens_slp = [] obj._basic_orbits = [] obj._transversals = [] obj._transversal_slp = [] # these attributes are assigned after running _random_pr_init obj._random_gens = [] # finite presentation of the group as an instance of `FpGroup` obj._fp_presentation = None return obj def __getitem__(self, i): return self._generators[i] def __contains__(self, i): """Return ``True`` if `i` is contained in PermutationGroup. Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> p = Permutation(1, 2, 3) >>> Permutation(3) in PermutationGroup(p) True """ if not isinstance(i, Permutation): raise TypeError("A PermutationGroup contains only Permutations as " "elements, not elements of type %s" % type(i)) return self.contains(i) def __len__(self): return len(self._generators) def __eq__(self, other): """Return ``True`` if PermutationGroup generated by elements in the group are same i.e they represent the same PermutationGroup. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> p = Permutation(0, 1, 2, 3, 4, 5) >>> G = PermutationGroup([p, p**2]) >>> H = PermutationGroup([p**2, p]) >>> G.generators == H.generators False >>> G == H True """ if not isinstance(other, PermutationGroup): return False set_self_gens = set(self.generators) set_other_gens = set(other.generators) # before reaching the general case there are also certain # optimisation and obvious cases requiring less or no actual # computation. if set_self_gens == set_other_gens: return True # in the most general case it will check that each generator of # one group belongs to the other PermutationGroup and vice-versa for gen1 in set_self_gens: if not other.contains(gen1): return False for gen2 in set_other_gens: if not self.contains(gen2): return False return True def __hash__(self): return super(PermutationGroup, self).__hash__() def __mul__(self, other): """Return the direct product of two permutation groups as a permutation group. This implementation realizes the direct product by shifting the index set for the generators of the second group: so if we have `G` acting on `n1` points and `H` acting on `n2` points, `G*H` acts on `n1 + n2` points. Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import CyclicGroup >>> G = CyclicGroup(5) >>> H = G*G >>> H PermutationGroup([ (9)(0 1 2 3 4), (5 6 7 8 9)]) >>> H.order() 25 """ gens1 = [perm._array_form for perm in self.generators] gens2 = [perm._array_form for perm in other.generators] n1 = self._degree n2 = other._degree start = list(range(n1)) end = list(range(n1, n1 + n2)) for i in range(len(gens2)): gens2[i] = [x + n1 for x in gens2[i]] gens2 = [start + gen for gen in gens2] gens1 = [gen + end for gen in gens1] together = gens1 + gens2 gens = [_af_new(x) for x in together] return PermutationGroup(gens) def _random_pr_init(self, r, n, _random_prec_n=None): r"""Initialize random generators for the product replacement algorithm. The implementation uses a modification of the original product replacement algorithm due to Leedham-Green, as described in [1], pp. 69-71; also, see [2], pp. 27-29 for a detailed theoretical analysis of the original product replacement algorithm, and [4]. The product replacement algorithm is used for producing random, uniformly distributed elements of a group `G` with a set of generators `S`. For the initialization ``_random_pr_init``, a list ``R`` of `\max\{r, |S|\}` group generators is created as the attribute ``G._random_gens``, repeating elements of `S` if necessary, and the identity element of `G` is appended to ``R`` - we shall refer to this last element as the accumulator. Then the function ``random_pr()`` is called ``n`` times, randomizing the list ``R`` while preserving the generation of `G` by ``R``. The function ``random_pr()`` itself takes two random elements ``g, h`` among all elements of ``R`` but the accumulator and replaces ``g`` with a randomly chosen element from `\{gh, g(~h), hg, (~h)g\}`. Then the accumulator is multiplied by whatever ``g`` was replaced by. The new value of the accumulator is then returned by ``random_pr()``. The elements returned will eventually (for ``n`` large enough) become uniformly distributed across `G` ([5]). For practical purposes however, the values ``n = 50, r = 11`` are suggested in [1]. Notes ===== THIS FUNCTION HAS SIDE EFFECTS: it changes the attribute self._random_gens See Also ======== random_pr """ deg = self.degree random_gens = [x._array_form for x in self.generators] k = len(random_gens) if k < r: for i in range(k, r): random_gens.append(random_gens[i - k]) acc = list(range(deg)) random_gens.append(acc) self._random_gens = random_gens # handle randomized input for testing purposes if _random_prec_n is None: for i in range(n): self.random_pr() else: for i in range(n): self.random_pr(_random_prec=_random_prec_n[i]) def _union_find_merge(self, first, second, ranks, parents, not_rep): """Merges two classes in a union-find data structure. Used in the implementation of Atkinson's algorithm as suggested in [1], pp. 83-87. The class merging process uses union by rank as an optimization. ([7]) Notes ===== THIS FUNCTION HAS SIDE EFFECTS: the list of class representatives, ``parents``, the list of class sizes, ``ranks``, and the list of elements that are not representatives, ``not_rep``, are changed due to class merging. See Also ======== minimal_block, _union_find_rep References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of computational group theory" .. [7] http://www.algorithmist.com/index.php/Union_Find """ rep_first = self._union_find_rep(first, parents) rep_second = self._union_find_rep(second, parents) if rep_first != rep_second: # union by rank if ranks[rep_first] >= ranks[rep_second]: new_1, new_2 = rep_first, rep_second else: new_1, new_2 = rep_second, rep_first total_rank = ranks[new_1] + ranks[new_2] if total_rank > self.max_div: return -1 parents[new_2] = new_1 ranks[new_1] = total_rank not_rep.append(new_2) return 1 return 0 def _union_find_rep(self, num, parents): """Find representative of a class in a union-find data structure. Used in the implementation of Atkinson's algorithm as suggested in [1], pp. 83-87. After the representative of the class to which ``num`` belongs is found, path compression is performed as an optimization ([7]). Notes ===== THIS FUNCTION HAS SIDE EFFECTS: the list of class representatives, ``parents``, is altered due to path compression. See Also ======== minimal_block, _union_find_merge References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of computational group theory" .. [7] http://www.algorithmist.com/index.php/Union_Find """ rep, parent = num, parents[num] while parent != rep: rep = parent parent = parents[rep] # path compression temp, parent = num, parents[num] while parent != rep: parents[temp] = rep temp = parent parent = parents[temp] return rep @property def base(self): """Return a base from the Schreier-Sims algorithm. For a permutation group `G`, a base is a sequence of points `B = (b_1, b_2, ..., b_k)` such that no element of `G` apart from the identity fixes all the points in `B`. The concepts of a base and strong generating set and their applications are discussed in depth in [1], pp. 87-89 and [2], pp. 55-57. An alternative way to think of `B` is that it gives the indices of the stabilizer cosets that contain more than the identity permutation. Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> G = PermutationGroup([Permutation(0, 1, 3)(2, 4)]) >>> G.base [0, 2] See Also ======== strong_gens, basic_transversals, basic_orbits, basic_stabilizers """ if self._base == []: self.schreier_sims() return self._base def baseswap(self, base, strong_gens, pos, randomized=False, transversals=None, basic_orbits=None, strong_gens_distr=None): r"""Swap two consecutive base points in base and strong generating set. If a base for a group `G` is given by `(b_1, b_2, ..., b_k)`, this function returns a base `(b_1, b_2, ..., b_{i+1}, b_i, ..., b_k)`, where `i` is given by ``pos``, and a strong generating set relative to that base. The original base and strong generating set are not modified. The randomized version (default) is of Las Vegas type. Parameters ========== base, strong_gens The base and strong generating set. pos The position at which swapping is performed. randomized A switch between randomized and deterministic version. transversals The transversals for the basic orbits, if known. basic_orbits The basic orbits, if known. strong_gens_distr The strong generators distributed by basic stabilizers, if known. Returns ======= (base, strong_gens) ``base`` is the new base, and ``strong_gens`` is a generating set relative to it. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.testutil import _verify_bsgs >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> S = SymmetricGroup(4) >>> S.schreier_sims() >>> S.base [0, 1, 2] >>> base, gens = S.baseswap(S.base, S.strong_gens, 1, randomized=False) >>> base, gens ([0, 2, 1], [(0 1 2 3), (3)(0 1), (1 3 2), (2 3), (1 3)]) check that base, gens is a BSGS >>> S1 = PermutationGroup(gens) >>> _verify_bsgs(S1, base, gens) True See Also ======== schreier_sims Notes ===== The deterministic version of the algorithm is discussed in [1], pp. 102-103; the randomized version is discussed in [1], p.103, and [2], p.98. It is of Las Vegas type. Notice that [1] contains a mistake in the pseudocode and discussion of BASESWAP: on line 3 of the pseudocode, `|\beta_{i+1}^{\left\langle T\right\rangle}|` should be replaced by `|\beta_{i}^{\left\langle T\right\rangle}|`, and the same for the discussion of the algorithm. """ # construct the basic orbits, generators for the stabilizer chain # and transversal elements from whatever was provided transversals, basic_orbits, strong_gens_distr = \ _handle_precomputed_bsgs(base, strong_gens, transversals, basic_orbits, strong_gens_distr) base_len = len(base) degree = self.degree # size of orbit of base[pos] under the stabilizer we seek to insert # in the stabilizer chain at position pos + 1 size = len(basic_orbits[pos])*len(basic_orbits[pos + 1]) \ //len(_orbit(degree, strong_gens_distr[pos], base[pos + 1])) # initialize the wanted stabilizer by a subgroup if pos + 2 > base_len - 1: T = [] else: T = strong_gens_distr[pos + 2][:] # randomized version if randomized is True: stab_pos = PermutationGroup(strong_gens_distr[pos]) schreier_vector = stab_pos.schreier_vector(base[pos + 1]) # add random elements of the stabilizer until they generate it while len(_orbit(degree, T, base[pos])) != size: new = stab_pos.random_stab(base[pos + 1], schreier_vector=schreier_vector) T.append(new) # deterministic version else: Gamma = set(basic_orbits[pos]) Gamma.remove(base[pos]) if base[pos + 1] in Gamma: Gamma.remove(base[pos + 1]) # add elements of the stabilizer until they generate it by # ruling out member of the basic orbit of base[pos] along the way while len(_orbit(degree, T, base[pos])) != size: gamma = next(iter(Gamma)) x = transversals[pos][gamma] temp = x._array_form.index(base[pos + 1]) # (~x)(base[pos + 1]) if temp not in basic_orbits[pos + 1]: Gamma = Gamma - _orbit(degree, T, gamma) else: y = transversals[pos + 1][temp] el = rmul(x, y) if el(base[pos]) not in _orbit(degree, T, base[pos]): T.append(el) Gamma = Gamma - _orbit(degree, T, base[pos]) # build the new base and strong generating set strong_gens_new_distr = strong_gens_distr[:] strong_gens_new_distr[pos + 1] = T base_new = base[:] base_new[pos], base_new[pos + 1] = base_new[pos + 1], base_new[pos] strong_gens_new = _strong_gens_from_distr(strong_gens_new_distr) for gen in T: if gen not in strong_gens_new: strong_gens_new.append(gen) return base_new, strong_gens_new @property def basic_orbits(self): """ Return the basic orbits relative to a base and strong generating set. If `(b_1, b_2, ..., b_k)` is a base for a group `G`, and `G^{(i)} = G_{b_1, b_2, ..., b_{i-1}}` is the ``i``-th basic stabilizer (so that `G^{(1)} = G`), the ``i``-th basic orbit relative to this base is the orbit of `b_i` under `G^{(i)}`. See [1], pp. 87-89 for more information. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> S = SymmetricGroup(4) >>> S.basic_orbits [[0, 1, 2, 3], [1, 2, 3], [2, 3]] See Also ======== base, strong_gens, basic_transversals, basic_stabilizers """ if self._basic_orbits == []: self.schreier_sims() return self._basic_orbits @property def basic_stabilizers(self): """ Return a chain of stabilizers relative to a base and strong generating set. The ``i``-th basic stabilizer `G^{(i)}` relative to a base `(b_1, b_2, ..., b_k)` is `G_{b_1, b_2, ..., b_{i-1}}`. For more information, see [1], pp. 87-89. Examples ======== >>> from sympy.combinatorics.named_groups import AlternatingGroup >>> A = AlternatingGroup(4) >>> A.schreier_sims() >>> A.base [0, 1] >>> for g in A.basic_stabilizers: ... print(g) ... PermutationGroup([ (3)(0 1 2), (1 2 3)]) PermutationGroup([ (1 2 3)]) See Also ======== base, strong_gens, basic_orbits, basic_transversals """ if self._transversals == []: self.schreier_sims() strong_gens = self._strong_gens base = self._base if not base: # e.g. if self is trivial return [] strong_gens_distr = _distribute_gens_by_base(base, strong_gens) basic_stabilizers = [] for gens in strong_gens_distr: basic_stabilizers.append(PermutationGroup(gens)) return basic_stabilizers @property def basic_transversals(self): """ Return basic transversals relative to a base and strong generating set. The basic transversals are transversals of the basic orbits. They are provided as a list of dictionaries, each dictionary having keys - the elements of one of the basic orbits, and values - the corresponding transversal elements. See [1], pp. 87-89 for more information. Examples ======== >>> from sympy.combinatorics.named_groups import AlternatingGroup >>> A = AlternatingGroup(4) >>> A.basic_transversals [{0: (3), 1: (3)(0 1 2), 2: (3)(0 2 1), 3: (0 3 1)}, {1: (3), 2: (1 2 3), 3: (1 3 2)}] See Also ======== strong_gens, base, basic_orbits, basic_stabilizers """ if self._transversals == []: self.schreier_sims() return self._transversals def composition_series(self): r""" Return the composition series for a group as a list of permutation groups. The composition series for a group `G` is defined as a subnormal series `G = H_0 > H_1 > H_2 \ldots` A composition series is a subnormal series such that each factor group `H(i+1) / H(i)` is simple. A subnormal series is a composition series only if it is of maximum length. The algorithm works as follows: Starting with the derived series the idea is to fill the gap between `G = der[i]` and `H = der[i+1]` for each `i` independently. Since, all subgroups of the abelian group `G/H` are normal so, first step is to take the generators `g` of `G` and add them to generators of `H` one by one. The factor groups formed are not simple in general. Each group is obtained from the previous one by adding one generator `g`, if the previous group is denoted by `H` then the next group `K` is generated by `g` and `H`. The factor group `K/H` is cyclic and it's order is `K.order()//G.order()`. The series is then extended between `K` and `H` by groups generated by powers of `g` and `H`. The series formed is then prepended to the already existing series. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.named_groups import CyclicGroup >>> S = SymmetricGroup(12) >>> G = S.sylow_subgroup(2) >>> C = G.composition_series() >>> [H.order() for H in C] [1024, 512, 256, 128, 64, 32, 16, 8, 4, 2, 1] >>> G = S.sylow_subgroup(3) >>> C = G.composition_series() >>> [H.order() for H in C] [243, 81, 27, 9, 3, 1] >>> G = CyclicGroup(12) >>> C = G.composition_series() >>> [H.order() for H in C] [12, 6, 3, 1] """ der = self.derived_series() if not (all(g.is_identity for g in der[-1].generators)): raise NotImplementedError('Group should be solvable') series = [] for i in range(len(der)-1): H = der[i+1] up_seg = [] for g in der[i].generators: K = PermutationGroup([g] + H.generators) order = K.order() // H.order() down_seg = [] for p, e in factorint(order).items(): for j in range(e): down_seg.append(PermutationGroup([g] + H.generators)) g = g**p up_seg = down_seg + up_seg H = K up_seg[0] = der[i] series.extend(up_seg) series.append(der[-1]) return series def coset_transversal(self, H): """Return a transversal of the right cosets of self by its subgroup H using the second method described in [1], Subsection 4.6.7 """ if not H.is_subgroup(self): raise ValueError("The argument must be a subgroup") if H.order() == 1: return self._elements self._schreier_sims(base=H.base) # make G.base an extension of H.base base = self.base base_ordering = _base_ordering(base, self.degree) identity = Permutation(self.degree - 1) transversals = self.basic_transversals[:] # transversals is a list of dictionaries. Get rid of the keys # so that it is a list of lists and sort each list in # the increasing order of base[l]^x for l, t in enumerate(transversals): transversals[l] = sorted(t.values(), key = lambda x: base_ordering[base[l]^x]) orbits = H.basic_orbits h_stabs = H.basic_stabilizers g_stabs = self.basic_stabilizers indices = [x.order()//y.order() for x, y in zip(g_stabs, h_stabs)] # T^(l) should be a right transversal of H^(l) in G^(l) for # 1<=l<=len(base). While H^(l) is the trivial group, T^(l) # contains all the elements of G^(l) so we might just as well # start with l = len(h_stabs)-1 if len(g_stabs) > len(h_stabs): T = g_stabs[len(h_stabs)]._elements else: T = [identity] l = len(h_stabs)-1 t_len = len(T) while l > -1: T_next = [] for u in transversals[l]: if u == identity: continue b = base_ordering[base[l]^u] for t in T: p = t*u if all([base_ordering[h^p] >= b for h in orbits[l]]): T_next.append(p) if t_len + len(T_next) == indices[l]: break if t_len + len(T_next) == indices[l]: break T += T_next t_len += len(T_next) l -= 1 T.remove(identity) T = [identity] + T return T def _coset_representative(self, g, H): """Return the representative of Hg from the transversal that would be computed by `self.coset_transversal(H)`. """ if H.order() == 1: return g # The base of self must be an extension of H.base. if not(self.base[:len(H.base)] == H.base): self._schreier_sims(base=H.base) orbits = H.basic_orbits[:] h_transversals = [list(_.values()) for _ in H.basic_transversals] transversals = [list(_.values()) for _ in self.basic_transversals] base = self.base base_ordering = _base_ordering(base, self.degree) def step(l, x): gamma = sorted(orbits[l], key = lambda y: base_ordering[y^x])[0] i = [base[l]^h for h in h_transversals[l]].index(gamma) x = h_transversals[l][i]*x if l < len(orbits)-1: for u in transversals[l]: if base[l]^u == base[l]^x: break x = step(l+1, x*u**-1)*u return x return step(0, g) def coset_table(self, H): """Return the standardised (right) coset table of self in H as a list of lists. """ # Maybe this should be made to return an instance of CosetTable # from fp_groups.py but the class would need to be changed first # to be compatible with PermutationGroups from itertools import chain, product if not H.is_subgroup(self): raise ValueError("The argument must be a subgroup") T = self.coset_transversal(H) n = len(T) A = list(chain.from_iterable((gen, gen**-1) for gen in self.generators)) table = [] for i in range(n): row = [self._coset_representative(T[i]*x, H) for x in A] row = [T.index(r) for r in row] table.append(row) # standardize (this is the same as the algorithm used in coset_table) # If CosetTable is made compatible with PermutationGroups, this # should be replaced by table.standardize() A = range(len(A)) gamma = 1 for alpha, a in product(range(n), A): beta = table[alpha][a] if beta >= gamma: if beta > gamma: for x in A: z = table[gamma][x] table[gamma][x] = table[beta][x] table[beta][x] = z for i in range(n): if table[i][x] == beta: table[i][x] = gamma elif table[i][x] == gamma: table[i][x] = beta gamma += 1 if gamma >= n-1: return table def center(self): r""" Return the center of a permutation group. The center for a group `G` is defined as `Z(G) = \{z\in G | \forall g\in G, zg = gz \}`, the set of elements of `G` that commute with all elements of `G`. It is equal to the centralizer of `G` inside `G`, and is naturally a subgroup of `G` ([9]). Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> D = DihedralGroup(4) >>> G = D.center() >>> G.order() 2 See Also ======== centralizer Notes ===== This is a naive implementation that is a straightforward application of ``.centralizer()`` """ return self.centralizer(self) def centralizer(self, other): r""" Return the centralizer of a group/set/element. The centralizer of a set of permutations ``S`` inside a group ``G`` is the set of elements of ``G`` that commute with all elements of ``S``:: `C_G(S) = \{ g \in G | gs = sg \forall s \in S\}` ([10]) Usually, ``S`` is a subset of ``G``, but if ``G`` is a proper subgroup of the full symmetric group, we allow for ``S`` to have elements outside ``G``. It is naturally a subgroup of ``G``; the centralizer of a permutation group is equal to the centralizer of any set of generators for that group, since any element commuting with the generators commutes with any product of the generators. Parameters ========== other a permutation group/list of permutations/single permutation Examples ======== >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... CyclicGroup) >>> S = SymmetricGroup(6) >>> C = CyclicGroup(6) >>> H = S.centralizer(C) >>> H.is_subgroup(C) True See Also ======== subgroup_search Notes ===== The implementation is an application of ``.subgroup_search()`` with tests using a specific base for the group ``G``. """ if hasattr(other, 'generators'): if other.is_trivial or self.is_trivial: return self degree = self.degree identity = _af_new(list(range(degree))) orbits = other.orbits() num_orbits = len(orbits) orbits.sort(key=lambda x: -len(x)) long_base = [] orbit_reps = [None]*num_orbits orbit_reps_indices = [None]*num_orbits orbit_descr = [None]*degree for i in range(num_orbits): orbit = list(orbits[i]) orbit_reps[i] = orbit[0] orbit_reps_indices[i] = len(long_base) for point in orbit: orbit_descr[point] = i long_base = long_base + orbit base, strong_gens = self.schreier_sims_incremental(base=long_base) strong_gens_distr = _distribute_gens_by_base(base, strong_gens) i = 0 for i in range(len(base)): if strong_gens_distr[i] == [identity]: break base = base[:i] base_len = i for j in range(num_orbits): if base[base_len - 1] in orbits[j]: break rel_orbits = orbits[: j + 1] num_rel_orbits = len(rel_orbits) transversals = [None]*num_rel_orbits for j in range(num_rel_orbits): rep = orbit_reps[j] transversals[j] = dict( other.orbit_transversal(rep, pairs=True)) trivial_test = lambda x: True tests = [None]*base_len for l in range(base_len): if base[l] in orbit_reps: tests[l] = trivial_test else: def test(computed_words, l=l): g = computed_words[l] rep_orb_index = orbit_descr[base[l]] rep = orbit_reps[rep_orb_index] im = g._array_form[base[l]] im_rep = g._array_form[rep] tr_el = transversals[rep_orb_index][base[l]] # using the definition of transversal, # base[l]^g = rep^(tr_el*g); # if g belongs to the centralizer, then # base[l]^g = (rep^g)^tr_el return im == tr_el._array_form[im_rep] tests[l] = test def prop(g): return [rmul(g, gen) for gen in other.generators] == \ [rmul(gen, g) for gen in other.generators] return self.subgroup_search(prop, base=base, strong_gens=strong_gens, tests=tests) elif hasattr(other, '__getitem__'): gens = list(other) return self.centralizer(PermutationGroup(gens)) elif hasattr(other, 'array_form'): return self.centralizer(PermutationGroup([other])) def commutator(self, G, H): """ Return the commutator of two subgroups. For a permutation group ``K`` and subgroups ``G``, ``H``, the commutator of ``G`` and ``H`` is defined as the group generated by all the commutators `[g, h] = hgh^{-1}g^{-1}` for ``g`` in ``G`` and ``h`` in ``H``. It is naturally a subgroup of ``K`` ([1], p.27). Examples ======== >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... AlternatingGroup) >>> S = SymmetricGroup(5) >>> A = AlternatingGroup(5) >>> G = S.commutator(S, A) >>> G.is_subgroup(A) True See Also ======== derived_subgroup Notes ===== The commutator of two subgroups `H, G` is equal to the normal closure of the commutators of all the generators, i.e. `hgh^{-1}g^{-1}` for `h` a generator of `H` and `g` a generator of `G` ([1], p.28) """ ggens = G.generators hgens = H.generators commutators = [] for ggen in ggens: for hgen in hgens: commutator = rmul(hgen, ggen, ~hgen, ~ggen) if commutator not in commutators: commutators.append(commutator) res = self.normal_closure(commutators) return res def coset_factor(self, g, factor_index=False): """Return ``G``'s (self's) coset factorization of ``g`` If ``g`` is an element of ``G`` then it can be written as the product of permutations drawn from the Schreier-Sims coset decomposition, The permutations returned in ``f`` are those for which the product gives ``g``: ``g = f[n]*...f[1]*f[0]`` where ``n = len(B)`` and ``B = G.base``. f[i] is one of the permutations in ``self._basic_orbits[i]``. If factor_index==True, returns a tuple ``[b[0],..,b[n]]``, where ``b[i]`` belongs to ``self._basic_orbits[i]`` Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> Permutation.print_cyclic = True >>> a = Permutation(0, 1, 3, 7, 6, 4)(2, 5) >>> b = Permutation(0, 1, 3, 2)(4, 5, 7, 6) >>> G = PermutationGroup([a, b]) Define g: >>> g = Permutation(7)(1, 2, 4)(3, 6, 5) Confirm that it is an element of G: >>> G.contains(g) True Thus, it can be written as a product of factors (up to 3) drawn from u. See below that a factor from u1 and u2 and the Identity permutation have been used: >>> f = G.coset_factor(g) >>> f[2]*f[1]*f[0] == g True >>> f1 = G.coset_factor(g, True); f1 [0, 4, 4] >>> tr = G.basic_transversals >>> f[0] == tr[0][f1[0]] True If g is not an element of G then [] is returned: >>> c = Permutation(5, 6, 7) >>> G.coset_factor(c) [] See Also ======== util._strip """ if isinstance(g, (Cycle, Permutation)): g = g.list() if len(g) != self._degree: # this could either adjust the size or return [] immediately # but we don't choose between the two and just signal a possible # error raise ValueError('g should be the same size as permutations of G') I = list(range(self._degree)) basic_orbits = self.basic_orbits transversals = self._transversals factors = [] base = self.base h = g for i in range(len(base)): beta = h[base[i]] if beta == base[i]: factors.append(beta) continue if beta not in basic_orbits[i]: return [] u = transversals[i][beta]._array_form h = _af_rmul(_af_invert(u), h) factors.append(beta) if h != I: return [] if factor_index: return factors tr = self.basic_transversals factors = [tr[i][factors[i]] for i in range(len(base))] return factors def generator_product(self, g, original=False): ''' Return a list of strong generators `[s1, ..., sn]` s.t `g = sn*...*s1`. If `original=True`, make the list contain only the original group generators ''' product = [] if g.is_identity: return [] if g in self.strong_gens: if not original or g in self.generators: return [g] else: slp = self._strong_gens_slp[g] for s in slp: product.extend(self.generator_product(s, original=True)) return product elif g**-1 in self.strong_gens: g = g**-1 if not original or g in self.generators: return [g**-1] else: slp = self._strong_gens_slp[g] for s in slp: product.extend(self.generator_product(s, original=True)) l = len(product) product = [product[l-i-1]**-1 for i in range(l)] return product f = self.coset_factor(g, True) for i, j in enumerate(f): slp = self._transversal_slp[i][j] for s in slp: if not original: product.append(self.strong_gens[s]) else: s = self.strong_gens[s] product.extend(self.generator_product(s, original=True)) return product def coset_rank(self, g): """rank using Schreier-Sims representation The coset rank of ``g`` is the ordering number in which it appears in the lexicographic listing according to the coset decomposition The ordering is the same as in G.generate(method='coset'). If ``g`` does not belong to the group it returns None. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation(0, 1, 3, 7, 6, 4)(2, 5) >>> b = Permutation(0, 1, 3, 2)(4, 5, 7, 6) >>> G = PermutationGroup([a, b]) >>> c = Permutation(7)(2, 4)(3, 5) >>> G.coset_rank(c) 16 >>> G.coset_unrank(16) (7)(2 4)(3 5) See Also ======== coset_factor """ factors = self.coset_factor(g, True) if not factors: return None rank = 0 b = 1 transversals = self._transversals base = self._base basic_orbits = self._basic_orbits for i in range(len(base)): k = factors[i] j = basic_orbits[i].index(k) rank += b*j b = b*len(transversals[i]) return rank def coset_unrank(self, rank, af=False): """unrank using Schreier-Sims representation coset_unrank is the inverse operation of coset_rank if 0 <= rank < order; otherwise it returns None. """ if rank < 0 or rank >= self.order(): return None base = self.base transversals = self.basic_transversals basic_orbits = self.basic_orbits m = len(base) v = [0]*m for i in range(m): rank, c = divmod(rank, len(transversals[i])) v[i] = basic_orbits[i][c] a = [transversals[i][v[i]]._array_form for i in range(m)] h = _af_rmuln(*a) if af: return h else: return _af_new(h) @property def degree(self): """Returns the size of the permutations in the group. The number of permutations comprising the group is given by ``len(group)``; the number of permutations that can be generated by the group is given by ``group.order()``. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([1, 0, 2]) >>> G = PermutationGroup([a]) >>> G.degree 3 >>> len(G) 1 >>> G.order() 2 >>> list(G.generate()) [(2), (2)(0 1)] See Also ======== order """ return self._degree @property def identity(self): ''' Return the identity element of the permutation group. ''' return _af_new(list(range(self.degree))) @property def elements(self): """Returns all the elements of the permutation group as a set Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> p = PermutationGroup(Permutation(1, 3), Permutation(1, 2)) >>> p.elements {(3), (2 3), (3)(1 2), (1 2 3), (1 3 2), (1 3)} """ return set(self._elements) @property def _elements(self): """Returns all the elements of the permutation group as a list Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> p = PermutationGroup(Permutation(1, 3), Permutation(1, 2)) >>> p._elements [(3), (3)(1 2), (1 3), (2 3), (1 2 3), (1 3 2)] """ return list(islice(self.generate(), None)) def derived_series(self): r"""Return the derived series for the group. The derived series for a group `G` is defined as `G = G_0 > G_1 > G_2 > \ldots` where `G_i = [G_{i-1}, G_{i-1}]`, i.e. `G_i` is the derived subgroup of `G_{i-1}`, for `i\in\mathbb{N}`. When we have `G_k = G_{k-1}` for some `k\in\mathbb{N}`, the series terminates. Returns ======= A list of permutation groups containing the members of the derived series in the order `G = G_0, G_1, G_2, \ldots`. Examples ======== >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... AlternatingGroup, DihedralGroup) >>> A = AlternatingGroup(5) >>> len(A.derived_series()) 1 >>> S = SymmetricGroup(4) >>> len(S.derived_series()) 4 >>> S.derived_series()[1].is_subgroup(AlternatingGroup(4)) True >>> S.derived_series()[2].is_subgroup(DihedralGroup(2)) True See Also ======== derived_subgroup """ res = [self] current = self next = self.derived_subgroup() while not current.is_subgroup(next): res.append(next) current = next next = next.derived_subgroup() return res def derived_subgroup(self): r"""Compute the derived subgroup. The derived subgroup, or commutator subgroup is the subgroup generated by all commutators `[g, h] = hgh^{-1}g^{-1}` for `g, h\in G` ; it is equal to the normal closure of the set of commutators of the generators ([1], p.28, [11]). Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([1, 0, 2, 4, 3]) >>> b = Permutation([0, 1, 3, 2, 4]) >>> G = PermutationGroup([a, b]) >>> C = G.derived_subgroup() >>> list(C.generate(af=True)) [[0, 1, 2, 3, 4], [0, 1, 3, 4, 2], [0, 1, 4, 2, 3]] See Also ======== derived_series """ r = self._r gens = [p._array_form for p in self.generators] set_commutators = set() degree = self._degree rng = list(range(degree)) for i in range(r): for j in range(r): p1 = gens[i] p2 = gens[j] c = list(range(degree)) for k in rng: c[p2[p1[k]]] = p1[p2[k]] ct = tuple(c) if not ct in set_commutators: set_commutators.add(ct) cms = [_af_new(p) for p in set_commutators] G2 = self.normal_closure(cms) return G2 def generate(self, method="coset", af=False): """Return iterator to generate the elements of the group Iteration is done with one of these methods:: method='coset' using the Schreier-Sims coset representation method='dimino' using the Dimino method If af = True it yields the array form of the permutations Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics import PermutationGroup >>> from sympy.combinatorics.polyhedron import tetrahedron The permutation group given in the tetrahedron object is also true groups: >>> G = tetrahedron.pgroup >>> G.is_group True Also the group generated by the permutations in the tetrahedron pgroup -- even the first two -- is a proper group: >>> H = PermutationGroup(G[0], G[1]) >>> J = PermutationGroup(list(H.generate())); J PermutationGroup([ (0 1)(2 3), (1 2 3), (1 3 2), (0 3 1), (0 2 3), (0 3)(1 2), (0 1 3), (3)(0 2 1), (0 3 2), (3)(0 1 2), (0 2)(1 3)]) >>> _.is_group True """ if method == "coset": return self.generate_schreier_sims(af) elif method == "dimino": return self.generate_dimino(af) else: raise NotImplementedError('No generation defined for %s' % method) def generate_dimino(self, af=False): """Yield group elements using Dimino's algorithm If af == True it yields the array form of the permutations Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1, 3]) >>> b = Permutation([0, 2, 3, 1]) >>> g = PermutationGroup([a, b]) >>> list(g.generate_dimino(af=True)) [[0, 1, 2, 3], [0, 2, 1, 3], [0, 2, 3, 1], [0, 1, 3, 2], [0, 3, 2, 1], [0, 3, 1, 2]] References ========== .. [1] The Implementation of Various Algorithms for Permutation Groups in the Computer Algebra System: AXIOM, N.J. Doye, M.Sc. Thesis """ idn = list(range(self.degree)) order = 0 element_list = [idn] set_element_list = {tuple(idn)} if af: yield idn else: yield _af_new(idn) gens = [p._array_form for p in self.generators] for i in range(len(gens)): # D elements of the subgroup G_i generated by gens[:i] D = element_list[:] N = [idn] while N: A = N N = [] for a in A: for g in gens[:i + 1]: ag = _af_rmul(a, g) if tuple(ag) not in set_element_list: # produce G_i*g for d in D: order += 1 ap = _af_rmul(d, ag) if af: yield ap else: p = _af_new(ap) yield p element_list.append(ap) set_element_list.add(tuple(ap)) N.append(ap) self._order = len(element_list) def generate_schreier_sims(self, af=False): """Yield group elements using the Schreier-Sims representation in coset_rank order If ``af = True`` it yields the array form of the permutations Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1, 3]) >>> b = Permutation([0, 2, 3, 1]) >>> g = PermutationGroup([a, b]) >>> list(g.generate_schreier_sims(af=True)) [[0, 1, 2, 3], [0, 2, 1, 3], [0, 3, 2, 1], [0, 1, 3, 2], [0, 2, 3, 1], [0, 3, 1, 2]] """ n = self._degree u = self.basic_transversals basic_orbits = self._basic_orbits if len(u) == 0: for x in self.generators: if af: yield x._array_form else: yield x return if len(u) == 1: for i in basic_orbits[0]: if af: yield u[0][i]._array_form else: yield u[0][i] return u = list(reversed(u)) basic_orbits = basic_orbits[::-1] # stg stack of group elements stg = [list(range(n))] posmax = [len(x) for x in u] n1 = len(posmax) - 1 pos = [0]*n1 h = 0 while 1: # backtrack when finished iterating over coset if pos[h] >= posmax[h]: if h == 0: return pos[h] = 0 h -= 1 stg.pop() continue p = _af_rmul(u[h][basic_orbits[h][pos[h]]]._array_form, stg[-1]) pos[h] += 1 stg.append(p) h += 1 if h == n1: if af: for i in basic_orbits[-1]: p = _af_rmul(u[-1][i]._array_form, stg[-1]) yield p else: for i in basic_orbits[-1]: p = _af_rmul(u[-1][i]._array_form, stg[-1]) p1 = _af_new(p) yield p1 stg.pop() h -= 1 @property def generators(self): """Returns the generators of the group. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G.generators [(1 2), (2)(0 1)] """ return self._generators def contains(self, g, strict=True): """Test if permutation ``g`` belong to self, ``G``. If ``g`` is an element of ``G`` it can be written as a product of factors drawn from the cosets of ``G``'s stabilizers. To see if ``g`` is one of the actual generators defining the group use ``G.has(g)``. If ``strict`` is not ``True``, ``g`` will be resized, if necessary, to match the size of permutations in ``self``. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation(1, 2) >>> b = Permutation(2, 3, 1) >>> G = PermutationGroup(a, b, degree=5) >>> G.contains(G[0]) # trivial check True >>> elem = Permutation([[2, 3]], size=5) >>> G.contains(elem) True >>> G.contains(Permutation(4)(0, 1, 2, 3)) False If strict is False, a permutation will be resized, if necessary: >>> H = PermutationGroup(Permutation(5)) >>> H.contains(Permutation(3)) False >>> H.contains(Permutation(3), strict=False) True To test if a given permutation is present in the group: >>> elem in G.generators False >>> G.has(elem) False See Also ======== coset_factor, has, in """ if not isinstance(g, Permutation): return False if g.size != self.degree: if strict: return False g = Permutation(g, size=self.degree) if g in self.generators: return True return bool(self.coset_factor(g.array_form, True)) @property def is_perfect(self): """Return ``True`` if the group is perfect. A group is perfect if it equals to its derived subgroup. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation(1,2,3)(4,5) >>> b = Permutation(1,2,3,4,5) >>> G = PermutationGroup([a, b]) >>> G.is_perfect False """ if self._is_perfect is None: self._is_perfect = self == self.derived_subgroup() return self._is_perfect @property def is_abelian(self): """Test if the group is Abelian. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G.is_abelian False >>> a = Permutation([0, 2, 1]) >>> G = PermutationGroup([a]) >>> G.is_abelian True """ if self._is_abelian is not None: return self._is_abelian self._is_abelian = True gens = [p._array_form for p in self.generators] for x in gens: for y in gens: if y <= x: continue if not _af_commutes_with(x, y): self._is_abelian = False return False return True def abelian_invariants(self): """ Returns the abelian invariants for the given group. Let ``G`` be a nontrivial finite abelian group. Then G is isomorphic to the direct product of finitely many nontrivial cyclic groups of prime-power order. The prime-powers that occur as the orders of the factors are uniquely determined by G. More precisely, the primes that occur in the orders of the factors in any such decomposition of ``G`` are exactly the primes that divide ``|G|`` and for any such prime ``p``, if the orders of the factors that are p-groups in one such decomposition of ``G`` are ``p^{t_1} >= p^{t_2} >= ... p^{t_r}``, then the orders of the factors that are p-groups in any such decomposition of ``G`` are ``p^{t_1} >= p^{t_2} >= ... p^{t_r}``. The uniquely determined integers ``p^{t_1} >= p^{t_2} >= ... p^{t_r}``, taken for all primes that divide ``|G|`` are called the invariants of the nontrivial group ``G`` as suggested in ([14], p. 542). Notes ===== We adopt the convention that the invariants of a trivial group are []. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G.abelian_invariants() [2] >>> from sympy.combinatorics.named_groups import CyclicGroup >>> G = CyclicGroup(7) >>> G.abelian_invariants() [7] """ if self.is_trivial: return [] gns = self.generators inv = [] G = self H = G.derived_subgroup() Hgens = H.generators for p in primefactors(G.order()): ranks = [] while True: pows = [] for g in gns: elm = g**p if not H.contains(elm): pows.append(elm) K = PermutationGroup(Hgens + pows) if pows else H r = G.order()//K.order() G = K gns = pows if r == 1: break; ranks.append(multiplicity(p, r)) if ranks: pows = [1]*ranks[0] for i in ranks: for j in range(0, i): pows[j] = pows[j]*p inv.extend(pows) inv.sort() return inv def is_elementary(self, p): """Return ``True`` if the group is elementary abelian. An elementary abelian group is a finite abelian group, where every nontrivial element has order `p`, where `p` is a prime. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1]) >>> G = PermutationGroup([a]) >>> G.is_elementary(2) True >>> a = Permutation([0, 2, 1, 3]) >>> b = Permutation([3, 1, 2, 0]) >>> G = PermutationGroup([a, b]) >>> G.is_elementary(2) True >>> G.is_elementary(3) False """ return self.is_abelian and all(g.order() == p for g in self.generators) def is_alt_sym(self, eps=0.05, _random_prec=None): r"""Monte Carlo test for the symmetric/alternating group for degrees >= 8. More specifically, it is one-sided Monte Carlo with the answer True (i.e., G is symmetric/alternating) guaranteed to be correct, and the answer False being incorrect with probability eps. For degree < 8, the order of the group is checked so the test is deterministic. Notes ===== The algorithm itself uses some nontrivial results from group theory and number theory: 1) If a transitive group ``G`` of degree ``n`` contains an element with a cycle of length ``n/2 < p < n-2`` for ``p`` a prime, ``G`` is the symmetric or alternating group ([1], pp. 81-82) 2) The proportion of elements in the symmetric/alternating group having the property described in 1) is approximately `\log(2)/\log(n)` ([1], p.82; [2], pp. 226-227). The helper function ``_check_cycles_alt_sym`` is used to go over the cycles in a permutation and look for ones satisfying 1). Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> D = DihedralGroup(10) >>> D.is_alt_sym() False See Also ======== _check_cycles_alt_sym """ if _random_prec is None: if self._is_sym or self._is_alt: return True n = self.degree if n < 8: sym_order = 1 for i in range(2, n+1): sym_order *= i order = self.order() if order == sym_order: self._is_sym = True return True elif 2*order == sym_order: self._is_alt = True return True return False if not self.is_transitive(): return False if n < 17: c_n = 0.34 else: c_n = 0.57 d_n = (c_n*log(2))/log(n) N_eps = int(-log(eps)/d_n) for i in range(N_eps): perm = self.random_pr() if _check_cycles_alt_sym(perm): return True return False else: for i in range(_random_prec['N_eps']): perm = _random_prec[i] if _check_cycles_alt_sym(perm): return True return False @property def is_nilpotent(self): """Test if the group is nilpotent. A group `G` is nilpotent if it has a central series of finite length. Alternatively, `G` is nilpotent if its lower central series terminates with the trivial group. Every nilpotent group is also solvable ([1], p.29, [12]). Examples ======== >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... CyclicGroup) >>> C = CyclicGroup(6) >>> C.is_nilpotent True >>> S = SymmetricGroup(5) >>> S.is_nilpotent False See Also ======== lower_central_series, is_solvable """ if self._is_nilpotent is None: lcs = self.lower_central_series() terminator = lcs[len(lcs) - 1] gens = terminator.generators degree = self.degree identity = _af_new(list(range(degree))) if all(g == identity for g in gens): self._is_solvable = True self._is_nilpotent = True return True else: self._is_nilpotent = False return False else: return self._is_nilpotent def is_normal(self, gr, strict=True): """Test if ``G=self`` is a normal subgroup of ``gr``. G is normal in gr if for each g2 in G, g1 in gr, ``g = g1*g2*g1**-1`` belongs to G It is sufficient to check this for each g1 in gr.generators and g2 in G.generators. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([1, 2, 0]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G1 = PermutationGroup([a, Permutation([2, 0, 1])]) >>> G1.is_normal(G) True """ if not self.is_subgroup(gr, strict=strict): return False d_self = self.degree d_gr = gr.degree if self.is_trivial and (d_self == d_gr or not strict): return True if self._is_abelian: return True new_self = self.copy() if not strict and d_self != d_gr: if d_self < d_gr: new_self = PermGroup(new_self.generators + [Permutation(d_gr - 1)]) else: gr = PermGroup(gr.generators + [Permutation(d_self - 1)]) gens2 = [p._array_form for p in new_self.generators] gens1 = [p._array_form for p in gr.generators] for g1 in gens1: for g2 in gens2: p = _af_rmuln(g1, g2, _af_invert(g1)) if not new_self.coset_factor(p, True): return False return True def is_primitive(self, randomized=True): r"""Test if a group is primitive. A permutation group ``G`` acting on a set ``S`` is called primitive if ``S`` contains no nontrivial block under the action of ``G`` (a block is nontrivial if its cardinality is more than ``1``). Notes ===== The algorithm is described in [1], p.83, and uses the function minimal_block to search for blocks of the form `\{0, k\}` for ``k`` ranging over representatives for the orbits of `G_0`, the stabilizer of ``0``. This algorithm has complexity `O(n^2)` where ``n`` is the degree of the group, and will perform badly if `G_0` is small. There are two implementations offered: one finds `G_0` deterministically using the function ``stabilizer``, and the other (default) produces random elements of `G_0` using ``random_stab``, hoping that they generate a subgroup of `G_0` with not too many more orbits than `G_0` (this is suggested in [1], p.83). Behavior is changed by the ``randomized`` flag. Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> D = DihedralGroup(10) >>> D.is_primitive() False See Also ======== minimal_block, random_stab """ if self._is_primitive is not None: return self._is_primitive if randomized: random_stab_gens = [] v = self.schreier_vector(0) for i in range(len(self)): random_stab_gens.append(self.random_stab(0, v)) stab = PermutationGroup(random_stab_gens) else: stab = self.stabilizer(0) orbits = stab.orbits() for orb in orbits: x = orb.pop() if x != 0 and any(e != 0 for e in self.minimal_block([0, x])): self._is_primitive = False return False self._is_primitive = True return True def minimal_blocks(self, randomized=True): ''' For a transitive group, return the list of all minimal block systems. If a group is intransitive, return `False`. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> DihedralGroup(6).minimal_blocks() [[0, 1, 0, 1, 0, 1], [0, 1, 2, 0, 1, 2]] >>> G = PermutationGroup(Permutation(1,2,5)) >>> G.minimal_blocks() False See Also ======== minimal_block, is_transitive, is_primitive ''' def _number_blocks(blocks): # number the blocks of a block system # in order and return the number of # blocks and the tuple with the # reordering n = len(blocks) appeared = {} m = 0 b = [None]*n for i in range(n): if blocks[i] not in appeared: appeared[blocks[i]] = m b[i] = m m += 1 else: b[i] = appeared[blocks[i]] return tuple(b), m if not self.is_transitive(): return False blocks = [] num_blocks = [] rep_blocks = [] if randomized: random_stab_gens = [] v = self.schreier_vector(0) for i in range(len(self)): random_stab_gens.append(self.random_stab(0, v)) stab = PermutationGroup(random_stab_gens) else: stab = self.stabilizer(0) orbits = stab.orbits() for orb in orbits: x = orb.pop() if x != 0: block = self.minimal_block([0, x]) num_block, m = _number_blocks(block) # a representative block (containing 0) rep = set(j for j in range(self.degree) if num_block[j] == 0) # check if the system is minimal with # respect to the already discovere ones minimal = True to_remove = [] for i, r in enumerate(rep_blocks): if len(r) > len(rep) and rep.issubset(r): # i-th block system is not minimal del num_blocks[i], blocks[i] to_remove.append(rep_blocks[i]) elif len(r) < len(rep) and r.issubset(rep): # the system being checked is not minimal minimal = False break # remove non-minimal representative blocks rep_blocks = [r for r in rep_blocks if r not in to_remove] if minimal and num_block not in num_blocks: blocks.append(block) num_blocks.append(num_block) rep_blocks.append(rep) return blocks @property def is_solvable(self): """Test if the group is solvable. ``G`` is solvable if its derived series terminates with the trivial group ([1], p.29). Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> S = SymmetricGroup(3) >>> S.is_solvable True See Also ======== is_nilpotent, derived_series """ if self._is_solvable is None: if self.order() % 2 != 0: return True ds = self.derived_series() terminator = ds[len(ds) - 1] gens = terminator.generators degree = self.degree identity = _af_new(list(range(degree))) if all(g == identity for g in gens): self._is_solvable = True return True else: self._is_solvable = False return False else: return self._is_solvable def is_subgroup(self, G, strict=True): """Return ``True`` if all elements of ``self`` belong to ``G``. If ``strict`` is ``False`` then if ``self``'s degree is smaller than ``G``'s, the elements will be resized to have the same degree. Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... CyclicGroup) Testing is strict by default: the degree of each group must be the same: >>> p = Permutation(0, 1, 2, 3, 4, 5) >>> G1 = PermutationGroup([Permutation(0, 1, 2), Permutation(0, 1)]) >>> G2 = PermutationGroup([Permutation(0, 2), Permutation(0, 1, 2)]) >>> G3 = PermutationGroup([p, p**2]) >>> assert G1.order() == G2.order() == G3.order() == 6 >>> G1.is_subgroup(G2) True >>> G1.is_subgroup(G3) False >>> G3.is_subgroup(PermutationGroup(G3[1])) False >>> G3.is_subgroup(PermutationGroup(G3[0])) True To ignore the size, set ``strict`` to ``False``: >>> S3 = SymmetricGroup(3) >>> S5 = SymmetricGroup(5) >>> S3.is_subgroup(S5, strict=False) True >>> C7 = CyclicGroup(7) >>> G = S5*C7 >>> S5.is_subgroup(G, False) True >>> C7.is_subgroup(G, 0) False """ if not isinstance(G, PermutationGroup): return False if self == G or self.generators[0]==Permutation(): return True if G.order() % self.order() != 0: return False if self.degree == G.degree or \ (self.degree < G.degree and not strict): gens = self.generators else: return False return all(G.contains(g, strict=strict) for g in gens) @property def is_polycyclic(self): """Return ``True`` if a group is polycyclic. A group is polycyclic if it has a subnormal series with cyclic factors. For finite groups, this is the same as if the group is solvable. Examples ======== >>> from sympy.combinatorics import Permutation, PermutationGroup >>> a = Permutation([0, 2, 1, 3]) >>> b = Permutation([2, 0, 1, 3]) >>> G = PermutationGroup([a, b]) >>> G.is_polycyclic True """ return self.is_solvable def is_transitive(self, strict=True): """Test if the group is transitive. A group is transitive if it has a single orbit. If ``strict`` is ``False`` the group is transitive if it has a single orbit of length different from 1. Examples ======== >>> from sympy.combinatorics.permutations import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1, 3]) >>> b = Permutation([2, 0, 1, 3]) >>> G1 = PermutationGroup([a, b]) >>> G1.is_transitive() False >>> G1.is_transitive(strict=False) True >>> c = Permutation([2, 3, 0, 1]) >>> G2 = PermutationGroup([a, c]) >>> G2.is_transitive() True >>> d = Permutation([1, 0, 2, 3]) >>> e = Permutation([0, 1, 3, 2]) >>> G3 = PermutationGroup([d, e]) >>> G3.is_transitive() or G3.is_transitive(strict=False) False """ if self._is_transitive: # strict or not, if True then True return self._is_transitive if strict: if self._is_transitive is not None: # we only store strict=True return self._is_transitive ans = len(self.orbit(0)) == self.degree self._is_transitive = ans return ans got_orb = False for x in self.orbits(): if len(x) > 1: if got_orb: return False got_orb = True return got_orb @property def is_trivial(self): """Test if the group is the trivial group. This is true if the group contains only the identity permutation. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> G = PermutationGroup([Permutation([0, 1, 2])]) >>> G.is_trivial True """ if self._is_trivial is None: self._is_trivial = len(self) == 1 and self[0].is_Identity return self._is_trivial def lower_central_series(self): r"""Return the lower central series for the group. The lower central series for a group `G` is the series `G = G_0 > G_1 > G_2 > \ldots` where `G_k = [G, G_{k-1}]`, i.e. every term after the first is equal to the commutator of `G` and the previous term in `G1` ([1], p.29). Returns ======= A list of permutation groups in the order `G = G_0, G_1, G_2, \ldots` Examples ======== >>> from sympy.combinatorics.named_groups import (AlternatingGroup, ... DihedralGroup) >>> A = AlternatingGroup(4) >>> len(A.lower_central_series()) 2 >>> A.lower_central_series()[1].is_subgroup(DihedralGroup(2)) True See Also ======== commutator, derived_series """ res = [self] current = self next = self.commutator(self, current) while not current.is_subgroup(next): res.append(next) current = next next = self.commutator(self, current) return res @property def max_div(self): """Maximum proper divisor of the degree of a permutation group. Notes ===== Obviously, this is the degree divided by its minimal proper divisor (larger than ``1``, if one exists). As it is guaranteed to be prime, the ``sieve`` from ``sympy.ntheory`` is used. This function is also used as an optimization tool for the functions ``minimal_block`` and ``_union_find_merge``. Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> G = PermutationGroup([Permutation([0, 2, 1, 3])]) >>> G.max_div 2 See Also ======== minimal_block, _union_find_merge """ if self._max_div is not None: return self._max_div n = self.degree if n == 1: return 1 for x in sieve: if n % x == 0: d = n//x self._max_div = d return d def minimal_block(self, points): r"""For a transitive group, finds the block system generated by ``points``. If a group ``G`` acts on a set ``S``, a nonempty subset ``B`` of ``S`` is called a block under the action of ``G`` if for all ``g`` in ``G`` we have ``gB = B`` (``g`` fixes ``B``) or ``gB`` and ``B`` have no common points (``g`` moves ``B`` entirely). ([1], p.23; [6]). The distinct translates ``gB`` of a block ``B`` for ``g`` in ``G`` partition the set ``S`` and this set of translates is known as a block system. Moreover, we obviously have that all blocks in the partition have the same size, hence the block size divides ``|S|`` ([1], p.23). A ``G``-congruence is an equivalence relation ``~`` on the set ``S`` such that ``a ~ b`` implies ``g(a) ~ g(b)`` for all ``g`` in ``G``. For a transitive group, the equivalence classes of a ``G``-congruence and the blocks of a block system are the same thing ([1], p.23). The algorithm below checks the group for transitivity, and then finds the ``G``-congruence generated by the pairs ``(p_0, p_1), (p_0, p_2), ..., (p_0,p_{k-1})`` which is the same as finding the maximal block system (i.e., the one with minimum block size) such that ``p_0, ..., p_{k-1}`` are in the same block ([1], p.83). It is an implementation of Atkinson's algorithm, as suggested in [1], and manipulates an equivalence relation on the set ``S`` using a union-find data structure. The running time is just above `O(|points||S|)`. ([1], pp. 83-87; [7]). Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> D = DihedralGroup(10) >>> D.minimal_block([0, 5]) [0, 1, 2, 3, 4, 0, 1, 2, 3, 4] >>> D.minimal_block([0, 1]) [0, 0, 0, 0, 0, 0, 0, 0, 0, 0] See Also ======== _union_find_rep, _union_find_merge, is_transitive, is_primitive """ if not self.is_transitive(): return False n = self.degree gens = self.generators # initialize the list of equivalence class representatives parents = list(range(n)) ranks = [1]*n not_rep = [] k = len(points) # the block size must divide the degree of the group if k > self.max_div: return [0]*n for i in range(k - 1): parents[points[i + 1]] = points[0] not_rep.append(points[i + 1]) ranks[points[0]] = k i = 0 len_not_rep = k - 1 while i < len_not_rep: gamma = not_rep[i] i += 1 for gen in gens: # find has side effects: performs path compression on the list # of representatives delta = self._union_find_rep(gamma, parents) # union has side effects: performs union by rank on the list # of representatives temp = self._union_find_merge(gen(gamma), gen(delta), ranks, parents, not_rep) if temp == -1: return [0]*n len_not_rep += temp for i in range(n): # force path compression to get the final state of the equivalence # relation self._union_find_rep(i, parents) # rewrite result so that block representatives are minimal new_reps = {} return [new_reps.setdefault(r, i) for i, r in enumerate(parents)] def normal_closure(self, other, k=10): r"""Return the normal closure of a subgroup/set of permutations. If ``S`` is a subset of a group ``G``, the normal closure of ``A`` in ``G`` is defined as the intersection of all normal subgroups of ``G`` that contain ``A`` ([1], p.14). Alternatively, it is the group generated by the conjugates ``x^{-1}yx`` for ``x`` a generator of ``G`` and ``y`` a generator of the subgroup ``\left\langle S\right\rangle`` generated by ``S`` (for some chosen generating set for ``\left\langle S\right\rangle``) ([1], p.73). Parameters ========== other a subgroup/list of permutations/single permutation k an implementation-specific parameter that determines the number of conjugates that are adjoined to ``other`` at once Examples ======== >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... CyclicGroup, AlternatingGroup) >>> S = SymmetricGroup(5) >>> C = CyclicGroup(5) >>> G = S.normal_closure(C) >>> G.order() 60 >>> G.is_subgroup(AlternatingGroup(5)) True See Also ======== commutator, derived_subgroup, random_pr Notes ===== The algorithm is described in [1], pp. 73-74; it makes use of the generation of random elements for permutation groups by the product replacement algorithm. """ if hasattr(other, 'generators'): degree = self.degree identity = _af_new(list(range(degree))) if all(g == identity for g in other.generators): return other Z = PermutationGroup(other.generators[:]) base, strong_gens = Z.schreier_sims_incremental() strong_gens_distr = _distribute_gens_by_base(base, strong_gens) basic_orbits, basic_transversals = \ _orbits_transversals_from_bsgs(base, strong_gens_distr) self._random_pr_init(r=10, n=20) _loop = True while _loop: Z._random_pr_init(r=10, n=10) for i in range(k): g = self.random_pr() h = Z.random_pr() conj = h^g res = _strip(conj, base, basic_orbits, basic_transversals) if res[0] != identity or res[1] != len(base) + 1: gens = Z.generators gens.append(conj) Z = PermutationGroup(gens) strong_gens.append(conj) temp_base, temp_strong_gens = \ Z.schreier_sims_incremental(base, strong_gens) base, strong_gens = temp_base, temp_strong_gens strong_gens_distr = \ _distribute_gens_by_base(base, strong_gens) basic_orbits, basic_transversals = \ _orbits_transversals_from_bsgs(base, strong_gens_distr) _loop = False for g in self.generators: for h in Z.generators: conj = h^g res = _strip(conj, base, basic_orbits, basic_transversals) if res[0] != identity or res[1] != len(base) + 1: _loop = True break if _loop: break return Z elif hasattr(other, '__getitem__'): return self.normal_closure(PermutationGroup(other)) elif hasattr(other, 'array_form'): return self.normal_closure(PermutationGroup([other])) def orbit(self, alpha, action='tuples'): r"""Compute the orbit of alpha `\{g(\alpha) | g \in G\}` as a set. The time complexity of the algorithm used here is `O(|Orb|*r)` where `|Orb|` is the size of the orbit and ``r`` is the number of generators of the group. For a more detailed analysis, see [1], p.78, [2], pp. 19-21. Here alpha can be a single point, or a list of points. If alpha is a single point, the ordinary orbit is computed. if alpha is a list of points, there are three available options: 'union' - computes the union of the orbits of the points in the list 'tuples' - computes the orbit of the list interpreted as an ordered tuple under the group action ( i.e., g((1,2,3)) = (g(1), g(2), g(3)) ) 'sets' - computes the orbit of the list interpreted as a sets Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([1, 2, 0, 4, 5, 6, 3]) >>> G = PermutationGroup([a]) >>> G.orbit(0) {0, 1, 2} >>> G.orbit([0, 4], 'union') {0, 1, 2, 3, 4, 5, 6} See Also ======== orbit_transversal """ return _orbit(self.degree, self.generators, alpha, action) def orbit_rep(self, alpha, beta, schreier_vector=None): """Return a group element which sends ``alpha`` to ``beta``. If ``beta`` is not in the orbit of ``alpha``, the function returns ``False``. This implementation makes use of the schreier vector. For a proof of correctness, see [1], p.80 Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import AlternatingGroup >>> G = AlternatingGroup(5) >>> G.orbit_rep(0, 4) (0 4 1 2 3) See Also ======== schreier_vector """ if schreier_vector is None: schreier_vector = self.schreier_vector(alpha) if schreier_vector[beta] is None: return False k = schreier_vector[beta] gens = [x._array_form for x in self.generators] a = [] while k != -1: a.append(gens[k]) beta = gens[k].index(beta) # beta = (~gens[k])(beta) k = schreier_vector[beta] if a: return _af_new(_af_rmuln(*a)) else: return _af_new(list(range(self._degree))) def orbit_transversal(self, alpha, pairs=False): r"""Computes a transversal for the orbit of ``alpha`` as a set. For a permutation group `G`, a transversal for the orbit `Orb = \{g(\alpha) | g \in G\}` is a set `\{g_\beta | g_\beta(\alpha) = \beta\}` for `\beta \in Orb`. Note that there may be more than one possible transversal. If ``pairs`` is set to ``True``, it returns the list of pairs `(\beta, g_\beta)`. For a proof of correctness, see [1], p.79 Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> G = DihedralGroup(6) >>> G.orbit_transversal(0) [(5), (0 1 2 3 4 5), (0 5)(1 4)(2 3), (0 2 4)(1 3 5), (5)(0 4)(1 3), (0 3)(1 4)(2 5)] See Also ======== orbit """ return _orbit_transversal(self._degree, self.generators, alpha, pairs) def orbits(self, rep=False): """Return the orbits of ``self``, ordered according to lowest element in each orbit. Examples ======== >>> from sympy.combinatorics.permutations import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation(1, 5)(2, 3)(4, 0, 6) >>> b = Permutation(1, 5)(3, 4)(2, 6, 0) >>> G = PermutationGroup([a, b]) >>> G.orbits() [{0, 2, 3, 4, 6}, {1, 5}] """ return _orbits(self._degree, self._generators) def order(self): """Return the order of the group: the number of permutations that can be generated from elements of the group. The number of permutations comprising the group is given by ``len(group)``; the length of each permutation in the group is given by ``group.size``. Examples ======== >>> from sympy.combinatorics.permutations import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([1, 0, 2]) >>> G = PermutationGroup([a]) >>> G.degree 3 >>> len(G) 1 >>> G.order() 2 >>> list(G.generate()) [(2), (2)(0 1)] >>> a = Permutation([0, 2, 1]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G.order() 6 See Also ======== degree """ if self._order is not None: return self._order if self._is_sym: n = self._degree self._order = factorial(n) return self._order if self._is_alt: n = self._degree self._order = factorial(n)/2 return self._order basic_transversals = self.basic_transversals m = 1 for x in basic_transversals: m *= len(x) self._order = m return m def index(self, H): """ Returns the index of a permutation group. Examples ======== >>> from sympy.combinatorics.permutations import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation(1,2,3) >>> b =Permutation(3) >>> G = PermutationGroup([a]) >>> H = PermutationGroup([b]) >>> G.index(H) 3 """ if H.is_subgroup(self): return self.order()//H.order() @property def is_cyclic(self): """ Return ``True`` if the group is Cyclic. Examples ======== >>> from sympy.combinatorics.named_groups import AbelianGroup >>> G = AbelianGroup(3, 4) >>> G.is_cyclic True >>> G = AbelianGroup(4, 4) >>> G.is_cyclic False """ if self._is_cyclic is not None: return self._is_cyclic self._is_cyclic = True if len(self.generators) == 1: return True if not self._is_abelian: self._is_cyclic = False return False for p in primefactors(self.order()): pgens = [] for g in self.generators: pgens.append(g**p) if self.index(self.subgroup(pgens)) != p: self._is_cyclic = False return False else: continue return True def pointwise_stabilizer(self, points, incremental=True): r"""Return the pointwise stabilizer for a set of points. For a permutation group `G` and a set of points `\{p_1, p_2,\ldots, p_k\}`, the pointwise stabilizer of `p_1, p_2, \ldots, p_k` is defined as `G_{p_1,\ldots, p_k} = \{g\in G | g(p_i) = p_i \forall i\in\{1, 2,\ldots,k\}\}` ([1],p20). It is a subgroup of `G`. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> S = SymmetricGroup(7) >>> Stab = S.pointwise_stabilizer([2, 3, 5]) >>> Stab.is_subgroup(S.stabilizer(2).stabilizer(3).stabilizer(5)) True See Also ======== stabilizer, schreier_sims_incremental Notes ===== When incremental == True, rather than the obvious implementation using successive calls to ``.stabilizer()``, this uses the incremental Schreier-Sims algorithm to obtain a base with starting segment - the given points. """ if incremental: base, strong_gens = self.schreier_sims_incremental(base=points) stab_gens = [] degree = self.degree for gen in strong_gens: if [gen(point) for point in points] == points: stab_gens.append(gen) if not stab_gens: stab_gens = _af_new(list(range(degree))) return PermutationGroup(stab_gens) else: gens = self._generators degree = self.degree for x in points: gens = _stabilizer(degree, gens, x) return PermutationGroup(gens) def make_perm(self, n, seed=None): """ Multiply ``n`` randomly selected permutations from pgroup together, starting with the identity permutation. If ``n`` is a list of integers, those integers will be used to select the permutations and they will be applied in L to R order: make_perm((A, B, C)) will give CBA(I) where I is the identity permutation. ``seed`` is used to set the seed for the random selection of permutations from pgroup. If this is a list of integers, the corresponding permutations from pgroup will be selected in the order give. This is mainly used for testing purposes. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a, b = [Permutation([1, 0, 3, 2]), Permutation([1, 3, 0, 2])] >>> G = PermutationGroup([a, b]) >>> G.make_perm(1, [0]) (0 1)(2 3) >>> G.make_perm(3, [0, 1, 0]) (0 2 3 1) >>> G.make_perm([0, 1, 0]) (0 2 3 1) See Also ======== random """ if is_sequence(n): if seed is not None: raise ValueError('If n is a sequence, seed should be None') n, seed = len(n), n else: try: n = int(n) except TypeError: raise ValueError('n must be an integer or a sequence.') randrange = _randrange(seed) # start with the identity permutation result = Permutation(list(range(self.degree))) m = len(self) for i in range(n): p = self[randrange(m)] result = rmul(result, p) return result def random(self, af=False): """Return a random group element """ rank = randrange(self.order()) return self.coset_unrank(rank, af) def random_pr(self, gen_count=11, iterations=50, _random_prec=None): """Return a random group element using product replacement. For the details of the product replacement algorithm, see ``_random_pr_init`` In ``random_pr`` the actual 'product replacement' is performed. Notice that if the attribute ``_random_gens`` is empty, it needs to be initialized by ``_random_pr_init``. See Also ======== _random_pr_init """ if self._random_gens == []: self._random_pr_init(gen_count, iterations) random_gens = self._random_gens r = len(random_gens) - 1 # handle randomized input for testing purposes if _random_prec is None: s = randrange(r) t = randrange(r - 1) if t == s: t = r - 1 x = choice([1, 2]) e = choice([-1, 1]) else: s = _random_prec['s'] t = _random_prec['t'] if t == s: t = r - 1 x = _random_prec['x'] e = _random_prec['e'] if x == 1: random_gens[s] = _af_rmul(random_gens[s], _af_pow(random_gens[t], e)) random_gens[r] = _af_rmul(random_gens[r], random_gens[s]) else: random_gens[s] = _af_rmul(_af_pow(random_gens[t], e), random_gens[s]) random_gens[r] = _af_rmul(random_gens[s], random_gens[r]) return _af_new(random_gens[r]) def random_stab(self, alpha, schreier_vector=None, _random_prec=None): """Random element from the stabilizer of ``alpha``. The schreier vector for ``alpha`` is an optional argument used for speeding up repeated calls. The algorithm is described in [1], p.81 See Also ======== random_pr, orbit_rep """ if schreier_vector is None: schreier_vector = self.schreier_vector(alpha) if _random_prec is None: rand = self.random_pr() else: rand = _random_prec['rand'] beta = rand(alpha) h = self.orbit_rep(alpha, beta, schreier_vector) return rmul(~h, rand) def schreier_sims(self): """Schreier-Sims algorithm. It computes the generators of the chain of stabilizers `G > G_{b_1} > .. > G_{b1,..,b_r} > 1` in which `G_{b_1,..,b_i}` stabilizes `b_1,..,b_i`, and the corresponding ``s`` cosets. An element of the group can be written as the product `h_1*..*h_s`. We use the incremental Schreier-Sims algorithm. Examples ======== >>> from sympy.combinatorics.permutations import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> a = Permutation([0, 2, 1]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G.schreier_sims() >>> G.basic_transversals [{0: (2)(0 1), 1: (2), 2: (1 2)}, {0: (2), 2: (0 2)}] """ if self._transversals: return self._schreier_sims() return def _schreier_sims(self, base=None): schreier = self.schreier_sims_incremental(base=base, slp_dict=True) base, strong_gens = schreier[:2] self._base = base self._strong_gens = strong_gens self._strong_gens_slp = schreier[2] if not base: self._transversals = [] self._basic_orbits = [] return strong_gens_distr = _distribute_gens_by_base(base, strong_gens) basic_orbits, transversals, slps = _orbits_transversals_from_bsgs(base,\ strong_gens_distr, slp=True) # rewrite the indices stored in slps in terms of strong_gens for i, slp in enumerate(slps): gens = strong_gens_distr[i] for k in slp: slp[k] = [strong_gens.index(gens[s]) for s in slp[k]] self._transversals = transversals self._basic_orbits = [sorted(x) for x in basic_orbits] self._transversal_slp = slps def schreier_sims_incremental(self, base=None, gens=None, slp_dict=False): """Extend a sequence of points and generating set to a base and strong generating set. Parameters ========== base The sequence of points to be extended to a base. Optional parameter with default value ``[]``. gens The generating set to be extended to a strong generating set relative to the base obtained. Optional parameter with default value ``self.generators``. slp_dict If `True`, return a dictionary `{g: gens}` for each strong generator `g` where `gens` is a list of strong generators coming before `g` in `strong_gens`, such that the product of the elements of `gens` is equal to `g`. Returns ======= (base, strong_gens) ``base`` is the base obtained, and ``strong_gens`` is the strong generating set relative to it. The original parameters ``base``, ``gens`` remain unchanged. Examples ======== >>> from sympy.combinatorics.named_groups import AlternatingGroup >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.testutil import _verify_bsgs >>> A = AlternatingGroup(7) >>> base = [2, 3] >>> seq = [2, 3] >>> base, strong_gens = A.schreier_sims_incremental(base=seq) >>> _verify_bsgs(A, base, strong_gens) True >>> base[:2] [2, 3] Notes ===== This version of the Schreier-Sims algorithm runs in polynomial time. There are certain assumptions in the implementation - if the trivial group is provided, ``base`` and ``gens`` are returned immediately, as any sequence of points is a base for the trivial group. If the identity is present in the generators ``gens``, it is removed as it is a redundant generator. The implementation is described in [1], pp. 90-93. See Also ======== schreier_sims, schreier_sims_random """ if base is None: base = [] if gens is None: gens = self.generators[:] degree = self.degree id_af = list(range(degree)) # handle the trivial group if len(gens) == 1 and gens[0].is_Identity: if slp_dict: return base, gens, {gens[0]: [gens[0]]} return base, gens # prevent side effects _base, _gens = base[:], gens[:] # remove the identity as a generator _gens = [x for x in _gens if not x.is_Identity] # make sure no generator fixes all base points for gen in _gens: if all(x == gen._array_form[x] for x in _base): for new in id_af: if gen._array_form[new] != new: break else: assert None # can this ever happen? _base.append(new) # distribute generators according to basic stabilizers strong_gens_distr = _distribute_gens_by_base(_base, _gens) strong_gens_slp = [] # initialize the basic stabilizers, basic orbits and basic transversals orbs = {} transversals = {} slps = {} base_len = len(_base) for i in range(base_len): transversals[i], slps[i] = _orbit_transversal(degree, strong_gens_distr[i], _base[i], pairs=True, af=True, slp=True) transversals[i] = dict(transversals[i]) orbs[i] = list(transversals[i].keys()) # main loop: amend the stabilizer chain until we have generators # for all stabilizers i = base_len - 1 while i >= 0: # this flag is used to continue with the main loop from inside # a nested loop continue_i = False # test the generators for being a strong generating set db = {} for beta, u_beta in list(transversals[i].items()): for j, gen in enumerate(strong_gens_distr[i]): gb = gen._array_form[beta] u1 = transversals[i][gb] g1 = _af_rmul(gen._array_form, u_beta) slp = [(i, g) for g in slps[i][beta]] slp = [(i, j)] + slp if g1 != u1: # test if the schreier generator is in the i+1-th # would-be basic stabilizer y = True try: u1_inv = db[gb] except KeyError: u1_inv = db[gb] = _af_invert(u1) schreier_gen = _af_rmul(u1_inv, g1) u1_inv_slp = slps[i][gb][:] u1_inv_slp.reverse() u1_inv_slp = [(i, (g,)) for g in u1_inv_slp] slp = u1_inv_slp + slp h, j, slp = _strip_af(schreier_gen, _base, orbs, transversals, i, slp=slp, slps=slps) if j <= base_len: # new strong generator h at level j y = False elif h: # h fixes all base points y = False moved = 0 while h[moved] == moved: moved += 1 _base.append(moved) base_len += 1 strong_gens_distr.append([]) if y is False: # if a new strong generator is found, update the # data structures and start over h = _af_new(h) strong_gens_slp.append((h, slp)) for l in range(i + 1, j): strong_gens_distr[l].append(h) transversals[l], slps[l] =\ _orbit_transversal(degree, strong_gens_distr[l], _base[l], pairs=True, af=True, slp=True) transversals[l] = dict(transversals[l]) orbs[l] = list(transversals[l].keys()) i = j - 1 # continue main loop using the flag continue_i = True if continue_i is True: break if continue_i is True: break if continue_i is True: continue i -= 1 strong_gens = _gens[:] if slp_dict: # create the list of the strong generators strong_gens and # rewrite the indices of strong_gens_slp in terms of the # elements of strong_gens for k, slp in strong_gens_slp: strong_gens.append(k) for i in range(len(slp)): s = slp[i] if isinstance(s[1], tuple): slp[i] = strong_gens_distr[s[0]][s[1][0]]**-1 else: slp[i] = strong_gens_distr[s[0]][s[1]] strong_gens_slp = dict(strong_gens_slp) # add the original generators for g in _gens: strong_gens_slp[g] = [g] return (_base, strong_gens, strong_gens_slp) strong_gens.extend([k for k, _ in strong_gens_slp]) return _base, strong_gens def schreier_sims_random(self, base=None, gens=None, consec_succ=10, _random_prec=None): r"""Randomized Schreier-Sims algorithm. The randomized Schreier-Sims algorithm takes the sequence ``base`` and the generating set ``gens``, and extends ``base`` to a base, and ``gens`` to a strong generating set relative to that base with probability of a wrong answer at most `2^{-consec\_succ}`, provided the random generators are sufficiently random. Parameters ========== base The sequence to be extended to a base. gens The generating set to be extended to a strong generating set. consec_succ The parameter defining the probability of a wrong answer. _random_prec An internal parameter used for testing purposes. Returns ======= (base, strong_gens) ``base`` is the base and ``strong_gens`` is the strong generating set relative to it. Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.testutil import _verify_bsgs >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> S = SymmetricGroup(5) >>> base, strong_gens = S.schreier_sims_random(consec_succ=5) >>> _verify_bsgs(S, base, strong_gens) #doctest: +SKIP True Notes ===== The algorithm is described in detail in [1], pp. 97-98. It extends the orbits ``orbs`` and the permutation groups ``stabs`` to basic orbits and basic stabilizers for the base and strong generating set produced in the end. The idea of the extension process is to "sift" random group elements through the stabilizer chain and amend the stabilizers/orbits along the way when a sift is not successful. The helper function ``_strip`` is used to attempt to decompose a random group element according to the current state of the stabilizer chain and report whether the element was fully decomposed (successful sift) or not (unsuccessful sift). In the latter case, the level at which the sift failed is reported and used to amend ``stabs``, ``base``, ``gens`` and ``orbs`` accordingly. The halting condition is for ``consec_succ`` consecutive successful sifts to pass. This makes sure that the current ``base`` and ``gens`` form a BSGS with probability at least `1 - 1/\text{consec\_succ}`. See Also ======== schreier_sims """ if base is None: base = [] if gens is None: gens = self.generators base_len = len(base) n = self.degree # make sure no generator fixes all base points for gen in gens: if all(gen(x) == x for x in base): new = 0 while gen._array_form[new] == new: new += 1 base.append(new) base_len += 1 # distribute generators according to basic stabilizers strong_gens_distr = _distribute_gens_by_base(base, gens) # initialize the basic stabilizers, basic transversals and basic orbits transversals = {} orbs = {} for i in range(base_len): transversals[i] = dict(_orbit_transversal(n, strong_gens_distr[i], base[i], pairs=True)) orbs[i] = list(transversals[i].keys()) # initialize the number of consecutive elements sifted c = 0 # start sifting random elements while the number of consecutive sifts # is less than consec_succ while c < consec_succ: if _random_prec is None: g = self.random_pr() else: g = _random_prec['g'].pop() h, j = _strip(g, base, orbs, transversals) y = True # determine whether a new base point is needed if j <= base_len: y = False elif not h.is_Identity: y = False moved = 0 while h(moved) == moved: moved += 1 base.append(moved) base_len += 1 strong_gens_distr.append([]) # if the element doesn't sift, amend the strong generators and # associated stabilizers and orbits if y is False: for l in range(1, j): strong_gens_distr[l].append(h) transversals[l] = dict(_orbit_transversal(n, strong_gens_distr[l], base[l], pairs=True)) orbs[l] = list(transversals[l].keys()) c = 0 else: c += 1 # build the strong generating set strong_gens = strong_gens_distr[0][:] for gen in strong_gens_distr[1]: if gen not in strong_gens: strong_gens.append(gen) return base, strong_gens def schreier_vector(self, alpha): """Computes the schreier vector for ``alpha``. The Schreier vector efficiently stores information about the orbit of ``alpha``. It can later be used to quickly obtain elements of the group that send ``alpha`` to a particular element in the orbit. Notice that the Schreier vector depends on the order in which the group generators are listed. For a definition, see [3]. Since list indices start from zero, we adopt the convention to use "None" instead of 0 to signify that an element doesn't belong to the orbit. For the algorithm and its correctness, see [2], pp.78-80. Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.permutations import Permutation >>> a = Permutation([2, 4, 6, 3, 1, 5, 0]) >>> b = Permutation([0, 1, 3, 5, 4, 6, 2]) >>> G = PermutationGroup([a, b]) >>> G.schreier_vector(0) [-1, None, 0, 1, None, 1, 0] See Also ======== orbit """ n = self.degree v = [None]*n v[alpha] = -1 orb = [alpha] used = [False]*n used[alpha] = True gens = self.generators r = len(gens) for b in orb: for i in range(r): temp = gens[i]._array_form[b] if used[temp] is False: orb.append(temp) used[temp] = True v[temp] = i return v def stabilizer(self, alpha): r"""Return the stabilizer subgroup of ``alpha``. The stabilizer of `\alpha` is the group `G_\alpha = \{g \in G | g(\alpha) = \alpha\}`. For a proof of correctness, see [1], p.79. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> G = DihedralGroup(6) >>> G.stabilizer(5) PermutationGroup([ (5)(0 4)(1 3)]) See Also ======== orbit """ return PermGroup(_stabilizer(self._degree, self._generators, alpha)) @property def strong_gens(self): r"""Return a strong generating set from the Schreier-Sims algorithm. A generating set `S = \{g_1, g_2, ..., g_t\}` for a permutation group `G` is a strong generating set relative to the sequence of points (referred to as a "base") `(b_1, b_2, ..., b_k)` if, for `1 \leq i \leq k` we have that the intersection of the pointwise stabilizer `G^{(i+1)} := G_{b_1, b_2, ..., b_i}` with `S` generates the pointwise stabilizer `G^{(i+1)}`. The concepts of a base and strong generating set and their applications are discussed in depth in [1], pp. 87-89 and [2], pp. 55-57. Examples ======== >>> from sympy.combinatorics.named_groups import DihedralGroup >>> D = DihedralGroup(4) >>> D.strong_gens [(0 1 2 3), (0 3)(1 2), (1 3)] >>> D.base [0, 1] See Also ======== base, basic_transversals, basic_orbits, basic_stabilizers """ if self._strong_gens == []: self.schreier_sims() return self._strong_gens def subgroup(self, gens): """ Return the subgroup generated by `gens` which is a list of elements of the group """ if not all([g in self for g in gens]): raise ValueError("The group doesn't contain the supplied generators") G = PermutationGroup(gens) return G def subgroup_search(self, prop, base=None, strong_gens=None, tests=None, init_subgroup=None): """Find the subgroup of all elements satisfying the property ``prop``. This is done by a depth-first search with respect to base images that uses several tests to prune the search tree. Parameters ========== prop The property to be used. Has to be callable on group elements and always return ``True`` or ``False``. It is assumed that all group elements satisfying ``prop`` indeed form a subgroup. base A base for the supergroup. strong_gens A strong generating set for the supergroup. tests A list of callables of length equal to the length of ``base``. These are used to rule out group elements by partial base images, so that ``tests[l](g)`` returns False if the element ``g`` is known not to satisfy prop base on where g sends the first ``l + 1`` base points. init_subgroup if a subgroup of the sought group is known in advance, it can be passed to the function as this parameter. Returns ======= res The subgroup of all elements satisfying ``prop``. The generating set for this group is guaranteed to be a strong generating set relative to the base ``base``. Examples ======== >>> from sympy.combinatorics.named_groups import (SymmetricGroup, ... AlternatingGroup) >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.testutil import _verify_bsgs >>> S = SymmetricGroup(7) >>> prop_even = lambda x: x.is_even >>> base, strong_gens = S.schreier_sims_incremental() >>> G = S.subgroup_search(prop_even, base=base, strong_gens=strong_gens) >>> G.is_subgroup(AlternatingGroup(7)) True >>> _verify_bsgs(G, base, G.generators) True Notes ===== This function is extremely lengthy and complicated and will require some careful attention. The implementation is described in [1], pp. 114-117, and the comments for the code here follow the lines of the pseudocode in the book for clarity. The complexity is exponential in general, since the search process by itself visits all members of the supergroup. However, there are a lot of tests which are used to prune the search tree, and users can define their own tests via the ``tests`` parameter, so in practice, and for some computations, it's not terrible. A crucial part in the procedure is the frequent base change performed (this is line 11 in the pseudocode) in order to obtain a new basic stabilizer. The book mentiones that this can be done by using ``.baseswap(...)``, however the current implementation uses a more straightforward way to find the next basic stabilizer - calling the function ``.stabilizer(...)`` on the previous basic stabilizer. """ # initialize BSGS and basic group properties def get_reps(orbits): # get the minimal element in the base ordering return [min(orbit, key = lambda x: base_ordering[x]) \ for orbit in orbits] def update_nu(l): temp_index = len(basic_orbits[l]) + 1 -\ len(res_basic_orbits_init_base[l]) # this corresponds to the element larger than all points if temp_index >= len(sorted_orbits[l]): nu[l] = base_ordering[degree] else: nu[l] = sorted_orbits[l][temp_index] if base is None: base, strong_gens = self.schreier_sims_incremental() base_len = len(base) degree = self.degree identity = _af_new(list(range(degree))) base_ordering = _base_ordering(base, degree) # add an element larger than all points base_ordering.append(degree) # add an element smaller than all points base_ordering.append(-1) # compute BSGS-related structures strong_gens_distr = _distribute_gens_by_base(base, strong_gens) basic_orbits, transversals = _orbits_transversals_from_bsgs(base, strong_gens_distr) # handle subgroup initialization and tests if init_subgroup is None: init_subgroup = PermutationGroup([identity]) if tests is None: trivial_test = lambda x: True tests = [] for i in range(base_len): tests.append(trivial_test) # line 1: more initializations. res = init_subgroup f = base_len - 1 l = base_len - 1 # line 2: set the base for K to the base for G res_base = base[:] # line 3: compute BSGS and related structures for K res_base, res_strong_gens = res.schreier_sims_incremental( base=res_base) res_strong_gens_distr = _distribute_gens_by_base(res_base, res_strong_gens) res_generators = res.generators res_basic_orbits_init_base = \ [_orbit(degree, res_strong_gens_distr[i], res_base[i])\ for i in range(base_len)] # initialize orbit representatives orbit_reps = [None]*base_len # line 4: orbit representatives for f-th basic stabilizer of K orbits = _orbits(degree, res_strong_gens_distr[f]) orbit_reps[f] = get_reps(orbits) # line 5: remove the base point from the representatives to avoid # getting the identity element as a generator for K orbit_reps[f].remove(base[f]) # line 6: more initializations c = [0]*base_len u = [identity]*base_len sorted_orbits = [None]*base_len for i in range(base_len): sorted_orbits[i] = basic_orbits[i][:] sorted_orbits[i].sort(key=lambda point: base_ordering[point]) # line 7: initializations mu = [None]*base_len nu = [None]*base_len # this corresponds to the element smaller than all points mu[l] = degree + 1 update_nu(l) # initialize computed words computed_words = [identity]*base_len # line 8: main loop while True: # apply all the tests while l < base_len - 1 and \ computed_words[l](base[l]) in orbit_reps[l] and \ base_ordering[mu[l]] < \ base_ordering[computed_words[l](base[l])] < \ base_ordering[nu[l]] and \ tests[l](computed_words): # line 11: change the (partial) base of K new_point = computed_words[l](base[l]) res_base[l] = new_point new_stab_gens = _stabilizer(degree, res_strong_gens_distr[l], new_point) res_strong_gens_distr[l + 1] = new_stab_gens # line 12: calculate minimal orbit representatives for the # l+1-th basic stabilizer orbits = _orbits(degree, new_stab_gens) orbit_reps[l + 1] = get_reps(orbits) # line 13: amend sorted orbits l += 1 temp_orbit = [computed_words[l - 1](point) for point in basic_orbits[l]] temp_orbit.sort(key=lambda point: base_ordering[point]) sorted_orbits[l] = temp_orbit # lines 14 and 15: update variables used minimality tests new_mu = degree + 1 for i in range(l): if base[l] in res_basic_orbits_init_base[i]: candidate = computed_words[i](base[i]) if base_ordering[candidate] > base_ordering[new_mu]: new_mu = candidate mu[l] = new_mu update_nu(l) # line 16: determine the new transversal element c[l] = 0 temp_point = sorted_orbits[l][c[l]] gamma = computed_words[l - 1]._array_form.index(temp_point) u[l] = transversals[l][gamma] # update computed words computed_words[l] = rmul(computed_words[l - 1], u[l]) # lines 17 & 18: apply the tests to the group element found g = computed_words[l] temp_point = g(base[l]) if l == base_len - 1 and \ base_ordering[mu[l]] < \ base_ordering[temp_point] < base_ordering[nu[l]] and \ temp_point in orbit_reps[l] and \ tests[l](computed_words) and \ prop(g): # line 19: reset the base of K res_generators.append(g) res_base = base[:] # line 20: recalculate basic orbits (and transversals) res_strong_gens.append(g) res_strong_gens_distr = _distribute_gens_by_base(res_base, res_strong_gens) res_basic_orbits_init_base = \ [_orbit(degree, res_strong_gens_distr[i], res_base[i]) \ for i in range(base_len)] # line 21: recalculate orbit representatives # line 22: reset the search depth orbit_reps[f] = get_reps(orbits) l = f # line 23: go up the tree until in the first branch not fully # searched while l >= 0 and c[l] == len(basic_orbits[l]) - 1: l = l - 1 # line 24: if the entire tree is traversed, return K if l == -1: return PermutationGroup(res_generators) # lines 25-27: update orbit representatives if l < f: # line 26 f = l c[l] = 0 # line 27 temp_orbits = _orbits(degree, res_strong_gens_distr[f]) orbit_reps[f] = get_reps(temp_orbits) # line 28: update variables used for minimality testing mu[l] = degree + 1 temp_index = len(basic_orbits[l]) + 1 - \ len(res_basic_orbits_init_base[l]) if temp_index >= len(sorted_orbits[l]): nu[l] = base_ordering[degree] else: nu[l] = sorted_orbits[l][temp_index] # line 29: set the next element from the current branch and update # accordingly c[l] += 1 if l == 0: gamma = sorted_orbits[l][c[l]] else: gamma = computed_words[l - 1]._array_form.index(sorted_orbits[l][c[l]]) u[l] = transversals[l][gamma] if l == 0: computed_words[l] = u[l] else: computed_words[l] = rmul(computed_words[l - 1], u[l]) @property def transitivity_degree(self): r"""Compute the degree of transitivity of the group. A permutation group `G` acting on `\Omega = \{0, 1, ..., n-1\}` is ``k``-fold transitive, if, for any k points `(a_1, a_2, ..., a_k)\in\Omega` and any k points `(b_1, b_2, ..., b_k)\in\Omega` there exists `g\in G` such that `g(a_1)=b_1, g(a_2)=b_2, ..., g(a_k)=b_k` The degree of transitivity of `G` is the maximum ``k`` such that `G` is ``k``-fold transitive. ([8]) Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.permutations import Permutation >>> a = Permutation([1, 2, 0]) >>> b = Permutation([1, 0, 2]) >>> G = PermutationGroup([a, b]) >>> G.transitivity_degree 3 See Also ======== is_transitive, orbit """ if self._transitivity_degree is None: n = self.degree G = self # if G is k-transitive, a tuple (a_0,..,a_k) # can be brought to (b_0,...,b_(k-1), b_k) # where b_0,...,b_(k-1) are fixed points; # consider the group G_k which stabilizes b_0,...,b_(k-1) # if G_k is transitive on the subset excluding b_0,...,b_(k-1) # then G is (k+1)-transitive for i in range(n): orb = G.orbit((i)) if len(orb) != n - i: self._transitivity_degree = i return i G = G.stabilizer(i) self._transitivity_degree = n return n else: return self._transitivity_degree def _p_elements_group(G, p): ''' For an abelian p-group G return the subgroup consisting of all elements of order p (and the identity) ''' gens = G.generators[:] gens = sorted(gens, key=lambda x: x.order(), reverse=True) gens_p = [g**(g.order()/p) for g in gens] gens_r = [] for i in range(len(gens)): x = gens[i] x_order = x.order() # x_p has order p x_p = x**(x_order/p) if i > 0: P = PermutationGroup(gens_p[:i]) else: P = PermutationGroup(G.identity) if x**(x_order/p) not in P: gens_r.append(x**(x_order/p)) else: # replace x by an element of order (x.order()/p) # so that gens still generates G g = P.generator_product(x_p, original=True) for s in g: x = x*s**-1 x_order = x_order/p # insert x to gens so that the sorting is preserved del gens[i] del gens_p[i] j = i - 1 while j < len(gens) and gens[j].order() >= x_order: j += 1 gens = gens[:j] + [x] + gens[j:] gens_p = gens_p[:j] + [x] + gens_p[j:] return PermutationGroup(gens_r) def _sylow_alt_sym(self, p): ''' Return a p-Sylow subgroup of a symmetric or an alternating group. The algorithm for this is hinted at in [1], Chapter 4, Exercise 4. For Sym(n) with n = p^i, the idea is as follows. Partition the interval [0..n-1] into p equal parts, each of length p^(i-1): [0..p^(i-1)-1], [p^(i-1)..2*p^(i-1)-1]...[(p-1)*p^(i-1)..p^i-1]. Find a p-Sylow subgroup of Sym(p^(i-1)) (treated as a subgroup of `self`) acting on each of the parts. Call the subgroups P_1, P_2...P_p. The generators for the subgroups P_2...P_p can be obtained from those of P_1 by applying a "shifting" permutation to them, that is, a permutation mapping [0..p^(i-1)-1] to the second part (the other parts are obtained by using the shift multiple times). The union of this permutation and the generators of P_1 is a p-Sylow subgroup of `self`. For n not equal to a power of p, partition [0..n-1] in accordance with how n would be written in base p. E.g. for p=2 and n=11, 11 = 2^3 + 2^2 + 1 so the partition is [[0..7], [8..9], {10}]. To generate a p-Sylow subgroup, take the union of the generators for each of the parts. For the above example, {(0 1), (0 2)(1 3), (0 4), (1 5)(2 7)} from the first part, {(8 9)} from the second part and nothing from the third. This gives 4 generators in total, and the subgroup they generate is p-Sylow. Alternating groups are treated the same except when p=2. In this case, (0 1)(s s+1) should be added for an appropriate s (the start of a part) for each part in the partitions. See Also ======== sylow_subgroup, is_alt_sym ''' n = self.degree gens = [] identity = Permutation(n-1) # the case of 2-sylow subgroups of alternating groups # needs special treatment alt = p == 2 and all(g.is_even for g in self.generators) # find the presentation of n in base p coeffs = [] m = n while m > 0: coeffs.append(m % p) m = m // p power = len(coeffs)-1 # for a symmetric group, gens[:i] is the generating # set for a p-Sylow subgroup on [0..p**(i-1)-1]. For # alternating groups, the same is given by gens[:2*(i-1)] for i in range(1, power+1): if i == 1 and alt: # (0 1) shouldn't be added for alternating groups continue gen = Permutation([(j + p**(i-1)) % p**i for j in range(p**i)]) gens.append(identity*gen) if alt: gen = Permutation(0, 1)*gen*Permutation(0, 1)*gen gens.append(gen) # the first point in the current part (see the algorithm # description in the docstring) start = 0 while power > 0: a = coeffs[power] # make the permutation shifting the start of the first # part ([0..p^i-1] for some i) to the current one for s in range(a): shift = Permutation() if start > 0: for i in range(p**power): shift = shift(i, start + i) if alt: gen = Permutation(0, 1)*shift*Permutation(0, 1)*shift gens.append(gen) j = 2*(power - 1) else: j = power for i, gen in enumerate(gens[:j]): if alt and i % 2 == 1: continue # shift the generator to the start of the # partition part gen = shift*gen*shift gens.append(gen) start += p**power power = power-1 return gens def sylow_subgroup(self, p): ''' Return a p-Sylow subgroup of the group. The algorithm is described in [1], Chapter 4, Section 7 Examples ======== >>> from sympy.combinatorics.named_groups import DihedralGroup >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.named_groups import AlternatingGroup >>> D = DihedralGroup(6) >>> S = D.sylow_subgroup(2) >>> S.order() 4 >>> G = SymmetricGroup(6) >>> S = G.sylow_subgroup(5) >>> S.order() 5 >>> G1 = AlternatingGroup(3) >>> G2 = AlternatingGroup(5) >>> G3 = AlternatingGroup(9) >>> S1 = G1.sylow_subgroup(3) >>> S2 = G2.sylow_subgroup(3) >>> S3 = G3.sylow_subgroup(3) >>> len1 = len(S1.lower_central_series()) >>> len2 = len(S2.lower_central_series()) >>> len3 = len(S3.lower_central_series()) >>> len1 == len2 True >>> len1 < len3 True ''' from sympy.combinatorics.homomorphisms import ( orbit_homomorphism, block_homomorphism) from sympy.ntheory.primetest import isprime if not isprime(p): raise ValueError("p must be a prime") def is_p_group(G): # check if the order of G is a power of p # and return the power m = G.order() n = 0 while m % p == 0: m = m/p n += 1 if m == 1: return True, n return False, n def _sylow_reduce(mu, nu): # reduction based on two homomorphisms # mu and nu with trivially intersecting # kernels Q = mu.image().sylow_subgroup(p) Q = mu.invert_subgroup(Q) nu = nu.restrict_to(Q) R = nu.image().sylow_subgroup(p) return nu.invert_subgroup(R) order = self.order() if order % p != 0: return PermutationGroup([self.identity]) p_group, n = is_p_group(self) if p_group: return self if self.is_alt_sym(): return PermutationGroup(self._sylow_alt_sym(p)) # if there is a non-trivial orbit with size not divisible # by p, the sylow subgroup is contained in its stabilizer # (by orbit-stabilizer theorem) orbits = self.orbits() non_p_orbits = [o for o in orbits if len(o) % p != 0 and len(o) != 1] if non_p_orbits: G = self.stabilizer(list(non_p_orbits[0]).pop()) return G.sylow_subgroup(p) if not self.is_transitive(): # apply _sylow_reduce to orbit actions orbits = sorted(orbits, key = lambda x: len(x)) omega1 = orbits.pop() omega2 = orbits[0].union(*orbits) mu = orbit_homomorphism(self, omega1) nu = orbit_homomorphism(self, omega2) return _sylow_reduce(mu, nu) blocks = self.minimal_blocks() if len(blocks) > 1: # apply _sylow_reduce to block system actions mu = block_homomorphism(self, blocks[0]) nu = block_homomorphism(self, blocks[1]) return _sylow_reduce(mu, nu) elif len(blocks) == 1: block = list(blocks)[0] if any(e != 0 for e in block): # self is imprimitive mu = block_homomorphism(self, block) if not is_p_group(mu.image())[0]: S = mu.image().sylow_subgroup(p) return mu.invert_subgroup(S).sylow_subgroup(p) # find an element of order p g = self.random() g_order = g.order() while g_order % p != 0 or g_order == 0: g = self.random() g_order = g.order() g = g**(g_order // p) if order % p**2 != 0: return PermutationGroup(g) C = self.centralizer(g) while C.order() % p**n != 0: S = C.sylow_subgroup(p) s_order = S.order() Z = S.center() P = Z._p_elements_group(p) h = P.random() C_h = self.centralizer(h) while C_h.order() % p*s_order != 0: h = P.random() C_h = self.centralizer(h) C = C_h return C.sylow_subgroup(p) def _block_verify(H, L, alpha): delta = sorted(list(H.orbit(alpha))) H_gens = H.generators # p[i] will be the number of the block # delta[i] belongs to p = [-1]*len(delta) blocks = [-1]*len(delta) B = [[]] # future list of blocks u = [0]*len(delta) # u[i] in L s.t. alpha^u[i] = B[0][i] t = L.orbit_transversal(alpha, pairs=True) for a, beta in t: B[0].append(a) i_a = delta.index(a) p[i_a] = 0 blocks[i_a] = alpha u[i_a] = beta rho = 0 m = 0 # number of blocks - 1 while rho <= m: beta = B[rho][0] for g in H_gens: d = beta^g i_d = delta.index(d) sigma = p[i_d] if sigma < 0: # define a new block m += 1 sigma = m u[i_d] = u[delta.index(beta)]*g p[i_d] = sigma rep = d blocks[i_d] = rep newb = [rep] for gamma in B[rho][1:]: i_gamma = delta.index(gamma) d = gamma^g i_d = delta.index(d) if p[i_d] < 0: u[i_d] = u[i_gamma]*g p[i_d] = sigma blocks[i_d] = rep newb.append(d) else: # B[rho] is not a block s = u[i_gamma]*g*u[i_d]**(-1) return False, s B.append(newb) else: for h in B[rho][1:]: if not h^g in B[sigma]: # B[rho] is not a block s = u[delta.index(beta)]*g*u[i_d]**(-1) return False, s rho += 1 return True, blocks def _verify(H, K, phi, z, alpha): ''' Return a list of relators `rels` in generators `gens_h` that are mapped to `H.generators` by `phi` so that given a finite presentation <gens_k | rels_k> of `K` on a subset of `gens_h` <gens_h | rels_k + rels> is a finite presentation of `H`. `H` should be generated by the union of `K.generators` and `z` (a single generator), and `H.stabilizer(alpha) == K`; `phi` is a canonical injection from a free group into a permutation group containing `H`. The algorithm is described in [1], Chapter 6. Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.homomorphisms import homomorphism >>> from sympy.combinatorics.free_groups import free_group >>> from sympy.combinatorics.fp_groups import FpGroup >>> H = PermutationGroup(Permutation(0, 2), Permutation (1, 5)) >>> K = PermutationGroup(Permutation(5)(0, 2)) >>> F = free_group("x_0 x_1")[0] >>> gens = F.generators >>> phi = homomorphism(F, H, F.generators, H.generators) >>> rels_k = [gens[0]**2] # relators for presentation of K >>> z= Permutation(1, 5) >>> check, rels_h = H._verify(K, phi, z, 1) >>> check True >>> rels = rels_k + rels_h >>> G = FpGroup(F, rels) # presentation of H >>> G.order() == H.order() True See also ======== strong_presentation, presentation, stabilizer ''' orbit = H.orbit(alpha) beta = alpha^(z**-1) K_beta = K.stabilizer(beta) # orbit representatives of K_beta gammas = [alpha, beta] orbits = list(set(tuple(K_beta.orbit(o)) for o in orbit)) orbit_reps = [orb[0] for orb in orbits] for rep in orbit_reps: if rep not in gammas: gammas.append(rep) # orbit transversal of K betas = [alpha, beta] transversal = {alpha: phi.invert(H.identity), beta: phi.invert(z**-1)} for s, g in K.orbit_transversal(beta, pairs=True): if not s in transversal: transversal[s] = transversal[beta]*phi.invert(g) union = K.orbit(alpha).union(K.orbit(beta)) while (len(union) < len(orbit)): for gamma in gammas: if gamma in union: r = gamma^z if r not in union: betas.append(r) transversal[r] = transversal[gamma]*phi.invert(z) for s, g in K.orbit_transversal(r, pairs=True): if not s in transversal: transversal[s] = transversal[r]*phi.invert(g) union = union.union(K.orbit(r)) break # compute relators rels = [] for b in betas: k_gens = K.stabilizer(b).generators for y in k_gens: new_rel = transversal[b] gens = K.generator_product(y, original=True) for g in gens[::-1]: new_rel = new_rel*phi.invert(g) new_rel = new_rel*transversal[b]**-1 perm = phi(new_rel) try: gens = K.generator_product(perm, original=True) except ValueError: return False, perm for g in gens: new_rel = new_rel*phi.invert(g)**-1 if new_rel not in rels: rels.append(new_rel) for gamma in gammas: new_rel = transversal[gamma]*phi.invert(z)*transversal[gamma^z]**-1 perm = phi(new_rel) try: gens = K.generator_product(perm, original=True) except ValueError: return False, perm for g in gens: new_rel = new_rel*phi.invert(g)**-1 if new_rel not in rels: rels.append(new_rel) return True, rels def strong_presentation(G): ''' Return a strong finite presentation of `G`. The generators of the returned group are in the same order as the strong generators of `G`. The algorithm is based on Sims' Verify algorithm described in [1], Chapter 6. Examples ======== >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.named_groups import DihedralGroup >>> P = DihedralGroup(4) >>> G = P.strong_presentation() >>> P.order() == G.order() True See Also ======== presentation, _verify ''' from sympy.combinatorics.fp_groups import (FpGroup, simplify_presentation) from sympy.combinatorics.free_groups import free_group from sympy.combinatorics.homomorphisms import (block_homomorphism, homomorphism, GroupHomomorphism) strong_gens = G.strong_gens[:] stabs = G.basic_stabilizers[:] base = G.base[:] # injection from a free group on len(strong_gens) # generators into G gen_syms = [('x_%d'%i) for i in range(len(strong_gens))] F = free_group(', '.join(gen_syms))[0] phi = homomorphism(F, G, F.generators, strong_gens) H = PermutationGroup(G.identity) while stabs: alpha = base.pop() K = H H = stabs.pop() new_gens = [g for g in H.generators if g not in K] if K.order() == 1: z = new_gens.pop() rels = [F.generators[-1]**z.order()] intermediate_gens = [z] K = PermutationGroup(intermediate_gens) # add generators one at a time building up from K to H while new_gens: z = new_gens.pop() intermediate_gens = [z] + intermediate_gens K_s = PermutationGroup(intermediate_gens) orbit = K_s.orbit(alpha) orbit_k = K.orbit(alpha) # split into cases based on the orbit of K_s if orbit_k == orbit: if z in K: rel = phi.invert(z) perm = z else: t = K.orbit_rep(alpha, alpha^z) rel = phi.invert(z)*phi.invert(t)**-1 perm = z*t**-1 for g in K.generator_product(perm, original=True): rel = rel*phi.invert(g)**-1 new_rels = [rel] elif len(orbit_k) == 1: # `success` is always true because `strong_gens` # and `base` are already a verified BSGS. Later # this could be changed to start with a randomly # generated (potential) BSGS, and then new elements # would have to be appended to it when `success` # is false. success, new_rels = K_s._verify(K, phi, z, alpha) else: # K.orbit(alpha) should be a block # under the action of K_s on K_s.orbit(alpha) check, block = K_s._block_verify(K, alpha) if check: # apply _verify to the action of K_s # on the block system; for convenience, # add the blocks as additional points # that K_s should act on t = block_homomorphism(K_s, block) m = t.codomain.degree # number of blocks d = K_s.degree # conjugating with p will shift # permutations in t.image() to # higher numbers, e.g. # p*(0 1)*p = (m m+1) p = Permutation() for i in range(m): p *= Permutation(i, i+d) t_img = t.images # combine generators of K_s with their # action on the block system images = {g: g*p*t_img[g]*p for g in t_img} for g in G.strong_gens[:-len(K_s.generators)]: images[g] = g K_s_act = PermutationGroup(list(images.values())) f = GroupHomomorphism(G, K_s_act, images) K_act = PermutationGroup([f(g) for g in K.generators]) success, new_rels = K_s_act._verify(K_act, f.compose(phi), f(z), d) for n in new_rels: if not n in rels: rels.append(n) K = K_s group = FpGroup(F, rels) return simplify_presentation(group) def presentation(G, eliminate_gens=True): ''' Return an `FpGroup` presentation of the group. The algorithm is described in [1], Chapter 6.1. ''' from sympy.combinatorics.fp_groups import (FpGroup, simplify_presentation) from sympy.combinatorics.coset_table import CosetTable from sympy.combinatorics.free_groups import free_group from sympy.combinatorics.homomorphisms import homomorphism from itertools import product if G._fp_presentation: return G._fp_presentation if G._fp_presentation: return G._fp_presentation def _factor_group_by_rels(G, rels): if isinstance(G, FpGroup): rels.extend(G.relators) return FpGroup(G.free_group, list(set(rels))) return FpGroup(G, rels) gens = G.generators len_g = len(gens) if len_g == 1: order = gens[0].order() # handle the trivial group if order == 1: return free_group([])[0] F, x = free_group('x') return FpGroup(F, [x**order]) if G.order() > 20: half_gens = G.generators[0:(len_g+1)//2] else: half_gens = [] H = PermutationGroup(half_gens) H_p = H.presentation() len_h = len(H_p.generators) C = G.coset_table(H) n = len(C) # subgroup index gen_syms = [('x_%d'%i) for i in range(len(gens))] F = free_group(', '.join(gen_syms))[0] # mapping generators of H_p to those of F images = [F.generators[i] for i in range(len_h)] R = homomorphism(H_p, F, H_p.generators, images, check=False) # rewrite relators rels = R(H_p.relators) G_p = FpGroup(F, rels) # injective homomorphism from G_p into G T = homomorphism(G_p, G, G_p.generators, gens) C_p = CosetTable(G_p, []) C_p.table = [[None]*(2*len_g) for i in range(n)] # initiate the coset transversal transversal = [None]*n transversal[0] = G_p.identity # fill in the coset table as much as possible for i in range(2*len_h): C_p.table[0][i] = 0 gamma = 1 for alpha, x in product(range(0, n), range(2*len_g)): beta = C[alpha][x] if beta == gamma: gen = G_p.generators[x//2]**((-1)**(x % 2)) transversal[beta] = transversal[alpha]*gen C_p.table[alpha][x] = beta C_p.table[beta][x + (-1)**(x % 2)] = alpha gamma += 1 if gamma == n: break C_p.p = list(range(n)) beta = x = 0 while not C_p.is_complete(): # find the first undefined entry while C_p.table[beta][x] == C[beta][x]: x = (x + 1) % (2*len_g) if x == 0: beta = (beta + 1) % n # define a new relator gen = G_p.generators[x//2]**((-1)**(x % 2)) new_rel = transversal[beta]*gen*transversal[C[beta][x]]**-1 perm = T(new_rel) next = G_p.identity for s in H.generator_product(perm, original=True): next = next*T.invert(s)**-1 new_rel = new_rel*next # continue coset enumeration G_p = _factor_group_by_rels(G_p, [new_rel]) C_p.scan_and_fill(0, new_rel) C_p = G_p.coset_enumeration([], strategy="coset_table", draft=C_p, max_cosets=n, incomplete=True) G._fp_presentation = simplify_presentation(G_p) return G._fp_presentation def polycyclic_group(self): from sympy.combinatorics.pc_groups import PolycyclicGroup if not self.is_polycyclic: raise ValueError("The group must be solvable") der = self.derived_series() pc_series = [] pc_sequence = [] relative_order = [] pc_series.append(der[-1]) der.reverse() for i in range(len(der)-1): H = der[i] for g in der[i+1].generators: if g not in H: H = PermutationGroup([g] + H.generators) pc_series.insert(0, H) pc_sequence.insert(0, g) G1 = pc_series[0].order() G2 = pc_series[1].order() relative_order.insert(0, G1 // G2) return PolycyclicGroup(pc_sequence, pc_series, relative_order, collector=None) def _orbit(degree, generators, alpha, action='tuples'): r"""Compute the orbit of alpha `\{g(\alpha) | g \in G\}` as a set. The time complexity of the algorithm used here is `O(|Orb|*r)` where `|Orb|` is the size of the orbit and ``r`` is the number of generators of the group. For a more detailed analysis, see [1], p.78, [2], pp. 19-21. Here alpha can be a single point, or a list of points. If alpha is a single point, the ordinary orbit is computed. if alpha is a list of points, there are three available options: 'union' - computes the union of the orbits of the points in the list 'tuples' - computes the orbit of the list interpreted as an ordered tuple under the group action ( i.e., g((1, 2, 3)) = (g(1), g(2), g(3)) ) 'sets' - computes the orbit of the list interpreted as a sets Examples ======== >>> from sympy.combinatorics import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup, _orbit >>> a = Permutation([1, 2, 0, 4, 5, 6, 3]) >>> G = PermutationGroup([a]) >>> _orbit(G.degree, G.generators, 0) {0, 1, 2} >>> _orbit(G.degree, G.generators, [0, 4], 'union') {0, 1, 2, 3, 4, 5, 6} See Also ======== orbit, orbit_transversal """ if not hasattr(alpha, '__getitem__'): alpha = [alpha] gens = [x._array_form for x in generators] if len(alpha) == 1 or action == 'union': orb = alpha used = [False]*degree for el in alpha: used[el] = True for b in orb: for gen in gens: temp = gen[b] if used[temp] == False: orb.append(temp) used[temp] = True return set(orb) elif action == 'tuples': alpha = tuple(alpha) orb = [alpha] used = {alpha} for b in orb: for gen in gens: temp = tuple([gen[x] for x in b]) if temp not in used: orb.append(temp) used.add(temp) return set(orb) elif action == 'sets': alpha = frozenset(alpha) orb = [alpha] used = {alpha} for b in orb: for gen in gens: temp = frozenset([gen[x] for x in b]) if temp not in used: orb.append(temp) used.add(temp) return {tuple(x) for x in orb} def _orbits(degree, generators): """Compute the orbits of G. If ``rep=False`` it returns a list of sets else it returns a list of representatives of the orbits Examples ======== >>> from sympy.combinatorics.permutations import Permutation >>> from sympy.combinatorics.perm_groups import PermutationGroup, _orbits >>> a = Permutation([0, 2, 1]) >>> b = Permutation([1, 0, 2]) >>> _orbits(a.size, [a, b]) [{0, 1, 2}] """ orbs = [] sorted_I = list(range(degree)) I = set(sorted_I) while I: i = sorted_I[0] orb = _orbit(degree, generators, i) orbs.append(orb) # remove all indices that are in this orbit I -= orb sorted_I = [i for i in sorted_I if i not in orb] return orbs def _orbit_transversal(degree, generators, alpha, pairs, af=False, slp=False): r"""Computes a transversal for the orbit of ``alpha`` as a set. generators generators of the group ``G`` For a permutation group ``G``, a transversal for the orbit `Orb = \{g(\alpha) | g \in G\}` is a set `\{g_\beta | g_\beta(\alpha) = \beta\}` for `\beta \in Orb`. Note that there may be more than one possible transversal. If ``pairs`` is set to ``True``, it returns the list of pairs `(\beta, g_\beta)`. For a proof of correctness, see [1], p.79 if ``af`` is ``True``, the transversal elements are given in array form. If `slp` is `True`, a dictionary `{beta: slp_beta}` is returned for `\beta \in Orb` where `slp_beta` is a list of indices of the generators in `generators` s.t. if `slp_beta = [i_1 ... i_n]` `g_\beta = generators[i_n]*...*generators[i_1]`. Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.named_groups import DihedralGroup >>> from sympy.combinatorics.perm_groups import _orbit_transversal >>> G = DihedralGroup(6) >>> _orbit_transversal(G.degree, G.generators, 0, False) [(5), (0 1 2 3 4 5), (0 5)(1 4)(2 3), (0 2 4)(1 3 5), (5)(0 4)(1 3), (0 3)(1 4)(2 5)] """ tr = [(alpha, list(range(degree)))] slp_dict = {alpha: []} used = [False]*degree used[alpha] = True gens = [x._array_form for x in generators] for x, px in tr: px_slp = slp_dict[x] for gen in gens: temp = gen[x] if used[temp] == False: slp_dict[temp] = [gens.index(gen)] + px_slp tr.append((temp, _af_rmul(gen, px))) used[temp] = True if pairs: if not af: tr = [(x, _af_new(y)) for x, y in tr] if not slp: return tr return tr, slp_dict if af: tr = [y for _, y in tr] if not slp: return tr return tr, slp_dict tr = [_af_new(y) for _, y in tr] if not slp: return tr return tr, slp_dict def _stabilizer(degree, generators, alpha): r"""Return the stabilizer subgroup of ``alpha``. The stabilizer of `\alpha` is the group `G_\alpha = \{g \in G | g(\alpha) = \alpha\}`. For a proof of correctness, see [1], p.79. degree : degree of G generators : generators of G Examples ======== >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> from sympy.combinatorics.perm_groups import _stabilizer >>> from sympy.combinatorics.named_groups import DihedralGroup >>> G = DihedralGroup(6) >>> _stabilizer(G.degree, G.generators, 5) [(5)(0 4)(1 3), (5)] See Also ======== orbit """ orb = [alpha] table = {alpha: list(range(degree))} table_inv = {alpha: list(range(degree))} used = [False]*degree used[alpha] = True gens = [x._array_form for x in generators] stab_gens = [] for b in orb: for gen in gens: temp = gen[b] if used[temp] is False: gen_temp = _af_rmul(gen, table[b]) orb.append(temp) table[temp] = gen_temp table_inv[temp] = _af_invert(gen_temp) used[temp] = True else: schreier_gen = _af_rmuln(table_inv[temp], gen, table[b]) if schreier_gen not in stab_gens: stab_gens.append(schreier_gen) return [_af_new(x) for x in stab_gens] PermGroup = PermutationGroup

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from __future__ import print_function, division from sympy.combinatorics.rewritingsystem_fsm import StateMachine class RewritingSystem(object): ''' A class implementing rewriting systems for `FpGroup`s. References ========== .. [1] Epstein, D., Holt, D. and Rees, S. (1991). The use of Knuth-Bendix methods to solve the word problem in automatic groups. Journal of Symbolic Computation, 12(4-5), pp.397-414. .. [2] GAP's Manual on its KBMAG package https://www.gap-system.org/Manuals/pkg/kbmag-1.5.3/doc/manual.pdf ''' def __init__(self, group): from collections import deque self.group = group self.alphabet = group.generators self._is_confluent = None # these values are taken from [2] self.maxeqns = 32767 # max rules self.tidyint = 100 # rules before tidying # _max_exceeded is True if maxeqns is exceeded # at any point self._max_exceeded = False # Reduction automaton self.reduction_automaton = None self._new_rules = {} # dictionary of reductions self.rules = {} self.rules_cache = deque([], 50) self._init_rules() # All the transition symbols in the automaton generators = list(self.alphabet) generators += [gen**-1 for gen in generators] # Create a finite state machine as an instance of the StateMachine object self.reduction_automaton = StateMachine('Reduction automaton for '+ repr(self.group), generators) self.construct_automaton() def set_max(self, n): ''' Set the maximum number of rules that can be defined ''' if n > self.maxeqns: self._max_exceeded = False self.maxeqns = n return @property def is_confluent(self): ''' Return `True` if the system is confluent ''' if self._is_confluent is None: self._is_confluent = self._check_confluence() return self._is_confluent def _init_rules(self): identity = self.group.free_group.identity for r in self.group.relators: self.add_rule(r, identity) self._remove_redundancies() return def _add_rule(self, r1, r2): ''' Add the rule r1 -> r2 with no checking or further deductions ''' if len(self.rules) + 1 > self.maxeqns: self._is_confluent = self._check_confluence() self._max_exceeded = True raise RuntimeError("Too many rules were defined.") self.rules[r1] = r2 # Add the newly added rule to the `new_rules` dictionary. if self.reduction_automaton: self._new_rules[r1] = r2 def add_rule(self, w1, w2, check=False): new_keys = set() if w1 == w2: return new_keys if w1 < w2: w1, w2 = w2, w1 if (w1, w2) in self.rules_cache: return new_keys self.rules_cache.append((w1, w2)) s1, s2 = w1, w2 # The following is the equivalent of checking # s1 for overlaps with the implicit reductions # {g*g**-1 -> <identity>} and {g**-1*g -> <identity>} # for any generator g without installing the # redundant rules that would result from processing # the overlaps. See [1], Section 3 for details. if len(s1) - len(s2) < 3: if s1 not in self.rules: new_keys.add(s1) if not check: self._add_rule(s1, s2) if s2**-1 > s1**-1 and s2**-1 not in self.rules: new_keys.add(s2**-1) if not check: self._add_rule(s2**-1, s1**-1) # overlaps on the right while len(s1) - len(s2) > -1: g = s1[len(s1)-1] s1 = s1.subword(0, len(s1)-1) s2 = s2*g**-1 if len(s1) - len(s2) < 0: if s2 not in self.rules: if not check: self._add_rule(s2, s1) new_keys.add(s2) elif len(s1) - len(s2) < 3: new = self.add_rule(s1, s2, check) new_keys.update(new) # overlaps on the left while len(w1) - len(w2) > -1: g = w1[0] w1 = w1.subword(1, len(w1)) w2 = g**-1*w2 if len(w1) - len(w2) < 0: if w2 not in self.rules: if not check: self._add_rule(w2, w1) new_keys.add(w2) elif len(w1) - len(w2) < 3: new = self.add_rule(w1, w2, check) new_keys.update(new) return new_keys def _remove_redundancies(self, changes=False): ''' Reduce left- and right-hand sides of reduction rules and remove redundant equations (i.e. those for which lhs == rhs). If `changes` is `True`, return a set containing the removed keys and a set containing the added keys ''' removed = set() added = set() rules = self.rules.copy() for r in rules: v = self.reduce(r, exclude=r) w = self.reduce(rules[r]) if v != r: del self.rules[r] removed.add(r) if v > w: added.add(v) self.rules[v] = w elif v < w: added.add(w) self.rules[w] = v else: self.rules[v] = w if changes: return removed, added return def make_confluent(self, check=False): ''' Try to make the system confluent using the Knuth-Bendix completion algorithm ''' if self._max_exceeded: return self._is_confluent lhs = list(self.rules.keys()) def _overlaps(r1, r2): len1 = len(r1) len2 = len(r2) result = [] for j in range(1, len1 + len2): if (r1.subword(len1 - j, len1 + len2 - j, strict=False) == r2.subword(j - len1, j, strict=False)): a = r1.subword(0, len1-j, strict=False) a = a*r2.subword(0, j-len1, strict=False) b = r2.subword(j-len1, j, strict=False) c = r2.subword(j, len2, strict=False) c = c*r1.subword(len1 + len2 - j, len1, strict=False) result.append(a*b*c) return result def _process_overlap(w, r1, r2, check): s = w.eliminate_word(r1, self.rules[r1]) s = self.reduce(s) t = w.eliminate_word(r2, self.rules[r2]) t = self.reduce(t) if s != t: if check: # system not confluent return [0] try: new_keys = self.add_rule(t, s, check) return new_keys except RuntimeError: return False return added = 0 i = 0 while i < len(lhs): r1 = lhs[i] i += 1 # j could be i+1 to not # check each pair twice but lhs # is extended in the loop and the new # elements have to be checked with the # preceding ones. there is probably a better way # to handle this j = 0 while j < len(lhs): r2 = lhs[j] j += 1 if r1 == r2: continue overlaps = _overlaps(r1, r2) overlaps.extend(_overlaps(r1**-1, r2)) if not overlaps: continue for w in overlaps: new_keys = _process_overlap(w, r1, r2, check) if new_keys: if check: return False lhs.extend(new_keys) added += len(new_keys) elif new_keys == False: # too many rules were added so the process # couldn't complete return self._is_confluent if added > self.tidyint and not check: # tidy up r, a = self._remove_redundancies(changes=True) added = 0 if r: # reset i since some elements were removed i = min([lhs.index(s) for s in r]) lhs = [l for l in lhs if l not in r] lhs.extend(a) if r1 in r: # r1 was removed as redundant break self._is_confluent = True if not check: self._remove_redundancies() return True def _check_confluence(self): return self.make_confluent(check=True) def reduce(self, word, exclude=None): ''' Apply reduction rules to `word` excluding the reduction rule for the lhs equal to `exclude` ''' rules = {r: self.rules[r] for r in self.rules if r != exclude} # the following is essentially `eliminate_words()` code from the # `FreeGroupElement` class, the only difference being the first # "if" statement again = True new = word while again: again = False for r in rules: prev = new if rules[r]**-1 > r**-1: new = new.eliminate_word(r, rules[r], _all=True, inverse=False) else: new = new.eliminate_word(r, rules[r], _all=True) if new != prev: again = True return new def _compute_inverse_rules(self, rules): ''' Compute the inverse rules for a given set of rules. The inverse rules are used in the automaton for word reduction. Arguments: rules (dictionary): Rules for which the inverse rules are to computed. Returns: Dictionary of inverse_rules. ''' inverse_rules = {} for r in rules: rule_key_inverse = r**-1 rule_value_inverse = (rules[r])**-1 if (rule_value_inverse < rule_key_inverse): inverse_rules[rule_key_inverse] = rule_value_inverse else: inverse_rules[rule_value_inverse] = rule_key_inverse return inverse_rules def construct_automaton(self): ''' Construct the automaton based on the set of reduction rules of the system. Automata Design: The accept states of the automaton are the proper prefixes of the left hand side of the rules. The complete left hand side of the rules are the dead states of the automaton. ''' self._add_to_automaton(self.rules) def _add_to_automaton(self, rules): ''' Add new states and transitions to the automaton. Summary: States corresponding to the new rules added to the system are computed and added to the automaton. Transitions in the previously added states are also modified if necessary. Arguments: rules (dictionary) -- Dictionary of the newly added rules. ''' # Automaton variables automaton_alphabet = [] proper_prefixes = {} # compute the inverses of all the new rules added all_rules = rules inverse_rules = self._compute_inverse_rules(all_rules) all_rules.update(inverse_rules) # Keep track of the accept_states. accept_states = [] for rule in all_rules: # The symbols present in the new rules are the symbols to be verified at each state. # computes the automaton_alphabet, as the transitions solely depend upon the new states. automaton_alphabet += rule.letter_form_elm # Compute the proper prefixes for every rule. proper_prefixes[rule] = [] letter_word_array = [s for s in rule.letter_form_elm] len_letter_word_array = len(letter_word_array) for i in range (1, len_letter_word_array): letter_word_array[i] = letter_word_array[i-1]*letter_word_array[i] # Add accept states. elem = letter_word_array[i-1] if not elem in self.reduction_automaton.states: self.reduction_automaton.add_state(elem, state_type='a') accept_states.append(elem) proper_prefixes[rule] = letter_word_array # Check for overlaps between dead and accept states. if rule in accept_states: self.reduction_automaton.states[rule].state_type = 'd' self.reduction_automaton.states[rule].rh_rule = all_rules[rule] accept_states.remove(rule) # Add dead states if not rule in self.reduction_automaton.states: self.reduction_automaton.add_state(rule, state_type='d', rh_rule=all_rules[rule]) automaton_alphabet = set(automaton_alphabet) # Add new transitions for every state. for state in self.reduction_automaton.states: current_state_name = state current_state_type = self.reduction_automaton.states[state].state_type # Transitions will be modified only when suffixes of the current_state # belongs to the proper_prefixes of the new rules. # The rest are ignored if they cannot lead to a dead state after a finite number of transisitons. if current_state_type == 's': for letter in automaton_alphabet: if letter in self.reduction_automaton.states: self.reduction_automaton.states[state].add_transition(letter, letter) else: self.reduction_automaton.states[state].add_transition(letter, current_state_name) elif current_state_type == 'a': # Check if the transition to any new state in possible. for letter in automaton_alphabet: _next = current_state_name*letter while len(_next) and _next not in self.reduction_automaton.states: _next = _next.subword(1, len(_next)) if not len(_next): _next = 'start' self.reduction_automaton.states[state].add_transition(letter, _next) # Add transitions for new states. All symbols used in the automaton are considered here. # Ignore this if `reduction_automaton.automaton_alphabet` = `automaton_alphabet`. if len(self.reduction_automaton.automaton_alphabet) != len(automaton_alphabet): for state in accept_states: current_state_name = state for letter in self.reduction_automaton.automaton_alphabet: _next = current_state_name*letter while len(_next) and _next not in self.reduction_automaton.states: _next = _next.subword(1, len(_next)) if not len(_next): _next = 'start' self.reduction_automaton.states[state].add_transition(letter, _next) def reduce_using_automaton(self, word): ''' Reduce a word using an automaton. Summary: All the symbols of the word are stored in an array and are given as the input to the automaton. If the automaton reaches a dead state that subword is replaced and the automaton is run from the beginning. The complete word has to be replaced when the word is read and the automaton reaches a dead state. So, this process is repeated until the word is read completely and the automaton reaches the accept state. Arguments: word (instance of FreeGroupElement) -- Word that needs to be reduced. ''' # Modify the automaton if new rules are found. if self._new_rules: self._add_to_automaton(self._new_rules) self._new_rules = {} flag = 1 while flag: flag = 0 current_state = self.reduction_automaton.states['start'] word_array = [s for s in word.letter_form_elm] for i in range (0, len(word_array)): next_state_name = current_state.transitions[word_array[i]] next_state = self.reduction_automaton.states[next_state_name] if next_state.state_type == 'd': subst = next_state.rh_rule word = word.substituted_word(i - len(next_state_name) + 1, i+1, subst) flag = 1 break current_state = next_state return word

14e8bbed9a2f72b7ad8958b4c2b70821f0c474fc764afa478d7ea0c879addd58

from sympy.combinatorics.permutations import Permutation, Cycle from sympy.combinatorics.prufer import Prufer from sympy.combinatorics.generators import cyclic, alternating, symmetric, dihedral from sympy.combinatorics.subsets import Subset from sympy.combinatorics.partitions import (Partition, IntegerPartition, RGS_rank, RGS_unrank, RGS_enum) from sympy.combinatorics.polyhedron import (Polyhedron, tetrahedron, cube, octahedron, dodecahedron, icosahedron) from sympy.combinatorics.perm_groups import PermutationGroup from sympy.combinatorics.group_constructs import DirectProduct from sympy.combinatorics.graycode import GrayCode from sympy.combinatorics.named_groups import (SymmetricGroup, DihedralGroup, CyclicGroup, AlternatingGroup, AbelianGroup, RubikGroup) from sympy.combinatorics.pc_groups import PolycyclicGroup, Collector

c891b895de3bbfb52ef2048401a91cf7c09f2eb67b77f8c49fb2ad2a7f98e682

from sympy.core import Basic from sympy import isprime, symbols from sympy.combinatorics.perm_groups import PermutationGroup from sympy.printing.defaults import DefaultPrinting from sympy.combinatorics.free_groups import free_group class PolycyclicGroup(DefaultPrinting): is_group = True is_solvable = True def __init__(self, pc_sequence, pc_series, relative_order, collector=None): self.pcgs = pc_sequence self.pc_series = pc_series self.relative_order = relative_order self.collector = Collector(self.pcgs, pc_series, relative_order) if not collector else collector def is_prime_order(self): return all(isprime(order) for order in self.relative_order) def length(self): return len(self.pcgs) class Collector(DefaultPrinting): """ References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of Computational Group Theory" Section 8.1.3 """ def __init__(self, pcgs, pc_series, relative_order, group=None, pc_presentation=None): self.pcgs = pcgs self.pc_series = pc_series self.relative_order = relative_order self.free_group = free_group('x:{0}'.format(len(pcgs)))[0] if not group else group self.index = {s: i for i, s in enumerate(self.free_group.symbols)} self.pc_presentation = self.pc_relators() def minimal_uncollected_subword(self, word): """ Returns the minimal uncollected subwords. A word `v` defined on generators in `X` is a minimal uncollected subword of the word `w` if `v` is a subword of `w` and it has one of the following form i) `v = x[i+1]**a_j*x[i]` ii) `v = x[i+1]**a_j*x[i]**-1` iii) `v = x[i]**a_j` for relative_order of `x[i] != infinity` and `a_j` is not in `{1, ..., s-1}`. Where, s is the power exponent of the corresponding generator. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.free_groups import free_group >>> G = SymmetricGroup(4) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> F, x1, x2 = free_group("x1, x2") >>> word = x2**2*x1**7 >>> collector.minimal_uncollected_subword(word) ((x2, 2),) """ # To handle the case word = <identity> if not word: return None array = word.array_form re = self.relative_order index = self.index for i in range(len(array)): s1, e1 = array[i] if re[index[s1]] and (e1 < 0 or e1 > re[index[s1]]-1): return ((s1, e1), ) for i in range(len(array)-1): s1, e1 = array[i] s2, e2 = array[i+1] if index[s1] > index[s2]: e = 1 if e2 > 0 else -1 return ((s1, e1), (s2, e)) return None def relations(self): """ Separates the given relators of pc presentation in power and conjugate relations. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> G = SymmetricGroup(3) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> power_rel, conj_rel = collector.relations() >>> power_rel {x0**2: (), x1**3: ()} >>> conj_rel {x0**-1*x1*x0: x1**2} """ power_relators = {} conjugate_relators = {} for key, value in self.pc_presentation.items(): if len(key.array_form) == 1: power_relators[key] = value else: conjugate_relators[key] = value return power_relators, conjugate_relators def subword_index(self, word, w): """ Returns the start and ending index of a given subword in a word. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.free_groups import free_group >>> G = SymmetricGroup(4) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> F, x1, x2 = free_group("x1, x2") >>> word = x2**2*x1**7 >>> w = x2**2*x1 >>> collector.subword_index(word, w) (0, 3) >>> w = x1**7 >>> collector.subword_index(word, w) (2, 9) """ low = -1 high = -1 for i in range(len(word)-len(w)+1): if word.subword(i, i+len(w)) == w: low = i high = i+len(w) break if low == high == -1: return -1, -1 return low, high def map_relation(self, w): """ Return a conjugate relation. Given a word formed by two free group elements, the corresponding conjugate relation with those free group elements is formed and mapped with the collected word in the polycyclic presentation. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.free_groups import free_group >>> G = SymmetricGroup(3) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> F, x0, x1 = free_group("x0, x1") >>> w = x1*x0 >>> collector.map_relation(w) x1**2 """ array = w.array_form s1 = array[0][0] s2 = array[1][0] key = ((s2, -1), (s1, 1), (s2, 1)) key = self.free_group.dtype(key) return self.pc_presentation[key] def collected_word(self, word): """ Return the collected form of a word. A word `w` is called collected, if `w = x{i_1}**a_1*...*x{i_r}**a_r` with `i_1 < i_2< ... < i_r` and `a_j` is in `{1, ..., s_j-1}` if `s_j != infinity`. Otherwise w is uncollected. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.perm_groups import PermutationGroup >>> from sympy.combinatorics.free_groups import free_group >>> G = SymmetricGroup(4) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> F, x0, x1, x2, x3 = free_group("x0, x1, x2, x3") >>> word = x3*x2*x1*x0 >>> collected_word = collector.collected_word(word) >>> free_to_perm = {} >>> free_group = collector.free_group >>> for sym, gen in zip(free_group.symbols, collector.pcgs): ... free_to_perm[sym] = gen >>> G1 = PermutationGroup() >>> for w in word: ... sym = w[0] ... perm = free_to_perm[sym] ... G1 = PermutationGroup([perm] + G1.generators) >>> G2 = PermutationGroup() >>> for w in collected_word: ... sym = w[0] ... perm = free_to_perm[sym] ... G2 = PermutationGroup([perm] + G2.generators) >>> G1 == G2 True """ free_group = self.free_group while True: w = self.minimal_uncollected_subword(word) if not w: break low, high = self.subword_index(word, free_group.dtype(w)) if low == -1: continue s1, e1 = w[0] if len(w) == 1: re = self.relative_order[self.index[s1]] q = e1 // re r = e1-q*re key = ((w[0][0], re), ) key = free_group.dtype(key) if self.pc_presentation[key]: word_ = ((w[0][0], r), (self.pc_presentation[key], q)) word_ = free_group.dtype(word_) else: if r != 0: word_ = ((w[0][0], r), ) word_ = free_group.dtype(word_) else: word_ = None word = word.eliminate_word(free_group.dtype(w), word_) if len(w) == 2 and w[1][1] > 0: s2, e2 = w[1] s2 = ((s2, 1), ) s2 = free_group.dtype(s2) word_ = self.map_relation(free_group.dtype(w)) word_ = s2*word_**e1 word_ = free_group.dtype(word_) word = word.substituted_word(low, high, word_) elif len(w) == 2 and w[1][1] < 0: s2, e2 = w[1] s2 = ((s2, 1), ) s2 = free_group.dtype(s2) word_ = self.map_relation(free_group.dtype(w)) word_ = s2**-1*word_**e1 word_ = free_group.dtype(word_) word = word.substituted_word(low, high, word_) return word def pc_relators(self): """ Return the polycyclic presentation. There are two types of relations used in polycyclic presentation. i) Power relations of the form `x{i}^re{i} = R{i}{i}`, `for 0 <= i < length(pcgs)` where `x` represents polycyclic generator and `re` is the corresponding relative order. ii) Conjugate relations of the form `x{j}^-1*x{i}*x{j}`, `for 0 <= j < i <= length(pcgs)`. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.permutations import Permutation >>> S = SymmetricGroup(49).sylow_subgroup(7) >>> der = S.derived_series() >>> G = der[len(der)-2] >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> pcgs = PcGroup.pcgs >>> len(pcgs) 6 >>> free_group = collector.free_group >>> pc_resentation = collector.pc_presentation >>> free_to_perm = {} >>> for s, g in zip(free_group.symbols, pcgs): ... free_to_perm[s] = g >>> for k, v in pc_resentation.items(): ... k_array = k.array_form ... if v != (): ... v_array = v.array_form ... lhs = Permutation() ... for gen in k_array: ... s = gen[0] ... e = gen[1] ... lhs = lhs*free_to_perm[s]**e ... if v == (): ... assert lhs.is_identity ... continue ... rhs = Permutation() ... for gen in v_array: ... s = gen[0] ... e = gen[1] ... rhs = rhs*free_to_perm[s]**e ... assert lhs == rhs """ free_group = self.free_group rel_order = self.relative_order pc_relators = {} perm_to_free = {} pcgs = self.pcgs for gen, s in zip(pcgs, free_group.generators): perm_to_free[gen**-1] = s**-1 perm_to_free[gen] = s pcgs = pcgs[::-1] series = self.pc_series[::-1] rel_order = rel_order[::-1] collected_gens = [] for i, gen in enumerate(pcgs): re = rel_order[i] relation = perm_to_free[gen]**re G = series[i] l = G.generator_product(gen**re, original = True) l.reverse() word = free_group.identity for g in l: word = word*perm_to_free[g] word = self.collected_word(word) pc_relators[relation] = word if word else () self.pc_presentation = pc_relators collected_gens.append(gen) if len(collected_gens) > 1: conj = collected_gens[len(collected_gens)-1] conjugator = perm_to_free[conj] for j in range(len(collected_gens)-1): conjugated = perm_to_free[collected_gens[j]] relation = conjugator**-1*conjugated*conjugator gens = conj**-1*collected_gens[j]*conj l = G.generator_product(gens, original = True) l.reverse() word = free_group.identity for g in l: word = word*perm_to_free[g] word = self.collected_word(word) pc_relators[relation] = word if word else () self.pc_presentation = pc_relators return pc_relators def exponent_vector(self, element): """ Return the exponent vector of length equal to the length of polycyclic generating sequence. For a given generator/element `g` of the polycyclic group, it can be represented as `g = x{1}**e{1}....x{n}**e{n}`, where `x{i}` represents polycyclic generators and `n` is the number of generators in the free_group equal to the length of pcgs. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> from sympy.combinatorics.permutations import Permutation >>> G = SymmetricGroup(4) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> pcgs = PcGroup.pcgs >>> collector.exponent_vector(G[0]) [1, 0, 0, 0] >>> exp = collector.exponent_vector(G[1]) >>> g = Permutation() >>> for i in range(len(exp)): ... g = g*pcgs[i]**exp[i] if exp[i] else g >>> assert g == G[1] References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of Computational Group Theory" Section 8.1.1, Definition 8.4 """ free_group = self.free_group G = PermutationGroup() for g in self.pcgs: G = PermutationGroup([g] + G.generators) gens = G.generator_product(element, original = True) gens.reverse() perm_to_free = {} for sym, g in zip(free_group.generators, self.pcgs): perm_to_free[g**-1] = sym**-1 perm_to_free[g] = sym w = free_group.identity for g in gens: w = w*perm_to_free[g] pc_presentation = self.pc_presentation word = self.collected_word(w) index = self.index exp_vector = [0]*len(free_group) word = word.array_form for t in word: exp_vector[index[t[0]]] = t[1] return exp_vector def depth(self, element): """ Return the depth of a given element. The depth of a given element `g` is defined by `dep{g} = i if e{1} = e{2} = ... = e{i-1} = 0` and `e{i} != 0`, where `e` represents the exponent-vector. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> G = SymmetricGroup(3) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> collector.depth(G[0]) 2 >>> collector.depth(G[1]) 1 References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of Computational Group Theory" Section 8.1.1, Definition 8.5 """ exp_vector = self.exponent_vector(element) return next((i+1 for i, x in enumerate(exp_vector) if x), len(self.pcgs)+1) def leading_exponent(self, element): """ Return the leading non-zero exponent. The leading exponent for a given element `g` is defined by `leading_exponent{g} = e{i}`, if `depth{g} = i`. Examples ======== >>> from sympy.combinatorics.named_groups import SymmetricGroup >>> G = SymmetricGroup(3) >>> PcGroup = G.polycyclic_group() >>> collector = PcGroup.collector >>> collector.leading_exponent(G[1]) 1 """ exp_vector = self.exponent_vector(element) depth = self.depth(element) if depth != len(self.pcgs)+1: return exp_vector[depth-1] return None

31cf4f67f4550f64f6f51aa4f6a1862819dc2d6c4f08af8883c6b8090e8c7d1b

from __future__ import print_function, division from sympy.combinatorics.free_groups import free_group from sympy.printing.defaults import DefaultPrinting from itertools import chain, product from bisect import bisect_left ############################################################################### # COSET TABLE # ############################################################################### class CosetTable(DefaultPrinting): # coset_table: Mathematically a coset table # represented using a list of lists # alpha: Mathematically a coset (precisely, a live coset) # represented by an integer between i with 1 <= i <= n # alpha in c # x: Mathematically an element of "A" (set of generators and # their inverses), represented using "FpGroupElement" # fp_grp: Finitely Presented Group with < X|R > as presentation. # H: subgroup of fp_grp. # NOTE: We start with H as being only a list of words in generators # of "fp_grp". Since `.subgroup` method has not been implemented. r""" Properties ========== [1] `0 \in \Omega` and `\tau(1) = \epsilon` [2] `\alpha^x = \beta \Leftrightarrow \beta^{x^{-1}} = \alpha` [3] If `\alpha^x = \beta`, then `H \tau(\alpha)x = H \tau(\beta)` [4] `\forall \alpha \in \Omega, 1^{\tau(\alpha)} = \alpha` References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of Computational Group Theory" .. [2] John J. Cannon; Lucien A. Dimino; George Havas; Jane M. Watson Mathematics of Computation, Vol. 27, No. 123. (Jul., 1973), pp. 463-490. "Implementation and Analysis of the Todd-Coxeter Algorithm" """ # default limit for the number of cosets allowed in a # coset enumeration. coset_table_max_limit = 4096000 # limit for the current instance coset_table_limit = None # maximum size of deduction stack above or equal to # which it is emptied max_stack_size = 100 def __init__(self, fp_grp, subgroup, max_cosets=None): if not max_cosets: max_cosets = CosetTable.coset_table_max_limit self.fp_group = fp_grp self.subgroup = subgroup self.coset_table_limit = max_cosets # "p" is setup independent of Omega and n self.p = [0] # a list of the form `[gen_1, gen_1^{-1}, ... , gen_k, gen_k^{-1}]` self.A = list(chain.from_iterable((gen, gen**-1) \ for gen in self.fp_group.generators)) #P[alpha, x] Only defined when alpha^x is defined. self.P = [[None]*len(self.A)] # the mathematical coset table which is a list of lists self.table = [[None]*len(self.A)] self.A_dict = {x: self.A.index(x) for x in self.A} self.A_dict_inv = {} for x, index in self.A_dict.items(): if index % 2 == 0: self.A_dict_inv[x] = self.A_dict[x] + 1 else: self.A_dict_inv[x] = self.A_dict[x] - 1 # used in the coset-table based method of coset enumeration. Each of # the element is called a "deduction" which is the form (alpha, x) whenever # a value is assigned to alpha^x during a definition or "deduction process" self.deduction_stack = [] # Attributes for modified methods. H = self.subgroup self._grp = free_group(', ' .join(["a_%d" % i for i in range(len(H))]))[0] self.P = [[None]*len(self.A)] self.p_p = {} @property def omega(self): """Set of live cosets. """ return [coset for coset in range(len(self.p)) if self.p[coset] == coset] def copy(self): """ Return a shallow copy of Coset Table instance ``self``. """ self_copy = self.__class__(self.fp_group, self.subgroup) self_copy.table = [list(perm_rep) for perm_rep in self.table] self_copy.p = list(self.p) self_copy.deduction_stack = list(self.deduction_stack) return self_copy def __str__(self): return "Coset Table on %s with %s as subgroup generators" \ % (self.fp_group, self.subgroup) __repr__ = __str__ @property def n(self): """The number `n` represents the length of the sublist containing the live cosets. """ if not self.table: return 0 return max(self.omega) + 1 # Pg. 152 [1] def is_complete(self): r""" The coset table is called complete if it has no undefined entries on the live cosets; that is, `\alpha^x` is defined for all `\alpha \in \Omega` and `x \in A`. """ return not any(None in self.table[coset] for coset in self.omega) # Pg. 153 [1] def define(self, alpha, x, modified=False): r""" This routine is used in the relator-based strategy of Todd-Coxeter algorithm if some `\alpha^x` is undefined. We check whether there is space available for defining a new coset. If there is enough space then we remedy this by adjoining a new coset `\beta` to `\Omega` (i.e to set of live cosets) and put that equal to `\alpha^x`, then make an assignment satisfying Property[1]. If there is not enough space then we halt the Coset Table creation. The maximum amount of space that can be used by Coset Table can be manipulated using the class variable ``CosetTable.coset_table_max_limit``. See Also ======== define_c """ A = self.A table = self.table len_table = len(table) if len_table >= self.coset_table_limit: # abort the further generation of cosets raise ValueError("the coset enumeration has defined more than " "%s cosets. Try with a greater value max number of cosets " % self.coset_table_limit) table.append([None]*len(A)) self.P.append([None]*len(self.A)) # beta is the new coset generated beta = len_table self.p.append(beta) table[alpha][self.A_dict[x]] = beta table[beta][self.A_dict_inv[x]] = alpha # P[alpha][x] = epsilon, P[beta][x**-1] = epsilon if modified: self.P[alpha][self.A_dict[x]] = self._grp.identity self.P[beta][self.A_dict_inv[x]] = self._grp.identity self.p_p[beta] = self._grp.identity def define_c(self, alpha, x): r""" A variation of ``define`` routine, described on Pg. 165 [1], used in the coset table-based strategy of Todd-Coxeter algorithm. It differs from ``define`` routine in that for each definition it also adds the tuple `(\alpha, x)` to the deduction stack. See Also ======== define """ A = self.A table = self.table len_table = len(table) if len_table >= self.coset_table_limit: # abort the further generation of cosets raise ValueError("the coset enumeration has defined more than " "%s cosets. Try with a greater value max number of cosets " % self.coset_table_limit) table.append([None]*len(A)) # beta is the new coset generated beta = len_table self.p.append(beta) table[alpha][self.A_dict[x]] = beta table[beta][self.A_dict_inv[x]] = alpha # append to deduction stack self.deduction_stack.append((alpha, x)) def scan_c(self, alpha, word): """ A variation of ``scan`` routine, described on pg. 165 of [1], which puts at tuple, whenever a deduction occurs, to deduction stack. See Also ======== scan, scan_check, scan_and_fill, scan_and_fill_c """ # alpha is an integer representing a "coset" # since scanning can be in two cases # 1. for alpha=0 and w in Y (i.e generating set of H) # 2. alpha in Omega (set of live cosets), w in R (relators) A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table f = alpha i = 0 r = len(word) b = alpha j = r - 1 # list of union of generators and their inverses while i <= j and table[f][A_dict[word[i]]] is not None: f = table[f][A_dict[word[i]]] i += 1 if i > j: if f != b: self.coincidence_c(f, b) return while j >= i and table[b][A_dict_inv[word[j]]] is not None: b = table[b][A_dict_inv[word[j]]] j -= 1 if j < i: # we have an incorrect completed scan with coincidence f ~ b # run the "coincidence" routine self.coincidence_c(f, b) elif j == i: # deduction process table[f][A_dict[word[i]]] = b table[b][A_dict_inv[word[i]]] = f self.deduction_stack.append((f, word[i])) # otherwise scan is incomplete and yields no information # alpha, beta coincide, i.e. alpha, beta represent the pair of cosets where # coincidence occurs def coincidence_c(self, alpha, beta): """ A variation of ``coincidence`` routine used in the coset-table based method of coset enumeration. The only difference being on addition of a new coset in coset table(i.e new coset introduction), then it is appended to ``deduction_stack``. See Also ======== coincidence """ A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table # behaves as a queue q = [] self.merge(alpha, beta, q) while len(q) > 0: gamma = q.pop(0) for x in A_dict: delta = table[gamma][A_dict[x]] if delta is not None: table[delta][A_dict_inv[x]] = None # only line of difference from ``coincidence`` routine self.deduction_stack.append((delta, x**-1)) mu = self.rep(gamma) nu = self.rep(delta) if table[mu][A_dict[x]] is not None: self.merge(nu, table[mu][A_dict[x]], q) elif table[nu][A_dict_inv[x]] is not None: self.merge(mu, table[nu][A_dict_inv[x]], q) else: table[mu][A_dict[x]] = nu table[nu][A_dict_inv[x]] = mu def scan(self, alpha, word, y=None, fill=False, modified=False): r""" ``scan`` performs a scanning process on the input ``word``. It first locates the largest prefix ``s`` of ``word`` for which `\alpha^s` is defined (i.e is not ``None``), ``s`` may be empty. Let ``word=sv``, let ``t`` be the longest suffix of ``v`` for which `\alpha^{t^{-1}}` is defined, and let ``v=ut``. Then three possibilities are there: 1. If ``t=v``, then we say that the scan completes, and if, in addition `\alpha^s = \alpha^{t^{-1}}`, then we say that the scan completes correctly. 2. It can also happen that scan does not complete, but `|u|=1`; that is, the word ``u`` consists of a single generator `x \in A`. In that case, if `\alpha^s = \beta` and `\alpha^{t^{-1}} = \gamma`, then we can set `\beta^x = \gamma` and `\gamma^{x^{-1}} = \beta`. These assignments are known as deductions and enable the scan to complete correctly. 3. See ``coicidence`` routine for explanation of third condition. Notes ===== The code for the procedure of scanning `\alpha \in \Omega` under `w \in A*` is defined on pg. 155 [1] See Also ======== scan_c, scan_check, scan_and_fill, scan_and_fill_c Scan and Fill ============= Performed when the default argument fill=True. Modified Scan ============= Performed when the default argument modified=True """ # alpha is an integer representing a "coset" # since scanning can be in two cases # 1. for alpha=0 and w in Y (i.e generating set of H) # 2. alpha in Omega (set of live cosets), w in R (relators) A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table f = alpha i = 0 r = len(word) b = alpha j = r - 1 b_p = y if modified: f_p = self._grp.identity flag = 0 while fill or flag == 0: flag = 1 while i <= j and table[f][A_dict[word[i]]] is not None: if modified: f_p = f_p*self.P[f][A_dict[word[i]]] f = table[f][A_dict[word[i]]] i += 1 if i > j: if f != b: if modified: self.modified_coincidence(f, b, f_p**-1*y) else: self.coincidence(f, b) return while j >= i and table[b][A_dict_inv[word[j]]] is not None: if modified: b_p = b_p*self.P[b][self.A_dict_inv[word[j]]] b = table[b][A_dict_inv[word[j]]] j -= 1 if j < i: # we have an incorrect completed scan with coincidence f ~ b # run the "coincidence" routine if modified: self.modified_coincidence(f, b, f_p**-1*b_p) else: self.coincidence(f, b) elif j == i: # deduction process table[f][A_dict[word[i]]] = b table[b][A_dict_inv[word[i]]] = f if modified: self.P[f][self.A_dict[word[i]]] = f_p**-1*b_p self.P[b][self.A_dict_inv[word[i]]] = b_p**-1*f_p return elif fill: self.define(f, word[i], modified=modified) # otherwise scan is incomplete and yields no information # used in the low-index subgroups algorithm def scan_check(self, alpha, word): r""" Another version of ``scan`` routine, described on, it checks whether `\alpha` scans correctly under `word`, it is a straightforward modification of ``scan``. ``scan_check`` returns ``False`` (rather than calling ``coincidence``) if the scan completes incorrectly; otherwise it returns ``True``. See Also ======== scan, scan_c, scan_and_fill, scan_and_fill_c """ # alpha is an integer representing a "coset" # since scanning can be in two cases # 1. for alpha=0 and w in Y (i.e generating set of H) # 2. alpha in Omega (set of live cosets), w in R (relators) A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table f = alpha i = 0 r = len(word) b = alpha j = r - 1 while i <= j and table[f][A_dict[word[i]]] is not None: f = table[f][A_dict[word[i]]] i += 1 if i > j: return f == b while j >= i and table[b][A_dict_inv[word[j]]] is not None: b = table[b][A_dict_inv[word[j]]] j -= 1 if j < i: # we have an incorrect completed scan with coincidence f ~ b # return False, instead of calling coincidence routine return False elif j == i: # deduction process table[f][A_dict[word[i]]] = b table[b][A_dict_inv[word[i]]] = f return True def merge(self, k, lamda, q, w=None, modified=False): """ Merge two classes with representatives ``k`` and ``lamda``, described on Pg. 157 [1] (for pseudocode), start by putting ``p[k] = lamda``. It is more efficient to choose the new representative from the larger of the two classes being merged, i.e larger among ``k`` and ``lamda``. procedure ``merge`` performs the merging operation, adds the deleted class representative to the queue ``q``. Parameters ========== 'k', 'lamda' being the two class representatives to be merged. Notes ===== Pg. 86-87 [1] contains a description of this method. See Also ======== coincidence, rep """ p = self.p rep = self.rep phi = rep(k, modified=modified) psi = rep(lamda, modified=modified) if phi != psi: mu = min(phi, psi) v = max(phi, psi) p[v] = mu if modified: if v == phi: self.p_p[phi] = self.p_p[k]**-1*w*self.p_p[lamda] else: self.p_p[psi] = self.p_p[lamda]**-1*w**-1*self.p_p[k] q.append(v) def rep(self, k, modified=False): r""" Parameters ========== `k \in [0 \ldots n-1]`, as for ``self`` only array ``p`` is used Returns ======= Representative of the class containing ``k``. Returns the representative of `\sim` class containing ``k``, it also makes some modification to array ``p`` of ``self`` to ease further computations, described on Pg. 157 [1]. The information on classes under `\sim` is stored in array `p` of ``self`` argument, which will always satisfy the property: `p[\alpha] \sim \alpha` and `p[\alpha]=\alpha \iff \alpha=rep(\alpha)` `\forall \in [0 \ldots n-1]`. So, for `\alpha \in [0 \ldots n-1]`, we find `rep(self, \alpha)` by continually replacing `\alpha` by `p[\alpha]` until it becomes constant (i.e satisfies `p[\alpha] = \alpha`):w To increase the efficiency of later ``rep`` calculations, whenever we find `rep(self, \alpha)=\beta`, we set `p[\gamma] = \beta \forall \gamma \in p-chain` from `\alpha` to `\beta` Notes ===== ``rep`` routine is also described on Pg. 85-87 [1] in Atkinson's algorithm, this results from the fact that ``coincidence`` routine introduces functionality similar to that introduced by the ``minimal_block`` routine on Pg. 85-87 [1]. See Also ======== coincidence, merge """ p = self.p lamda = k rho = p[lamda] if modified: s = p[:] while rho != lamda: if modified: s[rho] = lamda lamda = rho rho = p[lamda] if modified: rho = s[lamda] while rho != k: mu = rho rho = s[mu] p[rho] = lamda self.p_p[rho] = self.p_p[rho]*self.p_p[mu] else: mu = k rho = p[mu] while rho != lamda: p[mu] = lamda mu = rho rho = p[mu] return lamda # alpha, beta coincide, i.e. alpha, beta represent the pair of cosets # where coincidence occurs def coincidence(self, alpha, beta, w=None, modified=False): r""" The third situation described in ``scan`` routine is handled by this routine, described on Pg. 156-161 [1]. The unfortunate situation when the scan completes but not correctly, then ``coincidence`` routine is run. i.e when for some `i` with `1 \le i \le r+1`, we have `w=st` with `s=x_1*x_2 ... x_{i-1}`, `t=x_i*x_{i+1} ... x_r`, and `\beta = \alpha^s` and `\gamma = \alph^{t-1}` are defined but unequal. This means that `\beta` and `\gamma` represent the same coset of `H` in `G`. Described on Pg. 156 [1]. ``rep`` See Also ======== scan """ A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table # behaves as a queue q = [] if modified: self.modified_merge(alpha, beta, w, q) else: self.merge(alpha, beta, q) while len(q) > 0: gamma = q.pop(0) for x in A_dict: delta = table[gamma][A_dict[x]] if delta is not None: table[delta][A_dict_inv[x]] = None mu = self.rep(gamma, modified=modified) nu = self.rep(delta, modified=modified) if table[mu][A_dict[x]] is not None: if modified: v = self.p_p[delta]**-1*self.P[gamma][self.A_dict[x]]**-1 v = v*self.p_p[gamma]*self.P[mu][self.A_dict[x]] self.modified_merge(nu, table[mu][self.A_dict[x]], v, q) else: self.merge(nu, table[mu][A_dict[x]], q) elif table[nu][A_dict_inv[x]] is not None: if modified: v = self.p_p[gamma]**-1*self.P[gamma][self.A_dict[x]] v = v*self.p_p[delta]*self.P[mu][self.A_dict_inv[x]] self.modified_merge(mu, table[nu][self.A_dict_inv[x]], v, q) else: self.merge(mu, table[nu][A_dict_inv[x]], q) else: table[mu][A_dict[x]] = nu table[nu][A_dict_inv[x]] = mu if modified: v = self.p_p[gamma]**-1*self.P[gamma][self.A_dict[x]]*self.p_p[delta] self.P[mu][self.A_dict[x]] = v self.P[nu][self.A_dict_inv[x]] = v**-1 # method used in the HLT strategy def scan_and_fill(self, alpha, word): """ A modified version of ``scan`` routine used in the relator-based method of coset enumeration, described on pg. 162-163 [1], which follows the idea that whenever the procedure is called and the scan is incomplete then it makes new definitions to enable the scan to complete; i.e it fills in the gaps in the scan of the relator or subgroup generator. """ self.scan(alpha, word, fill=True) def scan_and_fill_c(self, alpha, word): """ A modified version of ``scan`` routine, described on Pg. 165 second para. [1], with modification similar to that of ``scan_anf_fill`` the only difference being it calls the coincidence procedure used in the coset-table based method i.e. the routine ``coincidence_c`` is used. See Also ======== scan, scan_and_fill """ A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table r = len(word) f = alpha i = 0 b = alpha j = r - 1 # loop until it has filled the alpha row in the table. while True: # do the forward scanning while i <= j and table[f][A_dict[word[i]]] is not None: f = table[f][A_dict[word[i]]] i += 1 if i > j: if f != b: self.coincidence_c(f, b) return # forward scan was incomplete, scan backwards while j >= i and table[b][A_dict_inv[word[j]]] is not None: b = table[b][A_dict_inv[word[j]]] j -= 1 if j < i: self.coincidence_c(f, b) elif j == i: table[f][A_dict[word[i]]] = b table[b][A_dict_inv[word[i]]] = f self.deduction_stack.append((f, word[i])) else: self.define_c(f, word[i]) # method used in the HLT strategy def look_ahead(self): """ When combined with the HLT method this is known as HLT+Lookahead method of coset enumeration, described on pg. 164 [1]. Whenever ``define`` aborts due to lack of space available this procedure is executed. This routine helps in recovering space resulting from "coincidence" of cosets. """ R = self.fp_group.relators p = self.p # complete scan all relators under all cosets(obviously live) # without making new definitions for beta in self.omega: for w in R: self.scan(beta, w) if p[beta] < beta: break # Pg. 166 def process_deductions(self, R_c_x, R_c_x_inv): """ Processes the deductions that have been pushed onto ``deduction_stack``, described on Pg. 166 [1] and is used in coset-table based enumeration. See Also ======== deduction_stack """ p = self.p table = self.table while len(self.deduction_stack) > 0: if len(self.deduction_stack) >= CosetTable.max_stack_size: self.look_ahead() del self.deduction_stack[:] continue else: alpha, x = self.deduction_stack.pop() if p[alpha] == alpha: for w in R_c_x: self.scan_c(alpha, w) if p[alpha] < alpha: break beta = table[alpha][self.A_dict[x]] if beta is not None and p[beta] == beta: for w in R_c_x_inv: self.scan_c(beta, w) if p[beta] < beta: break def process_deductions_check(self, R_c_x, R_c_x_inv): """ A variation of ``process_deductions``, this calls ``scan_check`` wherever ``process_deductions`` calls ``scan``, described on Pg. [1]. See Also ======== process_deductions """ table = self.table while len(self.deduction_stack) > 0: alpha, x = self.deduction_stack.pop() for w in R_c_x: if not self.scan_check(alpha, w): return False beta = table[alpha][self.A_dict[x]] if beta is not None: for w in R_c_x_inv: if not self.scan_check(beta, w): return False return True def switch(self, beta, gamma): r"""Switch the elements `\beta, \gamma \in \Omega` of ``self``, used by the ``standardize`` procedure, described on Pg. 167 [1]. See Also ======== standardize """ A = self.A A_dict = self.A_dict table = self.table for x in A: z = table[gamma][A_dict[x]] table[gamma][A_dict[x]] = table[beta][A_dict[x]] table[beta][A_dict[x]] = z for alpha in range(len(self.p)): if self.p[alpha] == alpha: if table[alpha][A_dict[x]] == beta: table[alpha][A_dict[x]] = gamma elif table[alpha][A_dict[x]] == gamma: table[alpha][A_dict[x]] = beta def standardize(self): r""" A coset table is standardized if when running through the cosets and within each coset through the generator images (ignoring generator inverses), the cosets appear in order of the integers `0, 1, , \ldots, n`. "Standardize" reorders the elements of `\Omega` such that, if we scan the coset table first by elements of `\Omega` and then by elements of A, then the cosets occur in ascending order. ``standardize()`` is used at the end of an enumeration to permute the cosets so that they occur in some sort of standard order. Notes ===== procedure is described on pg. 167-168 [1], it also makes use of the ``switch`` routine to replace by smaller integer value. Examples ======== >>> from sympy.combinatorics.free_groups import free_group >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_r >>> F, x, y = free_group("x, y") # Example 5.3 from [1] >>> f = FpGroup(F, [x**2*y**2, x**3*y**5]) >>> C = coset_enumeration_r(f, []) >>> C.compress() >>> C.table [[1, 3, 1, 3], [2, 0, 2, 0], [3, 1, 3, 1], [0, 2, 0, 2]] >>> C.standardize() >>> C.table [[1, 2, 1, 2], [3, 0, 3, 0], [0, 3, 0, 3], [2, 1, 2, 1]] """ A = self.A A_dict = self.A_dict gamma = 1 for alpha, x in product(range(self.n), A): beta = self.table[alpha][A_dict[x]] if beta >= gamma: if beta > gamma: self.switch(gamma, beta) gamma += 1 if gamma == self.n: return # Compression of a Coset Table def compress(self): """Removes the non-live cosets from the coset table, described on pg. 167 [1]. """ gamma = -1 A = self.A A_dict = self.A_dict A_dict_inv = self.A_dict_inv table = self.table chi = tuple([i for i in range(len(self.p)) if self.p[i] != i]) for alpha in self.omega: gamma += 1 if gamma != alpha: # replace alpha by gamma in coset table for x in A: beta = table[alpha][A_dict[x]] table[gamma][A_dict[x]] = beta table[beta][A_dict_inv[x]] == gamma # all the cosets in the table are live cosets self.p = list(range(gamma + 1)) # delete the useless columns del table[len(self.p):] # re-define values for row in table: for j in range(len(self.A)): row[j] -= bisect_left(chi, row[j]) def conjugates(self, R): R_c = list(chain.from_iterable((rel.cyclic_conjugates(), \ (rel**-1).cyclic_conjugates()) for rel in R)) R_set = set() for conjugate in R_c: R_set = R_set.union(conjugate) R_c_list = [] for x in self.A: r = set([word for word in R_set if word[0] == x]) R_c_list.append(r) R_set.difference_update(r) return R_c_list def coset_representative(self, coset): ''' Compute the coset representative of a given coset. Examples ======== >>> from sympy.combinatorics.free_groups import free_group >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_r >>> F, x, y = free_group("x, y") >>> f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) >>> C = coset_enumeration_r(f, [x]) >>> C.compress() >>> C.table [[0, 0, 1, 2], [1, 1, 2, 0], [2, 2, 0, 1]] >>> C.coset_representative(0) <identity> >>> C.coset_representative(1) y >>> C.coset_representative(2) y**-1 ''' for x in self.A: gamma = self.table[coset][self.A_dict[x]] if coset == 0: return self.fp_group.identity if gamma < coset: return self.coset_representative(gamma)*x**-1 ############################## # Modified Methods # ############################## def modified_define(self, alpha, x): r""" Define a function p_p from from [1..n] to A* as an additional component of the modified coset table. Parameters ========== \alpha \in \Omega x \in A* See Also ======== define """ self.define(alpha, x, modified=True) def modified_scan(self, alpha, w, y, fill=False): r""" Parameters ========== \alpha \in \Omega w \in A* y \in (YUY^-1) fill -- `modified_scan_and_fill` when set to True. See Also ======== scan """ self.scan(alpha, w, y=y, fill=fill, modified=True) def modified_scan_and_fill(self, alpha, w, y): self.modified_scan(alpha, w, y, fill=True) def modified_merge(self, k, lamda, w, q): r""" Parameters ========== 'k', 'lamda' -- the two class representatives to be merged. q -- queue of length l of elements to be deleted from `\Omega` *. w -- Word in (YUY^-1) See Also ======== merge """ self.merge(k, lamda, q, w=w, modified=True) def modified_rep(self, k): r""" Parameters ========== `k \in [0 \ldots n-1]` See Also ======== rep """ self.rep(k, modified=True) def modified_coincidence(self, alpha, beta, w): r""" Parameters ========== A coincident pair `\alpha, \beta \in \Omega, w \in Y \cup Y^{-1}` See Also ======== coincidence """ self.coincidence(alpha, beta, w=w, modified=True) ############################################################################### # COSET ENUMERATION # ############################################################################### # relator-based method def coset_enumeration_r(fp_grp, Y, max_cosets=None, draft=None, incomplete=False, modified=False): """ This is easier of the two implemented methods of coset enumeration. and is often called the HLT method, after Hazelgrove, Leech, Trotter The idea is that we make use of ``scan_and_fill`` makes new definitions whenever the scan is incomplete to enable the scan to complete; this way we fill in the gaps in the scan of the relator or subgroup generator, that's why the name relator-based method. An instance of `CosetTable` for `fp_grp` can be passed as the keyword argument `draft` in which case the coset enumeration will start with that instance and attempt to complete it. When `incomplete` is `True` and the function is unable to complete for some reason, the partially complete table will be returned. # TODO: complete the docstring See Also ======== scan_and_fill, Examples ======== >>> from sympy.combinatorics.free_groups import free_group >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_r >>> F, x, y = free_group("x, y") # Example 5.1 from [1] >>> f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) >>> C = coset_enumeration_r(f, [x]) >>> for i in range(len(C.p)): ... if C.p[i] == i: ... print(C.table[i]) [0, 0, 1, 2] [1, 1, 2, 0] [2, 2, 0, 1] >>> C.p [0, 1, 2, 1, 1] # Example from exercises Q2 [1] >>> f = FpGroup(F, [x**2*y**2, y**-1*x*y*x**-3]) >>> C = coset_enumeration_r(f, []) >>> C.compress(); C.standardize() >>> C.table [[1, 2, 3, 4], [5, 0, 6, 7], [0, 5, 7, 6], [7, 6, 5, 0], [6, 7, 0, 5], [2, 1, 4, 3], [3, 4, 2, 1], [4, 3, 1, 2]] # Example 5.2 >>> f = FpGroup(F, [x**2, y**3, (x*y)**3]) >>> Y = [x*y] >>> C = coset_enumeration_r(f, Y) >>> for i in range(len(C.p)): ... if C.p[i] == i: ... print(C.table[i]) [1, 1, 2, 1] [0, 0, 0, 2] [3, 3, 1, 0] [2, 2, 3, 3] # Example 5.3 >>> f = FpGroup(F, [x**2*y**2, x**3*y**5]) >>> Y = [] >>> C = coset_enumeration_r(f, Y) >>> for i in range(len(C.p)): ... if C.p[i] == i: ... print(C.table[i]) [1, 3, 1, 3] [2, 0, 2, 0] [3, 1, 3, 1] [0, 2, 0, 2] # Example 5.4 >>> F, a, b, c, d, e = free_group("a, b, c, d, e") >>> f = FpGroup(F, [a*b*c**-1, b*c*d**-1, c*d*e**-1, d*e*a**-1, e*a*b**-1]) >>> Y = [a] >>> C = coset_enumeration_r(f, Y) >>> for i in range(len(C.p)): ... if C.p[i] == i: ... print(C.table[i]) [0, 0, 0, 0, 0, 0, 0, 0, 0, 0] # example of "compress" method >>> C.compress() >>> C.table [[0, 0, 0, 0, 0, 0, 0, 0, 0, 0]] # Exercises Pg. 161, Q2. >>> F, x, y = free_group("x, y") >>> f = FpGroup(F, [x**2*y**2, y**-1*x*y*x**-3]) >>> Y = [] >>> C = coset_enumeration_r(f, Y) >>> C.compress() >>> C.standardize() >>> C.table [[1, 2, 3, 4], [5, 0, 6, 7], [0, 5, 7, 6], [7, 6, 5, 0], [6, 7, 0, 5], [2, 1, 4, 3], [3, 4, 2, 1], [4, 3, 1, 2]] # John J. Cannon; Lucien A. Dimino; George Havas; Jane M. Watson # Mathematics of Computation, Vol. 27, No. 123. (Jul., 1973), pp. 463-490 # from 1973chwd.pdf # Table 1. Ex. 1 >>> F, r, s, t = free_group("r, s, t") >>> E1 = FpGroup(F, [t**-1*r*t*r**-2, r**-1*s*r*s**-2, s**-1*t*s*t**-2]) >>> C = coset_enumeration_r(E1, [r]) >>> for i in range(len(C.p)): ... if C.p[i] == i: ... print(C.table[i]) [0, 0, 0, 0, 0, 0] Ex. 2 >>> F, a, b = free_group("a, b") >>> Cox = FpGroup(F, [a**6, b**6, (a*b)**2, (a**2*b**2)**2, (a**3*b**3)**5]) >>> C = coset_enumeration_r(Cox, [a]) >>> index = 0 >>> for i in range(len(C.p)): ... if C.p[i] == i: ... index += 1 >>> index 500 # Ex. 3 >>> F, a, b = free_group("a, b") >>> B_2_4 = FpGroup(F, [a**4, b**4, (a*b)**4, (a**-1*b)**4, (a**2*b)**4, \ (a*b**2)**4, (a**2*b**2)**4, (a**-1*b*a*b)**4, (a*b**-1*a*b)**4]) >>> C = coset_enumeration_r(B_2_4, [a]) >>> index = 0 >>> for i in range(len(C.p)): ... if C.p[i] == i: ... index += 1 >>> index 1024 References ========== .. [1] Holt, D., Eick, B., O'Brien, E. "Handbook of computational group theory" """ # 1. Initialize a coset table C for < X|R > C = CosetTable(fp_grp, Y, max_cosets=max_cosets) # Define coset table methods. if modified: _scan_and_fill = C.modified_scan_and_fill _define = C.modified_define else: _scan_and_fill = C.scan_and_fill _define = C.define if draft: C.table = draft.table[:] C.p = draft.p[:] R = fp_grp.relators A_dict = C.A_dict p = C.p for i in range(0, len(Y)): if modified: _scan_and_fill(0, Y[i], C._grp.generators[i]) else: _scan_and_fill(0, Y[i]) alpha = 0 while alpha < C.n: if p[alpha] == alpha: try: for w in R: if modified: _scan_and_fill(alpha, w, C._grp.identity) else: _scan_and_fill(alpha, w) # if alpha was eliminated during the scan then break if p[alpha] < alpha: break if p[alpha] == alpha: for x in A_dict: if C.table[alpha][A_dict[x]] is None: _define(alpha, x) except ValueError as e: if incomplete: return C raise e alpha += 1 return C def modified_coset_enumeration_r(fp_grp, Y, max_cosets=None, draft=None, incomplete=False): r""" Introduce a new set of symbols y \in Y that correspond to the generators of the subgroup. Store the elements of Y as a word P[\alpha, x] and compute the coset table similar to that of the regular coset enumeration methods. Examples ======== >>> from sympy.combinatorics.free_groups import free_group >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_r >>> from sympy.combinatorics.coset_table import modified_coset_enumeration_r >>> F, x, y = free_group("x, y") >>> f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) >>> C = modified_coset_enumeration_r(f, [x]) >>> C.table [[0, 0, 1, 2], [1, 1, 2, 0], [2, 2, 0, 1], [None, 1, None, None], [1, 3, None, None]] See Also ======== coset_enumertation_r References ========== .. [1] Holt, D., Eick, B., O'Brien, E., "Handbook of Computational Group Theory", Section 5.3.2 """ return coset_enumeration_r(fp_grp, Y, max_cosets=max_cosets, draft=draft, incomplete=incomplete, modified=True) # Pg. 166 # coset-table based method def coset_enumeration_c(fp_grp, Y, max_cosets=None, draft=None, incomplete=False): """ >>> from sympy.combinatorics.free_groups import free_group >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_c >>> F, x, y = free_group("x, y") >>> f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) >>> C = coset_enumeration_c(f, [x]) >>> C.table [[0, 0, 1, 2], [1, 1, 2, 0], [2, 2, 0, 1]] """ # Initialize a coset table C for < X|R > X = fp_grp.generators R = fp_grp.relators C = CosetTable(fp_grp, Y, max_cosets=max_cosets) if draft: C.table = draft.table[:] C.p = draft.p[:] C.deduction_stack = draft.deduction_stack for alpha, x in product(range(len(C.table)), X): if not C.table[alpha][C.A_dict[x]] is None: C.deduction_stack.append((alpha, x)) A = C.A # replace all the elements by cyclic reductions R_cyc_red = [rel.identity_cyclic_reduction() for rel in R] R_c = list(chain.from_iterable((rel.cyclic_conjugates(), (rel**-1).cyclic_conjugates()) \ for rel in R_cyc_red)) R_set = set() for conjugate in R_c: R_set = R_set.union(conjugate) # a list of subsets of R_c whose words start with "x". R_c_list = [] for x in C.A: r = set([word for word in R_set if word[0] == x]) R_c_list.append(r) R_set.difference_update(r) for w in Y: C.scan_and_fill_c(0, w) for x in A: C.process_deductions(R_c_list[C.A_dict[x]], R_c_list[C.A_dict_inv[x]]) alpha = 0 while alpha < len(C.table): if C.p[alpha] == alpha: try: for x in C.A: if C.p[alpha] != alpha: break if C.table[alpha][C.A_dict[x]] is None: C.define_c(alpha, x) C.process_deductions(R_c_list[C.A_dict[x]], R_c_list[C.A_dict_inv[x]]) except ValueError as e: if incomplete: return C raise e alpha += 1 return C

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from __future__ import print_function, division from sympy.core.compatibility import range from sympy.core.mul import Mul from sympy.core.singleton import S from sympy.concrete.expr_with_intlimits import ExprWithIntLimits from sympy.core.exprtools import factor_terms from sympy.functions.elementary.exponential import exp, log from sympy.polys import quo, roots from sympy.simplify import powsimp class Product(ExprWithIntLimits): r"""Represents unevaluated products. ``Product`` represents a finite or infinite product, with the first argument being the general form of terms in the series, and the second argument being ``(dummy_variable, start, end)``, with ``dummy_variable`` taking all integer values from ``start`` through ``end``. In accordance with long-standing mathematical convention, the end term is included in the product. Finite products =============== For finite products (and products with symbolic limits assumed to be finite) we follow the analogue of the summation convention described by Karr [1], especially definition 3 of section 1.4. The product: .. math:: \prod_{m \leq i < n} f(i) has *the obvious meaning* for `m < n`, namely: .. math:: \prod_{m \leq i < n} f(i) = f(m) f(m+1) \cdot \ldots \cdot f(n-2) f(n-1) with the upper limit value `f(n)` excluded. The product over an empty set is one if and only if `m = n`: .. math:: \prod_{m \leq i < n} f(i) = 1 \quad \mathrm{for} \quad m = n Finally, for all other products over empty sets we assume the following definition: .. math:: \prod_{m \leq i < n} f(i) = \frac{1}{\prod_{n \leq i < m} f(i)} \quad \mathrm{for} \quad m > n It is important to note that above we define all products with the upper limit being exclusive. This is in contrast to the usual mathematical notation, but does not affect the product convention. Indeed we have: .. math:: \prod_{m \leq i < n} f(i) = \prod_{i = m}^{n - 1} f(i) where the difference in notation is intentional to emphasize the meaning, with limits typeset on the top being inclusive. Examples ======== >>> from sympy.abc import a, b, i, k, m, n, x >>> from sympy import Product, factorial, oo >>> Product(k, (k, 1, m)) Product(k, (k, 1, m)) >>> Product(k, (k, 1, m)).doit() factorial(m) >>> Product(k**2,(k, 1, m)) Product(k**2, (k, 1, m)) >>> Product(k**2,(k, 1, m)).doit() factorial(m)**2 Wallis' product for pi: >>> W = Product(2*i/(2*i-1) * 2*i/(2*i+1), (i, 1, oo)) >>> W Product(4*i**2/((2*i - 1)*(2*i + 1)), (i, 1, oo)) Direct computation currently fails: >>> W.doit() Product(4*i**2/((2*i - 1)*(2*i + 1)), (i, 1, oo)) But we can approach the infinite product by a limit of finite products: >>> from sympy import limit >>> W2 = Product(2*i/(2*i-1)*2*i/(2*i+1), (i, 1, n)) >>> W2 Product(4*i**2/((2*i - 1)*(2*i + 1)), (i, 1, n)) >>> W2e = W2.doit() >>> W2e 2**(-2*n)*4**n*factorial(n)**2/(RisingFactorial(1/2, n)*RisingFactorial(3/2, n)) >>> limit(W2e, n, oo) pi/2 By the same formula we can compute sin(pi/2): >>> from sympy import pi, gamma, simplify >>> P = pi * x * Product(1 - x**2/k**2, (k, 1, n)) >>> P = P.subs(x, pi/2) >>> P pi**2*Product(1 - pi**2/(4*k**2), (k, 1, n))/2 >>> Pe = P.doit() >>> Pe pi**2*RisingFactorial(1 - pi/2, n)*RisingFactorial(1 + pi/2, n)/(2*factorial(n)**2) >>> Pe = Pe.rewrite(gamma) >>> Pe pi**2*gamma(n + 1 + pi/2)*gamma(n - pi/2 + 1)/(2*gamma(1 - pi/2)*gamma(1 + pi/2)*gamma(n + 1)**2) >>> Pe = simplify(Pe) >>> Pe sin(pi**2/2)*gamma(n + 1 + pi/2)*gamma(n - pi/2 + 1)/gamma(n + 1)**2 >>> limit(Pe, n, oo) sin(pi**2/2) Products with the lower limit being larger than the upper one: >>> Product(1/i, (i, 6, 1)).doit() 120 >>> Product(i, (i, 2, 5)).doit() 120 The empty product: >>> Product(i, (i, n, n-1)).doit() 1 An example showing that the symbolic result of a product is still valid for seemingly nonsensical values of the limits. Then the Karr convention allows us to give a perfectly valid interpretation to those products by interchanging the limits according to the above rules: >>> P = Product(2, (i, 10, n)).doit() >>> P 2**(n - 9) >>> P.subs(n, 5) 1/16 >>> Product(2, (i, 10, 5)).doit() 1/16 >>> 1/Product(2, (i, 6, 9)).doit() 1/16 An explicit example of the Karr summation convention applied to products: >>> P1 = Product(x, (i, a, b)).doit() >>> P1 x**(-a + b + 1) >>> P2 = Product(x, (i, b+1, a-1)).doit() >>> P2 x**(a - b - 1) >>> simplify(P1 * P2) 1 And another one: >>> P1 = Product(i, (i, b, a)).doit() >>> P1 RisingFactorial(b, a - b + 1) >>> P2 = Product(i, (i, a+1, b-1)).doit() >>> P2 RisingFactorial(a + 1, -a + b - 1) >>> P1 * P2 RisingFactorial(b, a - b + 1)*RisingFactorial(a + 1, -a + b - 1) >>> simplify(P1 * P2) 1 See Also ======== Sum, summation product References ========== .. [1] Michael Karr, "Summation in Finite Terms", Journal of the ACM, Volume 28 Issue 2, April 1981, Pages 305-350 http://dl.acm.org/citation.cfm?doid=322248.322255 .. [2] https://en.wikipedia.org/wiki/Multiplication#Capital_Pi_notation .. [3] https://en.wikipedia.org/wiki/Empty_product """ __slots__ = ['is_commutative'] def __new__(cls, function, *symbols, **assumptions): obj = ExprWithIntLimits.__new__(cls, function, *symbols, **assumptions) return obj def _eval_rewrite_as_Sum(self, *args, **kwargs): from sympy.concrete.summations import Sum return exp(Sum(log(self.function), *self.limits)) @property def term(self): return self._args[0] function = term def _eval_is_zero(self): # a Product is zero only if its term is zero. return self.term.is_zero def doit(self, **hints): f = self.function for index, limit in enumerate(self.limits): i, a, b = limit dif = b - a if dif.is_Integer and dif < 0: a, b = b + 1, a - 1 f = 1 / f g = self._eval_product(f, (i, a, b)) if g in (None, S.NaN): return self.func(powsimp(f), *self.limits[index:]) else: f = g if hints.get('deep', True): return f.doit(**hints) else: return powsimp(f) def _eval_adjoint(self): if self.is_commutative: return self.func(self.function.adjoint(), *self.limits) return None def _eval_conjugate(self): return self.func(self.function.conjugate(), *self.limits) def _eval_product(self, term, limits): from sympy.concrete.delta import deltaproduct, _has_simple_delta from sympy.concrete.summations import summation from sympy.functions import KroneckerDelta, RisingFactorial (k, a, n) = limits if k not in term.free_symbols: if (term - 1).is_zero: return S.One return term**(n - a + 1) if a == n: return term.subs(k, a) if term.has(KroneckerDelta) and _has_simple_delta(term, limits[0]): return deltaproduct(term, limits) dif = n - a if dif.is_Integer: return Mul(*[term.subs(k, a + i) for i in range(dif + 1)]) elif term.is_polynomial(k): poly = term.as_poly(k) A = B = Q = S.One all_roots = roots(poly) M = 0 for r, m in all_roots.items(): M += m A *= RisingFactorial(a - r, n - a + 1)**m Q *= (n - r)**m if M < poly.degree(): arg = quo(poly, Q.as_poly(k)) B = self.func(arg, (k, a, n)).doit() return poly.LC()**(n - a + 1) * A * B elif term.is_Add: factored = factor_terms(term, fraction=True) if factored.is_Mul: return self._eval_product(factored, (k, a, n)) elif term.is_Mul: exclude, include = [], [] for t in term.args: p = self._eval_product(t, (k, a, n)) if p is not None: exclude.append(p) else: include.append(t) if not exclude: return None else: arg = term._new_rawargs(*include) A = Mul(*exclude) B = self.func(arg, (k, a, n)).doit() return A * B elif term.is_Pow: if not term.base.has(k): s = summation(term.exp, (k, a, n)) return term.base**s elif not term.exp.has(k): p = self._eval_product(term.base, (k, a, n)) if p is not None: return p**term.exp elif isinstance(term, Product): evaluated = term.doit() f = self._eval_product(evaluated, limits) if f is None: return self.func(evaluated, limits) else: return f def _eval_simplify(self, **kwargs): from sympy.simplify.simplify import product_simplify rv = product_simplify(self) return rv.doit() if kwargs['doit'] else rv def _eval_transpose(self): if self.is_commutative: return self.func(self.function.transpose(), *self.limits) return None def is_convergent(self): r""" See docs of Sum.is_convergent() for explanation of convergence in SymPy. The infinite product: .. math:: \prod_{1 \leq i < \infty} f(i) is defined by the sequence of partial products: .. math:: \prod_{i=1}^{n} f(i) = f(1) f(2) \cdots f(n) as n increases without bound. The product converges to a non-zero value if and only if the sum: .. math:: \sum_{1 \leq i < \infty} \log{f(n)} converges. Examples ======== >>> from sympy import Interval, S, Product, Symbol, cos, pi, exp, oo >>> n = Symbol('n', integer=True) >>> Product(n/(n + 1), (n, 1, oo)).is_convergent() False >>> Product(1/n**2, (n, 1, oo)).is_convergent() False >>> Product(cos(pi/n), (n, 1, oo)).is_convergent() True >>> Product(exp(-n**2), (n, 1, oo)).is_convergent() False References ========== .. [1] https://en.wikipedia.org/wiki/Infinite_product """ from sympy.concrete.summations import Sum sequence_term = self.function log_sum = log(sequence_term) lim = self.limits try: is_conv = Sum(log_sum, *lim).is_convergent() except NotImplementedError: if Sum(sequence_term - 1, *lim).is_absolutely_convergent() is S.true: return S.true raise NotImplementedError("The algorithm to find the product convergence of %s " "is not yet implemented" % (sequence_term)) return is_conv def reverse_order(expr, *indices): """ Reverse the order of a limit in a Product. Usage ===== ``reverse_order(expr, *indices)`` reverses some limits in the expression ``expr`` which can be either a ``Sum`` or a ``Product``. The selectors in the argument ``indices`` specify some indices whose limits get reversed. These selectors are either variable names or numerical indices counted starting from the inner-most limit tuple. Examples ======== >>> from sympy import Product, simplify, RisingFactorial, gamma, Sum >>> from sympy.abc import x, y, a, b, c, d >>> P = Product(x, (x, a, b)) >>> Pr = P.reverse_order(x) >>> Pr Product(1/x, (x, b + 1, a - 1)) >>> Pr = Pr.doit() >>> Pr 1/RisingFactorial(b + 1, a - b - 1) >>> simplify(Pr) gamma(b + 1)/gamma(a) >>> P = P.doit() >>> P RisingFactorial(a, -a + b + 1) >>> simplify(P) gamma(b + 1)/gamma(a) While one should prefer variable names when specifying which limits to reverse, the index counting notation comes in handy in case there are several symbols with the same name. >>> S = Sum(x*y, (x, a, b), (y, c, d)) >>> S Sum(x*y, (x, a, b), (y, c, d)) >>> S0 = S.reverse_order(0) >>> S0 Sum(-x*y, (x, b + 1, a - 1), (y, c, d)) >>> S1 = S0.reverse_order(1) >>> S1 Sum(x*y, (x, b + 1, a - 1), (y, d + 1, c - 1)) Of course we can mix both notations: >>> Sum(x*y, (x, a, b), (y, 2, 5)).reverse_order(x, 1) Sum(x*y, (x, b + 1, a - 1), (y, 6, 1)) >>> Sum(x*y, (x, a, b), (y, 2, 5)).reverse_order(y, x) Sum(x*y, (x, b + 1, a - 1), (y, 6, 1)) See Also ======== index, reorder_limit, reorder References ========== .. [1] Michael Karr, "Summation in Finite Terms", Journal of the ACM, Volume 28 Issue 2, April 1981, Pages 305-350 http://dl.acm.org/citation.cfm?doid=322248.322255 """ l_indices = list(indices) for i, indx in enumerate(l_indices): if not isinstance(indx, int): l_indices[i] = expr.index(indx) e = 1 limits = [] for i, limit in enumerate(expr.limits): l = limit if i in l_indices: e = -e l = (limit[0], limit[2] + 1, limit[1] - 1) limits.append(l) return Product(expr.function ** e, *limits) def product(*args, **kwargs): r""" Compute the product. The notation for symbols is similar to the notation used in Sum or Integral. product(f, (i, a, b)) computes the product of f with respect to i from a to b, i.e., :: b _____ product(f(n), (i, a, b)) = | | f(n) | | i = a If it cannot compute the product, it returns an unevaluated Product object. Repeated products can be computed by introducing additional symbols tuples:: >>> from sympy import product, symbols >>> i, n, m, k = symbols('i n m k', integer=True) >>> product(i, (i, 1, k)) factorial(k) >>> product(m, (i, 1, k)) m**k >>> product(i, (i, 1, k), (k, 1, n)) Product(factorial(k), (k, 1, n)) """ prod = Product(*args, **kwargs) if isinstance(prod, Product): return prod.doit(deep=False) else: return prod

58a007652606de30a9a8fffcb417ddc7f7f13f62837cc5cd9a0610b6d4e93cfc

from __future__ import print_function, division from sympy.core.add import Add from sympy.core.compatibility import is_sequence from sympy.core.containers import Tuple from sympy.core.expr import Expr from sympy.core.mul import Mul from sympy.core.relational import Equality, Relational from sympy.core.singleton import S from sympy.core.symbol import Symbol, Dummy from sympy.core.sympify import sympify from sympy.functions.elementary.piecewise import (piecewise_fold, Piecewise) from sympy.logic.boolalg import BooleanFunction from sympy.matrices import Matrix from sympy.tensor.indexed import Idx from sympy.sets.sets import Interval from sympy.sets.fancysets import Range from sympy.utilities import flatten from sympy.utilities.iterables import sift def _common_new(cls, function, *symbols, **assumptions): """Return either a special return value or the tuple, (function, limits, orientation). This code is common to both ExprWithLimits and AddWithLimits.""" function = sympify(function) if hasattr(function, 'func') and isinstance(function, Equality): lhs = function.lhs rhs = function.rhs return Equality(cls(lhs, *symbols, **assumptions), \ cls(rhs, *symbols, **assumptions)) if function is S.NaN: return S.NaN if symbols: limits, orientation = _process_limits(*symbols) for i, li in enumerate(limits): if len(li) == 4: function = function.subs(li[0], li[-1]) limits[i] = tuple(li[:-1]) else: # symbol not provided -- we can still try to compute a general form free = function.free_symbols if len(free) != 1: raise ValueError( "specify dummy variables for %s" % function) limits, orientation = [Tuple(s) for s in free], 1 # denest any nested calls while cls == type(function): limits = list(function.limits) + limits function = function.function # Any embedded piecewise functions need to be brought out to the # top level. We only fold Piecewise that contain the integration # variable. reps = {} symbols_of_integration = set([i[0] for i in limits]) for p in function.atoms(Piecewise): if not p.has(*symbols_of_integration): reps[p] = Dummy() # mask off those that don't function = function.xreplace(reps) # do the fold function = piecewise_fold(function) # remove the masking function = function.xreplace({v: k for k, v in reps.items()}) return function, limits, orientation def _process_limits(*symbols): """Process the list of symbols and convert them to canonical limits, storing them as Tuple(symbol, lower, upper). The orientation of the function is also returned when the upper limit is missing so (x, 1, None) becomes (x, None, 1) and the orientation is changed. """ limits = [] orientation = 1 for V in symbols: if isinstance(V, (Relational, BooleanFunction)): variable = V.atoms(Symbol).pop() V = (variable, V.as_set()) if isinstance(V, Symbol) or getattr(V, '_diff_wrt', False): if isinstance(V, Idx): if V.lower is None or V.upper is None: limits.append(Tuple(V)) else: limits.append(Tuple(V, V.lower, V.upper)) else: limits.append(Tuple(V)) continue elif is_sequence(V, Tuple): if len(V) == 2 and isinstance(V[1], Range): lo = V[1].inf hi = V[1].sup dx = abs(V[1].step) V = [V[0]] + [0, (hi - lo)//dx, dx*V[0] + lo] V = sympify(flatten(V)) # a list of sympified elements if isinstance(V[0], (Symbol, Idx)) or getattr(V[0], '_diff_wrt', False): newsymbol = V[0] if len(V) == 2 and isinstance(V[1], Interval): # 2 -> 3 # Interval V[1:] = [V[1].start, V[1].end] elif len(V) == 3: # general case if V[2] is None and not V[1] is None: orientation *= -1 V = [newsymbol] + [i for i in V[1:] if i is not None] if not isinstance(newsymbol, Idx) or len(V) == 3: if len(V) == 4: limits.append(Tuple(*V)) continue if len(V) == 3: if isinstance(newsymbol, Idx): # Idx represents an integer which may have # specified values it can take on; if it is # given such a value, an error is raised here # if the summation would try to give it a larger # or smaller value than permitted. None and Symbolic # values will not raise an error. lo, hi = newsymbol.lower, newsymbol.upper try: if lo is not None and not bool(V[1] >= lo): raise ValueError("Summation will set Idx value too low.") except TypeError: pass try: if hi is not None and not bool(V[2] <= hi): raise ValueError("Summation will set Idx value too high.") except TypeError: pass limits.append(Tuple(*V)) continue if len(V) == 1 or (len(V) == 2 and V[1] is None): limits.append(Tuple(newsymbol)) continue elif len(V) == 2: limits.append(Tuple(newsymbol, V[1])) continue raise ValueError('Invalid limits given: %s' % str(symbols)) return limits, orientation class ExprWithLimits(Expr): __slots__ = ['is_commutative'] def __new__(cls, function, *symbols, **assumptions): pre = _common_new(cls, function, *symbols, **assumptions) if type(pre) is tuple: function, limits, _ = pre else: return pre # limits must have upper and lower bounds; the indefinite form # is not supported. This restriction does not apply to AddWithLimits if any(len(l) != 3 or None in l for l in limits): raise ValueError('ExprWithLimits requires values for lower and upper bounds.') obj = Expr.__new__(cls, **assumptions) arglist = [function] arglist.extend(limits) obj._args = tuple(arglist) obj.is_commutative = function.is_commutative # limits already checked return obj @property def function(self): """Return the function applied across limits. Examples ======== >>> from sympy import Integral >>> from sympy.abc import x >>> Integral(x**2, (x,)).function x**2 See Also ======== limits, variables, free_symbols """ return self._args[0] @property def limits(self): """Return the limits of expression. Examples ======== >>> from sympy import Integral >>> from sympy.abc import x, i >>> Integral(x**i, (i, 1, 3)).limits ((i, 1, 3),) See Also ======== function, variables, free_symbols """ return self._args[1:] @property def variables(self): """Return a list of the limit variables. >>> from sympy import Sum >>> from sympy.abc import x, i >>> Sum(x**i, (i, 1, 3)).variables [i] See Also ======== function, limits, free_symbols as_dummy : Rename dummy variables transform : Perform mapping on the dummy variable """ return [l[0] for l in self.limits] @property def bound_symbols(self): """Return only variables that are dummy variables. Examples ======== >>> from sympy import Integral >>> from sympy.abc import x, i, j, k >>> Integral(x**i, (i, 1, 3), (j, 2), k).bound_symbols [i, j] See Also ======== function, limits, free_symbols as_dummy : Rename dummy variables transform : Perform mapping on the dummy variable """ return [l[0] for l in self.limits if len(l) != 1] @property def free_symbols(self): """ This method returns the symbols in the object, excluding those that take on a specific value (i.e. the dummy symbols). Examples ======== >>> from sympy import Sum >>> from sympy.abc import x, y >>> Sum(x, (x, y, 1)).free_symbols {y} """ # don't test for any special values -- nominal free symbols # should be returned, e.g. don't return set() if the # function is zero -- treat it like an unevaluated expression. function, limits = self.function, self.limits isyms = function.free_symbols for xab in limits: if len(xab) == 1: isyms.add(xab[0]) continue # take out the target symbol if xab[0] in isyms: isyms.remove(xab[0]) # add in the new symbols for i in xab[1:]: isyms.update(i.free_symbols) return isyms @property def is_number(self): """Return True if the Sum has no free symbols, else False.""" return not self.free_symbols def _eval_interval(self, x, a, b): limits = [(i if i[0] != x else (x, a, b)) for i in self.limits] integrand = self.function return self.func(integrand, *limits) def _eval_subs(self, old, new): """ Perform substitutions over non-dummy variables of an expression with limits. Also, can be used to specify point-evaluation of an abstract antiderivative. Examples ======== >>> from sympy import Sum, oo >>> from sympy.abc import s, n >>> Sum(1/n**s, (n, 1, oo)).subs(s, 2) Sum(n**(-2), (n, 1, oo)) >>> from sympy import Integral >>> from sympy.abc import x, a >>> Integral(a*x**2, x).subs(x, 4) Integral(a*x**2, (x, 4)) See Also ======== variables : Lists the integration variables transform : Perform mapping on the dummy variable for integrals change_index : Perform mapping on the sum and product dummy variables """ from sympy.core.function import AppliedUndef, UndefinedFunction func, limits = self.function, list(self.limits) # If one of the expressions we are replacing is used as a func index # one of two things happens. # - the old variable first appears as a free variable # so we perform all free substitutions before it becomes # a func index. # - the old variable first appears as a func index, in # which case we ignore. See change_index. # Reorder limits to match standard mathematical practice for scoping limits.reverse() if not isinstance(old, Symbol) or \ old.free_symbols.intersection(self.free_symbols): sub_into_func = True for i, xab in enumerate(limits): if 1 == len(xab) and old == xab[0]: if new._diff_wrt: xab = (new,) else: xab = (old, old) limits[i] = Tuple(xab[0], *[l._subs(old, new) for l in xab[1:]]) if len(xab[0].free_symbols.intersection(old.free_symbols)) != 0: sub_into_func = False break if isinstance(old, AppliedUndef) or isinstance(old, UndefinedFunction): sy2 = set(self.variables).intersection(set(new.atoms(Symbol))) sy1 = set(self.variables).intersection(set(old.args)) if not sy2.issubset(sy1): raise ValueError( "substitution can not create dummy dependencies") sub_into_func = True if sub_into_func: func = func.subs(old, new) else: # old is a Symbol and a dummy variable of some limit for i, xab in enumerate(limits): if len(xab) == 3: limits[i] = Tuple(xab[0], *[l._subs(old, new) for l in xab[1:]]) if old == xab[0]: break # simplify redundant limits (x, x) to (x, ) for i, xab in enumerate(limits): if len(xab) == 2 and (xab[0] - xab[1]).is_zero: limits[i] = Tuple(xab[0], ) # Reorder limits back to representation-form limits.reverse() return self.func(func, *limits) class AddWithLimits(ExprWithLimits): r"""Represents unevaluated oriented additions. Parent class for Integral and Sum. """ def __new__(cls, function, *symbols, **assumptions): pre = _common_new(cls, function, *symbols, **assumptions) if type(pre) is tuple: function, limits, orientation = pre else: return pre obj = Expr.__new__(cls, **assumptions) arglist = [orientation*function] # orientation not used in ExprWithLimits arglist.extend(limits) obj._args = tuple(arglist) obj.is_commutative = function.is_commutative # limits already checked return obj def _eval_adjoint(self): if all([x.is_real for x in flatten(self.limits)]): return self.func(self.function.adjoint(), *self.limits) return None def _eval_conjugate(self): if all([x.is_real for x in flatten(self.limits)]): return self.func(self.function.conjugate(), *self.limits) return None def _eval_transpose(self): if all([x.is_real for x in flatten(self.limits)]): return self.func(self.function.transpose(), *self.limits) return None def _eval_factor(self, **hints): if 1 == len(self.limits): summand = self.function.factor(**hints) if summand.is_Mul: out = sift(summand.args, lambda w: w.is_commutative \ and not set(self.variables) & w.free_symbols) return Mul(*out[True])*self.func(Mul(*out[False]), \ *self.limits) else: summand = self.func(self.function, *self.limits[0:-1]).factor() if not summand.has(self.variables[-1]): return self.func(1, [self.limits[-1]]).doit()*summand elif isinstance(summand, Mul): return self.func(summand, self.limits[-1]).factor() return self def _eval_expand_basic(self, **hints): from sympy.matrices.matrices import MatrixBase summand = self.function.expand(**hints) if summand.is_Add and summand.is_commutative: return Add(*[self.func(i, *self.limits) for i in summand.args]) elif isinstance(summand, MatrixBase): return summand.applyfunc(lambda x: self.func(x, *self.limits)) elif summand != self.function: return self.func(summand, *self.limits) return self

6da50dccc16ff8447129b1e91a1933ffc4110096e71c5d024d81e5907dea1d11

from __future__ import print_function, division from sympy.calculus.singularities import is_decreasing from sympy.calculus.util import AccumulationBounds from sympy.concrete.expr_with_limits import AddWithLimits from sympy.concrete.expr_with_intlimits import ExprWithIntLimits from sympy.concrete.gosper import gosper_sum from sympy.core.add import Add from sympy.core.compatibility import range from sympy.core.function import Derivative from sympy.core.mul import Mul from sympy.core.relational import Eq from sympy.core.singleton import S from sympy.core.symbol import Dummy, Wild, Symbol from sympy.functions.special.zeta_functions import zeta from sympy.functions.elementary.piecewise import Piecewise from sympy.logic.boolalg import And from sympy.polys import apart, PolynomialError, together from sympy.series.limitseq import limit_seq from sympy.series.order import O from sympy.sets.sets import FiniteSet from sympy.simplify import denom from sympy.simplify.combsimp import combsimp from sympy.simplify.powsimp import powsimp from sympy.solvers import solve from sympy.solvers.solveset import solveset import itertools class Sum(AddWithLimits, ExprWithIntLimits): r"""Represents unevaluated summation. ``Sum`` represents a finite or infinite series, with the first argument being the general form of terms in the series, and the second argument being ``(dummy_variable, start, end)``, with ``dummy_variable`` taking all integer values from ``start`` through ``end``. In accordance with long-standing mathematical convention, the end term is included in the summation. Finite sums =========== For finite sums (and sums with symbolic limits assumed to be finite) we follow the summation convention described by Karr [1], especially definition 3 of section 1.4. The sum: .. math:: \sum_{m \leq i < n} f(i) has *the obvious meaning* for `m < n`, namely: .. math:: \sum_{m \leq i < n} f(i) = f(m) + f(m+1) + \ldots + f(n-2) + f(n-1) with the upper limit value `f(n)` excluded. The sum over an empty set is zero if and only if `m = n`: .. math:: \sum_{m \leq i < n} f(i) = 0 \quad \mathrm{for} \quad m = n Finally, for all other sums over empty sets we assume the following definition: .. math:: \sum_{m \leq i < n} f(i) = - \sum_{n \leq i < m} f(i) \quad \mathrm{for} \quad m > n It is important to note that Karr defines all sums with the upper limit being exclusive. This is in contrast to the usual mathematical notation, but does not affect the summation convention. Indeed we have: .. math:: \sum_{m \leq i < n} f(i) = \sum_{i = m}^{n - 1} f(i) where the difference in notation is intentional to emphasize the meaning, with limits typeset on the top being inclusive. Examples ======== >>> from sympy.abc import i, k, m, n, x >>> from sympy import Sum, factorial, oo, IndexedBase, Function >>> Sum(k, (k, 1, m)) Sum(k, (k, 1, m)) >>> Sum(k, (k, 1, m)).doit() m**2/2 + m/2 >>> Sum(k**2, (k, 1, m)) Sum(k**2, (k, 1, m)) >>> Sum(k**2, (k, 1, m)).doit() m**3/3 + m**2/2 + m/6 >>> Sum(x**k, (k, 0, oo)) Sum(x**k, (k, 0, oo)) >>> Sum(x**k, (k, 0, oo)).doit() Piecewise((1/(1 - x), Abs(x) < 1), (Sum(x**k, (k, 0, oo)), True)) >>> Sum(x**k/factorial(k), (k, 0, oo)).doit() exp(x) Here are examples to do summation with symbolic indices. You can use either Function of IndexedBase classes: >>> f = Function('f') >>> Sum(f(n), (n, 0, 3)).doit() f(0) + f(1) + f(2) + f(3) >>> Sum(f(n), (n, 0, oo)).doit() Sum(f(n), (n, 0, oo)) >>> f = IndexedBase('f') >>> Sum(f[n]**2, (n, 0, 3)).doit() f[0]**2 + f[1]**2 + f[2]**2 + f[3]**2 An example showing that the symbolic result of a summation is still valid for seemingly nonsensical values of the limits. Then the Karr convention allows us to give a perfectly valid interpretation to those sums by interchanging the limits according to the above rules: >>> S = Sum(i, (i, 1, n)).doit() >>> S n**2/2 + n/2 >>> S.subs(n, -4) 6 >>> Sum(i, (i, 1, -4)).doit() 6 >>> Sum(-i, (i, -3, 0)).doit() 6 An explicit example of the Karr summation convention: >>> S1 = Sum(i**2, (i, m, m+n-1)).doit() >>> S1 m**2*n + m*n**2 - m*n + n**3/3 - n**2/2 + n/6 >>> S2 = Sum(i**2, (i, m+n, m-1)).doit() >>> S2 -m**2*n - m*n**2 + m*n - n**3/3 + n**2/2 - n/6 >>> S1 + S2 0 >>> S3 = Sum(i, (i, m, m-1)).doit() >>> S3 0 See Also ======== summation Product, product References ========== .. [1] Michael Karr, "Summation in Finite Terms", Journal of the ACM, Volume 28 Issue 2, April 1981, Pages 305-350 http://dl.acm.org/citation.cfm?doid=322248.322255 .. [2] https://en.wikipedia.org/wiki/Summation#Capital-sigma_notation .. [3] https://en.wikipedia.org/wiki/Empty_sum """ __slots__ = ['is_commutative'] def __new__(cls, function, *symbols, **assumptions): obj = AddWithLimits.__new__(cls, function, *symbols, **assumptions) if not hasattr(obj, 'limits'): return obj if any(len(l) != 3 or None in l for l in obj.limits): raise ValueError('Sum requires values for lower and upper bounds.') return obj def _eval_is_zero(self): # a Sum is only zero if its function is zero or if all terms # cancel out. This only answers whether the summand is zero; if # not then None is returned since we don't analyze whether all # terms cancel out. if self.function.is_zero: return True def doit(self, **hints): if hints.get('deep', True): f = self.function.doit(**hints) else: f = self.function if self.function.is_Matrix: expanded = self.expand() if self != expanded: return expanded.doit() return self for n, limit in enumerate(self.limits): i, a, b = limit dif = b - a if dif.is_integer and (dif < 0) == True: a, b = b + 1, a - 1 f = -f newf = eval_sum(f, (i, a, b)) if newf is None: if f == self.function: zeta_function = self.eval_zeta_function(f, (i, a, b)) if zeta_function is not None: return zeta_function return self else: return self.func(f, *self.limits[n:]) f = newf if hints.get('deep', True): # eval_sum could return partially unevaluated # result with Piecewise. In this case we won't # doit() recursively. if not isinstance(f, Piecewise): return f.doit(**hints) return f def eval_zeta_function(self, f, limits): """ Check whether the function matches with the zeta function. If it matches, then return a `Piecewise` expression because zeta function does not converge unless `s > 1` and `q > 0` """ i, a, b = limits w, y, z = Wild('w', exclude=[i]), Wild('y', exclude=[i]), Wild('z', exclude=[i]) result = f.match((w * i + y) ** (-z)) if result is not None and b == S.Infinity: coeff = 1 / result[w] ** result[z] s = result[z] q = result[y] / result[w] + a return Piecewise((coeff * zeta(s, q), And(q > 0, s > 1)), (self, True)) def _eval_derivative(self, x): """ Differentiate wrt x as long as x is not in the free symbols of any of the upper or lower limits. Sum(a*b*x, (x, 1, a)) can be differentiated wrt x or b but not `a` since the value of the sum is discontinuous in `a`. In a case involving a limit variable, the unevaluated derivative is returned. """ # diff already confirmed that x is in the free symbols of self, but we # don't want to differentiate wrt any free symbol in the upper or lower # limits # XXX remove this test for free_symbols when the default _eval_derivative is in if isinstance(x, Symbol) and x not in self.free_symbols: return S.Zero # get limits and the function f, limits = self.function, list(self.limits) limit = limits.pop(-1) if limits: # f is the argument to a Sum f = self.func(f, *limits) if len(limit) == 3: _, a, b = limit if x in a.free_symbols or x in b.free_symbols: return None df = Derivative(f, x, evaluate=True) rv = self.func(df, limit) return rv else: return NotImplementedError('Lower and upper bound expected.') def _eval_difference_delta(self, n, step): k, _, upper = self.args[-1] new_upper = upper.subs(n, n + step) if len(self.args) == 2: f = self.args[0] else: f = self.func(*self.args[:-1]) return Sum(f, (k, upper + 1, new_upper)).doit() def _eval_simplify(self, **kwargs): from sympy.simplify.simplify import factor_sum, sum_combine from sympy.core.function import expand from sympy.core.mul import Mul # split the function into adds terms = Add.make_args(expand(self.function)) s_t = [] # Sum Terms o_t = [] # Other Terms for term in terms: if term.has(Sum): # if there is an embedded sum here # it is of the form x * (Sum(whatever)) # hence we make a Mul out of it, and simplify all interior sum terms subterms = Mul.make_args(expand(term)) out_terms = [] for subterm in subterms: # go through each term if isinstance(subterm, Sum): # if it's a sum, simplify it out_terms.append(subterm._eval_simplify()) else: # otherwise, add it as is out_terms.append(subterm) # turn it back into a Mul s_t.append(Mul(*out_terms)) else: o_t.append(term) # next try to combine any interior sums for further simplification result = Add(sum_combine(s_t), *o_t) return factor_sum(result, limits=self.limits) def _eval_summation(self, f, x): return None def is_convergent(self): r"""Checks for the convergence of a Sum. We divide the study of convergence of infinite sums and products in two parts. First Part: One part is the question whether all the terms are well defined, i.e., they are finite in a sum and also non-zero in a product. Zero is the analogy of (minus) infinity in products as :math:`e^{-\infty} = 0`. Second Part: The second part is the question of convergence after infinities, and zeros in products, have been omitted assuming that their number is finite. This means that we only consider the tail of the sum or product, starting from some point after which all terms are well defined. For example, in a sum of the form: .. math:: \sum_{1 \leq i < \infty} \frac{1}{n^2 + an + b} where a and b are numbers. The routine will return true, even if there are infinities in the term sequence (at most two). An analogous product would be: .. math:: \prod_{1 \leq i < \infty} e^{\frac{1}{n^2 + an + b}} This is how convergence is interpreted. It is concerned with what happens at the limit. Finding the bad terms is another independent matter. Note: It is responsibility of user to see that the sum or product is well defined. There are various tests employed to check the convergence like divergence test, root test, integral test, alternating series test, comparison tests, Dirichlet tests. It returns true if Sum is convergent and false if divergent and NotImplementedError if it can not be checked. References ========== .. [1] https://en.wikipedia.org/wiki/Convergence_tests Examples ======== >>> from sympy import factorial, S, Sum, Symbol, oo >>> n = Symbol('n', integer=True) >>> Sum(n/(n - 1), (n, 4, 7)).is_convergent() True >>> Sum(n/(2*n + 1), (n, 1, oo)).is_convergent() False >>> Sum(factorial(n)/5**n, (n, 1, oo)).is_convergent() False >>> Sum(1/n**(S(6)/5), (n, 1, oo)).is_convergent() True See Also ======== Sum.is_absolutely_convergent() Product.is_convergent() """ from sympy import Interval, Integral, log, symbols, simplify p, q, r = symbols('p q r', cls=Wild) sym = self.limits[0][0] lower_limit = self.limits[0][1] upper_limit = self.limits[0][2] sequence_term = self.function if len(sequence_term.free_symbols) > 1: raise NotImplementedError("convergence checking for more than one symbol " "containing series is not handled") if lower_limit.is_finite and upper_limit.is_finite: return S.true # transform sym -> -sym and swap the upper_limit = S.Infinity # and lower_limit = - upper_limit if lower_limit is S.NegativeInfinity: if upper_limit is S.Infinity: return Sum(sequence_term, (sym, 0, S.Infinity)).is_convergent() and \ Sum(sequence_term, (sym, S.NegativeInfinity, 0)).is_convergent() sequence_term = simplify(sequence_term.xreplace({sym: -sym})) lower_limit = -upper_limit upper_limit = S.Infinity sym_ = Dummy(sym.name, integer=True, positive=True) sequence_term = sequence_term.xreplace({sym: sym_}) sym = sym_ interval = Interval(lower_limit, upper_limit) # Piecewise function handle if sequence_term.is_Piecewise: for func, cond in sequence_term.args: # see if it represents something going to oo if cond == True or cond.as_set().sup is S.Infinity: s = Sum(func, (sym, lower_limit, upper_limit)) return s.is_convergent() return S.true ### -------- Divergence test ----------- ### try: lim_val = limit_seq(sequence_term, sym) if lim_val is not None and lim_val.is_zero is False: return S.false except NotImplementedError: pass try: lim_val_abs = limit_seq(abs(sequence_term), sym) if lim_val_abs is not None and lim_val_abs.is_zero is False: return S.false except NotImplementedError: pass order = O(sequence_term, (sym, S.Infinity)) ### --------- p-series test (1/n**p) ---------- ### p1_series_test = order.expr.match(sym**p) if p1_series_test is not None: if p1_series_test[p] < -1: return S.true if p1_series_test[p] >= -1: return S.false p2_series_test = order.expr.match((1/sym)**p) if p2_series_test is not None: if p2_series_test[p] > 1: return S.true if p2_series_test[p] <= 1: return S.false ### ------------- comparison test ------------- ### # 1/(n**p*log(n)**q*log(log(n))**r) comparison n_log_test = order.expr.match(1/(sym**p*log(sym)**q*log(log(sym))**r)) if n_log_test is not None: if (n_log_test[p] > 1 or (n_log_test[p] == 1 and n_log_test[q] > 1) or (n_log_test[p] == n_log_test[q] == 1 and n_log_test[r] > 1)): return S.true return S.false ### ------------- Limit comparison test -----------### # (1/n) comparison try: lim_comp = limit_seq(sym*sequence_term, sym) if lim_comp is not None and lim_comp.is_number and lim_comp > 0: return S.false except NotImplementedError: pass ### ----------- ratio test ---------------- ### next_sequence_term = sequence_term.xreplace({sym: sym + 1}) ratio = combsimp(powsimp(next_sequence_term/sequence_term)) try: lim_ratio = limit_seq(ratio, sym) if lim_ratio is not None and lim_ratio.is_number: if abs(lim_ratio) > 1: return S.false if abs(lim_ratio) < 1: return S.true except NotImplementedError: pass ### ----------- root test ---------------- ### # lim = Limit(abs(sequence_term)**(1/sym), sym, S.Infinity) try: lim_evaluated = limit_seq(abs(sequence_term)**(1/sym), sym) if lim_evaluated is not None and lim_evaluated.is_number: if lim_evaluated < 1: return S.true if lim_evaluated > 1: return S.false except NotImplementedError: pass ### ------------- alternating series test ----------- ### dict_val = sequence_term.match((-1)**(sym + p)*q) if not dict_val[p].has(sym) and is_decreasing(dict_val[q], interval): return S.true ### ------------- integral test -------------- ### check_interval = None maxima = solveset(sequence_term.diff(sym), sym, interval) if not maxima: check_interval = interval elif isinstance(maxima, FiniteSet) and maxima.sup.is_number: check_interval = Interval(maxima.sup, interval.sup) if (check_interval is not None and (is_decreasing(sequence_term, check_interval) or is_decreasing(-sequence_term, check_interval))): integral_val = Integral( sequence_term, (sym, lower_limit, upper_limit)) try: integral_val_evaluated = integral_val.doit() if integral_val_evaluated.is_number: return S(integral_val_evaluated.is_finite) except NotImplementedError: pass ### ----- Dirichlet and bounded times convergent tests ----- ### # TODO # # Dirichlet_test # https://en.wikipedia.org/wiki/Dirichlet%27s_test # # Bounded times convergent test # It is based on comparison theorems for series. # In particular, if the general term of a series can # be written as a product of two terms a_n and b_n # and if a_n is bounded and if Sum(b_n) is absolutely # convergent, then the original series Sum(a_n * b_n) # is absolutely convergent and so convergent. # # The following code can grows like 2**n where n is the # number of args in order.expr # Possibly combined with the potentially slow checks # inside the loop, could make this test extremely slow # for larger summation expressions. if order.expr.is_Mul: args = order.expr.args argset = set(args) ### -------------- Dirichlet tests -------------- ### m = Dummy('m', integer=True) def _dirichlet_test(g_n): try: ing_val = limit_seq(Sum(g_n, (sym, interval.inf, m)).doit(), m) if ing_val is not None and ing_val.is_finite: return S.true except NotImplementedError: pass ### -------- bounded times convergent test ---------### def _bounded_convergent_test(g1_n, g2_n): try: lim_val = limit_seq(g1_n, sym) if lim_val is not None and (lim_val.is_finite or ( isinstance(lim_val, AccumulationBounds) and (lim_val.max - lim_val.min).is_finite)): if Sum(g2_n, (sym, lower_limit, upper_limit)).is_absolutely_convergent(): return S.true except NotImplementedError: pass for n in range(1, len(argset)): for a_tuple in itertools.combinations(args, n): b_set = argset - set(a_tuple) a_n = Mul(*a_tuple) b_n = Mul(*b_set) if is_decreasing(a_n, interval): dirich = _dirichlet_test(b_n) if dirich is not None: return dirich bc_test = _bounded_convergent_test(a_n, b_n) if bc_test is not None: return bc_test _sym = self.limits[0][0] sequence_term = sequence_term.xreplace({sym: _sym}) raise NotImplementedError("The algorithm to find the Sum convergence of %s " "is not yet implemented" % (sequence_term)) def is_absolutely_convergent(self): """ Checks for the absolute convergence of an infinite series. Same as checking convergence of absolute value of sequence_term of an infinite series. References ========== .. [1] https://en.wikipedia.org/wiki/Absolute_convergence Examples ======== >>> from sympy import Sum, Symbol, sin, oo >>> n = Symbol('n', integer=True) >>> Sum((-1)**n, (n, 1, oo)).is_absolutely_convergent() False >>> Sum((-1)**n/n**2, (n, 1, oo)).is_absolutely_convergent() True See Also ======== Sum.is_convergent() """ return Sum(abs(self.function), self.limits).is_convergent() def euler_maclaurin(self, m=0, n=0, eps=0, eval_integral=True): """ Return an Euler-Maclaurin approximation of self, where m is the number of leading terms to sum directly and n is the number of terms in the tail. With m = n = 0, this is simply the corresponding integral plus a first-order endpoint correction. Returns (s, e) where s is the Euler-Maclaurin approximation and e is the estimated error (taken to be the magnitude of the first omitted term in the tail): >>> from sympy.abc import k, a, b >>> from sympy import Sum >>> Sum(1/k, (k, 2, 5)).doit().evalf() 1.28333333333333 >>> s, e = Sum(1/k, (k, 2, 5)).euler_maclaurin() >>> s -log(2) + 7/20 + log(5) >>> from sympy import sstr >>> print(sstr((s.evalf(), e.evalf()), full_prec=True)) (1.26629073187415, 0.0175000000000000) The endpoints may be symbolic: >>> s, e = Sum(1/k, (k, a, b)).euler_maclaurin() >>> s -log(a) + log(b) + 1/(2*b) + 1/(2*a) >>> e Abs(1/(12*b**2) - 1/(12*a**2)) If the function is a polynomial of degree at most 2n+1, the Euler-Maclaurin formula becomes exact (and e = 0 is returned): >>> Sum(k, (k, 2, b)).euler_maclaurin() (b**2/2 + b/2 - 1, 0) >>> Sum(k, (k, 2, b)).doit() b**2/2 + b/2 - 1 With a nonzero eps specified, the summation is ended as soon as the remainder term is less than the epsilon. """ from sympy.functions import bernoulli, factorial from sympy.integrals import Integral m = int(m) n = int(n) f = self.function if len(self.limits) != 1: raise ValueError("More than 1 limit") i, a, b = self.limits[0] if (a > b) == True: if a - b == 1: return S.Zero, S.Zero a, b = b + 1, a - 1 f = -f s = S.Zero if m: if b.is_Integer and a.is_Integer: m = min(m, b - a + 1) if not eps or f.is_polynomial(i): for k in range(m): s += f.subs(i, a + k) else: term = f.subs(i, a) if term: test = abs(term.evalf(3)) < eps if test == True: return s, abs(term) elif not (test == False): # a symbolic Relational class, can't go further return term, S.Zero s += term for k in range(1, m): term = f.subs(i, a + k) if abs(term.evalf(3)) < eps and term != 0: return s, abs(term) s += term if b - a + 1 == m: return s, S.Zero a += m x = Dummy('x') I = Integral(f.subs(i, x), (x, a, b)) if eval_integral: I = I.doit() s += I def fpoint(expr): if b is S.Infinity: return expr.subs(i, a), 0 return expr.subs(i, a), expr.subs(i, b) fa, fb = fpoint(f) iterm = (fa + fb)/2 g = f.diff(i) for k in range(1, n + 2): ga, gb = fpoint(g) term = bernoulli(2*k)/factorial(2*k)*(gb - ga) if (eps and term and abs(term.evalf(3)) < eps) or (k > n): break s += term g = g.diff(i, 2, simplify=False) return s + iterm, abs(term) def reverse_order(self, *indices): """ Reverse the order of a limit in a Sum. Usage ===== ``reverse_order(self, *indices)`` reverses some limits in the expression ``self`` which can be either a ``Sum`` or a ``Product``. The selectors in the argument ``indices`` specify some indices whose limits get reversed. These selectors are either variable names or numerical indices counted starting from the inner-most limit tuple. Examples ======== >>> from sympy import Sum >>> from sympy.abc import x, y, a, b, c, d >>> Sum(x, (x, 0, 3)).reverse_order(x) Sum(-x, (x, 4, -1)) >>> Sum(x*y, (x, 1, 5), (y, 0, 6)).reverse_order(x, y) Sum(x*y, (x, 6, 0), (y, 7, -1)) >>> Sum(x, (x, a, b)).reverse_order(x) Sum(-x, (x, b + 1, a - 1)) >>> Sum(x, (x, a, b)).reverse_order(0) Sum(-x, (x, b + 1, a - 1)) While one should prefer variable names when specifying which limits to reverse, the index counting notation comes in handy in case there are several symbols with the same name. >>> S = Sum(x**2, (x, a, b), (x, c, d)) >>> S Sum(x**2, (x, a, b), (x, c, d)) >>> S0 = S.reverse_order(0) >>> S0 Sum(-x**2, (x, b + 1, a - 1), (x, c, d)) >>> S1 = S0.reverse_order(1) >>> S1 Sum(x**2, (x, b + 1, a - 1), (x, d + 1, c - 1)) Of course we can mix both notations: >>> Sum(x*y, (x, a, b), (y, 2, 5)).reverse_order(x, 1) Sum(x*y, (x, b + 1, a - 1), (y, 6, 1)) >>> Sum(x*y, (x, a, b), (y, 2, 5)).reverse_order(y, x) Sum(x*y, (x, b + 1, a - 1), (y, 6, 1)) See Also ======== index, reorder_limit, reorder References ========== .. [1] Michael Karr, "Summation in Finite Terms", Journal of the ACM, Volume 28 Issue 2, April 1981, Pages 305-350 http://dl.acm.org/citation.cfm?doid=322248.322255 """ l_indices = list(indices) for i, indx in enumerate(l_indices): if not isinstance(indx, int): l_indices[i] = self.index(indx) e = 1 limits = [] for i, limit in enumerate(self.limits): l = limit if i in l_indices: e = -e l = (limit[0], limit[2] + 1, limit[1] - 1) limits.append(l) return Sum(e * self.function, *limits) def summation(f, *symbols, **kwargs): r""" Compute the summation of f with respect to symbols. The notation for symbols is similar to the notation used in Integral. summation(f, (i, a, b)) computes the sum of f with respect to i from a to b, i.e., :: b ____ \ ` summation(f, (i, a, b)) = ) f /___, i = a If it cannot compute the sum, it returns an unevaluated Sum object. Repeated sums can be computed by introducing additional symbols tuples:: >>> from sympy import summation, oo, symbols, log >>> i, n, m = symbols('i n m', integer=True) >>> summation(2*i - 1, (i, 1, n)) n**2 >>> summation(1/2**i, (i, 0, oo)) 2 >>> summation(1/log(n)**n, (n, 2, oo)) Sum(log(n)**(-n), (n, 2, oo)) >>> summation(i, (i, 0, n), (n, 0, m)) m**3/6 + m**2/2 + m/3 >>> from sympy.abc import x >>> from sympy import factorial >>> summation(x**n/factorial(n), (n, 0, oo)) exp(x) See Also ======== Sum Product, product """ return Sum(f, *symbols, **kwargs).doit(deep=False) def telescopic_direct(L, R, n, limits): """Returns the direct summation of the terms of a telescopic sum L is the term with lower index R is the term with higher index n difference between the indexes of L and R For example: >>> from sympy.concrete.summations import telescopic_direct >>> from sympy.abc import k, a, b >>> telescopic_direct(1/k, -1/(k+2), 2, (k, a, b)) -1/(b + 2) - 1/(b + 1) + 1/(a + 1) + 1/a """ (i, a, b) = limits s = 0 for m in range(n): s += L.subs(i, a + m) + R.subs(i, b - m) return s def telescopic(L, R, limits): '''Tries to perform the summation using the telescopic property return None if not possible ''' (i, a, b) = limits if L.is_Add or R.is_Add: return None # We want to solve(L.subs(i, i + m) + R, m) # First we try a simple match since this does things that # solve doesn't do, e.g. solve(f(k+m)-f(k), m) fails k = Wild("k") sol = (-R).match(L.subs(i, i + k)) s = None if sol and k in sol: s = sol[k] if not (s.is_Integer and L.subs(i, i + s) == -R): # sometimes match fail(f(x+2).match(-f(x+k))->{k: -2 - 2x})) s = None # But there are things that match doesn't do that solve # can do, e.g. determine that 1/(x + m) = 1/(1 - x) when m = 1 if s is None: m = Dummy('m') try: sol = solve(L.subs(i, i + m) + R, m) or [] except NotImplementedError: return None sol = [si for si in sol if si.is_Integer and (L.subs(i, i + si) + R).expand().is_zero] if len(sol) != 1: return None s = sol[0] if s < 0: return telescopic_direct(R, L, abs(s), (i, a, b)) elif s > 0: return telescopic_direct(L, R, s, (i, a, b)) def eval_sum(f, limits): from sympy.concrete.delta import deltasummation, _has_simple_delta from sympy.functions import KroneckerDelta (i, a, b) = limits if f is S.Zero: return S.Zero if i not in f.free_symbols: return f*(b - a + 1) if a == b: return f.subs(i, a) if isinstance(f, Piecewise): if not any(i in arg.args[1].free_symbols for arg in f.args): # Piecewise conditions do not depend on the dummy summation variable, # therefore we can fold: Sum(Piecewise((e, c), ...), limits) # --> Piecewise((Sum(e, limits), c), ...) newargs = [] for arg in f.args: newexpr = eval_sum(arg.expr, limits) if newexpr is None: return None newargs.append((newexpr, arg.cond)) return f.func(*newargs) if f.has(KroneckerDelta) and _has_simple_delta(f, limits[0]): return deltasummation(f, limits) dif = b - a definite = dif.is_Integer # Doing it directly may be faster if there are very few terms. if definite and (dif < 100): return eval_sum_direct(f, (i, a, b)) if isinstance(f, Piecewise): return None # Try to do it symbolically. Even when the number of terms is known, # this can save time when b-a is big. # We should try to transform to partial fractions value = eval_sum_symbolic(f.expand(), (i, a, b)) if value is not None: return value # Do it directly if definite: return eval_sum_direct(f, (i, a, b)) def eval_sum_direct(expr, limits): from sympy.core import Add (i, a, b) = limits dif = b - a return Add(*[expr.subs(i, a + j) for j in range(dif + 1)]) def eval_sum_symbolic(f, limits): from sympy.functions import harmonic, bernoulli f_orig = f (i, a, b) = limits if not f.has(i): return f*(b - a + 1) # Linearity if f.is_Mul: L, R = f.as_two_terms() if not L.has(i): sR = eval_sum_symbolic(R, (i, a, b)) if sR: return L*sR if not R.has(i): sL = eval_sum_symbolic(L, (i, a, b)) if sL: return R*sL try: f = apart(f, i) # see if it becomes an Add except PolynomialError: pass if f.is_Add: L, R = f.as_two_terms() lrsum = telescopic(L, R, (i, a, b)) if lrsum: return lrsum lsum = eval_sum_symbolic(L, (i, a, b)) rsum = eval_sum_symbolic(R, (i, a, b)) if None not in (lsum, rsum): r = lsum + rsum if not r is S.NaN: return r # Polynomial terms with Faulhaber's formula n = Wild('n') result = f.match(i**n) if result is not None: n = result[n] if n.is_Integer: if n >= 0: if (b is S.Infinity and not a is S.NegativeInfinity) or \ (a is S.NegativeInfinity and not b is S.Infinity): return S.Infinity return ((bernoulli(n + 1, b + 1) - bernoulli(n + 1, a))/(n + 1)).expand() elif a.is_Integer and a >= 1: if n == -1: return harmonic(b) - harmonic(a - 1) else: return harmonic(b, abs(n)) - harmonic(a - 1, abs(n)) if not (a.has(S.Infinity, S.NegativeInfinity) or b.has(S.Infinity, S.NegativeInfinity)): # Geometric terms c1 = Wild('c1', exclude=[i]) c2 = Wild('c2', exclude=[i]) c3 = Wild('c3', exclude=[i]) wexp = Wild('wexp') # Here we first attempt powsimp on f for easier matching with the # exponential pattern, and attempt expansion on the exponent for easier # matching with the linear pattern. e = f.powsimp().match(c1 ** wexp) if e is not None: e_exp = e.pop(wexp).expand().match(c2*i + c3) if e_exp is not None: e.update(e_exp) if e is not None: p = (c1**c3).subs(e) q = (c1**c2).subs(e) r = p*(q**a - q**(b + 1))/(1 - q) l = p*(b - a + 1) return Piecewise((l, Eq(q, S.One)), (r, True)) r = gosper_sum(f, (i, a, b)) if isinstance(r, (Mul,Add)): from sympy import ordered, Tuple non_limit = r.free_symbols - Tuple(*limits[1:]).free_symbols den = denom(together(r)) den_sym = non_limit & den.free_symbols args = [] for v in ordered(den_sym): try: s = solve(den, v) m = Eq(v, s[0]) if s else S.false if m != False: args.append((Sum(f_orig.subs(*m.args), limits).doit(), m)) break except NotImplementedError: continue args.append((r, True)) return Piecewise(*args) if not r in (None, S.NaN): return r h = eval_sum_hyper(f_orig, (i, a, b)) if h is not None: return h factored = f_orig.factor() if factored != f_orig: return eval_sum_symbolic(factored, (i, a, b)) def _eval_sum_hyper(f, i, a): """ Returns (res, cond). Sums from a to oo. """ from sympy.functions import hyper from sympy.simplify import hyperexpand, hypersimp, fraction, simplify from sympy.polys.polytools import Poly, factor from sympy.core.numbers import Float if a != 0: return _eval_sum_hyper(f.subs(i, i + a), i, 0) if f.subs(i, 0) == 0: if simplify(f.subs(i, Dummy('i', integer=True, positive=True))) == 0: return S(0), True return _eval_sum_hyper(f.subs(i, i + 1), i, 0) hs = hypersimp(f, i) if hs is None: return None if isinstance(hs, Float): from sympy.simplify.simplify import nsimplify hs = nsimplify(hs) numer, denom = fraction(factor(hs)) top, topl = numer.as_coeff_mul(i) bot, botl = denom.as_coeff_mul(i) ab = [top, bot] factors = [topl, botl] params = [[], []] for k in range(2): for fac in factors[k]: mul = 1 if fac.is_Pow: mul = fac.exp fac = fac.base if not mul.is_Integer: return None p = Poly(fac, i) if p.degree() != 1: return None m, n = p.all_coeffs() ab[k] *= m**mul params[k] += [n/m]*mul # Add "1" to numerator parameters, to account for implicit n! in # hypergeometric series. ap = params[0] + [1] bq = params[1] x = ab[0]/ab[1] h = hyper(ap, bq, x) f = combsimp(f) return f.subs(i, 0)*hyperexpand(h), h.convergence_statement def eval_sum_hyper(f, i_a_b): from sympy.logic.boolalg import And i, a, b = i_a_b if (b - a).is_Integer: # We are never going to do better than doing the sum in the obvious way return None old_sum = Sum(f, (i, a, b)) if b != S.Infinity: if a == S.NegativeInfinity: res = _eval_sum_hyper(f.subs(i, -i), i, -b) if res is not None: return Piecewise(res, (old_sum, True)) else: res1 = _eval_sum_hyper(f, i, a) res2 = _eval_sum_hyper(f, i, b + 1) if res1 is None or res2 is None: return None (res1, cond1), (res2, cond2) = res1, res2 cond = And(cond1, cond2) if cond == False: return None return Piecewise((res1 - res2, cond), (old_sum, True)) if a == S.NegativeInfinity: res1 = _eval_sum_hyper(f.subs(i, -i), i, 1) res2 = _eval_sum_hyper(f, i, 0) if res1 is None or res2 is None: return None res1, cond1 = res1 res2, cond2 = res2 cond = And(cond1, cond2) if cond == False or cond.as_set() == S.EmptySet: return None return Piecewise((res1 + res2, cond), (old_sum, True)) # Now b == oo, a != -oo res = _eval_sum_hyper(f, i, a) if res is not None: r, c = res if c == False: if r.is_number: f = f.subs(i, Dummy('i', integer=True, positive=True) + a) if f.is_positive or f.is_zero: return S.Infinity elif f.is_negative: return S.NegativeInfinity return None return Piecewise(res, (old_sum, True))

0478c1a7845d00b2f2a19eda6967aa99bd1a4b4883bba5901d3dd6134ca50677

"""Formal Power Series""" from __future__ import print_function, division from collections import defaultdict from sympy import oo, zoo, nan from sympy.core.add import Add from sympy.core.compatibility import iterable from sympy.core.expr import Expr from sympy.core.function import Derivative, Function, expand from sympy.core.mul import Mul from sympy.core.numbers import Rational from sympy.core.relational import Eq from sympy.sets.sets import Interval from sympy.core.singleton import S from sympy.core.symbol import Wild, Dummy, symbols, Symbol from sympy.core.sympify import sympify from sympy.discrete.convolutions import convolution from sympy.functions.combinatorial.factorials import binomial, factorial, rf from sympy.functions.combinatorial.numbers import bell from sympy.functions.elementary.integers import floor, frac, ceiling from sympy.functions.elementary.miscellaneous import Min, Max from sympy.functions.elementary.piecewise import Piecewise from sympy.series.limits import Limit from sympy.series.order import Order from sympy.simplify.powsimp import powsimp from sympy.series.sequences import sequence, SeqMul from sympy.series.series_class import SeriesBase def rational_algorithm(f, x, k, order=4, full=False): """Rational algorithm for computing formula of coefficients of Formal Power Series of a function. Applicable when f(x) or some derivative of f(x) is a rational function in x. :func:`rational_algorithm` uses :func:`apart` function for partial fraction decomposition. :func:`apart` by default uses 'undetermined coefficients method'. By setting ``full=True``, 'Bronstein's algorithm' can be used instead. Looks for derivative of a function up to 4'th order (by default). This can be overridden using order option. Returns ======= formula : Expr ind : Expr Independent terms. order : int Examples ======== >>> from sympy import log, atan, I >>> from sympy.series.formal import rational_algorithm as ra >>> from sympy.abc import x, k >>> ra(1 / (1 - x), x, k) (1, 0, 0) >>> ra(log(1 + x), x, k) (-(-1)**(-k)/k, 0, 1) >>> ra(atan(x), x, k, full=True) ((-I*(-I)**(-k)/2 + I*I**(-k)/2)/k, 0, 1) Notes ===== By setting ``full=True``, range of admissible functions to be solved using ``rational_algorithm`` can be increased. This option should be used carefully as it can significantly slow down the computation as ``doit`` is performed on the :class:`RootSum` object returned by the ``apart`` function. Use ``full=False`` whenever possible. See Also ======== sympy.polys.partfrac.apart References ========== .. [1] Formal Power Series - Dominik Gruntz, Wolfram Koepf .. [2] Power Series in Computer Algebra - Wolfram Koepf """ from sympy.polys import RootSum, apart from sympy.integrals import integrate diff = f ds = [] # list of diff for i in range(order + 1): if i: diff = diff.diff(x) if diff.is_rational_function(x): coeff, sep = S.Zero, S.Zero terms = apart(diff, x, full=full) if terms.has(RootSum): terms = terms.doit() for t in Add.make_args(terms): num, den = t.as_numer_denom() if not den.has(x): sep += t else: if isinstance(den, Mul): # m*(n*x - a)**j -> (n*x - a)**j ind = den.as_independent(x) den = ind[1] num /= ind[0] # (n*x - a)**j -> (x - b) den, j = den.as_base_exp() a, xterm = den.as_coeff_add(x) # term -> m/x**n if not a: sep += t continue xc = xterm[0].coeff(x) a /= -xc num /= xc**j ak = ((-1)**j * num * binomial(j + k - 1, k).rewrite(factorial) / a**(j + k)) coeff += ak # Hacky, better way? if coeff is S.Zero: return None if (coeff.has(x) or coeff.has(zoo) or coeff.has(oo) or coeff.has(nan)): return None for j in range(i): coeff = (coeff / (k + j + 1)) sep = integrate(sep, x) sep += (ds.pop() - sep).limit(x, 0) # constant of integration return (coeff.subs(k, k - i), sep, i) else: ds.append(diff) return None def rational_independent(terms, x): """Returns a list of all the rationally independent terms. Examples ======== >>> from sympy import sin, cos >>> from sympy.series.formal import rational_independent >>> from sympy.abc import x >>> rational_independent([cos(x), sin(x)], x) [cos(x), sin(x)] >>> rational_independent([x**2, sin(x), x*sin(x), x**3], x) [x**3 + x**2, x*sin(x) + sin(x)] """ if not terms: return [] ind = terms[0:1] for t in terms[1:]: n = t.as_independent(x)[1] for i, term in enumerate(ind): d = term.as_independent(x)[1] q = (n / d).cancel() if q.is_rational_function(x): ind[i] += t break else: ind.append(t) return ind def simpleDE(f, x, g, order=4): r"""Generates simple DE. DE is of the form .. math:: f^k(x) + \sum\limits_{j=0}^{k-1} A_j f^j(x) = 0 where :math:`A_j` should be rational function in x. Generates DE's upto order 4 (default). DE's can also have free parameters. By increasing order, higher order DE's can be found. Yields a tuple of (DE, order). """ from sympy.solvers.solveset import linsolve a = symbols('a:%d' % (order)) def _makeDE(k): eq = f.diff(x, k) + Add(*[a[i]*f.diff(x, i) for i in range(0, k)]) DE = g(x).diff(x, k) + Add(*[a[i]*g(x).diff(x, i) for i in range(0, k)]) return eq, DE found = False for k in range(1, order + 1): eq, DE = _makeDE(k) eq = eq.expand() terms = eq.as_ordered_terms() ind = rational_independent(terms, x) if found or len(ind) == k: sol = dict(zip(a, (i for s in linsolve(ind, a[:k]) for i in s))) if sol: found = True DE = DE.subs(sol) DE = DE.as_numer_denom()[0] DE = DE.factor().as_coeff_mul(Derivative)[1][0] yield DE.collect(Derivative(g(x))), k def exp_re(DE, r, k): """Converts a DE with constant coefficients (explike) into a RE. Performs the substitution: .. math:: f^j(x) \\to r(k + j) Normalises the terms so that lowest order of a term is always r(k). Examples ======== >>> from sympy import Function, Derivative >>> from sympy.series.formal import exp_re >>> from sympy.abc import x, k >>> f, r = Function('f'), Function('r') >>> exp_re(-f(x) + Derivative(f(x)), r, k) -r(k) + r(k + 1) >>> exp_re(Derivative(f(x), x) + Derivative(f(x), (x, 2)), r, k) r(k) + r(k + 1) See Also ======== sympy.series.formal.hyper_re """ RE = S.Zero g = DE.atoms(Function).pop() mini = None for t in Add.make_args(DE): coeff, d = t.as_independent(g) if isinstance(d, Derivative): j = d.derivative_count else: j = 0 if mini is None or j < mini: mini = j RE += coeff * r(k + j) if mini: RE = RE.subs(k, k - mini) return RE def hyper_re(DE, r, k): """Converts a DE into a RE. Performs the substitution: .. math:: x^l f^j(x) \\to (k + 1 - l)_j . a_{k + j - l} Normalises the terms so that lowest order of a term is always r(k). Examples ======== >>> from sympy import Function, Derivative >>> from sympy.series.formal import hyper_re >>> from sympy.abc import x, k >>> f, r = Function('f'), Function('r') >>> hyper_re(-f(x) + Derivative(f(x)), r, k) (k + 1)*r(k + 1) - r(k) >>> hyper_re(-x*f(x) + Derivative(f(x), (x, 2)), r, k) (k + 2)*(k + 3)*r(k + 3) - r(k) See Also ======== sympy.series.formal.exp_re """ RE = S.Zero g = DE.atoms(Function).pop() x = g.atoms(Symbol).pop() mini = None for t in Add.make_args(DE.expand()): coeff, d = t.as_independent(g) c, v = coeff.as_independent(x) l = v.as_coeff_exponent(x)[1] if isinstance(d, Derivative): j = d.derivative_count else: j = 0 RE += c * rf(k + 1 - l, j) * r(k + j - l) if mini is None or j - l < mini: mini = j - l RE = RE.subs(k, k - mini) m = Wild('m') return RE.collect(r(k + m)) def _transformation_a(f, x, P, Q, k, m, shift): f *= x**(-shift) P = P.subs(k, k + shift) Q = Q.subs(k, k + shift) return f, P, Q, m def _transformation_c(f, x, P, Q, k, m, scale): f = f.subs(x, x**scale) P = P.subs(k, k / scale) Q = Q.subs(k, k / scale) m *= scale return f, P, Q, m def _transformation_e(f, x, P, Q, k, m): f = f.diff(x) P = P.subs(k, k + 1) * (k + m + 1) Q = Q.subs(k, k + 1) * (k + 1) return f, P, Q, m def _apply_shift(sol, shift): return [(res, cond + shift) for res, cond in sol] def _apply_scale(sol, scale): return [(res, cond / scale) for res, cond in sol] def _apply_integrate(sol, x, k): return [(res / ((cond + 1)*(cond.as_coeff_Add()[1].coeff(k))), cond + 1) for res, cond in sol] def _compute_formula(f, x, P, Q, k, m, k_max): """Computes the formula for f.""" from sympy.polys import roots sol = [] for i in range(k_max + 1, k_max + m + 1): if (i < 0) == True: continue r = f.diff(x, i).limit(x, 0) / factorial(i) if r is S.Zero: continue kterm = m*k + i res = r p = P.subs(k, kterm) q = Q.subs(k, kterm) c1 = p.subs(k, 1/k).leadterm(k)[0] c2 = q.subs(k, 1/k).leadterm(k)[0] res *= (-c1 / c2)**k for r, mul in roots(p, k).items(): res *= rf(-r, k)**mul for r, mul in roots(q, k).items(): res /= rf(-r, k)**mul sol.append((res, kterm)) return sol def _rsolve_hypergeometric(f, x, P, Q, k, m): """Recursive wrapper to rsolve_hypergeometric. Returns a Tuple of (formula, series independent terms, maximum power of x in independent terms) if successful otherwise ``None``. See :func:`rsolve_hypergeometric` for details. """ from sympy.polys import lcm, roots from sympy.integrals import integrate # transformation - c proots, qroots = roots(P, k), roots(Q, k) all_roots = dict(proots) all_roots.update(qroots) scale = lcm([r.as_numer_denom()[1] for r, t in all_roots.items() if r.is_rational]) f, P, Q, m = _transformation_c(f, x, P, Q, k, m, scale) # transformation - a qroots = roots(Q, k) if qroots: k_min = Min(*qroots.keys()) else: k_min = S.Zero shift = k_min + m f, P, Q, m = _transformation_a(f, x, P, Q, k, m, shift) l = (x*f).limit(x, 0) if not isinstance(l, Limit) and l != 0: # Ideally should only be l != 0 return None qroots = roots(Q, k) if qroots: k_max = Max(*qroots.keys()) else: k_max = S.Zero ind, mp = S.Zero, -oo for i in range(k_max + m + 1): r = f.diff(x, i).limit(x, 0) / factorial(i) if r.is_finite is False: old_f = f f, P, Q, m = _transformation_a(f, x, P, Q, k, m, i) f, P, Q, m = _transformation_e(f, x, P, Q, k, m) sol, ind, mp = _rsolve_hypergeometric(f, x, P, Q, k, m) sol = _apply_integrate(sol, x, k) sol = _apply_shift(sol, i) ind = integrate(ind, x) ind += (old_f - ind).limit(x, 0) # constant of integration mp += 1 return sol, ind, mp elif r: ind += r*x**(i + shift) pow_x = Rational((i + shift), scale) if pow_x > mp: mp = pow_x # maximum power of x ind = ind.subs(x, x**(1/scale)) sol = _compute_formula(f, x, P, Q, k, m, k_max) sol = _apply_shift(sol, shift) sol = _apply_scale(sol, scale) return sol, ind, mp def rsolve_hypergeometric(f, x, P, Q, k, m): """Solves RE of hypergeometric type. Attempts to solve RE of the form Q(k)*a(k + m) - P(k)*a(k) Transformations that preserve Hypergeometric type: a. x**n*f(x): b(k + m) = R(k - n)*b(k) b. f(A*x): b(k + m) = A**m*R(k)*b(k) c. f(x**n): b(k + n*m) = R(k/n)*b(k) d. f(x**(1/m)): b(k + 1) = R(k*m)*b(k) e. f'(x): b(k + m) = ((k + m + 1)/(k + 1))*R(k + 1)*b(k) Some of these transformations have been used to solve the RE. Returns ======= formula : Expr ind : Expr Independent terms. order : int Examples ======== >>> from sympy import exp, ln, S >>> from sympy.series.formal import rsolve_hypergeometric as rh >>> from sympy.abc import x, k >>> rh(exp(x), x, -S.One, (k + 1), k, 1) (Piecewise((1/factorial(k), Eq(Mod(k, 1), 0)), (0, True)), 1, 1) >>> rh(ln(1 + x), x, k**2, k*(k + 1), k, 1) (Piecewise(((-1)**(k - 1)*factorial(k - 1)/RisingFactorial(2, k - 1), Eq(Mod(k, 1), 0)), (0, True)), x, 2) References ========== .. [1] Formal Power Series - Dominik Gruntz, Wolfram Koepf .. [2] Power Series in Computer Algebra - Wolfram Koepf """ result = _rsolve_hypergeometric(f, x, P, Q, k, m) if result is None: return None sol_list, ind, mp = result sol_dict = defaultdict(lambda: S.Zero) for res, cond in sol_list: j, mk = cond.as_coeff_Add() c = mk.coeff(k) if j.is_integer is False: res *= x**frac(j) j = floor(j) res = res.subs(k, (k - j) / c) cond = Eq(k % c, j % c) sol_dict[cond] += res # Group together formula for same conditions sol = [] for cond, res in sol_dict.items(): sol.append((res, cond)) sol.append((S.Zero, True)) sol = Piecewise(*sol) if mp is -oo: s = S.Zero elif mp.is_integer is False: s = ceiling(mp) else: s = mp + 1 # save all the terms of # form 1/x**k in ind if s < 0: ind += sum(sequence(sol * x**k, (k, s, -1))) s = S.Zero return (sol, ind, s) def _solve_hyper_RE(f, x, RE, g, k): """See docstring of :func:`rsolve_hypergeometric` for details.""" terms = Add.make_args(RE) if len(terms) == 2: gs = list(RE.atoms(Function)) P, Q = map(RE.coeff, gs) m = gs[1].args[0] - gs[0].args[0] if m < 0: P, Q = Q, P m = abs(m) return rsolve_hypergeometric(f, x, P, Q, k, m) def _solve_explike_DE(f, x, DE, g, k): """Solves DE with constant coefficients.""" from sympy.solvers import rsolve for t in Add.make_args(DE): coeff, d = t.as_independent(g) if coeff.free_symbols: return RE = exp_re(DE, g, k) init = {} for i in range(len(Add.make_args(RE))): if i: f = f.diff(x) init[g(k).subs(k, i)] = f.limit(x, 0) sol = rsolve(RE, g(k), init) if sol: return (sol / factorial(k), S.Zero, S.Zero) def _solve_simple(f, x, DE, g, k): """Converts DE into RE and solves using :func:`rsolve`.""" from sympy.solvers import rsolve RE = hyper_re(DE, g, k) init = {} for i in range(len(Add.make_args(RE))): if i: f = f.diff(x) init[g(k).subs(k, i)] = f.limit(x, 0) / factorial(i) sol = rsolve(RE, g(k), init) if sol: return (sol, S.Zero, S.Zero) def _transform_explike_DE(DE, g, x, order, syms): """Converts DE with free parameters into DE with constant coefficients.""" from sympy.solvers.solveset import linsolve eq = [] highest_coeff = DE.coeff(Derivative(g(x), x, order)) for i in range(order): coeff = DE.coeff(Derivative(g(x), x, i)) coeff = (coeff / highest_coeff).expand().collect(x) for t in Add.make_args(coeff): eq.append(t) temp = [] for e in eq: if e.has(x): break elif e.has(Symbol): temp.append(e) else: eq = temp if eq: sol = dict(zip(syms, (i for s in linsolve(eq, list(syms)) for i in s))) if sol: DE = DE.subs(sol) DE = DE.factor().as_coeff_mul(Derivative)[1][0] DE = DE.collect(Derivative(g(x))) return DE def _transform_DE_RE(DE, g, k, order, syms): """Converts DE with free parameters into RE of hypergeometric type.""" from sympy.solvers.solveset import linsolve RE = hyper_re(DE, g, k) eq = [] for i in range(1, order): coeff = RE.coeff(g(k + i)) eq.append(coeff) sol = dict(zip(syms, (i for s in linsolve(eq, list(syms)) for i in s))) if sol: m = Wild('m') RE = RE.subs(sol) RE = RE.factor().as_numer_denom()[0].collect(g(k + m)) RE = RE.as_coeff_mul(g)[1][0] for i in range(order): # smallest order should be g(k) if RE.coeff(g(k + i)) and i: RE = RE.subs(k, k - i) break return RE def solve_de(f, x, DE, order, g, k): """Solves the DE. Tries to solve DE by either converting into a RE containing two terms or converting into a DE having constant coefficients. Returns ======= formula : Expr ind : Expr Independent terms. order : int Examples ======== >>> from sympy import Derivative as D, Function >>> from sympy import exp, ln >>> from sympy.series.formal import solve_de >>> from sympy.abc import x, k >>> f = Function('f') >>> solve_de(exp(x), x, D(f(x), x) - f(x), 1, f, k) (Piecewise((1/factorial(k), Eq(Mod(k, 1), 0)), (0, True)), 1, 1) >>> solve_de(ln(1 + x), x, (x + 1)*D(f(x), x, 2) + D(f(x)), 2, f, k) (Piecewise(((-1)**(k - 1)*factorial(k - 1)/RisingFactorial(2, k - 1), Eq(Mod(k, 1), 0)), (0, True)), x, 2) """ sol = None syms = DE.free_symbols.difference({g, x}) if syms: RE = _transform_DE_RE(DE, g, k, order, syms) else: RE = hyper_re(DE, g, k) if not RE.free_symbols.difference({k}): sol = _solve_hyper_RE(f, x, RE, g, k) if sol: return sol if syms: DE = _transform_explike_DE(DE, g, x, order, syms) if not DE.free_symbols.difference({x}): sol = _solve_explike_DE(f, x, DE, g, k) if sol: return sol def hyper_algorithm(f, x, k, order=4): """Hypergeometric algorithm for computing Formal Power Series. Steps: * Generates DE * Convert the DE into RE * Solves the RE Examples ======== >>> from sympy import exp, ln >>> from sympy.series.formal import hyper_algorithm >>> from sympy.abc import x, k >>> hyper_algorithm(exp(x), x, k) (Piecewise((1/factorial(k), Eq(Mod(k, 1), 0)), (0, True)), 1, 1) >>> hyper_algorithm(ln(1 + x), x, k) (Piecewise(((-1)**(k - 1)*factorial(k - 1)/RisingFactorial(2, k - 1), Eq(Mod(k, 1), 0)), (0, True)), x, 2) See Also ======== sympy.series.formal.simpleDE sympy.series.formal.solve_de """ g = Function('g') des = [] # list of DE's sol = None for DE, i in simpleDE(f, x, g, order): if DE is not None: sol = solve_de(f, x, DE, i, g, k) if sol: return sol if not DE.free_symbols.difference({x}): des.append(DE) # If nothing works # Try plain rsolve for DE in des: sol = _solve_simple(f, x, DE, g, k) if sol: return sol def _compute_fps(f, x, x0, dir, hyper, order, rational, full): """Recursive wrapper to compute fps. See :func:`compute_fps` for details. """ if x0 in [S.Infinity, -S.Infinity]: dir = S.One if x0 is S.Infinity else -S.One temp = f.subs(x, 1/x) result = _compute_fps(temp, x, 0, dir, hyper, order, rational, full) if result is None: return None return (result[0], result[1].subs(x, 1/x), result[2].subs(x, 1/x)) elif x0 or dir == -S.One: if dir == -S.One: rep = -x + x0 rep2 = -x rep2b = x0 else: rep = x + x0 rep2 = x rep2b = -x0 temp = f.subs(x, rep) result = _compute_fps(temp, x, 0, S.One, hyper, order, rational, full) if result is None: return None return (result[0], result[1].subs(x, rep2 + rep2b), result[2].subs(x, rep2 + rep2b)) if f.is_polynomial(x): k = Dummy('k') ak = sequence(Coeff(f, x, k), (k, 1, oo)) xk = sequence(x**k, (k, 0, oo)) ind = f.coeff(x, 0) return ak, xk, ind # Break instances of Add # this allows application of different # algorithms on different terms increasing the # range of admissible functions. if isinstance(f, Add): result = False ak = sequence(S.Zero, (0, oo)) ind, xk = S.Zero, None for t in Add.make_args(f): res = _compute_fps(t, x, 0, S.One, hyper, order, rational, full) if res: if not result: result = True xk = res[1] if res[0].start > ak.start: seq = ak s, f = ak.start, res[0].start else: seq = res[0] s, f = res[0].start, ak.start save = Add(*[z[0]*z[1] for z in zip(seq[0:(f - s)], xk[s:f])]) ak += res[0] ind += res[2] + save else: ind += t if result: return ak, xk, ind return None # The symbolic term - symb, if present, is being separated from the function # Otherwise symb is being set to S.One syms = f.free_symbols.difference({x}) (f, symb) = expand(f).as_independent(*syms) if symb is S.Zero: symb = S.One symb = powsimp(symb) result = None # from here on it's x0=0 and dir=1 handling k = Dummy('k') if rational: result = rational_algorithm(f, x, k, order, full) if result is None and hyper: result = hyper_algorithm(f, x, k, order) if result is None: return None ak = sequence(result[0], (k, result[2], oo)) xk_formula = powsimp(x**k * symb) xk = sequence(xk_formula, (k, 0, oo)) ind = powsimp(result[1] * symb) return ak, xk, ind def compute_fps(f, x, x0=0, dir=1, hyper=True, order=4, rational=True, full=False): """Computes the formula for Formal Power Series of a function. Tries to compute the formula by applying the following techniques (in order): * rational_algorithm * Hypergeometric algorithm Parameters ========== x : Symbol x0 : number, optional Point to perform series expansion about. Default is 0. dir : {1, -1, '+', '-'}, optional If dir is 1 or '+' the series is calculated from the right and for -1 or '-' the series is calculated from the left. For smooth functions this flag will not alter the results. Default is 1. hyper : {True, False}, optional Set hyper to False to skip the hypergeometric algorithm. By default it is set to False. order : int, optional Order of the derivative of ``f``, Default is 4. rational : {True, False}, optional Set rational to False to skip rational algorithm. By default it is set to True. full : {True, False}, optional Set full to True to increase the range of rational algorithm. See :func:`rational_algorithm` for details. By default it is set to False. Returns ======= ak : sequence Sequence of coefficients. xk : sequence Sequence of powers of x. ind : Expr Independent terms. mul : Pow Common terms. See Also ======== sympy.series.formal.rational_algorithm sympy.series.formal.hyper_algorithm """ f = sympify(f) x = sympify(x) if not f.has(x): return None x0 = sympify(x0) if dir == '+': dir = S.One elif dir == '-': dir = -S.One elif dir not in [S.One, -S.One]: raise ValueError("Dir must be '+' or '-'") else: dir = sympify(dir) return _compute_fps(f, x, x0, dir, hyper, order, rational, full) class Coeff(Function): """ Coeff(p, x, n) represents the nth coefficient of the polynomial p in x """ @classmethod def eval(cls, p, x, n): if p.is_polynomial(x) and n.is_integer: return p.coeff(x, n) class FormalPowerSeries(SeriesBase): """Represents Formal Power Series of a function. No computation is performed. This class should only to be used to represent a series. No checks are performed. For computing a series use :func:`fps`. See Also ======== sympy.series.formal.fps """ def __new__(cls, *args): args = map(sympify, args) return Expr.__new__(cls, *args) def __init__(self, *args): ak = args[4][0] k = ak.variables[0] self.ak_seq = sequence(ak.formula, (k, 1, oo)) self.fact_seq = sequence(factorial(k), (k, 1, oo)) self.bell_coeff_seq = self.ak_seq * self.fact_seq self.sign_seq = sequence((-1, 1), (k, 1, oo)) @property def function(self): return self.args[0] @property def x(self): return self.args[1] @property def x0(self): return self.args[2] @property def dir(self): return self.args[3] @property def ak(self): return self.args[4][0] @property def xk(self): return self.args[4][1] @property def ind(self): return self.args[4][2] @property def interval(self): return Interval(0, oo) @property def start(self): return self.interval.inf @property def stop(self): return self.interval.sup @property def length(self): return oo @property def infinite(self): """Returns an infinite representation of the series""" from sympy.concrete import Sum ak, xk = self.ak, self.xk k = ak.variables[0] inf_sum = Sum(ak.formula * xk.formula, (k, ak.start, ak.stop)) return self.ind + inf_sum def _get_pow_x(self, term): """Returns the power of x in a term.""" xterm, pow_x = term.as_independent(self.x)[1].as_base_exp() if not xterm.has(self.x): return S.Zero return pow_x def polynomial(self, n=6): """Truncated series as polynomial. Returns series expansion of ``f`` upto order ``O(x**n)`` as a polynomial(without ``O`` term). """ terms = [] sym = self.free_symbols for i, t in enumerate(self): xp = self._get_pow_x(t) if xp.has(*sym): xp = xp.as_coeff_add(*sym)[0] if xp >= n: break elif xp.is_integer is True and i == n + 1: break elif t is not S.Zero: terms.append(t) return Add(*terms) def truncate(self, n=6): """Truncated series. Returns truncated series expansion of f upto order ``O(x**n)``. If n is ``None``, returns an infinite iterator. """ if n is None: return iter(self) x, x0 = self.x, self.x0 pt_xk = self.xk.coeff(n) if x0 is S.NegativeInfinity: x0 = S.Infinity return self.polynomial(n) + Order(pt_xk, (x, x0)) def _eval_term(self, pt): try: pt_xk = self.xk.coeff(pt) pt_ak = self.ak.coeff(pt).simplify() # Simplify the coefficients except IndexError: term = S.Zero else: term = (pt_ak * pt_xk) if self.ind: ind = S.Zero sym = self.free_symbols for t in Add.make_args(self.ind): pow_x = self._get_pow_x(t) if pow_x.has(*sym): pow_x = pow_x.as_coeff_add(*sym)[0] if pt == 0 and pow_x < 1: ind += t elif pow_x >= pt and pow_x < pt + 1: ind += t term += ind return term.collect(self.x) def _eval_subs(self, old, new): x = self.x if old.has(x): return self def _eval_as_leading_term(self, x): for t in self: if t is not S.Zero: return t def _eval_derivative(self, x): f = self.function.diff(x) ind = self.ind.diff(x) pow_xk = self._get_pow_x(self.xk.formula) ak = self.ak k = ak.variables[0] if ak.formula.has(x): form = [] for e, c in ak.formula.args: temp = S.Zero for t in Add.make_args(e): pow_x = self._get_pow_x(t) temp += t * (pow_xk + pow_x) form.append((temp, c)) form = Piecewise(*form) ak = sequence(form.subs(k, k + 1), (k, ak.start - 1, ak.stop)) else: ak = sequence((ak.formula * pow_xk).subs(k, k + 1), (k, ak.start - 1, ak.stop)) return self.func(f, self.x, self.x0, self.dir, (ak, self.xk, ind)) def integrate(self, x=None, **kwargs): """Integrate Formal Power Series. Examples ======== >>> from sympy import fps, sin, integrate >>> from sympy.abc import x >>> f = fps(sin(x)) >>> f.integrate(x).truncate() -1 + x**2/2 - x**4/24 + O(x**6) >>> integrate(f, (x, 0, 1)) 1 - cos(1) """ from sympy.integrals import integrate if x is None: x = self.x elif iterable(x): return integrate(self.function, x) f = integrate(self.function, x) ind = integrate(self.ind, x) ind += (f - ind).limit(x, 0) # constant of integration pow_xk = self._get_pow_x(self.xk.formula) ak = self.ak k = ak.variables[0] if ak.formula.has(x): form = [] for e, c in ak.formula.args: temp = S.Zero for t in Add.make_args(e): pow_x = self._get_pow_x(t) temp += t / (pow_xk + pow_x + 1) form.append((temp, c)) form = Piecewise(*form) ak = sequence(form.subs(k, k - 1), (k, ak.start + 1, ak.stop)) else: ak = sequence((ak.formula / (pow_xk + 1)).subs(k, k - 1), (k, ak.start + 1, ak.stop)) return self.func(f, self.x, self.x0, self.dir, (ak, self.xk, ind)) def product(self, other, x=None, n=6): """Multiplies two Formal Power Series, using discrete convolution and return the truncated terms upto specified order. Parameters ========== n : Number, optional Specifies the order of the term up to which the polynomial should be truncated. Examples ======== >>> from sympy import fps, sin, exp, convolution >>> from sympy.abc import x >>> f1 = fps(sin(x)) >>> f2 = fps(exp(x)) >>> f1.product(f2, x, 4) x + x**2 + x**3/3 + O(x**4) See Also ======== sympy.discrete.convolutions """ if x is None: x = self.x if n is None: return iter(self) other = sympify(other) if not isinstance(other, FormalPowerSeries): raise ValueError("Both series should be an instance of FormalPowerSeries" " class.") if self.dir != other.dir: raise ValueError("Both series should be calculated from the" " same direction.") elif self.x0 != other.x0: raise ValueError("Both series should be calculated about the" " same point.") elif self.x != other.x: raise ValueError("Both series should have the same symbol.") k = self.ak.variables[0] coeff1 = sequence(self.ak.formula, (k, 0, oo)) k = other.ak.variables[0] coeff2 = sequence(other.ak.formula, (k, 0, oo)) conv_coeff = convolution(coeff1[:n], coeff2[:n]) conv_seq = sequence(tuple(conv_coeff), (k, 0, oo)) k = self.xk.variables[0] xk_seq = sequence(self.xk.formula, (k, 0, oo)) terms_seq = xk_seq * conv_seq return Add(*(terms_seq[:n])) + Order(self.xk.coeff(n), (self.x, self.x0)) def coeff_bell(self, n): r""" self.coeff_bell(n) returns a sequence of Bell polynomials of the second kind. Note that ``n`` should be a integer. The second kind of Bell polynomials (are sometimes called "partial" Bell polynomials or incomplete Bell polynomials) are defined as .. math:: B_{n,k}(x_1, x_2,\dotsc x_{n-k+1}) = \sum_{j_1+j_2+j_2+\dotsb=k \atop j_1+2j_2+3j_2+\dotsb=n} \frac{n!}{j_1!j_2!\dotsb j_{n-k+1}!} \left(\frac{x_1}{1!} \right)^{j_1} \left(\frac{x_2}{2!} \right)^{j_2} \dotsb \left(\frac{x_{n-k+1}}{(n-k+1)!} \right) ^{j_{n-k+1}}. * ``bell(n, k, (x1, x2, ...))`` gives Bell polynomials of the second kind, `B_{n,k}(x_1, x_2, \dotsc, x_{n-k+1})`. See Also ======== sympy.functions.combinatorial.numbers.bell """ inner_coeffs = [bell(n, j, tuple(self.bell_coeff_seq[:n-j+1])) for j in range(1, n+1)] k = Dummy('k') return sequence(tuple(inner_coeffs), (k, 1, oo)) def compose(self, other, x=None, n=6): r""" Returns the truncated terms of the formal power series of the composed function, up to specified `n`. If `f` and `g` are two formal power series of two different functions, then the coefficient sequence ``ak`` of the composed formal power series `fp` will be as follows. .. math:: \sum\limits_{k=0}^{n} b_k B_{n,k}(x_1, x_2, \dotsc, x_{n-k+1}) Parameters ========== n : Number, optional Specifies the order of the term up to which the polynomial should be truncated. Examples ======== >>> from sympy import fps, sin, exp, bell >>> from sympy.abc import x >>> f1 = fps(exp(x)) >>> f2 = fps(sin(x)) >>> f1.compose(f2, x) 1 + x + x**2/2 - x**4/8 - x**5/15 + O(x**6) >>> f1.compose(f2, x, n=8) 1 + x + x**2/2 - x**4/8 - x**5/15 - x**6/240 + x**7/90 + O(x**8) See Also ======== sympy.functions.combinatorial.numbers.bell References ========== .. [1] Comtet, Louis: Advanced combinatorics; the art of finite and infinite expansions. Reidel, 1974. """ if x is None: x = self.x if n is None: return iter(self) other = sympify(other) if not isinstance(other, FormalPowerSeries): raise ValueError("Both series should be an instance of FormalPowerSeries" " class.") if self.dir != other.dir: raise ValueError("Both series should be calculated from the" " same direction.") elif self.x0 != other.x0: raise ValueError("Both series should be calculated about the" " same point.") elif self.x != other.x: raise ValueError("Both series should have the same symbol.") f, g = self.function, other.function if other._eval_term(0).as_coeff_mul(other.x)[0] is not S.Zero: raise ValueError("The formal power series of the inner function should not have any " "constant coefficient term.") terms = [] for i in range(1, n): bell_seq = other.coeff_bell(i) seq = (self.bell_coeff_seq * bell_seq) terms.append(Add(*(seq[:i])) * self.xk.coeff(i) / self.fact_seq[i-1]) return self._eval_term(0) + Add(*terms) + Order(self.xk.coeff(n), (self.x, self.x0)) def inverse(self, x=None, n=6): r""" Returns the truncated terms of the inverse of the formal power series, up to specified `n`. If `f` and `g` are two formal power series of two different functions, then the coefficient sequence ``ak`` of the composed formal power series `fp` will be as follows. .. math:: \sum\limits_{k=0}^{n} (-1)^{k} x_0^{-k-1} B_{n,k}(x_1, x_2, \dotsc, x_{n-k+1}) Parameters ========== n : Number, optional Specifies the order of the term up to which the polynomial should be truncated. Examples ======== >>> from sympy import fps, exp, cos, bell >>> from sympy.abc import x >>> f1 = fps(exp(x)) >>> f2 = fps(cos(x)) >>> f1.inverse(x) 1 - x + x**2/2 - x**3/6 + x**4/24 - x**5/120 + O(x**6) >>> f2.inverse(x, n=8) 1 + x**2/2 + 5*x**4/24 + 61*x**6/720 + O(x**8) See Also ======== sympy.functions.combinatorial.numbers.bell References ========== .. [1] Comtet, Louis: Advanced combinatorics; the art of finite and infinite expansions. Reidel, 1974. """ if x is None: x = self.x if n is None: return iter(self) f = self.function if self._eval_term(0) is S.Zero: raise ValueError("Constant coefficient should exist for an inverse of a formal" " power series to exist.") inv = self._eval_term(0) k = Dummy('k') terms = [] inv_seq = sequence(inv ** (-(k + 1)), (k, 1, oo)) aux_seq = self.sign_seq * self.fact_seq * inv_seq for i in range(1, n): bell_seq = self.coeff_bell(i) seq = (aux_seq * bell_seq) terms.append(Add(*(seq[:i])) * self.xk.coeff(i) / self.fact_seq[i-1]) return self._eval_term(0) + Add(*terms) + Order(self.xk.coeff(n), (self.x, self.x0)) def __add__(self, other): other = sympify(other) if isinstance(other, FormalPowerSeries): if self.dir != other.dir: raise ValueError("Both series should be calculated from the" " same direction.") elif self.x0 != other.x0: raise ValueError("Both series should be calculated about the" " same point.") x, y = self.x, other.x f = self.function + other.function.subs(y, x) if self.x not in f.free_symbols: return f ak = self.ak + other.ak if self.ak.start > other.ak.start: seq = other.ak s, e = other.ak.start, self.ak.start else: seq = self.ak s, e = self.ak.start, other.ak.start save = Add(*[z[0]*z[1] for z in zip(seq[0:(e - s)], self.xk[s:e])]) ind = self.ind + other.ind + save return self.func(f, x, self.x0, self.dir, (ak, self.xk, ind)) elif not other.has(self.x): f = self.function + other ind = self.ind + other return self.func(f, self.x, self.x0, self.dir, (self.ak, self.xk, ind)) return Add(self, other) def __radd__(self, other): return self.__add__(other) def __neg__(self): return self.func(-self.function, self.x, self.x0, self.dir, (-self.ak, self.xk, -self.ind)) def __sub__(self, other): return self.__add__(-other) def __rsub__(self, other): return (-self).__add__(other) def __mul__(self, other): other = sympify(other) if other.has(self.x): return Mul(self, other) f = self.function * other ak = self.ak.coeff_mul(other) ind = self.ind * other return self.func(f, self.x, self.x0, self.dir, (ak, self.xk, ind)) def __rmul__(self, other): return self.__mul__(other) def fps(f, x=None, x0=0, dir=1, hyper=True, order=4, rational=True, full=False): """Generates Formal Power Series of f. Returns the formal series expansion of ``f`` around ``x = x0`` with respect to ``x`` in the form of a ``FormalPowerSeries`` object. Formal Power Series is represented using an explicit formula computed using different algorithms. See :func:`compute_fps` for the more details regarding the computation of formula. Parameters ========== x : Symbol, optional If x is None and ``f`` is univariate, the univariate symbols will be supplied, otherwise an error will be raised. x0 : number, optional Point to perform series expansion about. Default is 0. dir : {1, -1, '+', '-'}, optional If dir is 1 or '+' the series is calculated from the right and for -1 or '-' the series is calculated from the left. For smooth functions this flag will not alter the results. Default is 1. hyper : {True, False}, optional Set hyper to False to skip the hypergeometric algorithm. By default it is set to False. order : int, optional Order of the derivative of ``f``, Default is 4. rational : {True, False}, optional Set rational to False to skip rational algorithm. By default it is set to True. full : {True, False}, optional Set full to True to increase the range of rational algorithm. See :func:`rational_algorithm` for details. By default it is set to False. Examples ======== >>> from sympy import fps, O, ln, atan, sin >>> from sympy.abc import x, n Rational Functions >>> fps(ln(1 + x)).truncate() x - x**2/2 + x**3/3 - x**4/4 + x**5/5 + O(x**6) >>> fps(atan(x), full=True).truncate() x - x**3/3 + x**5/5 + O(x**6) Symbolic Functions >>> fps(x**n*sin(x**2), x).truncate(8) -x**(n + 6)/6 + x**(n + 2) + O(x**(n + 8)) See Also ======== sympy.series.formal.FormalPowerSeries sympy.series.formal.compute_fps """ f = sympify(f) if x is None: free = f.free_symbols if len(free) == 1: x = free.pop() elif not free: return f else: raise NotImplementedError("multivariate formal power series") result = compute_fps(f, x, x0, dir, hyper, order, rational, full) if result is None: return f return FormalPowerSeries(f, x, x0, dir, result)

218425c4712f934cc59bde52a2599fea53f92c2479dfe2eda47c083079feacc5

from __future__ import print_function, division from sympy.core import S, sympify, Expr, Rational, Dummy from sympy.core import Add, Mul, expand_power_base, expand_log from sympy.core.cache import cacheit from sympy.core.compatibility import default_sort_key, is_sequence from sympy.core.containers import Tuple from sympy.sets.sets import Complement from sympy.utilities.iterables import uniq class Order(Expr): r""" Represents the limiting behavior of some function The order of a function characterizes the function based on the limiting behavior of the function as it goes to some limit. Only taking the limit point to be a number is currently supported. This is expressed in big O notation [1]_. The formal definition for the order of a function `g(x)` about a point `a` is such that `g(x) = O(f(x))` as `x \rightarrow a` if and only if for any `\delta > 0` there exists a `M > 0` such that `|g(x)| \leq M|f(x)|` for `|x-a| < \delta`. This is equivalent to `\lim_{x \rightarrow a} \sup |g(x)/f(x)| < \infty`. Let's illustrate it on the following example by taking the expansion of `\sin(x)` about 0: .. math :: \sin(x) = x - x^3/3! + O(x^5) where in this case `O(x^5) = x^5/5! - x^7/7! + \cdots`. By the definition of `O`, for any `\delta > 0` there is an `M` such that: .. math :: |x^5/5! - x^7/7! + ....| <= M|x^5| \text{ for } |x| < \delta or by the alternate definition: .. math :: \lim_{x \rightarrow 0} | (x^5/5! - x^7/7! + ....) / x^5| < \infty which surely is true, because .. math :: \lim_{x \rightarrow 0} | (x^5/5! - x^7/7! + ....) / x^5| = 1/5! As it is usually used, the order of a function can be intuitively thought of representing all terms of powers greater than the one specified. For example, `O(x^3)` corresponds to any terms proportional to `x^3, x^4,\ldots` and any higher power. For a polynomial, this leaves terms proportional to `x^2`, `x` and constants. Examples ======== >>> from sympy import O, oo, cos, pi >>> from sympy.abc import x, y >>> O(x + x**2) O(x) >>> O(x + x**2, (x, 0)) O(x) >>> O(x + x**2, (x, oo)) O(x**2, (x, oo)) >>> O(1 + x*y) O(1, x, y) >>> O(1 + x*y, (x, 0), (y, 0)) O(1, x, y) >>> O(1 + x*y, (x, oo), (y, oo)) O(x*y, (x, oo), (y, oo)) >>> O(1) in O(1, x) True >>> O(1, x) in O(1) False >>> O(x) in O(1, x) True >>> O(x**2) in O(x) True >>> O(x)*x O(x**2) >>> O(x) - O(x) O(x) >>> O(cos(x)) O(1) >>> O(cos(x), (x, pi/2)) O(x - pi/2, (x, pi/2)) References ========== .. [1] `Big O notation <https://en.wikipedia.org/wiki/Big_O_notation>`_ Notes ===== In ``O(f(x), x)`` the expression ``f(x)`` is assumed to have a leading term. ``O(f(x), x)`` is automatically transformed to ``O(f(x).as_leading_term(x),x)``. ``O(expr*f(x), x)`` is ``O(f(x), x)`` ``O(expr, x)`` is ``O(1)`` ``O(0, x)`` is 0. Multivariate O is also supported: ``O(f(x, y), x, y)`` is transformed to ``O(f(x, y).as_leading_term(x,y).as_leading_term(y), x, y)`` In the multivariate case, it is assumed the limits w.r.t. the various symbols commute. If no symbols are passed then all symbols in the expression are used and the limit point is assumed to be zero. """ is_Order = True __slots__ = [] @cacheit def __new__(cls, expr, *args, **kwargs): expr = sympify(expr) if not args: if expr.is_Order: variables = expr.variables point = expr.point else: variables = list(expr.free_symbols) point = [S.Zero]*len(variables) else: args = list(args if is_sequence(args) else [args]) variables, point = [], [] if is_sequence(args[0]): for a in args: v, p = list(map(sympify, a)) variables.append(v) point.append(p) else: variables = list(map(sympify, args)) point = [S.Zero]*len(variables) if not all(v.is_symbol for v in variables): raise TypeError('Variables are not symbols, got %s' % variables) if len(list(uniq(variables))) != len(variables): raise ValueError('Variables are supposed to be unique symbols, got %s' % variables) if expr.is_Order: expr_vp = dict(expr.args[1:]) new_vp = dict(expr_vp) vp = dict(zip(variables, point)) for v, p in vp.items(): if v in new_vp.keys(): if p != new_vp[v]: raise NotImplementedError( "Mixing Order at different points is not supported.") else: new_vp[v] = p if set(expr_vp.keys()) == set(new_vp.keys()): return expr else: variables = list(new_vp.keys()) point = [new_vp[v] for v in variables] if expr is S.NaN: return S.NaN if any(x in p.free_symbols for x in variables for p in point): raise ValueError('Got %s as a point.' % point) if variables: if any(p != point[0] for p in point): raise NotImplementedError( "Multivariable orders at different points are not supported.") if point[0] is S.Infinity: s = {k: 1/Dummy() for k in variables} rs = {1/v: 1/k for k, v in s.items()} elif point[0] is S.NegativeInfinity: s = {k: -1/Dummy() for k in variables} rs = {-1/v: -1/k for k, v in s.items()} elif point[0] is not S.Zero: s = dict((k, Dummy() + point[0]) for k in variables) rs = dict((v - point[0], k - point[0]) for k, v in s.items()) else: s = () rs = () expr = expr.subs(s) if expr.is_Add: from sympy import expand_multinomial expr = expand_multinomial(expr) if s: args = tuple([r[0] for r in rs.items()]) else: args = tuple(variables) if len(variables) > 1: # XXX: better way? We need this expand() to # workaround e.g: expr = x*(x + y). # (x*(x + y)).as_leading_term(x, y) currently returns # x*y (wrong order term!). That's why we want to deal with # expand()'ed expr (handled in "if expr.is_Add" branch below). expr = expr.expand() if expr.is_Add: lst = expr.extract_leading_order(args) expr = Add(*[f.expr for (e, f) in lst]) elif expr: expr = expr.as_leading_term(*args) expr = expr.as_independent(*args, as_Add=False)[1] expr = expand_power_base(expr) expr = expand_log(expr) if len(args) == 1: # The definition of O(f(x)) symbol explicitly stated that # the argument of f(x) is irrelevant. That's why we can # combine some power exponents (only "on top" of the # expression tree for f(x)), e.g.: # x**p * (-x)**q -> x**(p+q) for real p, q. x = args[0] margs = list(Mul.make_args( expr.as_independent(x, as_Add=False)[1])) for i, t in enumerate(margs): if t.is_Pow: b, q = t.args if b in (x, -x) and q.is_real and not q.has(x): margs[i] = x**q elif b.is_Pow and not b.exp.has(x): b, r = b.args if b in (x, -x) and r.is_real: margs[i] = x**(r*q) elif b.is_Mul and b.args[0] is S.NegativeOne: b = -b if b.is_Pow and not b.exp.has(x): b, r = b.args if b in (x, -x) and r.is_real: margs[i] = x**(r*q) expr = Mul(*margs) expr = expr.subs(rs) if expr is S.Zero: return expr if expr.is_Order: expr = expr.expr if not expr.has(*variables): expr = S.One # create Order instance: vp = dict(zip(variables, point)) variables.sort(key=default_sort_key) point = [vp[v] for v in variables] args = (expr,) + Tuple(*zip(variables, point)) obj = Expr.__new__(cls, *args) return obj def _eval_nseries(self, x, n, logx): return self @property def expr(self): return self.args[0] @property def variables(self): if self.args[1:]: return tuple(x[0] for x in self.args[1:]) else: return () @property def point(self): if self.args[1:]: return tuple(x[1] for x in self.args[1:]) else: return () @property def free_symbols(self): return self.expr.free_symbols | set(self.variables) def _eval_power(b, e): if e.is_Number and e.is_nonnegative: return b.func(b.expr ** e, *b.args[1:]) if e == O(1): return b return def as_expr_variables(self, order_symbols): if order_symbols is None: order_symbols = self.args[1:] else: if (not all(o[1] == order_symbols[0][1] for o in order_symbols) and not all(p == self.point[0] for p in self.point)): # pragma: no cover raise NotImplementedError('Order at points other than 0 ' 'or oo not supported, got %s as a point.' % self.point) if order_symbols and order_symbols[0][1] != self.point[0]: raise NotImplementedError( "Multiplying Order at different points is not supported.") order_symbols = dict(order_symbols) for s, p in dict(self.args[1:]).items(): if s not in order_symbols.keys(): order_symbols[s] = p order_symbols = sorted(order_symbols.items(), key=lambda x: default_sort_key(x[0])) return self.expr, tuple(order_symbols) def removeO(self): return S.Zero def getO(self): return self @cacheit def contains(self, expr): r""" Return True if expr belongs to Order(self.expr, \*self.variables). Return False if self belongs to expr. Return None if the inclusion relation cannot be determined (e.g. when self and expr have different symbols). """ from sympy import powsimp if expr is S.Zero: return True if expr is S.NaN: return False point = self.point[0] if self.point else S.Zero if expr.is_Order: if (any(p != point for p in expr.point) or any(p != point for p in self.point)): return None if expr.expr == self.expr: # O(1) + O(1), O(1) + O(1, x), etc. return all([x in self.args[1:] for x in expr.args[1:]]) if expr.expr.is_Add: return all([self.contains(x) for x in expr.expr.args]) if self.expr.is_Add and point == S.Zero: return any([self.func(x, *self.args[1:]).contains(expr) for x in self.expr.args]) if self.variables and expr.variables: common_symbols = tuple( [s for s in self.variables if s in expr.variables]) elif self.variables: common_symbols = self.variables else: common_symbols = expr.variables if not common_symbols: return None if (self.expr.is_Pow and len(self.variables) == 1 and self.variables == expr.variables): symbol = self.variables[0] other = expr.expr.as_independent(symbol, as_Add=False)[1] if (other.is_Pow and other.base == symbol and self.expr.base == symbol): if point == S.Zero: rv = (self.expr.exp - other.exp).is_nonpositive if point.is_infinite: rv = (self.expr.exp - other.exp).is_nonnegative if rv is not None: return rv r = None ratio = self.expr/expr.expr ratio = powsimp(ratio, deep=True, combine='exp') for s in common_symbols: from sympy.series.limits import Limit l = Limit(ratio, s, point).doit(heuristics=False) if not isinstance(l, Limit): l = l != 0 else: l = None if r is None: r = l else: if r != l: return return r if self.expr.is_Pow and len(self.variables) == 1: symbol = self.variables[0] other = expr.as_independent(symbol, as_Add=False)[1] if (other.is_Pow and other.base == symbol and self.expr.base == symbol): if point == S.Zero: rv = (self.expr.exp - other.exp).is_nonpositive if point.is_infinite: rv = (self.expr.exp - other.exp).is_nonnegative if rv is not None: return rv obj = self.func(expr, *self.args[1:]) return self.contains(obj) def __contains__(self, other): result = self.contains(other) if result is None: raise TypeError('contains did not evaluate to a bool') return result def _eval_subs(self, old, new): if old in self.variables: newexpr = self.expr.subs(old, new) i = self.variables.index(old) newvars = list(self.variables) newpt = list(self.point) if new.is_symbol: newvars[i] = new else: syms = new.free_symbols if len(syms) == 1 or old in syms: if old in syms: var = self.variables[i] else: var = syms.pop() # First, try to substitute self.point in the "new" # expr to see if this is a fixed point. # E.g. O(y).subs(y, sin(x)) point = new.subs(var, self.point[i]) if point != self.point[i]: from sympy.solvers.solveset import solveset d = Dummy() sol = solveset(old - new.subs(var, d), d) if isinstance(sol, Complement): e1 = sol.args[0] e2 = sol.args[1] sol = set(e1) - set(e2) res = [dict(zip((d, ), sol))] point = d.subs(res[0]).limit(old, self.point[i]) newvars[i] = var newpt[i] = point elif old not in syms: del newvars[i], newpt[i] if not syms and new == self.point[i]: newvars.extend(syms) newpt.extend([S.Zero]*len(syms)) else: return return Order(newexpr, *zip(newvars, newpt)) def _eval_conjugate(self): expr = self.expr._eval_conjugate() if expr is not None: return self.func(expr, *self.args[1:]) def _eval_derivative(self, x): return self.func(self.expr.diff(x), *self.args[1:]) or self def _eval_transpose(self): expr = self.expr._eval_transpose() if expr is not None: return self.func(expr, *self.args[1:]) def _sage_(self): #XXX: SAGE doesn't have Order yet. Let's return 0 instead. return Rational(0)._sage_() def __neg__(self): return self O = Order

f95364feefb86b9007cc679bfaa745ebc78531ff7b83f9d78c5cb8d38ed1ea13

from __future__ import print_function, division from collections import defaultdict from sympy.core import (Basic, S, Add, Mul, Pow, Symbol, sympify, expand_mul, expand_func, Function, Dummy, Expr, factor_terms, expand_power_exp, Eq) from sympy.core.compatibility import iterable, ordered, range, as_int from sympy.core.evaluate import global_evaluate from sympy.core.function import expand_log, count_ops, _mexpand, _coeff_isneg, nfloat from sympy.core.numbers import Float, I, pi, Rational, Integer from sympy.core.rules import Transform from sympy.core.sympify import _sympify from sympy.functions import gamma, exp, sqrt, log, exp_polar, piecewise_fold from sympy.functions.combinatorial.factorials import CombinatorialFunction from sympy.functions.elementary.complexes import unpolarify from sympy.functions.elementary.exponential import ExpBase from sympy.functions.elementary.hyperbolic import HyperbolicFunction from sympy.functions.elementary.integers import ceiling from sympy.functions.elementary.piecewise import Piecewise from sympy.functions.elementary.trigonometric import TrigonometricFunction from sympy.functions.special.bessel import besselj, besseli, besselk, jn, bessely from sympy.functions.special.tensor_functions import KroneckerDelta from sympy.polys import together, cancel, factor from sympy.simplify.combsimp import combsimp from sympy.simplify.cse_opts import sub_pre, sub_post from sympy.simplify.powsimp import powsimp from sympy.simplify.radsimp import radsimp, fraction from sympy.simplify.sqrtdenest import sqrtdenest from sympy.simplify.trigsimp import trigsimp, exptrigsimp from sympy.utilities.iterables import has_variety, sift import mpmath def separatevars(expr, symbols=[], dict=False, force=False): """ Separates variables in an expression, if possible. By default, it separates with respect to all symbols in an expression and collects constant coefficients that are independent of symbols. If dict=True then the separated terms will be returned in a dictionary keyed to their corresponding symbols. By default, all symbols in the expression will appear as keys; if symbols are provided, then all those symbols will be used as keys, and any terms in the expression containing other symbols or non-symbols will be returned keyed to the string 'coeff'. (Passing None for symbols will return the expression in a dictionary keyed to 'coeff'.) If force=True, then bases of powers will be separated regardless of assumptions on the symbols involved. Notes ===== The order of the factors is determined by Mul, so that the separated expressions may not necessarily be grouped together. Although factoring is necessary to separate variables in some expressions, it is not necessary in all cases, so one should not count on the returned factors being factored. Examples ======== >>> from sympy.abc import x, y, z, alpha >>> from sympy import separatevars, sin >>> separatevars((x*y)**y) (x*y)**y >>> separatevars((x*y)**y, force=True) x**y*y**y >>> e = 2*x**2*z*sin(y)+2*z*x**2 >>> separatevars(e) 2*x**2*z*(sin(y) + 1) >>> separatevars(e, symbols=(x, y), dict=True) {'coeff': 2*z, x: x**2, y: sin(y) + 1} >>> separatevars(e, [x, y, alpha], dict=True) {'coeff': 2*z, alpha: 1, x: x**2, y: sin(y) + 1} If the expression is not really separable, or is only partially separable, separatevars will do the best it can to separate it by using factoring. >>> separatevars(x + x*y - 3*x**2) -x*(3*x - y - 1) If the expression is not separable then expr is returned unchanged or (if dict=True) then None is returned. >>> eq = 2*x + y*sin(x) >>> separatevars(eq) == eq True >>> separatevars(2*x + y*sin(x), symbols=(x, y), dict=True) == None True """ expr = sympify(expr) if dict: return _separatevars_dict(_separatevars(expr, force), symbols) else: return _separatevars(expr, force) def _separatevars(expr, force): if len(expr.free_symbols) == 1: return expr # don't destroy a Mul since much of the work may already be done if expr.is_Mul: args = list(expr.args) changed = False for i, a in enumerate(args): args[i] = separatevars(a, force) changed = changed or args[i] != a if changed: expr = expr.func(*args) return expr # get a Pow ready for expansion if expr.is_Pow: expr = Pow(separatevars(expr.base, force=force), expr.exp) # First try other expansion methods expr = expr.expand(mul=False, multinomial=False, force=force) _expr, reps = posify(expr) if force else (expr, {}) expr = factor(_expr).subs(reps) if not expr.is_Add: return expr # Find any common coefficients to pull out args = list(expr.args) commonc = args[0].args_cnc(cset=True, warn=False)[0] for i in args[1:]: commonc &= i.args_cnc(cset=True, warn=False)[0] commonc = Mul(*commonc) commonc = commonc.as_coeff_Mul()[1] # ignore constants commonc_set = commonc.args_cnc(cset=True, warn=False)[0] # remove them for i, a in enumerate(args): c, nc = a.args_cnc(cset=True, warn=False) c = c - commonc_set args[i] = Mul(*c)*Mul(*nc) nonsepar = Add(*args) if len(nonsepar.free_symbols) > 1: _expr = nonsepar _expr, reps = posify(_expr) if force else (_expr, {}) _expr = (factor(_expr)).subs(reps) if not _expr.is_Add: nonsepar = _expr return commonc*nonsepar def _separatevars_dict(expr, symbols): if symbols: if not all((t.is_Atom for t in symbols)): raise ValueError("symbols must be Atoms.") symbols = list(symbols) elif symbols is None: return {'coeff': expr} else: symbols = list(expr.free_symbols) if not symbols: return None ret = dict(((i, []) for i in symbols + ['coeff'])) for i in Mul.make_args(expr): expsym = i.free_symbols intersection = set(symbols).intersection(expsym) if len(intersection) > 1: return None if len(intersection) == 0: # There are no symbols, so it is part of the coefficient ret['coeff'].append(i) else: ret[intersection.pop()].append(i) # rebuild for k, v in ret.items(): ret[k] = Mul(*v) return ret def _is_sum_surds(p): args = p.args if p.is_Add else [p] for y in args: if not ((y**2).is_Rational and y.is_extended_real): return False return True def posify(eq): """Return eq (with generic symbols made positive) and a dictionary containing the mapping between the old and new symbols. Any symbol that has positive=None will be replaced with a positive dummy symbol having the same name. This replacement will allow more symbolic processing of expressions, especially those involving powers and logarithms. A dictionary that can be sent to subs to restore eq to its original symbols is also returned. >>> from sympy import posify, Symbol, log, solve >>> from sympy.abc import x >>> posify(x + Symbol('p', positive=True) + Symbol('n', negative=True)) (_x + n + p, {_x: x}) >>> eq = 1/x >>> log(eq).expand() log(1/x) >>> log(posify(eq)[0]).expand() -log(_x) >>> p, rep = posify(eq) >>> log(p).expand().subs(rep) -log(x) It is possible to apply the same transformations to an iterable of expressions: >>> eq = x**2 - 4 >>> solve(eq, x) [-2, 2] >>> eq_x, reps = posify([eq, x]); eq_x [_x**2 - 4, _x] >>> solve(*eq_x) [2] """ eq = sympify(eq) if iterable(eq): f = type(eq) eq = list(eq) syms = set() for e in eq: syms = syms.union(e.atoms(Symbol)) reps = {} for s in syms: reps.update(dict((v, k) for k, v in posify(s)[1].items())) for i, e in enumerate(eq): eq[i] = e.subs(reps) return f(eq), {r: s for s, r in reps.items()} reps = {s: Dummy(s.name, positive=True, **s.assumptions0) for s in eq.free_symbols if s.is_positive is None} eq = eq.subs(reps) return eq, {r: s for s, r in reps.items()} def hypersimp(f, k): """Given combinatorial term f(k) simplify its consecutive term ratio i.e. f(k+1)/f(k). The input term can be composed of functions and integer sequences which have equivalent representation in terms of gamma special function. The algorithm performs three basic steps: 1. Rewrite all functions in terms of gamma, if possible. 2. Rewrite all occurrences of gamma in terms of products of gamma and rising factorial with integer, absolute constant exponent. 3. Perform simplification of nested fractions, powers and if the resulting expression is a quotient of polynomials, reduce their total degree. If f(k) is hypergeometric then as result we arrive with a quotient of polynomials of minimal degree. Otherwise None is returned. For more information on the implemented algorithm refer to: 1. W. Koepf, Algorithms for m-fold Hypergeometric Summation, Journal of Symbolic Computation (1995) 20, 399-417 """ f = sympify(f) g = f.subs(k, k + 1) / f g = g.rewrite(gamma) g = expand_func(g) g = powsimp(g, deep=True, combine='exp') if g.is_rational_function(k): return simplify(g, ratio=S.Infinity) else: return None def hypersimilar(f, g, k): """Returns True if 'f' and 'g' are hyper-similar. Similarity in hypergeometric sense means that a quotient of f(k) and g(k) is a rational function in k. This procedure is useful in solving recurrence relations. For more information see hypersimp(). """ f, g = list(map(sympify, (f, g))) h = (f/g).rewrite(gamma) h = h.expand(func=True, basic=False) return h.is_rational_function(k) def signsimp(expr, evaluate=None): """Make all Add sub-expressions canonical wrt sign. If an Add subexpression, ``a``, can have a sign extracted, as determined by could_extract_minus_sign, it is replaced with Mul(-1, a, evaluate=False). This allows signs to be extracted from powers and products. Examples ======== >>> from sympy import signsimp, exp, symbols >>> from sympy.abc import x, y >>> i = symbols('i', odd=True) >>> n = -1 + 1/x >>> n/x/(-n)**2 - 1/n/x (-1 + 1/x)/(x*(1 - 1/x)**2) - 1/(x*(-1 + 1/x)) >>> signsimp(_) 0 >>> x*n + x*-n x*(-1 + 1/x) + x*(1 - 1/x) >>> signsimp(_) 0 Since powers automatically handle leading signs >>> (-2)**i -2**i signsimp can be used to put the base of a power with an integer exponent into canonical form: >>> n**i (-1 + 1/x)**i By default, signsimp doesn't leave behind any hollow simplification: if making an Add canonical wrt sign didn't change the expression, the original Add is restored. If this is not desired then the keyword ``evaluate`` can be set to False: >>> e = exp(y - x) >>> signsimp(e) == e True >>> signsimp(e, evaluate=False) exp(-(x - y)) """ if evaluate is None: evaluate = global_evaluate[0] expr = sympify(expr) if not isinstance(expr, Expr) or expr.is_Atom: return expr e = sub_post(sub_pre(expr)) if not isinstance(e, Expr) or e.is_Atom: return e if e.is_Add: return e.func(*[signsimp(a, evaluate) for a in e.args]) if evaluate: e = e.xreplace({m: -(-m) for m in e.atoms(Mul) if -(-m) != m}) return e def simplify(expr, ratio=1.7, measure=count_ops, rational=False, inverse=False, doit=True, **kwargs): """Simplifies the given expression. Simplification is not a well defined term and the exact strategies this function tries can change in the future versions of SymPy. If your algorithm relies on "simplification" (whatever it is), try to determine what you need exactly - is it powsimp()?, radsimp()?, together()?, logcombine()?, or something else? And use this particular function directly, because those are well defined and thus your algorithm will be robust. Nonetheless, especially for interactive use, or when you don't know anything about the structure of the expression, simplify() tries to apply intelligent heuristics to make the input expression "simpler". For example: >>> from sympy import simplify, cos, sin >>> from sympy.abc import x, y >>> a = (x + x**2)/(x*sin(y)**2 + x*cos(y)**2) >>> a (x**2 + x)/(x*sin(y)**2 + x*cos(y)**2) >>> simplify(a) x + 1 Note that we could have obtained the same result by using specific simplification functions: >>> from sympy import trigsimp, cancel >>> trigsimp(a) (x**2 + x)/x >>> cancel(_) x + 1 In some cases, applying :func:`simplify` may actually result in some more complicated expression. The default ``ratio=1.7`` prevents more extreme cases: if (result length)/(input length) > ratio, then input is returned unmodified. The ``measure`` parameter lets you specify the function used to determine how complex an expression is. The function should take a single argument as an expression and return a number such that if expression ``a`` is more complex than expression ``b``, then ``measure(a) > measure(b)``. The default measure function is :func:`count_ops`, which returns the total number of operations in the expression. For example, if ``ratio=1``, ``simplify`` output can't be longer than input. :: >>> from sympy import sqrt, simplify, count_ops, oo >>> root = 1/(sqrt(2)+3) Since ``simplify(root)`` would result in a slightly longer expression, root is returned unchanged instead:: >>> simplify(root, ratio=1) == root True If ``ratio=oo``, simplify will be applied anyway:: >>> count_ops(simplify(root, ratio=oo)) > count_ops(root) True Note that the shortest expression is not necessary the simplest, so setting ``ratio`` to 1 may not be a good idea. Heuristically, the default value ``ratio=1.7`` seems like a reasonable choice. You can easily define your own measure function based on what you feel should represent the "size" or "complexity" of the input expression. Note that some choices, such as ``lambda expr: len(str(expr))`` may appear to be good metrics, but have other problems (in this case, the measure function may slow down simplify too much for very large expressions). If you don't know what a good metric would be, the default, ``count_ops``, is a good one. For example: >>> from sympy import symbols, log >>> a, b = symbols('a b', positive=True) >>> g = log(a) + log(b) + log(a)*log(1/b) >>> h = simplify(g) >>> h log(a*b**(1 - log(a))) >>> count_ops(g) 8 >>> count_ops(h) 5 So you can see that ``h`` is simpler than ``g`` using the count_ops metric. However, we may not like how ``simplify`` (in this case, using ``logcombine``) has created the ``b**(log(1/a) + 1)`` term. A simple way to reduce this would be to give more weight to powers as operations in ``count_ops``. We can do this by using the ``visual=True`` option: >>> print(count_ops(g, visual=True)) 2*ADD + DIV + 4*LOG + MUL >>> print(count_ops(h, visual=True)) 2*LOG + MUL + POW + SUB >>> from sympy import Symbol, S >>> def my_measure(expr): ... POW = Symbol('POW') ... # Discourage powers by giving POW a weight of 10 ... count = count_ops(expr, visual=True).subs(POW, 10) ... # Every other operation gets a weight of 1 (the default) ... count = count.replace(Symbol, type(S.One)) ... return count >>> my_measure(g) 8 >>> my_measure(h) 14 >>> 15./8 > 1.7 # 1.7 is the default ratio True >>> simplify(g, measure=my_measure) -log(a)*log(b) + log(a) + log(b) Note that because ``simplify()`` internally tries many different simplification strategies and then compares them using the measure function, we get a completely different result that is still different from the input expression by doing this. If rational=True, Floats will be recast as Rationals before simplification. If rational=None, Floats will be recast as Rationals but the result will be recast as Floats. If rational=False(default) then nothing will be done to the Floats. If inverse=True, it will be assumed that a composition of inverse functions, such as sin and asin, can be cancelled in any order. For example, ``asin(sin(x))`` will yield ``x`` without checking whether x belongs to the set where this relation is true. The default is False. Note that ``simplify()`` automatically calls ``doit()`` on the final expression. You can avoid this behavior by passing ``doit=False`` as an argument. """ def done(e): return e.doit() if doit else e expr = sympify(expr) kwargs = dict( ratio=kwargs.get('ratio', ratio), measure=kwargs.get('measure', measure), rational=kwargs.get('rational', rational), inverse=kwargs.get('inverse', inverse), doit=kwargs.get('doit', doit)) # no routine for Expr needs to check for is_zero if isinstance(expr, Expr) and expr.is_zero and expr*0 is S.Zero: return S.Zero _eval_simplify = getattr(expr, '_eval_simplify', None) if _eval_simplify is not None: return _eval_simplify(**kwargs) original_expr = expr = signsimp(expr) from sympy.simplify.hyperexpand import hyperexpand from sympy.functions.special.bessel import BesselBase from sympy import Sum, Product, Integral if not isinstance(expr, Basic) or not expr.args: # XXX: temporary hack return expr if inverse and expr.has(Function): expr = inversecombine(expr) if not expr.args: # simplified to atomic return expr if not isinstance(expr, (Add, Mul, Pow, ExpBase)): return done( expr.func(*[simplify(x, **kwargs) for x in expr.args])) if not expr.is_commutative: expr = nc_simplify(expr) # TODO: Apply different strategies, considering expression pattern: # is it a purely rational function? Is there any trigonometric function?... # See also https://github.com/sympy/sympy/pull/185. def shorter(*choices): '''Return the choice that has the fewest ops. In case of a tie, the expression listed first is selected.''' if not has_variety(choices): return choices[0] return min(choices, key=measure) # rationalize Floats floats = False if rational is not False and expr.has(Float): floats = True expr = nsimplify(expr, rational=True) expr = bottom_up(expr, lambda w: getattr(w, 'normal', lambda: w)()) expr = Mul(*powsimp(expr).as_content_primitive()) _e = cancel(expr) expr1 = shorter(_e, _mexpand(_e).cancel()) # issue 6829 expr2 = shorter(together(expr, deep=True), together(expr1, deep=True)) if ratio is S.Infinity: expr = expr2 else: expr = shorter(expr2, expr1, expr) if not isinstance(expr, Basic): # XXX: temporary hack return expr expr = factor_terms(expr, sign=False) # hyperexpand automatically only works on hypergeometric terms expr = hyperexpand(expr) expr = piecewise_fold(expr) if expr.has(KroneckerDelta): expr = kroneckersimp(expr) if expr.has(BesselBase): expr = besselsimp(expr) if expr.has(TrigonometricFunction, HyperbolicFunction): expr = trigsimp(expr, deep=True) if expr.has(log): expr = shorter(expand_log(expr, deep=True), logcombine(expr)) if expr.has(CombinatorialFunction, gamma): # expression with gamma functions or non-integer arguments is # automatically passed to gammasimp expr = combsimp(expr) if expr.has(Sum): expr = sum_simplify(expr, **kwargs) if expr.has(Integral): expr = expr.xreplace(dict([ (i, factor_terms(i)) for i in expr.atoms(Integral)])) if expr.has(Product): expr = product_simplify(expr) from sympy.physics.units import Quantity from sympy.physics.units.util import quantity_simplify if expr.has(Quantity): expr = quantity_simplify(expr) short = shorter(powsimp(expr, combine='exp', deep=True), powsimp(expr), expr) short = shorter(short, cancel(short)) short = shorter(short, factor_terms(short), expand_power_exp(expand_mul(short))) if short.has(TrigonometricFunction, HyperbolicFunction, ExpBase): short = exptrigsimp(short) # get rid of hollow 2-arg Mul factorization hollow_mul = Transform( lambda x: Mul(*x.args), lambda x: x.is_Mul and len(x.args) == 2 and x.args[0].is_Number and x.args[1].is_Add and x.is_commutative) expr = short.xreplace(hollow_mul) numer, denom = expr.as_numer_denom() if denom.is_Add: n, d = fraction(radsimp(1/denom, symbolic=False, max_terms=1)) if n is not S.One: expr = (numer*n).expand()/d if expr.could_extract_minus_sign(): n, d = fraction(expr) if d != 0: expr = signsimp(-n/(-d)) if measure(expr) > ratio*measure(original_expr): expr = original_expr # restore floats if floats and rational is None: expr = nfloat(expr, exponent=False) return done(expr) def sum_simplify(s, **kwargs): """Main function for Sum simplification""" from sympy.concrete.summations import Sum from sympy.core.function import expand if not isinstance(s, Add): s = s.xreplace(dict([(a, sum_simplify(a, **kwargs)) for a in s.atoms(Add) if a.has(Sum)])) s = expand(s) if not isinstance(s, Add): return s terms = s.args s_t = [] # Sum Terms o_t = [] # Other Terms for term in terms: sum_terms, other = sift(Mul.make_args(term), lambda i: isinstance(i, Sum), binary=True) if not sum_terms: o_t.append(term) continue other = [Mul(*other)] s_t.append(Mul(*(other + [s._eval_simplify(**kwargs) for s in sum_terms]))) result = Add(sum_combine(s_t), *o_t) return result def sum_combine(s_t): """Helper function for Sum simplification Attempts to simplify a list of sums, by combining limits / sum function's returns the simplified sum """ from sympy.concrete.summations import Sum used = [False] * len(s_t) for method in range(2): for i, s_term1 in enumerate(s_t): if not used[i]: for j, s_term2 in enumerate(s_t): if not used[j] and i != j: temp = sum_add(s_term1, s_term2, method) if isinstance(temp, Sum) or isinstance(temp, Mul): s_t[i] = temp s_term1 = s_t[i] used[j] = True result = S.Zero for i, s_term in enumerate(s_t): if not used[i]: result = Add(result, s_term) return result def factor_sum(self, limits=None, radical=False, clear=False, fraction=False, sign=True): """Return Sum with constant factors extracted. If ``limits`` is specified then ``self`` is the summand; the other keywords are passed to ``factor_terms``. Examples ======== >>> from sympy import Sum, Integral >>> from sympy.abc import x, y >>> from sympy.simplify.simplify import factor_sum >>> s = Sum(x*y, (x, 1, 3)) >>> factor_sum(s) y*Sum(x, (x, 1, 3)) >>> factor_sum(s.function, s.limits) y*Sum(x, (x, 1, 3)) """ # XXX deprecate in favor of direct call to factor_terms from sympy.concrete.summations import Sum kwargs = dict(radical=radical, clear=clear, fraction=fraction, sign=sign) expr = Sum(self, *limits) if limits else self return factor_terms(expr, **kwargs) def sum_add(self, other, method=0): """Helper function for Sum simplification""" from sympy.concrete.summations import Sum from sympy import Mul #we know this is something in terms of a constant * a sum #so we temporarily put the constants inside for simplification #then simplify the result def __refactor(val): args = Mul.make_args(val) sumv = next(x for x in args if isinstance(x, Sum)) constant = Mul(*[x for x in args if x != sumv]) return Sum(constant * sumv.function, *sumv.limits) if isinstance(self, Mul): rself = __refactor(self) else: rself = self if isinstance(other, Mul): rother = __refactor(other) else: rother = other if type(rself) == type(rother): if method == 0: if rself.limits == rother.limits: return factor_sum(Sum(rself.function + rother.function, *rself.limits)) elif method == 1: if simplify(rself.function - rother.function) == 0: if len(rself.limits) == len(rother.limits) == 1: i = rself.limits[0][0] x1 = rself.limits[0][1] y1 = rself.limits[0][2] j = rother.limits[0][0] x2 = rother.limits[0][1] y2 = rother.limits[0][2] if i == j: if x2 == y1 + 1: return factor_sum(Sum(rself.function, (i, x1, y2))) elif x1 == y2 + 1: return factor_sum(Sum(rself.function, (i, x2, y1))) return Add(self, other) def product_simplify(s): """Main function for Product simplification""" from sympy.concrete.products import Product terms = Mul.make_args(s) p_t = [] # Product Terms o_t = [] # Other Terms for term in terms: if isinstance(term, Product): p_t.append(term) else: o_t.append(term) used = [False] * len(p_t) for method in range(2): for i, p_term1 in enumerate(p_t): if not used[i]: for j, p_term2 in enumerate(p_t): if not used[j] and i != j: if isinstance(product_mul(p_term1, p_term2, method), Product): p_t[i] = product_mul(p_term1, p_term2, method) used[j] = True result = Mul(*o_t) for i, p_term in enumerate(p_t): if not used[i]: result = Mul(result, p_term) return result def product_mul(self, other, method=0): """Helper function for Product simplification""" from sympy.concrete.products import Product if type(self) == type(other): if method == 0: if self.limits == other.limits: return Product(self.function * other.function, *self.limits) elif method == 1: if simplify(self.function - other.function) == 0: if len(self.limits) == len(other.limits) == 1: i = self.limits[0][0] x1 = self.limits[0][1] y1 = self.limits[0][2] j = other.limits[0][0] x2 = other.limits[0][1] y2 = other.limits[0][2] if i == j: if x2 == y1 + 1: return Product(self.function, (i, x1, y2)) elif x1 == y2 + 1: return Product(self.function, (i, x2, y1)) return Mul(self, other) def _nthroot_solve(p, n, prec): """ helper function for ``nthroot`` It denests ``p**Rational(1, n)`` using its minimal polynomial """ from sympy.polys.numberfields import _minimal_polynomial_sq from sympy.solvers import solve while n % 2 == 0: p = sqrtdenest(sqrt(p)) n = n // 2 if n == 1: return p pn = p**Rational(1, n) x = Symbol('x') f = _minimal_polynomial_sq(p, n, x) if f is None: return None sols = solve(f, x) for sol in sols: if abs(sol - pn).n() < 1./10**prec: sol = sqrtdenest(sol) if _mexpand(sol**n) == p: return sol def logcombine(expr, force=False): """ Takes logarithms and combines them using the following rules: - log(x) + log(y) == log(x*y) if both are positive - a*log(x) == log(x**a) if x is positive and a is real If ``force`` is True then the assumptions above will be assumed to hold if there is no assumption already in place on a quantity. For example, if ``a`` is imaginary or the argument negative, force will not perform a combination but if ``a`` is a symbol with no assumptions the change will take place. Examples ======== >>> from sympy import Symbol, symbols, log, logcombine, I >>> from sympy.abc import a, x, y, z >>> logcombine(a*log(x) + log(y) - log(z)) a*log(x) + log(y) - log(z) >>> logcombine(a*log(x) + log(y) - log(z), force=True) log(x**a*y/z) >>> x,y,z = symbols('x,y,z', positive=True) >>> a = Symbol('a', real=True) >>> logcombine(a*log(x) + log(y) - log(z)) log(x**a*y/z) The transformation is limited to factors and/or terms that contain logs, so the result depends on the initial state of expansion: >>> eq = (2 + 3*I)*log(x) >>> logcombine(eq, force=True) == eq True >>> logcombine(eq.expand(), force=True) log(x**2) + I*log(x**3) See Also ======== posify: replace all symbols with symbols having positive assumptions sympy.core.function.expand_log: expand the logarithms of products and powers; the opposite of logcombine """ def f(rv): if not (rv.is_Add or rv.is_Mul): return rv def gooda(a): # bool to tell whether the leading ``a`` in ``a*log(x)`` # could appear as log(x**a) return (a is not S.NegativeOne and # -1 *could* go, but we disallow (a.is_extended_real or force and a.is_extended_real is not False)) def goodlog(l): # bool to tell whether log ``l``'s argument can combine with others a = l.args[0] return a.is_positive or force and a.is_nonpositive is not False other = [] logs = [] log1 = defaultdict(list) for a in Add.make_args(rv): if isinstance(a, log) and goodlog(a): log1[()].append(([], a)) elif not a.is_Mul: other.append(a) else: ot = [] co = [] lo = [] for ai in a.args: if ai.is_Rational and ai < 0: ot.append(S.NegativeOne) co.append(-ai) elif isinstance(ai, log) and goodlog(ai): lo.append(ai) elif gooda(ai): co.append(ai) else: ot.append(ai) if len(lo) > 1: logs.append((ot, co, lo)) elif lo: log1[tuple(ot)].append((co, lo[0])) else: other.append(a) # if there is only one log in other, put it with the # good logs if len(other) == 1 and isinstance(other[0], log): log1[()].append(([], other.pop())) # if there is only one log at each coefficient and none have # an exponent to place inside the log then there is nothing to do if not logs and all(len(log1[k]) == 1 and log1[k][0] == [] for k in log1): return rv # collapse multi-logs as far as possible in a canonical way # TODO: see if x*log(a)+x*log(a)*log(b) -> x*log(a)*(1+log(b))? # -- in this case, it's unambiguous, but if it were were a log(c) in # each term then it's arbitrary whether they are grouped by log(a) or # by log(c). So for now, just leave this alone; it's probably better to # let the user decide for o, e, l in logs: l = list(ordered(l)) e = log(l.pop(0).args[0]**Mul(*e)) while l: li = l.pop(0) e = log(li.args[0]**e) c, l = Mul(*o), e if isinstance(l, log): # it should be, but check to be sure log1[(c,)].append(([], l)) else: other.append(c*l) # logs that have the same coefficient can multiply for k in list(log1.keys()): log1[Mul(*k)] = log(logcombine(Mul(*[ l.args[0]**Mul(*c) for c, l in log1.pop(k)]), force=force), evaluate=False) # logs that have oppositely signed coefficients can divide for k in ordered(list(log1.keys())): if not k in log1: # already popped as -k continue if -k in log1: # figure out which has the minus sign; the one with # more op counts should be the one num, den = k, -k if num.count_ops() > den.count_ops(): num, den = den, num other.append( num*log(log1.pop(num).args[0]/log1.pop(den).args[0], evaluate=False)) else: other.append(k*log1.pop(k)) return Add(*other) return bottom_up(expr, f) def inversecombine(expr): """Simplify the composition of a function and its inverse. No attention is paid to whether the inverse is a left inverse or a right inverse; thus, the result will in general not be equivalent to the original expression. Examples ======== >>> from sympy.simplify.simplify import inversecombine >>> from sympy import asin, sin, log, exp >>> from sympy.abc import x >>> inversecombine(asin(sin(x))) x >>> inversecombine(2*log(exp(3*x))) 6*x """ def f(rv): if rv.is_Function and hasattr(rv, "inverse"): if (len(rv.args) == 1 and len(rv.args[0].args) == 1 and isinstance(rv.args[0], rv.inverse(argindex=1))): rv = rv.args[0].args[0] return rv return bottom_up(expr, f) def walk(e, *target): """iterate through the args that are the given types (target) and return a list of the args that were traversed; arguments that are not of the specified types are not traversed. Examples ======== >>> from sympy.simplify.simplify import walk >>> from sympy import Min, Max >>> from sympy.abc import x, y, z >>> list(walk(Min(x, Max(y, Min(1, z))), Min)) [Min(x, Max(y, Min(1, z)))] >>> list(walk(Min(x, Max(y, Min(1, z))), Min, Max)) [Min(x, Max(y, Min(1, z))), Max(y, Min(1, z)), Min(1, z)] See Also ======== bottom_up """ if isinstance(e, target): yield e for i in e.args: for w in walk(i, *target): yield w def bottom_up(rv, F, atoms=False, nonbasic=False): """Apply ``F`` to all expressions in an expression tree from the bottom up. If ``atoms`` is True, apply ``F`` even if there are no args; if ``nonbasic`` is True, try to apply ``F`` to non-Basic objects. """ args = getattr(rv, 'args', None) if args is not None: if args: args = tuple([bottom_up(a, F, atoms, nonbasic) for a in args]) if args != rv.args: rv = rv.func(*args) rv = F(rv) elif atoms: rv = F(rv) else: if nonbasic: try: rv = F(rv) except TypeError: pass return rv def kroneckersimp(expr): """ Simplify expressions with KroneckerDelta. The only simplification currently attempted is to identify multiplicative cancellation: >>> from sympy import KroneckerDelta, kroneckersimp >>> from sympy.abc import i, j >>> kroneckersimp(1 + KroneckerDelta(0, j) * KroneckerDelta(1, j)) 1 """ def args_cancel(args1, args2): for i1 in range(2): for i2 in range(2): a1 = args1[i1] a2 = args2[i2] a3 = args1[(i1 + 1) % 2] a4 = args2[(i2 + 1) % 2] if Eq(a1, a2) is S.true and Eq(a3, a4) is S.false: return True return False def cancel_kronecker_mul(m): from sympy.utilities.iterables import subsets args = m.args deltas = [a for a in args if isinstance(a, KroneckerDelta)] for delta1, delta2 in subsets(deltas, 2): args1 = delta1.args args2 = delta2.args if args_cancel(args1, args2): return 0*m return m if not expr.has(KroneckerDelta): return expr if expr.has(Piecewise): expr = expr.rewrite(KroneckerDelta) newexpr = expr expr = None while newexpr != expr: expr = newexpr newexpr = expr.replace(lambda e: isinstance(e, Mul), cancel_kronecker_mul) return expr def besselsimp(expr): """ Simplify bessel-type functions. This routine tries to simplify bessel-type functions. Currently it only works on the Bessel J and I functions, however. It works by looking at all such functions in turn, and eliminating factors of "I" and "-1" (actually their polar equivalents) in front of the argument. Then, functions of half-integer order are rewritten using strigonometric functions and functions of integer order (> 1) are rewritten using functions of low order. Finally, if the expression was changed, compute factorization of the result with factor(). >>> from sympy import besselj, besseli, besselsimp, polar_lift, I, S >>> from sympy.abc import z, nu >>> besselsimp(besselj(nu, z*polar_lift(-1))) exp(I*pi*nu)*besselj(nu, z) >>> besselsimp(besseli(nu, z*polar_lift(-I))) exp(-I*pi*nu/2)*besselj(nu, z) >>> besselsimp(besseli(S(-1)/2, z)) sqrt(2)*cosh(z)/(sqrt(pi)*sqrt(z)) >>> besselsimp(z*besseli(0, z) + z*(besseli(2, z))/2 + besseli(1, z)) 3*z*besseli(0, z)/2 """ # TODO # - better algorithm? # - simplify (cos(pi*b)*besselj(b,z) - besselj(-b,z))/sin(pi*b) ... # - use contiguity relations? def replacer(fro, to, factors): factors = set(factors) def repl(nu, z): if factors.intersection(Mul.make_args(z)): return to(nu, z) return fro(nu, z) return repl def torewrite(fro, to): def tofunc(nu, z): return fro(nu, z).rewrite(to) return tofunc def tominus(fro): def tofunc(nu, z): return exp(I*pi*nu)*fro(nu, exp_polar(-I*pi)*z) return tofunc orig_expr = expr ifactors = [I, exp_polar(I*pi/2), exp_polar(-I*pi/2)] expr = expr.replace( besselj, replacer(besselj, torewrite(besselj, besseli), ifactors)) expr = expr.replace( besseli, replacer(besseli, torewrite(besseli, besselj), ifactors)) minusfactors = [-1, exp_polar(I*pi)] expr = expr.replace( besselj, replacer(besselj, tominus(besselj), minusfactors)) expr = expr.replace( besseli, replacer(besseli, tominus(besseli), minusfactors)) z0 = Dummy('z') def expander(fro): def repl(nu, z): if (nu % 1) == S(1)/2: return simplify(trigsimp(unpolarify( fro(nu, z0).rewrite(besselj).rewrite(jn).expand( func=True)).subs(z0, z))) elif nu.is_Integer and nu > 1: return fro(nu, z).expand(func=True) return fro(nu, z) return repl expr = expr.replace(besselj, expander(besselj)) expr = expr.replace(bessely, expander(bessely)) expr = expr.replace(besseli, expander(besseli)) expr = expr.replace(besselk, expander(besselk)) if expr != orig_expr: expr = expr.factor() return expr def nthroot(expr, n, max_len=4, prec=15): """ compute a real nth-root of a sum of surds Parameters ========== expr : sum of surds n : integer max_len : maximum number of surds passed as constants to ``nsimplify`` Algorithm ========= First ``nsimplify`` is used to get a candidate root; if it is not a root the minimal polynomial is computed; the answer is one of its roots. Examples ======== >>> from sympy.simplify.simplify import nthroot >>> from sympy import Rational, sqrt >>> nthroot(90 + 34*sqrt(7), 3) sqrt(7) + 3 """ expr = sympify(expr) n = sympify(n) p = expr**Rational(1, n) if not n.is_integer: return p if not _is_sum_surds(expr): return p surds = [] coeff_muls = [x.as_coeff_Mul() for x in expr.args] for x, y in coeff_muls: if not x.is_rational: return p if y is S.One: continue if not (y.is_Pow and y.exp == S.Half and y.base.is_integer): return p surds.append(y) surds.sort() surds = surds[:max_len] if expr < 0 and n % 2 == 1: p = (-expr)**Rational(1, n) a = nsimplify(p, constants=surds) res = a if _mexpand(a**n) == _mexpand(-expr) else p return -res a = nsimplify(p, constants=surds) if _mexpand(a) is not _mexpand(p) and _mexpand(a**n) == _mexpand(expr): return _mexpand(a) expr = _nthroot_solve(expr, n, prec) if expr is None: return p return expr def nsimplify(expr, constants=(), tolerance=None, full=False, rational=None, rational_conversion='base10'): """ Find a simple representation for a number or, if there are free symbols or if rational=True, then replace Floats with their Rational equivalents. If no change is made and rational is not False then Floats will at least be converted to Rationals. For numerical expressions, a simple formula that numerically matches the given numerical expression is sought (and the input should be possible to evalf to a precision of at least 30 digits). Optionally, a list of (rationally independent) constants to include in the formula may be given. A lower tolerance may be set to find less exact matches. If no tolerance is given then the least precise value will set the tolerance (e.g. Floats default to 15 digits of precision, so would be tolerance=10**-15). With full=True, a more extensive search is performed (this is useful to find simpler numbers when the tolerance is set low). When converting to rational, if rational_conversion='base10' (the default), then convert floats to rationals using their base-10 (string) representation. When rational_conversion='exact' it uses the exact, base-2 representation. Examples ======== >>> from sympy import nsimplify, sqrt, GoldenRatio, exp, I, exp, pi >>> nsimplify(4/(1+sqrt(5)), [GoldenRatio]) -2 + 2*GoldenRatio >>> nsimplify((1/(exp(3*pi*I/5)+1))) 1/2 - I*sqrt(sqrt(5)/10 + 1/4) >>> nsimplify(I**I, [pi]) exp(-pi/2) >>> nsimplify(pi, tolerance=0.01) 22/7 >>> nsimplify(0.333333333333333, rational=True, rational_conversion='exact') 6004799503160655/18014398509481984 >>> nsimplify(0.333333333333333, rational=True) 1/3 See Also ======== sympy.core.function.nfloat """ try: return sympify(as_int(expr)) except (TypeError, ValueError): pass expr = sympify(expr).xreplace({ Float('inf'): S.Infinity, Float('-inf'): S.NegativeInfinity, }) if expr is S.Infinity or expr is S.NegativeInfinity: return expr if rational or expr.free_symbols: return _real_to_rational(expr, tolerance, rational_conversion) # SymPy's default tolerance for Rationals is 15; other numbers may have # lower tolerances set, so use them to pick the largest tolerance if None # was given if tolerance is None: tolerance = 10**-min([15] + [mpmath.libmp.libmpf.prec_to_dps(n._prec) for n in expr.atoms(Float)]) # XXX should prec be set independent of tolerance or should it be computed # from tolerance? prec = 30 bprec = int(prec*3.33) constants_dict = {} for constant in constants: constant = sympify(constant) v = constant.evalf(prec) if not v.is_Float: raise ValueError("constants must be real-valued") constants_dict[str(constant)] = v._to_mpmath(bprec) exprval = expr.evalf(prec, chop=True) re, im = exprval.as_real_imag() # safety check to make sure that this evaluated to a number if not (re.is_Number and im.is_Number): return expr def nsimplify_real(x): orig = mpmath.mp.dps xv = x._to_mpmath(bprec) try: # We'll be happy with low precision if a simple fraction if not (tolerance or full): mpmath.mp.dps = 15 rat = mpmath.pslq([xv, 1]) if rat is not None: return Rational(-int(rat[1]), int(rat[0])) mpmath.mp.dps = prec newexpr = mpmath.identify(xv, constants=constants_dict, tol=tolerance, full=full) if not newexpr: raise ValueError if full: newexpr = newexpr[0] expr = sympify(newexpr) if x and not expr: # don't let x become 0 raise ValueError if expr.is_finite is False and not xv in [mpmath.inf, mpmath.ninf]: raise ValueError return expr finally: # even though there are returns above, this is executed # before leaving mpmath.mp.dps = orig try: if re: re = nsimplify_real(re) if im: im = nsimplify_real(im) except ValueError: if rational is None: return _real_to_rational(expr, rational_conversion=rational_conversion) return expr rv = re + im*S.ImaginaryUnit # if there was a change or rational is explicitly not wanted # return the value, else return the Rational representation if rv != expr or rational is False: return rv return _real_to_rational(expr, rational_conversion=rational_conversion) def _real_to_rational(expr, tolerance=None, rational_conversion='base10'): """ Replace all reals in expr with rationals. Examples ======== >>> from sympy import Rational >>> from sympy.simplify.simplify import _real_to_rational >>> from sympy.abc import x >>> _real_to_rational(.76 + .1*x**.5) sqrt(x)/10 + 19/25 If rational_conversion='base10', this uses the base-10 string. If rational_conversion='exact', the exact, base-2 representation is used. >>> _real_to_rational(0.333333333333333, rational_conversion='exact') 6004799503160655/18014398509481984 >>> _real_to_rational(0.333333333333333) 1/3 """ expr = _sympify(expr) inf = Float('inf') p = expr reps = {} reduce_num = None if tolerance is not None and tolerance < 1: reduce_num = ceiling(1/tolerance) for fl in p.atoms(Float): key = fl if reduce_num is not None: r = Rational(fl).limit_denominator(reduce_num) elif (tolerance is not None and tolerance >= 1 and fl.is_Integer is False): r = Rational(tolerance*round(fl/tolerance) ).limit_denominator(int(tolerance)) else: if rational_conversion == 'exact': r = Rational(fl) reps[key] = r continue elif rational_conversion != 'base10': raise ValueError("rational_conversion must be 'base10' or 'exact'") r = nsimplify(fl, rational=False) # e.g. log(3).n() -> log(3) instead of a Rational if fl and not r: r = Rational(fl) elif not r.is_Rational: if fl == inf or fl == -inf: r = S.ComplexInfinity elif fl < 0: fl = -fl d = Pow(10, int((mpmath.log(fl)/mpmath.log(10)))) r = -Rational(str(fl/d))*d elif fl > 0: d = Pow(10, int((mpmath.log(fl)/mpmath.log(10)))) r = Rational(str(fl/d))*d else: r = Integer(0) reps[key] = r return p.subs(reps, simultaneous=True) def clear_coefficients(expr, rhs=S.Zero): """Return `p, r` where `p` is the expression obtained when Rational additive and multiplicative coefficients of `expr` have been stripped away in a naive fashion (i.e. without simplification). The operations needed to remove the coefficients will be applied to `rhs` and returned as `r`. Examples ======== >>> from sympy.simplify.simplify import clear_coefficients >>> from sympy.abc import x, y >>> from sympy import Dummy >>> expr = 4*y*(6*x + 3) >>> clear_coefficients(expr - 2) (y*(2*x + 1), 1/6) When solving 2 or more expressions like `expr = a`, `expr = b`, etc..., it is advantageous to provide a Dummy symbol for `rhs` and simply replace it with `a`, `b`, etc... in `r`. >>> rhs = Dummy('rhs') >>> clear_coefficients(expr, rhs) (y*(2*x + 1), _rhs/12) >>> _[1].subs(rhs, 2) 1/6 """ was = None free = expr.free_symbols if expr.is_Rational: return (S.Zero, rhs - expr) while expr and was != expr: was = expr m, expr = ( expr.as_content_primitive() if free else factor_terms(expr).as_coeff_Mul(rational=True)) rhs /= m c, expr = expr.as_coeff_Add(rational=True) rhs -= c expr = signsimp(expr, evaluate = False) if _coeff_isneg(expr): expr = -expr rhs = -rhs return expr, rhs def nc_simplify(expr, deep=True): ''' Simplify a non-commutative expression composed of multiplication and raising to a power by grouping repeated subterms into one power. Priority is given to simplifications that give the fewest number of arguments in the end (for example, in a*b*a*b*c*a*b*c simplifying to (a*b)**2*c*a*b*c gives 5 arguments while a*b*(a*b*c)**2 has 3). If `expr` is a sum of such terms, the sum of the simplified terms is returned. Keyword argument `deep` controls whether or not subexpressions nested deeper inside the main expression are simplified. See examples below. Setting `deep` to `False` can save time on nested expressions that don't need simplifying on all levels. Examples ======== >>> from sympy import symbols >>> from sympy.simplify.simplify import nc_simplify >>> a, b, c = symbols("a b c", commutative=False) >>> nc_simplify(a*b*a*b*c*a*b*c) a*b*(a*b*c)**2 >>> expr = a**2*b*a**4*b*a**4 >>> nc_simplify(expr) a**2*(b*a**4)**2 >>> nc_simplify(a*b*a*b*c**2*(a*b)**2*c**2) ((a*b)**2*c**2)**2 >>> nc_simplify(a*b*a*b + 2*a*c*a**2*c*a**2*c*a) (a*b)**2 + 2*(a*c*a)**3 >>> nc_simplify(b**-1*a**-1*(a*b)**2) a*b >>> nc_simplify(a**-1*b**-1*c*a) (b*a)**(-1)*c*a >>> expr = (a*b*a*b)**2*a*c*a*c >>> nc_simplify(expr) (a*b)**4*(a*c)**2 >>> nc_simplify(expr, deep=False) (a*b*a*b)**2*(a*c)**2 ''' from sympy.matrices.expressions import (MatrixExpr, MatAdd, MatMul, MatPow, MatrixSymbol) from sympy.core.exprtools import factor_nc if isinstance(expr, MatrixExpr): expr = expr.doit(inv_expand=False) _Add, _Mul, _Pow, _Symbol = MatAdd, MatMul, MatPow, MatrixSymbol else: _Add, _Mul, _Pow, _Symbol = Add, Mul, Pow, Symbol # =========== Auxiliary functions ======================== def _overlaps(args): # Calculate a list of lists m such that m[i][j] contains the lengths # of all possible overlaps between args[:i+1] and args[i+1+j:]. # An overlap is a suffix of the prefix that matches a prefix # of the suffix. # For example, let expr=c*a*b*a*b*a*b*a*b. Then m[3][0] contains # the lengths of overlaps of c*a*b*a*b with a*b*a*b. The overlaps # are a*b*a*b, a*b and the empty word so that m[3][0]=[4,2,0]. # All overlaps rather than only the longest one are recorded # because this information helps calculate other overlap lengths. m = [[([1, 0] if a == args[0] else [0]) for a in args[1:]]] for i in range(1, len(args)): overlaps = [] j = 0 for j in range(len(args) - i - 1): overlap = [] for v in m[i-1][j+1]: if j + i + 1 + v < len(args) and args[i] == args[j+i+1+v]: overlap.append(v + 1) overlap += [0] overlaps.append(overlap) m.append(overlaps) return m def _reduce_inverses(_args): # replace consecutive negative powers by an inverse # of a product of positive powers, e.g. a**-1*b**-1*c # will simplify to (a*b)**-1*c; # return that new args list and the number of negative # powers in it (inv_tot) inv_tot = 0 # total number of inverses inverses = [] args = [] for arg in _args: if isinstance(arg, _Pow) and arg.args[1] < 0: inverses = [arg**-1] + inverses inv_tot += 1 else: if len(inverses) == 1: args.append(inverses[0]**-1) elif len(inverses) > 1: args.append(_Pow(_Mul(*inverses), -1)) inv_tot -= len(inverses) - 1 inverses = [] args.append(arg) if inverses: args.append(_Pow(_Mul(*inverses), -1)) inv_tot -= len(inverses) - 1 return inv_tot, tuple(args) def get_score(s): # compute the number of arguments of s # (including in nested expressions) overall # but ignore exponents if isinstance(s, _Pow): return get_score(s.args[0]) elif isinstance(s, (_Add, _Mul)): return sum([get_score(a) for a in s.args]) return 1 def compare(s, alt_s): # compare two possible simplifications and return a # "better" one if s != alt_s and get_score(alt_s) < get_score(s): return alt_s return s # ======================================================== if not isinstance(expr, (_Add, _Mul, _Pow)) or expr.is_commutative: return expr args = expr.args[:] if isinstance(expr, _Pow): if deep: return _Pow(nc_simplify(args[0]), args[1]).doit() else: return expr elif isinstance(expr, _Add): return _Add(*[nc_simplify(a, deep=deep) for a in args]).doit() else: # get the non-commutative part c_args, args = expr.args_cnc() com_coeff = Mul(*c_args) if com_coeff != 1: return com_coeff*nc_simplify(expr/com_coeff, deep=deep) inv_tot, args = _reduce_inverses(args) # if most arguments are negative, work with the inverse # of the expression, e.g. a**-1*b*a**-1*c**-1 will become # (c*a*b**-1*a)**-1 at the end so can work with c*a*b**-1*a invert = False if inv_tot > len(args)/2: invert = True args = [a**-1 for a in args[::-1]] if deep: args = tuple(nc_simplify(a) for a in args) m = _overlaps(args) # simps will be {subterm: end} where `end` is the ending # index of a sequence of repetitions of subterm; # this is for not wasting time with subterms that are part # of longer, already considered sequences simps = {} post = 1 pre = 1 # the simplification coefficient is the number of # arguments by which contracting a given sequence # would reduce the word; e.g. in a*b*a*b*c*a*b*c, # contracting a*b*a*b to (a*b)**2 removes 3 arguments # while a*b*c*a*b*c to (a*b*c)**2 removes 6. It's # better to contract the latter so simplification # with a maximum simplification coefficient will be chosen max_simp_coeff = 0 simp = None # information about future simplification for i in range(1, len(args)): simp_coeff = 0 l = 0 # length of a subterm p = 0 # the power of a subterm if i < len(args) - 1: rep = m[i][0] start = i # starting index of the repeated sequence end = i+1 # ending index of the repeated sequence if i == len(args)-1 or rep == [0]: # no subterm is repeated at this stage, at least as # far as the arguments are concerned - there may be # a repetition if powers are taken into account if (isinstance(args[i], _Pow) and not isinstance(args[i].args[0], _Symbol)): subterm = args[i].args[0].args l = len(subterm) if args[i-l:i] == subterm: # e.g. a*b in a*b*(a*b)**2 is not repeated # in args (= [a, b, (a*b)**2]) but it # can be matched here p += 1 start -= l if args[i+1:i+1+l] == subterm: # e.g. a*b in (a*b)**2*a*b p += 1 end += l if p: p += args[i].args[1] else: continue else: l = rep[0] # length of the longest repeated subterm at this point start -= l - 1 subterm = args[start:end] p = 2 end += l if subterm in simps and simps[subterm] >= start: # the subterm is part of a sequence that # has already been considered continue # count how many times it's repeated while end < len(args): if l in m[end-1][0]: p += 1 end += l elif isinstance(args[end], _Pow) and args[end].args[0].args == subterm: # for cases like a*b*a*b*(a*b)**2*a*b p += args[end].args[1] end += 1 else: break # see if another match can be made, e.g. # for b*a**2 in b*a**2*b*a**3 or a*b in # a**2*b*a*b pre_exp = 0 pre_arg = 1 if start - l >= 0 and args[start-l+1:start] == subterm[1:]: if isinstance(subterm[0], _Pow): pre_arg = subterm[0].args[0] exp = subterm[0].args[1] else: pre_arg = subterm[0] exp = 1 if isinstance(args[start-l], _Pow) and args[start-l].args[0] == pre_arg: pre_exp = args[start-l].args[1] - exp start -= l p += 1 elif args[start-l] == pre_arg: pre_exp = 1 - exp start -= l p += 1 post_exp = 0 post_arg = 1 if end + l - 1 < len(args) and args[end:end+l-1] == subterm[:-1]: if isinstance(subterm[-1], _Pow): post_arg = subterm[-1].args[0] exp = subterm[-1].args[1] else: post_arg = subterm[-1] exp = 1 if isinstance(args[end+l-1], _Pow) and args[end+l-1].args[0] == post_arg: post_exp = args[end+l-1].args[1] - exp end += l p += 1 elif args[end+l-1] == post_arg: post_exp = 1 - exp end += l p += 1 # Consider a*b*a**2*b*a**2*b*a: # b*a**2 is explicitly repeated, but note # that in this case a*b*a is also repeated # so there are two possible simplifications: # a*(b*a**2)**3*a**-1 or (a*b*a)**3 # The latter is obviously simpler. # But in a*b*a**2*b**2*a**2 the simplifications are # a*(b*a**2)**2 and (a*b*a)**3*a in which case # it's better to stick with the shorter subterm if post_exp and exp % 2 == 0 and start > 0: exp = exp/2 _pre_exp = 1 _post_exp = 1 if isinstance(args[start-1], _Pow) and args[start-1].args[0] == post_arg: _post_exp = post_exp + exp _pre_exp = args[start-1].args[1] - exp elif args[start-1] == post_arg: _post_exp = post_exp + exp _pre_exp = 1 - exp if _pre_exp == 0 or _post_exp == 0: if not pre_exp: start -= 1 post_exp = _post_exp pre_exp = _pre_exp pre_arg = post_arg subterm = (post_arg**exp,) + subterm[:-1] + (post_arg**exp,) simp_coeff += end-start if post_exp: simp_coeff -= 1 if pre_exp: simp_coeff -= 1 simps[subterm] = end if simp_coeff > max_simp_coeff: max_simp_coeff = simp_coeff simp = (start, _Mul(*subterm), p, end, l) pre = pre_arg**pre_exp post = post_arg**post_exp if simp: subterm = _Pow(nc_simplify(simp[1], deep=deep), simp[2]) pre = nc_simplify(_Mul(*args[:simp[0]])*pre, deep=deep) post = post*nc_simplify(_Mul(*args[simp[3]:]), deep=deep) simp = pre*subterm*post if pre != 1 or post != 1: # new simplifications may be possible but no need # to recurse over arguments simp = nc_simplify(simp, deep=False) else: simp = _Mul(*args) if invert: simp = _Pow(simp, -1) # see if factor_nc(expr) is simplified better if not isinstance(expr, MatrixExpr): f_expr = factor_nc(expr) if f_expr != expr: alt_simp = nc_simplify(f_expr, deep=deep) simp = compare(simp, alt_simp) else: simp = simp.doit(inv_expand=False) return simp

c7a44562ad8ffb348d977d5170cfc5ead565c329373c56767c60f065ce2117eb

"""The module helps converting SymPy expressions into shorter forms of them. for example: the expression E**(pi*I) will be converted into -1 the expression (x+x)**2 will be converted into 4*x**2 """ from .simplify import (simplify, hypersimp, hypersimilar, logcombine, separatevars, posify, besselsimp, kroneckersimp, signsimp, bottom_up, nsimplify) from .fu import FU, fu from .sqrtdenest import sqrtdenest from .cse_main import cse from .traversaltools import use from .epathtools import epath, EPath from .hyperexpand import hyperexpand from .radsimp import collect, rcollect, radsimp, collect_const, fraction, numer, denom from .trigsimp import trigsimp, exptrigsimp from .powsimp import powsimp, powdenest from .combsimp import combsimp from .gammasimp import gammasimp from .ratsimp import ratsimp, ratsimpmodprime

9db141fe13acb3512c00d0896fb8f2d7551e688bcc09608ef2418021c41704a3

""" Implementation of the trigsimp algorithm by Fu et al. The idea behind the ``fu`` algorithm is to use a sequence of rules, applied in what is heuristically known to be a smart order, to select a simpler expression that is equivalent to the input. There are transform rules in which a single rule is applied to the expression tree. The following are just mnemonic in nature; see the docstrings for examples. TR0 - simplify expression TR1 - sec-csc to cos-sin TR2 - tan-cot to sin-cos ratio TR2i - sin-cos ratio to tan TR3 - angle canonicalization TR4 - functions at special angles TR5 - powers of sin to powers of cos TR6 - powers of cos to powers of sin TR7 - reduce cos power (increase angle) TR8 - expand products of sin-cos to sums TR9 - contract sums of sin-cos to products TR10 - separate sin-cos arguments TR10i - collect sin-cos arguments TR11 - reduce double angles TR12 - separate tan arguments TR12i - collect tan arguments TR13 - expand product of tan-cot TRmorrie - prod(cos(x*2**i), (i, 0, k - 1)) -> sin(2**k*x)/(2**k*sin(x)) TR14 - factored powers of sin or cos to cos or sin power TR15 - negative powers of sin to cot power TR16 - negative powers of cos to tan power TR22 - tan-cot powers to negative powers of sec-csc functions TR111 - negative sin-cos-tan powers to csc-sec-cot There are 4 combination transforms (CTR1 - CTR4) in which a sequence of transformations are applied and the simplest expression is selected from a few options. Finally, there are the 2 rule lists (RL1 and RL2), which apply a sequence of transformations and combined transformations, and the ``fu`` algorithm itself, which applies rules and rule lists and selects the best expressions. There is also a function ``L`` which counts the number of trigonometric functions that appear in the expression. Other than TR0, re-writing of expressions is not done by the transformations. e.g. TR10i finds pairs of terms in a sum that are in the form like ``cos(x)*cos(y) + sin(x)*sin(y)``. Such expression are targeted in a bottom-up traversal of the expression, but no manipulation to make them appear is attempted. For example, Set-up for examples below: >>> from sympy.simplify.fu import fu, L, TR9, TR10i, TR11 >>> from sympy import factor, sin, cos, powsimp >>> from sympy.abc import x, y, z, a >>> from time import time >>> eq = cos(x + y)/cos(x) >>> TR10i(eq.expand(trig=True)) -sin(x)*sin(y)/cos(x) + cos(y) If the expression is put in "normal" form (with a common denominator) then the transformation is successful: >>> TR10i(_.normal()) cos(x + y)/cos(x) TR11's behavior is similar. It rewrites double angles as smaller angles but doesn't do any simplification of the result. >>> TR11(sin(2)**a*cos(1)**(-a), 1) (2*sin(1)*cos(1))**a*cos(1)**(-a) >>> powsimp(_) (2*sin(1))**a The temptation is to try make these TR rules "smarter" but that should really be done at a higher level; the TR rules should try maintain the "do one thing well" principle. There is one exception, however. In TR10i and TR9 terms are recognized even when they are each multiplied by a common factor: >>> fu(a*cos(x)*cos(y) + a*sin(x)*sin(y)) a*cos(x - y) Factoring with ``factor_terms`` is used but it it "JIT"-like, being delayed until it is deemed necessary. Furthermore, if the factoring does not help with the simplification, it is not retained, so ``a*cos(x)*cos(y) + a*sin(x)*sin(z)`` does not become the factored (but unsimplified in the trigonometric sense) expression: >>> fu(a*cos(x)*cos(y) + a*sin(x)*sin(z)) a*sin(x)*sin(z) + a*cos(x)*cos(y) In some cases factoring might be a good idea, but the user is left to make that decision. For example: >>> expr=((15*sin(2*x) + 19*sin(x + y) + 17*sin(x + z) + 19*cos(x - z) + ... 25)*(20*sin(2*x) + 15*sin(x + y) + sin(y + z) + 14*cos(x - z) + ... 14*cos(y - z))*(9*sin(2*y) + 12*sin(y + z) + 10*cos(x - y) + 2*cos(y - ... z) + 18)).expand(trig=True).expand() In the expanded state, there are nearly 1000 trig functions: >>> L(expr) 932 If the expression where factored first, this would take time but the resulting expression would be transformed very quickly: >>> def clock(f, n=2): ... t=time(); f(); return round(time()-t, n) ... >>> clock(lambda: factor(expr)) # doctest: +SKIP 0.86 >>> clock(lambda: TR10i(expr), 3) # doctest: +SKIP 0.016 If the unexpanded expression is used, the transformation takes longer but not as long as it took to factor it and then transform it: >>> clock(lambda: TR10i(expr), 2) # doctest: +SKIP 0.28 So neither expansion nor factoring is used in ``TR10i``: if the expression is already factored (or partially factored) then expansion with ``trig=True`` would destroy what is already known and take longer; if the expression is expanded, factoring may take longer than simply applying the transformation itself. Although the algorithms should be canonical, always giving the same result, they may not yield the best result. This, in general, is the nature of simplification where searching all possible transformation paths is very expensive. Here is a simple example. There are 6 terms in the following sum: >>> expr = (sin(x)**2*cos(y)*cos(z) + sin(x)*sin(y)*cos(x)*cos(z) + ... sin(x)*sin(z)*cos(x)*cos(y) + sin(y)*sin(z)*cos(x)**2 + sin(y)*sin(z) + ... cos(y)*cos(z)) >>> args = expr.args Serendipitously, fu gives the best result: >>> fu(expr) 3*cos(y - z)/2 - cos(2*x + y + z)/2 But if different terms were combined, a less-optimal result might be obtained, requiring some additional work to get better simplification, but still less than optimal. The following shows an alternative form of ``expr`` that resists optimal simplification once a given step is taken since it leads to a dead end: >>> TR9(-cos(x)**2*cos(y + z) + 3*cos(y - z)/2 + ... cos(y + z)/2 + cos(-2*x + y + z)/4 - cos(2*x + y + z)/4) sin(2*x)*sin(y + z)/2 - cos(x)**2*cos(y + z) + 3*cos(y - z)/2 + cos(y + z)/2 Here is a smaller expression that exhibits the same behavior: >>> a = sin(x)*sin(z)*cos(x)*cos(y) + sin(x)*sin(y)*cos(x)*cos(z) >>> TR10i(a) sin(x)*sin(y + z)*cos(x) >>> newa = _ >>> TR10i(expr - a) # this combines two more of the remaining terms sin(x)**2*cos(y)*cos(z) + sin(y)*sin(z)*cos(x)**2 + cos(y - z) >>> TR10i(_ + newa) == _ + newa # but now there is no more simplification True Without getting lucky or trying all possible pairings of arguments, the final result may be less than optimal and impossible to find without better heuristics or brute force trial of all possibilities. Notes ===== This work was started by Dimitar Vlahovski at the Technological School "Electronic systems" (30.11.2011). References ========== Fu, Hongguang, Xiuqin Zhong, and Zhenbing Zeng. "Automated and readable simplification of trigonometric expressions." Mathematical and computer modelling 44.11 (2006): 1169-1177. http://rfdz.ph-noe.ac.at/fileadmin/Mathematik_Uploads/ACDCA/DESTIME2006/DES_contribs/Fu/simplification.pdf http://www.sosmath.com/trig/Trig5/trig5/pdf/pdf.html gives a formula sheet. """ from __future__ import print_function, division from collections import defaultdict from sympy.core.add import Add from sympy.core.basic import S from sympy.core.compatibility import ordered, range from sympy.core.expr import Expr from sympy.core.exprtools import Factors, gcd_terms, factor_terms from sympy.core.function import expand_mul from sympy.core.mul import Mul from sympy.core.numbers import pi, I from sympy.core.power import Pow from sympy.core.symbol import Dummy from sympy.core.sympify import sympify from sympy.functions.combinatorial.factorials import binomial from sympy.functions.elementary.hyperbolic import ( cosh, sinh, tanh, coth, sech, csch, HyperbolicFunction) from sympy.functions.elementary.trigonometric import ( cos, sin, tan, cot, sec, csc, sqrt, TrigonometricFunction) from sympy.ntheory.factor_ import perfect_power from sympy.polys.polytools import factor from sympy.simplify.simplify import bottom_up from sympy.strategies.tree import greedy from sympy.strategies.core import identity, debug from sympy import SYMPY_DEBUG # ================== Fu-like tools =========================== def TR0(rv): """Simplification of rational polynomials, trying to simplify the expression, e.g. combine things like 3*x + 2*x, etc.... """ # although it would be nice to use cancel, it doesn't work # with noncommutatives return rv.normal().factor().expand() def TR1(rv): """Replace sec, csc with 1/cos, 1/sin Examples ======== >>> from sympy.simplify.fu import TR1, sec, csc >>> from sympy.abc import x >>> TR1(2*csc(x) + sec(x)) 1/cos(x) + 2/sin(x) """ def f(rv): if isinstance(rv, sec): a = rv.args[0] return S.One/cos(a) elif isinstance(rv, csc): a = rv.args[0] return S.One/sin(a) return rv return bottom_up(rv, f) def TR2(rv): """Replace tan and cot with sin/cos and cos/sin Examples ======== >>> from sympy.simplify.fu import TR2 >>> from sympy.abc import x >>> from sympy import tan, cot, sin, cos >>> TR2(tan(x)) sin(x)/cos(x) >>> TR2(cot(x)) cos(x)/sin(x) >>> TR2(tan(tan(x) - sin(x)/cos(x))) 0 """ def f(rv): if isinstance(rv, tan): a = rv.args[0] return sin(a)/cos(a) elif isinstance(rv, cot): a = rv.args[0] return cos(a)/sin(a) return rv return bottom_up(rv, f) def TR2i(rv, half=False): """Converts ratios involving sin and cos as follows:: sin(x)/cos(x) -> tan(x) sin(x)/(cos(x) + 1) -> tan(x/2) if half=True Examples ======== >>> from sympy.simplify.fu import TR2i >>> from sympy.abc import x, a >>> from sympy import sin, cos >>> TR2i(sin(x)/cos(x)) tan(x) Powers of the numerator and denominator are also recognized >>> TR2i(sin(x)**2/(cos(x) + 1)**2, half=True) tan(x/2)**2 The transformation does not take place unless assumptions allow (i.e. the base must be positive or the exponent must be an integer for both numerator and denominator) >>> TR2i(sin(x)**a/(cos(x) + 1)**a) (cos(x) + 1)**(-a)*sin(x)**a """ def f(rv): if not rv.is_Mul: return rv n, d = rv.as_numer_denom() if n.is_Atom or d.is_Atom: return rv def ok(k, e): # initial filtering of factors return ( (e.is_integer or k.is_positive) and ( k.func in (sin, cos) or (half and k.is_Add and len(k.args) >= 2 and any(any(isinstance(ai, cos) or ai.is_Pow and ai.base is cos for ai in Mul.make_args(a)) for a in k.args)))) n = n.as_powers_dict() ndone = [(k, n.pop(k)) for k in list(n.keys()) if not ok(k, n[k])] if not n: return rv d = d.as_powers_dict() ddone = [(k, d.pop(k)) for k in list(d.keys()) if not ok(k, d[k])] if not d: return rv # factoring if necessary def factorize(d, ddone): newk = [] for k in d: if k.is_Add and len(k.args) > 1: knew = factor(k) if half else factor_terms(k) if knew != k: newk.append((k, knew)) if newk: for i, (k, knew) in enumerate(newk): del d[k] newk[i] = knew newk = Mul(*newk).as_powers_dict() for k in newk: v = d[k] + newk[k] if ok(k, v): d[k] = v else: ddone.append((k, v)) del newk factorize(n, ndone) factorize(d, ddone) # joining t = [] for k in n: if isinstance(k, sin): a = cos(k.args[0], evaluate=False) if a in d and d[a] == n[k]: t.append(tan(k.args[0])**n[k]) n[k] = d[a] = None elif half: a1 = 1 + a if a1 in d and d[a1] == n[k]: t.append((tan(k.args[0]/2))**n[k]) n[k] = d[a1] = None elif isinstance(k, cos): a = sin(k.args[0], evaluate=False) if a in d and d[a] == n[k]: t.append(tan(k.args[0])**-n[k]) n[k] = d[a] = None elif half and k.is_Add and k.args[0] is S.One and \ isinstance(k.args[1], cos): a = sin(k.args[1].args[0], evaluate=False) if a in d and d[a] == n[k] and (d[a].is_integer or \ a.is_positive): t.append(tan(a.args[0]/2)**-n[k]) n[k] = d[a] = None if t: rv = Mul(*(t + [b**e for b, e in n.items() if e]))/\ Mul(*[b**e for b, e in d.items() if e]) rv *= Mul(*[b**e for b, e in ndone])/Mul(*[b**e for b, e in ddone]) return rv return bottom_up(rv, f) def TR3(rv): """Induced formula: example sin(-a) = -sin(a) Examples ======== >>> from sympy.simplify.fu import TR3 >>> from sympy.abc import x, y >>> from sympy import pi >>> from sympy import cos >>> TR3(cos(y - x*(y - x))) cos(x*(x - y) + y) >>> cos(pi/2 + x) -sin(x) >>> cos(30*pi/2 + x) -cos(x) """ from sympy.simplify.simplify import signsimp # Negative argument (already automatic for funcs like sin(-x) -> -sin(x) # but more complicated expressions can use it, too). Also, trig angles # between pi/4 and pi/2 are not reduced to an angle between 0 and pi/4. # The following are automatically handled: # Argument of type: pi/2 +/- angle # Argument of type: pi +/- angle # Argument of type : 2k*pi +/- angle def f(rv): if not isinstance(rv, TrigonometricFunction): return rv rv = rv.func(signsimp(rv.args[0])) if not isinstance(rv, TrigonometricFunction): return rv if (rv.args[0] - S.Pi/4).is_positive is (S.Pi/2 - rv.args[0]).is_positive is True: fmap = {cos: sin, sin: cos, tan: cot, cot: tan, sec: csc, csc: sec} rv = fmap[rv.func](S.Pi/2 - rv.args[0]) return rv return bottom_up(rv, f) def TR4(rv): """Identify values of special angles. a= 0 pi/6 pi/4 pi/3 pi/2 ---------------------------------------------------- cos(a) 0 1/2 sqrt(2)/2 sqrt(3)/2 1 sin(a) 1 sqrt(3)/2 sqrt(2)/2 1/2 0 tan(a) 0 sqt(3)/3 1 sqrt(3) -- Examples ======== >>> from sympy.simplify.fu import TR4 >>> from sympy import pi >>> from sympy import cos, sin, tan, cot >>> for s in (0, pi/6, pi/4, pi/3, pi/2): ... print('%s %s %s %s' % (cos(s), sin(s), tan(s), cot(s))) ... 1 0 0 zoo sqrt(3)/2 1/2 sqrt(3)/3 sqrt(3) sqrt(2)/2 sqrt(2)/2 1 1 1/2 sqrt(3)/2 sqrt(3) sqrt(3)/3 0 1 zoo 0 """ # special values at 0, pi/6, pi/4, pi/3, pi/2 already handled return rv def _TR56(rv, f, g, h, max, pow): """Helper for TR5 and TR6 to replace f**2 with h(g**2) Options ======= max : controls size of exponent that can appear on f e.g. if max=4 then f**4 will be changed to h(g**2)**2. pow : controls whether the exponent must be a perfect power of 2 e.g. if pow=True (and max >= 6) then f**6 will not be changed but f**8 will be changed to h(g**2)**4 >>> from sympy.simplify.fu import _TR56 as T >>> from sympy.abc import x >>> from sympy import sin, cos >>> h = lambda x: 1 - x >>> T(sin(x)**3, sin, cos, h, 4, False) sin(x)**3 >>> T(sin(x)**6, sin, cos, h, 6, False) (1 - cos(x)**2)**3 >>> T(sin(x)**6, sin, cos, h, 6, True) sin(x)**6 >>> T(sin(x)**8, sin, cos, h, 10, True) (1 - cos(x)**2)**4 """ def _f(rv): # I'm not sure if this transformation should target all even powers # or only those expressible as powers of 2. Also, should it only # make the changes in powers that appear in sums -- making an isolated # change is not going to allow a simplification as far as I can tell. if not (rv.is_Pow and rv.base.func == f): return rv if not rv.exp.is_real: return rv if (rv.exp < 0) == True: return rv if (rv.exp > max) == True: return rv if rv.exp == 2: return h(g(rv.base.args[0])**2) else: if rv.exp == 4: e = 2 elif not pow: if rv.exp % 2: return rv e = rv.exp//2 else: p = perfect_power(rv.exp) if not p: return rv e = rv.exp//2 return h(g(rv.base.args[0])**2)**e return bottom_up(rv, _f) def TR5(rv, max=4, pow=False): """Replacement of sin**2 with 1 - cos(x)**2. See _TR56 docstring for advanced use of ``max`` and ``pow``. Examples ======== >>> from sympy.simplify.fu import TR5 >>> from sympy.abc import x >>> from sympy import sin >>> TR5(sin(x)**2) 1 - cos(x)**2 >>> TR5(sin(x)**-2) # unchanged sin(x)**(-2) >>> TR5(sin(x)**4) (1 - cos(x)**2)**2 """ return _TR56(rv, sin, cos, lambda x: 1 - x, max=max, pow=pow) def TR6(rv, max=4, pow=False): """Replacement of cos**2 with 1 - sin(x)**2. See _TR56 docstring for advanced use of ``max`` and ``pow``. Examples ======== >>> from sympy.simplify.fu import TR6 >>> from sympy.abc import x >>> from sympy import cos >>> TR6(cos(x)**2) 1 - sin(x)**2 >>> TR6(cos(x)**-2) #unchanged cos(x)**(-2) >>> TR6(cos(x)**4) (1 - sin(x)**2)**2 """ return _TR56(rv, cos, sin, lambda x: 1 - x, max=max, pow=pow) def TR7(rv): """Lowering the degree of cos(x)**2 Examples ======== >>> from sympy.simplify.fu import TR7 >>> from sympy.abc import x >>> from sympy import cos >>> TR7(cos(x)**2) cos(2*x)/2 + 1/2 >>> TR7(cos(x)**2 + 1) cos(2*x)/2 + 3/2 """ def f(rv): if not (rv.is_Pow and rv.base.func == cos and rv.exp == 2): return rv return (1 + cos(2*rv.base.args[0]))/2 return bottom_up(rv, f) def TR8(rv, first=True): """Converting products of ``cos`` and/or ``sin`` to a sum or difference of ``cos`` and or ``sin`` terms. Examples ======== >>> from sympy.simplify.fu import TR8, TR7 >>> from sympy import cos, sin >>> TR8(cos(2)*cos(3)) cos(5)/2 + cos(1)/2 >>> TR8(cos(2)*sin(3)) sin(5)/2 + sin(1)/2 >>> TR8(sin(2)*sin(3)) -cos(5)/2 + cos(1)/2 """ def f(rv): if not ( rv.is_Mul or rv.is_Pow and rv.base.func in (cos, sin) and (rv.exp.is_integer or rv.base.is_positive)): return rv if first: n, d = [expand_mul(i) for i in rv.as_numer_denom()] newn = TR8(n, first=False) newd = TR8(d, first=False) if newn != n or newd != d: rv = gcd_terms(newn/newd) if rv.is_Mul and rv.args[0].is_Rational and \ len(rv.args) == 2 and rv.args[1].is_Add: rv = Mul(*rv.as_coeff_Mul()) return rv args = {cos: [], sin: [], None: []} for a in ordered(Mul.make_args(rv)): if a.func in (cos, sin): args[a.func].append(a.args[0]) elif (a.is_Pow and a.exp.is_Integer and a.exp > 0 and \ a.base.func in (cos, sin)): # XXX this is ok but pathological expression could be handled # more efficiently as in TRmorrie args[a.base.func].extend([a.base.args[0]]*a.exp) else: args[None].append(a) c = args[cos] s = args[sin] if not (c and s or len(c) > 1 or len(s) > 1): return rv args = args[None] n = min(len(c), len(s)) for i in range(n): a1 = s.pop() a2 = c.pop() args.append((sin(a1 + a2) + sin(a1 - a2))/2) while len(c) > 1: a1 = c.pop() a2 = c.pop() args.append((cos(a1 + a2) + cos(a1 - a2))/2) if c: args.append(cos(c.pop())) while len(s) > 1: a1 = s.pop() a2 = s.pop() args.append((-cos(a1 + a2) + cos(a1 - a2))/2) if s: args.append(sin(s.pop())) return TR8(expand_mul(Mul(*args))) return bottom_up(rv, f) def TR9(rv): """Sum of ``cos`` or ``sin`` terms as a product of ``cos`` or ``sin``. Examples ======== >>> from sympy.simplify.fu import TR9 >>> from sympy import cos, sin >>> TR9(cos(1) + cos(2)) 2*cos(1/2)*cos(3/2) >>> TR9(cos(1) + 2*sin(1) + 2*sin(2)) cos(1) + 4*sin(3/2)*cos(1/2) If no change is made by TR9, no re-arrangement of the expression will be made. For example, though factoring of common term is attempted, if the factored expression wasn't changed, the original expression will be returned: >>> TR9(cos(3) + cos(3)*cos(2)) cos(3) + cos(2)*cos(3) """ def f(rv): if not rv.is_Add: return rv def do(rv, first=True): # cos(a)+/-cos(b) can be combined into a product of cosines and # sin(a)+/-sin(b) can be combined into a product of cosine and # sine. # # If there are more than two args, the pairs which "work" will # have a gcd extractable and the remaining two terms will have # the above structure -- all pairs must be checked to find the # ones that work. args that don't have a common set of symbols # are skipped since this doesn't lead to a simpler formula and # also has the arbitrariness of combining, for example, the x # and y term instead of the y and z term in something like # cos(x) + cos(y) + cos(z). if not rv.is_Add: return rv args = list(ordered(rv.args)) if len(args) != 2: hit = False for i in range(len(args)): ai = args[i] if ai is None: continue for j in range(i + 1, len(args)): aj = args[j] if aj is None: continue was = ai + aj new = do(was) if new != was: args[i] = new # update in place args[j] = None hit = True break # go to next i if hit: rv = Add(*[_f for _f in args if _f]) if rv.is_Add: rv = do(rv) return rv # two-arg Add split = trig_split(*args) if not split: return rv gcd, n1, n2, a, b, iscos = split # application of rule if possible if iscos: if n1 == n2: return gcd*n1*2*cos((a + b)/2)*cos((a - b)/2) if n1 < 0: a, b = b, a return -2*gcd*sin((a + b)/2)*sin((a - b)/2) else: if n1 == n2: return gcd*n1*2*sin((a + b)/2)*cos((a - b)/2) if n1 < 0: a, b = b, a return 2*gcd*cos((a + b)/2)*sin((a - b)/2) return process_common_addends(rv, do) # DON'T sift by free symbols return bottom_up(rv, f) def TR10(rv, first=True): """Separate sums in ``cos`` and ``sin``. Examples ======== >>> from sympy.simplify.fu import TR10 >>> from sympy.abc import a, b, c >>> from sympy import cos, sin >>> TR10(cos(a + b)) -sin(a)*sin(b) + cos(a)*cos(b) >>> TR10(sin(a + b)) sin(a)*cos(b) + sin(b)*cos(a) >>> TR10(sin(a + b + c)) (-sin(a)*sin(b) + cos(a)*cos(b))*sin(c) + \ (sin(a)*cos(b) + sin(b)*cos(a))*cos(c) """ def f(rv): if not rv.func in (cos, sin): return rv f = rv.func arg = rv.args[0] if arg.is_Add: if first: args = list(ordered(arg.args)) else: args = list(arg.args) a = args.pop() b = Add._from_args(args) if b.is_Add: if f == sin: return sin(a)*TR10(cos(b), first=False) + \ cos(a)*TR10(sin(b), first=False) else: return cos(a)*TR10(cos(b), first=False) - \ sin(a)*TR10(sin(b), first=False) else: if f == sin: return sin(a)*cos(b) + cos(a)*sin(b) else: return cos(a)*cos(b) - sin(a)*sin(b) return rv return bottom_up(rv, f) def TR10i(rv): """Sum of products to function of sum. Examples ======== >>> from sympy.simplify.fu import TR10i >>> from sympy import cos, sin, pi, Add, Mul, sqrt, Symbol >>> from sympy.abc import x, y >>> TR10i(cos(1)*cos(3) + sin(1)*sin(3)) cos(2) >>> TR10i(cos(1)*sin(3) + sin(1)*cos(3) + cos(3)) cos(3) + sin(4) >>> TR10i(sqrt(2)*cos(x)*x + sqrt(6)*sin(x)*x) 2*sqrt(2)*x*sin(x + pi/6) """ global _ROOT2, _ROOT3, _invROOT3 if _ROOT2 is None: _roots() def f(rv): if not rv.is_Add: return rv def do(rv, first=True): # args which can be expressed as A*(cos(a)*cos(b)+/-sin(a)*sin(b)) # or B*(cos(a)*sin(b)+/-cos(b)*sin(a)) can be combined into # A*f(a+/-b) where f is either sin or cos. # # If there are more than two args, the pairs which "work" will have # a gcd extractable and the remaining two terms will have the above # structure -- all pairs must be checked to find the ones that # work. if not rv.is_Add: return rv args = list(ordered(rv.args)) if len(args) != 2: hit = False for i in range(len(args)): ai = args[i] if ai is None: continue for j in range(i + 1, len(args)): aj = args[j] if aj is None: continue was = ai + aj new = do(was) if new != was: args[i] = new # update in place args[j] = None hit = True break # go to next i if hit: rv = Add(*[_f for _f in args if _f]) if rv.is_Add: rv = do(rv) return rv # two-arg Add split = trig_split(*args, two=True) if not split: return rv gcd, n1, n2, a, b, same = split # identify and get c1 to be cos then apply rule if possible if same: # coscos, sinsin gcd = n1*gcd if n1 == n2: return gcd*cos(a - b) return gcd*cos(a + b) else: #cossin, cossin gcd = n1*gcd if n1 == n2: return gcd*sin(a + b) return gcd*sin(b - a) rv = process_common_addends( rv, do, lambda x: tuple(ordered(x.free_symbols))) # need to check for inducible pairs in ratio of sqrt(3):1 that # appeared in different lists when sorting by coefficient while rv.is_Add: byrad = defaultdict(list) for a in rv.args: hit = 0 if a.is_Mul: for ai in a.args: if ai.is_Pow and ai.exp is S.Half and \ ai.base.is_Integer: byrad[ai].append(a) hit = 1 break if not hit: byrad[S.One].append(a) # no need to check all pairs -- just check for the onees # that have the right ratio args = [] for a in byrad: for b in [_ROOT3*a, _invROOT3]: if b in byrad: for i in range(len(byrad[a])): if byrad[a][i] is None: continue for j in range(len(byrad[b])): if byrad[b][j] is None: continue was = Add(byrad[a][i] + byrad[b][j]) new = do(was) if new != was: args.append(new) byrad[a][i] = None byrad[b][j] = None break if args: rv = Add(*(args + [Add(*[_f for _f in v if _f]) for v in byrad.values()])) else: rv = do(rv) # final pass to resolve any new inducible pairs break return rv return bottom_up(rv, f) def TR11(rv, base=None): """Function of double angle to product. The ``base`` argument can be used to indicate what is the un-doubled argument, e.g. if 3*pi/7 is the base then cosine and sine functions with argument 6*pi/7 will be replaced. Examples ======== >>> from sympy.simplify.fu import TR11 >>> from sympy import cos, sin, pi >>> from sympy.abc import x >>> TR11(sin(2*x)) 2*sin(x)*cos(x) >>> TR11(cos(2*x)) -sin(x)**2 + cos(x)**2 >>> TR11(sin(4*x)) 4*(-sin(x)**2 + cos(x)**2)*sin(x)*cos(x) >>> TR11(sin(4*x/3)) 4*(-sin(x/3)**2 + cos(x/3)**2)*sin(x/3)*cos(x/3) If the arguments are simply integers, no change is made unless a base is provided: >>> TR11(cos(2)) cos(2) >>> TR11(cos(4), 2) -sin(2)**2 + cos(2)**2 There is a subtle issue here in that autosimplification will convert some higher angles to lower angles >>> cos(6*pi/7) + cos(3*pi/7) -cos(pi/7) + cos(3*pi/7) The 6*pi/7 angle is now pi/7 but can be targeted with TR11 by supplying the 3*pi/7 base: >>> TR11(_, 3*pi/7) -sin(3*pi/7)**2 + cos(3*pi/7)**2 + cos(3*pi/7) """ def f(rv): if not rv.func in (cos, sin): return rv if base: f = rv.func t = f(base*2) co = S.One if t.is_Mul: co, t = t.as_coeff_Mul() if not t.func in (cos, sin): return rv if rv.args[0] == t.args[0]: c = cos(base) s = sin(base) if f is cos: return (c**2 - s**2)/co else: return 2*c*s/co return rv elif not rv.args[0].is_Number: # make a change if the leading coefficient's numerator is # divisible by 2 c, m = rv.args[0].as_coeff_Mul(rational=True) if c.p % 2 == 0: arg = c.p//2*m/c.q c = TR11(cos(arg)) s = TR11(sin(arg)) if rv.func == sin: rv = 2*s*c else: rv = c**2 - s**2 return rv return bottom_up(rv, f) def TR12(rv, first=True): """Separate sums in ``tan``. Examples ======== >>> from sympy.simplify.fu import TR12 >>> from sympy.abc import x, y >>> from sympy import tan >>> from sympy.simplify.fu import TR12 >>> TR12(tan(x + y)) (tan(x) + tan(y))/(-tan(x)*tan(y) + 1) """ def f(rv): if not rv.func == tan: return rv arg = rv.args[0] if arg.is_Add: if first: args = list(ordered(arg.args)) else: args = list(arg.args) a = args.pop() b = Add._from_args(args) if b.is_Add: tb = TR12(tan(b), first=False) else: tb = tan(b) return (tan(a) + tb)/(1 - tan(a)*tb) return rv return bottom_up(rv, f) def TR12i(rv): """Combine tan arguments as (tan(y) + tan(x))/(tan(x)*tan(y) - 1) -> -tan(x + y) Examples ======== >>> from sympy.simplify.fu import TR12i >>> from sympy import tan >>> from sympy.abc import a, b, c >>> ta, tb, tc = [tan(i) for i in (a, b, c)] >>> TR12i((ta + tb)/(-ta*tb + 1)) tan(a + b) >>> TR12i((ta + tb)/(ta*tb - 1)) -tan(a + b) >>> TR12i((-ta - tb)/(ta*tb - 1)) tan(a + b) >>> eq = (ta + tb)/(-ta*tb + 1)**2*(-3*ta - 3*tc)/(2*(ta*tc - 1)) >>> TR12i(eq.expand()) -3*tan(a + b)*tan(a + c)/(2*(tan(a) + tan(b) - 1)) """ from sympy import factor def f(rv): if not (rv.is_Add or rv.is_Mul or rv.is_Pow): return rv n, d = rv.as_numer_denom() if not d.args or not n.args: return rv dok = {} def ok(di): m = as_f_sign_1(di) if m: g, f, s = m if s is S.NegativeOne and f.is_Mul and len(f.args) == 2 and \ all(isinstance(fi, tan) for fi in f.args): return g, f d_args = list(Mul.make_args(d)) for i, di in enumerate(d_args): m = ok(di) if m: g, t = m s = Add(*[_.args[0] for _ in t.args]) dok[s] = S.One d_args[i] = g continue if di.is_Add: di = factor(di) if di.is_Mul: d_args.extend(di.args) d_args[i] = S.One elif di.is_Pow and (di.exp.is_integer or di.base.is_positive): m = ok(di.base) if m: g, t = m s = Add(*[_.args[0] for _ in t.args]) dok[s] = di.exp d_args[i] = g**di.exp else: di = factor(di) if di.is_Mul: d_args.extend(di.args) d_args[i] = S.One if not dok: return rv def ok(ni): if ni.is_Add and len(ni.args) == 2: a, b = ni.args if isinstance(a, tan) and isinstance(b, tan): return a, b n_args = list(Mul.make_args(factor_terms(n))) hit = False for i, ni in enumerate(n_args): m = ok(ni) if not m: m = ok(-ni) if m: n_args[i] = S.NegativeOne else: if ni.is_Add: ni = factor(ni) if ni.is_Mul: n_args.extend(ni.args) n_args[i] = S.One continue elif ni.is_Pow and ( ni.exp.is_integer or ni.base.is_positive): m = ok(ni.base) if m: n_args[i] = S.One else: ni = factor(ni) if ni.is_Mul: n_args.extend(ni.args) n_args[i] = S.One continue else: continue else: n_args[i] = S.One hit = True s = Add(*[_.args[0] for _ in m]) ed = dok[s] newed = ed.extract_additively(S.One) if newed is not None: if newed: dok[s] = newed else: dok.pop(s) n_args[i] *= -tan(s) if hit: rv = Mul(*n_args)/Mul(*d_args)/Mul(*[(Add(*[ tan(a) for a in i.args]) - 1)**e for i, e in dok.items()]) return rv return bottom_up(rv, f) def TR13(rv): """Change products of ``tan`` or ``cot``. Examples ======== >>> from sympy.simplify.fu import TR13 >>> from sympy import tan, cot, cos >>> TR13(tan(3)*tan(2)) -tan(2)/tan(5) - tan(3)/tan(5) + 1 >>> TR13(cot(3)*cot(2)) cot(2)*cot(5) + 1 + cot(3)*cot(5) """ def f(rv): if not rv.is_Mul: return rv # XXX handle products of powers? or let power-reducing handle it? args = {tan: [], cot: [], None: []} for a in ordered(Mul.make_args(rv)): if a.func in (tan, cot): args[a.func].append(a.args[0]) else: args[None].append(a) t = args[tan] c = args[cot] if len(t) < 2 and len(c) < 2: return rv args = args[None] while len(t) > 1: t1 = t.pop() t2 = t.pop() args.append(1 - (tan(t1)/tan(t1 + t2) + tan(t2)/tan(t1 + t2))) if t: args.append(tan(t.pop())) while len(c) > 1: t1 = c.pop() t2 = c.pop() args.append(1 + cot(t1)*cot(t1 + t2) + cot(t2)*cot(t1 + t2)) if c: args.append(cot(c.pop())) return Mul(*args) return bottom_up(rv, f) def TRmorrie(rv): """Returns cos(x)*cos(2*x)*...*cos(2**(k-1)*x) -> sin(2**k*x)/(2**k*sin(x)) Examples ======== >>> from sympy.simplify.fu import TRmorrie, TR8, TR3 >>> from sympy.abc import x >>> from sympy import Mul, cos, pi >>> TRmorrie(cos(x)*cos(2*x)) sin(4*x)/(4*sin(x)) >>> TRmorrie(7*Mul(*[cos(x) for x in range(10)])) 7*sin(12)*sin(16)*cos(5)*cos(7)*cos(9)/(64*sin(1)*sin(3)) Sometimes autosimplification will cause a power to be not recognized. e.g. in the following, cos(4*pi/7) automatically simplifies to -cos(3*pi/7) so only 2 of the 3 terms are recognized: >>> TRmorrie(cos(pi/7)*cos(2*pi/7)*cos(4*pi/7)) -sin(3*pi/7)*cos(3*pi/7)/(4*sin(pi/7)) A touch by TR8 resolves the expression to a Rational >>> TR8(_) -1/8 In this case, if eq is unsimplified, the answer is obtained directly: >>> eq = cos(pi/9)*cos(2*pi/9)*cos(3*pi/9)*cos(4*pi/9) >>> TRmorrie(eq) 1/16 But if angles are made canonical with TR3 then the answer is not simplified without further work: >>> TR3(eq) sin(pi/18)*cos(pi/9)*cos(2*pi/9)/2 >>> TRmorrie(_) sin(pi/18)*sin(4*pi/9)/(8*sin(pi/9)) >>> TR8(_) cos(7*pi/18)/(16*sin(pi/9)) >>> TR3(_) 1/16 The original expression would have resolve to 1/16 directly with TR8, however: >>> TR8(eq) 1/16 References ========== https://en.wikipedia.org/wiki/Morrie%27s_law """ def f(rv, first=True): if not rv.is_Mul: return rv if first: n, d = rv.as_numer_denom() return f(n, 0)/f(d, 0) args = defaultdict(list) coss = {} other = [] for c in rv.args: b, e = c.as_base_exp() if e.is_Integer and isinstance(b, cos): co, a = b.args[0].as_coeff_Mul() args[a].append(co) coss[b] = e else: other.append(c) new = [] for a in args: c = args[a] c.sort() no = [] while c: k = 0 cc = ci = c[0] while cc in c: k += 1 cc *= 2 if k > 1: newarg = sin(2**k*ci*a)/2**k/sin(ci*a) # see how many times this can be taken take = None ccs = [] for i in range(k): cc /= 2 key = cos(a*cc, evaluate=False) ccs.append(cc) take = min(coss[key], take or coss[key]) # update exponent counts for i in range(k): cc = ccs.pop() key = cos(a*cc, evaluate=False) coss[key] -= take if not coss[key]: c.remove(cc) new.append(newarg**take) else: no.append(c.pop(0)) c[:] = no if new: rv = Mul(*(new + other + [ cos(k*a, evaluate=False) for a in args for k in args[a]])) return rv return bottom_up(rv, f) def TR14(rv, first=True): """Convert factored powers of sin and cos identities into simpler expressions. Examples ======== >>> from sympy.simplify.fu import TR14 >>> from sympy.abc import x, y >>> from sympy import cos, sin >>> TR14((cos(x) - 1)*(cos(x) + 1)) -sin(x)**2 >>> TR14((sin(x) - 1)*(sin(x) + 1)) -cos(x)**2 >>> p1 = (cos(x) + 1)*(cos(x) - 1) >>> p2 = (cos(y) - 1)*2*(cos(y) + 1) >>> p3 = (3*(cos(y) - 1))*(3*(cos(y) + 1)) >>> TR14(p1*p2*p3*(x - 1)) -18*(x - 1)*sin(x)**2*sin(y)**4 """ def f(rv): if not rv.is_Mul: return rv if first: # sort them by location in numerator and denominator # so the code below can just deal with positive exponents n, d = rv.as_numer_denom() if d is not S.One: newn = TR14(n, first=False) newd = TR14(d, first=False) if newn != n or newd != d: rv = newn/newd return rv other = [] process = [] for a in rv.args: if a.is_Pow: b, e = a.as_base_exp() if not (e.is_integer or b.is_positive): other.append(a) continue a = b else: e = S.One m = as_f_sign_1(a) if not m or m[1].func not in (cos, sin): if e is S.One: other.append(a) else: other.append(a**e) continue g, f, si = m process.append((g, e.is_Number, e, f, si, a)) # sort them to get like terms next to each other process = list(ordered(process)) # keep track of whether there was any change nother = len(other) # access keys keys = (g, t, e, f, si, a) = list(range(6)) while process: A = process.pop(0) if process: B = process[0] if A[e].is_Number and B[e].is_Number: # both exponents are numbers if A[f] == B[f]: if A[si] != B[si]: B = process.pop(0) take = min(A[e], B[e]) # reinsert any remainder # the B will likely sort after A so check it first if B[e] != take: rem = [B[i] for i in keys] rem[e] -= take process.insert(0, rem) elif A[e] != take: rem = [A[i] for i in keys] rem[e] -= take process.insert(0, rem) if isinstance(A[f], cos): t = sin else: t = cos other.append((-A[g]*B[g]*t(A[f].args[0])**2)**take) continue elif A[e] == B[e]: # both exponents are equal symbols if A[f] == B[f]: if A[si] != B[si]: B = process.pop(0) take = A[e] if isinstance(A[f], cos): t = sin else: t = cos other.append((-A[g]*B[g]*t(A[f].args[0])**2)**take) continue # either we are done or neither condition above applied other.append(A[a]**A[e]) if len(other) != nother: rv = Mul(*other) return rv return bottom_up(rv, f) def TR15(rv, max=4, pow=False): """Convert sin(x)*-2 to 1 + cot(x)**2. See _TR56 docstring for advanced use of ``max`` and ``pow``. Examples ======== >>> from sympy.simplify.fu import TR15 >>> from sympy.abc import x >>> from sympy import cos, sin >>> TR15(1 - 1/sin(x)**2) -cot(x)**2 """ def f(rv): if not (isinstance(rv, Pow) and isinstance(rv.base, sin)): return rv ia = 1/rv a = _TR56(ia, sin, cot, lambda x: 1 + x, max=max, pow=pow) if a != ia: rv = a return rv return bottom_up(rv, f) def TR16(rv, max=4, pow=False): """Convert cos(x)*-2 to 1 + tan(x)**2. See _TR56 docstring for advanced use of ``max`` and ``pow``. Examples ======== >>> from sympy.simplify.fu import TR16 >>> from sympy.abc import x >>> from sympy import cos, sin >>> TR16(1 - 1/cos(x)**2) -tan(x)**2 """ def f(rv): if not (isinstance(rv, Pow) and isinstance(rv.base, cos)): return rv ia = 1/rv a = _TR56(ia, cos, tan, lambda x: 1 + x, max=max, pow=pow) if a != ia: rv = a return rv return bottom_up(rv, f) def TR111(rv): """Convert f(x)**-i to g(x)**i where either ``i`` is an integer or the base is positive and f, g are: tan, cot; sin, csc; or cos, sec. Examples ======== >>> from sympy.simplify.fu import TR111 >>> from sympy.abc import x >>> from sympy import tan >>> TR111(1 - 1/tan(x)**2) 1 - cot(x)**2 """ def f(rv): if not ( isinstance(rv, Pow) and (rv.base.is_positive or rv.exp.is_integer and rv.exp.is_negative)): return rv if isinstance(rv.base, tan): return cot(rv.base.args[0])**-rv.exp elif isinstance(rv.base, sin): return csc(rv.base.args[0])**-rv.exp elif isinstance(rv.base, cos): return sec(rv.base.args[0])**-rv.exp return rv return bottom_up(rv, f) def TR22(rv, max=4, pow=False): """Convert tan(x)**2 to sec(x)**2 - 1 and cot(x)**2 to csc(x)**2 - 1. See _TR56 docstring for advanced use of ``max`` and ``pow``. Examples ======== >>> from sympy.simplify.fu import TR22 >>> from sympy.abc import x >>> from sympy import tan, cot >>> TR22(1 + tan(x)**2) sec(x)**2 >>> TR22(1 + cot(x)**2) csc(x)**2 """ def f(rv): if not (isinstance(rv, Pow) and rv.base.func in (cot, tan)): return rv rv = _TR56(rv, tan, sec, lambda x: x - 1, max=max, pow=pow) rv = _TR56(rv, cot, csc, lambda x: x - 1, max=max, pow=pow) return rv return bottom_up(rv, f) def TRpower(rv): """Convert sin(x)**n and cos(x)**n with positive n to sums. Examples ======== >>> from sympy.simplify.fu import TRpower >>> from sympy.abc import x >>> from sympy import cos, sin >>> TRpower(sin(x)**6) -15*cos(2*x)/32 + 3*cos(4*x)/16 - cos(6*x)/32 + 5/16 >>> TRpower(sin(x)**3*cos(2*x)**4) (3*sin(x)/4 - sin(3*x)/4)*(cos(4*x)/2 + cos(8*x)/8 + 3/8) References ========== https://en.wikipedia.org/wiki/List_of_trigonometric_identities#Power-reduction_formulae """ def f(rv): if not (isinstance(rv, Pow) and isinstance(rv.base, (sin, cos))): return rv b, n = rv.as_base_exp() x = b.args[0] if n.is_Integer and n.is_positive: if n.is_odd and isinstance(b, cos): rv = 2**(1-n)*Add(*[binomial(n, k)*cos((n - 2*k)*x) for k in range((n + 1)/2)]) elif n.is_odd and isinstance(b, sin): rv = 2**(1-n)*(-1)**((n-1)/2)*Add(*[binomial(n, k)* (-1)**k*sin((n - 2*k)*x) for k in range((n + 1)/2)]) elif n.is_even and isinstance(b, cos): rv = 2**(1-n)*Add(*[binomial(n, k)*cos((n - 2*k)*x) for k in range(n/2)]) elif n.is_even and isinstance(b, sin): rv = 2**(1-n)*(-1)**(n/2)*Add(*[binomial(n, k)* (-1)**k*cos((n - 2*k)*x) for k in range(n/2)]) if n.is_even: rv += 2**(-n)*binomial(n, n/2) return rv return bottom_up(rv, f) def L(rv): """Return count of trigonometric functions in expression. Examples ======== >>> from sympy.simplify.fu import L >>> from sympy.abc import x >>> from sympy import cos, sin >>> L(cos(x)+sin(x)) 2 """ return S(rv.count(TrigonometricFunction)) # ============== end of basic Fu-like tools ===================== if SYMPY_DEBUG: (TR0, TR1, TR2, TR3, TR4, TR5, TR6, TR7, TR8, TR9, TR10, TR11, TR12, TR13, TR2i, TRmorrie, TR14, TR15, TR16, TR12i, TR111, TR22 )= list(map(debug, (TR0, TR1, TR2, TR3, TR4, TR5, TR6, TR7, TR8, TR9, TR10, TR11, TR12, TR13, TR2i, TRmorrie, TR14, TR15, TR16, TR12i, TR111, TR22))) # tuples are chains -- (f, g) -> lambda x: g(f(x)) # lists are choices -- [f, g] -> lambda x: min(f(x), g(x), key=objective) CTR1 = [(TR5, TR0), (TR6, TR0), identity] CTR2 = (TR11, [(TR5, TR0), (TR6, TR0), TR0]) CTR3 = [(TRmorrie, TR8, TR0), (TRmorrie, TR8, TR10i, TR0), identity] CTR4 = [(TR4, TR10i), identity] RL1 = (TR4, TR3, TR4, TR12, TR4, TR13, TR4, TR0) # XXX it's a little unclear how this one is to be implemented # see Fu paper of reference, page 7. What is the Union symbol referring to? # The diagram shows all these as one chain of transformations, but the # text refers to them being applied independently. Also, a break # if L starts to increase has not been implemented. RL2 = [ (TR4, TR3, TR10, TR4, TR3, TR11), (TR5, TR7, TR11, TR4), (CTR3, CTR1, TR9, CTR2, TR4, TR9, TR9, CTR4), identity, ] def fu(rv, measure=lambda x: (L(x), x.count_ops())): """Attempt to simplify expression by using transformation rules given in the algorithm by Fu et al. :func:`fu` will try to minimize the objective function ``measure``. By default this first minimizes the number of trig terms and then minimizes the number of total operations. Examples ======== >>> from sympy.simplify.fu import fu >>> from sympy import cos, sin, tan, pi, S, sqrt >>> from sympy.abc import x, y, a, b >>> fu(sin(50)**2 + cos(50)**2 + sin(pi/6)) 3/2 >>> fu(sqrt(6)*cos(x) + sqrt(2)*sin(x)) 2*sqrt(2)*sin(x + pi/3) CTR1 example >>> eq = sin(x)**4 - cos(y)**2 + sin(y)**2 + 2*cos(x)**2 >>> fu(eq) cos(x)**4 - 2*cos(y)**2 + 2 CTR2 example >>> fu(S.Half - cos(2*x)/2) sin(x)**2 CTR3 example >>> fu(sin(a)*(cos(b) - sin(b)) + cos(a)*(sin(b) + cos(b))) sqrt(2)*sin(a + b + pi/4) CTR4 example >>> fu(sqrt(3)*cos(x)/2 + sin(x)/2) sin(x + pi/3) Example 1 >>> fu(1-sin(2*x)**2/4-sin(y)**2-cos(x)**4) -cos(x)**2 + cos(y)**2 Example 2 >>> fu(cos(4*pi/9)) sin(pi/18) >>> fu(cos(pi/9)*cos(2*pi/9)*cos(3*pi/9)*cos(4*pi/9)) 1/16 Example 3 >>> fu(tan(7*pi/18)+tan(5*pi/18)-sqrt(3)*tan(5*pi/18)*tan(7*pi/18)) -sqrt(3) Objective function example >>> fu(sin(x)/cos(x)) # default objective function tan(x) >>> fu(sin(x)/cos(x), measure=lambda x: -x.count_ops()) # maximize op count sin(x)/cos(x) References ========== http://rfdz.ph-noe.ac.at/fileadmin/Mathematik_Uploads/ACDCA/ DESTIME2006/DES_contribs/Fu/simplification.pdf """ fRL1 = greedy(RL1, measure) fRL2 = greedy(RL2, measure) was = rv rv = sympify(rv) if not isinstance(rv, Expr): return rv.func(*[fu(a, measure=measure) for a in rv.args]) rv = TR1(rv) if rv.has(tan, cot): rv1 = fRL1(rv) if (measure(rv1) < measure(rv)): rv = rv1 if rv.has(tan, cot): rv = TR2(rv) if rv.has(sin, cos): rv1 = fRL2(rv) rv2 = TR8(TRmorrie(rv1)) rv = min([was, rv, rv1, rv2], key=measure) return min(TR2i(rv), rv, key=measure) def process_common_addends(rv, do, key2=None, key1=True): """Apply ``do`` to addends of ``rv`` that (if key1=True) share at least a common absolute value of their coefficient and the value of ``key2`` when applied to the argument. If ``key1`` is False ``key2`` must be supplied and will be the only key applied. """ # collect by absolute value of coefficient and key2 absc = defaultdict(list) if key1: for a in rv.args: c, a = a.as_coeff_Mul() if c < 0: c = -c a = -a # put the sign on `a` absc[(c, key2(a) if key2 else 1)].append(a) elif key2: for a in rv.args: absc[(S.One, key2(a))].append(a) else: raise ValueError('must have at least one key') args = [] hit = False for k in absc: v = absc[k] c, _ = k if len(v) > 1: e = Add(*v, evaluate=False) new = do(e) if new != e: e = new hit = True args.append(c*e) else: args.append(c*v[0]) if hit: rv = Add(*args) return rv fufuncs = ''' TR0 TR1 TR2 TR3 TR4 TR5 TR6 TR7 TR8 TR9 TR10 TR10i TR11 TR12 TR13 L TR2i TRmorrie TR12i TR14 TR15 TR16 TR111 TR22'''.split() FU = dict(list(zip(fufuncs, list(map(locals().get, fufuncs))))) def _roots(): global _ROOT2, _ROOT3, _invROOT3 _ROOT2, _ROOT3 = sqrt(2), sqrt(3) _invROOT3 = 1/_ROOT3 _ROOT2 = None def trig_split(a, b, two=False): """Return the gcd, s1, s2, a1, a2, bool where If two is False (default) then:: a + b = gcd*(s1*f(a1) + s2*f(a2)) where f = cos if bool else sin else: if bool, a + b was +/- cos(a1)*cos(a2) +/- sin(a1)*sin(a2) and equals n1*gcd*cos(a - b) if n1 == n2 else n1*gcd*cos(a + b) else a + b was +/- cos(a1)*sin(a2) +/- sin(a1)*cos(a2) and equals n1*gcd*sin(a + b) if n1 = n2 else n1*gcd*sin(b - a) Examples ======== >>> from sympy.simplify.fu import trig_split >>> from sympy.abc import x, y, z >>> from sympy import cos, sin, sqrt >>> trig_split(cos(x), cos(y)) (1, 1, 1, x, y, True) >>> trig_split(2*cos(x), -2*cos(y)) (2, 1, -1, x, y, True) >>> trig_split(cos(x)*sin(y), cos(y)*sin(y)) (sin(y), 1, 1, x, y, True) >>> trig_split(cos(x), -sqrt(3)*sin(x), two=True) (2, 1, -1, x, pi/6, False) >>> trig_split(cos(x), sin(x), two=True) (sqrt(2), 1, 1, x, pi/4, False) >>> trig_split(cos(x), -sin(x), two=True) (sqrt(2), 1, -1, x, pi/4, False) >>> trig_split(sqrt(2)*cos(x), -sqrt(6)*sin(x), two=True) (2*sqrt(2), 1, -1, x, pi/6, False) >>> trig_split(-sqrt(6)*cos(x), -sqrt(2)*sin(x), two=True) (-2*sqrt(2), 1, 1, x, pi/3, False) >>> trig_split(cos(x)/sqrt(6), sin(x)/sqrt(2), two=True) (sqrt(6)/3, 1, 1, x, pi/6, False) >>> trig_split(-sqrt(6)*cos(x)*sin(y), -sqrt(2)*sin(x)*sin(y), two=True) (-2*sqrt(2)*sin(y), 1, 1, x, pi/3, False) >>> trig_split(cos(x), sin(x)) >>> trig_split(cos(x), sin(z)) >>> trig_split(2*cos(x), -sin(x)) >>> trig_split(cos(x), -sqrt(3)*sin(x)) >>> trig_split(cos(x)*cos(y), sin(x)*sin(z)) >>> trig_split(cos(x)*cos(y), sin(x)*sin(y)) >>> trig_split(-sqrt(6)*cos(x), sqrt(2)*sin(x)*sin(y), two=True) """ global _ROOT2, _ROOT3, _invROOT3 if _ROOT2 is None: _roots() a, b = [Factors(i) for i in (a, b)] ua, ub = a.normal(b) gcd = a.gcd(b).as_expr() n1 = n2 = 1 if S.NegativeOne in ua.factors: ua = ua.quo(S.NegativeOne) n1 = -n1 elif S.NegativeOne in ub.factors: ub = ub.quo(S.NegativeOne) n2 = -n2 a, b = [i.as_expr() for i in (ua, ub)] def pow_cos_sin(a, two): """Return ``a`` as a tuple (r, c, s) such that ``a = (r or 1)*(c or 1)*(s or 1)``. Three arguments are returned (radical, c-factor, s-factor) as long as the conditions set by ``two`` are met; otherwise None is returned. If ``two`` is True there will be one or two non-None values in the tuple: c and s or c and r or s and r or s or c with c being a cosine function (if possible) else a sine, and s being a sine function (if possible) else oosine. If ``two`` is False then there will only be a c or s term in the tuple. ``two`` also require that either two cos and/or sin be present (with the condition that if the functions are the same the arguments are different or vice versa) or that a single cosine or a single sine be present with an optional radical. If the above conditions dictated by ``two`` are not met then None is returned. """ c = s = None co = S.One if a.is_Mul: co, a = a.as_coeff_Mul() if len(a.args) > 2 or not two: return None if a.is_Mul: args = list(a.args) else: args = [a] a = args.pop(0) if isinstance(a, cos): c = a elif isinstance(a, sin): s = a elif a.is_Pow and a.exp is S.Half: # autoeval doesn't allow -1/2 co *= a else: return None if args: b = args[0] if isinstance(b, cos): if c: s = b else: c = b elif isinstance(b, sin): if s: c = b else: s = b elif b.is_Pow and b.exp is S.Half: co *= b else: return None return co if co is not S.One else None, c, s elif isinstance(a, cos): c = a elif isinstance(a, sin): s = a if c is None and s is None: return co = co if co is not S.One else None return co, c, s # get the parts m = pow_cos_sin(a, two) if m is None: return coa, ca, sa = m m = pow_cos_sin(b, two) if m is None: return cob, cb, sb = m # check them if (not ca) and cb or ca and isinstance(ca, sin): coa, ca, sa, cob, cb, sb = cob, cb, sb, coa, ca, sa n1, n2 = n2, n1 if not two: # need cos(x) and cos(y) or sin(x) and sin(y) c = ca or sa s = cb or sb if not isinstance(c, s.func): return None return gcd, n1, n2, c.args[0], s.args[0], isinstance(c, cos) else: if not coa and not cob: if (ca and cb and sa and sb): if isinstance(ca, sa.func) is not isinstance(cb, sb.func): return args = {j.args for j in (ca, sa)} if not all(i.args in args for i in (cb, sb)): return return gcd, n1, n2, ca.args[0], sa.args[0], isinstance(ca, sa.func) if ca and sa or cb and sb or \ two and (ca is None and sa is None or cb is None and sb is None): return c = ca or sa s = cb or sb if c.args != s.args: return if not coa: coa = S.One if not cob: cob = S.One if coa is cob: gcd *= _ROOT2 return gcd, n1, n2, c.args[0], pi/4, False elif coa/cob == _ROOT3: gcd *= 2*cob return gcd, n1, n2, c.args[0], pi/3, False elif coa/cob == _invROOT3: gcd *= 2*coa return gcd, n1, n2, c.args[0], pi/6, False def as_f_sign_1(e): """If ``e`` is a sum that can be written as ``g*(a + s)`` where ``s`` is ``+/-1``, return ``g``, ``a``, and ``s`` where ``a`` does not have a leading negative coefficient. Examples ======== >>> from sympy.simplify.fu import as_f_sign_1 >>> from sympy.abc import x >>> as_f_sign_1(x + 1) (1, x, 1) >>> as_f_sign_1(x - 1) (1, x, -1) >>> as_f_sign_1(-x + 1) (-1, x, -1) >>> as_f_sign_1(-x - 1) (-1, x, 1) >>> as_f_sign_1(2*x + 2) (2, x, 1) """ if not e.is_Add or len(e.args) != 2: return # exact match a, b = e.args if a in (S.NegativeOne, S.One): g = S.One if b.is_Mul and b.args[0].is_Number and b.args[0] < 0: a, b = -a, -b g = -g return g, b, a # gcd match a, b = [Factors(i) for i in e.args] ua, ub = a.normal(b) gcd = a.gcd(b).as_expr() if S.NegativeOne in ua.factors: ua = ua.quo(S.NegativeOne) n1 = -1 n2 = 1 elif S.NegativeOne in ub.factors: ub = ub.quo(S.NegativeOne) n1 = 1 n2 = -1 else: n1 = n2 = 1 a, b = [i.as_expr() for i in (ua, ub)] if a is S.One: a, b = b, a n1, n2 = n2, n1 if n1 == -1: gcd = -gcd n2 = -n2 if b is S.One: return gcd, a, n2 def _osborne(e, d): """Replace all hyperbolic functions with trig functions using the Osborne rule. Notes ===== ``d`` is a dummy variable to prevent automatic evaluation of trigonometric/hyperbolic functions. References ========== https://en.wikipedia.org/wiki/Hyperbolic_function """ def f(rv): if not isinstance(rv, HyperbolicFunction): return rv a = rv.args[0] a = a*d if not a.is_Add else Add._from_args([i*d for i in a.args]) if isinstance(rv, sinh): return I*sin(a) elif isinstance(rv, cosh): return cos(a) elif isinstance(rv, tanh): return I*tan(a) elif isinstance(rv, coth): return cot(a)/I elif isinstance(rv, sech): return sec(a) elif isinstance(rv, csch): return csc(a)/I else: raise NotImplementedError('unhandled %s' % rv.func) return bottom_up(e, f) def _osbornei(e, d): """Replace all trig functions with hyperbolic functions using the Osborne rule. Notes ===== ``d`` is a dummy variable to prevent automatic evaluation of trigonometric/hyperbolic functions. References ========== https://en.wikipedia.org/wiki/Hyperbolic_function """ def f(rv): if not isinstance(rv, TrigonometricFunction): return rv const, x = rv.args[0].as_independent(d, as_Add=True) a = x.xreplace({d: S.One}) + const*I if isinstance(rv, sin): return sinh(a)/I elif isinstance(rv, cos): return cosh(a) elif isinstance(rv, tan): return tanh(a)/I elif isinstance(rv, cot): return coth(a)*I elif isinstance(rv, sec): return sech(a) elif isinstance(rv, csc): return csch(a)*I else: raise NotImplementedError('unhandled %s' % rv.func) return bottom_up(e, f) def hyper_as_trig(rv): """Return an expression containing hyperbolic functions in terms of trigonometric functions. Any trigonometric functions initially present are replaced with Dummy symbols and the function to undo the masking and the conversion back to hyperbolics is also returned. It should always be true that:: t, f = hyper_as_trig(expr) expr == f(t) Examples ======== >>> from sympy.simplify.fu import hyper_as_trig, fu >>> from sympy.abc import x >>> from sympy import cosh, sinh >>> eq = sinh(x)**2 + cosh(x)**2 >>> t, f = hyper_as_trig(eq) >>> f(fu(t)) cosh(2*x) References ========== https://en.wikipedia.org/wiki/Hyperbolic_function """ from sympy.simplify.simplify import signsimp from sympy.simplify.radsimp import collect # mask off trig functions trigs = rv.atoms(TrigonometricFunction) reps = [(t, Dummy()) for t in trigs] masked = rv.xreplace(dict(reps)) # get inversion substitutions in place reps = [(v, k) for k, v in reps] d = Dummy() return _osborne(masked, d), lambda x: collect(signsimp( _osbornei(x, d).xreplace(dict(reps))), S.ImaginaryUnit) def sincos_to_sum(expr): """Convert products and powers of sin and cos to sums. Applied power reduction TRpower first, then expands products, and converts products to sums with TR8. Examples ======== >>> from sympy.simplify.fu import sincos_to_sum >>> from sympy.abc import x >>> from sympy import cos, sin >>> sincos_to_sum(16*sin(x)**3*cos(2*x)**2) 7*sin(x) - 5*sin(3*x) + 3*sin(5*x) - sin(7*x) """ if not expr.has(cos, sin): return expr else: return TR8(expand_mul(TRpower(expr)))

4773bb35b18c11fb73372b8046006c29c59b7a38ce6ac4658088d77613c5e110

import bisect import itertools from functools import reduce from collections import defaultdict from sympy import Indexed, IndexedBase, Tuple, Sum, Add, S, Integer, diagonalize_vector, DiagonalizeVector from sympy.combinatorics import Permutation from sympy.core.basic import Basic from sympy.core.compatibility import accumulate, default_sort_key from sympy.core.mul import Mul from sympy.core.sympify import _sympify from sympy.functions.special.tensor_functions import KroneckerDelta from sympy.matrices.expressions import (MatAdd, MatMul, Trace, Transpose, MatrixSymbol) from sympy.matrices.expressions.matexpr import MatrixExpr, MatrixElement from sympy.tensor.array import NDimArray class _CodegenArrayAbstract(Basic): @property def subranks(self): """ Returns the ranks of the objects in the uppermost tensor product inside the current object. In case no tensor products are contained, return the atomic ranks. Examples ======== >>> from sympy.codegen.array_utils import CodegenArrayTensorProduct, CodegenArrayContraction >>> from sympy import MatrixSymbol >>> M = MatrixSymbol("M", 3, 3) >>> N = MatrixSymbol("N", 3, 3) >>> P = MatrixSymbol("P", 3, 3) Important: do not confuse the rank of the matrix with the rank of an array. >>> tp = CodegenArrayTensorProduct(M, N, P) >>> tp.subranks [2, 2, 2] >>> co = CodegenArrayContraction(tp, (1, 2), (3, 4)) >>> co.subranks [2, 2, 2] """ return self._subranks[:] def subrank(self): """ The sum of ``subranks``. """ return sum(self.subranks) @property def shape(self): return self._shape class CodegenArrayContraction(_CodegenArrayAbstract): r""" This class is meant to represent contractions of arrays in a form easily processable by the code printers. """ def __new__(cls, expr, *contraction_indices, **kwargs): contraction_indices = _sort_contraction_indices(contraction_indices) expr = _sympify(expr) if len(contraction_indices) == 0: return expr if isinstance(expr, CodegenArrayContraction): return cls._flatten(expr, *contraction_indices) obj = Basic.__new__(cls, expr, *contraction_indices) obj._subranks = _get_subranks(expr) obj._mapping = _get_mapping_from_subranks(obj._subranks) free_indices_to_position = {i: i for i in range(sum(obj._subranks)) if all([i not in cind for cind in contraction_indices])} obj._free_indices_to_position = free_indices_to_position shape = expr.shape cls._validate(expr, *contraction_indices) if shape: shape = tuple(shp for i, shp in enumerate(shape) if not any(i in j for j in contraction_indices)) obj._shape = shape return obj @staticmethod def _validate(expr, *contraction_indices): shape = expr.shape if shape is None: return # Check that no contraction happens when the shape is mismatched: for i in contraction_indices: if len(set(shape[j] for j in i if shape[j] != -1)) != 1: raise ValueError("contracting indices of different dimensions") @classmethod def _push_indices_down(cls, contraction_indices, indices): flattened_contraction_indices = [j for i in contraction_indices for j in i] flattened_contraction_indices.sort() transform = _build_push_indices_down_func_transformation(flattened_contraction_indices) return _apply_recursively_over_nested_lists(transform, indices) @classmethod def _push_indices_up(cls, contraction_indices, indices): flattened_contraction_indices = [j for i in contraction_indices for j in i] flattened_contraction_indices.sort() transform = _build_push_indices_up_func_transformation(flattened_contraction_indices) return _apply_recursively_over_nested_lists(transform, indices) def split_multiple_contractions(self): """ Recognize multiple contractions and attempt at rewriting them as paired-contractions. """ from sympy import ask, Q contraction_indices = self.contraction_indices if isinstance(self.expr, CodegenArrayTensorProduct): args = list(self.expr.args) else: args = [self.expr] # TODO: unify API, best location in CodegenArrayTensorProduct subranks = [get_rank(i) for i in args] # TODO: unify API mapping = _get_mapping_from_subranks(subranks) reverse_mapping = {v:k for k, v in mapping.items()} new_contraction_indices = [] for indl, links in enumerate(contraction_indices): if len(links) <= 2: new_contraction_indices.append(links) continue # Check multiple contractions: # # Examples: # # * `A_ij b_j0 C_jk` ===> `A*DiagonalizeVector(b)*C` # # Care for: # - matrix being diagonalized (i.e. `A_ii`) # - vectors being diagonalized (i.e. `a_i0`) # Also consider the case of diagonal matrices being contracted: current_dimension = self.expr.shape[links[0]] tuple_links = [mapping[i] for i in links] arg_indices, arg_positions = zip(*tuple_links) args_updates = {} if len(arg_indices) != len(set(arg_indices)): # Maybe trace should be supported? raise NotImplementedError not_vectors = [] vectors = [] for arg_ind, arg_pos in tuple_links: mat = args[arg_ind] other_arg_pos = 1-arg_pos other_arg_abs = reverse_mapping[arg_ind, other_arg_pos] if (((1 not in mat.shape) and (not ask(Q.diagonal(mat)))) or ((current_dimension == 1) is True and mat.shape != (1, 1)) or any([other_arg_abs in l for li, l in enumerate(contraction_indices) if li != indl]) ): not_vectors.append((arg_ind, arg_pos)) continue args_updates[arg_ind] = diagonalize_vector(mat) vectors.append((arg_ind, arg_pos)) vectors.append((arg_ind, 1-arg_pos)) if len(not_vectors) > 2: new_contraction_indices.append(links) continue if len(not_vectors) == 0: new_sequence = vectors[:1] + vectors[2:] elif len(not_vectors) == 1: new_sequence = not_vectors[:1] + vectors[:-1] else: new_sequence = not_vectors[:1] + vectors + not_vectors[1:] for i in range(0, len(new_sequence) - 1, 2): arg1, pos1 = new_sequence[i] arg2, pos2 = new_sequence[i+1] if arg1 == arg2: raise NotImplementedError continue abspos1 = reverse_mapping[arg1, pos1] abspos2 = reverse_mapping[arg2, pos2] new_contraction_indices.append((abspos1, abspos2)) for ind, newarg in args_updates.items(): args[ind] = newarg return CodegenArrayContraction( CodegenArrayTensorProduct(*args), *new_contraction_indices ) def flatten_contraction_of_diagonal(self): if not isinstance(self.expr, CodegenArrayDiagonal): return self contraction_down = self.expr._push_indices_down(self.expr.diagonal_indices, self.contraction_indices) new_contraction_indices = [] diagonal_indices = self.expr.diagonal_indices[:] for i in contraction_down: contraction_group = list(i) for j in i: diagonal_with = [k for k in diagonal_indices if j in k] contraction_group.extend([l for k in diagonal_with for l in k]) diagonal_indices = [k for k in diagonal_indices if k not in diagonal_with] new_contraction_indices.append(sorted(set(contraction_group))) new_contraction_indices = CodegenArrayDiagonal._push_indices_up(diagonal_indices, new_contraction_indices) return CodegenArrayContraction( CodegenArrayDiagonal( self.expr.expr, *diagonal_indices ), *new_contraction_indices ) @staticmethod def _get_free_indices_to_position_map(free_indices, contraction_indices): free_indices_to_position = {} flattened_contraction_indices = [j for i in contraction_indices for j in i] counter = 0 for ind in free_indices: while counter in flattened_contraction_indices: counter += 1 free_indices_to_position[ind] = counter counter += 1 return free_indices_to_position @staticmethod def _get_index_shifts(expr): """ Get the mapping of indices at the positions before the contraction occurs. Examples ======== >>> from sympy.codegen.array_utils import CodegenArrayContraction, CodegenArrayTensorProduct >>> from sympy import MatrixSymbol >>> M = MatrixSymbol("M", 3, 3) >>> N = MatrixSymbol("N", 3, 3) >>> cg = CodegenArrayContraction(CodegenArrayTensorProduct(M, N), [1, 2]) >>> cg._get_index_shifts(cg) [0, 2] Indeed, ``cg`` after the contraction has two dimensions, 0 and 1. They need to be shifted by 0 and 2 to get the corresponding positions before the contraction (that is, 0 and 3). """ inner_contraction_indices = expr.contraction_indices all_inner = [j for i in inner_contraction_indices for j in i] all_inner.sort() # TODO: add API for total rank and cumulative rank: total_rank = get_rank(expr) inner_rank = len(all_inner) outer_rank = total_rank - inner_rank shifts = [0 for i in range(outer_rank)] counter = 0 pointer = 0 for i in range(outer_rank): while pointer < inner_rank and counter >= all_inner[pointer]: counter += 1 pointer += 1 shifts[i] += pointer counter += 1 return shifts @staticmethod def _convert_outer_indices_to_inner_indices(expr, *outer_contraction_indices): shifts = CodegenArrayContraction._get_index_shifts(expr) outer_contraction_indices = tuple(tuple(shifts[j] + j for j in i) for i in outer_contraction_indices) return outer_contraction_indices @staticmethod def _flatten(expr, *outer_contraction_indices): inner_contraction_indices = expr.contraction_indices outer_contraction_indices = CodegenArrayContraction._convert_outer_indices_to_inner_indices(expr, *outer_contraction_indices) contraction_indices = inner_contraction_indices + outer_contraction_indices return CodegenArrayContraction(expr.expr, *contraction_indices) def _get_contraction_tuples(self): r""" Return tuples containing the argument index and position within the argument of the index position. Examples ======== >>> from sympy import MatrixSymbol, MatrixExpr, Sum, Symbol >>> from sympy.abc import i, j, k, l, N >>> from sympy.codegen.array_utils import CodegenArrayContraction, CodegenArrayTensorProduct >>> A = MatrixSymbol("A", N, N) >>> B = MatrixSymbol("B", N, N) >>> cg = CodegenArrayContraction(CodegenArrayTensorProduct(A, B), (1, 2)) >>> cg._get_contraction_tuples() [[(0, 1), (1, 0)]] Here the contraction pair `(1, 2)` meaning that the 2nd and 3rd indices of the tensor product `A\otimes B` are contracted, has been transformed into `(0, 1)` and `(1, 0)`, identifying the same indices in a different notation. `(0, 1)` is the second index (1) of the first argument (i.e. 0 or `A`). `(1, 0)` is the first index (i.e. 0) of the second argument (i.e. 1 or `B`). """ mapping = self._mapping return [[mapping[j] for j in i] for i in self.contraction_indices] @staticmethod def _contraction_tuples_to_contraction_indices(expr, contraction_tuples): # TODO: check that `expr` has `.subranks`: ranks = expr.subranks cumulative_ranks = [0] + list(accumulate(ranks)) return [tuple(cumulative_ranks[j]+k for j, k in i) for i in contraction_tuples] @property def free_indices(self): return self._free_indices[:] @property def free_indices_to_position(self): return dict(self._free_indices_to_position) @property def expr(self): return self.args[0] @property def contraction_indices(self): return self.args[1:] def _contraction_indices_to_components(self): expr = self.expr if not isinstance(expr, CodegenArrayTensorProduct): raise NotImplementedError("only for contractions of tensor products") ranks = expr.subranks mapping = {} counter = 0 for i, rank in enumerate(ranks): for j in range(rank): mapping[counter] = (i, j) counter += 1 return mapping def sort_args_by_name(self): """ Sort arguments in the tensor product so that their order is lexicographical. Examples ======== >>> from sympy import MatrixSymbol, MatrixExpr, Sum, Symbol >>> from sympy.abc import i, j, k, l, N >>> from sympy.codegen.array_utils import CodegenArrayContraction >>> A = MatrixSymbol("A", N, N) >>> B = MatrixSymbol("B", N, N) >>> C = MatrixSymbol("C", N, N) >>> D = MatrixSymbol("D", N, N) >>> cg = CodegenArrayContraction.from_MatMul(C*D*A*B) >>> cg CodegenArrayContraction(CodegenArrayTensorProduct(C, D, A, B), (1, 2), (3, 4), (5, 6)) >>> cg.sort_args_by_name() CodegenArrayContraction(CodegenArrayTensorProduct(A, B, C, D), (0, 7), (1, 2), (5, 6)) """ expr = self.expr if not isinstance(expr, CodegenArrayTensorProduct): return self args = expr.args sorted_data = sorted(enumerate(args), key=lambda x: default_sort_key(x[1])) pos_sorted, args_sorted = zip(*sorted_data) reordering_map = {i: pos_sorted.index(i) for i, arg in enumerate(args)} contraction_tuples = self._get_contraction_tuples() contraction_tuples = [[(reordering_map[j], k) for j, k in i] for i in contraction_tuples] c_tp = CodegenArrayTensorProduct(*args_sorted) new_contr_indices = self._contraction_tuples_to_contraction_indices( c_tp, contraction_tuples ) return CodegenArrayContraction(c_tp, *new_contr_indices) def _get_contraction_links(self): r""" Returns a dictionary of links between arguments in the tensor product being contracted. See the example for an explanation of the values. Examples ======== >>> from sympy import MatrixSymbol, MatrixExpr, Sum, Symbol >>> from sympy.abc import i, j, k, l, N >>> from sympy.codegen.array_utils import CodegenArrayContraction >>> A = MatrixSymbol("A", N, N) >>> B = MatrixSymbol("B", N, N) >>> C = MatrixSymbol("C", N, N) >>> D = MatrixSymbol("D", N, N) Matrix multiplications are pairwise contractions between neighboring matrices: `A_{ij} B_{jk} C_{kl} D_{lm}` >>> cg = CodegenArrayContraction.from_MatMul(A*B*C*D) >>> cg CodegenArrayContraction(CodegenArrayTensorProduct(A, B, C, D), (1, 2), (3, 4), (5, 6)) >>> cg._get_contraction_links() {0: {1: (1, 0)}, 1: {0: (0, 1), 1: (2, 0)}, 2: {0: (1, 1), 1: (3, 0)}, 3: {0: (2, 1)}} This dictionary is interpreted as follows: argument in position 0 (i.e. matrix `A`) has its second index (i.e. 1) contracted to `(1, 0)`, that is argument in position 1 (matrix `B`) on the first index slot of `B`, this is the contraction provided by the index `j` from `A`. The argument in position 1 (that is, matrix `B`) has two contractions, the ones provided by the indices `j` and `k`, respectively the first and second indices (0 and 1 in the sub-dict). The link `(0, 1)` and `(2, 0)` respectively. `(0, 1)` is the index slot 1 (the 2nd) of argument in position 0 (that is, `A_{\ldot j}`), and so on. """ args, dlinks = _get_contraction_links([self], self.subranks, *self.contraction_indices) return dlinks @staticmethod def from_MatMul(expr): args_nonmat = [] args = [] contractions = [] for arg in expr.args: if isinstance(arg, MatrixExpr): args.append(arg) else: args_nonmat.append(arg) contractions = [(2*i+1, 2*i+2) for i in range(len(args)-1)] return Mul.fromiter(args_nonmat)*CodegenArrayContraction( CodegenArrayTensorProduct(*args), *contractions ) def get_shape(expr): if hasattr(expr, "shape"): return expr.shape return () class CodegenArrayTensorProduct(_CodegenArrayAbstract): r""" Class to represent the tensor product of array-like objects. """ def __new__(cls, *args): args = [_sympify(arg) for arg in args] args = cls._flatten(args) ranks = [get_rank(arg) for arg in args] if len(args) == 1: return args[0] # If there are contraction objects inside, transform the whole # expression into `CodegenArrayContraction`: contractions = {i: arg for i, arg in enumerate(args) if isinstance(arg, CodegenArrayContraction)} if contractions: cumulative_ranks = list(accumulate([0] + ranks))[:-1] tp = cls(*[arg.expr if isinstance(arg, CodegenArrayContraction) else arg for arg in args]) contraction_indices = [tuple(cumulative_ranks[i] + k for k in j) for i, arg in contractions.items() for j in arg.contraction_indices] return CodegenArrayContraction(tp, *contraction_indices) #newargs = [i for i in args if hasattr(i, "shape")] #coeff = reduce(lambda x, y: x*y, [i for i in args if not hasattr(i, "shape")], S.One) #newargs[0] *= coeff obj = Basic.__new__(cls, *args) obj._subranks = ranks shapes = [get_shape(i) for i in args] if any(i is None for i in shapes): obj._shape = None else: obj._shape = tuple(j for i in shapes for j in i) return obj @classmethod def _flatten(cls, args): args = [i for arg in args for i in (arg.args if isinstance(arg, cls) else [arg])] return args class CodegenArrayElementwiseAdd(_CodegenArrayAbstract): r""" Class for elementwise array additions. """ def __new__(cls, *args): args = [_sympify(arg) for arg in args] obj = Basic.__new__(cls, *args) ranks = [get_rank(arg) for arg in args] ranks = list(set(ranks)) if len(ranks) != 1: raise ValueError("summing arrays of different ranks") obj._subranks = ranks shapes = [arg.shape for arg in args] if len(set([i for i in shapes if i is not None])) > 1: raise ValueError("mismatching shapes in addition") if any(i is None for i in shapes): obj._shape = None else: obj._shape = shapes[0] return obj class CodegenArrayPermuteDims(_CodegenArrayAbstract): r""" Class to represent permutation of axes of arrays. Examples ======== >>> from sympy.codegen.array_utils import CodegenArrayPermuteDims >>> from sympy import MatrixSymbol >>> M = MatrixSymbol("M", 3, 3) >>> cg = CodegenArrayPermuteDims(M, [1, 0]) The object ``cg`` represents the transposition of ``M``, as the permutation ``[1, 0]`` will act on its indices by switching them: `M_{ij} \Rightarrow M_{ji}` This is evident when transforming back to matrix form: >>> from sympy.codegen.array_utils import recognize_matrix_expression >>> recognize_matrix_expression(cg) M.T >>> N = MatrixSymbol("N", 3, 2) >>> cg = CodegenArrayPermuteDims(N, [1, 0]) >>> cg.shape (2, 3) """ def __new__(cls, expr, permutation): from sympy.combinatorics import Permutation expr = _sympify(expr) permutation = Permutation(permutation) plist = permutation.args[0] if plist == sorted(plist): return expr obj = Basic.__new__(cls, expr, permutation) obj._subranks = [get_rank(expr)] shape = expr.shape if shape is None: obj._shape = None else: obj._shape = tuple(shape[permutation(i)] for i in range(len(shape))) return obj @property def expr(self): return self.args[0] @property def permutation(self): return self.args[1] def nest_permutation(self): r""" Nest the permutation down the expression tree. Examples ======== >>> from sympy.codegen.array_utils import (CodegenArrayPermuteDims, CodegenArrayTensorProduct, nest_permutation) >>> from sympy import MatrixSymbol >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> M = MatrixSymbol("M", 3, 3) >>> N = MatrixSymbol("N", 3, 3) >>> cg = CodegenArrayPermuteDims(CodegenArrayTensorProduct(M, N), [1, 0, 3, 2]) >>> cg CodegenArrayPermuteDims(CodegenArrayTensorProduct(M, N), (0 1)(2 3)) >>> nest_permutation(cg) CodegenArrayTensorProduct(CodegenArrayPermuteDims(M, (0 1)), CodegenArrayPermuteDims(N, (0 1))) In ``cg`` both ``M`` and ``N`` are transposed. The cyclic representation of the permutation after the tensor product is `(0 1)(2 3)`. After nesting it down the expression tree, the usual transposition permutation `(0 1)` appears. """ expr = self.expr if isinstance(expr, CodegenArrayTensorProduct): # Check if the permutation keeps the subranks separated: subranks = expr.subranks subrank = expr.subrank() l = list(range(subrank)) p = [self.permutation(i) for i in l] dargs = {} counter = 0 for i, arg in zip(subranks, expr.args): p0 = p[counter:counter+i] counter += i s0 = sorted(p0) if not all([s0[j+1]-s0[j] == 1 for j in range(len(s0)-1)]): # Cross-argument permutations, impossible to nest the object: return self subpermutation = [p0.index(j) for j in s0] dargs[s0[0]] = CodegenArrayPermuteDims(arg, subpermutation) # Read the arguments sorting the according to the keys of the dict: args = [dargs[i] for i in sorted(dargs)] return CodegenArrayTensorProduct(*args) elif isinstance(expr, CodegenArrayContraction): # Invert tree hierarchy: put the contraction above. cycles = self.permutation.cyclic_form newcycles = CodegenArrayContraction._convert_outer_indices_to_inner_indices(expr, *cycles) newpermutation = Permutation(newcycles) new_contr_indices = [tuple(newpermutation(j) for j in i) for i in expr.contraction_indices] return CodegenArrayContraction(CodegenArrayPermuteDims(expr.expr, newpermutation), *new_contr_indices) elif isinstance(expr, CodegenArrayElementwiseAdd): return CodegenArrayElementwiseAdd(*[CodegenArrayPermuteDims(arg, self.permutation) for arg in expr.args]) return self def nest_permutation(expr): if isinstance(expr, CodegenArrayPermuteDims): return expr.nest_permutation() else: return expr class CodegenArrayDiagonal(_CodegenArrayAbstract): r""" Class to represent the diagonal operator. In a 2-dimensional array it returns the diagonal, this looks like the operation: `A_{ij} \rightarrow A_{ii}` The diagonal over axes 1 and 2 (the second and third) of the tensor product of two 2-dimensional arrays `A \otimes B` is `\Big[ A_{ab} B_{cd} \Big]_{abcd} \rightarrow \Big[ A_{ai} B_{id} \Big]_{adi}` In this last example the array expression has been reduced from 4-dimensional to 3-dimensional. Notice that no contraction has occurred, rather there is a new index `i` for the diagonal, contraction would have reduced the array to 2 dimensions. Notice that the diagonalized out dimensions are added as new dimensions at the end of the indices. """ def __new__(cls, expr, *diagonal_indices): expr = _sympify(expr) diagonal_indices = [Tuple(*sorted(i)) for i in diagonal_indices] if isinstance(expr, CodegenArrayDiagonal): return cls._flatten(expr, *diagonal_indices) shape = expr.shape if shape is not None: diagonal_indices = [i for i in diagonal_indices if len(i) > 1] cls._validate(expr, *diagonal_indices) #diagonal_indices = cls._remove_trivial_dimensions(shape, *diagonal_indices) # Get new shape: shp1 = tuple(shp for i,shp in enumerate(shape) if not any(i in j for j in diagonal_indices)) shp2 = tuple(shape[i[0]] for i in diagonal_indices) shape = shp1 + shp2 if len(diagonal_indices) == 0: return expr obj = Basic.__new__(cls, expr, *diagonal_indices) obj._subranks = _get_subranks(expr) obj._shape = shape return obj @staticmethod def _validate(expr, *diagonal_indices): # Check that no diagonalization happens on indices with mismatched # dimensions: shape = expr.shape for i in diagonal_indices: if len(set(shape[j] for j in i)) != 1: raise ValueError("diagonalizing indices of different dimensions") @staticmethod def _remove_trivial_dimensions(shape, *diagonal_indices): return [tuple(j for j in i) for i in diagonal_indices if shape[i[0]] != 1] @property def expr(self): return self.args[0] @property def diagonal_indices(self): return self.args[1:] @staticmethod def _flatten(expr, *outer_diagonal_indices): inner_diagonal_indices = expr.diagonal_indices all_inner = [j for i in inner_diagonal_indices for j in i] all_inner.sort() # TODO: add API for total rank and cumulative rank: total_rank = get_rank(expr) inner_rank = len(all_inner) outer_rank = total_rank - inner_rank shifts = [0 for i in range(outer_rank)] counter = 0 pointer = 0 for i in range(outer_rank): while pointer < inner_rank and counter >= all_inner[pointer]: counter += 1 pointer += 1 shifts[i] += pointer counter += 1 outer_diagonal_indices = tuple(tuple(shifts[j] + j for j in i) for i in outer_diagonal_indices) diagonal_indices = inner_diagonal_indices + outer_diagonal_indices return CodegenArrayDiagonal(expr.expr, *diagonal_indices) @classmethod def _push_indices_down(cls, diagonal_indices, indices): flattened_contraction_indices = [j for i in diagonal_indices for j in i[1:]] flattened_contraction_indices.sort() transform = _build_push_indices_down_func_transformation(flattened_contraction_indices) return _apply_recursively_over_nested_lists(transform, indices) @classmethod def _push_indices_up(cls, diagonal_indices, indices): flattened_contraction_indices = [j for i in diagonal_indices for j in i[1:]] flattened_contraction_indices.sort() transform = _build_push_indices_up_func_transformation(flattened_contraction_indices) return _apply_recursively_over_nested_lists(transform, indices) def transform_to_product(self): from sympy import ask, Q diagonal_indices = self.diagonal_indices if isinstance(self.expr, CodegenArrayContraction): # invert Diagonal and Contraction: diagonal_down = CodegenArrayContraction._push_indices_down( self.expr.contraction_indices, diagonal_indices ) newexpr = CodegenArrayDiagonal( self.expr.expr, *diagonal_down ).transform_to_product() contraction_up = newexpr._push_indices_up( diagonal_down, self.expr.contraction_indices ) return CodegenArrayContraction( newexpr, *contraction_up ) if not isinstance(self.expr, CodegenArrayTensorProduct): return self args = list(self.expr.args) # TODO: unify API subranks = [get_rank(i) for i in args] # TODO: unify API mapping = _get_mapping_from_subranks(subranks) new_contraction_indices = [] drop_diagonal_indices = [] for indl, links in enumerate(diagonal_indices): if len(links) > 2: continue # Also consider the case of diagonal matrices being contracted: current_dimension = self.expr.shape[links[0]] if current_dimension == 1: drop_diagonal_indices.append(indl) continue tuple_links = [mapping[i] for i in links] arg_indices, arg_positions = zip(*tuple_links) if len(arg_indices) != len(set(arg_indices)): # Maybe trace should be supported? raise NotImplementedError args_updates = {} count_nondiagonal = 0 last = None expression_is_square = False # Check that all args are vectors: for arg_ind, arg_pos in tuple_links: mat = args[arg_ind] if 1 in mat.shape and mat.shape != (1, 1): args_updates[arg_ind] = DiagonalizeVector(mat) last = arg_ind else: expression_is_square = True if not ask(Q.diagonal(mat)): count_nondiagonal += 1 if count_nondiagonal > 1: break if count_nondiagonal > 1: continue # TODO: if count_nondiagonal == 0 then the sub-expression can be recognized as HadamardProduct. for arg_ind, newmat in args_updates.items(): if not expression_is_square and arg_ind == last: continue #pass args[arg_ind] = newmat drop_diagonal_indices.append(indl) new_contraction_indices.append(links) new_diagonal_indices = CodegenArrayContraction._push_indices_up( new_contraction_indices, [e for i, e in enumerate(diagonal_indices) if i not in drop_diagonal_indices] ) return CodegenArrayDiagonal( CodegenArrayContraction( CodegenArrayTensorProduct(*args), *new_contraction_indices ), *new_diagonal_indices ) def get_rank(expr): if isinstance(expr, (MatrixExpr, MatrixElement)): return 2 if isinstance(expr, _CodegenArrayAbstract): return expr.subrank() if isinstance(expr, NDimArray): return expr.rank() if isinstance(expr, Indexed): return expr.rank if isinstance(expr, IndexedBase): shape = expr.shape if shape is None: return -1 else: return len(shape) if isinstance(expr, _RecognizeMatOp): return expr.rank() if isinstance(expr, _RecognizeMatMulLines): return expr.rank() return 0 def _get_subranks(expr): if isinstance(expr, _CodegenArrayAbstract): return expr.subranks else: return [get_rank(expr)] def _get_mapping_from_subranks(subranks): mapping = {} counter = 0 for i, rank in enumerate(subranks): for j in range(rank): mapping[counter] = (i, j) counter += 1 return mapping def _get_contraction_links(args, subranks, *contraction_indices): mapping = _get_mapping_from_subranks(subranks) contraction_tuples = [[mapping[j] for j in i] for i in contraction_indices] dlinks = defaultdict(dict) for links in contraction_tuples: if len(links) == 2: (arg1, pos1), (arg2, pos2) = links dlinks[arg1][pos1] = (arg2, pos2) dlinks[arg2][pos2] = (arg1, pos1) continue return args, dict(dlinks) def _sort_contraction_indices(pairing_indices): pairing_indices = [Tuple(*sorted(i)) for i in pairing_indices] pairing_indices.sort(key=lambda x: min(x)) return pairing_indices def _get_diagonal_indices(flattened_indices): axes_contraction = defaultdict(list) for i, ind in enumerate(flattened_indices): if isinstance(ind, (int, Integer)): # If the indices is a number, there can be no diagonal operation: continue axes_contraction[ind].append(i) axes_contraction = {k: v for k, v in axes_contraction.items() if len(v) > 1} # Put the diagonalized indices at the end: ret_indices = [i for i in flattened_indices if i not in axes_contraction] diag_indices = list(axes_contraction) diag_indices.sort(key=lambda x: flattened_indices.index(x)) diagonal_indices = [tuple(axes_contraction[i]) for i in diag_indices] ret_indices += diag_indices ret_indices = tuple(ret_indices) return diagonal_indices, ret_indices def _get_argindex(subindices, ind): for i, sind in enumerate(subindices): if ind == sind: return i if isinstance(sind, (set, frozenset)) and ind in sind: return i raise IndexError("%s not found in %s" % (ind, subindices)) def _codegen_array_parse(expr): if isinstance(expr, Sum): function = expr.function summation_indices = expr.variables subexpr, subindices = _codegen_array_parse(function) # Check dimensional consistency: shape = subexpr.shape if shape: for ind, istart, iend in expr.limits: i = _get_argindex(subindices, ind) if istart != 0 or iend+1 != shape[i]: raise ValueError("summation index and array dimension mismatch: %s" % ind) contraction_indices = [] subindices = list(subindices) if isinstance(subexpr, CodegenArrayDiagonal): diagonal_indices = list(subexpr.diagonal_indices) dindices = subindices[-len(diagonal_indices):] subindices = subindices[:-len(diagonal_indices)] for index in summation_indices: if index in dindices: position = dindices.index(index) contraction_indices.append(diagonal_indices[position]) diagonal_indices[position] = None diagonal_indices = [i for i in diagonal_indices if i is not None] for i, ind in enumerate(subindices): if ind in summation_indices: pass if diagonal_indices: subexpr = CodegenArrayDiagonal(subexpr.expr, *diagonal_indices) else: subexpr = subexpr.expr axes_contraction = defaultdict(list) for i, ind in enumerate(subindices): if ind in summation_indices: axes_contraction[ind].append(i) subindices[i] = None for k, v in axes_contraction.items(): contraction_indices.append(tuple(v)) free_indices = [i for i in subindices if i is not None] indices_ret = list(free_indices) indices_ret.sort(key=lambda x: free_indices.index(x)) return CodegenArrayContraction( subexpr, *contraction_indices, free_indices=free_indices ), tuple(indices_ret) if isinstance(expr, Mul): args, indices = zip(*[_codegen_array_parse(arg) for arg in expr.args]) # Check if there are KroneckerDelta objects: kronecker_delta_repl = {} for arg in args: if not isinstance(arg, KroneckerDelta): continue # Diagonalize two indices: i, j = arg.indices kindices = set(arg.indices) if i in kronecker_delta_repl: kindices.update(kronecker_delta_repl[i]) if j in kronecker_delta_repl: kindices.update(kronecker_delta_repl[j]) kindices = frozenset(kindices) for index in kindices: kronecker_delta_repl[index] = kindices # Remove KroneckerDelta objects, their relations should be handled by # CodegenArrayDiagonal: newargs = [] newindices = [] for arg, loc_indices in zip(args, indices): if isinstance(arg, KroneckerDelta): continue newargs.append(arg) newindices.append(loc_indices) flattened_indices = [kronecker_delta_repl.get(j, j) for i in newindices for j in i] diagonal_indices, ret_indices = _get_diagonal_indices(flattened_indices) tp = CodegenArrayTensorProduct(*newargs) if diagonal_indices: return (CodegenArrayDiagonal(tp, *diagonal_indices), ret_indices) else: return tp, ret_indices if isinstance(expr, MatrixElement): indices = expr.args[1:] diagonal_indices, ret_indices = _get_diagonal_indices(indices) if diagonal_indices: return (CodegenArrayDiagonal(expr.args[0], *diagonal_indices), ret_indices) else: return expr.args[0], ret_indices if isinstance(expr, Indexed): indices = expr.indices diagonal_indices, ret_indices = _get_diagonal_indices(indices) if diagonal_indices: return (CodegenArrayDiagonal(expr.base, *diagonal_indices), ret_indices) else: return expr.args[0], ret_indices if isinstance(expr, IndexedBase): raise NotImplementedError if isinstance(expr, KroneckerDelta): return expr, expr.indices if isinstance(expr, Add): args, indices = zip(*[_codegen_array_parse(arg) for arg in expr.args]) args = list(args) # Check if all indices are compatible. Otherwise expand the dimensions: index0set = set(indices[0]) index0 = indices[0] for i in range(1, len(args)): if set(indices[i]) != index0set: raise NotImplementedError("indices must be the same") permutation = Permutation([index0.index(j) for j in indices[i]]) # Perform index permutations: args[i] = CodegenArrayPermuteDims(args[i], permutation) return CodegenArrayElementwiseAdd(*args), index0 return expr, () raise NotImplementedError("could not recognize expression %s" % expr) def _parse_matrix_expression(expr): if isinstance(expr, MatMul): args_nonmat = [] args = [] contractions = [] for arg in expr.args: if isinstance(arg, MatrixExpr): args.append(arg) else: args_nonmat.append(arg) contractions = [(2*i+1, 2*i+2) for i in range(len(args)-1)] return Mul.fromiter(args_nonmat)*CodegenArrayContraction( CodegenArrayTensorProduct(*[_parse_matrix_expression(arg) for arg in args]), *contractions ) elif isinstance(expr, MatAdd): return CodegenArrayElementwiseAdd( *[_parse_matrix_expression(arg) for arg in expr.args] ) elif isinstance(expr, Transpose): return CodegenArrayPermuteDims( _parse_matrix_expression(expr.args[0]), [1, 0] ) else: return expr def parse_indexed_expression(expr, first_indices=None): r""" Parse indexed expression into a form useful for code generation. Examples ======== >>> from sympy.codegen.array_utils import parse_indexed_expression >>> from sympy import MatrixSymbol, Sum, symbols >>> from sympy.combinatorics import Permutation >>> Permutation.print_cyclic = True >>> i, j, k, d = symbols("i j k d") >>> M = MatrixSymbol("M", d, d) >>> N = MatrixSymbol("N", d, d) Recognize the trace in summation form: >>> expr = Sum(M[i, i], (i, 0, d-1)) >>> parse_indexed_expression(expr) CodegenArrayContraction(M, (0, 1)) Recognize the extraction of the diagonal by using the same index `i` on both axes of the matrix: >>> expr = M[i, i] >>> parse_indexed_expression(expr) CodegenArrayDiagonal(M, (0, 1)) This function can help perform the transformation expressed in two different mathematical notations as: `\sum_{j=0}^{N-1} A_{i,j} B_{j,k} \Longrightarrow \mathbf{A}\cdot \mathbf{B}` Recognize the matrix multiplication in summation form: >>> expr = Sum(M[i, j]*N[j, k], (j, 0, d-1)) >>> parse_indexed_expression(expr) CodegenArrayContraction(CodegenArrayTensorProduct(M, N), (1, 2)) Specify that ``k`` has to be the starting index: >>> parse_indexed_expression(expr, first_indices=[k]) CodegenArrayPermuteDims(CodegenArrayContraction(CodegenArrayTensorProduct(M, N), (1, 2)), (0 1)) """ result, indices = _codegen_array_parse(expr) if not first_indices: return result for i in first_indices: if i not in indices: first_indices.remove(i) #raise ValueError("index %s not found or not a free index" % i) first_indices.extend([i for i in indices if i not in first_indices]) permutation = [first_indices.index(i) for i in indices] return CodegenArrayPermuteDims(result, permutation) def _has_multiple_lines(expr): if isinstance(expr, _RecognizeMatMulLines): return True if isinstance(expr, _RecognizeMatOp): return expr.multiple_lines return False class _RecognizeMatOp(object): """ Class to help parsing matrix multiplication lines. """ def __init__(self, operator, args): self.operator = operator self.args = args if any(_has_multiple_lines(arg) for arg in args): multiple_lines = True else: multiple_lines = False self.multiple_lines = multiple_lines def rank(self): if self.operator == Trace: return 0 # TODO: check return 2 def __repr__(self): op = self.operator if op == MatMul: s = "*" elif op == MatAdd: s = "+" else: s = op.__name__ return "_RecognizeMatOp(%s, %s)" % (s, repr(self.args)) return "_RecognizeMatOp(%s)" % (s.join(repr(i) for i in self.args)) def __eq__(self, other): if not isinstance(other, type(self)): return False if self.operator != other.operator: return False if self.args != other.args: return False return True def __iter__(self): return iter(self.args) class _RecognizeMatMulLines(list): """ This class handles multiple parsed multiplication lines. """ def __new__(cls, args): if len(args) == 1: return args[0] return list.__new__(cls, args) def rank(self): return reduce(lambda x, y: x*y, [get_rank(i) for i in self], S.One) def __repr__(self): return "_RecognizeMatMulLines(%s)" % super(_RecognizeMatMulLines, self).__repr__() def _support_function_tp1_recognize(contraction_indices, args): if not isinstance(args, list): args = [args] subranks = [get_rank(i) for i in args] coeff = reduce(lambda x, y: x*y, [arg for arg, srank in zip(args, subranks) if srank == 0], S.One) mapping = _get_mapping_from_subranks(subranks) reverse_mapping = {v:k for k, v in mapping.items()} args, dlinks = _get_contraction_links(args, subranks, *contraction_indices) flatten_contractions = [j for i in contraction_indices for j in i] total_rank = sum(subranks) # TODO: turn `free_indices` into a list? free_indices = {i: i for i in range(total_rank) if i not in flatten_contractions} return_list = [] while dlinks: if free_indices: first_index, starting_argind = min(free_indices.items(), key=lambda x: x[1]) free_indices.pop(first_index) starting_argind, starting_pos = mapping[starting_argind] else: # Maybe a Trace first_index = None starting_argind = min(dlinks) starting_pos = 0 current_argind, current_pos = starting_argind, starting_pos matmul_args = [] last_index = None while True: elem = args[current_argind] if current_pos == 1: elem = _RecognizeMatOp(Transpose, [elem]) matmul_args.append(elem) other_pos = 1 - current_pos if current_argind not in dlinks: other_absolute = reverse_mapping[current_argind, other_pos] free_indices.pop(other_absolute, None) break link_dict = dlinks.pop(current_argind) if other_pos not in link_dict: if free_indices: last_index = [i for i, j in free_indices.items() if mapping[j] == (current_argind, other_pos)][0] else: last_index = None break if len(link_dict) > 2: raise NotImplementedError("not a matrix multiplication line") # Get the last element of `link_dict` as the next link. The last # element is the correct start for trace expressions: current_argind, current_pos = link_dict[other_pos] if current_argind == starting_argind: # This is a trace: if len(matmul_args) > 1: matmul_args = [_RecognizeMatOp(Trace, [_RecognizeMatOp(MatMul, matmul_args)])] elif args[current_argind].shape != (1, 1): matmul_args = [_RecognizeMatOp(Trace, matmul_args)] break dlinks.pop(starting_argind, None) free_indices.pop(last_index, None) return_list.append(_RecognizeMatOp(MatMul, matmul_args)) if coeff != 1: # Let's inject the coefficient: return_list[0].args.insert(0, coeff) return _RecognizeMatMulLines(return_list) def recognize_matrix_expression(expr): r""" Recognize matrix expressions in codegen objects. If more than one matrix multiplication line have been detected, return a list with the matrix expressions. Examples ======== >>> from sympy import MatrixSymbol, MatrixExpr, Sum, Symbol >>> from sympy.abc import i, j, k, l, N >>> from sympy.codegen.array_utils import CodegenArrayContraction, CodegenArrayTensorProduct >>> from sympy.codegen.array_utils import recognize_matrix_expression, parse_indexed_expression >>> A = MatrixSymbol("A", N, N) >>> B = MatrixSymbol("B", N, N) >>> C = MatrixSymbol("C", N, N) >>> D = MatrixSymbol("D", N, N) >>> expr = Sum(A[i, j]*B[j, k], (j, 0, N-1)) >>> cg = parse_indexed_expression(expr) >>> recognize_matrix_expression(cg) A*B >>> cg = parse_indexed_expression(expr, first_indices=[k]) >>> recognize_matrix_expression(cg) (A*B).T Transposition is detected: >>> expr = Sum(A[j, i]*B[j, k], (j, 0, N-1)) >>> cg = parse_indexed_expression(expr) >>> recognize_matrix_expression(cg) A.T*B >>> cg = parse_indexed_expression(expr, first_indices=[k]) >>> recognize_matrix_expression(cg) (A.T*B).T Detect the trace: >>> expr = Sum(A[i, i], (i, 0, N-1)) >>> cg = parse_indexed_expression(expr) >>> recognize_matrix_expression(cg) Trace(A) Recognize some more complex traces: >>> expr = Sum(A[i, j]*B[j, i], (i, 0, N-1), (j, 0, N-1)) >>> cg = parse_indexed_expression(expr) >>> recognize_matrix_expression(cg) Trace(A*B) More complicated expressions: >>> expr = Sum(A[i, j]*B[k, j]*A[l, k], (j, 0, N-1), (k, 0, N-1)) >>> cg = parse_indexed_expression(expr) >>> recognize_matrix_expression(cg) A*B.T*A.T Expressions constructed from matrix expressions do not contain literal indices, the positions of free indices are returned instead: >>> expr = A*B >>> cg = CodegenArrayContraction.from_MatMul(expr) >>> recognize_matrix_expression(cg) A*B If more than one line of matrix multiplications is detected, return separate matrix multiplication factors: >>> cg = CodegenArrayContraction(CodegenArrayTensorProduct(A, B, C, D), (1, 2), (5, 6)) >>> recognize_matrix_expression(cg) [A*B, C*D] The two lines have free indices at axes 0, 3 and 4, 7, respectively. """ # TODO: expr has to be a CodegenArray... type rec = _recognize_matrix_expression(expr) return _unfold_recognized_expr(rec) def _recognize_matrix_expression(expr): if isinstance(expr, CodegenArrayContraction): # Apply some transformations: expr = expr.flatten_contraction_of_diagonal() expr = expr.split_multiple_contractions() args = _recognize_matrix_expression(expr.expr) contraction_indices = expr.contraction_indices if isinstance(args, _RecognizeMatOp) and args.operator == MatAdd: addends = [] for arg in args.args: addends.append(_support_function_tp1_recognize(contraction_indices, arg)) return _RecognizeMatOp(MatAdd, addends) elif isinstance(args, _RecognizeMatMulLines): return _support_function_tp1_recognize(contraction_indices, args) return _support_function_tp1_recognize(contraction_indices, [args]) elif isinstance(expr, CodegenArrayElementwiseAdd): add_args = [] for arg in expr.args: add_args.append(_recognize_matrix_expression(arg)) return _RecognizeMatOp(MatAdd, add_args) elif isinstance(expr, (MatrixSymbol, IndexedBase)): return expr elif isinstance(expr, CodegenArrayPermuteDims): if expr.permutation.args[0] == [1, 0]: return _RecognizeMatOp(Transpose, [_recognize_matrix_expression(expr.expr)]) elif isinstance(expr.expr, CodegenArrayTensorProduct): ranks = expr.expr.subranks newrange = [expr.permutation(i) for i in range(sum(ranks))] newpos = [] counter = 0 for rank in ranks: newpos.append(newrange[counter:counter+rank]) counter += rank newargs = [] for pos, arg in zip(newpos, expr.expr.args): if pos == sorted(pos): newargs.append((_recognize_matrix_expression(arg), pos[0])) elif len(pos) == 2: newargs.append((_RecognizeMatOp(Transpose, [_recognize_matrix_expression(arg)]), pos[0])) else: raise NotImplementedError newargs.sort(key=lambda x: x[1]) newargs = [i[0] for i in newargs] return _RecognizeMatMulLines(newargs) else: raise NotImplementedError elif isinstance(expr, CodegenArrayTensorProduct): args = [_recognize_matrix_expression(arg) for arg in expr.args] multiple_lines = [_has_multiple_lines(arg) for arg in args] if any(multiple_lines): if any(a.operator != MatAdd for i, a in enumerate(args) if multiple_lines[i] and isinstance(a, _RecognizeMatOp)): raise NotImplementedError getargs = lambda x: x.args if isinstance(x, _RecognizeMatOp) else list(x) expand_args = [getargs(arg) if multiple_lines[i] else [arg] for i, arg in enumerate(args)] it = itertools.product(*expand_args) ret = _RecognizeMatOp(MatAdd, [_RecognizeMatMulLines([k for j in i for k in (j if isinstance(j, _RecognizeMatMulLines) else [j])]) for i in it]) return ret return _RecognizeMatMulLines(args) elif isinstance(expr, CodegenArrayDiagonal): pexpr = expr.transform_to_product() if expr == pexpr: return expr return _recognize_matrix_expression(pexpr) elif isinstance(expr, Transpose): return expr elif isinstance(expr, MatrixExpr): return expr return expr def _suppress_trivial_dims_in_tensor_product(mat_list): # Recognize expressions like [x, y] with shape (k, 1, k, 1) as `x*y.T`. # The matrix expression has to be equivalent to the tensor product of the matrices, with trivial dimensions (i.e. dim=1) dropped. # That is, add contractions over trivial dimensions: mat_11 = [] mat_k1 = [] last_dim = mat_list[0].shape[0] for mat in mat_list: if mat.shape == (1, 1): mat_11.append(mat) elif 1 in mat.shape: if mat.shape[0] == 1: mat_k1.append(mat.T) else: mat_k1.append(mat) else: return mat_list if len(mat_k1) > 2: return mat_list a = MatMul.fromiter(mat_k1[:1]) b = MatMul.fromiter(mat_k1[1:]) x = MatMul.fromiter(mat_11) return a*x*b.T def _unfold_recognized_expr(expr): if isinstance(expr, _RecognizeMatOp): return expr.operator(*[_unfold_recognized_expr(i) for i in expr.args]) elif isinstance(expr, _RecognizeMatMulLines): unfolded = [_unfold_recognized_expr(i) for i in expr] mat_list = [i for i in unfolded if isinstance(i, MatrixExpr)] scalar_list = [i for i in unfolded if i not in mat_list] scalar = Mul.fromiter(scalar_list) mat_list = [i.doit() for i in mat_list] mat_list = [i for i in mat_list if not (i.shape == (1, 1) and i.is_Identity)] if mat_list: mat_list[0] *= scalar if len(mat_list) == 1: return mat_list[0].doit() else: return _suppress_trivial_dims_in_tensor_product(mat_list) else: return scalar else: return expr def _apply_recursively_over_nested_lists(func, arr): if isinstance(arr, (tuple, list, Tuple)): return tuple(_apply_recursively_over_nested_lists(func, i) for i in arr) elif isinstance(arr, Tuple): return Tuple.fromiter(_apply_recursively_over_nested_lists(func, i) for i in arr) else: return func(arr) def _build_push_indices_up_func_transformation(flattened_contraction_indices): shifts = {0: 0} i = 0 cumulative = 0 while i < len(flattened_contraction_indices): j = 1 while i+j < len(flattened_contraction_indices): if flattened_contraction_indices[i] + j != flattened_contraction_indices[i+j]: break j += 1 cumulative += j shifts[flattened_contraction_indices[i]] = cumulative i += j shift_keys = sorted(shifts.keys()) def func(idx): return shifts[shift_keys[bisect.bisect_right(shift_keys, idx)-1]] def transform(j): if j in flattened_contraction_indices: return None else: return j - func(j) return transform def _build_push_indices_down_func_transformation(flattened_contraction_indices): N = flattened_contraction_indices[-1]+2 shifts = [i for i in range(N) if i not in flattened_contraction_indices] def transform(j): if j < len(shifts): return shifts[j] else: return j + shifts[-1] - len(shifts) + 1 return transform

ee5cce7bfe2ce65d3f7286e538f32f9dec16f588bd5507e2d99ef13e742cee4c

""" Types used to represent a full function/module as an Abstract Syntax Tree. Most types are small, and are merely used as tokens in the AST. A tree diagram has been included below to illustrate the relationships between the AST types. AST Type Tree ------------- :: *Basic* |--->AssignmentBase | |--->Assignment | |--->AugmentedAssignment | |--->AddAugmentedAssignment | |--->SubAugmentedAssignment | |--->MulAugmentedAssignment | |--->DivAugmentedAssignment | |--->ModAugmentedAssignment | |--->CodeBlock | | |--->Token | |--->Attribute | |--->For | |--->String | | |--->QuotedString | | |--->Comment | |--->Type | | |--->IntBaseType | | | |--->_SizedIntType | | | |--->SignedIntType | | | |--->UnsignedIntType | | |--->FloatBaseType | | |--->FloatType | | |--->ComplexBaseType | | |--->ComplexType | |--->Node | | |--->Variable | | | |---> Pointer | | |--->FunctionPrototype | | |--->FunctionDefinition | |--->Element | |--->Declaration | |--->While | |--->Scope | |--->Stream | |--->Print | |--->FunctionCall | |--->BreakToken | |--->ContinueToken | |--->NoneToken | |--->Statement |--->Return Predefined types ---------------- A number of ``Type`` instances are provided in the ``sympy.codegen.ast`` module for convenience. Perhaps the two most common ones for code-generation (of numeric codes) are ``float32`` and ``float64`` (known as single and double precision respectively). There are also precision generic versions of Types (for which the codeprinters selects the underlying data type at time of printing): ``real``, ``integer``, ``complex_``, ``bool_``. The other ``Type`` instances defined are: - ``intc``: Integer type used by C's "int". - ``intp``: Integer type used by C's "unsigned". - ``int8``, ``int16``, ``int32``, ``int64``: n-bit integers. - ``uint8``, ``uint16``, ``uint32``, ``uint64``: n-bit unsigned integers. - ``float80``: known as "extended precision" on modern x86/amd64 hardware. - ``complex64``: Complex number represented by two ``float32`` numbers - ``complex128``: Complex number represented by two ``float64`` numbers Using the nodes --------------- It is possible to construct simple algorithms using the AST nodes. Let's construct a loop applying Newton's method:: >>> from sympy import symbols, cos >>> from sympy.codegen.ast import While, Assignment, aug_assign, Print >>> t, dx, x = symbols('tol delta val') >>> expr = cos(x) - x**3 >>> whl = While(abs(dx) > t, [ ... Assignment(dx, -expr/expr.diff(x)), ... aug_assign(x, '+', dx), ... Print([x]) ... ]) >>> from sympy.printing import pycode >>> py_str = pycode(whl) >>> print(py_str) while (abs(delta) > tol): delta = (val**3 - math.cos(val))/(-3*val**2 - math.sin(val)) val += delta print(val) >>> import math >>> tol, val, delta = 1e-5, 0.5, float('inf') >>> exec(py_str) 1.1121416371 0.909672693737 0.867263818209 0.865477135298 0.865474033111 >>> print('%3.1g' % (math.cos(val) - val**3)) -3e-11 If we want to generate Fortran code for the same while loop we simple call ``fcode``:: >>> from sympy.printing.fcode import fcode >>> print(fcode(whl, standard=2003, source_format='free')) do while (abs(delta) > tol) delta = (val**3 - cos(val))/(-3*val**2 - sin(val)) val = val + delta print *, val end do There is a function constructing a loop (or a complete function) like this in :mod:`sympy.codegen.algorithms`. """ from __future__ import print_function, division from itertools import chain from collections import defaultdict from sympy.core import Symbol, Tuple, Dummy from sympy.core.basic import Basic from sympy.core.compatibility import string_types from sympy.core.expr import Expr from sympy.core.numbers import Float, Integer, oo from sympy.core.relational import Lt, Le, Ge, Gt from sympy.core.sympify import _sympify, sympify, SympifyError from sympy.utilities.iterables import iterable def _mk_Tuple(args): """ Create a Sympy Tuple object from an iterable, converting Python strings to AST strings. Parameters ========== args: iterable Arguments to :class:`sympy.Tuple`. Returns ======= sympy.Tuple """ args = [String(arg) if isinstance(arg, string_types) else arg for arg in args] return Tuple(*args) class Token(Basic): """ Base class for the AST types. Defining fields are set in ``__slots__``. Attributes (defined in __slots__) are only allowed to contain instances of Basic (unless atomic, see ``String``). The arguments to ``__new__()`` correspond to the attributes in the order defined in ``__slots__`. The ``defaults`` class attribute is a dictionary mapping attribute names to their default values. Subclasses should not need to override the ``__new__()`` method. They may define a class or static method named ``_construct_<attr>`` for each attribute to process the value passed to ``__new__()``. Attributes listed in the class attribute ``not_in_args`` are not passed to :class:`sympy.Basic`. """ __slots__ = [] defaults = {} not_in_args = [] indented_args = ['body'] @property def is_Atom(self): return len(self.__slots__) == 0 @classmethod def _get_constructor(cls, attr): """ Get the constructor function for an attribute by name. """ return getattr(cls, '_construct_%s' % attr, lambda x: x) @classmethod def _construct(cls, attr, arg): """ Construct an attribute value from argument passed to ``__new__()``. """ if arg == None: # Must be "== None", cannot be "is None" return cls.defaults.get(attr, none) else: if isinstance(arg, Dummy): # sympy's replace uses Dummy instances return arg else: return cls._get_constructor(attr)(arg) def __new__(cls, *args, **kwargs): # Pass through existing instances when given as sole argument if len(args) == 1 and not kwargs and isinstance(args[0], cls): return args[0] if len(args) > len(cls.__slots__): raise ValueError("Too many arguments (%d), expected at most %d" % (len(args), len(cls.__slots__))) attrvals = [] # Process positional arguments for attrname, argval in zip(cls.__slots__, args): if attrname in kwargs: raise TypeError('Got multiple values for attribute %r' % attrname) attrvals.append(cls._construct(attrname, argval)) # Process keyword arguments for attrname in cls.__slots__[len(args):]: if attrname in kwargs: argval = kwargs.pop(attrname) elif attrname in cls.defaults: argval = cls.defaults[attrname] else: raise TypeError('No value for %r given and attribute has no default' % attrname) attrvals.append(cls._construct(attrname, argval)) if kwargs: raise ValueError("Unknown keyword arguments: %s" % ' '.join(kwargs)) # Parent constructor basic_args = [ val for attr, val in zip(cls.__slots__, attrvals) if attr not in cls.not_in_args ] obj = Basic.__new__(cls, *basic_args) # Set attributes for attr, arg in zip(cls.__slots__, attrvals): setattr(obj, attr, arg) return obj def __eq__(self, other): if not isinstance(other, self.__class__): return False for attr in self.__slots__: if getattr(self, attr) != getattr(other, attr): return False return True def _hashable_content(self): return tuple([getattr(self, attr) for attr in self.__slots__]) def __hash__(self): return super(Token, self).__hash__() def _joiner(self, k, indent_level): return (',\n' + ' '*indent_level) if k in self.indented_args else ', ' def _indented(self, printer, k, v, *args, **kwargs): il = printer._context['indent_level'] def _print(arg): if isinstance(arg, Token): return printer._print(arg, *args, joiner=self._joiner(k, il), **kwargs) else: return printer._print(v, *args, **kwargs) if isinstance(v, Tuple): joined = self._joiner(k, il).join([_print(arg) for arg in v.args]) if k in self.indented_args: return '(\n' + ' '*il + joined + ',\n' + ' '*(il - 4) + ')' else: return ('({0},)' if len(v.args) == 1 else '({0})').format(joined) else: return _print(v) def _sympyrepr(self, printer, *args, **kwargs): from sympy.printing.printer import printer_context exclude = kwargs.get('exclude', ()) values = [getattr(self, k) for k in self.__slots__] indent_level = printer._context.get('indent_level', 0) joiner = kwargs.pop('joiner', ', ') arg_reprs = [] for i, (attr, value) in enumerate(zip(self.__slots__, values)): if attr in exclude: continue # Skip attributes which have the default value if attr in self.defaults and value == self.defaults[attr]: continue ilvl = indent_level + 4 if attr in self.indented_args else 0 with printer_context(printer, indent_level=ilvl): indented = self._indented(printer, attr, value, *args, **kwargs) arg_reprs.append(('{1}' if i == 0 else '{0}={1}').format(attr, indented.lstrip())) return "{0}({1})".format(self.__class__.__name__, joiner.join(arg_reprs)) _sympystr = _sympyrepr def __repr__(self): # sympy.core.Basic.__repr__ uses sstr from sympy.printing import srepr return srepr(self) def kwargs(self, exclude=(), apply=None): """ Get instance's attributes as dict of keyword arguments. Parameters ========== exclude : collection of str Collection of keywords to exclude. apply : callable, optional Function to apply to all values. """ kwargs = {k: getattr(self, k) for k in self.__slots__ if k not in exclude} if apply is not None: return {k: apply(v) for k, v in kwargs.items()} else: return kwargs class BreakToken(Token): """ Represents 'break' in C/Python ('exit' in Fortran). Use the premade instance ``break_`` or instantiate manually. Examples ======== >>> from sympy.printing import ccode, fcode >>> from sympy.codegen.ast import break_ >>> ccode(break_) 'break' >>> fcode(break_, source_format='free') 'exit' """ break_ = BreakToken() class ContinueToken(Token): """ Represents 'continue' in C/Python ('cycle' in Fortran) Use the premade instance ``continue_`` or instantiate manually. Examples ======== >>> from sympy.printing import ccode, fcode >>> from sympy.codegen.ast import continue_ >>> ccode(continue_) 'continue' >>> fcode(continue_, source_format='free') 'cycle' """ continue_ = ContinueToken() class NoneToken(Token): """ The AST equivalence of Python's NoneType The corresponding instance of Python's ``None`` is ``none``. Examples ======== >>> from sympy.codegen.ast import none, Variable >>> from sympy.printing.pycode import pycode >>> print(pycode(Variable('x').as_Declaration(value=none))) x = None """ def __eq__(self, other): return other is None or isinstance(other, NoneToken) def _hashable_content(self): return () def __hash__(self): return super(NoneToken, self).__hash__() none = NoneToken() class AssignmentBase(Basic): """ Abstract base class for Assignment and AugmentedAssignment. Attributes: =========== op : str Symbol for assignment operator, e.g. "=", "+=", etc. """ def __new__(cls, lhs, rhs): lhs = _sympify(lhs) rhs = _sympify(rhs) cls._check_args(lhs, rhs) return super(AssignmentBase, cls).__new__(cls, lhs, rhs) @property def lhs(self): return self.args[0] @property def rhs(self): return self.args[1] @classmethod def _check_args(cls, lhs, rhs): """ Check arguments to __new__ and raise exception if any problems found. Derived classes may wish to override this. """ from sympy.matrices.expressions.matexpr import ( MatrixElement, MatrixSymbol) from sympy.tensor.indexed import Indexed # Tuple of things that can be on the lhs of an assignment assignable = (Symbol, MatrixSymbol, MatrixElement, Indexed, Element, Variable) if not isinstance(lhs, assignable): raise TypeError("Cannot assign to lhs of type %s." % type(lhs)) # Indexed types implement shape, but don't define it until later. This # causes issues in assignment validation. For now, matrices are defined # as anything with a shape that is not an Indexed lhs_is_mat = hasattr(lhs, 'shape') and not isinstance(lhs, Indexed) rhs_is_mat = hasattr(rhs, 'shape') and not isinstance(rhs, Indexed) # If lhs and rhs have same structure, then this assignment is ok if lhs_is_mat: if not rhs_is_mat: raise ValueError("Cannot assign a scalar to a matrix.") elif lhs.shape != rhs.shape: raise ValueError("Dimensions of lhs and rhs don't align.") elif rhs_is_mat and not lhs_is_mat: raise ValueError("Cannot assign a matrix to a scalar.") class Assignment(AssignmentBase): """ Represents variable assignment for code generation. Parameters ========== lhs : Expr Sympy object representing the lhs of the expression. These should be singular objects, such as one would use in writing code. Notable types include Symbol, MatrixSymbol, MatrixElement, and Indexed. Types that subclass these types are also supported. rhs : Expr Sympy object representing the rhs of the expression. This can be any type, provided its shape corresponds to that of the lhs. For example, a Matrix type can be assigned to MatrixSymbol, but not to Symbol, as the dimensions will not align. Examples ======== >>> from sympy import symbols, MatrixSymbol, Matrix >>> from sympy.codegen.ast import Assignment >>> x, y, z = symbols('x, y, z') >>> Assignment(x, y) Assignment(x, y) >>> Assignment(x, 0) Assignment(x, 0) >>> A = MatrixSymbol('A', 1, 3) >>> mat = Matrix([x, y, z]).T >>> Assignment(A, mat) Assignment(A, Matrix([[x, y, z]])) >>> Assignment(A[0, 1], x) Assignment(A[0, 1], x) """ op = ':=' class AugmentedAssignment(AssignmentBase): """ Base class for augmented assignments. Attributes: =========== binop : str Symbol for binary operation being applied in the assignment, such as "+", "*", etc. """ @property def op(self): return self.binop + '=' class AddAugmentedAssignment(AugmentedAssignment): binop = '+' class SubAugmentedAssignment(AugmentedAssignment): binop = '-' class MulAugmentedAssignment(AugmentedAssignment): binop = '*' class DivAugmentedAssignment(AugmentedAssignment): binop = '/' class ModAugmentedAssignment(AugmentedAssignment): binop = '%' # Mapping from binary op strings to AugmentedAssignment subclasses augassign_classes = { cls.binop: cls for cls in [ AddAugmentedAssignment, SubAugmentedAssignment, MulAugmentedAssignment, DivAugmentedAssignment, ModAugmentedAssignment ] } def aug_assign(lhs, op, rhs): """ Create 'lhs op= rhs'. Represents augmented variable assignment for code generation. This is a convenience function. You can also use the AugmentedAssignment classes directly, like AddAugmentedAssignment(x, y). Parameters ========== lhs : Expr Sympy object representing the lhs of the expression. These should be singular objects, such as one would use in writing code. Notable types include Symbol, MatrixSymbol, MatrixElement, and Indexed. Types that subclass these types are also supported. op : str Operator (+, -, /, \\*, %). rhs : Expr Sympy object representing the rhs of the expression. This can be any type, provided its shape corresponds to that of the lhs. For example, a Matrix type can be assigned to MatrixSymbol, but not to Symbol, as the dimensions will not align. Examples ======== >>> from sympy import symbols >>> from sympy.codegen.ast import aug_assign >>> x, y = symbols('x, y') >>> aug_assign(x, '+', y) AddAugmentedAssignment(x, y) """ if op not in augassign_classes: raise ValueError("Unrecognized operator %s" % op) return augassign_classes[op](lhs, rhs) class CodeBlock(Basic): """ Represents a block of code For now only assignments are supported. This restriction will be lifted in the future. Useful attributes on this object are: ``left_hand_sides``: Tuple of left-hand sides of assignments, in order. ``left_hand_sides``: Tuple of right-hand sides of assignments, in order. ``free_symbols``: Free symbols of the expressions in the right-hand sides which do not appear in the left-hand side of an assignment. Useful methods on this object are: ``topological_sort``: Class method. Return a CodeBlock with assignments sorted so that variables are assigned before they are used. ``cse``: Return a new CodeBlock with common subexpressions eliminated and pulled out as assignments. Examples ======== >>> from sympy import symbols, ccode >>> from sympy.codegen.ast import CodeBlock, Assignment >>> x, y = symbols('x y') >>> c = CodeBlock(Assignment(x, 1), Assignment(y, x + 1)) >>> print(ccode(c)) x = 1; y = x + 1; """ def __new__(cls, *args): left_hand_sides = [] right_hand_sides = [] for i in args: if isinstance(i, Assignment): lhs, rhs = i.args left_hand_sides.append(lhs) right_hand_sides.append(rhs) obj = Basic.__new__(cls, *args) obj.left_hand_sides = Tuple(*left_hand_sides) obj.right_hand_sides = Tuple(*right_hand_sides) return obj def __iter__(self): return iter(self.args) def _sympyrepr(self, printer, *args, **kwargs): il = printer._context.get('indent_level', 0) joiner = ',\n' + ' '*il joined = joiner.join(map(printer._print, self.args)) return ('{0}(\n'.format(' '*(il-4) + self.__class__.__name__,) + ' '*il + joined + '\n' + ' '*(il - 4) + ')') _sympystr = _sympyrepr @property def free_symbols(self): return super(CodeBlock, self).free_symbols - set(self.left_hand_sides) @classmethod def topological_sort(cls, assignments): """ Return a CodeBlock with topologically sorted assignments so that variables are assigned before they are used. The existing order of assignments is preserved as much as possible. This function assumes that variables are assigned to only once. This is a class constructor so that the default constructor for CodeBlock can error when variables are used before they are assigned. Examples ======== >>> from sympy import symbols >>> from sympy.codegen.ast import CodeBlock, Assignment >>> x, y, z = symbols('x y z') >>> assignments = [ ... Assignment(x, y + z), ... Assignment(y, z + 1), ... Assignment(z, 2), ... ] >>> CodeBlock.topological_sort(assignments) CodeBlock( Assignment(z, 2), Assignment(y, z + 1), Assignment(x, y + z) ) """ from sympy.utilities.iterables import topological_sort if not all(isinstance(i, Assignment) for i in assignments): # Will support more things later raise NotImplementedError("CodeBlock.topological_sort only supports Assignments") if any(isinstance(i, AugmentedAssignment) for i in assignments): raise NotImplementedError("CodeBlock.topological_sort doesn't yet work with AugmentedAssignments") # Create a graph where the nodes are assignments and there is a directed edge # between nodes that use a variable and nodes that assign that # variable, like # [(x := 1, y := x + 1), (x := 1, z := y + z), (y := x + 1, z := y + z)] # If we then topologically sort these nodes, they will be in # assignment order, like # x := 1 # y := x + 1 # z := y + z # A = The nodes # # enumerate keeps nodes in the same order they are already in if # possible. It will also allow us to handle duplicate assignments to # the same variable when those are implemented. A = list(enumerate(assignments)) # var_map = {variable: [nodes for which this variable is assigned to]} # like {x: [(1, x := y + z), (4, x := 2 * w)], ...} var_map = defaultdict(list) for node in A: i, a = node var_map[a.lhs].append(node) # E = Edges in the graph E = [] for dst_node in A: i, a = dst_node for s in a.rhs.free_symbols: for src_node in var_map[s]: E.append((src_node, dst_node)) ordered_assignments = topological_sort([A, E]) # De-enumerate the result return cls(*[a for i, a in ordered_assignments]) def cse(self, symbols=None, optimizations=None, postprocess=None, order='canonical'): """ Return a new code block with common subexpressions eliminated See the docstring of :func:`sympy.simplify.cse_main.cse` for more information. Examples ======== >>> from sympy import symbols, sin >>> from sympy.codegen.ast import CodeBlock, Assignment >>> x, y, z = symbols('x y z') >>> c = CodeBlock( ... Assignment(x, 1), ... Assignment(y, sin(x) + 1), ... Assignment(z, sin(x) - 1), ... ) ... >>> c.cse() CodeBlock( Assignment(x, 1), Assignment(x0, sin(x)), Assignment(y, x0 + 1), Assignment(z, x0 - 1) ) """ from sympy.simplify.cse_main import cse from sympy.utilities.iterables import numbered_symbols, filter_symbols # Check that the CodeBlock only contains assignments to unique variables if not all(isinstance(i, Assignment) for i in self.args): # Will support more things later raise NotImplementedError("CodeBlock.cse only supports Assignments") if any(isinstance(i, AugmentedAssignment) for i in self.args): raise NotImplementedError("CodeBlock.cse doesn't yet work with AugmentedAssignments") for i, lhs in enumerate(self.left_hand_sides): if lhs in self.left_hand_sides[:i]: raise NotImplementedError("Duplicate assignments to the same " "variable are not yet supported (%s)" % lhs) # Ensure new symbols for subexpressions do not conflict with existing existing_symbols = self.atoms(Symbol) if symbols is None: symbols = numbered_symbols() symbols = filter_symbols(symbols, existing_symbols) replacements, reduced_exprs = cse(list(self.right_hand_sides), symbols=symbols, optimizations=optimizations, postprocess=postprocess, order=order) new_block = [Assignment(var, expr) for var, expr in zip(self.left_hand_sides, reduced_exprs)] new_assignments = [Assignment(var, expr) for var, expr in replacements] return self.topological_sort(new_assignments + new_block) class For(Token): """Represents a 'for-loop' in the code. Expressions are of the form: "for target in iter: body..." Parameters ========== target : symbol iter : iterable body : CodeBlock or iterable ! When passed an iterable it is used to instantiate a CodeBlock. Examples ======== >>> from sympy import symbols, Range >>> from sympy.codegen.ast import aug_assign, For >>> x, i, j, k = symbols('x i j k') >>> for_i = For(i, Range(10), [aug_assign(x, '+', i*j*k)]) >>> for_i # doctest: -NORMALIZE_WHITESPACE For(i, iterable=Range(0, 10, 1), body=CodeBlock( AddAugmentedAssignment(x, i*j*k) )) >>> for_ji = For(j, Range(7), [for_i]) >>> for_ji # doctest: -NORMALIZE_WHITESPACE For(j, iterable=Range(0, 7, 1), body=CodeBlock( For(i, iterable=Range(0, 10, 1), body=CodeBlock( AddAugmentedAssignment(x, i*j*k) )) )) >>> for_kji =For(k, Range(5), [for_ji]) >>> for_kji # doctest: -NORMALIZE_WHITESPACE For(k, iterable=Range(0, 5, 1), body=CodeBlock( For(j, iterable=Range(0, 7, 1), body=CodeBlock( For(i, iterable=Range(0, 10, 1), body=CodeBlock( AddAugmentedAssignment(x, i*j*k) )) )) )) """ __slots__ = ['target', 'iterable', 'body'] _construct_target = staticmethod(_sympify) @classmethod def _construct_body(cls, itr): if isinstance(itr, CodeBlock): return itr else: return CodeBlock(*itr) @classmethod def _construct_iterable(cls, itr): if not iterable(itr): raise TypeError("iterable must be an iterable") if isinstance(itr, list): # _sympify errors on lists because they are mutable itr = tuple(itr) return _sympify(itr) class String(Token): """ SymPy object representing a string. Atomic object which is not an expression (as opposed to Symbol). Parameters ========== text : str Examples ======== >>> from sympy.codegen.ast import String >>> f = String('foo') >>> f foo >>> str(f) 'foo' >>> f.text 'foo' >>> print(repr(f)) String('foo') """ __slots__ = ['text'] not_in_args = ['text'] is_Atom = True @classmethod def _construct_text(cls, text): if not isinstance(text, string_types): raise TypeError("Argument text is not a string type.") return text def _sympystr(self, printer, *args, **kwargs): return self.text class QuotedString(String): """ Represents a string which should be printed with quotes. """ class Comment(String): """ Represents a comment. """ class Node(Token): """ Subclass of Token, carrying the attribute 'attrs' (Tuple) Examples ======== >>> from sympy.codegen.ast import Node, value_const, pointer_const >>> n1 = Node([value_const]) >>> n1.attr_params('value_const') # get the parameters of attribute (by name) () >>> from sympy.codegen.fnodes import dimension >>> n2 = Node([value_const, dimension(5, 3)]) >>> n2.attr_params(value_const) # get the parameters of attribute (by Attribute instance) () >>> n2.attr_params('dimension') # get the parameters of attribute (by name) (5, 3) >>> n2.attr_params(pointer_const) is None True """ __slots__ = ['attrs'] defaults = {'attrs': Tuple()} _construct_attrs = staticmethod(_mk_Tuple) def attr_params(self, looking_for): """ Returns the parameters of the Attribute with name ``looking_for`` in self.attrs """ for attr in self.attrs: if str(attr.name) == str(looking_for): return attr.parameters class Type(Token): """ Represents a type. The naming is a super-set of NumPy naming. Type has a classmethod ``from_expr`` which offer type deduction. It also has a method ``cast_check`` which casts the argument to its type, possibly raising an exception if rounding error is not within tolerances, or if the value is not representable by the underlying data type (e.g. unsigned integers). Parameters ========== name : str Name of the type, e.g. ``object``, ``int16``, ``float16`` (where the latter two would use the ``Type`` sub-classes ``IntType`` and ``FloatType`` respectively). If a ``Type`` instance is given, the said instance is returned. Examples ======== >>> from sympy.codegen.ast import Type >>> t = Type.from_expr(42) >>> t integer >>> print(repr(t)) IntBaseType(String('integer')) >>> from sympy.codegen.ast import uint8 >>> uint8.cast_check(-1) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Minimum value for data type bigger than new value. >>> from sympy.codegen.ast import float32 >>> v6 = 0.123456 >>> float32.cast_check(v6) 0.123456 >>> v10 = 12345.67894 >>> float32.cast_check(v10) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Casting gives a significantly different value. >>> boost_mp50 = Type('boost::multiprecision::cpp_dec_float_50') >>> from sympy import Symbol >>> from sympy.printing.cxxcode import cxxcode >>> from sympy.codegen.ast import Declaration, Variable >>> cxxcode(Declaration(Variable('x', type=boost_mp50))) 'boost::multiprecision::cpp_dec_float_50 x' References ========== .. [1] https://docs.scipy.org/doc/numpy/user/basics.types.html """ __slots__ = ['name'] _construct_name = String def _sympystr(self, printer, *args, **kwargs): return str(self.name) @classmethod def from_expr(cls, expr): """ Deduces type from an expression or a ``Symbol``. Parameters ========== expr : number or SymPy object The type will be deduced from type or properties. Examples ======== >>> from sympy.codegen.ast import Type, integer, complex_ >>> Type.from_expr(2) == integer True >>> from sympy import Symbol >>> Type.from_expr(Symbol('z', complex=True)) == complex_ True >>> Type.from_expr(sum) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Could not deduce type from expr. Raises ====== ValueError when type deduction fails. """ if isinstance(expr, (float, Float)): return real if isinstance(expr, (int, Integer)) or getattr(expr, 'is_integer', False): return integer if getattr(expr, 'is_real', False): return real if isinstance(expr, complex) or getattr(expr, 'is_complex', False): return complex_ if isinstance(expr, bool) or getattr(expr, 'is_Relational', False): return bool_ else: raise ValueError("Could not deduce type from expr.") def _check(self, value): pass def cast_check(self, value, rtol=None, atol=0, limits=None, precision_targets=None): """ Casts a value to the data type of the instance. Parameters ========== value : number rtol : floating point number Relative tolerance. (will be deduced if not given). atol : floating point number Absolute tolerance (in addition to ``rtol``). limits : dict Values given by ``limits.h``, x86/IEEE754 defaults if not given. Default: :attr:`default_limits`. type_aliases : dict Maps substitutions for Type, e.g. {integer: int64, real: float32} Examples ======== >>> from sympy.codegen.ast import Type, integer, float32, int8 >>> integer.cast_check(3.0) == 3 True >>> float32.cast_check(1e-40) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Minimum value for data type bigger than new value. >>> int8.cast_check(256) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Maximum value for data type smaller than new value. >>> v10 = 12345.67894 >>> float32.cast_check(v10) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Casting gives a significantly different value. >>> from sympy.codegen.ast import float64 >>> float64.cast_check(v10) 12345.67894 >>> from sympy import Float >>> v18 = Float('0.123456789012345646') >>> float64.cast_check(v18) Traceback (most recent call last): ... ValueError: Casting gives a significantly different value. >>> from sympy.codegen.ast import float80 >>> float80.cast_check(v18) 0.123456789012345649 """ val = sympify(value) ten = Integer(10) exp10 = getattr(self, 'decimal_dig', None) if rtol is None: rtol = 1e-15 if exp10 is None else 2.0*ten**(-exp10) def tol(num): return atol + rtol*abs(num) new_val = self.cast_nocheck(value) self._check(new_val) delta = new_val - val if abs(delta) > tol(val): # rounding, e.g. int(3.5) != 3.5 raise ValueError("Casting gives a significantly different value.") return new_val class IntBaseType(Type): """ Integer base type, contains no size information. """ __slots__ = ['name'] cast_nocheck = lambda self, i: Integer(int(i)) class _SizedIntType(IntBaseType): __slots__ = ['name', 'nbits'] _construct_nbits = Integer def _check(self, value): if value < self.min: raise ValueError("Value is too small: %d < %d" % (value, self.min)) if value > self.max: raise ValueError("Value is too big: %d > %d" % (value, self.max)) class SignedIntType(_SizedIntType): """ Represents a signed integer type. """ @property def min(self): return -2**(self.nbits-1) @property def max(self): return 2**(self.nbits-1) - 1 class UnsignedIntType(_SizedIntType): """ Represents an unsigned integer type. """ @property def min(self): return 0 @property def max(self): return 2**self.nbits - 1 two = Integer(2) class FloatBaseType(Type): """ Represents a floating point number type. """ cast_nocheck = Float class FloatType(FloatBaseType): """ Represents a floating point type with fixed bit width. Base 2 & one sign bit is assumed. Parameters ========== name : str Name of the type. nbits : integer Number of bits used (storage). nmant : integer Number of bits used to represent the mantissa. nexp : integer Number of bits used to represent the mantissa. Examples ======== >>> from sympy import S, Float >>> from sympy.codegen.ast import FloatType >>> half_precision = FloatType('f16', nbits=16, nmant=10, nexp=5) >>> half_precision.max 65504 >>> half_precision.tiny == S(2)**-14 True >>> half_precision.eps == S(2)**-10 True >>> half_precision.dig == 3 True >>> half_precision.decimal_dig == 5 True >>> half_precision.cast_check(1.0) 1.0 >>> half_precision.cast_check(1e5) # doctest: +ELLIPSIS Traceback (most recent call last): ... ValueError: Maximum value for data type smaller than new value. """ __slots__ = ['name', 'nbits', 'nmant', 'nexp'] _construct_nbits = _construct_nmant = _construct_nexp = Integer @property def max_exponent(self): """ The largest positive number n, such that 2**(n - 1) is a representable finite value. """ # cf. C++'s ``std::numeric_limits::max_exponent`` return two**(self.nexp - 1) @property def min_exponent(self): """ The lowest negative number n, such that 2**(n - 1) is a valid normalized number. """ # cf. C++'s ``std::numeric_limits::min_exponent`` return 3 - self.max_exponent @property def max(self): """ Maximum value representable. """ return (1 - two**-(self.nmant+1))*two**self.max_exponent @property def tiny(self): """ The minimum positive normalized value. """ # See C macros: FLT_MIN, DBL_MIN, LDBL_MIN # or C++'s ``std::numeric_limits::min`` # or numpy.finfo(dtype).tiny return two**(self.min_exponent - 1) @property def eps(self): """ Difference between 1.0 and the next representable value. """ return two**(-self.nmant) @property def dig(self): """ Number of decimal digits that are guaranteed to be preserved in text. When converting text -> float -> text, you are guaranteed that at least ``dig`` number of digits are preserved with respect to rounding or overflow. """ from sympy.functions import floor, log return floor(self.nmant * log(2)/log(10)) @property def decimal_dig(self): """ Number of digits needed to store & load without loss. Number of decimal digits needed to guarantee that two consecutive conversions (float -> text -> float) to be idempotent. This is useful when one do not want to loose precision due to rounding errors when storing a floating point value as text. """ from sympy.functions import ceiling, log return ceiling((self.nmant + 1) * log(2)/log(10) + 1) def cast_nocheck(self, value): """ Casts without checking if out of bounds or subnormal. """ if value == oo: # float(oo) or oo return float(oo) elif value == -oo: # float(-oo) or -oo return float(-oo) return Float(str(sympify(value).evalf(self.decimal_dig)), self.decimal_dig) def _check(self, value): if value < -self.max: raise ValueError("Value is too small: %d < %d" % (value, -self.max)) if value > self.max: raise ValueError("Value is too big: %d > %d" % (value, self.max)) if abs(value) < self.tiny: raise ValueError("Smallest (absolute) value for data type bigger than new value.") class ComplexBaseType(FloatBaseType): def cast_nocheck(self, value): """ Casts without checking if out of bounds or subnormal. """ from sympy.functions import re, im return ( super(ComplexBaseType, self).cast_nocheck(re(value)) + super(ComplexBaseType, self).cast_nocheck(im(value))*1j ) def _check(self, value): from sympy.functions import re, im super(ComplexBaseType, self)._check(re(value)) super(ComplexBaseType, self)._check(im(value)) class ComplexType(ComplexBaseType, FloatType): """ Represents a complex floating point number. """ # NumPy types: intc = IntBaseType('intc') intp = IntBaseType('intp') int8 = SignedIntType('int8', 8) int16 = SignedIntType('int16', 16) int32 = SignedIntType('int32', 32) int64 = SignedIntType('int64', 64) uint8 = UnsignedIntType('uint8', 8) uint16 = UnsignedIntType('uint16', 16) uint32 = UnsignedIntType('uint32', 32) uint64 = UnsignedIntType('uint64', 64) float16 = FloatType('float16', 16, nexp=5, nmant=10) # IEEE 754 binary16, Half precision float32 = FloatType('float32', 32, nexp=8, nmant=23) # IEEE 754 binary32, Single precision float64 = FloatType('float64', 64, nexp=11, nmant=52) # IEEE 754 binary64, Double precision float80 = FloatType('float80', 80, nexp=15, nmant=63) # x86 extended precision (1 integer part bit), "long double" float128 = FloatType('float128', 128, nexp=15, nmant=112) # IEEE 754 binary128, Quadruple precision float256 = FloatType('float256', 256, nexp=19, nmant=236) # IEEE 754 binary256, Octuple precision complex64 = ComplexType('complex64', nbits=64, **float32.kwargs(exclude=('name', 'nbits'))) complex128 = ComplexType('complex128', nbits=128, **float64.kwargs(exclude=('name', 'nbits'))) # Generic types (precision may be chosen by code printers): untyped = Type('untyped') real = FloatBaseType('real') integer = IntBaseType('integer') complex_ = ComplexBaseType('complex') bool_ = Type('bool') class Attribute(Token): """ Attribute (possibly parametrized) For use with :class:`sympy.codegen.ast.Node` (which takes instances of ``Attribute`` as ``attrs``). Parameters ========== name : str parameters : Tuple Examples ======== >>> from sympy.codegen.ast import Attribute >>> volatile = Attribute('volatile') >>> volatile volatile >>> print(repr(volatile)) Attribute(String('volatile')) >>> a = Attribute('foo', [1, 2, 3]) >>> a foo(1, 2, 3) >>> a.parameters == (1, 2, 3) True """ __slots__ = ['name', 'parameters'] defaults = {'parameters': Tuple()} _construct_name = String _construct_parameters = staticmethod(_mk_Tuple) def _sympystr(self, printer, *args, **kwargs): result = str(self.name) if self.parameters: result += '(%s)' % ', '.join(map(lambda arg: printer._print( arg, *args, **kwargs), self.parameters)) return result value_const = Attribute('value_const') pointer_const = Attribute('pointer_const') class Variable(Node): """ Represents a variable Parameters ========== symbol : Symbol type : Type (optional) Type of the variable. attrs : iterable of Attribute instances Will be stored as a Tuple. Examples ======== >>> from sympy import Symbol >>> from sympy.codegen.ast import Variable, float32, integer >>> x = Symbol('x') >>> v = Variable(x, type=float32) >>> v.attrs () >>> v == Variable('x') False >>> v == Variable('x', type=float32) True >>> v Variable(x, type=float32) One may also construct a ``Variable`` instance with the type deduced from assumptions about the symbol using the ``deduced`` classmethod: >>> i = Symbol('i', integer=True) >>> v = Variable.deduced(i) >>> v.type == integer True >>> v == Variable('i') False >>> from sympy.codegen.ast import value_const >>> value_const in v.attrs False >>> w = Variable('w', attrs=[value_const]) >>> w Variable(w, attrs=(value_const,)) >>> value_const in w.attrs True >>> w.as_Declaration(value=42) Declaration(Variable(w, value=42, attrs=(value_const,))) """ __slots__ = ['symbol', 'type', 'value'] + Node.__slots__ defaults = dict(chain(Node.defaults.items(), { 'type': untyped, 'value': none }.items())) _construct_symbol = staticmethod(sympify) _construct_value = staticmethod(sympify) @classmethod def deduced(cls, symbol, value=None, attrs=Tuple(), cast_check=True): """ Alt. constructor with type deduction from ``Type.from_expr``. Deduces type primarily from ``symbol``, secondarily from ``value``. Parameters ========== symbol : Symbol value : expr (optional) value of the variable. attrs : iterable of Attribute instances cast_check : bool Whether to apply ``Type.cast_check`` on ``value``. Examples ======== >>> from sympy import Symbol >>> from sympy.codegen.ast import Variable, complex_ >>> n = Symbol('n', integer=True) >>> str(Variable.deduced(n).type) 'integer' >>> x = Symbol('x', real=True) >>> v = Variable.deduced(x) >>> v.type real >>> z = Symbol('z', complex=True) >>> Variable.deduced(z).type == complex_ True """ if isinstance(symbol, Variable): return symbol try: type_ = Type.from_expr(symbol) except ValueError: type_ = Type.from_expr(value) if value is not None and cast_check: value = type_.cast_check(value) return cls(symbol, type=type_, value=value, attrs=attrs) def as_Declaration(self, **kwargs): """ Convenience method for creating a Declaration instance. If the variable of the Declaration need to wrap a modified variable keyword arguments may be passed (overriding e.g. the ``value`` of the Variable instance). Examples ======== >>> from sympy.codegen.ast import Variable >>> x = Variable('x') >>> decl1 = x.as_Declaration() >>> decl1.variable.value == None True >>> decl2 = x.as_Declaration(value=42.0) >>> decl2.variable.value == 42 True """ kw = self.kwargs() kw.update(kwargs) return Declaration(self.func(**kw)) def _relation(self, rhs, op): try: rhs = _sympify(rhs) except SympifyError: raise TypeError("Invalid comparison %s < %s" % (self, rhs)) return op(self, rhs, evaluate=False) __lt__ = lambda self, other: self._relation(other, Lt) __le__ = lambda self, other: self._relation(other, Le) __ge__ = lambda self, other: self._relation(other, Ge) __gt__ = lambda self, other: self._relation(other, Gt) class Pointer(Variable): """ Represents a pointer. See ``Variable``. Examples ======== Can create instances of ``Element``: >>> from sympy import Symbol >>> from sympy.codegen.ast import Pointer >>> i = Symbol('i', integer=True) >>> p = Pointer('x') >>> p[i+1] Element(x, indices=((i + 1,),)) """ def __getitem__(self, key): try: return Element(self.symbol, key) except TypeError: return Element(self.symbol, (key,)) class Element(Token): """ Element in (a possibly N-dimensional) array. Examples ======== >>> from sympy.codegen.ast import Element >>> elem = Element('x', 'ijk') >>> elem.symbol.name == 'x' True >>> elem.indices (i, j, k) >>> from sympy import ccode >>> ccode(elem) 'x[i][j][k]' >>> ccode(Element('x', 'ijk', strides='lmn', offset='o')) 'x[i*l + j*m + k*n + o]' """ __slots__ = ['symbol', 'indices', 'strides', 'offset'] defaults = {'strides': none, 'offset': none} _construct_symbol = staticmethod(sympify) _construct_indices = staticmethod(lambda arg: Tuple(*arg)) _construct_strides = staticmethod(lambda arg: Tuple(*arg)) _construct_offset = staticmethod(sympify) class Declaration(Token): """ Represents a variable declaration Parameters ========== variable : Variable Examples ======== >>> from sympy import Symbol >>> from sympy.codegen.ast import Declaration, Type, Variable, integer, untyped >>> z = Declaration('z') >>> z.variable.type == untyped True >>> z.variable.value == None True """ __slots__ = ['variable'] _construct_variable = Variable class While(Token): """ Represents a 'for-loop' in the code. Expressions are of the form: "while condition: body..." Parameters ========== condition : expression convertible to Boolean body : CodeBlock or iterable When passed an iterable it is used to instantiate a CodeBlock. Examples ======== >>> from sympy import symbols, Gt, Abs >>> from sympy.codegen import aug_assign, Assignment, While >>> x, dx = symbols('x dx') >>> expr = 1 - x**2 >>> whl = While(Gt(Abs(dx), 1e-9), [ ... Assignment(dx, -expr/expr.diff(x)), ... aug_assign(x, '+', dx) ... ]) """ __slots__ = ['condition', 'body'] _construct_condition = staticmethod(lambda cond: _sympify(cond)) @classmethod def _construct_body(cls, itr): if isinstance(itr, CodeBlock): return itr else: return CodeBlock(*itr) class Scope(Token): """ Represents a scope in the code. Parameters ========== body : CodeBlock or iterable When passed an iterable it is used to instantiate a CodeBlock. """ __slots__ = ['body'] @classmethod def _construct_body(cls, itr): if isinstance(itr, CodeBlock): return itr else: return CodeBlock(*itr) class Stream(Token): """ Represents a stream. There are two predefined Stream instances ``stdout`` & ``stderr``. Parameters ========== name : str Examples ======== >>> from sympy import Symbol >>> from sympy.printing.pycode import pycode >>> from sympy.codegen.ast import Print, stderr, QuotedString >>> print(pycode(Print(['x'], file=stderr))) print(x, file=sys.stderr) >>> x = Symbol('x') >>> print(pycode(Print([QuotedString('x')], file=stderr))) # print literally "x" print("x", file=sys.stderr) """ __slots__ = ['name'] _construct_name = String stdout = Stream('stdout') stderr = Stream('stderr') class Print(Token): """ Represents print command in the code. Parameters ========== formatstring : str *args : Basic instances (or convertible to such through sympify) Examples ======== >>> from sympy.codegen.ast import Print >>> from sympy.printing.pycode import pycode >>> print(pycode(Print('x y'.split(), "coordinate: %12.5g %12.5g"))) print("coordinate: %12.5g %12.5g" % (x, y)) """ __slots__ = ['print_args', 'format_string', 'file'] defaults = {'format_string': none, 'file': none} _construct_print_args = staticmethod(_mk_Tuple) _construct_format_string = QuotedString _construct_file = Stream class FunctionPrototype(Node): """ Represents a function prototype Allows the user to generate forward declaration in e.g. C/C++. Parameters ========== return_type : Type name : str parameters: iterable of Variable instances attrs : iterable of Attribute instances Examples ======== >>> from sympy import symbols >>> from sympy.codegen.ast import real, FunctionPrototype >>> from sympy.printing.ccode import ccode >>> x, y = symbols('x y', real=True) >>> fp = FunctionPrototype(real, 'foo', [x, y]) >>> ccode(fp) 'double foo(double x, double y)' """ __slots__ = ['return_type', 'name', 'parameters', 'attrs'] _construct_return_type = Type _construct_name = String @staticmethod def _construct_parameters(args): def _var(arg): if isinstance(arg, Declaration): return arg.variable elif isinstance(arg, Variable): return arg else: return Variable.deduced(arg) return Tuple(*map(_var, args)) @classmethod def from_FunctionDefinition(cls, func_def): if not isinstance(func_def, FunctionDefinition): raise TypeError("func_def is not an instance of FunctionDefiniton") return cls(**func_def.kwargs(exclude=('body',))) class FunctionDefinition(FunctionPrototype): """ Represents a function definition in the code. Parameters ========== return_type : Type name : str parameters: iterable of Variable instances body : CodeBlock or iterable attrs : iterable of Attribute instances Examples ======== >>> from sympy import symbols >>> from sympy.codegen.ast import real, FunctionPrototype >>> from sympy.printing.ccode import ccode >>> x, y = symbols('x y', real=True) >>> fp = FunctionPrototype(real, 'foo', [x, y]) >>> ccode(fp) 'double foo(double x, double y)' >>> from sympy.codegen.ast import FunctionDefinition, Return >>> body = [Return(x*y)] >>> fd = FunctionDefinition.from_FunctionPrototype(fp, body) >>> print(ccode(fd)) double foo(double x, double y){ return x*y; } """ __slots__ = FunctionPrototype.__slots__[:-1] + ['body', 'attrs'] @classmethod def _construct_body(cls, itr): if isinstance(itr, CodeBlock): return itr else: return CodeBlock(*itr) @classmethod def from_FunctionPrototype(cls, func_proto, body): if not isinstance(func_proto, FunctionPrototype): raise TypeError("func_proto is not an instance of FunctionPrototype") return cls(body=body, **func_proto.kwargs()) class Return(Basic): """ Represents a return command in the code. """ class FunctionCall(Token, Expr): """ Represents a call to a function in the code. Parameters ========== name : str function_args : Tuple Examples ======== >>> from sympy.codegen.ast import FunctionCall >>> from sympy.printing.pycode import pycode >>> fcall = FunctionCall('foo', 'bar baz'.split()) >>> print(pycode(fcall)) foo(bar, baz) """ __slots__ = ['name', 'function_args'] _construct_name = String _construct_function_args = staticmethod(lambda args: Tuple(*args))

440a0b0a05afada7e935996cfefa821cc3c7097dbeca048a97952499ac06097c

# -*- coding: utf-8 -*- """ This file contains some classical ciphers and routines implementing a linear-feedback shift register (LFSR) and the Diffie-Hellman key exchange. .. warning:: This module is intended for educational purposes only. Do not use the functions in this module for real cryptographic applications. If you wish to encrypt real data, we recommend using something like the `cryptography <https://cryptography.io/en/latest/>`_ module. """ from __future__ import print_function from string import whitespace, ascii_uppercase as uppercase, printable from sympy import nextprime from sympy.core import Rational, Symbol from sympy.core.numbers import igcdex, mod_inverse from sympy.core.compatibility import range from sympy.matrices import Matrix from sympy.ntheory import isprime, primitive_root from sympy.polys.domains import FF from sympy.polys.polytools import gcd, Poly from sympy.utilities.misc import filldedent, translate from sympy.utilities.iterables import uniq from sympy.utilities.randtest import _randrange, _randint from sympy.utilities.exceptions import SymPyDeprecationWarning def AZ(s=None): """Return the letters of ``s`` in uppercase. In case more than one string is passed, each of them will be processed and a list of upper case strings will be returned. Examples ======== >>> from sympy.crypto.crypto import AZ >>> AZ('Hello, world!') 'HELLOWORLD' >>> AZ('Hello, world!'.split()) ['HELLO', 'WORLD'] See Also ======== check_and_join """ if not s: return uppercase t = type(s) is str if t: s = [s] rv = [check_and_join(i.upper().split(), uppercase, filter=True) for i in s] if t: return rv[0] return rv bifid5 = AZ().replace('J', '') bifid6 = AZ() + '0123456789' bifid10 = printable def padded_key(key, symbols, filter=True): """Return a string of the distinct characters of ``symbols`` with those of ``key`` appearing first, omitting characters in ``key`` that are not in ``symbols``. A ValueError is raised if a) there are duplicate characters in ``symbols`` or b) there are characters in ``key`` that are not in ``symbols``. Examples ======== >>> from sympy.crypto.crypto import padded_key >>> padded_key('PUPPY', 'OPQRSTUVWXY') 'PUYOQRSTVWX' >>> padded_key('RSA', 'ARTIST') Traceback (most recent call last): ... ValueError: duplicate characters in symbols: T """ syms = list(uniq(symbols)) if len(syms) != len(symbols): extra = ''.join(sorted(set( [i for i in symbols if symbols.count(i) > 1]))) raise ValueError('duplicate characters in symbols: %s' % extra) extra = set(key) - set(syms) if extra: raise ValueError( 'characters in key but not symbols: %s' % ''.join( sorted(extra))) key0 = ''.join(list(uniq(key))) return key0 + ''.join([i for i in syms if i not in key0]) def check_and_join(phrase, symbols=None, filter=None): """ Joins characters of `phrase` and if ``symbols`` is given, raises an error if any character in ``phrase`` is not in ``symbols``. Parameters ========== phrase : string or list of strings to be returned as a string symbols : iterable of characters allowed in ``phrase``; if ``symbols`` is None, no checking is performed Examples ======== >>> from sympy.crypto.crypto import check_and_join >>> check_and_join('a phrase') 'a phrase' >>> check_and_join('a phrase'.upper().split()) 'APHRASE' >>> check_and_join('a phrase!'.upper().split(), 'ARE', filter=True) 'ARAE' >>> check_and_join('a phrase!'.upper().split(), 'ARE') Traceback (most recent call last): ... ValueError: characters in phrase but not symbols: "!HPS" """ rv = ''.join(''.join(phrase)) if symbols is not None: symbols = check_and_join(symbols) missing = ''.join(list(sorted(set(rv) - set(symbols)))) if missing: if not filter: raise ValueError( 'characters in phrase but not symbols: "%s"' % missing) rv = translate(rv, None, missing) return rv def _prep(msg, key, alp, default=None): if not alp: if not default: alp = AZ() msg = AZ(msg) key = AZ(key) else: alp = default else: alp = ''.join(alp) key = check_and_join(key, alp, filter=True) msg = check_and_join(msg, alp, filter=True) return msg, key, alp def cycle_list(k, n): """ Returns the elements of the list ``range(n)`` shifted to the left by ``k`` (so the list starts with ``k`` (mod ``n``)). Examples ======== >>> from sympy.crypto.crypto import cycle_list >>> cycle_list(3, 10) [3, 4, 5, 6, 7, 8, 9, 0, 1, 2] """ k = k % n return list(range(k, n)) + list(range(k)) ######## shift cipher examples ############ def encipher_shift(msg, key, symbols=None): """ Performs shift cipher encryption on plaintext msg, and returns the ciphertext. Parameters ========== key : an integer (the secret key) msg : plaintext of upper-case letters Returns ======= ct : ciphertext of upper-case letters ALGORITHM: STEPS: 0. Number the letters of the alphabet from 0, ..., N 1. Compute from the string ``msg`` a list ``L1`` of corresponding integers. 2. Compute from the list ``L1`` a new list ``L2``, given by adding ``(k mod 26)`` to each element in ``L1``. 3. Compute from the list ``L2`` a string ``ct`` of corresponding letters. Examples ======== >>> from sympy.crypto.crypto import encipher_shift, decipher_shift >>> msg = "GONAVYBEATARMY" >>> ct = encipher_shift(msg, 1); ct 'HPOBWZCFBUBSNZ' To decipher the shifted text, change the sign of the key: >>> encipher_shift(ct, -1) 'GONAVYBEATARMY' There is also a convenience function that does this with the original key: >>> decipher_shift(ct, 1) 'GONAVYBEATARMY' Notes ===== The shift cipher is also called the Caesar cipher, after Julius Caesar, who, according to Suetonius, used it with a shift of three to protect messages of military significance. Caesar's nephew Augustus reportedly used a similar cipher, but with a right shift of 1. References ========== .. [1] https://en.wikipedia.org/wiki/Caesar_cipher .. [2] http://mathworld.wolfram.com/CaesarsMethod.html See Also ======== decipher_shift """ msg, _, A = _prep(msg, '', symbols) shift = len(A) - key % len(A) key = A[shift:] + A[:shift] return translate(msg, key, A) def decipher_shift(msg, key, symbols=None): """ Return the text by shifting the characters of ``msg`` to the left by the amount given by ``key``. Examples ======== >>> from sympy.crypto.crypto import encipher_shift, decipher_shift >>> msg = "GONAVYBEATARMY" >>> ct = encipher_shift(msg, 1); ct 'HPOBWZCFBUBSNZ' To decipher the shifted text, change the sign of the key: >>> encipher_shift(ct, -1) 'GONAVYBEATARMY' Or use this function with the original key: >>> decipher_shift(ct, 1) 'GONAVYBEATARMY' """ return encipher_shift(msg, -key, symbols) def encipher_rot13(msg, symbols=None): """ Performs the ROT13 encryption on a given plaintext ``msg``. Notes ===== ROT13 is a substitution cipher which substitutes each letter in the plaintext message for the letter furthest away from it in the English alphabet. Equivalently, it is just a Caeser (shift) cipher with a shift key of 13 (midway point of the alphabet). References ========== .. [1] https://en.wikipedia.org/wiki/ROT13 See Also ======== decipher_rot13 encipher_shift """ return encipher_shift(msg, 13, symbols) def decipher_rot13(msg, symbols=None): """ Performs the ROT13 decryption on a given plaintext ``msg``. Notes ===== ``decipher_rot13`` is equivalent to ``encipher_rot13`` as both ``decipher_shift`` with a key of 13 and ``encipher_shift`` key with a key of 13 will return the same results. Nonetheless, ``decipher_rot13`` has nonetheless been explicitly defined here for consistency. Examples ======== >>> from sympy.crypto.crypto import encipher_rot13, decipher_rot13 >>> msg = 'GONAVYBEATARMY' >>> ciphertext = encipher_rot13(msg);ciphertext 'TBANILORNGNEZL' >>> decipher_rot13(ciphertext) 'GONAVYBEATARMY' >>> encipher_rot13(msg) == decipher_rot13(msg) True >>> msg == decipher_rot13(ciphertext) True """ return decipher_shift(msg, 13, symbols) ######## affine cipher examples ############ def encipher_affine(msg, key, symbols=None, _inverse=False): r""" Performs the affine cipher encryption on plaintext ``msg``, and returns the ciphertext. Encryption is based on the map `x \rightarrow ax+b` (mod `N`) where ``N`` is the number of characters in the alphabet. Decryption is based on the map `x \rightarrow cx+d` (mod `N`), where `c = a^{-1}` (mod `N`) and `d = -a^{-1}b` (mod `N`). In particular, for the map to be invertible, we need `\mathrm{gcd}(a, N) = 1` and an error will be raised if this is not true. Parameters ========== msg : string of characters that appear in ``symbols`` a, b : a pair integers, with ``gcd(a, N) = 1`` (the secret key) symbols : string of characters (default = uppercase letters). When no symbols are given, ``msg`` is converted to upper case letters and all other characters are ignored. Returns ======= ct : string of characters (the ciphertext message) ALGORITHM: STEPS: 0. Number the letters of the alphabet from 0, ..., N 1. Compute from the string ``msg`` a list ``L1`` of corresponding integers. 2. Compute from the list ``L1`` a new list ``L2``, given by replacing ``x`` by ``a*x + b (mod N)``, for each element ``x`` in ``L1``. 3. Compute from the list ``L2`` a string ``ct`` of corresponding letters. Notes ===== This is a straightforward generalization of the shift cipher with the added complexity of requiring 2 characters to be deciphered in order to recover the key. References ========== .. [1] https://en.wikipedia.org/wiki/Affine_cipher See Also ======== decipher_affine """ msg, _, A = _prep(msg, '', symbols) N = len(A) a, b = key assert gcd(a, N) == 1 if _inverse: c = mod_inverse(a, N) d = -b*c a, b = c, d B = ''.join([A[(a*i + b) % N] for i in range(N)]) return translate(msg, A, B) def decipher_affine(msg, key, symbols=None): r""" Return the deciphered text that was made from the mapping, `x \rightarrow ax+b` (mod `N`), where ``N`` is the number of characters in the alphabet. Deciphering is done by reciphering with a new key: `x \rightarrow cx+d` (mod `N`), where `c = a^{-1}` (mod `N`) and `d = -a^{-1}b` (mod `N`). Examples ======== >>> from sympy.crypto.crypto import encipher_affine, decipher_affine >>> msg = "GO NAVY BEAT ARMY" >>> key = (3, 1) >>> encipher_affine(msg, key) 'TROBMVENBGBALV' >>> decipher_affine(_, key) 'GONAVYBEATARMY' See Also ======== encipher_affine """ return encipher_affine(msg, key, symbols, _inverse=True) def encipher_atbash(msg, symbols=None): r""" Enciphers a given ``msg`` into its Atbash ciphertext and returns it. Notes ===== Atbash is a substitution cipher originally used to encrypt the Hebrew alphabet. Atbash works on the principle of mapping each alphabet to its reverse / counterpart (i.e. a would map to z, b to y etc.) Atbash is functionally equivalent to the affine cipher with ``a = 25`` and ``b = 25`` See Also ======== decipher_atbash """ return encipher_affine(msg, (25,25), symbols) def decipher_atbash(msg, symbols=None): r""" Deciphers a given ``msg`` using Atbash cipher and returns it. Notes ===== ``decipher_atbash`` is functionally equivalent to ``encipher_atbash``. However, it has still been added as a separate function to maintain consistency. Examples ======== >>> from sympy.crypto.crypto import encipher_atbash, decipher_atbash >>> msg = 'GONAVYBEATARMY' >>> encipher_atbash(msg) 'TLMZEBYVZGZINB' >>> decipher_atbash(msg) 'TLMZEBYVZGZINB' >>> encipher_atbash(msg) == decipher_atbash(msg) True >>> msg == encipher_atbash(encipher_atbash(msg)) True References ========== .. [1] https://en.wikipedia.org/wiki/Atbash See Also ======== encipher_atbash """ return decipher_affine(msg, (25,25), symbols) #################### substitution cipher ########################### def encipher_substitution(msg, old, new=None): r""" Returns the ciphertext obtained by replacing each character that appears in ``old`` with the corresponding character in ``new``. If ``old`` is a mapping, then new is ignored and the replacements defined by ``old`` are used. Notes ===== This is a more general than the affine cipher in that the key can only be recovered by determining the mapping for each symbol. Though in practice, once a few symbols are recognized the mappings for other characters can be quickly guessed. Examples ======== >>> from sympy.crypto.crypto import encipher_substitution, AZ >>> old = 'OEYAG' >>> new = '034^6' >>> msg = AZ("go navy! beat army!") >>> ct = encipher_substitution(msg, old, new); ct '60N^V4B3^T^RM4' To decrypt a substitution, reverse the last two arguments: >>> encipher_substitution(ct, new, old) 'GONAVYBEATARMY' In the special case where ``old`` and ``new`` are a permutation of order 2 (representing a transposition of characters) their order is immaterial: >>> old = 'NAVY' >>> new = 'ANYV' >>> encipher = lambda x: encipher_substitution(x, old, new) >>> encipher('NAVY') 'ANYV' >>> encipher(_) 'NAVY' The substitution cipher, in general, is a method whereby "units" (not necessarily single characters) of plaintext are replaced with ciphertext according to a regular system. >>> ords = dict(zip('abc', ['\\%i' % ord(i) for i in 'abc'])) >>> print(encipher_substitution('abc', ords)) \97\98\99 References ========== .. [1] https://en.wikipedia.org/wiki/Substitution_cipher """ return translate(msg, old, new) ###################################################################### #################### Vigenère cipher examples ######################## ###################################################################### def encipher_vigenere(msg, key, symbols=None): """ Performs the Vigenère cipher encryption on plaintext ``msg``, and returns the ciphertext. Examples ======== >>> from sympy.crypto.crypto import encipher_vigenere, AZ >>> key = "encrypt" >>> msg = "meet me on monday" >>> encipher_vigenere(msg, key) 'QRGKKTHRZQEBPR' Section 1 of the Kryptos sculpture at the CIA headquarters uses this cipher and also changes the order of the the alphabet [2]_. Here is the first line of that section of the sculpture: >>> from sympy.crypto.crypto import decipher_vigenere, padded_key >>> alp = padded_key('KRYPTOS', AZ()) >>> key = 'PALIMPSEST' >>> msg = 'EMUFPHZLRFAXYUSDJKZLDKRNSHGNFIVJ' >>> decipher_vigenere(msg, key, alp) 'BETWEENSUBTLESHADINGANDTHEABSENC' Notes ===== The Vigenère cipher is named after Blaise de Vigenère, a sixteenth century diplomat and cryptographer, by a historical accident. Vigenère actually invented a different and more complicated cipher. The so-called *Vigenère cipher* was actually invented by Giovan Batista Belaso in 1553. This cipher was used in the 1800's, for example, during the American Civil War. The Confederacy used a brass cipher disk to implement the Vigenère cipher (now on display in the NSA Museum in Fort Meade) [1]_. The Vigenère cipher is a generalization of the shift cipher. Whereas the shift cipher shifts each letter by the same amount (that amount being the key of the shift cipher) the Vigenère cipher shifts a letter by an amount determined by the key (which is a word or phrase known only to the sender and receiver). For example, if the key was a single letter, such as "C", then the so-called Vigenere cipher is actually a shift cipher with a shift of `2` (since "C" is the 2nd letter of the alphabet, if you start counting at `0`). If the key was a word with two letters, such as "CA", then the so-called Vigenère cipher will shift letters in even positions by `2` and letters in odd positions are left alone (shifted by `0`, since "A" is the 0th letter, if you start counting at `0`). ALGORITHM: INPUT: ``msg``: string of characters that appear in ``symbols`` (the plaintext) ``key``: a string of characters that appear in ``symbols`` (the secret key) ``symbols``: a string of letters defining the alphabet OUTPUT: ``ct``: string of characters (the ciphertext message) STEPS: 0. Number the letters of the alphabet from 0, ..., N 1. Compute from the string ``key`` a list ``L1`` of corresponding integers. Let ``n1 = len(L1)``. 2. Compute from the string ``msg`` a list ``L2`` of corresponding integers. Let ``n2 = len(L2)``. 3. Break ``L2`` up sequentially into sublists of size ``n1``; the last sublist may be smaller than ``n1`` 4. For each of these sublists ``L`` of ``L2``, compute a new list ``C`` given by ``C[i] = L[i] + L1[i] (mod N)`` to the ``i``-th element in the sublist, for each ``i``. 5. Assemble these lists ``C`` by concatenation into a new list of length ``n2``. 6. Compute from the new list a string ``ct`` of corresponding letters. Once it is known that the key is, say, `n` characters long, frequency analysis can be applied to every `n`-th letter of the ciphertext to determine the plaintext. This method is called *Kasiski examination* (although it was first discovered by Babbage). If they key is as long as the message and is comprised of randomly selected characters -- a one-time pad -- the message is theoretically unbreakable. The cipher Vigenère actually discovered is an "auto-key" cipher described as follows. ALGORITHM: INPUT: ``key``: a string of letters (the secret key) ``msg``: string of letters (the plaintext message) OUTPUT: ``ct``: string of upper-case letters (the ciphertext message) STEPS: 0. Number the letters of the alphabet from 0, ..., N 1. Compute from the string ``msg`` a list ``L2`` of corresponding integers. Let ``n2 = len(L2)``. 2. Let ``n1`` be the length of the key. Append to the string ``key`` the first ``n2 - n1`` characters of the plaintext message. Compute from this string (also of length ``n2``) a list ``L1`` of integers corresponding to the letter numbers in the first step. 3. Compute a new list ``C`` given by ``C[i] = L1[i] + L2[i] (mod N)``. 4. Compute from the new list a string ``ct`` of letters corresponding to the new integers. To decipher the auto-key ciphertext, the key is used to decipher the first ``n1`` characters and then those characters become the key to decipher the next ``n1`` characters, etc...: >>> m = AZ('go navy, beat army! yes you can'); m 'GONAVYBEATARMYYESYOUCAN' >>> key = AZ('gold bug'); n1 = len(key); n2 = len(m) >>> auto_key = key + m[:n2 - n1]; auto_key 'GOLDBUGGONAVYBEATARMYYE' >>> ct = encipher_vigenere(m, auto_key); ct 'MCYDWSHKOGAMKZCELYFGAYR' >>> n1 = len(key) >>> pt = [] >>> while ct: ... part, ct = ct[:n1], ct[n1:] ... pt.append(decipher_vigenere(part, key)) ... key = pt[-1] ... >>> ''.join(pt) == m True References ========== .. [1] https://en.wikipedia.org/wiki/Vigenere_cipher .. [2] http://web.archive.org/web/20071116100808/ .. [3] http://filebox.vt.edu/users/batman/kryptos.html (short URL: https://goo.gl/ijr22d) """ msg, key, A = _prep(msg, key, symbols) map = {c: i for i, c in enumerate(A)} key = [map[c] for c in key] N = len(map) k = len(key) rv = [] for i, m in enumerate(msg): rv.append(A[(map[m] + key[i % k]) % N]) rv = ''.join(rv) return rv def decipher_vigenere(msg, key, symbols=None): """ Decode using the Vigenère cipher. Examples ======== >>> from sympy.crypto.crypto import decipher_vigenere >>> key = "encrypt" >>> ct = "QRGK kt HRZQE BPR" >>> decipher_vigenere(ct, key) 'MEETMEONMONDAY' """ msg, key, A = _prep(msg, key, symbols) map = {c: i for i, c in enumerate(A)} N = len(A) # normally, 26 K = [map[c] for c in key] n = len(K) C = [map[c] for c in msg] rv = ''.join([A[(-K[i % n] + c) % N] for i, c in enumerate(C)]) return rv #################### Hill cipher ######################## def encipher_hill(msg, key, symbols=None, pad="Q"): r""" Return the Hill cipher encryption of ``msg``. Notes ===== The Hill cipher [1]_, invented by Lester S. Hill in the 1920's [2]_, was the first polygraphic cipher in which it was practical (though barely) to operate on more than three symbols at once. The following discussion assumes an elementary knowledge of matrices. First, each letter is first encoded as a number starting with 0. Suppose your message `msg` consists of `n` capital letters, with no spaces. This may be regarded an `n`-tuple M of elements of `Z_{26}` (if the letters are those of the English alphabet). A key in the Hill cipher is a `k x k` matrix `K`, all of whose entries are in `Z_{26}`, such that the matrix `K` is invertible (i.e., the linear transformation `K: Z_{N}^k \rightarrow Z_{N}^k` is one-to-one). Parameters ========== msg : plaintext message of `n` upper-case letters key : a `k x k` invertible matrix `K`, all of whose entries are in `Z_{26}` (or whatever number of symbols are being used). pad : character (default "Q") to use to make length of text be a multiple of ``k`` Returns ======= ct : ciphertext of upper-case letters ALGORITHM: STEPS: 0. Number the letters of the alphabet from 0, ..., N 1. Compute from the string ``msg`` a list ``L`` of corresponding integers. Let ``n = len(L)``. 2. Break the list ``L`` up into ``t = ceiling(n/k)`` sublists ``L_1``, ..., ``L_t`` of size ``k`` (with the last list "padded" to ensure its size is ``k``). 3. Compute new list ``C_1``, ..., ``C_t`` given by ``C[i] = K*L_i`` (arithmetic is done mod N), for each ``i``. 4. Concatenate these into a list ``C = C_1 + ... + C_t``. 5. Compute from ``C`` a string ``ct`` of corresponding letters. This has length ``k*t``. References ========== .. [1] https://en.wikipedia.org/wiki/Hill_cipher .. [2] Lester S. Hill, Cryptography in an Algebraic Alphabet, The American Mathematical Monthly Vol.36, June-July 1929, pp.306-312. See Also ======== decipher_hill """ assert key.is_square assert len(pad) == 1 msg, pad, A = _prep(msg, pad, symbols) map = {c: i for i, c in enumerate(A)} P = [map[c] for c in msg] N = len(A) k = key.cols n = len(P) m, r = divmod(n, k) if r: P = P + [map[pad]]*(k - r) m += 1 rv = ''.join([A[c % N] for j in range(m) for c in list(key*Matrix(k, 1, [P[i] for i in range(k*j, k*(j + 1))]))]) return rv def decipher_hill(msg, key, symbols=None): """ Deciphering is the same as enciphering but using the inverse of the key matrix. Examples ======== >>> from sympy.crypto.crypto import encipher_hill, decipher_hill >>> from sympy import Matrix >>> key = Matrix([[1, 2], [3, 5]]) >>> encipher_hill("meet me on monday", key) 'UEQDUEODOCTCWQ' >>> decipher_hill(_, key) 'MEETMEONMONDAY' When the length of the plaintext (stripped of invalid characters) is not a multiple of the key dimension, extra characters will appear at the end of the enciphered and deciphered text. In order to decipher the text, those characters must be included in the text to be deciphered. In the following, the key has a dimension of 4 but the text is 2 short of being a multiple of 4 so two characters will be added. >>> key = Matrix([[1, 1, 1, 2], [0, 1, 1, 0], ... [2, 2, 3, 4], [1, 1, 0, 1]]) >>> msg = "ST" >>> encipher_hill(msg, key) 'HJEB' >>> decipher_hill(_, key) 'STQQ' >>> encipher_hill(msg, key, pad="Z") 'ISPK' >>> decipher_hill(_, key) 'STZZ' If the last two characters of the ciphertext were ignored in either case, the wrong plaintext would be recovered: >>> decipher_hill("HD", key) 'ORMV' >>> decipher_hill("IS", key) 'UIKY' See Also ======== encipher_hill """ assert key.is_square msg, _, A = _prep(msg, '', symbols) map = {c: i for i, c in enumerate(A)} C = [map[c] for c in msg] N = len(A) k = key.cols n = len(C) m, r = divmod(n, k) if r: C = C + [0]*(k - r) m += 1 key_inv = key.inv_mod(N) rv = ''.join([A[p % N] for j in range(m) for p in list(key_inv*Matrix( k, 1, [C[i] for i in range(k*j, k*(j + 1))]))]) return rv #################### Bifid cipher ######################## def encipher_bifid(msg, key, symbols=None): r""" Performs the Bifid cipher encryption on plaintext ``msg``, and returns the ciphertext. This is the version of the Bifid cipher that uses an `n \times n` Polybius square. Parameters ========== msg : plaintext string key : short string for key; duplicate characters are ignored and then it is padded with the characters in ``symbols`` that were not in the short key symbols : `n \times n` characters defining the alphabet (default is string.printable) Returns ======= ciphertext (using Bifid5 cipher without spaces) See Also ======== decipher_bifid, encipher_bifid5, encipher_bifid6 References ========== .. [1] https://en.wikipedia.org/wiki/Bifid_cipher """ msg, key, A = _prep(msg, key, symbols, bifid10) long_key = ''.join(uniq(key)) or A n = len(A)**.5 if n != int(n): raise ValueError( 'Length of alphabet (%s) is not a square number.' % len(A)) N = int(n) if len(long_key) < N**2: long_key = list(long_key) + [x for x in A if x not in long_key] # the fractionalization row_col = {ch: divmod(i, N) for i, ch in enumerate(long_key)} r, c = zip(*[row_col[x] for x in msg]) rc = r + c ch = {i: ch for ch, i in row_col.items()} rv = ''.join((ch[i] for i in zip(rc[::2], rc[1::2]))) return rv def decipher_bifid(msg, key, symbols=None): r""" Performs the Bifid cipher decryption on ciphertext ``msg``, and returns the plaintext. This is the version of the Bifid cipher that uses the `n \times n` Polybius square. Parameters ========== msg : ciphertext string key : short string for key; duplicate characters are ignored and then it is padded with the characters in symbols that were not in the short key symbols : `n \times n` characters defining the alphabet (default=string.printable, a `10 \times 10` matrix) Returns ======= deciphered text Examples ======== >>> from sympy.crypto.crypto import ( ... encipher_bifid, decipher_bifid, AZ) Do an encryption using the bifid5 alphabet: >>> alp = AZ().replace('J', '') >>> ct = AZ("meet me on monday!") >>> key = AZ("gold bug") >>> encipher_bifid(ct, key, alp) 'IEILHHFSTSFQYE' When entering the text or ciphertext, spaces are ignored so it can be formatted as desired. Re-entering the ciphertext from the preceding, putting 4 characters per line and padding with an extra J, does not cause problems for the deciphering: >>> decipher_bifid(''' ... IEILH ... HFSTS ... FQYEJ''', key, alp) 'MEETMEONMONDAY' When no alphabet is given, all 100 printable characters will be used: >>> key = '' >>> encipher_bifid('hello world!', key) 'bmtwmg-bIo*w' >>> decipher_bifid(_, key) 'hello world!' If the key is changed, a different encryption is obtained: >>> key = 'gold bug' >>> encipher_bifid('hello world!', 'gold_bug') 'hg2sfuei7t}w' And if the key used to decrypt the message is not exact, the original text will not be perfectly obtained: >>> decipher_bifid(_, 'gold pug') 'heldo~wor6d!' """ msg, _, A = _prep(msg, '', symbols, bifid10) long_key = ''.join(uniq(key)) or A n = len(A)**.5 if n != int(n): raise ValueError( 'Length of alphabet (%s) is not a square number.' % len(A)) N = int(n) if len(long_key) < N**2: long_key = list(long_key) + [x for x in A if x not in long_key] # the reverse fractionalization row_col = dict( [(ch, divmod(i, N)) for i, ch in enumerate(long_key)]) rc = [i for c in msg for i in row_col[c]] n = len(msg) rc = zip(*(rc[:n], rc[n:])) ch = {i: ch for ch, i in row_col.items()} rv = ''.join((ch[i] for i in rc)) return rv def bifid_square(key): """Return characters of ``key`` arranged in a square. Examples ======== >>> from sympy.crypto.crypto import ( ... bifid_square, AZ, padded_key, bifid5) >>> bifid_square(AZ().replace('J', '')) Matrix([ [A, B, C, D, E], [F, G, H, I, K], [L, M, N, O, P], [Q, R, S, T, U], [V, W, X, Y, Z]]) >>> bifid_square(padded_key(AZ('gold bug!'), bifid5)) Matrix([ [G, O, L, D, B], [U, A, C, E, F], [H, I, K, M, N], [P, Q, R, S, T], [V, W, X, Y, Z]]) See Also ======== padded_key """ A = ''.join(uniq(''.join(key))) n = len(A)**.5 if n != int(n): raise ValueError( 'Length of alphabet (%s) is not a square number.' % len(A)) n = int(n) f = lambda i, j: Symbol(A[n*i + j]) rv = Matrix(n, n, f) return rv def encipher_bifid5(msg, key): r""" Performs the Bifid cipher encryption on plaintext ``msg``, and returns the ciphertext. This is the version of the Bifid cipher that uses the `5 \times 5` Polybius square. The letter "J" is ignored so it must be replaced with something else (traditionally an "I") before encryption. ALGORITHM: (5x5 case) STEPS: 0. Create the `5 \times 5` Polybius square ``S`` associated to ``key`` as follows: a) moving from left-to-right, top-to-bottom, place the letters of the key into a `5 \times 5` matrix, b) if the key has less than 25 letters, add the letters of the alphabet not in the key until the `5 \times 5` square is filled. 1. Create a list ``P`` of pairs of numbers which are the coordinates in the Polybius square of the letters in ``msg``. 2. Let ``L1`` be the list of all first coordinates of ``P`` (length of ``L1 = n``), let ``L2`` be the list of all second coordinates of ``P`` (so the length of ``L2`` is also ``n``). 3. Let ``L`` be the concatenation of ``L1`` and ``L2`` (length ``L = 2*n``), except that consecutive numbers are paired ``(L[2*i], L[2*i + 1])``. You can regard ``L`` as a list of pairs of length ``n``. 4. Let ``C`` be the list of all letters which are of the form ``S[i, j]``, for all ``(i, j)`` in ``L``. As a string, this is the ciphertext of ``msg``. Parameters ========== msg : plaintext string; converted to upper case and filtered of anything but all letters except J. key : short string for key; non-alphabetic letters, J and duplicated characters are ignored and then, if the length is less than 25 characters, it is padded with other letters of the alphabet (in alphabetical order). Returns ======= ct : ciphertext (all caps, no spaces) Examples ======== >>> from sympy.crypto.crypto import ( ... encipher_bifid5, decipher_bifid5) "J" will be omitted unless it is replaced with something else: >>> round_trip = lambda m, k: \ ... decipher_bifid5(encipher_bifid5(m, k), k) >>> key = 'a' >>> msg = "JOSIE" >>> round_trip(msg, key) 'OSIE' >>> round_trip(msg.replace("J", "I"), key) 'IOSIE' >>> j = "QIQ" >>> round_trip(msg.replace("J", j), key).replace(j, "J") 'JOSIE' Notes ===== The Bifid cipher was invented around 1901 by Felix Delastelle. It is a *fractional substitution* cipher, where letters are replaced by pairs of symbols from a smaller alphabet. The cipher uses a `5 \times 5` square filled with some ordering of the alphabet, except that "J" is replaced with "I" (this is a so-called Polybius square; there is a `6 \times 6` analog if you add back in "J" and also append onto the usual 26 letter alphabet, the digits 0, 1, ..., 9). According to Helen Gaines' book *Cryptanalysis*, this type of cipher was used in the field by the German Army during World War I. See Also ======== decipher_bifid5, encipher_bifid """ msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid5) key = padded_key(key, bifid5) return encipher_bifid(msg, '', key) def decipher_bifid5(msg, key): r""" Return the Bifid cipher decryption of ``msg``. This is the version of the Bifid cipher that uses the `5 \times 5` Polybius square; the letter "J" is ignored unless a ``key`` of length 25 is used. Parameters ========== msg : ciphertext string key : short string for key; duplicated characters are ignored and if the length is less then 25 characters, it will be padded with other letters from the alphabet omitting "J". Non-alphabetic characters are ignored. Returns ======= plaintext from Bifid5 cipher (all caps, no spaces) Examples ======== >>> from sympy.crypto.crypto import encipher_bifid5, decipher_bifid5 >>> key = "gold bug" >>> encipher_bifid5('meet me on friday', key) 'IEILEHFSTSFXEE' >>> encipher_bifid5('meet me on monday', key) 'IEILHHFSTSFQYE' >>> decipher_bifid5(_, key) 'MEETMEONMONDAY' """ msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid5) key = padded_key(key, bifid5) return decipher_bifid(msg, '', key) def bifid5_square(key=None): r""" 5x5 Polybius square. Produce the Polybius square for the `5 \times 5` Bifid cipher. Examples ======== >>> from sympy.crypto.crypto import bifid5_square >>> bifid5_square("gold bug") Matrix([ [G, O, L, D, B], [U, A, C, E, F], [H, I, K, M, N], [P, Q, R, S, T], [V, W, X, Y, Z]]) """ if not key: key = bifid5 else: _, key, _ = _prep('', key.upper(), None, bifid5) key = padded_key(key, bifid5) return bifid_square(key) def encipher_bifid6(msg, key): r""" Performs the Bifid cipher encryption on plaintext ``msg``, and returns the ciphertext. This is the version of the Bifid cipher that uses the `6 \times 6` Polybius square. Parameters ========== msg : plaintext string (digits okay) key : short string for key (digits okay). If ``key`` is less than 36 characters long, the square will be filled with letters A through Z and digits 0 through 9. Returns ======= ciphertext from Bifid cipher (all caps, no spaces) See Also ======== decipher_bifid6, encipher_bifid """ msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid6) key = padded_key(key, bifid6) return encipher_bifid(msg, '', key) def decipher_bifid6(msg, key): r""" Performs the Bifid cipher decryption on ciphertext ``msg``, and returns the plaintext. This is the version of the Bifid cipher that uses the `6 \times 6` Polybius square. Parameters ========== msg : ciphertext string (digits okay); converted to upper case key : short string for key (digits okay). If ``key`` is less than 36 characters long, the square will be filled with letters A through Z and digits 0 through 9. All letters are converted to uppercase. Returns ======= plaintext from Bifid cipher (all caps, no spaces) Examples ======== >>> from sympy.crypto.crypto import encipher_bifid6, decipher_bifid6 >>> key = "gold bug" >>> encipher_bifid6('meet me on monday at 8am', key) 'KFKLJJHF5MMMKTFRGPL' >>> decipher_bifid6(_, key) 'MEETMEONMONDAYAT8AM' """ msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid6) key = padded_key(key, bifid6) return decipher_bifid(msg, '', key) def bifid6_square(key=None): r""" 6x6 Polybius square. Produces the Polybius square for the `6 \times 6` Bifid cipher. Assumes alphabet of symbols is "A", ..., "Z", "0", ..., "9". Examples ======== >>> from sympy.crypto.crypto import bifid6_square >>> key = "gold bug" >>> bifid6_square(key) Matrix([ [G, O, L, D, B, U], [A, C, E, F, H, I], [J, K, M, N, P, Q], [R, S, T, V, W, X], [Y, Z, 0, 1, 2, 3], [4, 5, 6, 7, 8, 9]]) """ if not key: key = bifid6 else: _, key, _ = _prep('', key.upper(), None, bifid6) key = padded_key(key, bifid6) return bifid_square(key) #################### RSA ############################# def rsa_public_key(p, q, e): r""" Return the RSA *public key* pair, `(n, e)`, where `n` is a product of two primes and `e` is relatively prime (coprime) to the Euler totient `\phi(n)`. False is returned if any assumption is violated. Examples ======== >>> from sympy.crypto.crypto import rsa_public_key >>> p, q, e = 3, 5, 7 >>> rsa_public_key(p, q, e) (15, 7) >>> rsa_public_key(p, q, 30) False See Also ======== rsa_private_key encipher_rsa decipher_rsa References ========== .. [1] https://en.wikipedia.org/wiki/RSA_%28cryptosystem%29 """ n = p*q if isprime(p) and isprime(q): if p == q: SymPyDeprecationWarning( feature="Using non-distinct primes for rsa_public_key", useinstead="distinct primes", issue=16162, deprecated_since_version="1.4").warn() phi = p * (p - 1) else: phi = (p - 1) * (q - 1) if gcd(e, phi) == 1: return n, e return False def rsa_private_key(p, q, e): r""" Return the RSA *private key*, `(n,d)`, where `n` is a product of two primes and `d` is the inverse of `e` (mod `\phi(n)`). False is returned if any assumption is violated. Examples ======== >>> from sympy.crypto.crypto import rsa_private_key >>> p, q, e = 3, 5, 7 >>> rsa_private_key(p, q, e) (15, 7) >>> rsa_private_key(p, q, 30) False """ n = p*q if isprime(p) and isprime(q): if p == q: SymPyDeprecationWarning( feature="Using non-distinct primes for rsa_public_key", useinstead="distinct primes", issue=16162, deprecated_since_version="1.4").warn() phi = p * (p - 1) else: phi = (p - 1) * (q - 1) if gcd(e, phi) == 1: d = mod_inverse(e, phi) return n, d return False def encipher_rsa(i, key): """ Return encryption of ``i`` by computing `i^e` (mod `n`), where ``key`` is the public key `(n, e)`. Examples ======== >>> from sympy.crypto.crypto import encipher_rsa, rsa_public_key >>> p, q, e = 3, 5, 7 >>> puk = rsa_public_key(p, q, e) >>> msg = 12 >>> encipher_rsa(msg, puk) 3 """ n, e = key return pow(i, e, n) def decipher_rsa(i, key): """ Return decyption of ``i`` by computing `i^d` (mod `n`), where ``key`` is the private key `(n, d)`. Examples ======== >>> from sympy.crypto.crypto import decipher_rsa, rsa_private_key >>> p, q, e = 3, 5, 7 >>> prk = rsa_private_key(p, q, e) >>> msg = 3 >>> decipher_rsa(msg, prk) 12 """ n, d = key return pow(i, d, n) #################### kid krypto (kid RSA) ############################# def kid_rsa_public_key(a, b, A, B): r""" Kid RSA is a version of RSA useful to teach grade school children since it does not involve exponentiation. Alice wants to talk to Bob. Bob generates keys as follows. Key generation: * Select positive integers `a, b, A, B` at random. * Compute `M = a b - 1`, `e = A M + a`, `d = B M + b`, `n = (e d - 1)//M`. * The *public key* is `(n, e)`. Bob sends these to Alice. * The *private key* is `(n, d)`, which Bob keeps secret. Encryption: If `p` is the plaintext message then the ciphertext is `c = p e \pmod n`. Decryption: If `c` is the ciphertext message then the plaintext is `p = c d \pmod n`. Examples ======== >>> from sympy.crypto.crypto import kid_rsa_public_key >>> a, b, A, B = 3, 4, 5, 6 >>> kid_rsa_public_key(a, b, A, B) (369, 58) """ M = a*b - 1 e = A*M + a d = B*M + b n = (e*d - 1)//M return n, e def kid_rsa_private_key(a, b, A, B): """ Compute `M = a b - 1`, `e = A M + a`, `d = B M + b`, `n = (e d - 1) / M`. The *private key* is `d`, which Bob keeps secret. Examples ======== >>> from sympy.crypto.crypto import kid_rsa_private_key >>> a, b, A, B = 3, 4, 5, 6 >>> kid_rsa_private_key(a, b, A, B) (369, 70) """ M = a*b - 1 e = A*M + a d = B*M + b n = (e*d - 1)//M return n, d def encipher_kid_rsa(msg, key): """ Here ``msg`` is the plaintext and ``key`` is the public key. Examples ======== >>> from sympy.crypto.crypto import ( ... encipher_kid_rsa, kid_rsa_public_key) >>> msg = 200 >>> a, b, A, B = 3, 4, 5, 6 >>> key = kid_rsa_public_key(a, b, A, B) >>> encipher_kid_rsa(msg, key) 161 """ n, e = key return (msg*e) % n def decipher_kid_rsa(msg, key): """ Here ``msg`` is the plaintext and ``key`` is the private key. Examples ======== >>> from sympy.crypto.crypto import ( ... kid_rsa_public_key, kid_rsa_private_key, ... decipher_kid_rsa, encipher_kid_rsa) >>> a, b, A, B = 3, 4, 5, 6 >>> d = kid_rsa_private_key(a, b, A, B) >>> msg = 200 >>> pub = kid_rsa_public_key(a, b, A, B) >>> pri = kid_rsa_private_key(a, b, A, B) >>> ct = encipher_kid_rsa(msg, pub) >>> decipher_kid_rsa(ct, pri) 200 """ n, d = key return (msg*d) % n #################### Morse Code ###################################### morse_char = { ".-": "A", "-...": "B", "-.-.": "C", "-..": "D", ".": "E", "..-.": "F", "--.": "G", "....": "H", "..": "I", ".---": "J", "-.-": "K", ".-..": "L", "--": "M", "-.": "N", "---": "O", ".--.": "P", "--.-": "Q", ".-.": "R", "...": "S", "-": "T", "..-": "U", "...-": "V", ".--": "W", "-..-": "X", "-.--": "Y", "--..": "Z", "-----": "0", ".----": "1", "..---": "2", "...--": "3", "....-": "4", ".....": "5", "-....": "6", "--...": "7", "---..": "8", "----.": "9", ".-.-.-": ".", "--..--": ",", "---...": ":", "-.-.-.": ";", "..--..": "?", "-....-": "-", "..--.-": "_", "-.--.": "(", "-.--.-": ")", ".----.": "'", "-...-": "=", ".-.-.": "+", "-..-.": "/", ".--.-.": "@", "...-..-": "$", "-.-.--": "!"} char_morse = {v: k for k, v in morse_char.items()} def encode_morse(msg, sep='|', mapping=None): """ Encodes a plaintext into popular Morse Code with letters separated by `sep` and words by a double `sep`. Examples ======== >>> from sympy.crypto.crypto import encode_morse >>> msg = 'ATTACK RIGHT FLANK' >>> encode_morse(msg) '.-|-|-|.-|-.-.|-.-||.-.|..|--.|....|-||..-.|.-..|.-|-.|-.-' References ========== .. [1] https://en.wikipedia.org/wiki/Morse_code """ mapping = mapping or char_morse assert sep not in mapping word_sep = 2*sep mapping[" "] = word_sep suffix = msg and msg[-1] in whitespace # normalize whitespace msg = (' ' if word_sep else '').join(msg.split()) # omit unmapped chars chars = set(''.join(msg.split())) ok = set(mapping.keys()) msg = translate(msg, None, ''.join(chars - ok)) morsestring = [] words = msg.split() for word in words: morseword = [] for letter in word: morseletter = mapping[letter] morseword.append(morseletter) word = sep.join(morseword) morsestring.append(word) return word_sep.join(morsestring) + (word_sep if suffix else '') def decode_morse(msg, sep='|', mapping=None): """ Decodes a Morse Code with letters separated by `sep` (default is '|') and words by `word_sep` (default is '||) into plaintext. Examples ======== >>> from sympy.crypto.crypto import decode_morse >>> mc = '--|---|...-|.||.|.-|...|-' >>> decode_morse(mc) 'MOVE EAST' References ========== .. [1] https://en.wikipedia.org/wiki/Morse_code """ mapping = mapping or morse_char word_sep = 2*sep characterstring = [] words = msg.strip(word_sep).split(word_sep) for word in words: letters = word.split(sep) chars = [mapping[c] for c in letters] word = ''.join(chars) characterstring.append(word) rv = " ".join(characterstring) return rv #################### LFSRs ########################################## def lfsr_sequence(key, fill, n): r""" This function creates an LFSR sequence. Parameters ========== key : a list of finite field elements, `[c_0, c_1, \ldots, c_k].` fill : the list of the initial terms of the LFSR sequence, `[x_0, x_1, \ldots, x_k].` n : number of terms of the sequence that the function returns. Returns ======= The LFSR sequence defined by `x_{n+1} = c_k x_n + \ldots + c_0 x_{n-k}`, for `n \leq k`. Notes ===== S. Golomb [G]_ gives a list of three statistical properties a sequence of numbers `a = \{a_n\}_{n=1}^\infty`, `a_n \in \{0,1\}`, should display to be considered "random". Define the autocorrelation of `a` to be .. math:: C(k) = C(k,a) = \lim_{N\rightarrow \infty} {1\over N}\sum_{n=1}^N (-1)^{a_n + a_{n+k}}. In the case where `a` is periodic with period `P` then this reduces to .. math:: C(k) = {1\over P}\sum_{n=1}^P (-1)^{a_n + a_{n+k}}. Assume `a` is periodic with period `P`. - balance: .. math:: \left|\sum_{n=1}^P(-1)^{a_n}\right| \leq 1. - low autocorrelation: .. math:: C(k) = \left\{ \begin{array}{cc} 1,& k = 0,\\ \epsilon, & k \ne 0. \end{array} \right. (For sequences satisfying these first two properties, it is known that `\epsilon = -1/P` must hold.) - proportional runs property: In each period, half the runs have length `1`, one-fourth have length `2`, etc. Moreover, there are as many runs of `1`'s as there are of `0`'s. Examples ======== >>> from sympy.crypto.crypto import lfsr_sequence >>> from sympy.polys.domains import FF >>> F = FF(2) >>> fill = [F(1), F(1), F(0), F(1)] >>> key = [F(1), F(0), F(0), F(1)] >>> lfsr_sequence(key, fill, 10) [1 mod 2, 1 mod 2, 0 mod 2, 1 mod 2, 0 mod 2, 1 mod 2, 1 mod 2, 0 mod 2, 0 mod 2, 1 mod 2] References ========== .. [G] Solomon Golomb, Shift register sequences, Aegean Park Press, Laguna Hills, Ca, 1967 """ if not isinstance(key, list): raise TypeError("key must be a list") if not isinstance(fill, list): raise TypeError("fill must be a list") p = key[0].mod F = FF(p) s = fill k = len(fill) L = [] for i in range(n): s0 = s[:] L.append(s[0]) s = s[1:k] x = sum([int(key[i]*s0[i]) for i in range(k)]) s.append(F(x)) return L # use [x.to_int() for x in L] for int version def lfsr_autocorrelation(L, P, k): """ This function computes the LFSR autocorrelation function. Parameters ========== L : is a periodic sequence of elements of `GF(2)`. L must have length larger than P. P : the period of L k : an integer (`0 < k < P`) Returns ======= The k-th value of the autocorrelation of the LFSR L Examples ======== >>> from sympy.crypto.crypto import ( ... lfsr_sequence, lfsr_autocorrelation) >>> from sympy.polys.domains import FF >>> F = FF(2) >>> fill = [F(1), F(1), F(0), F(1)] >>> key = [F(1), F(0), F(0), F(1)] >>> s = lfsr_sequence(key, fill, 20) >>> lfsr_autocorrelation(s, 15, 7) -1/15 >>> lfsr_autocorrelation(s, 15, 0) 1 """ if not isinstance(L, list): raise TypeError("L (=%s) must be a list" % L) P = int(P) k = int(k) L0 = L[:P] # slices makes a copy L1 = L0 + L0[:k] L2 = [(-1)**(L1[i].to_int() + L1[i + k].to_int()) for i in range(P)] tot = sum(L2) return Rational(tot, P) def lfsr_connection_polynomial(s): """ This function computes the LFSR connection polynomial. Parameters ========== s : a sequence of elements of even length, with entries in a finite field Returns ======= C(x) : the connection polynomial of a minimal LFSR yielding s. This implements the algorithm in section 3 of J. L. Massey's article [M]_. Examples ======== >>> from sympy.crypto.crypto import ( ... lfsr_sequence, lfsr_connection_polynomial) >>> from sympy.polys.domains import FF >>> F = FF(2) >>> fill = [F(1), F(1), F(0), F(1)] >>> key = [F(1), F(0), F(0), F(1)] >>> s = lfsr_sequence(key, fill, 20) >>> lfsr_connection_polynomial(s) x**4 + x + 1 >>> fill = [F(1), F(0), F(0), F(1)] >>> key = [F(1), F(1), F(0), F(1)] >>> s = lfsr_sequence(key, fill, 20) >>> lfsr_connection_polynomial(s) x**3 + 1 >>> fill = [F(1), F(0), F(1)] >>> key = [F(1), F(1), F(0)] >>> s = lfsr_sequence(key, fill, 20) >>> lfsr_connection_polynomial(s) x**3 + x**2 + 1 >>> fill = [F(1), F(0), F(1)] >>> key = [F(1), F(0), F(1)] >>> s = lfsr_sequence(key, fill, 20) >>> lfsr_connection_polynomial(s) x**3 + x + 1 References ========== .. [M] James L. Massey, "Shift-Register Synthesis and BCH Decoding." IEEE Trans. on Information Theory, vol. 15(1), pp. 122-127, Jan 1969. """ # Initialization: p = s[0].mod x = Symbol("x") C = 1*x**0 B = 1*x**0 m = 1 b = 1*x**0 L = 0 N = 0 while N < len(s): if L > 0: dC = Poly(C).degree() r = min(L + 1, dC + 1) coeffsC = [C.subs(x, 0)] + [C.coeff(x**i) for i in range(1, dC + 1)] d = (s[N].to_int() + sum([coeffsC[i]*s[N - i].to_int() for i in range(1, r)])) % p if L == 0: d = s[N].to_int()*x**0 if d == 0: m += 1 N += 1 if d > 0: if 2*L > N: C = (C - d*((b**(p - 2)) % p)*x**m*B).expand() m += 1 N += 1 else: T = C C = (C - d*((b**(p - 2)) % p)*x**m*B).expand() L = N + 1 - L m = 1 b = d B = T N += 1 dC = Poly(C).degree() coeffsC = [C.subs(x, 0)] + [C.coeff(x**i) for i in range(1, dC + 1)] return sum([coeffsC[i] % p*x**i for i in range(dC + 1) if coeffsC[i] is not None]) #################### ElGamal ############################# def elgamal_private_key(digit=10, seed=None): r""" Return three number tuple as private key. Elgamal encryption is based on the mathmatical problem called the Discrete Logarithm Problem (DLP). For example, `a^{b} \equiv c \pmod p` In general, if ``a`` and ``b`` are known, ``ct`` is easily calculated. If ``b`` is unknown, it is hard to use ``a`` and ``ct`` to get ``b``. Parameters ========== digit : minimum number of binary digits for key Returns ======= (p, r, d) : p = prime number, r = primitive root, d = random number Notes ===== For testing purposes, the ``seed`` parameter may be set to control the output of this routine. See sympy.utilities.randtest._randrange. Examples ======== >>> from sympy.crypto.crypto import elgamal_private_key >>> from sympy.ntheory import is_primitive_root, isprime >>> a, b, _ = elgamal_private_key() >>> isprime(a) True >>> is_primitive_root(b, a) True """ randrange = _randrange(seed) p = nextprime(2**digit) return p, primitive_root(p), randrange(2, p) def elgamal_public_key(key): """ Return three number tuple as public key. Parameters ========== key : Tuple (p, r, e) generated by ``elgamal_private_key`` Returns ======= (p, r, e = r**d mod p) : d is a random number in private key. Examples ======== >>> from sympy.crypto.crypto import elgamal_public_key >>> elgamal_public_key((1031, 14, 636)) (1031, 14, 212) """ p, r, e = key return p, r, pow(r, e, p) def encipher_elgamal(i, key, seed=None): r""" Encrypt message with public key ``i`` is a plaintext message expressed as an integer. ``key`` is public key (p, r, e). In order to encrypt a message, a random number ``a`` in ``range(2, p)`` is generated and the encryped message is returned as `c_{1}` and `c_{2}` where: `c_{1} \equiv r^{a} \pmod p` `c_{2} \equiv m e^{a} \pmod p` Parameters ========== msg : int of encoded message key : public key Returns ======= (c1, c2) : Encipher into two number Notes ===== For testing purposes, the ``seed`` parameter may be set to control the output of this routine. See sympy.utilities.randtest._randrange. Examples ======== >>> from sympy.crypto.crypto import encipher_elgamal, elgamal_private_key, elgamal_public_key >>> pri = elgamal_private_key(5, seed=[3]); pri (37, 2, 3) >>> pub = elgamal_public_key(pri); pub (37, 2, 8) >>> msg = 36 >>> encipher_elgamal(msg, pub, seed=[3]) (8, 6) """ p, r, e = key if i < 0 or i >= p: raise ValueError( 'Message (%s) should be in range(%s)' % (i, p)) randrange = _randrange(seed) a = randrange(2, p) return pow(r, a, p), i*pow(e, a, p) % p def decipher_elgamal(msg, key): r""" Decrypt message with private key `msg = (c_{1}, c_{2})` `key = (p, r, d)` According to extended Eucliden theorem, `u c_{1}^{d} + p n = 1` `u \equiv 1/{{c_{1}}^d} \pmod p` `u c_{2} \equiv \frac{1}{c_{1}^d} c_{2} \equiv \frac{1}{r^{ad}} c_{2} \pmod p` `\frac{1}{r^{ad}} m e^a \equiv \frac{1}{r^{ad}} m {r^{d a}} \equiv m \pmod p` Examples ======== >>> from sympy.crypto.crypto import decipher_elgamal >>> from sympy.crypto.crypto import encipher_elgamal >>> from sympy.crypto.crypto import elgamal_private_key >>> from sympy.crypto.crypto import elgamal_public_key >>> pri = elgamal_private_key(5, seed=[3]) >>> pub = elgamal_public_key(pri); pub (37, 2, 8) >>> msg = 17 >>> decipher_elgamal(encipher_elgamal(msg, pub), pri) == msg True """ p, r, d = key c1, c2 = msg u = igcdex(c1**d, p)[0] return u * c2 % p ################ Diffie-Hellman Key Exchange ######################### def dh_private_key(digit=10, seed=None): r""" Return three integer tuple as private key. Diffie-Hellman key exchange is based on the mathematical problem called the Discrete Logarithm Problem (see ElGamal). Diffie-Hellman key exchange is divided into the following steps: * Alice and Bob agree on a base that consist of a prime ``p`` and a primitive root of ``p`` called ``g`` * Alice choses a number ``a`` and Bob choses a number ``b`` where ``a`` and ``b`` are random numbers in range `[2, p)`. These are their private keys. * Alice then publicly sends Bob `g^{a} \pmod p` while Bob sends Alice `g^{b} \pmod p` * They both raise the received value to their secretly chosen number (``a`` or ``b``) and now have both as their shared key `g^{ab} \pmod p` Parameters ========== digit: minimum number of binary digits required in key Returns ======= (p, g, a) : p = prime number, g = primitive root of p, a = random number from 2 through p - 1 Notes ===== For testing purposes, the ``seed`` parameter may be set to control the output of this routine. See sympy.utilities.randtest._randrange. Examples ======== >>> from sympy.crypto.crypto import dh_private_key >>> from sympy.ntheory import isprime, is_primitive_root >>> p, g, _ = dh_private_key() >>> isprime(p) True >>> is_primitive_root(g, p) True >>> p, g, _ = dh_private_key(5) >>> isprime(p) True >>> is_primitive_root(g, p) True """ p = nextprime(2**digit) g = primitive_root(p) randrange = _randrange(seed) a = randrange(2, p) return p, g, a def dh_public_key(key): """ Return three number tuple as public key. This is the tuple that Alice sends to Bob. Parameters ========== key : Tuple (p, g, a) generated by ``dh_private_key`` Returns ======= (p, g, g^a mod p) : p, g and a as in Parameters Examples ======== >>> from sympy.crypto.crypto import dh_private_key, dh_public_key >>> p, g, a = dh_private_key(); >>> _p, _g, x = dh_public_key((p, g, a)) >>> p == _p and g == _g True >>> x == pow(g, a, p) True """ p, g, a = key return p, g, pow(g, a, p) def dh_shared_key(key, b): """ Return an integer that is the shared key. This is what Bob and Alice can both calculate using the public keys they received from each other and their private keys. Parameters ========== key : Tuple (p, g, x) generated by ``dh_public_key`` b : Random number in the range of 2 to p - 1 (Chosen by second key exchange member (Bob)) Returns ======= shared key (int) Examples ======== >>> from sympy.crypto.crypto import ( ... dh_private_key, dh_public_key, dh_shared_key) >>> prk = dh_private_key(); >>> p, g, x = dh_public_key(prk); >>> sk = dh_shared_key((p, g, x), 1000) >>> sk == pow(x, 1000, p) True """ p, _, x = key if 1 >= b or b >= p: raise ValueError(filldedent(''' Value of b should be greater 1 and less than prime %s.''' % p)) return pow(x, b, p) ################ Goldwasser-Micali Encryption ######################### def _legendre(a, p): """ Returns the legendre symbol of a and p assuming that p is a prime i.e. 1 if a is a quadratic residue mod p -1 if a is not a quadratic residue mod p 0 if a is divisible by p Parameters ========== a : int the number to test p : the prime to test a against Returns ======= legendre symbol (a / p) (int) """ sig = pow(a, (p - 1)//2, p) if sig == 1: return 1 elif sig == 0: return 0 else: return -1 def _random_coprime_stream(n, seed=None): randrange = _randrange(seed) while True: y = randrange(n) if gcd(y, n) == 1: yield y def gm_private_key(p, q, a=None): """ Check if p and q can be used as private keys for the Goldwasser-Micali encryption. The method works roughly as follows. Pick two large primes p ands q. Call their product N. Given a message as an integer i, write i in its bit representation b_0,...,b_n. For each k, if b_k = 0: let a_k be a random square (quadratic residue) modulo p * q such that jacobi_symbol(a, p * q) = 1 if b_k = 1: let a_k be a random non-square (non-quadratic residue) modulo p * q such that jacobi_symbol(a, p * q) = 1 return [a_1, a_2,...] b_k can be recovered by checking whether or not a_k is a residue. And from the b_k's, the message can be reconstructed. The idea is that, while jacobi_symbol(a, p * q) can be easily computed (and when it is equal to -1 will tell you that a is not a square mod p * q), quadratic residuosity modulo a composite number is hard to compute without knowing its factorization. Moreover, approximately half the numbers coprime to p * q have jacobi_symbol equal to 1. And among those, approximately half are residues and approximately half are not. This maximizes the entropy of the code. Parameters ========== p, q, a : initialization variables Returns ======= p, q : the input value p and q Raises ====== ValueError : if p and q are not distinct odd primes """ if p == q: raise ValueError("expected distinct primes, " "got two copies of %i" % p) elif not isprime(p) or not isprime(q): raise ValueError("first two arguments must be prime, " "got %i of %i" % (p, q)) elif p == 2 or q == 2: raise ValueError("first two arguments must not be even, " "got %i of %i" % (p, q)) return p, q def gm_public_key(p, q, a=None, seed=None): """ Compute public keys for p and q. Note that in Goldwasser-Micali Encryption, public keys are randomly selected. Parameters ========== p, q, a : (int) initialization variables Returns ======= (a, N) : tuple[int] a is the input a if it is not None otherwise some random integer coprime to p and q. N is the product of p and q """ p, q = gm_private_key(p, q) N = p * q if a is None: randrange = _randrange(seed) while True: a = randrange(N) if _legendre(a, p) == _legendre(a, q) == -1: break else: if _legendre(a, p) != -1 or _legendre(a, q) != -1: return False return (a, N) def encipher_gm(i, key, seed=None): """ Encrypt integer 'i' using public_key 'key' Note that gm uses random encryption. Parameters ========== i : (int) the message to encrypt key : Tuple (a, N) the public key Returns ======= List[int] : the randomized encrypted message. """ if i < 0: raise ValueError( "message must be a non-negative " "integer: got %d instead" % i) a, N = key bits = [] while i > 0: bits.append(i % 2) i //= 2 gen = _random_coprime_stream(N, seed) rev = reversed(bits) encode = lambda b: next(gen)**2*pow(a, b) % N return [ encode(b) for b in rev ] def decipher_gm(message, key): """ Decrypt message 'message' using public_key 'key'. Parameters ========== List[int] : the randomized encrypted message. key : Tuple (p, q) the private key Returns ======= i : (int) the encrypted message """ p, q = key res = lambda m, p: _legendre(m, p) > 0 bits = [res(m, p) * res(m, q) for m in message] m = 0 for b in bits: m <<= 1 m += not b return m ################ Blum–Goldwasser cryptosystem ######################### def bg_private_key(p, q): """ Check if p and q can be used as private keys for the Blum–Goldwasser cryptosystem. The three necessary checks for p and q to pass so that they can be used as private keys: 1. p and q must both be prime 2. p and q must be distinct 3. p and q must be congruent to 3 mod 4 Parameters ========== p, q : the keys to be checked Returns ======= p, q : input values Raises ====== ValueError : if p and q do not pass the above conditions """ if not isprime(p) or not isprime(q): raise ValueError("the two arguments must be prime, " "got %i and %i" %(p, q)) elif p == q: raise ValueError("the two arguments must be distinct, " "got two copies of %i. " %p) elif (p - 3) % 4 != 0 or (q - 3) % 4 != 0: raise ValueError("the two arguments must be congruent to 3 mod 4, " "got %i and %i" %(p, q)) return p, q def bg_public_key(p, q): """ Calculates public keys from private keys. The function first checks the validity of private keys passed as arguments and then returns their product. Parameters ========== p, q : the private keys Returns ======= N : the public key """ p, q = bg_private_key(p, q) N = p * q return N def encipher_bg(i, key, seed=None): """ Encrypts the message using public key and seed. ALGORITHM: 1. Encodes i as a string of L bits, m. 2. Select a random element r, where 1 < r < key, and computes x = r^2 mod key. 3. Use BBS pseudo-random number generator to generate L random bits, b, using the initial seed as x. 4. Encrypted message, c_i = m_i XOR b_i, 1 <= i <= L. 5. x_L = x^(2^L) mod key. 6. Return (c, x_L) Parameters ========== i : message, a non-negative integer key : the public key Returns ======= (encrypted_message, x_L) : Tuple Raises ====== ValueError : if i is negative """ if i < 0: raise ValueError( "message must be a non-negative " "integer: got %d instead" % i) enc_msg = [] while i > 0: enc_msg.append(i % 2) i //= 2 enc_msg.reverse() L = len(enc_msg) r = _randint(seed)(2, key - 1) x = r**2 % key x_L = pow(int(x), int(2**L), int(key)) rand_bits = [] for k in range(L): rand_bits.append(x % 2) x = x**2 % key encrypt_msg = [m ^ b for (m, b) in zip(enc_msg, rand_bits)] return (encrypt_msg, x_L) def decipher_bg(message, key): """ Decrypts the message using private keys. ALGORITHM: 1. Let, c be the encrypted message, y the second number received, and p and q be the private keys. 2. Compute, r_p = y^((p+1)/4 ^ L) mod p and r_q = y^((q+1)/4 ^ L) mod q. 3. Compute x_0 = (q(q^-1 mod p)r_p + p(p^-1 mod q)r_q) mod N. 4. From, recompute the bits using the BBS generator, as in the encryption algorithm. 5. Compute original message by XORing c and b. Parameters ========== message : Tuple of encrypted message and a non-negative integer. key : Tuple of private keys Returns ======= orig_msg : The original message """ p, q = key encrypt_msg, y = message public_key = p * q L = len(encrypt_msg) p_t = ((p + 1)/4)**L q_t = ((q + 1)/4)**L r_p = pow(int(y), int(p_t), int(p)) r_q = pow(int(y), int(q_t), int(q)) x = (q * mod_inverse(q, p) * r_p + p * mod_inverse(p, q) * r_q) % public_key orig_bits = [] for k in range(L): orig_bits.append(x % 2) x = x**2 % public_key orig_msg = 0 for (m, b) in zip(encrypt_msg, orig_bits): orig_msg = orig_msg * 2 orig_msg += (m ^ b) return orig_msg

e35fba9435c7026463c4c773429eb8a994374598a6cbce98545c640227315944

"""A functions module, includes all the standard functions. Combinatorial - factorial, fibonacci, harmonic, bernoulli... Elementary - hyperbolic, trigonometric, exponential, floor and ceiling, sqrt... Special - gamma, zeta,spherical harmonics... """ from sympy.functions.combinatorial.factorials import (factorial, factorial2, rf, ff, binomial, RisingFactorial, FallingFactorial, subfactorial) from sympy.functions.combinatorial.numbers import (carmichael, fibonacci, lucas, tribonacci, harmonic, bernoulli, bell, euler, catalan, genocchi, partition) from sympy.functions.elementary.miscellaneous import (sqrt, root, Min, Max, Id, real_root, cbrt) from sympy.functions.elementary.complexes import (re, im, sign, Abs, conjugate, arg, polar_lift, periodic_argument, unbranched_argument, principal_branch, transpose, adjoint, polarify, unpolarify) from sympy.functions.elementary.trigonometric import (sin, cos, tan, sec, csc, cot, sinc, asin, acos, atan, asec, acsc, acot, atan2) from sympy.functions.elementary.exponential import (exp_polar, exp, log, LambertW) from sympy.functions.elementary.hyperbolic import (sinh, cosh, tanh, coth, sech, csch, asinh, acosh, atanh, acoth, asech, acsch) from sympy.functions.elementary.integers import floor, ceiling, frac from sympy.functions.elementary.piecewise import Piecewise, piecewise_fold from sympy.functions.special.error_functions import (erf, erfc, erfi, erf2, erfinv, erfcinv, erf2inv, Ei, expint, E1, li, Li, Si, Ci, Shi, Chi, fresnels, fresnelc) from sympy.functions.special.gamma_functions import (gamma, lowergamma, uppergamma, polygamma, loggamma, digamma, trigamma, multigamma) from sympy.functions.special.zeta_functions import (dirichlet_eta, zeta, lerchphi, polylog, stieltjes) from sympy.functions.special.tensor_functions import (Eijk, LeviCivita, KroneckerDelta) from sympy.functions.special.singularity_functions import SingularityFunction from sympy.functions.special.delta_functions import DiracDelta, Heaviside from sympy.functions.special.bsplines import bspline_basis, bspline_basis_set, interpolating_spline from sympy.functions.special.bessel import (besselj, bessely, besseli, besselk, hankel1, hankel2, jn, yn, jn_zeros, hn1, hn2, airyai, airybi, airyaiprime, airybiprime) from sympy.functions.special.hyper import hyper, meijerg, appellf1 from sympy.functions.special.polynomials import (legendre, assoc_legendre, hermite, chebyshevt, chebyshevu, chebyshevu_root, chebyshevt_root, laguerre, assoc_laguerre, gegenbauer, jacobi, jacobi_normalized) from sympy.functions.special.spherical_harmonics import Ynm, Ynm_c, Znm from sympy.functions.special.elliptic_integrals import (elliptic_k, elliptic_f, elliptic_e, elliptic_pi) from sympy.functions.special.beta_functions import beta from sympy.functions.special.mathieu_functions import (mathieus, mathieuc, mathieusprime, mathieucprime) ln = log

b0fd38bf5dd35f0e61f8d0a0168ca11ec1c8c76b001509695420c5c26b64c4fc

from __future__ import print_function, division from sympy.core.add import Add from sympy.core.compatibility import ordered, range from sympy.core.function import expand_log from sympy.core.power import Pow from sympy.core.singleton import S from sympy.core.symbol import Dummy from sympy.functions.elementary.exponential import (LambertW, exp, log) from sympy.functions.elementary.miscellaneous import root from sympy.polys.polyroots import roots from sympy.polys.polytools import Poly, factor from sympy.core.function import _mexpand from sympy.simplify.simplify import separatevars from sympy.simplify.radsimp import collect from sympy.simplify.simplify import powsimp from sympy.solvers.solvers import solve, _invert from sympy.utilities.iterables import uniq def _filtered_gens(poly, symbol): """process the generators of ``poly``, returning the set of generators that have ``symbol``. If there are two generators that are inverses of each other, prefer the one that has no denominator. Examples ======== >>> from sympy.solvers.bivariate import _filtered_gens >>> from sympy import Poly, exp >>> from sympy.abc import x >>> _filtered_gens(Poly(x + 1/x + exp(x)), x) {x, exp(x)} """ gens = {g for g in poly.gens if symbol in g.free_symbols} for g in list(gens): ag = 1/g if g in gens and ag in gens: if ag.as_numer_denom()[1] is not S.One: g = ag gens.remove(g) return gens def _mostfunc(lhs, func, X=None): """Returns the term in lhs which contains the most of the func-type things e.g. log(log(x)) wins over log(x) if both terms appear. ``func`` can be a function (exp, log, etc...) or any other SymPy object, like Pow. If ``X`` is not ``None``, then the function returns the term composed with the most ``func`` having the specified variable. Examples ======== >>> from sympy.solvers.bivariate import _mostfunc >>> from sympy.functions.elementary.exponential import exp >>> from sympy.utilities.pytest import raises >>> from sympy.abc import x, y >>> _mostfunc(exp(x) + exp(exp(x) + 2), exp) exp(exp(x) + 2) >>> _mostfunc(exp(x) + exp(exp(y) + 2), exp) exp(exp(y) + 2) >>> _mostfunc(exp(x) + exp(exp(y) + 2), exp, x) exp(x) >>> _mostfunc(x, exp, x) is None True >>> _mostfunc(exp(x) + exp(x*y), exp, x) exp(x) """ fterms = [tmp for tmp in lhs.atoms(func) if (not X or X.is_Symbol and X in tmp.free_symbols or not X.is_Symbol and tmp.has(X))] if len(fterms) == 1: return fterms[0] elif fterms: return max(list(ordered(fterms)), key=lambda x: x.count(func)) return None def _linab(arg, symbol): """Return ``a, b, X`` assuming ``arg`` can be written as ``a*X + b`` where ``X`` is a symbol-dependent factor and ``a`` and ``b`` are independent of ``symbol``. Examples ======== >>> from sympy.functions.elementary.exponential import exp >>> from sympy.solvers.bivariate import _linab >>> from sympy.abc import x, y >>> from sympy import S >>> _linab(S(2), x) (2, 0, 1) >>> _linab(2*x, x) (2, 0, x) >>> _linab(y + y*x + 2*x, x) (y + 2, y, x) >>> _linab(3 + 2*exp(x), x) (2, 3, exp(x)) """ from sympy.core.exprtools import factor_terms arg = factor_terms(arg.expand()) ind, dep = arg.as_independent(symbol) if arg.is_Mul and dep.is_Add: a, b, x = _linab(dep, symbol) return ind*a, ind*b, x if not arg.is_Add: b = 0 a, x = ind, dep else: b = ind a, x = separatevars(dep).as_independent(symbol, as_Add=False) if x.could_extract_minus_sign(): a = -a x = -x return a, b, x def _lambert(eq, x): """ Given an expression assumed to be in the form ``F(X, a..f) = a*log(b*X + c) + d*X + f = 0`` where X = g(x) and x = g^-1(X), return the Lambert solution, ``x = g^-1(-c/b + (a/d)*W(d/(a*b)*exp(c*d/a/b)*exp(-f/a)))``. """ eq = _mexpand(expand_log(eq)) mainlog = _mostfunc(eq, log, x) if not mainlog: return [] # violated assumptions other = eq.subs(mainlog, 0) if isinstance(-other, log): eq = (eq - other).subs(mainlog, mainlog.args[0]) mainlog = mainlog.args[0] if not isinstance(mainlog, log): return [] # violated assumptions other = -(-other).args[0] eq += other if not x in other.free_symbols: return [] # violated assumptions d, f, X2 = _linab(other, x) logterm = collect(eq - other, mainlog) a = logterm.as_coefficient(mainlog) if a is None or x in a.free_symbols: return [] # violated assumptions logarg = mainlog.args[0] b, c, X1 = _linab(logarg, x) if X1 != X2: return [] # violated assumptions # invert the generator X1 so we have x(u) u = Dummy('rhs') xusolns = solve(X1 - u, x) # There are infinitely many branches for LambertW # but only branches for k = -1 and 0 might be real. The k = 0 # branch is real and the k = -1 branch is real if the LambertW argumen # in in range [-1/e, 0]. Since `solve` does not return infinite # solutions we will only include the -1 branch if it tests as real. # Otherwise, inclusion of any LambertW in the solution indicates to # the user that there are imaginary solutions corresponding to # different k values. lambert_real_branches = [-1, 0] sol = [] # solution of the given Lambert equation is like # sol = -c/b + (a/d)*LambertW(arg, k), # where arg = d/(a*b)*exp((c*d-b*f)/a/b) and k in lambert_real_branches. # Instead of considering the single arg, `d/(a*b)*exp((c*d-b*f)/a/b)`, # the individual `p` roots obtained when writing `exp((c*d-b*f)/a/b)` # as `exp(A/p) = exp(A)**(1/p)`, where `p` is an Integer, are used. # calculating args for LambertW num, den = ((c*d-b*f)/a/b).as_numer_denom() p, den = den.as_coeff_Mul() e = exp(num/den) t = Dummy('t') args = [d/(a*b)*t for t in roots(t**p - e, t).keys()] # calculating solutions from args for arg in args: for k in lambert_real_branches: w = LambertW(arg, k) if k and not w.is_real: continue rhs = -c/b + (a/d)*w for xu in xusolns: sol.append(xu.subs(u, rhs)) return sol def _solve_lambert(f, symbol, gens): """Return solution to ``f`` if it is a Lambert-type expression else raise NotImplementedError. For ``f(X, a..f) = a*log(b*X + c) + d*X - f = 0`` the solution for ``X`` is ``X = -c/b + (a/d)*W(d/(a*b)*exp(c*d/a/b)*exp(f/a))``. There are a variety of forms for `f(X, a..f)` as enumerated below: 1a1) if B**B = R for R not in [0, 1] (since those cases would already be solved before getting here) then log of both sides gives log(B) + log(log(B)) = log(log(R)) and X = log(B), a = 1, b = 1, c = 0, d = 1, f = log(log(R)) 1a2) if B*(b*log(B) + c)**a = R then log of both sides gives log(B) + a*log(b*log(B) + c) = log(R) and X = log(B), d=1, f=log(R) 1b) if a*log(b*B + c) + d*B = R and X = B, f = R 2a) if (b*B + c)*exp(d*B + g) = R then log of both sides gives log(b*B + c) + d*B + g = log(R) and X = B, a = 1, f = log(R) - g 2b) if g*exp(d*B + h) - b*B = c then the log form is log(g) + d*B + h - log(b*B + c) = 0 and X = B, a = -1, f = -h - log(g) 3) if d*p**(a*B + g) - b*B = c then the log form is log(d) + (a*B + g)*log(p) - log(b*B + c) = 0 and X = B, a = -1, d = a*log(p), f = -log(d) - g*log(p) """ def _solve_even_degree_expr(expr, t, symbol): """Return the unique solutions of equations derived from ``expr`` by replacing ``t`` with ``+/- symbol``. Parameters ========== expr : Expr The expression which includes a dummy variable t to be replaced with +symbol and -symbol. symbol : Symbol The symbol for which a solution is being sought. Returns ======= List of unique solution of the two equations generated by replacing ``t`` with positive and negative ``symbol``. Notes ===== If ``expr = 2*log(t) + x/2` then solutions for ``2*log(x) + x/2 = 0`` and ``2*log(-x) + x/2 = 0`` are returned by this function. Though this may seem counter-intuitive, one must note that the ``expr`` being solved here has been derived from a different expression. For an expression like ``eq = x**2*g(x) = 1``, if we take the log of both sides we obtain ``log(x**2) + log(g(x)) = 0``. If x is positive then this simplifies to ``2*log(x) + log(g(x)) = 0``; the Lambert-solving routines will return solutions for this, but we must also consider the solutions for ``2*log(-x) + log(g(x))`` since those must also be a solution of ``eq`` which has the same value when the ``x`` in ``x**2`` is negated. If `g(x)` does not have even powers of symbol then we don't want to replace the ``x`` there with ``-x``. So the role of the ``t`` in the expression received by this function is to mark where ``+/-x`` should be inserted before obtaining the Lambert solutions. """ nlhs, plhs = [ expr.xreplace({t: sgn*symbol}) for sgn in (-1, 1)] sols = _solve_lambert(nlhs, symbol, gens) if plhs != nlhs: sols.extend(_solve_lambert(plhs, symbol, gens)) # uniq is needed for a case like # 2*log(t) - log(-z**2) + log(z + log(x) + log(z)) # where subtituting t with +/-x gives all the same solution; # uniq, rather than list(set()), is used to maintain canonical # order return list(uniq(sols)) nrhs, lhs = f.as_independent(symbol, as_Add=True) rhs = -nrhs lamcheck = [tmp for tmp in gens if (tmp.func in [exp, log] or (tmp.is_Pow and symbol in tmp.exp.free_symbols))] if not lamcheck: raise NotImplementedError() if lhs.is_Add or lhs.is_Mul: # replacing all even_degrees of symbol with dummy variable t # since these will need special handling; non-Add/Mul do not # need this handling t = Dummy('t', **symbol.assumptions0) lhs = lhs.replace( lambda i: # find symbol**even i.is_Pow and i.base == symbol and i.exp.is_even, lambda i: # replace t**even t**i.exp) if lhs.is_Add and lhs.has(t): t_indep = lhs.subs(t, 0) t_term = lhs - t_indep _rhs = rhs - t_indep if not t_term.is_Add and _rhs and not ( t_term.has(S.ComplexInfinity, S.NaN)): eq = expand_log(log(t_term) - log(_rhs)) return _solve_even_degree_expr(eq, t, symbol) elif lhs.is_Mul and rhs: # this needs to happen whether t is present or not lhs = expand_log(log(lhs), force=True) rhs = log(rhs) if lhs.has(t) and lhs.is_Add: # it expanded from Mul to Add eq = lhs - rhs return _solve_even_degree_expr(eq, t, symbol) # restore symbol in lhs lhs = lhs.xreplace({t: symbol}) lhs = powsimp(factor(lhs, deep=True)) # make sure we have inverted as completely as possible r = Dummy() i, lhs = _invert(lhs - r, symbol) rhs = i.xreplace({r: rhs}) # For the first forms: # # 1a1) B**B = R will arrive here as B*log(B) = log(R) # lhs is Mul so take log of both sides: # log(B) + log(log(B)) = log(log(R)) # 1a2) B*(b*log(B) + c)**a = R will arrive unchanged so # lhs is Mul, so take log of both sides: # log(B) + a*log(b*log(B) + c) = log(R) # 1b) d*log(a*B + b) + c*B = R will arrive unchanged so # lhs is Add, so isolate c*B and expand log of both sides: # log(c) + log(B) = log(R - d*log(a*B + b)) soln = [] if not soln: mainlog = _mostfunc(lhs, log, symbol) if mainlog: if lhs.is_Mul and rhs != 0: soln = _lambert(log(lhs) - log(rhs), symbol) elif lhs.is_Add: other = lhs.subs(mainlog, 0) if other and not other.is_Add and [ tmp for tmp in other.atoms(Pow) if symbol in tmp.free_symbols]: if not rhs: diff = log(other) - log(other - lhs) else: diff = log(lhs - other) - log(rhs - other) soln = _lambert(expand_log(diff), symbol) else: #it's ready to go soln = _lambert(lhs - rhs, symbol) # For the next forms, # # collect on main exp # 2a) (b*B + c)*exp(d*B + g) = R # lhs is mul, so take log of both sides: # log(b*B + c) + d*B = log(R) - g # 2b) g*exp(d*B + h) - b*B = R # lhs is add, so add b*B to both sides, # take the log of both sides and rearrange to give # log(R + b*B) - d*B = log(g) + h if not soln: mainexp = _mostfunc(lhs, exp, symbol) if mainexp: lhs = collect(lhs, mainexp) if lhs.is_Mul and rhs != 0: soln = _lambert(expand_log(log(lhs) - log(rhs)), symbol) elif lhs.is_Add: # move all but mainexp-containing term to rhs other = lhs.subs(mainexp, 0) mainterm = lhs - other rhs = rhs - other if (mainterm.could_extract_minus_sign() and rhs.could_extract_minus_sign()): mainterm *= -1 rhs *= -1 diff = log(mainterm) - log(rhs) soln = _lambert(expand_log(diff), symbol) # For the last form: # # 3) d*p**(a*B + g) - b*B = c # collect on main pow, add b*B to both sides, # take log of both sides and rearrange to give # a*B*log(p) - log(b*B + c) = -log(d) - g*log(p) if not soln: mainpow = _mostfunc(lhs, Pow, symbol) if mainpow and symbol in mainpow.exp.free_symbols: lhs = collect(lhs, mainpow) if lhs.is_Mul and rhs != 0: # b*B = 0 soln = _lambert(expand_log(log(lhs) - log(rhs)), symbol) elif lhs.is_Add: # move all but mainpow-containing term to rhs other = lhs.subs(mainpow, 0) mainterm = lhs - other rhs = rhs - other diff = log(mainterm) - log(rhs) soln = _lambert(expand_log(diff), symbol) if not soln: raise NotImplementedError('%s does not appear to have a solution in ' 'terms of LambertW' % f) return list(ordered(soln)) def bivariate_type(f, x, y, **kwargs): """Given an expression, f, 3 tests will be done to see what type of composite bivariate it might be, options for u(x, y) are:: x*y x+y x*y+x x*y+y If it matches one of these types, ``u(x, y)``, ``P(u)`` and dummy variable ``u`` will be returned. Solving ``P(u)`` for ``u`` and equating the solutions to ``u(x, y)`` and then solving for ``x`` or ``y`` is equivalent to solving the original expression for ``x`` or ``y``. If ``x`` and ``y`` represent two functions in the same variable, e.g. ``x = g(t)`` and ``y = h(t)``, then if ``u(x, y) - p`` can be solved for ``t`` then these represent the solutions to ``P(u) = 0`` when ``p`` are the solutions of ``P(u) = 0``. Only positive values of ``u`` are considered. Examples ======== >>> from sympy.solvers.solvers import solve >>> from sympy.solvers.bivariate import bivariate_type >>> from sympy.abc import x, y >>> eq = (x**2 - 3).subs(x, x + y) >>> bivariate_type(eq, x, y) (x + y, _u**2 - 3, _u) >>> uxy, pu, u = _ >>> usol = solve(pu, u); usol [sqrt(3)] >>> [solve(uxy - s) for s in solve(pu, u)] [[{x: -y + sqrt(3)}]] >>> all(eq.subs(s).equals(0) for sol in _ for s in sol) True """ u = Dummy('u', positive=True) if kwargs.pop('first', True): p = Poly(f, x, y) f = p.as_expr() _x = Dummy() _y = Dummy() rv = bivariate_type(Poly(f.subs({x: _x, y: _y}), _x, _y), _x, _y, first=False) if rv: reps = {_x: x, _y: y} return rv[0].xreplace(reps), rv[1].xreplace(reps), rv[2] return p = f f = p.as_expr() # f(x*y) args = Add.make_args(p.as_expr()) new = [] for a in args: a = _mexpand(a.subs(x, u/y)) free = a.free_symbols if x in free or y in free: break new.append(a) else: return x*y, Add(*new), u def ok(f, v, c): new = _mexpand(f.subs(v, c)) free = new.free_symbols return None if (x in free or y in free) else new # f(a*x + b*y) new = [] d = p.degree(x) if p.degree(y) == d: a = root(p.coeff_monomial(x**d), d) b = root(p.coeff_monomial(y**d), d) new = ok(f, x, (u - b*y)/a) if new is not None: return a*x + b*y, new, u # f(a*x*y + b*y) new = [] d = p.degree(x) if p.degree(y) == d: for itry in range(2): a = root(p.coeff_monomial(x**d*y**d), d) b = root(p.coeff_monomial(y**d), d) new = ok(f, x, (u - b*y)/a/y) if new is not None: return a*x*y + b*y, new, u x, y = y, x

3f48c72c1b29df48db19a2b984988b62f0f272dfdcd306248dc749238dd055dd

r""" This module contains :py:meth:`~sympy.solvers.ode.dsolve` and different helper functions that it uses. :py:meth:`~sympy.solvers.ode.dsolve` solves ordinary differential equations. See the docstring on the various functions for their uses. Note that partial differential equations support is in ``pde.py``. Note that hint functions have docstrings describing their various methods, but they are intended for internal use. Use ``dsolve(ode, func, hint=hint)`` to solve an ODE using a specific hint. See also the docstring on :py:meth:`~sympy.solvers.ode.dsolve`. **Functions in this module** These are the user functions in this module: - :py:meth:`~sympy.solvers.ode.dsolve` - Solves ODEs. - :py:meth:`~sympy.solvers.ode.classify_ode` - Classifies ODEs into possible hints for :py:meth:`~sympy.solvers.ode.dsolve`. - :py:meth:`~sympy.solvers.ode.checkodesol` - Checks if an equation is the solution to an ODE. - :py:meth:`~sympy.solvers.ode.homogeneous_order` - Returns the homogeneous order of an expression. - :py:meth:`~sympy.solvers.ode.infinitesimals` - Returns the infinitesimals of the Lie group of point transformations of an ODE, such that it is invariant. - :py:meth:`~sympy.solvers.ode_checkinfsol` - Checks if the given infinitesimals are the actual infinitesimals of a first order ODE. These are the non-solver helper functions that are for internal use. The user should use the various options to :py:meth:`~sympy.solvers.ode.dsolve` to obtain the functionality provided by these functions: - :py:meth:`~sympy.solvers.ode.odesimp` - Does all forms of ODE simplification. - :py:meth:`~sympy.solvers.ode.ode_sol_simplicity` - A key function for comparing solutions by simplicity. - :py:meth:`~sympy.solvers.ode.constantsimp` - Simplifies arbitrary constants. - :py:meth:`~sympy.solvers.ode.constant_renumber` - Renumber arbitrary constants. - :py:meth:`~sympy.solvers.ode._handle_Integral` - Evaluate unevaluated Integrals. See also the docstrings of these functions. **Currently implemented solver methods** The following methods are implemented for solving ordinary differential equations. See the docstrings of the various hint functions for more information on each (run ``help(ode)``): - 1st order separable differential equations. - 1st order differential equations whose coefficients or `dx` and `dy` are functions homogeneous of the same order. - 1st order exact differential equations. - 1st order linear differential equations. - 1st order Bernoulli differential equations. - Power series solutions for first order differential equations. - Lie Group method of solving first order differential equations. - 2nd order Liouville differential equations. - Power series solutions for second order differential equations at ordinary and regular singular points. - `n`\th order differential equation that can be solved with algebraic rearrangement and integration. - `n`\th order linear homogeneous differential equation with constant coefficients. - `n`\th order linear inhomogeneous differential equation with constant coefficients using the method of undetermined coefficients. - `n`\th order linear inhomogeneous differential equation with constant coefficients using the method of variation of parameters. **Philosophy behind this module** This module is designed to make it easy to add new ODE solving methods without having to mess with the solving code for other methods. The idea is that there is a :py:meth:`~sympy.solvers.ode.classify_ode` function, which takes in an ODE and tells you what hints, if any, will solve the ODE. It does this without attempting to solve the ODE, so it is fast. Each solving method is a hint, and it has its own function, named ``ode_<hint>``. That function takes in the ODE and any match expression gathered by :py:meth:`~sympy.solvers.ode.classify_ode` and returns a solved result. If this result has any integrals in it, the hint function will return an unevaluated :py:class:`~sympy.integrals.Integral` class. :py:meth:`~sympy.solvers.ode.dsolve`, which is the user wrapper function around all of this, will then call :py:meth:`~sympy.solvers.ode.odesimp` on the result, which, among other things, will attempt to solve the equation for the dependent variable (the function we are solving for), simplify the arbitrary constants in the expression, and evaluate any integrals, if the hint allows it. **How to add new solution methods** If you have an ODE that you want :py:meth:`~sympy.solvers.ode.dsolve` to be able to solve, try to avoid adding special case code here. Instead, try finding a general method that will solve your ODE, as well as others. This way, the :py:mod:`~sympy.solvers.ode` module will become more robust, and unhindered by special case hacks. WolphramAlpha and Maple's DETools[odeadvisor] function are two resources you can use to classify a specific ODE. It is also better for a method to work with an `n`\th order ODE instead of only with specific orders, if possible. To add a new method, there are a few things that you need to do. First, you need a hint name for your method. Try to name your hint so that it is unambiguous with all other methods, including ones that may not be implemented yet. If your method uses integrals, also include a ``hint_Integral`` hint. If there is more than one way to solve ODEs with your method, include a hint for each one, as well as a ``<hint>_best`` hint. Your ``ode_<hint>_best()`` function should choose the best using min with ``ode_sol_simplicity`` as the key argument. See :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_best`, for example. The function that uses your method will be called ``ode_<hint>()``, so the hint must only use characters that are allowed in a Python function name (alphanumeric characters and the underscore '``_``' character). Include a function for every hint, except for ``_Integral`` hints (:py:meth:`~sympy.solvers.ode.dsolve` takes care of those automatically). Hint names should be all lowercase, unless a word is commonly capitalized (such as Integral or Bernoulli). If you have a hint that you do not want to run with ``all_Integral`` that doesn't have an ``_Integral`` counterpart (such as a best hint that would defeat the purpose of ``all_Integral``), you will need to remove it manually in the :py:meth:`~sympy.solvers.ode.dsolve` code. See also the :py:meth:`~sympy.solvers.ode.classify_ode` docstring for guidelines on writing a hint name. Determine *in general* how the solutions returned by your method compare with other methods that can potentially solve the same ODEs. Then, put your hints in the :py:data:`~sympy.solvers.ode.allhints` tuple in the order that they should be called. The ordering of this tuple determines which hints are default. Note that exceptions are ok, because it is easy for the user to choose individual hints with :py:meth:`~sympy.solvers.ode.dsolve`. In general, ``_Integral`` variants should go at the end of the list, and ``_best`` variants should go before the various hints they apply to. For example, the ``undetermined_coefficients`` hint comes before the ``variation_of_parameters`` hint because, even though variation of parameters is more general than undetermined coefficients, undetermined coefficients generally returns cleaner results for the ODEs that it can solve than variation of parameters does, and it does not require integration, so it is much faster. Next, you need to have a match expression or a function that matches the type of the ODE, which you should put in :py:meth:`~sympy.solvers.ode.classify_ode` (if the match function is more than just a few lines, like :py:meth:`~sympy.solvers.ode._undetermined_coefficients_match`, it should go outside of :py:meth:`~sympy.solvers.ode.classify_ode`). It should match the ODE without solving for it as much as possible, so that :py:meth:`~sympy.solvers.ode.classify_ode` remains fast and is not hindered by bugs in solving code. Be sure to consider corner cases. For example, if your solution method involves dividing by something, make sure you exclude the case where that division will be 0. In most cases, the matching of the ODE will also give you the various parts that you need to solve it. You should put that in a dictionary (``.match()`` will do this for you), and add that as ``matching_hints['hint'] = matchdict`` in the relevant part of :py:meth:`~sympy.solvers.ode.classify_ode`. :py:meth:`~sympy.solvers.ode.classify_ode` will then send this to :py:meth:`~sympy.solvers.ode.dsolve`, which will send it to your function as the ``match`` argument. Your function should be named ``ode_<hint>(eq, func, order, match)`. If you need to send more information, put it in the ``match`` dictionary. For example, if you had to substitute in a dummy variable in :py:meth:`~sympy.solvers.ode.classify_ode` to match the ODE, you will need to pass it to your function using the `match` dict to access it. You can access the independent variable using ``func.args[0]``, and the dependent variable (the function you are trying to solve for) as ``func.func``. If, while trying to solve the ODE, you find that you cannot, raise ``NotImplementedError``. :py:meth:`~sympy.solvers.ode.dsolve` will catch this error with the ``all`` meta-hint, rather than causing the whole routine to fail. Add a docstring to your function that describes the method employed. Like with anything else in SymPy, you will need to add a doctest to the docstring, in addition to real tests in ``test_ode.py``. Try to maintain consistency with the other hint functions' docstrings. Add your method to the list at the top of this docstring. Also, add your method to ``ode.rst`` in the ``docs/src`` directory, so that the Sphinx docs will pull its docstring into the main SymPy documentation. Be sure to make the Sphinx documentation by running ``make html`` from within the doc directory to verify that the docstring formats correctly. If your solution method involves integrating, use :py:meth:`Integral() <sympy.integrals.integrals.Integral>` instead of :py:meth:`~sympy.core.expr.Expr.integrate`. This allows the user to bypass hard/slow integration by using the ``_Integral`` variant of your hint. In most cases, calling :py:meth:`sympy.core.basic.Basic.doit` will integrate your solution. If this is not the case, you will need to write special code in :py:meth:`~sympy.solvers.ode._handle_Integral`. Arbitrary constants should be symbols named ``C1``, ``C2``, and so on. All solution methods should return an equality instance. If you need an arbitrary number of arbitrary constants, you can use ``constants = numbered_symbols(prefix='C', cls=Symbol, start=1)``. If it is possible to solve for the dependent function in a general way, do so. Otherwise, do as best as you can, but do not call solve in your ``ode_<hint>()`` function. :py:meth:`~sympy.solvers.ode.odesimp` will attempt to solve the solution for you, so you do not need to do that. Lastly, if your ODE has a common simplification that can be applied to your solutions, you can add a special case in :py:meth:`~sympy.solvers.ode.odesimp` for it. For example, solutions returned from the ``1st_homogeneous_coeff`` hints often have many :py:meth:`~sympy.functions.log` terms, so :py:meth:`~sympy.solvers.ode.odesimp` calls :py:meth:`~sympy.simplify.simplify.logcombine` on them (it also helps to write the arbitrary constant as ``log(C1)`` instead of ``C1`` in this case). Also consider common ways that you can rearrange your solution to have :py:meth:`~sympy.solvers.ode.constantsimp` take better advantage of it. It is better to put simplification in :py:meth:`~sympy.solvers.ode.odesimp` than in your method, because it can then be turned off with the simplify flag in :py:meth:`~sympy.solvers.ode.dsolve`. If you have any extraneous simplification in your function, be sure to only run it using ``if match.get('simplify', True):``, especially if it can be slow or if it can reduce the domain of the solution. Finally, as with every contribution to SymPy, your method will need to be tested. Add a test for each method in ``test_ode.py``. Follow the conventions there, i.e., test the solver using ``dsolve(eq, f(x), hint=your_hint)``, and also test the solution using :py:meth:`~sympy.solvers.ode.checkodesol` (you can put these in a separate tests and skip/XFAIL if it runs too slow/doesn't work). Be sure to call your hint specifically in :py:meth:`~sympy.solvers.ode.dsolve`, that way the test won't be broken simply by the introduction of another matching hint. If your method works for higher order (>1) ODEs, you will need to run ``sol = constant_renumber(sol, 'C', 1, order)`` for each solution, where ``order`` is the order of the ODE. This is because ``constant_renumber`` renumbers the arbitrary constants by printing order, which is platform dependent. Try to test every corner case of your solver, including a range of orders if it is a `n`\th order solver, but if your solver is slow, such as if it involves hard integration, try to keep the test run time down. Feel free to refactor existing hints to avoid duplicating code or creating inconsistencies. If you can show that your method exactly duplicates an existing method, including in the simplicity and speed of obtaining the solutions, then you can remove the old, less general method. The existing code is tested extensively in ``test_ode.py``, so if anything is broken, one of those tests will surely fail. """ from __future__ import print_function, division from collections import defaultdict from itertools import islice from sympy.core import Add, S, Mul, Pow, oo from sympy.core.compatibility import ordered, iterable, is_sequence, range, string_types from sympy.core.containers import Tuple from sympy.core.exprtools import factor_terms from sympy.core.expr import AtomicExpr, Expr from sympy.core.function import (Function, Derivative, AppliedUndef, diff, expand, expand_mul, Subs, _mexpand) from sympy.core.multidimensional import vectorize from sympy.core.numbers import NaN, zoo, I, Number from sympy.core.relational import Equality, Eq from sympy.core.symbol import Symbol, Wild, Dummy, symbols from sympy.core.sympify import sympify from sympy.logic.boolalg import (BooleanAtom, And, Not, BooleanTrue, BooleanFalse) from sympy.functions import cos, exp, im, log, re, sin, tan, sqrt, \ atan2, conjugate, Piecewise from sympy.functions.combinatorial.factorials import factorial from sympy.integrals.integrals import Integral, integrate from sympy.matrices import wronskian, Matrix, eye, zeros from sympy.polys import (Poly, RootOf, rootof, terms_gcd, PolynomialError, lcm, roots) from sympy.polys.polyroots import roots_quartic from sympy.polys.polytools import cancel, degree, div from sympy.series import Order from sympy.series.series import series from sympy.simplify import collect, logcombine, powsimp, separatevars, \ simplify, trigsimp, posify, cse from sympy.simplify.powsimp import powdenest from sympy.simplify.radsimp import collect_const from sympy.solvers import solve from sympy.solvers.pde import pdsolve from sympy.utilities import numbered_symbols, default_sort_key, sift from sympy.solvers.deutils import _preprocess, ode_order, _desolve #: This is a list of hints in the order that they should be preferred by #: :py:meth:`~sympy.solvers.ode.classify_ode`. In general, hints earlier in the #: list should produce simpler solutions than those later in the list (for #: ODEs that fit both). For now, the order of this list is based on empirical #: observations by the developers of SymPy. #: #: The hint used by :py:meth:`~sympy.solvers.ode.dsolve` for a specific ODE #: can be overridden (see the docstring). #: #: In general, ``_Integral`` hints are grouped at the end of the list, unless #: there is a method that returns an unevaluable integral most of the time #: (which go near the end of the list anyway). ``default``, ``all``, #: ``best``, and ``all_Integral`` meta-hints should not be included in this #: list, but ``_best`` and ``_Integral`` hints should be included. allhints = ( "nth_algebraic", "separable", "1st_exact", "1st_linear", "Bernoulli", "Riccati_special_minus2", "1st_homogeneous_coeff_best", "1st_homogeneous_coeff_subs_indep_div_dep", "1st_homogeneous_coeff_subs_dep_div_indep", "almost_linear", "linear_coefficients", "separable_reduced", "1st_power_series", "lie_group", "nth_linear_constant_coeff_homogeneous", "nth_linear_euler_eq_homogeneous", "nth_linear_constant_coeff_undetermined_coefficients", "nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients", "nth_linear_constant_coeff_variation_of_parameters", "nth_linear_euler_eq_nonhomogeneous_variation_of_parameters", "Liouville", "nth_order_reducible", "2nd_power_series_ordinary", "2nd_power_series_regular", "nth_algebraic_Integral", "separable_Integral", "1st_exact_Integral", "1st_linear_Integral", "Bernoulli_Integral", "1st_homogeneous_coeff_subs_indep_div_dep_Integral", "1st_homogeneous_coeff_subs_dep_div_indep_Integral", "almost_linear_Integral", "linear_coefficients_Integral", "separable_reduced_Integral", "nth_linear_constant_coeff_variation_of_parameters_Integral", "nth_linear_euler_eq_nonhomogeneous_variation_of_parameters_Integral", "Liouville_Integral", ) lie_heuristics = ( "abaco1_simple", "abaco1_product", "abaco2_similar", "abaco2_unique_unknown", "abaco2_unique_general", "linear", "function_sum", "bivariate", "chi" ) def sub_func_doit(eq, func, new): r""" When replacing the func with something else, we usually want the derivative evaluated, so this function helps in making that happen. Examples ======== >>> from sympy import Derivative, symbols, Function >>> from sympy.solvers.ode import sub_func_doit >>> x, z = symbols('x, z') >>> y = Function('y') >>> sub_func_doit(3*Derivative(y(x), x) - 1, y(x), x) 2 >>> sub_func_doit(x*Derivative(y(x), x) - y(x)**2 + y(x), y(x), ... 1/(x*(z + 1/x))) x*(-1/(x**2*(z + 1/x)) + 1/(x**3*(z + 1/x)**2)) + 1/(x*(z + 1/x)) ...- 1/(x**2*(z + 1/x)**2) """ reps= {func: new} for d in eq.atoms(Derivative): if d.expr == func: reps[d] = new.diff(*d.variable_count) else: reps[d] = d.xreplace({func: new}).doit(deep=False) return eq.xreplace(reps) def get_numbered_constants(eq, num=1, start=1, prefix='C'): """ Returns a list of constants that do not occur in eq already. """ ncs = iter_numbered_constants(eq, start, prefix) Cs = [next(ncs) for i in range(num)] return (Cs[0] if num == 1 else tuple(Cs)) def iter_numbered_constants(eq, start=1, prefix='C'): """ Returns an iterator of constants that do not occur in eq already. """ if isinstance(eq, Expr): eq = [eq] elif not iterable(eq): raise ValueError("Expected Expr or iterable but got %s" % eq) atom_set = set().union(*[i.free_symbols for i in eq]) func_set = set().union(*[i.atoms(Function) for i in eq]) if func_set: atom_set |= {Symbol(str(f.func)) for f in func_set} return numbered_symbols(start=start, prefix=prefix, exclude=atom_set) def dsolve(eq, func=None, hint="default", simplify=True, ics= None, xi=None, eta=None, x0=0, n=6, **kwargs): r""" Solves any (supported) kind of ordinary differential equation and system of ordinary differential equations. For single ordinary differential equation ========================================= It is classified under this when number of equation in ``eq`` is one. **Usage** ``dsolve(eq, f(x), hint)`` -> Solve ordinary differential equation ``eq`` for function ``f(x)``, using method ``hint``. **Details** ``eq`` can be any supported ordinary differential equation (see the :py:mod:`~sympy.solvers.ode` docstring for supported methods). This can either be an :py:class:`~sympy.core.relational.Equality`, or an expression, which is assumed to be equal to ``0``. ``f(x)`` is a function of one variable whose derivatives in that variable make up the ordinary differential equation ``eq``. In many cases it is not necessary to provide this; it will be autodetected (and an error raised if it couldn't be detected). ``hint`` is the solving method that you want dsolve to use. Use ``classify_ode(eq, f(x))`` to get all of the possible hints for an ODE. The default hint, ``default``, will use whatever hint is returned first by :py:meth:`~sympy.solvers.ode.classify_ode`. See Hints below for more options that you can use for hint. ``simplify`` enables simplification by :py:meth:`~sympy.solvers.ode.odesimp`. See its docstring for more information. Turn this off, for example, to disable solving of solutions for ``func`` or simplification of arbitrary constants. It will still integrate with this hint. Note that the solution may contain more arbitrary constants than the order of the ODE with this option enabled. ``xi`` and ``eta`` are the infinitesimal functions of an ordinary differential equation. They are the infinitesimals of the Lie group of point transformations for which the differential equation is invariant. The user can specify values for the infinitesimals. If nothing is specified, ``xi`` and ``eta`` are calculated using :py:meth:`~sympy.solvers.ode.infinitesimals` with the help of various heuristics. ``ics`` is the set of initial/boundary conditions for the differential equation. It should be given in the form of ``{f(x0): x1, f(x).diff(x).subs(x, x2): x3}`` and so on. For power series solutions, if no initial conditions are specified ``f(0)`` is assumed to be ``C0`` and the power series solution is calculated about 0. ``x0`` is the point about which the power series solution of a differential equation is to be evaluated. ``n`` gives the exponent of the dependent variable up to which the power series solution of a differential equation is to be evaluated. **Hints** Aside from the various solving methods, there are also some meta-hints that you can pass to :py:meth:`~sympy.solvers.ode.dsolve`: ``default``: This uses whatever hint is returned first by :py:meth:`~sympy.solvers.ode.classify_ode`. This is the default argument to :py:meth:`~sympy.solvers.ode.dsolve`. ``all``: To make :py:meth:`~sympy.solvers.ode.dsolve` apply all relevant classification hints, use ``dsolve(ODE, func, hint="all")``. This will return a dictionary of ``hint:solution`` terms. If a hint causes dsolve to raise the ``NotImplementedError``, value of that hint's key will be the exception object raised. The dictionary will also include some special keys: - ``order``: The order of the ODE. See also :py:meth:`~sympy.solvers.deutils.ode_order` in ``deutils.py``. - ``best``: The simplest hint; what would be returned by ``best`` below. - ``best_hint``: The hint that would produce the solution given by ``best``. If more than one hint produces the best solution, the first one in the tuple returned by :py:meth:`~sympy.solvers.ode.classify_ode` is chosen. - ``default``: The solution that would be returned by default. This is the one produced by the hint that appears first in the tuple returned by :py:meth:`~sympy.solvers.ode.classify_ode`. ``all_Integral``: This is the same as ``all``, except if a hint also has a corresponding ``_Integral`` hint, it only returns the ``_Integral`` hint. This is useful if ``all`` causes :py:meth:`~sympy.solvers.ode.dsolve` to hang because of a difficult or impossible integral. This meta-hint will also be much faster than ``all``, because :py:meth:`~sympy.core.expr.Expr.integrate` is an expensive routine. ``best``: To have :py:meth:`~sympy.solvers.ode.dsolve` try all methods and return the simplest one. This takes into account whether the solution is solvable in the function, whether it contains any Integral classes (i.e. unevaluatable integrals), and which one is the shortest in size. See also the :py:meth:`~sympy.solvers.ode.classify_ode` docstring for more info on hints, and the :py:mod:`~sympy.solvers.ode` docstring for a list of all supported hints. **Tips** - You can declare the derivative of an unknown function this way: >>> from sympy import Function, Derivative >>> from sympy.abc import x # x is the independent variable >>> f = Function("f")(x) # f is a function of x >>> # f_ will be the derivative of f with respect to x >>> f_ = Derivative(f, x) - See ``test_ode.py`` for many tests, which serves also as a set of examples for how to use :py:meth:`~sympy.solvers.ode.dsolve`. - :py:meth:`~sympy.solvers.ode.dsolve` always returns an :py:class:`~sympy.core.relational.Equality` class (except for the case when the hint is ``all`` or ``all_Integral``). If possible, it solves the solution explicitly for the function being solved for. Otherwise, it returns an implicit solution. - Arbitrary constants are symbols named ``C1``, ``C2``, and so on. - Because all solutions should be mathematically equivalent, some hints may return the exact same result for an ODE. Often, though, two different hints will return the same solution formatted differently. The two should be equivalent. Also note that sometimes the values of the arbitrary constants in two different solutions may not be the same, because one constant may have "absorbed" other constants into it. - Do ``help(ode.ode_<hintname>)`` to get help more information on a specific hint, where ``<hintname>`` is the name of a hint without ``_Integral``. For system of ordinary differential equations ============================================= **Usage** ``dsolve(eq, func)`` -> Solve a system of ordinary differential equations ``eq`` for ``func`` being list of functions including `x(t)`, `y(t)`, `z(t)` where number of functions in the list depends upon the number of equations provided in ``eq``. **Details** ``eq`` can be any supported system of ordinary differential equations This can either be an :py:class:`~sympy.core.relational.Equality`, or an expression, which is assumed to be equal to ``0``. ``func`` holds ``x(t)`` and ``y(t)`` being functions of one variable which together with some of their derivatives make up the system of ordinary differential equation ``eq``. It is not necessary to provide this; it will be autodetected (and an error raised if it couldn't be detected). **Hints** The hints are formed by parameters returned by classify_sysode, combining them give hints name used later for forming method name. Examples ======== >>> from sympy import Function, dsolve, Eq, Derivative, sin, cos, symbols >>> from sympy.abc import x >>> f = Function('f') >>> dsolve(Derivative(f(x), x, x) + 9*f(x), f(x)) Eq(f(x), C1*sin(3*x) + C2*cos(3*x)) >>> eq = sin(x)*cos(f(x)) + cos(x)*sin(f(x))*f(x).diff(x) >>> dsolve(eq, hint='1st_exact') [Eq(f(x), -acos(C1/cos(x)) + 2*pi), Eq(f(x), acos(C1/cos(x)))] >>> dsolve(eq, hint='almost_linear') [Eq(f(x), -acos(C1/cos(x)) + 2*pi), Eq(f(x), acos(C1/cos(x)))] >>> t = symbols('t') >>> x, y = symbols('x, y', cls=Function) >>> eq = (Eq(Derivative(x(t),t), 12*t*x(t) + 8*y(t)), Eq(Derivative(y(t),t), 21*x(t) + 7*t*y(t))) >>> dsolve(eq) [Eq(x(t), C1*x0(t) + C2*x0(t)*Integral(8*exp(Integral(7*t, t))*exp(Integral(12*t, t))/x0(t)**2, t)), Eq(y(t), C1*y0(t) + C2*(y0(t)*Integral(8*exp(Integral(7*t, t))*exp(Integral(12*t, t))/x0(t)**2, t) + exp(Integral(7*t, t))*exp(Integral(12*t, t))/x0(t)))] >>> eq = (Eq(Derivative(x(t),t),x(t)*y(t)*sin(t)), Eq(Derivative(y(t),t),y(t)**2*sin(t))) >>> dsolve(eq) {Eq(x(t), -exp(C1)/(C2*exp(C1) - cos(t))), Eq(y(t), -1/(C1 - cos(t)))} """ if iterable(eq): match = classify_sysode(eq, func) eq = match['eq'] order = match['order'] func = match['func'] t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] # keep highest order term coefficient positive for i in range(len(eq)): for func_ in func: if isinstance(func_, list): pass else: if eq[i].coeff(diff(func[i],t,ode_order(eq[i], func[i]))).is_negative: eq[i] = -eq[i] match['eq'] = eq if len(set(order.values()))!=1: raise ValueError("It solves only those systems of equations whose orders are equal") match['order'] = list(order.values())[0] def recur_len(l): return sum(recur_len(item) if isinstance(item,list) else 1 for item in l) if recur_len(func) != len(eq): raise ValueError("dsolve() and classify_sysode() work with " "number of functions being equal to number of equations") if match['type_of_equation'] is None: raise NotImplementedError else: if match['is_linear'] == True: if match['no_of_equation'] > 3: solvefunc = globals()['sysode_linear_neq_order%(order)s' % match] else: solvefunc = globals()['sysode_linear_%(no_of_equation)seq_order%(order)s' % match] else: solvefunc = globals()['sysode_nonlinear_%(no_of_equation)seq_order%(order)s' % match] sols = solvefunc(match) if ics: constants = Tuple(*sols).free_symbols - Tuple(*eq).free_symbols solved_constants = solve_ics(sols, func, constants, ics) return [sol.subs(solved_constants) for sol in sols] return sols else: given_hint = hint # hint given by the user # See the docstring of _desolve for more details. hints = _desolve(eq, func=func, hint=hint, simplify=True, xi=xi, eta=eta, type='ode', ics=ics, x0=x0, n=n, **kwargs) eq = hints.pop('eq', eq) all_ = hints.pop('all', False) if all_: retdict = {} failed_hints = {} gethints = classify_ode(eq, dict=True) orderedhints = gethints['ordered_hints'] for hint in hints: try: rv = _helper_simplify(eq, hint, hints[hint], simplify) except NotImplementedError as detail: failed_hints[hint] = detail else: retdict[hint] = rv func = hints[hint]['func'] retdict['best'] = min(list(retdict.values()), key=lambda x: ode_sol_simplicity(x, func, trysolving=not simplify)) if given_hint == 'best': return retdict['best'] for i in orderedhints: if retdict['best'] == retdict.get(i, None): retdict['best_hint'] = i break retdict['default'] = gethints['default'] retdict['order'] = gethints['order'] retdict.update(failed_hints) return retdict else: # The key 'hint' stores the hint needed to be solved for. hint = hints['hint'] return _helper_simplify(eq, hint, hints, simplify, ics=ics) def _helper_simplify(eq, hint, match, simplify=True, ics=None, **kwargs): r""" Helper function of dsolve that calls the respective :py:mod:`~sympy.solvers.ode` functions to solve for the ordinary differential equations. This minimizes the computation in calling :py:meth:`~sympy.solvers.deutils._desolve` multiple times. """ r = match if hint.endswith('_Integral'): solvefunc = globals()['ode_' + hint[:-len('_Integral')]] else: solvefunc = globals()['ode_' + hint] func = r['func'] order = r['order'] match = r[hint] free = eq.free_symbols cons = lambda s: s.free_symbols.difference(free) if simplify: # odesimp() will attempt to integrate, if necessary, apply constantsimp(), # attempt to solve for func, and apply any other hint specific # simplifications sols = solvefunc(eq, func, order, match) if isinstance(sols, Expr): rv = odesimp(eq, sols, func, hint) else: rv = [odesimp(eq, s, func, hint) for s in sols] else: # We still want to integrate (you can disable it separately with the hint) match['simplify'] = False # Some hints can take advantage of this option rv = _handle_Integral(solvefunc(eq, func, order, match), func, hint) if ics and not 'power_series' in hint: if isinstance(rv, Expr): solved_constants = solve_ics([rv], [r['func']], cons(rv), ics) rv = rv.subs(solved_constants) else: rv1 = [] for s in rv: try: solved_constants = solve_ics([s], [r['func']], cons(s), ics) except ValueError: continue rv1.append(s.subs(solved_constants)) if len(rv1) == 1: return rv1[0] rv = rv1 return rv def solve_ics(sols, funcs, constants, ics): """ Solve for the constants given initial conditions ``sols`` is a list of solutions. ``funcs`` is a list of functions. ``constants`` is a list of constants. ``ics`` is the set of initial/boundary conditions for the differential equation. It should be given in the form of ``{f(x0): x1, f(x).diff(x).subs(x, x2): x3}`` and so on. Returns a dictionary mapping constants to values. ``solution.subs(constants)`` will replace the constants in ``solution``. Example ======= >>> # From dsolve(f(x).diff(x) - f(x), f(x)) >>> from sympy import symbols, Eq, exp, Function >>> from sympy.solvers.ode import solve_ics >>> f = Function('f') >>> x, C1 = symbols('x C1') >>> sols = [Eq(f(x), C1*exp(x))] >>> funcs = [f(x)] >>> constants = [C1] >>> ics = {f(0): 2} >>> solved_constants = solve_ics(sols, funcs, constants, ics) >>> solved_constants {C1: 2} >>> sols[0].subs(solved_constants) Eq(f(x), 2*exp(x)) """ # Assume ics are of the form f(x0): value or Subs(diff(f(x), x, n), (x, # x0)): value (currently checked by classify_ode). To solve, replace x # with x0, f(x0) with value, then solve for constants. For f^(n)(x0), # differentiate the solution n times, so that f^(n)(x) appears. x = funcs[0].args[0] diff_sols = [] subs_sols = [] diff_variables = set() for funcarg, value in ics.items(): if isinstance(funcarg, AppliedUndef): x0 = funcarg.args[0] matching_func = [f for f in funcs if f.func == funcarg.func][0] S = sols elif isinstance(funcarg, (Subs, Derivative)): if isinstance(funcarg, Subs): # Make sure it stays a subs. Otherwise subs below will produce # a different looking term. funcarg = funcarg.doit() if isinstance(funcarg, Subs): deriv = funcarg.expr x0 = funcarg.point[0] variables = funcarg.expr.variables matching_func = deriv elif isinstance(funcarg, Derivative): deriv = funcarg x0 = funcarg.variables[0] variables = (x,)*len(funcarg.variables) matching_func = deriv.subs(x0, x) if variables not in diff_variables: for sol in sols: if sol.has(deriv.expr.func): diff_sols.append(Eq(sol.lhs.diff(*variables), sol.rhs.diff(*variables))) diff_variables.add(variables) S = diff_sols else: raise NotImplementedError("Unrecognized initial condition") for sol in S: if sol.has(matching_func): sol2 = sol sol2 = sol2.subs(x, x0) sol2 = sol2.subs(funcarg, value) # This check is necessary because of issue #15724 if not isinstance(sol2, BooleanAtom) or not subs_sols: subs_sols = [s for s in subs_sols if not isinstance(s, BooleanAtom)] subs_sols.append(sol2) # TODO: Use solveset here try: solved_constants = solve(subs_sols, constants, dict=True) except NotImplementedError: solved_constants = [] # XXX: We can't differentiate between the solution not existing because of # invalid initial conditions, and not existing because solve is not smart # enough. If we could use solveset, this might be improvable, but for now, # we use NotImplementedError in this case. if not solved_constants: raise ValueError("Couldn't solve for initial conditions") if solved_constants == True: raise ValueError("Initial conditions did not produce any solutions for constants. Perhaps they are degenerate.") if len(solved_constants) > 1: raise NotImplementedError("Initial conditions produced too many solutions for constants") return solved_constants[0] def classify_ode(eq, func=None, dict=False, ics=None, **kwargs): r""" Returns a tuple of possible :py:meth:`~sympy.solvers.ode.dsolve` classifications for an ODE. The tuple is ordered so that first item is the classification that :py:meth:`~sympy.solvers.ode.dsolve` uses to solve the ODE by default. In general, classifications at the near the beginning of the list will produce better solutions faster than those near the end, thought there are always exceptions. To make :py:meth:`~sympy.solvers.ode.dsolve` use a different classification, use ``dsolve(ODE, func, hint=<classification>)``. See also the :py:meth:`~sympy.solvers.ode.dsolve` docstring for different meta-hints you can use. If ``dict`` is true, :py:meth:`~sympy.solvers.ode.classify_ode` will return a dictionary of ``hint:match`` expression terms. This is intended for internal use by :py:meth:`~sympy.solvers.ode.dsolve`. Note that because dictionaries are ordered arbitrarily, this will most likely not be in the same order as the tuple. You can get help on different hints by executing ``help(ode.ode_hintname)``, where ``hintname`` is the name of the hint without ``_Integral``. See :py:data:`~sympy.solvers.ode.allhints` or the :py:mod:`~sympy.solvers.ode` docstring for a list of all supported hints that can be returned from :py:meth:`~sympy.solvers.ode.classify_ode`. Notes ===== These are remarks on hint names. ``_Integral`` If a classification has ``_Integral`` at the end, it will return the expression with an unevaluated :py:class:`~sympy.integrals.Integral` class in it. Note that a hint may do this anyway if :py:meth:`~sympy.core.expr.Expr.integrate` cannot do the integral, though just using an ``_Integral`` will do so much faster. Indeed, an ``_Integral`` hint will always be faster than its corresponding hint without ``_Integral`` because :py:meth:`~sympy.core.expr.Expr.integrate` is an expensive routine. If :py:meth:`~sympy.solvers.ode.dsolve` hangs, it is probably because :py:meth:`~sympy.core.expr.Expr.integrate` is hanging on a tough or impossible integral. Try using an ``_Integral`` hint or ``all_Integral`` to get it return something. Note that some hints do not have ``_Integral`` counterparts. This is because :py:meth:`~sympy.solvers.ode.integrate` is not used in solving the ODE for those method. For example, `n`\th order linear homogeneous ODEs with constant coefficients do not require integration to solve, so there is no ``nth_linear_homogeneous_constant_coeff_Integrate`` hint. You can easily evaluate any unevaluated :py:class:`~sympy.integrals.Integral`\s in an expression by doing ``expr.doit()``. Ordinals Some hints contain an ordinal such as ``1st_linear``. This is to help differentiate them from other hints, as well as from other methods that may not be implemented yet. If a hint has ``nth`` in it, such as the ``nth_linear`` hints, this means that the method used to applies to ODEs of any order. ``indep`` and ``dep`` Some hints contain the words ``indep`` or ``dep``. These reference the independent variable and the dependent function, respectively. For example, if an ODE is in terms of `f(x)`, then ``indep`` will refer to `x` and ``dep`` will refer to `f`. ``subs`` If a hints has the word ``subs`` in it, it means the the ODE is solved by substituting the expression given after the word ``subs`` for a single dummy variable. This is usually in terms of ``indep`` and ``dep`` as above. The substituted expression will be written only in characters allowed for names of Python objects, meaning operators will be spelled out. For example, ``indep``/``dep`` will be written as ``indep_div_dep``. ``coeff`` The word ``coeff`` in a hint refers to the coefficients of something in the ODE, usually of the derivative terms. See the docstring for the individual methods for more info (``help(ode)``). This is contrast to ``coefficients``, as in ``undetermined_coefficients``, which refers to the common name of a method. ``_best`` Methods that have more than one fundamental way to solve will have a hint for each sub-method and a ``_best`` meta-classification. This will evaluate all hints and return the best, using the same considerations as the normal ``best`` meta-hint. Examples ======== >>> from sympy import Function, classify_ode, Eq >>> from sympy.abc import x >>> f = Function('f') >>> classify_ode(Eq(f(x).diff(x), 0), f(x)) ('nth_algebraic', 'separable', '1st_linear', '1st_homogeneous_coeff_best', '1st_homogeneous_coeff_subs_indep_div_dep', '1st_homogeneous_coeff_subs_dep_div_indep', '1st_power_series', 'lie_group', 'nth_linear_constant_coeff_homogeneous', 'nth_linear_euler_eq_homogeneous', 'nth_algebraic_Integral', 'separable_Integral', '1st_linear_Integral', '1st_homogeneous_coeff_subs_indep_div_dep_Integral', '1st_homogeneous_coeff_subs_dep_div_indep_Integral') >>> classify_ode(f(x).diff(x, 2) + 3*f(x).diff(x) + 2*f(x) - 4) ('nth_linear_constant_coeff_undetermined_coefficients', 'nth_linear_constant_coeff_variation_of_parameters', 'nth_linear_constant_coeff_variation_of_parameters_Integral') """ ics = sympify(ics) prep = kwargs.pop('prep', True) if func and len(func.args) != 1: raise ValueError("dsolve() and classify_ode() only " "work with functions of one variable, not %s" % func) if prep or func is None: eq, func_ = _preprocess(eq, func) if func is None: func = func_ x = func.args[0] f = func.func y = Dummy('y') xi = kwargs.get('xi') eta = kwargs.get('eta') terms = kwargs.get('n') if isinstance(eq, Equality): if eq.rhs != 0: return classify_ode(eq.lhs - eq.rhs, func, dict=dict, ics=ics, xi=xi, n=terms, eta=eta, prep=False) eq = eq.lhs order = ode_order(eq, f(x)) # hint:matchdict or hint:(tuple of matchdicts) # Also will contain "default":<default hint> and "order":order items. matching_hints = {"order": order} if not order: if dict: matching_hints["default"] = None return matching_hints else: return () df = f(x).diff(x) a = Wild('a', exclude=[f(x)]) b = Wild('b', exclude=[f(x)]) c = Wild('c', exclude=[f(x)]) d = Wild('d', exclude=[df, f(x).diff(x, 2)]) e = Wild('e', exclude=[df]) k = Wild('k', exclude=[df]) n = Wild('n', exclude=[x, f(x), df]) c1 = Wild('c1', exclude=[x]) a2 = Wild('a2', exclude=[x, f(x), df]) b2 = Wild('b2', exclude=[x, f(x), df]) c2 = Wild('c2', exclude=[x, f(x), df]) d2 = Wild('d2', exclude=[x, f(x), df]) a3 = Wild('a3', exclude=[f(x), df, f(x).diff(x, 2)]) b3 = Wild('b3', exclude=[f(x), df, f(x).diff(x, 2)]) c3 = Wild('c3', exclude=[f(x), df, f(x).diff(x, 2)]) r3 = {'xi': xi, 'eta': eta} # Used for the lie_group hint boundary = {} # Used to extract initial conditions C1 = Symbol("C1") eq = expand(eq) # Preprocessing to get the initial conditions out if ics is not None: for funcarg in ics: # Separating derivatives if isinstance(funcarg, (Subs, Derivative)): # f(x).diff(x).subs(x, 0) is a Subs, but f(x).diff(x).subs(x, # y) is a Derivative if isinstance(funcarg, Subs): deriv = funcarg.expr old = funcarg.variables[0] new = funcarg.point[0] elif isinstance(funcarg, Derivative): deriv = funcarg # No information on this. Just assume it was x old = x new = funcarg.variables[0] if (isinstance(deriv, Derivative) and isinstance(deriv.args[0], AppliedUndef) and deriv.args[0].func == f and len(deriv.args[0].args) == 1 and old == x and not new.has(x) and all(i == deriv.variables[0] for i in deriv.variables) and not ics[funcarg].has(f)): dorder = ode_order(deriv, x) temp = 'f' + str(dorder) boundary.update({temp: new, temp + 'val': ics[funcarg]}) else: raise ValueError("Enter valid boundary conditions for Derivatives") # Separating functions elif isinstance(funcarg, AppliedUndef): if (funcarg.func == f and len(funcarg.args) == 1 and not funcarg.args[0].has(x) and not ics[funcarg].has(f)): boundary.update({'f0': funcarg.args[0], 'f0val': ics[funcarg]}) else: raise ValueError("Enter valid boundary conditions for Function") else: raise ValueError("Enter boundary conditions of the form ics={f(point}: value, f(x).diff(x, order).subs(x, point): value}") # Precondition to try remove f(x) from highest order derivative reduced_eq = None if eq.is_Add: deriv_coef = eq.coeff(f(x).diff(x, order)) if deriv_coef not in (1, 0): r = deriv_coef.match(a*f(x)**c1) if r and r[c1]: den = f(x)**r[c1] reduced_eq = Add(*[arg/den for arg in eq.args]) if not reduced_eq: reduced_eq = eq if order == 1: ## Linear case: a(x)*y'+b(x)*y+c(x) == 0 if eq.is_Add: ind, dep = reduced_eq.as_independent(f) else: u = Dummy('u') ind, dep = (reduced_eq + u).as_independent(f) ind, dep = [tmp.subs(u, 0) for tmp in [ind, dep]] r = {a: dep.coeff(df), b: dep.coeff(f(x)), c: ind} # double check f[a] since the preconditioning may have failed if not r[a].has(f) and not r[b].has(f) and ( r[a]*df + r[b]*f(x) + r[c]).expand() - reduced_eq == 0: r['a'] = a r['b'] = b r['c'] = c matching_hints["1st_linear"] = r matching_hints["1st_linear_Integral"] = r ## Bernoulli case: a(x)*y'+b(x)*y+c(x)*y**n == 0 r = collect( reduced_eq, f(x), exact=True).match(a*df + b*f(x) + c*f(x)**n) if r and r[c] != 0 and r[n] != 1: # See issue 4676 r['a'] = a r['b'] = b r['c'] = c r['n'] = n matching_hints["Bernoulli"] = r matching_hints["Bernoulli_Integral"] = r ## Riccati special n == -2 case: a2*y'+b2*y**2+c2*y/x+d2/x**2 == 0 r = collect(reduced_eq, f(x), exact=True).match(a2*df + b2*f(x)**2 + c2*f(x)/x + d2/x**2) if r and r[b2] != 0 and (r[c2] != 0 or r[d2] != 0): r['a2'] = a2 r['b2'] = b2 r['c2'] = c2 r['d2'] = d2 matching_hints["Riccati_special_minus2"] = r # NON-REDUCED FORM OF EQUATION matches r = collect(eq, df, exact=True).match(d + e * df) if r: r['d'] = d r['e'] = e r['y'] = y r[d] = r[d].subs(f(x), y) r[e] = r[e].subs(f(x), y) # FIRST ORDER POWER SERIES WHICH NEEDS INITIAL CONDITIONS # TODO: Hint first order series should match only if d/e is analytic. # For now, only d/e and (d/e).diff(arg) is checked for existence at # at a given point. # This is currently done internally in ode_1st_power_series. point = boundary.get('f0', 0) value = boundary.get('f0val', C1) check = cancel(r[d]/r[e]) check1 = check.subs({x: point, y: value}) if not check1.has(oo) and not check1.has(zoo) and \ not check1.has(NaN) and not check1.has(-oo): check2 = (check1.diff(x)).subs({x: point, y: value}) if not check2.has(oo) and not check2.has(zoo) and \ not check2.has(NaN) and not check2.has(-oo): rseries = r.copy() rseries.update({'terms': terms, 'f0': point, 'f0val': value}) matching_hints["1st_power_series"] = rseries r3.update(r) ## Exact Differential Equation: P(x, y) + Q(x, y)*y' = 0 where # dP/dy == dQ/dx try: if r[d] != 0: numerator = simplify(r[d].diff(y) - r[e].diff(x)) # The following few conditions try to convert a non-exact # differential equation into an exact one. # References : Differential equations with applications # and historical notes - George E. Simmons if numerator: # If (dP/dy - dQ/dx) / Q = f(x) # then exp(integral(f(x))*equation becomes exact factor = simplify(numerator/r[e]) variables = factor.free_symbols if len(variables) == 1 and x == variables.pop(): factor = exp(Integral(factor).doit()) r[d] *= factor r[e] *= factor matching_hints["1st_exact"] = r matching_hints["1st_exact_Integral"] = r else: # If (dP/dy - dQ/dx) / -P = f(y) # then exp(integral(f(y))*equation becomes exact factor = simplify(-numerator/r[d]) variables = factor.free_symbols if len(variables) == 1 and y == variables.pop(): factor = exp(Integral(factor).doit()) r[d] *= factor r[e] *= factor matching_hints["1st_exact"] = r matching_hints["1st_exact_Integral"] = r else: matching_hints["1st_exact"] = r matching_hints["1st_exact_Integral"] = r except NotImplementedError: # Differentiating the coefficients might fail because of things # like f(2*x).diff(x). See issue 4624 and issue 4719. pass # Any first order ODE can be ideally solved by the Lie Group # method matching_hints["lie_group"] = r3 # This match is used for several cases below; we now collect on # f(x) so the matching works. r = collect(reduced_eq, df, exact=True).match(d + e*df) if r: # Using r[d] and r[e] without any modification for hints # linear-coefficients and separable-reduced. num, den = r[d], r[e] # ODE = d/e + df r['d'] = d r['e'] = e r['y'] = y r[d] = num.subs(f(x), y) r[e] = den.subs(f(x), y) ## Separable Case: y' == P(y)*Q(x) r[d] = separatevars(r[d]) r[e] = separatevars(r[e]) # m1[coeff]*m1[x]*m1[y] + m2[coeff]*m2[x]*m2[y]*y' m1 = separatevars(r[d], dict=True, symbols=(x, y)) m2 = separatevars(r[e], dict=True, symbols=(x, y)) if m1 and m2: r1 = {'m1': m1, 'm2': m2, 'y': y} matching_hints["separable"] = r1 matching_hints["separable_Integral"] = r1 ## First order equation with homogeneous coefficients: # dy/dx == F(y/x) or dy/dx == F(x/y) ordera = homogeneous_order(r[d], x, y) if ordera is not None: orderb = homogeneous_order(r[e], x, y) if ordera == orderb: # u1=y/x and u2=x/y u1 = Dummy('u1') u2 = Dummy('u2') s = "1st_homogeneous_coeff_subs" s1 = s + "_dep_div_indep" s2 = s + "_indep_div_dep" if simplify((r[d] + u1*r[e]).subs({x: 1, y: u1})) != 0: matching_hints[s1] = r matching_hints[s1 + "_Integral"] = r if simplify((r[e] + u2*r[d]).subs({x: u2, y: 1})) != 0: matching_hints[s2] = r matching_hints[s2 + "_Integral"] = r if s1 in matching_hints and s2 in matching_hints: matching_hints["1st_homogeneous_coeff_best"] = r ## Linear coefficients of the form # y'+ F((a*x + b*y + c)/(a'*x + b'y + c')) = 0 # that can be reduced to homogeneous form. F = num/den params = _linear_coeff_match(F, func) if params: xarg, yarg = params u = Dummy('u') t = Dummy('t') # Dummy substitution for df and f(x). dummy_eq = reduced_eq.subs(((df, t), (f(x), u))) reps = ((x, x + xarg), (u, u + yarg), (t, df), (u, f(x))) dummy_eq = simplify(dummy_eq.subs(reps)) # get the re-cast values for e and d r2 = collect(expand(dummy_eq), [df, f(x)]).match(e*df + d) if r2: orderd = homogeneous_order(r2[d], x, f(x)) if orderd is not None: ordere = homogeneous_order(r2[e], x, f(x)) if orderd == ordere: # Match arguments are passed in such a way that it # is coherent with the already existing homogeneous # functions. r2[d] = r2[d].subs(f(x), y) r2[e] = r2[e].subs(f(x), y) r2.update({'xarg': xarg, 'yarg': yarg, 'd': d, 'e': e, 'y': y}) matching_hints["linear_coefficients"] = r2 matching_hints["linear_coefficients_Integral"] = r2 ## Equation of the form y' + (y/x)*H(x^n*y) = 0 # that can be reduced to separable form factor = simplify(x/f(x)*num/den) # Try representing factor in terms of x^n*y # where n is lowest power of x in factor; # first remove terms like sqrt(2)*3 from factor.atoms(Mul) u = None for mul in ordered(factor.atoms(Mul)): if mul.has(x): _, u = mul.as_independent(x, f(x)) break if u and u.has(f(x)): h = x**(degree(Poly(u.subs(f(x), y), gen=x)))*f(x) p = Wild('p') if (u/h == 1) or ((u/h).simplify().match(x**p)): t = Dummy('t') r2 = {'t': t} xpart, ypart = u.as_independent(f(x)) test = factor.subs(((u, t), (1/u, 1/t))) free = test.free_symbols if len(free) == 1 and free.pop() == t: r2.update({'power': xpart.as_base_exp()[1], 'u': test}) matching_hints["separable_reduced"] = r2 matching_hints["separable_reduced_Integral"] = r2 ## Almost-linear equation of the form f(x)*g(y)*y' + k(x)*l(y) + m(x) = 0 r = collect(eq, [df, f(x)]).match(e*df + d) if r: r2 = r.copy() r2[c] = S.Zero if r2[d].is_Add: # Separate the terms having f(x) to r[d] and # remaining to r[c] no_f, r2[d] = r2[d].as_independent(f(x)) r2[c] += no_f factor = simplify(r2[d].diff(f(x))/r[e]) if factor and not factor.has(f(x)): r2[d] = factor_terms(r2[d]) u = r2[d].as_independent(f(x), as_Add=False)[1] r2.update({'a': e, 'b': d, 'c': c, 'u': u}) r2[d] /= u r2[e] /= u.diff(f(x)) matching_hints["almost_linear"] = r2 matching_hints["almost_linear_Integral"] = r2 elif order == 2: # Liouville ODE in the form # f(x).diff(x, 2) + g(f(x))*(f(x).diff(x))**2 + h(x)*f(x).diff(x) # See Goldstein and Braun, "Advanced Methods for the Solution of # Differential Equations", pg. 98 s = d*f(x).diff(x, 2) + e*df**2 + k*df r = reduced_eq.match(s) if r and r[d] != 0: y = Dummy('y') g = simplify(r[e]/r[d]).subs(f(x), y) h = simplify(r[k]/r[d]).subs(f(x), y) if y in h.free_symbols or x in g.free_symbols: pass else: r = {'g': g, 'h': h, 'y': y} matching_hints["Liouville"] = r matching_hints["Liouville_Integral"] = r # Homogeneous second order differential equation of the form # a3*f(x).diff(x, 2) + b3*f(x).diff(x) + c3, where # for simplicity, a3, b3 and c3 are assumed to be polynomials. # It has a definite power series solution at point x0 if, b3/a3 and c3/a3 # are analytic at x0. deq = a3*(f(x).diff(x, 2)) + b3*df + c3*f(x) r = collect(reduced_eq, [f(x).diff(x, 2), f(x).diff(x), f(x)]).match(deq) ordinary = False if r and r[a3] != 0: if all([r[key].is_polynomial() for key in r]): p = cancel(r[b3]/r[a3]) # Used below q = cancel(r[c3]/r[a3]) # Used below point = kwargs.get('x0', 0) check = p.subs(x, point) if not check.has(oo) and not check.has(NaN) and \ not check.has(zoo) and not check.has(-oo): check = q.subs(x, point) if not check.has(oo) and not check.has(NaN) and \ not check.has(zoo) and not check.has(-oo): ordinary = True r.update({'a3': a3, 'b3': b3, 'c3': c3, 'x0': point, 'terms': terms}) matching_hints["2nd_power_series_ordinary"] = r # Checking if the differential equation has a regular singular point # at x0. It has a regular singular point at x0, if (b3/a3)*(x - x0) # and (c3/a3)*((x - x0)**2) are analytic at x0. if not ordinary: p = cancel((x - point)*p) check = p.subs(x, point) if not check.has(oo) and not check.has(NaN) and \ not check.has(zoo) and not check.has(-oo): q = cancel(((x - point)**2)*q) check = q.subs(x, point) if not check.has(oo) and not check.has(NaN) and \ not check.has(zoo) and not check.has(-oo): coeff_dict = {'p': p, 'q': q, 'x0': point, 'terms': terms} matching_hints["2nd_power_series_regular"] = coeff_dict if order > 0: # Any ODE that can be solved with a substitution and # repeated integration e.g.: # `d^2/dx^2(y) + x*d/dx(y) = constant #f'(x) must be finite for this to work r = _nth_order_reducible_match(reduced_eq, func) if r: matching_hints['nth_order_reducible'] = r # Any ODE that can be solved with a combination of algebra and # integrals e.g.: # d^3/dx^3(x y) = F(x) r = _nth_algebraic_match(reduced_eq, func) if r['solutions']: matching_hints['nth_algebraic'] = r matching_hints['nth_algebraic_Integral'] = r # nth order linear ODE # a_n(x)y^(n) + ... + a_1(x)y' + a_0(x)y = F(x) = b r = _nth_linear_match(reduced_eq, func, order) # Constant coefficient case (a_i is constant for all i) if r and not any(r[i].has(x) for i in r if i >= 0): # Inhomogeneous case: F(x) is not identically 0 if r[-1]: undetcoeff = _undetermined_coefficients_match(r[-1], x) s = "nth_linear_constant_coeff_variation_of_parameters" matching_hints[s] = r matching_hints[s + "_Integral"] = r if undetcoeff['test']: r['trialset'] = undetcoeff['trialset'] matching_hints[ "nth_linear_constant_coeff_undetermined_coefficients" ] = r # Homogeneous case: F(x) is identically 0 else: matching_hints["nth_linear_constant_coeff_homogeneous"] = r # nth order Euler equation a_n*x**n*y^(n) + ... + a_1*x*y' + a_0*y = F(x) #In case of Homogeneous euler equation F(x) = 0 def _test_term(coeff, order): r""" Linear Euler ODEs have the form K*x**order*diff(y(x),x,order) = F(x), where K is independent of x and y(x), order>= 0. So we need to check that for each term, coeff == K*x**order from some K. We have a few cases, since coeff may have several different types. """ if order < 0: raise ValueError("order should be greater than 0") if coeff == 0: return True if order == 0: if x in coeff.free_symbols: return False return True if coeff.is_Mul: if coeff.has(f(x)): return False return x**order in coeff.args elif coeff.is_Pow: return coeff.as_base_exp() == (x, order) elif order == 1: return x == coeff return False # Find coefficient for highest derivative, multiply coefficients to # bring the equation into Euler form if possible r_rescaled = None if r is not None: coeff = r[order] factor = x**order / coeff r_rescaled = {i: factor*r[i] for i in r} if r_rescaled and not any(not _test_term(r_rescaled[i], i) for i in r_rescaled if i != 'trialset' and i >= 0): if not r_rescaled[-1]: matching_hints["nth_linear_euler_eq_homogeneous"] = r_rescaled else: matching_hints["nth_linear_euler_eq_nonhomogeneous_variation_of_parameters"] = r_rescaled matching_hints["nth_linear_euler_eq_nonhomogeneous_variation_of_parameters_Integral"] = r_rescaled e, re = posify(r_rescaled[-1].subs(x, exp(x))) undetcoeff = _undetermined_coefficients_match(e.subs(re), x) if undetcoeff['test']: r_rescaled['trialset'] = undetcoeff['trialset'] matching_hints["nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients"] = r_rescaled # Order keys based on allhints. retlist = [i for i in allhints if i in matching_hints] if dict: # Dictionaries are ordered arbitrarily, so make note of which # hint would come first for dsolve(). Use an ordered dict in Py 3. matching_hints["default"] = retlist[0] if retlist else None matching_hints["ordered_hints"] = tuple(retlist) return matching_hints else: return tuple(retlist) def classify_sysode(eq, funcs=None, **kwargs): r""" Returns a dictionary of parameter names and values that define the system of ordinary differential equations in ``eq``. The parameters are further used in :py:meth:`~sympy.solvers.ode.dsolve` for solving that system. The parameter names and values are: 'is_linear' (boolean), which tells whether the given system is linear. Note that "linear" here refers to the operator: terms such as ``x*diff(x,t)`` are nonlinear, whereas terms like ``sin(t)*diff(x,t)`` are still linear operators. 'func' (list) contains the :py:class:`~sympy.core.function.Function`s that appear with a derivative in the ODE, i.e. those that we are trying to solve the ODE for. 'order' (dict) with the maximum derivative for each element of the 'func' parameter. 'func_coeff' (dict) with the coefficient for each triple ``(equation number, function, order)```. The coefficients are those subexpressions that do not appear in 'func', and hence can be considered constant for purposes of ODE solving. 'eq' (list) with the equations from ``eq``, sympified and transformed into expressions (we are solving for these expressions to be zero). 'no_of_equations' (int) is the number of equations (same as ``len(eq)``). 'type_of_equation' (string) is an internal classification of the type of ODE. References ========== -http://eqworld.ipmnet.ru/en/solutions/sysode/sode-toc1.htm -A. D. Polyanin and A. V. Manzhirov, Handbook of Mathematics for Engineers and Scientists Examples ======== >>> from sympy import Function, Eq, symbols, diff >>> from sympy.solvers.ode import classify_sysode >>> from sympy.abc import t >>> f, x, y = symbols('f, x, y', cls=Function) >>> k, l, m, n = symbols('k, l, m, n', Integer=True) >>> x1 = diff(x(t), t) ; y1 = diff(y(t), t) >>> x2 = diff(x(t), t, t) ; y2 = diff(y(t), t, t) >>> eq = (Eq(5*x1, 12*x(t) - 6*y(t)), Eq(2*y1, 11*x(t) + 3*y(t))) >>> classify_sysode(eq) {'eq': [-12*x(t) + 6*y(t) + 5*Derivative(x(t), t), -11*x(t) - 3*y(t) + 2*Derivative(y(t), t)], 'func': [x(t), y(t)], 'func_coeff': {(0, x(t), 0): -12, (0, x(t), 1): 5, (0, y(t), 0): 6, (0, y(t), 1): 0, (1, x(t), 0): -11, (1, x(t), 1): 0, (1, y(t), 0): -3, (1, y(t), 1): 2}, 'is_linear': True, 'no_of_equation': 2, 'order': {x(t): 1, y(t): 1}, 'type_of_equation': 'type1'} >>> eq = (Eq(diff(x(t),t), 5*t*x(t) + t**2*y(t)), Eq(diff(y(t),t), -t**2*x(t) + 5*t*y(t))) >>> classify_sysode(eq) {'eq': [-t**2*y(t) - 5*t*x(t) + Derivative(x(t), t), t**2*x(t) - 5*t*y(t) + Derivative(y(t), t)], 'func': [x(t), y(t)], 'func_coeff': {(0, x(t), 0): -5*t, (0, x(t), 1): 1, (0, y(t), 0): -t**2, (0, y(t), 1): 0, (1, x(t), 0): t**2, (1, x(t), 1): 0, (1, y(t), 0): -5*t, (1, y(t), 1): 1}, 'is_linear': True, 'no_of_equation': 2, 'order': {x(t): 1, y(t): 1}, 'type_of_equation': 'type4'} """ # Sympify equations and convert iterables of equations into # a list of equations def _sympify(eq): return list(map(sympify, eq if iterable(eq) else [eq])) eq, funcs = (_sympify(w) for w in [eq, funcs]) for i, fi in enumerate(eq): if isinstance(fi, Equality): eq[i] = fi.lhs - fi.rhs matching_hints = {"no_of_equation":i+1} matching_hints['eq'] = eq if i==0: raise ValueError("classify_sysode() works for systems of ODEs. " "For scalar ODEs, classify_ode should be used") t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] # find all the functions if not given order = dict() if funcs==[None]: funcs = [] for eqs in eq: derivs = eqs.atoms(Derivative) func = set().union(*[d.atoms(AppliedUndef) for d in derivs]) for func_ in func: funcs.append(func_) funcs = list(set(funcs)) if len(funcs) != len(eq): raise ValueError("Number of functions given is not equal to the number of equations %s" % funcs) func_dict = dict() for func in funcs: if not order.get(func, False): max_order = 0 for i, eqs_ in enumerate(eq): order_ = ode_order(eqs_,func) if max_order < order_: max_order = order_ eq_no = i if eq_no in func_dict: list_func = [] list_func.append(func_dict[eq_no]) list_func.append(func) func_dict[eq_no] = list_func else: func_dict[eq_no] = func order[func] = max_order funcs = [func_dict[i] for i in range(len(func_dict))] matching_hints['func'] = funcs for func in funcs: if isinstance(func, list): for func_elem in func: if len(func_elem.args) != 1: raise ValueError("dsolve() and classify_sysode() work with " "functions of one variable only, not %s" % func) else: if func and len(func.args) != 1: raise ValueError("dsolve() and classify_sysode() work with " "functions of one variable only, not %s" % func) # find the order of all equation in system of odes matching_hints["order"] = order # find coefficients of terms f(t), diff(f(t),t) and higher derivatives # and similarly for other functions g(t), diff(g(t),t) in all equations. # Here j denotes the equation number, funcs[l] denotes the function about # which we are talking about and k denotes the order of function funcs[l] # whose coefficient we are calculating. def linearity_check(eqs, j, func, is_linear_): for k in range(order[func] + 1): func_coef[j, func, k] = collect(eqs.expand(), [diff(func, t, k)]).coeff(diff(func, t, k)) if is_linear_ == True: if func_coef[j, func, k] == 0: if k == 0: coef = eqs.as_independent(func, as_Add=True)[1] for xr in range(1, ode_order(eqs,func) + 1): coef -= eqs.as_independent(diff(func, t, xr), as_Add=True)[1] if coef != 0: is_linear_ = False else: if eqs.as_independent(diff(func, t, k), as_Add=True)[1]: is_linear_ = False else: for func_ in funcs: if isinstance(func_, list): for elem_func_ in func_: dep = func_coef[j, func, k].as_independent(elem_func_, as_Add=True)[1] if dep != 0: is_linear_ = False else: dep = func_coef[j, func, k].as_independent(func_, as_Add=True)[1] if dep != 0: is_linear_ = False return is_linear_ func_coef = {} is_linear = True for j, eqs in enumerate(eq): for func in funcs: if isinstance(func, list): for func_elem in func: is_linear = linearity_check(eqs, j, func_elem, is_linear) else: is_linear = linearity_check(eqs, j, func, is_linear) matching_hints['func_coeff'] = func_coef matching_hints['is_linear'] = is_linear if len(set(order.values())) == 1: order_eq = list(matching_hints['order'].values())[0] if matching_hints['is_linear'] == True: if matching_hints['no_of_equation'] == 2: if order_eq == 1: type_of_equation = check_linear_2eq_order1(eq, funcs, func_coef) elif order_eq == 2: type_of_equation = check_linear_2eq_order2(eq, funcs, func_coef) else: type_of_equation = None elif matching_hints['no_of_equation'] == 3: if order_eq == 1: type_of_equation = check_linear_3eq_order1(eq, funcs, func_coef) if type_of_equation is None: type_of_equation = check_linear_neq_order1(eq, funcs, func_coef) else: type_of_equation = None else: if order_eq == 1: type_of_equation = check_linear_neq_order1(eq, funcs, func_coef) else: type_of_equation = None else: if matching_hints['no_of_equation'] == 2: if order_eq == 1: type_of_equation = check_nonlinear_2eq_order1(eq, funcs, func_coef) else: type_of_equation = None elif matching_hints['no_of_equation'] == 3: if order_eq == 1: type_of_equation = check_nonlinear_3eq_order1(eq, funcs, func_coef) else: type_of_equation = None else: type_of_equation = None else: type_of_equation = None matching_hints['type_of_equation'] = type_of_equation return matching_hints def check_linear_2eq_order1(eq, func, func_coef): x = func[0].func y = func[1].func fc = func_coef t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] r = dict() # for equations Eq(a1*diff(x(t),t), b1*x(t) + c1*y(t) + d1) # and Eq(a2*diff(y(t),t), b2*x(t) + c2*y(t) + d2) r['a1'] = fc[0,x(t),1] ; r['a2'] = fc[1,y(t),1] r['b1'] = -fc[0,x(t),0]/fc[0,x(t),1] ; r['b2'] = -fc[1,x(t),0]/fc[1,y(t),1] r['c1'] = -fc[0,y(t),0]/fc[0,x(t),1] ; r['c2'] = -fc[1,y(t),0]/fc[1,y(t),1] forcing = [S(0),S(0)] for i in range(2): for j in Add.make_args(eq[i]): if not j.has(x(t), y(t)): forcing[i] += j if not (forcing[0].has(t) or forcing[1].has(t)): # We can handle homogeneous case and simple constant forcings r['d1'] = forcing[0] r['d2'] = forcing[1] else: # Issue #9244: nonhomogeneous linear systems are not supported return None # Conditions to check for type 6 whose equations are Eq(diff(x(t),t), f(t)*x(t) + g(t)*y(t)) and # Eq(diff(y(t),t), a*[f(t) + a*h(t)]x(t) + a*[g(t) - h(t)]*y(t)) p = 0 q = 0 p1 = cancel(r['b2']/(cancel(r['b2']/r['c2']).as_numer_denom()[0])) p2 = cancel(r['b1']/(cancel(r['b1']/r['c1']).as_numer_denom()[0])) for n, i in enumerate([p1, p2]): for j in Mul.make_args(collect_const(i)): if not j.has(t): q = j if q and n==0: if ((r['b2']/j - r['b1'])/(r['c1'] - r['c2']/j)) == j: p = 1 elif q and n==1: if ((r['b1']/j - r['b2'])/(r['c2'] - r['c1']/j)) == j: p = 2 # End of condition for type 6 if r['d1']!=0 or r['d2']!=0: if not r['d1'].has(t) and not r['d2'].has(t): if all(not r[k].has(t) for k in 'a1 a2 b1 b2 c1 c2'.split()): # Equations for type 2 are Eq(a1*diff(x(t),t),b1*x(t)+c1*y(t)+d1) and Eq(a2*diff(y(t),t),b2*x(t)+c2*y(t)+d2) return "type2" else: return None else: if all(not r[k].has(t) for k in 'a1 a2 b1 b2 c1 c2'.split()): # Equations for type 1 are Eq(a1*diff(x(t),t),b1*x(t)+c1*y(t)) and Eq(a2*diff(y(t),t),b2*x(t)+c2*y(t)) return "type1" else: r['b1'] = r['b1']/r['a1'] ; r['b2'] = r['b2']/r['a2'] r['c1'] = r['c1']/r['a1'] ; r['c2'] = r['c2']/r['a2'] if (r['b1'] == r['c2']) and (r['c1'] == r['b2']): # Equation for type 3 are Eq(diff(x(t),t), f(t)*x(t) + g(t)*y(t)) and Eq(diff(y(t),t), g(t)*x(t) + f(t)*y(t)) return "type3" elif (r['b1'] == r['c2']) and (r['c1'] == -r['b2']) or (r['b1'] == -r['c2']) and (r['c1'] == r['b2']): # Equation for type 4 are Eq(diff(x(t),t), f(t)*x(t) + g(t)*y(t)) and Eq(diff(y(t),t), -g(t)*x(t) + f(t)*y(t)) return "type4" elif (not cancel(r['b2']/r['c1']).has(t) and not cancel((r['c2']-r['b1'])/r['c1']).has(t)) \ or (not cancel(r['b1']/r['c2']).has(t) and not cancel((r['c1']-r['b2'])/r['c2']).has(t)): # Equations for type 5 are Eq(diff(x(t),t), f(t)*x(t) + g(t)*y(t)) and Eq(diff(y(t),t), a*g(t)*x(t) + [f(t) + b*g(t)]*y(t) return "type5" elif p: return "type6" else: # Equations for type 7 are Eq(diff(x(t),t), f(t)*x(t) + g(t)*y(t)) and Eq(diff(y(t),t), h(t)*x(t) + p(t)*y(t)) return "type7" def check_linear_2eq_order2(eq, func, func_coef): x = func[0].func y = func[1].func fc = func_coef t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] r = dict() a = Wild('a', exclude=[1/t]) b = Wild('b', exclude=[1/t**2]) u = Wild('u', exclude=[t, t**2]) v = Wild('v', exclude=[t, t**2]) w = Wild('w', exclude=[t, t**2]) p = Wild('p', exclude=[t, t**2]) r['a1'] = fc[0,x(t),2] ; r['a2'] = fc[1,y(t),2] r['b1'] = fc[0,x(t),1] ; r['b2'] = fc[1,x(t),1] r['c1'] = fc[0,y(t),1] ; r['c2'] = fc[1,y(t),1] r['d1'] = fc[0,x(t),0] ; r['d2'] = fc[1,x(t),0] r['e1'] = fc[0,y(t),0] ; r['e2'] = fc[1,y(t),0] const = [S(0), S(0)] for i in range(2): for j in Add.make_args(eq[i]): if not (j.has(x(t)) or j.has(y(t))): const[i] += j r['f1'] = const[0] r['f2'] = const[1] if r['f1']!=0 or r['f2']!=0: if all(not r[k].has(t) for k in 'a1 a2 d1 d2 e1 e2 f1 f2'.split()) \ and r['b1']==r['c1']==r['b2']==r['c2']==0: return "type2" elif all(not r[k].has(t) for k in 'a1 a2 b1 b2 c1 c2 d1 d2 e1 e1'.split()): p = [S(0), S(0)] ; q = [S(0), S(0)] for n, e in enumerate([r['f1'], r['f2']]): if e.has(t): tpart = e.as_independent(t, Mul)[1] for i in Mul.make_args(tpart): if i.has(exp): b, e = i.as_base_exp() co = e.coeff(t) if co and not co.has(t) and co.has(I): p[n] = 1 else: q[n] = 1 else: q[n] = 1 else: q[n] = 1 if p[0]==1 and p[1]==1 and q[0]==0 and q[1]==0: return "type4" else: return None else: return None else: if r['b1']==r['b2']==r['c1']==r['c2']==0 and all(not r[k].has(t) \ for k in 'a1 a2 d1 d2 e1 e2'.split()): return "type1" elif r['b1']==r['e1']==r['c2']==r['d2']==0 and all(not r[k].has(t) \ for k in 'a1 a2 b2 c1 d1 e2'.split()) and r['c1'] == -r['b2'] and \ r['d1'] == r['e2']: return "type3" elif cancel(-r['b2']/r['d2'])==t and cancel(-r['c1']/r['e1'])==t and not \ (r['d2']/r['a2']).has(t) and not (r['e1']/r['a1']).has(t) and \ r['b1']==r['d1']==r['c2']==r['e2']==0: return "type5" elif ((r['a1']/r['d1']).expand()).match((p*(u*t**2+v*t+w)**2).expand()) and not \ (cancel(r['a1']*r['d2']/(r['a2']*r['d1']))).has(t) and not (r['d1']/r['e1']).has(t) and not \ (r['d2']/r['e2']).has(t) and r['b1'] == r['b2'] == r['c1'] == r['c2'] == 0: return "type10" elif not cancel(r['d1']/r['e1']).has(t) and not cancel(r['d2']/r['e2']).has(t) and not \ cancel(r['d1']*r['a2']/(r['d2']*r['a1'])).has(t) and r['b1']==r['b2']==r['c1']==r['c2']==0: return "type6" elif not cancel(r['b1']/r['c1']).has(t) and not cancel(r['b2']/r['c2']).has(t) and not \ cancel(r['b1']*r['a2']/(r['b2']*r['a1'])).has(t) and r['d1']==r['d2']==r['e1']==r['e2']==0: return "type7" elif cancel(-r['b2']/r['d2'])==t and cancel(-r['c1']/r['e1'])==t and not \ cancel(r['e1']*r['a2']/(r['d2']*r['a1'])).has(t) and r['e1'].has(t) \ and r['b1']==r['d1']==r['c2']==r['e2']==0: return "type8" elif (r['b1']/r['a1']).match(a/t) and (r['b2']/r['a2']).match(a/t) and not \ (r['b1']/r['c1']).has(t) and not (r['b2']/r['c2']).has(t) and \ (r['d1']/r['a1']).match(b/t**2) and (r['d2']/r['a2']).match(b/t**2) \ and not (r['d1']/r['e1']).has(t) and not (r['d2']/r['e2']).has(t): return "type9" elif -r['b1']/r['d1']==-r['c1']/r['e1']==-r['b2']/r['d2']==-r['c2']/r['e2']==t: return "type11" else: return None def check_linear_3eq_order1(eq, func, func_coef): x = func[0].func y = func[1].func z = func[2].func fc = func_coef t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] r = dict() r['a1'] = fc[0,x(t),1]; r['a2'] = fc[1,y(t),1]; r['a3'] = fc[2,z(t),1] r['b1'] = fc[0,x(t),0]; r['b2'] = fc[1,x(t),0]; r['b3'] = fc[2,x(t),0] r['c1'] = fc[0,y(t),0]; r['c2'] = fc[1,y(t),0]; r['c3'] = fc[2,y(t),0] r['d1'] = fc[0,z(t),0]; r['d2'] = fc[1,z(t),0]; r['d3'] = fc[2,z(t),0] forcing = [S(0), S(0), S(0)] for i in range(3): for j in Add.make_args(eq[i]): if not j.has(x(t), y(t), z(t)): forcing[i] += j if forcing[0].has(t) or forcing[1].has(t) or forcing[2].has(t): # We can handle homogeneous case and simple constant forcings. # Issue #9244: nonhomogeneous linear systems are not supported return None if all(not r[k].has(t) for k in 'a1 a2 a3 b1 b2 b3 c1 c2 c3 d1 d2 d3'.split()): if r['c1']==r['d1']==r['d2']==0: return 'type1' elif r['c1'] == -r['b2'] and r['d1'] == -r['b3'] and r['d2'] == -r['c3'] \ and r['b1'] == r['c2'] == r['d3'] == 0: return 'type2' elif r['b1'] == r['c2'] == r['d3'] == 0 and r['c1']/r['a1'] == -r['d1']/r['a1'] \ and r['d2']/r['a2'] == -r['b2']/r['a2'] and r['b3']/r['a3'] == -r['c3']/r['a3']: return 'type3' else: return None else: for k1 in 'c1 d1 b2 d2 b3 c3'.split(): if r[k1] == 0: continue else: if all(not cancel(r[k1]/r[k]).has(t) for k in 'd1 b2 d2 b3 c3'.split() if r[k]!=0) \ and all(not cancel(r[k1]/(r['b1'] - r[k])).has(t) for k in 'b1 c2 d3'.split() if r['b1']!=r[k]): return 'type4' else: break return None def check_linear_neq_order1(eq, func, func_coef): fc = func_coef t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] n = len(eq) for i in range(n): for j in range(n): if (fc[i, func[j], 0]/fc[i, func[i], 1]).has(t): return None if len(eq) == 3: return 'type6' return 'type1' def check_nonlinear_2eq_order1(eq, func, func_coef): t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] f = Wild('f') g = Wild('g') u, v = symbols('u, v', cls=Dummy) def check_type(x, y): r1 = eq[0].match(t*diff(x(t),t) - x(t) + f) r2 = eq[1].match(t*diff(y(t),t) - y(t) + g) if not (r1 and r2): r1 = eq[0].match(diff(x(t),t) - x(t)/t + f/t) r2 = eq[1].match(diff(y(t),t) - y(t)/t + g/t) if not (r1 and r2): r1 = (-eq[0]).match(t*diff(x(t),t) - x(t) + f) r2 = (-eq[1]).match(t*diff(y(t),t) - y(t) + g) if not (r1 and r2): r1 = (-eq[0]).match(diff(x(t),t) - x(t)/t + f/t) r2 = (-eq[1]).match(diff(y(t),t) - y(t)/t + g/t) if r1 and r2 and not (r1[f].subs(diff(x(t),t),u).subs(diff(y(t),t),v).has(t) \ or r2[g].subs(diff(x(t),t),u).subs(diff(y(t),t),v).has(t)): return 'type5' else: return None for func_ in func: if isinstance(func_, list): x = func[0][0].func y = func[0][1].func eq_type = check_type(x, y) if not eq_type: eq_type = check_type(y, x) return eq_type x = func[0].func y = func[1].func fc = func_coef n = Wild('n', exclude=[x(t),y(t)]) f1 = Wild('f1', exclude=[v,t]) f2 = Wild('f2', exclude=[v,t]) g1 = Wild('g1', exclude=[u,t]) g2 = Wild('g2', exclude=[u,t]) for i in range(2): eqs = 0 for terms in Add.make_args(eq[i]): eqs += terms/fc[i,func[i],1] eq[i] = eqs r = eq[0].match(diff(x(t),t) - x(t)**n*f) if r: g = (diff(y(t),t) - eq[1])/r[f] if r and not (g.has(x(t)) or g.subs(y(t),v).has(t) or r[f].subs(x(t),u).subs(y(t),v).has(t)): return 'type1' r = eq[0].match(diff(x(t),t) - exp(n*x(t))*f) if r: g = (diff(y(t),t) - eq[1])/r[f] if r and not (g.has(x(t)) or g.subs(y(t),v).has(t) or r[f].subs(x(t),u).subs(y(t),v).has(t)): return 'type2' g = Wild('g') r1 = eq[0].match(diff(x(t),t) - f) r2 = eq[1].match(diff(y(t),t) - g) if r1 and r2 and not (r1[f].subs(x(t),u).subs(y(t),v).has(t) or \ r2[g].subs(x(t),u).subs(y(t),v).has(t)): return 'type3' r1 = eq[0].match(diff(x(t),t) - f) r2 = eq[1].match(diff(y(t),t) - g) num, den = ( (r1[f].subs(x(t),u).subs(y(t),v))/ (r2[g].subs(x(t),u).subs(y(t),v))).as_numer_denom() R1 = num.match(f1*g1) R2 = den.match(f2*g2) # phi = (r1[f].subs(x(t),u).subs(y(t),v))/num if R1 and R2: return 'type4' return None def check_nonlinear_2eq_order2(eq, func, func_coef): return None def check_nonlinear_3eq_order1(eq, func, func_coef): x = func[0].func y = func[1].func z = func[2].func fc = func_coef t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] u, v, w = symbols('u, v, w', cls=Dummy) a = Wild('a', exclude=[x(t), y(t), z(t), t]) b = Wild('b', exclude=[x(t), y(t), z(t), t]) c = Wild('c', exclude=[x(t), y(t), z(t), t]) f = Wild('f') F1 = Wild('F1') F2 = Wild('F2') F3 = Wild('F3') for i in range(3): eqs = 0 for terms in Add.make_args(eq[i]): eqs += terms/fc[i,func[i],1] eq[i] = eqs r1 = eq[0].match(diff(x(t),t) - a*y(t)*z(t)) r2 = eq[1].match(diff(y(t),t) - b*z(t)*x(t)) r3 = eq[2].match(diff(z(t),t) - c*x(t)*y(t)) if r1 and r2 and r3: num1, den1 = r1[a].as_numer_denom() num2, den2 = r2[b].as_numer_denom() num3, den3 = r3[c].as_numer_denom() if solve([num1*u-den1*(v-w), num2*v-den2*(w-u), num3*w-den3*(u-v)],[u, v]): return 'type1' r = eq[0].match(diff(x(t),t) - y(t)*z(t)*f) if r: r1 = collect_const(r[f]).match(a*f) r2 = ((diff(y(t),t) - eq[1])/r1[f]).match(b*z(t)*x(t)) r3 = ((diff(z(t),t) - eq[2])/r1[f]).match(c*x(t)*y(t)) if r1 and r2 and r3: num1, den1 = r1[a].as_numer_denom() num2, den2 = r2[b].as_numer_denom() num3, den3 = r3[c].as_numer_denom() if solve([num1*u-den1*(v-w), num2*v-den2*(w-u), num3*w-den3*(u-v)],[u, v]): return 'type2' r = eq[0].match(diff(x(t),t) - (F2-F3)) if r: r1 = collect_const(r[F2]).match(c*F2) r1.update(collect_const(r[F3]).match(b*F3)) if r1: if eq[1].has(r1[F2]) and not eq[1].has(r1[F3]): r1[F2], r1[F3] = r1[F3], r1[F2] r1[c], r1[b] = -r1[b], -r1[c] r2 = eq[1].match(diff(y(t),t) - a*r1[F3] + r1[c]*F1) if r2: r3 = (eq[2] == diff(z(t),t) - r1[b]*r2[F1] + r2[a]*r1[F2]) if r1 and r2 and r3: return 'type3' r = eq[0].match(diff(x(t),t) - z(t)*F2 + y(t)*F3) if r: r1 = collect_const(r[F2]).match(c*F2) r1.update(collect_const(r[F3]).match(b*F3)) if r1: if eq[1].has(r1[F2]) and not eq[1].has(r1[F3]): r1[F2], r1[F3] = r1[F3], r1[F2] r1[c], r1[b] = -r1[b], -r1[c] r2 = (diff(y(t),t) - eq[1]).match(a*x(t)*r1[F3] - r1[c]*z(t)*F1) if r2: r3 = (diff(z(t),t) - eq[2] == r1[b]*y(t)*r2[F1] - r2[a]*x(t)*r1[F2]) if r1 and r2 and r3: return 'type4' r = (diff(x(t),t) - eq[0]).match(x(t)*(F2 - F3)) if r: r1 = collect_const(r[F2]).match(c*F2) r1.update(collect_const(r[F3]).match(b*F3)) if r1: if eq[1].has(r1[F2]) and not eq[1].has(r1[F3]): r1[F2], r1[F3] = r1[F3], r1[F2] r1[c], r1[b] = -r1[b], -r1[c] r2 = (diff(y(t),t) - eq[1]).match(y(t)*(a*r1[F3] - r1[c]*F1)) if r2: r3 = (diff(z(t),t) - eq[2] == z(t)*(r1[b]*r2[F1] - r2[a]*r1[F2])) if r1 and r2 and r3: return 'type5' return None def check_nonlinear_3eq_order2(eq, func, func_coef): return None def checksysodesol(eqs, sols, func=None): r""" Substitutes corresponding ``sols`` for each functions into each ``eqs`` and checks that the result of substitutions for each equation is ``0``. The equations and solutions passed can be any iterable. This only works when each ``sols`` have one function only, like `x(t)` or `y(t)`. For each function, ``sols`` can have a single solution or a list of solutions. In most cases it will not be necessary to explicitly identify the function, but if the function cannot be inferred from the original equation it can be supplied through the ``func`` argument. When a sequence of equations is passed, the same sequence is used to return the result for each equation with each function substituted with corresponding solutions. It tries the following method to find zero equivalence for each equation: Substitute the solutions for functions, like `x(t)` and `y(t)` into the original equations containing those functions. This function returns a tuple. The first item in the tuple is ``True`` if the substitution results for each equation is ``0``, and ``False`` otherwise. The second item in the tuple is what the substitution results in. Each element of the ``list`` should always be ``0`` corresponding to each equation if the first item is ``True``. Note that sometimes this function may return ``False``, but with an expression that is identically equal to ``0``, instead of returning ``True``. This is because :py:meth:`~sympy.simplify.simplify.simplify` cannot reduce the expression to ``0``. If an expression returned by each function vanishes identically, then ``sols`` really is a solution to ``eqs``. If this function seems to hang, it is probably because of a difficult simplification. Examples ======== >>> from sympy import Eq, diff, symbols, sin, cos, exp, sqrt, S, Function >>> from sympy.solvers.ode import checksysodesol >>> C1, C2 = symbols('C1:3') >>> t = symbols('t') >>> x, y = symbols('x, y', cls=Function) >>> eq = (Eq(diff(x(t),t), x(t) + y(t) + 17), Eq(diff(y(t),t), -2*x(t) + y(t) + 12)) >>> sol = [Eq(x(t), (C1*sin(sqrt(2)*t) + C2*cos(sqrt(2)*t))*exp(t) - S(5)/3), ... Eq(y(t), (sqrt(2)*C1*cos(sqrt(2)*t) - sqrt(2)*C2*sin(sqrt(2)*t))*exp(t) - S(46)/3)] >>> checksysodesol(eq, sol) (True, [0, 0]) >>> eq = (Eq(diff(x(t),t),x(t)*y(t)**4), Eq(diff(y(t),t),y(t)**3)) >>> sol = [Eq(x(t), C1*exp(-1/(4*(C2 + t)))), Eq(y(t), -sqrt(2)*sqrt(-1/(C2 + t))/2), ... Eq(x(t), C1*exp(-1/(4*(C2 + t)))), Eq(y(t), sqrt(2)*sqrt(-1/(C2 + t))/2)] >>> checksysodesol(eq, sol) (True, [0, 0]) """ def _sympify(eq): return list(map(sympify, eq if iterable(eq) else [eq])) eqs = _sympify(eqs) for i in range(len(eqs)): if isinstance(eqs[i], Equality): eqs[i] = eqs[i].lhs - eqs[i].rhs if func is None: funcs = [] for eq in eqs: derivs = eq.atoms(Derivative) func = set().union(*[d.atoms(AppliedUndef) for d in derivs]) for func_ in func: funcs.append(func_) funcs = list(set(funcs)) if not all(isinstance(func, AppliedUndef) and len(func.args) == 1 for func in funcs)\ and len({func.args for func in funcs})!=1: raise ValueError("func must be a function of one variable, not %s" % func) for sol in sols: if len(sol.atoms(AppliedUndef)) != 1: raise ValueError("solutions should have one function only") if len(funcs) != len({sol.lhs for sol in sols}): raise ValueError("number of solutions provided does not match the number of equations") dictsol = dict() for sol in sols: func = list(sol.atoms(AppliedUndef))[0] if sol.rhs == func: sol = sol.reversed solved = sol.lhs == func and not sol.rhs.has(func) if not solved: rhs = solve(sol, func) if not rhs: raise NotImplementedError else: rhs = sol.rhs dictsol[func] = rhs checkeq = [] for eq in eqs: for func in funcs: eq = sub_func_doit(eq, func, dictsol[func]) ss = simplify(eq) if ss != 0: eq = ss.expand(force=True) else: eq = 0 checkeq.append(eq) if len(set(checkeq)) == 1 and list(set(checkeq))[0] == 0: return (True, checkeq) else: return (False, checkeq) @vectorize(0) def odesimp(ode, eq, func, hint): r""" Simplifies solutions of ODEs, including trying to solve for ``func`` and running :py:meth:`~sympy.solvers.ode.constantsimp`. It may use knowledge of the type of solution that the hint returns to apply additional simplifications. It also attempts to integrate any :py:class:`~sympy.integrals.Integral`\s in the expression, if the hint is not an ``_Integral`` hint. This function should have no effect on expressions returned by :py:meth:`~sympy.solvers.ode.dsolve`, as :py:meth:`~sympy.solvers.ode.dsolve` already calls :py:meth:`~sympy.solvers.ode.odesimp`, but the individual hint functions do not call :py:meth:`~sympy.solvers.ode.odesimp` (because the :py:meth:`~sympy.solvers.ode.dsolve` wrapper does). Therefore, this function is designed for mainly internal use. Examples ======== >>> from sympy import sin, symbols, dsolve, pprint, Function >>> from sympy.solvers.ode import odesimp >>> x , u2, C1= symbols('x,u2,C1') >>> f = Function('f') >>> eq = dsolve(x*f(x).diff(x) - f(x) - x*sin(f(x)/x), f(x), ... hint='1st_homogeneous_coeff_subs_indep_div_dep_Integral', ... simplify=False) >>> pprint(eq, wrap_line=False) x ---- f(x) / | | / 1 \ | -|u2 + -------| | | /1 \| | | sin|--|| | \ \u2// log(f(x)) = log(C1) + | ---------------- d(u2) | 2 | u2 | / >>> pprint(odesimp(eq, f(x), 1, {C1}, ... hint='1st_homogeneous_coeff_subs_indep_div_dep' ... )) #doctest: +SKIP x --------- = C1 /f(x)\ tan|----| \2*x / """ x = func.args[0] f = func.func C1 = get_numbered_constants(eq, num=1) constants = eq.free_symbols - ode.free_symbols # First, integrate if the hint allows it. eq = _handle_Integral(eq, func, hint) if hint.startswith("nth_linear_euler_eq_nonhomogeneous"): eq = simplify(eq) if not isinstance(eq, Equality): raise TypeError("eq should be an instance of Equality") # Second, clean up the arbitrary constants. # Right now, nth linear hints can put as many as 2*order constants in an # expression. If that number grows with another hint, the third argument # here should be raised accordingly, or constantsimp() rewritten to handle # an arbitrary number of constants. eq = constantsimp(eq, constants) # Lastly, now that we have cleaned up the expression, try solving for func. # When CRootOf is implemented in solve(), we will want to return a CRootOf # every time instead of an Equality. # Get the f(x) on the left if possible. if eq.rhs == func and not eq.lhs.has(func): eq = [Eq(eq.rhs, eq.lhs)] # make sure we are working with lists of solutions in simplified form. if eq.lhs == func and not eq.rhs.has(func): # The solution is already solved eq = [eq] # special simplification of the rhs if hint.startswith("nth_linear_constant_coeff"): # Collect terms to make the solution look nice. # This is also necessary for constantsimp to remove unnecessary # terms from the particular solution from variation of parameters # # Collect is not behaving reliably here. The results for # some linear constant-coefficient equations with repeated # roots do not properly simplify all constants sometimes. # 'collectterms' gives different orders sometimes, and results # differ in collect based on that order. The # sort-reverse trick fixes things, but may fail in the # future. In addition, collect is splitting exponentials with # rational powers for no reason. We have to do a match # to fix this using Wilds. global collectterms try: collectterms.sort(key=default_sort_key) collectterms.reverse() except Exception: pass assert len(eq) == 1 and eq[0].lhs == f(x) sol = eq[0].rhs sol = expand_mul(sol) for i, reroot, imroot in collectterms: sol = collect(sol, x**i*exp(reroot*x)*sin(abs(imroot)*x)) sol = collect(sol, x**i*exp(reroot*x)*cos(imroot*x)) for i, reroot, imroot in collectterms: sol = collect(sol, x**i*exp(reroot*x)) del collectterms # Collect is splitting exponentials with rational powers for # no reason. We call powsimp to fix. sol = powsimp(sol) eq[0] = Eq(f(x), sol) else: # The solution is not solved, so try to solve it try: floats = any(i.is_Float for i in eq.atoms(Number)) eqsol = solve(eq, func, force=True, rational=False if floats else None) if not eqsol: raise NotImplementedError except (NotImplementedError, PolynomialError): eq = [eq] else: def _expand(expr): numer, denom = expr.as_numer_denom() if denom.is_Add: return expr else: return powsimp(expr.expand(), combine='exp', deep=True) # XXX: the rest of odesimp() expects each ``t`` to be in a # specific normal form: rational expression with numerator # expanded, but with combined exponential functions (at # least in this setup all tests pass). eq = [Eq(f(x), _expand(t)) for t in eqsol] # special simplification of the lhs. if hint.startswith("1st_homogeneous_coeff"): for j, eqi in enumerate(eq): newi = logcombine(eqi, force=True) if isinstance(newi.lhs, log) and newi.rhs == 0: newi = Eq(newi.lhs.args[0]/C1, C1) eq[j] = newi # We cleaned up the constants before solving to help the solve engine with # a simpler expression, but the solved expression could have introduced # things like -C1, so rerun constantsimp() one last time before returning. for i, eqi in enumerate(eq): eq[i] = constantsimp(eqi, constants) eq[i] = constant_renumber(eq[i], ode.free_symbols) # If there is only 1 solution, return it; # otherwise return the list of solutions. if len(eq) == 1: eq = eq[0] return eq def checkodesol(ode, sol, func=None, order='auto', solve_for_func=True): r""" Substitutes ``sol`` into ``ode`` and checks that the result is ``0``. This only works when ``func`` is one function, like `f(x)`. ``sol`` can be a single solution or a list of solutions. Each solution may be an :py:class:`~sympy.core.relational.Equality` that the solution satisfies, e.g. ``Eq(f(x), C1), Eq(f(x) + C1, 0)``; or simply an :py:class:`~sympy.core.expr.Expr`, e.g. ``f(x) - C1``. In most cases it will not be necessary to explicitly identify the function, but if the function cannot be inferred from the original equation it can be supplied through the ``func`` argument. If a sequence of solutions is passed, the same sort of container will be used to return the result for each solution. It tries the following methods, in order, until it finds zero equivalence: 1. Substitute the solution for `f` in the original equation. This only works if ``ode`` is solved for `f`. It will attempt to solve it first unless ``solve_for_func == False``. 2. Take `n` derivatives of the solution, where `n` is the order of ``ode``, and check to see if that is equal to the solution. This only works on exact ODEs. 3. Take the 1st, 2nd, ..., `n`\th derivatives of the solution, each time solving for the derivative of `f` of that order (this will always be possible because `f` is a linear operator). Then back substitute each derivative into ``ode`` in reverse order. This function returns a tuple. The first item in the tuple is ``True`` if the substitution results in ``0``, and ``False`` otherwise. The second item in the tuple is what the substitution results in. It should always be ``0`` if the first item is ``True``. Sometimes this function will return ``False`` even when an expression is identically equal to ``0``. This happens when :py:meth:`~sympy.simplify.simplify.simplify` does not reduce the expression to ``0``. If an expression returned by this function vanishes identically, then ``sol`` really is a solution to the ``ode``. If this function seems to hang, it is probably because of a hard simplification. To use this function to test, test the first item of the tuple. Examples ======== >>> from sympy import Eq, Function, checkodesol, symbols >>> x, C1 = symbols('x,C1') >>> f = Function('f') >>> checkodesol(f(x).diff(x), Eq(f(x), C1)) (True, 0) >>> assert checkodesol(f(x).diff(x), C1)[0] >>> assert not checkodesol(f(x).diff(x), x)[0] >>> checkodesol(f(x).diff(x, 2), x**2) (False, 2) """ if not isinstance(ode, Equality): ode = Eq(ode, 0) if func is None: try: _, func = _preprocess(ode.lhs) except ValueError: funcs = [s.atoms(AppliedUndef) for s in ( sol if is_sequence(sol, set) else [sol])] funcs = set().union(*funcs) if len(funcs) != 1: raise ValueError( 'must pass func arg to checkodesol for this case.') func = funcs.pop() if not isinstance(func, AppliedUndef) or len(func.args) != 1: raise ValueError( "func must be a function of one variable, not %s" % func) if is_sequence(sol, set): return type(sol)([checkodesol(ode, i, order=order, solve_for_func=solve_for_func) for i in sol]) if not isinstance(sol, Equality): sol = Eq(func, sol) elif sol.rhs == func: sol = sol.reversed if order == 'auto': order = ode_order(ode, func) solved = sol.lhs == func and not sol.rhs.has(func) if solve_for_func and not solved: rhs = solve(sol, func) if rhs: eqs = [Eq(func, t) for t in rhs] if len(rhs) == 1: eqs = eqs[0] return checkodesol(ode, eqs, order=order, solve_for_func=False) s = True testnum = 0 x = func.args[0] while s: if testnum == 0: # First pass, try substituting a solved solution directly into the # ODE. This has the highest chance of succeeding. ode_diff = ode.lhs - ode.rhs if sol.lhs == func: s = sub_func_doit(ode_diff, func, sol.rhs) else: testnum += 1 continue ss = simplify(s) if ss: # with the new numer_denom in power.py, if we do a simple # expansion then testnum == 0 verifies all solutions. s = ss.expand(force=True) else: s = 0 testnum += 1 elif testnum == 1: # Second pass. If we cannot substitute f, try seeing if the nth # derivative is equal, this will only work for odes that are exact, # by definition. s = simplify( trigsimp(diff(sol.lhs, x, order) - diff(sol.rhs, x, order)) - trigsimp(ode.lhs) + trigsimp(ode.rhs)) # s2 = simplify( # diff(sol.lhs, x, order) - diff(sol.rhs, x, order) - \ # ode.lhs + ode.rhs) testnum += 1 elif testnum == 2: # Third pass. Try solving for df/dx and substituting that into the # ODE. Thanks to Chris Smith for suggesting this method. Many of # the comments below are his, too. # The method: # - Take each of 1..n derivatives of the solution. # - Solve each nth derivative for d^(n)f/dx^(n) # (the differential of that order) # - Back substitute into the ODE in decreasing order # (i.e., n, n-1, ...) # - Check the result for zero equivalence if sol.lhs == func and not sol.rhs.has(func): diffsols = {0: sol.rhs} elif sol.rhs == func and not sol.lhs.has(func): diffsols = {0: sol.lhs} else: diffsols = {} sol = sol.lhs - sol.rhs for i in range(1, order + 1): # Differentiation is a linear operator, so there should always # be 1 solution. Nonetheless, we test just to make sure. # We only need to solve once. After that, we automatically # have the solution to the differential in the order we want. if i == 1: ds = sol.diff(x) try: sdf = solve(ds, func.diff(x, i)) if not sdf: raise NotImplementedError except NotImplementedError: testnum += 1 break else: diffsols[i] = sdf[0] else: # This is what the solution says df/dx should be. diffsols[i] = diffsols[i - 1].diff(x) # Make sure the above didn't fail. if testnum > 2: continue else: # Substitute it into ODE to check for self consistency. lhs, rhs = ode.lhs, ode.rhs for i in range(order, -1, -1): if i == 0 and 0 not in diffsols: # We can only substitute f(x) if the solution was # solved for f(x). break lhs = sub_func_doit(lhs, func.diff(x, i), diffsols[i]) rhs = sub_func_doit(rhs, func.diff(x, i), diffsols[i]) ode_or_bool = Eq(lhs, rhs) ode_or_bool = simplify(ode_or_bool) if isinstance(ode_or_bool, (bool, BooleanAtom)): if ode_or_bool: lhs = rhs = S.Zero else: lhs = ode_or_bool.lhs rhs = ode_or_bool.rhs # No sense in overworking simplify -- just prove that the # numerator goes to zero num = trigsimp((lhs - rhs).as_numer_denom()[0]) # since solutions are obtained using force=True we test # using the same level of assumptions ## replace function with dummy so assumptions will work _func = Dummy('func') num = num.subs(func, _func) ## posify the expression num, reps = posify(num) s = simplify(num).xreplace(reps).xreplace({_func: func}) testnum += 1 else: break if not s: return (True, s) elif s is True: # The code above never was able to change s raise NotImplementedError("Unable to test if " + str(sol) + " is a solution to " + str(ode) + ".") else: return (False, s) def ode_sol_simplicity(sol, func, trysolving=True): r""" Returns an extended integer representing how simple a solution to an ODE is. The following things are considered, in order from most simple to least: - ``sol`` is solved for ``func``. - ``sol`` is not solved for ``func``, but can be if passed to solve (e.g., a solution returned by ``dsolve(ode, func, simplify=False``). - If ``sol`` is not solved for ``func``, then base the result on the length of ``sol``, as computed by ``len(str(sol))``. - If ``sol`` has any unevaluated :py:class:`~sympy.integrals.Integral`\s, this will automatically be considered less simple than any of the above. This function returns an integer such that if solution A is simpler than solution B by above metric, then ``ode_sol_simplicity(sola, func) < ode_sol_simplicity(solb, func)``. Currently, the following are the numbers returned, but if the heuristic is ever improved, this may change. Only the ordering is guaranteed. +----------------------------------------------+-------------------+ | Simplicity | Return | +==============================================+===================+ | ``sol`` solved for ``func`` | ``-2`` | +----------------------------------------------+-------------------+ | ``sol`` not solved for ``func`` but can be | ``-1`` | +----------------------------------------------+-------------------+ | ``sol`` is not solved nor solvable for | ``len(str(sol))`` | | ``func`` | | +----------------------------------------------+-------------------+ | ``sol`` contains an | ``oo`` | | :py:class:`~sympy.integrals.Integral` | | +----------------------------------------------+-------------------+ ``oo`` here means the SymPy infinity, which should compare greater than any integer. If you already know :py:meth:`~sympy.solvers.solvers.solve` cannot solve ``sol``, you can use ``trysolving=False`` to skip that step, which is the only potentially slow step. For example, :py:meth:`~sympy.solvers.ode.dsolve` with the ``simplify=False`` flag should do this. If ``sol`` is a list of solutions, if the worst solution in the list returns ``oo`` it returns that, otherwise it returns ``len(str(sol))``, that is, the length of the string representation of the whole list. Examples ======== This function is designed to be passed to ``min`` as the key argument, such as ``min(listofsolutions, key=lambda i: ode_sol_simplicity(i, f(x)))``. >>> from sympy import symbols, Function, Eq, tan, cos, sqrt, Integral >>> from sympy.solvers.ode import ode_sol_simplicity >>> x, C1, C2 = symbols('x, C1, C2') >>> f = Function('f') >>> ode_sol_simplicity(Eq(f(x), C1*x**2), f(x)) -2 >>> ode_sol_simplicity(Eq(x**2 + f(x), C1), f(x)) -1 >>> ode_sol_simplicity(Eq(f(x), C1*Integral(2*x, x)), f(x)) oo >>> eq1 = Eq(f(x)/tan(f(x)/(2*x)), C1) >>> eq2 = Eq(f(x)/tan(f(x)/(2*x) + f(x)), C2) >>> [ode_sol_simplicity(eq, f(x)) for eq in [eq1, eq2]] [28, 35] >>> min([eq1, eq2], key=lambda i: ode_sol_simplicity(i, f(x))) Eq(f(x)/tan(f(x)/(2*x)), C1) """ # TODO: if two solutions are solved for f(x), we still want to be # able to get the simpler of the two # See the docstring for the coercion rules. We check easier (faster) # things here first, to save time. if iterable(sol): # See if there are Integrals for i in sol: if ode_sol_simplicity(i, func, trysolving=trysolving) == oo: return oo return len(str(sol)) if sol.has(Integral): return oo # Next, try to solve for func. This code will change slightly when CRootOf # is implemented in solve(). Probably a CRootOf solution should fall # somewhere between a normal solution and an unsolvable expression. # First, see if they are already solved if sol.lhs == func and not sol.rhs.has(func) or \ sol.rhs == func and not sol.lhs.has(func): return -2 # We are not so lucky, try solving manually if trysolving: try: sols = solve(sol, func) if not sols: raise NotImplementedError except NotImplementedError: pass else: return -1 # Finally, a naive computation based on the length of the string version # of the expression. This may favor combined fractions because they # will not have duplicate denominators, and may slightly favor expressions # with fewer additions and subtractions, as those are separated by spaces # by the printer. # Additional ideas for simplicity heuristics are welcome, like maybe # checking if a equation has a larger domain, or if constantsimp has # introduced arbitrary constants numbered higher than the order of a # given ODE that sol is a solution of. return len(str(sol)) def _get_constant_subexpressions(expr, Cs): Cs = set(Cs) Ces = [] def _recursive_walk(expr): expr_syms = expr.free_symbols if expr_syms and expr_syms.issubset(Cs): Ces.append(expr) else: if expr.func == exp: expr = expr.expand(mul=True) if expr.func in (Add, Mul): d = sift(expr.args, lambda i : i.free_symbols.issubset(Cs)) if len(d[True]) > 1: x = expr.func(*d[True]) if not x.is_number: Ces.append(x) elif isinstance(expr, Integral): if expr.free_symbols.issubset(Cs) and \ all(len(x) == 3 for x in expr.limits): Ces.append(expr) for i in expr.args: _recursive_walk(i) return _recursive_walk(expr) return Ces def __remove_linear_redundancies(expr, Cs): cnts = {i: expr.count(i) for i in Cs} Cs = [i for i in Cs if cnts[i] > 0] def _linear(expr): if isinstance(expr, Add): xs = [i for i in Cs if expr.count(i)==cnts[i] \ and 0 == expr.diff(i, 2)] d = {} for x in xs: y = expr.diff(x) if y not in d: d[y]=[] d[y].append(x) for y in d: if len(d[y]) > 1: d[y].sort(key=str) for x in d[y][1:]: expr = expr.subs(x, 0) return expr def _recursive_walk(expr): if len(expr.args) != 0: expr = expr.func(*[_recursive_walk(i) for i in expr.args]) expr = _linear(expr) return expr if isinstance(expr, Equality): lhs, rhs = [_recursive_walk(i) for i in expr.args] f = lambda i: isinstance(i, Number) or i in Cs if isinstance(lhs, Symbol) and lhs in Cs: rhs, lhs = lhs, rhs if lhs.func in (Add, Symbol) and rhs.func in (Add, Symbol): dlhs = sift([lhs] if isinstance(lhs, AtomicExpr) else lhs.args, f) drhs = sift([rhs] if isinstance(rhs, AtomicExpr) else rhs.args, f) for i in [True, False]: for hs in [dlhs, drhs]: if i not in hs: hs[i] = [0] # this calculation can be simplified lhs = Add(*dlhs[False]) - Add(*drhs[False]) rhs = Add(*drhs[True]) - Add(*dlhs[True]) elif lhs.func in (Mul, Symbol) and rhs.func in (Mul, Symbol): dlhs = sift([lhs] if isinstance(lhs, AtomicExpr) else lhs.args, f) if True in dlhs: if False not in dlhs: dlhs[False] = [1] lhs = Mul(*dlhs[False]) rhs = rhs/Mul(*dlhs[True]) return Eq(lhs, rhs) else: return _recursive_walk(expr) @vectorize(0) def constantsimp(expr, constants): r""" Simplifies an expression with arbitrary constants in it. This function is written specifically to work with :py:meth:`~sympy.solvers.ode.dsolve`, and is not intended for general use. Simplification is done by "absorbing" the arbitrary constants into other arbitrary constants, numbers, and symbols that they are not independent of. The symbols must all have the same name with numbers after it, for example, ``C1``, ``C2``, ``C3``. The ``symbolname`` here would be '``C``', the ``startnumber`` would be 1, and the ``endnumber`` would be 3. If the arbitrary constants are independent of the variable ``x``, then the independent symbol would be ``x``. There is no need to specify the dependent function, such as ``f(x)``, because it already has the independent symbol, ``x``, in it. Because terms are "absorbed" into arbitrary constants and because constants are renumbered after simplifying, the arbitrary constants in expr are not necessarily equal to the ones of the same name in the returned result. If two or more arbitrary constants are added, multiplied, or raised to the power of each other, they are first absorbed together into a single arbitrary constant. Then the new constant is combined into other terms if necessary. Absorption of constants is done with limited assistance: 1. terms of :py:class:`~sympy.core.add.Add`\s are collected to try join constants so `e^x (C_1 \cos(x) + C_2 \cos(x))` will simplify to `e^x C_1 \cos(x)`; 2. powers with exponents that are :py:class:`~sympy.core.add.Add`\s are expanded so `e^{C_1 + x}` will be simplified to `C_1 e^x`. Use :py:meth:`~sympy.solvers.ode.constant_renumber` to renumber constants after simplification or else arbitrary numbers on constants may appear, e.g. `C_1 + C_3 x`. In rare cases, a single constant can be "simplified" into two constants. Every differential equation solution should have as many arbitrary constants as the order of the differential equation. The result here will be technically correct, but it may, for example, have `C_1` and `C_2` in an expression, when `C_1` is actually equal to `C_2`. Use your discretion in such situations, and also take advantage of the ability to use hints in :py:meth:`~sympy.solvers.ode.dsolve`. Examples ======== >>> from sympy import symbols >>> from sympy.solvers.ode import constantsimp >>> C1, C2, C3, x, y = symbols('C1, C2, C3, x, y') >>> constantsimp(2*C1*x, {C1, C2, C3}) C1*x >>> constantsimp(C1 + 2 + x, {C1, C2, C3}) C1 + x >>> constantsimp(C1*C2 + 2 + C2 + C3*x, {C1, C2, C3}) C1 + C3*x """ # This function works recursively. The idea is that, for Mul, # Add, Pow, and Function, if the class has a constant in it, then # we can simplify it, which we do by recursing down and # simplifying up. Otherwise, we can skip that part of the # expression. Cs = constants orig_expr = expr constant_subexprs = _get_constant_subexpressions(expr, Cs) for xe in constant_subexprs: xes = list(xe.free_symbols) if not xes: continue if all([expr.count(c) == xe.count(c) for c in xes]): xes.sort(key=str) expr = expr.subs(xe, xes[0]) # try to perform common sub-expression elimination of constant terms try: commons, rexpr = cse(expr) commons.reverse() rexpr = rexpr[0] for s in commons: cs = list(s[1].atoms(Symbol)) if len(cs) == 1 and cs[0] in Cs and \ cs[0] not in rexpr.atoms(Symbol) and \ not any(cs[0] in ex for ex in commons if ex != s): rexpr = rexpr.subs(s[0], cs[0]) else: rexpr = rexpr.subs(*s) expr = rexpr except Exception: pass expr = __remove_linear_redundancies(expr, Cs) def _conditional_term_factoring(expr): new_expr = terms_gcd(expr, clear=False, deep=True, expand=False) # we do not want to factor exponentials, so handle this separately if new_expr.is_Mul: infac = False asfac = False for m in new_expr.args: if isinstance(m, exp): asfac = True elif m.is_Add: infac = any(isinstance(fi, exp) for t in m.args for fi in Mul.make_args(t)) if asfac and infac: new_expr = expr break return new_expr expr = _conditional_term_factoring(expr) # call recursively if more simplification is possible if orig_expr != expr: return constantsimp(expr, Cs) return expr def constant_renumber(expr, variables=None, newconstants=None): r""" Renumber arbitrary constants in ``expr`` to use the symbol names as given in ``newconstants``. In the process, this reorders expression terms in a standard way. If ``newconstants`` is not provided then the new constant names will be ``C1``, ``C2`` etc. Otherwise ``newconstants`` should be an iterable giving the new symbols to use for the constants in order. The ``variables`` argument is a list of non-constant symbols. All other free symbols found in ``expr`` are assumed to be constants and will be renumbered. If ``variables`` is not given then any numbered symbol beginning with ``C`` (e.g. ``C1``) is assumed to be a constant. Symbols are renumbered based on ``.sort_key()``, so they should be numbered roughly in the order that they appear in the final, printed expression. Note that this ordering is based in part on hashes, so it can produce different results on different machines. The structure of this function is very similar to that of :py:meth:`~sympy.solvers.ode.constantsimp`. Examples ======== >>> from sympy import symbols, Eq, pprint >>> from sympy.solvers.ode import constant_renumber >>> x, C1, C2, C3 = symbols('x,C1:4') >>> expr = C3 + C2*x + C1*x**2 >>> expr C1*x**2 + C2*x + C3 >>> constant_renumber(expr) C1 + C2*x + C3*x**2 The ``variables`` argument specifies which are constants so that the other symbols will not be renumbered: >>> constant_renumber(expr, [C1, x]) C1*x**2 + C2 + C3*x The ``newconstants`` argument is used to specify what symbols to use when replacing the constants: >>> constant_renumber(expr, [x], newconstants=symbols('E1:4')) E1 + E2*x + E3*x**2 """ if type(expr) in (set, list, tuple): renumbered = [constant_renumber(e, variables, newconstants) for e in expr] return type(expr)(renumbered) # Symbols in solution but not ODE are constants if variables is not None: variables = set(variables) constantsymbols = list(expr.free_symbols - variables) # Any Cn is a constant... else: variables = set() isconstant = lambda s: s.startswith('C') and s[1:].isdigit() constantsymbols = [sym for sym in expr.free_symbols if isconstant(sym.name)] # Find new constants checking that they aren't already in the ODE if newconstants is None: iter_constants = numbered_symbols(start=1, prefix='C', exclude=variables) else: iter_constants = (sym for sym in newconstants if sym not in variables) global newstartnumber newstartnumber = 1 endnumber = len(constantsymbols) constants_found = [None]*(endnumber + 2) # make a mapping to send all constantsymbols to S.One and use # that to make sure that term ordering is not dependent on # the indexed value of C C_1 = [(ci, S.One) for ci in constantsymbols] sort_key=lambda arg: default_sort_key(arg.subs(C_1)) def _constant_renumber(expr): r""" We need to have an internal recursive function so that newstartnumber maintains its values throughout recursive calls. """ # FIXME: Use nonlocal here when support for Py2 is dropped: global newstartnumber if isinstance(expr, Equality): return Eq( _constant_renumber(expr.lhs), _constant_renumber(expr.rhs)) if type(expr) not in (Mul, Add, Pow) and not expr.is_Function and \ not expr.has(*constantsymbols): # Base case, as above. Hope there aren't constants inside # of some other class, because they won't be renumbered. return expr elif expr.is_Piecewise: return expr elif expr in constantsymbols: if expr not in constants_found: constants_found[newstartnumber] = expr newstartnumber += 1 return expr elif expr.is_Function or expr.is_Pow or isinstance(expr, Tuple): return expr.func( *[_constant_renumber(x) for x in expr.args]) else: sortedargs = list(expr.args) sortedargs.sort(key=sort_key) return expr.func(*[_constant_renumber(x) for x in sortedargs]) expr = _constant_renumber(expr) # Don't renumber symbols present in the ODE. constants_found = [c for c in constants_found if c not in variables] # Renumbering happens here expr = expr.subs(zip(constants_found[1:], iter_constants), simultaneous=True) return expr def _handle_Integral(expr, func, hint): r""" Converts a solution with Integrals in it into an actual solution. For most hints, this simply runs ``expr.doit()``. """ global y x = func.args[0] f = func.func if hint == "1st_exact": sol = (expr.doit()).subs(y, f(x)) del y elif hint == "1st_exact_Integral": sol = Eq(Subs(expr.lhs, y, f(x)), expr.rhs) del y elif hint == "nth_linear_constant_coeff_homogeneous": sol = expr elif not hint.endswith("_Integral"): sol = expr.doit() else: sol = expr return sol # FIXME: replace the general solution in the docstring with # dsolve(equation, hint='1st_exact_Integral'). You will need to be able # to have assumptions on P and Q that dP/dy = dQ/dx. def ode_1st_exact(eq, func, order, match): r""" Solves 1st order exact ordinary differential equations. A 1st order differential equation is called exact if it is the total differential of a function. That is, the differential equation .. math:: P(x, y) \,\partial{}x + Q(x, y) \,\partial{}y = 0 is exact if there is some function `F(x, y)` such that `P(x, y) = \partial{}F/\partial{}x` and `Q(x, y) = \partial{}F/\partial{}y`. It can be shown that a necessary and sufficient condition for a first order ODE to be exact is that `\partial{}P/\partial{}y = \partial{}Q/\partial{}x`. Then, the solution will be as given below:: >>> from sympy import Function, Eq, Integral, symbols, pprint >>> x, y, t, x0, y0, C1= symbols('x,y,t,x0,y0,C1') >>> P, Q, F= map(Function, ['P', 'Q', 'F']) >>> pprint(Eq(Eq(F(x, y), Integral(P(t, y), (t, x0, x)) + ... Integral(Q(x0, t), (t, y0, y))), C1)) x y / / | | F(x, y) = | P(t, y) dt + | Q(x0, t) dt = C1 | | / / x0 y0 Where the first partials of `P` and `Q` exist and are continuous in a simply connected region. A note: SymPy currently has no way to represent inert substitution on an expression, so the hint ``1st_exact_Integral`` will return an integral with `dy`. This is supposed to represent the function that you are solving for. Examples ======== >>> from sympy import Function, dsolve, cos, sin >>> from sympy.abc import x >>> f = Function('f') >>> dsolve(cos(f(x)) - (x*sin(f(x)) - f(x)**2)*f(x).diff(x), ... f(x), hint='1st_exact') Eq(x*cos(f(x)) + f(x)**3/3, C1) References ========== - https://en.wikipedia.org/wiki/Exact_differential_equation - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 73 # indirect doctest """ x = func.args[0] r = match # d+e*diff(f(x),x) e = r[r['e']] d = r[r['d']] global y # This is the only way to pass dummy y to _handle_Integral y = r['y'] C1 = get_numbered_constants(eq, num=1) # Refer Joel Moses, "Symbolic Integration - The Stormy Decade", # Communications of the ACM, Volume 14, Number 8, August 1971, pp. 558 # which gives the method to solve an exact differential equation. sol = Integral(d, x) + Integral((e - (Integral(d, x).diff(y))), y) return Eq(sol, C1) def ode_1st_homogeneous_coeff_best(eq, func, order, match): r""" Returns the best solution to an ODE from the two hints ``1st_homogeneous_coeff_subs_dep_div_indep`` and ``1st_homogeneous_coeff_subs_indep_div_dep``. This is as determined by :py:meth:`~sympy.solvers.ode.ode_sol_simplicity`. See the :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_subs_indep_div_dep` and :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_subs_dep_div_indep` docstrings for more information on these hints. Note that there is no ``ode_1st_homogeneous_coeff_best_Integral`` hint. Examples ======== >>> from sympy import Function, dsolve, pprint >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(2*x*f(x) + (x**2 + f(x)**2)*f(x).diff(x), f(x), ... hint='1st_homogeneous_coeff_best', simplify=False)) / 2 \ | 3*x | log|----- + 1| | 2 | \f (x) / log(f(x)) = log(C1) - -------------- 3 References ========== - https://en.wikipedia.org/wiki/Homogeneous_differential_equation - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 59 # indirect doctest """ # There are two substitutions that solve the equation, u1=y/x and u2=x/y # They produce different integrals, so try them both and see which # one is easier. sol1 = ode_1st_homogeneous_coeff_subs_indep_div_dep(eq, func, order, match) sol2 = ode_1st_homogeneous_coeff_subs_dep_div_indep(eq, func, order, match) simplify = match.get('simplify', True) if simplify: # why is odesimp called here? Should it be at the usual spot? sol1 = odesimp(eq, sol1, func, "1st_homogeneous_coeff_subs_indep_div_dep") sol2 = odesimp(eq, sol2, func, "1st_homogeneous_coeff_subs_dep_div_indep") return min([sol1, sol2], key=lambda x: ode_sol_simplicity(x, func, trysolving=not simplify)) def ode_1st_homogeneous_coeff_subs_dep_div_indep(eq, func, order, match): r""" Solves a 1st order differential equation with homogeneous coefficients using the substitution `u_1 = \frac{\text{<dependent variable>}}{\text{<independent variable>}}`. This is a differential equation .. math:: P(x, y) + Q(x, y) dy/dx = 0 such that `P` and `Q` are homogeneous and of the same order. A function `F(x, y)` is homogeneous of order `n` if `F(x t, y t) = t^n F(x, y)`. Equivalently, `F(x, y)` can be rewritten as `G(y/x)` or `H(x/y)`. See also the docstring of :py:meth:`~sympy.solvers.ode.homogeneous_order`. If the coefficients `P` and `Q` in the differential equation above are homogeneous functions of the same order, then it can be shown that the substitution `y = u_1 x` (i.e. `u_1 = y/x`) will turn the differential equation into an equation separable in the variables `x` and `u`. If `h(u_1)` is the function that results from making the substitution `u_1 = f(x)/x` on `P(x, f(x))` and `g(u_2)` is the function that results from the substitution on `Q(x, f(x))` in the differential equation `P(x, f(x)) + Q(x, f(x)) f'(x) = 0`, then the general solution is:: >>> from sympy import Function, dsolve, pprint >>> from sympy.abc import x >>> f, g, h = map(Function, ['f', 'g', 'h']) >>> genform = g(f(x)/x) + h(f(x)/x)*f(x).diff(x) >>> pprint(genform) /f(x)\ /f(x)\ d g|----| + h|----|*--(f(x)) \ x / \ x / dx >>> pprint(dsolve(genform, f(x), ... hint='1st_homogeneous_coeff_subs_dep_div_indep_Integral')) f(x) ---- x / | | -h(u1) log(x) = C1 + | ---------------- d(u1) | u1*h(u1) + g(u1) | / Where `u_1 h(u_1) + g(u_1) \ne 0` and `x \ne 0`. See also the docstrings of :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_best` and :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_subs_indep_div_dep`. Examples ======== >>> from sympy import Function, dsolve >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(2*x*f(x) + (x**2 + f(x)**2)*f(x).diff(x), f(x), ... hint='1st_homogeneous_coeff_subs_dep_div_indep', simplify=False)) / 3 \ |3*f(x) f (x)| log|------ + -----| | x 3 | \ x / log(x) = log(C1) - ------------------- 3 References ========== - https://en.wikipedia.org/wiki/Homogeneous_differential_equation - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 59 # indirect doctest """ x = func.args[0] f = func.func u = Dummy('u') u1 = Dummy('u1') # u1 == f(x)/x r = match # d+e*diff(f(x),x) C1 = get_numbered_constants(eq, num=1) xarg = match.get('xarg', 0) yarg = match.get('yarg', 0) int = Integral( (-r[r['e']]/(r[r['d']] + u1*r[r['e']])).subs({x: 1, r['y']: u1}), (u1, None, f(x)/x)) sol = logcombine(Eq(log(x), int + log(C1)), force=True) sol = sol.subs(f(x), u).subs(((u, u - yarg), (x, x - xarg), (u, f(x)))) return sol def ode_1st_homogeneous_coeff_subs_indep_div_dep(eq, func, order, match): r""" Solves a 1st order differential equation with homogeneous coefficients using the substitution `u_2 = \frac{\text{<independent variable>}}{\text{<dependent variable>}}`. This is a differential equation .. math:: P(x, y) + Q(x, y) dy/dx = 0 such that `P` and `Q` are homogeneous and of the same order. A function `F(x, y)` is homogeneous of order `n` if `F(x t, y t) = t^n F(x, y)`. Equivalently, `F(x, y)` can be rewritten as `G(y/x)` or `H(x/y)`. See also the docstring of :py:meth:`~sympy.solvers.ode.homogeneous_order`. If the coefficients `P` and `Q` in the differential equation above are homogeneous functions of the same order, then it can be shown that the substitution `x = u_2 y` (i.e. `u_2 = x/y`) will turn the differential equation into an equation separable in the variables `y` and `u_2`. If `h(u_2)` is the function that results from making the substitution `u_2 = x/f(x)` on `P(x, f(x))` and `g(u_2)` is the function that results from the substitution on `Q(x, f(x))` in the differential equation `P(x, f(x)) + Q(x, f(x)) f'(x) = 0`, then the general solution is: >>> from sympy import Function, dsolve, pprint >>> from sympy.abc import x >>> f, g, h = map(Function, ['f', 'g', 'h']) >>> genform = g(x/f(x)) + h(x/f(x))*f(x).diff(x) >>> pprint(genform) / x \ / x \ d g|----| + h|----|*--(f(x)) \f(x)/ \f(x)/ dx >>> pprint(dsolve(genform, f(x), ... hint='1st_homogeneous_coeff_subs_indep_div_dep_Integral')) x ---- f(x) / | | -g(u2) | ---------------- d(u2) | u2*g(u2) + h(u2) | / <BLANKLINE> f(x) = C1*e Where `u_2 g(u_2) + h(u_2) \ne 0` and `f(x) \ne 0`. See also the docstrings of :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_best` and :py:meth:`~sympy.solvers.ode.ode_1st_homogeneous_coeff_subs_dep_div_indep`. Examples ======== >>> from sympy import Function, pprint, dsolve >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(2*x*f(x) + (x**2 + f(x)**2)*f(x).diff(x), f(x), ... hint='1st_homogeneous_coeff_subs_indep_div_dep', ... simplify=False)) / 2 \ | 3*x | log|----- + 1| | 2 | \f (x) / log(f(x)) = log(C1) - -------------- 3 References ========== - https://en.wikipedia.org/wiki/Homogeneous_differential_equation - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 59 # indirect doctest """ x = func.args[0] f = func.func u = Dummy('u') u2 = Dummy('u2') # u2 == x/f(x) r = match # d+e*diff(f(x),x) C1 = get_numbered_constants(eq, num=1) xarg = match.get('xarg', 0) # If xarg present take xarg, else zero yarg = match.get('yarg', 0) # If yarg present take yarg, else zero int = Integral( simplify( (-r[r['d']]/(r[r['e']] + u2*r[r['d']])).subs({x: u2, r['y']: 1})), (u2, None, x/f(x))) sol = logcombine(Eq(log(f(x)), int + log(C1)), force=True) sol = sol.subs(f(x), u).subs(((u, u - yarg), (x, x - xarg), (u, f(x)))) return sol # XXX: Should this function maybe go somewhere else? def homogeneous_order(eq, *symbols): r""" Returns the order `n` if `g` is homogeneous and ``None`` if it is not homogeneous. Determines if a function is homogeneous and if so of what order. A function `f(x, y, \cdots)` is homogeneous of order `n` if `f(t x, t y, \cdots) = t^n f(x, y, \cdots)`. If the function is of two variables, `F(x, y)`, then `f` being homogeneous of any order is equivalent to being able to rewrite `F(x, y)` as `G(x/y)` or `H(y/x)`. This fact is used to solve 1st order ordinary differential equations whose coefficients are homogeneous of the same order (see the docstrings of :py:meth:`~solvers.ode.ode_1st_homogeneous_coeff_subs_dep_div_indep` and :py:meth:`~solvers.ode.ode_1st_homogeneous_coeff_subs_indep_div_dep`). Symbols can be functions, but every argument of the function must be a symbol, and the arguments of the function that appear in the expression must match those given in the list of symbols. If a declared function appears with different arguments than given in the list of symbols, ``None`` is returned. Examples ======== >>> from sympy import Function, homogeneous_order, sqrt >>> from sympy.abc import x, y >>> f = Function('f') >>> homogeneous_order(f(x), f(x)) is None True >>> homogeneous_order(f(x,y), f(y, x), x, y) is None True >>> homogeneous_order(f(x), f(x), x) 1 >>> homogeneous_order(x**2*f(x)/sqrt(x**2+f(x)**2), x, f(x)) 2 >>> homogeneous_order(x**2+f(x), x, f(x)) is None True """ if not symbols: raise ValueError("homogeneous_order: no symbols were given.") symset = set(symbols) eq = sympify(eq) # The following are not supported if eq.has(Order, Derivative): return None # These are all constants if (eq.is_Number or eq.is_NumberSymbol or eq.is_number ): return S.Zero # Replace all functions with dummy variables dum = numbered_symbols(prefix='d', cls=Dummy) newsyms = set() for i in [j for j in symset if getattr(j, 'is_Function')]: iargs = set(i.args) if iargs.difference(symset): return None else: dummyvar = next(dum) eq = eq.subs(i, dummyvar) symset.remove(i) newsyms.add(dummyvar) symset.update(newsyms) if not eq.free_symbols & symset: return None # assuming order of a nested function can only be equal to zero if isinstance(eq, Function): return None if homogeneous_order( eq.args[0], *tuple(symset)) != 0 else S.Zero # make the replacement of x with x*t and see if t can be factored out t = Dummy('t', positive=True) # It is sufficient that t > 0 eqs = separatevars(eq.subs([(i, t*i) for i in symset]), [t], dict=True)[t] if eqs is S.One: return S.Zero # there was no term with only t i, d = eqs.as_independent(t, as_Add=False) b, e = d.as_base_exp() if b == t: return e def ode_1st_linear(eq, func, order, match): r""" Solves 1st order linear differential equations. These are differential equations of the form .. math:: dy/dx + P(x) y = Q(x)\text{.} These kinds of differential equations can be solved in a general way. The integrating factor `e^{\int P(x) \,dx}` will turn the equation into a separable equation. The general solution is:: >>> from sympy import Function, dsolve, Eq, pprint, diff, sin >>> from sympy.abc import x >>> f, P, Q = map(Function, ['f', 'P', 'Q']) >>> genform = Eq(f(x).diff(x) + P(x)*f(x), Q(x)) >>> pprint(genform) d P(x)*f(x) + --(f(x)) = Q(x) dx >>> pprint(dsolve(genform, f(x), hint='1st_linear_Integral')) / / \ | | | | | / | / | | | | | | | | P(x) dx | - | P(x) dx | | | | | | | / | / f(x) = |C1 + | Q(x)*e dx|*e | | | \ / / Examples ======== >>> f = Function('f') >>> pprint(dsolve(Eq(x*diff(f(x), x) - f(x), x**2*sin(x)), ... f(x), '1st_linear')) f(x) = x*(C1 - cos(x)) References ========== - https://en.wikipedia.org/wiki/Linear_differential_equation#First_order_equation - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 92 # indirect doctest """ x = func.args[0] f = func.func r = match # a*diff(f(x),x) + b*f(x) + c C1 = get_numbered_constants(eq, num=1) t = exp(Integral(r[r['b']]/r[r['a']], x)) tt = Integral(t*(-r[r['c']]/r[r['a']]), x) f = match.get('u', f(x)) # take almost-linear u if present, else f(x) return Eq(f, (tt + C1)/t) def ode_Bernoulli(eq, func, order, match): r""" Solves Bernoulli differential equations. These are equations of the form .. math:: dy/dx + P(x) y = Q(x) y^n\text{, }n \ne 1`\text{.} The substitution `w = 1/y^{1-n}` will transform an equation of this form into one that is linear (see the docstring of :py:meth:`~sympy.solvers.ode.ode_1st_linear`). The general solution is:: >>> from sympy import Function, dsolve, Eq, pprint >>> from sympy.abc import x, n >>> f, P, Q = map(Function, ['f', 'P', 'Q']) >>> genform = Eq(f(x).diff(x) + P(x)*f(x), Q(x)*f(x)**n) >>> pprint(genform) d n P(x)*f(x) + --(f(x)) = Q(x)*f (x) dx >>> pprint(dsolve(genform, f(x), hint='Bernoulli_Integral')) #doctest: +SKIP 1 ---- 1 - n // / \ \ || | | | || | / | / | || | | | | | || | (1 - n)* | P(x) dx | (-1 + n)* | P(x) dx| || | | | | | || | / | / | f(x) = ||C1 + (-1 + n)* | -Q(x)*e dx|*e | || | | | \\ / / / Note that the equation is separable when `n = 1` (see the docstring of :py:meth:`~sympy.solvers.ode.ode_separable`). >>> pprint(dsolve(Eq(f(x).diff(x) + P(x)*f(x), Q(x)*f(x)), f(x), ... hint='separable_Integral')) f(x) / | / | 1 | | - dy = C1 + | (-P(x) + Q(x)) dx | y | | / / Examples ======== >>> from sympy import Function, dsolve, Eq, pprint, log >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(Eq(x*f(x).diff(x) + f(x), log(x)*f(x)**2), ... f(x), hint='Bernoulli')) 1 f(x) = ------------------- / log(x) 1\ x*|C1 + ------ + -| \ x x/ References ========== - https://en.wikipedia.org/wiki/Bernoulli_differential_equation - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 95 # indirect doctest """ x = func.args[0] f = func.func r = match # a*diff(f(x),x) + b*f(x) + c*f(x)**n, n != 1 C1 = get_numbered_constants(eq, num=1) t = exp((1 - r[r['n']])*Integral(r[r['b']]/r[r['a']], x)) tt = (r[r['n']] - 1)*Integral(t*r[r['c']]/r[r['a']], x) return Eq(f(x), ((tt + C1)/t)**(1/(1 - r[r['n']]))) def ode_Riccati_special_minus2(eq, func, order, match): r""" The general Riccati equation has the form .. math:: dy/dx = f(x) y^2 + g(x) y + h(x)\text{.} While it does not have a general solution [1], the "special" form, `dy/dx = a y^2 - b x^c`, does have solutions in many cases [2]. This routine returns a solution for `a(dy/dx) = b y^2 + c y/x + d/x^2` that is obtained by using a suitable change of variables to reduce it to the special form and is valid when neither `a` nor `b` are zero and either `c` or `d` is zero. >>> from sympy.abc import x, y, a, b, c, d >>> from sympy.solvers.ode import dsolve, checkodesol >>> from sympy import pprint, Function >>> f = Function('f') >>> y = f(x) >>> genform = a*y.diff(x) - (b*y**2 + c*y/x + d/x**2) >>> sol = dsolve(genform, y) >>> pprint(sol, wrap_line=False) / / __________________ \\ | __________________ | / 2 || | / 2 | \/ 4*b*d - (a + c) *log(x)|| -|a + c - \/ 4*b*d - (a + c) *tan|C1 + ----------------------------|| \ \ 2*a // f(x) = ------------------------------------------------------------------------ 2*b*x >>> checkodesol(genform, sol, order=1)[0] True References ========== 1. http://www.maplesoft.com/support/help/Maple/view.aspx?path=odeadvisor/Riccati 2. http://eqworld.ipmnet.ru/en/solutions/ode/ode0106.pdf - http://eqworld.ipmnet.ru/en/solutions/ode/ode0123.pdf """ x = func.args[0] f = func.func r = match # a2*diff(f(x),x) + b2*f(x) + c2*f(x)/x + d2/x**2 a2, b2, c2, d2 = [r[r[s]] for s in 'a2 b2 c2 d2'.split()] C1 = get_numbered_constants(eq, num=1) mu = sqrt(4*d2*b2 - (a2 - c2)**2) return Eq(f(x), (a2 - c2 - mu*tan(mu/(2*a2)*log(x) + C1))/(2*b2*x)) def ode_Liouville(eq, func, order, match): r""" Solves 2nd order Liouville differential equations. The general form of a Liouville ODE is .. math:: \frac{d^2 y}{dx^2} + g(y) \left(\! \frac{dy}{dx}\!\right)^2 + h(x) \frac{dy}{dx}\text{.} The general solution is: >>> from sympy import Function, dsolve, Eq, pprint, diff >>> from sympy.abc import x >>> f, g, h = map(Function, ['f', 'g', 'h']) >>> genform = Eq(diff(f(x),x,x) + g(f(x))*diff(f(x),x)**2 + ... h(x)*diff(f(x),x), 0) >>> pprint(genform) 2 2 /d \ d d g(f(x))*|--(f(x))| + h(x)*--(f(x)) + ---(f(x)) = 0 \dx / dx 2 dx >>> pprint(dsolve(genform, f(x), hint='Liouville_Integral')) f(x) / / | | | / | / | | | | | - | h(x) dx | | g(y) dy | | | | | / | / C1 + C2* | e dx + | e dy = 0 | | / / Examples ======== >>> from sympy import Function, dsolve, Eq, pprint >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(diff(f(x), x, x) + diff(f(x), x)**2/f(x) + ... diff(f(x), x)/x, f(x), hint='Liouville')) ________________ ________________ [f(x) = -\/ C1 + C2*log(x) , f(x) = \/ C1 + C2*log(x) ] References ========== - Goldstein and Braun, "Advanced Methods for the Solution of Differential Equations", pp. 98 - http://www.maplesoft.com/support/help/Maple/view.aspx?path=odeadvisor/Liouville # indirect doctest """ # Liouville ODE: # f(x).diff(x, 2) + g(f(x))*(f(x).diff(x, 2))**2 + h(x)*f(x).diff(x) # See Goldstein and Braun, "Advanced Methods for the Solution of # Differential Equations", pg. 98, as well as # http://www.maplesoft.com/support/help/view.aspx?path=odeadvisor/Liouville x = func.args[0] f = func.func r = match # f(x).diff(x, 2) + g*f(x).diff(x)**2 + h*f(x).diff(x) y = r['y'] C1, C2 = get_numbered_constants(eq, num=2) int = Integral(exp(Integral(r['g'], y)), (y, None, f(x))) sol = Eq(int + C1*Integral(exp(-Integral(r['h'], x)), x) + C2, 0) return sol def ode_2nd_power_series_ordinary(eq, func, order, match): r""" Gives a power series solution to a second order homogeneous differential equation with polynomial coefficients at an ordinary point. A homogeneous differential equation is of the form .. math :: P(x)\frac{d^2y}{dx^2} + Q(x)\frac{dy}{dx} + R(x) = 0 For simplicity it is assumed that `P(x)`, `Q(x)` and `R(x)` are polynomials, it is sufficient that `\frac{Q(x)}{P(x)}` and `\frac{R(x)}{P(x)}` exists at `x_{0}`. A recurrence relation is obtained by substituting `y` as `\sum_{n=0}^\infty a_{n}x^{n}`, in the differential equation, and equating the nth term. Using this relation various terms can be generated. Examples ======== >>> from sympy import dsolve, Function, pprint >>> from sympy.abc import x, y >>> f = Function("f") >>> eq = f(x).diff(x, 2) + f(x) >>> pprint(dsolve(eq, hint='2nd_power_series_ordinary')) / 4 2 \ / 2\ |x x | | x | / 6\ f(x) = C2*|-- - -- + 1| + C1*x*|1 - --| + O\x / \24 2 / \ 6 / References ========== - http://tutorial.math.lamar.edu/Classes/DE/SeriesSolutions.aspx - George E. Simmons, "Differential Equations with Applications and Historical Notes", p.p 176 - 184 """ x = func.args[0] f = func.func C0, C1 = get_numbered_constants(eq, num=2) n = Dummy("n", integer=True) s = Wild("s") k = Wild("k", exclude=[x]) x0 = match.get('x0') terms = match.get('terms', 5) p = match[match['a3']] q = match[match['b3']] r = match[match['c3']] seriesdict = {} recurr = Function("r") # Generating the recurrence relation which works this way: # for the second order term the summation begins at n = 2. The coefficients # p is multiplied with an*(n - 1)*(n - 2)*x**n-2 and a substitution is made such that # the exponent of x becomes n. # For example, if p is x, then the second degree recurrence term is # an*(n - 1)*(n - 2)*x**n-1, substituting (n - 1) as n, it transforms to # an+1*n*(n - 1)*x**n. # A similar process is done with the first order and zeroth order term. coefflist = [(recurr(n), r), (n*recurr(n), q), (n*(n - 1)*recurr(n), p)] for index, coeff in enumerate(coefflist): if coeff[1]: f2 = powsimp(expand((coeff[1]*(x - x0)**(n - index)).subs(x, x + x0))) if f2.is_Add: addargs = f2.args else: addargs = [f2] for arg in addargs: powm = arg.match(s*x**k) term = coeff[0]*powm[s] if not powm[k].is_Symbol: term = term.subs(n, n - powm[k].as_independent(n)[0]) startind = powm[k].subs(n, index) # Seeing if the startterm can be reduced further. # If it vanishes for n lesser than startind, it is # equal to summation from n. if startind: for i in reversed(range(startind)): if not term.subs(n, i): seriesdict[term] = i else: seriesdict[term] = i + 1 break else: seriesdict[term] = S(0) # Stripping of terms so that the sum starts with the same number. teq = S(0) suminit = seriesdict.values() rkeys = seriesdict.keys() req = Add(*rkeys) if any(suminit): maxval = max(suminit) for term in seriesdict: val = seriesdict[term] if val != maxval: for i in range(val, maxval): teq += term.subs(n, val) finaldict = {} if teq: fargs = teq.atoms(AppliedUndef) if len(fargs) == 1: finaldict[fargs.pop()] = 0 else: maxf = max(fargs, key = lambda x: x.args[0]) sol = solve(teq, maxf) if isinstance(sol, list): sol = sol[0] finaldict[maxf] = sol # Finding the recurrence relation in terms of the largest term. fargs = req.atoms(AppliedUndef) maxf = max(fargs, key = lambda x: x.args[0]) minf = min(fargs, key = lambda x: x.args[0]) if minf.args[0].is_Symbol: startiter = 0 else: startiter = -minf.args[0].as_independent(n)[0] lhs = maxf rhs = solve(req, maxf) if isinstance(rhs, list): rhs = rhs[0] # Checking how many values are already present tcounter = len([t for t in finaldict.values() if t]) for _ in range(tcounter, terms - 3): # Assuming c0 and c1 to be arbitrary check = rhs.subs(n, startiter) nlhs = lhs.subs(n, startiter) nrhs = check.subs(finaldict) finaldict[nlhs] = nrhs startiter += 1 # Post processing series = C0 + C1*(x - x0) for term in finaldict: if finaldict[term]: fact = term.args[0] series += (finaldict[term].subs([(recurr(0), C0), (recurr(1), C1)])*( x - x0)**fact) series = collect(expand_mul(series), [C0, C1]) + Order(x**terms) return Eq(f(x), series) def ode_2nd_power_series_regular(eq, func, order, match): r""" Gives a power series solution to a second order homogeneous differential equation with polynomial coefficients at a regular point. A second order homogeneous differential equation is of the form .. math :: P(x)\frac{d^2y}{dx^2} + Q(x)\frac{dy}{dx} + R(x) = 0 A point is said to regular singular at `x0` if `x - x0\frac{Q(x)}{P(x)}` and `(x - x0)^{2}\frac{R(x)}{P(x)}` are analytic at `x0`. For simplicity `P(x)`, `Q(x)` and `R(x)` are assumed to be polynomials. The algorithm for finding the power series solutions is: 1. Try expressing `(x - x0)P(x)` and `((x - x0)^{2})Q(x)` as power series solutions about x0. Find `p0` and `q0` which are the constants of the power series expansions. 2. Solve the indicial equation `f(m) = m(m - 1) + m*p0 + q0`, to obtain the roots `m1` and `m2` of the indicial equation. 3. If `m1 - m2` is a non integer there exists two series solutions. If `m1 = m2`, there exists only one solution. If `m1 - m2` is an integer, then the existence of one solution is confirmed. The other solution may or may not exist. The power series solution is of the form `x^{m}\sum_{n=0}^\infty a_{n}x^{n}`. The coefficients are determined by the following recurrence relation. `a_{n} = -\frac{\sum_{k=0}^{n-1} q_{n-k} + (m + k)p_{n-k}}{f(m + n)}`. For the case in which `m1 - m2` is an integer, it can be seen from the recurrence relation that for the lower root `m`, when `n` equals the difference of both the roots, the denominator becomes zero. So if the numerator is not equal to zero, a second series solution exists. Examples ======== >>> from sympy import dsolve, Function, pprint >>> from sympy.abc import x, y >>> f = Function("f") >>> eq = x*(f(x).diff(x, 2)) + 2*(f(x).diff(x)) + x*f(x) >>> pprint(dsolve(eq)) / 6 4 2 \ | x x x | / 4 2 \ C1*|- --- + -- - -- + 1| | x x | \ 720 24 2 / / 6\ f(x) = C2*|--- - -- + 1| + ------------------------ + O\x / \120 6 / x References ========== - George E. Simmons, "Differential Equations with Applications and Historical Notes", p.p 176 - 184 """ x = func.args[0] f = func.func C0, C1 = get_numbered_constants(eq, num=2) m = Dummy("m") # for solving the indicial equation x0 = match.get('x0') terms = match.get('terms', 5) p = match['p'] q = match['q'] # Generating the indicial equation indicial = [] for term in [p, q]: if not term.has(x): indicial.append(term) else: term = series(term, n=1, x0=x0) if isinstance(term, Order): indicial.append(S(0)) else: for arg in term.args: if not arg.has(x): indicial.append(arg) break p0, q0 = indicial sollist = solve(m*(m - 1) + m*p0 + q0, m) if sollist and isinstance(sollist, list) and all( [sol.is_real for sol in sollist]): serdict1 = {} serdict2 = {} if len(sollist) == 1: # Only one series solution exists in this case. m1 = m2 = sollist.pop() if terms-m1-1 <= 0: return Eq(f(x), Order(terms)) serdict1 = _frobenius(terms-m1-1, m1, p0, q0, p, q, x0, x, C0) else: m1 = sollist[0] m2 = sollist[1] if m1 < m2: m1, m2 = m2, m1 # Irrespective of whether m1 - m2 is an integer or not, one # Frobenius series solution exists. serdict1 = _frobenius(terms-m1-1, m1, p0, q0, p, q, x0, x, C0) if not (m1 - m2).is_integer: # Second frobenius series solution exists. serdict2 = _frobenius(terms-m2-1, m2, p0, q0, p, q, x0, x, C1) else: # Check if second frobenius series solution exists. serdict2 = _frobenius(terms-m2-1, m2, p0, q0, p, q, x0, x, C1, check=m1) if serdict1: finalseries1 = C0 for key in serdict1: power = int(key.name[1:]) finalseries1 += serdict1[key]*(x - x0)**power finalseries1 = (x - x0)**m1*finalseries1 finalseries2 = S(0) if serdict2: for key in serdict2: power = int(key.name[1:]) finalseries2 += serdict2[key]*(x - x0)**power finalseries2 += C1 finalseries2 = (x - x0)**m2*finalseries2 return Eq(f(x), collect(finalseries1 + finalseries2, [C0, C1]) + Order(x**terms)) def _frobenius(n, m, p0, q0, p, q, x0, x, c, check=None): r""" Returns a dict with keys as coefficients and values as their values in terms of C0 """ n = int(n) # In cases where m1 - m2 is not an integer m2 = check d = Dummy("d") numsyms = numbered_symbols("C", start=0) numsyms = [next(numsyms) for i in range(n + 1)] serlist = [] for ser in [p, q]: # Order term not present if ser.is_polynomial(x) and Poly(ser, x).degree() <= n: if x0: ser = ser.subs(x, x + x0) dict_ = Poly(ser, x).as_dict() # Order term present else: tseries = series(ser, x=x0, n=n+1) # Removing order dict_ = Poly(list(ordered(tseries.args))[: -1], x).as_dict() # Fill in with zeros, if coefficients are zero. for i in range(n + 1): if (i,) not in dict_: dict_[(i,)] = S(0) serlist.append(dict_) pseries = serlist[0] qseries = serlist[1] indicial = d*(d - 1) + d*p0 + q0 frobdict = {} for i in range(1, n + 1): num = c*(m*pseries[(i,)] + qseries[(i,)]) for j in range(1, i): sym = Symbol("C" + str(j)) num += frobdict[sym]*((m + j)*pseries[(i - j,)] + qseries[(i - j,)]) # Checking for cases when m1 - m2 is an integer. If num equals zero # then a second Frobenius series solution cannot be found. If num is not zero # then set constant as zero and proceed. if m2 is not None and i == m2 - m: if num: return False else: frobdict[numsyms[i]] = S(0) else: frobdict[numsyms[i]] = -num/(indicial.subs(d, m+i)) return frobdict def _nth_order_reducible_match(eq, func): r""" Matches any differential equation that can be rewritten with a smaller order. Only derivatives of ``func`` alone, wrt a single variable, are considered, and only in them should ``func`` appear. """ # ODE only handles functions of 1 variable so this affirms that state assert len(func.args) == 1 x = func.args[0] vc = [d.variable_count[0] for d in eq.atoms(Derivative) if d.expr == func and len(d.variable_count) == 1] ords = [c for v, c in vc if v == x] if len(ords) < 2: return smallest = min(ords) # make sure func does not appear outside of derivatives D = Dummy() if eq.subs(func.diff(x, smallest), D).has(func): return return {'n': smallest} def ode_nth_order_reducible(eq, func, order, match): r""" Solves ODEs that only involve derivatives of the dependent variable using a substitution of the form `f^n(x) = g(x)`. For example any second order ODE of the form `f''(x) = h(f'(x), x)` can be transformed into a pair of 1st order ODEs `g'(x) = h(g(x), x)` and `f'(x) = g(x)`. Usually the 1st order ODE for `g` is easier to solve. If that gives an explicit solution for `g` then `f` is found simply by integration. Examples ======== >>> from sympy import Function, dsolve, Eq >>> from sympy.abc import x >>> f = Function('f') >>> eq = Eq(x*f(x).diff(x)**2 + f(x).diff(x, 2), 0) >>> dsolve(eq, f(x), hint='nth_order_reducible') ... # doctest: +NORMALIZE_WHITESPACE Eq(f(x), C1 - sqrt(-1/C2)*log(-C2*sqrt(-1/C2) + x) + sqrt(-1/C2)*log(C2*sqrt(-1/C2) + x)) """ x = func.args[0] f = func.func n = match['n'] # get a unique function name for g names = [a.name for a in eq.atoms(AppliedUndef)] while True: name = Dummy().name if name not in names: g = Function(name) break w = f(x).diff(x, n) geq = eq.subs(w, g(x)) gsol = dsolve(geq, g(x)) if not isinstance(gsol, list): gsol = [gsol] # Might be multiple solutions to the reduced ODE: fsol = [] for gsoli in gsol: fsoli = dsolve(gsoli.subs(g(x), w), f(x)) # or do integration n times fsol.append(fsoli) if len(fsol) == 1: fsol = fsol[0] return fsol # This needs to produce an invertible function but the inverse depends # which variable we are integrating with respect to. Since the class can # be stored in cached results we need to ensure that we always get the # same class back for each particular integration variable so we store these # classes in a global dict: _nth_algebraic_diffx_stored = {} def _nth_algebraic_diffx(var): cls = _nth_algebraic_diffx_stored.get(var, None) if cls is None: # A class that behaves like Derivative wrt var but is "invertible". class diffx(Function): def inverse(self): # don't use integrate here because fx has been replaced by _t # in the equation; integrals will not be correct while solve # is at work. return lambda expr: Integral(expr, var) + Dummy('C') cls = _nth_algebraic_diffx_stored.setdefault(var, diffx) return cls def _nth_algebraic_match(eq, func): r""" Matches any differential equation that nth_algebraic can solve. Uses `sympy.solve` but teaches it how to integrate derivatives. This involves calling `sympy.solve` and does most of the work of finding a solution (apart from evaluating the integrals). """ # The independent variable var = func.args[0] # Derivative that solve can handle: diffx = _nth_algebraic_diffx(var) # Replace derivatives wrt the independent variable with diffx def replace(eq, var): def expand_diffx(*args): differand, diffs = args[0], args[1:] toreplace = differand for v, n in diffs: for _ in range(n): if v == var: toreplace = diffx(toreplace) else: toreplace = Derivative(toreplace, v) return toreplace return eq.replace(Derivative, expand_diffx) # Restore derivatives in solution afterwards def unreplace(eq, var): return eq.replace(diffx, lambda e: Derivative(e, var)) subs_eqn = replace(eq, var) try: # turn off simplification to protect Integrals that have # _t instead of fx in them and would otherwise factor # as t_*Integral(1, x) solns = solve(subs_eqn, func, simplify=False) except NotImplementedError: solns = [] solns = [simplify(unreplace(soln, var)) for soln in solns] solns = [Equality(func, soln) for soln in solns] return {'var':var, 'solutions':solns} def ode_nth_algebraic(eq, func, order, match): r""" Solves an `n`\th order ordinary differential equation using algebra and integrals. There is no general form for the kind of equation that this can solve. The the equation is solved algebraically treating differentiation as an invertible algebraic function. Examples ======== >>> from sympy import Function, dsolve, Eq >>> from sympy.abc import x >>> f = Function('f') >>> eq = Eq(f(x) * (f(x).diff(x)**2 - 1), 0) >>> dsolve(eq, f(x), hint='nth_algebraic') ... # doctest: +NORMALIZE_WHITESPACE [Eq(f(x), 0), Eq(f(x), C1 - x), Eq(f(x), C1 + x)] Note that this solver can return algebraic solutions that do not have any integration constants (f(x) = 0 in the above example). # indirect doctest """ solns = match['solutions'] var = match['var'] solns = _nth_algebraic_remove_redundant_solutions(eq, solns, order, var) if len(solns) == 1: return solns[0] else: return solns # FIXME: Maybe something like this function should be applied to the solutions # returned by dsolve in general rather than just for nth_algebraic... def _nth_algebraic_remove_redundant_solutions(eq, solns, order, var): r""" Remove redundant solutions from the set of solutions returned by nth_algebraic. This function is needed because otherwise nth_algebraic can return redundant solutions where both algebraic solutions and integral solutions are found to the ODE. As an example consider: eq = Eq(f(x) * f(x).diff(x), 0) There are two ways to find solutions to eq. The first is the algebraic solution f(x)=0. The second is to solve the equation f(x).diff(x) = 0 leading to the solution f(x) = C1. In this particular case we then see that the first solution is a special case of the second and we don't want to return it. This does not always happen for algebraic solutions though since if we have eq = Eq(f(x)*(1 + f(x).diff(x)), 0) then we get the algebraic solution f(x) = 0 and the integral solution f(x) = -x + C1 and in this case the two solutions are not equivalent wrt initial conditions so both should be returned. """ def is_special_case_of(soln1, soln2): return _nth_algebraic_is_special_case_of(soln1, soln2, eq, order, var) unique_solns = [] for soln1 in solns: for soln2 in unique_solns[:]: if is_special_case_of(soln1, soln2): break elif is_special_case_of(soln2, soln1): unique_solns.remove(soln2) else: unique_solns.append(soln1) return unique_solns def _nth_algebraic_is_special_case_of(soln1, soln2, eq, order, var): r""" True if soln1 is found to be a special case of soln2 wrt some value of the constants that appear in soln2. False otherwise. """ # The solutions returned by nth_algebraic should be given explicitly as in # Eq(f(x), expr). We will equate the RHSs of the two solutions giving an # equation f1(x) = f2(x). # # Since this is supposed to hold for all x it also holds for derivatives # f1'(x) and f2'(x). For an order n ode we should be able to differentiate # each solution n times to get n+1 equations. # # We then try to solve those n+1 equations for the integrations constants # in f2(x). If we can find a solution that doesn't depend on x then it # means that some value of the constants in f1(x) is a special case of # f2(x) corresponding to a paritcular choice of the integration constants. constants1 = soln1.free_symbols.difference(eq.free_symbols) constants2 = soln2.free_symbols.difference(eq.free_symbols) constants1_new = get_numbered_constants(soln1.rhs - soln2.rhs, len(constants1)) if len(constants1) == 1: constants1_new = {constants1_new} for c_old, c_new in zip(constants1, constants1_new): soln1 = soln1.subs(c_old, c_new) # n equations for f1(x)=f2(x), f1'(x)=f2'(x), ... lhs = soln1.rhs.doit() rhs = soln2.rhs.doit() eqns = [Eq(lhs, rhs)] for n in range(1, order): lhs = lhs.diff(var) rhs = rhs.diff(var) eq = Eq(lhs, rhs) eqns.append(eq) # BooleanTrue/False awkwardly show up for trivial equations if any(isinstance(eq, BooleanFalse) for eq in eqns): return False eqns = [eq for eq in eqns if not isinstance(eq, BooleanTrue)] constant_solns = solve(eqns, constants2) # Sometimes returns a dict and sometimes a list of dicts if isinstance(constant_solns, dict): constant_solns = [constant_solns] # If any solution gives all constants as expressions that don't depend on # x then there exists constants for soln2 that give soln1 for constant_soln in constant_solns: if not any(c.has(var) for c in constant_soln.values()): return True return False def _nth_linear_match(eq, func, order): r""" Matches a differential equation to the linear form: .. math:: a_n(x) y^{(n)} + \cdots + a_1(x)y' + a_0(x) y + B(x) = 0 Returns a dict of order:coeff terms, where order is the order of the derivative on each term, and coeff is the coefficient of that derivative. The key ``-1`` holds the function `B(x)`. Returns ``None`` if the ODE is not linear. This function assumes that ``func`` has already been checked to be good. Examples ======== >>> from sympy import Function, cos, sin >>> from sympy.abc import x >>> from sympy.solvers.ode import _nth_linear_match >>> f = Function('f') >>> _nth_linear_match(f(x).diff(x, 3) + 2*f(x).diff(x) + ... x*f(x).diff(x, 2) + cos(x)*f(x).diff(x) + x - f(x) - ... sin(x), f(x), 3) {-1: x - sin(x), 0: -1, 1: cos(x) + 2, 2: x, 3: 1} >>> _nth_linear_match(f(x).diff(x, 3) + 2*f(x).diff(x) + ... x*f(x).diff(x, 2) + cos(x)*f(x).diff(x) + x - f(x) - ... sin(f(x)), f(x), 3) == None True """ x = func.args[0] one_x = {x} terms = {i: S.Zero for i in range(-1, order + 1)} for i in Add.make_args(eq): if not i.has(func): terms[-1] += i else: c, f = i.as_independent(func) if (isinstance(f, Derivative) and set(f.variables) == one_x and f.args[0] == func): terms[f.derivative_count] += c elif f == func: terms[len(f.args[1:])] += c else: return None return terms def ode_nth_linear_euler_eq_homogeneous(eq, func, order, match, returns='sol'): r""" Solves an `n`\th order linear homogeneous variable-coefficient Cauchy-Euler equidimensional ordinary differential equation. This is an equation with form `0 = a_0 f(x) + a_1 x f'(x) + a_2 x^2 f''(x) \cdots`. These equations can be solved in a general manner, by substituting solutions of the form `f(x) = x^r`, and deriving a characteristic equation for `r`. When there are repeated roots, we include extra terms of the form `C_{r k} \ln^k(x) x^r`, where `C_{r k}` is an arbitrary integration constant, `r` is a root of the characteristic equation, and `k` ranges over the multiplicity of `r`. In the cases where the roots are complex, solutions of the form `C_1 x^a \sin(b \log(x)) + C_2 x^a \cos(b \log(x))` are returned, based on expansions with Euler's formula. The general solution is the sum of the terms found. If SymPy cannot find exact roots to the characteristic equation, a :py:class:`~sympy.polys.rootoftools.CRootOf` instance will be returned instead. >>> from sympy import Function, dsolve, Eq >>> from sympy.abc import x >>> f = Function('f') >>> dsolve(4*x**2*f(x).diff(x, 2) + f(x), f(x), ... hint='nth_linear_euler_eq_homogeneous') ... # doctest: +NORMALIZE_WHITESPACE Eq(f(x), sqrt(x)*(C1 + C2*log(x))) Note that because this method does not involve integration, there is no ``nth_linear_euler_eq_homogeneous_Integral`` hint. The following is for internal use: - ``returns = 'sol'`` returns the solution to the ODE. - ``returns = 'list'`` returns a list of linearly independent solutions, corresponding to the fundamental solution set, for use with non homogeneous solution methods like variation of parameters and undetermined coefficients. Note that, though the solutions should be linearly independent, this function does not explicitly check that. You can do ``assert simplify(wronskian(sollist)) != 0`` to check for linear independence. Also, ``assert len(sollist) == order`` will need to pass. - ``returns = 'both'``, return a dictionary ``{'sol': <solution to ODE>, 'list': <list of linearly independent solutions>}``. Examples ======== >>> from sympy import Function, dsolve, pprint >>> from sympy.abc import x >>> f = Function('f') >>> eq = f(x).diff(x, 2)*x**2 - 4*f(x).diff(x)*x + 6*f(x) >>> pprint(dsolve(eq, f(x), ... hint='nth_linear_euler_eq_homogeneous')) 2 f(x) = x *(C1 + C2*x) References ========== - https://en.wikipedia.org/wiki/Cauchy%E2%80%93Euler_equation - C. Bender & S. Orszag, "Advanced Mathematical Methods for Scientists and Engineers", Springer 1999, pp. 12 # indirect doctest """ global collectterms collectterms = [] x = func.args[0] f = func.func r = match # First, set up characteristic equation. chareq, symbol = S.Zero, Dummy('x') for i in r.keys(): if not isinstance(i, string_types) and i >= 0: chareq += (r[i]*diff(x**symbol, x, i)*x**-symbol).expand() chareq = Poly(chareq, symbol) chareqroots = [rootof(chareq, k) for k in range(chareq.degree())] # A generator of constants constants = list(get_numbered_constants(eq, num=chareq.degree()*2)) constants.reverse() # Create a dict root: multiplicity or charroots charroots = defaultdict(int) for root in chareqroots: charroots[root] += 1 gsol = S(0) # We need keep track of terms so we can run collect() at the end. # This is necessary for constantsimp to work properly. ln = log for root, multiplicity in charroots.items(): for i in range(multiplicity): if isinstance(root, RootOf): gsol += (x**root) * constants.pop() if multiplicity != 1: raise ValueError("Value should be 1") collectterms = [(0, root, 0)] + collectterms elif root.is_real: gsol += ln(x)**i*(x**root) * constants.pop() collectterms = [(i, root, 0)] + collectterms else: reroot = re(root) imroot = im(root) gsol += ln(x)**i * (x**reroot) * ( constants.pop() * sin(abs(imroot)*ln(x)) + constants.pop() * cos(imroot*ln(x))) # Preserve ordering (multiplicity, real part, imaginary part) # It will be assumed implicitly when constructing # fundamental solution sets. collectterms = [(i, reroot, imroot)] + collectterms if returns == 'sol': return Eq(f(x), gsol) elif returns in ('list' 'both'): # HOW TO TEST THIS CODE? (dsolve does not pass 'returns' through) # Create a list of (hopefully) linearly independent solutions gensols = [] # Keep track of when to use sin or cos for nonzero imroot for i, reroot, imroot in collectterms: if imroot == 0: gensols.append(ln(x)**i*x**reroot) else: sin_form = ln(x)**i*x**reroot*sin(abs(imroot)*ln(x)) if sin_form in gensols: cos_form = ln(x)**i*x**reroot*cos(imroot*ln(x)) gensols.append(cos_form) else: gensols.append(sin_form) if returns == 'list': return gensols else: return {'sol': Eq(f(x), gsol), 'list': gensols} else: raise ValueError('Unknown value for key "returns".') def ode_nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients(eq, func, order, match, returns='sol'): r""" Solves an `n`\th order linear non homogeneous Cauchy-Euler equidimensional ordinary differential equation using undetermined coefficients. This is an equation with form `g(x) = a_0 f(x) + a_1 x f'(x) + a_2 x^2 f''(x) \cdots`. These equations can be solved in a general manner, by substituting solutions of the form `x = exp(t)`, and deriving a characteristic equation of form `g(exp(t)) = b_0 f(t) + b_1 f'(t) + b_2 f''(t) \cdots` which can be then solved by nth_linear_constant_coeff_undetermined_coefficients if g(exp(t)) has finite number of linearly independent derivatives. Functions that fit this requirement are finite sums functions of the form `a x^i e^{b x} \sin(c x + d)` or `a x^i e^{b x} \cos(c x + d)`, where `i` is a non-negative integer and `a`, `b`, `c`, and `d` are constants. For example any polynomial in `x`, functions like `x^2 e^{2 x}`, `x \sin(x)`, and `e^x \cos(x)` can all be used. Products of `\sin`'s and `\cos`'s have a finite number of derivatives, because they can be expanded into `\sin(a x)` and `\cos(b x)` terms. However, SymPy currently cannot do that expansion, so you will need to manually rewrite the expression in terms of the above to use this method. So, for example, you will need to manually convert `\sin^2(x)` into `(1 + \cos(2 x))/2` to properly apply the method of undetermined coefficients on it. After replacement of x by exp(t), this method works by creating a trial function from the expression and all of its linear independent derivatives and substituting them into the original ODE. The coefficients for each term will be a system of linear equations, which are be solved for and substituted, giving the solution. If any of the trial functions are linearly dependent on the solution to the homogeneous equation, they are multiplied by sufficient `x` to make them linearly independent. Examples ======== >>> from sympy import dsolve, Function, Derivative, log >>> from sympy.abc import x >>> f = Function('f') >>> eq = x**2*Derivative(f(x), x, x) - 2*x*Derivative(f(x), x) + 2*f(x) - log(x) >>> dsolve(eq, f(x), ... hint='nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients').expand() Eq(f(x), C1*x + C2*x**2 + log(x)/2 + 3/4) """ x = func.args[0] f = func.func r = match chareq, eq, symbol = S.Zero, S.Zero, Dummy('x') for i in r.keys(): if not isinstance(i, string_types) and i >= 0: chareq += (r[i]*diff(x**symbol, x, i)*x**-symbol).expand() for i in range(1,degree(Poly(chareq, symbol))+1): eq += chareq.coeff(symbol**i)*diff(f(x), x, i) if chareq.as_coeff_add(symbol)[0]: eq += chareq.as_coeff_add(symbol)[0]*f(x) e, re = posify(r[-1].subs(x, exp(x))) eq += e.subs(re) match = _nth_linear_match(eq, f(x), ode_order(eq, f(x))) match['trialset'] = r['trialset'] return ode_nth_linear_constant_coeff_undetermined_coefficients(eq, func, order, match).subs(x, log(x)).subs(f(log(x)), f(x)).expand() def ode_nth_linear_euler_eq_nonhomogeneous_variation_of_parameters(eq, func, order, match, returns='sol'): r""" Solves an `n`\th order linear non homogeneous Cauchy-Euler equidimensional ordinary differential equation using variation of parameters. This is an equation with form `g(x) = a_0 f(x) + a_1 x f'(x) + a_2 x^2 f''(x) \cdots`. This method works by assuming that the particular solution takes the form .. math:: \sum_{x=1}^{n} c_i(x) y_i(x) {a_n} {x^n} \text{,} where `y_i` is the `i`\th solution to the homogeneous equation. The solution is then solved using Wronskian's and Cramer's Rule. The particular solution is given by multiplying eq given below with `a_n x^{n}` .. math:: \sum_{x=1}^n \left( \int \frac{W_i(x)}{W(x)} \,dx \right) y_i(x) \text{,} where `W(x)` is the Wronskian of the fundamental system (the system of `n` linearly independent solutions to the homogeneous equation), and `W_i(x)` is the Wronskian of the fundamental system with the `i`\th column replaced with `[0, 0, \cdots, 0, \frac{x^{- n}}{a_n} g{\left(x \right)}]`. This method is general enough to solve any `n`\th order inhomogeneous linear differential equation, but sometimes SymPy cannot simplify the Wronskian well enough to integrate it. If this method hangs, try using the ``nth_linear_constant_coeff_variation_of_parameters_Integral`` hint and simplifying the integrals manually. Also, prefer using ``nth_linear_constant_coeff_undetermined_coefficients`` when it applies, because it doesn't use integration, making it faster and more reliable. Warning, using simplify=False with 'nth_linear_constant_coeff_variation_of_parameters' in :py:meth:`~sympy.solvers.ode.dsolve` may cause it to hang, because it will not attempt to simplify the Wronskian before integrating. It is recommended that you only use simplify=False with 'nth_linear_constant_coeff_variation_of_parameters_Integral' for this method, especially if the solution to the homogeneous equation has trigonometric functions in it. Examples ======== >>> from sympy import Function, dsolve, Derivative >>> from sympy.abc import x >>> f = Function('f') >>> eq = x**2*Derivative(f(x), x, x) - 2*x*Derivative(f(x), x) + 2*f(x) - x**4 >>> dsolve(eq, f(x), ... hint='nth_linear_euler_eq_nonhomogeneous_variation_of_parameters').expand() Eq(f(x), C1*x + C2*x**2 + x**4/6) """ x = func.args[0] f = func.func r = match gensol = ode_nth_linear_euler_eq_homogeneous(eq, func, order, match, returns='both') match.update(gensol) r[-1] = r[-1]/r[ode_order(eq, f(x))] sol = _solve_variation_of_parameters(eq, func, order, match) return Eq(f(x), r['sol'].rhs + (sol.rhs - r['sol'].rhs)*r[ode_order(eq, f(x))]) def ode_almost_linear(eq, func, order, match): r""" Solves an almost-linear differential equation. The general form of an almost linear differential equation is .. math:: f(x) g(y) y + k(x) l(y) + m(x) = 0 \text{where} l'(y) = g(y)\text{.} This can be solved by substituting `l(y) = u(y)`. Making the given substitution reduces it to a linear differential equation of the form `u' + P(x) u + Q(x) = 0`. The general solution is >>> from sympy import Function, dsolve, Eq, pprint >>> from sympy.abc import x, y, n >>> f, g, k, l = map(Function, ['f', 'g', 'k', 'l']) >>> genform = Eq(f(x)*(l(y).diff(y)) + k(x)*l(y) + g(x), 0) >>> pprint(genform) d f(x)*--(l(y)) + g(x) + k(x)*l(y) = 0 dy >>> pprint(dsolve(genform, hint = 'almost_linear')) / // y*k(x) \\ | || ------ || | || f(x) || -y*k(x) | ||-g(x)*e || -------- | ||-------------- for k(x) != 0|| f(x) l(y) = |C1 + |< k(x) ||*e | || || | || -y*g(x) || | || -------- otherwise || | || f(x) || \ \\ // See Also ======== :meth:`sympy.solvers.ode.ode_1st_linear` Examples ======== >>> from sympy import Function, Derivative, pprint >>> from sympy.solvers.ode import dsolve, classify_ode >>> from sympy.abc import x >>> f = Function('f') >>> d = f(x).diff(x) >>> eq = x*d + x*f(x) + 1 >>> dsolve(eq, f(x), hint='almost_linear') Eq(f(x), (C1 - Ei(x))*exp(-x)) >>> pprint(dsolve(eq, f(x), hint='almost_linear')) -x f(x) = (C1 - Ei(x))*e References ========== - Joel Moses, "Symbolic Integration - The Stormy Decade", Communications of the ACM, Volume 14, Number 8, August 1971, pp. 558 """ # Since ode_1st_linear has already been implemented, and the # coefficients have been modified to the required form in # classify_ode, just passing eq, func, order and match to # ode_1st_linear will give the required output. return ode_1st_linear(eq, func, order, match) def _linear_coeff_match(expr, func): r""" Helper function to match hint ``linear_coefficients``. Matches the expression to the form `(a_1 x + b_1 f(x) + c_1)/(a_2 x + b_2 f(x) + c_2)` where the following conditions hold: 1. `a_1`, `b_1`, `c_1`, `a_2`, `b_2`, `c_2` are Rationals; 2. `c_1` or `c_2` are not equal to zero; 3. `a_2 b_1 - a_1 b_2` is not equal to zero. Return ``xarg``, ``yarg`` where 1. ``xarg`` = `(b_2 c_1 - b_1 c_2)/(a_2 b_1 - a_1 b_2)` 2. ``yarg`` = `(a_1 c_2 - a_2 c_1)/(a_2 b_1 - a_1 b_2)` Examples ======== >>> from sympy import Function >>> from sympy.abc import x >>> from sympy.solvers.ode import _linear_coeff_match >>> from sympy.functions.elementary.trigonometric import sin >>> f = Function('f') >>> _linear_coeff_match(( ... (-25*f(x) - 8*x + 62)/(4*f(x) + 11*x - 11)), f(x)) (1/9, 22/9) >>> _linear_coeff_match( ... sin((-5*f(x) - 8*x + 6)/(4*f(x) + x - 1)), f(x)) (19/27, 2/27) >>> _linear_coeff_match(sin(f(x)/x), f(x)) """ f = func.func x = func.args[0] def abc(eq): r''' Internal function of _linear_coeff_match that returns Rationals a, b, c if eq is a*x + b*f(x) + c, else None. ''' eq = _mexpand(eq) c = eq.as_independent(x, f(x), as_Add=True)[0] if not c.is_Rational: return a = eq.coeff(x) if not a.is_Rational: return b = eq.coeff(f(x)) if not b.is_Rational: return if eq == a*x + b*f(x) + c: return a, b, c def match(arg): r''' Internal function of _linear_coeff_match that returns Rationals a1, b1, c1, a2, b2, c2 and a2*b1 - a1*b2 of the expression (a1*x + b1*f(x) + c1)/(a2*x + b2*f(x) + c2) if one of c1 or c2 and a2*b1 - a1*b2 is non-zero, else None. ''' n, d = arg.together().as_numer_denom() m = abc(n) if m is not None: a1, b1, c1 = m m = abc(d) if m is not None: a2, b2, c2 = m d = a2*b1 - a1*b2 if (c1 or c2) and d: return a1, b1, c1, a2, b2, c2, d m = [fi.args[0] for fi in expr.atoms(Function) if fi.func != f and len(fi.args) == 1 and not fi.args[0].is_Function] or {expr} m1 = match(m.pop()) if m1 and all(match(mi) == m1 for mi in m): a1, b1, c1, a2, b2, c2, denom = m1 return (b2*c1 - b1*c2)/denom, (a1*c2 - a2*c1)/denom def ode_linear_coefficients(eq, func, order, match): r""" Solves a differential equation with linear coefficients. The general form of a differential equation with linear coefficients is .. math:: y' + F\left(\!\frac{a_1 x + b_1 y + c_1}{a_2 x + b_2 y + c_2}\!\right) = 0\text{,} where `a_1`, `b_1`, `c_1`, `a_2`, `b_2`, `c_2` are constants and `a_1 b_2 - a_2 b_1 \ne 0`. This can be solved by substituting: .. math:: x = x' + \frac{b_2 c_1 - b_1 c_2}{a_2 b_1 - a_1 b_2} y = y' + \frac{a_1 c_2 - a_2 c_1}{a_2 b_1 - a_1 b_2}\text{.} This substitution reduces the equation to a homogeneous differential equation. See Also ======== :meth:`sympy.solvers.ode.ode_1st_homogeneous_coeff_best` :meth:`sympy.solvers.ode.ode_1st_homogeneous_coeff_subs_indep_div_dep` :meth:`sympy.solvers.ode.ode_1st_homogeneous_coeff_subs_dep_div_indep` Examples ======== >>> from sympy import Function, Derivative, pprint >>> from sympy.solvers.ode import dsolve, classify_ode >>> from sympy.abc import x >>> f = Function('f') >>> df = f(x).diff(x) >>> eq = (x + f(x) + 1)*df + (f(x) - 6*x + 1) >>> dsolve(eq, hint='linear_coefficients') [Eq(f(x), -x - sqrt(C1 + 7*x**2) - 1), Eq(f(x), -x + sqrt(C1 + 7*x**2) - 1)] >>> pprint(dsolve(eq, hint='linear_coefficients')) ___________ ___________ / 2 / 2 [f(x) = -x - \/ C1 + 7*x - 1, f(x) = -x + \/ C1 + 7*x - 1] References ========== - Joel Moses, "Symbolic Integration - The Stormy Decade", Communications of the ACM, Volume 14, Number 8, August 1971, pp. 558 """ return ode_1st_homogeneous_coeff_best(eq, func, order, match) def ode_separable_reduced(eq, func, order, match): r""" Solves a differential equation that can be reduced to the separable form. The general form of this equation is .. math:: y' + (y/x) H(x^n y) = 0\text{}. This can be solved by substituting `u(y) = x^n y`. The equation then reduces to the separable form `\frac{u'}{u (\mathrm{power} - H(u))} - \frac{1}{x} = 0`. The general solution is: >>> from sympy import Function, dsolve, Eq, pprint >>> from sympy.abc import x, n >>> f, g = map(Function, ['f', 'g']) >>> genform = f(x).diff(x) + (f(x)/x)*g(x**n*f(x)) >>> pprint(genform) / n \ d f(x)*g\x *f(x)/ --(f(x)) + --------------- dx x >>> pprint(dsolve(genform, hint='separable_reduced')) n x *f(x) / | | 1 | ------------ dy = C1 + log(x) | y*(n - g(y)) | / See Also ======== :meth:`sympy.solvers.ode.ode_separable` Examples ======== >>> from sympy import Function, Derivative, pprint >>> from sympy.solvers.ode import dsolve, classify_ode >>> from sympy.abc import x >>> f = Function('f') >>> d = f(x).diff(x) >>> eq = (x - x**2*f(x))*d - f(x) >>> dsolve(eq, hint='separable_reduced') [Eq(f(x), (1 - sqrt(C1*x**2 + 1))/x), Eq(f(x), (sqrt(C1*x**2 + 1) + 1)/x)] >>> pprint(dsolve(eq, hint='separable_reduced')) ___________ ___________ / 2 / 2 1 - \/ C1*x + 1 \/ C1*x + 1 + 1 [f(x) = ------------------, f(x) = ------------------] x x References ========== - Joel Moses, "Symbolic Integration - The Stormy Decade", Communications of the ACM, Volume 14, Number 8, August 1971, pp. 558 """ # Arguments are passed in a way so that they are coherent with the # ode_separable function x = func.args[0] f = func.func y = Dummy('y') u = match['u'].subs(match['t'], y) ycoeff = 1/(y*(match['power'] - u)) m1 = {y: 1, x: -1/x, 'coeff': 1} m2 = {y: ycoeff, x: 1, 'coeff': 1} r = {'m1': m1, 'm2': m2, 'y': y, 'hint': x**match['power']*f(x)} return ode_separable(eq, func, order, r) def ode_1st_power_series(eq, func, order, match): r""" The power series solution is a method which gives the Taylor series expansion to the solution of a differential equation. For a first order differential equation `\frac{dy}{dx} = h(x, y)`, a power series solution exists at a point `x = x_{0}` if `h(x, y)` is analytic at `x_{0}`. The solution is given by .. math:: y(x) = y(x_{0}) + \sum_{n = 1}^{\infty} \frac{F_{n}(x_{0},b)(x - x_{0})^n}{n!}, where `y(x_{0}) = b` is the value of y at the initial value of `x_{0}`. To compute the values of the `F_{n}(x_{0},b)` the following algorithm is followed, until the required number of terms are generated. 1. `F_1 = h(x_{0}, b)` 2. `F_{n+1} = \frac{\partial F_{n}}{\partial x} + \frac{\partial F_{n}}{\partial y}F_{1}` Examples ======== >>> from sympy import Function, Derivative, pprint, exp >>> from sympy.solvers.ode import dsolve >>> from sympy.abc import x >>> f = Function('f') >>> eq = exp(x)*(f(x).diff(x)) - f(x) >>> pprint(dsolve(eq, hint='1st_power_series')) 3 4 5 C1*x C1*x C1*x / 6\ f(x) = C1 + C1*x - ----- + ----- + ----- + O\x / 6 24 60 References ========== - Travis W. Walker, Analytic power series technique for solving first-order differential equations, p.p 17, 18 """ x = func.args[0] y = match['y'] f = func.func h = -match[match['d']]/match[match['e']] point = match.get('f0') value = match.get('f0val') terms = match.get('terms') # First term F = h if not h: return Eq(f(x), value) # Initialization series = value if terms > 1: hc = h.subs({x: point, y: value}) if hc.has(oo) or hc.has(NaN) or hc.has(zoo): # Derivative does not exist, not analytic return Eq(f(x), oo) elif hc: series += hc*(x - point) for factcount in range(2, terms): Fnew = F.diff(x) + F.diff(y)*h Fnewc = Fnew.subs({x: point, y: value}) # Same logic as above if Fnewc.has(oo) or Fnewc.has(NaN) or Fnewc.has(-oo) or Fnewc.has(zoo): return Eq(f(x), oo) series += Fnewc*((x - point)**factcount)/factorial(factcount) F = Fnew series += Order(x**terms) return Eq(f(x), series) def ode_nth_linear_constant_coeff_homogeneous(eq, func, order, match, returns='sol'): r""" Solves an `n`\th order linear homogeneous differential equation with constant coefficients. This is an equation of the form .. math:: a_n f^{(n)}(x) + a_{n-1} f^{(n-1)}(x) + \cdots + a_1 f'(x) + a_0 f(x) = 0\text{.} These equations can be solved in a general manner, by taking the roots of the characteristic equation `a_n m^n + a_{n-1} m^{n-1} + \cdots + a_1 m + a_0 = 0`. The solution will then be the sum of `C_n x^i e^{r x}` terms, for each where `C_n` is an arbitrary constant, `r` is a root of the characteristic equation and `i` is one of each from 0 to the multiplicity of the root - 1 (for example, a root 3 of multiplicity 2 would create the terms `C_1 e^{3 x} + C_2 x e^{3 x}`). The exponential is usually expanded for complex roots using Euler's equation `e^{I x} = \cos(x) + I \sin(x)`. Complex roots always come in conjugate pairs in polynomials with real coefficients, so the two roots will be represented (after simplifying the constants) as `e^{a x} \left(C_1 \cos(b x) + C_2 \sin(b x)\right)`. If SymPy cannot find exact roots to the characteristic equation, a :py:class:`~sympy.polys.rootoftools.CRootOf` instance will be return instead. >>> from sympy import Function, dsolve, Eq >>> from sympy.abc import x >>> f = Function('f') >>> dsolve(f(x).diff(x, 5) + 10*f(x).diff(x) - 2*f(x), f(x), ... hint='nth_linear_constant_coeff_homogeneous') ... # doctest: +NORMALIZE_WHITESPACE Eq(f(x), C5*exp(x*CRootOf(_x**5 + 10*_x - 2, 0)) + (C1*sin(x*im(CRootOf(_x**5 + 10*_x - 2, 1))) + C2*cos(x*im(CRootOf(_x**5 + 10*_x - 2, 1))))*exp(x*re(CRootOf(_x**5 + 10*_x - 2, 1))) + (C3*sin(x*im(CRootOf(_x**5 + 10*_x - 2, 3))) + C4*cos(x*im(CRootOf(_x**5 + 10*_x - 2, 3))))*exp(x*re(CRootOf(_x**5 + 10*_x - 2, 3)))) Note that because this method does not involve integration, there is no ``nth_linear_constant_coeff_homogeneous_Integral`` hint. The following is for internal use: - ``returns = 'sol'`` returns the solution to the ODE. - ``returns = 'list'`` returns a list of linearly independent solutions, for use with non homogeneous solution methods like variation of parameters and undetermined coefficients. Note that, though the solutions should be linearly independent, this function does not explicitly check that. You can do ``assert simplify(wronskian(sollist)) != 0`` to check for linear independence. Also, ``assert len(sollist) == order`` will need to pass. - ``returns = 'both'``, return a dictionary ``{'sol': <solution to ODE>, 'list': <list of linearly independent solutions>}``. Examples ======== >>> from sympy import Function, dsolve, pprint >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(f(x).diff(x, 4) + 2*f(x).diff(x, 3) - ... 2*f(x).diff(x, 2) - 6*f(x).diff(x) + 5*f(x), f(x), ... hint='nth_linear_constant_coeff_homogeneous')) x -2*x f(x) = (C1 + C2*x)*e + (C3*sin(x) + C4*cos(x))*e References ========== - https://en.wikipedia.org/wiki/Linear_differential_equation section: Nonhomogeneous_equation_with_constant_coefficients - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 211 # indirect doctest """ x = func.args[0] f = func.func r = match # First, set up characteristic equation. chareq, symbol = S.Zero, Dummy('x') for i in r.keys(): if type(i) == str or i < 0: pass else: chareq += r[i]*symbol**i chareq = Poly(chareq, symbol) # Can't just call roots because it doesn't return rootof for unsolveable # polynomials. chareqroots = roots(chareq, multiple=True) if len(chareqroots) != order: chareqroots = [rootof(chareq, k) for k in range(chareq.degree())] chareq_is_complex = not all([i.is_real for i in chareq.all_coeffs()]) # A generator of constants constants = list(get_numbered_constants(eq, num=chareq.degree()*2)) # Create a dict root: multiplicity or charroots charroots = defaultdict(int) for root in chareqroots: charroots[root] += 1 # We need to keep track of terms so we can run collect() at the end. # This is necessary for constantsimp to work properly. global collectterms collectterms = [] gensols = [] conjugate_roots = [] # used to prevent double-use of conjugate roots # Loop over roots in theorder provided by roots/rootof... for root in chareqroots: # but don't repoeat multiple roots. if root not in charroots: continue multiplicity = charroots.pop(root) for i in range(multiplicity): if chareq_is_complex: gensols.append(x**i*exp(root*x)) collectterms = [(i, root, 0)] + collectterms continue reroot = re(root) imroot = im(root) if imroot.has(atan2) and reroot.has(atan2): # Remove this condition when re and im stop returning # circular atan2 usages. gensols.append(x**i*exp(root*x)) collectterms = [(i, root, 0)] + collectterms else: if root in conjugate_roots: collectterms = [(i, reroot, imroot)] + collectterms continue if imroot == 0: gensols.append(x**i*exp(reroot*x)) collectterms = [(i, reroot, 0)] + collectterms continue conjugate_roots.append(conjugate(root)) gensols.append(x**i*exp(reroot*x) * sin(abs(imroot) * x)) gensols.append(x**i*exp(reroot*x) * cos( imroot * x)) # This ordering is important collectterms = [(i, reroot, imroot)] + collectterms if returns == 'list': return gensols elif returns in ('sol' 'both'): gsol = Add(*[i*j for (i, j) in zip(constants, gensols)]) if returns == 'sol': return Eq(f(x), gsol) else: return {'sol': Eq(f(x), gsol), 'list': gensols} else: raise ValueError('Unknown value for key "returns".') def ode_nth_linear_constant_coeff_undetermined_coefficients(eq, func, order, match): r""" Solves an `n`\th order linear differential equation with constant coefficients using the method of undetermined coefficients. This method works on differential equations of the form .. math:: a_n f^{(n)}(x) + a_{n-1} f^{(n-1)}(x) + \cdots + a_1 f'(x) + a_0 f(x) = P(x)\text{,} where `P(x)` is a function that has a finite number of linearly independent derivatives. Functions that fit this requirement are finite sums functions of the form `a x^i e^{b x} \sin(c x + d)` or `a x^i e^{b x} \cos(c x + d)`, where `i` is a non-negative integer and `a`, `b`, `c`, and `d` are constants. For example any polynomial in `x`, functions like `x^2 e^{2 x}`, `x \sin(x)`, and `e^x \cos(x)` can all be used. Products of `\sin`'s and `\cos`'s have a finite number of derivatives, because they can be expanded into `\sin(a x)` and `\cos(b x)` terms. However, SymPy currently cannot do that expansion, so you will need to manually rewrite the expression in terms of the above to use this method. So, for example, you will need to manually convert `\sin^2(x)` into `(1 + \cos(2 x))/2` to properly apply the method of undetermined coefficients on it. This method works by creating a trial function from the expression and all of its linear independent derivatives and substituting them into the original ODE. The coefficients for each term will be a system of linear equations, which are be solved for and substituted, giving the solution. If any of the trial functions are linearly dependent on the solution to the homogeneous equation, they are multiplied by sufficient `x` to make them linearly independent. Examples ======== >>> from sympy import Function, dsolve, pprint, exp, cos >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(f(x).diff(x, 2) + 2*f(x).diff(x) + f(x) - ... 4*exp(-x)*x**2 + cos(2*x), f(x), ... hint='nth_linear_constant_coeff_undetermined_coefficients')) / 4\ | x | -x 4*sin(2*x) 3*cos(2*x) f(x) = |C1 + C2*x + --|*e - ---------- + ---------- \ 3 / 25 25 References ========== - https://en.wikipedia.org/wiki/Method_of_undetermined_coefficients - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 221 # indirect doctest """ gensol = ode_nth_linear_constant_coeff_homogeneous(eq, func, order, match, returns='both') match.update(gensol) return _solve_undetermined_coefficients(eq, func, order, match) def _solve_undetermined_coefficients(eq, func, order, match): r""" Helper function for the method of undetermined coefficients. See the :py:meth:`~sympy.solvers.ode.ode_nth_linear_constant_coeff_undetermined_coefficients` docstring for more information on this method. The parameter ``match`` should be a dictionary that has the following keys: ``list`` A list of solutions to the homogeneous equation, such as the list returned by ``ode_nth_linear_constant_coeff_homogeneous(returns='list')``. ``sol`` The general solution, such as the solution returned by ``ode_nth_linear_constant_coeff_homogeneous(returns='sol')``. ``trialset`` The set of trial functions as returned by ``_undetermined_coefficients_match()['trialset']``. """ x = func.args[0] f = func.func r = match coeffs = numbered_symbols('a', cls=Dummy) coefflist = [] gensols = r['list'] gsol = r['sol'] trialset = r['trialset'] notneedset = set([]) global collectterms if len(gensols) != order: raise NotImplementedError("Cannot find " + str(order) + " solutions to the homogeneous equation necessary to apply" + " undetermined coefficients to " + str(eq) + " (number of terms != order)") usedsin = set([]) mult = 0 # The multiplicity of the root getmult = True for i, reroot, imroot in collectterms: if getmult: mult = i + 1 getmult = False if i == 0: getmult = True if imroot: # Alternate between sin and cos if (i, reroot) in usedsin: check = x**i*exp(reroot*x)*cos(imroot*x) else: check = x**i*exp(reroot*x)*sin(abs(imroot)*x) usedsin.add((i, reroot)) else: check = x**i*exp(reroot*x) if check in trialset: # If an element of the trial function is already part of the # homogeneous solution, we need to multiply by sufficient x to # make it linearly independent. We also don't need to bother # checking for the coefficients on those elements, since we # already know it will be 0. while True: if check*x**mult in trialset: mult += 1 else: break trialset.add(check*x**mult) notneedset.add(check) newtrialset = trialset - notneedset trialfunc = 0 for i in newtrialset: c = next(coeffs) coefflist.append(c) trialfunc += c*i eqs = sub_func_doit(eq, f(x), trialfunc) coeffsdict = dict(list(zip(trialset, [0]*(len(trialset) + 1)))) eqs = _mexpand(eqs) for i in Add.make_args(eqs): s = separatevars(i, dict=True, symbols=[x]) coeffsdict[s[x]] += s['coeff'] coeffvals = solve(list(coeffsdict.values()), coefflist) if not coeffvals: raise NotImplementedError( "Could not solve `%s` using the " "method of undetermined coefficients " "(unable to solve for coefficients)." % eq) psol = trialfunc.subs(coeffvals) return Eq(f(x), gsol.rhs + psol) def _undetermined_coefficients_match(expr, x): r""" Returns a trial function match if undetermined coefficients can be applied to ``expr``, and ``None`` otherwise. A trial expression can be found for an expression for use with the method of undetermined coefficients if the expression is an additive/multiplicative combination of constants, polynomials in `x` (the independent variable of expr), `\sin(a x + b)`, `\cos(a x + b)`, and `e^{a x}` terms (in other words, it has a finite number of linearly independent derivatives). Note that you may still need to multiply each term returned here by sufficient `x` to make it linearly independent with the solutions to the homogeneous equation. This is intended for internal use by ``undetermined_coefficients`` hints. SymPy currently has no way to convert `\sin^n(x) \cos^m(y)` into a sum of only `\sin(a x)` and `\cos(b x)` terms, so these are not implemented. So, for example, you will need to manually convert `\sin^2(x)` into `[1 + \cos(2 x)]/2` to properly apply the method of undetermined coefficients on it. Examples ======== >>> from sympy import log, exp >>> from sympy.solvers.ode import _undetermined_coefficients_match >>> from sympy.abc import x >>> _undetermined_coefficients_match(9*x*exp(x) + exp(-x), x) {'test': True, 'trialset': {x*exp(x), exp(-x), exp(x)}} >>> _undetermined_coefficients_match(log(x), x) {'test': False} """ a = Wild('a', exclude=[x]) b = Wild('b', exclude=[x]) expr = powsimp(expr, combine='exp') # exp(x)*exp(2*x + 1) => exp(3*x + 1) retdict = {} def _test_term(expr, x): r""" Test if ``expr`` fits the proper form for undetermined coefficients. """ if not expr.has(x): return True elif expr.is_Add: return all(_test_term(i, x) for i in expr.args) elif expr.is_Mul: if expr.has(sin, cos): foundtrig = False # Make sure that there is only one trig function in the args. # See the docstring. for i in expr.args: if i.has(sin, cos): if foundtrig: return False else: foundtrig = True return all(_test_term(i, x) for i in expr.args) elif expr.is_Function: if expr.func in (sin, cos, exp): if expr.args[0].match(a*x + b): return True else: return False else: return False elif expr.is_Pow and expr.base.is_Symbol and expr.exp.is_Integer and \ expr.exp >= 0: return True elif expr.is_Pow and expr.base.is_number: if expr.exp.match(a*x + b): return True else: return False elif expr.is_Symbol or expr.is_number: return True else: return False def _get_trial_set(expr, x, exprs=set([])): r""" Returns a set of trial terms for undetermined coefficients. The idea behind undetermined coefficients is that the terms expression repeat themselves after a finite number of derivatives, except for the coefficients (they are linearly dependent). So if we collect these, we should have the terms of our trial function. """ def _remove_coefficient(expr, x): r""" Returns the expression without a coefficient. Similar to expr.as_independent(x)[1], except it only works multiplicatively. """ term = S.One if expr.is_Mul: for i in expr.args: if i.has(x): term *= i elif expr.has(x): term = expr return term expr = expand_mul(expr) if expr.is_Add: for term in expr.args: if _remove_coefficient(term, x) in exprs: pass else: exprs.add(_remove_coefficient(term, x)) exprs = exprs.union(_get_trial_set(term, x, exprs)) else: term = _remove_coefficient(expr, x) tmpset = exprs.union({term}) oldset = set([]) while tmpset != oldset: # If you get stuck in this loop, then _test_term is probably # broken oldset = tmpset.copy() expr = expr.diff(x) term = _remove_coefficient(expr, x) if term.is_Add: tmpset = tmpset.union(_get_trial_set(term, x, tmpset)) else: tmpset.add(term) exprs = tmpset return exprs retdict['test'] = _test_term(expr, x) if retdict['test']: # Try to generate a list of trial solutions that will have the # undetermined coefficients. Note that if any of these are not linearly # independent with any of the solutions to the homogeneous equation, # then they will need to be multiplied by sufficient x to make them so. # This function DOES NOT do that (it doesn't even look at the # homogeneous equation). retdict['trialset'] = _get_trial_set(expr, x) return retdict def ode_nth_linear_constant_coeff_variation_of_parameters(eq, func, order, match): r""" Solves an `n`\th order linear differential equation with constant coefficients using the method of variation of parameters. This method works on any differential equations of the form .. math:: f^{(n)}(x) + a_{n-1} f^{(n-1)}(x) + \cdots + a_1 f'(x) + a_0 f(x) = P(x)\text{.} This method works by assuming that the particular solution takes the form .. math:: \sum_{x=1}^{n} c_i(x) y_i(x)\text{,} where `y_i` is the `i`\th solution to the homogeneous equation. The solution is then solved using Wronskian's and Cramer's Rule. The particular solution is given by .. math:: \sum_{x=1}^n \left( \int \frac{W_i(x)}{W(x)} \,dx \right) y_i(x) \text{,} where `W(x)` is the Wronskian of the fundamental system (the system of `n` linearly independent solutions to the homogeneous equation), and `W_i(x)` is the Wronskian of the fundamental system with the `i`\th column replaced with `[0, 0, \cdots, 0, P(x)]`. This method is general enough to solve any `n`\th order inhomogeneous linear differential equation with constant coefficients, but sometimes SymPy cannot simplify the Wronskian well enough to integrate it. If this method hangs, try using the ``nth_linear_constant_coeff_variation_of_parameters_Integral`` hint and simplifying the integrals manually. Also, prefer using ``nth_linear_constant_coeff_undetermined_coefficients`` when it applies, because it doesn't use integration, making it faster and more reliable. Warning, using simplify=False with 'nth_linear_constant_coeff_variation_of_parameters' in :py:meth:`~sympy.solvers.ode.dsolve` may cause it to hang, because it will not attempt to simplify the Wronskian before integrating. It is recommended that you only use simplify=False with 'nth_linear_constant_coeff_variation_of_parameters_Integral' for this method, especially if the solution to the homogeneous equation has trigonometric functions in it. Examples ======== >>> from sympy import Function, dsolve, pprint, exp, log >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(f(x).diff(x, 3) - 3*f(x).diff(x, 2) + ... 3*f(x).diff(x) - f(x) - exp(x)*log(x), f(x), ... hint='nth_linear_constant_coeff_variation_of_parameters')) / 3 \ | 2 x *(6*log(x) - 11)| x f(x) = |C1 + C2*x + C3*x + ------------------|*e \ 36 / References ========== - https://en.wikipedia.org/wiki/Variation_of_parameters - http://planetmath.org/VariationOfParameters - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 233 # indirect doctest """ gensol = ode_nth_linear_constant_coeff_homogeneous(eq, func, order, match, returns='both') match.update(gensol) return _solve_variation_of_parameters(eq, func, order, match) def _solve_variation_of_parameters(eq, func, order, match): r""" Helper function for the method of variation of parameters and nonhomogeneous euler eq. See the :py:meth:`~sympy.solvers.ode.ode_nth_linear_constant_coeff_variation_of_parameters` docstring for more information on this method. The parameter ``match`` should be a dictionary that has the following keys: ``list`` A list of solutions to the homogeneous equation, such as the list returned by ``ode_nth_linear_constant_coeff_homogeneous(returns='list')``. ``sol`` The general solution, such as the solution returned by ``ode_nth_linear_constant_coeff_homogeneous(returns='sol')``. """ x = func.args[0] f = func.func r = match psol = 0 gensols = r['list'] gsol = r['sol'] wr = wronskian(gensols, x) if r.get('simplify', True): wr = simplify(wr) # We need much better simplification for # some ODEs. See issue 4662, for example. # To reduce commonly occurring sin(x)**2 + cos(x)**2 to 1 wr = trigsimp(wr, deep=True, recursive=True) if not wr: # The wronskian will be 0 iff the solutions are not linearly # independent. raise NotImplementedError("Cannot find " + str(order) + " solutions to the homogeneous equation necessary to apply " + "variation of parameters to " + str(eq) + " (Wronskian == 0)") if len(gensols) != order: raise NotImplementedError("Cannot find " + str(order) + " solutions to the homogeneous equation necessary to apply " + "variation of parameters to " + str(eq) + " (number of terms != order)") negoneterm = (-1)**(order) for i in gensols: psol += negoneterm*Integral(wronskian([sol for sol in gensols if sol != i], x)*r[-1]/wr, x)*i/r[order] negoneterm *= -1 if r.get('simplify', True): psol = simplify(psol) psol = trigsimp(psol, deep=True) return Eq(f(x), gsol.rhs + psol) def ode_separable(eq, func, order, match): r""" Solves separable 1st order differential equations. This is any differential equation that can be written as `P(y) \tfrac{dy}{dx} = Q(x)`. The solution can then just be found by rearranging terms and integrating: `\int P(y) \,dy = \int Q(x) \,dx`. This hint uses :py:meth:`sympy.simplify.simplify.separatevars` as its back end, so if a separable equation is not caught by this solver, it is most likely the fault of that function. :py:meth:`~sympy.simplify.simplify.separatevars` is smart enough to do most expansion and factoring necessary to convert a separable equation `F(x, y)` into the proper form `P(x)\cdot{}Q(y)`. The general solution is:: >>> from sympy import Function, dsolve, Eq, pprint >>> from sympy.abc import x >>> a, b, c, d, f = map(Function, ['a', 'b', 'c', 'd', 'f']) >>> genform = Eq(a(x)*b(f(x))*f(x).diff(x), c(x)*d(f(x))) >>> pprint(genform) d a(x)*b(f(x))*--(f(x)) = c(x)*d(f(x)) dx >>> pprint(dsolve(genform, f(x), hint='separable_Integral')) f(x) / / | | | b(y) | c(x) | ---- dy = C1 + | ---- dx | d(y) | a(x) | | / / Examples ======== >>> from sympy import Function, dsolve, Eq >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(Eq(f(x)*f(x).diff(x) + x, 3*x*f(x)**2), f(x), ... hint='separable', simplify=False)) / 2 \ 2 log\3*f (x) - 1/ x ---------------- = C1 + -- 6 2 References ========== - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", Dover 1963, pp. 52 # indirect doctest """ x = func.args[0] f = func.func C1 = get_numbered_constants(eq, num=1) r = match # {'m1':m1, 'm2':m2, 'y':y} u = r.get('hint', f(x)) # get u from separable_reduced else get f(x) return Eq(Integral(r['m2']['coeff']*r['m2'][r['y']]/r['m1'][r['y']], (r['y'], None, u)), Integral(-r['m1']['coeff']*r['m1'][x]/ r['m2'][x], x) + C1) def checkinfsol(eq, infinitesimals, func=None, order=None): r""" This function is used to check if the given infinitesimals are the actual infinitesimals of the given first order differential equation. This method is specific to the Lie Group Solver of ODEs. As of now, it simply checks, by substituting the infinitesimals in the partial differential equation. .. math:: \frac{\partial \eta}{\partial x} + \left(\frac{\partial \eta}{\partial y} - \frac{\partial \xi}{\partial x}\right)*h - \frac{\partial \xi}{\partial y}*h^{2} - \xi\frac{\partial h}{\partial x} - \eta\frac{\partial h}{\partial y} = 0 where `\eta`, and `\xi` are the infinitesimals and `h(x,y) = \frac{dy}{dx}` The infinitesimals should be given in the form of a list of dicts ``[{xi(x, y): inf, eta(x, y): inf}]``, corresponding to the output of the function infinitesimals. It returns a list of values of the form ``[(True/False, sol)]`` where ``sol`` is the value obtained after substituting the infinitesimals in the PDE. If it is ``True``, then ``sol`` would be 0. """ if isinstance(eq, Equality): eq = eq.lhs - eq.rhs if not func: eq, func = _preprocess(eq) variables = func.args if len(variables) != 1: raise ValueError("ODE's have only one independent variable") else: x = variables[0] if not order: order = ode_order(eq, func) if order != 1: raise NotImplementedError("Lie groups solver has been implemented " "only for first order differential equations") else: df = func.diff(x) a = Wild('a', exclude = [df]) b = Wild('b', exclude = [df]) match = collect(expand(eq), df).match(a*df + b) if match: h = -simplify(match[b]/match[a]) else: try: sol = solve(eq, df) except NotImplementedError: raise NotImplementedError("Infinitesimals for the " "first order ODE could not be found") else: h = sol[0] # Find infinitesimals for one solution y = Dummy('y') h = h.subs(func, y) xi = Function('xi')(x, y) eta = Function('eta')(x, y) dxi = Function('xi')(x, func) deta = Function('eta')(x, func) pde = (eta.diff(x) + (eta.diff(y) - xi.diff(x))*h - (xi.diff(y))*h**2 - xi*(h.diff(x)) - eta*(h.diff(y))) soltup = [] for sol in infinitesimals: tsol = {xi: S(sol[dxi]).subs(func, y), eta: S(sol[deta]).subs(func, y)} sol = simplify(pde.subs(tsol).doit()) if sol: soltup.append((False, sol.subs(y, func))) else: soltup.append((True, 0)) return soltup def ode_lie_group(eq, func, order, match): r""" This hint implements the Lie group method of solving first order differential equations. The aim is to convert the given differential equation from the given coordinate given system into another coordinate system where it becomes invariant under the one-parameter Lie group of translations. The converted ODE is quadrature and can be solved easily. It makes use of the :py:meth:`sympy.solvers.ode.infinitesimals` function which returns the infinitesimals of the transformation. The coordinates `r` and `s` can be found by solving the following Partial Differential Equations. .. math :: \xi\frac{\partial r}{\partial x} + \eta\frac{\partial r}{\partial y} = 0 .. math :: \xi\frac{\partial s}{\partial x} + \eta\frac{\partial s}{\partial y} = 1 The differential equation becomes separable in the new coordinate system .. math :: \frac{ds}{dr} = \frac{\frac{\partial s}{\partial x} + h(x, y)\frac{\partial s}{\partial y}}{ \frac{\partial r}{\partial x} + h(x, y)\frac{\partial r}{\partial y}} After finding the solution by integration, it is then converted back to the original coordinate system by substituting `r` and `s` in terms of `x` and `y` again. Examples ======== >>> from sympy import Function, dsolve, Eq, exp, pprint >>> from sympy.abc import x >>> f = Function('f') >>> pprint(dsolve(f(x).diff(x) + 2*x*f(x) - x*exp(-x**2), f(x), ... hint='lie_group')) / 2\ 2 | x | -x f(x) = |C1 + --|*e \ 2 / References ========== - Solving differential equations by Symmetry Groups, John Starrett, pp. 1 - pp. 14 """ heuristics = lie_heuristics inf = {} f = func.func x = func.args[0] df = func.diff(x) xi = Function("xi") eta = Function("eta") xis = match.pop('xi') etas = match.pop('eta') if match: h = -simplify(match[match['d']]/match[match['e']]) y = match['y'] else: try: sol = solve(eq, df) if sol == []: raise NotImplementedError except NotImplementedError: raise NotImplementedError("Unable to solve the differential equation " + str(eq) + " by the lie group method") else: y = Dummy("y") h = sol[0].subs(func, y) if xis is not None and etas is not None: inf = [{xi(x, f(x)): S(xis), eta(x, f(x)): S(etas)}] if not checkinfsol(eq, inf, func=f(x), order=1)[0][0]: raise ValueError("The given infinitesimals xi and eta" " are not the infinitesimals to the given equation") else: heuristics = ["user_defined"] match = {'h': h, 'y': y} # This is done so that if: # a] solve raises a NotImplementedError. # b] any heuristic raises a ValueError # another heuristic can be used. tempsol = [] # Used by solve below for heuristic in heuristics: try: if not inf: inf = infinitesimals(eq, hint=heuristic, func=func, order=1, match=match) except ValueError: continue else: for infsim in inf: xiinf = (infsim[xi(x, func)]).subs(func, y) etainf = (infsim[eta(x, func)]).subs(func, y) # This condition creates recursion while using pdsolve. # Since the first step while solving a PDE of form # a*(f(x, y).diff(x)) + b*(f(x, y).diff(y)) + c = 0 # is to solve the ODE dy/dx = b/a if simplify(etainf/xiinf) == h: continue rpde = f(x, y).diff(x)*xiinf + f(x, y).diff(y)*etainf r = pdsolve(rpde, func=f(x, y)).rhs s = pdsolve(rpde - 1, func=f(x, y)).rhs newcoord = [_lie_group_remove(coord) for coord in [r, s]] r = Dummy("r") s = Dummy("s") C1 = Symbol("C1") rcoord = newcoord[0] scoord = newcoord[-1] try: sol = solve([r - rcoord, s - scoord], x, y, dict=True) except NotImplementedError: continue else: sol = sol[0] xsub = sol[x] ysub = sol[y] num = simplify(scoord.diff(x) + scoord.diff(y)*h) denom = simplify(rcoord.diff(x) + rcoord.diff(y)*h) if num and denom: diffeq = simplify((num/denom).subs([(x, xsub), (y, ysub)])) sep = separatevars(diffeq, symbols=[r, s], dict=True) if sep: # Trying to separate, r and s coordinates deq = integrate((1/sep[s]), s) + C1 - integrate(sep['coeff']*sep[r], r) # Substituting and reverting back to original coordinates deq = deq.subs([(r, rcoord), (s, scoord)]) try: sdeq = solve(deq, y) except NotImplementedError: tempsol.append(deq) else: if len(sdeq) == 1: return Eq(f(x), sdeq.pop()) else: return [Eq(f(x), sol) for sol in sdeq] elif denom: # (ds/dr) is zero which means s is constant return Eq(f(x), solve(scoord - C1, y)[0]) elif num: # (dr/ds) is zero which means r is constant return Eq(f(x), solve(rcoord - C1, y)[0]) # If nothing works, return solution as it is, without solving for y if tempsol: if len(tempsol) == 1: return Eq(tempsol.pop().subs(y, f(x)), 0) else: return [Eq(sol.subs(y, f(x)), 0) for sol in tempsol] raise NotImplementedError("The given ODE " + str(eq) + " cannot be solved by" + " the lie group method") def _lie_group_remove(coords): r""" This function is strictly meant for internal use by the Lie group ODE solving method. It replaces arbitrary functions returned by pdsolve with either 0 or 1 or the args of the arbitrary function. The algorithm used is: 1] If coords is an instance of an Undefined Function, then the args are returned 2] If the arbitrary function is present in an Add object, it is replaced by zero. 3] If the arbitrary function is present in an Mul object, it is replaced by one. 4] If coords has no Undefined Function, it is returned as it is. Examples ======== >>> from sympy.solvers.ode import _lie_group_remove >>> from sympy import Function >>> from sympy.abc import x, y >>> F = Function("F") >>> eq = x**2*y >>> _lie_group_remove(eq) x**2*y >>> eq = F(x**2*y) >>> _lie_group_remove(eq) x**2*y >>> eq = y**2*x + F(x**3) >>> _lie_group_remove(eq) x*y**2 >>> eq = (F(x**3) + y)*x**4 >>> _lie_group_remove(eq) x**4*y """ if isinstance(coords, AppliedUndef): return coords.args[0] elif coords.is_Add: subfunc = coords.atoms(AppliedUndef) if subfunc: for func in subfunc: coords = coords.subs(func, 0) return coords elif coords.is_Pow: base, expr = coords.as_base_exp() base = _lie_group_remove(base) expr = _lie_group_remove(expr) return base**expr elif coords.is_Mul: mulargs = [] coordargs = coords.args for arg in coordargs: if not isinstance(coords, AppliedUndef): mulargs.append(_lie_group_remove(arg)) return Mul(*mulargs) return coords def infinitesimals(eq, func=None, order=None, hint='default', match=None): r""" The infinitesimal functions of an ordinary differential equation, `\xi(x,y)` and `\eta(x,y)`, are the infinitesimals of the Lie group of point transformations for which the differential equation is invariant. So, the ODE `y'=f(x,y)` would admit a Lie group `x^*=X(x,y;\varepsilon)=x+\varepsilon\xi(x,y)`, `y^*=Y(x,y;\varepsilon)=y+\varepsilon\eta(x,y)` such that `(y^*)'=f(x^*, y^*)`. A change of coordinates, to `r(x,y)` and `s(x,y)`, can be performed so this Lie group becomes the translation group, `r^*=r` and `s^*=s+\varepsilon`. They are tangents to the coordinate curves of the new system. Consider the transformation `(x, y) \to (X, Y)` such that the differential equation remains invariant. `\xi` and `\eta` are the tangents to the transformed coordinates `X` and `Y`, at `\varepsilon=0`. .. math:: \left(\frac{\partial X(x,y;\varepsilon)}{\partial\varepsilon }\right)|_{\varepsilon=0} = \xi, \left(\frac{\partial Y(x,y;\varepsilon)}{\partial\varepsilon }\right)|_{\varepsilon=0} = \eta, The infinitesimals can be found by solving the following PDE: >>> from sympy import Function, diff, Eq, pprint >>> from sympy.abc import x, y >>> xi, eta, h = map(Function, ['xi', 'eta', 'h']) >>> h = h(x, y) # dy/dx = h >>> eta = eta(x, y) >>> xi = xi(x, y) >>> genform = Eq(eta.diff(x) + (eta.diff(y) - xi.diff(x))*h ... - (xi.diff(y))*h**2 - xi*(h.diff(x)) - eta*(h.diff(y)), 0) >>> pprint(genform) /d d \ d 2 d |--(eta(x, y)) - --(xi(x, y))|*h(x, y) - eta(x, y)*--(h(x, y)) - h (x, y)*--(x \dy dx / dy dy <BLANKLINE> d d i(x, y)) - xi(x, y)*--(h(x, y)) + --(eta(x, y)) = 0 dx dx Solving the above mentioned PDE is not trivial, and can be solved only by making intelligent assumptions for `\xi` and `\eta` (heuristics). Once an infinitesimal is found, the attempt to find more heuristics stops. This is done to optimise the speed of solving the differential equation. If a list of all the infinitesimals is needed, ``hint`` should be flagged as ``all``, which gives the complete list of infinitesimals. If the infinitesimals for a particular heuristic needs to be found, it can be passed as a flag to ``hint``. Examples ======== >>> from sympy import Function, diff >>> from sympy.solvers.ode import infinitesimals >>> from sympy.abc import x >>> f = Function('f') >>> eq = f(x).diff(x) - x**2*f(x) >>> infinitesimals(eq) [{eta(x, f(x)): exp(x**3/3), xi(x, f(x)): 0}] References ========== - Solving differential equations by Symmetry Groups, John Starrett, pp. 1 - pp. 14 """ if isinstance(eq, Equality): eq = eq.lhs - eq.rhs if not func: eq, func = _preprocess(eq) variables = func.args if len(variables) != 1: raise ValueError("ODE's have only one independent variable") else: x = variables[0] if not order: order = ode_order(eq, func) if order != 1: raise NotImplementedError("Infinitesimals for only " "first order ODE's have been implemented") else: df = func.diff(x) # Matching differential equation of the form a*df + b a = Wild('a', exclude = [df]) b = Wild('b', exclude = [df]) if match: # Used by lie_group hint h = match['h'] y = match['y'] else: match = collect(expand(eq), df).match(a*df + b) if match: h = -simplify(match[b]/match[a]) else: try: sol = solve(eq, df) except NotImplementedError: raise NotImplementedError("Infinitesimals for the " "first order ODE could not be found") else: h = sol[0] # Find infinitesimals for one solution y = Dummy("y") h = h.subs(func, y) u = Dummy("u") hx = h.diff(x) hy = h.diff(y) hinv = ((1/h).subs([(x, u), (y, x)])).subs(u, y) # Inverse ODE match = {'h': h, 'func': func, 'hx': hx, 'hy': hy, 'y': y, 'hinv': hinv} if hint == 'all': xieta = [] for heuristic in lie_heuristics: function = globals()['lie_heuristic_' + heuristic] inflist = function(match, comp=True) if inflist: xieta.extend([inf for inf in inflist if inf not in xieta]) if xieta: return xieta else: raise NotImplementedError("Infinitesimals could not be found for " "the given ODE") elif hint == 'default': for heuristic in lie_heuristics: function = globals()['lie_heuristic_' + heuristic] xieta = function(match, comp=False) if xieta: return xieta raise NotImplementedError("Infinitesimals could not be found for" " the given ODE") elif hint not in lie_heuristics: raise ValueError("Heuristic not recognized: " + hint) else: function = globals()['lie_heuristic_' + hint] xieta = function(match, comp=True) if xieta: return xieta else: raise ValueError("Infinitesimals could not be found using the" " given heuristic") def lie_heuristic_abaco1_simple(match, comp=False): r""" The first heuristic uses the following four sets of assumptions on `\xi` and `\eta` .. math:: \xi = 0, \eta = f(x) .. math:: \xi = 0, \eta = f(y) .. math:: \xi = f(x), \eta = 0 .. math:: \xi = f(y), \eta = 0 The success of this heuristic is determined by algebraic factorisation. For the first assumption `\xi = 0` and `\eta` to be a function of `x`, the PDE .. math:: \frac{\partial \eta}{\partial x} + (\frac{\partial \eta}{\partial y} - \frac{\partial \xi}{\partial x})*h - \frac{\partial \xi}{\partial y}*h^{2} - \xi*\frac{\partial h}{\partial x} - \eta*\frac{\partial h}{\partial y} = 0 reduces to `f'(x) - f\frac{\partial h}{\partial y} = 0` If `\frac{\partial h}{\partial y}` is a function of `x`, then this can usually be integrated easily. A similar idea is applied to the other 3 assumptions as well. References ========== - E.S Cheb-Terrab, L.G.S Duarte and L.A,C.P da Mota, Computer Algebra Solving of First Order ODEs Using Symmetry Methods, pp. 8 """ xieta = [] y = match['y'] h = match['h'] func = match['func'] x = func.args[0] hx = match['hx'] hy = match['hy'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) hysym = hy.free_symbols if y not in hysym: try: fx = exp(integrate(hy, x)) except NotImplementedError: pass else: inf = {xi: S(0), eta: fx} if not comp: return [inf] if comp and inf not in xieta: xieta.append(inf) factor = hy/h facsym = factor.free_symbols if x not in facsym: try: fy = exp(integrate(factor, y)) except NotImplementedError: pass else: inf = {xi: S(0), eta: fy.subs(y, func)} if not comp: return [inf] if comp and inf not in xieta: xieta.append(inf) factor = -hx/h facsym = factor.free_symbols if y not in facsym: try: fx = exp(integrate(factor, x)) except NotImplementedError: pass else: inf = {xi: fx, eta: S(0)} if not comp: return [inf] if comp and inf not in xieta: xieta.append(inf) factor = -hx/(h**2) facsym = factor.free_symbols if x not in facsym: try: fy = exp(integrate(factor, y)) except NotImplementedError: pass else: inf = {xi: fy.subs(y, func), eta: S(0)} if not comp: return [inf] if comp and inf not in xieta: xieta.append(inf) if xieta: return xieta def lie_heuristic_abaco1_product(match, comp=False): r""" The second heuristic uses the following two assumptions on `\xi` and `\eta` .. math:: \eta = 0, \xi = f(x)*g(y) .. math:: \eta = f(x)*g(y), \xi = 0 The first assumption of this heuristic holds good if `\frac{1}{h^{2}}\frac{\partial^2}{\partial x \partial y}\log(h)` is separable in `x` and `y`, then the separated factors containing `x` is `f(x)`, and `g(y)` is obtained by .. math:: e^{\int f\frac{\partial}{\partial x}\left(\frac{1}{f*h}\right)\,dy} provided `f\frac{\partial}{\partial x}\left(\frac{1}{f*h}\right)` is a function of `y` only. The second assumption holds good if `\frac{dy}{dx} = h(x, y)` is rewritten as `\frac{dy}{dx} = \frac{1}{h(y, x)}` and the same properties of the first assumption satisfies. After obtaining `f(x)` and `g(y)`, the coordinates are again interchanged, to get `\eta` as `f(x)*g(y)` References ========== - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order ODE Patterns, pp. 7 - pp. 8 """ xieta = [] y = match['y'] h = match['h'] hinv = match['hinv'] func = match['func'] x = func.args[0] xi = Function('xi')(x, func) eta = Function('eta')(x, func) inf = separatevars(((log(h).diff(y)).diff(x))/h**2, dict=True, symbols=[x, y]) if inf and inf['coeff']: fx = inf[x] gy = simplify(fx*((1/(fx*h)).diff(x))) gysyms = gy.free_symbols if x not in gysyms: gy = exp(integrate(gy, y)) inf = {eta: S(0), xi: (fx*gy).subs(y, func)} if not comp: return [inf] if comp and inf not in xieta: xieta.append(inf) u1 = Dummy("u1") inf = separatevars(((log(hinv).diff(y)).diff(x))/hinv**2, dict=True, symbols=[x, y]) if inf and inf['coeff']: fx = inf[x] gy = simplify(fx*((1/(fx*hinv)).diff(x))) gysyms = gy.free_symbols if x not in gysyms: gy = exp(integrate(gy, y)) etaval = fx*gy etaval = (etaval.subs([(x, u1), (y, x)])).subs(u1, y) inf = {eta: etaval.subs(y, func), xi: S(0)} if not comp: return [inf] if comp and inf not in xieta: xieta.append(inf) if xieta: return xieta def lie_heuristic_bivariate(match, comp=False): r""" The third heuristic assumes the infinitesimals `\xi` and `\eta` to be bi-variate polynomials in `x` and `y`. The assumption made here for the logic below is that `h` is a rational function in `x` and `y` though that may not be necessary for the infinitesimals to be bivariate polynomials. The coefficients of the infinitesimals are found out by substituting them in the PDE and grouping similar terms that are polynomials and since they form a linear system, solve and check for non trivial solutions. The degree of the assumed bivariates are increased till a certain maximum value. References ========== - Lie Groups and Differential Equations pp. 327 - pp. 329 """ h = match['h'] hx = match['hx'] hy = match['hy'] func = match['func'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) if h.is_rational_function(): # The maximum degree that the infinitesimals can take is # calculated by this technique. etax, etay, etad, xix, xiy, xid = symbols("etax etay etad xix xiy xid") ipde = etax + (etay - xix)*h - xiy*h**2 - xid*hx - etad*hy num, denom = cancel(ipde).as_numer_denom() deg = Poly(num, x, y).total_degree() deta = Function('deta')(x, y) dxi = Function('dxi')(x, y) ipde = (deta.diff(x) + (deta.diff(y) - dxi.diff(x))*h - (dxi.diff(y))*h**2 - dxi*hx - deta*hy) xieq = Symbol("xi0") etaeq = Symbol("eta0") for i in range(deg + 1): if i: xieq += Add(*[ Symbol("xi_" + str(power) + "_" + str(i - power))*x**power*y**(i - power) for power in range(i + 1)]) etaeq += Add(*[ Symbol("eta_" + str(power) + "_" + str(i - power))*x**power*y**(i - power) for power in range(i + 1)]) pden, denom = (ipde.subs({dxi: xieq, deta: etaeq}).doit()).as_numer_denom() pden = expand(pden) # If the individual terms are monomials, the coefficients # are grouped if pden.is_polynomial(x, y) and pden.is_Add: polyy = Poly(pden, x, y).as_dict() if polyy: symset = xieq.free_symbols.union(etaeq.free_symbols) - {x, y} soldict = solve(polyy.values(), *symset) if isinstance(soldict, list): soldict = soldict[0] if any(soldict.values()): xired = xieq.subs(soldict) etared = etaeq.subs(soldict) # Scaling is done by substituting one for the parameters # This can be any number except zero. dict_ = dict((sym, 1) for sym in symset) inf = {eta: etared.subs(dict_).subs(y, func), xi: xired.subs(dict_).subs(y, func)} return [inf] def lie_heuristic_chi(match, comp=False): r""" The aim of the fourth heuristic is to find the function `\chi(x, y)` that satisfies the PDE `\frac{d\chi}{dx} + h\frac{d\chi}{dx} - \frac{\partial h}{\partial y}\chi = 0`. This assumes `\chi` to be a bivariate polynomial in `x` and `y`. By intuition, `h` should be a rational function in `x` and `y`. The method used here is to substitute a general binomial for `\chi` up to a certain maximum degree is reached. The coefficients of the polynomials, are calculated by by collecting terms of the same order in `x` and `y`. After finding `\chi`, the next step is to use `\eta = \xi*h + \chi`, to determine `\xi` and `\eta`. This can be done by dividing `\chi` by `h` which would give `-\xi` as the quotient and `\eta` as the remainder. References ========== - E.S Cheb-Terrab, L.G.S Duarte and L.A,C.P da Mota, Computer Algebra Solving of First Order ODEs Using Symmetry Methods, pp. 8 """ h = match['h'] hy = match['hy'] func = match['func'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) if h.is_rational_function(): schi, schix, schiy = symbols("schi, schix, schiy") cpde = schix + h*schiy - hy*schi num, denom = cancel(cpde).as_numer_denom() deg = Poly(num, x, y).total_degree() chi = Function('chi')(x, y) chix = chi.diff(x) chiy = chi.diff(y) cpde = chix + h*chiy - hy*chi chieq = Symbol("chi") for i in range(1, deg + 1): chieq += Add(*[ Symbol("chi_" + str(power) + "_" + str(i - power))*x**power*y**(i - power) for power in range(i + 1)]) cnum, cden = cancel(cpde.subs({chi : chieq}).doit()).as_numer_denom() cnum = expand(cnum) if cnum.is_polynomial(x, y) and cnum.is_Add: cpoly = Poly(cnum, x, y).as_dict() if cpoly: solsyms = chieq.free_symbols - {x, y} soldict = solve(cpoly.values(), *solsyms) if isinstance(soldict, list): soldict = soldict[0] if any(soldict.values()): chieq = chieq.subs(soldict) dict_ = dict((sym, 1) for sym in solsyms) chieq = chieq.subs(dict_) # After finding chi, the main aim is to find out # eta, xi by the equation eta = xi*h + chi # One method to set xi, would be rearranging it to # (eta/h) - xi = (chi/h). This would mean dividing # chi by h would give -xi as the quotient and eta # as the remainder. Thanks to Sean Vig for suggesting # this method. xic, etac = div(chieq, h) inf = {eta: etac.subs(y, func), xi: -xic.subs(y, func)} return [inf] def lie_heuristic_function_sum(match, comp=False): r""" This heuristic uses the following two assumptions on `\xi` and `\eta` .. math:: \eta = 0, \xi = f(x) + g(y) .. math:: \eta = f(x) + g(y), \xi = 0 The first assumption of this heuristic holds good if .. math:: \frac{\partial}{\partial y}[(h\frac{\partial^{2}}{ \partial x^{2}}(h^{-1}))^{-1}] is separable in `x` and `y`, 1. The separated factors containing `y` is `\frac{\partial g}{\partial y}`. From this `g(y)` can be determined. 2. The separated factors containing `x` is `f''(x)`. 3. `h\frac{\partial^{2}}{\partial x^{2}}(h^{-1})` equals `\frac{f''(x)}{f(x) + g(y)}`. From this `f(x)` can be determined. The second assumption holds good if `\frac{dy}{dx} = h(x, y)` is rewritten as `\frac{dy}{dx} = \frac{1}{h(y, x)}` and the same properties of the first assumption satisfies. After obtaining `f(x)` and `g(y)`, the coordinates are again interchanged, to get `\eta` as `f(x) + g(y)`. For both assumptions, the constant factors are separated among `g(y)` and `f''(x)`, such that `f''(x)` obtained from 3] is the same as that obtained from 2]. If not possible, then this heuristic fails. References ========== - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order ODE Patterns, pp. 7 - pp. 8 """ xieta = [] h = match['h'] func = match['func'] hinv = match['hinv'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) for odefac in [h, hinv]: factor = odefac*((1/odefac).diff(x, 2)) sep = separatevars((1/factor).diff(y), dict=True, symbols=[x, y]) if sep and sep['coeff'] and sep[x].has(x) and sep[y].has(y): k = Dummy("k") try: gy = k*integrate(sep[y], y) except NotImplementedError: pass else: fdd = 1/(k*sep[x]*sep['coeff']) fx = simplify(fdd/factor - gy) check = simplify(fx.diff(x, 2) - fdd) if fx: if not check: fx = fx.subs(k, 1) gy = (gy/k) else: sol = solve(check, k) if sol: sol = sol[0] fx = fx.subs(k, sol) gy = (gy/k)*sol else: continue if odefac == hinv: # Inverse ODE fx = fx.subs(x, y) gy = gy.subs(y, x) etaval = factor_terms(fx + gy) if etaval.is_Mul: etaval = Mul(*[arg for arg in etaval.args if arg.has(x, y)]) if odefac == hinv: # Inverse ODE inf = {eta: etaval.subs(y, func), xi : S(0)} else: inf = {xi: etaval.subs(y, func), eta : S(0)} if not comp: return [inf] else: xieta.append(inf) if xieta: return xieta def lie_heuristic_abaco2_similar(match, comp=False): r""" This heuristic uses the following two assumptions on `\xi` and `\eta` .. math:: \eta = g(x), \xi = f(x) .. math:: \eta = f(y), \xi = g(y) For the first assumption, 1. First `\frac{\frac{\partial h}{\partial y}}{\frac{\partial^{2} h}{ \partial yy}}` is calculated. Let us say this value is A 2. If this is constant, then `h` is matched to the form `A(x) + B(x)e^{ \frac{y}{C}}` then, `\frac{e^{\int \frac{A(x)}{C} \,dx}}{B(x)}` gives `f(x)` and `A(x)*f(x)` gives `g(x)` 3. Otherwise `\frac{\frac{\partial A}{\partial X}}{\frac{\partial A}{ \partial Y}} = \gamma` is calculated. If a] `\gamma` is a function of `x` alone b] `\frac{\gamma\frac{\partial h}{\partial y} - \gamma'(x) - \frac{ \partial h}{\partial x}}{h + \gamma} = G` is a function of `x` alone. then, `e^{\int G \,dx}` gives `f(x)` and `-\gamma*f(x)` gives `g(x)` The second assumption holds good if `\frac{dy}{dx} = h(x, y)` is rewritten as `\frac{dy}{dx} = \frac{1}{h(y, x)}` and the same properties of the first assumption satisfies. After obtaining `f(x)` and `g(x)`, the coordinates are again interchanged, to get `\xi` as `f(x^*)` and `\eta` as `g(y^*)` References ========== - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order ODE Patterns, pp. 10 - pp. 12 """ h = match['h'] hx = match['hx'] hy = match['hy'] func = match['func'] hinv = match['hinv'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) factor = cancel(h.diff(y)/h.diff(y, 2)) factorx = factor.diff(x) factory = factor.diff(y) if not factor.has(x) and not factor.has(y): A = Wild('A', exclude=[y]) B = Wild('B', exclude=[y]) C = Wild('C', exclude=[x, y]) match = h.match(A + B*exp(y/C)) try: tau = exp(-integrate(match[A]/match[C]), x)/match[B] except NotImplementedError: pass else: gx = match[A]*tau return [{xi: tau, eta: gx}] else: gamma = cancel(factorx/factory) if not gamma.has(y): tauint = cancel((gamma*hy - gamma.diff(x) - hx)/(h + gamma)) if not tauint.has(y): try: tau = exp(integrate(tauint, x)) except NotImplementedError: pass else: gx = -tau*gamma return [{xi: tau, eta: gx}] factor = cancel(hinv.diff(y)/hinv.diff(y, 2)) factorx = factor.diff(x) factory = factor.diff(y) if not factor.has(x) and not factor.has(y): A = Wild('A', exclude=[y]) B = Wild('B', exclude=[y]) C = Wild('C', exclude=[x, y]) match = h.match(A + B*exp(y/C)) try: tau = exp(-integrate(match[A]/match[C]), x)/match[B] except NotImplementedError: pass else: gx = match[A]*tau return [{eta: tau.subs(x, func), xi: gx.subs(x, func)}] else: gamma = cancel(factorx/factory) if not gamma.has(y): tauint = cancel((gamma*hinv.diff(y) - gamma.diff(x) - hinv.diff(x))/( hinv + gamma)) if not tauint.has(y): try: tau = exp(integrate(tauint, x)) except NotImplementedError: pass else: gx = -tau*gamma return [{eta: tau.subs(x, func), xi: gx.subs(x, func)}] def lie_heuristic_abaco2_unique_unknown(match, comp=False): r""" This heuristic assumes the presence of unknown functions or known functions with non-integer powers. 1. A list of all functions and non-integer powers containing x and y 2. Loop over each element `f` in the list, find `\frac{\frac{\partial f}{\partial x}}{ \frac{\partial f}{\partial x}} = R` If it is separable in `x` and `y`, let `X` be the factors containing `x`. Then a] Check if `\xi = X` and `\eta = -\frac{X}{R}` satisfy the PDE. If yes, then return `\xi` and `\eta` b] Check if `\xi = \frac{-R}{X}` and `\eta = -\frac{1}{X}` satisfy the PDE. If yes, then return `\xi` and `\eta` If not, then check if a] :math:`\xi = -R,\eta = 1` b] :math:`\xi = 1, \eta = -\frac{1}{R}` are solutions. References ========== - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order ODE Patterns, pp. 10 - pp. 12 """ h = match['h'] hx = match['hx'] hy = match['hy'] func = match['func'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) funclist = [] for atom in h.atoms(Pow): base, exp = atom.as_base_exp() if base.has(x) and base.has(y): if not exp.is_Integer: funclist.append(atom) for function in h.atoms(AppliedUndef): syms = function.free_symbols if x in syms and y in syms: funclist.append(function) for f in funclist: frac = cancel(f.diff(y)/f.diff(x)) sep = separatevars(frac, dict=True, symbols=[x, y]) if sep and sep['coeff']: xitry1 = sep[x] etatry1 = -1/(sep[y]*sep['coeff']) pde1 = etatry1.diff(y)*h - xitry1.diff(x)*h - xitry1*hx - etatry1*hy if not simplify(pde1): return [{xi: xitry1, eta: etatry1.subs(y, func)}] xitry2 = 1/etatry1 etatry2 = 1/xitry1 pde2 = etatry2.diff(x) - (xitry2.diff(y))*h**2 - xitry2*hx - etatry2*hy if not simplify(expand(pde2)): return [{xi: xitry2.subs(y, func), eta: etatry2}] else: etatry = -1/frac pde = etatry.diff(x) + etatry.diff(y)*h - hx - etatry*hy if not simplify(pde): return [{xi: S(1), eta: etatry.subs(y, func)}] xitry = -frac pde = -xitry.diff(x)*h -xitry.diff(y)*h**2 - xitry*hx -hy if not simplify(expand(pde)): return [{xi: xitry.subs(y, func), eta: S(1)}] def lie_heuristic_abaco2_unique_general(match, comp=False): r""" This heuristic finds if infinitesimals of the form `\eta = f(x)`, `\xi = g(y)` without making any assumptions on `h`. The complete sequence of steps is given in the paper mentioned below. References ========== - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order ODE Patterns, pp. 10 - pp. 12 """ hx = match['hx'] hy = match['hy'] func = match['func'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) A = hx.diff(y) B = hy.diff(y) + hy**2 C = hx.diff(x) - hx**2 if not (A and B and C): return Ax = A.diff(x) Ay = A.diff(y) Axy = Ax.diff(y) Axx = Ax.diff(x) Ayy = Ay.diff(y) D = simplify(2*Axy + hx*Ay - Ax*hy + (hx*hy + 2*A)*A)*A - 3*Ax*Ay if not D: E1 = simplify(3*Ax**2 + ((hx**2 + 2*C)*A - 2*Axx)*A) if E1: E2 = simplify((2*Ayy + (2*B - hy**2)*A)*A - 3*Ay**2) if not E2: E3 = simplify( E1*((28*Ax + 4*hx*A)*A**3 - E1*(hy*A + Ay)) - E1.diff(x)*8*A**4) if not E3: etaval = cancel((4*A**3*(Ax - hx*A) + E1*(hy*A - Ay))/(S(2)*A*E1)) if x not in etaval: try: etaval = exp(integrate(etaval, y)) except NotImplementedError: pass else: xival = -4*A**3*etaval/E1 if y not in xival: return [{xi: xival, eta: etaval.subs(y, func)}] else: E1 = simplify((2*Ayy + (2*B - hy**2)*A)*A - 3*Ay**2) if E1: E2 = simplify( 4*A**3*D - D**2 + E1*((2*Axx - (hx**2 + 2*C)*A)*A - 3*Ax**2)) if not E2: E3 = simplify( -(A*D)*E1.diff(y) + ((E1.diff(x) - hy*D)*A + 3*Ay*D + (A*hx - 3*Ax)*E1)*E1) if not E3: etaval = cancel(((A*hx - Ax)*E1 - (Ay + A*hy)*D)/(S(2)*A*D)) if x not in etaval: try: etaval = exp(integrate(etaval, y)) except NotImplementedError: pass else: xival = -E1*etaval/D if y not in xival: return [{xi: xival, eta: etaval.subs(y, func)}] def lie_heuristic_linear(match, comp=False): r""" This heuristic assumes 1. `\xi = ax + by + c` and 2. `\eta = fx + gy + h` After substituting the following assumptions in the determining PDE, it reduces to .. math:: f + (g - a)h - bh^{2} - (ax + by + c)\frac{\partial h}{\partial x} - (fx + gy + c)\frac{\partial h}{\partial y} Solving the reduced PDE obtained, using the method of characteristics, becomes impractical. The method followed is grouping similar terms and solving the system of linear equations obtained. The difference between the bivariate heuristic is that `h` need not be a rational function in this case. References ========== - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order ODE Patterns, pp. 10 - pp. 12 """ h = match['h'] hx = match['hx'] hy = match['hy'] func = match['func'] x = func.args[0] y = match['y'] xi = Function('xi')(x, func) eta = Function('eta')(x, func) coeffdict = {} symbols = numbered_symbols("c", cls=Dummy) symlist = [next(symbols) for _ in islice(symbols, 6)] C0, C1, C2, C3, C4, C5 = symlist pde = C3 + (C4 - C0)*h - (C0*x + C1*y + C2)*hx - (C3*x + C4*y + C5)*hy - C1*h**2 pde, denom = pde.as_numer_denom() pde = powsimp(expand(pde)) if pde.is_Add: terms = pde.args for term in terms: if term.is_Mul: rem = Mul(*[m for m in term.args if not m.has(x, y)]) xypart = term/rem if xypart not in coeffdict: coeffdict[xypart] = rem else: coeffdict[xypart] += rem else: if term not in coeffdict: coeffdict[term] = S(1) else: coeffdict[term] += S(1) sollist = coeffdict.values() soldict = solve(sollist, symlist) if soldict: if isinstance(soldict, list): soldict = soldict[0] subval = soldict.values() if any(t for t in subval): onedict = dict(zip(symlist, [1]*6)) xival = C0*x + C1*func + C2 etaval = C3*x + C4*func + C5 xival = xival.subs(soldict) etaval = etaval.subs(soldict) xival = xival.subs(onedict) etaval = etaval.subs(onedict) return [{xi: xival, eta: etaval}] def sysode_linear_2eq_order1(match_): x = match_['func'][0].func y = match_['func'][1].func func = match_['func'] fc = match_['func_coeff'] eq = match_['eq'] r = dict() t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] for i in range(2): eqs = 0 for terms in Add.make_args(eq[i]): eqs += terms/fc[i,func[i],1] eq[i] = eqs # for equations Eq(a1*diff(x(t),t), a*x(t) + b*y(t) + k1) # and Eq(a2*diff(x(t),t), c*x(t) + d*y(t) + k2) r['a'] = -fc[0,x(t),0]/fc[0,x(t),1] r['c'] = -fc[1,x(t),0]/fc[1,y(t),1] r['b'] = -fc[0,y(t),0]/fc[0,x(t),1] r['d'] = -fc[1,y(t),0]/fc[1,y(t),1] forcing = [S(0),S(0)] for i in range(2): for j in Add.make_args(eq[i]): if not j.has(x(t), y(t)): forcing[i] += j if not (forcing[0].has(t) or forcing[1].has(t)): r['k1'] = forcing[0] r['k2'] = forcing[1] else: raise NotImplementedError("Only homogeneous problems are supported" + " (and constant inhomogeneity)") if match_['type_of_equation'] == 'type1': sol = _linear_2eq_order1_type1(x, y, t, r, eq) if match_['type_of_equation'] == 'type2': gsol = _linear_2eq_order1_type1(x, y, t, r, eq) psol = _linear_2eq_order1_type2(x, y, t, r, eq) sol = [Eq(x(t), gsol[0].rhs+psol[0]), Eq(y(t), gsol[1].rhs+psol[1])] if match_['type_of_equation'] == 'type3': sol = _linear_2eq_order1_type3(x, y, t, r, eq) if match_['type_of_equation'] == 'type4': sol = _linear_2eq_order1_type4(x, y, t, r, eq) if match_['type_of_equation'] == 'type5': sol = _linear_2eq_order1_type5(x, y, t, r, eq) if match_['type_of_equation'] == 'type6': sol = _linear_2eq_order1_type6(x, y, t, r, eq) if match_['type_of_equation'] == 'type7': sol = _linear_2eq_order1_type7(x, y, t, r, eq) return sol def _linear_2eq_order1_type1(x, y, t, r, eq): r""" It is classified under system of two linear homogeneous first-order constant-coefficient ordinary differential equations. The equations which come under this type are .. math:: x' = ax + by, .. math:: y' = cx + dy The characteristics equation is written as .. math:: \lambda^{2} + (a+d) \lambda + ad - bc = 0 and its discriminant is `D = (a-d)^{2} + 4bc`. There are several cases 1. Case when `ad - bc \neq 0`. The origin of coordinates, `x = y = 0`, is the only stationary point; it is - a node if `D = 0` - a node if `D > 0` and `ad - bc > 0` - a saddle if `D > 0` and `ad - bc < 0` - a focus if `D < 0` and `a + d \neq 0` - a centre if `D < 0` and `a + d \neq 0`. 1.1. If `D > 0`. The characteristic equation has two distinct real roots `\lambda_1` and `\lambda_ 2` . The general solution of the system in question is expressed as .. math:: x = C_1 b e^{\lambda_1 t} + C_2 b e^{\lambda_2 t} .. math:: y = C_1 (\lambda_1 - a) e^{\lambda_1 t} + C_2 (\lambda_2 - a) e^{\lambda_2 t} where `C_1` and `C_2` being arbitrary constants 1.2. If `D < 0`. The characteristics equation has two conjugate roots, `\lambda_1 = \sigma + i \beta` and `\lambda_2 = \sigma - i \beta`. The general solution of the system is given by .. math:: x = b e^{\sigma t} (C_1 \sin(\beta t) + C_2 \cos(\beta t)) .. math:: y = e^{\sigma t} ([(\sigma - a) C_1 - \beta C_2] \sin(\beta t) + [\beta C_1 + (\sigma - a) C_2 \cos(\beta t)]) 1.3. If `D = 0` and `a \neq d`. The characteristic equation has two equal roots, `\lambda_1 = \lambda_2`. The general solution of the system is written as .. math:: x = 2b (C_1 + \frac{C_2}{a-d} + C_2 t) e^{\frac{a+d}{2} t} .. math:: y = [(d - a) C_1 + C_2 + (d - a) C_2 t] e^{\frac{a+d}{2} t} 1.4. If `D = 0` and `a = d \neq 0` and `b = 0` .. math:: x = C_1 e^{a t} , y = (c C_1 t + C_2) e^{a t} 1.5. If `D = 0` and `a = d \neq 0` and `c = 0` .. math:: x = (b C_1 t + C_2) e^{a t} , y = C_1 e^{a t} 2. Case when `ad - bc = 0` and `a^{2} + b^{2} > 0`. The whole straight line `ax + by = 0` consists of singular points. The original system of differential equations can be rewritten as .. math:: x' = ax + by , y' = k (ax + by) 2.1 If `a + bk \neq 0`, solution will be .. math:: x = b C_1 + C_2 e^{(a + bk) t} , y = -a C_1 + k C_2 e^{(a + bk) t} 2.2 If `a + bk = 0`, solution will be .. math:: x = C_1 (bk t - 1) + b C_2 t , y = k^{2} b C_1 t + (b k^{2} t + 1) C_2 """ C1, C2 = get_numbered_constants(eq, num=2) a, b, c, d = r['a'], r['b'], r['c'], r['d'] real_coeff = all(v.is_real for v in (a, b, c, d)) D = (a - d)**2 + 4*b*c l1 = (a + d + sqrt(D))/2 l2 = (a + d - sqrt(D))/2 equal_roots = Eq(D, 0).expand() gsol1, gsol2 = [], [] # Solutions have exponential form if either D > 0 with real coefficients # or D != 0 with complex coefficients. Eigenvalues are distinct. # For each eigenvalue lam, pick an eigenvector, making sure we don't get (0, 0) # The candidates are (b, lam-a) and (lam-d, c). exponential_form = D > 0 if real_coeff else Not(equal_roots) bad_ab_vector1 = And(Eq(b, 0), Eq(l1, a)) bad_ab_vector2 = And(Eq(b, 0), Eq(l2, a)) vector1 = Matrix((Piecewise((l1 - d, bad_ab_vector1), (b, True)), Piecewise((c, bad_ab_vector1), (l1 - a, True)))) vector2 = Matrix((Piecewise((l2 - d, bad_ab_vector2), (b, True)), Piecewise((c, bad_ab_vector2), (l2 - a, True)))) sol_vector = C1*exp(l1*t)*vector1 + C2*exp(l2*t)*vector2 gsol1.append((sol_vector[0], exponential_form)) gsol2.append((sol_vector[1], exponential_form)) # Solutions have trigonometric form for real coefficients with D < 0 # Both b and c are nonzero in this case, so (b, lam-a) is an eigenvector # It splits into real/imag parts as (b, sigma-a) and (0, beta). Then # multiply it by C1(cos(beta*t) + I*C2*sin(beta*t)) and separate real/imag trigonometric_form = D < 0 if real_coeff else False sigma = re(l1) if im(l1).is_positive: beta = im(l1) else: beta = im(l2) vector1 = Matrix((b, sigma - a)) vector2 = Matrix((0, beta)) sol_vector = exp(sigma*t) * (C1*(cos(beta*t)*vector1 - sin(beta*t)*vector2) + \ C2*(sin(beta*t)*vector1 + cos(beta*t)*vector2)) gsol1.append((sol_vector[0], trigonometric_form)) gsol2.append((sol_vector[1], trigonometric_form)) # Final case is D == 0, a single eigenvalue. If the eigenspace is 2-dimensional # then we have a scalar matrix, deal with this case first. scalar_matrix = And(Eq(a, d), Eq(b, 0), Eq(c, 0)) vector1 = Matrix((S.One, S.Zero)) vector2 = Matrix((S.Zero, S.One)) sol_vector = exp(l1*t) * (C1*vector1 + C2*vector2) gsol1.append((sol_vector[0], scalar_matrix)) gsol2.append((sol_vector[1], scalar_matrix)) # Have one eigenvector. Get a generalized eigenvector from (A-lam)*vector2 = vector1 vector1 = Matrix((Piecewise((l1 - d, bad_ab_vector1), (b, True)), Piecewise((c, bad_ab_vector1), (l1 - a, True)))) vector2 = Matrix((Piecewise((S.One, bad_ab_vector1), (S.Zero, Eq(a, l1)), (b/(a - l1), True)), Piecewise((S.Zero, bad_ab_vector1), (S.One, Eq(a, l1)), (S.Zero, True)))) sol_vector = exp(l1*t) * (C1*vector1 + C2*(vector2 + t*vector1)) gsol1.append((sol_vector[0], equal_roots)) gsol2.append((sol_vector[1], equal_roots)) return [Eq(x(t), Piecewise(*gsol1)), Eq(y(t), Piecewise(*gsol2))] def _linear_2eq_order1_type2(x, y, t, r, eq): r""" The equations of this type are .. math:: x' = ax + by + k1 , y' = cx + dy + k2 The general solution of this system is given by sum of its particular solution and the general solution of the corresponding homogeneous system is obtained from type1. 1. When `ad - bc \neq 0`. The particular solution will be `x = x_0` and `y = y_0` where `x_0` and `y_0` are determined by solving linear system of equations .. math:: a x_0 + b y_0 + k1 = 0 , c x_0 + d y_0 + k2 = 0 2. When `ad - bc = 0` and `a^{2} + b^{2} > 0`. In this case, the system of equation becomes .. math:: x' = ax + by + k_1 , y' = k (ax + by) + k_2 2.1 If `\sigma = a + bk \neq 0`, particular solution is given by .. math:: x = b \sigma^{-1} (c_1 k - c_2) t - \sigma^{-2} (a c_1 + b c_2) .. math:: y = kx + (c_2 - c_1 k) t 2.2 If `\sigma = a + bk = 0`, particular solution is given by .. math:: x = \frac{1}{2} b (c_2 - c_1 k) t^{2} + c_1 t .. math:: y = kx + (c_2 - c_1 k) t """ r['k1'] = -r['k1']; r['k2'] = -r['k2'] if (r['a']*r['d'] - r['b']*r['c']) != 0: x0, y0 = symbols('x0, y0', cls=Dummy) sol = solve((r['a']*x0+r['b']*y0+r['k1'], r['c']*x0+r['d']*y0+r['k2']), x0, y0) psol = [sol[x0], sol[y0]] elif (r['a']*r['d'] - r['b']*r['c']) == 0 and (r['a']**2+r['b']**2) > 0: k = r['c']/r['a'] sigma = r['a'] + r['b']*k if sigma != 0: sol1 = r['b']*sigma**-1*(r['k1']*k-r['k2'])*t - sigma**-2*(r['a']*r['k1']+r['b']*r['k2']) sol2 = k*sol1 + (r['k2']-r['k1']*k)*t else: # FIXME: a previous typo fix shows this is not covered by tests sol1 = r['b']*(r['k2']-r['k1']*k)*t**2 + r['k1']*t sol2 = k*sol1 + (r['k2']-r['k1']*k)*t psol = [sol1, sol2] return psol def _linear_2eq_order1_type3(x, y, t, r, eq): r""" The equations of this type of ode are .. math:: x' = f(t) x + g(t) y .. math:: y' = g(t) x + f(t) y The solution of such equations is given by .. math:: x = e^{F} (C_1 e^{G} + C_2 e^{-G}) , y = e^{F} (C_1 e^{G} - C_2 e^{-G}) where `C_1` and `C_2` are arbitrary constants, and .. math:: F = \int f(t) \,dt , G = \int g(t) \,dt """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) F = Integral(r['a'], t) G = Integral(r['b'], t) sol1 = exp(F)*(C1*exp(G) + C2*exp(-G)) sol2 = exp(F)*(C1*exp(G) - C2*exp(-G)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order1_type4(x, y, t, r, eq): r""" The equations of this type of ode are . .. math:: x' = f(t) x + g(t) y .. math:: y' = -g(t) x + f(t) y The solution is given by .. math:: x = F (C_1 \cos(G) + C_2 \sin(G)), y = F (-C_1 \sin(G) + C_2 \cos(G)) where `C_1` and `C_2` are arbitrary constants, and .. math:: F = \int f(t) \,dt , G = \int g(t) \,dt """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) if r['b'] == -r['c']: F = exp(Integral(r['a'], t)) G = Integral(r['b'], t) sol1 = F*(C1*cos(G) + C2*sin(G)) sol2 = F*(-C1*sin(G) + C2*cos(G)) elif r['d'] == -r['a']: F = exp(Integral(r['c'], t)) G = Integral(r['d'], t) sol1 = F*(-C1*sin(G) + C2*cos(G)) sol2 = F*(C1*cos(G) + C2*sin(G)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order1_type5(x, y, t, r, eq): r""" The equations of this type of ode are . .. math:: x' = f(t) x + g(t) y .. math:: y' = a g(t) x + [f(t) + b g(t)] y The transformation of .. math:: x = e^{\int f(t) \,dt} u , y = e^{\int f(t) \,dt} v , T = \int g(t) \,dt leads to a system of constant coefficient linear differential equations .. math:: u'(T) = v , v'(T) = au + bv """ u, v = symbols('u, v', cls=Function) T = Symbol('T') if not cancel(r['c']/r['b']).has(t): p = cancel(r['c']/r['b']) q = cancel((r['d']-r['a'])/r['b']) eq = (Eq(diff(u(T),T), v(T)), Eq(diff(v(T),T), p*u(T)+q*v(T))) sol = dsolve(eq) sol1 = exp(Integral(r['a'], t))*sol[0].rhs.subs(T, Integral(r['b'], t)) sol2 = exp(Integral(r['a'], t))*sol[1].rhs.subs(T, Integral(r['b'], t)) if not cancel(r['a']/r['d']).has(t): p = cancel(r['a']/r['d']) q = cancel((r['b']-r['c'])/r['d']) sol = dsolve(Eq(diff(u(T),T), v(T)), Eq(diff(v(T),T), p*u(T)+q*v(T))) sol1 = exp(Integral(r['c'], t))*sol[1].rhs.subs(T, Integral(r['d'], t)) sol2 = exp(Integral(r['c'], t))*sol[0].rhs.subs(T, Integral(r['d'], t)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order1_type6(x, y, t, r, eq): r""" The equations of this type of ode are . .. math:: x' = f(t) x + g(t) y .. math:: y' = a [f(t) + a h(t)] x + a [g(t) - h(t)] y This is solved by first multiplying the first equation by `-a` and adding it to the second equation to obtain .. math:: y' - a x' = -a h(t) (y - a x) Setting `U = y - ax` and integrating the equation we arrive at .. math:: y - ax = C_1 e^{-a \int h(t) \,dt} and on substituting the value of y in first equation give rise to first order ODEs. After solving for `x`, we can obtain `y` by substituting the value of `x` in second equation. """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) p = 0 q = 0 p1 = cancel(r['c']/cancel(r['c']/r['d']).as_numer_denom()[0]) p2 = cancel(r['a']/cancel(r['a']/r['b']).as_numer_denom()[0]) for n, i in enumerate([p1, p2]): for j in Mul.make_args(collect_const(i)): if not j.has(t): q = j if q!=0 and n==0: if ((r['c']/j - r['a'])/(r['b'] - r['d']/j)) == j: p = 1 s = j break if q!=0 and n==1: if ((r['a']/j - r['c'])/(r['d'] - r['b']/j)) == j: p = 2 s = j break if p == 1: equ = diff(x(t),t) - r['a']*x(t) - r['b']*(s*x(t) + C1*exp(-s*Integral(r['b'] - r['d']/s, t))) hint1 = classify_ode(equ)[1] sol1 = dsolve(equ, hint=hint1+'_Integral').rhs sol2 = s*sol1 + C1*exp(-s*Integral(r['b'] - r['d']/s, t)) elif p ==2: equ = diff(y(t),t) - r['c']*y(t) - r['d']*s*y(t) + C1*exp(-s*Integral(r['d'] - r['b']/s, t)) hint1 = classify_ode(equ)[1] sol2 = dsolve(equ, hint=hint1+'_Integral').rhs sol1 = s*sol2 + C1*exp(-s*Integral(r['d'] - r['b']/s, t)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order1_type7(x, y, t, r, eq): r""" The equations of this type of ode are . .. math:: x' = f(t) x + g(t) y .. math:: y' = h(t) x + p(t) y Differentiating the first equation and substituting the value of `y` from second equation will give a second-order linear equation .. math:: g x'' - (fg + gp + g') x' + (fgp - g^{2} h + f g' - f' g) x = 0 This above equation can be easily integrated if following conditions are satisfied. 1. `fgp - g^{2} h + f g' - f' g = 0` 2. `fgp - g^{2} h + f g' - f' g = ag, fg + gp + g' = bg` If first condition is satisfied then it is solved by current dsolve solver and in second case it becomes a constant coefficient differential equation which is also solved by current solver. Otherwise if the above condition fails then, a particular solution is assumed as `x = x_0(t)` and `y = y_0(t)` Then the general solution is expressed as .. math:: x = C_1 x_0(t) + C_2 x_0(t) \int \frac{g(t) F(t) P(t)}{x_0^{2}(t)} \,dt .. math:: y = C_1 y_0(t) + C_2 [\frac{F(t) P(t)}{x_0(t)} + y_0(t) \int \frac{g(t) F(t) P(t)}{x_0^{2}(t)} \,dt] where C1 and C2 are arbitrary constants and .. math:: F(t) = e^{\int f(t) \,dt} , P(t) = e^{\int p(t) \,dt} """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) e1 = r['a']*r['b']*r['c'] - r['b']**2*r['c'] + r['a']*diff(r['b'],t) - diff(r['a'],t)*r['b'] e2 = r['a']*r['c']*r['d'] - r['b']*r['c']**2 + diff(r['c'],t)*r['d'] - r['c']*diff(r['d'],t) m1 = r['a']*r['b'] + r['b']*r['d'] + diff(r['b'],t) m2 = r['a']*r['c'] + r['c']*r['d'] + diff(r['c'],t) if e1 == 0: sol1 = dsolve(r['b']*diff(x(t),t,t) - m1*diff(x(t),t)).rhs sol2 = dsolve(diff(y(t),t) - r['c']*sol1 - r['d']*y(t)).rhs elif e2 == 0: sol2 = dsolve(r['c']*diff(y(t),t,t) - m2*diff(y(t),t)).rhs sol1 = dsolve(diff(x(t),t) - r['a']*x(t) - r['b']*sol2).rhs elif not (e1/r['b']).has(t) and not (m1/r['b']).has(t): sol1 = dsolve(diff(x(t),t,t) - (m1/r['b'])*diff(x(t),t) - (e1/r['b'])*x(t)).rhs sol2 = dsolve(diff(y(t),t) - r['c']*sol1 - r['d']*y(t)).rhs elif not (e2/r['c']).has(t) and not (m2/r['c']).has(t): sol2 = dsolve(diff(y(t),t,t) - (m2/r['c'])*diff(y(t),t) - (e2/r['c'])*y(t)).rhs sol1 = dsolve(diff(x(t),t) - r['a']*x(t) - r['b']*sol2).rhs else: x0 = Function('x0')(t) # x0 and y0 being particular solutions y0 = Function('y0')(t) F = exp(Integral(r['a'],t)) P = exp(Integral(r['d'],t)) sol1 = C1*x0 + C2*x0*Integral(r['b']*F*P/x0**2, t) sol2 = C1*y0 + C2*(F*P/x0 + y0*Integral(r['b']*F*P/x0**2, t)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def sysode_linear_2eq_order2(match_): x = match_['func'][0].func y = match_['func'][1].func func = match_['func'] fc = match_['func_coeff'] eq = match_['eq'] r = dict() t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] for i in range(2): eqs = [] for terms in Add.make_args(eq[i]): eqs.append(terms/fc[i,func[i],2]) eq[i] = Add(*eqs) # for equations Eq(diff(x(t),t,t), a1*diff(x(t),t)+b1*diff(y(t),t)+c1*x(t)+d1*y(t)+e1) # and Eq(a2*diff(y(t),t,t), a2*diff(x(t),t)+b2*diff(y(t),t)+c2*x(t)+d2*y(t)+e2) r['a1'] = -fc[0,x(t),1]/fc[0,x(t),2] ; r['a2'] = -fc[1,x(t),1]/fc[1,y(t),2] r['b1'] = -fc[0,y(t),1]/fc[0,x(t),2] ; r['b2'] = -fc[1,y(t),1]/fc[1,y(t),2] r['c1'] = -fc[0,x(t),0]/fc[0,x(t),2] ; r['c2'] = -fc[1,x(t),0]/fc[1,y(t),2] r['d1'] = -fc[0,y(t),0]/fc[0,x(t),2] ; r['d2'] = -fc[1,y(t),0]/fc[1,y(t),2] const = [S(0), S(0)] for i in range(2): for j in Add.make_args(eq[i]): if not (j.has(x(t)) or j.has(y(t))): const[i] += j r['e1'] = -const[0] r['e2'] = -const[1] if match_['type_of_equation'] == 'type1': sol = _linear_2eq_order2_type1(x, y, t, r, eq) elif match_['type_of_equation'] == 'type2': gsol = _linear_2eq_order2_type1(x, y, t, r, eq) psol = _linear_2eq_order2_type2(x, y, t, r, eq) sol = [Eq(x(t), gsol[0].rhs+psol[0]), Eq(y(t), gsol[1].rhs+psol[1])] elif match_['type_of_equation'] == 'type3': sol = _linear_2eq_order2_type3(x, y, t, r, eq) elif match_['type_of_equation'] == 'type4': sol = _linear_2eq_order2_type4(x, y, t, r, eq) elif match_['type_of_equation'] == 'type5': sol = _linear_2eq_order2_type5(x, y, t, r, eq) elif match_['type_of_equation'] == 'type6': sol = _linear_2eq_order2_type6(x, y, t, r, eq) elif match_['type_of_equation'] == 'type7': sol = _linear_2eq_order2_type7(x, y, t, r, eq) elif match_['type_of_equation'] == 'type8': sol = _linear_2eq_order2_type8(x, y, t, r, eq) elif match_['type_of_equation'] == 'type9': sol = _linear_2eq_order2_type9(x, y, t, r, eq) elif match_['type_of_equation'] == 'type10': sol = _linear_2eq_order2_type10(x, y, t, r, eq) elif match_['type_of_equation'] == 'type11': sol = _linear_2eq_order2_type11(x, y, t, r, eq) return sol def _linear_2eq_order2_type1(x, y, t, r, eq): r""" System of two constant-coefficient second-order linear homogeneous differential equations .. math:: x'' = ax + by .. math:: y'' = cx + dy The characteristic equation for above equations .. math:: \lambda^4 - (a + d) \lambda^2 + ad - bc = 0 whose discriminant is `D = (a - d)^2 + 4bc \neq 0` 1. When `ad - bc \neq 0` 1.1. If `D \neq 0`. The characteristic equation has four distinct roots, `\lambda_1, \lambda_2, \lambda_3, \lambda_4`. The general solution of the system is .. math:: x = C_1 b e^{\lambda_1 t} + C_2 b e^{\lambda_2 t} + C_3 b e^{\lambda_3 t} + C_4 b e^{\lambda_4 t} .. math:: y = C_1 (\lambda_1^{2} - a) e^{\lambda_1 t} + C_2 (\lambda_2^{2} - a) e^{\lambda_2 t} + C_3 (\lambda_3^{2} - a) e^{\lambda_3 t} + C_4 (\lambda_4^{2} - a) e^{\lambda_4 t} where `C_1,..., C_4` are arbitrary constants. 1.2. If `D = 0` and `a \neq d`: .. math:: x = 2 C_1 (bt + \frac{2bk}{a - d}) e^{\frac{kt}{2}} + 2 C_2 (bt + \frac{2bk}{a - d}) e^{\frac{-kt}{2}} + 2b C_3 t e^{\frac{kt}{2}} + 2b C_4 t e^{\frac{-kt}{2}} .. math:: y = C_1 (d - a) t e^{\frac{kt}{2}} + C_2 (d - a) t e^{\frac{-kt}{2}} + C_3 [(d - a) t + 2k] e^{\frac{kt}{2}} + C_4 [(d - a) t - 2k] e^{\frac{-kt}{2}} where `C_1,..., C_4` are arbitrary constants and `k = \sqrt{2 (a + d)}` 1.3. If `D = 0` and `a = d \neq 0` and `b = 0`: .. math:: x = 2 \sqrt{a} C_1 e^{\sqrt{a} t} + 2 \sqrt{a} C_2 e^{-\sqrt{a} t} .. math:: y = c C_1 t e^{\sqrt{a} t} - c C_2 t e^{-\sqrt{a} t} + C_3 e^{\sqrt{a} t} + C_4 e^{-\sqrt{a} t} 1.4. If `D = 0` and `a = d \neq 0` and `c = 0`: .. math:: x = b C_1 t e^{\sqrt{a} t} - b C_2 t e^{-\sqrt{a} t} + C_3 e^{\sqrt{a} t} + C_4 e^{-\sqrt{a} t} .. math:: y = 2 \sqrt{a} C_1 e^{\sqrt{a} t} + 2 \sqrt{a} C_2 e^{-\sqrt{a} t} 2. When `ad - bc = 0` and `a^2 + b^2 > 0`. Then the original system becomes .. math:: x'' = ax + by .. math:: y'' = k (ax + by) 2.1. If `a + bk \neq 0`: .. math:: x = C_1 e^{t \sqrt{a + bk}} + C_2 e^{-t \sqrt{a + bk}} + C_3 bt + C_4 b .. math:: y = C_1 k e^{t \sqrt{a + bk}} + C_2 k e^{-t \sqrt{a + bk}} - C_3 at - C_4 a 2.2. If `a + bk = 0`: .. math:: x = C_1 b t^3 + C_2 b t^2 + C_3 t + C_4 .. math:: y = kx + 6 C_1 t + 2 C_2 """ r['a'] = r['c1'] r['b'] = r['d1'] r['c'] = r['c2'] r['d'] = r['d2'] l = Symbol('l') C1, C2, C3, C4 = get_numbered_constants(eq, num=4) chara_eq = l**4 - (r['a']+r['d'])*l**2 + r['a']*r['d'] - r['b']*r['c'] l1 = rootof(chara_eq, 0) l2 = rootof(chara_eq, 1) l3 = rootof(chara_eq, 2) l4 = rootof(chara_eq, 3) D = (r['a'] - r['d'])**2 + 4*r['b']*r['c'] if (r['a']*r['d'] - r['b']*r['c']) != 0: if D != 0: gsol1 = C1*r['b']*exp(l1*t) + C2*r['b']*exp(l2*t) + C3*r['b']*exp(l3*t) \ + C4*r['b']*exp(l4*t) gsol2 = C1*(l1**2-r['a'])*exp(l1*t) + C2*(l2**2-r['a'])*exp(l2*t) + \ C3*(l3**2-r['a'])*exp(l3*t) + C4*(l4**2-r['a'])*exp(l4*t) else: if r['a'] != r['d']: k = sqrt(2*(r['a']+r['d'])) mid = r['b']*t+2*r['b']*k/(r['a']-r['d']) gsol1 = 2*C1*mid*exp(k*t/2) + 2*C2*mid*exp(-k*t/2) + \ 2*r['b']*C3*t*exp(k*t/2) + 2*r['b']*C4*t*exp(-k*t/2) gsol2 = C1*(r['d']-r['a'])*t*exp(k*t/2) + C2*(r['d']-r['a'])*t*exp(-k*t/2) + \ C3*((r['d']-r['a'])*t+2*k)*exp(k*t/2) + C4*((r['d']-r['a'])*t-2*k)*exp(-k*t/2) elif r['a'] == r['d'] != 0 and r['b'] == 0: sa = sqrt(r['a']) gsol1 = 2*sa*C1*exp(sa*t) + 2*sa*C2*exp(-sa*t) gsol2 = r['c']*C1*t*exp(sa*t)-r['c']*C2*t*exp(-sa*t)+C3*exp(sa*t)+C4*exp(-sa*t) elif r['a'] == r['d'] != 0 and r['c'] == 0: sa = sqrt(r['a']) gsol1 = r['b']*C1*t*exp(sa*t)-r['b']*C2*t*exp(-sa*t)+C3*exp(sa*t)+C4*exp(-sa*t) gsol2 = 2*sa*C1*exp(sa*t) + 2*sa*C2*exp(-sa*t) elif (r['a']*r['d'] - r['b']*r['c']) == 0 and (r['a']**2 + r['b']**2) > 0: k = r['c']/r['a'] if r['a'] + r['b']*k != 0: mid = sqrt(r['a'] + r['b']*k) gsol1 = C1*exp(mid*t) + C2*exp(-mid*t) + C3*r['b']*t + C4*r['b'] gsol2 = C1*k*exp(mid*t) + C2*k*exp(-mid*t) - C3*r['a']*t - C4*r['a'] else: gsol1 = C1*r['b']*t**3 + C2*r['b']*t**2 + C3*t + C4 gsol2 = k*gsol1 + 6*C1*t + 2*C2 return [Eq(x(t), gsol1), Eq(y(t), gsol2)] def _linear_2eq_order2_type2(x, y, t, r, eq): r""" The equations in this type are .. math:: x'' = a_1 x + b_1 y + c_1 .. math:: y'' = a_2 x + b_2 y + c_2 The general solution of this system is given by the sum of its particular solution and the general solution of the homogeneous system. The general solution is given by the linear system of 2 equation of order 2 and type 1 1. If `a_1 b_2 - a_2 b_1 \neq 0`. A particular solution will be `x = x_0` and `y = y_0` where the constants `x_0` and `y_0` are determined by solving the linear algebraic system .. math:: a_1 x_0 + b_1 y_0 + c_1 = 0, a_2 x_0 + b_2 y_0 + c_2 = 0 2. If `a_1 b_2 - a_2 b_1 = 0` and `a_1^2 + b_1^2 > 0`. In this case, the system in question becomes .. math:: x'' = ax + by + c_1, y'' = k (ax + by) + c_2 2.1. If `\sigma = a + bk \neq 0`, the particular solution will be .. math:: x = \frac{1}{2} b \sigma^{-1} (c_1 k - c_2) t^2 - \sigma^{-2} (a c_1 + b c_2) .. math:: y = kx + \frac{1}{2} (c_2 - c_1 k) t^2 2.2. If `\sigma = a + bk = 0`, the particular solution will be .. math:: x = \frac{1}{24} b (c_2 - c_1 k) t^4 + \frac{1}{2} c_1 t^2 .. math:: y = kx + \frac{1}{2} (c_2 - c_1 k) t^2 """ x0, y0 = symbols('x0, y0') if r['c1']*r['d2'] - r['c2']*r['d1'] != 0: sol = solve((r['c1']*x0+r['d1']*y0+r['e1'], r['c2']*x0+r['d2']*y0+r['e2']), x0, y0) psol = [sol[x0], sol[y0]] elif r['c1']*r['d2'] - r['c2']*r['d1'] == 0 and (r['c1']**2 + r['d1']**2) > 0: k = r['c2']/r['c1'] sig = r['c1'] + r['d1']*k if sig != 0: psol1 = r['d1']*sig**-1*(r['e1']*k-r['e2'])*t**2/2 - \ sig**-2*(r['c1']*r['e1']+r['d1']*r['e2']) psol2 = k*psol1 + (r['e2'] - r['e1']*k)*t**2/2 psol = [psol1, psol2] else: psol1 = r['d1']*(r['e2']-r['e1']*k)*t**4/24 + r['e1']*t**2/2 psol2 = k*psol1 + (r['e2']-r['e1']*k)*t**2/2 psol = [psol1, psol2] return psol def _linear_2eq_order2_type3(x, y, t, r, eq): r""" These type of equation is used for describing the horizontal motion of a pendulum taking into account the Earth rotation. The solution is given with `a^2 + 4b > 0`: .. math:: x = C_1 \cos(\alpha t) + C_2 \sin(\alpha t) + C_3 \cos(\beta t) + C_4 \sin(\beta t) .. math:: y = -C_1 \sin(\alpha t) + C_2 \cos(\alpha t) - C_3 \sin(\beta t) + C_4 \cos(\beta t) where `C_1,...,C_4` and .. math:: \alpha = \frac{1}{2} a + \frac{1}{2} \sqrt{a^2 + 4b}, \beta = \frac{1}{2} a - \frac{1}{2} \sqrt{a^2 + 4b} """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) if r['b1']**2 - 4*r['c1'] > 0: r['a'] = r['b1'] ; r['b'] = -r['c1'] alpha = r['a']/2 + sqrt(r['a']**2 + 4*r['b'])/2 beta = r['a']/2 - sqrt(r['a']**2 + 4*r['b'])/2 sol1 = C1*cos(alpha*t) + C2*sin(alpha*t) + C3*cos(beta*t) + C4*sin(beta*t) sol2 = -C1*sin(alpha*t) + C2*cos(alpha*t) - C3*sin(beta*t) + C4*cos(beta*t) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type4(x, y, t, r, eq): r""" These equations are found in the theory of oscillations .. math:: x'' + a_1 x' + b_1 y' + c_1 x + d_1 y = k_1 e^{i \omega t} .. math:: y'' + a_2 x' + b_2 y' + c_2 x + d_2 y = k_2 e^{i \omega t} The general solution of this linear nonhomogeneous system of constant-coefficient differential equations is given by the sum of its particular solution and the general solution of the corresponding homogeneous system (with `k_1 = k_2 = 0`) 1. A particular solution is obtained by the method of undetermined coefficients: .. math:: x = A_* e^{i \omega t}, y = B_* e^{i \omega t} On substituting these expressions into the original system of differential equations, one arrive at a linear nonhomogeneous system of algebraic equations for the coefficients `A` and `B`. 2. The general solution of the homogeneous system of differential equations is determined by a linear combination of linearly independent particular solutions determined by the method of undetermined coefficients in the form of exponentials: .. math:: x = A e^{\lambda t}, y = B e^{\lambda t} On substituting these expressions into the original system and collecting the coefficients of the unknown `A` and `B`, one obtains .. math:: (\lambda^{2} + a_1 \lambda + c_1) A + (b_1 \lambda + d_1) B = 0 .. math:: (a_2 \lambda + c_2) A + (\lambda^{2} + b_2 \lambda + d_2) B = 0 The determinant of this system must vanish for nontrivial solutions A, B to exist. This requirement results in the following characteristic equation for `\lambda` .. math:: (\lambda^2 + a_1 \lambda + c_1) (\lambda^2 + b_2 \lambda + d_2) - (b_1 \lambda + d_1) (a_2 \lambda + c_2) = 0 If all roots `k_1,...,k_4` of this equation are distinct, the general solution of the original system of the differential equations has the form .. math:: x = C_1 (b_1 \lambda_1 + d_1) e^{\lambda_1 t} - C_2 (b_1 \lambda_2 + d_1) e^{\lambda_2 t} - C_3 (b_1 \lambda_3 + d_1) e^{\lambda_3 t} - C_4 (b_1 \lambda_4 + d_1) e^{\lambda_4 t} .. math:: y = C_1 (\lambda_1^{2} + a_1 \lambda_1 + c_1) e^{\lambda_1 t} + C_2 (\lambda_2^{2} + a_1 \lambda_2 + c_1) e^{\lambda_2 t} + C_3 (\lambda_3^{2} + a_1 \lambda_3 + c_1) e^{\lambda_3 t} + C_4 (\lambda_4^{2} + a_1 \lambda_4 + c_1) e^{\lambda_4 t} """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) k = Symbol('k') Ra, Ca, Rb, Cb = symbols('Ra, Ca, Rb, Cb') a1 = r['a1'] ; a2 = r['a2'] b1 = r['b1'] ; b2 = r['b2'] c1 = r['c1'] ; c2 = r['c2'] d1 = r['d1'] ; d2 = r['d2'] k1 = r['e1'].expand().as_independent(t)[0] k2 = r['e2'].expand().as_independent(t)[0] ew1 = r['e1'].expand().as_independent(t)[1] ew2 = powdenest(ew1).as_base_exp()[1] ew3 = collect(ew2, t).coeff(t) w = cancel(ew3/I) # The particular solution is assumed to be (Ra+I*Ca)*exp(I*w*t) and # (Rb+I*Cb)*exp(I*w*t) for x(t) and y(t) respectively peq1 = (-w**2+c1)*Ra - a1*w*Ca + d1*Rb - b1*w*Cb - k1 peq2 = a1*w*Ra + (-w**2+c1)*Ca + b1*w*Rb + d1*Cb peq3 = c2*Ra - a2*w*Ca + (-w**2+d2)*Rb - b2*w*Cb - k2 peq4 = a2*w*Ra + c2*Ca + b2*w*Rb + (-w**2+d2)*Cb # FIXME: solve for what in what? Ra, Rb, etc I guess # but then psol not used for anything? psol = solve([peq1, peq2, peq3, peq4]) chareq = (k**2+a1*k+c1)*(k**2+b2*k+d2) - (b1*k+d1)*(a2*k+c2) [k1, k2, k3, k4] = roots_quartic(Poly(chareq)) sol1 = -C1*(b1*k1+d1)*exp(k1*t) - C2*(b1*k2+d1)*exp(k2*t) - \ C3*(b1*k3+d1)*exp(k3*t) - C4*(b1*k4+d1)*exp(k4*t) + (Ra+I*Ca)*exp(I*w*t) a1_ = (a1-1) sol2 = C1*(k1**2+a1_*k1+c1)*exp(k1*t) + C2*(k2**2+a1_*k2+c1)*exp(k2*t) + \ C3*(k3**2+a1_*k3+c1)*exp(k3*t) + C4*(k4**2+a1_*k4+c1)*exp(k4*t) + (Rb+I*Cb)*exp(I*w*t) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type5(x, y, t, r, eq): r""" The equation which come under this category are .. math:: x'' = a (t y' - y) .. math:: y'' = b (t x' - x) The transformation .. math:: u = t x' - x, b = t y' - y leads to the first-order system .. math:: u' = atv, v' = btu The general solution of this system is given by If `ab > 0`: .. math:: u = C_1 a e^{\frac{1}{2} \sqrt{ab} t^2} + C_2 a e^{-\frac{1}{2} \sqrt{ab} t^2} .. math:: v = C_1 \sqrt{ab} e^{\frac{1}{2} \sqrt{ab} t^2} - C_2 \sqrt{ab} e^{-\frac{1}{2} \sqrt{ab} t^2} If `ab < 0`: .. math:: u = C_1 a \cos(\frac{1}{2} \sqrt{\left|ab\right|} t^2) + C_2 a \sin(-\frac{1}{2} \sqrt{\left|ab\right|} t^2) .. math:: v = C_1 \sqrt{\left|ab\right|} \sin(\frac{1}{2} \sqrt{\left|ab\right|} t^2) + C_2 \sqrt{\left|ab\right|} \cos(-\frac{1}{2} \sqrt{\left|ab\right|} t^2) where `C_1` and `C_2` are arbitrary constants. On substituting the value of `u` and `v` in above equations and integrating the resulting expressions, the general solution will become .. math:: x = C_3 t + t \int \frac{u}{t^2} \,dt, y = C_4 t + t \int \frac{u}{t^2} \,dt where `C_3` and `C_4` are arbitrary constants. """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) r['a'] = -r['d1'] ; r['b'] = -r['c2'] mul = sqrt(abs(r['a']*r['b'])) if r['a']*r['b'] > 0: u = C1*r['a']*exp(mul*t**2/2) + C2*r['a']*exp(-mul*t**2/2) v = C1*mul*exp(mul*t**2/2) - C2*mul*exp(-mul*t**2/2) else: u = C1*r['a']*cos(mul*t**2/2) + C2*r['a']*sin(mul*t**2/2) v = -C1*mul*sin(mul*t**2/2) + C2*mul*cos(mul*t**2/2) sol1 = C3*t + t*Integral(u/t**2, t) sol2 = C4*t + t*Integral(v/t**2, t) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type6(x, y, t, r, eq): r""" The equations are .. math:: x'' = f(t) (a_1 x + b_1 y) .. math:: y'' = f(t) (a_2 x + b_2 y) If `k_1` and `k_2` are roots of the quadratic equation .. math:: k^2 - (a_1 + b_2) k + a_1 b_2 - a_2 b_1 = 0 Then by multiplying appropriate constants and adding together original equations we obtain two independent equations: .. math:: z_1'' = k_1 f(t) z_1, z_1 = a_2 x + (k_1 - a_1) y .. math:: z_2'' = k_2 f(t) z_2, z_2 = a_2 x + (k_2 - a_1) y Solving the equations will give the values of `x` and `y` after obtaining the value of `z_1` and `z_2` by solving the differential equation and substituting the result. """ k = Symbol('k') z = Function('z') num, den = cancel( (r['c1']*x(t) + r['d1']*y(t))/ (r['c2']*x(t) + r['d2']*y(t))).as_numer_denom() f = r['c1']/num.coeff(x(t)) a1 = num.coeff(x(t)) b1 = num.coeff(y(t)) a2 = den.coeff(x(t)) b2 = den.coeff(y(t)) chareq = k**2 - (a1 + b2)*k + a1*b2 - a2*b1 k1, k2 = [rootof(chareq, k) for k in range(Poly(chareq).degree())] z1 = dsolve(diff(z(t),t,t) - k1*f*z(t)).rhs z2 = dsolve(diff(z(t),t,t) - k2*f*z(t)).rhs sol1 = (k1*z2 - k2*z1 + a1*(z1 - z2))/(a2*(k1-k2)) sol2 = (z1 - z2)/(k1 - k2) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type7(x, y, t, r, eq): r""" The equations are given as .. math:: x'' = f(t) (a_1 x' + b_1 y') .. math:: y'' = f(t) (a_2 x' + b_2 y') If `k_1` and 'k_2` are roots of the quadratic equation .. math:: k^2 - (a_1 + b_2) k + a_1 b_2 - a_2 b_1 = 0 Then the system can be reduced by adding together the two equations multiplied by appropriate constants give following two independent equations: .. math:: z_1'' = k_1 f(t) z_1', z_1 = a_2 x + (k_1 - a_1) y .. math:: z_2'' = k_2 f(t) z_2', z_2 = a_2 x + (k_2 - a_1) y Integrating these and returning to the original variables, one arrives at a linear algebraic system for the unknowns `x` and `y`: .. math:: a_2 x + (k_1 - a_1) y = C_1 \int e^{k_1 F(t)} \,dt + C_2 .. math:: a_2 x + (k_2 - a_1) y = C_3 \int e^{k_2 F(t)} \,dt + C_4 where `C_1,...,C_4` are arbitrary constants and `F(t) = \int f(t) \,dt` """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) k = Symbol('k') num, den = cancel( (r['a1']*x(t) + r['b1']*y(t))/ (r['a2']*x(t) + r['b2']*y(t))).as_numer_denom() f = r['a1']/num.coeff(x(t)) a1 = num.coeff(x(t)) b1 = num.coeff(y(t)) a2 = den.coeff(x(t)) b2 = den.coeff(y(t)) chareq = k**2 - (a1 + b2)*k + a1*b2 - a2*b1 [k1, k2] = [rootof(chareq, k) for k in range(Poly(chareq).degree())] F = Integral(f, t) z1 = C1*Integral(exp(k1*F), t) + C2 z2 = C3*Integral(exp(k2*F), t) + C4 sol1 = (k1*z2 - k2*z1 + a1*(z1 - z2))/(a2*(k1-k2)) sol2 = (z1 - z2)/(k1 - k2) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type8(x, y, t, r, eq): r""" The equation of this category are .. math:: x'' = a f(t) (t y' - y) .. math:: y'' = b f(t) (t x' - x) The transformation .. math:: u = t x' - x, v = t y' - y leads to the system of first-order equations .. math:: u' = a t f(t) v, v' = b t f(t) u The general solution of this system has the form If `ab > 0`: .. math:: u = C_1 a e^{\sqrt{ab} \int t f(t) \,dt} + C_2 a e^{-\sqrt{ab} \int t f(t) \,dt} .. math:: v = C_1 \sqrt{ab} e^{\sqrt{ab} \int t f(t) \,dt} - C_2 \sqrt{ab} e^{-\sqrt{ab} \int t f(t) \,dt} If `ab < 0`: .. math:: u = C_1 a \cos(\sqrt{\left|ab\right|} \int t f(t) \,dt) + C_2 a \sin(-\sqrt{\left|ab\right|} \int t f(t) \,dt) .. math:: v = C_1 \sqrt{\left|ab\right|} \sin(\sqrt{\left|ab\right|} \int t f(t) \,dt) + C_2 \sqrt{\left|ab\right|} \cos(-\sqrt{\left|ab\right|} \int t f(t) \,dt) where `C_1` and `C_2` are arbitrary constants. On substituting the value of `u` and `v` in above equations and integrating the resulting expressions, the general solution will become .. math:: x = C_3 t + t \int \frac{u}{t^2} \,dt, y = C_4 t + t \int \frac{u}{t^2} \,dt where `C_3` and `C_4` are arbitrary constants. """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) num, den = cancel(r['d1']/r['c2']).as_numer_denom() f = -r['d1']/num a = num b = den mul = sqrt(abs(a*b)) Igral = Integral(t*f, t) if a*b > 0: u = C1*a*exp(mul*Igral) + C2*a*exp(-mul*Igral) v = C1*mul*exp(mul*Igral) - C2*mul*exp(-mul*Igral) else: u = C1*a*cos(mul*Igral) + C2*a*sin(mul*Igral) v = -C1*mul*sin(mul*Igral) + C2*mul*cos(mul*Igral) sol1 = C3*t + t*Integral(u/t**2, t) sol2 = C4*t + t*Integral(v/t**2, t) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type9(x, y, t, r, eq): r""" .. math:: t^2 x'' + a_1 t x' + b_1 t y' + c_1 x + d_1 y = 0 .. math:: t^2 y'' + a_2 t x' + b_2 t y' + c_2 x + d_2 y = 0 These system of equations are euler type. The substitution of `t = \sigma e^{\tau} (\sigma \neq 0)` leads to the system of constant coefficient linear differential equations .. math:: x'' + (a_1 - 1) x' + b_1 y' + c_1 x + d_1 y = 0 .. math:: y'' + a_2 x' + (b_2 - 1) y' + c_2 x + d_2 y = 0 The general solution of the homogeneous system of differential equations is determined by a linear combination of linearly independent particular solutions determined by the method of undetermined coefficients in the form of exponentials .. math:: x = A e^{\lambda t}, y = B e^{\lambda t} On substituting these expressions into the original system and collecting the coefficients of the unknown `A` and `B`, one obtains .. math:: (\lambda^{2} + (a_1 - 1) \lambda + c_1) A + (b_1 \lambda + d_1) B = 0 .. math:: (a_2 \lambda + c_2) A + (\lambda^{2} + (b_2 - 1) \lambda + d_2) B = 0 The determinant of this system must vanish for nontrivial solutions A, B to exist. This requirement results in the following characteristic equation for `\lambda` .. math:: (\lambda^2 + (a_1 - 1) \lambda + c_1) (\lambda^2 + (b_2 - 1) \lambda + d_2) - (b_1 \lambda + d_1) (a_2 \lambda + c_2) = 0 If all roots `k_1,...,k_4` of this equation are distinct, the general solution of the original system of the differential equations has the form .. math:: x = C_1 (b_1 \lambda_1 + d_1) e^{\lambda_1 t} - C_2 (b_1 \lambda_2 + d_1) e^{\lambda_2 t} - C_3 (b_1 \lambda_3 + d_1) e^{\lambda_3 t} - C_4 (b_1 \lambda_4 + d_1) e^{\lambda_4 t} .. math:: y = C_1 (\lambda_1^{2} + (a_1 - 1) \lambda_1 + c_1) e^{\lambda_1 t} + C_2 (\lambda_2^{2} + (a_1 - 1) \lambda_2 + c_1) e^{\lambda_2 t} + C_3 (\lambda_3^{2} + (a_1 - 1) \lambda_3 + c_1) e^{\lambda_3 t} + C_4 (\lambda_4^{2} + (a_1 - 1) \lambda_4 + c_1) e^{\lambda_4 t} """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) k = Symbol('k') a1 = -r['a1']*t; a2 = -r['a2']*t b1 = -r['b1']*t; b2 = -r['b2']*t c1 = -r['c1']*t**2; c2 = -r['c2']*t**2 d1 = -r['d1']*t**2; d2 = -r['d2']*t**2 eq = (k**2+(a1-1)*k+c1)*(k**2+(b2-1)*k+d2)-(b1*k+d1)*(a2*k+c2) [k1, k2, k3, k4] = roots_quartic(Poly(eq)) sol1 = -C1*(b1*k1+d1)*exp(k1*log(t)) - C2*(b1*k2+d1)*exp(k2*log(t)) - \ C3*(b1*k3+d1)*exp(k3*log(t)) - C4*(b1*k4+d1)*exp(k4*log(t)) a1_ = (a1-1) sol2 = C1*(k1**2+a1_*k1+c1)*exp(k1*log(t)) + C2*(k2**2+a1_*k2+c1)*exp(k2*log(t)) \ + C3*(k3**2+a1_*k3+c1)*exp(k3*log(t)) + C4*(k4**2+a1_*k4+c1)*exp(k4*log(t)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type10(x, y, t, r, eq): r""" The equation of this category are .. math:: (\alpha t^2 + \beta t + \gamma)^{2} x'' = ax + by .. math:: (\alpha t^2 + \beta t + \gamma)^{2} y'' = cx + dy The transformation .. math:: \tau = \int \frac{1}{\alpha t^2 + \beta t + \gamma} \,dt , u = \frac{x}{\sqrt{\left|\alpha t^2 + \beta t + \gamma\right|}} , v = \frac{y}{\sqrt{\left|\alpha t^2 + \beta t + \gamma\right|}} leads to a constant coefficient linear system of equations .. math:: u'' = (a - \alpha \gamma + \frac{1}{4} \beta^{2}) u + b v .. math:: v'' = c u + (d - \alpha \gamma + \frac{1}{4} \beta^{2}) v These system of equations obtained can be solved by type1 of System of two constant-coefficient second-order linear homogeneous differential equations. """ u, v = symbols('u, v', cls=Function) assert False p = Wild('p', exclude=[t, t**2]) q = Wild('q', exclude=[t, t**2]) s = Wild('s', exclude=[t, t**2]) n = Wild('n', exclude=[t, t**2]) num, den = r['c1'].as_numer_denom() dic = den.match((n*(p*t**2+q*t+s)**2).expand()) eqz = dic[p]*t**2 + dic[q]*t + dic[s] a = num/dic[n] b = cancel(r['d1']*eqz**2) c = cancel(r['c2']*eqz**2) d = cancel(r['d2']*eqz**2) [msol1, msol2] = dsolve([Eq(diff(u(t), t, t), (a - dic[p]*dic[s] + dic[q]**2/4)*u(t) \ + b*v(t)), Eq(diff(v(t),t,t), c*u(t) + (d - dic[p]*dic[s] + dic[q]**2/4)*v(t))]) sol1 = (msol1.rhs*sqrt(abs(eqz))).subs(t, Integral(1/eqz, t)) sol2 = (msol2.rhs*sqrt(abs(eqz))).subs(t, Integral(1/eqz, t)) return [Eq(x(t), sol1), Eq(y(t), sol2)] def _linear_2eq_order2_type11(x, y, t, r, eq): r""" The equations which comes under this type are .. math:: x'' = f(t) (t x' - x) + g(t) (t y' - y) .. math:: y'' = h(t) (t x' - x) + p(t) (t y' - y) The transformation .. math:: u = t x' - x, v = t y' - y leads to the linear system of first-order equations .. math:: u' = t f(t) u + t g(t) v, v' = t h(t) u + t p(t) v On substituting the value of `u` and `v` in transformed equation gives value of `x` and `y` as .. math:: x = C_3 t + t \int \frac{u}{t^2} \,dt , y = C_4 t + t \int \frac{v}{t^2} \,dt. where `C_3` and `C_4` are arbitrary constants. """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) u, v = symbols('u, v', cls=Function) f = -r['c1'] ; g = -r['d1'] h = -r['c2'] ; p = -r['d2'] [msol1, msol2] = dsolve([Eq(diff(u(t),t), t*f*u(t) + t*g*v(t)), Eq(diff(v(t),t), t*h*u(t) + t*p*v(t))]) sol1 = C3*t + t*Integral(msol1.rhs/t**2, t) sol2 = C4*t + t*Integral(msol2.rhs/t**2, t) return [Eq(x(t), sol1), Eq(y(t), sol2)] def sysode_linear_3eq_order1(match_): x = match_['func'][0].func y = match_['func'][1].func z = match_['func'][2].func func = match_['func'] fc = match_['func_coeff'] eq = match_['eq'] r = dict() t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] for i in range(3): eqs = 0 for terms in Add.make_args(eq[i]): eqs += terms/fc[i,func[i],1] eq[i] = eqs # for equations: # Eq(g1*diff(x(t),t), a1*x(t)+b1*y(t)+c1*z(t)+d1), # Eq(g2*diff(y(t),t), a2*x(t)+b2*y(t)+c2*z(t)+d2), and # Eq(g3*diff(z(t),t), a3*x(t)+b3*y(t)+c3*z(t)+d3) r['a1'] = fc[0,x(t),0]/fc[0,x(t),1]; r['a2'] = fc[1,x(t),0]/fc[1,y(t),1]; r['a3'] = fc[2,x(t),0]/fc[2,z(t),1] r['b1'] = fc[0,y(t),0]/fc[0,x(t),1]; r['b2'] = fc[1,y(t),0]/fc[1,y(t),1]; r['b3'] = fc[2,y(t),0]/fc[2,z(t),1] r['c1'] = fc[0,z(t),0]/fc[0,x(t),1]; r['c2'] = fc[1,z(t),0]/fc[1,y(t),1]; r['c3'] = fc[2,z(t),0]/fc[2,z(t),1] for i in range(3): for j in Add.make_args(eq[i]): if not j.has(x(t), y(t), z(t)): raise NotImplementedError("Only homogeneous problems are supported, non-homogeneous are not supported currently.") if match_['type_of_equation'] == 'type1': sol = _linear_3eq_order1_type1(x, y, z, t, r, eq) if match_['type_of_equation'] == 'type2': sol = _linear_3eq_order1_type2(x, y, z, t, r, eq) if match_['type_of_equation'] == 'type3': sol = _linear_3eq_order1_type3(x, y, z, t, r, eq) if match_['type_of_equation'] == 'type4': sol = _linear_3eq_order1_type4(x, y, z, t, r, eq) if match_['type_of_equation'] == 'type6': sol = _linear_neq_order1_type1(match_) return sol def _linear_3eq_order1_type1(x, y, z, t, r, eq): r""" .. math:: x' = ax .. math:: y' = bx + cy .. math:: z' = dx + ky + pz Solution of such equations are forward substitution. Solving first equations gives the value of `x`, substituting it in second and third equation and solving second equation gives `y` and similarly substituting `y` in third equation give `z`. .. math:: x = C_1 e^{at} .. math:: y = \frac{b C_1}{a - c} e^{at} + C_2 e^{ct} .. math:: z = \frac{C_1}{a - p} (d + \frac{bk}{a - c}) e^{at} + \frac{k C_2}{c - p} e^{ct} + C_3 e^{pt} where `C_1, C_2` and `C_3` are arbitrary constants. """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) a = -r['a1']; b = -r['a2']; c = -r['b2'] d = -r['a3']; k = -r['b3']; p = -r['c3'] sol1 = C1*exp(a*t) sol2 = b*C1*exp(a*t)/(a-c) + C2*exp(c*t) sol3 = C1*(d+b*k/(a-c))*exp(a*t)/(a-p) + k*C2*exp(c*t)/(c-p) + C3*exp(p*t) return [Eq(x(t), sol1), Eq(y(t), sol2), Eq(z(t), sol3)] def _linear_3eq_order1_type2(x, y, z, t, r, eq): r""" The equations of this type are .. math:: x' = cy - bz .. math:: y' = az - cx .. math:: z' = bx - ay 1. First integral: .. math:: ax + by + cz = A \qquad - (1) .. math:: x^2 + y^2 + z^2 = B^2 \qquad - (2) where `A` and `B` are arbitrary constants. It follows from these integrals that the integral lines are circles formed by the intersection of the planes `(1)` and sphere `(2)` 2. Solution: .. math:: x = a C_0 + k C_1 \cos(kt) + (c C_2 - b C_3) \sin(kt) .. math:: y = b C_0 + k C_2 \cos(kt) + (a C_2 - c C_3) \sin(kt) .. math:: z = c C_0 + k C_3 \cos(kt) + (b C_2 - a C_3) \sin(kt) where `k = \sqrt{a^2 + b^2 + c^2}` and the four constants of integration, `C_1,...,C_4` are constrained by a single relation, .. math:: a C_1 + b C_2 + c C_3 = 0 """ C0, C1, C2, C3 = get_numbered_constants(eq, num=4, start=0) a = -r['c2']; b = -r['a3']; c = -r['b1'] k = sqrt(a**2 + b**2 + c**2) C3 = (-a*C1 - b*C2)/c sol1 = a*C0 + k*C1*cos(k*t) + (c*C2-b*C3)*sin(k*t) sol2 = b*C0 + k*C2*cos(k*t) + (a*C3-c*C1)*sin(k*t) sol3 = c*C0 + k*C3*cos(k*t) + (b*C1-a*C2)*sin(k*t) return [Eq(x(t), sol1), Eq(y(t), sol2), Eq(z(t), sol3)] def _linear_3eq_order1_type3(x, y, z, t, r, eq): r""" Equations of this system of ODEs .. math:: a x' = bc (y - z) .. math:: b y' = ac (z - x) .. math:: c z' = ab (x - y) 1. First integral: .. math:: a^2 x + b^2 y + c^2 z = A where A is an arbitrary constant. It follows that the integral lines are plane curves. 2. Solution: .. math:: x = C_0 + k C_1 \cos(kt) + a^{-1} bc (C_2 - C_3) \sin(kt) .. math:: y = C_0 + k C_2 \cos(kt) + a b^{-1} c (C_3 - C_1) \sin(kt) .. math:: z = C_0 + k C_3 \cos(kt) + ab c^{-1} (C_1 - C_2) \sin(kt) where `k = \sqrt{a^2 + b^2 + c^2}` and the four constants of integration, `C_1,...,C_4` are constrained by a single relation .. math:: a^2 C_1 + b^2 C_2 + c^2 C_3 = 0 """ C0, C1, C2, C3 = get_numbered_constants(eq, num=4, start=0) c = sqrt(r['b1']*r['c2']) b = sqrt(r['b1']*r['a3']) a = sqrt(r['c2']*r['a3']) C3 = (-a**2*C1-b**2*C2)/c**2 k = sqrt(a**2 + b**2 + c**2) sol1 = C0 + k*C1*cos(k*t) + a**-1*b*c*(C2-C3)*sin(k*t) sol2 = C0 + k*C2*cos(k*t) + a*b**-1*c*(C3-C1)*sin(k*t) sol3 = C0 + k*C3*cos(k*t) + a*b*c**-1*(C1-C2)*sin(k*t) return [Eq(x(t), sol1), Eq(y(t), sol2), Eq(z(t), sol3)] def _linear_3eq_order1_type4(x, y, z, t, r, eq): r""" Equations: .. math:: x' = (a_1 f(t) + g(t)) x + a_2 f(t) y + a_3 f(t) z .. math:: y' = b_1 f(t) x + (b_2 f(t) + g(t)) y + b_3 f(t) z .. math:: z' = c_1 f(t) x + c_2 f(t) y + (c_3 f(t) + g(t)) z The transformation .. math:: x = e^{\int g(t) \,dt} u, y = e^{\int g(t) \,dt} v, z = e^{\int g(t) \,dt} w, \tau = \int f(t) \,dt leads to the system of constant coefficient linear differential equations .. math:: u' = a_1 u + a_2 v + a_3 w .. math:: v' = b_1 u + b_2 v + b_3 w .. math:: w' = c_1 u + c_2 v + c_3 w These system of equations are solved by homogeneous linear system of constant coefficients of `n` equations of first order. Then substituting the value of `u, v` and `w` in transformed equation gives value of `x, y` and `z`. """ u, v, w = symbols('u, v, w', cls=Function) a2, a3 = cancel(r['b1']/r['c1']).as_numer_denom() f = cancel(r['b1']/a2) b1 = cancel(r['a2']/f); b3 = cancel(r['c2']/f) c1 = cancel(r['a3']/f); c2 = cancel(r['b3']/f) a1, g = div(r['a1'],f) b2 = div(r['b2'],f)[0] c3 = div(r['c3'],f)[0] trans_eq = (diff(u(t),t)-a1*u(t)-a2*v(t)-a3*w(t), diff(v(t),t)-b1*u(t)-\ b2*v(t)-b3*w(t), diff(w(t),t)-c1*u(t)-c2*v(t)-c3*w(t)) sol = dsolve(trans_eq) sol1 = exp(Integral(g,t))*((sol[0].rhs).subs(t, Integral(f,t))) sol2 = exp(Integral(g,t))*((sol[1].rhs).subs(t, Integral(f,t))) sol3 = exp(Integral(g,t))*((sol[2].rhs).subs(t, Integral(f,t))) return [Eq(x(t), sol1), Eq(y(t), sol2), Eq(z(t), sol3)] def sysode_linear_neq_order1(match_): sol = _linear_neq_order1_type1(match_) return sol def _linear_neq_order1_type1(match_): r""" System of n first-order constant-coefficient linear nonhomogeneous differential equation .. math:: y'_k = a_{k1} y_1 + a_{k2} y_2 +...+ a_{kn} y_n; k = 1,2,...,n or that can be written as `\vec{y'} = A . \vec{y}` where `\vec{y}` is matrix of `y_k` for `k = 1,2,...n` and `A` is a `n \times n` matrix. Since these equations are equivalent to a first order homogeneous linear differential equation. So the general solution will contain `n` linearly independent parts and solution will consist some type of exponential functions. Assuming `y = \vec{v} e^{rt}` is a solution of the system where `\vec{v}` is a vector of coefficients of `y_1,...,y_n`. Substituting `y` and `y' = r v e^{r t}` into the equation `\vec{y'} = A . \vec{y}`, we get .. math:: r \vec{v} e^{rt} = A \vec{v} e^{rt} .. math:: r \vec{v} = A \vec{v} where `r` comes out to be eigenvalue of `A` and vector `\vec{v}` is the eigenvector of `A` corresponding to `r`. There are three possibilities of eigenvalues of `A` - `n` distinct real eigenvalues - complex conjugate eigenvalues - eigenvalues with multiplicity `k` 1. When all eigenvalues `r_1,..,r_n` are distinct with `n` different eigenvectors `v_1,...v_n` then the solution is given by .. math:: \vec{y} = C_1 e^{r_1 t} \vec{v_1} + C_2 e^{r_2 t} \vec{v_2} +...+ C_n e^{r_n t} \vec{v_n} where `C_1,C_2,...,C_n` are arbitrary constants. 2. When some eigenvalues are complex then in order to make the solution real, we take a linear combination: if `r = a + bi` has an eigenvector `\vec{v} = \vec{w_1} + i \vec{w_2}` then to obtain real-valued solutions to the system, replace the complex-valued solutions `e^{rx} \vec{v}` with real-valued solution `e^{ax} (\vec{w_1} \cos(bx) - \vec{w_2} \sin(bx))` and for `r = a - bi` replace the solution `e^{-r x} \vec{v}` with `e^{ax} (\vec{w_1} \sin(bx) + \vec{w_2} \cos(bx))` 3. If some eigenvalues are repeated. Then we get fewer than `n` linearly independent eigenvectors, we miss some of the solutions and need to construct the missing ones. We do this via generalized eigenvectors, vectors which are not eigenvectors but are close enough that we can use to write down the remaining solutions. For a eigenvalue `r` with eigenvector `\vec{w}` we obtain `\vec{w_2},...,\vec{w_k}` using .. math:: (A - r I) . \vec{w_2} = \vec{w} .. math:: (A - r I) . \vec{w_3} = \vec{w_2} .. math:: \vdots .. math:: (A - r I) . \vec{w_k} = \vec{w_{k-1}} Then the solutions to the system for the eigenspace are `e^{rt} [\vec{w}], e^{rt} [t \vec{w} + \vec{w_2}], e^{rt} [\frac{t^2}{2} \vec{w} + t \vec{w_2} + \vec{w_3}], ...,e^{rt} [\frac{t^{k-1}}{(k-1)!} \vec{w} + \frac{t^{k-2}}{(k-2)!} \vec{w_2} +...+ t \vec{w_{k-1}} + \vec{w_k}]` So, If `\vec{y_1},...,\vec{y_n}` are `n` solution of obtained from three categories of `A`, then general solution to the system `\vec{y'} = A . \vec{y}` .. math:: \vec{y} = C_1 \vec{y_1} + C_2 \vec{y_2} + \cdots + C_n \vec{y_n} """ eq = match_['eq'] func = match_['func'] fc = match_['func_coeff'] n = len(eq) t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] constants = numbered_symbols(prefix='C', cls=Symbol, start=1) M = Matrix(n,n,lambda i,j:-fc[i,func[j],0]) evector = M.eigenvects(simplify=True) def is_complex(mat, root): return Matrix(n, 1, lambda i,j: re(mat[i])*cos(im(root)*t) - im(mat[i])*sin(im(root)*t)) def is_complex_conjugate(mat, root): return Matrix(n, 1, lambda i,j: re(mat[i])*sin(abs(im(root))*t) + im(mat[i])*cos(im(root)*t)*abs(im(root))/im(root)) conjugate_root = [] e_vector = zeros(n,1) for evects in evector: if evects[0] not in conjugate_root: # If number of column of an eigenvector is not equal to the multiplicity # of its eigenvalue then the legt eigenvectors are calculated if len(evects[2])!=evects[1]: var_mat = Matrix(n, 1, lambda i,j: Symbol('x'+str(i))) Mnew = (M - evects[0]*eye(evects[2][-1].rows))*var_mat w = [0 for i in range(evects[1])] w[0] = evects[2][-1] for r in range(1, evects[1]): w_ = Mnew - w[r-1] sol_dict = solve(list(w_), var_mat[1:]) sol_dict[var_mat[0]] = var_mat[0] for key, value in sol_dict.items(): sol_dict[key] = value.subs(var_mat[0],1) w[r] = Matrix(n, 1, lambda i,j: sol_dict[var_mat[i]]) evects[2].append(w[r]) for i in range(evects[1]): C = next(constants) for j in range(i+1): if evects[0].has(I): evects[2][j] = simplify(evects[2][j]) e_vector += C*is_complex(evects[2][j], evects[0])*t**(i-j)*exp(re(evects[0])*t)/factorial(i-j) C = next(constants) e_vector += C*is_complex_conjugate(evects[2][j], evects[0])*t**(i-j)*exp(re(evects[0])*t)/factorial(i-j) else: e_vector += C*evects[2][j]*t**(i-j)*exp(evects[0]*t)/factorial(i-j) if evects[0].has(I): conjugate_root.append(conjugate(evects[0])) sol = [] for i in range(len(eq)): sol.append(Eq(func[i],e_vector[i])) return sol def sysode_nonlinear_2eq_order1(match_): func = match_['func'] eq = match_['eq'] fc = match_['func_coeff'] t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] if match_['type_of_equation'] == 'type5': sol = _nonlinear_2eq_order1_type5(func, t, eq) return sol x = func[0].func y = func[1].func for i in range(2): eqs = 0 for terms in Add.make_args(eq[i]): eqs += terms/fc[i,func[i],1] eq[i] = eqs if match_['type_of_equation'] == 'type1': sol = _nonlinear_2eq_order1_type1(x, y, t, eq) elif match_['type_of_equation'] == 'type2': sol = _nonlinear_2eq_order1_type2(x, y, t, eq) elif match_['type_of_equation'] == 'type3': sol = _nonlinear_2eq_order1_type3(x, y, t, eq) elif match_['type_of_equation'] == 'type4': sol = _nonlinear_2eq_order1_type4(x, y, t, eq) return sol def _nonlinear_2eq_order1_type1(x, y, t, eq): r""" Equations: .. math:: x' = x^n F(x,y) .. math:: y' = g(y) F(x,y) Solution: .. math:: x = \varphi(y), \int \frac{1}{g(y) F(\varphi(y),y)} \,dy = t + C_2 where if `n \neq 1` .. math:: \varphi = [C_1 + (1-n) \int \frac{1}{g(y)} \,dy]^{\frac{1}{1-n}} if `n = 1` .. math:: \varphi = C_1 e^{\int \frac{1}{g(y)} \,dy} where `C_1` and `C_2` are arbitrary constants. """ C1, C2 = get_numbered_constants(eq, num=2) n = Wild('n', exclude=[x(t),y(t)]) f = Wild('f') u, v = symbols('u, v') r = eq[0].match(diff(x(t),t) - x(t)**n*f) g = ((diff(y(t),t) - eq[1])/r[f]).subs(y(t),v) F = r[f].subs(x(t),u).subs(y(t),v) n = r[n] if n!=1: phi = (C1 + (1-n)*Integral(1/g, v))**(1/(1-n)) else: phi = C1*exp(Integral(1/g, v)) phi = phi.doit() sol2 = solve(Integral(1/(g*F.subs(u,phi)), v).doit() - t - C2, v) sol = [] for sols in sol2: sol.append(Eq(x(t),phi.subs(v, sols))) sol.append(Eq(y(t), sols)) return sol def _nonlinear_2eq_order1_type2(x, y, t, eq): r""" Equations: .. math:: x' = e^{\lambda x} F(x,y) .. math:: y' = g(y) F(x,y) Solution: .. math:: x = \varphi(y), \int \frac{1}{g(y) F(\varphi(y),y)} \,dy = t + C_2 where if `\lambda \neq 0` .. math:: \varphi = -\frac{1}{\lambda} log(C_1 - \lambda \int \frac{1}{g(y)} \,dy) if `\lambda = 0` .. math:: \varphi = C_1 + \int \frac{1}{g(y)} \,dy where `C_1` and `C_2` are arbitrary constants. """ C1, C2 = get_numbered_constants(eq, num=2) n = Wild('n', exclude=[x(t),y(t)]) f = Wild('f') u, v = symbols('u, v') r = eq[0].match(diff(x(t),t) - exp(n*x(t))*f) g = ((diff(y(t),t) - eq[1])/r[f]).subs(y(t),v) F = r[f].subs(x(t),u).subs(y(t),v) n = r[n] if n: phi = -1/n*log(C1 - n*Integral(1/g, v)) else: phi = C1 + Integral(1/g, v) phi = phi.doit() sol2 = solve(Integral(1/(g*F.subs(u,phi)), v).doit() - t - C2, v) sol = [] for sols in sol2: sol.append(Eq(x(t),phi.subs(v, sols))) sol.append(Eq(y(t), sols)) return sol def _nonlinear_2eq_order1_type3(x, y, t, eq): r""" Autonomous system of general form .. math:: x' = F(x,y) .. math:: y' = G(x,y) Assuming `y = y(x, C_1)` where `C_1` is an arbitrary constant is the general solution of the first-order equation .. math:: F(x,y) y'_x = G(x,y) Then the general solution of the original system of equations has the form .. math:: \int \frac{1}{F(x,y(x,C_1))} \,dx = t + C_1 """ C1, C2, C3, C4 = get_numbered_constants(eq, num=4) v = Function('v') u = Symbol('u') f = Wild('f') g = Wild('g') r1 = eq[0].match(diff(x(t),t) - f) r2 = eq[1].match(diff(y(t),t) - g) F = r1[f].subs(x(t), u).subs(y(t), v(u)) G = r2[g].subs(x(t), u).subs(y(t), v(u)) sol2r = dsolve(Eq(diff(v(u), u), G/F)) for sol2s in sol2r: sol1 = solve(Integral(1/F.subs(v(u), sol2s.rhs), u).doit() - t - C2, u) sol = [] for sols in sol1: sol.append(Eq(x(t), sols)) sol.append(Eq(y(t), (sol2s.rhs).subs(u, sols))) return sol def _nonlinear_2eq_order1_type4(x, y, t, eq): r""" Equation: .. math:: x' = f_1(x) g_1(y) \phi(x,y,t) .. math:: y' = f_2(x) g_2(y) \phi(x,y,t) First integral: .. math:: \int \frac{f_2(x)}{f_1(x)} \,dx - \int \frac{g_1(y)}{g_2(y)} \,dy = C where `C` is an arbitrary constant. On solving the first integral for `x` (resp., `y` ) and on substituting the resulting expression into either equation of the original solution, one arrives at a first-order equation for determining `y` (resp., `x` ). """ C1, C2 = get_numbered_constants(eq, num=2) u, v = symbols('u, v') U, V = symbols('U, V', cls=Function) f = Wild('f') g = Wild('g') f1 = Wild('f1', exclude=[v,t]) f2 = Wild('f2', exclude=[v,t]) g1 = Wild('g1', exclude=[u,t]) g2 = Wild('g2', exclude=[u,t]) r1 = eq[0].match(diff(x(t),t) - f) r2 = eq[1].match(diff(y(t),t) - g) num, den = ( (r1[f].subs(x(t),u).subs(y(t),v))/ (r2[g].subs(x(t),u).subs(y(t),v))).as_numer_denom() R1 = num.match(f1*g1) R2 = den.match(f2*g2) phi = (r1[f].subs(x(t),u).subs(y(t),v))/num F1 = R1[f1]; F2 = R2[f2] G1 = R1[g1]; G2 = R2[g2] sol1r = solve(Integral(F2/F1, u).doit() - Integral(G1/G2,v).doit() - C1, u) sol2r = solve(Integral(F2/F1, u).doit() - Integral(G1/G2,v).doit() - C1, v) sol = [] for sols in sol1r: sol.append(Eq(y(t), dsolve(diff(V(t),t) - F2.subs(u,sols).subs(v,V(t))*G2.subs(v,V(t))*phi.subs(u,sols).subs(v,V(t))).rhs)) for sols in sol2r: sol.append(Eq(x(t), dsolve(diff(U(t),t) - F1.subs(u,U(t))*G1.subs(v,sols).subs(u,U(t))*phi.subs(v,sols).subs(u,U(t))).rhs)) return set(sol) def _nonlinear_2eq_order1_type5(func, t, eq): r""" Clairaut system of ODEs .. math:: x = t x' + F(x',y') .. math:: y = t y' + G(x',y') The following are solutions of the system `(i)` straight lines: .. math:: x = C_1 t + F(C_1, C_2), y = C_2 t + G(C_1, C_2) where `C_1` and `C_2` are arbitrary constants; `(ii)` envelopes of the above lines; `(iii)` continuously differentiable lines made up from segments of the lines `(i)` and `(ii)`. """ C1, C2 = get_numbered_constants(eq, num=2) f = Wild('f') g = Wild('g') def check_type(x, y): r1 = eq[0].match(t*diff(x(t),t) - x(t) + f) r2 = eq[1].match(t*diff(y(t),t) - y(t) + g) if not (r1 and r2): r1 = eq[0].match(diff(x(t),t) - x(t)/t + f/t) r2 = eq[1].match(diff(y(t),t) - y(t)/t + g/t) if not (r1 and r2): r1 = (-eq[0]).match(t*diff(x(t),t) - x(t) + f) r2 = (-eq[1]).match(t*diff(y(t),t) - y(t) + g) if not (r1 and r2): r1 = (-eq[0]).match(diff(x(t),t) - x(t)/t + f/t) r2 = (-eq[1]).match(diff(y(t),t) - y(t)/t + g/t) return [r1, r2] for func_ in func: if isinstance(func_, list): x = func[0][0].func y = func[0][1].func [r1, r2] = check_type(x, y) if not (r1 and r2): [r1, r2] = check_type(y, x) x, y = y, x x1 = diff(x(t),t); y1 = diff(y(t),t) return {Eq(x(t), C1*t + r1[f].subs(x1,C1).subs(y1,C2)), Eq(y(t), C2*t + r2[g].subs(x1,C1).subs(y1,C2))} def sysode_nonlinear_3eq_order1(match_): x = match_['func'][0].func y = match_['func'][1].func z = match_['func'][2].func eq = match_['eq'] t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] if match_['type_of_equation'] == 'type1': sol = _nonlinear_3eq_order1_type1(x, y, z, t, eq) if match_['type_of_equation'] == 'type2': sol = _nonlinear_3eq_order1_type2(x, y, z, t, eq) if match_['type_of_equation'] == 'type3': sol = _nonlinear_3eq_order1_type3(x, y, z, t, eq) if match_['type_of_equation'] == 'type4': sol = _nonlinear_3eq_order1_type4(x, y, z, t, eq) if match_['type_of_equation'] == 'type5': sol = _nonlinear_3eq_order1_type5(x, y, z, t, eq) return sol def _nonlinear_3eq_order1_type1(x, y, z, t, eq): r""" Equations: .. math:: a x' = (b - c) y z, \enspace b y' = (c - a) z x, \enspace c z' = (a - b) x y First Integrals: .. math:: a x^{2} + b y^{2} + c z^{2} = C_1 .. math:: a^{2} x^{2} + b^{2} y^{2} + c^{2} z^{2} = C_2 where `C_1` and `C_2` are arbitrary constants. On solving the integrals for `y` and `z` and on substituting the resulting expressions into the first equation of the system, we arrives at a separable first-order equation on `x`. Similarly doing that for other two equations, we will arrive at first order equation on `y` and `z` too. References ========== -http://eqworld.ipmnet.ru/en/solutions/sysode/sode0401.pdf """ C1, C2 = get_numbered_constants(eq, num=2) u, v, w = symbols('u, v, w') p = Wild('p', exclude=[x(t), y(t), z(t), t]) q = Wild('q', exclude=[x(t), y(t), z(t), t]) s = Wild('s', exclude=[x(t), y(t), z(t), t]) r = (diff(x(t),t) - eq[0]).match(p*y(t)*z(t)) r.update((diff(y(t),t) - eq[1]).match(q*z(t)*x(t))) r.update((diff(z(t),t) - eq[2]).match(s*x(t)*y(t))) n1, d1 = r[p].as_numer_denom() n2, d2 = r[q].as_numer_denom() n3, d3 = r[s].as_numer_denom() val = solve([n1*u-d1*v+d1*w, d2*u+n2*v-d2*w, d3*u-d3*v-n3*w],[u,v]) vals = [val[v], val[u]] c = lcm(vals[0].as_numer_denom()[1], vals[1].as_numer_denom()[1]) b = vals[0].subs(w, c) a = vals[1].subs(w, c) y_x = sqrt(((c*C1-C2) - a*(c-a)*x(t)**2)/(b*(c-b))) z_x = sqrt(((b*C1-C2) - a*(b-a)*x(t)**2)/(c*(b-c))) z_y = sqrt(((a*C1-C2) - b*(a-b)*y(t)**2)/(c*(a-c))) x_y = sqrt(((c*C1-C2) - b*(c-b)*y(t)**2)/(a*(c-a))) x_z = sqrt(((b*C1-C2) - c*(b-c)*z(t)**2)/(a*(b-a))) y_z = sqrt(((a*C1-C2) - c*(a-c)*z(t)**2)/(b*(a-b))) sol1 = dsolve(a*diff(x(t),t) - (b-c)*y_x*z_x) sol2 = dsolve(b*diff(y(t),t) - (c-a)*z_y*x_y) sol3 = dsolve(c*diff(z(t),t) - (a-b)*x_z*y_z) return [sol1, sol2, sol3] def _nonlinear_3eq_order1_type2(x, y, z, t, eq): r""" Equations: .. math:: a x' = (b - c) y z f(x, y, z, t) .. math:: b y' = (c - a) z x f(x, y, z, t) .. math:: c z' = (a - b) x y f(x, y, z, t) First Integrals: .. math:: a x^{2} + b y^{2} + c z^{2} = C_1 .. math:: a^{2} x^{2} + b^{2} y^{2} + c^{2} z^{2} = C_2 where `C_1` and `C_2` are arbitrary constants. On solving the integrals for `y` and `z` and on substituting the resulting expressions into the first equation of the system, we arrives at a first-order differential equations on `x`. Similarly doing that for other two equations we will arrive at first order equation on `y` and `z`. References ========== -http://eqworld.ipmnet.ru/en/solutions/sysode/sode0402.pdf """ C1, C2 = get_numbered_constants(eq, num=2) u, v, w = symbols('u, v, w') p = Wild('p', exclude=[x(t), y(t), z(t), t]) q = Wild('q', exclude=[x(t), y(t), z(t), t]) s = Wild('s', exclude=[x(t), y(t), z(t), t]) f = Wild('f') r1 = (diff(x(t),t) - eq[0]).match(y(t)*z(t)*f) r = collect_const(r1[f]).match(p*f) r.update(((diff(y(t),t) - eq[1])/r[f]).match(q*z(t)*x(t))) r.update(((diff(z(t),t) - eq[2])/r[f]).match(s*x(t)*y(t))) n1, d1 = r[p].as_numer_denom() n2, d2 = r[q].as_numer_denom() n3, d3 = r[s].as_numer_denom() val = solve([n1*u-d1*v+d1*w, d2*u+n2*v-d2*w, -d3*u+d3*v+n3*w],[u,v]) vals = [val[v], val[u]] c = lcm(vals[0].as_numer_denom()[1], vals[1].as_numer_denom()[1]) a = vals[0].subs(w, c) b = vals[1].subs(w, c) y_x = sqrt(((c*C1-C2) - a*(c-a)*x(t)**2)/(b*(c-b))) z_x = sqrt(((b*C1-C2) - a*(b-a)*x(t)**2)/(c*(b-c))) z_y = sqrt(((a*C1-C2) - b*(a-b)*y(t)**2)/(c*(a-c))) x_y = sqrt(((c*C1-C2) - b*(c-b)*y(t)**2)/(a*(c-a))) x_z = sqrt(((b*C1-C2) - c*(b-c)*z(t)**2)/(a*(b-a))) y_z = sqrt(((a*C1-C2) - c*(a-c)*z(t)**2)/(b*(a-b))) sol1 = dsolve(a*diff(x(t),t) - (b-c)*y_x*z_x*r[f]) sol2 = dsolve(b*diff(y(t),t) - (c-a)*z_y*x_y*r[f]) sol3 = dsolve(c*diff(z(t),t) - (a-b)*x_z*y_z*r[f]) return [sol1, sol2, sol3] def _nonlinear_3eq_order1_type3(x, y, z, t, eq): r""" Equations: .. math:: x' = c F_2 - b F_3, \enspace y' = a F_3 - c F_1, \enspace z' = b F_1 - a F_2 where `F_n = F_n(x, y, z, t)`. 1. First Integral: .. math:: a x + b y + c z = C_1, where C is an arbitrary constant. 2. If we assume function `F_n` to be independent of `t`,i.e, `F_n` = `F_n (x, y, z)` Then, on eliminating `t` and `z` from the first two equation of the system, one arrives at the first-order equation .. math:: \frac{dy}{dx} = \frac{a F_3 (x, y, z) - c F_1 (x, y, z)}{c F_2 (x, y, z) - b F_3 (x, y, z)} where `z = \frac{1}{c} (C_1 - a x - b y)` References ========== -http://eqworld.ipmnet.ru/en/solutions/sysode/sode0404.pdf """ C1 = get_numbered_constants(eq, num=1) u, v, w = symbols('u, v, w') p = Wild('p', exclude=[x(t), y(t), z(t), t]) q = Wild('q', exclude=[x(t), y(t), z(t), t]) s = Wild('s', exclude=[x(t), y(t), z(t), t]) F1, F2, F3 = symbols('F1, F2, F3', cls=Wild) r1 = (diff(x(t), t) - eq[0]).match(F2-F3) r = collect_const(r1[F2]).match(s*F2) r.update(collect_const(r1[F3]).match(q*F3)) if eq[1].has(r[F2]) and not eq[1].has(r[F3]): r[F2], r[F3] = r[F3], r[F2] r[s], r[q] = -r[q], -r[s] r.update((diff(y(t), t) - eq[1]).match(p*r[F3] - r[s]*F1)) a = r[p]; b = r[q]; c = r[s] F1 = r[F1].subs(x(t), u).subs(y(t),v).subs(z(t), w) F2 = r[F2].subs(x(t), u).subs(y(t),v).subs(z(t), w) F3 = r[F3].subs(x(t), u).subs(y(t),v).subs(z(t), w) z_xy = (C1-a*u-b*v)/c y_zx = (C1-a*u-c*w)/b x_yz = (C1-b*v-c*w)/a y_x = dsolve(diff(v(u),u) - ((a*F3-c*F1)/(c*F2-b*F3)).subs(w,z_xy).subs(v,v(u))).rhs z_x = dsolve(diff(w(u),u) - ((b*F1-a*F2)/(c*F2-b*F3)).subs(v,y_zx).subs(w,w(u))).rhs z_y = dsolve(diff(w(v),v) - ((b*F1-a*F2)/(a*F3-c*F1)).subs(u,x_yz).subs(w,w(v))).rhs x_y = dsolve(diff(u(v),v) - ((c*F2-b*F3)/(a*F3-c*F1)).subs(w,z_xy).subs(u,u(v))).rhs y_z = dsolve(diff(v(w),w) - ((a*F3-c*F1)/(b*F1-a*F2)).subs(u,x_yz).subs(v,v(w))).rhs x_z = dsolve(diff(u(w),w) - ((c*F2-b*F3)/(b*F1-a*F2)).subs(v,y_zx).subs(u,u(w))).rhs sol1 = dsolve(diff(u(t),t) - (c*F2 - b*F3).subs(v,y_x).subs(w,z_x).subs(u,u(t))).rhs sol2 = dsolve(diff(v(t),t) - (a*F3 - c*F1).subs(u,x_y).subs(w,z_y).subs(v,v(t))).rhs sol3 = dsolve(diff(w(t),t) - (b*F1 - a*F2).subs(u,x_z).subs(v,y_z).subs(w,w(t))).rhs return [sol1, sol2, sol3] def _nonlinear_3eq_order1_type4(x, y, z, t, eq): r""" Equations: .. math:: x' = c z F_2 - b y F_3, \enspace y' = a x F_3 - c z F_1, \enspace z' = b y F_1 - a x F_2 where `F_n = F_n (x, y, z, t)` 1. First integral: .. math:: a x^{2} + b y^{2} + c z^{2} = C_1 where `C` is an arbitrary constant. 2. Assuming the function `F_n` is independent of `t`: `F_n = F_n (x, y, z)`. Then on eliminating `t` and `z` from the first two equations of the system, one arrives at the first-order equation .. math:: \frac{dy}{dx} = \frac{a x F_3 (x, y, z) - c z F_1 (x, y, z)} {c z F_2 (x, y, z) - b y F_3 (x, y, z)} where `z = \pm \sqrt{\frac{1}{c} (C_1 - a x^{2} - b y^{2})}` References ========== -http://eqworld.ipmnet.ru/en/solutions/sysode/sode0405.pdf """ C1 = get_numbered_constants(eq, num=1) u, v, w = symbols('u, v, w') p = Wild('p', exclude=[x(t), y(t), z(t), t]) q = Wild('q', exclude=[x(t), y(t), z(t), t]) s = Wild('s', exclude=[x(t), y(t), z(t), t]) F1, F2, F3 = symbols('F1, F2, F3', cls=Wild) r1 = eq[0].match(diff(x(t),t) - z(t)*F2 + y(t)*F3) r = collect_const(r1[F2]).match(s*F2) r.update(collect_const(r1[F3]).match(q*F3)) if eq[1].has(r[F2]) and not eq[1].has(r[F3]): r[F2], r[F3] = r[F3], r[F2] r[s], r[q] = -r[q], -r[s] r.update((diff(y(t),t) - eq[1]).match(p*x(t)*r[F3] - r[s]*z(t)*F1)) a = r[p]; b = r[q]; c = r[s] F1 = r[F1].subs(x(t),u).subs(y(t),v).subs(z(t),w) F2 = r[F2].subs(x(t),u).subs(y(t),v).subs(z(t),w) F3 = r[F3].subs(x(t),u).subs(y(t),v).subs(z(t),w) x_yz = sqrt((C1 - b*v**2 - c*w**2)/a) y_zx = sqrt((C1 - c*w**2 - a*u**2)/b) z_xy = sqrt((C1 - a*u**2 - b*v**2)/c) y_x = dsolve(diff(v(u),u) - ((a*u*F3-c*w*F1)/(c*w*F2-b*v*F3)).subs(w,z_xy).subs(v,v(u))).rhs z_x = dsolve(diff(w(u),u) - ((b*v*F1-a*u*F2)/(c*w*F2-b*v*F3)).subs(v,y_zx).subs(w,w(u))).rhs z_y = dsolve(diff(w(v),v) - ((b*v*F1-a*u*F2)/(a*u*F3-c*w*F1)).subs(u,x_yz).subs(w,w(v))).rhs x_y = dsolve(diff(u(v),v) - ((c*w*F2-b*v*F3)/(a*u*F3-c*w*F1)).subs(w,z_xy).subs(u,u(v))).rhs y_z = dsolve(diff(v(w),w) - ((a*u*F3-c*w*F1)/(b*v*F1-a*u*F2)).subs(u,x_yz).subs(v,v(w))).rhs x_z = dsolve(diff(u(w),w) - ((c*w*F2-b*v*F3)/(b*v*F1-a*u*F2)).subs(v,y_zx).subs(u,u(w))).rhs sol1 = dsolve(diff(u(t),t) - (c*w*F2 - b*v*F3).subs(v,y_x).subs(w,z_x).subs(u,u(t))).rhs sol2 = dsolve(diff(v(t),t) - (a*u*F3 - c*w*F1).subs(u,x_y).subs(w,z_y).subs(v,v(t))).rhs sol3 = dsolve(diff(w(t),t) - (b*v*F1 - a*u*F2).subs(u,x_z).subs(v,y_z).subs(w,w(t))).rhs return [sol1, sol2, sol3] def _nonlinear_3eq_order1_type5(x, y, z, t, eq): r""" .. math:: x' = x (c F_2 - b F_3), \enspace y' = y (a F_3 - c F_1), \enspace z' = z (b F_1 - a F_2) where `F_n = F_n (x, y, z, t)` and are arbitrary functions. First Integral: .. math:: \left|x\right|^{a} \left|y\right|^{b} \left|z\right|^{c} = C_1 where `C` is an arbitrary constant. If the function `F_n` is independent of `t`, then, by eliminating `t` and `z` from the first two equations of the system, one arrives at a first-order equation. References ========== -http://eqworld.ipmnet.ru/en/solutions/sysode/sode0406.pdf """ C1 = get_numbered_constants(eq, num=1) u, v, w = symbols('u, v, w') p = Wild('p', exclude=[x(t), y(t), z(t), t]) q = Wild('q', exclude=[x(t), y(t), z(t), t]) s = Wild('s', exclude=[x(t), y(t), z(t), t]) F1, F2, F3 = symbols('F1, F2, F3', cls=Wild) r1 = eq[0].match(diff(x(t), t) - x(t)*(F2 - F3)) r = collect_const(r1[F2]).match(s*F2) r.update(collect_const(r1[F3]).match(q*F3)) if eq[1].has(r[F2]) and not eq[1].has(r[F3]): r[F2], r[F3] = r[F3], r[F2] r[s], r[q] = -r[q], -r[s] r.update((diff(y(t), t) - eq[1]).match(y(t)*(p*r[F3] - r[s]*F1))) a = r[p]; b = r[q]; c = r[s] F1 = r[F1].subs(x(t), u).subs(y(t), v).subs(z(t), w) F2 = r[F2].subs(x(t), u).subs(y(t), v).subs(z(t), w) F3 = r[F3].subs(x(t), u).subs(y(t), v).subs(z(t), w) x_yz = (C1*v**-b*w**-c)**-a y_zx = (C1*w**-c*u**-a)**-b z_xy = (C1*u**-a*v**-b)**-c y_x = dsolve(diff(v(u), u) - ((v*(a*F3 - c*F1))/(u*(c*F2 - b*F3))).subs(w, z_xy).subs(v, v(u))).rhs z_x = dsolve(diff(w(u), u) - ((w*(b*F1 - a*F2))/(u*(c*F2 - b*F3))).subs(v, y_zx).subs(w, w(u))).rhs z_y = dsolve(diff(w(v), v) - ((w*(b*F1 - a*F2))/(v*(a*F3 - c*F1))).subs(u, x_yz).subs(w, w(v))).rhs x_y = dsolve(diff(u(v), v) - ((u*(c*F2 - b*F3))/(v*(a*F3 - c*F1))).subs(w, z_xy).subs(u, u(v))).rhs y_z = dsolve(diff(v(w), w) - ((v*(a*F3 - c*F1))/(w*(b*F1 - a*F2))).subs(u, x_yz).subs(v, v(w))).rhs x_z = dsolve(diff(u(w), w) - ((u*(c*F2 - b*F3))/(w*(b*F1 - a*F2))).subs(v, y_zx).subs(u, u(w))).rhs sol1 = dsolve(diff(u(t), t) - (u*(c*F2 - b*F3)).subs(v, y_x).subs(w, z_x).subs(u, u(t))).rhs sol2 = dsolve(diff(v(t), t) - (v*(a*F3 - c*F1)).subs(u, x_y).subs(w, z_y).subs(v, v(t))).rhs sol3 = dsolve(diff(w(t), t) - (w*(b*F1 - a*F2)).subs(u, x_z).subs(v, y_z).subs(w, w(t))).rhs return [sol1, sol2, sol3]

571ba5d67f3bc76b5f145794678ba908c30ea0a9792af624aeb6eff5beb5d2fb

from __future__ import print_function, division from sympy.core.add import Add from sympy.core.compatibility import as_int, is_sequence, range from sympy.core.exprtools import factor_terms from sympy.core.function import _mexpand from sympy.core.mul import Mul from sympy.core.numbers import Rational from sympy.core.numbers import igcdex, ilcm, igcd from sympy.core.power import integer_nthroot, isqrt from sympy.core.relational import Eq from sympy.core.singleton import S from sympy.core.symbol import Symbol, symbols from sympy.functions.elementary.complexes import sign from sympy.functions.elementary.integers import floor from sympy.functions.elementary.miscellaneous import sqrt from sympy.matrices.dense import MutableDenseMatrix as Matrix from sympy.ntheory.factor_ import ( divisors, factorint, multiplicity, perfect_power) from sympy.ntheory.generate import nextprime from sympy.ntheory.primetest import is_square, isprime from sympy.ntheory.residue_ntheory import sqrt_mod from sympy.polys.polyerrors import GeneratorsNeeded from sympy.polys.polytools import Poly, factor_list from sympy.simplify.simplify import signsimp from sympy.solvers.solvers import check_assumptions from sympy.solvers.solveset import solveset_real from sympy.utilities import default_sort_key, numbered_symbols from sympy.utilities.misc import filldedent # these are imported with 'from sympy.solvers.diophantine import * __all__ = ['diophantine', 'classify_diop'] # these types are known (but not necessarily handled) diop_known = { "binary_quadratic", "cubic_thue", "general_pythagorean", "general_sum_of_even_powers", "general_sum_of_squares", "homogeneous_general_quadratic", "homogeneous_ternary_quadratic", "homogeneous_ternary_quadratic_normal", "inhomogeneous_general_quadratic", "inhomogeneous_ternary_quadratic", "linear", "univariate"} def _is_int(i): try: as_int(i) return True except ValueError: pass def _sorted_tuple(*i): return tuple(sorted(i)) def _remove_gcd(*x): try: g = igcd(*x) return tuple([i//g for i in x]) except ValueError: return x except TypeError: raise TypeError('_remove_gcd(a,b,c) or _remove_gcd(*container)') def _rational_pq(a, b): # return `(numer, denom)` for a/b; sign in numer and gcd removed return _remove_gcd(sign(b)*a, abs(b)) def _nint_or_floor(p, q): # return nearest int to p/q; in case of tie return floor(p/q) w, r = divmod(p, q) if abs(r) <= abs(q)//2: return w return w + 1 def _odd(i): return i % 2 != 0 def _even(i): return i % 2 == 0 def diophantine(eq, param=symbols("t", integer=True), syms=None, permute=False): """ Simplify the solution procedure of diophantine equation ``eq`` by converting it into a product of terms which should equal zero. For example, when solving, `x^2 - y^2 = 0` this is treated as `(x + y)(x - y) = 0` and `x + y = 0` and `x - y = 0` are solved independently and combined. Each term is solved by calling ``diop_solve()``. (Although it is possible to call ``diop_solve()`` directly, one must be careful to pass an equation in the correct form and to interpret the output correctly; ``diophantine()`` is the public-facing function to use in general.) Output of ``diophantine()`` is a set of tuples. The elements of the tuple are the solutions for each variable in the equation and are arranged according to the alphabetic ordering of the variables. e.g. For an equation with two variables, `a` and `b`, the first element of the tuple is the solution for `a` and the second for `b`. Usage ===== ``diophantine(eq, t, syms)``: Solve the diophantine equation ``eq``. ``t`` is the optional parameter to be used by ``diop_solve()``. ``syms`` is an optional list of symbols which determines the order of the elements in the returned tuple. By default, only the base solution is returned. If ``permute`` is set to True then permutations of the base solution and/or permutations of the signs of the values will be returned when applicable. >>> from sympy.solvers.diophantine import diophantine >>> from sympy.abc import a, b >>> eq = a**4 + b**4 - (2**4 + 3**4) >>> diophantine(eq) {(2, 3)} >>> diophantine(eq, permute=True) {(-3, -2), (-3, 2), (-2, -3), (-2, 3), (2, -3), (2, 3), (3, -2), (3, 2)} Details ======= ``eq`` should be an expression which is assumed to be zero. ``t`` is the parameter to be used in the solution. Examples ======== >>> from sympy.abc import x, y, z >>> diophantine(x**2 - y**2) {(t_0, -t_0), (t_0, t_0)} >>> diophantine(x*(2*x + 3*y - z)) {(0, n1, n2), (t_0, t_1, 2*t_0 + 3*t_1)} >>> diophantine(x**2 + 3*x*y + 4*x) {(0, n1), (3*t_0 - 4, -t_0)} See Also ======== diop_solve() sympy.utilities.iterables.permute_signs sympy.utilities.iterables.signed_permutations """ from sympy.utilities.iterables import ( subsets, permute_signs, signed_permutations) if isinstance(eq, Eq): eq = eq.lhs - eq.rhs try: var = list(eq.expand(force=True).free_symbols) var.sort(key=default_sort_key) if syms: if not is_sequence(syms): raise TypeError( 'syms should be given as a sequence, e.g. a list') syms = [i for i in syms if i in var] if syms != var: dict_sym_index = dict(zip(syms, range(len(syms)))) return {tuple([t[dict_sym_index[i]] for i in var]) for t in diophantine(eq, param)} n, d = eq.as_numer_denom() if n.is_number: return set() if not d.is_number: dsol = diophantine(d) good = diophantine(n) - dsol return {s for s in good if _mexpand(d.subs(zip(var, s)))} else: eq = n eq = factor_terms(eq) assert not eq.is_number eq = eq.as_independent(*var, as_Add=False)[1] p = Poly(eq) assert not any(g.is_number for g in p.gens) eq = p.as_expr() assert eq.is_polynomial() except (GeneratorsNeeded, AssertionError, AttributeError): raise TypeError(filldedent(''' Equation should be a polynomial with Rational coefficients.''')) # permute only sign do_permute_signs = False # permute sign and values do_permute_signs_var = False # permute few signs permute_few_signs = False try: # if we know that factoring should not be attempted, skip # the factoring step v, c, t = classify_diop(eq) # check for permute sign if permute: len_var = len(v) permute_signs_for = [ 'general_sum_of_squares', 'general_sum_of_even_powers'] permute_signs_check = [ 'homogeneous_ternary_quadratic', 'homogeneous_ternary_quadratic_normal', 'binary_quadratic'] if t in permute_signs_for: do_permute_signs_var = True elif t in permute_signs_check: # if all the variables in eq have even powers # then do_permute_sign = True if len_var == 3: var_mul = list(subsets(v, 2)) # here var_mul is like [(x, y), (x, z), (y, z)] xy_coeff = True x_coeff = True var1_mul_var2 = map(lambda a: a[0]*a[1], var_mul) # if coeff(y*z), coeff(y*x), coeff(x*z) is not 0 then # `xy_coeff` => True and do_permute_sign => False. # Means no permuted solution. for v1_mul_v2 in var1_mul_var2: try: coeff = c[v1_mul_v2] except KeyError: coeff = 0 xy_coeff = bool(xy_coeff) and bool(coeff) var_mul = list(subsets(v, 1)) # here var_mul is like [(x,), (y, )] for v1 in var_mul: try: coeff = c[v1[0]] except KeyError: coeff = 0 x_coeff = bool(x_coeff) and bool(coeff) if not any([xy_coeff, x_coeff]): # means only x**2, y**2, z**2, const is present do_permute_signs = True elif not x_coeff: permute_few_signs = True elif len_var == 2: var_mul = list(subsets(v, 2)) # here var_mul is like [(x, y)] xy_coeff = True x_coeff = True var1_mul_var2 = map(lambda x: x[0]*x[1], var_mul) for v1_mul_v2 in var1_mul_var2: try: coeff = c[v1_mul_v2] except KeyError: coeff = 0 xy_coeff = bool(xy_coeff) and bool(coeff) var_mul = list(subsets(v, 1)) # here var_mul is like [(x,), (y, )] for v1 in var_mul: try: coeff = c[v1[0]] except KeyError: coeff = 0 x_coeff = bool(x_coeff) and bool(coeff) if not any([xy_coeff, x_coeff]): # means only x**2, y**2 and const is present # so we can get more soln by permuting this soln. do_permute_signs = True elif not x_coeff: # when coeff(x), coeff(y) is not present then signs of # x, y can be permuted such that their sign are same # as sign of x*y. # e.g 1. (x_val,y_val)=> (x_val,y_val), (-x_val,-y_val) # 2. (-x_vall, y_val)=> (-x_val,y_val), (x_val,-y_val) permute_few_signs = True if t == 'general_sum_of_squares': # trying to factor such expressions will sometimes hang terms = [(eq, 1)] else: raise TypeError except (TypeError, NotImplementedError): terms = factor_list(eq)[1] sols = set([]) for term in terms: base, _ = term var_t, _, eq_type = classify_diop(base, _dict=False) _, base = signsimp(base, evaluate=False).as_coeff_Mul() solution = diop_solve(base, param) if eq_type in [ "linear", "homogeneous_ternary_quadratic", "homogeneous_ternary_quadratic_normal", "general_pythagorean"]: sols.add(merge_solution(var, var_t, solution)) elif eq_type in [ "binary_quadratic", "general_sum_of_squares", "general_sum_of_even_powers", "univariate"]: for sol in solution: sols.add(merge_solution(var, var_t, sol)) else: raise NotImplementedError('unhandled type: %s' % eq_type) # remove null merge results if () in sols: sols.remove(()) null = tuple([0]*len(var)) # if there is no solution, return trivial solution if not sols and eq.subs(zip(var, null)) is S.Zero: sols.add(null) final_soln = set([]) for sol in sols: if all(_is_int(s) for s in sol): if do_permute_signs: permuted_sign = set(permute_signs(sol)) final_soln.update(permuted_sign) elif permute_few_signs: lst = list(permute_signs(sol)) lst = list(filter(lambda x: x[0]*x[1] == sol[1]*sol[0], lst)) permuted_sign = set(lst) final_soln.update(permuted_sign) elif do_permute_signs_var: permuted_sign_var = set(signed_permutations(sol)) final_soln.update(permuted_sign_var) else: final_soln.add(sol) else: final_soln.add(sol) return final_soln def merge_solution(var, var_t, solution): """ This is used to construct the full solution from the solutions of sub equations. For example when solving the equation `(x - y)(x^2 + y^2 - z^2) = 0`, solutions for each of the equations `x - y = 0` and `x^2 + y^2 - z^2` are found independently. Solutions for `x - y = 0` are `(x, y) = (t, t)`. But we should introduce a value for z when we output the solution for the original equation. This function converts `(t, t)` into `(t, t, n_{1})` where `n_{1}` is an integer parameter. """ sol = [] if None in solution: return () solution = iter(solution) params = numbered_symbols("n", integer=True, start=1) for v in var: if v in var_t: sol.append(next(solution)) else: sol.append(next(params)) for val, symb in zip(sol, var): if check_assumptions(val, **symb.assumptions0) is False: return tuple() return tuple(sol) def diop_solve(eq, param=symbols("t", integer=True)): """ Solves the diophantine equation ``eq``. Unlike ``diophantine()``, factoring of ``eq`` is not attempted. Uses ``classify_diop()`` to determine the type of the equation and calls the appropriate solver function. Use of ``diophantine()`` is recommended over other helper functions. ``diop_solve()`` can return either a set or a tuple depending on the nature of the equation. Usage ===== ``diop_solve(eq, t)``: Solve diophantine equation, ``eq`` using ``t`` as a parameter if needed. Details ======= ``eq`` should be an expression which is assumed to be zero. ``t`` is a parameter to be used in the solution. Examples ======== >>> from sympy.solvers.diophantine import diop_solve >>> from sympy.abc import x, y, z, w >>> diop_solve(2*x + 3*y - 5) (3*t_0 - 5, 5 - 2*t_0) >>> diop_solve(4*x + 3*y - 4*z + 5) (t_0, 8*t_0 + 4*t_1 + 5, 7*t_0 + 3*t_1 + 5) >>> diop_solve(x + 3*y - 4*z + w - 6) (t_0, t_0 + t_1, 6*t_0 + 5*t_1 + 4*t_2 - 6, 5*t_0 + 4*t_1 + 3*t_2 - 6) >>> diop_solve(x**2 + y**2 - 5) {(-2, -1), (-2, 1), (-1, -2), (-1, 2), (1, -2), (1, 2), (2, -1), (2, 1)} See Also ======== diophantine() """ var, coeff, eq_type = classify_diop(eq, _dict=False) if eq_type == "linear": return _diop_linear(var, coeff, param) elif eq_type == "binary_quadratic": return _diop_quadratic(var, coeff, param) elif eq_type == "homogeneous_ternary_quadratic": x_0, y_0, z_0 = _diop_ternary_quadratic(var, coeff) return _parametrize_ternary_quadratic( (x_0, y_0, z_0), var, coeff) elif eq_type == "homogeneous_ternary_quadratic_normal": x_0, y_0, z_0 = _diop_ternary_quadratic_normal(var, coeff) return _parametrize_ternary_quadratic( (x_0, y_0, z_0), var, coeff) elif eq_type == "general_pythagorean": return _diop_general_pythagorean(var, coeff, param) elif eq_type == "univariate": return set([(int(i),) for i in solveset_real( eq, var[0]).intersect(S.Integers)]) elif eq_type == "general_sum_of_squares": return _diop_general_sum_of_squares(var, -int(coeff[1]), limit=S.Infinity) elif eq_type == "general_sum_of_even_powers": for k in coeff.keys(): if k.is_Pow and coeff[k]: p = k.exp return _diop_general_sum_of_even_powers(var, p, -int(coeff[1]), limit=S.Infinity) if eq_type is not None and eq_type not in diop_known: raise ValueError(filldedent(''' Alhough this type of equation was identified, it is not yet handled. It should, however, be listed in `diop_known` at the top of this file. Developers should see comments at the end of `classify_diop`. ''')) # pragma: no cover else: raise NotImplementedError( 'No solver has been written for %s.' % eq_type) def classify_diop(eq, _dict=True): # docstring supplied externally try: var = list(eq.free_symbols) assert var except (AttributeError, AssertionError): raise ValueError('equation should have 1 or more free symbols') var.sort(key=default_sort_key) eq = eq.expand(force=True) coeff = eq.as_coefficients_dict() if not all(_is_int(c) for c in coeff.values()): raise TypeError("Coefficients should be Integers") diop_type = None total_degree = Poly(eq).total_degree() homogeneous = 1 not in coeff if total_degree == 1: diop_type = "linear" elif len(var) == 1: diop_type = "univariate" elif total_degree == 2 and len(var) == 2: diop_type = "binary_quadratic" elif total_degree == 2 and len(var) == 3 and homogeneous: if set(coeff) & set(var): diop_type = "inhomogeneous_ternary_quadratic" else: nonzero = [k for k in coeff if coeff[k]] if len(nonzero) == 3 and all(i**2 in nonzero for i in var): diop_type = "homogeneous_ternary_quadratic_normal" else: diop_type = "homogeneous_ternary_quadratic" elif total_degree == 2 and len(var) >= 3: if set(coeff) & set(var): diop_type = "inhomogeneous_general_quadratic" else: # there may be Pow keys like x**2 or Mul keys like x*y if any(k.is_Mul for k in coeff): # cross terms if not homogeneous: diop_type = "inhomogeneous_general_quadratic" else: diop_type = "homogeneous_general_quadratic" else: # all squares: x**2 + y**2 + ... + constant if all(coeff[k] == 1 for k in coeff if k != 1): diop_type = "general_sum_of_squares" elif all(is_square(abs(coeff[k])) for k in coeff): if abs(sum(sign(coeff[k]) for k in coeff)) == \ len(var) - 2: # all but one has the same sign # e.g. 4*x**2 + y**2 - 4*z**2 diop_type = "general_pythagorean" elif total_degree == 3 and len(var) == 2: diop_type = "cubic_thue" elif (total_degree > 3 and total_degree % 2 == 0 and all(k.is_Pow and k.exp == total_degree for k in coeff if k != 1)): if all(coeff[k] == 1 for k in coeff if k != 1): diop_type = 'general_sum_of_even_powers' if diop_type is not None: return var, dict(coeff) if _dict else coeff, diop_type # new diop type instructions # -------------------------- # if this error raises and the equation *can* be classified, # * it should be identified in the if-block above # * the type should be added to the diop_known # if a solver can be written for it, # * a dedicated handler should be written (e.g. diop_linear) # * it should be passed to that handler in diop_solve raise NotImplementedError(filldedent(''' This equation is not yet recognized or else has not been simplified sufficiently to put it in a form recognized by diop_classify().''')) classify_diop.func_doc = ''' Helper routine used by diop_solve() to find information about ``eq``. Returns a tuple containing the type of the diophantine equation along with the variables (free symbols) and their coefficients. Variables are returned as a list and coefficients are returned as a dict with the key being the respective term and the constant term is keyed to 1. The type is one of the following: * %s Usage ===== ``classify_diop(eq)``: Return variables, coefficients and type of the ``eq``. Details ======= ``eq`` should be an expression which is assumed to be zero. ``_dict`` is for internal use: when True (default) a dict is returned, otherwise a defaultdict which supplies 0 for missing keys is returned. Examples ======== >>> from sympy.solvers.diophantine import classify_diop >>> from sympy.abc import x, y, z, w, t >>> classify_diop(4*x + 6*y - 4) ([x, y], {1: -4, x: 4, y: 6}, 'linear') >>> classify_diop(x + 3*y -4*z + 5) ([x, y, z], {1: 5, x: 1, y: 3, z: -4}, 'linear') >>> classify_diop(x**2 + y**2 - x*y + x + 5) ([x, y], {1: 5, x: 1, x**2: 1, y**2: 1, x*y: -1}, 'binary_quadratic') ''' % ('\n * '.join(sorted(diop_known))) def diop_linear(eq, param=symbols("t", integer=True)): """ Solves linear diophantine equations. A linear diophantine equation is an equation of the form `a_{1}x_{1} + a_{2}x_{2} + .. + a_{n}x_{n} = 0` where `a_{1}, a_{2}, ..a_{n}` are integer constants and `x_{1}, x_{2}, ..x_{n}` are integer variables. Usage ===== ``diop_linear(eq)``: Returns a tuple containing solutions to the diophantine equation ``eq``. Values in the tuple is arranged in the same order as the sorted variables. Details ======= ``eq`` is a linear diophantine equation which is assumed to be zero. ``param`` is the parameter to be used in the solution. Examples ======== >>> from sympy.solvers.diophantine import diop_linear >>> from sympy.abc import x, y, z, t >>> diop_linear(2*x - 3*y - 5) # solves equation 2*x - 3*y - 5 == 0 (3*t_0 - 5, 2*t_0 - 5) Here x = -3*t_0 - 5 and y = -2*t_0 - 5 >>> diop_linear(2*x - 3*y - 4*z -3) (t_0, 2*t_0 + 4*t_1 + 3, -t_0 - 3*t_1 - 3) See Also ======== diop_quadratic(), diop_ternary_quadratic(), diop_general_pythagorean(), diop_general_sum_of_squares() """ from sympy.core.function import count_ops var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "linear": return _diop_linear(var, coeff, param) def _diop_linear(var, coeff, param): """ Solves diophantine equations of the form: a_0*x_0 + a_1*x_1 + ... + a_n*x_n == c Note that no solution exists if gcd(a_0, ..., a_n) doesn't divide c. """ if 1 in coeff: # negate coeff[] because input is of the form: ax + by + c == 0 # but is used as: ax + by == -c c = -coeff[1] else: c = 0 # Some solutions will have multiple free variables in their solutions. if param is None: params = [symbols('t')]*len(var) else: temp = str(param) + "_%i" params = [symbols(temp % i, integer=True) for i in range(len(var))] if len(var) == 1: q, r = divmod(c, coeff[var[0]]) if not r: return (q,) else: return (None,) ''' base_solution_linear() can solve diophantine equations of the form: a*x + b*y == c We break down multivariate linear diophantine equations into a series of bivariate linear diophantine equations which can then be solved individually by base_solution_linear(). Consider the following: a_0*x_0 + a_1*x_1 + a_2*x_2 == c which can be re-written as: a_0*x_0 + g_0*y_0 == c where g_0 == gcd(a_1, a_2) and y == (a_1*x_1)/g_0 + (a_2*x_2)/g_0 This leaves us with two binary linear diophantine equations. For the first equation: a == a_0 b == g_0 c == c For the second: a == a_1/g_0 b == a_2/g_0 c == the solution we find for y_0 in the first equation. The arrays A and B are the arrays of integers used for 'a' and 'b' in each of the n-1 bivariate equations we solve. ''' A = [coeff[v] for v in var] B = [] if len(var) > 2: B.append(igcd(A[-2], A[-1])) A[-2] = A[-2] // B[0] A[-1] = A[-1] // B[0] for i in range(len(A) - 3, 0, -1): gcd = igcd(B[0], A[i]) B[0] = B[0] // gcd A[i] = A[i] // gcd B.insert(0, gcd) B.append(A[-1]) ''' Consider the trivariate linear equation: 4*x_0 + 6*x_1 + 3*x_2 == 2 This can be re-written as: 4*x_0 + 3*y_0 == 2 where y_0 == 2*x_1 + x_2 (Note that gcd(3, 6) == 3) The complete integral solution to this equation is: x_0 == 2 + 3*t_0 y_0 == -2 - 4*t_0 where 't_0' is any integer. Now that we have a solution for 'x_0', find 'x_1' and 'x_2': 2*x_1 + x_2 == -2 - 4*t_0 We can then solve for '-2' and '-4' independently, and combine the results: 2*x_1a + x_2a == -2 x_1a == 0 + t_0 x_2a == -2 - 2*t_0 2*x_1b + x_2b == -4*t_0 x_1b == 0*t_0 + t_1 x_2b == -4*t_0 - 2*t_1 ==> x_1 == t_0 + t_1 x_2 == -2 - 6*t_0 - 2*t_1 where 't_0' and 't_1' are any integers. Note that: 4*(2 + 3*t_0) + 6*(t_0 + t_1) + 3*(-2 - 6*t_0 - 2*t_1) == 2 for any integral values of 't_0', 't_1'; as required. This method is generalised for many variables, below. ''' solutions = [] for i in range(len(B)): tot_x, tot_y = [], [] for j, arg in enumerate(Add.make_args(c)): if arg.is_Integer: # example: 5 -> k = 5 k, p = arg, S.One pnew = params[0] else: # arg is a Mul or Symbol # example: 3*t_1 -> k = 3 # example: t_0 -> k = 1 k, p = arg.as_coeff_Mul() pnew = params[params.index(p) + 1] sol = sol_x, sol_y = base_solution_linear(k, A[i], B[i], pnew) if p is S.One: if None in sol: return tuple([None]*len(var)) else: # convert a + b*pnew -> a*p + b*pnew if isinstance(sol_x, Add): sol_x = sol_x.args[0]*p + sol_x.args[1] if isinstance(sol_y, Add): sol_y = sol_y.args[0]*p + sol_y.args[1] tot_x.append(sol_x) tot_y.append(sol_y) solutions.append(Add(*tot_x)) c = Add(*tot_y) solutions.append(c) if param is None: # just keep the additive constant (i.e. replace t with 0) solutions = [i.as_coeff_Add()[0] for i in solutions] return tuple(solutions) def base_solution_linear(c, a, b, t=None): """ Return the base solution for the linear equation, `ax + by = c`. Used by ``diop_linear()`` to find the base solution of a linear Diophantine equation. If ``t`` is given then the parametrized solution is returned. Usage ===== ``base_solution_linear(c, a, b, t)``: ``a``, ``b``, ``c`` are coefficients in `ax + by = c` and ``t`` is the parameter to be used in the solution. Examples ======== >>> from sympy.solvers.diophantine import base_solution_linear >>> from sympy.abc import t >>> base_solution_linear(5, 2, 3) # equation 2*x + 3*y = 5 (-5, 5) >>> base_solution_linear(0, 5, 7) # equation 5*x + 7*y = 0 (0, 0) >>> base_solution_linear(5, 2, 3, t) # equation 2*x + 3*y = 5 (3*t - 5, 5 - 2*t) >>> base_solution_linear(0, 5, 7, t) # equation 5*x + 7*y = 0 (7*t, -5*t) """ a, b, c = _remove_gcd(a, b, c) if c == 0: if t is not None: if b < 0: t = -t return (b*t , -a*t) else: return (0, 0) else: x0, y0, d = igcdex(abs(a), abs(b)) x0 *= sign(a) y0 *= sign(b) if divisible(c, d): if t is not None: if b < 0: t = -t return (c*x0 + b*t, c*y0 - a*t) else: return (c*x0, c*y0) else: return (None, None) def divisible(a, b): """ Returns `True` if ``a`` is divisible by ``b`` and `False` otherwise. """ return not a % b def diop_quadratic(eq, param=symbols("t", integer=True)): """ Solves quadratic diophantine equations. i.e. equations of the form `Ax^2 + Bxy + Cy^2 + Dx + Ey + F = 0`. Returns a set containing the tuples `(x, y)` which contains the solutions. If there are no solutions then `(None, None)` is returned. Usage ===== ``diop_quadratic(eq, param)``: ``eq`` is a quadratic binary diophantine equation. ``param`` is used to indicate the parameter to be used in the solution. Details ======= ``eq`` should be an expression which is assumed to be zero. ``param`` is a parameter to be used in the solution. Examples ======== >>> from sympy.abc import x, y, t >>> from sympy.solvers.diophantine import diop_quadratic >>> diop_quadratic(x**2 + y**2 + 2*x + 2*y + 2, t) {(-1, -1)} References ========== .. [1] Methods to solve Ax^2 + Bxy + Cy^2 + Dx + Ey + F = 0, [online], Available: http://www.alpertron.com.ar/METHODS.HTM .. [2] Solving the equation ax^2+ bxy + cy^2 + dx + ey + f= 0, [online], Available: http://www.jpr2718.org/ax2p.pdf See Also ======== diop_linear(), diop_ternary_quadratic(), diop_general_sum_of_squares(), diop_general_pythagorean() """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "binary_quadratic": return _diop_quadratic(var, coeff, param) def _diop_quadratic(var, coeff, t): x, y = var A = coeff[x**2] B = coeff[x*y] C = coeff[y**2] D = coeff[x] E = coeff[y] F = coeff[1] A, B, C, D, E, F = [as_int(i) for i in _remove_gcd(A, B, C, D, E, F)] # (1) Simple-Hyperbolic case: A = C = 0, B != 0 # In this case equation can be converted to (Bx + E)(By + D) = DE - BF # We consider two cases; DE - BF = 0 and DE - BF != 0 # More details, http://www.alpertron.com.ar/METHODS.HTM#SHyperb sol = set([]) discr = B**2 - 4*A*C if A == 0 and C == 0 and B != 0: if D*E - B*F == 0: q, r = divmod(E, B) if not r: sol.add((-q, t)) q, r = divmod(D, B) if not r: sol.add((t, -q)) else: div = divisors(D*E - B*F) div = div + [-term for term in div] for d in div: x0, r = divmod(d - E, B) if not r: q, r = divmod(D*E - B*F, d) if not r: y0, r = divmod(q - D, B) if not r: sol.add((x0, y0)) # (2) Parabolic case: B**2 - 4*A*C = 0 # There are two subcases to be considered in this case. # sqrt(c)D - sqrt(a)E = 0 and sqrt(c)D - sqrt(a)E != 0 # More Details, http://www.alpertron.com.ar/METHODS.HTM#Parabol elif discr == 0: if A == 0: s = _diop_quadratic([y, x], coeff, t) for soln in s: sol.add((soln[1], soln[0])) else: g = sign(A)*igcd(A, C) a = A // g b = B // g c = C // g e = sign(B/A) sqa = isqrt(a) sqc = isqrt(c) _c = e*sqc*D - sqa*E if not _c: z = symbols("z", real=True) eq = sqa*g*z**2 + D*z + sqa*F roots = solveset_real(eq, z).intersect(S.Integers) for root in roots: ans = diop_solve(sqa*x + e*sqc*y - root) sol.add((ans[0], ans[1])) elif _is_int(c): solve_x = lambda u: -e*sqc*g*_c*t**2 - (E + 2*e*sqc*g*u)*t\ - (e*sqc*g*u**2 + E*u + e*sqc*F) // _c solve_y = lambda u: sqa*g*_c*t**2 + (D + 2*sqa*g*u)*t \ + (sqa*g*u**2 + D*u + sqa*F) // _c for z0 in range(0, abs(_c)): # Check if the coefficients of y and x obtained are integers or not if (divisible(sqa*g*z0**2 + D*z0 + sqa*F, _c) and divisible(e*sqc**g*z0**2 + E*z0 + e*sqc*F, _c)): sol.add((solve_x(z0), solve_y(z0))) # (3) Method used when B**2 - 4*A*C is a square, is described in p. 6 of the below paper # by John P. Robertson. # http://www.jpr2718.org/ax2p.pdf elif is_square(discr): if A != 0: r = sqrt(discr) u, v = symbols("u, v", integer=True) eq = _mexpand( 4*A*r*u*v + 4*A*D*(B*v + r*u + r*v - B*u) + 2*A*4*A*E*(u - v) + 4*A*r*4*A*F) solution = diop_solve(eq, t) for s0, t0 in solution: num = B*t0 + r*s0 + r*t0 - B*s0 x_0 = S(num)/(4*A*r) y_0 = S(s0 - t0)/(2*r) if isinstance(s0, Symbol) or isinstance(t0, Symbol): if check_param(x_0, y_0, 4*A*r, t) != (None, None): ans = check_param(x_0, y_0, 4*A*r, t) sol.add((ans[0], ans[1])) elif x_0.is_Integer and y_0.is_Integer: if is_solution_quad(var, coeff, x_0, y_0): sol.add((x_0, y_0)) else: s = _diop_quadratic(var[::-1], coeff, t) # Interchange x and y while s: # | sol.add(s.pop()[::-1]) # and solution <--------+ # (4) B**2 - 4*A*C > 0 and B**2 - 4*A*C not a square or B**2 - 4*A*C < 0 else: P, Q = _transformation_to_DN(var, coeff) D, N = _find_DN(var, coeff) solns_pell = diop_DN(D, N) if D < 0: for x0, y0 in solns_pell: for x in [-x0, x0]: for y in [-y0, y0]: s = P*Matrix([x, y]) + Q try: sol.add(tuple([as_int(_) for _ in s])) except ValueError: pass else: # In this case equation can be transformed into a Pell equation solns_pell = set(solns_pell) for X, Y in list(solns_pell): solns_pell.add((-X, -Y)) a = diop_DN(D, 1) T = a[0][0] U = a[0][1] if all(_is_int(_) for _ in P[:4] + Q[:2]): for r, s in solns_pell: _a = (r + s*sqrt(D))*(T + U*sqrt(D))**t _b = (r - s*sqrt(D))*(T - U*sqrt(D))**t x_n = _mexpand(S(_a + _b)/2) y_n = _mexpand(S(_a - _b)/(2*sqrt(D))) s = P*Matrix([x_n, y_n]) + Q sol.add(tuple(s)) else: L = ilcm(*[_.q for _ in P[:4] + Q[:2]]) k = 1 T_k = T U_k = U while (T_k - 1) % L != 0 or U_k % L != 0: T_k, U_k = T_k*T + D*U_k*U, T_k*U + U_k*T k += 1 for X, Y in solns_pell: for i in range(k): if all(_is_int(_) for _ in P*Matrix([X, Y]) + Q): _a = (X + sqrt(D)*Y)*(T_k + sqrt(D)*U_k)**t _b = (X - sqrt(D)*Y)*(T_k - sqrt(D)*U_k)**t Xt = S(_a + _b)/2 Yt = S(_a - _b)/(2*sqrt(D)) s = P*Matrix([Xt, Yt]) + Q sol.add(tuple(s)) X, Y = X*T + D*U*Y, X*U + Y*T return sol def is_solution_quad(var, coeff, u, v): """ Check whether `(u, v)` is solution to the quadratic binary diophantine equation with the variable list ``var`` and coefficient dictionary ``coeff``. Not intended for use by normal users. """ reps = dict(zip(var, (u, v))) eq = Add(*[j*i.xreplace(reps) for i, j in coeff.items()]) return _mexpand(eq) == 0 def diop_DN(D, N, t=symbols("t", integer=True)): """ Solves the equation `x^2 - Dy^2 = N`. Mainly concerned with the case `D > 0, D` is not a perfect square, which is the same as the generalized Pell equation. The LMM algorithm [1]_ is used to solve this equation. Returns one solution tuple, (`x, y)` for each class of the solutions. Other solutions of the class can be constructed according to the values of ``D`` and ``N``. Usage ===== ``diop_DN(D, N, t)``: D and N are integers as in `x^2 - Dy^2 = N` and ``t`` is the parameter to be used in the solutions. Details ======= ``D`` and ``N`` correspond to D and N in the equation. ``t`` is the parameter to be used in the solutions. Examples ======== >>> from sympy.solvers.diophantine import diop_DN >>> diop_DN(13, -4) # Solves equation x**2 - 13*y**2 = -4 [(3, 1), (393, 109), (36, 10)] The output can be interpreted as follows: There are three fundamental solutions to the equation `x^2 - 13y^2 = -4` given by (3, 1), (393, 109) and (36, 10). Each tuple is in the form (x, y), i.e. solution (3, 1) means that `x = 3` and `y = 1`. >>> diop_DN(986, 1) # Solves equation x**2 - 986*y**2 = 1 [(49299, 1570)] See Also ======== find_DN(), diop_bf_DN() References ========== .. [1] Solving the generalized Pell equation x**2 - D*y**2 = N, John P. Robertson, July 31, 2004, Pages 16 - 17. [online], Available: http://www.jpr2718.org/pell.pdf """ if D < 0: if N == 0: return [(0, 0)] elif N < 0: return [] elif N > 0: sol = [] for d in divisors(square_factor(N)): sols = cornacchia(1, -D, N // d**2) if sols: for x, y in sols: sol.append((d*x, d*y)) if D == -1: sol.append((d*y, d*x)) return sol elif D == 0: if N < 0: return [] if N == 0: return [(0, t)] sN, _exact = integer_nthroot(N, 2) if _exact: return [(sN, t)] else: return [] else: # D > 0 sD, _exact = integer_nthroot(D, 2) if _exact: if N == 0: return [(sD*t, t)] else: sol = [] for y in range(floor(sign(N)*(N - 1)/(2*sD)) + 1): try: sq, _exact = integer_nthroot(D*y**2 + N, 2) except ValueError: _exact = False if _exact: sol.append((sq, y)) return sol elif 1 < N**2 < D: # It is much faster to call `_special_diop_DN`. return _special_diop_DN(D, N) else: if N == 0: return [(0, 0)] elif abs(N) == 1: pqa = PQa(0, 1, D) j = 0 G = [] B = [] for i in pqa: a = i[2] G.append(i[5]) B.append(i[4]) if j != 0 and a == 2*sD: break j = j + 1 if _odd(j): if N == -1: x = G[j - 1] y = B[j - 1] else: count = j while count < 2*j - 1: i = next(pqa) G.append(i[5]) B.append(i[4]) count += 1 x = G[count] y = B[count] else: if N == 1: x = G[j - 1] y = B[j - 1] else: return [] return [(x, y)] else: fs = [] sol = [] div = divisors(N) for d in div: if divisible(N, d**2): fs.append(d) for f in fs: m = N // f**2 zs = sqrt_mod(D, abs(m), all_roots=True) zs = [i for i in zs if i <= abs(m) // 2 ] if abs(m) != 2: zs = zs + [-i for i in zs if i] # omit dupl 0 for z in zs: pqa = PQa(z, abs(m), D) j = 0 G = [] B = [] for i in pqa: G.append(i[5]) B.append(i[4]) if j != 0 and abs(i[1]) == 1: r = G[j-1] s = B[j-1] if r**2 - D*s**2 == m: sol.append((f*r, f*s)) elif diop_DN(D, -1) != []: a = diop_DN(D, -1) sol.append((f*(r*a[0][0] + a[0][1]*s*D), f*(r*a[0][1] + s*a[0][0]))) break j = j + 1 if j == length(z, abs(m), D): break return sol def _special_diop_DN(D, N): """ Solves the equation `x^2 - Dy^2 = N` for the special case where `1 < N**2 < D` and `D` is not a perfect square. It is better to call `diop_DN` rather than this function, as the former checks the condition `1 < N**2 < D`, and calls the latter only if appropriate. Usage ===== WARNING: Internal method. Do not call directly! ``_special_diop_DN(D, N)``: D and N are integers as in `x^2 - Dy^2 = N`. Details ======= ``D`` and ``N`` correspond to D and N in the equation. Examples ======== >>> from sympy.solvers.diophantine import _special_diop_DN >>> _special_diop_DN(13, -3) # Solves equation x**2 - 13*y**2 = -3 [(7, 2), (137, 38)] The output can be interpreted as follows: There are two fundamental solutions to the equation `x^2 - 13y^2 = -3` given by (7, 2) and (137, 38). Each tuple is in the form (x, y), i.e. solution (7, 2) means that `x = 7` and `y = 2`. >>> _special_diop_DN(2445, -20) # Solves equation x**2 - 2445*y**2 = -20 [(445, 9), (17625560, 356454), (698095554475, 14118073569)] See Also ======== diop_DN() References ========== .. [1] Section 4.4.4 of the following book: Quadratic Diophantine Equations, T. Andreescu and D. Andrica, Springer, 2015. """ # The following assertion was removed for efficiency, with the understanding # that this method is not called directly. The parent method, `diop_DN` # is responsible for performing the appropriate checks. # # assert (1 < N**2 < D) and (not integer_nthroot(D, 2)[1]) sqrt_D = sqrt(D) F = [(N, 1)] f = 2 while True: f2 = f**2 if f2 > abs(N): break n, r = divmod(N, f2) if r == 0: F.append((n, f)) f += 1 P = 0 Q = 1 G0, G1 = 0, 1 B0, B1 = 1, 0 solutions = [] i = 0 while True: a = floor((P + sqrt_D) / Q) P = a*Q - P Q = (D - P**2) // Q G2 = a*G1 + G0 B2 = a*B1 + B0 for n, f in F: if G2**2 - D*B2**2 == n: solutions.append((f*G2, f*B2)) i += 1 if Q == 1 and i % 2 == 0: break G0, G1 = G1, G2 B0, B1 = B1, B2 return solutions def cornacchia(a, b, m): r""" Solves `ax^2 + by^2 = m` where `\gcd(a, b) = 1 = gcd(a, m)` and `a, b > 0`. Uses the algorithm due to Cornacchia. The method only finds primitive solutions, i.e. ones with `\gcd(x, y) = 1`. So this method can't be used to find the solutions of `x^2 + y^2 = 20` since the only solution to former is `(x, y) = (4, 2)` and it is not primitive. When `a = b`, only the solutions with `x \leq y` are found. For more details, see the References. Examples ======== >>> from sympy.solvers.diophantine import cornacchia >>> cornacchia(2, 3, 35) # equation 2x**2 + 3y**2 = 35 {(2, 3), (4, 1)} >>> cornacchia(1, 1, 25) # equation x**2 + y**2 = 25 {(4, 3)} References =========== .. [1] A. Nitaj, "L'algorithme de Cornacchia" .. [2] Solving the diophantine equation ax**2 + by**2 = m by Cornacchia's method, [online], Available: http://www.numbertheory.org/php/cornacchia.html See Also ======== sympy.utilities.iterables.signed_permutations """ sols = set() a1 = igcdex(a, m)[0] v = sqrt_mod(-b*a1, m, all_roots=True) if not v: return None for t in v: if t < m // 2: continue u, r = t, m while True: u, r = r, u % r if a*r**2 < m: break m1 = m - a*r**2 if m1 % b == 0: m1 = m1 // b s, _exact = integer_nthroot(m1, 2) if _exact: if a == b and r < s: r, s = s, r sols.add((int(r), int(s))) return sols def PQa(P_0, Q_0, D): r""" Returns useful information needed to solve the Pell equation. There are six sequences of integers defined related to the continued fraction representation of `\\frac{P + \sqrt{D}}{Q}`, namely {`P_{i}`}, {`Q_{i}`}, {`a_{i}`},{`A_{i}`}, {`B_{i}`}, {`G_{i}`}. ``PQa()`` Returns these values as a 6-tuple in the same order as mentioned above. Refer [1]_ for more detailed information. Usage ===== ``PQa(P_0, Q_0, D)``: ``P_0``, ``Q_0`` and ``D`` are integers corresponding to `P_{0}`, `Q_{0}` and `D` in the continued fraction `\\frac{P_{0} + \sqrt{D}}{Q_{0}}`. Also it's assumed that `P_{0}^2 == D mod(|Q_{0}|)` and `D` is square free. Examples ======== >>> from sympy.solvers.diophantine import PQa >>> pqa = PQa(13, 4, 5) # (13 + sqrt(5))/4 >>> next(pqa) # (P_0, Q_0, a_0, A_0, B_0, G_0) (13, 4, 3, 3, 1, -1) >>> next(pqa) # (P_1, Q_1, a_1, A_1, B_1, G_1) (-1, 1, 1, 4, 1, 3) References ========== .. [1] Solving the generalized Pell equation x^2 - Dy^2 = N, John P. Robertson, July 31, 2004, Pages 4 - 8. http://www.jpr2718.org/pell.pdf """ A_i_2 = B_i_1 = 0 A_i_1 = B_i_2 = 1 G_i_2 = -P_0 G_i_1 = Q_0 P_i = P_0 Q_i = Q_0 while True: a_i = floor((P_i + sqrt(D))/Q_i) A_i = a_i*A_i_1 + A_i_2 B_i = a_i*B_i_1 + B_i_2 G_i = a_i*G_i_1 + G_i_2 yield P_i, Q_i, a_i, A_i, B_i, G_i A_i_1, A_i_2 = A_i, A_i_1 B_i_1, B_i_2 = B_i, B_i_1 G_i_1, G_i_2 = G_i, G_i_1 P_i = a_i*Q_i - P_i Q_i = (D - P_i**2)/Q_i def diop_bf_DN(D, N, t=symbols("t", integer=True)): r""" Uses brute force to solve the equation, `x^2 - Dy^2 = N`. Mainly concerned with the generalized Pell equation which is the case when `D > 0, D` is not a perfect square. For more information on the case refer [1]_. Let `(t, u)` be the minimal positive solution of the equation `x^2 - Dy^2 = 1`. Then this method requires `\sqrt{\\frac{\mid N \mid (t \pm 1)}{2D}}` to be small. Usage ===== ``diop_bf_DN(D, N, t)``: ``D`` and ``N`` are coefficients in `x^2 - Dy^2 = N` and ``t`` is the parameter to be used in the solutions. Details ======= ``D`` and ``N`` correspond to D and N in the equation. ``t`` is the parameter to be used in the solutions. Examples ======== >>> from sympy.solvers.diophantine import diop_bf_DN >>> diop_bf_DN(13, -4) [(3, 1), (-3, 1), (36, 10)] >>> diop_bf_DN(986, 1) [(49299, 1570)] See Also ======== diop_DN() References ========== .. [1] Solving the generalized Pell equation x**2 - D*y**2 = N, John P. Robertson, July 31, 2004, Page 15. http://www.jpr2718.org/pell.pdf """ D = as_int(D) N = as_int(N) sol = [] a = diop_DN(D, 1) u = a[0][0] v = a[0][1] if abs(N) == 1: return diop_DN(D, N) elif N > 1: L1 = 0 L2 = integer_nthroot(int(N*(u - 1)/(2*D)), 2)[0] + 1 elif N < -1: L1, _exact = integer_nthroot(-int(N/D), 2) if not _exact: L1 += 1 L2 = integer_nthroot(-int(N*(u + 1)/(2*D)), 2)[0] + 1 else: # N = 0 if D < 0: return [(0, 0)] elif D == 0: return [(0, t)] else: sD, _exact = integer_nthroot(D, 2) if _exact: return [(sD*t, t), (-sD*t, t)] else: return [(0, 0)] for y in range(L1, L2): try: x, _exact = integer_nthroot(N + D*y**2, 2) except ValueError: _exact = False if _exact: sol.append((x, y)) if not equivalent(x, y, -x, y, D, N): sol.append((-x, y)) return sol def equivalent(u, v, r, s, D, N): """ Returns True if two solutions `(u, v)` and `(r, s)` of `x^2 - Dy^2 = N` belongs to the same equivalence class and False otherwise. Two solutions `(u, v)` and `(r, s)` to the above equation fall to the same equivalence class iff both `(ur - Dvs)` and `(us - vr)` are divisible by `N`. See reference [1]_. No test is performed to test whether `(u, v)` and `(r, s)` are actually solutions to the equation. User should take care of this. Usage ===== ``equivalent(u, v, r, s, D, N)``: `(u, v)` and `(r, s)` are two solutions of the equation `x^2 - Dy^2 = N` and all parameters involved are integers. Examples ======== >>> from sympy.solvers.diophantine import equivalent >>> equivalent(18, 5, -18, -5, 13, -1) True >>> equivalent(3, 1, -18, 393, 109, -4) False References ========== .. [1] Solving the generalized Pell equation x**2 - D*y**2 = N, John P. Robertson, July 31, 2004, Page 12. http://www.jpr2718.org/pell.pdf """ return divisible(u*r - D*v*s, N) and divisible(u*s - v*r, N) def length(P, Q, D): r""" Returns the (length of aperiodic part + length of periodic part) of continued fraction representation of `\\frac{P + \sqrt{D}}{Q}`. It is important to remember that this does NOT return the length of the periodic part but the sum of the lengths of the two parts as mentioned above. Usage ===== ``length(P, Q, D)``: ``P``, ``Q`` and ``D`` are integers corresponding to the continued fraction `\\frac{P + \sqrt{D}}{Q}`. Details ======= ``P``, ``D`` and ``Q`` corresponds to P, D and Q in the continued fraction, `\\frac{P + \sqrt{D}}{Q}`. Examples ======== >>> from sympy.solvers.diophantine import length >>> length(-2 , 4, 5) # (-2 + sqrt(5))/4 3 >>> length(-5, 4, 17) # (-5 + sqrt(17))/4 4 See Also ======== sympy.ntheory.continued_fraction.continued_fraction_periodic """ from sympy.ntheory.continued_fraction import continued_fraction_periodic v = continued_fraction_periodic(P, Q, D) if type(v[-1]) is list: rpt = len(v[-1]) nonrpt = len(v) - 1 else: rpt = 0 nonrpt = len(v) return rpt + nonrpt def transformation_to_DN(eq): """ This function transforms general quadratic, `ax^2 + bxy + cy^2 + dx + ey + f = 0` to more easy to deal with `X^2 - DY^2 = N` form. This is used to solve the general quadratic equation by transforming it to the latter form. Refer [1]_ for more detailed information on the transformation. This function returns a tuple (A, B) where A is a 2 X 2 matrix and B is a 2 X 1 matrix such that, Transpose([x y]) = A * Transpose([X Y]) + B Usage ===== ``transformation_to_DN(eq)``: where ``eq`` is the quadratic to be transformed. Examples ======== >>> from sympy.abc import x, y >>> from sympy.solvers.diophantine import transformation_to_DN >>> from sympy.solvers.diophantine import classify_diop >>> A, B = transformation_to_DN(x**2 - 3*x*y - y**2 - 2*y + 1) >>> A Matrix([ [1/26, 3/26], [ 0, 1/13]]) >>> B Matrix([ [-6/13], [-4/13]]) A, B returned are such that Transpose((x y)) = A * Transpose((X Y)) + B. Substituting these values for `x` and `y` and a bit of simplifying work will give an equation of the form `x^2 - Dy^2 = N`. >>> from sympy.abc import X, Y >>> from sympy import Matrix, simplify >>> u = (A*Matrix([X, Y]) + B)[0] # Transformation for x >>> u X/26 + 3*Y/26 - 6/13 >>> v = (A*Matrix([X, Y]) + B)[1] # Transformation for y >>> v Y/13 - 4/13 Next we will substitute these formulas for `x` and `y` and do ``simplify()``. >>> eq = simplify((x**2 - 3*x*y - y**2 - 2*y + 1).subs(zip((x, y), (u, v)))) >>> eq X**2/676 - Y**2/52 + 17/13 By multiplying the denominator appropriately, we can get a Pell equation in the standard form. >>> eq * 676 X**2 - 13*Y**2 + 884 If only the final equation is needed, ``find_DN()`` can be used. See Also ======== find_DN() References ========== .. [1] Solving the equation ax^2 + bxy + cy^2 + dx + ey + f = 0, John P.Robertson, May 8, 2003, Page 7 - 11. http://www.jpr2718.org/ax2p.pdf """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "binary_quadratic": return _transformation_to_DN(var, coeff) def _transformation_to_DN(var, coeff): x, y = var a = coeff[x**2] b = coeff[x*y] c = coeff[y**2] d = coeff[x] e = coeff[y] f = coeff[1] a, b, c, d, e, f = [as_int(i) for i in _remove_gcd(a, b, c, d, e, f)] X, Y = symbols("X, Y", integer=True) if b: B, C = _rational_pq(2*a, b) A, T = _rational_pq(a, B**2) # eq_1 = A*B*X**2 + B*(c*T - A*C**2)*Y**2 + d*T*X + (B*e*T - d*T*C)*Y + f*T*B coeff = {X**2: A*B, X*Y: 0, Y**2: B*(c*T - A*C**2), X: d*T, Y: B*e*T - d*T*C, 1: f*T*B} A_0, B_0 = _transformation_to_DN([X, Y], coeff) return Matrix(2, 2, [S(1)/B, -S(C)/B, 0, 1])*A_0, Matrix(2, 2, [S(1)/B, -S(C)/B, 0, 1])*B_0 else: if d: B, C = _rational_pq(2*a, d) A, T = _rational_pq(a, B**2) # eq_2 = A*X**2 + c*T*Y**2 + e*T*Y + f*T - A*C**2 coeff = {X**2: A, X*Y: 0, Y**2: c*T, X: 0, Y: e*T, 1: f*T - A*C**2} A_0, B_0 = _transformation_to_DN([X, Y], coeff) return Matrix(2, 2, [S(1)/B, 0, 0, 1])*A_0, Matrix(2, 2, [S(1)/B, 0, 0, 1])*B_0 + Matrix([-S(C)/B, 0]) else: if e: B, C = _rational_pq(2*c, e) A, T = _rational_pq(c, B**2) # eq_3 = a*T*X**2 + A*Y**2 + f*T - A*C**2 coeff = {X**2: a*T, X*Y: 0, Y**2: A, X: 0, Y: 0, 1: f*T - A*C**2} A_0, B_0 = _transformation_to_DN([X, Y], coeff) return Matrix(2, 2, [1, 0, 0, S(1)/B])*A_0, Matrix(2, 2, [1, 0, 0, S(1)/B])*B_0 + Matrix([0, -S(C)/B]) else: # TODO: pre-simplification: Not necessary but may simplify # the equation. return Matrix(2, 2, [S(1)/a, 0, 0, 1]), Matrix([0, 0]) def find_DN(eq): """ This function returns a tuple, `(D, N)` of the simplified form, `x^2 - Dy^2 = N`, corresponding to the general quadratic, `ax^2 + bxy + cy^2 + dx + ey + f = 0`. Solving the general quadratic is then equivalent to solving the equation `X^2 - DY^2 = N` and transforming the solutions by using the transformation matrices returned by ``transformation_to_DN()``. Usage ===== ``find_DN(eq)``: where ``eq`` is the quadratic to be transformed. Examples ======== >>> from sympy.abc import x, y >>> from sympy.solvers.diophantine import find_DN >>> find_DN(x**2 - 3*x*y - y**2 - 2*y + 1) (13, -884) Interpretation of the output is that we get `X^2 -13Y^2 = -884` after transforming `x^2 - 3xy - y^2 - 2y + 1` using the transformation returned by ``transformation_to_DN()``. See Also ======== transformation_to_DN() References ========== .. [1] Solving the equation ax^2 + bxy + cy^2 + dx + ey + f = 0, John P.Robertson, May 8, 2003, Page 7 - 11. http://www.jpr2718.org/ax2p.pdf """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "binary_quadratic": return _find_DN(var, coeff) def _find_DN(var, coeff): x, y = var X, Y = symbols("X, Y", integer=True) A, B = _transformation_to_DN(var, coeff) u = (A*Matrix([X, Y]) + B)[0] v = (A*Matrix([X, Y]) + B)[1] eq = x**2*coeff[x**2] + x*y*coeff[x*y] + y**2*coeff[y**2] + x*coeff[x] + y*coeff[y] + coeff[1] simplified = _mexpand(eq.subs(zip((x, y), (u, v)))) coeff = simplified.as_coefficients_dict() return -coeff[Y**2]/coeff[X**2], -coeff[1]/coeff[X**2] def check_param(x, y, a, t): """ If there is a number modulo ``a`` such that ``x`` and ``y`` are both integers, then return a parametric representation for ``x`` and ``y`` else return (None, None). Here ``x`` and ``y`` are functions of ``t``. """ from sympy.simplify.simplify import clear_coefficients if x.is_number and not x.is_Integer: return (None, None) if y.is_number and not y.is_Integer: return (None, None) m, n = symbols("m, n", integer=True) c, p = (m*x + n*y).as_content_primitive() if a % c.q: return (None, None) # clear_coefficients(mx + b, R)[1] -> (R - b)/m eq = clear_coefficients(x, m)[1] - clear_coefficients(y, n)[1] junk, eq = eq.as_content_primitive() return diop_solve(eq, t) def diop_ternary_quadratic(eq): """ Solves the general quadratic ternary form, `ax^2 + by^2 + cz^2 + fxy + gyz + hxz = 0`. Returns a tuple `(x, y, z)` which is a base solution for the above equation. If there are no solutions, `(None, None, None)` is returned. Usage ===== ``diop_ternary_quadratic(eq)``: Return a tuple containing a basic solution to ``eq``. Details ======= ``eq`` should be an homogeneous expression of degree two in three variables and it is assumed to be zero. Examples ======== >>> from sympy.abc import x, y, z >>> from sympy.solvers.diophantine import diop_ternary_quadratic >>> diop_ternary_quadratic(x**2 + 3*y**2 - z**2) (1, 0, 1) >>> diop_ternary_quadratic(4*x**2 + 5*y**2 - z**2) (1, 0, 2) >>> diop_ternary_quadratic(45*x**2 - 7*y**2 - 8*x*y - z**2) (28, 45, 105) >>> diop_ternary_quadratic(x**2 - 49*y**2 - z**2 + 13*z*y -8*x*y) (9, 1, 5) """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type in ( "homogeneous_ternary_quadratic", "homogeneous_ternary_quadratic_normal"): return _diop_ternary_quadratic(var, coeff) def _diop_ternary_quadratic(_var, coeff): x, y, z = _var var = [x, y, z] # Equations of the form B*x*y + C*z*x + E*y*z = 0 and At least two of the # coefficients A, B, C are non-zero. # There are infinitely many solutions for the equation. # Ex: (0, 0, t), (0, t, 0), (t, 0, 0) # Equation can be re-written as y*(B*x + E*z) = -C*x*z and we can find rather # unobvious solutions. Set y = -C and B*x + E*z = x*z. The latter can be solved by # using methods for binary quadratic diophantine equations. Let's select the # solution which minimizes |x| + |z| if not any(coeff[i**2] for i in var): if coeff[x*z]: sols = diophantine(coeff[x*y]*x + coeff[y*z]*z - x*z) s = sols.pop() min_sum = abs(s[0]) + abs(s[1]) for r in sols: m = abs(r[0]) + abs(r[1]) if m < min_sum: s = r min_sum = m x_0, y_0, z_0 = s[0], -coeff[x*z], s[1] else: var[0], var[1] = _var[1], _var[0] y_0, x_0, z_0 = _diop_ternary_quadratic(var, coeff) return _remove_gcd(x_0, y_0, z_0) if coeff[x**2] == 0: # If the coefficient of x is zero change the variables if coeff[y**2] == 0: var[0], var[2] = _var[2], _var[0] z_0, y_0, x_0 = _diop_ternary_quadratic(var, coeff) else: var[0], var[1] = _var[1], _var[0] y_0, x_0, z_0 = _diop_ternary_quadratic(var, coeff) else: if coeff[x*y] or coeff[x*z]: # Apply the transformation x --> X - (B*y + C*z)/(2*A) A = coeff[x**2] B = coeff[x*y] C = coeff[x*z] D = coeff[y**2] E = coeff[y*z] F = coeff[z**2] _coeff = dict() _coeff[x**2] = 4*A**2 _coeff[y**2] = 4*A*D - B**2 _coeff[z**2] = 4*A*F - C**2 _coeff[y*z] = 4*A*E - 2*B*C _coeff[x*y] = 0 _coeff[x*z] = 0 x_0, y_0, z_0 = _diop_ternary_quadratic(var, _coeff) if x_0 is None: return (None, None, None) p, q = _rational_pq(B*y_0 + C*z_0, 2*A) x_0, y_0, z_0 = x_0*q - p, y_0*q, z_0*q elif coeff[z*y] != 0: if coeff[y**2] == 0: if coeff[z**2] == 0: # Equations of the form A*x**2 + E*yz = 0. A = coeff[x**2] E = coeff[y*z] b, a = _rational_pq(-E, A) x_0, y_0, z_0 = b, a, b else: # Ax**2 + E*y*z + F*z**2 = 0 var[0], var[2] = _var[2], _var[0] z_0, y_0, x_0 = _diop_ternary_quadratic(var, coeff) else: # A*x**2 + D*y**2 + E*y*z + F*z**2 = 0, C may be zero var[0], var[1] = _var[1], _var[0] y_0, x_0, z_0 = _diop_ternary_quadratic(var, coeff) else: # Ax**2 + D*y**2 + F*z**2 = 0, C may be zero x_0, y_0, z_0 = _diop_ternary_quadratic_normal(var, coeff) return _remove_gcd(x_0, y_0, z_0) def transformation_to_normal(eq): """ Returns the transformation Matrix that converts a general ternary quadratic equation `eq` (`ax^2 + by^2 + cz^2 + dxy + eyz + fxz`) to a form without cross terms: `ax^2 + by^2 + cz^2 = 0`. This is not used in solving ternary quadratics; it is only implemented for the sake of completeness. """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type in ( "homogeneous_ternary_quadratic", "homogeneous_ternary_quadratic_normal"): return _transformation_to_normal(var, coeff) def _transformation_to_normal(var, coeff): _var = list(var) # copy x, y, z = var if not any(coeff[i**2] for i in var): # https://math.stackexchange.com/questions/448051/transform-quadratic-ternary-form-to-normal-form/448065#448065 a = coeff[x*y] b = coeff[y*z] c = coeff[x*z] swap = False if not a: # b can't be 0 or else there aren't 3 vars swap = True a, b = b, a T = Matrix(((1, 1, -b/a), (1, -1, -c/a), (0, 0, 1))) if swap: T.row_swap(0, 1) T.col_swap(0, 1) return T if coeff[x**2] == 0: # If the coefficient of x is zero change the variables if coeff[y**2] == 0: _var[0], _var[2] = var[2], var[0] T = _transformation_to_normal(_var, coeff) T.row_swap(0, 2) T.col_swap(0, 2) return T else: _var[0], _var[1] = var[1], var[0] T = _transformation_to_normal(_var, coeff) T.row_swap(0, 1) T.col_swap(0, 1) return T # Apply the transformation x --> X - (B*Y + C*Z)/(2*A) if coeff[x*y] != 0 or coeff[x*z] != 0: A = coeff[x**2] B = coeff[x*y] C = coeff[x*z] D = coeff[y**2] E = coeff[y*z] F = coeff[z**2] _coeff = dict() _coeff[x**2] = 4*A**2 _coeff[y**2] = 4*A*D - B**2 _coeff[z**2] = 4*A*F - C**2 _coeff[y*z] = 4*A*E - 2*B*C _coeff[x*y] = 0 _coeff[x*z] = 0 T_0 = _transformation_to_normal(_var, _coeff) return Matrix(3, 3, [1, S(-B)/(2*A), S(-C)/(2*A), 0, 1, 0, 0, 0, 1])*T_0 elif coeff[y*z] != 0: if coeff[y**2] == 0: if coeff[z**2] == 0: # Equations of the form A*x**2 + E*yz = 0. # Apply transformation y -> Y + Z ans z -> Y - Z return Matrix(3, 3, [1, 0, 0, 0, 1, 1, 0, 1, -1]) else: # Ax**2 + E*y*z + F*z**2 = 0 _var[0], _var[2] = var[2], var[0] T = _transformation_to_normal(_var, coeff) T.row_swap(0, 2) T.col_swap(0, 2) return T else: # A*x**2 + D*y**2 + E*y*z + F*z**2 = 0, F may be zero _var[0], _var[1] = var[1], var[0] T = _transformation_to_normal(_var, coeff) T.row_swap(0, 1) T.col_swap(0, 1) return T else: return Matrix.eye(3) def parametrize_ternary_quadratic(eq): """ Returns the parametrized general solution for the ternary quadratic equation ``eq`` which has the form `ax^2 + by^2 + cz^2 + fxy + gyz + hxz = 0`. Examples ======== >>> from sympy.abc import x, y, z >>> from sympy.solvers.diophantine import parametrize_ternary_quadratic >>> parametrize_ternary_quadratic(x**2 + y**2 - z**2) (2*p*q, p**2 - q**2, p**2 + q**2) Here `p` and `q` are two co-prime integers. >>> parametrize_ternary_quadratic(3*x**2 + 2*y**2 - z**2 - 2*x*y + 5*y*z - 7*y*z) (2*p**2 - 2*p*q - q**2, 2*p**2 + 2*p*q - q**2, 2*p**2 - 2*p*q + 3*q**2) >>> parametrize_ternary_quadratic(124*x**2 - 30*y**2 - 7729*z**2) (-1410*p**2 - 363263*q**2, 2700*p**2 + 30916*p*q - 695610*q**2, -60*p**2 + 5400*p*q + 15458*q**2) References ========== .. [1] The algorithmic resolution of Diophantine equations, Nigel P. Smart, London Mathematical Society Student Texts 41, Cambridge University Press, Cambridge, 1998. """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type in ( "homogeneous_ternary_quadratic", "homogeneous_ternary_quadratic_normal"): x_0, y_0, z_0 = _diop_ternary_quadratic(var, coeff) return _parametrize_ternary_quadratic( (x_0, y_0, z_0), var, coeff) def _parametrize_ternary_quadratic(solution, _var, coeff): # called for a*x**2 + b*y**2 + c*z**2 + d*x*y + e*y*z + f*x*z = 0 assert 1 not in coeff x_0, y_0, z_0 = solution v = list(_var) # copy if x_0 is None: return (None, None, None) if solution.count(0) >= 2: # if there are 2 zeros the equation reduces # to k*X**2 == 0 where X is x, y, or z so X must # be zero, too. So there is only the trivial # solution. return (None, None, None) if x_0 == 0: v[0], v[1] = v[1], v[0] y_p, x_p, z_p = _parametrize_ternary_quadratic( (y_0, x_0, z_0), v, coeff) return x_p, y_p, z_p x, y, z = v r, p, q = symbols("r, p, q", integer=True) eq = sum(k*v for k, v in coeff.items()) eq_1 = _mexpand(eq.subs(zip( (x, y, z), (r*x_0, r*y_0 + p, r*z_0 + q)))) A, B = eq_1.as_independent(r, as_Add=True) x = A*x_0 y = (A*y_0 - _mexpand(B/r*p)) z = (A*z_0 - _mexpand(B/r*q)) return x, y, z def diop_ternary_quadratic_normal(eq): """ Solves the quadratic ternary diophantine equation, `ax^2 + by^2 + cz^2 = 0`. Here the coefficients `a`, `b`, and `c` should be non zero. Otherwise the equation will be a quadratic binary or univariate equation. If solvable, returns a tuple `(x, y, z)` that satisfies the given equation. If the equation does not have integer solutions, `(None, None, None)` is returned. Usage ===== ``diop_ternary_quadratic_normal(eq)``: where ``eq`` is an equation of the form `ax^2 + by^2 + cz^2 = 0`. Examples ======== >>> from sympy.abc import x, y, z >>> from sympy.solvers.diophantine import diop_ternary_quadratic_normal >>> diop_ternary_quadratic_normal(x**2 + 3*y**2 - z**2) (1, 0, 1) >>> diop_ternary_quadratic_normal(4*x**2 + 5*y**2 - z**2) (1, 0, 2) >>> diop_ternary_quadratic_normal(34*x**2 - 3*y**2 - 301*z**2) (4, 9, 1) """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "homogeneous_ternary_quadratic_normal": return _diop_ternary_quadratic_normal(var, coeff) def _diop_ternary_quadratic_normal(var, coeff): x, y, z = var a = coeff[x**2] b = coeff[y**2] c = coeff[z**2] try: assert len([k for k in coeff if coeff[k]]) == 3 assert all(coeff[i**2] for i in var) except AssertionError: raise ValueError(filldedent(''' coeff dict is not consistent with assumption of this routine: coefficients should be those of an expression in the form a*x**2 + b*y**2 + c*z**2 where a*b*c != 0.''')) (sqf_of_a, sqf_of_b, sqf_of_c), (a_1, b_1, c_1), (a_2, b_2, c_2) = \ sqf_normal(a, b, c, steps=True) A = -a_2*c_2 B = -b_2*c_2 # If following two conditions are satisfied then there are no solutions if A < 0 and B < 0: return (None, None, None) if ( sqrt_mod(-b_2*c_2, a_2) is None or sqrt_mod(-c_2*a_2, b_2) is None or sqrt_mod(-a_2*b_2, c_2) is None): return (None, None, None) z_0, x_0, y_0 = descent(A, B) z_0, q = _rational_pq(z_0, abs(c_2)) x_0 *= q y_0 *= q x_0, y_0, z_0 = _remove_gcd(x_0, y_0, z_0) # Holzer reduction if sign(a) == sign(b): x_0, y_0, z_0 = holzer(x_0, y_0, z_0, abs(a_2), abs(b_2), abs(c_2)) elif sign(a) == sign(c): x_0, z_0, y_0 = holzer(x_0, z_0, y_0, abs(a_2), abs(c_2), abs(b_2)) else: y_0, z_0, x_0 = holzer(y_0, z_0, x_0, abs(b_2), abs(c_2), abs(a_2)) x_0 = reconstruct(b_1, c_1, x_0) y_0 = reconstruct(a_1, c_1, y_0) z_0 = reconstruct(a_1, b_1, z_0) sq_lcm = ilcm(sqf_of_a, sqf_of_b, sqf_of_c) x_0 = abs(x_0*sq_lcm//sqf_of_a) y_0 = abs(y_0*sq_lcm//sqf_of_b) z_0 = abs(z_0*sq_lcm//sqf_of_c) return _remove_gcd(x_0, y_0, z_0) def sqf_normal(a, b, c, steps=False): """ Return `a', b', c'`, the coefficients of the square-free normal form of `ax^2 + by^2 + cz^2 = 0`, where `a', b', c'` are pairwise prime. If `steps` is True then also return three tuples: `sq`, `sqf`, and `(a', b', c')` where `sq` contains the square factors of `a`, `b` and `c` after removing the `gcd(a, b, c)`; `sqf` contains the values of `a`, `b` and `c` after removing both the `gcd(a, b, c)` and the square factors. The solutions for `ax^2 + by^2 + cz^2 = 0` can be recovered from the solutions of `a'x^2 + b'y^2 + c'z^2 = 0`. Examples ======== >>> from sympy.solvers.diophantine import sqf_normal >>> sqf_normal(2 * 3**2 * 5, 2 * 5 * 11, 2 * 7**2 * 11) (11, 1, 5) >>> sqf_normal(2 * 3**2 * 5, 2 * 5 * 11, 2 * 7**2 * 11, True) ((3, 1, 7), (5, 55, 11), (11, 1, 5)) References ========== .. [1] Legendre's Theorem, Legrange's Descent, http://public.csusm.edu/aitken_html/notes/legendre.pdf See Also ======== reconstruct() """ ABC = _remove_gcd(a, b, c) sq = tuple(square_factor(i) for i in ABC) sqf = A, B, C = tuple([i//j**2 for i,j in zip(ABC, sq)]) pc = igcd(A, B) A /= pc B /= pc pa = igcd(B, C) B /= pa C /= pa pb = igcd(A, C) A /= pb B /= pb A *= pa B *= pb C *= pc if steps: return (sq, sqf, (A, B, C)) else: return A, B, C def square_factor(a): r""" Returns an integer `c` s.t. `a = c^2k, \ c,k \in Z`. Here `k` is square free. `a` can be given as an integer or a dictionary of factors. Examples ======== >>> from sympy.solvers.diophantine import square_factor >>> square_factor(24) 2 >>> square_factor(-36*3) 6 >>> square_factor(1) 1 >>> square_factor({3: 2, 2: 1, -1: 1}) # -18 3 See Also ======== sympy.ntheory.factor_.core """ f = a if isinstance(a, dict) else factorint(a) return Mul(*[p**(e//2) for p, e in f.items()]) def reconstruct(A, B, z): """ Reconstruct the `z` value of an equivalent solution of `ax^2 + by^2 + cz^2` from the `z` value of a solution of the square-free normal form of the equation, `a'*x^2 + b'*y^2 + c'*z^2`, where `a'`, `b'` and `c'` are square free and `gcd(a', b', c') == 1`. """ f = factorint(igcd(A, B)) for p, e in f.items(): if e != 1: raise ValueError('a and b should be square-free') z *= p return z def ldescent(A, B): """ Return a non-trivial solution to `w^2 = Ax^2 + By^2` using Lagrange's method; return None if there is no such solution. . Here, `A \\neq 0` and `B \\neq 0` and `A` and `B` are square free. Output a tuple `(w_0, x_0, y_0)` which is a solution to the above equation. Examples ======== >>> from sympy.solvers.diophantine import ldescent >>> ldescent(1, 1) # w^2 = x^2 + y^2 (1, 1, 0) >>> ldescent(4, -7) # w^2 = 4x^2 - 7y^2 (2, -1, 0) This means that `x = -1, y = 0` and `w = 2` is a solution to the equation `w^2 = 4x^2 - 7y^2` >>> ldescent(5, -1) # w^2 = 5x^2 - y^2 (2, 1, -1) References ========== .. [1] The algorithmic resolution of Diophantine equations, Nigel P. Smart, London Mathematical Society Student Texts 41, Cambridge University Press, Cambridge, 1998. .. [2] Efficient Solution of Rational Conices, J. E. Cremona and D. Rusin, [online], Available: http://eprints.nottingham.ac.uk/60/1/kvxefz87.pdf """ if abs(A) > abs(B): w, y, x = ldescent(B, A) return w, x, y if A == 1: return (1, 1, 0) if B == 1: return (1, 0, 1) if B == -1: # and A == -1 return r = sqrt_mod(A, B) Q = (r**2 - A) // B if Q == 0: B_0 = 1 d = 0 else: div = divisors(Q) B_0 = None for i in div: sQ, _exact = integer_nthroot(abs(Q) // i, 2) if _exact: B_0, d = sign(Q)*i, sQ break if B_0 is not None: W, X, Y = ldescent(A, B_0) return _remove_gcd((-A*X + r*W), (r*X - W), Y*(B_0*d)) def descent(A, B): """ Returns a non-trivial solution, (x, y, z), to `x^2 = Ay^2 + Bz^2` using Lagrange's descent method with lattice-reduction. `A` and `B` are assumed to be valid for such a solution to exist. This is faster than the normal Lagrange's descent algorithm because the Gaussian reduction is used. Examples ======== >>> from sympy.solvers.diophantine import descent >>> descent(3, 1) # x**2 = 3*y**2 + z**2 (1, 0, 1) `(x, y, z) = (1, 0, 1)` is a solution to the above equation. >>> descent(41, -113) (-16, -3, 1) References ========== .. [1] Efficient Solution of Rational Conices, J. E. Cremona and D. Rusin, Mathematics of Computation, Volume 00, Number 0. """ if abs(A) > abs(B): x, y, z = descent(B, A) return x, z, y if B == 1: return (1, 0, 1) if A == 1: return (1, 1, 0) if B == -A: return (0, 1, 1) if B == A: x, z, y = descent(-1, A) return (A*y, z, x) w = sqrt_mod(A, B) x_0, z_0 = gaussian_reduce(w, A, B) t = (x_0**2 - A*z_0**2) // B t_2 = square_factor(t) t_1 = t // t_2**2 x_1, z_1, y_1 = descent(A, t_1) return _remove_gcd(x_0*x_1 + A*z_0*z_1, z_0*x_1 + x_0*z_1, t_1*t_2*y_1) def gaussian_reduce(w, a, b): r""" Returns a reduced solution `(x, z)` to the congruence `X^2 - aZ^2 \equiv 0 \ (mod \ b)` so that `x^2 + |a|z^2` is minimal. Details ======= Here ``w`` is a solution of the congruence `x^2 \equiv a \ (mod \ b)` References ========== .. [1] Gaussian lattice Reduction [online]. Available: http://home.ie.cuhk.edu.hk/~wkshum/wordpress/?p=404 .. [2] Efficient Solution of Rational Conices, J. E. Cremona and D. Rusin, Mathematics of Computation, Volume 00, Number 0. """ u = (0, 1) v = (1, 0) if dot(u, v, w, a, b) < 0: v = (-v[0], -v[1]) if norm(u, w, a, b) < norm(v, w, a, b): u, v = v, u while norm(u, w, a, b) > norm(v, w, a, b): k = dot(u, v, w, a, b) // dot(v, v, w, a, b) u, v = v, (u[0]- k*v[0], u[1]- k*v[1]) u, v = v, u if dot(u, v, w, a, b) < dot(v, v, w, a, b)/2 or norm((u[0]-v[0], u[1]-v[1]), w, a, b) > norm(v, w, a, b): c = v else: c = (u[0] - v[0], u[1] - v[1]) return c[0]*w + b*c[1], c[0] def dot(u, v, w, a, b): r""" Returns a special dot product of the vectors `u = (u_{1}, u_{2})` and `v = (v_{1}, v_{2})` which is defined in order to reduce solution of the congruence equation `X^2 - aZ^2 \equiv 0 \ (mod \ b)`. """ u_1, u_2 = u v_1, v_2 = v return (w*u_1 + b*u_2)*(w*v_1 + b*v_2) + abs(a)*u_1*v_1 def norm(u, w, a, b): r""" Returns the norm of the vector `u = (u_{1}, u_{2})` under the dot product defined by `u \cdot v = (wu_{1} + bu_{2})(w*v_{1} + bv_{2}) + |a|*u_{1}*v_{1}` where `u = (u_{1}, u_{2})` and `v = (v_{1}, v_{2})`. """ u_1, u_2 = u return sqrt(dot((u_1, u_2), (u_1, u_2), w, a, b)) def holzer(x, y, z, a, b, c): r""" Simplify the solution `(x, y, z)` of the equation `ax^2 + by^2 = cz^2` with `a, b, c > 0` and `z^2 \geq \mid ab \mid` to a new reduced solution `(x', y', z')` such that `z'^2 \leq \mid ab \mid`. The algorithm is an interpretation of Mordell's reduction as described on page 8 of Cremona and Rusin's paper [1]_ and the work of Mordell in reference [2]_. References ========== .. [1] Efficient Solution of Rational Conices, J. E. Cremona and D. Rusin, Mathematics of Computation, Volume 00, Number 0. .. [2] Diophantine Equations, L. J. Mordell, page 48. """ if _odd(c): k = 2*c else: k = c//2 small = a*b*c step = 0 while True: t1, t2, t3 = a*x**2, b*y**2, c*z**2 # check that it's a solution if t1 + t2 != t3: if step == 0: raise ValueError('bad starting solution') break x_0, y_0, z_0 = x, y, z if max(t1, t2, t3) <= small: # Holzer condition break uv = u, v = base_solution_linear(k, y_0, -x_0) if None in uv: break p, q = -(a*u*x_0 + b*v*y_0), c*z_0 r = Rational(p, q) if _even(c): w = _nint_or_floor(p, q) assert abs(w - r) <= S.Half else: w = p//q # floor if _odd(a*u + b*v + c*w): w += 1 assert abs(w - r) <= S.One A = (a*u**2 + b*v**2 + c*w**2) B = (a*u*x_0 + b*v*y_0 + c*w*z_0) x = Rational(x_0*A - 2*u*B, k) y = Rational(y_0*A - 2*v*B, k) z = Rational(z_0*A - 2*w*B, k) assert all(i.is_Integer for i in (x, y, z)) step += 1 return tuple([int(i) for i in (x_0, y_0, z_0)]) def diop_general_pythagorean(eq, param=symbols("m", integer=True)): """ Solves the general pythagorean equation, `a_{1}^2x_{1}^2 + a_{2}^2x_{2}^2 + . . . + a_{n}^2x_{n}^2 - a_{n + 1}^2x_{n + 1}^2 = 0`. Returns a tuple which contains a parametrized solution to the equation, sorted in the same order as the input variables. Usage ===== ``diop_general_pythagorean(eq, param)``: where ``eq`` is a general pythagorean equation which is assumed to be zero and ``param`` is the base parameter used to construct other parameters by subscripting. Examples ======== >>> from sympy.solvers.diophantine import diop_general_pythagorean >>> from sympy.abc import a, b, c, d, e >>> diop_general_pythagorean(a**2 + b**2 + c**2 - d**2) (m1**2 + m2**2 - m3**2, 2*m1*m3, 2*m2*m3, m1**2 + m2**2 + m3**2) >>> diop_general_pythagorean(9*a**2 - 4*b**2 + 16*c**2 + 25*d**2 + e**2) (10*m1**2 + 10*m2**2 + 10*m3**2 - 10*m4**2, 15*m1**2 + 15*m2**2 + 15*m3**2 + 15*m4**2, 15*m1*m4, 12*m2*m4, 60*m3*m4) """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "general_pythagorean": return _diop_general_pythagorean(var, coeff, param) def _diop_general_pythagorean(var, coeff, t): if sign(coeff[var[0]**2]) + sign(coeff[var[1]**2]) + sign(coeff[var[2]**2]) < 0: for key in coeff.keys(): coeff[key] = -coeff[key] n = len(var) index = 0 for i, v in enumerate(var): if sign(coeff[v**2]) == -1: index = i m = symbols('%s1:%i' % (t, n), integer=True) ith = sum(m_i**2 for m_i in m) L = [ith - 2*m[n - 2]**2] L.extend([2*m[i]*m[n-2] for i in range(n - 2)]) sol = L[:index] + [ith] + L[index:] lcm = 1 for i, v in enumerate(var): if i == index or (index > 0 and i == 0) or (index == 0 and i == 1): lcm = ilcm(lcm, sqrt(abs(coeff[v**2]))) else: s = sqrt(coeff[v**2]) lcm = ilcm(lcm, s if _odd(s) else s//2) for i, v in enumerate(var): sol[i] = (lcm*sol[i]) / sqrt(abs(coeff[v**2])) return tuple(sol) def diop_general_sum_of_squares(eq, limit=1): r""" Solves the equation `x_{1}^2 + x_{2}^2 + . . . + x_{n}^2 - k = 0`. Returns at most ``limit`` number of solutions. Usage ===== ``general_sum_of_squares(eq, limit)`` : Here ``eq`` is an expression which is assumed to be zero. Also, ``eq`` should be in the form, `x_{1}^2 + x_{2}^2 + . . . + x_{n}^2 - k = 0`. Details ======= When `n = 3` if `k = 4^a(8m + 7)` for some `a, m \in Z` then there will be no solutions. Refer [1]_ for more details. Examples ======== >>> from sympy.solvers.diophantine import diop_general_sum_of_squares >>> from sympy.abc import a, b, c, d, e, f >>> diop_general_sum_of_squares(a**2 + b**2 + c**2 + d**2 + e**2 - 2345) {(15, 22, 22, 24, 24)} Reference ========= .. [1] Representing an integer as a sum of three squares, [online], Available: http://www.proofwiki.org/wiki/Integer_as_Sum_of_Three_Squares """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "general_sum_of_squares": return _diop_general_sum_of_squares(var, -coeff[1], limit) def _diop_general_sum_of_squares(var, k, limit=1): # solves Eq(sum(i**2 for i in var), k) n = len(var) if n < 3: raise ValueError('n must be greater than 2') s = set() if k < 0 or limit < 1: return s sign = [-1 if x.is_nonpositive else 1 for x in var] negs = sign.count(-1) != 0 took = 0 for t in sum_of_squares(k, n, zeros=True): if negs: s.add(tuple([sign[i]*j for i, j in enumerate(t)])) else: s.add(t) took += 1 if took == limit: break return s def diop_general_sum_of_even_powers(eq, limit=1): """ Solves the equation `x_{1}^e + x_{2}^e + . . . + x_{n}^e - k = 0` where `e` is an even, integer power. Returns at most ``limit`` number of solutions. Usage ===== ``general_sum_of_even_powers(eq, limit)`` : Here ``eq`` is an expression which is assumed to be zero. Also, ``eq`` should be in the form, `x_{1}^e + x_{2}^e + . . . + x_{n}^e - k = 0`. Examples ======== >>> from sympy.solvers.diophantine import diop_general_sum_of_even_powers >>> from sympy.abc import a, b >>> diop_general_sum_of_even_powers(a**4 + b**4 - (2**4 + 3**4)) {(2, 3)} See Also ======== power_representation() """ var, coeff, diop_type = classify_diop(eq, _dict=False) if diop_type == "general_sum_of_even_powers": for k in coeff.keys(): if k.is_Pow and coeff[k]: p = k.exp return _diop_general_sum_of_even_powers(var, p, -coeff[1], limit) def _diop_general_sum_of_even_powers(var, p, n, limit=1): # solves Eq(sum(i**2 for i in var), n) k = len(var) s = set() if n < 0 or limit < 1: return s sign = [-1 if x.is_nonpositive else 1 for x in var] negs = sign.count(-1) != 0 took = 0 for t in power_representation(n, p, k): if negs: s.add(tuple([sign[i]*j for i, j in enumerate(t)])) else: s.add(t) took += 1 if took == limit: break return s ## Functions below this comment can be more suitably grouped under ## an Additive number theory module rather than the Diophantine ## equation module. def partition(n, k=None, zeros=False): """ Returns a generator that can be used to generate partitions of an integer `n`. A partition of `n` is a set of positive integers which add up to `n`. For example, partitions of 3 are 3, 1 + 2, 1 + 1 + 1. A partition is returned as a tuple. If ``k`` equals None, then all possible partitions are returned irrespective of their size, otherwise only the partitions of size ``k`` are returned. If the ``zero`` parameter is set to True then a suitable number of zeros are added at the end of every partition of size less than ``k``. ``zero`` parameter is considered only if ``k`` is not None. When the partitions are over, the last `next()` call throws the ``StopIteration`` exception, so this function should always be used inside a try - except block. Details ======= ``partition(n, k)``: Here ``n`` is a positive integer and ``k`` is the size of the partition which is also positive integer. Examples ======== >>> from sympy.solvers.diophantine import partition >>> f = partition(5) >>> next(f) (1, 1, 1, 1, 1) >>> next(f) (1, 1, 1, 2) >>> g = partition(5, 3) >>> next(g) (1, 1, 3) >>> next(g) (1, 2, 2) >>> g = partition(5, 3, zeros=True) >>> next(g) (0, 0, 5) """ from sympy.utilities.iterables import ordered_partitions if not zeros or k is None: for i in ordered_partitions(n, k): yield tuple(i) else: for m in range(1, k + 1): for i in ordered_partitions(n, m): i = tuple(i) yield (0,)*(k - len(i)) + i def prime_as_sum_of_two_squares(p): """ Represent a prime `p` as a unique sum of two squares; this can only be done if the prime is congruent to 1 mod 4. Examples ======== >>> from sympy.solvers.diophantine import prime_as_sum_of_two_squares >>> prime_as_sum_of_two_squares(7) # can't be done >>> prime_as_sum_of_two_squares(5) (1, 2) Reference ========= .. [1] Representing a number as a sum of four squares, [online], Available: http://schorn.ch/lagrange.html See Also ======== sum_of_squares() """ if not p % 4 == 1: return if p % 8 == 5: b = 2 else: b = 3 while pow(b, (p - 1) // 2, p) == 1: b = nextprime(b) b = pow(b, (p - 1) // 4, p) a = p while b**2 > p: a, b = b, a % b return (int(a % b), int(b)) # convert from long def sum_of_three_squares(n): r""" Returns a 3-tuple `(a, b, c)` such that `a^2 + b^2 + c^2 = n` and `a, b, c \geq 0`. Returns None if `n = 4^a(8m + 7)` for some `a, m \in Z`. See [1]_ for more details. Usage ===== ``sum_of_three_squares(n)``: Here ``n`` is a non-negative integer. Examples ======== >>> from sympy.solvers.diophantine import sum_of_three_squares >>> sum_of_three_squares(44542) (18, 37, 207) References ========== .. [1] Representing a number as a sum of three squares, [online], Available: http://schorn.ch/lagrange.html See Also ======== sum_of_squares() """ special = {1:(1, 0, 0), 2:(1, 1, 0), 3:(1, 1, 1), 10: (1, 3, 0), 34: (3, 3, 4), 58:(3, 7, 0), 85:(6, 7, 0), 130:(3, 11, 0), 214:(3, 6, 13), 226:(8, 9, 9), 370:(8, 9, 15), 526:(6, 7, 21), 706:(15, 15, 16), 730:(1, 27, 0), 1414:(6, 17, 33), 1906:(13, 21, 36), 2986: (21, 32, 39), 9634: (56, 57, 57)} v = 0 if n == 0: return (0, 0, 0) v = multiplicity(4, n) n //= 4**v if n % 8 == 7: return if n in special.keys(): x, y, z = special[n] return _sorted_tuple(2**v*x, 2**v*y, 2**v*z) s, _exact = integer_nthroot(n, 2) if _exact: return (2**v*s, 0, 0) x = None if n % 8 == 3: s = s if _odd(s) else s - 1 for x in range(s, -1, -2): N = (n - x**2) // 2 if isprime(N): y, z = prime_as_sum_of_two_squares(N) return _sorted_tuple(2**v*x, 2**v*(y + z), 2**v*abs(y - z)) return if n % 8 == 2 or n % 8 == 6: s = s if _odd(s) else s - 1 else: s = s - 1 if _odd(s) else s for x in range(s, -1, -2): N = n - x**2 if isprime(N): y, z = prime_as_sum_of_two_squares(N) return _sorted_tuple(2**v*x, 2**v*y, 2**v*z) def sum_of_four_squares(n): r""" Returns a 4-tuple `(a, b, c, d)` such that `a^2 + b^2 + c^2 + d^2 = n`. Here `a, b, c, d \geq 0`. Usage ===== ``sum_of_four_squares(n)``: Here ``n`` is a non-negative integer. Examples ======== >>> from sympy.solvers.diophantine import sum_of_four_squares >>> sum_of_four_squares(3456) (8, 8, 32, 48) >>> sum_of_four_squares(1294585930293) (0, 1234, 2161, 1137796) References ========== .. [1] Representing a number as a sum of four squares, [online], Available: http://schorn.ch/lagrange.html See Also ======== sum_of_squares() """ if n == 0: return (0, 0, 0, 0) v = multiplicity(4, n) n //= 4**v if n % 8 == 7: d = 2 n = n - 4 elif n % 8 == 6 or n % 8 == 2: d = 1 n = n - 1 else: d = 0 x, y, z = sum_of_three_squares(n) return _sorted_tuple(2**v*d, 2**v*x, 2**v*y, 2**v*z) def power_representation(n, p, k, zeros=False): """ Returns a generator for finding k-tuples of integers, `(n_{1}, n_{2}, . . . n_{k})`, such that `n = n_{1}^p + n_{2}^p + . . . n_{k}^p`. Usage ===== ``power_representation(n, p, k, zeros)``: Represent non-negative number ``n`` as a sum of ``k`` ``p``th powers. If ``zeros`` is true, then the solutions is allowed to contain zeros. Examples ======== >>> from sympy.solvers.diophantine import power_representation Represent 1729 as a sum of two cubes: >>> f = power_representation(1729, 3, 2) >>> next(f) (9, 10) >>> next(f) (1, 12) If the flag `zeros` is True, the solution may contain tuples with zeros; any such solutions will be generated after the solutions without zeros: >>> list(power_representation(125, 2, 3, zeros=True)) [(5, 6, 8), (3, 4, 10), (0, 5, 10), (0, 2, 11)] For even `p` the `permute_sign` function can be used to get all signed values: >>> from sympy.utilities.iterables import permute_signs >>> list(permute_signs((1, 12))) [(1, 12), (-1, 12), (1, -12), (-1, -12)] All possible signed permutations can also be obtained: >>> from sympy.utilities.iterables import signed_permutations >>> list(signed_permutations((1, 12))) [(1, 12), (-1, 12), (1, -12), (-1, -12), (12, 1), (-12, 1), (12, -1), (-12, -1)] """ n, p, k = [as_int(i) for i in (n, p, k)] if n < 0: if p % 2: for t in power_representation(-n, p, k, zeros): yield tuple(-i for i in t) return if p < 1 or k < 1: raise ValueError(filldedent(''' Expecting positive integers for `(p, k)`, but got `(%s, %s)`''' % (p, k))) if n == 0: if zeros: yield (0,)*k return if k == 1: if p == 1: yield (n,) else: be = perfect_power(n) if be: b, e = be d, r = divmod(e, p) if not r: yield (b**d,) return if p == 1: for t in partition(n, k, zeros=zeros): yield t return if p == 2: feasible = _can_do_sum_of_squares(n, k) if not feasible: return if not zeros and n > 33 and k >= 5 and k <= n and n - k in ( 13, 10, 7, 5, 4, 2, 1): '''Todd G. Will, "When Is n^2 a Sum of k Squares?", [online]. Available: https://www.maa.org/sites/default/files/Will-MMz-201037918.pdf''' return if feasible is not True: # it's prime and k == 2 yield prime_as_sum_of_two_squares(n) return if k == 2 and p > 2: be = perfect_power(n) if be and be[1] % p == 0: return # Fermat: a**n + b**n = c**n has no solution for n > 2 if n >= k: a = integer_nthroot(n - (k - 1), p)[0] for t in pow_rep_recursive(a, k, n, [], p): yield tuple(reversed(t)) if zeros: a = integer_nthroot(n, p)[0] for i in range(1, k): for t in pow_rep_recursive(a, i, n, [], p): yield tuple(reversed(t + (0,) * (k - i))) sum_of_powers = power_representation def pow_rep_recursive(n_i, k, n_remaining, terms, p): if k == 0 and n_remaining == 0: yield tuple(terms) else: if n_i >= 1 and k > 0: for t in pow_rep_recursive(n_i - 1, k, n_remaining, terms, p): yield t residual = n_remaining - pow(n_i, p) if residual >= 0: for t in pow_rep_recursive(n_i, k - 1, residual, terms + [n_i], p): yield t def sum_of_squares(n, k, zeros=False): """Return a generator that yields the k-tuples of nonnegative values, the squares of which sum to n. If zeros is False (default) then the solution will not contain zeros. The nonnegative elements of a tuple are sorted. * If k == 1 and n is square, (n,) is returned. * If k == 2 then n can only be written as a sum of squares if every prime in the factorization of n that has the form 4*k + 3 has an even multiplicity. If n is prime then it can only be written as a sum of two squares if it is in the form 4*k + 1. * if k == 3 then n can be written as a sum of squares if it does not have the form 4**m*(8*k + 7). * all integers can be written as the sum of 4 squares. * if k > 4 then n can be partitioned and each partition can be written as a sum of 4 squares; if n is not evenly divisible by 4 then n can be written as a sum of squares only if the an additional partition can be written as sum of squares. For example, if k = 6 then n is partitioned into two parts, the first being written as a sum of 4 squares and the second being written as a sum of 2 squares -- which can only be done if the condition above for k = 2 can be met, so this will automatically reject certain partitions of n. Examples ======== >>> from sympy.solvers.diophantine import sum_of_squares >>> list(sum_of_squares(25, 2)) [(3, 4)] >>> list(sum_of_squares(25, 2, True)) [(3, 4), (0, 5)] >>> list(sum_of_squares(25, 4)) [(1, 2, 2, 4)] See Also ======== sympy.utilities.iterables.signed_permutations """ for t in power_representation(n, 2, k, zeros): yield t def _can_do_sum_of_squares(n, k): """Return True if n can be written as the sum of k squares, False if it can't, or 1 if k == 2 and n is prime (in which case it *can* be written as a sum of two squares). A False is returned only if it can't be written as k-squares, even if 0s are allowed. """ if k < 1: return False if n < 0: return False if n == 0: return True if k == 1: return is_square(n) if k == 2: if n in (1, 2): return True if isprime(n): if n % 4 == 1: return 1 # signal that it was prime return False else: f = factorint(n) for p, m in f.items(): # we can proceed iff no prime factor in the form 4*k + 3 # has an odd multiplicity if (p % 4 == 3) and m % 2: return False return True if k == 3: if (n//4**multiplicity(4, n)) % 8 == 7: return False # every number can be written as a sum of 4 squares; for k > 4 partitions # can be 0 return True

ca4841fbd70c9c13d35d507188a6cd465cc2a838dc23588e2820d298cd7dc464

""" This module contain solvers for all kinds of equations: - algebraic or transcendental, use solve() - recurrence, use rsolve() - differential, use dsolve() - nonlinear (numerically), use nsolve() (you will need a good starting point) """ from __future__ import print_function, division from sympy import divisors from sympy.core.compatibility import (iterable, is_sequence, ordered, default_sort_key, range) from sympy.core.sympify import sympify from sympy.core import (S, Add, Symbol, Equality, Dummy, Expr, Mul, Pow, Unequality) from sympy.core.exprtools import factor_terms from sympy.core.function import (expand_mul, expand_log, Derivative, AppliedUndef, UndefinedFunction, nfloat, Function, expand_power_exp, Lambda, _mexpand, expand) from sympy.integrals.integrals import Integral from sympy.core.numbers import ilcm, Float, Rational from sympy.core.relational import Relational, Ge from sympy.core.logic import fuzzy_not, fuzzy_and from sympy.core.power import integer_log from sympy.logic.boolalg import And, Or, BooleanAtom from sympy.core.basic import preorder_traversal from sympy.functions import (log, exp, LambertW, cos, sin, tan, acos, asin, atan, Abs, re, im, arg, sqrt, atan2) from sympy.functions.elementary.trigonometric import (TrigonometricFunction, HyperbolicFunction) from sympy.simplify import (simplify, collect, powsimp, posify, powdenest, nsimplify, denom, logcombine, sqrtdenest, fraction) from sympy.simplify.sqrtdenest import sqrt_depth from sympy.simplify.fu import TR1 from sympy.matrices import Matrix, zeros from sympy.polys import roots, cancel, factor, Poly, degree from sympy.polys.polyerrors import GeneratorsNeeded, PolynomialError from sympy.functions.elementary.piecewise import piecewise_fold, Piecewise from sympy.utilities.lambdify import lambdify from sympy.utilities.misc import filldedent from sympy.utilities.iterables import uniq, generate_bell, flatten from sympy.utilities.decorator import conserve_mpmath_dps from mpmath import findroot from sympy.solvers.polysys import solve_poly_system from sympy.solvers.inequalities import reduce_inequalities from types import GeneratorType from collections import defaultdict import warnings def recast_to_symbols(eqs, symbols): """Return (e, s, d) where e and s are versions of eqs and symbols in which any non-Symbol objects in symbols have been replaced with generic Dummy symbols and d is a dictionary that can be used to restore the original expressions. Examples ======== >>> from sympy.solvers.solvers import recast_to_symbols >>> from sympy import symbols, Function >>> x, y = symbols('x y') >>> fx = Function('f')(x) >>> eqs, syms = [fx + 1, x, y], [fx, y] >>> e, s, d = recast_to_symbols(eqs, syms); (e, s, d) ([_X0 + 1, x, y], [_X0, y], {_X0: f(x)}) The original equations and symbols can be restored using d: >>> assert [i.xreplace(d) for i in eqs] == eqs >>> assert [d.get(i, i) for i in s] == syms """ if not iterable(eqs) and iterable(symbols): raise ValueError('Both eqs and symbols must be iterable') new_symbols = list(symbols) swap_sym = {} for i, s in enumerate(symbols): if not isinstance(s, Symbol) and s not in swap_sym: swap_sym[s] = Dummy('X%d' % i) new_symbols[i] = swap_sym[s] new_f = [] for i in eqs: isubs = getattr(i, 'subs', None) if isubs is not None: new_f.append(isubs(swap_sym)) else: new_f.append(i) swap_sym = {v: k for k, v in swap_sym.items()} return new_f, new_symbols, swap_sym def _ispow(e): """Return True if e is a Pow or is exp.""" return isinstance(e, Expr) and (e.is_Pow or isinstance(e, exp)) def _simple_dens(f, symbols): # when checking if a denominator is zero, we can just check the # base of powers with nonzero exponents since if the base is zero # the power will be zero, too. To keep it simple and fast, we # limit simplification to exponents that are Numbers dens = set() for d in denoms(f, symbols): if d.is_Pow and d.exp.is_Number: if d.exp.is_zero: continue # foo**0 is never 0 d = d.base dens.add(d) return dens def denoms(eq, *symbols): """Return (recursively) set of all denominators that appear in eq that contain any symbol in ``symbols``; if ``symbols`` are not provided then all denominators will be returned. Examples ======== >>> from sympy.solvers.solvers import denoms >>> from sympy.abc import x, y, z >>> from sympy import sqrt >>> denoms(x/y) {y} >>> denoms(x/(y*z)) {y, z} >>> denoms(3/x + y/z) {x, z} >>> denoms(x/2 + y/z) {2, z} If `symbols` are provided then only denominators containing those symbols will be returned >>> denoms(1/x + 1/y + 1/z, y, z) {y, z} """ pot = preorder_traversal(eq) dens = set() for p in pot: den = denom(p) if den is S.One: continue for d in Mul.make_args(den): dens.add(d) if not symbols: return dens elif len(symbols) == 1: if iterable(symbols[0]): symbols = symbols[0] rv = [] for d in dens: free = d.free_symbols if any(s in free for s in symbols): rv.append(d) return set(rv) def checksol(f, symbol, sol=None, **flags): """Checks whether sol is a solution of equation f == 0. Input can be either a single symbol and corresponding value or a dictionary of symbols and values. When given as a dictionary and flag ``simplify=True``, the values in the dictionary will be simplified. ``f`` can be a single equation or an iterable of equations. A solution must satisfy all equations in ``f`` to be considered valid; if a solution does not satisfy any equation, False is returned; if one or more checks are inconclusive (and none are False) then None is returned. Examples ======== >>> from sympy import symbols >>> from sympy.solvers import checksol >>> x, y = symbols('x,y') >>> checksol(x**4 - 1, x, 1) True >>> checksol(x**4 - 1, x, 0) False >>> checksol(x**2 + y**2 - 5**2, {x: 3, y: 4}) True To check if an expression is zero using checksol, pass it as ``f`` and send an empty dictionary for ``symbol``: >>> checksol(x**2 + x - x*(x + 1), {}) True None is returned if checksol() could not conclude. flags: 'numerical=True (default)' do a fast numerical check if ``f`` has only one symbol. 'minimal=True (default is False)' a very fast, minimal testing. 'warn=True (default is False)' show a warning if checksol() could not conclude. 'simplify=True (default)' simplify solution before substituting into function and simplify the function before trying specific simplifications 'force=True (default is False)' make positive all symbols without assumptions regarding sign. """ from sympy.physics.units import Unit minimal = flags.get('minimal', False) if sol is not None: sol = {symbol: sol} elif isinstance(symbol, dict): sol = symbol else: msg = 'Expecting (sym, val) or ({sym: val}, None) but got (%s, %s)' raise ValueError(msg % (symbol, sol)) if iterable(f): if not f: raise ValueError('no functions to check') rv = True for fi in f: check = checksol(fi, sol, **flags) if check: continue if check is False: return False rv = None # don't return, wait to see if there's a False return rv if isinstance(f, Poly): f = f.as_expr() elif isinstance(f, (Equality, Unequality)): if f.rhs in (S.true, S.false): f = f.reversed B, E = f.args if B in (S.true, S.false): f = f.subs(sol) if f not in (S.true, S.false): return else: f = f.rewrite(Add, evaluate=False) if isinstance(f, BooleanAtom): return bool(f) elif not f.is_Relational and not f: return True if sol and not f.free_symbols & set(sol.keys()): # if f(y) == 0, x=3 does not set f(y) to zero...nor does it not return None illegal = set([S.NaN, S.ComplexInfinity, S.Infinity, S.NegativeInfinity]) if any(sympify(v).atoms() & illegal for k, v in sol.items()): return False was = f attempt = -1 numerical = flags.get('numerical', True) while 1: attempt += 1 if attempt == 0: val = f.subs(sol) if isinstance(val, Mul): val = val.as_independent(Unit)[0] if val.atoms() & illegal: return False elif attempt == 1: if not val.is_number: if not val.is_constant(*list(sol.keys()), simplify=not minimal): return False # there are free symbols -- simple expansion might work _, val = val.as_content_primitive() val = _mexpand(val.as_numer_denom()[0], recursive=True) elif attempt == 2: if minimal: return if flags.get('simplify', True): for k in sol: sol[k] = simplify(sol[k]) # start over without the failed expanded form, possibly # with a simplified solution val = simplify(f.subs(sol)) if flags.get('force', True): val, reps = posify(val) # expansion may work now, so try again and check exval = _mexpand(val, recursive=True) if exval.is_number: # we can decide now val = exval else: # if there are no radicals and no functions then this can't be # zero anymore -- can it? pot = preorder_traversal(expand_mul(val)) seen = set() saw_pow_func = False for p in pot: if p in seen: continue seen.add(p) if p.is_Pow and not p.exp.is_Integer: saw_pow_func = True elif p.is_Function: saw_pow_func = True elif isinstance(p, UndefinedFunction): saw_pow_func = True if saw_pow_func: break if saw_pow_func is False: return False if flags.get('force', True): # don't do a zero check with the positive assumptions in place val = val.subs(reps) nz = fuzzy_not(val.is_zero) if nz is not None: # issue 5673: nz may be True even when False # so these are just hacks to keep a false positive # from being returned # HACK 1: LambertW (issue 5673) if val.is_number and val.has(LambertW): # don't eval this to verify solution since if we got here, # numerical must be False return None # add other HACKs here if necessary, otherwise we assume # the nz value is correct return not nz break if val == was: continue elif val.is_Rational: return val == 0 if numerical and val.is_number: if val in (S.true, S.false): return bool(val) return bool(abs(val.n(18).n(12, chop=True)) < 1e-9) was = val if flags.get('warn', False): warnings.warn("\n\tWarning: could not verify solution %s." % sol) # returns None if it can't conclude # TODO: improve solution testing def failing_assumptions(expr, **assumptions): """Return a dictionary containing assumptions with values not matching those of the passed assumptions. Examples ======== >>> from sympy import failing_assumptions, Symbol >>> x = Symbol('x', real=True, positive=True) >>> y = Symbol('y') >>> failing_assumptions(6*x + y, real=True, positive=True) {'positive': None, 'real': None} >>> failing_assumptions(x**2 - 1, positive=True) {'positive': None} If all assumptions satisfy the `expr` an empty dictionary is returned. >>> failing_assumptions(x**2, positive=True) {} """ expr = sympify(expr) failed = {} for key in list(assumptions.keys()): test = getattr(expr, 'is_%s' % key, None) if test is not assumptions[key]: failed[key] = test return failed # {} or {assumption: value != desired} def check_assumptions(expr, against=None, **assumptions): """Checks whether expression `expr` satisfies all assumptions. `assumptions` is a dict of assumptions: {'assumption': True|False, ...}. Examples ======== >>> from sympy import Symbol, pi, I, exp, check_assumptions >>> check_assumptions(-5, integer=True) True >>> check_assumptions(pi, real=True, integer=False) True >>> check_assumptions(pi, real=True, negative=True) False >>> check_assumptions(exp(I*pi/7), real=False) True >>> x = Symbol('x', real=True, positive=True) >>> check_assumptions(2*x + 1, real=True, positive=True) True >>> check_assumptions(-2*x - 5, real=True, positive=True) False To check assumptions of ``expr`` against another variable or expression, pass the expression or variable as ``against``. >>> check_assumptions(2*x + 1, x) True `None` is returned if check_assumptions() could not conclude. >>> check_assumptions(2*x - 1, real=True, positive=True) >>> z = Symbol('z') >>> check_assumptions(z, real=True) See Also ======== failing_assumptions """ expr = sympify(expr) if against: if not isinstance(against, Symbol): raise TypeError('against should be of type Symbol') if assumptions: raise AssertionError('No assumptions should be specified') assumptions = against.assumptions0 def _test(key): v = getattr(expr, 'is_' + key, None) if v is not None: return assumptions[key] is v return fuzzy_and(_test(key) for key in assumptions) def solve(f, *symbols, **flags): r""" Algebraically solves equations and systems of equations. Currently supported are: - polynomial, - transcendental - piecewise combinations of the above - systems of linear and polynomial equations - systems containing relational expressions. Input is formed as: * f - a single Expr or Poly that must be zero, - an Equality - a Relational expression - a Boolean - iterable of one or more of the above * symbols (object(s) to solve for) specified as - none given (other non-numeric objects will be used) - single symbol - denested list of symbols e.g. solve(f, x, y) - ordered iterable of symbols e.g. solve(f, [x, y]) * flags 'dict'=True (default is False) return list (perhaps empty) of solution mappings 'set'=True (default is False) return list of symbols and set of tuple(s) of solution(s) 'exclude=[] (default)' don't try to solve for any of the free symbols in exclude; if expressions are given, the free symbols in them will be extracted automatically. 'check=True (default)' If False, don't do any testing of solutions. This can be useful if one wants to include solutions that make any denominator zero. 'numerical=True (default)' do a fast numerical check if ``f`` has only one symbol. 'minimal=True (default is False)' a very fast, minimal testing. 'warn=True (default is False)' show a warning if checksol() could not conclude. 'simplify=True (default)' simplify all but polynomials of order 3 or greater before returning them and (if check is not False) use the general simplify function on the solutions and the expression obtained when they are substituted into the function which should be zero 'force=True (default is False)' make positive all symbols without assumptions regarding sign. 'rational=True (default)' recast Floats as Rational; if this option is not used, the system containing floats may fail to solve because of issues with polys. If rational=None, Floats will be recast as rationals but the answer will be recast as Floats. If the flag is False then nothing will be done to the Floats. 'manual=True (default is False)' do not use the polys/matrix method to solve a system of equations, solve them one at a time as you might "manually" 'implicit=True (default is False)' allows solve to return a solution for a pattern in terms of other functions that contain that pattern; this is only needed if the pattern is inside of some invertible function like cos, exp, .... 'particular=True (default is False)' instructs solve to try to find a particular solution to a linear system with as many zeros as possible; this is very expensive 'quick=True (default is False)' when using particular=True, use a fast heuristic instead to find a solution with many zeros (instead of using the very slow method guaranteed to find the largest number of zeros possible) 'cubics=True (default)' return explicit solutions when cubic expressions are encountered 'quartics=True (default)' return explicit solutions when quartic expressions are encountered 'quintics=True (default)' return explicit solutions (if possible) when quintic expressions are encountered Examples ======== The output varies according to the input and can be seen by example:: >>> from sympy import solve, Poly, Eq, Function, exp >>> from sympy.abc import x, y, z, a, b >>> f = Function('f') * boolean or univariate Relational >>> solve(x < 3) (-oo < x) & (x < 3) * to always get a list of solution mappings, use flag dict=True >>> solve(x - 3, dict=True) [{x: 3}] >>> sol = solve([x - 3, y - 1], dict=True) >>> sol [{x: 3, y: 1}] >>> sol[0][x] 3 >>> sol[0][y] 1 * to get a list of symbols and set of solution(s) use flag set=True >>> solve([x**2 - 3, y - 1], set=True) ([x, y], {(-sqrt(3), 1), (sqrt(3), 1)}) * single expression and single symbol that is in the expression >>> solve(x - y, x) [y] >>> solve(x - 3, x) [3] >>> solve(Eq(x, 3), x) [3] >>> solve(Poly(x - 3), x) [3] >>> solve(x**2 - y**2, x, set=True) ([x], {(-y,), (y,)}) >>> solve(x**4 - 1, x, set=True) ([x], {(-1,), (1,), (-I,), (I,)}) * single expression with no symbol that is in the expression >>> solve(3, x) [] >>> solve(x - 3, y) [] * single expression with no symbol given In this case, all free symbols will be selected as potential symbols to solve for. If the equation is univariate then a list of solutions is returned; otherwise -- as is the case when symbols are given as an iterable of length > 1 -- a list of mappings will be returned. >>> solve(x - 3) [3] >>> solve(x**2 - y**2) [{x: -y}, {x: y}] >>> solve(z**2*x**2 - z**2*y**2) [{x: -y}, {x: y}, {z: 0}] >>> solve(z**2*x - z**2*y**2) [{x: y**2}, {z: 0}] * when an object other than a Symbol is given as a symbol, it is isolated algebraically and an implicit solution may be obtained. This is mostly provided as a convenience to save one from replacing the object with a Symbol and solving for that Symbol. It will only work if the specified object can be replaced with a Symbol using the subs method. >>> solve(f(x) - x, f(x)) [x] >>> solve(f(x).diff(x) - f(x) - x, f(x).diff(x)) [x + f(x)] >>> solve(f(x).diff(x) - f(x) - x, f(x)) [-x + Derivative(f(x), x)] >>> solve(x + exp(x)**2, exp(x), set=True) ([exp(x)], {(-sqrt(-x),), (sqrt(-x),)}) >>> from sympy import Indexed, IndexedBase, Tuple, sqrt >>> A = IndexedBase('A') >>> eqs = Tuple(A[1] + A[2] - 3, A[1] - A[2] + 1) >>> solve(eqs, eqs.atoms(Indexed)) {A[1]: 1, A[2]: 2} * To solve for a *symbol* implicitly, use 'implicit=True': >>> solve(x + exp(x), x) [-LambertW(1)] >>> solve(x + exp(x), x, implicit=True) [-exp(x)] * It is possible to solve for anything that can be targeted with subs: >>> solve(x + 2 + sqrt(3), x + 2) [-sqrt(3)] >>> solve((x + 2 + sqrt(3), x + 4 + y), y, x + 2) {y: -2 + sqrt(3), x + 2: -sqrt(3)} * Nothing heroic is done in this implicit solving so you may end up with a symbol still in the solution: >>> eqs = (x*y + 3*y + sqrt(3), x + 4 + y) >>> solve(eqs, y, x + 2) {y: -sqrt(3)/(x + 3), x + 2: (-2*x - 6 + sqrt(3))/(x + 3)} >>> solve(eqs, y*x, x) {x: -y - 4, x*y: -3*y - sqrt(3)} * if you attempt to solve for a number remember that the number you have obtained does not necessarily mean that the value is equivalent to the expression obtained: >>> solve(sqrt(2) - 1, 1) [sqrt(2)] >>> solve(x - y + 1, 1) # /!\ -1 is targeted, too [x/(y - 1)] >>> [_.subs(z, -1) for _ in solve((x - y + 1).subs(-1, z), 1)] [-x + y] * To solve for a function within a derivative, use dsolve. * single expression and more than 1 symbol * when there is a linear solution >>> solve(x - y**2, x, y) [(y**2, y)] >>> solve(x**2 - y, x, y) [(x, x**2)] >>> solve(x**2 - y, x, y, dict=True) [{y: x**2}] * when undetermined coefficients are identified * that are linear >>> solve((a + b)*x - b + 2, a, b) {a: -2, b: 2} * that are nonlinear >>> solve((a + b)*x - b**2 + 2, a, b, set=True) ([a, b], {(-sqrt(2), sqrt(2)), (sqrt(2), -sqrt(2))}) * if there is no linear solution then the first successful attempt for a nonlinear solution will be returned >>> solve(x**2 - y**2, x, y, dict=True) [{x: -y}, {x: y}] >>> solve(x**2 - y**2/exp(x), x, y, dict=True) [{x: 2*LambertW(-y/2)}, {x: 2*LambertW(y/2)}] >>> solve(x**2 - y**2/exp(x), y, x) [(-x*sqrt(exp(x)), x), (x*sqrt(exp(x)), x)] * iterable of one or more of the above * involving relationals or bools >>> solve([x < 3, x - 2]) Eq(x, 2) >>> solve([x > 3, x - 2]) False * when the system is linear * with a solution >>> solve([x - 3], x) {x: 3} >>> solve((x + 5*y - 2, -3*x + 6*y - 15), x, y) {x: -3, y: 1} >>> solve((x + 5*y - 2, -3*x + 6*y - 15), x, y, z) {x: -3, y: 1} >>> solve((x + 5*y - 2, -3*x + 6*y - z), z, x, y) {x: 2 - 5*y, z: 21*y - 6} * without a solution >>> solve([x + 3, x - 3]) [] * when the system is not linear >>> solve([x**2 + y -2, y**2 - 4], x, y, set=True) ([x, y], {(-2, -2), (0, 2), (2, -2)}) * if no symbols are given, all free symbols will be selected and a list of mappings returned >>> solve([x - 2, x**2 + y]) [{x: 2, y: -4}] >>> solve([x - 2, x**2 + f(x)], {f(x), x}) [{x: 2, f(x): -4}] * if any equation doesn't depend on the symbol(s) given it will be eliminated from the equation set and an answer may be given implicitly in terms of variables that were not of interest >>> solve([x - y, y - 3], x) {x: y} Notes ===== solve() with check=True (default) will run through the symbol tags to elimate unwanted solutions. If no assumptions are included all possible solutions will be returned. >>> from sympy import Symbol, solve >>> x = Symbol("x") >>> solve(x**2 - 1) [-1, 1] By using the positive tag only one solution will be returned: >>> pos = Symbol("pos", positive=True) >>> solve(pos**2 - 1) [1] Assumptions aren't checked when `solve()` input involves relationals or bools. When the solutions are checked, those that make any denominator zero are automatically excluded. If you do not want to exclude such solutions then use the check=False option: >>> from sympy import sin, limit >>> solve(sin(x)/x) # 0 is excluded [pi] If check=False then a solution to the numerator being zero is found: x = 0. In this case, this is a spurious solution since sin(x)/x has the well known limit (without dicontinuity) of 1 at x = 0: >>> solve(sin(x)/x, check=False) [0, pi] In the following case, however, the limit exists and is equal to the value of x = 0 that is excluded when check=True: >>> eq = x**2*(1/x - z**2/x) >>> solve(eq, x) [] >>> solve(eq, x, check=False) [0] >>> limit(eq, x, 0, '-') 0 >>> limit(eq, x, 0, '+') 0 Disabling high-order, explicit solutions ---------------------------------------- When solving polynomial expressions, one might not want explicit solutions (which can be quite long). If the expression is univariate, CRootOf instances will be returned instead: >>> solve(x**3 - x + 1) [-1/((-1/2 - sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)) - (-1/2 - sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)/3, -(-1/2 + sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)/3 - 1/((-1/2 + sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)), -(3*sqrt(69)/2 + 27/2)**(1/3)/3 - 1/(3*sqrt(69)/2 + 27/2)**(1/3)] >>> solve(x**3 - x + 1, cubics=False) [CRootOf(x**3 - x + 1, 0), CRootOf(x**3 - x + 1, 1), CRootOf(x**3 - x + 1, 2)] If the expression is multivariate, no solution might be returned: >>> solve(x**3 - x + a, x, cubics=False) [] Sometimes solutions will be obtained even when a flag is False because the expression could be factored. In the following example, the equation can be factored as the product of a linear and a quadratic factor so explicit solutions (which did not require solving a cubic expression) are obtained: >>> eq = x**3 + 3*x**2 + x - 1 >>> solve(eq, cubics=False) [-1, -1 + sqrt(2), -sqrt(2) - 1] Solving equations involving radicals ------------------------------------ Because of SymPy's use of the principle root (issue #8789), some solutions to radical equations will be missed unless check=False: >>> from sympy import root >>> eq = root(x**3 - 3*x**2, 3) + 1 - x >>> solve(eq) [] >>> solve(eq, check=False) [1/3] In the above example there is only a single solution to the equation. Other expressions will yield spurious roots which must be checked manually; roots which give a negative argument to odd-powered radicals will also need special checking: >>> from sympy import real_root, S >>> eq = root(x, 3) - root(x, 5) + S(1)/7 >>> solve(eq) # this gives 2 solutions but misses a 3rd [CRootOf(7*_p**5 - 7*_p**3 + 1, 1)**15, CRootOf(7*_p**5 - 7*_p**3 + 1, 2)**15] >>> sol = solve(eq, check=False) >>> [abs(eq.subs(x,i).n(2)) for i in sol] [0.48, 0.e-110, 0.e-110, 0.052, 0.052] The first solution is negative so real_root must be used to see that it satisfies the expression: >>> abs(real_root(eq.subs(x, sol[0])).n(2)) 0.e-110 If the roots of the equation are not real then more care will be necessary to find the roots, especially for higher order equations. Consider the following expression: >>> expr = root(x, 3) - root(x, 5) We will construct a known value for this expression at x = 3 by selecting the 1-th root for each radical: >>> expr1 = root(x, 3, 1) - root(x, 5, 1) >>> v = expr1.subs(x, -3) The solve function is unable to find any exact roots to this equation: >>> eq = Eq(expr, v); eq1 = Eq(expr1, v) >>> solve(eq, check=False), solve(eq1, check=False) ([], []) The function unrad, however, can be used to get a form of the equation for which numerical roots can be found: >>> from sympy.solvers.solvers import unrad >>> from sympy import nroots >>> e, (p, cov) = unrad(eq) >>> pvals = nroots(e) >>> inversion = solve(cov, x)[0] >>> xvals = [inversion.subs(p, i) for i in pvals] Although eq or eq1 could have been used to find xvals, the solution can only be verified with expr1: >>> z = expr - v >>> [xi.n(chop=1e-9) for xi in xvals if abs(z.subs(x, xi).n()) < 1e-9] [] >>> z1 = expr1 - v >>> [xi.n(chop=1e-9) for xi in xvals if abs(z1.subs(x, xi).n()) < 1e-9] [-3.0] See Also ======== - rsolve() for solving recurrence relationships - dsolve() for solving differential equations """ # keeping track of how f was passed since if it is a list # a dictionary of results will be returned. ########################################################################### def _sympified_list(w): return list(map(sympify, w if iterable(w) else [w])) bare_f = not iterable(f) ordered_symbols = (symbols and symbols[0] and (isinstance(symbols[0], Symbol) or is_sequence(symbols[0], include=GeneratorType) ) ) f, symbols = (_sympified_list(w) for w in [f, symbols]) if isinstance(f, list): f = [s for s in f if s is not S.true and s is not True] implicit = flags.get('implicit', False) # preprocess symbol(s) ########################################################################### if not symbols: # get symbols from equations symbols = set().union(*[fi.free_symbols for fi in f]) if len(symbols) < len(f): for fi in f: pot = preorder_traversal(fi) for p in pot: if isinstance(p, AppliedUndef): flags['dict'] = True # better show symbols symbols.add(p) pot.skip() # don't go any deeper symbols = list(symbols) ordered_symbols = False elif len(symbols) == 1 and iterable(symbols[0]): symbols = symbols[0] # remove symbols the user is not interested in exclude = flags.pop('exclude', set()) if exclude: if isinstance(exclude, Expr): exclude = [exclude] exclude = set().union(*[e.free_symbols for e in sympify(exclude)]) symbols = [s for s in symbols if s not in exclude] # preprocess equation(s) ########################################################################### for i, fi in enumerate(f): if isinstance(fi, (Equality, Unequality)): if 'ImmutableDenseMatrix' in [type(a).__name__ for a in fi.args]: fi = fi.lhs - fi.rhs else: args = fi.args if args[1] in (S.true, S.false): args = args[1], args[0] L, R = args if L in (S.false, S.true): if isinstance(fi, Unequality): L = ~L if R.is_Relational: fi = ~R if L is S.false else R elif R.is_Symbol: return L elif R.is_Boolean and (~R).is_Symbol: return ~L else: raise NotImplementedError(filldedent(''' Unanticipated argument of Eq when other arg is True or False. ''')) else: fi = fi.rewrite(Add, evaluate=False) f[i] = fi if fi.is_Relational: return reduce_inequalities(f, symbols=symbols) if isinstance(fi, Poly): f[i] = fi.as_expr() # rewrite hyperbolics in terms of exp f[i] = f[i].replace(lambda w: isinstance(w, HyperbolicFunction), lambda w: w.rewrite(exp)) # if we have a Matrix, we need to iterate over its elements again if f[i].is_Matrix: bare_f = False f.extend(list(f[i])) f[i] = S.Zero # if we can split it into real and imaginary parts then do so freei = f[i].free_symbols if freei and all(s.is_extended_real or s.is_imaginary for s in freei): fr, fi = f[i].as_real_imag() # accept as long as new re, im, arg or atan2 are not introduced had = f[i].atoms(re, im, arg, atan2) if fr and fi and fr != fi and not any( i.atoms(re, im, arg, atan2) - had for i in (fr, fi)): if bare_f: bare_f = False f[i: i + 1] = [fr, fi] # real/imag handling ----------------------------- if any(isinstance(fi, (bool, BooleanAtom)) for fi in f): if flags.get('set', False): return [], set() return [] w = Dummy('w') piece = Lambda(w, Piecewise((w, Ge(w, 0)), (-w, True))) for i, fi in enumerate(f): # Abs reps = [] for a in fi.atoms(Abs): if not a.has(*symbols): continue if a.args[0].is_extended_real is None: raise NotImplementedError('solving %s when the argument ' 'is not real or imaginary.' % a) reps.append((a, piece(a.args[0]) if a.args[0].is_extended_real else \ piece(a.args[0]*S.ImaginaryUnit))) fi = fi.subs(reps) # arg _arg = [a for a in fi.atoms(arg) if a.has(*symbols)] fi = fi.xreplace(dict(list(zip(_arg, [atan(im(a.args[0])/re(a.args[0])) for a in _arg])))) # save changes f[i] = fi # see if re(s) or im(s) appear irf = [] for s in symbols: if s.is_extended_real or s.is_imaginary: continue # neither re(x) nor im(x) will appear # if re(s) or im(s) appear, the auxiliary equation must be present if any(fi.has(re(s), im(s)) for fi in f): irf.append((s, re(s) + S.ImaginaryUnit*im(s))) if irf: for s, rhs in irf: for i, fi in enumerate(f): f[i] = fi.xreplace({s: rhs}) f.append(s - rhs) symbols.extend([re(s), im(s)]) if bare_f: bare_f = False flags['dict'] = True # end of real/imag handling ----------------------------- symbols = list(uniq(symbols)) if not ordered_symbols: # we do this to make the results returned canonical in case f # contains a system of nonlinear equations; all other cases should # be unambiguous symbols = sorted(symbols, key=default_sort_key) # we can solve for non-symbol entities by replacing them with Dummy symbols f, symbols, swap_sym = recast_to_symbols(f, symbols) # this is needed in the next two events symset = set(symbols) # get rid of equations that have no symbols of interest; we don't # try to solve them because the user didn't ask and they might be # hard to solve; this means that solutions may be given in terms # of the eliminated equations e.g. solve((x-y, y-3), x) -> {x: y} newf = [] for fi in f: # let the solver handle equations that.. # - have no symbols but are expressions # - have symbols of interest # - have no symbols of interest but are constant # but when an expression is not constant and has no symbols of # interest, it can't change what we obtain for a solution from # the remaining equations so we don't include it; and if it's # zero it can be removed and if it's not zero, there is no # solution for the equation set as a whole # # The reason for doing this filtering is to allow an answer # to be obtained to queries like solve((x - y, y), x); without # this mod the return value is [] ok = False if fi.has(*symset): ok = True else: if fi.is_number: if fi.is_Number: if fi.is_zero: continue return [] ok = True else: if fi.is_constant(): ok = True if ok: newf.append(fi) if not newf: return [] f = newf del newf # mask off any Object that we aren't going to invert: Derivative, # Integral, etc... so that solving for anything that they contain will # give an implicit solution seen = set() non_inverts = set() for fi in f: pot = preorder_traversal(fi) for p in pot: if not isinstance(p, Expr) or isinstance(p, Piecewise): pass elif (isinstance(p, bool) or not p.args or p in symset or p.is_Add or p.is_Mul or p.is_Pow and not implicit or p.is_Function and not implicit) and p.func not in (re, im): continue elif not p in seen: seen.add(p) if p.free_symbols & symset: non_inverts.add(p) else: continue pot.skip() del seen non_inverts = dict(list(zip(non_inverts, [Dummy() for _ in non_inverts]))) f = [fi.subs(non_inverts) for fi in f] # Both xreplace and subs are needed below: xreplace to force substitution # inside Derivative, subs to handle non-straightforward substitutions non_inverts = [(v, k.xreplace(swap_sym).subs(swap_sym)) for k, v in non_inverts.items()] # rationalize Floats floats = False if flags.get('rational', True) is not False: for i, fi in enumerate(f): if fi.has(Float): floats = True f[i] = nsimplify(fi, rational=True) # capture any denominators before rewriting since # they may disappear after the rewrite, e.g. issue 14779 flags['_denominators'] = _simple_dens(f[0], symbols) # Any embedded piecewise functions need to be brought out to the # top level so that the appropriate strategy gets selected. # However, this is necessary only if one of the piecewise # functions depends on one of the symbols we are solving for. def _has_piecewise(e): if e.is_Piecewise: return e.has(*symbols) return any([_has_piecewise(a) for a in e.args]) for i, fi in enumerate(f): if _has_piecewise(fi): f[i] = piecewise_fold(fi) # # try to get a solution ########################################################################### if bare_f: solution = _solve(f[0], *symbols, **flags) else: solution = _solve_system(f, symbols, **flags) # # postprocessing ########################################################################### # Restore masked-off objects if non_inverts: def _do_dict(solution): return {k: v.subs(non_inverts) for k, v in solution.items()} for i in range(1): if isinstance(solution, dict): solution = _do_dict(solution) break elif solution and isinstance(solution, list): if isinstance(solution[0], dict): solution = [_do_dict(s) for s in solution] break elif isinstance(solution[0], tuple): solution = [tuple([v.subs(non_inverts) for v in s]) for s in solution] break else: solution = [v.subs(non_inverts) for v in solution] break elif not solution: break else: raise NotImplementedError(filldedent(''' no handling of %s was implemented''' % solution)) # Restore original "symbols" if a dictionary is returned. # This is not necessary for # - the single univariate equation case # since the symbol will have been removed from the solution; # - the nonlinear poly_system since that only supports zero-dimensional # systems and those results come back as a list # # ** unless there were Derivatives with the symbols, but those were handled # above. if swap_sym: symbols = [swap_sym.get(k, k) for k in symbols] if isinstance(solution, dict): solution = {swap_sym.get(k, k): v.subs(swap_sym) for k, v in solution.items()} elif solution and isinstance(solution, list) and isinstance(solution[0], dict): for i, sol in enumerate(solution): solution[i] = {swap_sym.get(k, k): v.subs(swap_sym) for k, v in sol.items()} # undo the dictionary solutions returned when the system was only partially # solved with poly-system if all symbols are present if ( not flags.get('dict', False) and solution and ordered_symbols and not isinstance(solution, dict) and all(isinstance(sol, dict) for sol in solution) ): solution = [tuple([r.get(s, s).subs(r) for s in symbols]) for r in solution] # Get assumptions about symbols, to filter solutions. # Note that if assumptions about a solution can't be verified, it is still # returned. check = flags.get('check', True) # restore floats if floats and solution and flags.get('rational', None) is None: solution = nfloat(solution, exponent=False) if check and solution: # assumption checking warn = flags.get('warn', False) got_None = [] # solutions for which one or more symbols gave None no_False = [] # solutions for which no symbols gave False if isinstance(solution, tuple): # this has already been checked and is in as_set form return solution elif isinstance(solution, list): if isinstance(solution[0], tuple): for sol in solution: for symb, val in zip(symbols, sol): test = check_assumptions(val, **symb.assumptions0) if test is False: break if test is None: got_None.append(sol) else: no_False.append(sol) elif isinstance(solution[0], dict): for sol in solution: a_None = False for symb, val in sol.items(): test = check_assumptions(val, **symb.assumptions0) if test: continue if test is False: break a_None = True else: no_False.append(sol) if a_None: got_None.append(sol) else: # list of expressions for sol in solution: test = check_assumptions(sol, **symbols[0].assumptions0) if test is False: continue no_False.append(sol) if test is None: got_None.append(sol) elif isinstance(solution, dict): a_None = False for symb, val in solution.items(): test = check_assumptions(val, **symb.assumptions0) if test: continue if test is False: no_False = None break a_None = True else: no_False = solution if a_None: got_None.append(solution) elif isinstance(solution, (Relational, And, Or)): if len(symbols) != 1: raise ValueError("Length should be 1") if warn and symbols[0].assumptions0: warnings.warn(filldedent(""" \tWarning: assumptions about variable '%s' are not handled currently.""" % symbols[0])) # TODO: check also variable assumptions for inequalities else: raise TypeError('Unrecognized solution') # improve the checker solution = no_False if warn and got_None: warnings.warn(filldedent(""" \tWarning: assumptions concerning following solution(s) can't be checked:""" + '\n\t' + ', '.join(str(s) for s in got_None))) # # done ########################################################################### as_dict = flags.get('dict', False) as_set = flags.get('set', False) if not as_set and isinstance(solution, list): # Make sure that a list of solutions is ordered in a canonical way. solution.sort(key=default_sort_key) if not as_dict and not as_set: return solution or [] # return a list of mappings or [] if not solution: solution = [] else: if isinstance(solution, dict): solution = [solution] elif iterable(solution[0]): solution = [dict(list(zip(symbols, s))) for s in solution] elif isinstance(solution[0], dict): pass else: if len(symbols) != 1: raise ValueError("Length should be 1") solution = [{symbols[0]: s} for s in solution] if as_dict: return solution assert as_set if not solution: return [], set() k = list(ordered(solution[0].keys())) return k, {tuple([s[ki] for ki in k]) for s in solution} def _solve(f, *symbols, **flags): """Return a checked solution for f in terms of one or more of the symbols. A list should be returned except for the case when a linear undetermined-coefficients equation is encountered (in which case a dictionary is returned). If no method is implemented to solve the equation, a NotImplementedError will be raised. In the case that conversion of an expression to a Poly gives None a ValueError will be raised.""" not_impl_msg = "No algorithms are implemented to solve equation %s" if len(symbols) != 1: soln = None free = f.free_symbols ex = free - set(symbols) if len(ex) != 1: ind, dep = f.as_independent(*symbols) ex = ind.free_symbols & dep.free_symbols if len(ex) == 1: ex = ex.pop() try: # soln may come back as dict, list of dicts or tuples, or # tuple of symbol list and set of solution tuples soln = solve_undetermined_coeffs(f, symbols, ex, **flags) except NotImplementedError: pass if soln: if flags.get('simplify', True): if isinstance(soln, dict): for k in soln: soln[k] = simplify(soln[k]) elif isinstance(soln, list): if isinstance(soln[0], dict): for d in soln: for k in d: d[k] = simplify(d[k]) elif isinstance(soln[0], tuple): soln = [tuple(simplify(i) for i in j) for j in soln] else: raise TypeError('unrecognized args in list') elif isinstance(soln, tuple): sym, sols = soln soln = sym, {tuple(simplify(i) for i in j) for j in sols} else: raise TypeError('unrecognized solution type') return soln # find first successful solution failed = [] got_s = set([]) result = [] for s in symbols: xi, v = solve_linear(f, symbols=[s]) if xi == s: # no need to check but we should simplify if desired if flags.get('simplify', True): v = simplify(v) vfree = v.free_symbols if got_s and any([ss in vfree for ss in got_s]): # sol depends on previously solved symbols: discard it continue got_s.add(xi) result.append({xi: v}) elif xi: # there might be a non-linear solution if xi is not 0 failed.append(s) if not failed: return result for s in failed: try: soln = _solve(f, s, **flags) for sol in soln: if got_s and any([ss in sol.free_symbols for ss in got_s]): # sol depends on previously solved symbols: discard it continue got_s.add(s) result.append({s: sol}) except NotImplementedError: continue if got_s: return result else: raise NotImplementedError(not_impl_msg % f) symbol = symbols[0] # /!\ capture this flag then set it to False so that no checking in # recursive calls will be done; only the final answer is checked flags['check'] = checkdens = check = flags.pop('check', True) # build up solutions if f is a Mul if f.is_Mul: result = set() for m in f.args: if m in set([S.NegativeInfinity, S.ComplexInfinity, S.Infinity]): result = set() break soln = _solve(m, symbol, **flags) result.update(set(soln)) result = list(result) if check: # all solutions have been checked but now we must # check that the solutions do not set denominators # in any factor to zero dens = flags.get('_denominators', _simple_dens(f, symbols)) result = [s for s in result if all(not checksol(den, {symbol: s}, **flags) for den in dens)] # set flags for quick exit at end; solutions for each # factor were already checked and simplified check = False flags['simplify'] = False elif f.is_Piecewise: result = set() for i, (expr, cond) in enumerate(f.args): if expr.is_zero: raise NotImplementedError( 'solve cannot represent interval solutions') candidates = _solve(expr, symbol, **flags) # the explicit condition for this expr is the current cond # and none of the previous conditions args = [~c for _, c in f.args[:i]] + [cond] cond = And(*args) for candidate in candidates: if candidate in result: # an unconditional value was already there continue try: v = cond.subs(symbol, candidate) _eval_simpify = getattr(v, '_eval_simpify', None) if _eval_simpify is not None: # unconditionally take the simpification of v v = _eval_simpify(ratio=2, measure=lambda x: 1) except TypeError: # incompatible type with condition(s) continue if v == False: continue result.add(Piecewise( (candidate, v), (S.NaN, True))) # set flags for quick exit at end; solutions for each # piece were already checked and simplified check = False flags['simplify'] = False else: # first see if it really depends on symbol and whether there # is only a linear solution f_num, sol = solve_linear(f, symbols=symbols) if f_num is S.Zero or sol is S.NaN: return [] elif f_num.is_Symbol: # no need to check but simplify if desired if flags.get('simplify', True): sol = simplify(sol) return [sol] result = False # no solution was obtained msg = '' # there is no failure message # Poly is generally robust enough to convert anything to # a polynomial and tell us the different generators that it # contains, so we will inspect the generators identified by # polys to figure out what to do. # try to identify a single generator that will allow us to solve this # as a polynomial, followed (perhaps) by a change of variables if the # generator is not a symbol try: poly = Poly(f_num) if poly is None: raise ValueError('could not convert %s to Poly' % f_num) except GeneratorsNeeded: simplified_f = simplify(f_num) if simplified_f != f_num: return _solve(simplified_f, symbol, **flags) raise ValueError('expression appears to be a constant') gens = [g for g in poly.gens if g.has(symbol)] def _as_base_q(x): """Return (b**e, q) for x = b**(p*e/q) where p/q is the leading Rational of the exponent of x, e.g. exp(-2*x/3) -> (exp(x), 3) """ b, e = x.as_base_exp() if e.is_Rational: return b, e.q if not e.is_Mul: return x, 1 c, ee = e.as_coeff_Mul() if c.is_Rational and c is not S.One: # c could be a Float return b**ee, c.q return x, 1 if len(gens) > 1: # If there is more than one generator, it could be that the # generators have the same base but different powers, e.g. # >>> Poly(exp(x) + 1/exp(x)) # Poly(exp(-x) + exp(x), exp(-x), exp(x), domain='ZZ') # # If unrad was not disabled then there should be no rational # exponents appearing as in # >>> Poly(sqrt(x) + sqrt(sqrt(x))) # Poly(sqrt(x) + x**(1/4), sqrt(x), x**(1/4), domain='ZZ') bases, qs = list(zip(*[_as_base_q(g) for g in gens])) bases = set(bases) if len(bases) > 1 or not all(q == 1 for q in qs): funcs = set(b for b in bases if b.is_Function) trig = set([_ for _ in funcs if isinstance(_, TrigonometricFunction)]) other = funcs - trig if not other and len(funcs.intersection(trig)) > 1: newf = TR1(f_num).rewrite(tan) if newf != f_num: # don't check the rewritten form --check # solutions in the un-rewritten form below flags['check'] = False result = _solve(newf, symbol, **flags) flags['check'] = check # just a simple case - see if replacement of single function # clears all symbol-dependent functions, e.g. # log(x) - log(log(x) - 1) - 3 can be solved even though it has # two generators. if result is False and funcs: funcs = list(ordered(funcs)) # put shallowest function first f1 = funcs[0] t = Dummy('t') # perform the substitution ftry = f_num.subs(f1, t) # if no Functions left, we can proceed with usual solve if not ftry.has(symbol): cv_sols = _solve(ftry, t, **flags) cv_inv = _solve(t - f1, symbol, **flags)[0] sols = list() for sol in cv_sols: sols.append(cv_inv.subs(t, sol)) result = list(ordered(sols)) if result is False: msg = 'multiple generators %s' % gens else: # e.g. case where gens are exp(x), exp(-x) u = bases.pop() t = Dummy('t') inv = _solve(u - t, symbol, **flags) if isinstance(u, (Pow, exp)): # this will be resolved by factor in _tsolve but we might # as well try a simple expansion here to get things in # order so something like the following will work now without # having to factor: # # >>> eq = (exp(I*(-x-2))+exp(I*(x+2))) # >>> eq.subs(exp(x),y) # fails # exp(I*(-x - 2)) + exp(I*(x + 2)) # >>> eq.expand().subs(exp(x),y) # works # y**I*exp(2*I) + y**(-I)*exp(-2*I) def _expand(p): b, e = p.as_base_exp() e = expand_mul(e) return expand_power_exp(b**e) ftry = f_num.replace( lambda w: w.is_Pow or isinstance(w, exp), _expand).subs(u, t) if not ftry.has(symbol): soln = _solve(ftry, t, **flags) sols = list() for sol in soln: for i in inv: sols.append(i.subs(t, sol)) result = list(ordered(sols)) elif len(gens) == 1: # There is only one generator that we are interested in, but # there may have been more than one generator identified by # polys (e.g. for symbols other than the one we are interested # in) so recast the poly in terms of our generator of interest. # Also use composite=True with f_num since Poly won't update # poly as documented in issue 8810. poly = Poly(f_num, gens[0], composite=True) # if we aren't on the tsolve-pass, use roots if not flags.pop('tsolve', False): soln = None deg = poly.degree() flags['tsolve'] = True solvers = {k: flags.get(k, True) for k in ('cubics', 'quartics', 'quintics')} soln = roots(poly, **solvers) if sum(soln.values()) < deg: # e.g. roots(32*x**5 + 400*x**4 + 2032*x**3 + # 5000*x**2 + 6250*x + 3189) -> {} # so all_roots is used and RootOf instances are # returned *unless* the system is multivariate # or high-order EX domain. try: soln = poly.all_roots() except NotImplementedError: if not flags.get('incomplete', True): raise NotImplementedError( filldedent(''' Neither high-order multivariate polynomials nor sorting of EX-domain polynomials is supported. If you want to see any results, pass keyword incomplete=True to solve; to see numerical values of roots for univariate expressions, use nroots. ''')) else: pass else: soln = list(soln.keys()) if soln is not None: u = poly.gen if u != symbol: try: t = Dummy('t') iv = _solve(u - t, symbol, **flags) soln = list(ordered({i.subs(t, s) for i in iv for s in soln})) except NotImplementedError: # perhaps _tsolve can handle f_num soln = None else: check = False # only dens need to be checked if soln is not None: if len(soln) > 2: # if the flag wasn't set then unset it since high-order # results are quite long. Perhaps one could base this # decision on a certain critical length of the # roots. In addition, wester test M2 has an expression # whose roots can be shown to be real with the # unsimplified form of the solution whereas only one of # the simplified forms appears to be real. flags['simplify'] = flags.get('simplify', False) result = soln # fallback if above fails # ----------------------- if result is False: # try unrad if flags.pop('_unrad', True): try: u = unrad(f_num, symbol) except (ValueError, NotImplementedError): u = False if u: eq, cov = u if cov: isym, ieq = cov inv = _solve(ieq, symbol, **flags)[0] rv = {inv.subs(isym, xi) for xi in _solve(eq, isym, **flags)} else: try: rv = set(_solve(eq, symbol, **flags)) except NotImplementedError: rv = None if rv is not None: result = list(ordered(rv)) # if the flag wasn't set then unset it since unrad results # can be quite long or of very high order flags['simplify'] = flags.get('simplify', False) else: pass # for coverage # try _tsolve if result is False: flags.pop('tsolve', None) # allow tsolve to be used on next pass try: soln = _tsolve(f_num, symbol, **flags) if soln is not None: result = soln except PolynomialError: pass # ----------- end of fallback ---------------------------- if result is False: raise NotImplementedError('\n'.join([msg, not_impl_msg % f])) if flags.get('simplify', True): result = list(map(simplify, result)) # we just simplified the solution so we now set the flag to # False so the simplification doesn't happen again in checksol() flags['simplify'] = False if checkdens: # reject any result that makes any denom. affirmatively 0; # if in doubt, keep it dens = _simple_dens(f, symbols) result = [s for s in result if all(not checksol(d, {symbol: s}, **flags) for d in dens)] if check: # keep only results if the check is not False result = [r for r in result if checksol(f_num, {symbol: r}, **flags) is not False] return result def _solve_system(exprs, symbols, **flags): if not exprs: return [] polys = [] dens = set() failed = [] result = False linear = False manual = flags.get('manual', False) checkdens = check = flags.get('check', True) for j, g in enumerate(exprs): dens.update(_simple_dens(g, symbols)) i, d = _invert(g, *symbols) g = d - i g = g.as_numer_denom()[0] if manual: failed.append(g) continue poly = g.as_poly(*symbols, extension=True) if poly is not None: polys.append(poly) else: failed.append(g) if not polys: solved_syms = [] else: if all(p.is_linear for p in polys): n, m = len(polys), len(symbols) matrix = zeros(n, m + 1) for i, poly in enumerate(polys): for monom, coeff in poly.terms(): try: j = monom.index(1) matrix[i, j] = coeff except ValueError: matrix[i, m] = -coeff # returns a dictionary ({symbols: values}) or None if flags.pop('particular', False): result = minsolve_linear_system(matrix, *symbols, **flags) else: result = solve_linear_system(matrix, *symbols, **flags) if failed: if result: solved_syms = list(result.keys()) else: solved_syms = [] else: linear = True else: if len(symbols) > len(polys): from sympy.utilities.iterables import subsets free = set().union(*[p.free_symbols for p in polys]) free = list(ordered(free.intersection(symbols))) got_s = set() result = [] for syms in subsets(free, len(polys)): try: # returns [] or list of tuples of solutions for syms res = solve_poly_system(polys, *syms) if res: for r in res: skip = False for r1 in r: if got_s and any([ss in r1.free_symbols for ss in got_s]): # sol depends on previously # solved symbols: discard it skip = True if not skip: got_s.update(syms) result.extend([dict(list(zip(syms, r)))]) except NotImplementedError: pass if got_s: solved_syms = list(got_s) else: raise NotImplementedError('no valid subset found') else: try: result = solve_poly_system(polys, *symbols) if result: solved_syms = symbols # we don't know here if the symbols provided # were given or not, so let solve resolve that. # A list of dictionaries is going to always be # returned from here. result = [dict(list(zip(solved_syms, r))) for r in result] except NotImplementedError: failed.extend([g.as_expr() for g in polys]) solved_syms = [] result = None if result: if isinstance(result, dict): result = [result] else: result = [{}] if failed: # For each failed equation, see if we can solve for one of the # remaining symbols from that equation. If so, we update the # solution set and continue with the next failed equation, # repeating until we are done or we get an equation that can't # be solved. def _ok_syms(e, sort=False): rv = (e.free_symbols - solved_syms) & legal if sort: rv = list(rv) rv.sort(key=default_sort_key) return rv solved_syms = set(solved_syms) # set of symbols we have solved for legal = set(symbols) # what we are interested in # sort so equation with the fewest potential symbols is first u = Dummy() # used in solution checking for eq in ordered(failed, lambda _: len(_ok_syms(_))): newresult = [] bad_results = [] got_s = set() hit = False for r in result: # update eq with everything that is known so far eq2 = eq.subs(r) # if check is True then we see if it satisfies this # equation, otherwise we just accept it if check and r: b = checksol(u, u, eq2, minimal=True) if b is not None: # this solution is sufficient to know whether # it is valid or not so we either accept or # reject it, then continue if b: newresult.append(r) else: bad_results.append(r) continue # search for a symbol amongst those available that # can be solved for ok_syms = _ok_syms(eq2, sort=True) if not ok_syms: if r: newresult.append(r) break # skip as it's independent of desired symbols for s in ok_syms: try: soln = _solve(eq2, s, **flags) except NotImplementedError: continue # put each solution in r and append the now-expanded # result in the new result list; use copy since the # solution for s in being added in-place for sol in soln: if got_s and any([ss in sol.free_symbols for ss in got_s]): # sol depends on previously solved symbols: discard it continue rnew = r.copy() for k, v in r.items(): rnew[k] = v.subs(s, sol) # and add this new solution rnew[s] = sol newresult.append(rnew) hit = True got_s.add(s) if not hit: raise NotImplementedError('could not solve %s' % eq2) else: result = newresult for b in bad_results: if b in result: result.remove(b) default_simplify = bool(failed) # rely on system-solvers to simplify if flags.get('simplify', default_simplify): for r in result: for k in r: r[k] = simplify(r[k]) flags['simplify'] = False # don't need to do so in checksol now if checkdens: result = [r for r in result if not any(checksol(d, r, **flags) for d in dens)] if check and not linear: result = [r for r in result if not any(checksol(e, r, **flags) is False for e in exprs)] result = [r for r in result if r] if linear and result: result = result[0] return result def solve_linear(lhs, rhs=0, symbols=[], exclude=[]): r""" Return a tuple derived from f = lhs - rhs that is one of the following: (0, 1) meaning that ``f`` is independent of the symbols in ``symbols`` that aren't in ``exclude``, e.g:: >>> from sympy.solvers.solvers import solve_linear >>> from sympy.abc import x, y, z >>> from sympy import cos, sin >>> eq = y*cos(x)**2 + y*sin(x)**2 - y # = y*(1 - 1) = 0 >>> solve_linear(eq) (0, 1) >>> eq = cos(x)**2 + sin(x)**2 # = 1 >>> solve_linear(eq) (0, 1) >>> solve_linear(x, exclude=[x]) (0, 1) (0, 0) meaning that there is no solution to the equation amongst the symbols given. (If the first element of the tuple is not zero then the function is guaranteed to be dependent on a symbol in ``symbols``.) (symbol, solution) where symbol appears linearly in the numerator of ``f``, is in ``symbols`` (if given) and is not in ``exclude`` (if given). No simplification is done to ``f`` other than a ``mul=True`` expansion, so the solution will correspond strictly to a unique solution. ``(n, d)`` where ``n`` and ``d`` are the numerator and denominator of ``f`` when the numerator was not linear in any symbol of interest; ``n`` will never be a symbol unless a solution for that symbol was found (in which case the second element is the solution, not the denominator). Examples ======== >>> from sympy.core.power import Pow >>> from sympy.polys.polytools import cancel The variable ``x`` appears as a linear variable in each of the following: >>> solve_linear(x + y**2) (x, -y**2) >>> solve_linear(1/x - y**2) (x, y**(-2)) When not linear in x or y then the numerator and denominator are returned. >>> solve_linear(x**2/y**2 - 3) (x**2 - 3*y**2, y**2) If the numerator of the expression is a symbol then (0, 0) is returned if the solution for that symbol would have set any denominator to 0: >>> eq = 1/(1/x - 2) >>> eq.as_numer_denom() (x, 1 - 2*x) >>> solve_linear(eq) (0, 0) But automatic rewriting may cause a symbol in the denominator to appear in the numerator so a solution will be returned: >>> (1/x)**-1 x >>> solve_linear((1/x)**-1) (x, 0) Use an unevaluated expression to avoid this: >>> solve_linear(Pow(1/x, -1, evaluate=False)) (0, 0) If ``x`` is allowed to cancel in the following expression, then it appears to be linear in ``x``, but this sort of cancellation is not done by ``solve_linear`` so the solution will always satisfy the original expression without causing a division by zero error. >>> eq = x**2*(1/x - z**2/x) >>> solve_linear(cancel(eq)) (x, 0) >>> solve_linear(eq) (x**2*(1 - z**2), x) A list of symbols for which a solution is desired may be given: >>> solve_linear(x + y + z, symbols=[y]) (y, -x - z) A list of symbols to ignore may also be given: >>> solve_linear(x + y + z, exclude=[x]) (y, -x - z) (A solution for ``y`` is obtained because it is the first variable from the canonically sorted list of symbols that had a linear solution.) """ if isinstance(lhs, Equality): if rhs: raise ValueError(filldedent(''' If lhs is an Equality, rhs must be 0 but was %s''' % rhs)) rhs = lhs.rhs lhs = lhs.lhs dens = None eq = lhs - rhs n, d = eq.as_numer_denom() if not n: return S.Zero, S.One free = n.free_symbols if not symbols: symbols = free else: bad = [s for s in symbols if not s.is_Symbol] if bad: if len(bad) == 1: bad = bad[0] if len(symbols) == 1: eg = 'solve(%s, %s)' % (eq, symbols[0]) else: eg = 'solve(%s, *%s)' % (eq, list(symbols)) raise ValueError(filldedent(''' solve_linear only handles symbols, not %s. To isolate non-symbols use solve, e.g. >>> %s <<<. ''' % (bad, eg))) symbols = free.intersection(symbols) symbols = symbols.difference(exclude) if not symbols: return S.Zero, S.One dfree = d.free_symbols # derivatives are easy to do but tricky to analyze to see if they # are going to disallow a linear solution, so for simplicity we # just evaluate the ones that have the symbols of interest derivs = defaultdict(list) for der in n.atoms(Derivative): csym = der.free_symbols & symbols for c in csym: derivs[c].append(der) all_zero = True for xi in sorted(symbols, key=default_sort_key): # canonical order # if there are derivatives in this var, calculate them now if isinstance(derivs[xi], list): derivs[xi] = {der: der.doit() for der in derivs[xi]} newn = n.subs(derivs[xi]) dnewn_dxi = newn.diff(xi) # dnewn_dxi can be nonzero if it survives differentation by any # of its free symbols free = dnewn_dxi.free_symbols if dnewn_dxi and (not free or any(dnewn_dxi.diff(s) for s in free)): all_zero = False if dnewn_dxi is S.NaN: break if xi not in dnewn_dxi.free_symbols: vi = -1/dnewn_dxi*(newn.subs(xi, 0)) if dens is None: dens = _simple_dens(eq, symbols) if not any(checksol(di, {xi: vi}, minimal=True) is True for di in dens): # simplify any trivial integral irep = [(i, i.doit()) for i in vi.atoms(Integral) if i.function.is_number] # do a slight bit of simplification vi = expand_mul(vi.subs(irep)) return xi, vi if all_zero: return S.Zero, S.One if n.is_Symbol: # no solution for this symbol was found return S.Zero, S.Zero return n, d def minsolve_linear_system(system, *symbols, **flags): r""" Find a particular solution to a linear system. In particular, try to find a solution with the minimal possible number of non-zero variables using a naive algorithm with exponential complexity. If ``quick=True``, a heuristic is used. """ quick = flags.get('quick', False) # Check if there are any non-zero solutions at all s0 = solve_linear_system(system, *symbols, **flags) if not s0 or all(v == 0 for v in s0.values()): return s0 if quick: # We just solve the system and try to heuristically find a nice # solution. s = solve_linear_system(system, *symbols) def update(determined, solution): delete = [] for k, v in solution.items(): solution[k] = v.subs(determined) if not solution[k].free_symbols: delete.append(k) determined[k] = solution[k] for k in delete: del solution[k] determined = {} update(determined, s) while s: # NOTE sort by default_sort_key to get deterministic result k = max((k for k in s.values()), key=lambda x: (len(x.free_symbols), default_sort_key(x))) x = max(k.free_symbols, key=default_sort_key) if len(k.free_symbols) != 1: determined[x] = S(0) else: val = solve(k)[0] if val == 0 and all(v.subs(x, val) == 0 for v in s.values()): determined[x] = S(1) else: determined[x] = val update(determined, s) return determined else: # We try to select n variables which we want to be non-zero. # All others will be assumed zero. We try to solve the modified system. # If there is a non-trivial solution, just set the free variables to # one. If we do this for increasing n, trying all combinations of # variables, we will find an optimal solution. # We speed up slightly by starting at one less than the number of # variables the quick method manages. from itertools import combinations from sympy.utilities.misc import debug N = len(symbols) bestsol = minsolve_linear_system(system, *symbols, quick=True) n0 = len([x for x in bestsol.values() if x != 0]) for n in range(n0 - 1, 1, -1): debug('minsolve: %s' % n) thissol = None for nonzeros in combinations(list(range(N)), n): subm = Matrix([system.col(i).T for i in nonzeros] + [system.col(-1).T]).T s = solve_linear_system(subm, *[symbols[i] for i in nonzeros]) if s and not all(v == 0 for v in s.values()): subs = [(symbols[v], S(1)) for v in nonzeros] for k, v in s.items(): s[k] = v.subs(subs) for sym in symbols: if sym not in s: if symbols.index(sym) in nonzeros: s[sym] = S(1) else: s[sym] = S(0) thissol = s break if thissol is None: break bestsol = thissol return bestsol def solve_linear_system(system, *symbols, **flags): r""" Solve system of N linear equations with M variables, which means both under- and overdetermined systems are supported. The possible number of solutions is zero, one or infinite. Respectively, this procedure will return None or a dictionary with solutions. In the case of underdetermined systems, all arbitrary parameters are skipped. This may cause a situation in which an empty dictionary is returned. In that case, all symbols can be assigned arbitrary values. Input to this functions is a Nx(M+1) matrix, which means it has to be in augmented form. If you prefer to enter N equations and M unknowns then use `solve(Neqs, *Msymbols)` instead. Note: a local copy of the matrix is made by this routine so the matrix that is passed will not be modified. The algorithm used here is fraction-free Gaussian elimination, which results, after elimination, in an upper-triangular matrix. Then solutions are found using back-substitution. This approach is more efficient and compact than the Gauss-Jordan method. >>> from sympy import Matrix, solve_linear_system >>> from sympy.abc import x, y Solve the following system:: x + 4 y == 2 -2 x + y == 14 >>> system = Matrix(( (1, 4, 2), (-2, 1, 14))) >>> solve_linear_system(system, x, y) {x: -6, y: 2} A degenerate system returns an empty dictionary. >>> system = Matrix(( (0,0,0), (0,0,0) )) >>> solve_linear_system(system, x, y) {} """ do_simplify = flags.get('simplify', True) if system.rows == system.cols - 1 == len(symbols): try: # well behaved n-equations and n-unknowns inv = inv_quick(system[:, :-1]) rv = dict(zip(symbols, inv*system[:, -1])) if do_simplify: for k, v in rv.items(): rv[k] = simplify(v) if not all(i.is_zero for i in rv.values()): # non-trivial solution return rv except ValueError: pass matrix = system[:, :] syms = list(symbols) i, m = 0, matrix.cols - 1 # don't count augmentation while i < matrix.rows: if i == m: # an overdetermined system if any(matrix[i:, m]): return None # no solutions else: # remove trailing rows matrix = matrix[:i, :] break if not matrix[i, i]: # there is no pivot in current column # so try to find one in other columns for k in range(i + 1, m): if matrix[i, k]: break else: if matrix[i, m]: # We need to know if this is always zero or not. We # assume that if there are free symbols that it is not # identically zero (or that there is more than one way # to make this zero). Otherwise, if there are none, this # is a constant and we assume that it does not simplify # to zero XXX are there better (fast) ways to test this? # The .equals(0) method could be used but that can be # slow; numerical testing is prone to errors of scaling. if not matrix[i, m].free_symbols: return None # no solution # A row of zeros with a non-zero rhs can only be accepted # if there is another equivalent row. Any such rows will # be deleted. nrows = matrix.rows rowi = matrix.row(i) ip = None j = i + 1 while j < matrix.rows: # do we need to see if the rhs of j # is a constant multiple of i's rhs? rowj = matrix.row(j) if rowj == rowi: matrix.row_del(j) elif rowj[:-1] == rowi[:-1]: if ip is None: _, ip = rowi[-1].as_content_primitive() _, jp = rowj[-1].as_content_primitive() if not (simplify(jp - ip) or simplify(jp + ip)): matrix.row_del(j) j += 1 if nrows == matrix.rows: # no solution return None # zero row or was a linear combination of # other rows or was a row with a symbolic # expression that matched other rows, e.g. [0, 0, x - y] # so now we can safely skip it matrix.row_del(i) if not matrix: # every choice of variable values is a solution # so we return an empty dict instead of None return dict() continue # we want to change the order of columns so # the order of variables must also change syms[i], syms[k] = syms[k], syms[i] matrix.col_swap(i, k) pivot_inv = S.One/matrix[i, i] # divide all elements in the current row by the pivot matrix.row_op(i, lambda x, _: x * pivot_inv) for k in range(i + 1, matrix.rows): if matrix[k, i]: coeff = matrix[k, i] # subtract from the current row the row containing # pivot and multiplied by extracted coefficient matrix.row_op(k, lambda x, j: simplify(x - matrix[i, j]*coeff)) i += 1 # if there weren't any problems, augmented matrix is now # in row-echelon form so we can check how many solutions # there are and extract them using back substitution if len(syms) == matrix.rows: # this system is Cramer equivalent so there is # exactly one solution to this system of equations k, solutions = i - 1, {} while k >= 0: content = matrix[k, m] # run back-substitution for variables for j in range(k + 1, m): content -= matrix[k, j]*solutions[syms[j]] if do_simplify: solutions[syms[k]] = simplify(content) else: solutions[syms[k]] = content k -= 1 return solutions elif len(syms) > matrix.rows: # this system will have infinite number of solutions # dependent on exactly len(syms) - i parameters k, solutions = i - 1, {} while k >= 0: content = matrix[k, m] # run back-substitution for variables for j in range(k + 1, i): content -= matrix[k, j]*solutions[syms[j]] # run back-substitution for parameters for j in range(i, m): content -= matrix[k, j]*syms[j] if do_simplify: solutions[syms[k]] = simplify(content) else: solutions[syms[k]] = content k -= 1 return solutions else: return [] # no solutions def solve_undetermined_coeffs(equ, coeffs, sym, **flags): """Solve equation of a type p(x; a_1, ..., a_k) == q(x) where both p, q are univariate polynomials and f depends on k parameters. The result of this functions is a dictionary with symbolic values of those parameters with respect to coefficients in q. This functions accepts both Equations class instances and ordinary SymPy expressions. Specification of parameters and variable is obligatory for efficiency and simplicity reason. >>> from sympy import Eq >>> from sympy.abc import a, b, c, x >>> from sympy.solvers import solve_undetermined_coeffs >>> solve_undetermined_coeffs(Eq(2*a*x + a+b, x), [a, b], x) {a: 1/2, b: -1/2} >>> solve_undetermined_coeffs(Eq(a*c*x + a+b, x), [a, b], x) {a: 1/c, b: -1/c} """ if isinstance(equ, Equality): # got equation, so move all the # terms to the left hand side equ = equ.lhs - equ.rhs equ = cancel(equ).as_numer_denom()[0] system = list(collect(equ.expand(), sym, evaluate=False).values()) if not any(equ.has(sym) for equ in system): # consecutive powers in the input expressions have # been successfully collected, so solve remaining # system using Gaussian elimination algorithm return solve(system, *coeffs, **flags) else: return None # no solutions def solve_linear_system_LU(matrix, syms): """ Solves the augmented matrix system using LUsolve and returns a dictionary in which solutions are keyed to the symbols of syms *as ordered*. The matrix must be invertible. Examples ======== >>> from sympy import Matrix >>> from sympy.abc import x, y, z >>> from sympy.solvers.solvers import solve_linear_system_LU >>> solve_linear_system_LU(Matrix([ ... [1, 2, 0, 1], ... [3, 2, 2, 1], ... [2, 0, 0, 1]]), [x, y, z]) {x: 1/2, y: 1/4, z: -1/2} See Also ======== sympy.matrices.LUsolve """ if matrix.rows != matrix.cols - 1: raise ValueError("Rows should be equal to columns - 1") A = matrix[:matrix.rows, :matrix.rows] b = matrix[:, matrix.cols - 1:] soln = A.LUsolve(b) solutions = {} for i in range(soln.rows): solutions[syms[i]] = soln[i, 0] return solutions def det_perm(M): """Return the det(``M``) by using permutations to select factors. For size larger than 8 the number of permutations becomes prohibitively large, or if there are no symbols in the matrix, it is better to use the standard determinant routines, e.g. `M.det()`. See Also ======== det_minor det_quick """ args = [] s = True n = M.rows list_ = getattr(M, '_mat', None) if list_ is None: list_ = flatten(M.tolist()) for perm in generate_bell(n): fac = [] idx = 0 for j in perm: fac.append(list_[idx + j]) idx += n term = Mul(*fac) # disaster with unevaluated Mul -- takes forever for n=7 args.append(term if s else -term) s = not s return Add(*args) def det_minor(M): """Return the ``det(M)`` computed from minors without introducing new nesting in products. See Also ======== det_perm det_quick """ n = M.rows if n == 2: return M[0, 0]*M[1, 1] - M[1, 0]*M[0, 1] else: return sum([(1, -1)[i % 2]*Add(*[M[0, i]*d for d in Add.make_args(det_minor(M.minor_submatrix(0, i)))]) if M[0, i] else S.Zero for i in range(n)]) def det_quick(M, method=None): """Return ``det(M)`` assuming that either there are lots of zeros or the size of the matrix is small. If this assumption is not met, then the normal Matrix.det function will be used with method = ``method``. See Also ======== det_minor det_perm """ if any(i.has(Symbol) for i in M): if M.rows < 8 and all(i.has(Symbol) for i in M): return det_perm(M) return det_minor(M) else: return M.det(method=method) if method else M.det() def inv_quick(M): """Return the inverse of ``M``, assuming that either there are lots of zeros or the size of the matrix is small. """ from sympy.matrices import zeros if not all(i.is_Number for i in M): if not any(i.is_Number for i in M): det = lambda _: det_perm(_) else: det = lambda _: det_minor(_) else: return M.inv() n = M.rows d = det(M) if d is S.Zero: raise ValueError("Matrix det == 0; not invertible.") ret = zeros(n) s1 = -1 for i in range(n): s = s1 = -s1 for j in range(n): di = det(M.minor_submatrix(i, j)) ret[j, i] = s*di/d s = -s return ret # these are functions that have multiple inverse values per period multi_inverses = { sin: lambda x: (asin(x), S.Pi - asin(x)), cos: lambda x: (acos(x), 2*S.Pi - acos(x)), } def _tsolve(eq, sym, **flags): """ Helper for _solve that solves a transcendental equation with respect to the given symbol. Various equations containing powers and logarithms, can be solved. There is currently no guarantee that all solutions will be returned or that a real solution will be favored over a complex one. Either a list of potential solutions will be returned or None will be returned (in the case that no method was known to get a solution for the equation). All other errors (like the inability to cast an expression as a Poly) are unhandled. Examples ======== >>> from sympy import log >>> from sympy.solvers.solvers import _tsolve as tsolve >>> from sympy.abc import x >>> tsolve(3**(2*x + 5) - 4, x) [-5/2 + log(2)/log(3), (-5*log(3)/2 + log(2) + I*pi)/log(3)] >>> tsolve(log(x) + 2*x, x) [LambertW(2)/2] """ if 'tsolve_saw' not in flags: flags['tsolve_saw'] = [] if eq in flags['tsolve_saw']: return None else: flags['tsolve_saw'].append(eq) rhs, lhs = _invert(eq, sym) if lhs == sym: return [rhs] try: if lhs.is_Add: # it's time to try factoring; powdenest is used # to try get powers in standard form for better factoring f = factor(powdenest(lhs - rhs)) if f.is_Mul: return _solve(f, sym, **flags) if rhs: f = logcombine(lhs, force=flags.get('force', True)) if f.count(log) != lhs.count(log): if isinstance(f, log): return _solve(f.args[0] - exp(rhs), sym, **flags) return _tsolve(f - rhs, sym, **flags) elif lhs.is_Pow: if lhs.exp.is_Integer: if lhs - rhs != eq: return _solve(lhs - rhs, sym, **flags) if sym not in lhs.exp.free_symbols: return _solve(lhs.base - rhs**(1/lhs.exp), sym, **flags) # _tsolve calls this with Dummy before passing the actual number in. if any(t.is_Dummy for t in rhs.free_symbols): raise NotImplementedError # _tsolve will call here again... # a ** g(x) == 0 if not rhs: # f(x)**g(x) only has solutions where f(x) == 0 and g(x) != 0 at # the same place sol_base = _solve(lhs.base, sym, **flags) return [s for s in sol_base if lhs.exp.subs(sym, s) != 0] # a ** g(x) == b if not lhs.base.has(sym): if lhs.base == 0: return _solve(lhs.exp, sym, **flags) if rhs != 0 else [] # Gets most solutions... if lhs.base == rhs.as_base_exp()[0]: # handles case when bases are equal sol = _solve(lhs.exp - rhs.as_base_exp()[1], sym, **flags) else: # handles cases when bases are not equal and exp # may or may not be equal sol = _solve(exp(log(lhs.base)*lhs.exp)-exp(log(rhs)), sym, **flags) # Check for duplicate solutions def equal(expr1, expr2): return expr1.equals(expr2) or nsimplify(expr1) == nsimplify(expr2) # Guess a rational exponent e_rat = nsimplify(log(abs(rhs))/log(abs(lhs.base))) e_rat = simplify(posify(e_rat)[0]) n, d = fraction(e_rat) if expand(lhs.base**n - rhs**d) == 0: sol = [s for s in sol if not equal(lhs.exp.subs(sym, s), e_rat)] sol.extend(_solve(lhs.exp - e_rat, sym, **flags)) return list(ordered(set(sol))) # f(x) ** g(x) == c else: sol = [] logform = lhs.exp*log(lhs.base) - log(rhs) if logform != lhs - rhs: try: sol.extend(_solve(logform, sym, **flags)) except NotImplementedError: pass # Collect possible solutions and check with substitution later. check = [] if rhs == 1: # f(x) ** g(x) = 1 -- g(x)=0 or f(x)=+-1 check.extend(_solve(lhs.exp, sym, **flags)) check.extend(_solve(lhs.base - 1, sym, **flags)) check.extend(_solve(lhs.base + 1, sym, **flags)) elif rhs.is_Rational: for d in (i for i in divisors(abs(rhs.p)) if i != 1): e, t = integer_log(rhs.p, d) if not t: continue # rhs.p != d**b for s in divisors(abs(rhs.q)): if s**e== rhs.q: r = Rational(d, s) check.extend(_solve(lhs.base - r, sym, **flags)) check.extend(_solve(lhs.base + r, sym, **flags)) check.extend(_solve(lhs.exp - e, sym, **flags)) elif rhs.is_irrational: b_l, e_l = lhs.base.as_base_exp() n, d = e_l*lhs.exp.as_numer_denom() b, e = sqrtdenest(rhs).as_base_exp() check = [sqrtdenest(i) for i in (_solve(lhs.base - b, sym, **flags))] check.extend([sqrtdenest(i) for i in (_solve(lhs.exp - e, sym, **flags))]) if (e_l*d) !=1 : check.extend(_solve(b_l**(n) - rhs**(e_l*d), sym, **flags)) sol.extend(s for s in check if eq.subs(sym, s).equals(0)) return list(ordered(set(sol))) elif lhs.is_Function and len(lhs.args) == 1: if lhs.func in multi_inverses: # sin(x) = 1/3 -> x - asin(1/3) & x - (pi - asin(1/3)) soln = [] for i in multi_inverses[lhs.func](rhs): soln.extend(_solve(lhs.args[0] - i, sym, **flags)) return list(ordered(soln)) elif lhs.func == LambertW: return _solve(lhs.args[0] - rhs*exp(rhs), sym, **flags) rewrite = lhs.rewrite(exp) if rewrite != lhs: return _solve(rewrite - rhs, sym, **flags) except NotImplementedError: pass # maybe it is a lambert pattern if flags.pop('bivariate', True): # lambert forms may need some help being recognized, e.g. changing # 2**(3*x) + x**3*log(2)**3 + 3*x**2*log(2)**2 + 3*x*log(2) + 1 # to 2**(3*x) + (x*log(2) + 1)**3 g = _filtered_gens(eq.as_poly(), sym) up_or_log = set() for gi in g: if isinstance(gi, exp) or isinstance(gi, log): up_or_log.add(gi) elif gi.is_Pow: gisimp = powdenest(expand_power_exp(gi)) if gisimp.is_Pow and sym in gisimp.exp.free_symbols: up_or_log.add(gi) down = g.difference(up_or_log) eq_down = expand_log(expand_power_exp(eq)).subs( dict(list(zip(up_or_log, [0]*len(up_or_log))))) eq = expand_power_exp(factor(eq_down, deep=True) + (eq - eq_down)) rhs, lhs = _invert(eq, sym) if lhs.has(sym): try: poly = lhs.as_poly() g = _filtered_gens(poly, sym) sols = _solve_lambert(lhs - rhs, sym, g) for n, s in enumerate(sols): ns = nsimplify(s) if ns != s and eq.subs(sym, ns).equals(0): sols[n] = ns return sols except NotImplementedError: # maybe it's a convoluted function if len(g) == 2: try: gpu = bivariate_type(lhs - rhs, *g) if gpu is None: raise NotImplementedError g, p, u = gpu flags['bivariate'] = False inversion = _tsolve(g - u, sym, **flags) if inversion: sol = _solve(p, u, **flags) return list(ordered(set([i.subs(u, s) for i in inversion for s in sol]))) except NotImplementedError: pass else: pass if flags.pop('force', True): flags['force'] = False pos, reps = posify(lhs - rhs) for u, s in reps.items(): if s == sym: break else: u = sym if pos.has(u): try: soln = _solve(pos, u, **flags) return list(ordered([s.subs(reps) for s in soln])) except NotImplementedError: pass else: pass # here for coverage return # here for coverage # TODO: option for calculating J numerically @conserve_mpmath_dps def nsolve(*args, **kwargs): r""" Solve a nonlinear equation system numerically:: nsolve(f, [args,] x0, modules=['mpmath'], **kwargs) f is a vector function of symbolic expressions representing the system. args are the variables. If there is only one variable, this argument can be omitted. x0 is a starting vector close to a solution. Use the modules keyword to specify which modules should be used to evaluate the function and the Jacobian matrix. Make sure to use a module that supports matrices. For more information on the syntax, please see the docstring of lambdify. If the keyword arguments contain 'dict'=True (default is False) nsolve will return a list (perhaps empty) of solution mappings. This might be especially useful if you want to use nsolve as a fallback to solve since using the dict argument for both methods produces return values of consistent type structure. Please note: to keep this consistency with solve, the solution will be returned in a list even though nsolve (currently at least) only finds one solution at a time. Overdetermined systems are supported. >>> from sympy import Symbol, nsolve >>> import sympy >>> import mpmath >>> mpmath.mp.dps = 15 >>> x1 = Symbol('x1') >>> x2 = Symbol('x2') >>> f1 = 3 * x1**2 - 2 * x2**2 - 1 >>> f2 = x1**2 - 2 * x1 + x2**2 + 2 * x2 - 8 >>> print(nsolve((f1, f2), (x1, x2), (-1, 1))) Matrix([[-1.19287309935246], [1.27844411169911]]) For one-dimensional functions the syntax is simplified: >>> from sympy import sin, nsolve >>> from sympy.abc import x >>> nsolve(sin(x), x, 2) 3.14159265358979 >>> nsolve(sin(x), 2) 3.14159265358979 To solve with higher precision than the default, use the prec argument. >>> from sympy import cos >>> nsolve(cos(x) - x, 1) 0.739085133215161 >>> nsolve(cos(x) - x, 1, prec=50) 0.73908513321516064165531208767387340401341175890076 >>> cos(_) 0.73908513321516064165531208767387340401341175890076 To solve for complex roots of real functions, a nonreal initial point must be specified: >>> from sympy import I >>> nsolve(x**2 + 2, I) 1.4142135623731*I mpmath.findroot is used and you can find there more extensive documentation, especially concerning keyword parameters and available solvers. Note, however, that functions which are very steep near the root the verification of the solution may fail. In this case you should use the flag `verify=False` and independently verify the solution. >>> from sympy import cos, cosh >>> from sympy.abc import i >>> f = cos(x)*cosh(x) - 1 >>> nsolve(f, 3.14*100) Traceback (most recent call last): ... ValueError: Could not find root within given tolerance. (1.39267e+230 > 2.1684e-19) >>> ans = nsolve(f, 3.14*100, verify=False); ans 312.588469032184 >>> f.subs(x, ans).n(2) 2.1e+121 >>> (f/f.diff(x)).subs(x, ans).n(2) 7.4e-15 One might safely skip the verification if bounds of the root are known and a bisection method is used: >>> bounds = lambda i: (3.14*i, 3.14*(i + 1)) >>> nsolve(f, bounds(100), solver='bisect', verify=False) 315.730061685774 Alternatively, a function may be better behaved when the denominator is ignored. Since this is not always the case, however, the decision of what function to use is left to the discretion of the user. >>> eq = x**2/(1 - x)/(1 - 2*x)**2 - 100 >>> nsolve(eq, 0.46) Traceback (most recent call last): ... ValueError: Could not find root within given tolerance. (10000 > 2.1684e-19) Try another starting point or tweak arguments. >>> nsolve(eq.as_numer_denom()[0], 0.46) 0.46792545969349058 """ # there are several other SymPy functions that use method= so # guard against that here if 'method' in kwargs: raise ValueError(filldedent(''' Keyword "method" should not be used in this context. When using some mpmath solvers directly, the keyword "method" is used, but when using nsolve (and findroot) the keyword to use is "solver".''')) if 'prec' in kwargs: prec = kwargs.pop('prec') import mpmath mpmath.mp.dps = prec else: prec = None # keyword argument to return result as a dictionary as_dict = kwargs.pop('dict', False) # interpret arguments if len(args) == 3: f = args[0] fargs = args[1] x0 = args[2] if iterable(fargs) and iterable(x0): if len(x0) != len(fargs): raise TypeError('nsolve expected exactly %i guess vectors, got %i' % (len(fargs), len(x0))) elif len(args) == 2: f = args[0] fargs = None x0 = args[1] if iterable(f): raise TypeError('nsolve expected 3 arguments, got 2') elif len(args) < 2: raise TypeError('nsolve expected at least 2 arguments, got %i' % len(args)) else: raise TypeError('nsolve expected at most 3 arguments, got %i' % len(args)) modules = kwargs.get('modules', ['mpmath']) if iterable(f): f = list(f) for i, fi in enumerate(f): if isinstance(fi, Equality): f[i] = fi.lhs - fi.rhs f = Matrix(f).T if iterable(x0): x0 = list(x0) if not isinstance(f, Matrix): # assume it's a sympy expression if isinstance(f, Equality): f = f.lhs - f.rhs syms = f.free_symbols if fargs is None: fargs = syms.copy().pop() if not (len(syms) == 1 and (fargs in syms or fargs[0] in syms)): raise ValueError(filldedent(''' expected a one-dimensional and numerical function''')) # the function is much better behaved if there is no denominator # but sending the numerator is left to the user since sometimes # the function is better behaved when the denominator is present # e.g., issue 11768 f = lambdify(fargs, f, modules) x = sympify(findroot(f, x0, **kwargs)) if as_dict: return [{fargs: x}] return x if len(fargs) > f.cols: raise NotImplementedError(filldedent(''' need at least as many equations as variables''')) verbose = kwargs.get('verbose', False) if verbose: print('f(x):') print(f) # derive Jacobian J = f.jacobian(fargs) if verbose: print('J(x):') print(J) # create functions f = lambdify(fargs, f.T, modules) J = lambdify(fargs, J, modules) # solve the system numerically x = findroot(f, x0, J=J, **kwargs) if as_dict: return [dict(zip(fargs, [sympify(xi) for xi in x]))] return Matrix(x) def _invert(eq, *symbols, **kwargs): """Return tuple (i, d) where ``i`` is independent of ``symbols`` and ``d`` contains symbols. ``i`` and ``d`` are obtained after recursively using algebraic inversion until an uninvertible ``d`` remains. If there are no free symbols then ``d`` will be zero. Some (but not necessarily all) solutions to the expression ``i - d`` will be related to the solutions of the original expression. Examples ======== >>> from sympy.solvers.solvers import _invert as invert >>> from sympy import sqrt, cos >>> from sympy.abc import x, y >>> invert(x - 3) (3, x) >>> invert(3) (3, 0) >>> invert(2*cos(x) - 1) (1/2, cos(x)) >>> invert(sqrt(x) - 3) (3, sqrt(x)) >>> invert(sqrt(x) + y, x) (-y, sqrt(x)) >>> invert(sqrt(x) + y, y) (-sqrt(x), y) >>> invert(sqrt(x) + y, x, y) (0, sqrt(x) + y) If there is more than one symbol in a power's base and the exponent is not an Integer, then the principal root will be used for the inversion: >>> invert(sqrt(x + y) - 2) (4, x + y) >>> invert(sqrt(x + y) - 2) (4, x + y) If the exponent is an integer, setting ``integer_power`` to True will force the principal root to be selected: >>> invert(x**2 - 4, integer_power=True) (2, x) """ eq = sympify(eq) if eq.args: # make sure we are working with flat eq eq = eq.func(*eq.args) free = eq.free_symbols if not symbols: symbols = free if not free & set(symbols): return eq, S.Zero dointpow = bool(kwargs.get('integer_power', False)) lhs = eq rhs = S.Zero while True: was = lhs while True: indep, dep = lhs.as_independent(*symbols) # dep + indep == rhs if lhs.is_Add: # this indicates we have done it all if indep is S.Zero: break lhs = dep rhs -= indep # dep * indep == rhs else: # this indicates we have done it all if indep is S.One: break lhs = dep rhs /= indep # collect like-terms in symbols if lhs.is_Add: terms = {} for a in lhs.args: i, d = a.as_independent(*symbols) terms.setdefault(d, []).append(i) if any(len(v) > 1 for v in terms.values()): args = [] for d, i in terms.items(): if len(i) > 1: args.append(Add(*i)*d) else: args.append(i[0]*d) lhs = Add(*args) # if it's a two-term Add with rhs = 0 and two powers we can get the # dependent terms together, e.g. 3*f(x) + 2*g(x) -> f(x)/g(x) = -2/3 if lhs.is_Add and not rhs and len(lhs.args) == 2 and \ not lhs.is_polynomial(*symbols): a, b = ordered(lhs.args) ai, ad = a.as_independent(*symbols) bi, bd = b.as_independent(*symbols) if any(_ispow(i) for i in (ad, bd)): a_base, a_exp = ad.as_base_exp() b_base, b_exp = bd.as_base_exp() if a_base == b_base: # a = -b lhs = powsimp(powdenest(ad/bd)) rhs = -bi/ai else: rat = ad/bd _lhs = powsimp(ad/bd) if _lhs != rat: lhs = _lhs rhs = -bi/ai elif ai == -bi: if isinstance(ad, Function) and ad.func == bd.func: if len(ad.args) == len(bd.args) == 1: lhs = ad.args[0] - bd.args[0] elif len(ad.args) == len(bd.args): # should be able to solve # f(x, y) - f(2 - x, 0) == 0 -> x == 1 raise NotImplementedError( 'equal function with more than 1 argument') else: raise ValueError( 'function with different numbers of args') elif lhs.is_Mul and any(_ispow(a) for a in lhs.args): lhs = powsimp(powdenest(lhs)) if lhs.is_Function: if hasattr(lhs, 'inverse') and len(lhs.args) == 1: # -1 # f(x) = g -> x = f (g) # # /!\ inverse should not be defined if there are multiple values # for the function -- these are handled in _tsolve # rhs = lhs.inverse()(rhs) lhs = lhs.args[0] elif isinstance(lhs, atan2): y, x = lhs.args lhs = 2*atan(y/(sqrt(x**2 + y**2) + x)) elif lhs.func == rhs.func: if len(lhs.args) == len(rhs.args) == 1: lhs = lhs.args[0] rhs = rhs.args[0] elif len(lhs.args) == len(rhs.args): # should be able to solve # f(x, y) == f(2, 3) -> x == 2 # f(x, x + y) == f(2, 3) -> x == 2 raise NotImplementedError( 'equal function with more than 1 argument') else: raise ValueError( 'function with different numbers of args') if rhs and lhs.is_Pow and lhs.exp.is_Integer and lhs.exp < 0: lhs = 1/lhs rhs = 1/rhs # base**a = b -> base = b**(1/a) if # a is an Integer and dointpow=True (this gives real branch of root) # a is not an Integer and the equation is multivariate and the # base has more than 1 symbol in it # The rationale for this is that right now the multi-system solvers # doesn't try to resolve generators to see, for example, if the whole # system is written in terms of sqrt(x + y) so it will just fail, so we # do that step here. if lhs.is_Pow and ( lhs.exp.is_Integer and dointpow or not lhs.exp.is_Integer and len(symbols) > 1 and len(lhs.base.free_symbols & set(symbols)) > 1): rhs = rhs**(1/lhs.exp) lhs = lhs.base if lhs == was: break return rhs, lhs def unrad(eq, *syms, **flags): """ Remove radicals with symbolic arguments and return (eq, cov), None or raise an error: None is returned if there are no radicals to remove. NotImplementedError is raised if there are radicals and they cannot be removed or if the relationship between the original symbols and the change of variable needed to rewrite the system as a polynomial cannot be solved. Otherwise the tuple, ``(eq, cov)``, is returned where:: ``eq``, ``cov`` ``eq`` is an equation without radicals (in the symbol(s) of interest) whose solutions are a superset of the solutions to the original expression. ``eq`` might be re-written in terms of a new variable; the relationship to the original variables is given by ``cov`` which is a list containing ``v`` and ``v**p - b`` where ``p`` is the power needed to clear the radical and ``b`` is the radical now expressed as a polynomial in the symbols of interest. For example, for sqrt(2 - x) the tuple would be ``(c, c**2 - 2 + x)``. The solutions of ``eq`` will contain solutions to the original equation (if there are any). ``syms`` an iterable of symbols which, if provided, will limit the focus of radical removal: only radicals with one or more of the symbols of interest will be cleared. All free symbols are used if ``syms`` is not set. ``flags`` are used internally for communication during recursive calls. Two options are also recognized:: ``take``, when defined, is interpreted as a single-argument function that returns True if a given Pow should be handled. Radicals can be removed from an expression if:: * all bases of the radicals are the same; a change of variables is done in this case. * if all radicals appear in one term of the expression * there are only 4 terms with sqrt() factors or there are less than four terms having sqrt() factors * there are only two terms with radicals Examples ======== >>> from sympy.solvers.solvers import unrad >>> from sympy.abc import x >>> from sympy import sqrt, Rational, root, real_roots, solve >>> unrad(sqrt(x)*x**Rational(1, 3) + 2) (x**5 - 64, []) >>> unrad(sqrt(x) + root(x + 1, 3)) (x**3 - x**2 - 2*x - 1, []) >>> eq = sqrt(x) + root(x, 3) - 2 >>> unrad(eq) (_p**3 + _p**2 - 2, [_p, _p**6 - x]) """ _inv_error = 'cannot get an analytical solution for the inversion' uflags = dict(check=False, simplify=False) def _cov(p, e): if cov: # XXX - uncovered oldp, olde = cov if Poly(e, p).degree(p) in (1, 2): cov[:] = [p, olde.subs(oldp, _solve(e, p, **uflags)[0])] else: raise NotImplementedError else: cov[:] = [p, e] def _canonical(eq, cov): if cov: # change symbol to vanilla so no solutions are eliminated p, e = cov rep = {p: Dummy(p.name)} eq = eq.xreplace(rep) cov = [p.xreplace(rep), e.xreplace(rep)] # remove constants and powers of factors since these don't change # the location of the root; XXX should factor or factor_terms be used? eq = factor_terms(_mexpand(eq.as_numer_denom()[0], recursive=True), clear=True) if eq.is_Mul: args = [] for f in eq.args: if f.is_number: continue if f.is_Pow and _take(f, True): args.append(f.base) else: args.append(f) eq = Mul(*args) # leave as Mul for more efficient solving # make the sign canonical free = eq.free_symbols if len(free) == 1: if eq.coeff(free.pop()**degree(eq)).could_extract_minus_sign(): eq = -eq elif eq.could_extract_minus_sign(): eq = -eq return eq, cov def _Q(pow): # return leading Rational of denominator of Pow's exponent c = pow.as_base_exp()[1].as_coeff_Mul()[0] if not c.is_Rational: return S.One return c.q # define the _take method that will determine whether a term is of interest def _take(d, take_int_pow): # return True if coefficient of any factor's exponent's den is not 1 for pow in Mul.make_args(d): if not (pow.is_Symbol or pow.is_Pow): continue b, e = pow.as_base_exp() if not b.has(*syms): continue if not take_int_pow and _Q(pow) == 1: continue free = pow.free_symbols if free.intersection(syms): return True return False _take = flags.setdefault('_take', _take) cov, nwas, rpt = [flags.setdefault(k, v) for k, v in sorted(dict(cov=[], n=None, rpt=0).items())] # preconditioning eq = powdenest(factor_terms(eq, radical=True, clear=True)) eq, d = eq.as_numer_denom() eq = _mexpand(eq, recursive=True) if eq.is_number: return syms = set(syms) or eq.free_symbols poly = eq.as_poly() gens = [g for g in poly.gens if _take(g, True)] if not gens: return # check for trivial case # - already a polynomial in integer powers if all(_Q(g) == 1 for g in gens): return # - an exponent has a symbol of interest (don't handle) if any(g.as_base_exp()[1].has(*syms) for g in gens): return def _rads_bases_lcm(poly): # if all the bases are the same or all the radicals are in one # term, `lcm` will be the lcm of the denominators of the # exponents of the radicals lcm = 1 rads = set() bases = set() for g in poly.gens: if not _take(g, False): continue q = _Q(g) if q != 1: rads.add(g) lcm = ilcm(lcm, q) bases.add(g.base) return rads, bases, lcm rads, bases, lcm = _rads_bases_lcm(poly) if not rads: return covsym = Dummy('p', nonnegative=True) # only keep in syms symbols that actually appear in radicals; # and update gens newsyms = set() for r in rads: newsyms.update(syms & r.free_symbols) if newsyms != syms: syms = newsyms gens = [g for g in gens if g.free_symbols & syms] # get terms together that have common generators drad = dict(list(zip(rads, list(range(len(rads)))))) rterms = {(): []} args = Add.make_args(poly.as_expr()) for t in args: if _take(t, False): common = set(t.as_poly().gens).intersection(rads) key = tuple(sorted([drad[i] for i in common])) else: key = () rterms.setdefault(key, []).append(t) others = Add(*rterms.pop(())) rterms = [Add(*rterms[k]) for k in rterms.keys()] # the output will depend on the order terms are processed, so # make it canonical quickly rterms = list(reversed(list(ordered(rterms)))) ok = False # we don't have a solution yet depth = sqrt_depth(eq) if len(rterms) == 1 and not (rterms[0].is_Add and lcm > 2): eq = rterms[0]**lcm - ((-others)**lcm) ok = True else: if len(rterms) == 1 and rterms[0].is_Add: rterms = list(rterms[0].args) if len(bases) == 1: b = bases.pop() if len(syms) > 1: free = b.free_symbols x = {g for g in gens if g.is_Symbol} & free if not x: x = free x = ordered(x) else: x = syms x = list(x)[0] try: inv = _solve(covsym**lcm - b, x, **uflags) if not inv: raise NotImplementedError eq = poly.as_expr().subs(b, covsym**lcm).subs(x, inv[0]) _cov(covsym, covsym**lcm - b) return _canonical(eq, cov) except NotImplementedError: pass else: # no longer consider integer powers as generators gens = [g for g in gens if _Q(g) != 1] if len(rterms) == 2: if not others: eq = rterms[0]**lcm - (-rterms[1])**lcm ok = True elif not log(lcm, 2).is_Integer: # the lcm-is-power-of-two case is handled below r0, r1 = rterms if flags.get('_reverse', False): r1, r0 = r0, r1 i0 = _rads0, _bases0, lcm0 = _rads_bases_lcm(r0.as_poly()) i1 = _rads1, _bases1, lcm1 = _rads_bases_lcm(r1.as_poly()) for reverse in range(2): if reverse: i0, i1 = i1, i0 r0, r1 = r1, r0 _rads1, _, lcm1 = i1 _rads1 = Mul(*_rads1) t1 = _rads1**lcm1 c = covsym**lcm1 - t1 for x in syms: try: sol = _solve(c, x, **uflags) if not sol: raise NotImplementedError neweq = r0.subs(x, sol[0]) + covsym*r1/_rads1 + \ others tmp = unrad(neweq, covsym) if tmp: eq, newcov = tmp if newcov: newp, newc = newcov _cov(newp, c.subs(covsym, _solve(newc, covsym, **uflags)[0])) else: _cov(covsym, c) else: eq = neweq _cov(covsym, c) ok = True break except NotImplementedError: if reverse: raise NotImplementedError( 'no successful change of variable found') else: pass if ok: break elif len(rterms) == 3: # two cube roots and another with order less than 5 # (so an analytical solution can be found) or a base # that matches one of the cube root bases info = [_rads_bases_lcm(i.as_poly()) for i in rterms] RAD = 0 BASES = 1 LCM = 2 if info[0][LCM] != 3: info.append(info.pop(0)) rterms.append(rterms.pop(0)) elif info[1][LCM] != 3: info.append(info.pop(1)) rterms.append(rterms.pop(1)) if info[0][LCM] == info[1][LCM] == 3: if info[1][BASES] != info[2][BASES]: info[0], info[1] = info[1], info[0] rterms[0], rterms[1] = rterms[1], rterms[0] if info[1][BASES] == info[2][BASES]: eq = rterms[0]**3 + (rterms[1] + rterms[2] + others)**3 ok = True elif info[2][LCM] < 5: # a*root(A, 3) + b*root(B, 3) + others = c a, b, c, d, A, B = [Dummy(i) for i in 'abcdAB'] # zz represents the unraded expression into which the # specifics for this case are substituted zz = (c - d)*(A**3*a**9 + 3*A**2*B*a**6*b**3 - 3*A**2*a**6*c**3 + 9*A**2*a**6*c**2*d - 9*A**2*a**6*c*d**2 + 3*A**2*a**6*d**3 + 3*A*B**2*a**3*b**6 + 21*A*B*a**3*b**3*c**3 - 63*A*B*a**3*b**3*c**2*d + 63*A*B*a**3*b**3*c*d**2 - 21*A*B*a**3*b**3*d**3 + 3*A*a**3*c**6 - 18*A*a**3*c**5*d + 45*A*a**3*c**4*d**2 - 60*A*a**3*c**3*d**3 + 45*A*a**3*c**2*d**4 - 18*A*a**3*c*d**5 + 3*A*a**3*d**6 + B**3*b**9 - 3*B**2*b**6*c**3 + 9*B**2*b**6*c**2*d - 9*B**2*b**6*c*d**2 + 3*B**2*b**6*d**3 + 3*B*b**3*c**6 - 18*B*b**3*c**5*d + 45*B*b**3*c**4*d**2 - 60*B*b**3*c**3*d**3 + 45*B*b**3*c**2*d**4 - 18*B*b**3*c*d**5 + 3*B*b**3*d**6 - c**9 + 9*c**8*d - 36*c**7*d**2 + 84*c**6*d**3 - 126*c**5*d**4 + 126*c**4*d**5 - 84*c**3*d**6 + 36*c**2*d**7 - 9*c*d**8 + d**9) def _t(i): b = Mul(*info[i][RAD]) return cancel(rterms[i]/b), Mul(*info[i][BASES]) aa, AA = _t(0) bb, BB = _t(1) cc = -rterms[2] dd = others eq = zz.xreplace(dict(zip( (a, A, b, B, c, d), (aa, AA, bb, BB, cc, dd)))) ok = True # handle power-of-2 cases if not ok: if log(lcm, 2).is_Integer and (not others and len(rterms) == 4 or len(rterms) < 4): def _norm2(a, b): return a**2 + b**2 + 2*a*b if len(rterms) == 4: # (r0+r1)**2 - (r2+r3)**2 r0, r1, r2, r3 = rterms eq = _norm2(r0, r1) - _norm2(r2, r3) ok = True elif len(rterms) == 3: # (r1+r2)**2 - (r0+others)**2 r0, r1, r2 = rterms eq = _norm2(r1, r2) - _norm2(r0, others) ok = True elif len(rterms) == 2: # r0**2 - (r1+others)**2 r0, r1 = rterms eq = r0**2 - _norm2(r1, others) ok = True new_depth = sqrt_depth(eq) if ok else depth rpt += 1 # XXX how many repeats with others unchanging is enough? if not ok or ( nwas is not None and len(rterms) == nwas and new_depth is not None and new_depth == depth and rpt > 3): raise NotImplementedError('Cannot remove all radicals') flags.update(dict(cov=cov, n=len(rterms), rpt=rpt)) neq = unrad(eq, *syms, **flags) if neq: eq, cov = neq eq, cov = _canonical(eq, cov) return eq, cov from sympy.solvers.bivariate import ( bivariate_type, _solve_lambert, _filtered_gens)

19dda14fc0d39382644a4b0f011ef46ed41fd2093bb44f561c74d8ff04b0a687

""" Finite difference weights ========================= This module implements an algorithm for efficient generation of finite difference weights for ordinary differentials of functions for derivatives from 0 (interpolation) up to arbitrary order. The core algorithm is provided in the finite difference weight generating function (``finite_diff_weights``), and two convenience functions are provided for: - estimating a derivative (or interpolate) directly from a series of points is also provided (``apply_finite_diff``). - differentiating by using finite difference approximations (``differentiate_finite``). """ from sympy import Derivative, S from sympy.core.compatibility import iterable, range from sympy.core.decorators import deprecated def finite_diff_weights(order, x_list, x0=S.One): """ Calculates the finite difference weights for an arbitrarily spaced one-dimensional grid (``x_list``) for derivatives at ``x0`` of order 0, 1, ..., up to ``order`` using a recursive formula. Order of accuracy is at least ``len(x_list) - order``, if ``x_list`` is defined correctly. Parameters ========== order: int Up to what derivative order weights should be calculated. 0 corresponds to interpolation. x_list: sequence Sequence of (unique) values for the independent variable. It is useful (but not necessary) to order ``x_list`` from nearest to furthest from ``x0``; see examples below. x0: Number or Symbol Root or value of the independent variable for which the finite difference weights should be generated. Default is ``S.One``. Returns ======= list A list of sublists, each corresponding to coefficients for increasing derivative order, and each containing lists of coefficients for increasing subsets of x_list. Examples ======== >>> from sympy import S >>> from sympy.calculus import finite_diff_weights >>> res = finite_diff_weights(1, [-S(1)/2, S(1)/2, S(3)/2, S(5)/2], 0) >>> res [[[1, 0, 0, 0], [1/2, 1/2, 0, 0], [3/8, 3/4, -1/8, 0], [5/16, 15/16, -5/16, 1/16]], [[0, 0, 0, 0], [-1, 1, 0, 0], [-1, 1, 0, 0], [-23/24, 7/8, 1/8, -1/24]]] >>> res[0][-1] # FD weights for 0th derivative, using full x_list [5/16, 15/16, -5/16, 1/16] >>> res[1][-1] # FD weights for 1st derivative [-23/24, 7/8, 1/8, -1/24] >>> res[1][-2] # FD weights for 1st derivative, using x_list[:-1] [-1, 1, 0, 0] >>> res[1][-1][0] # FD weight for 1st deriv. for x_list[0] -23/24 >>> res[1][-1][1] # FD weight for 1st deriv. for x_list[1], etc. 7/8 Each sublist contains the most accurate formula at the end. Note, that in the above example ``res[1][1]`` is the same as ``res[1][2]``. Since res[1][2] has an order of accuracy of ``len(x_list[:3]) - order = 3 - 1 = 2``, the same is true for ``res[1][1]``! >>> from sympy import S >>> from sympy.calculus import finite_diff_weights >>> res = finite_diff_weights(1, [S(0), S(1), -S(1), S(2), -S(2)], 0)[1] >>> res [[0, 0, 0, 0, 0], [-1, 1, 0, 0, 0], [0, 1/2, -1/2, 0, 0], [-1/2, 1, -1/3, -1/6, 0], [0, 2/3, -2/3, -1/12, 1/12]] >>> res[0] # no approximation possible, using x_list[0] only [0, 0, 0, 0, 0] >>> res[1] # classic forward step approximation [-1, 1, 0, 0, 0] >>> res[2] # classic centered approximation [0, 1/2, -1/2, 0, 0] >>> res[3:] # higher order approximations [[-1/2, 1, -1/3, -1/6, 0], [0, 2/3, -2/3, -1/12, 1/12]] Let us compare this to a differently defined ``x_list``. Pay attention to ``foo[i][k]`` corresponding to the gridpoint defined by ``x_list[k]``. >>> from sympy import S >>> from sympy.calculus import finite_diff_weights >>> foo = finite_diff_weights(1, [-S(2), -S(1), S(0), S(1), S(2)], 0)[1] >>> foo [[0, 0, 0, 0, 0], [-1, 1, 0, 0, 0], [1/2, -2, 3/2, 0, 0], [1/6, -1, 1/2, 1/3, 0], [1/12, -2/3, 0, 2/3, -1/12]] >>> foo[1] # not the same and of lower accuracy as res[1]! [-1, 1, 0, 0, 0] >>> foo[2] # classic double backward step approximation [1/2, -2, 3/2, 0, 0] >>> foo[4] # the same as res[4] [1/12, -2/3, 0, 2/3, -1/12] Note that, unless you plan on using approximations based on subsets of ``x_list``, the order of gridpoints does not matter. The capability to generate weights at arbitrary points can be used e.g. to minimize Runge's phenomenon by using Chebyshev nodes: >>> from sympy import cos, symbols, pi, simplify >>> from sympy.calculus import finite_diff_weights >>> N, (h, x) = 4, symbols('h x') >>> x_list = [x+h*cos(i*pi/(N)) for i in range(N,-1,-1)] # chebyshev nodes >>> print(x_list) [-h + x, -sqrt(2)*h/2 + x, x, sqrt(2)*h/2 + x, h + x] >>> mycoeffs = finite_diff_weights(1, x_list, 0)[1][4] >>> [simplify(c) for c in mycoeffs] #doctest: +NORMALIZE_WHITESPACE [(h**3/2 + h**2*x - 3*h*x**2 - 4*x**3)/h**4, (-sqrt(2)*h**3 - 4*h**2*x + 3*sqrt(2)*h*x**2 + 8*x**3)/h**4, 6*x/h**2 - 8*x**3/h**4, (sqrt(2)*h**3 - 4*h**2*x - 3*sqrt(2)*h*x**2 + 8*x**3)/h**4, (-h**3/2 + h**2*x + 3*h*x**2 - 4*x**3)/h**4] Notes ===== If weights for a finite difference approximation of 3rd order derivative is wanted, weights for 0th, 1st and 2nd order are calculated "for free", so are formulae using subsets of ``x_list``. This is something one can take advantage of to save computational cost. Be aware that one should define ``x_list`` from nearest to furthest from ``x0``. If not, subsets of ``x_list`` will yield poorer approximations, which might not grand an order of accuracy of ``len(x_list) - order``. See also ======== sympy.calculus.finite_diff.apply_finite_diff References ========== .. [1] Generation of Finite Difference Formulas on Arbitrarily Spaced Grids, Bengt Fornberg; Mathematics of computation; 51; 184; (1988); 699-706; doi:10.1090/S0025-5718-1988-0935077-0 """ # The notation below closely corresponds to the one used in the paper. if order < 0: raise ValueError("Negative derivative order illegal.") if int(order) != order: raise ValueError("Non-integer order illegal") M = order N = len(x_list) - 1 delta = [[[0 for nu in range(N+1)] for n in range(N+1)] for m in range(M+1)] delta[0][0][0] = S(1) c1 = S(1) for n in range(1, N+1): c2 = S(1) for nu in range(0, n): c3 = x_list[n]-x_list[nu] c2 = c2 * c3 if n <= M: delta[n][n-1][nu] = 0 for m in range(0, min(n, M)+1): delta[m][n][nu] = (x_list[n]-x0)*delta[m][n-1][nu] -\ m*delta[m-1][n-1][nu] delta[m][n][nu] /= c3 for m in range(0, min(n, M)+1): delta[m][n][n] = c1/c2*(m*delta[m-1][n-1][n-1] - (x_list[n-1]-x0)*delta[m][n-1][n-1]) c1 = c2 return delta def apply_finite_diff(order, x_list, y_list, x0=S(0)): """ Calculates the finite difference approximation of the derivative of requested order at ``x0`` from points provided in ``x_list`` and ``y_list``. Parameters ========== order: int order of derivative to approximate. 0 corresponds to interpolation. x_list: sequence Sequence of (unique) values for the independent variable. y_list: sequence The function value at corresponding values for the independent variable in x_list. x0: Number or Symbol At what value of the independent variable the derivative should be evaluated. Defaults to S(0). Returns ======= sympy.core.add.Add or sympy.core.numbers.Number The finite difference expression approximating the requested derivative order at ``x0``. Examples ======== >>> from sympy.calculus import apply_finite_diff >>> cube = lambda arg: (1.0*arg)**3 >>> xlist = range(-3,3+1) >>> apply_finite_diff(2, xlist, map(cube, xlist), 2) - 12 # doctest: +SKIP -3.55271367880050e-15 we see that the example above only contain rounding errors. apply_finite_diff can also be used on more abstract objects: >>> from sympy import IndexedBase, Idx >>> from sympy.calculus import apply_finite_diff >>> x, y = map(IndexedBase, 'xy') >>> i = Idx('i') >>> x_list, y_list = zip(*[(x[i+j], y[i+j]) for j in range(-1,2)]) >>> apply_finite_diff(1, x_list, y_list, x[i]) ((x[i + 1] - x[i])/(-x[i - 1] + x[i]) - 1)*y[i]/(x[i + 1] - x[i]) - \ (x[i + 1] - x[i])*y[i - 1]/((x[i + 1] - x[i - 1])*(-x[i - 1] + x[i])) + \ (-x[i - 1] + x[i])*y[i + 1]/((x[i + 1] - x[i - 1])*(x[i + 1] - x[i])) Notes ===== Order = 0 corresponds to interpolation. Only supply so many points you think makes sense to around x0 when extracting the derivative (the function need to be well behaved within that region). Also beware of Runge's phenomenon. See also ======== sympy.calculus.finite_diff.finite_diff_weights References ========== Fortran 90 implementation with Python interface for numerics: finitediff_ .. _finitediff: https://github.com/bjodah/finitediff """ # In the original paper the following holds for the notation: # M = order # N = len(x_list) - 1 N = len(x_list) - 1 if len(x_list) != len(y_list): raise ValueError("x_list and y_list not equal in length.") delta = finite_diff_weights(order, x_list, x0) derivative = 0 for nu in range(0, len(x_list)): derivative += delta[order][N][nu]*y_list[nu] return derivative def _as_finite_diff(derivative, points=1, x0=None, wrt=None): """ Returns an approximation of a derivative of a function in the form of a finite difference formula. The expression is a weighted sum of the function at a number of discrete values of (one of) the independent variable(s). Parameters ========== derivative: a Derivative instance points: sequence or coefficient, optional If sequence: discrete values (length >= order+1) of the independent variable used for generating the finite difference weights. If it is a coefficient, it will be used as the step-size for generating an equidistant sequence of length order+1 centered around ``x0``. default: 1 (step-size 1) x0: number or Symbol, optional the value of the independent variable (``wrt``) at which the derivative is to be approximated. Default: same as ``wrt``. wrt: Symbol, optional "with respect to" the variable for which the (partial) derivative is to be approximated for. If not provided it is required that the Derivative is ordinary. Default: ``None``. Examples ======== >>> from sympy import symbols, Function, exp, sqrt, Symbol, as_finite_diff >>> from sympy.utilities.exceptions import SymPyDeprecationWarning >>> import warnings >>> warnings.simplefilter("ignore", SymPyDeprecationWarning) >>> x, h = symbols('x h') >>> f = Function('f') >>> as_finite_diff(f(x).diff(x)) -f(x - 1/2) + f(x + 1/2) The default step size and number of points are 1 and ``order + 1`` respectively. We can change the step size by passing a symbol as a parameter: >>> as_finite_diff(f(x).diff(x), h) -f(-h/2 + x)/h + f(h/2 + x)/h We can also specify the discretized values to be used in a sequence: >>> as_finite_diff(f(x).diff(x), [x, x+h, x+2*h]) -3*f(x)/(2*h) + 2*f(h + x)/h - f(2*h + x)/(2*h) The algorithm is not restricted to use equidistant spacing, nor do we need to make the approximation around ``x0``, but we can get an expression estimating the derivative at an offset: >>> e, sq2 = exp(1), sqrt(2) >>> xl = [x-h, x+h, x+e*h] >>> as_finite_diff(f(x).diff(x, 1), xl, x+h*sq2) 2*h*((h + sqrt(2)*h)/(2*h) - (-sqrt(2)*h + h)/(2*h))*f(E*h + x)/\ ((-h + E*h)*(h + E*h)) + (-(-sqrt(2)*h + h)/(2*h) - \ (-sqrt(2)*h + E*h)/(2*h))*f(-h + x)/(h + E*h) + \ (-(h + sqrt(2)*h)/(2*h) + (-sqrt(2)*h + E*h)/(2*h))*f(h + x)/(-h + E*h) Partial derivatives are also supported: >>> y = Symbol('y') >>> d2fdxdy=f(x,y).diff(x,y) >>> as_finite_diff(d2fdxdy, wrt=x) -Derivative(f(x - 1/2, y), y) + Derivative(f(x + 1/2, y), y) See also ======== sympy.calculus.finite_diff.apply_finite_diff sympy.calculus.finite_diff.finite_diff_weights """ if derivative.is_Derivative: pass elif derivative.is_Atom: return derivative else: return derivative.fromiter( [_as_finite_diff(ar, points, x0, wrt) for ar in derivative.args], **derivative.assumptions0) if wrt is None: old = None for v in derivative.variables: if old is v: continue derivative = _as_finite_diff(derivative, points, x0, v) old = v return derivative order = derivative.variables.count(wrt) if x0 is None: x0 = wrt if not iterable(points): if getattr(points, 'is_Function', False) and wrt in points.args: points = points.subs(wrt, x0) # points is simply the step-size, let's make it a # equidistant sequence centered around x0 if order % 2 == 0: # even order => odd number of points, grid point included points = [x0 + points*i for i in range(-order//2, order//2 + 1)] else: # odd order => even number of points, half-way wrt grid point points = [x0 + points*S(i)/2 for i in range(-order, order + 1, 2)] others = [wrt, 0] for v in set(derivative.variables): if v == wrt: continue others += [v, derivative.variables.count(v)] if len(points) < order+1: raise ValueError("Too few points for order %d" % order) return apply_finite_diff(order, points, [ Derivative(derivative.expr.subs({wrt: x}), *others) for x in points], x0) as_finite_diff = deprecated( useinstead="Derivative.as_finite_difference", deprecated_since_version="1.1", issue=11410)(_as_finite_diff) as_finite_diff.__doc__ = """ Deprecated function. Use Diff.as_finite_difference instead. """ def differentiate_finite(expr, *symbols, # points=1, x0=None, wrt=None, evaluate=True, #Py2: **kwargs): r""" Differentiate expr and replace Derivatives with finite differences. Parameters ========== expr : expression \*symbols : differentiate with respect to symbols points: sequence or coefficient, optional see ``Derivative.as_finite_difference`` x0: number or Symbol, optional see ``Derivative.as_finite_difference`` wrt: Symbol, optional see ``Derivative.as_finite_difference`` evaluate : bool kwarg passed on to ``diff``, whether or not to evaluate the Derivative intermediately (default: ``False``). Examples ======== >>> from sympy import cos, sin, Function, differentiate_finite >>> from sympy.abc import x, y, h >>> f, g = Function('f'), Function('g') >>> differentiate_finite(f(x)*g(x), x, points=[x-h, x+h]) -f(-h + x)*g(-h + x)/(2*h) + f(h + x)*g(h + x)/(2*h) Note that the above form preserves the product rule in discrete form. If we want we can pass ``evaluate=True`` to get another form (which is usually not what we want): >>> differentiate_finite(f(x)*g(x), x, points=[x-h, x+h], evaluate=True).simplify() -((f(-h + x) - f(h + x))*g(x) + (g(-h + x) - g(h + x))*f(x))/(2*h) ``differentiate_finite`` works on any expression: >>> differentiate_finite(f(x) + sin(x), x, 2) -2*f(x) + f(x - 1) + f(x + 1) - 2*sin(x) + sin(x - 1) + sin(x + 1) >>> differentiate_finite(f(x) + sin(x), x, 2, evaluate=True) -2*f(x) + f(x - 1) + f(x + 1) - sin(x) >>> differentiate_finite(f(x, y), x, y) f(x - 1/2, y - 1/2) - f(x - 1/2, y + 1/2) - f(x + 1/2, y - 1/2) + f(x + 1/2, y + 1/2) """ # Key-word only arguments only available in Python 3 points = kwargs.pop('points', 1) x0 = kwargs.pop('x0', None) wrt = kwargs.pop('wrt', None) evaluate = kwargs.pop('evaluate', False) if kwargs: raise ValueError("Unknown kwargs: %s" % kwargs) Dexpr = expr.diff(*symbols, evaluate=evaluate) return Dexpr.replace( lambda arg: arg.is_Derivative, lambda arg: arg.as_finite_difference(points=points, x0=x0, wrt=wrt))

8d74baf1a03748fd69da42cf8b2e282e0767d1ea414dfe3557bb0a15c28ccfad

""" module for generating C, C++, Fortran77, Fortran90, Julia, Rust and Octave/Matlab routines that evaluate sympy expressions. This module is work in progress. Only the milestones with a '+' character in the list below have been completed. --- How is sympy.utilities.codegen different from sympy.printing.ccode? --- We considered the idea to extend the printing routines for sympy functions in such a way that it prints complete compilable code, but this leads to a few unsurmountable issues that can only be tackled with dedicated code generator: - For C, one needs both a code and a header file, while the printing routines generate just one string. This code generator can be extended to support .pyf files for f2py. - SymPy functions are not concerned with programming-technical issues, such as input, output and input-output arguments. Other examples are contiguous or non-contiguous arrays, including headers of other libraries such as gsl or others. - It is highly interesting to evaluate several sympy functions in one C routine, eventually sharing common intermediate results with the help of the cse routine. This is more than just printing. - From the programming perspective, expressions with constants should be evaluated in the code generator as much as possible. This is different for printing. --- Basic assumptions --- * A generic Routine data structure describes the routine that must be translated into C/Fortran/... code. This data structure covers all features present in one or more of the supported languages. * Descendants from the CodeGen class transform multiple Routine instances into compilable code. Each derived class translates into a specific language. * In many cases, one wants a simple workflow. The friendly functions in the last part are a simple api on top of the Routine/CodeGen stuff. They are easier to use, but are less powerful. --- Milestones --- + First working version with scalar input arguments, generating C code, tests + Friendly functions that are easier to use than the rigorous Routine/CodeGen workflow. + Integer and Real numbers as input and output + Output arguments + InputOutput arguments + Sort input/output arguments properly + Contiguous array arguments (numpy matrices) + Also generate .pyf code for f2py (in autowrap module) + Isolate constants and evaluate them beforehand in double precision + Fortran 90 + Octave/Matlab - Common Subexpression Elimination - User defined comments in the generated code - Optional extra include lines for libraries/objects that can eval special functions - Test other C compilers and libraries: gcc, tcc, libtcc, gcc+gsl, ... - Contiguous array arguments (sympy matrices) - Non-contiguous array arguments (sympy matrices) - ccode must raise an error when it encounters something that can not be translated into c. ccode(integrate(sin(x)/x, x)) does not make sense. - Complex numbers as input and output - A default complex datatype - Include extra information in the header: date, user, hostname, sha1 hash, ... - Fortran 77 - C++ - Python - Julia - Rust - ... """ from __future__ import print_function, division import os import textwrap from sympy import __version__ as sympy_version from sympy.core import Symbol, S, Tuple, Equality, Function, Basic from sympy.core.compatibility import is_sequence, StringIO, string_types from sympy.printing.ccode import c_code_printers from sympy.printing.codeprinter import AssignmentError from sympy.printing.fcode import FCodePrinter from sympy.printing.julia import JuliaCodePrinter from sympy.printing.octave import OctaveCodePrinter from sympy.printing.rust import RustCodePrinter from sympy.tensor import Idx, Indexed, IndexedBase from sympy.matrices import (MatrixSymbol, ImmutableMatrix, MatrixBase, MatrixExpr, MatrixSlice) __all__ = [ # description of routines "Routine", "DataType", "default_datatypes", "get_default_datatype", "Argument", "InputArgument", "OutputArgument", "Result", # routines -> code "CodeGen", "CCodeGen", "FCodeGen", "JuliaCodeGen", "OctaveCodeGen", "RustCodeGen", # friendly functions "codegen", "make_routine", ] # # Description of routines # class Routine(object): """Generic description of evaluation routine for set of expressions. A CodeGen class can translate instances of this class into code in a particular language. The routine specification covers all the features present in these languages. The CodeGen part must raise an exception when certain features are not present in the target language. For example, multiple return values are possible in Python, but not in C or Fortran. Another example: Fortran and Python support complex numbers, while C does not. """ def __init__(self, name, arguments, results, local_vars, global_vars): """Initialize a Routine instance. Parameters ========== name : string Name of the routine. arguments : list of Arguments These are things that appear in arguments of a routine, often appearing on the right-hand side of a function call. These are commonly InputArguments but in some languages, they can also be OutputArguments or InOutArguments (e.g., pass-by-reference in C code). results : list of Results These are the return values of the routine, often appearing on the left-hand side of a function call. The difference between Results and OutputArguments and when you should use each is language-specific. local_vars : list of Results These are variables that will be defined at the beginning of the function. global_vars : list of Symbols Variables which will not be passed into the function. """ # extract all input symbols and all symbols appearing in an expression input_symbols = set([]) symbols = set([]) for arg in arguments: if isinstance(arg, OutputArgument): symbols.update(arg.expr.free_symbols - arg.expr.atoms(Indexed)) elif isinstance(arg, InputArgument): input_symbols.add(arg.name) elif isinstance(arg, InOutArgument): input_symbols.add(arg.name) symbols.update(arg.expr.free_symbols - arg.expr.atoms(Indexed)) else: raise ValueError("Unknown Routine argument: %s" % arg) for r in results: if not isinstance(r, Result): raise ValueError("Unknown Routine result: %s" % r) symbols.update(r.expr.free_symbols - r.expr.atoms(Indexed)) local_symbols = set() for r in local_vars: if isinstance(r, Result): symbols.update(r.expr.free_symbols - r.expr.atoms(Indexed)) local_symbols.add(r.name) else: local_symbols.add(r) symbols = set([s.label if isinstance(s, Idx) else s for s in symbols]) # Check that all symbols in the expressions are covered by # InputArguments/InOutArguments---subset because user could # specify additional (unused) InputArguments or local_vars. notcovered = symbols.difference( input_symbols.union(local_symbols).union(global_vars)) if notcovered != set([]): raise ValueError("Symbols needed for output are not in input " + ", ".join([str(x) for x in notcovered])) self.name = name self.arguments = arguments self.results = results self.local_vars = local_vars self.global_vars = global_vars def __str__(self): return self.__class__.__name__ + "({name!r}, {arguments}, {results}, {local_vars}, {global_vars})".format(**self.__dict__) __repr__ = __str__ @property def variables(self): """Returns a set of all variables possibly used in the routine. For routines with unnamed return values, the dummies that may or may not be used will be included in the set. """ v = set(self.local_vars) for arg in self.arguments: v.add(arg.name) for res in self.results: v.add(res.result_var) return v @property def result_variables(self): """Returns a list of OutputArgument, InOutArgument and Result. If return values are present, they are at the end ot the list. """ args = [arg for arg in self.arguments if isinstance( arg, (OutputArgument, InOutArgument))] args.extend(self.results) return args class DataType(object): """Holds strings for a certain datatype in different languages.""" def __init__(self, cname, fname, pyname, jlname, octname, rsname): self.cname = cname self.fname = fname self.pyname = pyname self.jlname = jlname self.octname = octname self.rsname = rsname default_datatypes = { "int": DataType("int", "INTEGER*4", "int", "", "", "i32"), "float": DataType("double", "REAL*8", "float", "", "", "f64"), "complex": DataType("double", "COMPLEX*16", "complex", "", "", "float") #FIXME: # complex is only supported in fortran, python, julia, and octave. # So to not break c or rust code generation, we stick with double or # float, respecitvely (but actually should raise an exception for # explicitly complex variables (x.is_complex==True)) } COMPLEX_ALLOWED = False def get_default_datatype(expr, complex_allowed=None): """Derives an appropriate datatype based on the expression.""" if complex_allowed is None: complex_allowed = COMPLEX_ALLOWED if complex_allowed: final_dtype = "complex" else: final_dtype = "float" if expr.is_integer: return default_datatypes["int"] elif expr.is_real: return default_datatypes["float"] elif isinstance(expr, MatrixBase): #check all entries dt = "int" for element in expr: if dt == "int" and not element.is_integer: dt = "float" if dt == "float" and not element.is_real: return default_datatypes[final_dtype] return default_datatypes[dt] else: return default_datatypes[final_dtype] class Variable(object): """Represents a typed variable.""" def __init__(self, name, datatype=None, dimensions=None, precision=None): """Return a new variable. Parameters ========== name : Symbol or MatrixSymbol datatype : optional When not given, the data type will be guessed based on the assumptions on the symbol argument. dimension : sequence containing tupes, optional If present, the argument is interpreted as an array, where this sequence of tuples specifies (lower, upper) bounds for each index of the array. precision : int, optional Controls the precision of floating point constants. """ if not isinstance(name, (Symbol, MatrixSymbol)): raise TypeError("The first argument must be a sympy symbol.") if datatype is None: datatype = get_default_datatype(name) elif not isinstance(datatype, DataType): raise TypeError("The (optional) `datatype' argument must be an " "instance of the DataType class.") if dimensions and not isinstance(dimensions, (tuple, list)): raise TypeError( "The dimension argument must be a sequence of tuples") self._name = name self._datatype = { 'C': datatype.cname, 'FORTRAN': datatype.fname, 'JULIA': datatype.jlname, 'OCTAVE': datatype.octname, 'PYTHON': datatype.pyname, 'RUST': datatype.rsname, } self.dimensions = dimensions self.precision = precision def __str__(self): return "%s(%r)" % (self.__class__.__name__, self.name) __repr__ = __str__ @property def name(self): return self._name def get_datatype(self, language): """Returns the datatype string for the requested language. Examples ======== >>> from sympy import Symbol >>> from sympy.utilities.codegen import Variable >>> x = Variable(Symbol('x')) >>> x.get_datatype('c') 'double' >>> x.get_datatype('fortran') 'REAL*8' """ try: return self._datatype[language.upper()] except KeyError: raise CodeGenError("Has datatypes for languages: %s" % ", ".join(self._datatype)) class Argument(Variable): """An abstract Argument data structure: a name and a data type. This structure is refined in the descendants below. """ pass class InputArgument(Argument): pass class ResultBase(object): """Base class for all "outgoing" information from a routine. Objects of this class stores a sympy expression, and a sympy object representing a result variable that will be used in the generated code only if necessary. """ def __init__(self, expr, result_var): self.expr = expr self.result_var = result_var def __str__(self): return "%s(%r, %r)" % (self.__class__.__name__, self.expr, self.result_var) __repr__ = __str__ class OutputArgument(Argument, ResultBase): """OutputArgument are always initialized in the routine.""" def __init__(self, name, result_var, expr, datatype=None, dimensions=None, precision=None): """Return a new variable. Parameters ========== name : Symbol, MatrixSymbol The name of this variable. When used for code generation, this might appear, for example, in the prototype of function in the argument list. result_var : Symbol, Indexed Something that can be used to assign a value to this variable. Typically the same as `name` but for Indexed this should be e.g., "y[i]" whereas `name` should be the Symbol "y". expr : object The expression that should be output, typically a SymPy expression. datatype : optional When not given, the data type will be guessed based on the assumptions on the symbol argument. dimension : sequence containing tupes, optional If present, the argument is interpreted as an array, where this sequence of tuples specifies (lower, upper) bounds for each index of the array. precision : int, optional Controls the precision of floating point constants. """ Argument.__init__(self, name, datatype, dimensions, precision) ResultBase.__init__(self, expr, result_var) def __str__(self): return "%s(%r, %r, %r)" % (self.__class__.__name__, self.name, self.result_var, self.expr) __repr__ = __str__ class InOutArgument(Argument, ResultBase): """InOutArgument are never initialized in the routine.""" def __init__(self, name, result_var, expr, datatype=None, dimensions=None, precision=None): if not datatype: datatype = get_default_datatype(expr) Argument.__init__(self, name, datatype, dimensions, precision) ResultBase.__init__(self, expr, result_var) __init__.__doc__ = OutputArgument.__init__.__doc__ def __str__(self): return "%s(%r, %r, %r)" % (self.__class__.__name__, self.name, self.expr, self.result_var) __repr__ = __str__ class Result(Variable, ResultBase): """An expression for a return value. The name result is used to avoid conflicts with the reserved word "return" in the python language. It is also shorter than ReturnValue. These may or may not need a name in the destination (e.g., "return(x*y)" might return a value without ever naming it). """ def __init__(self, expr, name=None, result_var=None, datatype=None, dimensions=None, precision=None): """Initialize a return value. Parameters ========== expr : SymPy expression name : Symbol, MatrixSymbol, optional The name of this return variable. When used for code generation, this might appear, for example, in the prototype of function in a list of return values. A dummy name is generated if omitted. result_var : Symbol, Indexed, optional Something that can be used to assign a value to this variable. Typically the same as `name` but for Indexed this should be e.g., "y[i]" whereas `name` should be the Symbol "y". Defaults to `name` if omitted. datatype : optional When not given, the data type will be guessed based on the assumptions on the expr argument. dimension : sequence containing tupes, optional If present, this variable is interpreted as an array, where this sequence of tuples specifies (lower, upper) bounds for each index of the array. precision : int, optional Controls the precision of floating point constants. """ # Basic because it is the base class for all types of expressions if not isinstance(expr, (Basic, MatrixBase)): raise TypeError("The first argument must be a sympy expression.") if name is None: name = 'result_%d' % abs(hash(expr)) if datatype is None: #try to infer data type from the expression datatype = get_default_datatype(expr) if isinstance(name, string_types): if isinstance(expr, (MatrixBase, MatrixExpr)): name = MatrixSymbol(name, *expr.shape) else: name = Symbol(name) if result_var is None: result_var = name Variable.__init__(self, name, datatype=datatype, dimensions=dimensions, precision=precision) ResultBase.__init__(self, expr, result_var) def __str__(self): return "%s(%r, %r, %r)" % (self.__class__.__name__, self.expr, self.name, self.result_var) __repr__ = __str__ # # Transformation of routine objects into code # class CodeGen(object): """Abstract class for the code generators.""" printer = None # will be set to an instance of a CodePrinter subclass def _indent_code(self, codelines): return self.printer.indent_code(codelines) def _printer_method_with_settings(self, method, settings=None, *args, **kwargs): settings = settings or {} ori = {k: self.printer._settings[k] for k in settings} for k, v in settings.items(): self.printer._settings[k] = v result = getattr(self.printer, method)(*args, **kwargs) for k, v in ori.items(): self.printer._settings[k] = v return result def _get_symbol(self, s): """Returns the symbol as fcode prints it.""" if self.printer._settings['human']: expr_str = self.printer.doprint(s) else: constants, not_supported, expr_str = self.printer.doprint(s) if constants or not_supported: raise ValueError("Failed to print %s" % str(s)) return expr_str.strip() def __init__(self, project="project", cse=False): """Initialize a code generator. Derived classes will offer more options that affect the generated code. """ self.project = project self.cse = cse def routine(self, name, expr, argument_sequence=None, global_vars=None): """Creates an Routine object that is appropriate for this language. This implementation is appropriate for at least C/Fortran. Subclasses can override this if necessary. Here, we assume at most one return value (the l-value) which must be scalar. Additional outputs are OutputArguments (e.g., pointers on right-hand-side or pass-by-reference). Matrices are always returned via OutputArguments. If ``argument_sequence`` is None, arguments will be ordered alphabetically, but with all InputArguments first, and then OutputArgument and InOutArguments. """ if self.cse: from sympy.simplify.cse_main import cse if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)): if not expr: raise ValueError("No expression given") for e in expr: if not e.is_Equality: raise CodeGenError("Lists of expressions must all be Equalities. {} is not.".format(e)) # create a list of right hand sides and simplify them rhs = [e.rhs for e in expr] common, simplified = cse(rhs) # pack the simplified expressions back up with their left hand sides expr = [Equality(e.lhs, rhs) for e, rhs in zip(expr, simplified)] else: rhs = [expr] if isinstance(expr, Equality): common, simplified = cse(expr.rhs) #, ignore=in_out_args) expr = Equality(expr.lhs, simplified[0]) else: common, simplified = cse(expr) expr = simplified local_vars = [Result(b,a) for a,b in common] local_symbols = set([a for a,_ in common]) local_expressions = Tuple(*[b for _,b in common]) else: local_expressions = Tuple() if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)): if not expr: raise ValueError("No expression given") expressions = Tuple(*expr) else: expressions = Tuple(expr) if self.cse: if {i.label for i in expressions.atoms(Idx)} != set(): raise CodeGenError("CSE and Indexed expressions do not play well together yet") else: # local variables for indexed expressions local_vars = {i.label for i in expressions.atoms(Idx)} local_symbols = local_vars # global variables global_vars = set() if global_vars is None else set(global_vars) # symbols that should be arguments symbols = (expressions.free_symbols | local_expressions.free_symbols) - local_symbols - global_vars new_symbols = set([]) new_symbols.update(symbols) for symbol in symbols: if isinstance(symbol, Idx): new_symbols.remove(symbol) new_symbols.update(symbol.args[1].free_symbols) if isinstance(symbol, Indexed): new_symbols.remove(symbol) symbols = new_symbols # Decide whether to use output argument or return value return_val = [] output_args = [] for expr in expressions: if isinstance(expr, Equality): out_arg = expr.lhs expr = expr.rhs if isinstance(out_arg, Indexed): dims = tuple([ (S.Zero, dim - 1) for dim in out_arg.shape]) symbol = out_arg.base.label elif isinstance(out_arg, Symbol): dims = [] symbol = out_arg elif isinstance(out_arg, MatrixSymbol): dims = tuple([ (S.Zero, dim - 1) for dim in out_arg.shape]) symbol = out_arg else: raise CodeGenError("Only Indexed, Symbol, or MatrixSymbol " "can define output arguments.") if expr.has(symbol): output_args.append( InOutArgument(symbol, out_arg, expr, dimensions=dims)) else: output_args.append( OutputArgument(symbol, out_arg, expr, dimensions=dims)) # remove duplicate arguments when they are not local variables if symbol not in local_vars: # avoid duplicate arguments symbols.remove(symbol) elif isinstance(expr, (ImmutableMatrix, MatrixSlice)): # Create a "dummy" MatrixSymbol to use as the Output arg out_arg = MatrixSymbol('out_%s' % abs(hash(expr)), *expr.shape) dims = tuple([(S.Zero, dim - 1) for dim in out_arg.shape]) output_args.append( OutputArgument(out_arg, out_arg, expr, dimensions=dims)) else: return_val.append(Result(expr)) arg_list = [] # setup input argument list # helper to get dimensions for data for array-like args def dimensions(s): return [(S.Zero, dim - 1) for dim in s.shape] array_symbols = {} for array in expressions.atoms(Indexed) | local_expressions.atoms(Indexed): array_symbols[array.base.label] = array for array in expressions.atoms(MatrixSymbol) | local_expressions.atoms(MatrixSymbol): array_symbols[array] = array for symbol in sorted(symbols, key=str): if symbol in array_symbols: array = array_symbols[symbol] metadata = {'dimensions': dimensions(array)} else: metadata = {} arg_list.append(InputArgument(symbol, **metadata)) output_args.sort(key=lambda x: str(x.name)) arg_list.extend(output_args) if argument_sequence is not None: # if the user has supplied IndexedBase instances, we'll accept that new_sequence = [] for arg in argument_sequence: if isinstance(arg, IndexedBase): new_sequence.append(arg.label) else: new_sequence.append(arg) argument_sequence = new_sequence missing = [x for x in arg_list if x.name not in argument_sequence] if missing: msg = "Argument list didn't specify: {0} " msg = msg.format(", ".join([str(m.name) for m in missing])) raise CodeGenArgumentListError(msg, missing) # create redundant arguments to produce the requested sequence name_arg_dict = {x.name: x for x in arg_list} new_args = [] for symbol in argument_sequence: try: new_args.append(name_arg_dict[symbol]) except KeyError: if isinstance(symbol, (IndexedBase, MatrixSymbol)): metadata = {'dimensions': dimensions(symbol)} else: metadata = {} new_args.append(InputArgument(symbol, **metadata)) arg_list = new_args return Routine(name, arg_list, return_val, local_vars, global_vars) def write(self, routines, prefix, to_files=False, header=True, empty=True): """Writes all the source code files for the given routines. The generated source is returned as a list of (filename, contents) tuples, or is written to files (see below). Each filename consists of the given prefix, appended with an appropriate extension. Parameters ========== routines : list A list of Routine instances to be written prefix : string The prefix for the output files to_files : bool, optional When True, the output is written to files. Otherwise, a list of (filename, contents) tuples is returned. [default: False] header : bool, optional When True, a header comment is included on top of each source file. [default: True] empty : bool, optional When True, empty lines are included to structure the source files. [default: True] """ if to_files: for dump_fn in self.dump_fns: filename = "%s.%s" % (prefix, dump_fn.extension) with open(filename, "w") as f: dump_fn(self, routines, f, prefix, header, empty) else: result = [] for dump_fn in self.dump_fns: filename = "%s.%s" % (prefix, dump_fn.extension) contents = StringIO() dump_fn(self, routines, contents, prefix, header, empty) result.append((filename, contents.getvalue())) return result def dump_code(self, routines, f, prefix, header=True, empty=True): """Write the code by calling language specific methods. The generated file contains all the definitions of the routines in low-level code and refers to the header file if appropriate. Parameters ========== routines : list A list of Routine instances. f : file-like Where to write the file. prefix : string The filename prefix, used to refer to the proper header file. Only the basename of the prefix is used. header : bool, optional When True, a header comment is included on top of each source file. [default : True] empty : bool, optional When True, empty lines are included to structure the source files. [default : True] """ code_lines = self._preprocessor_statements(prefix) for routine in routines: if empty: code_lines.append("\n") code_lines.extend(self._get_routine_opening(routine)) code_lines.extend(self._declare_arguments(routine)) code_lines.extend(self._declare_globals(routine)) code_lines.extend(self._declare_locals(routine)) if empty: code_lines.append("\n") code_lines.extend(self._call_printer(routine)) if empty: code_lines.append("\n") code_lines.extend(self._get_routine_ending(routine)) code_lines = self._indent_code(''.join(code_lines)) if header: code_lines = ''.join(self._get_header() + [code_lines]) if code_lines: f.write(code_lines) class CodeGenError(Exception): pass class CodeGenArgumentListError(Exception): @property def missing_args(self): return self.args[1] header_comment = """Code generated with sympy %(version)s See http://www.sympy.org/ for more information. This file is part of '%(project)s' """ class CCodeGen(CodeGen): """Generator for C code. The .write() method inherited from CodeGen will output a code file and an interface file, <prefix>.c and <prefix>.h respectively. """ code_extension = "c" interface_extension = "h" standard = 'c99' def __init__(self, project="project", printer=None, preprocessor_statements=None, cse=False): super(CCodeGen, self).__init__(project=project, cse=cse) self.printer = printer or c_code_printers[self.standard.lower()]() self.preprocessor_statements = preprocessor_statements if preprocessor_statements is None: self.preprocessor_statements = ['#include <math.h>'] def _get_header(self): """Writes a common header for the generated files.""" code_lines = [] code_lines.append("/" + "*"*78 + '\n') tmp = header_comment % {"version": sympy_version, "project": self.project} for line in tmp.splitlines(): code_lines.append(" *%s*\n" % line.center(76)) code_lines.append(" " + "*"*78 + "/\n") return code_lines def get_prototype(self, routine): """Returns a string for the function prototype of the routine. If the routine has multiple result objects, an CodeGenError is raised. See: https://en.wikipedia.org/wiki/Function_prototype """ if len(routine.results) > 1: raise CodeGenError("C only supports a single or no return value.") elif len(routine.results) == 1: ctype = routine.results[0].get_datatype('C') else: ctype = "void" type_args = [] for arg in routine.arguments: name = self.printer.doprint(arg.name) if arg.dimensions or isinstance(arg, ResultBase): type_args.append((arg.get_datatype('C'), "*%s" % name)) else: type_args.append((arg.get_datatype('C'), name)) arguments = ", ".join([ "%s %s" % t for t in type_args]) return "%s %s(%s)" % (ctype, routine.name, arguments) def _preprocessor_statements(self, prefix): code_lines = [] code_lines.append('#include "{}.h"'.format(os.path.basename(prefix))) code_lines.extend(self.preprocessor_statements) code_lines = ['{}\n'.format(l) for l in code_lines] return code_lines def _get_routine_opening(self, routine): prototype = self.get_prototype(routine) return ["%s {\n" % prototype] def _declare_arguments(self, routine): # arguments are declared in prototype return [] def _declare_globals(self, routine): # global variables are not explicitly declared within C functions return [] def _declare_locals(self, routine): # Compose a list of symbols to be dereferenced in the function # body. These are the arguments that were passed by a reference # pointer, excluding arrays. dereference = [] for arg in routine.arguments: if isinstance(arg, ResultBase) and not arg.dimensions: dereference.append(arg.name) code_lines = [] for result in routine.local_vars: # local variables that are simple symbols such as those used as indices into # for loops are defined declared elsewhere. if not isinstance(result, Result): continue if result.name != result.result_var: raise CodeGen("Result variable and name should match: {}".format(result)) assign_to = result.name t = result.get_datatype('c') if isinstance(result.expr, (MatrixBase, MatrixExpr)): dims = result.expr.shape if dims[1] != 1: raise CodeGenError("Only column vectors are supported in local variabels. Local result {} has dimensions {}".format(result, dims)) code_lines.append("{0} {1}[{2}];\n".format(t, str(assign_to), dims[0])) prefix = "" else: prefix = "const {0} ".format(t) constants, not_c, c_expr = self._printer_method_with_settings( 'doprint', dict(human=False, dereference=dereference), result.expr, assign_to=assign_to) for name, value in sorted(constants, key=str): code_lines.append("double const %s = %s;\n" % (name, value)) code_lines.append("{}{}\n".format(prefix, c_expr)) return code_lines def _call_printer(self, routine): code_lines = [] # Compose a list of symbols to be dereferenced in the function # body. These are the arguments that were passed by a reference # pointer, excluding arrays. dereference = [] for arg in routine.arguments: if isinstance(arg, ResultBase) and not arg.dimensions: dereference.append(arg.name) return_val = None for result in routine.result_variables: if isinstance(result, Result): assign_to = routine.name + "_result" t = result.get_datatype('c') code_lines.append("{0} {1};\n".format(t, str(assign_to))) return_val = assign_to else: assign_to = result.result_var try: constants, not_c, c_expr = self._printer_method_with_settings( 'doprint', dict(human=False, dereference=dereference), result.expr, assign_to=assign_to) except AssignmentError: assign_to = result.result_var code_lines.append( "%s %s;\n" % (result.get_datatype('c'), str(assign_to))) constants, not_c, c_expr = self._printer_method_with_settings( 'doprint', dict(human=False, dereference=dereference), result.expr, assign_to=assign_to) for name, value in sorted(constants, key=str): code_lines.append("double const %s = %s;\n" % (name, value)) code_lines.append("%s\n" % c_expr) if return_val: code_lines.append(" return %s;\n" % return_val) return code_lines def _get_routine_ending(self, routine): return ["}\n"] def dump_c(self, routines, f, prefix, header=True, empty=True): self.dump_code(routines, f, prefix, header, empty) dump_c.extension = code_extension dump_c.__doc__ = CodeGen.dump_code.__doc__ def dump_h(self, routines, f, prefix, header=True, empty=True): """Writes the C header file. This file contains all the function declarations. Parameters ========== routines : list A list of Routine instances. f : file-like Where to write the file. prefix : string The filename prefix, used to construct the include guards. Only the basename of the prefix is used. header : bool, optional When True, a header comment is included on top of each source file. [default : True] empty : bool, optional When True, empty lines are included to structure the source files. [default : True] """ if header: print(''.join(self._get_header()), file=f) guard_name = "%s__%s__H" % (self.project.replace( " ", "_").upper(), prefix.replace("/", "_").upper()) # include guards if empty: print(file=f) print("#ifndef %s" % guard_name, file=f) print("#define %s" % guard_name, file=f) if empty: print(file=f) # declaration of the function prototypes for routine in routines: prototype = self.get_prototype(routine) print("%s;" % prototype, file=f) # end if include guards if empty: print(file=f) print("#endif", file=f) if empty: print(file=f) dump_h.extension = interface_extension # This list of dump functions is used by CodeGen.write to know which dump # functions it has to call. dump_fns = [dump_c, dump_h] class C89CodeGen(CCodeGen): standard = 'C89' class C99CodeGen(CCodeGen): standard = 'C99' class FCodeGen(CodeGen): """Generator for Fortran 95 code The .write() method inherited from CodeGen will output a code file and an interface file, <prefix>.f90 and <prefix>.h respectively. """ code_extension = "f90" interface_extension = "h" def __init__(self, project='project', printer=None): super(FCodeGen, self).__init__(project) self.printer = printer or FCodePrinter() def _get_header(self): """Writes a common header for the generated files.""" code_lines = [] code_lines.append("!" + "*"*78 + '\n') tmp = header_comment % {"version": sympy_version, "project": self.project} for line in tmp.splitlines(): code_lines.append("!*%s*\n" % line.center(76)) code_lines.append("!" + "*"*78 + '\n') return code_lines def _preprocessor_statements(self, prefix): return [] def _get_routine_opening(self, routine): """Returns the opening statements of the fortran routine.""" code_list = [] if len(routine.results) > 1: raise CodeGenError( "Fortran only supports a single or no return value.") elif len(routine.results) == 1: result = routine.results[0] code_list.append(result.get_datatype('fortran')) code_list.append("function") else: code_list.append("subroutine") args = ", ".join("%s" % self._get_symbol(arg.name) for arg in routine.arguments) call_sig = "{0}({1})\n".format(routine.name, args) # Fortran 95 requires all lines be less than 132 characters, so wrap # this line before appending. call_sig = ' &\n'.join(textwrap.wrap(call_sig, width=60, break_long_words=False)) + '\n' code_list.append(call_sig) code_list = [' '.join(code_list)] code_list.append('implicit none\n') return code_list def _declare_arguments(self, routine): # argument type declarations code_list = [] array_list = [] scalar_list = [] for arg in routine.arguments: if isinstance(arg, InputArgument): typeinfo = "%s, intent(in)" % arg.get_datatype('fortran') elif isinstance(arg, InOutArgument): typeinfo = "%s, intent(inout)" % arg.get_datatype('fortran') elif isinstance(arg, OutputArgument): typeinfo = "%s, intent(out)" % arg.get_datatype('fortran') else: raise CodeGenError("Unknown Argument type: %s" % type(arg)) fprint = self._get_symbol if arg.dimensions: # fortran arrays start at 1 dimstr = ", ".join(["%s:%s" % ( fprint(dim[0] + 1), fprint(dim[1] + 1)) for dim in arg.dimensions]) typeinfo += ", dimension(%s)" % dimstr array_list.append("%s :: %s\n" % (typeinfo, fprint(arg.name))) else: scalar_list.append("%s :: %s\n" % (typeinfo, fprint(arg.name))) # scalars first, because they can be used in array declarations code_list.extend(scalar_list) code_list.extend(array_list) return code_list def _declare_globals(self, routine): # Global variables not explicitly declared within Fortran 90 functions. # Note: a future F77 mode may need to generate "common" blocks. return [] def _declare_locals(self, routine): code_list = [] for var in sorted(routine.local_vars, key=str): typeinfo = get_default_datatype(var) code_list.append("%s :: %s\n" % ( typeinfo.fname, self._get_symbol(var))) return code_list def _get_routine_ending(self, routine): """Returns the closing statements of the fortran routine.""" if len(routine.results) == 1: return ["end function\n"] else: return ["end subroutine\n"] def get_interface(self, routine): """Returns a string for the function interface. The routine should have a single result object, which can be None. If the routine has multiple result objects, a CodeGenError is raised. See: https://en.wikipedia.org/wiki/Function_prototype """ prototype = [ "interface\n" ] prototype.extend(self._get_routine_opening(routine)) prototype.extend(self._declare_arguments(routine)) prototype.extend(self._get_routine_ending(routine)) prototype.append("end interface\n") return "".join(prototype) def _call_printer(self, routine): declarations = [] code_lines = [] for result in routine.result_variables: if isinstance(result, Result): assign_to = routine.name elif isinstance(result, (OutputArgument, InOutArgument)): assign_to = result.result_var constants, not_fortran, f_expr = self._printer_method_with_settings( 'doprint', dict(human=False, source_format='free', standard=95), result.expr, assign_to=assign_to) for obj, v in sorted(constants, key=str): t = get_default_datatype(obj) declarations.append( "%s, parameter :: %s = %s\n" % (t.fname, obj, v)) for obj in sorted(not_fortran, key=str): t = get_default_datatype(obj) if isinstance(obj, Function): name = obj.func else: name = obj declarations.append("%s :: %s\n" % (t.fname, name)) code_lines.append("%s\n" % f_expr) return declarations + code_lines def _indent_code(self, codelines): return self._printer_method_with_settings( 'indent_code', dict(human=False, source_format='free'), codelines) def dump_f95(self, routines, f, prefix, header=True, empty=True): # check that symbols are unique with ignorecase for r in routines: lowercase = {str(x).lower() for x in r.variables} orig_case = {str(x) for x in r.variables} if len(lowercase) < len(orig_case): raise CodeGenError("Fortran ignores case. Got symbols: %s" % (", ".join([str(var) for var in r.variables]))) self.dump_code(routines, f, prefix, header, empty) dump_f95.extension = code_extension dump_f95.__doc__ = CodeGen.dump_code.__doc__ def dump_h(self, routines, f, prefix, header=True, empty=True): """Writes the interface to a header file. This file contains all the function declarations. Parameters ========== routines : list A list of Routine instances. f : file-like Where to write the file. prefix : string The filename prefix. header : bool, optional When True, a header comment is included on top of each source file. [default : True] empty : bool, optional When True, empty lines are included to structure the source files. [default : True] """ if header: print(''.join(self._get_header()), file=f) if empty: print(file=f) # declaration of the function prototypes for routine in routines: prototype = self.get_interface(routine) f.write(prototype) if empty: print(file=f) dump_h.extension = interface_extension # This list of dump functions is used by CodeGen.write to know which dump # functions it has to call. dump_fns = [dump_f95, dump_h] class JuliaCodeGen(CodeGen): """Generator for Julia code. The .write() method inherited from CodeGen will output a code file <prefix>.jl. """ code_extension = "jl" def __init__(self, project='project', printer=None): super(JuliaCodeGen, self).__init__(project) self.printer = printer or JuliaCodePrinter() def routine(self, name, expr, argument_sequence, global_vars): """Specialized Routine creation for Julia.""" if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)): if not expr: raise ValueError("No expression given") expressions = Tuple(*expr) else: expressions = Tuple(expr) # local variables local_vars = {i.label for i in expressions.atoms(Idx)} # global variables global_vars = set() if global_vars is None else set(global_vars) # symbols that should be arguments old_symbols = expressions.free_symbols - local_vars - global_vars symbols = set([]) for s in old_symbols: if isinstance(s, Idx): symbols.update(s.args[1].free_symbols) elif not isinstance(s, Indexed): symbols.add(s) # Julia supports multiple return values return_vals = [] output_args = [] for (i, expr) in enumerate(expressions): if isinstance(expr, Equality): out_arg = expr.lhs expr = expr.rhs symbol = out_arg if isinstance(out_arg, Indexed): dims = tuple([ (S.One, dim) for dim in out_arg.shape]) symbol = out_arg.base.label output_args.append(InOutArgument(symbol, out_arg, expr, dimensions=dims)) if not isinstance(out_arg, (Indexed, Symbol, MatrixSymbol)): raise CodeGenError("Only Indexed, Symbol, or MatrixSymbol " "can define output arguments.") return_vals.append(Result(expr, name=symbol, result_var=out_arg)) if not expr.has(symbol): # this is a pure output: remove from the symbols list, so # it doesn't become an input. symbols.remove(symbol) else: # we have no name for this output return_vals.append(Result(expr, name='out%d' % (i+1))) # setup input argument list output_args.sort(key=lambda x: str(x.name)) arg_list = list(output_args) array_symbols = {} for array in expressions.atoms(Indexed): array_symbols[array.base.label] = array for array in expressions.atoms(MatrixSymbol): array_symbols[array] = array for symbol in sorted(symbols, key=str): arg_list.append(InputArgument(symbol)) if argument_sequence is not None: # if the user has supplied IndexedBase instances, we'll accept that new_sequence = [] for arg in argument_sequence: if isinstance(arg, IndexedBase): new_sequence.append(arg.label) else: new_sequence.append(arg) argument_sequence = new_sequence missing = [x for x in arg_list if x.name not in argument_sequence] if missing: msg = "Argument list didn't specify: {0} " msg = msg.format(", ".join([str(m.name) for m in missing])) raise CodeGenArgumentListError(msg, missing) # create redundant arguments to produce the requested sequence name_arg_dict = {x.name: x for x in arg_list} new_args = [] for symbol in argument_sequence: try: new_args.append(name_arg_dict[symbol]) except KeyError: new_args.append(InputArgument(symbol)) arg_list = new_args return Routine(name, arg_list, return_vals, local_vars, global_vars) def _get_header(self): """Writes a common header for the generated files.""" code_lines = [] tmp = header_comment % {"version": sympy_version, "project": self.project} for line in tmp.splitlines(): if line == '': code_lines.append("#\n") else: code_lines.append("# %s\n" % line) return code_lines def _preprocessor_statements(self, prefix): return [] def _get_routine_opening(self, routine): """Returns the opening statements of the routine.""" code_list = [] code_list.append("function ") # Inputs args = [] for i, arg in enumerate(routine.arguments): if isinstance(arg, OutputArgument): raise CodeGenError("Julia: invalid argument of type %s" % str(type(arg))) if isinstance(arg, (InputArgument, InOutArgument)): args.append("%s" % self._get_symbol(arg.name)) args = ", ".join(args) code_list.append("%s(%s)\n" % (routine.name, args)) code_list = [ "".join(code_list) ] return code_list def _declare_arguments(self, routine): return [] def _declare_globals(self, routine): return [] def _declare_locals(self, routine): return [] def _get_routine_ending(self, routine): outs = [] for result in routine.results: if isinstance(result, Result): # Note: name not result_var; want `y` not `y[i]` for Indexed s = self._get_symbol(result.name) else: raise CodeGenError("unexpected object in Routine results") outs.append(s) return ["return " + ", ".join(outs) + "\nend\n"] def _call_printer(self, routine): declarations = [] code_lines = [] for i, result in enumerate(routine.results): if isinstance(result, Result): assign_to = result.result_var else: raise CodeGenError("unexpected object in Routine results") constants, not_supported, jl_expr = self._printer_method_with_settings( 'doprint', dict(human=False), result.expr, assign_to=assign_to) for obj, v in sorted(constants, key=str): declarations.append( "%s = %s\n" % (obj, v)) for obj in sorted(not_supported, key=str): if isinstance(obj, Function): name = obj.func else: name = obj declarations.append( "# unsupported: %s\n" % (name)) code_lines.append("%s\n" % (jl_expr)) return declarations + code_lines def _indent_code(self, codelines): # Note that indenting seems to happen twice, first # statement-by-statement by JuliaPrinter then again here. p = JuliaCodePrinter({'human': False}) return p.indent_code(codelines) def dump_jl(self, routines, f, prefix, header=True, empty=True): self.dump_code(routines, f, prefix, header, empty) dump_jl.extension = code_extension dump_jl.__doc__ = CodeGen.dump_code.__doc__ # This list of dump functions is used by CodeGen.write to know which dump # functions it has to call. dump_fns = [dump_jl] class OctaveCodeGen(CodeGen): """Generator for Octave code. The .write() method inherited from CodeGen will output a code file <prefix>.m. Octave .m files usually contain one function. That function name should match the filename (``prefix``). If you pass multiple ``name_expr`` pairs, the latter ones are presumed to be private functions accessed by the primary function. You should only pass inputs to ``argument_sequence``: outputs are ordered according to their order in ``name_expr``. """ code_extension = "m" def __init__(self, project='project', printer=None): super(OctaveCodeGen, self).__init__(project) self.printer = printer or OctaveCodePrinter() def routine(self, name, expr, argument_sequence, global_vars): """Specialized Routine creation for Octave.""" # FIXME: this is probably general enough for other high-level # languages, perhaps its the C/Fortran one that is specialized! if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)): if not expr: raise ValueError("No expression given") expressions = Tuple(*expr) else: expressions = Tuple(expr) # local variables local_vars = {i.label for i in expressions.atoms(Idx)} # global variables global_vars = set() if global_vars is None else set(global_vars) # symbols that should be arguments old_symbols = expressions.free_symbols - local_vars - global_vars symbols = set([]) for s in old_symbols: if isinstance(s, Idx): symbols.update(s.args[1].free_symbols) elif not isinstance(s, Indexed): symbols.add(s) # Octave supports multiple return values return_vals = [] for (i, expr) in enumerate(expressions): if isinstance(expr, Equality): out_arg = expr.lhs expr = expr.rhs symbol = out_arg if isinstance(out_arg, Indexed): symbol = out_arg.base.label if not isinstance(out_arg, (Indexed, Symbol, MatrixSymbol)): raise CodeGenError("Only Indexed, Symbol, or MatrixSymbol " "can define output arguments.") return_vals.append(Result(expr, name=symbol, result_var=out_arg)) if not expr.has(symbol): # this is a pure output: remove from the symbols list, so # it doesn't become an input. symbols.remove(symbol) else: # we have no name for this output return_vals.append(Result(expr, name='out%d' % (i+1))) # setup input argument list arg_list = [] array_symbols = {} for array in expressions.atoms(Indexed): array_symbols[array.base.label] = array for array in expressions.atoms(MatrixSymbol): array_symbols[array] = array for symbol in sorted(symbols, key=str): arg_list.append(InputArgument(symbol)) if argument_sequence is not None: # if the user has supplied IndexedBase instances, we'll accept that new_sequence = [] for arg in argument_sequence: if isinstance(arg, IndexedBase): new_sequence.append(arg.label) else: new_sequence.append(arg) argument_sequence = new_sequence missing = [x for x in arg_list if x.name not in argument_sequence] if missing: msg = "Argument list didn't specify: {0} " msg = msg.format(", ".join([str(m.name) for m in missing])) raise CodeGenArgumentListError(msg, missing) # create redundant arguments to produce the requested sequence name_arg_dict = {x.name: x for x in arg_list} new_args = [] for symbol in argument_sequence: try: new_args.append(name_arg_dict[symbol]) except KeyError: new_args.append(InputArgument(symbol)) arg_list = new_args return Routine(name, arg_list, return_vals, local_vars, global_vars) def _get_header(self): """Writes a common header for the generated files.""" code_lines = [] tmp = header_comment % {"version": sympy_version, "project": self.project} for line in tmp.splitlines(): if line == '': code_lines.append("%\n") else: code_lines.append("%% %s\n" % line) return code_lines def _preprocessor_statements(self, prefix): return [] def _get_routine_opening(self, routine): """Returns the opening statements of the routine.""" code_list = [] code_list.append("function ") # Outputs outs = [] for i, result in enumerate(routine.results): if isinstance(result, Result): # Note: name not result_var; want `y` not `y(i)` for Indexed s = self._get_symbol(result.name) else: raise CodeGenError("unexpected object in Routine results") outs.append(s) if len(outs) > 1: code_list.append("[" + (", ".join(outs)) + "]") else: code_list.append("".join(outs)) code_list.append(" = ") # Inputs args = [] for i, arg in enumerate(routine.arguments): if isinstance(arg, (OutputArgument, InOutArgument)): raise CodeGenError("Octave: invalid argument of type %s" % str(type(arg))) if isinstance(arg, InputArgument): args.append("%s" % self._get_symbol(arg.name)) args = ", ".join(args) code_list.append("%s(%s)\n" % (routine.name, args)) code_list = [ "".join(code_list) ] return code_list def _declare_arguments(self, routine): return [] def _declare_globals(self, routine): if not routine.global_vars: return [] s = " ".join(sorted([self._get_symbol(g) for g in routine.global_vars])) return ["global " + s + "\n"] def _declare_locals(self, routine): return [] def _get_routine_ending(self, routine): return ["end\n"] def _call_printer(self, routine): declarations = [] code_lines = [] for i, result in enumerate(routine.results): if isinstance(result, Result): assign_to = result.result_var else: raise CodeGenError("unexpected object in Routine results") constants, not_supported, oct_expr = self._printer_method_with_settings( 'doprint', dict(human=False), result.expr, assign_to=assign_to) for obj, v in sorted(constants, key=str): declarations.append( " %s = %s; %% constant\n" % (obj, v)) for obj in sorted(not_supported, key=str): if isinstance(obj, Function): name = obj.func else: name = obj declarations.append( " %% unsupported: %s\n" % (name)) code_lines.append("%s\n" % (oct_expr)) return declarations + code_lines def _indent_code(self, codelines): return self._printer_method_with_settings( 'indent_code', dict(human=False), codelines) def dump_m(self, routines, f, prefix, header=True, empty=True, inline=True): # Note used to call self.dump_code() but we need more control for header code_lines = self._preprocessor_statements(prefix) for i, routine in enumerate(routines): if i > 0: if empty: code_lines.append("\n") code_lines.extend(self._get_routine_opening(routine)) if i == 0: if routine.name != prefix: raise ValueError('Octave function name should match prefix') if header: code_lines.append("%" + prefix.upper() + " Autogenerated by sympy\n") code_lines.append(''.join(self._get_header())) code_lines.extend(self._declare_arguments(routine)) code_lines.extend(self._declare_globals(routine)) code_lines.extend(self._declare_locals(routine)) if empty: code_lines.append("\n") code_lines.extend(self._call_printer(routine)) if empty: code_lines.append("\n") code_lines.extend(self._get_routine_ending(routine)) code_lines = self._indent_code(''.join(code_lines)) if code_lines: f.write(code_lines) dump_m.extension = code_extension dump_m.__doc__ = CodeGen.dump_code.__doc__ # This list of dump functions is used by CodeGen.write to know which dump # functions it has to call. dump_fns = [dump_m] class RustCodeGen(CodeGen): """Generator for Rust code. The .write() method inherited from CodeGen will output a code file <prefix>.rs """ code_extension = "rs" def __init__(self, project="project", printer=None): super(RustCodeGen, self).__init__(project=project) self.printer = printer or RustCodePrinter() def routine(self, name, expr, argument_sequence, global_vars): """Specialized Routine creation for Rust.""" if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)): if not expr: raise ValueError("No expression given") expressions = Tuple(*expr) else: expressions = Tuple(expr) # local variables local_vars = set([i.label for i in expressions.atoms(Idx)]) # global variables global_vars = set() if global_vars is None else set(global_vars) # symbols that should be arguments symbols = expressions.free_symbols - local_vars - global_vars - expressions.atoms(Indexed) # Rust supports multiple return values return_vals = [] output_args = [] for (i, expr) in enumerate(expressions): if isinstance(expr, Equality): out_arg = expr.lhs expr = expr.rhs symbol = out_arg if isinstance(out_arg, Indexed): dims = tuple([ (S.One, dim) for dim in out_arg.shape]) symbol = out_arg.base.label output_args.append(InOutArgument(symbol, out_arg, expr, dimensions=dims)) if not isinstance(out_arg, (Indexed, Symbol, MatrixSymbol)): raise CodeGenError("Only Indexed, Symbol, or MatrixSymbol " "can define output arguments.") return_vals.append(Result(expr, name=symbol, result_var=out_arg)) if not expr.has(symbol): # this is a pure output: remove from the symbols list, so # it doesn't become an input. symbols.remove(symbol) else: # we have no name for this output return_vals.append(Result(expr, name='out%d' % (i+1))) # setup input argument list output_args.sort(key=lambda x: str(x.name)) arg_list = list(output_args) array_symbols = {} for array in expressions.atoms(Indexed): array_symbols[array.base.label] = array for array in expressions.atoms(MatrixSymbol): array_symbols[array] = array for symbol in sorted(symbols, key=str): arg_list.append(InputArgument(symbol)) if argument_sequence is not None: # if the user has supplied IndexedBase instances, we'll accept that new_sequence = [] for arg in argument_sequence: if isinstance(arg, IndexedBase): new_sequence.append(arg.label) else: new_sequence.append(arg) argument_sequence = new_sequence missing = [x for x in arg_list if x.name not in argument_sequence] if missing: msg = "Argument list didn't specify: {0} " msg = msg.format(", ".join([str(m.name) for m in missing])) raise CodeGenArgumentListError(msg, missing) # create redundant arguments to produce the requested sequence name_arg_dict = {x.name: x for x in arg_list} new_args = [] for symbol in argument_sequence: try: new_args.append(name_arg_dict[symbol]) except KeyError: new_args.append(InputArgument(symbol)) arg_list = new_args return Routine(name, arg_list, return_vals, local_vars, global_vars) def _get_header(self): """Writes a common header for the generated files.""" code_lines = [] code_lines.append("/*\n") tmp = header_comment % {"version": sympy_version, "project": self.project} for line in tmp.splitlines(): code_lines.append((" *%s" % line.center(76)).rstrip() + "\n") code_lines.append(" */\n") return code_lines def get_prototype(self, routine): """Returns a string for the function prototype of the routine. If the routine has multiple result objects, an CodeGenError is raised. See: https://en.wikipedia.org/wiki/Function_prototype """ results = [i.get_datatype('Rust') for i in routine.results] if len(results) == 1: rstype = " -> " + results[0] elif len(routine.results) > 1: rstype = " -> (" + ", ".join(results) + ")" else: rstype = "" type_args = [] for arg in routine.arguments: name = self.printer.doprint(arg.name) if arg.dimensions or isinstance(arg, ResultBase): type_args.append(("*%s" % name, arg.get_datatype('Rust'))) else: type_args.append((name, arg.get_datatype('Rust'))) arguments = ", ".join([ "%s: %s" % t for t in type_args]) return "fn %s(%s)%s" % (routine.name, arguments, rstype) def _preprocessor_statements(self, prefix): code_lines = [] # code_lines.append("use std::f64::consts::*;\n") return code_lines def _get_routine_opening(self, routine): prototype = self.get_prototype(routine) return ["%s {\n" % prototype] def _declare_arguments(self, routine): # arguments are declared in prototype return [] def _declare_globals(self, routine): # global variables are not explicitly declared within C functions return [] def _declare_locals(self, routine): # loop variables are declared in loop statement return [] def _call_printer(self, routine): code_lines = [] declarations = [] returns = [] # Compose a list of symbols to be dereferenced in the function # body. These are the arguments that were passed by a reference # pointer, excluding arrays. dereference = [] for arg in routine.arguments: if isinstance(arg, ResultBase) and not arg.dimensions: dereference.append(arg.name) for i, result in enumerate(routine.results): if isinstance(result, Result): assign_to = result.result_var returns.append(str(result.result_var)) else: raise CodeGenError("unexpected object in Routine results") constants, not_supported, rs_expr = self._printer_method_with_settings( 'doprint', dict(human=False), result.expr, assign_to=assign_to) for name, value in sorted(constants, key=str): declarations.append("const %s: f64 = %s;\n" % (name, value)) for obj in sorted(not_supported, key=str): if isinstance(obj, Function): name = obj.func else: name = obj declarations.append("// unsupported: %s\n" % (name)) code_lines.append("let %s\n" % rs_expr); if len(returns) > 1: returns = ['(' + ', '.join(returns) + ')'] returns.append('\n') return declarations + code_lines + returns def _get_routine_ending(self, routine): return ["}\n"] def dump_rs(self, routines, f, prefix, header=True, empty=True): self.dump_code(routines, f, prefix, header, empty) dump_rs.extension = code_extension dump_rs.__doc__ = CodeGen.dump_code.__doc__ # This list of dump functions is used by CodeGen.write to know which dump # functions it has to call. dump_fns = [dump_rs] def get_code_generator(language, project=None, standard=None, printer = None): if language == 'C': if standard is None: pass elif standard.lower() == 'c89': language = 'C89' elif standard.lower() == 'c99': language = 'C99' CodeGenClass = {"C": CCodeGen, "C89": C89CodeGen, "C99": C99CodeGen, "F95": FCodeGen, "JULIA": JuliaCodeGen, "OCTAVE": OctaveCodeGen, "RUST": RustCodeGen}.get(language.upper()) if CodeGenClass is None: raise ValueError("Language '%s' is not supported." % language) return CodeGenClass(project, printer) # # Friendly functions # def codegen(name_expr, language=None, prefix=None, project="project", to_files=False, header=True, empty=True, argument_sequence=None, global_vars=None, standard=None, code_gen=None, printer = None): """Generate source code for expressions in a given language. Parameters ========== name_expr : tuple, or list of tuples A single (name, expression) tuple or a list of (name, expression) tuples. Each tuple corresponds to a routine. If the expression is an equality (an instance of class Equality) the left hand side is considered an output argument. If expression is an iterable, then the routine will have multiple outputs. language : string, A string that indicates the source code language. This is case insensitive. Currently, 'C', 'F95' and 'Octave' are supported. 'Octave' generates code compatible with both Octave and Matlab. prefix : string, optional A prefix for the names of the files that contain the source code. Language-dependent suffixes will be appended. If omitted, the name of the first name_expr tuple is used. project : string, optional A project name, used for making unique preprocessor instructions. [default: "project"] to_files : bool, optional When True, the code will be written to one or more files with the given prefix, otherwise strings with the names and contents of these files are returned. [default: False] header : bool, optional When True, a header is written on top of each source file. [default: True] empty : bool, optional When True, empty lines are used to structure the code. [default: True] argument_sequence : iterable, optional Sequence of arguments for the routine in a preferred order. A CodeGenError is raised if required arguments are missing. Redundant arguments are used without warning. If omitted, arguments will be ordered alphabetically, but with all input arguments first, and then output or in-out arguments. global_vars : iterable, optional Sequence of global variables used by the routine. Variables listed here will not show up as function arguments. standard : string code_gen : CodeGen instance An instance of a CodeGen subclass. Overrides ``language``. Examples ======== >>> from sympy.utilities.codegen import codegen >>> from sympy.abc import x, y, z >>> [(c_name, c_code), (h_name, c_header)] = codegen( ... ("f", x+y*z), "C89", "test", header=False, empty=False) >>> print(c_name) test.c >>> print(c_code) #include "test.h" #include <math.h> double f(double x, double y, double z) { double f_result; f_result = x + y*z; return f_result; } <BLANKLINE> >>> print(h_name) test.h >>> print(c_header) #ifndef PROJECT__TEST__H #define PROJECT__TEST__H double f(double x, double y, double z); #endif <BLANKLINE> Another example using Equality objects to give named outputs. Here the filename (prefix) is taken from the first (name, expr) pair. >>> from sympy.abc import f, g >>> from sympy import Eq >>> [(c_name, c_code), (h_name, c_header)] = codegen( ... [("myfcn", x + y), ("fcn2", [Eq(f, 2*x), Eq(g, y)])], ... "C99", header=False, empty=False) >>> print(c_name) myfcn.c >>> print(c_code) #include "myfcn.h" #include <math.h> double myfcn(double x, double y) { double myfcn_result; myfcn_result = x + y; return myfcn_result; } void fcn2(double x, double y, double *f, double *g) { (*f) = 2*x; (*g) = y; } <BLANKLINE> If the generated function(s) will be part of a larger project where various global variables have been defined, the 'global_vars' option can be used to remove the specified variables from the function signature >>> from sympy.utilities.codegen import codegen >>> from sympy.abc import x, y, z >>> [(f_name, f_code), header] = codegen( ... ("f", x+y*z), "F95", header=False, empty=False, ... argument_sequence=(x, y), global_vars=(z,)) >>> print(f_code) REAL*8 function f(x, y) implicit none REAL*8, intent(in) :: x REAL*8, intent(in) :: y f = x + y*z end function <BLANKLINE> """ # Initialize the code generator. if language is None: if code_gen is None: raise ValueError("Need either language or code_gen") else: if code_gen is not None: raise ValueError("You cannot specify both language and code_gen.") code_gen = get_code_generator(language, project, standard, printer) if isinstance(name_expr[0], string_types): # single tuple is given, turn it into a singleton list with a tuple. name_expr = [name_expr] if prefix is None: prefix = name_expr[0][0] # Construct Routines appropriate for this code_gen from (name, expr) pairs. routines = [] for name, expr in name_expr: routines.append(code_gen.routine(name, expr, argument_sequence, global_vars)) # Write the code. return code_gen.write(routines, prefix, to_files, header, empty) def make_routine(name, expr, argument_sequence=None, global_vars=None, language="F95"): """A factory that makes an appropriate Routine from an expression. Parameters ========== name : string The name of this routine in the generated code. expr : expression or list/tuple of expressions A SymPy expression that the Routine instance will represent. If given a list or tuple of expressions, the routine will be considered to have multiple return values and/or output arguments. argument_sequence : list or tuple, optional List arguments for the routine in a preferred order. If omitted, the results are language dependent, for example, alphabetical order or in the same order as the given expressions. global_vars : iterable, optional Sequence of global variables used by the routine. Variables listed here will not show up as function arguments. language : string, optional Specify a target language. The Routine itself should be language-agnostic but the precise way one is created, error checking, etc depend on the language. [default: "F95"]. A decision about whether to use output arguments or return values is made depending on both the language and the particular mathematical expressions. For an expression of type Equality, the left hand side is typically made into an OutputArgument (or perhaps an InOutArgument if appropriate). Otherwise, typically, the calculated expression is made a return values of the routine. Examples ======== >>> from sympy.utilities.codegen import make_routine >>> from sympy.abc import x, y, f, g >>> from sympy import Eq >>> r = make_routine('test', [Eq(f, 2*x), Eq(g, x + y)]) >>> [arg.result_var for arg in r.results] [] >>> [arg.name for arg in r.arguments] [x, y, f, g] >>> [arg.name for arg in r.result_variables] [f, g] >>> r.local_vars set() Another more complicated example with a mixture of specified and automatically-assigned names. Also has Matrix output. >>> from sympy import Matrix >>> r = make_routine('fcn', [x*y, Eq(f, 1), Eq(g, x + g), Matrix([[x, 2]])]) >>> [arg.result_var for arg in r.results] # doctest: +SKIP [result_5397460570204848505] >>> [arg.expr for arg in r.results] [x*y] >>> [arg.name for arg in r.arguments] # doctest: +SKIP [x, y, f, g, out_8598435338387848786] We can examine the various arguments more closely: >>> from sympy.utilities.codegen import (InputArgument, OutputArgument, ... InOutArgument) >>> [a.name for a in r.arguments if isinstance(a, InputArgument)] [x, y] >>> [a.name for a in r.arguments if isinstance(a, OutputArgument)] # doctest: +SKIP [f, out_8598435338387848786] >>> [a.expr for a in r.arguments if isinstance(a, OutputArgument)] [1, Matrix([[x, 2]])] >>> [a.name for a in r.arguments if isinstance(a, InOutArgument)] [g] >>> [a.expr for a in r.arguments if isinstance(a, InOutArgument)] [g + x] """ # initialize a new code generator code_gen = get_code_generator(language) return code_gen.routine(name, expr, argument_sequence, global_vars)

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from __future__ import print_function, division from collections import defaultdict, OrderedDict from itertools import ( combinations, combinations_with_replacement, permutations, product, product as cartes ) import random from operator import gt from sympy.core import Basic # this is the logical location of these functions from sympy.core.compatibility import ( as_int, default_sort_key, is_sequence, iterable, ordered, range, string_types ) from sympy.utilities.enumerative import ( multiset_partitions_taocp, list_visitor, MultisetPartitionTraverser) def flatten(iterable, levels=None, cls=None): """ Recursively denest iterable containers. >>> from sympy.utilities.iterables import flatten >>> flatten([1, 2, 3]) [1, 2, 3] >>> flatten([1, 2, [3]]) [1, 2, 3] >>> flatten([1, [2, 3], [4, 5]]) [1, 2, 3, 4, 5] >>> flatten([1.0, 2, (1, None)]) [1.0, 2, 1, None] If you want to denest only a specified number of levels of nested containers, then set ``levels`` flag to the desired number of levels:: >>> ls = [[(-2, -1), (1, 2)], [(0, 0)]] >>> flatten(ls, levels=1) [(-2, -1), (1, 2), (0, 0)] If cls argument is specified, it will only flatten instances of that class, for example: >>> from sympy.core import Basic >>> class MyOp(Basic): ... pass ... >>> flatten([MyOp(1, MyOp(2, 3))], cls=MyOp) [1, 2, 3] adapted from https://kogs-www.informatik.uni-hamburg.de/~meine/python_tricks """ if levels is not None: if not levels: return iterable elif levels > 0: levels -= 1 else: raise ValueError( "expected non-negative number of levels, got %s" % levels) if cls is None: reducible = lambda x: is_sequence(x, set) else: reducible = lambda x: isinstance(x, cls) result = [] for el in iterable: if reducible(el): if hasattr(el, 'args'): el = el.args result.extend(flatten(el, levels=levels, cls=cls)) else: result.append(el) return result def unflatten(iter, n=2): """Group ``iter`` into tuples of length ``n``. Raise an error if the length of ``iter`` is not a multiple of ``n``. """ if n < 1 or len(iter) % n: raise ValueError('iter length is not a multiple of %i' % n) return list(zip(*(iter[i::n] for i in range(n)))) def reshape(seq, how): """Reshape the sequence according to the template in ``how``. Examples ======== >>> from sympy.utilities import reshape >>> seq = list(range(1, 9)) >>> reshape(seq, [4]) # lists of 4 [[1, 2, 3, 4], [5, 6, 7, 8]] >>> reshape(seq, (4,)) # tuples of 4 [(1, 2, 3, 4), (5, 6, 7, 8)] >>> reshape(seq, (2, 2)) # tuples of 4 [(1, 2, 3, 4), (5, 6, 7, 8)] >>> reshape(seq, (2, [2])) # (i, i, [i, i]) [(1, 2, [3, 4]), (5, 6, [7, 8])] >>> reshape(seq, ((2,), [2])) # etc.... [((1, 2), [3, 4]), ((5, 6), [7, 8])] >>> reshape(seq, (1, [2], 1)) [(1, [2, 3], 4), (5, [6, 7], 8)] >>> reshape(tuple(seq), ([[1], 1, (2,)],)) (([[1], 2, (3, 4)],), ([[5], 6, (7, 8)],)) >>> reshape(tuple(seq), ([1], 1, (2,))) (([1], 2, (3, 4)), ([5], 6, (7, 8))) >>> reshape(list(range(12)), [2, [3], {2}, (1, (3,), 1)]) [[0, 1, [2, 3, 4], {5, 6}, (7, (8, 9, 10), 11)]] """ m = sum(flatten(how)) n, rem = divmod(len(seq), m) if m < 0 or rem: raise ValueError('template must sum to positive number ' 'that divides the length of the sequence') i = 0 container = type(how) rv = [None]*n for k in range(len(rv)): rv[k] = [] for hi in how: if type(hi) is int: rv[k].extend(seq[i: i + hi]) i += hi else: n = sum(flatten(hi)) hi_type = type(hi) rv[k].append(hi_type(reshape(seq[i: i + n], hi)[0])) i += n rv[k] = container(rv[k]) return type(seq)(rv) def group(seq, multiple=True): """ Splits a sequence into a list of lists of equal, adjacent elements. Examples ======== >>> from sympy.utilities.iterables import group >>> group([1, 1, 1, 2, 2, 3]) [[1, 1, 1], [2, 2], [3]] >>> group([1, 1, 1, 2, 2, 3], multiple=False) [(1, 3), (2, 2), (3, 1)] >>> group([1, 1, 3, 2, 2, 1], multiple=False) [(1, 2), (3, 1), (2, 2), (1, 1)] See Also ======== multiset """ if not seq: return [] current, groups = [seq[0]], [] for elem in seq[1:]: if elem == current[-1]: current.append(elem) else: groups.append(current) current = [elem] groups.append(current) if multiple: return groups for i, current in enumerate(groups): groups[i] = (current[0], len(current)) return groups def multiset(seq): """Return the hashable sequence in multiset form with values being the multiplicity of the item in the sequence. Examples ======== >>> from sympy.utilities.iterables import multiset >>> multiset('mississippi') {'i': 4, 'm': 1, 'p': 2, 's': 4} See Also ======== group """ rv = defaultdict(int) for s in seq: rv[s] += 1 return dict(rv) def postorder_traversal(node, keys=None): """ Do a postorder traversal of a tree. This generator recursively yields nodes that it has visited in a postorder fashion. That is, it descends through the tree depth-first to yield all of a node's children's postorder traversal before yielding the node itself. Parameters ========== node : sympy expression The expression to traverse. keys : (default None) sort key(s) The key(s) used to sort args of Basic objects. When None, args of Basic objects are processed in arbitrary order. If key is defined, it will be passed along to ordered() as the only key(s) to use to sort the arguments; if ``key`` is simply True then the default keys of ``ordered`` will be used (node count and default_sort_key). Yields ====== subtree : sympy expression All of the subtrees in the tree. Examples ======== >>> from sympy.utilities.iterables import postorder_traversal >>> from sympy.abc import w, x, y, z The nodes are returned in the order that they are encountered unless key is given; simply passing key=True will guarantee that the traversal is unique. >>> list(postorder_traversal(w + (x + y)*z)) # doctest: +SKIP [z, y, x, x + y, z*(x + y), w, w + z*(x + y)] >>> list(postorder_traversal(w + (x + y)*z, keys=True)) [w, z, x, y, x + y, z*(x + y), w + z*(x + y)] """ if isinstance(node, Basic): args = node.args if keys: if keys != True: args = ordered(args, keys, default=False) else: args = ordered(args) for arg in args: for subtree in postorder_traversal(arg, keys): yield subtree elif iterable(node): for item in node: for subtree in postorder_traversal(item, keys): yield subtree yield node def interactive_traversal(expr): """Traverse a tree asking a user which branch to choose. """ from sympy.printing import pprint RED, BRED = '\033[0;31m', '\033[1;31m' GREEN, BGREEN = '\033[0;32m', '\033[1;32m' YELLOW, BYELLOW = '\033[0;33m', '\033[1;33m' BLUE, BBLUE = '\033[0;34m', '\033[1;34m' MAGENTA, BMAGENTA = '\033[0;35m', '\033[1;35m' CYAN, BCYAN = '\033[0;36m', '\033[1;36m' END = '\033[0m' def cprint(*args): print("".join(map(str, args)) + END) def _interactive_traversal(expr, stage): if stage > 0: print() cprint("Current expression (stage ", BYELLOW, stage, END, "):") print(BCYAN) pprint(expr) print(END) if isinstance(expr, Basic): if expr.is_Add: args = expr.as_ordered_terms() elif expr.is_Mul: args = expr.as_ordered_factors() else: args = expr.args elif hasattr(expr, "__iter__"): args = list(expr) else: return expr n_args = len(args) if not n_args: return expr for i, arg in enumerate(args): cprint(GREEN, "[", BGREEN, i, GREEN, "] ", BLUE, type(arg), END) pprint(arg) print if n_args == 1: choices = '0' else: choices = '0-%d' % (n_args - 1) try: choice = raw_input("Your choice [%s,f,l,r,d,?]: " % choices) except EOFError: result = expr print() else: if choice == '?': cprint(RED, "%s - select subexpression with the given index" % choices) cprint(RED, "f - select the first subexpression") cprint(RED, "l - select the last subexpression") cprint(RED, "r - select a random subexpression") cprint(RED, "d - done\n") result = _interactive_traversal(expr, stage) elif choice in ['d', '']: result = expr elif choice == 'f': result = _interactive_traversal(args[0], stage + 1) elif choice == 'l': result = _interactive_traversal(args[-1], stage + 1) elif choice == 'r': result = _interactive_traversal(random.choice(args), stage + 1) else: try: choice = int(choice) except ValueError: cprint(BRED, "Choice must be a number in %s range\n" % choices) result = _interactive_traversal(expr, stage) else: if choice < 0 or choice >= n_args: cprint(BRED, "Choice must be in %s range\n" % choices) result = _interactive_traversal(expr, stage) else: result = _interactive_traversal(args[choice], stage + 1) return result return _interactive_traversal(expr, 0) def ibin(n, bits=0, str=False): """Return a list of length ``bits`` corresponding to the binary value of ``n`` with small bits to the right (last). If bits is omitted, the length will be the number required to represent ``n``. If the bits are desired in reversed order, use the ``[::-1]`` slice of the returned list. If a sequence of all bits-length lists starting from ``[0, 0,..., 0]`` through ``[1, 1, ..., 1]`` are desired, pass a non-integer for bits, e.g. ``'all'``. If the bit *string* is desired pass ``str=True``. Examples ======== >>> from sympy.utilities.iterables import ibin >>> ibin(2) [1, 0] >>> ibin(2, 4) [0, 0, 1, 0] >>> ibin(2, 4)[::-1] [0, 1, 0, 0] If all lists corresponding to 0 to 2**n - 1, pass a non-integer for bits: >>> bits = 2 >>> for i in ibin(2, 'all'): ... print(i) (0, 0) (0, 1) (1, 0) (1, 1) If a bit string is desired of a given length, use str=True: >>> n = 123 >>> bits = 10 >>> ibin(n, bits, str=True) '0001111011' >>> ibin(n, bits, str=True)[::-1] # small bits left '1101111000' >>> list(ibin(3, 'all', str=True)) ['000', '001', '010', '011', '100', '101', '110', '111'] """ if not str: try: bits = as_int(bits) return [1 if i == "1" else 0 for i in bin(n)[2:].rjust(bits, "0")] except ValueError: return variations(list(range(2)), n, repetition=True) else: try: bits = as_int(bits) return bin(n)[2:].rjust(bits, "0") except ValueError: return (bin(i)[2:].rjust(n, "0") for i in range(2**n)) def variations(seq, n, repetition=False): r"""Returns a generator of the n-sized variations of ``seq`` (size N). ``repetition`` controls whether items in ``seq`` can appear more than once; Examples ======== ``variations(seq, n)`` will return `\frac{N!}{(N - n)!}` permutations without repetition of ``seq``'s elements: >>> from sympy.utilities.iterables import variations >>> list(variations([1, 2], 2)) [(1, 2), (2, 1)] ``variations(seq, n, True)`` will return the `N^n` permutations obtained by allowing repetition of elements: >>> list(variations([1, 2], 2, repetition=True)) [(1, 1), (1, 2), (2, 1), (2, 2)] If you ask for more items than are in the set you get the empty set unless you allow repetitions: >>> list(variations([0, 1], 3, repetition=False)) [] >>> list(variations([0, 1], 3, repetition=True))[:4] [(0, 0, 0), (0, 0, 1), (0, 1, 0), (0, 1, 1)] See Also ======== sympy.core.compatibility.permutations sympy.core.compatibility.product """ if not repetition: seq = tuple(seq) if len(seq) < n: return for i in permutations(seq, n): yield i else: if n == 0: yield () else: for i in product(seq, repeat=n): yield i def subsets(seq, k=None, repetition=False): r"""Generates all `k`-subsets (combinations) from an `n`-element set, ``seq``. A `k`-subset of an `n`-element set is any subset of length exactly `k`. The number of `k`-subsets of an `n`-element set is given by ``binomial(n, k)``, whereas there are `2^n` subsets all together. If `k` is ``None`` then all `2^n` subsets will be returned from shortest to longest. Examples ======== >>> from sympy.utilities.iterables import subsets ``subsets(seq, k)`` will return the `\frac{n!}{k!(n - k)!}` `k`-subsets (combinations) without repetition, i.e. once an item has been removed, it can no longer be "taken": >>> list(subsets([1, 2], 2)) [(1, 2)] >>> list(subsets([1, 2])) [(), (1,), (2,), (1, 2)] >>> list(subsets([1, 2, 3], 2)) [(1, 2), (1, 3), (2, 3)] ``subsets(seq, k, repetition=True)`` will return the `\frac{(n - 1 + k)!}{k!(n - 1)!}` combinations *with* repetition: >>> list(subsets([1, 2], 2, repetition=True)) [(1, 1), (1, 2), (2, 2)] If you ask for more items than are in the set you get the empty set unless you allow repetitions: >>> list(subsets([0, 1], 3, repetition=False)) [] >>> list(subsets([0, 1], 3, repetition=True)) [(0, 0, 0), (0, 0, 1), (0, 1, 1), (1, 1, 1)] """ if k is None: for k in range(len(seq) + 1): for i in subsets(seq, k, repetition): yield i else: if not repetition: for i in combinations(seq, k): yield i else: for i in combinations_with_replacement(seq, k): yield i def filter_symbols(iterator, exclude): """ Only yield elements from `iterator` that do not occur in `exclude`. Parameters ========== iterator : iterable iterator to take elements from exclude : iterable elements to exclude Returns ======= iterator : iterator filtered iterator """ exclude = set(exclude) for s in iterator: if s not in exclude: yield s def numbered_symbols(prefix='x', cls=None, start=0, exclude=[], *args, **assumptions): """ Generate an infinite stream of Symbols consisting of a prefix and increasing subscripts provided that they do not occur in ``exclude``. Parameters ========== prefix : str, optional The prefix to use. By default, this function will generate symbols of the form "x0", "x1", etc. cls : class, optional The class to use. By default, it uses ``Symbol``, but you can also use ``Wild`` or ``Dummy``. start : int, optional The start number. By default, it is 0. Returns ======= sym : Symbol The subscripted symbols. """ exclude = set(exclude or []) if cls is None: # We can't just make the default cls=Symbol because it isn't # imported yet. from sympy import Symbol cls = Symbol while True: name = '%s%s' % (prefix, start) s = cls(name, *args, **assumptions) if s not in exclude: yield s start += 1 def capture(func): """Return the printed output of func(). ``func`` should be a function without arguments that produces output with print statements. >>> from sympy.utilities.iterables import capture >>> from sympy import pprint >>> from sympy.abc import x >>> def foo(): ... print('hello world!') ... >>> 'hello' in capture(foo) # foo, not foo() True >>> capture(lambda: pprint(2/x)) '2\\n-\\nx\\n' """ from sympy.core.compatibility import StringIO import sys stdout = sys.stdout sys.stdout = file = StringIO() try: func() finally: sys.stdout = stdout return file.getvalue() def sift(seq, keyfunc, binary=False): """ Sift the sequence, ``seq`` according to ``keyfunc``. Returns ======= When ``binary`` is ``False`` (default), the output is a dictionary where elements of ``seq`` are stored in a list keyed to the value of keyfunc for that element. If ``binary`` is True then a tuple with lists ``T`` and ``F`` are returned where ``T`` is a list containing elements of seq for which ``keyfunc`` was ``True`` and ``F`` containing those elements for which ``keyfunc`` was ``False``; a ValueError is raised if the ``keyfunc`` is not binary. Examples ======== >>> from sympy.utilities import sift >>> from sympy.abc import x, y >>> from sympy import sqrt, exp, pi, Tuple >>> sift(range(5), lambda x: x % 2) {0: [0, 2, 4], 1: [1, 3]} sift() returns a defaultdict() object, so any key that has no matches will give []. >>> sift([x], lambda x: x.is_commutative) {True: [x]} >>> _[False] [] Sometimes you will not know how many keys you will get: >>> sift([sqrt(x), exp(x), (y**x)**2], ... lambda x: x.as_base_exp()[0]) {E: [exp(x)], x: [sqrt(x)], y: [y**(2*x)]} Sometimes you expect the results to be binary; the results can be unpacked by setting ``binary`` to True: >>> sift(range(4), lambda x: x % 2, binary=True) ([1, 3], [0, 2]) >>> sift(Tuple(1, pi), lambda x: x.is_rational, binary=True) ([1], [pi]) A ValueError is raised if the predicate was not actually binary (which is a good test for the logic where sifting is used and binary results were expected): >>> unknown = exp(1) - pi # the rationality of this is unknown >>> args = Tuple(1, pi, unknown) >>> sift(args, lambda x: x.is_rational, binary=True) Traceback (most recent call last): ... ValueError: keyfunc gave non-binary output The non-binary sifting shows that there were 3 keys generated: >>> set(sift(args, lambda x: x.is_rational).keys()) {None, False, True} If you need to sort the sifted items it might be better to use ``ordered`` which can economically apply multiple sort keys to a sequence while sorting. See Also ======== ordered """ if not binary: m = defaultdict(list) for i in seq: m[keyfunc(i)].append(i) return m sift = F, T = [], [] for i in seq: try: sift[keyfunc(i)].append(i) except (IndexError, TypeError): raise ValueError('keyfunc gave non-binary output') return T, F def take(iter, n): """Return ``n`` items from ``iter`` iterator. """ return [ value for _, value in zip(range(n), iter) ] def dict_merge(*dicts): """Merge dictionaries into a single dictionary. """ merged = {} for dict in dicts: merged.update(dict) return merged def common_prefix(*seqs): """Return the subsequence that is a common start of sequences in ``seqs``. >>> from sympy.utilities.iterables import common_prefix >>> common_prefix(list(range(3))) [0, 1, 2] >>> common_prefix(list(range(3)), list(range(4))) [0, 1, 2] >>> common_prefix([1, 2, 3], [1, 2, 5]) [1, 2] >>> common_prefix([1, 2, 3], [1, 3, 5]) [1] """ if any(not s for s in seqs): return [] elif len(seqs) == 1: return seqs[0] i = 0 for i in range(min(len(s) for s in seqs)): if not all(seqs[j][i] == seqs[0][i] for j in range(len(seqs))): break else: i += 1 return seqs[0][:i] def common_suffix(*seqs): """Return the subsequence that is a common ending of sequences in ``seqs``. >>> from sympy.utilities.iterables import common_suffix >>> common_suffix(list(range(3))) [0, 1, 2] >>> common_suffix(list(range(3)), list(range(4))) [] >>> common_suffix([1, 2, 3], [9, 2, 3]) [2, 3] >>> common_suffix([1, 2, 3], [9, 7, 3]) [3] """ if any(not s for s in seqs): return [] elif len(seqs) == 1: return seqs[0] i = 0 for i in range(-1, -min(len(s) for s in seqs) - 1, -1): if not all(seqs[j][i] == seqs[0][i] for j in range(len(seqs))): break else: i -= 1 if i == -1: return [] else: return seqs[0][i + 1:] def prefixes(seq): """ Generate all prefixes of a sequence. Examples ======== >>> from sympy.utilities.iterables import prefixes >>> list(prefixes([1,2,3,4])) [[1], [1, 2], [1, 2, 3], [1, 2, 3, 4]] """ n = len(seq) for i in range(n): yield seq[:i + 1] def postfixes(seq): """ Generate all postfixes of a sequence. Examples ======== >>> from sympy.utilities.iterables import postfixes >>> list(postfixes([1,2,3,4])) [[4], [3, 4], [2, 3, 4], [1, 2, 3, 4]] """ n = len(seq) for i in range(n): yield seq[n - i - 1:] def topological_sort(graph, key=None): r""" Topological sort of graph's vertices. Parameters ========== graph : tuple[list, list[tuple[T, T]] A tuple consisting of a list of vertices and a list of edges of a graph to be sorted topologically. key : callable[T] (optional) Ordering key for vertices on the same level. By default the natural (e.g. lexicographic) ordering is used (in this case the base type must implement ordering relations). Examples ======== Consider a graph:: +---+ +---+ +---+ | 7 |\ | 5 | | 3 | +---+ \ +---+ +---+ | _\___/ ____ _/ | | / \___/ \ / | V V V V | +----+ +---+ | | 11 | | 8 | | +----+ +---+ | | | \____ ___/ _ | | \ \ / / \ | V \ V V / V V +---+ \ +---+ | +----+ | 2 | | | 9 | | | 10 | +---+ | +---+ | +----+ \________/ where vertices are integers. This graph can be encoded using elementary Python's data structures as follows:: >>> V = [2, 3, 5, 7, 8, 9, 10, 11] >>> E = [(7, 11), (7, 8), (5, 11), (3, 8), (3, 10), ... (11, 2), (11, 9), (11, 10), (8, 9)] To compute a topological sort for graph ``(V, E)`` issue:: >>> from sympy.utilities.iterables import topological_sort >>> topological_sort((V, E)) [3, 5, 7, 8, 11, 2, 9, 10] If specific tie breaking approach is needed, use ``key`` parameter:: >>> topological_sort((V, E), key=lambda v: -v) [7, 5, 11, 3, 10, 8, 9, 2] Only acyclic graphs can be sorted. If the input graph has a cycle, then :py:exc:`ValueError` will be raised:: >>> topological_sort((V, E + [(10, 7)])) Traceback (most recent call last): ... ValueError: cycle detected References ========== .. [1] https://en.wikipedia.org/wiki/Topological_sorting """ V, E = graph L = [] S = set(V) E = list(E) for v, u in E: S.discard(u) if key is None: key = lambda value: value S = sorted(S, key=key, reverse=True) while S: node = S.pop() L.append(node) for u, v in list(E): if u == node: E.remove((u, v)) for _u, _v in E: if v == _v: break else: kv = key(v) for i, s in enumerate(S): ks = key(s) if kv > ks: S.insert(i, v) break else: S.append(v) if E: raise ValueError("cycle detected") else: return L def strongly_connected_components(G): r""" Strongly connected components of a directed graph in reverse topological order. Parameters ========== graph : tuple[list, list[tuple[T, T]] A tuple consisting of a list of vertices and a list of edges of a graph whose strongly connected components are to be found. Examples ======== Consider a directed graph (in dot notation):: digraph { A -> B A -> C B -> C C -> B B -> D } where vertices are the letters A, B, C and D. This graph can be encoded using Python's elementary data structures as follows:: >>> V = ['A', 'B', 'C', 'D'] >>> E = [('A', 'B'), ('A', 'C'), ('B', 'C'), ('C', 'B'), ('B', 'D')] The strongly connected components of this graph can be computed as >>> from sympy.utilities.iterables import strongly_connected_components >>> strongly_connected_components((V, E)) [['D'], ['B', 'C'], ['A']] This also gives the components in reverse topological order. Since the subgraph containing B and C has a cycle they must be together in a strongly connected component. A and D are connected to the rest of the graph but not in a cyclic manner so they appear as their own strongly connected components. Notes ===== The vertices of the graph must be hashable for the data structures used. If the vertices are unhashable replace them with integer indices. This function uses Tarjan's algorithm to compute the strongly connected components in `O(|V|+|E|)` (linear) time. References ========== .. [1] https://en.wikipedia.org/wiki/Strongly_connected_component .. [2] https://en.wikipedia.org/wiki/Tarjan%27s_strongly_connected_components_algorithm See Also ======== utilities.iterables.connected_components() """ # Map from a vertex to its neighbours V, E = G Gmap = {vi: [] for vi in V} for v1, v2 in E: Gmap[v1].append(v2) # Non-recursive Tarjan's algorithm: lowlink = {} indices = {} stack = OrderedDict() callstack = [] components = [] nomore = object() def start(v): index = len(stack) indices[v] = lowlink[v] = index stack[v] = None callstack.append((v, iter(Gmap[v]))) def finish(v1): # Finished a component? if lowlink[v1] == indices[v1]: component = [stack.popitem()[0]] while component[-1] is not v1: component.append(stack.popitem()[0]) components.append(component[::-1]) v2, _ = callstack.pop() if callstack: v1, _ = callstack[-1] lowlink[v1] = min(lowlink[v1], lowlink[v2]) for v in V: if v in indices: continue start(v) while callstack: v1, it1 = callstack[-1] v2 = next(it1, nomore) # Finished children of v1? if v2 is nomore: finish(v1) # Recurse on v2 elif v2 not in indices: start(v2) elif v2 in stack: lowlink[v1] = min(lowlink[v1], indices[v2]) # Reverse topological sort order: return components def connected_components(G): r""" Connected components of an undirected graph or weakly connected components of a directed graph. Parameters ========== graph : tuple[list, list[tuple[T, T]] A tuple consisting of a list of vertices and a list of edges of a graph whose connected components are to be found. Examples ======== Given an undirected graph:: graph { A -- B C -- D } We can find the connected components using this function if we include each edge in both directions:: >>> from sympy.utilities.iterables import connected_components >>> V = ['A', 'B', 'C', 'D'] >>> E = [('A', 'B'), ('B', 'A'), ('C', 'D'), ('D', 'C')] >>> connected_components((V, E)) [['A', 'B'], ['C', 'D']] The weakly connected components of a directed graph can found the same way. Notes ===== The vertices of the graph must be hashable for the data structures used. If the vertices are unhashable replace them with integer indices. This function uses Tarjan's algorithm to compute the connected components in `O(|V|+|E|)` (linear) time. References ========== .. [1] https://en.wikipedia.org/wiki/Connected_component_(graph_theory) .. [2] https://en.wikipedia.org/wiki/Tarjan%27s_strongly_connected_components_algorithm See Also ======== utilities.iterables.strongly_connected_components() """ # Duplicate edges both ways so that the graph is effectively undirected # and return the strongly connected components: V, E = G E_undirected = [] for v1, v2 in E: E_undirected.extend([(v1, v2), (v2, v1)]) return strongly_connected_components((V, E_undirected)) def rotate_left(x, y): """ Left rotates a list x by the number of steps specified in y. Examples ======== >>> from sympy.utilities.iterables import rotate_left >>> a = [0, 1, 2] >>> rotate_left(a, 1) [1, 2, 0] """ if len(x) == 0: return [] y = y % len(x) return x[y:] + x[:y] def rotate_right(x, y): """ Right rotates a list x by the number of steps specified in y. Examples ======== >>> from sympy.utilities.iterables import rotate_right >>> a = [0, 1, 2] >>> rotate_right(a, 1) [2, 0, 1] """ if len(x) == 0: return [] y = len(x) - y % len(x) return x[y:] + x[:y] def least_rotation(x): ''' Returns the number of steps of left rotation required to obtain lexicographically minimal string/list/tuple, etc. Examples ======== >>> from sympy.utilities.iterables import least_rotation, rotate_left >>> a = [3, 1, 5, 1, 2] >>> least_rotation(a) 3 >>> rotate_left(a, _) [1, 2, 3, 1, 5] References ========== .. [1] https://en.wikipedia.org/wiki/Lexicographically_minimal_string_rotation ''' S = x + x # Concatenate string to it self to avoid modular arithmetic f = [-1] * len(S) # Failure function k = 0 # Least rotation of string found so far for j in range(1,len(S)): sj = S[j] i = f[j-k-1] while i != -1 and sj != S[k+i+1]: if sj < S[k+i+1]: k = j-i-1 i = f[i] if sj != S[k+i+1]: if sj < S[k]: k = j f[j-k] = -1 else: f[j-k] = i+1 return k def multiset_combinations(m, n, g=None): """ Return the unique combinations of size ``n`` from multiset ``m``. Examples ======== >>> from sympy.utilities.iterables import multiset_combinations >>> from itertools import combinations >>> [''.join(i) for i in multiset_combinations('baby', 3)] ['abb', 'aby', 'bby'] >>> def count(f, s): return len(list(f(s, 3))) The number of combinations depends on the number of letters; the number of unique combinations depends on how the letters are repeated. >>> s1 = 'abracadabra' >>> s2 = 'banana tree' >>> count(combinations, s1), count(multiset_combinations, s1) (165, 23) >>> count(combinations, s2), count(multiset_combinations, s2) (165, 54) """ if g is None: if type(m) is dict: if n > sum(m.values()): return g = [[k, m[k]] for k in ordered(m)] else: m = list(m) if n > len(m): return try: m = multiset(m) g = [(k, m[k]) for k in ordered(m)] except TypeError: m = list(ordered(m)) g = [list(i) for i in group(m, multiple=False)] del m if sum(v for k, v in g) < n or not n: yield [] else: for i, (k, v) in enumerate(g): if v >= n: yield [k]*n v = n - 1 for v in range(min(n, v), 0, -1): for j in multiset_combinations(None, n - v, g[i + 1:]): rv = [k]*v + j if len(rv) == n: yield rv def multiset_permutations(m, size=None, g=None): """ Return the unique permutations of multiset ``m``. Examples ======== >>> from sympy.utilities.iterables import multiset_permutations >>> from sympy import factorial >>> [''.join(i) for i in multiset_permutations('aab')] ['aab', 'aba', 'baa'] >>> factorial(len('banana')) 720 >>> len(list(multiset_permutations('banana'))) 60 """ if g is None: if type(m) is dict: g = [[k, m[k]] for k in ordered(m)] else: m = list(ordered(m)) g = [list(i) for i in group(m, multiple=False)] del m do = [gi for gi in g if gi[1] > 0] SUM = sum([gi[1] for gi in do]) if not do or size is not None and (size > SUM or size < 1): if size < 1: yield [] return elif size == 1: for k, v in do: yield [k] elif len(do) == 1: k, v = do[0] v = v if size is None else (size if size <= v else 0) yield [k for i in range(v)] elif all(v == 1 for k, v in do): for p in permutations([k for k, v in do], size): yield list(p) else: size = size if size is not None else SUM for i, (k, v) in enumerate(do): do[i][1] -= 1 for j in multiset_permutations(None, size - 1, do): if j: yield [k] + j do[i][1] += 1 def _partition(seq, vector, m=None): """ Return the partition of seq as specified by the partition vector. Examples ======== >>> from sympy.utilities.iterables import _partition >>> _partition('abcde', [1, 0, 1, 2, 0]) [['b', 'e'], ['a', 'c'], ['d']] Specifying the number of bins in the partition is optional: >>> _partition('abcde', [1, 0, 1, 2, 0], 3) [['b', 'e'], ['a', 'c'], ['d']] The output of _set_partitions can be passed as follows: >>> output = (3, [1, 0, 1, 2, 0]) >>> _partition('abcde', *output) [['b', 'e'], ['a', 'c'], ['d']] See Also ======== combinatorics.partitions.Partition.from_rgs() """ if m is None: m = max(vector) + 1 elif type(vector) is int: # entered as m, vector vector, m = m, vector p = [[] for i in range(m)] for i, v in enumerate(vector): p[v].append(seq[i]) return p def _set_partitions(n): """Cycle through all partions of n elements, yielding the current number of partitions, ``m``, and a mutable list, ``q`` such that element[i] is in part q[i] of the partition. NOTE: ``q`` is modified in place and generally should not be changed between function calls. Examples ======== >>> from sympy.utilities.iterables import _set_partitions, _partition >>> for m, q in _set_partitions(3): ... print('%s %s %s' % (m, q, _partition('abc', q, m))) 1 [0, 0, 0] [['a', 'b', 'c']] 2 [0, 0, 1] [['a', 'b'], ['c']] 2 [0, 1, 0] [['a', 'c'], ['b']] 2 [0, 1, 1] [['a'], ['b', 'c']] 3 [0, 1, 2] [['a'], ['b'], ['c']] Notes ===== This algorithm is similar to, and solves the same problem as, Algorithm 7.2.1.5H, from volume 4A of Knuth's The Art of Computer Programming. Knuth uses the term "restricted growth string" where this code refers to a "partition vector". In each case, the meaning is the same: the value in the ith element of the vector specifies to which part the ith set element is to be assigned. At the lowest level, this code implements an n-digit big-endian counter (stored in the array q) which is incremented (with carries) to get the next partition in the sequence. A special twist is that a digit is constrained to be at most one greater than the maximum of all the digits to the left of it. The array p maintains this maximum, so that the code can efficiently decide when a digit can be incremented in place or whether it needs to be reset to 0 and trigger a carry to the next digit. The enumeration starts with all the digits 0 (which corresponds to all the set elements being assigned to the same 0th part), and ends with 0123...n, which corresponds to each set element being assigned to a different, singleton, part. This routine was rewritten to use 0-based lists while trying to preserve the beauty and efficiency of the original algorithm. References ========== .. [1] Nijenhuis, Albert and Wilf, Herbert. (1978) Combinatorial Algorithms, 2nd Ed, p 91, algorithm "nexequ". Available online from https://www.math.upenn.edu/~wilf/website/CombAlgDownld.html (viewed November 17, 2012). """ p = [0]*n q = [0]*n nc = 1 yield nc, q while nc != n: m = n while 1: m -= 1 i = q[m] if p[i] != 1: break q[m] = 0 i += 1 q[m] = i m += 1 nc += m - n p[0] += n - m if i == nc: p[nc] = 0 nc += 1 p[i - 1] -= 1 p[i] += 1 yield nc, q def multiset_partitions(multiset, m=None): """ Return unique partitions of the given multiset (in list form). If ``m`` is None, all multisets will be returned, otherwise only partitions with ``m`` parts will be returned. If ``multiset`` is an integer, a range [0, 1, ..., multiset - 1] will be supplied. Examples ======== >>> from sympy.utilities.iterables import multiset_partitions >>> list(multiset_partitions([1, 2, 3, 4], 2)) [[[1, 2, 3], [4]], [[1, 2, 4], [3]], [[1, 2], [3, 4]], [[1, 3, 4], [2]], [[1, 3], [2, 4]], [[1, 4], [2, 3]], [[1], [2, 3, 4]]] >>> list(multiset_partitions([1, 2, 3, 4], 1)) [[[1, 2, 3, 4]]] Only unique partitions are returned and these will be returned in a canonical order regardless of the order of the input: >>> a = [1, 2, 2, 1] >>> ans = list(multiset_partitions(a, 2)) >>> a.sort() >>> list(multiset_partitions(a, 2)) == ans True >>> a = range(3, 1, -1) >>> (list(multiset_partitions(a)) == ... list(multiset_partitions(sorted(a)))) True If m is omitted then all partitions will be returned: >>> list(multiset_partitions([1, 1, 2])) [[[1, 1, 2]], [[1, 1], [2]], [[1, 2], [1]], [[1], [1], [2]]] >>> list(multiset_partitions([1]*3)) [[[1, 1, 1]], [[1], [1, 1]], [[1], [1], [1]]] Counting ======== The number of partitions of a set is given by the bell number: >>> from sympy import bell >>> len(list(multiset_partitions(5))) == bell(5) == 52 True The number of partitions of length k from a set of size n is given by the Stirling Number of the 2nd kind: >>> from sympy.functions.combinatorial.numbers import stirling >>> stirling(5, 2) == len(list(multiset_partitions(5, 2))) == 15 True These comments on counting apply to *sets*, not multisets. Notes ===== When all the elements are the same in the multiset, the order of the returned partitions is determined by the ``partitions`` routine. If one is counting partitions then it is better to use the ``nT`` function. See Also ======== partitions sympy.combinatorics.partitions.Partition sympy.combinatorics.partitions.IntegerPartition sympy.functions.combinatorial.numbers.nT """ # This function looks at the supplied input and dispatches to # several special-case routines as they apply. if type(multiset) is int: n = multiset if m and m > n: return multiset = list(range(n)) if m == 1: yield [multiset[:]] return # If m is not None, it can sometimes be faster to use # MultisetPartitionTraverser.enum_range() even for inputs # which are sets. Since the _set_partitions code is quite # fast, this is only advantageous when the overall set # partitions outnumber those with the desired number of parts # by a large factor. (At least 60.) Such a switch is not # currently implemented. for nc, q in _set_partitions(n): if m is None or nc == m: rv = [[] for i in range(nc)] for i in range(n): rv[q[i]].append(multiset[i]) yield rv return if len(multiset) == 1 and isinstance(multiset, string_types): multiset = [multiset] if not has_variety(multiset): # Only one component, repeated n times. The resulting # partitions correspond to partitions of integer n. n = len(multiset) if m and m > n: return if m == 1: yield [multiset[:]] return x = multiset[:1] for size, p in partitions(n, m, size=True): if m is None or size == m: rv = [] for k in sorted(p): rv.extend([x*k]*p[k]) yield rv else: multiset = list(ordered(multiset)) n = len(multiset) if m and m > n: return if m == 1: yield [multiset[:]] return # Split the information of the multiset into two lists - # one of the elements themselves, and one (of the same length) # giving the number of repeats for the corresponding element. elements, multiplicities = zip(*group(multiset, False)) if len(elements) < len(multiset): # General case - multiset with more than one distinct element # and at least one element repeated more than once. if m: mpt = MultisetPartitionTraverser() for state in mpt.enum_range(multiplicities, m-1, m): yield list_visitor(state, elements) else: for state in multiset_partitions_taocp(multiplicities): yield list_visitor(state, elements) else: # Set partitions case - no repeated elements. Pretty much # same as int argument case above, with same possible, but # currently unimplemented optimization for some cases when # m is not None for nc, q in _set_partitions(n): if m is None or nc == m: rv = [[] for i in range(nc)] for i in range(n): rv[q[i]].append(i) yield [[multiset[j] for j in i] for i in rv] def partitions(n, m=None, k=None, size=False): """Generate all partitions of positive integer, n. Parameters ========== m : integer (default gives partitions of all sizes) limits number of parts in partition (mnemonic: m, maximum parts) k : integer (default gives partitions number from 1 through n) limits the numbers that are kept in the partition (mnemonic: k, keys) size : bool (default False, only partition is returned) when ``True`` then (M, P) is returned where M is the sum of the multiplicities and P is the generated partition. Each partition is represented as a dictionary, mapping an integer to the number of copies of that integer in the partition. For example, the first partition of 4 returned is {4: 1}, "4: one of them". Examples ======== >>> from sympy.utilities.iterables import partitions The numbers appearing in the partition (the key of the returned dict) are limited with k: >>> for p in partitions(6, k=2): # doctest: +SKIP ... print(p) {2: 3} {1: 2, 2: 2} {1: 4, 2: 1} {1: 6} The maximum number of parts in the partition (the sum of the values in the returned dict) are limited with m (default value, None, gives partitions from 1 through n): >>> for p in partitions(6, m=2): # doctest: +SKIP ... print(p) ... {6: 1} {1: 1, 5: 1} {2: 1, 4: 1} {3: 2} Note that the _same_ dictionary object is returned each time. This is for speed: generating each partition goes quickly, taking constant time, independent of n. >>> [p for p in partitions(6, k=2)] [{1: 6}, {1: 6}, {1: 6}, {1: 6}] If you want to build a list of the returned dictionaries then make a copy of them: >>> [p.copy() for p in partitions(6, k=2)] # doctest: +SKIP [{2: 3}, {1: 2, 2: 2}, {1: 4, 2: 1}, {1: 6}] >>> [(M, p.copy()) for M, p in partitions(6, k=2, size=True)] # doctest: +SKIP [(3, {2: 3}), (4, {1: 2, 2: 2}), (5, {1: 4, 2: 1}), (6, {1: 6})] References ========== .. [1] modified from Tim Peter's version to allow for k and m values: http://code.activestate.com/recipes/218332-generator-for-integer-partitions/ See Also ======== sympy.combinatorics.partitions.Partition sympy.combinatorics.partitions.IntegerPartition """ if (n <= 0 or m is not None and m < 1 or k is not None and k < 1 or m and k and m*k < n): # the empty set is the only way to handle these inputs # and returning {} to represent it is consistent with # the counting convention, e.g. nT(0) == 1. if size: yield 0, {} else: yield {} return if m is None: m = n else: m = min(m, n) if n == 0: if size: yield 1, {0: 1} else: yield {0: 1} return k = min(k or n, n) n, m, k = as_int(n), as_int(m), as_int(k) q, r = divmod(n, k) ms = {k: q} keys = [k] # ms.keys(), from largest to smallest if r: ms[r] = 1 keys.append(r) room = m - q - bool(r) if size: yield sum(ms.values()), ms else: yield ms while keys != [1]: # Reuse any 1's. if keys[-1] == 1: del keys[-1] reuse = ms.pop(1) room += reuse else: reuse = 0 while 1: # Let i be the smallest key larger than 1. Reuse one # instance of i. i = keys[-1] newcount = ms[i] = ms[i] - 1 reuse += i if newcount == 0: del keys[-1], ms[i] room += 1 # Break the remainder into pieces of size i-1. i -= 1 q, r = divmod(reuse, i) need = q + bool(r) if need > room: if not keys: return continue ms[i] = q keys.append(i) if r: ms[r] = 1 keys.append(r) break room -= need if size: yield sum(ms.values()), ms else: yield ms def ordered_partitions(n, m=None, sort=True): """Generates ordered partitions of integer ``n``. Parameters ========== m : integer (default None) The default value gives partitions of all sizes else only those with size m. In addition, if ``m`` is not None then partitions are generated *in place* (see examples). sort : bool (default True) Controls whether partitions are returned in sorted order when ``m`` is not None; when False, the partitions are returned as fast as possible with elements sorted, but when m|n the partitions will not be in ascending lexicographical order. Examples ======== >>> from sympy.utilities.iterables import ordered_partitions All partitions of 5 in ascending lexicographical: >>> for p in ordered_partitions(5): ... print(p) [1, 1, 1, 1, 1] [1, 1, 1, 2] [1, 1, 3] [1, 2, 2] [1, 4] [2, 3] [5] Only partitions of 5 with two parts: >>> for p in ordered_partitions(5, 2): ... print(p) [1, 4] [2, 3] When ``m`` is given, a given list objects will be used more than once for speed reasons so you will not see the correct partitions unless you make a copy of each as it is generated: >>> [p for p in ordered_partitions(7, 3)] [[1, 1, 1], [1, 1, 1], [1, 1, 1], [2, 2, 2]] >>> [list(p) for p in ordered_partitions(7, 3)] [[1, 1, 5], [1, 2, 4], [1, 3, 3], [2, 2, 3]] When ``n`` is a multiple of ``m``, the elements are still sorted but the partitions themselves will be *unordered* if sort is False; the default is to return them in ascending lexicographical order. >>> for p in ordered_partitions(6, 2): ... print(p) [1, 5] [2, 4] [3, 3] But if speed is more important than ordering, sort can be set to False: >>> for p in ordered_partitions(6, 2, sort=False): ... print(p) [1, 5] [3, 3] [2, 4] References ========== .. [1] Generating Integer Partitions, [online], Available: https://jeromekelleher.net/generating-integer-partitions.html .. [2] Jerome Kelleher and Barry O'Sullivan, "Generating All Partitions: A Comparison Of Two Encodings", [online], Available: https://arxiv.org/pdf/0909.2331v2.pdf """ if n < 1 or m is not None and m < 1: # the empty set is the only way to handle these inputs # and returning {} to represent it is consistent with # the counting convention, e.g. nT(0) == 1. yield [] return if m is None: # The list `a`'s leading elements contain the partition in which # y is the biggest element and x is either the same as y or the # 2nd largest element; v and w are adjacent element indices # to which x and y are being assigned, respectively. a = [1]*n y = -1 v = n while v > 0: v -= 1 x = a[v] + 1 while y >= 2 * x: a[v] = x y -= x v += 1 w = v + 1 while x <= y: a[v] = x a[w] = y yield a[:w + 1] x += 1 y -= 1 a[v] = x + y y = a[v] - 1 yield a[:w] elif m == 1: yield [n] elif n == m: yield [1]*n else: # recursively generate partitions of size m for b in range(1, n//m + 1): a = [b]*m x = n - b*m if not x: if sort: yield a elif not sort and x <= m: for ax in ordered_partitions(x, sort=False): mi = len(ax) a[-mi:] = [i + b for i in ax] yield a a[-mi:] = [b]*mi else: for mi in range(1, m): for ax in ordered_partitions(x, mi, sort=True): a[-mi:] = [i + b for i in ax] yield a a[-mi:] = [b]*mi def binary_partitions(n): """ Generates the binary partition of n. A binary partition consists only of numbers that are powers of two. Each step reduces a `2^{k+1}` to `2^k` and `2^k`. Thus 16 is converted to 8 and 8. Examples ======== >>> from sympy.utilities.iterables import binary_partitions >>> for i in binary_partitions(5): ... print(i) ... [4, 1] [2, 2, 1] [2, 1, 1, 1] [1, 1, 1, 1, 1] References ========== .. [1] TAOCP 4, section 7.2.1.5, problem 64 """ from math import ceil, log pow = int(2**(ceil(log(n, 2)))) sum = 0 partition = [] while pow: if sum + pow <= n: partition.append(pow) sum += pow pow >>= 1 last_num = len(partition) - 1 - (n & 1) while last_num >= 0: yield partition if partition[last_num] == 2: partition[last_num] = 1 partition.append(1) last_num -= 1 continue partition.append(1) partition[last_num] >>= 1 x = partition[last_num + 1] = partition[last_num] last_num += 1 while x > 1: if x <= len(partition) - last_num - 1: del partition[-x + 1:] last_num += 1 partition[last_num] = x else: x >>= 1 yield [1]*n def has_dups(seq): """Return True if there are any duplicate elements in ``seq``. Examples ======== >>> from sympy.utilities.iterables import has_dups >>> from sympy import Dict, Set >>> has_dups((1, 2, 1)) True >>> has_dups(range(3)) False >>> all(has_dups(c) is False for c in (set(), Set(), dict(), Dict())) True """ from sympy.core.containers import Dict from sympy.sets.sets import Set if isinstance(seq, (dict, set, Dict, Set)): return False uniq = set() return any(True for s in seq if s in uniq or uniq.add(s)) def has_variety(seq): """Return True if there are any different elements in ``seq``. Examples ======== >>> from sympy.utilities.iterables import has_variety >>> has_variety((1, 2, 1)) True >>> has_variety((1, 1, 1)) False """ for i, s in enumerate(seq): if i == 0: sentinel = s else: if s != sentinel: return True return False def uniq(seq, result=None): """ Yield unique elements from ``seq`` as an iterator. The second parameter ``result`` is used internally; it is not necessary to pass anything for this. Examples ======== >>> from sympy.utilities.iterables import uniq >>> dat = [1, 4, 1, 5, 4, 2, 1, 2] >>> type(uniq(dat)) in (list, tuple) False >>> list(uniq(dat)) [1, 4, 5, 2] >>> list(uniq(x for x in dat)) [1, 4, 5, 2] >>> list(uniq([[1], [2, 1], [1]])) [[1], [2, 1]] """ try: seen = set() result = result or [] for i, s in enumerate(seq): if not (s in seen or seen.add(s)): yield s except TypeError: if s not in result: yield s result.append(s) if hasattr(seq, '__getitem__'): for s in uniq(seq[i + 1:], result): yield s else: for s in uniq(seq, result): yield s def generate_bell(n): """Return permutations of [0, 1, ..., n - 1] such that each permutation differs from the last by the exchange of a single pair of neighbors. The ``n!`` permutations are returned as an iterator. In order to obtain the next permutation from a random starting permutation, use the ``next_trotterjohnson`` method of the Permutation class (which generates the same sequence in a different manner). Examples ======== >>> from itertools import permutations >>> from sympy.utilities.iterables import generate_bell >>> from sympy import zeros, Matrix This is the sort of permutation used in the ringing of physical bells, and does not produce permutations in lexicographical order. Rather, the permutations differ from each other by exactly one inversion, and the position at which the swapping occurs varies periodically in a simple fashion. Consider the first few permutations of 4 elements generated by ``permutations`` and ``generate_bell``: >>> list(permutations(range(4)))[:5] [(0, 1, 2, 3), (0, 1, 3, 2), (0, 2, 1, 3), (0, 2, 3, 1), (0, 3, 1, 2)] >>> list(generate_bell(4))[:5] [(0, 1, 2, 3), (0, 1, 3, 2), (0, 3, 1, 2), (3, 0, 1, 2), (3, 0, 2, 1)] Notice how the 2nd and 3rd lexicographical permutations have 3 elements out of place whereas each "bell" permutation always has only two elements out of place relative to the previous permutation (and so the signature (+/-1) of a permutation is opposite of the signature of the previous permutation). How the position of inversion varies across the elements can be seen by tracing out where the largest number appears in the permutations: >>> m = zeros(4, 24) >>> for i, p in enumerate(generate_bell(4)): ... m[:, i] = Matrix([j - 3 for j in list(p)]) # make largest zero >>> m.print_nonzero('X') [XXX XXXXXX XXXXXX XXX] [XX XX XXXX XX XXXX XX XX] [X XXXX XX XXXX XX XXXX X] [ XXXXXX XXXXXX XXXXXX ] See Also ======== sympy.combinatorics.Permutation.next_trotterjohnson References ========== .. [1] https://en.wikipedia.org/wiki/Method_ringing .. [2] https://stackoverflow.com/questions/4856615/recursive-permutation/4857018 .. [3] http://programminggeeks.com/bell-algorithm-for-permutation/ .. [4] https://en.wikipedia.org/wiki/Steinhaus%E2%80%93Johnson%E2%80%93Trotter_algorithm .. [5] Generating involutions, derangements, and relatives by ECO Vincent Vajnovszki, DMTCS vol 1 issue 12, 2010 """ n = as_int(n) if n < 1: raise ValueError('n must be a positive integer') if n == 1: yield (0,) elif n == 2: yield (0, 1) yield (1, 0) elif n == 3: for li in [(0, 1, 2), (0, 2, 1), (2, 0, 1), (2, 1, 0), (1, 2, 0), (1, 0, 2)]: yield li else: m = n - 1 op = [0] + [-1]*m l = list(range(n)) while True: yield tuple(l) # find biggest element with op big = None, -1 # idx, value for i in range(n): if op[i] and l[i] > big[1]: big = i, l[i] i, _ = big if i is None: break # there are no ops left # swap it with neighbor in the indicated direction j = i + op[i] l[i], l[j] = l[j], l[i] op[i], op[j] = op[j], op[i] # if it landed at the end or if the neighbor in the same # direction is bigger then turn off op if j == 0 or j == m or l[j + op[j]] > l[j]: op[j] = 0 # any element bigger to the left gets +1 op for i in range(j): if l[i] > l[j]: op[i] = 1 # any element bigger to the right gets -1 op for i in range(j + 1, n): if l[i] > l[j]: op[i] = -1 def generate_involutions(n): """ Generates involutions. An involution is a permutation that when multiplied by itself equals the identity permutation. In this implementation the involutions are generated using Fixed Points. Alternatively, an involution can be considered as a permutation that does not contain any cycles with a length that is greater than two. Examples ======== >>> from sympy.utilities.iterables import generate_involutions >>> list(generate_involutions(3)) [(0, 1, 2), (0, 2, 1), (1, 0, 2), (2, 1, 0)] >>> len(list(generate_involutions(4))) 10 References ========== .. [1] http://mathworld.wolfram.com/PermutationInvolution.html """ idx = list(range(n)) for p in permutations(idx): for i in idx: if p[p[i]] != i: break else: yield p def generate_derangements(perm): """ Routine to generate unique derangements. TODO: This will be rewritten to use the ECO operator approach once the permutations branch is in master. Examples ======== >>> from sympy.utilities.iterables import generate_derangements >>> list(generate_derangements([0, 1, 2])) [[1, 2, 0], [2, 0, 1]] >>> list(generate_derangements([0, 1, 2, 3])) [[1, 0, 3, 2], [1, 2, 3, 0], [1, 3, 0, 2], [2, 0, 3, 1], \ [2, 3, 0, 1], [2, 3, 1, 0], [3, 0, 1, 2], [3, 2, 0, 1], \ [3, 2, 1, 0]] >>> list(generate_derangements([0, 1, 1])) [] See Also ======== sympy.functions.combinatorial.factorials.subfactorial """ p = multiset_permutations(perm) indices = range(len(perm)) p0 = next(p) for pi in p: if all(pi[i] != p0[i] for i in indices): yield pi def necklaces(n, k, free=False): """ A routine to generate necklaces that may (free=True) or may not (free=False) be turned over to be viewed. The "necklaces" returned are comprised of ``n`` integers (beads) with ``k`` different values (colors). Only unique necklaces are returned. Examples ======== >>> from sympy.utilities.iterables import necklaces, bracelets >>> def show(s, i): ... return ''.join(s[j] for j in i) The "unrestricted necklace" is sometimes also referred to as a "bracelet" (an object that can be turned over, a sequence that can be reversed) and the term "necklace" is used to imply a sequence that cannot be reversed. So ACB == ABC for a bracelet (rotate and reverse) while the two are different for a necklace since rotation alone cannot make the two sequences the same. (mnemonic: Bracelets can be viewed Backwards, but Not Necklaces.) >>> B = [show('ABC', i) for i in bracelets(3, 3)] >>> N = [show('ABC', i) for i in necklaces(3, 3)] >>> set(N) - set(B) {'ACB'} >>> list(necklaces(4, 2)) [(0, 0, 0, 0), (0, 0, 0, 1), (0, 0, 1, 1), (0, 1, 0, 1), (0, 1, 1, 1), (1, 1, 1, 1)] >>> [show('.o', i) for i in bracelets(4, 2)] ['....', '...o', '..oo', '.o.o', '.ooo', 'oooo'] References ========== .. [1] http://mathworld.wolfram.com/Necklace.html """ return uniq(minlex(i, directed=not free) for i in variations(list(range(k)), n, repetition=True)) def bracelets(n, k): """Wrapper to necklaces to return a free (unrestricted) necklace.""" return necklaces(n, k, free=True) def generate_oriented_forest(n): """ This algorithm generates oriented forests. An oriented graph is a directed graph having no symmetric pair of directed edges. A forest is an acyclic graph, i.e., it has no cycles. A forest can also be described as a disjoint union of trees, which are graphs in which any two vertices are connected by exactly one simple path. Examples ======== >>> from sympy.utilities.iterables import generate_oriented_forest >>> list(generate_oriented_forest(4)) [[0, 1, 2, 3], [0, 1, 2, 2], [0, 1, 2, 1], [0, 1, 2, 0], \ [0, 1, 1, 1], [0, 1, 1, 0], [0, 1, 0, 1], [0, 1, 0, 0], [0, 0, 0, 0]] References ========== .. [1] T. Beyer and S.M. Hedetniemi: constant time generation of rooted trees, SIAM J. Computing Vol. 9, No. 4, November 1980 .. [2] https://stackoverflow.com/questions/1633833/oriented-forest-taocp-algorithm-in-python """ P = list(range(-1, n)) while True: yield P[1:] if P[n] > 0: P[n] = P[P[n]] else: for p in range(n - 1, 0, -1): if P[p] != 0: target = P[p] - 1 for q in range(p - 1, 0, -1): if P[q] == target: break offset = p - q for i in range(p, n + 1): P[i] = P[i - offset] break else: break def minlex(seq, directed=True, is_set=False, small=None): """ Return a tuple where the smallest element appears first; if ``directed`` is True (default) then the order is preserved, otherwise the sequence will be reversed if that gives a smaller ordering. If every element appears only once then is_set can be set to True for more efficient processing. If the smallest element is known at the time of calling, it can be passed and the calculation of the smallest element will be omitted. Examples ======== >>> from sympy.combinatorics.polyhedron import minlex >>> minlex((1, 2, 0)) (0, 1, 2) >>> minlex((1, 0, 2)) (0, 2, 1) >>> minlex((1, 0, 2), directed=False) (0, 1, 2) >>> minlex('11010011000', directed=True) '00011010011' >>> minlex('11010011000', directed=False) '00011001011' """ is_str = isinstance(seq, string_types) seq = list(seq) if small is None: small = min(seq, key=default_sort_key) if is_set: i = seq.index(small) if not directed: n = len(seq) p = (i + 1) % n m = (i - 1) % n if default_sort_key(seq[p]) > default_sort_key(seq[m]): seq = list(reversed(seq)) i = n - i - 1 if i: seq = rotate_left(seq, i) best = seq else: count = seq.count(small) if count == 1 and directed: best = rotate_left(seq, seq.index(small)) else: # if not directed, and not a set, we can't just # pass this off to minlex with is_set True since # peeking at the neighbor may not be sufficient to # make the decision so we continue... best = seq for i in range(count): seq = rotate_left(seq, seq.index(small, count != 1)) if seq < best: best = seq # it's cheaper to rotate now rather than search # again for these in reversed order so we test # the reverse now if not directed: seq = rotate_left(seq, 1) seq = list(reversed(seq)) if seq < best: best = seq seq = list(reversed(seq)) seq = rotate_right(seq, 1) # common return if is_str: return ''.join(best) return tuple(best) def runs(seq, op=gt): """Group the sequence into lists in which successive elements all compare the same with the comparison operator, ``op``: op(seq[i + 1], seq[i]) is True from all elements in a run. Examples ======== >>> from sympy.utilities.iterables import runs >>> from operator import ge >>> runs([0, 1, 2, 2, 1, 4, 3, 2, 2]) [[0, 1, 2], [2], [1, 4], [3], [2], [2]] >>> runs([0, 1, 2, 2, 1, 4, 3, 2, 2], op=ge) [[0, 1, 2, 2], [1, 4], [3], [2, 2]] """ cycles = [] seq = iter(seq) try: run = [next(seq)] except StopIteration: return [] while True: try: ei = next(seq) except StopIteration: break if op(ei, run[-1]): run.append(ei) continue else: cycles.append(run) run = [ei] if run: cycles.append(run) return cycles def kbins(l, k, ordered=None): """ Return sequence ``l`` partitioned into ``k`` bins. Examples ======== >>> from sympy.utilities.iterables import kbins The default is to give the items in the same order, but grouped into k partitions without any reordering: >>> from __future__ import print_function >>> for p in kbins(list(range(5)), 2): ... print(p) ... [[0], [1, 2, 3, 4]] [[0, 1], [2, 3, 4]] [[0, 1, 2], [3, 4]] [[0, 1, 2, 3], [4]] The ``ordered`` flag is either None (to give the simple partition of the elements) or is a 2 digit integer indicating whether the order of the bins and the order of the items in the bins matters. Given:: A = [[0], [1, 2]] B = [[1, 2], [0]] C = [[2, 1], [0]] D = [[0], [2, 1]] the following values for ``ordered`` have the shown meanings:: 00 means A == B == C == D 01 means A == B 10 means A == D 11 means A == A >>> for ordered in [None, 0, 1, 10, 11]: ... print('ordered = %s' % ordered) ... for p in kbins(list(range(3)), 2, ordered=ordered): ... print(' %s' % p) ... ordered = None [[0], [1, 2]] [[0, 1], [2]] ordered = 0 [[0, 1], [2]] [[0, 2], [1]] [[0], [1, 2]] ordered = 1 [[0], [1, 2]] [[0], [2, 1]] [[1], [0, 2]] [[1], [2, 0]] [[2], [0, 1]] [[2], [1, 0]] ordered = 10 [[0, 1], [2]] [[2], [0, 1]] [[0, 2], [1]] [[1], [0, 2]] [[0], [1, 2]] [[1, 2], [0]] ordered = 11 [[0], [1, 2]] [[0, 1], [2]] [[0], [2, 1]] [[0, 2], [1]] [[1], [0, 2]] [[1, 0], [2]] [[1], [2, 0]] [[1, 2], [0]] [[2], [0, 1]] [[2, 0], [1]] [[2], [1, 0]] [[2, 1], [0]] See Also ======== partitions, multiset_partitions """ def partition(lista, bins): # EnricoGiampieri's partition generator from # https://stackoverflow.com/questions/13131491/ # partition-n-items-into-k-bins-in-python-lazily if len(lista) == 1 or bins == 1: yield [lista] elif len(lista) > 1 and bins > 1: for i in range(1, len(lista)): for part in partition(lista[i:], bins - 1): if len([lista[:i]] + part) == bins: yield [lista[:i]] + part if ordered is None: for p in partition(l, k): yield p elif ordered == 11: for pl in multiset_permutations(l): pl = list(pl) for p in partition(pl, k): yield p elif ordered == 00: for p in multiset_partitions(l, k): yield p elif ordered == 10: for p in multiset_partitions(l, k): for perm in permutations(p): yield list(perm) elif ordered == 1: for kgot, p in partitions(len(l), k, size=True): if kgot != k: continue for li in multiset_permutations(l): rv = [] i = j = 0 li = list(li) for size, multiplicity in sorted(p.items()): for m in range(multiplicity): j = i + size rv.append(li[i: j]) i = j yield rv else: raise ValueError( 'ordered must be one of 00, 01, 10 or 11, not %s' % ordered) def permute_signs(t): """Return iterator in which the signs of non-zero elements of t are permuted. Examples ======== >>> from sympy.utilities.iterables import permute_signs >>> list(permute_signs((0, 1, 2))) [(0, 1, 2), (0, -1, 2), (0, 1, -2), (0, -1, -2)] """ for signs in cartes(*[(1, -1)]*(len(t) - t.count(0))): signs = list(signs) yield type(t)([i*signs.pop() if i else i for i in t]) def signed_permutations(t): """Return iterator in which the signs of non-zero elements of t and the order of the elements are permuted. Examples ======== >>> from sympy.utilities.iterables import signed_permutations >>> list(signed_permutations((0, 1, 2))) [(0, 1, 2), (0, -1, 2), (0, 1, -2), (0, -1, -2), (0, 2, 1), (0, -2, 1), (0, 2, -1), (0, -2, -1), (1, 0, 2), (-1, 0, 2), (1, 0, -2), (-1, 0, -2), (1, 2, 0), (-1, 2, 0), (1, -2, 0), (-1, -2, 0), (2, 0, 1), (-2, 0, 1), (2, 0, -1), (-2, 0, -1), (2, 1, 0), (-2, 1, 0), (2, -1, 0), (-2, -1, 0)] """ return (type(t)(i) for j in permutations(t) for i in permute_signs(j)) def rotations(s, dir=1): """Return a generator giving the items in s as list where each subsequent list has the items rotated to the left (default) or right (dir=-1) relative to the previous list. Examples ======== >>> from sympy.utilities.iterables import rotations >>> list(rotations([1,2,3])) [[1, 2, 3], [2, 3, 1], [3, 1, 2]] >>> list(rotations([1,2,3], -1)) [[1, 2, 3], [3, 1, 2], [2, 3, 1]] """ seq = list(s) for i in range(len(seq)): yield seq seq = rotate_left(seq, dir)

08466959c55b31891c9599b0f1d4c7c5c5f7a29c12f7109d1c5cd84d3faa8ac6

""" This is our testing framework. Goals: * it should be compatible with py.test and operate very similarly (or identically) * doesn't require any external dependencies * preferably all the functionality should be in this file only * no magic, just import the test file and execute the test functions, that's it * portable """ from __future__ import print_function, division import os import sys import platform import inspect import traceback import pdb import re import linecache import time from fnmatch import fnmatch from timeit import default_timer as clock import doctest as pdoctest # avoid clashing with our doctest() function from doctest import DocTestFinder, DocTestRunner import random import subprocess import signal import stat import tempfile from sympy.core.cache import clear_cache from sympy.core.compatibility import exec_, PY3, string_types, range, unwrap from sympy.utilities.misc import find_executable from sympy.external import import_module from sympy.utilities.exceptions import SymPyDeprecationWarning IS_WINDOWS = (os.name == 'nt') ON_TRAVIS = os.getenv('TRAVIS_BUILD_NUMBER', None) # emperically generated list of the proportion of time spent running # an even split of tests. This should periodically be regenerated. # A list of [.6, .1, .3] would mean that if the tests are evenly split # into '1/3', '2/3', '3/3', the first split would take 60% of the time, # the second 10% and the third 30%. These lists are normalized to sum # to 1, so [60, 10, 30] has the same behavior as [6, 1, 3] or [.6, .1, .3]. # # This list can be generated with the code: # from time import time # import sympy # # delays, num_splits = [], 30 # for i in range(1, num_splits + 1): # tic = time() # sympy.test(split='{}/{}'.format(i, num_splits), time_balance=False) # Add slow=True for slow tests # delays.append(time() - tic) # tot = sum(delays) # print([round(x / tot, 4) for x in delays]) SPLIT_DENSITY = [0.0801, 0.0099, 0.0429, 0.0103, 0.0122, 0.0055, 0.0533, 0.0191, 0.0977, 0.0878, 0.0026, 0.0028, 0.0147, 0.0118, 0.0358, 0.0063, 0.0026, 0.0351, 0.0084, 0.0027, 0.0158, 0.0156, 0.0024, 0.0416, 0.0566, 0.0425, 0.2123, 0.0042, 0.0099, 0.0576] SPLIT_DENSITY_SLOW = [0.1525, 0.0342, 0.0092, 0.0004, 0.0005, 0.0005, 0.0379, 0.0353, 0.0637, 0.0801, 0.0005, 0.0004, 0.0133, 0.0021, 0.0098, 0.0108, 0.0005, 0.0076, 0.0005, 0.0004, 0.0056, 0.0093, 0.0005, 0.0264, 0.0051, 0.0956, 0.2983, 0.0005, 0.0005, 0.0981] class Skipped(Exception): pass class TimeOutError(Exception): pass class DependencyError(Exception): pass # add more flags ?? future_flags = division.compiler_flag def _indent(s, indent=4): """ Add the given number of space characters to the beginning of every non-blank line in ``s``, and return the result. If the string ``s`` is Unicode, it is encoded using the stdout encoding and the ``backslashreplace`` error handler. """ # After a 2to3 run the below code is bogus, so wrap it with a version check if not PY3: if isinstance(s, unicode): s = s.encode(pdoctest._encoding, 'backslashreplace') # This regexp matches the start of non-blank lines: return re.sub('(?m)^(?!$)', indent*' ', s) pdoctest._indent = _indent # override reporter to maintain windows and python3 def _report_failure(self, out, test, example, got): """ Report that the given example failed. """ s = self._checker.output_difference(example, got, self.optionflags) s = s.encode('raw_unicode_escape').decode('utf8', 'ignore') out(self._failure_header(test, example) + s) if PY3 and IS_WINDOWS: DocTestRunner.report_failure = _report_failure def convert_to_native_paths(lst): """ Converts a list of '/' separated paths into a list of native (os.sep separated) paths and converts to lowercase if the system is case insensitive. """ newlst = [] for i, rv in enumerate(lst): rv = os.path.join(*rv.split("/")) # on windows the slash after the colon is dropped if sys.platform == "win32": pos = rv.find(':') if pos != -1: if rv[pos + 1] != '\\': rv = rv[:pos + 1] + '\\' + rv[pos + 1:] newlst.append(os.path.normcase(rv)) return newlst def get_sympy_dir(): """ Returns the root sympy directory and set the global value indicating whether the system is case sensitive or not. """ this_file = os.path.abspath(__file__) sympy_dir = os.path.join(os.path.dirname(this_file), "..", "..") sympy_dir = os.path.normpath(sympy_dir) return os.path.normcase(sympy_dir) def setup_pprint(): from sympy import pprint_use_unicode, init_printing import sympy.interactive.printing as interactive_printing # force pprint to be in ascii mode in doctests use_unicode_prev = pprint_use_unicode(False) # hook our nice, hash-stable strprinter init_printing(pretty_print=False) # Prevent init_printing() in doctests from affecting other doctests interactive_printing.NO_GLOBAL = True return use_unicode_prev def run_in_subprocess_with_hash_randomization( function, function_args=(), function_kwargs=None, command=sys.executable, module='sympy.utilities.runtests', force=False): """ Run a function in a Python subprocess with hash randomization enabled. If hash randomization is not supported by the version of Python given, it returns False. Otherwise, it returns the exit value of the command. The function is passed to sys.exit(), so the return value of the function will be the return value. The environment variable PYTHONHASHSEED is used to seed Python's hash randomization. If it is set, this function will return False, because starting a new subprocess is unnecessary in that case. If it is not set, one is set at random, and the tests are run. Note that if this environment variable is set when Python starts, hash randomization is automatically enabled. To force a subprocess to be created even if PYTHONHASHSEED is set, pass ``force=True``. This flag will not force a subprocess in Python versions that do not support hash randomization (see below), because those versions of Python do not support the ``-R`` flag. ``function`` should be a string name of a function that is importable from the module ``module``, like "_test". The default for ``module`` is "sympy.utilities.runtests". ``function_args`` and ``function_kwargs`` should be a repr-able tuple and dict, respectively. The default Python command is sys.executable, which is the currently running Python command. This function is necessary because the seed for hash randomization must be set by the environment variable before Python starts. Hence, in order to use a predetermined seed for tests, we must start Python in a separate subprocess. Hash randomization was added in the minor Python versions 2.6.8, 2.7.3, 3.1.5, and 3.2.3, and is enabled by default in all Python versions after and including 3.3.0. Examples ======== >>> from sympy.utilities.runtests import ( ... run_in_subprocess_with_hash_randomization) >>> # run the core tests in verbose mode >>> run_in_subprocess_with_hash_randomization("_test", ... function_args=("core",), ... function_kwargs={'verbose': True}) # doctest: +SKIP # Will return 0 if sys.executable supports hash randomization and tests # pass, 1 if they fail, and False if it does not support hash # randomization. """ # Note, we must return False everywhere, not None, as subprocess.call will # sometimes return None. # First check if the Python version supports hash randomization # If it doesn't have this support, it won't reconize the -R flag p = subprocess.Popen([command, "-RV"], stdout=subprocess.PIPE, stderr=subprocess.STDOUT) p.communicate() if p.returncode != 0: return False hash_seed = os.getenv("PYTHONHASHSEED") if not hash_seed: os.environ["PYTHONHASHSEED"] = str(random.randrange(2**32)) else: if not force: return False function_kwargs = function_kwargs or {} # Now run the command commandstring = ("import sys; from %s import %s;sys.exit(%s(*%s, **%s))" % (module, function, function, repr(function_args), repr(function_kwargs))) try: p = subprocess.Popen([command, "-R", "-c", commandstring]) p.communicate() except KeyboardInterrupt: p.wait() finally: # Put the environment variable back, so that it reads correctly for # the current Python process. if hash_seed is None: del os.environ["PYTHONHASHSEED"] else: os.environ["PYTHONHASHSEED"] = hash_seed return p.returncode def run_all_tests(test_args=(), test_kwargs=None, doctest_args=(), doctest_kwargs=None, examples_args=(), examples_kwargs=None): """ Run all tests. Right now, this runs the regular tests (bin/test), the doctests (bin/doctest), the examples (examples/all.py), and the sage tests (see sympy/external/tests/test_sage.py). This is what ``setup.py test`` uses. You can pass arguments and keyword arguments to the test functions that support them (for now, test, doctest, and the examples). See the docstrings of those functions for a description of the available options. For example, to run the solvers tests with colors turned off: >>> from sympy.utilities.runtests import run_all_tests >>> run_all_tests(test_args=("solvers",), ... test_kwargs={"colors:False"}) # doctest: +SKIP """ tests_successful = True test_kwargs = test_kwargs or {} doctest_kwargs = doctest_kwargs or {} examples_kwargs = examples_kwargs or {'quiet': True} try: # Regular tests if not test(*test_args, **test_kwargs): # some regular test fails, so set the tests_successful # flag to false and continue running the doctests tests_successful = False # Doctests print() if not doctest(*doctest_args, **doctest_kwargs): tests_successful = False # Examples print() sys.path.append("examples") from all import run_examples # examples/all.py if not run_examples(*examples_args, **examples_kwargs): tests_successful = False # Sage tests if sys.platform != "win32" and not PY3 and os.path.exists("bin/test"): # run Sage tests; Sage currently doesn't support Windows or Python 3 # Only run Sage tests if 'bin/test' is present (it is missing from # our release because everything in the 'bin' directory gets # installed). dev_null = open(os.devnull, 'w') if subprocess.call("sage -v", shell=True, stdout=dev_null, stderr=dev_null) == 0: if subprocess.call("sage -python bin/test " "sympy/external/tests/test_sage.py", shell=True, cwd=os.path.dirname(os.path.dirname(os.path.dirname(__file__)))) != 0: tests_successful = False if tests_successful: return else: # Return nonzero exit code sys.exit(1) except KeyboardInterrupt: print() print("DO *NOT* COMMIT!") sys.exit(1) def test(*paths, **kwargs): """ Run tests in the specified test_*.py files. Tests in a particular test_*.py file are run if any of the given strings in ``paths`` matches a part of the test file's path. If ``paths=[]``, tests in all test_*.py files are run. Notes: - If sort=False, tests are run in random order (not default). - Paths can be entered in native system format or in unix, forward-slash format. - Files that are on the blacklist can be tested by providing their path; they are only excluded if no paths are given. **Explanation of test results** ====== =============================================================== Output Meaning ====== =============================================================== . passed F failed X XPassed (expected to fail but passed) f XFAILed (expected to fail and indeed failed) s skipped w slow T timeout (e.g., when ``--timeout`` is used) K KeyboardInterrupt (when running the slow tests with ``--slow``, you can interrupt one of them without killing the test runner) ====== =============================================================== Colors have no additional meaning and are used just to facilitate interpreting the output. Examples ======== >>> import sympy Run all tests: >>> sympy.test() # doctest: +SKIP Run one file: >>> sympy.test("sympy/core/tests/test_basic.py") # doctest: +SKIP >>> sympy.test("_basic") # doctest: +SKIP Run all tests in sympy/functions/ and some particular file: >>> sympy.test("sympy/core/tests/test_basic.py", ... "sympy/functions") # doctest: +SKIP Run all tests in sympy/core and sympy/utilities: >>> sympy.test("/core", "/util") # doctest: +SKIP Run specific test from a file: >>> sympy.test("sympy/core/tests/test_basic.py", ... kw="test_equality") # doctest: +SKIP Run specific test from any file: >>> sympy.test(kw="subs") # doctest: +SKIP Run the tests with verbose mode on: >>> sympy.test(verbose=True) # doctest: +SKIP Don't sort the test output: >>> sympy.test(sort=False) # doctest: +SKIP Turn on post-mortem pdb: >>> sympy.test(pdb=True) # doctest: +SKIP Turn off colors: >>> sympy.test(colors=False) # doctest: +SKIP Force colors, even when the output is not to a terminal (this is useful, e.g., if you are piping to ``less -r`` and you still want colors) >>> sympy.test(force_colors=False) # doctest: +SKIP The traceback verboseness can be set to "short" or "no" (default is "short") >>> sympy.test(tb='no') # doctest: +SKIP The ``split`` option can be passed to split the test run into parts. The split currently only splits the test files, though this may change in the future. ``split`` should be a string of the form 'a/b', which will run part ``a`` of ``b``. For instance, to run the first half of the test suite: >>> sympy.test(split='1/2') # doctest: +SKIP The ``time_balance`` option can be passed in conjunction with ``split``. If ``time_balance=True`` (the default for ``sympy.test``), sympy will attempt to split the tests such that each split takes equal time. This heuristic for balancing is based on pre-recorded test data. >>> sympy.test(split='1/2', time_balance=True) # doctest: +SKIP You can disable running the tests in a separate subprocess using ``subprocess=False``. This is done to support seeding hash randomization, which is enabled by default in the Python versions where it is supported. If subprocess=False, hash randomization is enabled/disabled according to whether it has been enabled or not in the calling Python process. However, even if it is enabled, the seed cannot be printed unless it is called from a new Python process. Hash randomization was added in the minor Python versions 2.6.8, 2.7.3, 3.1.5, and 3.2.3, and is enabled by default in all Python versions after and including 3.3.0. If hash randomization is not supported ``subprocess=False`` is used automatically. >>> sympy.test(subprocess=False) # doctest: +SKIP To set the hash randomization seed, set the environment variable ``PYTHONHASHSEED`` before running the tests. This can be done from within Python using >>> import os >>> os.environ['PYTHONHASHSEED'] = '42' # doctest: +SKIP Or from the command line using $ PYTHONHASHSEED=42 ./bin/test If the seed is not set, a random seed will be chosen. Note that to reproduce the same hash values, you must use both the same seed as well as the same architecture (32-bit vs. 64-bit). """ subprocess = kwargs.pop("subprocess", True) rerun = kwargs.pop("rerun", 0) # count up from 0, do not print 0 print_counter = lambda i : (print("rerun %d" % (rerun-i)) if rerun-i else None) if subprocess: # loop backwards so last i is 0 for i in range(rerun, -1, -1): print_counter(i) ret = run_in_subprocess_with_hash_randomization("_test", function_args=paths, function_kwargs=kwargs) if ret is False: break val = not bool(ret) # exit on the first failure or if done if not val or i == 0: return val # rerun even if hash randomization is not supported for i in range(rerun, -1, -1): print_counter(i) val = not bool(_test(*paths, **kwargs)) if not val or i == 0: return val def _test(*paths, **kwargs): """ Internal function that actually runs the tests. All keyword arguments from ``test()`` are passed to this function except for ``subprocess``. Returns 0 if tests passed and 1 if they failed. See the docstring of ``test()`` for more information. """ verbose = kwargs.get("verbose", False) tb = kwargs.get("tb", "short") kw = kwargs.get("kw", None) or () # ensure that kw is a tuple if isinstance(kw, string_types): kw = (kw, ) post_mortem = kwargs.get("pdb", False) colors = kwargs.get("colors", True) force_colors = kwargs.get("force_colors", False) sort = kwargs.get("sort", True) seed = kwargs.get("seed", None) if seed is None: seed = random.randrange(100000000) timeout = kwargs.get("timeout", False) fail_on_timeout = kwargs.get("fail_on_timeout", False) if ON_TRAVIS and timeout is False: # Travis times out if no activity is seen for 10 minutes. timeout = 595 fail_on_timeout = True slow = kwargs.get("slow", False) enhance_asserts = kwargs.get("enhance_asserts", False) split = kwargs.get('split', None) time_balance = kwargs.get('time_balance', True) blacklist = kwargs.get('blacklist', ['sympy/integrals/rubi/rubi_tests/tests']) if ON_TRAVIS: # pyglet does not work on Travis blacklist.extend(['sympy/plotting/pygletplot/tests']) blacklist = convert_to_native_paths(blacklist) fast_threshold = kwargs.get('fast_threshold', None) slow_threshold = kwargs.get('slow_threshold', None) r = PyTestReporter(verbose=verbose, tb=tb, colors=colors, force_colors=force_colors, split=split) t = SymPyTests(r, kw, post_mortem, seed, fast_threshold=fast_threshold, slow_threshold=slow_threshold) # Show deprecation warnings import warnings warnings.simplefilter("error", SymPyDeprecationWarning) warnings.filterwarnings('error', '.*', DeprecationWarning, module='sympy.*') test_files = t.get_test_files('sympy') not_blacklisted = [f for f in test_files if not any(b in f for b in blacklist)] if len(paths) == 0: matched = not_blacklisted else: paths = convert_to_native_paths(paths) matched = [] for f in not_blacklisted: basename = os.path.basename(f) for p in paths: if p in f or fnmatch(basename, p): matched.append(f) break density = None if time_balance: if slow: density = SPLIT_DENSITY_SLOW else: density = SPLIT_DENSITY if split: matched = split_list(matched, split, density=density) t._testfiles.extend(matched) return int(not t.test(sort=sort, timeout=timeout, slow=slow, enhance_asserts=enhance_asserts, fail_on_timeout=fail_on_timeout)) def doctest(*paths, **kwargs): r""" Runs doctests in all \*.py files in the sympy directory which match any of the given strings in ``paths`` or all tests if paths=[]. Notes: - Paths can be entered in native system format or in unix, forward-slash format. - Files that are on the blacklist can be tested by providing their path; they are only excluded if no paths are given. Examples ======== >>> import sympy Run all tests: >>> sympy.doctest() # doctest: +SKIP Run one file: >>> sympy.doctest("sympy/core/basic.py") # doctest: +SKIP >>> sympy.doctest("polynomial.rst") # doctest: +SKIP Run all tests in sympy/functions/ and some particular file: >>> sympy.doctest("/functions", "basic.py") # doctest: +SKIP Run any file having polynomial in its name, doc/src/modules/polynomial.rst, sympy/functions/special/polynomials.py, and sympy/polys/polynomial.py: >>> sympy.doctest("polynomial") # doctest: +SKIP The ``split`` option can be passed to split the test run into parts. The split currently only splits the test files, though this may change in the future. ``split`` should be a string of the form 'a/b', which will run part ``a`` of ``b``. Note that the regular doctests and the Sphinx doctests are split independently. For instance, to run the first half of the test suite: >>> sympy.doctest(split='1/2') # doctest: +SKIP The ``subprocess`` and ``verbose`` options are the same as with the function ``test()``. See the docstring of that function for more information. """ subprocess = kwargs.pop("subprocess", True) rerun = kwargs.pop("rerun", 0) # count up from 0, do not print 0 print_counter = lambda i : (print("rerun %d" % (rerun-i)) if rerun-i else None) if subprocess: # loop backwards so last i is 0 for i in range(rerun, -1, -1): print_counter(i) ret = run_in_subprocess_with_hash_randomization("_doctest", function_args=paths, function_kwargs=kwargs) if ret is False: break val = not bool(ret) # exit on the first failure or if done if not val or i == 0: return val # rerun even if hash randomization is not supported for i in range(rerun, -1, -1): print_counter(i) val = not bool(_doctest(*paths, **kwargs)) if not val or i == 0: return val def _get_doctest_blacklist(): '''Get the default blacklist for the doctests''' blacklist = [] blacklist.extend([ "doc/src/modules/plotting.rst", # generates live plots "doc/src/modules/physics/mechanics/autolev_parser.rst", "sympy/physics/gaussopt.py", # raises deprecation warning "sympy/galgebra.py", # raises ImportError "sympy/this.py", # Prints text to the terminal "sympy/matrices/densearith.py", # raises deprecation warning "sympy/matrices/densesolve.py", # raises deprecation warning "sympy/matrices/densetools.py", # raises deprecation warning "sympy/physics/unitsystems.py", # raises deprecation warning "sympy/parsing/autolev/_antlr/autolevlexer.py", # generated code "sympy/parsing/autolev/_antlr/autolevparser.py", # generated code "sympy/parsing/autolev/_antlr/autolevlistener.py", # generated code "sympy/parsing/latex/_antlr/latexlexer.py", # generated code "sympy/parsing/latex/_antlr/latexparser.py", # generated code "sympy/integrals/rubi/rubi.py" ]) # autolev parser tests num = 12 for i in range (1, num+1): blacklist.append("sympy/parsing/autolev/test-examples/ruletest" + str(i) + ".py") blacklist.extend(["sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.py", "sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.py", "sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.py", "sympy/parsing/autolev/test-examples/pydy-example-repo/non_min_pendulum.py"]) if import_module('numpy') is None: blacklist.extend([ "sympy/plotting/experimental_lambdify.py", "sympy/plotting/plot_implicit.py", "examples/advanced/autowrap_integrators.py", "examples/advanced/autowrap_ufuncify.py", "examples/intermediate/sample.py", "examples/intermediate/mplot2d.py", "examples/intermediate/mplot3d.py", "doc/src/modules/numeric-computation.rst" ]) else: if import_module('matplotlib') is None: blacklist.extend([ "examples/intermediate/mplot2d.py", "examples/intermediate/mplot3d.py" ]) else: # Use a non-windowed backend, so that the tests work on Travis import matplotlib matplotlib.use('Agg') if ON_TRAVIS or import_module('pyglet') is None: blacklist.extend(["sympy/plotting/pygletplot"]) if import_module('theano') is None: blacklist.extend([ "sympy/printing/theanocode.py", "doc/src/modules/numeric-computation.rst", ]) if import_module('antlr4') is None: blacklist.extend([ "sympy/parsing/autolev/__init__.py", "sympy/parsing/latex/_parse_latex_antlr.py", ]) # disabled because of doctest failures in asmeurer's bot blacklist.extend([ "sympy/utilities/autowrap.py", "examples/advanced/autowrap_integrators.py", "examples/advanced/autowrap_ufuncify.py" ]) # blacklist these modules until issue 4840 is resolved blacklist.extend([ "sympy/conftest.py", "sympy/utilities/benchmarking.py" ]) blacklist = convert_to_native_paths(blacklist) return blacklist def _doctest(*paths, **kwargs): """ Internal function that actually runs the doctests. All keyword arguments from ``doctest()`` are passed to this function except for ``subprocess``. Returns 0 if tests passed and 1 if they failed. See the docstrings of ``doctest()`` and ``test()`` for more information. """ from sympy import pprint_use_unicode normal = kwargs.get("normal", False) verbose = kwargs.get("verbose", False) colors = kwargs.get("colors", True) force_colors = kwargs.get("force_colors", False) blacklist = kwargs.get("blacklist", []) split = kwargs.get('split', None) blacklist.extend(_get_doctest_blacklist()) # Use a non-windowed backend, so that the tests work on Travis if import_module('matplotlib') is not None: import matplotlib matplotlib.use('Agg') # Disable warnings for external modules import sympy.external sympy.external.importtools.WARN_OLD_VERSION = False sympy.external.importtools.WARN_NOT_INSTALLED = False # Disable showing up of plots from sympy.plotting.plot import unset_show unset_show() # Show deprecation warnings import warnings warnings.simplefilter("error", SymPyDeprecationWarning) warnings.filterwarnings('error', '.*', DeprecationWarning, module='sympy.*') r = PyTestReporter(verbose, split=split, colors=colors,\ force_colors=force_colors) t = SymPyDocTests(r, normal) test_files = t.get_test_files('sympy') test_files.extend(t.get_test_files('examples', init_only=False)) not_blacklisted = [f for f in test_files if not any(b in f for b in blacklist)] if len(paths) == 0: matched = not_blacklisted else: # take only what was requested...but not blacklisted items # and allow for partial match anywhere or fnmatch of name paths = convert_to_native_paths(paths) matched = [] for f in not_blacklisted: basename = os.path.basename(f) for p in paths: if p in f or fnmatch(basename, p): matched.append(f) break if split: matched = split_list(matched, split) t._testfiles.extend(matched) # run the tests and record the result for this *py portion of the tests if t._testfiles: failed = not t.test() else: failed = False # N.B. # -------------------------------------------------------------------- # Here we test *.rst files at or below doc/src. Code from these must # be self supporting in terms of imports since there is no importing # of necessary modules by doctest.testfile. If you try to pass *.py # files through this they might fail because they will lack the needed # imports and smarter parsing that can be done with source code. # test_files = t.get_test_files('doc/src', '*.rst', init_only=False) test_files.sort() not_blacklisted = [f for f in test_files if not any(b in f for b in blacklist)] if len(paths) == 0: matched = not_blacklisted else: # Take only what was requested as long as it's not on the blacklist. # Paths were already made native in *py tests so don't repeat here. # There's no chance of having a *py file slip through since we # only have *rst files in test_files. matched = [] for f in not_blacklisted: basename = os.path.basename(f) for p in paths: if p in f or fnmatch(basename, p): matched.append(f) break if split: matched = split_list(matched, split) first_report = True for rst_file in matched: if not os.path.isfile(rst_file): continue old_displayhook = sys.displayhook try: use_unicode_prev = setup_pprint() out = sympytestfile( rst_file, module_relative=False, encoding='utf-8', optionflags=pdoctest.ELLIPSIS | pdoctest.NORMALIZE_WHITESPACE | pdoctest.IGNORE_EXCEPTION_DETAIL) finally: # make sure we return to the original displayhook in case some # doctest has changed that sys.displayhook = old_displayhook # The NO_GLOBAL flag overrides the no_global flag to init_printing # if True import sympy.interactive.printing as interactive_printing interactive_printing.NO_GLOBAL = False pprint_use_unicode(use_unicode_prev) rstfailed, tested = out if tested: failed = rstfailed or failed if first_report: first_report = False msg = 'rst doctests start' if not t._testfiles: r.start(msg=msg) else: r.write_center(msg) print() # use as the id, everything past the first 'sympy' file_id = rst_file[rst_file.find('sympy') + len('sympy') + 1:] print(file_id, end=" ") # get at least the name out so it is know who is being tested wid = r.terminal_width - len(file_id) - 1 # update width test_file = '[%s]' % (tested) report = '[%s]' % (rstfailed or 'OK') print(''.join( [test_file, ' '*(wid - len(test_file) - len(report)), report]) ) # the doctests for *py will have printed this message already if there was # a failure, so now only print it if there was intervening reporting by # testing the *rst as evidenced by first_report no longer being True. if not first_report and failed: print() print("DO *NOT* COMMIT!") return int(failed) sp = re.compile(r'([0-9]+)/([1-9][0-9]*)') def split_list(l, split, density=None): """ Splits a list into part a of b split should be a string of the form 'a/b'. For instance, '1/3' would give the split one of three. If the length of the list is not divisible by the number of splits, the last split will have more items. `density` may be specified as a list. If specified, tests will be balanced so that each split has as equal-as-possible amount of mass according to `density`. >>> from sympy.utilities.runtests import split_list >>> a = list(range(10)) >>> split_list(a, '1/3') [0, 1, 2] >>> split_list(a, '2/3') [3, 4, 5] >>> split_list(a, '3/3') [6, 7, 8, 9] """ m = sp.match(split) if not m: raise ValueError("split must be a string of the form a/b where a and b are ints") i, t = map(int, m.groups()) if not density: return l[(i - 1)*len(l)//t : i*len(l)//t] # normalize density tot = sum(density) density = [x / tot for x in density] def density_inv(x): """Interpolate the inverse to the cumulative distribution function given by density""" if x <= 0: return 0 if x >= sum(density): return 1 # find the first time the cumulative sum surpasses x # and linearly interpolate cumm = 0 for i, d in enumerate(density): cumm += d if cumm >= x: break frac = (d - (cumm - x)) / d return (i + frac) / len(density) lower_frac = density_inv((i - 1) / t) higher_frac = density_inv(i / t) return l[int(lower_frac*len(l)) : int(higher_frac*len(l))] from collections import namedtuple SymPyTestResults = namedtuple('TestResults', 'failed attempted') def sympytestfile(filename, module_relative=True, name=None, package=None, globs=None, verbose=None, report=True, optionflags=0, extraglobs=None, raise_on_error=False, parser=pdoctest.DocTestParser(), encoding=None): """ Test examples in the given file. Return (#failures, #tests). Optional keyword arg ``module_relative`` specifies how filenames should be interpreted: - If ``module_relative`` is True (the default), then ``filename`` specifies a module-relative path. By default, this path is relative to the calling module's directory; but if the ``package`` argument is specified, then it is relative to that package. To ensure os-independence, ``filename`` should use "/" characters to separate path segments, and should not be an absolute path (i.e., it may not begin with "/"). - If ``module_relative`` is False, then ``filename`` specifies an os-specific path. The path may be absolute or relative (to the current working directory). Optional keyword arg ``name`` gives the name of the test; by default use the file's basename. Optional keyword argument ``package`` is a Python package or the name of a Python package whose directory should be used as the base directory for a module relative filename. If no package is specified, then the calling module's directory is used as the base directory for module relative filenames. It is an error to specify ``package`` if ``module_relative`` is False. Optional keyword arg ``globs`` gives a dict to be used as the globals when executing examples; by default, use {}. A copy of this dict is actually used for each docstring, so that each docstring's examples start with a clean slate. Optional keyword arg ``extraglobs`` gives a dictionary that should be merged into the globals that are used to execute examples. By default, no extra globals are used. Optional keyword arg ``verbose`` prints lots of stuff if true, prints only failures if false; by default, it's true iff "-v" is in sys.argv. Optional keyword arg ``report`` prints a summary at the end when true, else prints nothing at the end. In verbose mode, the summary is detailed, else very brief (in fact, empty if all tests passed). Optional keyword arg ``optionflags`` or's together module constants, and defaults to 0. Possible values (see the docs for details): - DONT_ACCEPT_TRUE_FOR_1 - DONT_ACCEPT_BLANKLINE - NORMALIZE_WHITESPACE - ELLIPSIS - SKIP - IGNORE_EXCEPTION_DETAIL - REPORT_UDIFF - REPORT_CDIFF - REPORT_NDIFF - REPORT_ONLY_FIRST_FAILURE Optional keyword arg ``raise_on_error`` raises an exception on the first unexpected exception or failure. This allows failures to be post-mortem debugged. Optional keyword arg ``parser`` specifies a DocTestParser (or subclass) that should be used to extract tests from the files. Optional keyword arg ``encoding`` specifies an encoding that should be used to convert the file to unicode. Advanced tomfoolery: testmod runs methods of a local instance of class doctest.Tester, then merges the results into (or creates) global Tester instance doctest.master. Methods of doctest.master can be called directly too, if you want to do something unusual. Passing report=0 to testmod is especially useful then, to delay displaying a summary. Invoke doctest.master.summarize(verbose) when you're done fiddling. """ if package and not module_relative: raise ValueError("Package may only be specified for module-" "relative paths.") # Relativize the path if not PY3: text, filename = pdoctest._load_testfile( filename, package, module_relative) if encoding is not None: text = text.decode(encoding) else: text, filename = pdoctest._load_testfile( filename, package, module_relative, encoding) # If no name was given, then use the file's name. if name is None: name = os.path.basename(filename) # Assemble the globals. if globs is None: globs = {} else: globs = globs.copy() if extraglobs is not None: globs.update(extraglobs) if '__name__' not in globs: globs['__name__'] = '__main__' if raise_on_error: runner = pdoctest.DebugRunner(verbose=verbose, optionflags=optionflags) else: runner = SymPyDocTestRunner(verbose=verbose, optionflags=optionflags) runner._checker = SymPyOutputChecker() # Read the file, convert it to a test, and run it. test = parser.get_doctest(text, globs, name, filename, 0) runner.run(test, compileflags=future_flags) if report: runner.summarize() if pdoctest.master is None: pdoctest.master = runner else: pdoctest.master.merge(runner) return SymPyTestResults(runner.failures, runner.tries) class SymPyTests(object): def __init__(self, reporter, kw="", post_mortem=False, seed=None, fast_threshold=None, slow_threshold=None): self._post_mortem = post_mortem self._kw = kw self._count = 0 self._root_dir = get_sympy_dir() self._reporter = reporter self._reporter.root_dir(self._root_dir) self._testfiles = [] self._seed = seed if seed is not None else random.random() # Defaults in seconds, from human / UX design limits # http://www.nngroup.com/articles/response-times-3-important-limits/ # # These defaults are *NOT* set in stone as we are measuring different # things, so others feel free to come up with a better yardstick :) if fast_threshold: self._fast_threshold = float(fast_threshold) else: self._fast_threshold = 5 if slow_threshold: self._slow_threshold = float(slow_threshold) else: self._slow_threshold = 10 def test(self, sort=False, timeout=False, slow=False, enhance_asserts=False, fail_on_timeout=False): """ Runs the tests returning True if all tests pass, otherwise False. If sort=False run tests in random order. """ if sort: self._testfiles.sort() elif slow: pass else: random.seed(self._seed) random.shuffle(self._testfiles) self._reporter.start(self._seed) for f in self._testfiles: try: self.test_file(f, sort, timeout, slow, enhance_asserts, fail_on_timeout) except KeyboardInterrupt: print(" interrupted by user") self._reporter.finish() raise return self._reporter.finish() def _enhance_asserts(self, source): from ast import (NodeTransformer, Compare, Name, Store, Load, Tuple, Assign, BinOp, Str, Mod, Assert, parse, fix_missing_locations) ops = {"Eq": '==', "NotEq": '!=', "Lt": '<', "LtE": '<=', "Gt": '>', "GtE": '>=', "Is": 'is', "IsNot": 'is not', "In": 'in', "NotIn": 'not in'} class Transform(NodeTransformer): def visit_Assert(self, stmt): if isinstance(stmt.test, Compare): compare = stmt.test values = [compare.left] + compare.comparators names = [ "_%s" % i for i, _ in enumerate(values) ] names_store = [ Name(n, Store()) for n in names ] names_load = [ Name(n, Load()) for n in names ] target = Tuple(names_store, Store()) value = Tuple(values, Load()) assign = Assign([target], value) new_compare = Compare(names_load[0], compare.ops, names_load[1:]) msg_format = "\n%s " + "\n%s ".join([ ops[op.__class__.__name__] for op in compare.ops ]) + "\n%s" msg = BinOp(Str(msg_format), Mod(), Tuple(names_load, Load())) test = Assert(new_compare, msg, lineno=stmt.lineno, col_offset=stmt.col_offset) return [assign, test] else: return stmt tree = parse(source) new_tree = Transform().visit(tree) return fix_missing_locations(new_tree) def test_file(self, filename, sort=True, timeout=False, slow=False, enhance_asserts=False, fail_on_timeout=False): reporter = self._reporter funcs = [] try: gl = {'__file__': filename} try: if PY3: open_file = lambda: open(filename, encoding="utf8") else: open_file = lambda: open(filename) with open_file() as f: source = f.read() if self._kw: for l in source.splitlines(): if l.lstrip().startswith('def '): if any(l.find(k) != -1 for k in self._kw): break else: return if enhance_asserts: try: source = self._enhance_asserts(source) except ImportError: pass code = compile(source, filename, "exec", flags=0, dont_inherit=True) exec_(code, gl) except (SystemExit, KeyboardInterrupt): raise except ImportError: reporter.import_error(filename, sys.exc_info()) return except Exception: reporter.test_exception(sys.exc_info()) clear_cache() self._count += 1 random.seed(self._seed) disabled = gl.get("disabled", False) if not disabled: # we need to filter only those functions that begin with 'test_' # We have to be careful about decorated functions. As long as # the decorator uses functools.wraps, we can detect it. funcs = [] for f in gl: if (f.startswith("test_") and (inspect.isfunction(gl[f]) or inspect.ismethod(gl[f]))): func = gl[f] # Handle multiple decorators while hasattr(func, '__wrapped__'): func = func.__wrapped__ if inspect.getsourcefile(func) == filename: funcs.append(gl[f]) if slow: funcs = [f for f in funcs if getattr(f, '_slow', False)] # Sorting of XFAILed functions isn't fixed yet :-( funcs.sort(key=lambda x: inspect.getsourcelines(x)[1]) i = 0 while i < len(funcs): if inspect.isgeneratorfunction(funcs[i]): # some tests can be generators, that return the actual # test functions. We unpack it below: f = funcs.pop(i) for fg in f(): func = fg[0] args = fg[1:] fgw = lambda: func(*args) funcs.insert(i, fgw) i += 1 else: i += 1 # drop functions that are not selected with the keyword expression: funcs = [x for x in funcs if self.matches(x)] if not funcs: return except Exception: reporter.entering_filename(filename, len(funcs)) raise reporter.entering_filename(filename, len(funcs)) if not sort: random.shuffle(funcs) for f in funcs: start = time.time() reporter.entering_test(f) try: if getattr(f, '_slow', False) and not slow: raise Skipped("Slow") if timeout: self._timeout(f, timeout, fail_on_timeout) else: random.seed(self._seed) f() except KeyboardInterrupt: if getattr(f, '_slow', False): reporter.test_skip("KeyboardInterrupt") else: raise except Exception: if timeout: signal.alarm(0) # Disable the alarm. It could not be handled before. t, v, tr = sys.exc_info() if t is AssertionError: reporter.test_fail((t, v, tr)) if self._post_mortem: pdb.post_mortem(tr) elif t.__name__ == "Skipped": reporter.test_skip(v) elif t.__name__ == "XFail": reporter.test_xfail() elif t.__name__ == "XPass": reporter.test_xpass(v) else: reporter.test_exception((t, v, tr)) if self._post_mortem: pdb.post_mortem(tr) else: reporter.test_pass() taken = time.time() - start if taken > self._slow_threshold: reporter.slow_test_functions.append((f.__name__, taken)) if getattr(f, '_slow', False) and slow: if taken < self._fast_threshold: reporter.fast_test_functions.append((f.__name__, taken)) reporter.leaving_filename() def _timeout(self, function, timeout, fail_on_timeout): def callback(x, y): signal.alarm(0) if fail_on_timeout: raise TimeOutError("Timed out after %d seconds" % timeout) else: raise Skipped("Timeout") signal.signal(signal.SIGALRM, callback) signal.alarm(timeout) # Set an alarm with a given timeout function() signal.alarm(0) # Disable the alarm def matches(self, x): """ Does the keyword expression self._kw match "x"? Returns True/False. Always returns True if self._kw is "". """ if not self._kw: return True for kw in self._kw: if x.__name__.find(kw) != -1: return True return False def get_test_files(self, dir, pat='test_*.py'): """ Returns the list of test_*.py (default) files at or below directory ``dir`` relative to the sympy home directory. """ dir = os.path.join(self._root_dir, convert_to_native_paths([dir])[0]) g = [] for path, folders, files in os.walk(dir): g.extend([os.path.join(path, f) for f in files if fnmatch(f, pat)]) return sorted([os.path.normcase(gi) for gi in g]) class SymPyDocTests(object): def __init__(self, reporter, normal): self._count = 0 self._root_dir = get_sympy_dir() self._reporter = reporter self._reporter.root_dir(self._root_dir) self._normal = normal self._testfiles = [] def test(self): """ Runs the tests and returns True if all tests pass, otherwise False. """ self._reporter.start() for f in self._testfiles: try: self.test_file(f) except KeyboardInterrupt: print(" interrupted by user") self._reporter.finish() raise return self._reporter.finish() def test_file(self, filename): clear_cache() from sympy.core.compatibility import StringIO import sympy.interactive.printing as interactive_printing from sympy import pprint_use_unicode rel_name = filename[len(self._root_dir) + 1:] dirname, file = os.path.split(filename) module = rel_name.replace(os.sep, '.')[:-3] if rel_name.startswith("examples"): # Examples files do not have __init__.py files, # So we have to temporarily extend sys.path to import them sys.path.insert(0, dirname) module = file[:-3] # remove ".py" try: module = pdoctest._normalize_module(module) tests = SymPyDocTestFinder().find(module) except (SystemExit, KeyboardInterrupt): raise except ImportError: self._reporter.import_error(filename, sys.exc_info()) return finally: if rel_name.startswith("examples"): del sys.path[0] tests = [test for test in tests if len(test.examples) > 0] # By default tests are sorted by alphabetical order by function name. # We sort by line number so one can edit the file sequentially from # bottom to top. However, if there are decorated functions, their line # numbers will be too large and for now one must just search for these # by text and function name. tests.sort(key=lambda x: -x.lineno) if not tests: return self._reporter.entering_filename(filename, len(tests)) for test in tests: assert len(test.examples) != 0 if self._reporter._verbose: self._reporter.write("\n{} ".format(test.name)) # check if there are external dependencies which need to be met if '_doctest_depends_on' in test.globs: try: self._check_dependencies(**test.globs['_doctest_depends_on']) except DependencyError as e: self._reporter.test_skip(v=str(e)) continue runner = SymPyDocTestRunner(optionflags=pdoctest.ELLIPSIS | pdoctest.NORMALIZE_WHITESPACE | pdoctest.IGNORE_EXCEPTION_DETAIL) runner._checker = SymPyOutputChecker() old = sys.stdout new = StringIO() sys.stdout = new # If the testing is normal, the doctests get importing magic to # provide the global namespace. If not normal (the default) then # then must run on their own; all imports must be explicit within # a function's docstring. Once imported that import will be # available to the rest of the tests in a given function's # docstring (unless clear_globs=True below). if not self._normal: test.globs = {} # if this is uncommented then all the test would get is what # comes by default with a "from sympy import *" #exec('from sympy import *') in test.globs test.globs['print_function'] = print_function old_displayhook = sys.displayhook use_unicode_prev = setup_pprint() try: f, t = runner.run(test, compileflags=future_flags, out=new.write, clear_globs=False) except KeyboardInterrupt: raise finally: sys.stdout = old if f > 0: self._reporter.doctest_fail(test.name, new.getvalue()) else: self._reporter.test_pass() sys.displayhook = old_displayhook interactive_printing.NO_GLOBAL = False pprint_use_unicode(use_unicode_prev) self._reporter.leaving_filename() def get_test_files(self, dir, pat='*.py', init_only=True): r""" Returns the list of \*.py files (default) from which docstrings will be tested which are at or below directory ``dir``. By default, only those that have an __init__.py in their parent directory and do not start with ``test_`` will be included. """ def importable(x): """ Checks if given pathname x is an importable module by checking for __init__.py file. Returns True/False. Currently we only test if the __init__.py file exists in the directory with the file "x" (in theory we should also test all the parent dirs). """ init_py = os.path.join(os.path.dirname(x), "__init__.py") return os.path.exists(init_py) dir = os.path.join(self._root_dir, convert_to_native_paths([dir])[0]) g = [] for path, folders, files in os.walk(dir): g.extend([os.path.join(path, f) for f in files if not f.startswith('test_') and fnmatch(f, pat)]) if init_only: # skip files that are not importable (i.e. missing __init__.py) g = [x for x in g if importable(x)] return [os.path.normcase(gi) for gi in g] def _check_dependencies(self, executables=(), modules=(), disable_viewers=(), python_version=(2,)): """ Checks if the dependencies for the test are installed. Raises ``DependencyError`` it at least one dependency is not installed. """ for executable in executables: if not find_executable(executable): raise DependencyError("Could not find %s" % executable) for module in modules: if module == 'matplotlib': matplotlib = import_module( 'matplotlib', __import__kwargs={'fromlist': ['pyplot', 'cm', 'collections']}, min_module_version='1.0.0', catch=(RuntimeError,)) if matplotlib is None: raise DependencyError("Could not import matplotlib") else: if not import_module(module): raise DependencyError("Could not import %s" % module) if disable_viewers: tempdir = tempfile.mkdtemp() os.environ['PATH'] = '%s:%s' % (tempdir, os.environ['PATH']) vw = ('#!/usr/bin/env {}\n' 'import sys\n' 'if len(sys.argv) <= 1:\n' ' exit("wrong number of args")\n').format( 'python3' if PY3 else 'python') for viewer in disable_viewers: with open(os.path.join(tempdir, viewer), 'w') as fh: fh.write(vw) # make the file executable os.chmod(os.path.join(tempdir, viewer), stat.S_IREAD | stat.S_IWRITE | stat.S_IXUSR) if python_version: if sys.version_info < python_version: raise DependencyError("Requires Python >= " + '.'.join(map(str, python_version))) if 'pyglet' in modules: # monkey-patch pyglet s.t. it does not open a window during # doctesting import pyglet class DummyWindow(object): def __init__(self, *args, **kwargs): self.has_exit = True self.width = 600 self.height = 400 def set_vsync(self, x): pass def switch_to(self): pass def push_handlers(self, x): pass def close(self): pass pyglet.window.Window = DummyWindow class SymPyDocTestFinder(DocTestFinder): """ A class used to extract the DocTests that are relevant to a given object, from its docstring and the docstrings of its contained objects. Doctests can currently be extracted from the following object types: modules, functions, classes, methods, staticmethods, classmethods, and properties. Modified from doctest's version to look harder for code that appears comes from a different module. For example, the @vectorize decorator makes it look like functions come from multidimensional.py even though their code exists elsewhere. """ def _find(self, tests, obj, name, module, source_lines, globs, seen): """ Find tests for the given object and any contained objects, and add them to ``tests``. """ if self._verbose: print('Finding tests in %s' % name) # If we've already processed this object, then ignore it. if id(obj) in seen: return seen[id(obj)] = 1 # Make sure we don't run doctests for classes outside of sympy, such # as in numpy or scipy. if inspect.isclass(obj): if obj.__module__.split('.')[0] != 'sympy': return # Find a test for this object, and add it to the list of tests. test = self._get_test(obj, name, module, globs, source_lines) if test is not None: tests.append(test) if not self._recurse: return # Look for tests in a module's contained objects. if inspect.ismodule(obj): for rawname, val in obj.__dict__.items(): # Recurse to functions & classes. if inspect.isfunction(val) or inspect.isclass(val): # Make sure we don't run doctests functions or classes # from different modules if val.__module__ != module.__name__: continue assert self._from_module(module, val), \ "%s is not in module %s (rawname %s)" % (val, module, rawname) try: valname = '%s.%s' % (name, rawname) self._find(tests, val, valname, module, source_lines, globs, seen) except KeyboardInterrupt: raise # Look for tests in a module's __test__ dictionary. for valname, val in getattr(obj, '__test__', {}).items(): if not isinstance(valname, string_types): raise ValueError("SymPyDocTestFinder.find: __test__ keys " "must be strings: %r" % (type(valname),)) if not (inspect.isfunction(val) or inspect.isclass(val) or inspect.ismethod(val) or inspect.ismodule(val) or isinstance(val, string_types)): raise ValueError("SymPyDocTestFinder.find: __test__ values " "must be strings, functions, methods, " "classes, or modules: %r" % (type(val),)) valname = '%s.__test__.%s' % (name, valname) self._find(tests, val, valname, module, source_lines, globs, seen) # Look for tests in a class's contained objects. if inspect.isclass(obj): for valname, val in obj.__dict__.items(): # Special handling for staticmethod/classmethod. if isinstance(val, staticmethod): val = getattr(obj, valname) if isinstance(val, classmethod): val = getattr(obj, valname).__func__ # Recurse to methods, properties, and nested classes. if ((inspect.isfunction(unwrap(val)) or inspect.isclass(val) or isinstance(val, property)) and self._from_module(module, val)): # Make sure we don't run doctests functions or classes # from different modules if isinstance(val, property): if hasattr(val.fget, '__module__'): if val.fget.__module__ != module.__name__: continue else: if val.__module__ != module.__name__: continue assert self._from_module(module, val), \ "%s is not in module %s (valname %s)" % ( val, module, valname) valname = '%s.%s' % (name, valname) self._find(tests, val, valname, module, source_lines, globs, seen) def _get_test(self, obj, name, module, globs, source_lines): """ Return a DocTest for the given object, if it defines a docstring; otherwise, return None. """ lineno = None # Extract the object's docstring. If it doesn't have one, # then return None (no test for this object). if isinstance(obj, string_types): # obj is a string in the case for objects in the polys package. # Note that source_lines is a binary string (compiled polys # modules), which can't be handled by _find_lineno so determine # the line number here. docstring = obj matches = re.findall(r"line \d+", name) assert len(matches) == 1, \ "string '%s' does not contain lineno " % name # NOTE: this is not the exact linenumber but its better than no # lineno ;) lineno = int(matches[0][5:]) else: try: if obj.__doc__ is None: docstring = '' else: docstring = obj.__doc__ if not isinstance(docstring, string_types): docstring = str(docstring) except (TypeError, AttributeError): docstring = '' # Don't bother if the docstring is empty. if self._exclude_empty and not docstring: return None # check that properties have a docstring because _find_lineno # assumes it if isinstance(obj, property): if obj.fget.__doc__ is None: return None # Find the docstring's location in the file. if lineno is None: obj = unwrap(obj) # handling of properties is not implemented in _find_lineno so do # it here if hasattr(obj, 'func_closure') and obj.func_closure is not None: tobj = obj.func_closure[0].cell_contents elif isinstance(obj, property): tobj = obj.fget else: tobj = obj lineno = self._find_lineno(tobj, source_lines) if lineno is None: return None # Return a DocTest for this object. if module is None: filename = None else: filename = getattr(module, '__file__', module.__name__) if filename[-4:] in (".pyc", ".pyo"): filename = filename[:-1] globs['_doctest_depends_on'] = getattr(obj, '_doctest_depends_on', {}) return self._parser.get_doctest(docstring, globs, name, filename, lineno) class SymPyDocTestRunner(DocTestRunner): """ A class used to run DocTest test cases, and accumulate statistics. The ``run`` method is used to process a single DocTest case. It returns a tuple ``(f, t)``, where ``t`` is the number of test cases tried, and ``f`` is the number of test cases that failed. Modified from the doctest version to not reset the sys.displayhook (see issue 5140). See the docstring of the original DocTestRunner for more information. """ def run(self, test, compileflags=None, out=None, clear_globs=True): """ Run the examples in ``test``, and display the results using the writer function ``out``. The examples are run in the namespace ``test.globs``. If ``clear_globs`` is true (the default), then this namespace will be cleared after the test runs, to help with garbage collection. If you would like to examine the namespace after the test completes, then use ``clear_globs=False``. ``compileflags`` gives the set of flags that should be used by the Python compiler when running the examples. If not specified, then it will default to the set of future-import flags that apply to ``globs``. The output of each example is checked using ``SymPyDocTestRunner.check_output``, and the results are formatted by the ``SymPyDocTestRunner.report_*`` methods. """ self.test = test if compileflags is None: compileflags = pdoctest._extract_future_flags(test.globs) save_stdout = sys.stdout if out is None: out = save_stdout.write sys.stdout = self._fakeout # Patch pdb.set_trace to restore sys.stdout during interactive # debugging (so it's not still redirected to self._fakeout). # Note that the interactive output will go to *our* # save_stdout, even if that's not the real sys.stdout; this # allows us to write test cases for the set_trace behavior. save_set_trace = pdb.set_trace self.debugger = pdoctest._OutputRedirectingPdb(save_stdout) self.debugger.reset() pdb.set_trace = self.debugger.set_trace # Patch linecache.getlines, so we can see the example's source # when we're inside the debugger. self.save_linecache_getlines = pdoctest.linecache.getlines linecache.getlines = self.__patched_linecache_getlines try: test.globs['print_function'] = print_function return self.__run(test, compileflags, out) finally: sys.stdout = save_stdout pdb.set_trace = save_set_trace linecache.getlines = self.save_linecache_getlines if clear_globs: test.globs.clear() # We have to override the name mangled methods. SymPyDocTestRunner._SymPyDocTestRunner__patched_linecache_getlines = \ DocTestRunner._DocTestRunner__patched_linecache_getlines SymPyDocTestRunner._SymPyDocTestRunner__run = DocTestRunner._DocTestRunner__run SymPyDocTestRunner._SymPyDocTestRunner__record_outcome = \ DocTestRunner._DocTestRunner__record_outcome class SymPyOutputChecker(pdoctest.OutputChecker): """ Compared to the OutputChecker from the stdlib our OutputChecker class supports numerical comparison of floats occurring in the output of the doctest examples """ def __init__(self): # NOTE OutputChecker is an old-style class with no __init__ method, # so we can't call the base class version of __init__ here got_floats = r'(\d+\.\d*|\.\d+)' # floats in the 'want' string may contain ellipses want_floats = got_floats + r'(\.{3})?' front_sep = r'\s|\+|\-|\*|,' back_sep = front_sep + r'|j|e' fbeg = r'^%s(?=%s|$)' % (got_floats, back_sep) fmidend = r'(?<=%s)%s(?=%s|$)' % (front_sep, got_floats, back_sep) self.num_got_rgx = re.compile(r'(%s|%s)' %(fbeg, fmidend)) fbeg = r'^%s(?=%s|$)' % (want_floats, back_sep) fmidend = r'(?<=%s)%s(?=%s|$)' % (front_sep, want_floats, back_sep) self.num_want_rgx = re.compile(r'(%s|%s)' %(fbeg, fmidend)) def check_output(self, want, got, optionflags): """ Return True iff the actual output from an example (`got`) matches the expected output (`want`). These strings are always considered to match if they are identical; but depending on what option flags the test runner is using, several non-exact match types are also possible. See the documentation for `TestRunner` for more information about option flags. """ # Handle the common case first, for efficiency: # if they're string-identical, always return true. if got == want: return True # TODO parse integers as well ? # Parse floats and compare them. If some of the parsed floats contain # ellipses, skip the comparison. matches = self.num_got_rgx.finditer(got) numbers_got = [match.group(1) for match in matches] # list of strs matches = self.num_want_rgx.finditer(want) numbers_want = [match.group(1) for match in matches] # list of strs if len(numbers_got) != len(numbers_want): return False if len(numbers_got) > 0: nw_ = [] for ng, nw in zip(numbers_got, numbers_want): if '...' in nw: nw_.append(ng) continue else: nw_.append(nw) if abs(float(ng)-float(nw)) > 1e-5: return False got = self.num_got_rgx.sub(r'%s', got) got = got % tuple(nw_) # <BLANKLINE> can be used as a special sequence to signify a # blank line, unless the DONT_ACCEPT_BLANKLINE flag is used. if not (optionflags & pdoctest.DONT_ACCEPT_BLANKLINE): # Replace <BLANKLINE> in want with a blank line. want = re.sub(r'(?m)^%s\s*?$' % re.escape(pdoctest.BLANKLINE_MARKER), '', want) # If a line in got contains only spaces, then remove the # spaces. got = re.sub(r'(?m)^\s*?$', '', got) if got == want: return True # This flag causes doctest to ignore any differences in the # contents of whitespace strings. Note that this can be used # in conjunction with the ELLIPSIS flag. if optionflags & pdoctest.NORMALIZE_WHITESPACE: got = ' '.join(got.split()) want = ' '.join(want.split()) if got == want: return True # The ELLIPSIS flag says to let the sequence "..." in `want` # match any substring in `got`. if optionflags & pdoctest.ELLIPSIS: if pdoctest._ellipsis_match(want, got): return True # We didn't find any match; return false. return False class Reporter(object): """ Parent class for all reporters. """ pass class PyTestReporter(Reporter): """ Py.test like reporter. Should produce output identical to py.test. """ def __init__(self, verbose=False, tb="short", colors=True, force_colors=False, split=None): self._verbose = verbose self._tb_style = tb self._colors = colors self._force_colors = force_colors self._xfailed = 0 self._xpassed = [] self._failed = [] self._failed_doctest = [] self._passed = 0 self._skipped = 0 self._exceptions = [] self._terminal_width = None self._default_width = 80 self._split = split self._active_file = '' self._active_f = None # TODO: Should these be protected? self.slow_test_functions = [] self.fast_test_functions = [] # this tracks the x-position of the cursor (useful for positioning # things on the screen), without the need for any readline library: self._write_pos = 0 self._line_wrap = False def root_dir(self, dir): self._root_dir = dir @property def terminal_width(self): if self._terminal_width is not None: return self._terminal_width def findout_terminal_width(): if sys.platform == "win32": # Windows support is based on: # # http://code.activestate.com/recipes/ # 440694-determine-size-of-console-window-on-windows/ from ctypes import windll, create_string_buffer h = windll.kernel32.GetStdHandle(-12) csbi = create_string_buffer(22) res = windll.kernel32.GetConsoleScreenBufferInfo(h, csbi) if res: import struct (_, _, _, _, _, left, _, right, _, _, _) = \ struct.unpack("hhhhHhhhhhh", csbi.raw) return right - left else: return self._default_width if hasattr(sys.stdout, 'isatty') and not sys.stdout.isatty(): return self._default_width # leave PIPEs alone try: process = subprocess.Popen(['stty', '-a'], stdout=subprocess.PIPE, stderr=subprocess.PIPE) stdout = process.stdout.read() if PY3: stdout = stdout.decode("utf-8") except (OSError, IOError): pass else: # We support the following output formats from stty: # # 1) Linux -> columns 80 # 2) OS X -> 80 columns # 3) Solaris -> columns = 80 re_linux = r"columns\s+(?P<columns>\d+);" re_osx = r"(?P<columns>\d+)\s*columns;" re_solaris = r"columns\s+=\s+(?P<columns>\d+);" for regex in (re_linux, re_osx, re_solaris): match = re.search(regex, stdout) if match is not None: columns = match.group('columns') try: width = int(columns) except ValueError: pass if width != 0: return width return self._default_width width = findout_terminal_width() self._terminal_width = width return width def write(self, text, color="", align="left", width=None, force_colors=False): """ Prints a text on the screen. It uses sys.stdout.write(), so no readline library is necessary. Parameters ========== color : choose from the colors below, "" means default color align : "left"/"right", "left" is a normal print, "right" is aligned on the right-hand side of the screen, filled with spaces if necessary width : the screen width """ color_templates = ( ("Black", "0;30"), ("Red", "0;31"), ("Green", "0;32"), ("Brown", "0;33"), ("Blue", "0;34"), ("Purple", "0;35"), ("Cyan", "0;36"), ("LightGray", "0;37"), ("DarkGray", "1;30"), ("LightRed", "1;31"), ("LightGreen", "1;32"), ("Yellow", "1;33"), ("LightBlue", "1;34"), ("LightPurple", "1;35"), ("LightCyan", "1;36"), ("White", "1;37"), ) colors = {} for name, value in color_templates: colors[name] = value c_normal = '\033[0m' c_color = '\033[%sm' if width is None: width = self.terminal_width if align == "right": if self._write_pos + len(text) > width: # we don't fit on the current line, create a new line self.write("\n") self.write(" "*(width - self._write_pos - len(text))) if not self._force_colors and hasattr(sys.stdout, 'isatty') and not \ sys.stdout.isatty(): # the stdout is not a terminal, this for example happens if the # output is piped to less, e.g. "bin/test | less". In this case, # the terminal control sequences would be printed verbatim, so # don't use any colors. color = "" elif sys.platform == "win32": # Windows consoles don't support ANSI escape sequences color = "" elif not self._colors: color = "" if self._line_wrap: if text[0] != "\n": sys.stdout.write("\n") # Avoid UnicodeEncodeError when printing out test failures if PY3 and IS_WINDOWS: text = text.encode('raw_unicode_escape').decode('utf8', 'ignore') elif PY3 and not sys.stdout.encoding.lower().startswith('utf'): text = text.encode(sys.stdout.encoding, 'backslashreplace' ).decode(sys.stdout.encoding) if color == "": sys.stdout.write(text) else: sys.stdout.write("%s%s%s" % (c_color % colors[color], text, c_normal)) sys.stdout.flush() l = text.rfind("\n") if l == -1: self._write_pos += len(text) else: self._write_pos = len(text) - l - 1 self._line_wrap = self._write_pos >= width self._write_pos %= width def write_center(self, text, delim="="): width = self.terminal_width if text != "": text = " %s " % text idx = (width - len(text)) // 2 t = delim*idx + text + delim*(width - idx - len(text)) self.write(t + "\n") def write_exception(self, e, val, tb): # remove the first item, as that is always runtests.py tb = tb.tb_next t = traceback.format_exception(e, val, tb) self.write("".join(t)) def start(self, seed=None, msg="test process starts"): self.write_center(msg) executable = sys.executable v = tuple(sys.version_info) python_version = "%s.%s.%s-%s-%s" % v implementation = platform.python_implementation() if implementation == 'PyPy': implementation += " %s.%s.%s-%s-%s" % sys.pypy_version_info self.write("executable: %s (%s) [%s]\n" % (executable, python_version, implementation)) from .misc import ARCH self.write("architecture: %s\n" % ARCH) from sympy.core.cache import USE_CACHE self.write("cache: %s\n" % USE_CACHE) from sympy.core.compatibility import GROUND_TYPES, HAS_GMPY version = '' if GROUND_TYPES =='gmpy': if HAS_GMPY == 1: import gmpy elif HAS_GMPY == 2: import gmpy2 as gmpy version = gmpy.version() self.write("ground types: %s %s\n" % (GROUND_TYPES, version)) numpy = import_module('numpy') self.write("numpy: %s\n" % (None if not numpy else numpy.__version__)) if seed is not None: self.write("random seed: %d\n" % seed) from .misc import HASH_RANDOMIZATION self.write("hash randomization: ") hash_seed = os.getenv("PYTHONHASHSEED") or '0' if HASH_RANDOMIZATION and (hash_seed == "random" or int(hash_seed)): self.write("on (PYTHONHASHSEED=%s)\n" % hash_seed) else: self.write("off\n") if self._split: self.write("split: %s\n" % self._split) self.write('\n') self._t_start = clock() def finish(self): self._t_end = clock() self.write("\n") global text, linelen text = "tests finished: %d passed, " % self._passed linelen = len(text) def add_text(mytext): global text, linelen """Break new text if too long.""" if linelen + len(mytext) > self.terminal_width: text += '\n' linelen = 0 text += mytext linelen += len(mytext) if len(self._failed) > 0: add_text("%d failed, " % len(self._failed)) if len(self._failed_doctest) > 0: add_text("%d failed, " % len(self._failed_doctest)) if self._skipped > 0: add_text("%d skipped, " % self._skipped) if self._xfailed > 0: add_text("%d expected to fail, " % self._xfailed) if len(self._xpassed) > 0: add_text("%d expected to fail but passed, " % len(self._xpassed)) if len(self._exceptions) > 0: add_text("%d exceptions, " % len(self._exceptions)) add_text("in %.2f seconds" % (self._t_end - self._t_start)) if self.slow_test_functions: self.write_center('slowest tests', '_') sorted_slow = sorted(self.slow_test_functions, key=lambda r: r[1]) for slow_func_name, taken in sorted_slow: print('%s - Took %.3f seconds' % (slow_func_name, taken)) if self.fast_test_functions: self.write_center('unexpectedly fast tests', '_') sorted_fast = sorted(self.fast_test_functions, key=lambda r: r[1]) for fast_func_name, taken in sorted_fast: print('%s - Took %.3f seconds' % (fast_func_name, taken)) if len(self._xpassed) > 0: self.write_center("xpassed tests", "_") for e in self._xpassed: self.write("%s: %s\n" % (e[0], e[1])) self.write("\n") if self._tb_style != "no" and len(self._exceptions) > 0: for e in self._exceptions: filename, f, (t, val, tb) = e self.write_center("", "_") if f is None: s = "%s" % filename else: s = "%s:%s" % (filename, f.__name__) self.write_center(s, "_") self.write_exception(t, val, tb) self.write("\n") if self._tb_style != "no" and len(self._failed) > 0: for e in self._failed: filename, f, (t, val, tb) = e self.write_center("", "_") self.write_center("%s:%s" % (filename, f.__name__), "_") self.write_exception(t, val, tb) self.write("\n") if self._tb_style != "no" and len(self._failed_doctest) > 0: for e in self._failed_doctest: filename, msg = e self.write_center("", "_") self.write_center("%s" % filename, "_") self.write(msg) self.write("\n") self.write_center(text) ok = len(self._failed) == 0 and len(self._exceptions) == 0 and \ len(self._failed_doctest) == 0 if not ok: self.write("DO *NOT* COMMIT!\n") return ok def entering_filename(self, filename, n): rel_name = filename[len(self._root_dir) + 1:] self._active_file = rel_name self._active_file_error = False self.write(rel_name) self.write("[%d] " % n) def leaving_filename(self): self.write(" ") if self._active_file_error: self.write("[FAIL]", "Red", align="right") else: self.write("[OK]", "Green", align="right") self.write("\n") if self._verbose: self.write("\n") def entering_test(self, f): self._active_f = f if self._verbose: self.write("\n" + f.__name__ + " ") def test_xfail(self): self._xfailed += 1 self.write("f", "Green") def test_xpass(self, v): message = str(v) self._xpassed.append((self._active_file, message)) self.write("X", "Green") def test_fail(self, exc_info): self._failed.append((self._active_file, self._active_f, exc_info)) self.write("F", "Red") self._active_file_error = True def doctest_fail(self, name, error_msg): # the first line contains "******", remove it: error_msg = "\n".join(error_msg.split("\n")[1:]) self._failed_doctest.append((name, error_msg)) self.write("F", "Red") self._active_file_error = True def test_pass(self, char="."): self._passed += 1 if self._verbose: self.write("ok", "Green") else: self.write(char, "Green") def test_skip(self, v=None): char = "s" self._skipped += 1 if v is not None: message = str(v) if message == "KeyboardInterrupt": char = "K" elif message == "Timeout": char = "T" elif message == "Slow": char = "w" if self._verbose: if v is not None: self.write(message + ' ', "Blue") else: self.write(" - ", "Blue") self.write(char, "Blue") def test_exception(self, exc_info): self._exceptions.append((self._active_file, self._active_f, exc_info)) if exc_info[0] is TimeOutError: self.write("T", "Red") else: self.write("E", "Red") self._active_file_error = True def import_error(self, filename, exc_info): self._exceptions.append((filename, None, exc_info)) rel_name = filename[len(self._root_dir) + 1:] self.write(rel_name) self.write("[?] Failed to import", "Red") self.write(" ") self.write("[FAIL]", "Red", align="right") self.write("\n")

4ade5cd3d100c7c6b87db84cd65d925aa831482424ac1a0c12a2de02eb4bc6f4

""" Python code printers This module contains python code printers for plain python as well as NumPy & SciPy enabled code. """ from collections import defaultdict from itertools import chain from sympy.core import S from .precedence import precedence from .codeprinter import CodePrinter _kw_py2and3 = { 'and', 'as', 'assert', 'break', 'class', 'continue', 'def', 'del', 'elif', 'else', 'except', 'finally', 'for', 'from', 'global', 'if', 'import', 'in', 'is', 'lambda', 'not', 'or', 'pass', 'raise', 'return', 'try', 'while', 'with', 'yield', 'None' # 'None' is actually not in Python 2's keyword.kwlist } _kw_only_py2 = {'exec', 'print'} _kw_only_py3 = {'False', 'nonlocal', 'True'} _known_functions = { 'Abs': 'abs', } _known_functions_math = { 'acos': 'acos', 'acosh': 'acosh', 'asin': 'asin', 'asinh': 'asinh', 'atan': 'atan', 'atan2': 'atan2', 'atanh': 'atanh', 'ceiling': 'ceil', 'cos': 'cos', 'cosh': 'cosh', 'erf': 'erf', 'erfc': 'erfc', 'exp': 'exp', 'expm1': 'expm1', 'factorial': 'factorial', 'floor': 'floor', 'gamma': 'gamma', 'hypot': 'hypot', 'loggamma': 'lgamma', 'log': 'log', 'ln': 'log', 'log10': 'log10', 'log1p': 'log1p', 'log2': 'log2', 'sin': 'sin', 'sinh': 'sinh', 'Sqrt': 'sqrt', 'tan': 'tan', 'tanh': 'tanh' } # Not used from ``math``: [copysign isclose isfinite isinf isnan ldexp frexp pow modf # radians trunc fmod fsum gcd degrees fabs] _known_constants_math = { 'Exp1': 'e', 'Pi': 'pi', 'E': 'e' # Only in python >= 3.5: # 'Infinity': 'inf', # 'NaN': 'nan' } def _print_known_func(self, expr): known = self.known_functions[expr.__class__.__name__] return '{name}({args})'.format(name=self._module_format(known), args=', '.join(map(lambda arg: self._print(arg), expr.args))) def _print_known_const(self, expr): known = self.known_constants[expr.__class__.__name__] return self._module_format(known) class AbstractPythonCodePrinter(CodePrinter): printmethod = "_pythoncode" language = "Python" reserved_words = _kw_py2and3.union(_kw_only_py3) modules = None # initialized to a set in __init__ tab = ' ' _kf = dict(chain( _known_functions.items(), [(k, 'math.' + v) for k, v in _known_functions_math.items()] )) _kc = {k: 'math.'+v for k, v in _known_constants_math.items()} _operators = {'and': 'and', 'or': 'or', 'not': 'not'} _default_settings = dict( CodePrinter._default_settings, user_functions={}, precision=17, inline=True, fully_qualified_modules=True, contract=False, standard='python3' ) def __init__(self, settings=None): super(AbstractPythonCodePrinter, self).__init__(settings) # XXX Remove after dropping python 2 support. # Python standard handler std = self._settings['standard'] if std is None: import sys std = 'python{}'.format(sys.version_info.major) if std not in ('python2', 'python3'): raise ValueError('Unrecognized python standard : {}'.format(std)) self.standard = std self.module_imports = defaultdict(set) # Known functions and constants handler self.known_functions = dict(self._kf, **(settings or {}).get( 'user_functions', {})) self.known_constants = dict(self._kc, **(settings or {}).get( 'user_constants', {})) def _declare_number_const(self, name, value): return "%s = %s" % (name, value) def _module_format(self, fqn, register=True): parts = fqn.split('.') if register and len(parts) > 1: self.module_imports['.'.join(parts[:-1])].add(parts[-1]) if self._settings['fully_qualified_modules']: return fqn else: return fqn.split('(')[0].split('[')[0].split('.')[-1] def _format_code(self, lines): return lines def _get_statement(self, codestring): return "{}".format(codestring) def _get_comment(self, text): return " # {0}".format(text) def _expand_fold_binary_op(self, op, args): """ This method expands a fold on binary operations. ``functools.reduce`` is an example of a folded operation. For example, the expression `A + B + C + D` is folded into `((A + B) + C) + D` """ if len(args) == 1: return self._print(args[0]) else: return "%s(%s, %s)" % ( self._module_format(op), self._expand_fold_binary_op(op, args[:-1]), self._print(args[-1]), ) def _expand_reduce_binary_op(self, op, args): """ This method expands a reductin on binary operations. Notice: this is NOT the same as ``functools.reduce``. For example, the expression `A + B + C + D` is reduced into: `(A + B) + (C + D)` """ if len(args) == 1: return self._print(args[0]) else: N = len(args) Nhalf = N // 2 return "%s(%s, %s)" % ( self._module_format(op), self._expand_reduce_binary_op(args[:Nhalf]), self._expand_reduce_binary_op(args[Nhalf:]), ) def _get_einsum_string(self, subranks, contraction_indices): letters = self._get_letter_generator_for_einsum() contraction_string = "" counter = 0 d = {j: min(i) for i in contraction_indices for j in i} indices = [] for rank_arg in subranks: lindices = [] for i in range(rank_arg): if counter in d: lindices.append(d[counter]) else: lindices.append(counter) counter += 1 indices.append(lindices) mapping = {} letters_free = [] letters_dum = [] for i in indices: for j in i: if j not in mapping: l = next(letters) mapping[j] = l else: l = mapping[j] contraction_string += l if j in d: if l not in letters_dum: letters_dum.append(l) else: letters_free.append(l) contraction_string += "," contraction_string = contraction_string[:-1] return contraction_string, letters_free, letters_dum def _print_NaN(self, expr): return "float('nan')" def _print_Infinity(self, expr): return "float('inf')" def _print_NegativeInfinity(self, expr): return "float('-inf')" def _print_ComplexInfinity(self, expr): return self._print_NaN(expr) def _print_Mod(self, expr): PREC = precedence(expr) return ('{0} % {1}'.format(*map(lambda x: self.parenthesize(x, PREC), expr.args))) def _print_Piecewise(self, expr): result = [] i = 0 for arg in expr.args: e = arg.expr c = arg.cond if i == 0: result.append('(') result.append('(') result.append(self._print(e)) result.append(')') result.append(' if ') result.append(self._print(c)) result.append(' else ') i += 1 result = result[:-1] if result[-1] == 'True': result = result[:-2] result.append(')') else: result.append(' else None)') return ''.join(result) def _print_Relational(self, expr): "Relational printer for Equality and Unequality" op = { '==' :'equal', '!=' :'not_equal', '<' :'less', '<=' :'less_equal', '>' :'greater', '>=' :'greater_equal', } if expr.rel_op in op: lhs = self._print(expr.lhs) rhs = self._print(expr.rhs) return '({lhs} {op} {rhs})'.format(op=expr.rel_op, lhs=lhs, rhs=rhs) return super(AbstractPythonCodePrinter, self)._print_Relational(expr) def _print_ITE(self, expr): from sympy.functions.elementary.piecewise import Piecewise return self._print(expr.rewrite(Piecewise)) def _print_Sum(self, expr): loops = ( 'for {i} in range({a}, {b}+1)'.format( i=self._print(i), a=self._print(a), b=self._print(b)) for i, a, b in expr.limits) return '(builtins.sum({function} {loops}))'.format( function=self._print(expr.function), loops=' '.join(loops)) def _print_ImaginaryUnit(self, expr): return '1j' def _print_MatrixBase(self, expr): name = expr.__class__.__name__ func = self.known_functions.get(name, name) return "%s(%s)" % (func, self._print(expr.tolist())) _print_SparseMatrix = \ _print_MutableSparseMatrix = \ _print_ImmutableSparseMatrix = \ _print_Matrix = \ _print_DenseMatrix = \ _print_MutableDenseMatrix = \ _print_ImmutableMatrix = \ _print_ImmutableDenseMatrix = \ lambda self, expr: self._print_MatrixBase(expr) def _indent_codestring(self, codestring): return '\n'.join([self.tab + line for line in codestring.split('\n')]) def _print_FunctionDefinition(self, fd): body = '\n'.join(map(lambda arg: self._print(arg), fd.body)) return "def {name}({parameters}):\n{body}".format( name=self._print(fd.name), parameters=', '.join([self._print(var.symbol) for var in fd.parameters]), body=self._indent_codestring(body) ) def _print_While(self, whl): body = '\n'.join(map(lambda arg: self._print(arg), whl.body)) return "while {cond}:\n{body}".format( cond=self._print(whl.condition), body=self._indent_codestring(body) ) def _print_Declaration(self, decl): return '%s = %s' % ( self._print(decl.variable.symbol), self._print(decl.variable.value) ) def _print_Return(self, ret): arg, = ret.args return 'return %s' % self._print(arg) def _print_Print(self, prnt): print_args = ', '.join(map(lambda arg: self._print(arg), prnt.print_args)) if prnt.format_string != None: # Must be '!= None', cannot be 'is not None' print_args = '{0} % ({1})'.format( self._print(prnt.format_string), print_args) if prnt.file != None: # Must be '!= None', cannot be 'is not None' print_args += ', file=%s' % self._print(prnt.file) # XXX Remove after dropping python 2 support. if self.standard == 'python2': return 'print %s' % print_args return 'print(%s)' % print_args def _print_Stream(self, strm): if str(strm.name) == 'stdout': return self._module_format('sys.stdout') elif str(strm.name) == 'stderr': return self._module_format('sys.stderr') else: return self._print(strm.name) def _print_NoneToken(self, arg): return 'None' class PythonCodePrinter(AbstractPythonCodePrinter): def _print_sign(self, e): return '(0.0 if {e} == 0 else {f}(1, {e}))'.format( f=self._module_format('math.copysign'), e=self._print(e.args[0])) def _print_Not(self, expr): PREC = precedence(expr) return self._operators['not'] + self.parenthesize(expr.args[0], PREC) def _print_Indexed(self, expr): base = expr.args[0] index = expr.args[1:] return "{}[{}]".format(str(base), ", ".join([self._print(ind) for ind in index])) def _hprint_Pow(self, expr, rational=False, sqrt='math.sqrt'): """Printing helper function for ``Pow`` Notes ===== This only preprocesses the ``sqrt`` as math formatter Examples ======== >>> from sympy.functions import sqrt >>> from sympy.printing.pycode import PythonCodePrinter >>> from sympy.abc import x Python code printer automatically looks up ``math.sqrt``. >>> printer = PythonCodePrinter({'standard':'python3'}) >>> printer._hprint_Pow(sqrt(x), rational=True) 'x**(1/2)' >>> printer._hprint_Pow(sqrt(x), rational=False) 'math.sqrt(x)' >>> printer._hprint_Pow(1/sqrt(x), rational=True) 'x**(-1/2)' >>> printer._hprint_Pow(1/sqrt(x), rational=False) '1/math.sqrt(x)' Using sqrt from numpy or mpmath >>> printer._hprint_Pow(sqrt(x), sqrt='numpy.sqrt') 'numpy.sqrt(x)' >>> printer._hprint_Pow(sqrt(x), sqrt='mpmath.sqrt') 'mpmath.sqrt(x)' See Also ======== sympy.printing.str.StrPrinter._print_Pow """ PREC = precedence(expr) if expr.exp == S.Half and not rational: func = self._module_format(sqrt) arg = self._print(expr.base) return '{func}({arg})'.format(func=func, arg=arg) if expr.is_commutative: if -expr.exp is S.Half and not rational: func = self._module_format(sqrt) num = self._print(S.One) arg = self._print(expr.base) return "{num}/{func}({arg})".format( num=num, func=func, arg=arg) base_str = self.parenthesize(expr.base, PREC, strict=False) exp_str = self.parenthesize(expr.exp, PREC, strict=False) return "{}**{}".format(base_str, exp_str) def _print_Pow(self, expr, rational=False): return self._hprint_Pow(expr, rational=rational) def _print_Rational(self, expr): # XXX Remove after dropping python 2 support. if self.standard == 'python2': return '{}./{}.'.format(expr.p, expr.q) return '{}/{}'.format(expr.p, expr.q) def _print_Half(self, expr): return self._print_Rational(expr) for k in PythonCodePrinter._kf: setattr(PythonCodePrinter, '_print_%s' % k, _print_known_func) for k in _known_constants_math: setattr(PythonCodePrinter, '_print_%s' % k, _print_known_const) def pycode(expr, **settings): """ Converts an expr to a string of Python code Parameters ========== expr : Expr A SymPy expression. fully_qualified_modules : bool Whether or not to write out full module names of functions (``math.sin`` vs. ``sin``). default: ``True``. standard : str or None, optional If 'python2', Python 2 sematics will be used. If 'python3', Python 3 sematics will be used. If None, the standard will be automatically detected. Default is 'python3'. And this parameter may be removed in the future. Examples ======== >>> from sympy import tan, Symbol >>> from sympy.printing.pycode import pycode >>> pycode(tan(Symbol('x')) + 1) 'math.tan(x) + 1' """ return PythonCodePrinter(settings).doprint(expr) _not_in_mpmath = 'log1p log2'.split() _in_mpmath = [(k, v) for k, v in _known_functions_math.items() if k not in _not_in_mpmath] _known_functions_mpmath = dict(_in_mpmath, **{ 'sign': 'sign', }) _known_constants_mpmath = { 'Pi': 'pi' } class MpmathPrinter(PythonCodePrinter): """ Lambda printer for mpmath which maintains precision for floats """ printmethod = "_mpmathcode" _kf = dict(chain( _known_functions.items(), [(k, 'mpmath.' + v) for k, v in _known_functions_mpmath.items()] )) def _print_Float(self, e): # XXX: This does not handle setting mpmath.mp.dps. It is assumed that # the caller of the lambdified function will have set it to sufficient # precision to match the Floats in the expression. # Remove 'mpz' if gmpy is installed. args = str(tuple(map(int, e._mpf_))) return '{func}({args})'.format(func=self._module_format('mpmath.mpf'), args=args) def _print_Rational(self, e): return "{func}({p})/{func}({q})".format( func=self._module_format('mpmath.mpf'), q=self._print(e.q), p=self._print(e.p) ) def _print_Half(self, e): return self._print_Rational(e) def _print_uppergamma(self, e): return "{0}({1}, {2}, {3})".format( self._module_format('mpmath.gammainc'), self._print(e.args[0]), self._print(e.args[1]), self._module_format('mpmath.inf')) def _print_lowergamma(self, e): return "{0}({1}, 0, {2})".format( self._module_format('mpmath.gammainc'), self._print(e.args[0]), self._print(e.args[1])) def _print_log2(self, e): return '{0}({1})/{0}(2)'.format( self._module_format('mpmath.log'), self._print(e.args[0])) def _print_log1p(self, e): return '{0}({1}+1)'.format( self._module_format('mpmath.log'), self._print(e.args[0])) def _print_Pow(self, expr, rational=False): return self._hprint_Pow(expr, rational=rational, sqrt='mpmath.sqrt') for k in MpmathPrinter._kf: setattr(MpmathPrinter, '_print_%s' % k, _print_known_func) for k in _known_constants_mpmath: setattr(MpmathPrinter, '_print_%s' % k, _print_known_const) _not_in_numpy = 'erf erfc factorial gamma loggamma'.split() _in_numpy = [(k, v) for k, v in _known_functions_math.items() if k not in _not_in_numpy] _known_functions_numpy = dict(_in_numpy, **{ 'acos': 'arccos', 'acosh': 'arccosh', 'asin': 'arcsin', 'asinh': 'arcsinh', 'atan': 'arctan', 'atan2': 'arctan2', 'atanh': 'arctanh', 'exp2': 'exp2', 'sign': 'sign', }) class NumPyPrinter(PythonCodePrinter): """ Numpy printer which handles vectorized piecewise functions, logical operators, etc. """ printmethod = "_numpycode" _kf = dict(chain( PythonCodePrinter._kf.items(), [(k, 'numpy.' + v) for k, v in _known_functions_numpy.items()] )) _kc = {k: 'numpy.'+v for k, v in _known_constants_math.items()} def _print_seq(self, seq): "General sequence printer: converts to tuple" # Print tuples here instead of lists because numba supports # tuples in nopython mode. delimiter=', ' return '({},)'.format(delimiter.join(self._print(item) for item in seq)) def _print_MatMul(self, expr): "Matrix multiplication printer" if expr.as_coeff_matrices()[0] is not S(1): expr_list = expr.as_coeff_matrices()[1]+[(expr.as_coeff_matrices()[0])] return '({0})'.format(').dot('.join(self._print(i) for i in expr_list)) return '({0})'.format(').dot('.join(self._print(i) for i in expr.args)) def _print_MatPow(self, expr): "Matrix power printer" return '{0}({1}, {2})'.format(self._module_format('numpy.linalg.matrix_power'), self._print(expr.args[0]), self._print(expr.args[1])) def _print_Inverse(self, expr): "Matrix inverse printer" return '{0}({1})'.format(self._module_format('numpy.linalg.inv'), self._print(expr.args[0])) def _print_DotProduct(self, expr): # DotProduct allows any shape order, but numpy.dot does matrix # multiplication, so we have to make sure it gets 1 x n by n x 1. arg1, arg2 = expr.args if arg1.shape[0] != 1: arg1 = arg1.T if arg2.shape[1] != 1: arg2 = arg2.T return "%s(%s, %s)" % (self._module_format('numpy.dot'), self._print(arg1), self._print(arg2)) def _print_MatrixSolve(self, expr): return "%s(%s, %s)" % (self._module_format('numpy.linalg.solve'), self._print(expr.matrix), self._print(expr.vector)) def _print_Piecewise(self, expr): "Piecewise function printer" exprs = '[{0}]'.format(','.join(self._print(arg.expr) for arg in expr.args)) conds = '[{0}]'.format(','.join(self._print(arg.cond) for arg in expr.args)) # If [default_value, True] is a (expr, cond) sequence in a Piecewise object # it will behave the same as passing the 'default' kwarg to select() # *as long as* it is the last element in expr.args. # If this is not the case, it may be triggered prematurely. return '{0}({1}, {2}, default=numpy.nan)'.format(self._module_format('numpy.select'), conds, exprs) def _print_Relational(self, expr): "Relational printer for Equality and Unequality" op = { '==' :'equal', '!=' :'not_equal', '<' :'less', '<=' :'less_equal', '>' :'greater', '>=' :'greater_equal', } if expr.rel_op in op: lhs = self._print(expr.lhs) rhs = self._print(expr.rhs) return '{op}({lhs}, {rhs})'.format(op=self._module_format('numpy.'+op[expr.rel_op]), lhs=lhs, rhs=rhs) return super(NumPyPrinter, self)._print_Relational(expr) def _print_And(self, expr): "Logical And printer" # We have to override LambdaPrinter because it uses Python 'and' keyword. # If LambdaPrinter didn't define it, we could use StrPrinter's # version of the function and add 'logical_and' to NUMPY_TRANSLATIONS. return '{0}.reduce(({1}))'.format(self._module_format('numpy.logical_and'), ','.join(self._print(i) for i in expr.args)) def _print_Or(self, expr): "Logical Or printer" # We have to override LambdaPrinter because it uses Python 'or' keyword. # If LambdaPrinter didn't define it, we could use StrPrinter's # version of the function and add 'logical_or' to NUMPY_TRANSLATIONS. return '{0}.reduce(({1}))'.format(self._module_format('numpy.logical_or'), ','.join(self._print(i) for i in expr.args)) def _print_Not(self, expr): "Logical Not printer" # We have to override LambdaPrinter because it uses Python 'not' keyword. # If LambdaPrinter didn't define it, we would still have to define our # own because StrPrinter doesn't define it. return '{0}({1})'.format(self._module_format('numpy.logical_not'), ','.join(self._print(i) for i in expr.args)) def _print_Pow(self, expr, rational=False): # XXX Workaround for negative integer power error if expr.exp.is_integer and expr.exp.is_negative: expr = expr.base ** expr.exp.evalf() return self._hprint_Pow(expr, rational=rational, sqrt='numpy.sqrt') def _print_Min(self, expr): return '{0}(({1}))'.format(self._module_format('numpy.amin'), ','.join(self._print(i) for i in expr.args)) def _print_Max(self, expr): return '{0}(({1}))'.format(self._module_format('numpy.amax'), ','.join(self._print(i) for i in expr.args)) def _print_arg(self, expr): return "%s(%s)" % (self._module_format('numpy.angle'), self._print(expr.args[0])) def _print_im(self, expr): return "%s(%s)" % (self._module_format('numpy.imag'), self._print(expr.args[0])) def _print_Mod(self, expr): return "%s(%s)" % (self._module_format('numpy.mod'), ', '.join( map(lambda arg: self._print(arg), expr.args))) def _print_re(self, expr): return "%s(%s)" % (self._module_format('numpy.real'), self._print(expr.args[0])) def _print_sinc(self, expr): return "%s(%s)" % (self._module_format('numpy.sinc'), self._print(expr.args[0]/S.Pi)) def _print_MatrixBase(self, expr): func = self.known_functions.get(expr.__class__.__name__, None) if func is None: func = self._module_format('numpy.array') return "%s(%s)" % (func, self._print(expr.tolist())) def _print_Identity(self, expr): shape = expr.shape if all([dim.is_Integer for dim in shape]): return "%s(%s)" % (self._module_format('numpy.eye'), self._print(expr.shape[0])) else: raise NotImplementedError("Symbolic matrix dimensions are not yet supported for identity matrices") def _print_BlockMatrix(self, expr): return '{0}({1})'.format(self._module_format('numpy.block'), self._print(expr.args[0].tolist())) def _print_CodegenArrayTensorProduct(self, expr): array_list = [j for i, arg in enumerate(expr.args) for j in (self._print(arg), "[%i, %i]" % (2*i, 2*i+1))] return "%s(%s)" % (self._module_format('numpy.einsum'), ", ".join(array_list)) def _print_CodegenArrayContraction(self, expr): from sympy.codegen.array_utils import CodegenArrayTensorProduct base = expr.expr contraction_indices = expr.contraction_indices if not contraction_indices: return self._print(base) if isinstance(base, CodegenArrayTensorProduct): counter = 0 d = {j: min(i) for i in contraction_indices for j in i} indices = [] for rank_arg in base.subranks: lindices = [] for i in range(rank_arg): if counter in d: lindices.append(d[counter]) else: lindices.append(counter) counter += 1 indices.append(lindices) elems = ["%s, %s" % (self._print(arg), ind) for arg, ind in zip(base.args, indices)] return "%s(%s)" % ( self._module_format('numpy.einsum'), ", ".join(elems) ) raise NotImplementedError() def _print_CodegenArrayDiagonal(self, expr): diagonal_indices = list(expr.diagonal_indices) if len(diagonal_indices) > 1: # TODO: this should be handled in sympy.codegen.array_utils, # possibly by creating the possibility of unfolding the # CodegenArrayDiagonal object into nested ones. Same reasoning for # the array contraction. raise NotImplementedError if len(diagonal_indices[0]) != 2: raise NotImplementedError return "%s(%s, 0, axis1=%s, axis2=%s)" % ( self._module_format("numpy.diagonal"), self._print(expr.expr), diagonal_indices[0][0], diagonal_indices[0][1], ) def _print_CodegenArrayPermuteDims(self, expr): return "%s(%s, %s)" % ( self._module_format("numpy.transpose"), self._print(expr.expr), self._print(expr.permutation.args[0]), ) def _print_CodegenArrayElementwiseAdd(self, expr): return self._expand_fold_binary_op('numpy.add', expr.args) for k in NumPyPrinter._kf: setattr(NumPyPrinter, '_print_%s' % k, _print_known_func) for k in NumPyPrinter._kc: setattr(NumPyPrinter, '_print_%s' % k, _print_known_const) _known_functions_scipy_special = { 'erf': 'erf', 'erfc': 'erfc', 'besselj': 'jv', 'bessely': 'yv', 'besseli': 'iv', 'besselk': 'kv', 'factorial': 'factorial', 'gamma': 'gamma', 'loggamma': 'gammaln', 'digamma': 'psi', 'RisingFactorial': 'poch', 'jacobi': 'eval_jacobi', 'gegenbauer': 'eval_gegenbauer', 'chebyshevt': 'eval_chebyt', 'chebyshevu': 'eval_chebyu', 'legendre': 'eval_legendre', 'hermite': 'eval_hermite', 'laguerre': 'eval_laguerre', 'assoc_laguerre': 'eval_genlaguerre', } _known_constants_scipy_constants = { 'GoldenRatio': 'golden_ratio', 'Pi': 'pi', 'E': 'e' } class SciPyPrinter(NumPyPrinter): _kf = dict(chain( NumPyPrinter._kf.items(), [(k, 'scipy.special.' + v) for k, v in _known_functions_scipy_special.items()] )) _kc = {k: 'scipy.constants.' + v for k, v in _known_constants_scipy_constants.items()} def _print_SparseMatrix(self, expr): i, j, data = [], [], [] for (r, c), v in expr._smat.items(): i.append(r) j.append(c) data.append(v) return "{name}({data}, ({i}, {j}), shape={shape})".format( name=self._module_format('scipy.sparse.coo_matrix'), data=data, i=i, j=j, shape=expr.shape ) _print_ImmutableSparseMatrix = _print_SparseMatrix # SciPy's lpmv has a different order of arguments from assoc_legendre def _print_assoc_legendre(self, expr): return "{0}({2}, {1}, {3})".format( self._module_format('scipy.special.lpmv'), self._print(expr.args[0]), self._print(expr.args[1]), self._print(expr.args[2])) for k in SciPyPrinter._kf: setattr(SciPyPrinter, '_print_%s' % k, _print_known_func) for k in SciPyPrinter._kc: setattr(SciPyPrinter, '_print_%s' % k, _print_known_const) class SymPyPrinter(PythonCodePrinter): _kf = {k: 'sympy.' + v for k, v in chain( _known_functions.items(), _known_functions_math.items() )} def _print_Function(self, expr): mod = expr.func.__module__ or '' return '%s(%s)' % (self._module_format(mod + ('.' if mod else '') + expr.func.__name__), ', '.join(map(lambda arg: self._print(arg), expr.args))) def _print_Pow(self, expr, rational=False): return self._hprint_Pow(expr, rational=rational, sqrt='sympy.sqrt')

6560df5dd6fa76f9d4aa453ae3e4ea09a45149a02c3395a62eac217d9e62d174

""" Rust code printer The `RustCodePrinter` converts SymPy expressions into Rust expressions. A complete code generator, which uses `rust_code` extensively, can be found in `sympy.utilities.codegen`. The `codegen` module can be used to generate complete source code files. """ # Possible Improvement # # * make sure we follow Rust Style Guidelines_ # * make use of pattern matching # * better support for reference # * generate generic code and use trait to make sure they have specific methods # * use crates_ to get more math support # - num_ # + BigInt_, BigUint_ # + Complex_ # + Rational64_, Rational32_, BigRational_ # # .. _crates: https://crates.io/ # .. _Guidelines: https://github.com/rust-lang/rust/tree/master/src/doc/style # .. _num: http://rust-num.github.io/num/num/ # .. _BigInt: http://rust-num.github.io/num/num/bigint/struct.BigInt.html # .. _BigUint: http://rust-num.github.io/num/num/bigint/struct.BigUint.html # .. _Complex: http://rust-num.github.io/num/num/complex/struct.Complex.html # .. _Rational32: http://rust-num.github.io/num/num/rational/type.Rational32.html # .. _Rational64: http://rust-num.github.io/num/num/rational/type.Rational64.html # .. _BigRational: http://rust-num.github.io/num/num/rational/type.BigRational.html from __future__ import print_function, division from sympy.core import S, Rational, Float, Lambda from sympy.core.compatibility import string_types, range from sympy.printing.codeprinter import CodePrinter # Rust's methods for integer and float can be found at here : # # * `Rust - Primitive Type f64 <https://doc.rust-lang.org/std/primitive.f64.html>`_ # * `Rust - Primitive Type i64 <https://doc.rust-lang.org/std/primitive.i64.html>`_ # # Function Style : # # 1. args[0].func(args[1:]), method with arguments # 2. args[0].func(), method without arguments # 3. args[1].func(), method without arguments (e.g. (e, x) => x.exp()) # 4. func(args), function with arguments # dictionary mapping sympy function to (argument_conditions, Rust_function). # Used in RustCodePrinter._print_Function(self) # f64 method in Rust known_functions = { "": "is_nan", "": "is_infinite", "": "is_finite", "": "is_normal", "": "classify", "floor": "floor", "ceiling": "ceil", "": "round", "": "trunc", "": "fract", "Abs": "abs", "sign": "signum", "": "is_sign_positive", "": "is_sign_negative", "": "mul_add", "Pow": [(lambda base, exp: exp == -S.One, "recip", 2), # 1.0/x (lambda base, exp: exp == S.Half, "sqrt", 2), # x ** 0.5 (lambda base, exp: exp == -S.Half, "sqrt().recip", 2), # 1/(x ** 0.5) (lambda base, exp: exp == Rational(1, 3), "cbrt", 2), # x ** (1/3) (lambda base, exp: base == S.One*2, "exp2", 3), # 2 ** x (lambda base, exp: exp.is_integer, "powi", 1), # x ** y, for i32 (lambda base, exp: not exp.is_integer, "powf", 1)], # x ** y, for f64 "exp": [(lambda exp: True, "exp", 2)], # e ** x "log": "ln", "": "log", # number.log(base) "": "log2", "": "log10", "": "to_degrees", "": "to_radians", "Max": "max", "Min": "min", "": "hypot", # (x**2 + y**2) ** 0.5 "sin": "sin", "cos": "cos", "tan": "tan", "asin": "asin", "acos": "acos", "atan": "atan", "atan2": "atan2", "": "sin_cos", "": "exp_m1", # e ** x - 1 "": "ln_1p", # ln(1 + x) "sinh": "sinh", "cosh": "cosh", "tanh": "tanh", "asinh": "asinh", "acosh": "acosh", "atanh": "atanh", } # i64 method in Rust # known_functions_i64 = { # "": "min_value", # "": "max_value", # "": "from_str_radix", # "": "count_ones", # "": "count_zeros", # "": "leading_zeros", # "": "trainling_zeros", # "": "rotate_left", # "": "rotate_right", # "": "swap_bytes", # "": "from_be", # "": "from_le", # "": "to_be", # to big endian # "": "to_le", # to little endian # "": "checked_add", # "": "checked_sub", # "": "checked_mul", # "": "checked_div", # "": "checked_rem", # "": "checked_neg", # "": "checked_shl", # "": "checked_shr", # "": "checked_abs", # "": "saturating_add", # "": "saturating_sub", # "": "saturating_mul", # "": "wrapping_add", # "": "wrapping_sub", # "": "wrapping_mul", # "": "wrapping_div", # "": "wrapping_rem", # "": "wrapping_neg", # "": "wrapping_shl", # "": "wrapping_shr", # "": "wrapping_abs", # "": "overflowing_add", # "": "overflowing_sub", # "": "overflowing_mul", # "": "overflowing_div", # "": "overflowing_rem", # "": "overflowing_neg", # "": "overflowing_shl", # "": "overflowing_shr", # "": "overflowing_abs", # "Pow": "pow", # "Abs": "abs", # "sign": "signum", # "": "is_positive", # "": "is_negnative", # } # These are the core reserved words in the Rust language. Taken from: # http://doc.rust-lang.org/grammar.html#keywords reserved_words = ['abstract', 'alignof', 'as', 'become', 'box', 'break', 'const', 'continue', 'crate', 'do', 'else', 'enum', 'extern', 'false', 'final', 'fn', 'for', 'if', 'impl', 'in', 'let', 'loop', 'macro', 'match', 'mod', 'move', 'mut', 'offsetof', 'override', 'priv', 'proc', 'pub', 'pure', 'ref', 'return', 'Self', 'self', 'sizeof', 'static', 'struct', 'super', 'trait', 'true', 'type', 'typeof', 'unsafe', 'unsized', 'use', 'virtual', 'where', 'while', 'yield'] class RustCodePrinter(CodePrinter): """A printer to convert python expressions to strings of Rust code""" printmethod = "_rust_code" language = "Rust" _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 17, 'user_functions': {}, 'human': True, 'contract': True, 'dereference': set(), 'error_on_reserved': False, 'reserved_word_suffix': '_', 'inline': False, } def __init__(self, settings={}): CodePrinter.__init__(self, settings) self.known_functions = dict(known_functions) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) self._dereference = set(settings.get('dereference', [])) self.reserved_words = set(reserved_words) def _rate_index_position(self, p): return p*5 def _get_statement(self, codestring): return "%s;" % codestring def _get_comment(self, text): return "// %s" % text def _declare_number_const(self, name, value): return "const %s: f64 = %s;" % (name, value) def _format_code(self, lines): return self.indent_code(lines) def _traverse_matrix_indices(self, mat): rows, cols = mat.shape return ((i, j) for i in range(rows) for j in range(cols)) def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] loopstart = "for %(var)s in %(start)s..%(end)s {" for i in indices: # Rust arrays start at 0 and end at dimension-1 open_lines.append(loopstart % { 'var': self._print(i), 'start': self._print(i.lower), 'end': self._print(i.upper + 1)}) close_lines.append("}") return open_lines, close_lines def _print_caller_var(self, expr): if len(expr.args) > 1: # for something like `sin(x + y + z)`, # make sure we can get '(x + y + z).sin()' # instead of 'x + y + z.sin()' return '(' + self._print(expr) + ')' elif expr.is_number: return self._print(expr, _type=True) else: return self._print(expr) def _print_Function(self, expr): """ basic function for printing `Function` Function Style : 1. args[0].func(args[1:]), method with arguments 2. args[0].func(), method without arguments 3. args[1].func(), method without arguments (e.g. (e, x) => x.exp()) 4. func(args), function with arguments """ if expr.func.__name__ in self.known_functions: cond_func = self.known_functions[expr.func.__name__] func = None style = 1 if isinstance(cond_func, string_types): func = cond_func else: for cond, func, style in cond_func: if cond(*expr.args): break if func is not None: if style == 1: ret = "%(var)s.%(method)s(%(args)s)" % { 'var': self._print_caller_var(expr.args[0]), 'method': func, 'args': self.stringify(expr.args[1:], ", ") if len(expr.args) > 1 else '' } elif style == 2: ret = "%(var)s.%(method)s()" % { 'var': self._print_caller_var(expr.args[0]), 'method': func, } elif style == 3: ret = "%(var)s.%(method)s()" % { 'var': self._print_caller_var(expr.args[1]), 'method': func, } else: ret = "%(func)s(%(args)s)" % { 'func': func, 'args': self.stringify(expr.args, ", "), } return ret elif hasattr(expr, '_imp_') and isinstance(expr._imp_, Lambda): # inlined function return self._print(expr._imp_(*expr.args)) else: return self._print_not_supported(expr) def _print_Pow(self, expr): if expr.base.is_integer and not expr.exp.is_integer: expr = type(expr)(Float(expr.base), expr.exp) return self._print(expr) return self._print_Function(expr) def _print_Float(self, expr, _type=False): ret = super(RustCodePrinter, self)._print_Float(expr) if _type: return ret + '_f64' else: return ret def _print_Integer(self, expr, _type=False): ret = super(RustCodePrinter, self)._print_Integer(expr) if _type: return ret + '_i32' else: return ret def _print_Rational(self, expr): p, q = int(expr.p), int(expr.q) return '%d_f64/%d.0' % (p, q) def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_Indexed(self, expr): # calculate index for 1d array dims = expr.shape elem = S.Zero offset = S.One for i in reversed(range(expr.rank)): elem += expr.indices[i]*offset offset *= dims[i] return "%s[%s]" % (self._print(expr.base.label), self._print(elem)) def _print_Idx(self, expr): return expr.label.name def _print_Dummy(self, expr): return expr.name def _print_Exp1(self, expr, _type=False): return "E" def _print_Pi(self, expr, _type=False): return 'PI' def _print_Infinity(self, expr, _type=False): return 'INFINITY' def _print_NegativeInfinity(self, expr, _type=False): return 'NEG_INFINITY' def _print_BooleanTrue(self, expr, _type=False): return "true" def _print_BooleanFalse(self, expr, _type=False): return "false" def _print_bool(self, expr, _type=False): return str(expr).lower() def _print_NaN(self, expr, _type=False): return "NAN" def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s) {" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines[-1] += " else {" else: lines[-1] += " else if (%s) {" % self._print(c) code0 = self._print(e) lines.append(code0) lines.append("}") if self._settings['inline']: return " ".join(lines) else: return "\n".join(lines) def _print_ITE(self, expr): from sympy.functions import Piecewise _piecewise = Piecewise((expr.args[1], expr.args[0]), (expr.args[2], True)) return self._print(_piecewise) def _print_Matrix(self, expr): return "%s[%s]" % (expr.parent, expr.j + expr.i*expr.parent.shape[1]) def _print_MatrixBase(self, A): if A.cols == 1: return "[%s]" % ", ".join(self._print(a) for a in A) else: raise ValueError("Full Matrix Support in Rust need Crates (https://crates.io/keywords/matrix).") def _print_MatrixElement(self, expr): return "%s[%s]" % (expr.parent, expr.j + expr.i*expr.parent.shape[1]) # FIXME: Str/CodePrinter could define each of these to call the _print # method from higher up the class hierarchy (see _print_NumberSymbol). # Then subclasses like us would not need to repeat all this. _print_Matrix = \ _print_MatrixElement = \ _print_DenseMatrix = \ _print_MutableDenseMatrix = \ _print_ImmutableMatrix = \ _print_ImmutableDenseMatrix = \ _print_MatrixBase def _print_Symbol(self, expr): name = super(RustCodePrinter, self)._print_Symbol(expr) if expr in self._dereference: return '(*%s)' % name else: return name def _print_Assignment(self, expr): from sympy.tensor.indexed import IndexedBase lhs = expr.lhs rhs = expr.rhs if self._settings["contract"] and (lhs.has(IndexedBase) or rhs.has(IndexedBase)): # Here we check if there is looping to be done, and if so # print the required loops. return self._doprint_loops(rhs, lhs) else: lhs_code = self._print(lhs) rhs_code = self._print(rhs) return self._get_statement("%s = %s" % (lhs_code, rhs_code)) def indent_code(self, code): """Accepts a string of code or a list of code lines""" if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_token = ('{', '(', '{\n', '(\n') dec_token = ('}', ')') code = [ line.lstrip(' \t') for line in code ] increase = [ int(any(map(line.endswith, inc_token))) for line in code ] decrease = [ int(any(map(line.startswith, dec_token))) for line in code ] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tab*level, line)) level += increase[n] return pretty def rust_code(expr, assign_to=None, **settings): """Converts an expr to a string of Rust code Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of line-wrapping, or for expressions that generate multi-line statements. precision : integer, optional The precision for numbers such as pi [default=15]. user_functions : dict, optional A dictionary where the keys are string representations of either ``FunctionClass`` or ``UndefinedFunction`` instances and the values are their desired C string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. See below for examples. dereference : iterable, optional An iterable of symbols that should be dereferenced in the printed code expression. These would be values passed by address to the function. For example, if ``dereference=[a]``, the resulting code would print ``(*a)`` instead of ``a``. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. Examples ======== >>> from sympy import rust_code, symbols, Rational, sin, ceiling, Abs, Function >>> x, tau = symbols("x, tau") >>> rust_code((2*tau)**Rational(7, 2)) '8*1.4142135623731*tau.powf(7_f64/2.0)' >>> rust_code(sin(x), assign_to="s") 's = x.sin();' Simple custom printing can be defined for certain types by passing a dictionary of {"type" : "function"} to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. >>> custom_functions = { ... "ceiling": "CEIL", ... "Abs": [(lambda x: not x.is_integer, "fabs", 4), ... (lambda x: x.is_integer, "ABS", 4)], ... "func": "f" ... } >>> func = Function('func') >>> rust_code(func(Abs(x) + ceiling(x)), user_functions=custom_functions) '(fabs(x) + x.CEIL()).f()' ``Piecewise`` expressions are converted into conditionals. If an ``assign_to`` variable is provided an if statement is created, otherwise the ternary operator is used. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> expr = Piecewise((x + 1, x > 0), (x, True)) >>> print(rust_code(expr, tau)) tau = if (x > 0) { x + 1 } else { x }; Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> rust_code(e.rhs, assign_to=e.lhs, contract=False) 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions must be provided to ``assign_to``. Note that any expression that can be generated normally can also exist inside a Matrix: >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) >>> A = MatrixSymbol('A', 3, 1) >>> print(rust_code(mat, A)) A = [x.powi(2), if (x > 0) { x + 1 } else { x }, x.sin()]; """ return RustCodePrinter(settings).doprint(expr, assign_to) def print_rust_code(expr, **settings): """Prints Rust representation of the given expression.""" print(rust_code(expr, **settings))

6b75f7b8c2ced98a056d4dd475c078b9d94cce98d535771ee704aa9257027f11

""" A Printer which converts an expression into its LaTeX equivalent. """ from __future__ import print_function, division import itertools from sympy.core import S, Add, Symbol, Mod from sympy.core.alphabets import greeks from sympy.core.containers import Tuple from sympy.core.function import _coeff_isneg, AppliedUndef, Derivative from sympy.core.operations import AssocOp from sympy.core.sympify import SympifyError from sympy.logic.boolalg import true # sympy.printing imports from sympy.printing.precedence import precedence_traditional from sympy.printing.printer import Printer from sympy.printing.conventions import split_super_sub, requires_partial from sympy.printing.precedence import precedence, PRECEDENCE import mpmath.libmp as mlib from mpmath.libmp import prec_to_dps from sympy.core.compatibility import default_sort_key, range from sympy.utilities.iterables import has_variety import re # Hand-picked functions which can be used directly in both LaTeX and MathJax # Complete list at # https://docs.mathjax.org/en/latest/tex.html#supported-latex-commands # This variable only contains those functions which sympy uses. accepted_latex_functions = ['arcsin', 'arccos', 'arctan', 'sin', 'cos', 'tan', 'sinh', 'cosh', 'tanh', 'sqrt', 'ln', 'log', 'sec', 'csc', 'cot', 'coth', 're', 'im', 'frac', 'root', 'arg', ] tex_greek_dictionary = { 'Alpha': 'A', 'Beta': 'B', 'Gamma': r'\Gamma', 'Delta': r'\Delta', 'Epsilon': 'E', 'Zeta': 'Z', 'Eta': 'H', 'Theta': r'\Theta', 'Iota': 'I', 'Kappa': 'K', 'Lambda': r'\Lambda', 'Mu': 'M', 'Nu': 'N', 'Xi': r'\Xi', 'omicron': 'o', 'Omicron': 'O', 'Pi': r'\Pi', 'Rho': 'P', 'Sigma': r'\Sigma', 'Tau': 'T', 'Upsilon': r'\Upsilon', 'Phi': r'\Phi', 'Chi': 'X', 'Psi': r'\Psi', 'Omega': r'\Omega', 'lamda': r'\lambda', 'Lamda': r'\Lambda', 'khi': r'\chi', 'Khi': r'X', 'varepsilon': r'\varepsilon', 'varkappa': r'\varkappa', 'varphi': r'\varphi', 'varpi': r'\varpi', 'varrho': r'\varrho', 'varsigma': r'\varsigma', 'vartheta': r'\vartheta', } other_symbols = set(['aleph', 'beth', 'daleth', 'gimel', 'ell', 'eth', 'hbar', 'hslash', 'mho', 'wp', ]) # Variable name modifiers modifier_dict = { # Accents 'mathring': lambda s: r'\mathring{'+s+r'}', 'ddddot': lambda s: r'\ddddot{'+s+r'}', 'dddot': lambda s: r'\dddot{'+s+r'}', 'ddot': lambda s: r'\ddot{'+s+r'}', 'dot': lambda s: r'\dot{'+s+r'}', 'check': lambda s: r'\check{'+s+r'}', 'breve': lambda s: r'\breve{'+s+r'}', 'acute': lambda s: r'\acute{'+s+r'}', 'grave': lambda s: r'\grave{'+s+r'}', 'tilde': lambda s: r'\tilde{'+s+r'}', 'hat': lambda s: r'\hat{'+s+r'}', 'bar': lambda s: r'\bar{'+s+r'}', 'vec': lambda s: r'\vec{'+s+r'}', 'prime': lambda s: "{"+s+"}'", 'prm': lambda s: "{"+s+"}'", # Faces 'bold': lambda s: r'\boldsymbol{'+s+r'}', 'bm': lambda s: r'\boldsymbol{'+s+r'}', 'cal': lambda s: r'\mathcal{'+s+r'}', 'scr': lambda s: r'\mathscr{'+s+r'}', 'frak': lambda s: r'\mathfrak{'+s+r'}', # Brackets 'norm': lambda s: r'\left\|{'+s+r'}\right\|', 'avg': lambda s: r'\left\langle{'+s+r'}\right\rangle', 'abs': lambda s: r'\left|{'+s+r'}\right|', 'mag': lambda s: r'\left|{'+s+r'}\right|', } greek_letters_set = frozenset(greeks) _between_two_numbers_p = ( re.compile(r'[0-9][} ]*$'), # search re.compile(r'[{ ]*[-+0-9]'), # match ) class LatexPrinter(Printer): printmethod = "_latex" _default_settings = { "fold_frac_powers": False, "fold_func_brackets": False, "fold_short_frac": None, "inv_trig_style": "abbreviated", "itex": False, "ln_notation": False, "long_frac_ratio": None, "mat_delim": "[", "mat_str": None, "mode": "plain", "mul_symbol": None, "order": None, "symbol_names": {}, "root_notation": True, "mat_symbol_style": "plain", "imaginary_unit": "i", "gothic_re_im": False, "decimal_separator": "period", } def __init__(self, settings=None): Printer.__init__(self, settings) if 'mode' in self._settings: valid_modes = ['inline', 'plain', 'equation', 'equation*'] if self._settings['mode'] not in valid_modes: raise ValueError("'mode' must be one of 'inline', 'plain', " "'equation' or 'equation*'") if self._settings['fold_short_frac'] is None and \ self._settings['mode'] == 'inline': self._settings['fold_short_frac'] = True mul_symbol_table = { None: r" ", "ldot": r" \,.\, ", "dot": r" \cdot ", "times": r" \times " } try: self._settings['mul_symbol_latex'] = \ mul_symbol_table[self._settings['mul_symbol']] except KeyError: self._settings['mul_symbol_latex'] = \ self._settings['mul_symbol'] try: self._settings['mul_symbol_latex_numbers'] = \ mul_symbol_table[self._settings['mul_symbol'] or 'dot'] except KeyError: if (self._settings['mul_symbol'].strip() in ['', ' ', '\\', '\\,', '\\:', '\\;', '\\quad']): self._settings['mul_symbol_latex_numbers'] = \ mul_symbol_table['dot'] else: self._settings['mul_symbol_latex_numbers'] = \ self._settings['mul_symbol'] self._delim_dict = {'(': ')', '[': ']'} imaginary_unit_table = { None: r"i", "i": r"i", "ri": r"\mathrm{i}", "ti": r"\text{i}", "j": r"j", "rj": r"\mathrm{j}", "tj": r"\text{j}", } try: self._settings['imaginary_unit_latex'] = \ imaginary_unit_table[self._settings['imaginary_unit']] except KeyError: self._settings['imaginary_unit_latex'] = \ self._settings['imaginary_unit'] def parenthesize(self, item, level, strict=False): prec_val = precedence_traditional(item) if (prec_val < level) or ((not strict) and prec_val <= level): return r"\left({}\right)".format(self._print(item)) else: return self._print(item) def parenthesize_super(self, s): """ Parenthesize s if there is a superscript in s""" if "^" in s: return r"\left({}\right)".format(s) return s def embed_super(self, s): """ Embed s in {} if there is a superscript in s""" if "^" in s: return "{{{}}}".format(s) return s def doprint(self, expr): tex = Printer.doprint(self, expr) if self._settings['mode'] == 'plain': return tex elif self._settings['mode'] == 'inline': return r"$%s$" % tex elif self._settings['itex']: return r"$$%s$$" % tex else: env_str = self._settings['mode'] return r"\begin{%s}%s\end{%s}" % (env_str, tex, env_str) def _needs_brackets(self, expr): """ Returns True if the expression needs to be wrapped in brackets when printed, False otherwise. For example: a + b => True; a => False; 10 => False; -10 => True. """ return not ((expr.is_Integer and expr.is_nonnegative) or (expr.is_Atom and (expr is not S.NegativeOne and expr.is_Rational is False))) def _needs_function_brackets(self, expr): """ Returns True if the expression needs to be wrapped in brackets when passed as an argument to a function, False otherwise. This is a more liberal version of _needs_brackets, in that many expressions which need to be wrapped in brackets when added/subtracted/raised to a power do not need them when passed to a function. Such an example is a*b. """ if not self._needs_brackets(expr): return False else: # Muls of the form a*b*c... can be folded if expr.is_Mul and not self._mul_is_clean(expr): return True # Pows which don't need brackets can be folded elif expr.is_Pow and not self._pow_is_clean(expr): return True # Add and Function always need brackets elif expr.is_Add or expr.is_Function: return True else: return False def _needs_mul_brackets(self, expr, first=False, last=False): """ Returns True if the expression needs to be wrapped in brackets when printed as part of a Mul, False otherwise. This is True for Add, but also for some container objects that would not need brackets when appearing last in a Mul, e.g. an Integral. ``last=True`` specifies that this expr is the last to appear in a Mul. ``first=True`` specifies that this expr is the first to appear in a Mul. """ from sympy import Integral, Product, Sum if expr.is_Mul: if not first and _coeff_isneg(expr): return True elif precedence_traditional(expr) < PRECEDENCE["Mul"]: return True elif expr.is_Relational: return True if expr.is_Piecewise: return True if any([expr.has(x) for x in (Mod,)]): return True if (not last and any([expr.has(x) for x in (Integral, Product, Sum)])): return True return False def _needs_add_brackets(self, expr): """ Returns True if the expression needs to be wrapped in brackets when printed as part of an Add, False otherwise. This is False for most things. """ if expr.is_Relational: return True if any([expr.has(x) for x in (Mod,)]): return True if expr.is_Add: return True return False def _mul_is_clean(self, expr): for arg in expr.args: if arg.is_Function: return False return True def _pow_is_clean(self, expr): return not self._needs_brackets(expr.base) def _do_exponent(self, expr, exp): if exp is not None: return r"\left(%s\right)^{%s}" % (expr, exp) else: return expr def _print_Basic(self, expr): ls = [self._print(o) for o in expr.args] return self._deal_with_super_sub(expr.__class__.__name__) + \ r"\left(%s\right)" % ", ".join(ls) def _print_bool(self, e): return r"\text{%s}" % e _print_BooleanTrue = _print_bool _print_BooleanFalse = _print_bool def _print_NoneType(self, e): return r"\text{%s}" % e def _print_Add(self, expr, order=None): if self.order == 'none': terms = list(expr.args) else: terms = self._as_ordered_terms(expr, order=order) tex = "" for i, term in enumerate(terms): if i == 0: pass elif _coeff_isneg(term): tex += " - " term = -term else: tex += " + " term_tex = self._print(term) if self._needs_add_brackets(term): term_tex = r"\left(%s\right)" % term_tex tex += term_tex return tex def _print_Cycle(self, expr): from sympy.combinatorics.permutations import Permutation if expr.size == 0: return r"\left( \right)" expr = Permutation(expr) expr_perm = expr.cyclic_form siz = expr.size if expr.array_form[-1] == siz - 1: expr_perm = expr_perm + [[siz - 1]] term_tex = '' for i in expr_perm: term_tex += str(i).replace(',', r"\;") term_tex = term_tex.replace('[', r"\left( ") term_tex = term_tex.replace(']', r"\right)") return term_tex _print_Permutation = _print_Cycle def _print_Float(self, expr): # Based off of that in StrPrinter dps = prec_to_dps(expr._prec) str_real = mlib.to_str(expr._mpf_, dps, strip_zeros=True) # Must always have a mul symbol (as 2.5 10^{20} just looks odd) # thus we use the number separator separator = self._settings['mul_symbol_latex_numbers'] if 'e' in str_real: (mant, exp) = str_real.split('e') if exp[0] == '+': exp = exp[1:] if self._settings['decimal_separator'] == 'comma': mant = mant.replace('.','{,}') return r"%s%s10^{%s}" % (mant, separator, exp) elif str_real == "+inf": return r"\infty" elif str_real == "-inf": return r"- \infty" else: if self._settings['decimal_separator'] == 'comma': str_real = str_real.replace('.','{,}') return str_real def _print_Cross(self, expr): vec1 = expr._expr1 vec2 = expr._expr2 return r"%s \times %s" % (self.parenthesize(vec1, PRECEDENCE['Mul']), self.parenthesize(vec2, PRECEDENCE['Mul'])) def _print_Curl(self, expr): vec = expr._expr return r"\nabla\times %s" % self.parenthesize(vec, PRECEDENCE['Mul']) def _print_Divergence(self, expr): vec = expr._expr return r"\nabla\cdot %s" % self.parenthesize(vec, PRECEDENCE['Mul']) def _print_Dot(self, expr): vec1 = expr._expr1 vec2 = expr._expr2 return r"%s \cdot %s" % (self.parenthesize(vec1, PRECEDENCE['Mul']), self.parenthesize(vec2, PRECEDENCE['Mul'])) def _print_Gradient(self, expr): func = expr._expr return r"\nabla %s" % self.parenthesize(func, PRECEDENCE['Mul']) def _print_Laplacian(self, expr): func = expr._expr return r"\triangle %s" % self.parenthesize(func, PRECEDENCE['Mul']) def _print_Mul(self, expr): from sympy.core.power import Pow from sympy.physics.units import Quantity include_parens = False if _coeff_isneg(expr): expr = -expr tex = "- " if expr.is_Add: tex += "(" include_parens = True else: tex = "" from sympy.simplify import fraction numer, denom = fraction(expr, exact=True) separator = self._settings['mul_symbol_latex'] numbersep = self._settings['mul_symbol_latex_numbers'] def convert(expr): if not expr.is_Mul: return str(self._print(expr)) else: _tex = last_term_tex = "" if self.order not in ('old', 'none'): args = expr.as_ordered_factors() else: args = list(expr.args) # If quantities are present append them at the back args = sorted(args, key=lambda x: isinstance(x, Quantity) or (isinstance(x, Pow) and isinstance(x.base, Quantity))) for i, term in enumerate(args): term_tex = self._print(term) if self._needs_mul_brackets(term, first=(i == 0), last=(i == len(args) - 1)): term_tex = r"\left(%s\right)" % term_tex if _between_two_numbers_p[0].search(last_term_tex) and \ _between_two_numbers_p[1].match(term_tex): # between two numbers _tex += numbersep elif _tex: _tex += separator _tex += term_tex last_term_tex = term_tex return _tex if denom is S.One and Pow(1, -1, evaluate=False) not in expr.args: # use the original expression here, since fraction() may have # altered it when producing numer and denom tex += convert(expr) else: snumer = convert(numer) sdenom = convert(denom) ldenom = len(sdenom.split()) ratio = self._settings['long_frac_ratio'] if self._settings['fold_short_frac'] and ldenom <= 2 and \ "^" not in sdenom: # handle short fractions if self._needs_mul_brackets(numer, last=False): tex += r"\left(%s\right) / %s" % (snumer, sdenom) else: tex += r"%s / %s" % (snumer, sdenom) elif ratio is not None and \ len(snumer.split()) > ratio*ldenom: # handle long fractions if self._needs_mul_brackets(numer, last=True): tex += r"\frac{1}{%s}%s\left(%s\right)" \ % (sdenom, separator, snumer) elif numer.is_Mul: # split a long numerator a = S.One b = S.One for x in numer.args: if self._needs_mul_brackets(x, last=False) or \ len(convert(a*x).split()) > ratio*ldenom or \ (b.is_commutative is x.is_commutative is False): b *= x else: a *= x if self._needs_mul_brackets(b, last=True): tex += r"\frac{%s}{%s}%s\left(%s\right)" \ % (convert(a), sdenom, separator, convert(b)) else: tex += r"\frac{%s}{%s}%s%s" \ % (convert(a), sdenom, separator, convert(b)) else: tex += r"\frac{1}{%s}%s%s" % (sdenom, separator, snumer) else: tex += r"\frac{%s}{%s}" % (snumer, sdenom) if include_parens: tex += ")" return tex def _print_Pow(self, expr): # Treat x**Rational(1,n) as special case if expr.exp.is_Rational and abs(expr.exp.p) == 1 and expr.exp.q != 1 \ and self._settings['root_notation']: base = self._print(expr.base) expq = expr.exp.q if expq == 2: tex = r"\sqrt{%s}" % base elif self._settings['itex']: tex = r"\root{%d}{%s}" % (expq, base) else: tex = r"\sqrt[%d]{%s}" % (expq, base) if expr.exp.is_negative: return r"\frac{1}{%s}" % tex else: return tex elif self._settings['fold_frac_powers'] \ and expr.exp.is_Rational \ and expr.exp.q != 1: base = self.parenthesize(expr.base, PRECEDENCE['Pow']) p, q = expr.exp.p, expr.exp.q # issue #12886: add parentheses for superscripts raised to powers if '^' in base and expr.base.is_Symbol: base = r"\left(%s\right)" % base if expr.base.is_Function: return self._print(expr.base, exp="%s/%s" % (p, q)) return r"%s^{%s/%s}" % (base, p, q) elif expr.exp.is_Rational and expr.exp.is_negative and \ expr.base.is_commutative: # special case for 1^(-x), issue 9216 if expr.base == 1: return r"%s^{%s}" % (expr.base, expr.exp) # things like 1/x return self._print_Mul(expr) else: if expr.base.is_Function: return self._print(expr.base, exp=self._print(expr.exp)) else: tex = r"%s^{%s}" return self._helper_print_standard_power(expr, tex) def _helper_print_standard_power(self, expr, template): exp = self._print(expr.exp) # issue #12886: add parentheses around superscripts raised # to powers base = self.parenthesize(expr.base, PRECEDENCE['Pow']) if '^' in base and expr.base.is_Symbol: base = r"\left(%s\right)" % base elif (isinstance(expr.base, Derivative) and base.startswith(r'\left(') and re.match(r'\\left\(\\d?d?dot', base) and base.endswith(r'\right)')): # don't use parentheses around dotted derivative base = base[6: -7] # remove outermost added parens return template % (base, exp) def _print_UnevaluatedExpr(self, expr): return self._print(expr.args[0]) def _print_Sum(self, expr): if len(expr.limits) == 1: tex = r"\sum_{%s=%s}^{%s} " % \ tuple([self._print(i) for i in expr.limits[0]]) else: def _format_ineq(l): return r"%s \leq %s \leq %s" % \ tuple([self._print(s) for s in (l[1], l[0], l[2])]) tex = r"\sum_{\substack{%s}} " % \ str.join('\\\\', [_format_ineq(l) for l in expr.limits]) if isinstance(expr.function, Add): tex += r"\left(%s\right)" % self._print(expr.function) else: tex += self._print(expr.function) return tex def _print_Product(self, expr): if len(expr.limits) == 1: tex = r"\prod_{%s=%s}^{%s} " % \ tuple([self._print(i) for i in expr.limits[0]]) else: def _format_ineq(l): return r"%s \leq %s \leq %s" % \ tuple([self._print(s) for s in (l[1], l[0], l[2])]) tex = r"\prod_{\substack{%s}} " % \ str.join('\\\\', [_format_ineq(l) for l in expr.limits]) if isinstance(expr.function, Add): tex += r"\left(%s\right)" % self._print(expr.function) else: tex += self._print(expr.function) return tex def _print_BasisDependent(self, expr): from sympy.vector import Vector o1 = [] if expr == expr.zero: return expr.zero._latex_form if isinstance(expr, Vector): items = expr.separate().items() else: items = [(0, expr)] for system, vect in items: inneritems = list(vect.components.items()) inneritems.sort(key=lambda x: x[0].__str__()) for k, v in inneritems: if v == 1: o1.append(' + ' + k._latex_form) elif v == -1: o1.append(' - ' + k._latex_form) else: arg_str = '(' + LatexPrinter().doprint(v) + ')' o1.append(' + ' + arg_str + k._latex_form) outstr = (''.join(o1)) if outstr[1] != '-': outstr = outstr[3:] else: outstr = outstr[1:] return outstr def _print_Indexed(self, expr): tex_base = self._print(expr.base) tex = '{'+tex_base+'}'+'_{%s}' % ','.join( map(self._print, expr.indices)) return tex def _print_IndexedBase(self, expr): return self._print(expr.label) def _print_Derivative(self, expr): if requires_partial(expr): diff_symbol = r'\partial' else: diff_symbol = r'd' tex = "" dim = 0 for x, num in reversed(expr.variable_count): dim += num if num == 1: tex += r"%s %s" % (diff_symbol, self._print(x)) else: tex += r"%s %s^{%s}" % (diff_symbol, self.parenthesize_super(self._print(x)), self._print(num)) if dim == 1: tex = r"\frac{%s}{%s}" % (diff_symbol, tex) else: tex = r"\frac{%s^{%s}}{%s}" % (diff_symbol, self._print(dim), tex) return r"%s %s" % (tex, self.parenthesize(expr.expr, PRECEDENCE["Mul"], strict=True)) def _print_Subs(self, subs): expr, old, new = subs.args latex_expr = self._print(expr) latex_old = (self._print(e) for e in old) latex_new = (self._print(e) for e in new) latex_subs = r'\\ '.join( e[0] + '=' + e[1] for e in zip(latex_old, latex_new)) return r'\left. %s \right|_{\substack{ %s }}' % (latex_expr, latex_subs) def _print_Integral(self, expr): tex, symbols = "", [] # Only up to \iiiint exists if len(expr.limits) <= 4 and all(len(lim) == 1 for lim in expr.limits): # Use len(expr.limits)-1 so that syntax highlighters don't think # \" is an escaped quote tex = r"\i" + "i"*(len(expr.limits) - 1) + "nt" symbols = [r"\, d%s" % self._print(symbol[0]) for symbol in expr.limits] else: for lim in reversed(expr.limits): symbol = lim[0] tex += r"\int" if len(lim) > 1: if self._settings['mode'] != 'inline' \ and not self._settings['itex']: tex += r"\limits" if len(lim) == 3: tex += "_{%s}^{%s}" % (self._print(lim[1]), self._print(lim[2])) if len(lim) == 2: tex += "^{%s}" % (self._print(lim[1])) symbols.insert(0, r"\, d%s" % self._print(symbol)) return r"%s %s%s" % (tex, self.parenthesize(expr.function, PRECEDENCE["Mul"], strict=True), "".join(symbols)) def _print_Limit(self, expr): e, z, z0, dir = expr.args tex = r"\lim_{%s \to " % self._print(z) if str(dir) == '+-' or z0 in (S.Infinity, S.NegativeInfinity): tex += r"%s}" % self._print(z0) else: tex += r"%s^%s}" % (self._print(z0), self._print(dir)) if isinstance(e, AssocOp): return r"%s\left(%s\right)" % (tex, self._print(e)) else: return r"%s %s" % (tex, self._print(e)) def _hprint_Function(self, func): r''' Logic to decide how to render a function to latex - if it is a recognized latex name, use the appropriate latex command - if it is a single letter, just use that letter - if it is a longer name, then put \operatorname{} around it and be mindful of undercores in the name ''' func = self._deal_with_super_sub(func) if func in accepted_latex_functions: name = r"\%s" % func elif len(func) == 1 or func.startswith('\\'): name = func else: name = r"\operatorname{%s}" % func return name def _print_Function(self, expr, exp=None): r''' Render functions to LaTeX, handling functions that LaTeX knows about e.g., sin, cos, ... by using the proper LaTeX command (\sin, \cos, ...). For single-letter function names, render them as regular LaTeX math symbols. For multi-letter function names that LaTeX does not know about, (e.g., Li, sech) use \operatorname{} so that the function name is rendered in Roman font and LaTeX handles spacing properly. expr is the expression involving the function exp is an exponent ''' func = expr.func.__name__ if hasattr(self, '_print_' + func) and \ not isinstance(expr, AppliedUndef): return getattr(self, '_print_' + func)(expr, exp) else: args = [str(self._print(arg)) for arg in expr.args] # How inverse trig functions should be displayed, formats are: # abbreviated: asin, full: arcsin, power: sin^-1 inv_trig_style = self._settings['inv_trig_style'] # If we are dealing with a power-style inverse trig function inv_trig_power_case = False # If it is applicable to fold the argument brackets can_fold_brackets = self._settings['fold_func_brackets'] and \ len(args) == 1 and \ not self._needs_function_brackets(expr.args[0]) inv_trig_table = ["asin", "acos", "atan", "acsc", "asec", "acot"] # If the function is an inverse trig function, handle the style if func in inv_trig_table: if inv_trig_style == "abbreviated": pass elif inv_trig_style == "full": func = "arc" + func[1:] elif inv_trig_style == "power": func = func[1:] inv_trig_power_case = True # Can never fold brackets if we're raised to a power if exp is not None: can_fold_brackets = False if inv_trig_power_case: if func in accepted_latex_functions: name = r"\%s^{-1}" % func else: name = r"\operatorname{%s}^{-1}" % func elif exp is not None: name = r'%s^{%s}' % (self._hprint_Function(func), exp) else: name = self._hprint_Function(func) if can_fold_brackets: if func in accepted_latex_functions: # Wrap argument safely to avoid parse-time conflicts # with the function name itself name += r" {%s}" else: name += r"%s" else: name += r"{\left(%s \right)}" if inv_trig_power_case and exp is not None: name += r"^{%s}" % exp return name % ",".join(args) def _print_UndefinedFunction(self, expr): return self._hprint_Function(str(expr)) def _print_ElementwiseApplyFunction(self, expr): return r"%s\left({%s}\ldots\right)" % ( self._print(expr.function), self._print(expr.expr), ) @property def _special_function_classes(self): from sympy.functions.special.tensor_functions import KroneckerDelta from sympy.functions.special.gamma_functions import gamma, lowergamma from sympy.functions.special.beta_functions import beta from sympy.functions.special.delta_functions import DiracDelta from sympy.functions.special.error_functions import Chi return {KroneckerDelta: r'\delta', gamma: r'\Gamma', lowergamma: r'\gamma', beta: r'\operatorname{B}', DiracDelta: r'\delta', Chi: r'\operatorname{Chi}'} def _print_FunctionClass(self, expr): for cls in self._special_function_classes: if issubclass(expr, cls) and expr.__name__ == cls.__name__: return self._special_function_classes[cls] return self._hprint_Function(str(expr)) def _print_Lambda(self, expr): symbols, expr = expr.args if len(symbols) == 1: symbols = self._print(symbols[0]) else: symbols = self._print(tuple(symbols)) tex = r"\left( %s \mapsto %s \right)" % (symbols, self._print(expr)) return tex def _hprint_variadic_function(self, expr, exp=None): args = sorted(expr.args, key=default_sort_key) texargs = [r"%s" % self._print(symbol) for symbol in args] tex = r"\%s\left(%s\right)" % (self._print((str(expr.func)).lower()), ", ".join(texargs)) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex _print_Min = _print_Max = _hprint_variadic_function def _print_floor(self, expr, exp=None): tex = r"\left\lfloor{%s}\right\rfloor" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_ceiling(self, expr, exp=None): tex = r"\left\lceil{%s}\right\rceil" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_log(self, expr, exp=None): if not self._settings["ln_notation"]: tex = r"\log{\left(%s \right)}" % self._print(expr.args[0]) else: tex = r"\ln{\left(%s \right)}" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_Abs(self, expr, exp=None): tex = r"\left|{%s}\right|" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex _print_Determinant = _print_Abs def _print_re(self, expr, exp=None): if self._settings['gothic_re_im']: tex = r"\Re{%s}" % self.parenthesize(expr.args[0], PRECEDENCE['Atom']) else: tex = r"\operatorname{{re}}{{{}}}".format(self.parenthesize(expr.args[0], PRECEDENCE['Atom'])) return self._do_exponent(tex, exp) def _print_im(self, expr, exp=None): if self._settings['gothic_re_im']: tex = r"\Im{%s}" % self.parenthesize(expr.args[0], PRECEDENCE['Atom']) else: tex = r"\operatorname{{im}}{{{}}}".format(self.parenthesize(expr.args[0], PRECEDENCE['Atom'])) return self._do_exponent(tex, exp) def _print_Not(self, e): from sympy import Equivalent, Implies if isinstance(e.args[0], Equivalent): return self._print_Equivalent(e.args[0], r"\not\Leftrightarrow") if isinstance(e.args[0], Implies): return self._print_Implies(e.args[0], r"\not\Rightarrow") if (e.args[0].is_Boolean): return r"\neg \left(%s\right)" % self._print(e.args[0]) else: return r"\neg %s" % self._print(e.args[0]) def _print_LogOp(self, args, char): arg = args[0] if arg.is_Boolean and not arg.is_Not: tex = r"\left(%s\right)" % self._print(arg) else: tex = r"%s" % self._print(arg) for arg in args[1:]: if arg.is_Boolean and not arg.is_Not: tex += r" %s \left(%s\right)" % (char, self._print(arg)) else: tex += r" %s %s" % (char, self._print(arg)) return tex def _print_And(self, e): args = sorted(e.args, key=default_sort_key) return self._print_LogOp(args, r"\wedge") def _print_Or(self, e): args = sorted(e.args, key=default_sort_key) return self._print_LogOp(args, r"\vee") def _print_Xor(self, e): args = sorted(e.args, key=default_sort_key) return self._print_LogOp(args, r"\veebar") def _print_Implies(self, e, altchar=None): return self._print_LogOp(e.args, altchar or r"\Rightarrow") def _print_Equivalent(self, e, altchar=None): args = sorted(e.args, key=default_sort_key) return self._print_LogOp(args, altchar or r"\Leftrightarrow") def _print_conjugate(self, expr, exp=None): tex = r"\overline{%s}" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_polar_lift(self, expr, exp=None): func = r"\operatorname{polar\_lift}" arg = r"{\left(%s \right)}" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}%s" % (func, exp, arg) else: return r"%s%s" % (func, arg) def _print_ExpBase(self, expr, exp=None): # TODO should exp_polar be printed differently? # what about exp_polar(0), exp_polar(1)? tex = r"e^{%s}" % self._print(expr.args[0]) return self._do_exponent(tex, exp) def _print_elliptic_k(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"K^{%s}%s" % (exp, tex) else: return r"K%s" % tex def _print_elliptic_f(self, expr, exp=None): tex = r"\left(%s\middle| %s\right)" % \ (self._print(expr.args[0]), self._print(expr.args[1])) if exp is not None: return r"F^{%s}%s" % (exp, tex) else: return r"F%s" % tex def _print_elliptic_e(self, expr, exp=None): if len(expr.args) == 2: tex = r"\left(%s\middle| %s\right)" % \ (self._print(expr.args[0]), self._print(expr.args[1])) else: tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"E^{%s}%s" % (exp, tex) else: return r"E%s" % tex def _print_elliptic_pi(self, expr, exp=None): if len(expr.args) == 3: tex = r"\left(%s; %s\middle| %s\right)" % \ (self._print(expr.args[0]), self._print(expr.args[1]), self._print(expr.args[2])) else: tex = r"\left(%s\middle| %s\right)" % \ (self._print(expr.args[0]), self._print(expr.args[1])) if exp is not None: return r"\Pi^{%s}%s" % (exp, tex) else: return r"\Pi%s" % tex def _print_beta(self, expr, exp=None): tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]), self._print(expr.args[1])) if exp is not None: return r"\operatorname{B}^{%s}%s" % (exp, tex) else: return r"\operatorname{B}%s" % tex def _print_uppergamma(self, expr, exp=None): tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]), self._print(expr.args[1])) if exp is not None: return r"\Gamma^{%s}%s" % (exp, tex) else: return r"\Gamma%s" % tex def _print_lowergamma(self, expr, exp=None): tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]), self._print(expr.args[1])) if exp is not None: return r"\gamma^{%s}%s" % (exp, tex) else: return r"\gamma%s" % tex def _hprint_one_arg_func(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}%s" % (self._print(expr.func), exp, tex) else: return r"%s%s" % (self._print(expr.func), tex) _print_gamma = _hprint_one_arg_func def _print_Chi(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"\operatorname{Chi}^{%s}%s" % (exp, tex) else: return r"\operatorname{Chi}%s" % tex def _print_expint(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[1]) nu = self._print(expr.args[0]) if exp is not None: return r"\operatorname{E}_{%s}^{%s}%s" % (nu, exp, tex) else: return r"\operatorname{E}_{%s}%s" % (nu, tex) def _print_fresnels(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"S^{%s}%s" % (exp, tex) else: return r"S%s" % tex def _print_fresnelc(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"C^{%s}%s" % (exp, tex) else: return r"C%s" % tex def _print_subfactorial(self, expr, exp=None): tex = r"!%s" % self.parenthesize(expr.args[0], PRECEDENCE["Func"]) if exp is not None: return r"\left(%s\right)^{%s}" % (tex, exp) else: return tex def _print_factorial(self, expr, exp=None): tex = r"%s!" % self.parenthesize(expr.args[0], PRECEDENCE["Func"]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_factorial2(self, expr, exp=None): tex = r"%s!!" % self.parenthesize(expr.args[0], PRECEDENCE["Func"]) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_binomial(self, expr, exp=None): tex = r"{\binom{%s}{%s}}" % (self._print(expr.args[0]), self._print(expr.args[1])) if exp is not None: return r"%s^{%s}" % (tex, exp) else: return tex def _print_RisingFactorial(self, expr, exp=None): n, k = expr.args base = r"%s" % self.parenthesize(n, PRECEDENCE['Func']) tex = r"{%s}^{\left(%s\right)}" % (base, self._print(k)) return self._do_exponent(tex, exp) def _print_FallingFactorial(self, expr, exp=None): n, k = expr.args sub = r"%s" % self.parenthesize(k, PRECEDENCE['Func']) tex = r"{\left(%s\right)}_{%s}" % (self._print(n), sub) return self._do_exponent(tex, exp) def _hprint_BesselBase(self, expr, exp, sym): tex = r"%s" % (sym) need_exp = False if exp is not None: if tex.find('^') == -1: tex = r"%s^{%s}" % (tex, self._print(exp)) else: need_exp = True tex = r"%s_{%s}\left(%s\right)" % (tex, self._print(expr.order), self._print(expr.argument)) if need_exp: tex = self._do_exponent(tex, exp) return tex def _hprint_vec(self, vec): if not vec: return "" s = "" for i in vec[:-1]: s += "%s, " % self._print(i) s += self._print(vec[-1]) return s def _print_besselj(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'J') def _print_besseli(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'I') def _print_besselk(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'K') def _print_bessely(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'Y') def _print_yn(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'y') def _print_jn(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'j') def _print_hankel1(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'H^{(1)}') def _print_hankel2(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'H^{(2)}') def _print_hn1(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'h^{(1)}') def _print_hn2(self, expr, exp=None): return self._hprint_BesselBase(expr, exp, 'h^{(2)}') def _hprint_airy(self, expr, exp=None, notation=""): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"%s^{%s}%s" % (notation, exp, tex) else: return r"%s%s" % (notation, tex) def _hprint_airy_prime(self, expr, exp=None, notation=""): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"{%s^\prime}^{%s}%s" % (notation, exp, tex) else: return r"%s^\prime%s" % (notation, tex) def _print_airyai(self, expr, exp=None): return self._hprint_airy(expr, exp, 'Ai') def _print_airybi(self, expr, exp=None): return self._hprint_airy(expr, exp, 'Bi') def _print_airyaiprime(self, expr, exp=None): return self._hprint_airy_prime(expr, exp, 'Ai') def _print_airybiprime(self, expr, exp=None): return self._hprint_airy_prime(expr, exp, 'Bi') def _print_hyper(self, expr, exp=None): tex = r"{{}_{%s}F_{%s}\left(\begin{matrix} %s \\ %s \end{matrix}" \ r"\middle| {%s} \right)}" % \ (self._print(len(expr.ap)), self._print(len(expr.bq)), self._hprint_vec(expr.ap), self._hprint_vec(expr.bq), self._print(expr.argument)) if exp is not None: tex = r"{%s}^{%s}" % (tex, self._print(exp)) return tex def _print_meijerg(self, expr, exp=None): tex = r"{G_{%s, %s}^{%s, %s}\left(\begin{matrix} %s & %s \\" \ r"%s & %s \end{matrix} \middle| {%s} \right)}" % \ (self._print(len(expr.ap)), self._print(len(expr.bq)), self._print(len(expr.bm)), self._print(len(expr.an)), self._hprint_vec(expr.an), self._hprint_vec(expr.aother), self._hprint_vec(expr.bm), self._hprint_vec(expr.bother), self._print(expr.argument)) if exp is not None: tex = r"{%s}^{%s}" % (tex, self._print(exp)) return tex def _print_dirichlet_eta(self, expr, exp=None): tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"\eta^{%s}%s" % (self._print(exp), tex) return r"\eta%s" % tex def _print_zeta(self, expr, exp=None): if len(expr.args) == 2: tex = r"\left(%s, %s\right)" % tuple(map(self._print, expr.args)) else: tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"\zeta^{%s}%s" % (self._print(exp), tex) return r"\zeta%s" % tex def _print_stieltjes(self, expr, exp=None): if len(expr.args) == 2: tex = r"_{%s}\left(%s\right)" % tuple(map(self._print, expr.args)) else: tex = r"_{%s}" % self._print(expr.args[0]) if exp is not None: return r"\gamma%s^{%s}" % (tex, self._print(exp)) return r"\gamma%s" % tex def _print_lerchphi(self, expr, exp=None): tex = r"\left(%s, %s, %s\right)" % tuple(map(self._print, expr.args)) if exp is None: return r"\Phi%s" % tex return r"\Phi^{%s}%s" % (self._print(exp), tex) def _print_polylog(self, expr, exp=None): s, z = map(self._print, expr.args) tex = r"\left(%s\right)" % z if exp is None: return r"\operatorname{Li}_{%s}%s" % (s, tex) return r"\operatorname{Li}_{%s}^{%s}%s" % (s, self._print(exp), tex) def _print_jacobi(self, expr, exp=None): n, a, b, x = map(self._print, expr.args) tex = r"P_{%s}^{\left(%s,%s\right)}\left(%s\right)" % (n, a, b, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_gegenbauer(self, expr, exp=None): n, a, x = map(self._print, expr.args) tex = r"C_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_chebyshevt(self, expr, exp=None): n, x = map(self._print, expr.args) tex = r"T_{%s}\left(%s\right)" % (n, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_chebyshevu(self, expr, exp=None): n, x = map(self._print, expr.args) tex = r"U_{%s}\left(%s\right)" % (n, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_legendre(self, expr, exp=None): n, x = map(self._print, expr.args) tex = r"P_{%s}\left(%s\right)" % (n, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_assoc_legendre(self, expr, exp=None): n, a, x = map(self._print, expr.args) tex = r"P_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_hermite(self, expr, exp=None): n, x = map(self._print, expr.args) tex = r"H_{%s}\left(%s\right)" % (n, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_laguerre(self, expr, exp=None): n, x = map(self._print, expr.args) tex = r"L_{%s}\left(%s\right)" % (n, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_assoc_laguerre(self, expr, exp=None): n, a, x = map(self._print, expr.args) tex = r"L_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_Ynm(self, expr, exp=None): n, m, theta, phi = map(self._print, expr.args) tex = r"Y_{%s}^{%s}\left(%s,%s\right)" % (n, m, theta, phi) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def _print_Znm(self, expr, exp=None): n, m, theta, phi = map(self._print, expr.args) tex = r"Z_{%s}^{%s}\left(%s,%s\right)" % (n, m, theta, phi) if exp is not None: tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp)) return tex def __print_mathieu_functions(self, character, args, prime=False, exp=None): a, q, z = map(self._print, args) sup = r"^{\prime}" if prime else "" exp = "" if not exp else "^{%s}" % self._print(exp) return r"%s%s\left(%s, %s, %s\right)%s" % (character, sup, a, q, z, exp) def _print_mathieuc(self, expr, exp=None): return self.__print_mathieu_functions("C", expr.args, exp=exp) def _print_mathieus(self, expr, exp=None): return self.__print_mathieu_functions("S", expr.args, exp=exp) def _print_mathieucprime(self, expr, exp=None): return self.__print_mathieu_functions("C", expr.args, prime=True, exp=exp) def _print_mathieusprime(self, expr, exp=None): return self.__print_mathieu_functions("S", expr.args, prime=True, exp=exp) def _print_Rational(self, expr): if expr.q != 1: sign = "" p = expr.p if expr.p < 0: sign = "- " p = -p if self._settings['fold_short_frac']: return r"%s%d / %d" % (sign, p, expr.q) return r"%s\frac{%d}{%d}" % (sign, p, expr.q) else: return self._print(expr.p) def _print_Order(self, expr): s = self._print(expr.expr) if expr.point and any(p != S.Zero for p in expr.point) or \ len(expr.variables) > 1: s += '; ' if len(expr.variables) > 1: s += self._print(expr.variables) elif expr.variables: s += self._print(expr.variables[0]) s += r'\rightarrow ' if len(expr.point) > 1: s += self._print(expr.point) else: s += self._print(expr.point[0]) return r"O\left(%s\right)" % s def _print_Symbol(self, expr, style='plain'): if expr in self._settings['symbol_names']: return self._settings['symbol_names'][expr] result = self._deal_with_super_sub(expr.name) if \ '\\' not in expr.name else expr.name if style == 'bold': result = r"\mathbf{{{}}}".format(result) return result _print_RandomSymbol = _print_Symbol def _deal_with_super_sub(self, string): if '{' in string: return string name, supers, subs = split_super_sub(string) name = translate(name) supers = [translate(sup) for sup in supers] subs = [translate(sub) for sub in subs] # glue all items together: if supers: name += "^{%s}" % " ".join(supers) if subs: name += "_{%s}" % " ".join(subs) return name def _print_Relational(self, expr): if self._settings['itex']: gt = r"\gt" lt = r"\lt" else: gt = ">" lt = "<" charmap = { "==": "=", ">": gt, "<": lt, ">=": r"\geq", "<=": r"\leq", "!=": r"\neq", } return "%s %s %s" % (self._print(expr.lhs), charmap[expr.rel_op], self._print(expr.rhs)) def _print_Piecewise(self, expr): ecpairs = [r"%s & \text{for}\: %s" % (self._print(e), self._print(c)) for e, c in expr.args[:-1]] if expr.args[-1].cond == true: ecpairs.append(r"%s & \text{otherwise}" % self._print(expr.args[-1].expr)) else: ecpairs.append(r"%s & \text{for}\: %s" % (self._print(expr.args[-1].expr), self._print(expr.args[-1].cond))) tex = r"\begin{cases} %s \end{cases}" return tex % r" \\".join(ecpairs) def _print_MatrixBase(self, expr): lines = [] for line in range(expr.rows): # horrible, should be 'rows' lines.append(" & ".join([self._print(i) for i in expr[line, :]])) mat_str = self._settings['mat_str'] if mat_str is None: if self._settings['mode'] == 'inline': mat_str = 'smallmatrix' else: if (expr.cols <= 10) is True: mat_str = 'matrix' else: mat_str = 'array' out_str = r'\begin{%MATSTR%}%s\end{%MATSTR%}' out_str = out_str.replace('%MATSTR%', mat_str) if mat_str == 'array': out_str = out_str.replace('%s', '{' + 'c'*expr.cols + '}%s') if self._settings['mat_delim']: left_delim = self._settings['mat_delim'] right_delim = self._delim_dict[left_delim] out_str = r'\left' + left_delim + out_str + \ r'\right' + right_delim return out_str % r"\\".join(lines) _print_ImmutableMatrix = _print_ImmutableDenseMatrix \ = _print_Matrix \ = _print_MatrixBase def _print_MatrixElement(self, expr): return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True)\ + '_{%s, %s}' % (self._print(expr.i), self._print(expr.j)) def _print_MatrixSlice(self, expr): def latexslice(x): x = list(x) if x[2] == 1: del x[2] if x[1] == x[0] + 1: del x[1] if x[0] == 0: x[0] = '' return ':'.join(map(self._print, x)) return (self._print(expr.parent) + r'\left[' + latexslice(expr.rowslice) + ', ' + latexslice(expr.colslice) + r'\right]') def _print_BlockMatrix(self, expr): return self._print(expr.blocks) def _print_Transpose(self, expr): mat = expr.arg from sympy.matrices import MatrixSymbol if not isinstance(mat, MatrixSymbol): return r"\left(%s\right)^{T}" % self._print(mat) else: return "%s^{T}" % self.parenthesize(mat, precedence_traditional(expr), True) def _print_Trace(self, expr): mat = expr.arg return r"\operatorname{tr}\left(%s \right)" % self._print(mat) def _print_Adjoint(self, expr): mat = expr.arg from sympy.matrices import MatrixSymbol if not isinstance(mat, MatrixSymbol): return r"\left(%s\right)^{\dagger}" % self._print(mat) else: return r"%s^{\dagger}" % self._print(mat) def _print_MatMul(self, expr): from sympy import MatMul, Mul parens = lambda x: self.parenthesize(x, precedence_traditional(expr), False) args = expr.args if isinstance(args[0], Mul): args = args[0].as_ordered_factors() + list(args[1:]) else: args = list(args) if isinstance(expr, MatMul) and _coeff_isneg(expr): if args[0] == -1: args = args[1:] else: args[0] = -args[0] return '- ' + ' '.join(map(parens, args)) else: return ' '.join(map(parens, args)) def _print_Mod(self, expr, exp=None): if exp is not None: return r'\left(%s\bmod{%s}\right)^{%s}' % \ (self.parenthesize(expr.args[0], PRECEDENCE['Mul'], strict=True), self._print(expr.args[1]), self._print(exp)) return r'%s\bmod{%s}' % (self.parenthesize(expr.args[0], PRECEDENCE['Mul'], strict=True), self._print(expr.args[1])) def _print_HadamardProduct(self, expr): args = expr.args prec = PRECEDENCE['Pow'] parens = self.parenthesize return r' \circ '.join( map(lambda arg: parens(arg, prec, strict=True), args)) def _print_HadamardPower(self, expr): template = r"%s^{\circ {%s}}" return self._helper_print_standard_power(expr, template) def _print_KroneckerProduct(self, expr): args = expr.args prec = PRECEDENCE['Pow'] parens = self.parenthesize return r' \otimes '.join( map(lambda arg: parens(arg, prec, strict=True), args)) def _print_MatPow(self, expr): base, exp = expr.base, expr.exp from sympy.matrices import MatrixSymbol if not isinstance(base, MatrixSymbol): return "\\left(%s\\right)^{%s}" % (self._print(base), self._print(exp)) else: return "%s^{%s}" % (self._print(base), self._print(exp)) def _print_MatrixSymbol(self, expr): return self._print_Symbol(expr, style=self._settings[ 'mat_symbol_style']) def _print_ZeroMatrix(self, Z): return r"\mathbb{0}" if self._settings[ 'mat_symbol_style'] == 'plain' else r"\mathbf{0}" def _print_OneMatrix(self, O): return r"\mathbb{1}" if self._settings[ 'mat_symbol_style'] == 'plain' else r"\mathbf{1}" def _print_Identity(self, I): return r"\mathbb{I}" if self._settings[ 'mat_symbol_style'] == 'plain' else r"\mathbf{I}" def _print_NDimArray(self, expr): if expr.rank() == 0: return self._print(expr[()]) mat_str = self._settings['mat_str'] if mat_str is None: if self._settings['mode'] == 'inline': mat_str = 'smallmatrix' else: if (expr.rank() == 0) or (expr.shape[-1] <= 10): mat_str = 'matrix' else: mat_str = 'array' block_str = r'\begin{%MATSTR%}%s\end{%MATSTR%}' block_str = block_str.replace('%MATSTR%', mat_str) if self._settings['mat_delim']: left_delim = self._settings['mat_delim'] right_delim = self._delim_dict[left_delim] block_str = r'\left' + left_delim + block_str + \ r'\right' + right_delim if expr.rank() == 0: return block_str % "" level_str = [[]] + [[] for i in range(expr.rank())] shape_ranges = [list(range(i)) for i in expr.shape] for outer_i in itertools.product(*shape_ranges): level_str[-1].append(self._print(expr[outer_i])) even = True for back_outer_i in range(expr.rank()-1, -1, -1): if len(level_str[back_outer_i+1]) < expr.shape[back_outer_i]: break if even: level_str[back_outer_i].append( r" & ".join(level_str[back_outer_i+1])) else: level_str[back_outer_i].append( block_str % (r"\\".join(level_str[back_outer_i+1]))) if len(level_str[back_outer_i+1]) == 1: level_str[back_outer_i][-1] = r"\left[" + \ level_str[back_outer_i][-1] + r"\right]" even = not even level_str[back_outer_i+1] = [] out_str = level_str[0][0] if expr.rank() % 2 == 1: out_str = block_str % out_str return out_str _print_ImmutableDenseNDimArray = _print_NDimArray _print_ImmutableSparseNDimArray = _print_NDimArray _print_MutableDenseNDimArray = _print_NDimArray _print_MutableSparseNDimArray = _print_NDimArray def _printer_tensor_indices(self, name, indices, index_map={}): out_str = self._print(name) last_valence = None prev_map = None for index in indices: new_valence = index.is_up if ((index in index_map) or prev_map) and \ last_valence == new_valence: out_str += "," if last_valence != new_valence: if last_valence is not None: out_str += "}" if index.is_up: out_str += "{}^{" else: out_str += "{}_{" out_str += self._print(index.args[0]) if index in index_map: out_str += "=" out_str += self._print(index_map[index]) prev_map = True else: prev_map = False last_valence = new_valence if last_valence is not None: out_str += "}" return out_str def _print_Tensor(self, expr): name = expr.args[0].args[0] indices = expr.get_indices() return self._printer_tensor_indices(name, indices) def _print_TensorElement(self, expr): name = expr.expr.args[0].args[0] indices = expr.expr.get_indices() index_map = expr.index_map return self._printer_tensor_indices(name, indices, index_map) def _print_TensMul(self, expr): # prints expressions like "A(a)", "3*A(a)", "(1+x)*A(a)" sign, args = expr._get_args_for_traditional_printer() return sign + "".join( [self.parenthesize(arg, precedence(expr)) for arg in args] ) def _print_TensAdd(self, expr): a = [] args = expr.args for x in args: a.append(self.parenthesize(x, precedence(expr))) a.sort() s = ' + '.join(a) s = s.replace('+ -', '- ') return s def _print_TensorIndex(self, expr): return "{}%s{%s}" % ( "^" if expr.is_up else "_", self._print(expr.args[0]) ) def _print_UniversalSet(self, expr): return r"\mathbb{U}" def _print_frac(self, expr, exp=None): if exp is None: return r"\operatorname{frac}{\left(%s\right)}" % self._print(expr.args[0]) else: return r"\operatorname{frac}{\left(%s\right)}^{%s}" % ( self._print(expr.args[0]), self._print(exp)) def _print_tuple(self, expr): if self._settings['decimal_separator'] =='comma': return r"\left( %s\right)" % \ r"; \ ".join([self._print(i) for i in expr]) elif self._settings['decimal_separator'] =='period': return r"\left( %s\right)" % \ r", \ ".join([self._print(i) for i in expr]) else: raise ValueError('Unknown Decimal Separator') def _print_TensorProduct(self, expr): elements = [self._print(a) for a in expr.args] return r' \otimes '.join(elements) def _print_WedgeProduct(self, expr): elements = [self._print(a) for a in expr.args] return r' \wedge '.join(elements) def _print_Tuple(self, expr): return self._print_tuple(expr) def _print_list(self, expr): if self._settings['decimal_separator'] == 'comma': return r"\left[ %s\right]" % \ r"; \ ".join([self._print(i) for i in expr]) elif self._settings['decimal_separator'] == 'period': return r"\left[ %s\right]" % \ r", \ ".join([self._print(i) for i in expr]) else: raise ValueError('Unknown Decimal Separator') def _print_dict(self, d): keys = sorted(d.keys(), key=default_sort_key) items = [] for key in keys: val = d[key] items.append("%s : %s" % (self._print(key), self._print(val))) return r"\left\{ %s\right\}" % r", \ ".join(items) def _print_Dict(self, expr): return self._print_dict(expr) def _print_DiracDelta(self, expr, exp=None): if len(expr.args) == 1 or expr.args[1] == 0: tex = r"\delta\left(%s\right)" % self._print(expr.args[0]) else: tex = r"\delta^{\left( %s \right)}\left( %s \right)" % ( self._print(expr.args[1]), self._print(expr.args[0])) if exp: tex = r"\left(%s\right)^{%s}" % (tex, exp) return tex def _print_SingularityFunction(self, expr): shift = self._print(expr.args[0] - expr.args[1]) power = self._print(expr.args[2]) tex = r"{\left\langle %s \right\rangle}^{%s}" % (shift, power) return tex def _print_Heaviside(self, expr, exp=None): tex = r"\theta\left(%s\right)" % self._print(expr.args[0]) if exp: tex = r"\left(%s\right)^{%s}" % (tex, exp) return tex def _print_KroneckerDelta(self, expr, exp=None): i = self._print(expr.args[0]) j = self._print(expr.args[1]) if expr.args[0].is_Atom and expr.args[1].is_Atom: tex = r'\delta_{%s %s}' % (i, j) else: tex = r'\delta_{%s, %s}' % (i, j) if exp is not None: tex = r'\left(%s\right)^{%s}' % (tex, exp) return tex def _print_LeviCivita(self, expr, exp=None): indices = map(self._print, expr.args) if all(x.is_Atom for x in expr.args): tex = r'\varepsilon_{%s}' % " ".join(indices) else: tex = r'\varepsilon_{%s}' % ", ".join(indices) if exp: tex = r'\left(%s\right)^{%s}' % (tex, exp) return tex def _print_ProductSet(self, p): if len(p.sets) > 1 and not has_variety(p.sets): return self._print(p.sets[0]) + "^{%d}" % len(p.sets) else: return r" \times ".join(self._print(set) for set in p.sets) def _print_RandomDomain(self, d): if hasattr(d, 'as_boolean'): return '\\text{Domain: }' + self._print(d.as_boolean()) elif hasattr(d, 'set'): return ('\\text{Domain: }' + self._print(d.symbols) + '\\text{ in }' + self._print(d.set)) elif hasattr(d, 'symbols'): return '\\text{Domain on }' + self._print(d.symbols) else: return self._print(None) def _print_FiniteSet(self, s): items = sorted(s.args, key=default_sort_key) return self._print_set(items) def _print_set(self, s): items = sorted(s, key=default_sort_key) if self._settings['decimal_separator'] == 'comma': items = "; ".join(map(self._print, items)) elif self._settings['decimal_separator'] == 'period': items = ", ".join(map(self._print, items)) else: raise ValueError('Unknown Decimal Separator') return r"\left\{%s\right\}" % items _print_frozenset = _print_set def _print_Range(self, s): dots = r'\ldots' if s.start.is_infinite: printset = dots, s[-1] - s.step, s[-1] elif s.stop.is_infinite: it = iter(s) printset = next(it), next(it), dots elif len(s) > 4: it = iter(s) printset = next(it), next(it), dots, s[-1] else: printset = tuple(s) return (r"\left\{" + r", ".join(self._print(el) for el in printset) + r"\right\}") def __print_number_polynomial(self, expr, letter, exp=None): if len(expr.args) == 2: if exp is not None: return r"%s_{%s}^{%s}\left(%s\right)" % (letter, self._print(expr.args[0]), self._print(exp), self._print(expr.args[1])) return r"%s_{%s}\left(%s\right)" % (letter, self._print(expr.args[0]), self._print(expr.args[1])) tex = r"%s_{%s}" % (letter, self._print(expr.args[0])) if exp is not None: tex = r"%s^{%s}" % (tex, self._print(exp)) return tex def _print_bernoulli(self, expr, exp=None): return self.__print_number_polynomial(expr, "B", exp) def _print_bell(self, expr, exp=None): if len(expr.args) == 3: tex1 = r"B_{%s, %s}" % (self._print(expr.args[0]), self._print(expr.args[1])) tex2 = r"\left(%s\right)" % r", ".join(self._print(el) for el in expr.args[2]) if exp is not None: tex = r"%s^{%s}%s" % (tex1, self._print(exp), tex2) else: tex = tex1 + tex2 return tex return self.__print_number_polynomial(expr, "B", exp) def _print_fibonacci(self, expr, exp=None): return self.__print_number_polynomial(expr, "F", exp) def _print_lucas(self, expr, exp=None): tex = r"L_{%s}" % self._print(expr.args[0]) if exp is not None: tex = r"%s^{%s}" % (tex, self._print(exp)) return tex def _print_tribonacci(self, expr, exp=None): return self.__print_number_polynomial(expr, "T", exp) def _print_SeqFormula(self, s): if len(s.start.free_symbols) > 0 or len(s.stop.free_symbols) > 0: return r"\left\{%s\right\}_{%s=%s}^{%s}" % ( self._print(s.formula), self._print(s.variables[0]), self._print(s.start), self._print(s.stop) ) if s.start is S.NegativeInfinity: stop = s.stop printset = (r'\ldots', s.coeff(stop - 3), s.coeff(stop - 2), s.coeff(stop - 1), s.coeff(stop)) elif s.stop is S.Infinity or s.length > 4: printset = s[:4] printset.append(r'\ldots') else: printset = tuple(s) return (r"\left[" + r", ".join(self._print(el) for el in printset) + r"\right]") _print_SeqPer = _print_SeqFormula _print_SeqAdd = _print_SeqFormula _print_SeqMul = _print_SeqFormula def _print_Interval(self, i): if i.start == i.end: return r"\left\{%s\right\}" % self._print(i.start) else: if i.left_open: left = '(' else: left = '[' if i.right_open: right = ')' else: right = ']' return r"\left%s%s, %s\right%s" % \ (left, self._print(i.start), self._print(i.end), right) def _print_AccumulationBounds(self, i): return r"\left\langle %s, %s\right\rangle" % \ (self._print(i.min), self._print(i.max)) def _print_Union(self, u): return r" \cup ".join([self._print(i) for i in u.args]) def _print_Complement(self, u): return r" \setminus ".join([self._print(i) for i in u.args]) def _print_Intersection(self, u): return r" \cap ".join([self._print(i) for i in u.args]) def _print_SymmetricDifference(self, u): return r" \triangle ".join([self._print(i) for i in u.args]) def _print_EmptySet(self, e): return r"\emptyset" def _print_Naturals(self, n): return r"\mathbb{N}" def _print_Naturals0(self, n): return r"\mathbb{N}_0" def _print_Integers(self, i): return r"\mathbb{Z}" def _print_Reals(self, i): return r"\mathbb{R}" def _print_Complexes(self, i): return r"\mathbb{C}" def _print_ImageSet(self, s): sets = s.args[1:] varsets = [r"%s \in %s" % (self._print(var), self._print(setv)) for var, setv in zip(s.lamda.variables, sets)] return r"\left\{%s\; |\; %s\right\}" % ( self._print(s.lamda.expr), ', '.join(varsets)) def _print_ConditionSet(self, s): vars_print = ', '.join([self._print(var) for var in Tuple(s.sym)]) if s.base_set is S.UniversalSet: return r"\left\{%s \mid %s \right\}" % \ (vars_print, self._print(s.condition.as_expr())) return r"\left\{%s \mid %s \in %s \wedge %s \right\}" % ( vars_print, vars_print, self._print(s.base_set), self._print(s.condition)) def _print_ComplexRegion(self, s): vars_print = ', '.join([self._print(var) for var in s.variables]) return r"\left\{%s\; |\; %s \in %s \right\}" % ( self._print(s.expr), vars_print, self._print(s.sets)) def _print_Contains(self, e): return r"%s \in %s" % tuple(self._print(a) for a in e.args) def _print_FourierSeries(self, s): return self._print_Add(s.truncate()) + self._print(r' + \ldots') def _print_FormalPowerSeries(self, s): return self._print_Add(s.infinite) def _print_FiniteField(self, expr): return r"\mathbb{F}_{%s}" % expr.mod def _print_IntegerRing(self, expr): return r"\mathbb{Z}" def _print_RationalField(self, expr): return r"\mathbb{Q}" def _print_RealField(self, expr): return r"\mathbb{R}" def _print_ComplexField(self, expr): return r"\mathbb{C}" def _print_PolynomialRing(self, expr): domain = self._print(expr.domain) symbols = ", ".join(map(self._print, expr.symbols)) return r"%s\left[%s\right]" % (domain, symbols) def _print_FractionField(self, expr): domain = self._print(expr.domain) symbols = ", ".join(map(self._print, expr.symbols)) return r"%s\left(%s\right)" % (domain, symbols) def _print_PolynomialRingBase(self, expr): domain = self._print(expr.domain) symbols = ", ".join(map(self._print, expr.symbols)) inv = "" if not expr.is_Poly: inv = r"S_<^{-1}" return r"%s%s\left[%s\right]" % (inv, domain, symbols) def _print_Poly(self, poly): cls = poly.__class__.__name__ terms = [] for monom, coeff in poly.terms(): s_monom = '' for i, exp in enumerate(monom): if exp > 0: if exp == 1: s_monom += self._print(poly.gens[i]) else: s_monom += self._print(pow(poly.gens[i], exp)) if coeff.is_Add: if s_monom: s_coeff = r"\left(%s\right)" % self._print(coeff) else: s_coeff = self._print(coeff) else: if s_monom: if coeff is S.One: terms.extend(['+', s_monom]) continue if coeff is S.NegativeOne: terms.extend(['-', s_monom]) continue s_coeff = self._print(coeff) if not s_monom: s_term = s_coeff else: s_term = s_coeff + " " + s_monom if s_term.startswith('-'): terms.extend(['-', s_term[1:]]) else: terms.extend(['+', s_term]) if terms[0] in ['-', '+']: modifier = terms.pop(0) if modifier == '-': terms[0] = '-' + terms[0] expr = ' '.join(terms) gens = list(map(self._print, poly.gens)) domain = "domain=%s" % self._print(poly.get_domain()) args = ", ".join([expr] + gens + [domain]) if cls in accepted_latex_functions: tex = r"\%s {\left(%s \right)}" % (cls, args) else: tex = r"\operatorname{%s}{\left( %s \right)}" % (cls, args) return tex def _print_ComplexRootOf(self, root): cls = root.__class__.__name__ if cls == "ComplexRootOf": cls = "CRootOf" expr = self._print(root.expr) index = root.index if cls in accepted_latex_functions: return r"\%s {\left(%s, %d\right)}" % (cls, expr, index) else: return r"\operatorname{%s} {\left(%s, %d\right)}" % (cls, expr, index) def _print_RootSum(self, expr): cls = expr.__class__.__name__ args = [self._print(expr.expr)] if expr.fun is not S.IdentityFunction: args.append(self._print(expr.fun)) if cls in accepted_latex_functions: return r"\%s {\left(%s\right)}" % (cls, ", ".join(args)) else: return r"\operatorname{%s} {\left(%s\right)}" % (cls, ", ".join(args)) def _print_PolyElement(self, poly): mul_symbol = self._settings['mul_symbol_latex'] return poly.str(self, PRECEDENCE, "{%s}^{%d}", mul_symbol) def _print_FracElement(self, frac): if frac.denom == 1: return self._print(frac.numer) else: numer = self._print(frac.numer) denom = self._print(frac.denom) return r"\frac{%s}{%s}" % (numer, denom) def _print_euler(self, expr, exp=None): m, x = (expr.args[0], None) if len(expr.args) == 1 else expr.args tex = r"E_{%s}" % self._print(m) if exp is not None: tex = r"%s^{%s}" % (tex, self._print(exp)) if x is not None: tex = r"%s\left(%s\right)" % (tex, self._print(x)) return tex def _print_catalan(self, expr, exp=None): tex = r"C_{%s}" % self._print(expr.args[0]) if exp is not None: tex = r"%s^{%s}" % (tex, self._print(exp)) return tex def _print_UnifiedTransform(self, expr, s, inverse=False): return r"\mathcal{{{}}}{}_{{{}}}\left[{}\right]\left({}\right)".format(s, '^{-1}' if inverse else '', self._print(expr.args[1]), self._print(expr.args[0]), self._print(expr.args[2])) def _print_MellinTransform(self, expr): return self._print_UnifiedTransform(expr, 'M') def _print_InverseMellinTransform(self, expr): return self._print_UnifiedTransform(expr, 'M', True) def _print_LaplaceTransform(self, expr): return self._print_UnifiedTransform(expr, 'L') def _print_InverseLaplaceTransform(self, expr): return self._print_UnifiedTransform(expr, 'L', True) def _print_FourierTransform(self, expr): return self._print_UnifiedTransform(expr, 'F') def _print_InverseFourierTransform(self, expr): return self._print_UnifiedTransform(expr, 'F', True) def _print_SineTransform(self, expr): return self._print_UnifiedTransform(expr, 'SIN') def _print_InverseSineTransform(self, expr): return self._print_UnifiedTransform(expr, 'SIN', True) def _print_CosineTransform(self, expr): return self._print_UnifiedTransform(expr, 'COS') def _print_InverseCosineTransform(self, expr): return self._print_UnifiedTransform(expr, 'COS', True) def _print_DMP(self, p): try: if p.ring is not None: # TODO incorporate order return self._print(p.ring.to_sympy(p)) except SympifyError: pass return self._print(repr(p)) def _print_DMF(self, p): return self._print_DMP(p) def _print_Object(self, object): return self._print(Symbol(object.name)) def _print_LambertW(self, expr): return r"W\left(%s\right)" % self._print(expr.args[0]) def _print_Morphism(self, morphism): domain = self._print(morphism.domain) codomain = self._print(morphism.codomain) return "%s\\rightarrow %s" % (domain, codomain) def _print_NamedMorphism(self, morphism): pretty_name = self._print(Symbol(morphism.name)) pretty_morphism = self._print_Morphism(morphism) return "%s:%s" % (pretty_name, pretty_morphism) def _print_IdentityMorphism(self, morphism): from sympy.categories import NamedMorphism return self._print_NamedMorphism(NamedMorphism( morphism.domain, morphism.codomain, "id")) def _print_CompositeMorphism(self, morphism): # All components of the morphism have names and it is thus # possible to build the name of the composite. component_names_list = [self._print(Symbol(component.name)) for component in morphism.components] component_names_list.reverse() component_names = "\\circ ".join(component_names_list) + ":" pretty_morphism = self._print_Morphism(morphism) return component_names + pretty_morphism def _print_Category(self, morphism): return r"\mathbf{{{}}}".format(self._print(Symbol(morphism.name))) def _print_Diagram(self, diagram): if not diagram.premises: # This is an empty diagram. return self._print(S.EmptySet) latex_result = self._print(diagram.premises) if diagram.conclusions: latex_result += "\\Longrightarrow %s" % \ self._print(diagram.conclusions) return latex_result def _print_DiagramGrid(self, grid): latex_result = "\\begin{array}{%s}\n" % ("c" * grid.width) for i in range(grid.height): for j in range(grid.width): if grid[i, j]: latex_result += latex(grid[i, j]) latex_result += " " if j != grid.width - 1: latex_result += "& " if i != grid.height - 1: latex_result += "\\\\" latex_result += "\n" latex_result += "\\end{array}\n" return latex_result def _print_FreeModule(self, M): return '{{{}}}^{{{}}}'.format(self._print(M.ring), self._print(M.rank)) def _print_FreeModuleElement(self, m): # Print as row vector for convenience, for now. return r"\left[ {} \right]".format(",".join( '{' + self._print(x) + '}' for x in m)) def _print_SubModule(self, m): return r"\left\langle {} \right\rangle".format(",".join( '{' + self._print(x) + '}' for x in m.gens)) def _print_ModuleImplementedIdeal(self, m): return r"\left\langle {} \right\rangle".format(",".join( '{' + self._print(x) + '}' for [x] in m._module.gens)) def _print_Quaternion(self, expr): # TODO: This expression is potentially confusing, # shall we print it as `Quaternion( ... )`? s = [self.parenthesize(i, PRECEDENCE["Mul"], strict=True) for i in expr.args] a = [s[0]] + [i+" "+j for i, j in zip(s[1:], "ijk")] return " + ".join(a) def _print_QuotientRing(self, R): # TODO nicer fractions for few generators... return r"\frac{{{}}}{{{}}}".format(self._print(R.ring), self._print(R.base_ideal)) def _print_QuotientRingElement(self, x): return r"{{{}}} + {{{}}}".format(self._print(x.data), self._print(x.ring.base_ideal)) def _print_QuotientModuleElement(self, m): return r"{{{}}} + {{{}}}".format(self._print(m.data), self._print(m.module.killed_module)) def _print_QuotientModule(self, M): # TODO nicer fractions for few generators... return r"\frac{{{}}}{{{}}}".format(self._print(M.base), self._print(M.killed_module)) def _print_MatrixHomomorphism(self, h): return r"{{{}}} : {{{}}} \to {{{}}}".format(self._print(h._sympy_matrix()), self._print(h.domain), self._print(h.codomain)) def _print_BaseScalarField(self, field): string = field._coord_sys._names[field._index] return r'\mathbf{{{}}}'.format(self._print(Symbol(string))) def _print_BaseVectorField(self, field): string = field._coord_sys._names[field._index] return r'\partial_{{{}}}'.format(self._print(Symbol(string))) def _print_Differential(self, diff): field = diff._form_field if hasattr(field, '_coord_sys'): string = field._coord_sys._names[field._index] return r'\operatorname{{d}}{}'.format(self._print(Symbol(string))) else: string = self._print(field) return r'\operatorname{{d}}\left({}\right)'.format(string) def _print_Tr(self, p): # TODO: Handle indices contents = self._print(p.args[0]) return r'\operatorname{{tr}}\left({}\right)'.format(contents) def _print_totient(self, expr, exp=None): if exp is not None: return r'\left(\phi\left(%s\right)\right)^{%s}' % \ (self._print(expr.args[0]), self._print(exp)) return r'\phi\left(%s\right)' % self._print(expr.args[0]) def _print_reduced_totient(self, expr, exp=None): if exp is not None: return r'\left(\lambda\left(%s\right)\right)^{%s}' % \ (self._print(expr.args[0]), self._print(exp)) return r'\lambda\left(%s\right)' % self._print(expr.args[0]) def _print_divisor_sigma(self, expr, exp=None): if len(expr.args) == 2: tex = r"_%s\left(%s\right)" % tuple(map(self._print, (expr.args[1], expr.args[0]))) else: tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"\sigma^{%s}%s" % (self._print(exp), tex) return r"\sigma%s" % tex def _print_udivisor_sigma(self, expr, exp=None): if len(expr.args) == 2: tex = r"_%s\left(%s\right)" % tuple(map(self._print, (expr.args[1], expr.args[0]))) else: tex = r"\left(%s\right)" % self._print(expr.args[0]) if exp is not None: return r"\sigma^*^{%s}%s" % (self._print(exp), tex) return r"\sigma^*%s" % tex def _print_primenu(self, expr, exp=None): if exp is not None: return r'\left(\nu\left(%s\right)\right)^{%s}' % \ (self._print(expr.args[0]), self._print(exp)) return r'\nu\left(%s\right)' % self._print(expr.args[0]) def _print_primeomega(self, expr, exp=None): if exp is not None: return r'\left(\Omega\left(%s\right)\right)^{%s}' % \ (self._print(expr.args[0]), self._print(exp)) return r'\Omega\left(%s\right)' % self._print(expr.args[0]) def translate(s): r''' Check for a modifier ending the string. If present, convert the modifier to latex and translate the rest recursively. Given a description of a Greek letter or other special character, return the appropriate latex. Let everything else pass as given. >>> from sympy.printing.latex import translate >>> translate('alphahatdotprime') "{\\dot{\\hat{\\alpha}}}'" ''' # Process the rest tex = tex_greek_dictionary.get(s) if tex: return tex elif s.lower() in greek_letters_set: return "\\" + s.lower() elif s in other_symbols: return "\\" + s else: # Process modifiers, if any, and recurse for key in sorted(modifier_dict.keys(), key=lambda k:len(k), reverse=True): if s.lower().endswith(key) and len(s) > len(key): return modifier_dict[key](translate(s[:-len(key)])) return s def latex(expr, fold_frac_powers=False, fold_func_brackets=False, fold_short_frac=None, inv_trig_style="abbreviated", itex=False, ln_notation=False, long_frac_ratio=None, mat_delim="[", mat_str=None, mode="plain", mul_symbol=None, order=None, symbol_names=None, root_notation=True, mat_symbol_style="plain", imaginary_unit="i", gothic_re_im=False, decimal_separator="period" ): r"""Convert the given expression to LaTeX string representation. Parameters ========== fold_frac_powers : boolean, optional Emit ``^{p/q}`` instead of ``^{\frac{p}{q}}`` for fractional powers. fold_func_brackets : boolean, optional Fold function brackets where applicable. fold_short_frac : boolean, optional Emit ``p / q`` instead of ``\frac{p}{q}`` when the denominator is simple enough (at most two terms and no powers). The default value is ``True`` for inline mode, ``False`` otherwise. inv_trig_style : string, optional How inverse trig functions should be displayed. Can be one of ``abbreviated``, ``full``, or ``power``. Defaults to ``abbreviated``. itex : boolean, optional Specifies if itex-specific syntax is used, including emitting ``$$...$$``. ln_notation : boolean, optional If set to ``True``, ``\ln`` is used instead of default ``\log``. long_frac_ratio : float or None, optional The allowed ratio of the width of the numerator to the width of the denominator before the printer breaks off long fractions. If ``None`` (the default value), long fractions are not broken up. mat_delim : string, optional The delimiter to wrap around matrices. Can be one of ``[``, ``(``, or the empty string. Defaults to ``[``. mat_str : string, optional Which matrix environment string to emit. ``smallmatrix``, ``matrix``, ``array``, etc. Defaults to ``smallmatrix`` for inline mode, ``matrix`` for matrices of no more than 10 columns, and ``array`` otherwise. mode: string, optional Specifies how the generated code will be delimited. ``mode`` can be one of ``plain``, ``inline``, ``equation`` or ``equation*``. If ``mode`` is set to ``plain``, then the resulting code will not be delimited at all (this is the default). If ``mode`` is set to ``inline`` then inline LaTeX ``$...$`` will be used. If ``mode`` is set to ``equation`` or ``equation*``, the resulting code will be enclosed in the ``equation`` or ``equation*`` environment (remember to import ``amsmath`` for ``equation*``), unless the ``itex`` option is set. In the latter case, the ``$$...$$`` syntax is used. mul_symbol : string or None, optional The symbol to use for multiplication. Can be one of ``None``, ``ldot``, ``dot``, or ``times``. order: string, optional Any of the supported monomial orderings (currently ``lex``, ``grlex``, or ``grevlex``), ``old``, and ``none``. This parameter does nothing for Mul objects. Setting order to ``old`` uses the compatibility ordering for Add defined in Printer. For very large expressions, set the ``order`` keyword to ``none`` if speed is a concern. symbol_names : dictionary of strings mapped to symbols, optional Dictionary of symbols and the custom strings they should be emitted as. root_notation : boolean, optional If set to ``False``, exponents of the form 1/n are printed in fractonal form. Default is ``True``, to print exponent in root form. mat_symbol_style : string, optional Can be either ``plain`` (default) or ``bold``. If set to ``bold``, a MatrixSymbol A will be printed as ``\mathbf{A}``, otherwise as ``A``. imaginary_unit : string, optional String to use for the imaginary unit. Defined options are "i" (default) and "j". Adding "r" or "t" in front gives ``\mathrm`` or ``\text``, so "ri" leads to ``\mathrm{i}`` which gives `\mathrm{i}`. gothic_re_im : boolean, optional If set to ``True``, `\Re` and `\Im` is used for ``re`` and ``im``, respectively. The default is ``False`` leading to `\operatorname{re}` and `\operatorname{im}`. decimal_separator : string, optional Specifies what separator to use to separate the whole and fractional parts of a floating point number as in `2.5` for the default, ``period`` or `2{,}5` when ``comma`` is specified. Lists, sets, and tuple are printed with semicolon separating the elements when ``comma`` is chosen. For example, [1; 2; 3] when ``comma`` is chosen and [1,2,3] for when ``period`` is chosen. Notes ===== Not using a print statement for printing, results in double backslashes for latex commands since that's the way Python escapes backslashes in strings. >>> from sympy import latex, Rational >>> from sympy.abc import tau >>> latex((2*tau)**Rational(7,2)) '8 \\sqrt{2} \\tau^{\\frac{7}{2}}' >>> print(latex((2*tau)**Rational(7,2))) 8 \sqrt{2} \tau^{\frac{7}{2}} Examples ======== >>> from sympy import latex, pi, sin, asin, Integral, Matrix, Rational, log >>> from sympy.abc import x, y, mu, r, tau Basic usage: >>> print(latex((2*tau)**Rational(7,2))) 8 \sqrt{2} \tau^{\frac{7}{2}} ``mode`` and ``itex`` options: >>> print(latex((2*mu)**Rational(7,2), mode='plain')) 8 \sqrt{2} \mu^{\frac{7}{2}} >>> print(latex((2*tau)**Rational(7,2), mode='inline')) $8 \sqrt{2} \tau^{7 / 2}$ >>> print(latex((2*mu)**Rational(7,2), mode='equation*')) \begin{equation*}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation*} >>> print(latex((2*mu)**Rational(7,2), mode='equation')) \begin{equation}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation} >>> print(latex((2*mu)**Rational(7,2), mode='equation', itex=True)) $$8 \sqrt{2} \mu^{\frac{7}{2}}$$ >>> print(latex((2*mu)**Rational(7,2), mode='plain')) 8 \sqrt{2} \mu^{\frac{7}{2}} >>> print(latex((2*tau)**Rational(7,2), mode='inline')) $8 \sqrt{2} \tau^{7 / 2}$ >>> print(latex((2*mu)**Rational(7,2), mode='equation*')) \begin{equation*}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation*} >>> print(latex((2*mu)**Rational(7,2), mode='equation')) \begin{equation}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation} >>> print(latex((2*mu)**Rational(7,2), mode='equation', itex=True)) $$8 \sqrt{2} \mu^{\frac{7}{2}}$$ Fraction options: >>> print(latex((2*tau)**Rational(7,2), fold_frac_powers=True)) 8 \sqrt{2} \tau^{7/2} >>> print(latex((2*tau)**sin(Rational(7,2)))) \left(2 \tau\right)^{\sin{\left(\frac{7}{2} \right)}} >>> print(latex((2*tau)**sin(Rational(7,2)), fold_func_brackets=True)) \left(2 \tau\right)^{\sin {\frac{7}{2}}} >>> print(latex(3*x**2/y)) \frac{3 x^{2}}{y} >>> print(latex(3*x**2/y, fold_short_frac=True)) 3 x^{2} / y >>> print(latex(Integral(r, r)/2/pi, long_frac_ratio=2)) \frac{\int r\, dr}{2 \pi} >>> print(latex(Integral(r, r)/2/pi, long_frac_ratio=0)) \frac{1}{2 \pi} \int r\, dr Multiplication options: >>> print(latex((2*tau)**sin(Rational(7,2)), mul_symbol="times")) \left(2 \times \tau\right)^{\sin{\left(\frac{7}{2} \right)}} Trig options: >>> print(latex(asin(Rational(7,2)))) \operatorname{asin}{\left(\frac{7}{2} \right)} >>> print(latex(asin(Rational(7,2)), inv_trig_style="full")) \arcsin{\left(\frac{7}{2} \right)} >>> print(latex(asin(Rational(7,2)), inv_trig_style="power")) \sin^{-1}{\left(\frac{7}{2} \right)} Matrix options: >>> print(latex(Matrix(2, 1, [x, y]))) \left[\begin{matrix}x\\y\end{matrix}\right] >>> print(latex(Matrix(2, 1, [x, y]), mat_str = "array")) \left[\begin{array}{c}x\\y\end{array}\right] >>> print(latex(Matrix(2, 1, [x, y]), mat_delim="(")) \left(\begin{matrix}x\\y\end{matrix}\right) Custom printing of symbols: >>> print(latex(x**2, symbol_names={x: 'x_i'})) x_i^{2} Logarithms: >>> print(latex(log(10))) \log{\left(10 \right)} >>> print(latex(log(10), ln_notation=True)) \ln{\left(10 \right)} ``latex()`` also supports the builtin container types list, tuple, and dictionary. >>> print(latex([2/x, y], mode='inline')) $\left[ 2 / x, \ y\right]$ """ if symbol_names is None: symbol_names = {} settings = { 'fold_frac_powers': fold_frac_powers, 'fold_func_brackets': fold_func_brackets, 'fold_short_frac': fold_short_frac, 'inv_trig_style': inv_trig_style, 'itex': itex, 'ln_notation': ln_notation, 'long_frac_ratio': long_frac_ratio, 'mat_delim': mat_delim, 'mat_str': mat_str, 'mode': mode, 'mul_symbol': mul_symbol, 'order': order, 'symbol_names': symbol_names, 'root_notation': root_notation, 'mat_symbol_style': mat_symbol_style, 'imaginary_unit': imaginary_unit, 'gothic_re_im': gothic_re_im, 'decimal_separator': decimal_separator, } return LatexPrinter(settings).doprint(expr) def print_latex(expr, **settings): """Prints LaTeX representation of the given expression. Takes the same settings as ``latex()``.""" print(latex(expr, **settings)) def multiline_latex(lhs, rhs, terms_per_line=1, environment="align*", use_dots=False, **settings): r""" This function generates a LaTeX equation with a multiline right-hand side in an ``align*``, ``eqnarray`` or ``IEEEeqnarray`` environment. Parameters ========== lhs : Expr Left-hand side of equation rhs : Expr Right-hand side of equation terms_per_line : integer, optional Number of terms per line to print. Default is 1. environment : "string", optional Which LaTeX wnvironment to use for the output. Options are "align*" (default), "eqnarray", and "IEEEeqnarray". use_dots : boolean, optional If ``True``, ``\\dots`` is added to the end of each line. Default is ``False``. Examples ======== >>> from sympy import multiline_latex, symbols, sin, cos, exp, log, I >>> x, y, alpha = symbols('x y alpha') >>> expr = sin(alpha*y) + exp(I*alpha) - cos(log(y)) >>> print(multiline_latex(x, expr)) \begin{align*} x = & e^{i \alpha} \\ & + \sin{\left(\alpha y \right)} \\ & - \cos{\left(\log{\left(y \right)} \right)} \end{align*} Using at most two terms per line: >>> print(multiline_latex(x, expr, 2)) \begin{align*} x = & e^{i \alpha} + \sin{\left(\alpha y \right)} \\ & - \cos{\left(\log{\left(y \right)} \right)} \end{align*} Using ``eqnarray`` and dots: >>> print(multiline_latex(x, expr, terms_per_line=2, environment="eqnarray", use_dots=True)) \begin{eqnarray} x & = & e^{i \alpha} + \sin{\left(\alpha y \right)} \dots\nonumber\\ & & - \cos{\left(\log{\left(y \right)} \right)} \end{eqnarray} Using ``IEEEeqnarray``: >>> print(multiline_latex(x, expr, environment="IEEEeqnarray")) \begin{IEEEeqnarray}{rCl} x & = & e^{i \alpha} \nonumber\\ & & + \sin{\left(\alpha y \right)} \nonumber\\ & & - \cos{\left(\log{\left(y \right)} \right)} \end{IEEEeqnarray} Notes ===== All optional parameters from ``latex`` can also be used. """ # Based on code from https://github.com/sympy/sympy/issues/3001 l = LatexPrinter(**settings) if environment == "eqnarray": result = r'\begin{eqnarray}' + '\n' first_term = '& = &' nonumber = r'\nonumber' end_term = '\n\\end{eqnarray}' doubleet = True elif environment == "IEEEeqnarray": result = r'\begin{IEEEeqnarray}{rCl}' + '\n' first_term = '& = &' nonumber = r'\nonumber' end_term = '\n\\end{IEEEeqnarray}' doubleet = True elif environment == "align*": result = r'\begin{align*}' + '\n' first_term = '= &' nonumber = '' end_term = '\n\\end{align*}' doubleet = False else: raise ValueError("Unknown environment: {}".format(environment)) dots = '' if use_dots: dots=r'\dots' terms = rhs.as_ordered_terms() n_terms = len(terms) term_count = 1 for i in range(n_terms): term = terms[i] term_start = '' term_end = '' sign = '+' if term_count > terms_per_line: if doubleet: term_start = '& & ' else: term_start = '& ' term_count = 1 if term_count == terms_per_line: # End of line if i < n_terms-1: # There are terms remaining term_end = dots + nonumber + r'\\' + '\n' else: term_end = '' if term.as_ordered_factors()[0] == -1: term = -1*term sign = r'-' if i == 0: # beginning if sign == '+': sign = '' result += r'{:s} {:s}{:s} {:s} {:s}'.format(l.doprint(lhs), first_term, sign, l.doprint(term), term_end) else: result += r'{:s}{:s} {:s} {:s}'.format(term_start, sign, l.doprint(term), term_end) term_count += 1 result += end_term return result

22474219f45c1022c683b06bffc21a3c97e320e0d87088932329c9f314c63a2c

""" Mathematica code printer """ from __future__ import print_function, division from sympy.printing.codeprinter import CodePrinter from sympy.printing.precedence import precedence # Used in MCodePrinter._print_Function(self) known_functions = { "exp": [(lambda x: True, "Exp")], "log": [(lambda x: True, "Log")], "sin": [(lambda x: True, "Sin")], "cos": [(lambda x: True, "Cos")], "tan": [(lambda x: True, "Tan")], "cot": [(lambda x: True, "Cot")], "sec": [(lambda x: True, "Sec")], "csc": [(lambda x: True, "Csc")], "asin": [(lambda x: True, "ArcSin")], "acos": [(lambda x: True, "ArcCos")], "atan": [(lambda x: True, "ArcTan")], "acot": [(lambda x: True, "ArcCot")], "asec": [(lambda x: True, "ArcSec")], "acsc": [(lambda x: True, "ArcCsc")], "atan2": [(lambda *x: True, "ArcTan")], "sinh": [(lambda x: True, "Sinh")], "cosh": [(lambda x: True, "Cosh")], "tanh": [(lambda x: True, "Tanh")], "coth": [(lambda x: True, "Coth")], "sech": [(lambda x: True, "Sech")], "csch": [(lambda x: True, "Csch")], "asinh": [(lambda x: True, "ArcSinh")], "acosh": [(lambda x: True, "ArcCosh")], "atanh": [(lambda x: True, "ArcTanh")], "acoth": [(lambda x: True, "ArcCoth")], "asech": [(lambda x: True, "ArcSech")], "acsch": [(lambda x: True, "ArcCsch")], "conjugate": [(lambda x: True, "Conjugate")], "Max": [(lambda *x: True, "Max")], "Min": [(lambda *x: True, "Min")], "erf": [(lambda x: True, "Erf")], "erf2": [(lambda *x: True, "Erf")], "erfc": [(lambda x: True, "Erfc")], "erfi": [(lambda x: True, "Erfi")], "erfinv": [(lambda x: True, "InverseErf")], "erfcinv": [(lambda x: True, "InverseErfc")], "erf2inv": [(lambda *x: True, "InverseErf")], "expint": [(lambda *x: True, "ExpIntegralE")], "Ei": [(lambda x: True, "ExpIntegralEi")], "fresnelc": [(lambda x: True, "FresnelC")], "fresnels": [(lambda x: True, "FresnelS")], "gamma": [(lambda x: True, "Gamma")], "uppergamma": [(lambda *x: True, "Gamma")], "polygamma": [(lambda *x: True, "PolyGamma")], "loggamma": [(lambda x: True, "LogGamma")], "beta": [(lambda *x: True, "Beta")], "Ci": [(lambda x: True, "CosIntegral")], "Si": [(lambda x: True, "SinIntegral")], "Chi": [(lambda x: True, "CoshIntegral")], "Shi": [(lambda x: True, "SinhIntegral")], "li": [(lambda x: True, "LogIntegral")], "factorial": [(lambda x: True, "Factorial")], "factorial2": [(lambda x: True, "Factorial2")], "subfactorial": [(lambda x: True, "Subfactorial")], "catalan": [(lambda x: True, "CatalanNumber")], "harmonic": [(lambda *x: True, "HarmonicNumber")], "RisingFactorial": [(lambda *x: True, "Pochhammer")], "FallingFactorial": [(lambda *x: True, "FactorialPower")], "laguerre": [(lambda *x: True, "LaguerreL")], "assoc_laguerre": [(lambda *x: True, "LaguerreL")], "hermite": [(lambda *x: True, "HermiteH")], "jacobi": [(lambda *x: True, "JacobiP")], "gegenbauer": [(lambda *x: True, "GegenbauerC")], "chebyshevt": [(lambda *x: True, "ChebyshevT")], "chebyshevu": [(lambda *x: True, "ChebyshevU")], "legendre": [(lambda *x: True, "LegendreP")], "assoc_legendre": [(lambda *x: True, "LegendreP")], "mathieuc": [(lambda *x: True, "MathieuC")], "mathieus": [(lambda *x: True, "MathieuS")], "mathieucprime": [(lambda *x: True, "MathieuCPrime")], "mathieusprime": [(lambda *x: True, "MathieuSPrime")], "stieltjes": [(lambda x: True, "StieltjesGamma")], "elliptic_e": [(lambda *x: True, "EllipticE")], "elliptic_f": [(lambda *x: True, "EllipticE")], "elliptic_k": [(lambda x: True, "EllipticK")], "elliptic_pi": [(lambda *x: True, "EllipticPi")], "zeta": [(lambda *x: True, "Zeta")], "besseli": [(lambda *x: True, "BesselI")], "besselj": [(lambda *x: True, "BesselJ")], "besselk": [(lambda *x: True, "BesselK")], "bessely": [(lambda *x: True, "BesselY")], "hankel1": [(lambda *x: True, "HankelH1")], "hankel2": [(lambda *x: True, "HankelH2")], "airyai": [(lambda x: True, "AiryAi")], "airybi": [(lambda x: True, "AiryBi")], "airyaiprime": [(lambda x: True, "AiryAiPrime")], "airybiprime": [(lambda x: True, "AiryBiPrime")], "polylog": [(lambda *x: True, "PolyLog")], "lerchphi": [(lambda *x: True, "LerchPhi")], "gcd": [(lambda *x: True, "GCD")], "lcm": [(lambda *x: True, "LCM")], "jn": [(lambda *x: True, "SphericalBesselJ")], "yn": [(lambda *x: True, "SphericalBesselY")], "hyper": [(lambda *x: True, "HypergeometricPFQ")], "meijerg": [(lambda *x: True, "MeijerG")], "appellf1": [(lambda *x: True, "AppellF1")], "DiracDelta": [(lambda x: True, "DiracDelta")], "Heaviside": [(lambda x: True, "HeavisideTheta")], "KroneckerDelta": [(lambda *x: True, "KroneckerDelta")], "LambertW": [(lambda x: True, "ProductLog")], } class MCodePrinter(CodePrinter): """A printer to convert python expressions to strings of the Wolfram's Mathematica code """ printmethod = "_mcode" language = "Wolfram Language" _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 15, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, } _number_symbols = set() _not_supported = set() def __init__(self, settings={}): """Register function mappings supplied by user""" CodePrinter.__init__(self, settings) self.known_functions = dict(known_functions) userfuncs = settings.get('user_functions', {}).copy() for k, v in userfuncs.items(): if not isinstance(v, list): userfuncs[k] = [(lambda *x: True, v)] self.known_functions.update(userfuncs) def _format_code(self, lines): return lines def _print_Pow(self, expr): PREC = precedence(expr) return '%s^%s' % (self.parenthesize(expr.base, PREC), self.parenthesize(expr.exp, PREC)) def _print_Mul(self, expr): PREC = precedence(expr) c, nc = expr.args_cnc() res = super(MCodePrinter, self)._print_Mul(expr.func(*c)) if nc: res += '*' res += '**'.join(self.parenthesize(a, PREC) for a in nc) return res def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) # Primitive numbers def _print_Zero(self, expr): return '0' def _print_One(self, expr): return '1' def _print_NegativeOne(self, expr): return '-1' def _print_Half(self, expr): return '1/2' def _print_ImaginaryUnit(self, expr): return 'I' # Infinity and invalid numbers def _print_Infinity(self, expr): return 'Infinity' def _print_NegativeInfinity(self, expr): return '-Infinity' def _print_ComplexInfinity(self, expr): return 'ComplexInfinity' def _print_NaN(self, expr): return 'Indeterminate' # Mathematical constants def _print_Exp1(self, expr): return 'E' def _print_Pi(self, expr): return 'Pi' def _print_GoldenRatio(self, expr): return 'GoldenRatio' def _print_TribonacciConstant(self, expr): expanded = expr.expand(func=True) PREC = precedence(expr) return self.parenthesize(expanded, PREC) def _print_EulerGamma(self, expr): return 'EulerGamma' def _print_Catalan(self, expr): return 'Catalan' def _print_list(self, expr): return '{' + ', '.join(self.doprint(a) for a in expr) + '}' _print_tuple = _print_list _print_Tuple = _print_list def _print_ImmutableDenseMatrix(self, expr): return self.doprint(expr.tolist()) def _print_ImmutableSparseMatrix(self, expr): from sympy.core.compatibility import default_sort_key def print_rule(pos, val): return '{} -> {}'.format( self.doprint((pos[0]+1, pos[1]+1)), self.doprint(val)) def print_data(): items = sorted(expr._smat.items(), key=default_sort_key) return '{' + \ ', '.join(print_rule(k, v) for k, v in items) + \ '}' def print_dims(): return self.doprint(expr.shape) return 'SparseArray[{}, {}]'.format(print_data(), print_dims()) def _print_ImmutableDenseNDimArray(self, expr): return self.doprint(expr.tolist()) def _print_ImmutableSparseNDimArray(self, expr): def print_string_list(string_list): return '{' + ', '.join(a for a in string_list) + '}' def to_mathematica_index(*args): """Helper function to change Python style indexing to Pathematica indexing. Python indexing (0, 1 ... n-1) -> Mathematica indexing (1, 2 ... n) """ return tuple(i + 1 for i in args) def print_rule(pos, val): """Helper function to print a rule of Mathematica""" return '{} -> {}'.format(self.doprint(pos), self.doprint(val)) def print_data(): """Helper function to print data part of Mathematica sparse array. It uses the fourth notation ``SparseArray[data,{d1,d2,...}]`` from https://reference.wolfram.com/language/ref/SparseArray.html ``data`` must be formatted with rule. """ return print_string_list( [print_rule( to_mathematica_index(*(expr._get_tuple_index(key))), value) for key, value in sorted(expr._sparse_array.items())] ) def print_dims(): """Helper function to print dimensions part of Mathematica sparse array. It uses the fourth notation ``SparseArray[data,{d1,d2,...}]`` from https://reference.wolfram.com/language/ref/SparseArray.html """ return self.doprint(expr.shape) return 'SparseArray[{}, {}]'.format(print_data(), print_dims()) def _print_Function(self, expr): if expr.func.__name__ in self.known_functions: cond_mfunc = self.known_functions[expr.func.__name__] for cond, mfunc in cond_mfunc: if cond(*expr.args): return "%s[%s]" % (mfunc, self.stringify(expr.args, ", ")) elif (expr.func.__name__ in self._rewriteable_functions and self._rewriteable_functions[expr.func.__name__] in self.known_functions): # Simple rewrite to supported function possible return self._print(expr.rewrite(self._rewriteable_functions[expr.func.__name__])) return expr.func.__name__ + "[%s]" % self.stringify(expr.args, ", ") _print_MinMaxBase = _print_Function def _print_Integral(self, expr): if len(expr.variables) == 1 and not expr.limits[0][1:]: args = [expr.args[0], expr.variables[0]] else: args = expr.args return "Hold[Integrate[" + ', '.join(self.doprint(a) for a in args) + "]]" def _print_Sum(self, expr): return "Hold[Sum[" + ', '.join(self.doprint(a) for a in expr.args) + "]]" def _print_Derivative(self, expr): dexpr = expr.expr dvars = [i[0] if i[1] == 1 else i for i in expr.variable_count] return "Hold[D[" + ', '.join(self.doprint(a) for a in [dexpr] + dvars) + "]]" def _get_comment(self, text): return "(* {} *)".format(text) def mathematica_code(expr, **settings): r"""Converts an expr to a string of the Wolfram Mathematica code Examples ======== >>> from sympy import mathematica_code as mcode, symbols, sin >>> x = symbols('x') >>> mcode(sin(x).series(x).removeO()) '(1/120)*x^5 - 1/6*x^3 + x' """ return MCodePrinter(settings).doprint(expr)

046f2004065c2b5c26853a03fc4ca3b7b52caf5518193b686a15523fa697c6a3

""" C code printer The C89CodePrinter & C99CodePrinter converts single sympy expressions into single C expressions, using the functions defined in math.h where possible. A complete code generator, which uses ccode extensively, can be found in sympy.utilities.codegen. The codegen module can be used to generate complete source code files that are compilable without further modifications. """ from __future__ import print_function, division from functools import wraps from itertools import chain from sympy.core import S from sympy.core.compatibility import string_types, range from sympy.core.decorators import deprecated from sympy.codegen.ast import ( Assignment, Pointer, Variable, Declaration, real, complex_, integer, bool_, float32, float64, float80, complex64, complex128, intc, value_const, pointer_const, int8, int16, int32, int64, uint8, uint16, uint32, uint64, untyped ) from sympy.printing.codeprinter import CodePrinter, requires from sympy.printing.precedence import precedence, PRECEDENCE from sympy.sets.fancysets import Range # dictionary mapping sympy function to (argument_conditions, C_function). # Used in C89CodePrinter._print_Function(self) known_functions_C89 = { "Abs": [(lambda x: not x.is_integer, "fabs"), (lambda x: x.is_integer, "abs")], "sin": "sin", "cos": "cos", "tan": "tan", "asin": "asin", "acos": "acos", "atan": "atan", "atan2": "atan2", "exp": "exp", "log": "log", "sinh": "sinh", "cosh": "cosh", "tanh": "tanh", "floor": "floor", "ceiling": "ceil", } # move to C99 once CCodePrinter is removed: _known_functions_C9X = dict(known_functions_C89, **{ "asinh": "asinh", "acosh": "acosh", "atanh": "atanh", "erf": "erf", "gamma": "tgamma", }) known_functions = _known_functions_C9X known_functions_C99 = dict(_known_functions_C9X, **{ 'exp2': 'exp2', 'expm1': 'expm1', 'log10': 'log10', 'log2': 'log2', 'log1p': 'log1p', 'Cbrt': 'cbrt', 'hypot': 'hypot', 'fma': 'fma', 'loggamma': 'lgamma', 'erfc': 'erfc', 'Max': 'fmax', 'Min': 'fmin' }) # These are the core reserved words in the C language. Taken from: # http://en.cppreference.com/w/c/keyword reserved_words = [ 'auto', 'break', 'case', 'char', 'const', 'continue', 'default', 'do', 'double', 'else', 'enum', 'extern', 'float', 'for', 'goto', 'if', 'int', 'long', 'register', 'return', 'short', 'signed', 'sizeof', 'static', 'struct', 'entry', # never standardized, we'll leave it here anyway 'switch', 'typedef', 'union', 'unsigned', 'void', 'volatile', 'while' ] reserved_words_c99 = ['inline', 'restrict'] def get_math_macros(): """ Returns a dictionary with math-related macros from math.h/cmath Note that these macros are not strictly required by the C/C++-standard. For MSVC they are enabled by defining "_USE_MATH_DEFINES" (preferably via a compilation flag). Returns ======= Dictionary mapping sympy expressions to strings (macro names) """ from sympy.codegen.cfunctions import log2, Sqrt from sympy.functions.elementary.exponential import log from sympy.functions.elementary.miscellaneous import sqrt return { S.Exp1: 'M_E', log2(S.Exp1): 'M_LOG2E', 1/log(2): 'M_LOG2E', log(2): 'M_LN2', log(10): 'M_LN10', S.Pi: 'M_PI', S.Pi/2: 'M_PI_2', S.Pi/4: 'M_PI_4', 1/S.Pi: 'M_1_PI', 2/S.Pi: 'M_2_PI', 2/sqrt(S.Pi): 'M_2_SQRTPI', 2/Sqrt(S.Pi): 'M_2_SQRTPI', sqrt(2): 'M_SQRT2', Sqrt(2): 'M_SQRT2', 1/sqrt(2): 'M_SQRT1_2', 1/Sqrt(2): 'M_SQRT1_2' } def _as_macro_if_defined(meth): """ Decorator for printer methods When a Printer's method is decorated using this decorator the expressions printed will first be looked for in the attribute ``math_macros``, and if present it will print the macro name in ``math_macros`` followed by a type suffix for the type ``real``. e.g. printing ``sympy.pi`` would print ``M_PIl`` if real is mapped to float80. """ @wraps(meth) def _meth_wrapper(self, expr, **kwargs): if expr in self.math_macros: return '%s%s' % (self.math_macros[expr], self._get_math_macro_suffix(real)) else: return meth(self, expr, **kwargs) return _meth_wrapper class C89CodePrinter(CodePrinter): """A printer to convert python expressions to strings of c code""" printmethod = "_ccode" language = "C" standard = "C89" reserved_words = set(reserved_words) _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 17, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, 'contract': True, 'dereference': set(), 'error_on_reserved': False, 'reserved_word_suffix': '_', } type_aliases = { real: float64, complex_: complex128, integer: intc } type_mappings = { real: 'double', intc: 'int', float32: 'float', float64: 'double', integer: 'int', bool_: 'bool', int8: 'int8_t', int16: 'int16_t', int32: 'int32_t', int64: 'int64_t', uint8: 'int8_t', uint16: 'int16_t', uint32: 'int32_t', uint64: 'int64_t', } type_headers = { bool_: {'stdbool.h'}, int8: {'stdint.h'}, int16: {'stdint.h'}, int32: {'stdint.h'}, int64: {'stdint.h'}, uint8: {'stdint.h'}, uint16: {'stdint.h'}, uint32: {'stdint.h'}, uint64: {'stdint.h'}, } type_macros = {} # Macros needed to be defined when using a Type type_func_suffixes = { float32: 'f', float64: '', float80: 'l' } type_literal_suffixes = { float32: 'F', float64: '', float80: 'L' } type_math_macro_suffixes = { float80: 'l' } math_macros = None _ns = '' # namespace, C++ uses 'std::' _kf = known_functions_C89 # known_functions-dict to copy def __init__(self, settings=None): settings = settings or {} if self.math_macros is None: self.math_macros = settings.pop('math_macros', get_math_macros()) self.type_aliases = dict(chain(self.type_aliases.items(), settings.pop('type_aliases', {}).items())) self.type_mappings = dict(chain(self.type_mappings.items(), settings.pop('type_mappings', {}).items())) self.type_headers = dict(chain(self.type_headers.items(), settings.pop('type_headers', {}).items())) self.type_macros = dict(chain(self.type_macros.items(), settings.pop('type_macros', {}).items())) self.type_func_suffixes = dict(chain(self.type_func_suffixes.items(), settings.pop('type_func_suffixes', {}).items())) self.type_literal_suffixes = dict(chain(self.type_literal_suffixes.items(), settings.pop('type_literal_suffixes', {}).items())) self.type_math_macro_suffixes = dict(chain(self.type_math_macro_suffixes.items(), settings.pop('type_math_macro_suffixes', {}).items())) super(C89CodePrinter, self).__init__(settings) self.known_functions = dict(self._kf, **settings.get('user_functions', {})) self._dereference = set(settings.get('dereference', [])) self.headers = set() self.libraries = set() self.macros = set() def _rate_index_position(self, p): return p*5 def _get_statement(self, codestring): """ Get code string as a statement - i.e. ending with a semicolon. """ return codestring if codestring.endswith(';') else codestring + ';' def _get_comment(self, text): return "// {0}".format(text) def _declare_number_const(self, name, value): type_ = self.type_aliases[real] var = Variable(name, type=type_, value=value.evalf(type_.decimal_dig), attrs={value_const}) decl = Declaration(var) return self._get_statement(self._print(decl)) def _format_code(self, lines): return self.indent_code(lines) def _traverse_matrix_indices(self, mat): rows, cols = mat.shape return ((i, j) for i in range(rows) for j in range(cols)) @_as_macro_if_defined def _print_Mul(self, expr, **kwargs): return super(C89CodePrinter, self)._print_Mul(expr, **kwargs) @_as_macro_if_defined def _print_Pow(self, expr): if "Pow" in self.known_functions: return self._print_Function(expr) PREC = precedence(expr) suffix = self._get_func_suffix(real) if expr.exp == -1: return '1.0%s/%s' % (suffix.upper(), self.parenthesize(expr.base, PREC)) elif expr.exp == 0.5: return '%ssqrt%s(%s)' % (self._ns, suffix, self._print(expr.base)) elif expr.exp == S.One/3 and self.standard != 'C89': return '%scbrt%s(%s)' % (self._ns, suffix, self._print(expr.base)) else: return '%spow%s(%s, %s)' % (self._ns, suffix, self._print(expr.base), self._print(expr.exp)) def _print_Mod(self, expr): num, den = expr.args if num.is_integer and den.is_integer: return "(({}) % ({}))".format(self._print(num), self._print(den)) else: return self._print_math_func(expr, known='fmod') def _print_Rational(self, expr): p, q = int(expr.p), int(expr.q) suffix = self._get_literal_suffix(real) return '%d.0%s/%d.0%s' % (p, suffix, q, suffix) def _print_Indexed(self, expr): # calculate index for 1d array offset = getattr(expr.base, 'offset', S.Zero) strides = getattr(expr.base, 'strides', None) indices = expr.indices if strides is None or isinstance(strides, string_types): dims = expr.shape shift = S.One temp = tuple() if strides == 'C' or strides is None: traversal = reversed(range(expr.rank)) indices = indices[::-1] elif strides == 'F': traversal = range(expr.rank) for i in traversal: temp += (shift,) shift *= dims[i] strides = temp flat_index = sum([x[0]*x[1] for x in zip(indices, strides)]) + offset return "%s[%s]" % (self._print(expr.base.label), self._print(flat_index)) def _print_Idx(self, expr): return self._print(expr.label) @_as_macro_if_defined def _print_NumberSymbol(self, expr): return super(C89CodePrinter, self)._print_NumberSymbol(expr) def _print_Infinity(self, expr): return 'HUGE_VAL' def _print_NegativeInfinity(self, expr): return '-HUGE_VAL' def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] if expr.has(Assignment): for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s) {" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines.append("else {") else: lines.append("else if (%s) {" % self._print(c)) code0 = self._print(e) lines.append(code0) lines.append("}") return "\n".join(lines) else: # The piecewise was used in an expression, need to do inline # operators. This has the downside that inline operators will # not work for statements that span multiple lines (Matrix or # Indexed expressions). ecpairs = ["((%s) ? (\n%s\n)\n" % (self._print(c), self._print(e)) for e, c in expr.args[:-1]] last_line = ": (\n%s\n)" % self._print(expr.args[-1].expr) return ": ".join(ecpairs) + last_line + " ".join([")"*len(ecpairs)]) def _print_ITE(self, expr): from sympy.functions import Piecewise _piecewise = Piecewise((expr.args[1], expr.args[0]), (expr.args[2], True)) return self._print(_piecewise) def _print_MatrixElement(self, expr): return "{0}[{1}]".format(self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True), expr.j + expr.i*expr.parent.shape[1]) def _print_Symbol(self, expr): name = super(C89CodePrinter, self)._print_Symbol(expr) if expr in self._settings['dereference']: return '(*{0})'.format(name) else: return name def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_sinc(self, expr): from sympy.functions.elementary.trigonometric import sin from sympy.core.relational import Ne from sympy.functions import Piecewise _piecewise = Piecewise( (sin(expr.args[0]) / expr.args[0], Ne(expr.args[0], 0)), (1, True)) return self._print(_piecewise) def _print_For(self, expr): target = self._print(expr.target) if isinstance(expr.iterable, Range): start, stop, step = expr.iterable.args else: raise NotImplementedError("Only iterable currently supported is Range") body = self._print(expr.body) return ('for ({target} = {start}; {target} < {stop}; {target} += ' '{step}) {{\n{body}\n}}').format(target=target, start=start, stop=stop, step=step, body=body) def _print_sign(self, func): return '((({0}) > 0) - (({0}) < 0))'.format(self._print(func.args[0])) def _print_Max(self, expr): if "Max" in self.known_functions: return self._print_Function(expr) def inner_print_max(args): # The more natural abstraction of creating if len(args) == 1: # and printing smaller Max objects is slow return self._print(args[0]) # when there are many arguments. half = len(args) // 2 return "((%(a)s > %(b)s) ? %(a)s : %(b)s)" % { 'a': inner_print_max(args[:half]), 'b': inner_print_max(args[half:]) } return inner_print_max(expr.args) def _print_Min(self, expr): if "Min" in self.known_functions: return self._print_Function(expr) def inner_print_min(args): # The more natural abstraction of creating if len(args) == 1: # and printing smaller Min objects is slow return self._print(args[0]) # when there are many arguments. half = len(args) // 2 return "((%(a)s < %(b)s) ? %(a)s : %(b)s)" % { 'a': inner_print_min(args[:half]), 'b': inner_print_min(args[half:]) } return inner_print_min(expr.args) def indent_code(self, code): """Accepts a string of code or a list of code lines""" if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_token = ('{', '(', '{\n', '(\n') dec_token = ('}', ')') code = [line.lstrip(' \t') for line in code] increase = [int(any(map(line.endswith, inc_token))) for line in code] decrease = [int(any(map(line.startswith, dec_token))) for line in code] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tab*level, line)) level += increase[n] return pretty def _get_func_suffix(self, type_): return self.type_func_suffixes[self.type_aliases.get(type_, type_)] def _get_literal_suffix(self, type_): return self.type_literal_suffixes[self.type_aliases.get(type_, type_)] def _get_math_macro_suffix(self, type_): alias = self.type_aliases.get(type_, type_) dflt = self.type_math_macro_suffixes.get(alias, '') return self.type_math_macro_suffixes.get(type_, dflt) def _print_Type(self, type_): self.headers.update(self.type_headers.get(type_, set())) self.macros.update(self.type_macros.get(type_, set())) return self._print(self.type_mappings.get(type_, type_.name)) def _print_Declaration(self, decl): from sympy.codegen.cnodes import restrict var = decl.variable val = var.value if var.type == untyped: raise ValueError("C does not support untyped variables") if isinstance(var, Pointer): result = '{vc}{t} *{pc} {r}{s}'.format( vc='const ' if value_const in var.attrs else '', t=self._print(var.type), pc=' const' if pointer_const in var.attrs else '', r='restrict ' if restrict in var.attrs else '', s=self._print(var.symbol) ) elif isinstance(var, Variable): result = '{vc}{t} {s}'.format( vc='const ' if value_const in var.attrs else '', t=self._print(var.type), s=self._print(var.symbol) ) else: raise NotImplementedError("Unknown type of var: %s" % type(var)) if val != None: # Must be "!= None", cannot be "is not None" result += ' = %s' % self._print(val) return result def _print_Float(self, flt): type_ = self.type_aliases.get(real, real) self.macros.update(self.type_macros.get(type_, set())) suffix = self._get_literal_suffix(type_) num = str(flt.evalf(type_.decimal_dig)) if 'e' not in num and '.' not in num: num += '.0' num_parts = num.split('e') num_parts[0] = num_parts[0].rstrip('0') if num_parts[0].endswith('.'): num_parts[0] += '0' return 'e'.join(num_parts) + suffix @requires(headers={'stdbool.h'}) def _print_BooleanTrue(self, expr): return 'true' @requires(headers={'stdbool.h'}) def _print_BooleanFalse(self, expr): return 'false' def _print_Element(self, elem): if elem.strides == None: # Must be "== None", cannot be "is None" if elem.offset != None: # Must be "!= None", cannot be "is not None" raise ValueError("Expected strides when offset is given") idxs = ']['.join(map(lambda arg: self._print(arg), elem.indices)) else: global_idx = sum([i*s for i, s in zip(elem.indices, elem.strides)]) if elem.offset != None: # Must be "!= None", cannot be "is not None" global_idx += elem.offset idxs = self._print(global_idx) return "{symb}[{idxs}]".format( symb=self._print(elem.symbol), idxs=idxs ) def _print_CodeBlock(self, expr): """ Elements of code blocks printed as statements. """ return '\n'.join([self._get_statement(self._print(i)) for i in expr.args]) def _print_While(self, expr): return 'while ({condition}) {{\n{body}\n}}'.format(**expr.kwargs( apply=lambda arg: self._print(arg))) def _print_Scope(self, expr): return '{\n%s\n}' % self._print_CodeBlock(expr.body) @requires(headers={'stdio.h'}) def _print_Print(self, expr): return 'printf({fmt}, {pargs})'.format( fmt=self._print(expr.format_string), pargs=', '.join(map(lambda arg: self._print(arg), expr.print_args)) ) def _print_FunctionPrototype(self, expr): pars = ', '.join(map(lambda arg: self._print(Declaration(arg)), expr.parameters)) return "%s %s(%s)" % ( tuple(map(lambda arg: self._print(arg), (expr.return_type, expr.name))) + (pars,) ) def _print_FunctionDefinition(self, expr): return "%s%s" % (self._print_FunctionPrototype(expr), self._print_Scope(expr)) def _print_Return(self, expr): arg, = expr.args return 'return %s' % self._print(arg) def _print_CommaOperator(self, expr): return '(%s)' % ', '.join(map(lambda arg: self._print(arg), expr.args)) def _print_Label(self, expr): return '%s:' % str(expr) def _print_goto(self, expr): return 'goto %s' % expr.label def _print_PreIncrement(self, expr): arg, = expr.args return '++(%s)' % self._print(arg) def _print_PostIncrement(self, expr): arg, = expr.args return '(%s)++' % self._print(arg) def _print_PreDecrement(self, expr): arg, = expr.args return '--(%s)' % self._print(arg) def _print_PostDecrement(self, expr): arg, = expr.args return '(%s)--' % self._print(arg) def _print_struct(self, expr): return "%(keyword)s %(name)s {\n%(lines)s}" % dict( keyword=expr.__class__.__name__, name=expr.name, lines=';\n'.join( [self._print(decl) for decl in expr.declarations] + ['']) ) def _print_BreakToken(self, _): return 'break' def _print_ContinueToken(self, _): return 'continue' _print_union = _print_struct class _C9XCodePrinter(object): # Move these methods to C99CodePrinter when removing CCodePrinter def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] loopstart = "for (int %(var)s=%(start)s; %(var)s<%(end)s; %(var)s++){" # C99 for i in indices: # C arrays start at 0 and end at dimension-1 open_lines.append(loopstart % { 'var': self._print(i.label), 'start': self._print(i.lower), 'end': self._print(i.upper + 1)}) close_lines.append("}") return open_lines, close_lines @deprecated( last_supported_version='1.0', useinstead="C89CodePrinter or C99CodePrinter, e.g. ccode(..., standard='C99')", issue=12220, deprecated_since_version='1.1') class CCodePrinter(_C9XCodePrinter, C89CodePrinter): """ Deprecated. Alias for C89CodePrinter, for backwards compatibility. """ _kf = _known_functions_C9X # known_functions-dict to copy class C99CodePrinter(_C9XCodePrinter, C89CodePrinter): standard = 'C99' reserved_words = set(reserved_words + reserved_words_c99) type_mappings=dict(chain(C89CodePrinter.type_mappings.items(), { complex64: 'float complex', complex128: 'double complex', }.items())) type_headers = dict(chain(C89CodePrinter.type_headers.items(), { complex64: {'complex.h'}, complex128: {'complex.h'} }.items())) _kf = known_functions_C99 # known_functions-dict to copy # functions with versions with 'f' and 'l' suffixes: _prec_funcs = ('fabs fmod remainder remquo fma fmax fmin fdim nan exp exp2' ' expm1 log log10 log2 log1p pow sqrt cbrt hypot sin cos tan' ' asin acos atan atan2 sinh cosh tanh asinh acosh atanh erf' ' erfc tgamma lgamma ceil floor trunc round nearbyint rint' ' frexp ldexp modf scalbn ilogb logb nextafter copysign').split() def _print_Infinity(self, expr): return 'INFINITY' def _print_NegativeInfinity(self, expr): return '-INFINITY' def _print_NaN(self, expr): return 'NAN' # tgamma was already covered by 'known_functions' dict @requires(headers={'math.h'}, libraries={'m'}) @_as_macro_if_defined def _print_math_func(self, expr, nest=False, known=None): if known is None: known = self.known_functions[expr.__class__.__name__] if not isinstance(known, string_types): for cb, name in known: if cb(*expr.args): known = name break else: raise ValueError("No matching printer") try: return known(self, *expr.args) except TypeError: suffix = self._get_func_suffix(real) if self._ns + known in self._prec_funcs else '' if nest: args = self._print(expr.args[0]) if len(expr.args) > 1: paren_pile = '' for curr_arg in expr.args[1:-1]: paren_pile += ')' args += ', {ns}{name}{suffix}({next}'.format( ns=self._ns, name=known, suffix=suffix, next = self._print(curr_arg) ) args += ', %s%s' % ( self._print(expr.func(expr.args[-1])), paren_pile ) else: args = ', '.join(map(lambda arg: self._print(arg), expr.args)) return '{ns}{name}{suffix}({args})'.format( ns=self._ns, name=known, suffix=suffix, args=args ) def _print_Max(self, expr): return self._print_math_func(expr, nest=True) def _print_Min(self, expr): return self._print_math_func(expr, nest=True) for k in ('Abs Sqrt exp exp2 expm1 log log10 log2 log1p Cbrt hypot fma' ' loggamma sin cos tan asin acos atan atan2 sinh cosh tanh asinh acosh ' 'atanh erf erfc loggamma gamma ceiling floor').split(): setattr(C99CodePrinter, '_print_%s' % k, C99CodePrinter._print_math_func) class C11CodePrinter(C99CodePrinter): @requires(headers={'stdalign.h'}) def _print_alignof(self, expr): arg, = expr.args return 'alignof(%s)' % self._print(arg) c_code_printers = { 'c89': C89CodePrinter, 'c99': C99CodePrinter, 'c11': C11CodePrinter } def ccode(expr, assign_to=None, standard='c99', **settings): """Converts an expr to a string of c code Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of line-wrapping, or for expressions that generate multi-line statements. standard : str, optional String specifying the standard. If your compiler supports a more modern standard you may set this to 'c99' to allow the printer to use more math functions. [default='c89']. precision : integer, optional The precision for numbers such as pi [default=17]. user_functions : dict, optional A dictionary where the keys are string representations of either ``FunctionClass`` or ``UndefinedFunction`` instances and the values are their desired C string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)] or [(argument_test, cfunction_formater)]. See below for examples. dereference : iterable, optional An iterable of symbols that should be dereferenced in the printed code expression. These would be values passed by address to the function. For example, if ``dereference=[a]``, the resulting code would print ``(*a)`` instead of ``a``. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. Examples ======== >>> from sympy import ccode, symbols, Rational, sin, ceiling, Abs, Function >>> x, tau = symbols("x, tau") >>> expr = (2*tau)**Rational(7, 2) >>> ccode(expr) '8*M_SQRT2*pow(tau, 7.0/2.0)' >>> ccode(expr, math_macros={}) '8*sqrt(2)*pow(tau, 7.0/2.0)' >>> ccode(sin(x), assign_to="s") 's = sin(x);' >>> from sympy.codegen.ast import real, float80 >>> ccode(expr, type_aliases={real: float80}) '8*M_SQRT2l*powl(tau, 7.0L/2.0L)' Simple custom printing can be defined for certain types by passing a dictionary of {"type" : "function"} to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. >>> custom_functions = { ... "ceiling": "CEIL", ... "Abs": [(lambda x: not x.is_integer, "fabs"), ... (lambda x: x.is_integer, "ABS")], ... "func": "f" ... } >>> func = Function('func') >>> ccode(func(Abs(x) + ceiling(x)), standard='C89', user_functions=custom_functions) 'f(fabs(x) + CEIL(x))' or if the C-function takes a subset of the original arguments: >>> ccode(2**x + 3**x, standard='C99', user_functions={'Pow': [ ... (lambda b, e: b == 2, lambda b, e: 'exp2(%s)' % e), ... (lambda b, e: b != 2, 'pow')]}) 'exp2(x) + pow(3, x)' ``Piecewise`` expressions are converted into conditionals. If an ``assign_to`` variable is provided an if statement is created, otherwise the ternary operator is used. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> expr = Piecewise((x + 1, x > 0), (x, True)) >>> print(ccode(expr, tau, standard='C89')) if (x > 0) { tau = x + 1; } else { tau = x; } Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> ccode(e.rhs, assign_to=e.lhs, contract=False, standard='C89') 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions must be provided to ``assign_to``. Note that any expression that can be generated normally can also exist inside a Matrix: >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) >>> A = MatrixSymbol('A', 3, 1) >>> print(ccode(mat, A, standard='C89')) A[0] = pow(x, 2); if (x > 0) { A[1] = x + 1; } else { A[1] = x; } A[2] = sin(x); """ return c_code_printers[standard.lower()](settings).doprint(expr, assign_to) def print_ccode(expr, **settings): """Prints C representation of the given expression.""" print(ccode(expr, **settings))

ebb17aa2cdae84bd61289de82af86cb7080bfd173ceac43e52e3d4130c110a44

""" A MathML printer. """ from __future__ import print_function, division from sympy import sympify, S, Mul from sympy.core.compatibility import range, string_types, default_sort_key from sympy.core.function import _coeff_isneg from sympy.printing.conventions import split_super_sub, requires_partial from sympy.printing.precedence import precedence_traditional, PRECEDENCE from sympy.printing.pretty.pretty_symbology import greek_unicode from sympy.printing.printer import Printer import mpmath.libmp as mlib from mpmath.libmp import prec_to_dps class MathMLPrinterBase(Printer): """Contains common code required for MathMLContentPrinter and MathMLPresentationPrinter. """ _default_settings = { "order": None, "encoding": "utf-8", "fold_frac_powers": False, "fold_func_brackets": False, "fold_short_frac": None, "inv_trig_style": "abbreviated", "ln_notation": False, "long_frac_ratio": None, "mat_delim": "[", "mat_symbol_style": "plain", "mul_symbol": None, "root_notation": True, "symbol_names": {}, "mul_symbol_mathml_numbers": '·', } def __init__(self, settings=None): Printer.__init__(self, settings) from xml.dom.minidom import Document, Text self.dom = Document() # Workaround to allow strings to remain unescaped # Based on # https://stackoverflow.com/questions/38015864/python-xml-dom-minidom-\ # please-dont-escape-my-strings/38041194 class RawText(Text): def writexml(self, writer, indent='', addindent='', newl=''): if self.data: writer.write(u'{}{}{}'.format(indent, self.data, newl)) def createRawTextNode(data): r = RawText() r.data = data r.ownerDocument = self.dom return r self.dom.createTextNode = createRawTextNode def doprint(self, expr): """ Prints the expression as MathML. """ mathML = Printer._print(self, expr) unistr = mathML.toxml() xmlbstr = unistr.encode('ascii', 'xmlcharrefreplace') res = xmlbstr.decode() return res def apply_patch(self): # Applying the patch of xml.dom.minidom bug # Date: 2011-11-18 # Description: http://ronrothman.com/public/leftbraned/xml-dom-minidom\ # -toprettyxml-and-silly-whitespace/#best-solution # Issue: http://bugs.python.org/issue4147 # Patch: http://hg.python.org/cpython/rev/7262f8f276ff/ from xml.dom.minidom import Element, Text, Node, _write_data def writexml(self, writer, indent="", addindent="", newl=""): # indent = current indentation # addindent = indentation to add to higher levels # newl = newline string writer.write(indent + "<" + self.tagName) attrs = self._get_attributes() a_names = list(attrs.keys()) a_names.sort() for a_name in a_names: writer.write(" %s=\"" % a_name) _write_data(writer, attrs[a_name].value) writer.write("\"") if self.childNodes: writer.write(">") if (len(self.childNodes) == 1 and self.childNodes[0].nodeType == Node.TEXT_NODE): self.childNodes[0].writexml(writer, '', '', '') else: writer.write(newl) for node in self.childNodes: node.writexml( writer, indent + addindent, addindent, newl) writer.write(indent) writer.write("</%s>%s" % (self.tagName, newl)) else: writer.write("/>%s" % (newl)) self._Element_writexml_old = Element.writexml Element.writexml = writexml def writexml(self, writer, indent="", addindent="", newl=""): _write_data(writer, "%s%s%s" % (indent, self.data, newl)) self._Text_writexml_old = Text.writexml Text.writexml = writexml def restore_patch(self): from xml.dom.minidom import Element, Text Element.writexml = self._Element_writexml_old Text.writexml = self._Text_writexml_old class MathMLContentPrinter(MathMLPrinterBase): """Prints an expression to the Content MathML markup language. References: https://www.w3.org/TR/MathML2/chapter4.html """ printmethod = "_mathml_content" def mathml_tag(self, e): """Returns the MathML tag for an expression.""" translate = { 'Add': 'plus', 'Mul': 'times', 'Derivative': 'diff', 'Number': 'cn', 'int': 'cn', 'Pow': 'power', 'Max': 'max', 'Min': 'min', 'Abs': 'abs', 'And': 'and', 'Or': 'or', 'Xor': 'xor', 'Not': 'not', 'Implies': 'implies', 'Symbol': 'ci', 'MatrixSymbol': 'ci', 'RandomSymbol': 'ci', 'Integral': 'int', 'Sum': 'sum', 'sin': 'sin', 'cos': 'cos', 'tan': 'tan', 'cot': 'cot', 'csc': 'csc', 'sec': 'sec', 'sinh': 'sinh', 'cosh': 'cosh', 'tanh': 'tanh', 'coth': 'coth', 'csch': 'csch', 'sech': 'sech', 'asin': 'arcsin', 'asinh': 'arcsinh', 'acos': 'arccos', 'acosh': 'arccosh', 'atan': 'arctan', 'atanh': 'arctanh', 'atan2': 'arctan', 'acot': 'arccot', 'acoth': 'arccoth', 'asec': 'arcsec', 'asech': 'arcsech', 'acsc': 'arccsc', 'acsch': 'arccsch', 'log': 'ln', 'Equality': 'eq', 'Unequality': 'neq', 'GreaterThan': 'geq', 'LessThan': 'leq', 'StrictGreaterThan': 'gt', 'StrictLessThan': 'lt', } for cls in e.__class__.__mro__: n = cls.__name__ if n in translate: return translate[n] # Not found in the MRO set n = e.__class__.__name__ return n.lower() def _print_Mul(self, expr): if _coeff_isneg(expr): x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('minus')) x.appendChild(self._print_Mul(-expr)) return x from sympy.simplify import fraction numer, denom = fraction(expr) if denom is not S.One: x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('divide')) x.appendChild(self._print(numer)) x.appendChild(self._print(denom)) return x coeff, terms = expr.as_coeff_mul() if coeff is S.One and len(terms) == 1: # XXX since the negative coefficient has been handled, I don't # think a coeff of 1 can remain return self._print(terms[0]) if self.order != 'old': terms = Mul._from_args(terms).as_ordered_factors() x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('times')) if coeff != 1: x.appendChild(self._print(coeff)) for term in terms: x.appendChild(self._print(term)) return x def _print_Add(self, expr, order=None): args = self._as_ordered_terms(expr, order=order) lastProcessed = self._print(args[0]) plusNodes = [] for arg in args[1:]: if _coeff_isneg(arg): # use minus x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('minus')) x.appendChild(lastProcessed) x.appendChild(self._print(-arg)) # invert expression since this is now minused lastProcessed = x if arg == args[-1]: plusNodes.append(lastProcessed) else: plusNodes.append(lastProcessed) lastProcessed = self._print(arg) if arg == args[-1]: plusNodes.append(self._print(arg)) if len(plusNodes) == 1: return lastProcessed x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('plus')) while plusNodes: x.appendChild(plusNodes.pop(0)) return x def _print_MatrixBase(self, m): x = self.dom.createElement('matrix') for i in range(m.rows): x_r = self.dom.createElement('matrixrow') for j in range(m.cols): x_r.appendChild(self._print(m[i, j])) x.appendChild(x_r) return x def _print_Rational(self, e): if e.q == 1: # don't divide x = self.dom.createElement('cn') x.appendChild(self.dom.createTextNode(str(e.p))) return x x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('divide')) # numerator xnum = self.dom.createElement('cn') xnum.appendChild(self.dom.createTextNode(str(e.p))) # denominator xdenom = self.dom.createElement('cn') xdenom.appendChild(self.dom.createTextNode(str(e.q))) x.appendChild(xnum) x.appendChild(xdenom) return x def _print_Limit(self, e): x = self.dom.createElement('apply') x.appendChild(self.dom.createElement(self.mathml_tag(e))) x_1 = self.dom.createElement('bvar') x_2 = self.dom.createElement('lowlimit') x_1.appendChild(self._print(e.args[1])) x_2.appendChild(self._print(e.args[2])) x.appendChild(x_1) x.appendChild(x_2) x.appendChild(self._print(e.args[0])) return x def _print_ImaginaryUnit(self, e): return self.dom.createElement('imaginaryi') def _print_EulerGamma(self, e): return self.dom.createElement('eulergamma') def _print_GoldenRatio(self, e): """We use unicode #x3c6 for Greek letter phi as defined here http://www.w3.org/2003/entities/2007doc/isogrk1.html""" x = self.dom.createElement('cn') x.appendChild(self.dom.createTextNode(u"\N{GREEK SMALL LETTER PHI}")) return x def _print_Exp1(self, e): return self.dom.createElement('exponentiale') def _print_Pi(self, e): return self.dom.createElement('pi') def _print_Infinity(self, e): return self.dom.createElement('infinity') def _print_NaN(self, e): return self.dom.createElement('notanumber') def _print_EmptySet(self, e): return self.dom.createElement('emptyset') def _print_BooleanTrue(self, e): return self.dom.createElement('true') def _print_BooleanFalse(self, e): return self.dom.createElement('false') def _print_NegativeInfinity(self, e): x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('minus')) x.appendChild(self.dom.createElement('infinity')) return x def _print_Integral(self, e): def lime_recur(limits): x = self.dom.createElement('apply') x.appendChild(self.dom.createElement(self.mathml_tag(e))) bvar_elem = self.dom.createElement('bvar') bvar_elem.appendChild(self._print(limits[0][0])) x.appendChild(bvar_elem) if len(limits[0]) == 3: low_elem = self.dom.createElement('lowlimit') low_elem.appendChild(self._print(limits[0][1])) x.appendChild(low_elem) up_elem = self.dom.createElement('uplimit') up_elem.appendChild(self._print(limits[0][2])) x.appendChild(up_elem) if len(limits[0]) == 2: up_elem = self.dom.createElement('uplimit') up_elem.appendChild(self._print(limits[0][1])) x.appendChild(up_elem) if len(limits) == 1: x.appendChild(self._print(e.function)) else: x.appendChild(lime_recur(limits[1:])) return x limits = list(e.limits) limits.reverse() return lime_recur(limits) def _print_Sum(self, e): # Printer can be shared because Sum and Integral have the # same internal representation. return self._print_Integral(e) def _print_Symbol(self, sym): ci = self.dom.createElement(self.mathml_tag(sym)) def join(items): if len(items) > 1: mrow = self.dom.createElement('mml:mrow') for i, item in enumerate(items): if i > 0: mo = self.dom.createElement('mml:mo') mo.appendChild(self.dom.createTextNode(" ")) mrow.appendChild(mo) mi = self.dom.createElement('mml:mi') mi.appendChild(self.dom.createTextNode(item)) mrow.appendChild(mi) return mrow else: mi = self.dom.createElement('mml:mi') mi.appendChild(self.dom.createTextNode(items[0])) return mi # translate name, supers and subs to unicode characters def translate(s): if s in greek_unicode: return greek_unicode.get(s) else: return s name, supers, subs = split_super_sub(sym.name) name = translate(name) supers = [translate(sup) for sup in supers] subs = [translate(sub) for sub in subs] mname = self.dom.createElement('mml:mi') mname.appendChild(self.dom.createTextNode(name)) if not supers: if not subs: ci.appendChild(self.dom.createTextNode(name)) else: msub = self.dom.createElement('mml:msub') msub.appendChild(mname) msub.appendChild(join(subs)) ci.appendChild(msub) else: if not subs: msup = self.dom.createElement('mml:msup') msup.appendChild(mname) msup.appendChild(join(supers)) ci.appendChild(msup) else: msubsup = self.dom.createElement('mml:msubsup') msubsup.appendChild(mname) msubsup.appendChild(join(subs)) msubsup.appendChild(join(supers)) ci.appendChild(msubsup) return ci _print_MatrixSymbol = _print_Symbol _print_RandomSymbol = _print_Symbol def _print_Pow(self, e): # Here we use root instead of power if the exponent is the reciprocal # of an integer if (self._settings['root_notation'] and e.exp.is_Rational and e.exp.p == 1): x = self.dom.createElement('apply') x.appendChild(self.dom.createElement('root')) if e.exp.q != 2: xmldeg = self.dom.createElement('degree') xmlci = self.dom.createElement('ci') xmlci.appendChild(self.dom.createTextNode(str(e.exp.q))) xmldeg.appendChild(xmlci) x.appendChild(xmldeg) x.appendChild(self._print(e.base)) return x x = self.dom.createElement('apply') x_1 = self.dom.createElement(self.mathml_tag(e)) x.appendChild(x_1) x.appendChild(self._print(e.base)) x.appendChild(self._print(e.exp)) return x def _print_Number(self, e): x = self.dom.createElement(self.mathml_tag(e)) x.appendChild(self.dom.createTextNode(str(e))) return x def _print_Derivative(self, e): x = self.dom.createElement('apply') diff_symbol = self.mathml_tag(e) if requires_partial(e): diff_symbol = 'partialdiff' x.appendChild(self.dom.createElement(diff_symbol)) x_1 = self.dom.createElement('bvar') for sym, times in reversed(e.variable_count): x_1.appendChild(self._print(sym)) if times > 1: degree = self.dom.createElement('degree') degree.appendChild(self._print(sympify(times))) x_1.appendChild(degree) x.appendChild(x_1) x.appendChild(self._print(e.expr)) return x def _print_Function(self, e): x = self.dom.createElement("apply") x.appendChild(self.dom.createElement(self.mathml_tag(e))) for arg in e.args: x.appendChild(self._print(arg)) return x def _print_Basic(self, e): x = self.dom.createElement(self.mathml_tag(e)) for arg in e.args: x.appendChild(self._print(arg)) return x def _print_AssocOp(self, e): x = self.dom.createElement('apply') x_1 = self.dom.createElement(self.mathml_tag(e)) x.appendChild(x_1) for arg in e.args: x.appendChild(self._print(arg)) return x def _print_Relational(self, e): x = self.dom.createElement('apply') x.appendChild(self.dom.createElement(self.mathml_tag(e))) x.appendChild(self._print(e.lhs)) x.appendChild(self._print(e.rhs)) return x def _print_list(self, seq): """MathML reference for the <list> element: http://www.w3.org/TR/MathML2/chapter4.html#contm.list""" dom_element = self.dom.createElement('list') for item in seq: dom_element.appendChild(self._print(item)) return dom_element def _print_int(self, p): dom_element = self.dom.createElement(self.mathml_tag(p)) dom_element.appendChild(self.dom.createTextNode(str(p))) return dom_element _print_Implies = _print_AssocOp _print_Not = _print_AssocOp _print_Xor = _print_AssocOp class MathMLPresentationPrinter(MathMLPrinterBase): """Prints an expression to the Presentation MathML markup language. References: https://www.w3.org/TR/MathML2/chapter3.html """ printmethod = "_mathml_presentation" def mathml_tag(self, e): """Returns the MathML tag for an expression.""" translate = { 'Number': 'mn', 'Limit': '→', 'Derivative': '&dd;', 'int': 'mn', 'Symbol': 'mi', 'Integral': '∫', 'Sum': '∑', 'sin': 'sin', 'cos': 'cos', 'tan': 'tan', 'cot': 'cot', 'asin': 'arcsin', 'asinh': 'arcsinh', 'acos': 'arccos', 'acosh': 'arccosh', 'atan': 'arctan', 'atanh': 'arctanh', 'acot': 'arccot', 'atan2': 'arctan', 'Equality': '=', 'Unequality': '≠', 'GreaterThan': '≥', 'LessThan': '≤', 'StrictGreaterThan': '>', 'StrictLessThan': '<', 'lerchphi': 'Φ', 'zeta': 'ζ', 'dirichlet_eta': 'η', 'elliptic_k': 'Κ', 'lowergamma': 'γ', 'uppergamma': 'Γ', 'gamma': 'Γ', 'totient': 'ϕ', 'reduced_totient': 'λ', 'primenu': 'ν', 'primeomega': 'Ω', 'fresnels': 'S', 'fresnelc': 'C', 'LambertW': 'W', 'Heaviside': 'Θ', 'BooleanTrue': 'True', 'BooleanFalse': 'False', 'NoneType': 'None', 'mathieus': 'S', 'mathieuc': 'C', 'mathieusprime': 'S′', 'mathieucprime': 'C′', } def mul_symbol_selection(): if (self._settings["mul_symbol"] is None or self._settings["mul_symbol"] == 'None'): return '⁢' elif self._settings["mul_symbol"] == 'times': return '×' elif self._settings["mul_symbol"] == 'dot': return '·' elif self._settings["mul_symbol"] == 'ldot': return '․' elif not isinstance(self._settings["mul_symbol"], string_types): raise TypeError else: return self._settings["mul_symbol"] for cls in e.__class__.__mro__: n = cls.__name__ if n in translate: return translate[n] # Not found in the MRO set if e.__class__.__name__ == "Mul": return mul_symbol_selection() n = e.__class__.__name__ return n.lower() def parenthesize(self, item, level, strict=False): prec_val = precedence_traditional(item) if (prec_val < level) or ((not strict) and prec_val <= level): brac = self.dom.createElement('mfenced') brac.appendChild(self._print(item)) return brac else: return self._print(item) def _print_Mul(self, expr): def multiply(expr, mrow): from sympy.simplify import fraction numer, denom = fraction(expr) if denom is not S.One: frac = self.dom.createElement('mfrac') if self._settings["fold_short_frac"] and len(str(expr)) < 7: frac.setAttribute('bevelled', 'true') xnum = self._print(numer) xden = self._print(denom) frac.appendChild(xnum) frac.appendChild(xden) mrow.appendChild(frac) return mrow coeff, terms = expr.as_coeff_mul() if coeff is S.One and len(terms) == 1: mrow.appendChild(self._print(terms[0])) return mrow if self.order != 'old': terms = Mul._from_args(terms).as_ordered_factors() if coeff != 1: x = self._print(coeff) y = self.dom.createElement('mo') y.appendChild(self.dom.createTextNode(self.mathml_tag(expr))) mrow.appendChild(x) mrow.appendChild(y) for term in terms: mrow.appendChild(self.parenthesize(term, PRECEDENCE['Mul'])) if not term == terms[-1]: y = self.dom.createElement('mo') y.appendChild(self.dom.createTextNode(self.mathml_tag(expr))) mrow.appendChild(y) return mrow mrow = self.dom.createElement('mrow') if _coeff_isneg(expr): x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode('-')) mrow.appendChild(x) mrow = multiply(-expr, mrow) else: mrow = multiply(expr, mrow) return mrow def _print_Add(self, expr, order=None): mrow = self.dom.createElement('mrow') args = self._as_ordered_terms(expr, order=order) mrow.appendChild(self._print(args[0])) for arg in args[1:]: if _coeff_isneg(arg): # use minus x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode('-')) y = self._print(-arg) # invert expression since this is now minused else: x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode('+')) y = self._print(arg) mrow.appendChild(x) mrow.appendChild(y) return mrow def _print_MatrixBase(self, m): table = self.dom.createElement('mtable') for i in range(m.rows): x = self.dom.createElement('mtr') for j in range(m.cols): y = self.dom.createElement('mtd') y.appendChild(self._print(m[i, j])) x.appendChild(y) table.appendChild(x) if self._settings["mat_delim"] == '': return table brac = self.dom.createElement('mfenced') if self._settings["mat_delim"] == "[": brac.setAttribute('close', ']') brac.setAttribute('open', '[') brac.appendChild(table) return brac def _get_printed_Rational(self, e, folded=None): if e.p < 0: p = -e.p else: p = e.p x = self.dom.createElement('mfrac') if folded or self._settings["fold_short_frac"]: x.setAttribute('bevelled', 'true') x.appendChild(self._print(p)) x.appendChild(self._print(e.q)) if e.p < 0: mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('-')) mrow.appendChild(mo) mrow.appendChild(x) return mrow else: return x def _print_Rational(self, e): if e.q == 1: # don't divide return self._print(e.p) return self._get_printed_Rational(e, self._settings["fold_short_frac"]) def _print_Limit(self, e): mrow = self.dom.createElement('mrow') munder = self.dom.createElement('munder') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode('lim')) x = self.dom.createElement('mrow') x_1 = self._print(e.args[1]) arrow = self.dom.createElement('mo') arrow.appendChild(self.dom.createTextNode(self.mathml_tag(e))) x_2 = self._print(e.args[2]) x.appendChild(x_1) x.appendChild(arrow) x.appendChild(x_2) munder.appendChild(mi) munder.appendChild(x) mrow.appendChild(munder) mrow.appendChild(self._print(e.args[0])) return mrow def _print_ImaginaryUnit(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('&ImaginaryI;')) return x def _print_GoldenRatio(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('Φ')) return x def _print_Exp1(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('&ExponentialE;')) return x def _print_Pi(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('π')) return x def _print_Infinity(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('∞')) return x def _print_NegativeInfinity(self, e): mrow = self.dom.createElement('mrow') y = self.dom.createElement('mo') y.appendChild(self.dom.createTextNode('-')) x = self._print_Infinity(e) mrow.appendChild(y) mrow.appendChild(x) return mrow def _print_HBar(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('ℏ')) return x def _print_EulerGamma(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('γ')) return x def _print_TribonacciConstant(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('TribonacciConstant')) return x def _print_Dagger(self, e): msup = self.dom.createElement('msup') msup.appendChild(self._print(e.args[0])) msup.appendChild(self.dom.createTextNode('†')) return msup def _print_Contains(self, e): mrow = self.dom.createElement('mrow') mrow.appendChild(self._print(e.args[0])) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∈')) mrow.appendChild(mo) mrow.appendChild(self._print(e.args[1])) return mrow def _print_HilbertSpace(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('ℋ')) return x def _print_ComplexSpace(self, e): msup = self.dom.createElement('msup') msup.appendChild(self.dom.createTextNode('𝒞')) msup.appendChild(self._print(e.args[0])) return msup def _print_FockSpace(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('ℱ')) return x def _print_Integral(self, expr): intsymbols = {1: "∫", 2: "∬", 3: "∭"} mrow = self.dom.createElement('mrow') if len(expr.limits) <= 3 and all(len(lim) == 1 for lim in expr.limits): # Only up to three-integral signs exists mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode(intsymbols[len(expr.limits)])) mrow.appendChild(mo) else: # Either more than three or limits provided for lim in reversed(expr.limits): mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode(intsymbols[1])) if len(lim) == 1: mrow.appendChild(mo) if len(lim) == 2: msup = self.dom.createElement('msup') msup.appendChild(mo) msup.appendChild(self._print(lim[1])) mrow.appendChild(msup) if len(lim) == 3: msubsup = self.dom.createElement('msubsup') msubsup.appendChild(mo) msubsup.appendChild(self._print(lim[1])) msubsup.appendChild(self._print(lim[2])) mrow.appendChild(msubsup) # print function mrow.appendChild(self.parenthesize(expr.function, PRECEDENCE["Mul"], strict=True)) # print integration variables for lim in reversed(expr.limits): d = self.dom.createElement('mo') d.appendChild(self.dom.createTextNode('&dd;')) mrow.appendChild(d) mrow.appendChild(self._print(lim[0])) return mrow def _print_Sum(self, e): limits = list(e.limits) subsup = self.dom.createElement('munderover') low_elem = self._print(limits[0][1]) up_elem = self._print(limits[0][2]) summand = self.dom.createElement('mo') summand.appendChild(self.dom.createTextNode(self.mathml_tag(e))) low = self.dom.createElement('mrow') var = self._print(limits[0][0]) equal = self.dom.createElement('mo') equal.appendChild(self.dom.createTextNode('=')) low.appendChild(var) low.appendChild(equal) low.appendChild(low_elem) subsup.appendChild(summand) subsup.appendChild(low) subsup.appendChild(up_elem) mrow = self.dom.createElement('mrow') mrow.appendChild(subsup) if len(str(e.function)) == 1: mrow.appendChild(self._print(e.function)) else: fence = self.dom.createElement('mfenced') fence.appendChild(self._print(e.function)) mrow.appendChild(fence) return mrow def _print_Symbol(self, sym, style='plain'): def join(items): if len(items) > 1: mrow = self.dom.createElement('mrow') for i, item in enumerate(items): if i > 0: mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode(" ")) mrow.appendChild(mo) mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(item)) mrow.appendChild(mi) return mrow else: mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(items[0])) return mi # translate name, supers and subs to unicode characters def translate(s): if s in greek_unicode: return greek_unicode.get(s) else: return s name, supers, subs = split_super_sub(sym.name) name = translate(name) supers = [translate(sup) for sup in supers] subs = [translate(sub) for sub in subs] mname = self.dom.createElement('mi') mname.appendChild(self.dom.createTextNode(name)) if len(supers) == 0: if len(subs) == 0: x = mname else: x = self.dom.createElement('msub') x.appendChild(mname) x.appendChild(join(subs)) else: if len(subs) == 0: x = self.dom.createElement('msup') x.appendChild(mname) x.appendChild(join(supers)) else: x = self.dom.createElement('msubsup') x.appendChild(mname) x.appendChild(join(subs)) x.appendChild(join(supers)) # Set bold font? if style == 'bold': x.setAttribute('mathvariant', 'bold') return x def _print_MatrixSymbol(self, sym): return self._print_Symbol(sym, style=self._settings['mat_symbol_style']) _print_RandomSymbol = _print_Symbol def _print_conjugate(self, expr): enc = self.dom.createElement('menclose') enc.setAttribute('notation', 'top') enc.appendChild(self._print(expr.args[0])) return enc def _print_operator_after(self, op, expr): row = self.dom.createElement('mrow') row.appendChild(self.parenthesize(expr, PRECEDENCE["Func"])) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode(op)) row.appendChild(mo) return row def _print_factorial(self, expr): return self._print_operator_after('!', expr.args[0]) def _print_factorial2(self, expr): return self._print_operator_after('!!', expr.args[0]) def _print_binomial(self, expr): brac = self.dom.createElement('mfenced') frac = self.dom.createElement('mfrac') frac.setAttribute('linethickness', '0') frac.appendChild(self._print(expr.args[0])) frac.appendChild(self._print(expr.args[1])) brac.appendChild(frac) return brac def _print_Pow(self, e): # Here we use root instead of power if the exponent is the # reciprocal of an integer if (e.exp.is_Rational and abs(e.exp.p) == 1 and e.exp.q != 1 and self._settings['root_notation']): if e.exp.q == 2: x = self.dom.createElement('msqrt') x.appendChild(self._print(e.base)) if e.exp.q != 2: x = self.dom.createElement('mroot') x.appendChild(self._print(e.base)) x.appendChild(self._print(e.exp.q)) if e.exp.p == -1: frac = self.dom.createElement('mfrac') frac.appendChild(self._print(1)) frac.appendChild(x) return frac else: return x if e.exp.is_Rational and e.exp.q != 1: if e.exp.is_negative: top = self.dom.createElement('mfrac') top.appendChild(self._print(1)) x = self.dom.createElement('msup') x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow'])) x.appendChild(self._get_printed_Rational(-e.exp, self._settings['fold_frac_powers'])) top.appendChild(x) return top else: x = self.dom.createElement('msup') x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow'])) x.appendChild(self._get_printed_Rational(e.exp, self._settings['fold_frac_powers'])) return x if e.exp.is_negative: top = self.dom.createElement('mfrac') top.appendChild(self._print(1)) if e.exp == -1: top.appendChild(self._print(e.base)) else: x = self.dom.createElement('msup') x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow'])) x.appendChild(self._print(-e.exp)) top.appendChild(x) return top x = self.dom.createElement('msup') x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow'])) x.appendChild(self._print(e.exp)) return x def _print_Number(self, e): x = self.dom.createElement(self.mathml_tag(e)) x.appendChild(self.dom.createTextNode(str(e))) return x def _print_AccumulationBounds(self, i): brac = self.dom.createElement('mfenced') brac.setAttribute('close', u'\u27e9') brac.setAttribute('open', u'\u27e8') brac.appendChild(self._print(i.min)) brac.appendChild(self._print(i.max)) return brac def _print_Derivative(self, e): if requires_partial(e): d = '∂' else: d = self.mathml_tag(e) # Determine denominator m = self.dom.createElement('mrow') dim = 0 # Total diff dimension, for numerator for sym, num in reversed(e.variable_count): dim += num if num >= 2: x = self.dom.createElement('msup') xx = self.dom.createElement('mo') xx.appendChild(self.dom.createTextNode(d)) x.appendChild(xx) x.appendChild(self._print(num)) else: x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode(d)) m.appendChild(x) y = self._print(sym) m.appendChild(y) mnum = self.dom.createElement('mrow') if dim >= 2: x = self.dom.createElement('msup') xx = self.dom.createElement('mo') xx.appendChild(self.dom.createTextNode(d)) x.appendChild(xx) x.appendChild(self._print(dim)) else: x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode(d)) mnum.appendChild(x) mrow = self.dom.createElement('mrow') frac = self.dom.createElement('mfrac') frac.appendChild(mnum) frac.appendChild(m) mrow.appendChild(frac) # Print function mrow.appendChild(self._print(e.expr)) return mrow def _print_Function(self, e): mrow = self.dom.createElement('mrow') x = self.dom.createElement('mi') if self.mathml_tag(e) == 'log' and self._settings["ln_notation"]: x.appendChild(self.dom.createTextNode('ln')) else: x.appendChild(self.dom.createTextNode(self.mathml_tag(e))) y = self.dom.createElement('mfenced') for arg in e.args: y.appendChild(self._print(arg)) mrow.appendChild(x) mrow.appendChild(y) return mrow def _print_Float(self, expr): # Based off of that in StrPrinter dps = prec_to_dps(expr._prec) str_real = mlib.to_str(expr._mpf_, dps, strip_zeros=True) # Must always have a mul symbol (as 2.5 10^{20} just looks odd) # thus we use the number separator separator = self._settings['mul_symbol_mathml_numbers'] mrow = self.dom.createElement('mrow') if 'e' in str_real: (mant, exp) = str_real.split('e') if exp[0] == '+': exp = exp[1:] mn = self.dom.createElement('mn') mn.appendChild(self.dom.createTextNode(mant)) mrow.appendChild(mn) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode(separator)) mrow.appendChild(mo) msup = self.dom.createElement('msup') mn = self.dom.createElement('mn') mn.appendChild(self.dom.createTextNode("10")) msup.appendChild(mn) mn = self.dom.createElement('mn') mn.appendChild(self.dom.createTextNode(exp)) msup.appendChild(mn) mrow.appendChild(msup) return mrow elif str_real == "+inf": return self._print_Infinity(None) elif str_real == "-inf": return self._print_NegativeInfinity(None) else: mn = self.dom.createElement('mn') mn.appendChild(self.dom.createTextNode(str_real)) return mn def _print_polylog(self, expr): mrow = self.dom.createElement('mrow') m = self.dom.createElement('msub') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode('Li')) m.appendChild(mi) m.appendChild(self._print(expr.args[0])) mrow.appendChild(m) brac = self.dom.createElement('mfenced') brac.appendChild(self._print(expr.args[1])) mrow.appendChild(brac) return mrow def _print_Basic(self, e): mrow = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(self.mathml_tag(e))) mrow.appendChild(mi) brac = self.dom.createElement('mfenced') for arg in e.args: brac.appendChild(self._print(arg)) mrow.appendChild(brac) return mrow def _print_Tuple(self, e): mrow = self.dom.createElement('mrow') x = self.dom.createElement('mfenced') for arg in e.args: x.appendChild(self._print(arg)) mrow.appendChild(x) return mrow def _print_Interval(self, i): mrow = self.dom.createElement('mrow') brac = self.dom.createElement('mfenced') if i.start == i.end: # Most often, this type of Interval is converted to a FiniteSet brac.setAttribute('close', '}') brac.setAttribute('open', '{') brac.appendChild(self._print(i.start)) else: if i.right_open: brac.setAttribute('close', ')') else: brac.setAttribute('close', ']') if i.left_open: brac.setAttribute('open', '(') else: brac.setAttribute('open', '[') brac.appendChild(self._print(i.start)) brac.appendChild(self._print(i.end)) mrow.appendChild(brac) return mrow def _print_Abs(self, expr, exp=None): mrow = self.dom.createElement('mrow') x = self.dom.createElement('mfenced') x.setAttribute('close', '|') x.setAttribute('open', '|') x.appendChild(self._print(expr.args[0])) mrow.appendChild(x) return mrow _print_Determinant = _print_Abs def _print_re_im(self, c, expr): mrow = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.setAttribute('mathvariant', 'fraktur') mi.appendChild(self.dom.createTextNode(c)) mrow.appendChild(mi) brac = self.dom.createElement('mfenced') brac.appendChild(self._print(expr)) mrow.appendChild(brac) return mrow def _print_re(self, expr, exp=None): return self._print_re_im('R', expr.args[0]) def _print_im(self, expr, exp=None): return self._print_re_im('I', expr.args[0]) def _print_AssocOp(self, e): mrow = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(self.mathml_tag(e))) mrow.appendChild(mi) for arg in e.args: mrow.appendChild(self._print(arg)) return mrow def _print_SetOp(self, expr, symbol): mrow = self.dom.createElement('mrow') mrow.appendChild(self._print(expr.args[0])) for arg in expr.args[1:]: x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode(symbol)) y = self._print(arg) mrow.appendChild(x) mrow.appendChild(y) return mrow def _print_Union(self, expr): return self._print_SetOp(expr, '∪') def _print_Intersection(self, expr): return self._print_SetOp(expr, '∩') def _print_Complement(self, expr): return self._print_SetOp(expr, '∖') def _print_SymmetricDifference(self, expr): return self._print_SetOp(expr, '∆') def _print_FiniteSet(self, s): return self._print_set(s.args) def _print_set(self, s): items = sorted(s, key=default_sort_key) brac = self.dom.createElement('mfenced') brac.setAttribute('close', '}') brac.setAttribute('open', '{') for item in items: brac.appendChild(self._print(item)) return brac _print_frozenset = _print_set def _print_LogOp(self, args, symbol): mrow = self.dom.createElement('mrow') if args[0].is_Boolean and not args[0].is_Not: brac = self.dom.createElement('mfenced') brac.appendChild(self._print(args[0])) mrow.appendChild(brac) else: mrow.appendChild(self._print(args[0])) for arg in args[1:]: x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode(symbol)) if arg.is_Boolean and not arg.is_Not: y = self.dom.createElement('mfenced') y.appendChild(self._print(arg)) else: y = self._print(arg) mrow.appendChild(x) mrow.appendChild(y) return mrow def _print_BasisDependent(self, expr): from sympy.vector import Vector if expr == expr.zero: # Not clear if this is ever called return self._print(expr.zero) if isinstance(expr, Vector): items = expr.separate().items() else: items = [(0, expr)] mrow = self.dom.createElement('mrow') for system, vect in items: inneritems = list(vect.components.items()) inneritems.sort(key = lambda x:x[0].__str__()) for i, (k, v) in enumerate(inneritems): if v == 1: if i: # No + for first item mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('+')) mrow.appendChild(mo) mrow.appendChild(self._print(k)) elif v == -1: mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('-')) mrow.appendChild(mo) mrow.appendChild(self._print(k)) else: if i: # No + for first item mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('+')) mrow.appendChild(mo) mbrac = self.dom.createElement('mfenced') mbrac.appendChild(self._print(v)) mrow.appendChild(mbrac) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('⁢')) mrow.appendChild(mo) mrow.appendChild(self._print(k)) return mrow def _print_And(self, expr): args = sorted(expr.args, key=default_sort_key) return self._print_LogOp(args, '∧') def _print_Or(self, expr): args = sorted(expr.args, key=default_sort_key) return self._print_LogOp(args, '∨') def _print_Xor(self, expr): args = sorted(expr.args, key=default_sort_key) return self._print_LogOp(args, '⊻') def _print_Implies(self, expr): return self._print_LogOp(expr.args, '⇒') def _print_Equivalent(self, expr): args = sorted(expr.args, key=default_sort_key) return self._print_LogOp(args, '⇔') def _print_Not(self, e): mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('¬')) mrow.appendChild(mo) if (e.args[0].is_Boolean): x = self.dom.createElement('mfenced') x.appendChild(self._print(e.args[0])) else: x = self._print(e.args[0]) mrow.appendChild(x) return mrow def _print_bool(self, e): mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(self.mathml_tag(e))) return mi _print_BooleanTrue = _print_bool _print_BooleanFalse = _print_bool def _print_NoneType(self, e): mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(self.mathml_tag(e))) return mi def _print_Range(self, s): dots = u"\u2026" brac = self.dom.createElement('mfenced') brac.setAttribute('close', '}') brac.setAttribute('open', '{') if s.start.is_infinite: printset = dots, s[-1] - s.step, s[-1] elif s.stop.is_infinite: it = iter(s) printset = next(it), next(it), dots elif len(s) > 4: it = iter(s) printset = next(it), next(it), dots, s[-1] else: printset = tuple(s) for el in printset: if el == dots: mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(dots)) brac.appendChild(mi) else: brac.appendChild(self._print(el)) return brac def _hprint_variadic_function(self, expr): args = sorted(expr.args, key=default_sort_key) mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode((str(expr.func)).lower())) mrow.appendChild(mo) brac = self.dom.createElement('mfenced') for symbol in args: brac.appendChild(self._print(symbol)) mrow.appendChild(brac) return mrow _print_Min = _print_Max = _hprint_variadic_function def _print_exp(self, expr): msup = self.dom.createElement('msup') msup.appendChild(self._print_Exp1(None)) msup.appendChild(self._print(expr.args[0])) return msup def _print_Relational(self, e): mrow = self.dom.createElement('mrow') mrow.appendChild(self._print(e.lhs)) x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode(self.mathml_tag(e))) mrow.appendChild(x) mrow.appendChild(self._print(e.rhs)) return mrow def _print_int(self, p): dom_element = self.dom.createElement(self.mathml_tag(p)) dom_element.appendChild(self.dom.createTextNode(str(p))) return dom_element def _print_BaseScalar(self, e): msub = self.dom.createElement('msub') index, system = e._id mi = self.dom.createElement('mi') mi.setAttribute('mathvariant', 'bold') mi.appendChild(self.dom.createTextNode(system._variable_names[index])) msub.appendChild(mi) mi = self.dom.createElement('mi') mi.setAttribute('mathvariant', 'bold') mi.appendChild(self.dom.createTextNode(system._name)) msub.appendChild(mi) return msub def _print_BaseVector(self, e): msub = self.dom.createElement('msub') index, system = e._id mover = self.dom.createElement('mover') mi = self.dom.createElement('mi') mi.setAttribute('mathvariant', 'bold') mi.appendChild(self.dom.createTextNode(system._vector_names[index])) mover.appendChild(mi) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('^')) mover.appendChild(mo) msub.appendChild(mover) mi = self.dom.createElement('mi') mi.setAttribute('mathvariant', 'bold') mi.appendChild(self.dom.createTextNode(system._name)) msub.appendChild(mi) return msub def _print_VectorZero(self, e): mover = self.dom.createElement('mover') mi = self.dom.createElement('mi') mi.setAttribute('mathvariant', 'bold') mi.appendChild(self.dom.createTextNode("0")) mover.appendChild(mi) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('^')) mover.appendChild(mo) return mover def _print_Cross(self, expr): mrow = self.dom.createElement('mrow') vec1 = expr._expr1 vec2 = expr._expr2 mrow.appendChild(self.parenthesize(vec1, PRECEDENCE['Mul'])) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('×')) mrow.appendChild(mo) mrow.appendChild(self.parenthesize(vec2, PRECEDENCE['Mul'])) return mrow def _print_Curl(self, expr): mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∇')) mrow.appendChild(mo) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('×')) mrow.appendChild(mo) mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul'])) return mrow def _print_Divergence(self, expr): mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∇')) mrow.appendChild(mo) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('·')) mrow.appendChild(mo) mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul'])) return mrow def _print_Dot(self, expr): mrow = self.dom.createElement('mrow') vec1 = expr._expr1 vec2 = expr._expr2 mrow.appendChild(self.parenthesize(vec1, PRECEDENCE['Mul'])) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('·')) mrow.appendChild(mo) mrow.appendChild(self.parenthesize(vec2, PRECEDENCE['Mul'])) return mrow def _print_Gradient(self, expr): mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∇')) mrow.appendChild(mo) mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul'])) return mrow def _print_Laplacian(self, expr): mrow = self.dom.createElement('mrow') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∆')) mrow.appendChild(mo) mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul'])) return mrow def _print_Integers(self, e): x = self.dom.createElement('mi') x.setAttribute('mathvariant', 'normal') x.appendChild(self.dom.createTextNode('ℤ')) return x def _print_Complexes(self, e): x = self.dom.createElement('mi') x.setAttribute('mathvariant', 'normal') x.appendChild(self.dom.createTextNode('ℂ')) return x def _print_Reals(self, e): x = self.dom.createElement('mi') x.setAttribute('mathvariant', 'normal') x.appendChild(self.dom.createTextNode('ℝ')) return x def _print_Naturals(self, e): x = self.dom.createElement('mi') x.setAttribute('mathvariant', 'normal') x.appendChild(self.dom.createTextNode('ℕ')) return x def _print_Naturals0(self, e): sub = self.dom.createElement('msub') x = self.dom.createElement('mi') x.setAttribute('mathvariant', 'normal') x.appendChild(self.dom.createTextNode('ℕ')) sub.appendChild(x) sub.appendChild(self._print(S.Zero)) return sub def _print_SingularityFunction(self, expr): shift = expr.args[0] - expr.args[1] power = expr.args[2] sup = self.dom.createElement('msup') brac = self.dom.createElement('mfenced') brac.setAttribute('close', u'\u27e9') brac.setAttribute('open', u'\u27e8') brac.appendChild(self._print(shift)) sup.appendChild(brac) sup.appendChild(self._print(power)) return sup def _print_NaN(self, e): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('NaN')) return x def _print_number_function(self, e, name): # Print name_arg[0] for one argument or name_arg[0](arg[1]) # for more than one argument sub = self.dom.createElement('msub') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode(name)) sub.appendChild(mi) sub.appendChild(self._print(e.args[0])) if len(e.args) == 1: return sub # TODO: copy-pasted from _print_Function: can we do better? mrow = self.dom.createElement('mrow') y = self.dom.createElement('mfenced') for arg in e.args[1:]: y.appendChild(self._print(arg)) mrow.appendChild(sub) mrow.appendChild(y) return mrow def _print_bernoulli(self, e): return self._print_number_function(e, 'B') _print_bell = _print_bernoulli def _print_catalan(self, e): return self._print_number_function(e, 'C') def _print_euler(self, e): return self._print_number_function(e, 'E') def _print_fibonacci(self, e): return self._print_number_function(e, 'F') def _print_lucas(self, e): return self._print_number_function(e, 'L') def _print_stieltjes(self, e): return self._print_number_function(e, 'γ') def _print_tribonacci(self, e): return self._print_number_function(e, 'T') def _print_ComplexInfinity(self, e): x = self.dom.createElement('mover') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∞')) x.appendChild(mo) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('~')) x.appendChild(mo) return x def _print_EmptySet(self, e): x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode('∅')) return x def _print_UniversalSet(self, e): x = self.dom.createElement('mo') x.appendChild(self.dom.createTextNode('𝕌')) return x def _print_Adjoint(self, expr): from sympy.matrices import MatrixSymbol mat = expr.arg sup = self.dom.createElement('msup') if not isinstance(mat, MatrixSymbol): brac = self.dom.createElement('mfenced') brac.appendChild(self._print(mat)) sup.appendChild(brac) else: sup.appendChild(self._print(mat)) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('†')) sup.appendChild(mo) return sup def _print_Transpose(self, expr): from sympy.matrices import MatrixSymbol mat = expr.arg sup = self.dom.createElement('msup') if not isinstance(mat, MatrixSymbol): brac = self.dom.createElement('mfenced') brac.appendChild(self._print(mat)) sup.appendChild(brac) else: sup.appendChild(self._print(mat)) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('T')) sup.appendChild(mo) return sup def _print_Inverse(self, expr): from sympy.matrices import MatrixSymbol mat = expr.arg sup = self.dom.createElement('msup') if not isinstance(mat, MatrixSymbol): brac = self.dom.createElement('mfenced') brac.appendChild(self._print(mat)) sup.appendChild(brac) else: sup.appendChild(self._print(mat)) sup.appendChild(self._print(-1)) return sup def _print_MatMul(self, expr): from sympy import MatMul x = self.dom.createElement('mrow') args = expr.args if isinstance(args[0], Mul): args = args[0].as_ordered_factors() + list(args[1:]) else: args = list(args) if isinstance(expr, MatMul) and _coeff_isneg(expr): if args[0] == -1: args = args[1:] else: args[0] = -args[0] mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('-')) x.appendChild(mo) for arg in args[:-1]: x.appendChild(self.parenthesize(arg, precedence_traditional(expr), False)) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('⁢')) x.appendChild(mo) x.appendChild(self.parenthesize(args[-1], precedence_traditional(expr), False)) return x def _print_MatPow(self, expr): from sympy.matrices import MatrixSymbol base, exp = expr.base, expr.exp sup = self.dom.createElement('msup') if not isinstance(base, MatrixSymbol): brac = self.dom.createElement('mfenced') brac.appendChild(self._print(base)) sup.appendChild(brac) else: sup.appendChild(self._print(base)) sup.appendChild(self._print(exp)) return sup def _print_HadamardProduct(self, expr): x = self.dom.createElement('mrow') args = expr.args for arg in args[:-1]: x.appendChild( self.parenthesize(arg, precedence_traditional(expr), False)) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('∘')) x.appendChild(mo) x.appendChild( self.parenthesize(args[-1], precedence_traditional(expr), False)) return x def _print_ZeroMatrix(self, Z): x = self.dom.createElement('mn') x.appendChild(self.dom.createTextNode('&#x1D7D8')) return x def _print_OneMatrix(self, Z): x = self.dom.createElement('mn') x.appendChild(self.dom.createTextNode('&#x1D7D9')) return x def _print_Identity(self, I): x = self.dom.createElement('mi') x.appendChild(self.dom.createTextNode('𝕀')) return x def _print_floor(self, e): mrow = self.dom.createElement('mrow') x = self.dom.createElement('mfenced') x.setAttribute('close', u'\u230B') x.setAttribute('open', u'\u230A') x.appendChild(self._print(e.args[0])) mrow.appendChild(x) return mrow def _print_ceiling(self, e): mrow = self.dom.createElement('mrow') x = self.dom.createElement('mfenced') x.setAttribute('close', u'\u2309') x.setAttribute('open', u'\u2308') x.appendChild(self._print(e.args[0])) mrow.appendChild(x) return mrow def _print_Lambda(self, e): x = self.dom.createElement('mfenced') mrow = self.dom.createElement('mrow') symbols = e.args[0] if len(symbols) == 1: symbols = self._print(symbols[0]) else: symbols = self._print(symbols) mrow.appendChild(symbols) mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('↦')) mrow.appendChild(mo) mrow.appendChild(self._print(e.args[1])) x.appendChild(mrow) return x def _print_tuple(self, e): x = self.dom.createElement('mfenced') for i in e: x.appendChild(self._print(i)) return x def _print_IndexedBase(self, e): return self._print(e.label) def _print_Indexed(self, e): x = self.dom.createElement('msub') x.appendChild(self._print(e.base)) if len(e.indices) == 1: x.appendChild(self._print(e.indices[0])) return x x.appendChild(self._print(e.indices)) return x def _print_MatrixElement(self, e): x = self.dom.createElement('msub') x.appendChild(self.parenthesize(e.parent, PRECEDENCE["Atom"], strict = True)) brac = self.dom.createElement('mfenced') brac.setAttribute("close", "") brac.setAttribute("open", "") for i in e.indices: brac.appendChild(self._print(i)) x.appendChild(brac) return x def _print_elliptic_f(self, e): x = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode('𝖥')) x.appendChild(mi) y = self.dom.createElement('mfenced') y.setAttribute("separators", "|") for i in e.args: y.appendChild(self._print(i)) x.appendChild(y) return x def _print_elliptic_e(self, e): x = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode('𝖤')) x.appendChild(mi) y = self.dom.createElement('mfenced') y.setAttribute("separators", "|") for i in e.args: y.appendChild(self._print(i)) x.appendChild(y) return x def _print_elliptic_pi(self, e): x = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode('𝛱')) x.appendChild(mi) y = self.dom.createElement('mfenced') if len(e.args) == 2: y.setAttribute("separators", "|") else: y.setAttribute("separators", ";|") for i in e.args: y.appendChild(self._print(i)) x.appendChild(y) return x def _print_Ei(self, e): x = self.dom.createElement('mrow') mi = self.dom.createElement('mi') mi.appendChild(self.dom.createTextNode('Ei')) x.appendChild(mi) x.appendChild(self._print(e.args)) return x def _print_expint(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msub') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('E')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) x.appendChild(y) x.appendChild(self._print(e.args[1:])) return x def _print_jacobi(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msubsup') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('P')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) y.appendChild(self._print(e.args[1:3])) x.appendChild(y) x.appendChild(self._print(e.args[3:])) return x def _print_gegenbauer(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msubsup') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('C')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) y.appendChild(self._print(e.args[1:2])) x.appendChild(y) x.appendChild(self._print(e.args[2:])) return x def _print_chebyshevt(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msub') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('T')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) x.appendChild(y) x.appendChild(self._print(e.args[1:])) return x def _print_chebyshevu(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msub') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('U')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) x.appendChild(y) x.appendChild(self._print(e.args[1:])) return x def _print_legendre(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msub') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('P')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) x.appendChild(y) x.appendChild(self._print(e.args[1:])) return x def _print_assoc_legendre(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msubsup') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('P')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) y.appendChild(self._print(e.args[1:2])) x.appendChild(y) x.appendChild(self._print(e.args[2:])) return x def _print_laguerre(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msub') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('L')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) x.appendChild(y) x.appendChild(self._print(e.args[1:])) return x def _print_assoc_laguerre(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msubsup') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('L')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) y.appendChild(self._print(e.args[1:2])) x.appendChild(y) x.appendChild(self._print(e.args[2:])) return x def _print_hermite(self, e): x = self.dom.createElement('mrow') y = self.dom.createElement('msub') mo = self.dom.createElement('mo') mo.appendChild(self.dom.createTextNode('H')) y.appendChild(mo) y.appendChild(self._print(e.args[0])) x.appendChild(y) x.appendChild(self._print(e.args[1:])) return x def mathml(expr, printer='content', **settings): """Returns the MathML representation of expr. If printer is presentation then prints Presentation MathML else prints content MathML. """ if printer == 'presentation': return MathMLPresentationPrinter(settings).doprint(expr) else: return MathMLContentPrinter(settings).doprint(expr) def print_mathml(expr, printer='content', **settings): """ Prints a pretty representation of the MathML code for expr. If printer is presentation then prints Presentation MathML else prints content MathML. Examples ======== >>> ## >>> from sympy.printing.mathml import print_mathml >>> from sympy.abc import x >>> print_mathml(x+1) #doctest: +NORMALIZE_WHITESPACE <apply> <plus/> <ci>x</ci> <cn>1</cn> </apply> >>> print_mathml(x+1, printer='presentation') <mrow> <mi>x</mi> <mo>+</mo> <mn>1</mn> </mrow> """ if printer == 'presentation': s = MathMLPresentationPrinter(settings) else: s = MathMLContentPrinter(settings) xml = s._print(sympify(expr)) s.apply_patch() pretty_xml = xml.toprettyxml() s.restore_patch() print(pretty_xml) # For backward compatibility MathMLPrinter = MathMLContentPrinter

4852efe07b6e3186b5e5905f8ed06864b107b3ec6e1a72f4212c059e65ecfc90

""" R code printer The RCodePrinter converts single sympy expressions into single R expressions, using the functions defined in math.h where possible. """ from __future__ import print_function, division from sympy.codegen.ast import Assignment from sympy.core.compatibility import string_types, range from sympy.printing.codeprinter import CodePrinter from sympy.printing.precedence import precedence, PRECEDENCE from sympy.sets.fancysets import Range # dictionary mapping sympy function to (argument_conditions, C_function). # Used in RCodePrinter._print_Function(self) known_functions = { #"Abs": [(lambda x: not x.is_integer, "fabs")], "Abs": "abs", "sin": "sin", "cos": "cos", "tan": "tan", "asin": "asin", "acos": "acos", "atan": "atan", "atan2": "atan2", "exp": "exp", "log": "log", "erf": "erf", "sinh": "sinh", "cosh": "cosh", "tanh": "tanh", "asinh": "asinh", "acosh": "acosh", "atanh": "atanh", "floor": "floor", "ceiling": "ceiling", "sign": "sign", "Max": "max", "Min": "min", "factorial": "factorial", "gamma": "gamma", "digamma": "digamma", "trigamma": "trigamma", "beta": "beta", } # These are the core reserved words in the R language. Taken from: # https://cran.r-project.org/doc/manuals/r-release/R-lang.html#Reserved-words reserved_words = ['if', 'else', 'repeat', 'while', 'function', 'for', 'in', 'next', 'break', 'TRUE', 'FALSE', 'NULL', 'Inf', 'NaN', 'NA', 'NA_integer_', 'NA_real_', 'NA_complex_', 'NA_character_', 'volatile'] class RCodePrinter(CodePrinter): """A printer to convert python expressions to strings of R code""" printmethod = "_rcode" language = "R" _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 15, 'user_functions': {}, 'human': True, 'contract': True, 'dereference': set(), 'error_on_reserved': False, 'reserved_word_suffix': '_', } _operators = { 'and': '&', 'or': '|', 'not': '!', } _relationals = { } def __init__(self, settings={}): CodePrinter.__init__(self, settings) self.known_functions = dict(known_functions) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) self._dereference = set(settings.get('dereference', [])) self.reserved_words = set(reserved_words) def _rate_index_position(self, p): return p*5 def _get_statement(self, codestring): return "%s;" % codestring def _get_comment(self, text): return "// {0}".format(text) def _declare_number_const(self, name, value): return "{0} = {1};".format(name, value) def _format_code(self, lines): return self.indent_code(lines) def _traverse_matrix_indices(self, mat): rows, cols = mat.shape return ((i, j) for i in range(rows) for j in range(cols)) def _get_loop_opening_ending(self, indices): """Returns a tuple (open_lines, close_lines) containing lists of codelines """ open_lines = [] close_lines = [] loopstart = "for (%(var)s in %(start)s:%(end)s){" for i in indices: # R arrays start at 1 and end at dimension open_lines.append(loopstart % { 'var': self._print(i.label), 'start': self._print(i.lower+1), 'end': self._print(i.upper + 1)}) close_lines.append("}") return open_lines, close_lines def _print_Pow(self, expr): if "Pow" in self.known_functions: return self._print_Function(expr) PREC = precedence(expr) if expr.exp == -1: return '1.0/%s' % (self.parenthesize(expr.base, PREC)) elif expr.exp == 0.5: return 'sqrt(%s)' % self._print(expr.base) else: return '%s^%s' % (self.parenthesize(expr.base, PREC), self.parenthesize(expr.exp, PREC)) def _print_Rational(self, expr): p, q = int(expr.p), int(expr.q) return '%d.0/%d.0' % (p, q) def _print_Indexed(self, expr): inds = [ self._print(i) for i in expr.indices ] return "%s[%s]" % (self._print(expr.base.label), ", ".join(inds)) def _print_Idx(self, expr): return self._print(expr.label) def _print_Exp1(self, expr): return "exp(1)" def _print_Pi(self, expr): return 'pi' def _print_Infinity(self, expr): return 'Inf' def _print_NegativeInfinity(self, expr): return '-Inf' def _print_Assignment(self, expr): from sympy.matrices.expressions.matexpr import MatrixSymbol from sympy.tensor.indexed import IndexedBase lhs = expr.lhs rhs = expr.rhs # We special case assignments that take multiple lines #if isinstance(expr.rhs, Piecewise): # from sympy.functions.elementary.piecewise import Piecewise # # Here we modify Piecewise so each expression is now # # an Assignment, and then continue on the print. # expressions = [] # conditions = [] # for (e, c) in rhs.args: # expressions.append(Assignment(lhs, e)) # conditions.append(c) # temp = Piecewise(*zip(expressions, conditions)) # return self._print(temp) #elif isinstance(lhs, MatrixSymbol): if isinstance(lhs, MatrixSymbol): # Here we form an Assignment for each element in the array, # printing each one. lines = [] for (i, j) in self._traverse_matrix_indices(lhs): temp = Assignment(lhs[i, j], rhs[i, j]) code0 = self._print(temp) lines.append(code0) return "\n".join(lines) elif self._settings["contract"] and (lhs.has(IndexedBase) or rhs.has(IndexedBase)): # Here we check if there is looping to be done, and if so # print the required loops. return self._doprint_loops(rhs, lhs) else: lhs_code = self._print(lhs) rhs_code = self._print(rhs) return self._get_statement("%s = %s" % (lhs_code, rhs_code)) def _print_Piecewise(self, expr): # This method is called only for inline if constructs # Top level piecewise is handled in doprint() if expr.args[-1].cond == True: last_line = "%s" % self._print(expr.args[-1].expr) else: last_line = "ifelse(%s,%s,NA)" % (self._print(expr.args[-1].cond), self._print(expr.args[-1].expr)) code=last_line for e, c in reversed(expr.args[:-1]): code= "ifelse(%s,%s," % (self._print(c), self._print(e))+code+")" return(code) def _print_ITE(self, expr): from sympy.functions import Piecewise _piecewise = Piecewise((expr.args[1], expr.args[0]), (expr.args[2], True)) return self._print(_piecewise) def _print_MatrixElement(self, expr): return "{0}[{1}]".format(self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True), expr.j + expr.i*expr.parent.shape[1]) def _print_Symbol(self, expr): name = super(RCodePrinter, self)._print_Symbol(expr) if expr in self._dereference: return '(*{0})'.format(name) else: return name def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_sinc(self, expr): from sympy.functions.elementary.trigonometric import sin from sympy.core.relational import Ne from sympy.functions import Piecewise _piecewise = Piecewise( (sin(expr.args[0]) / expr.args[0], Ne(expr.args[0], 0)), (1, True)) return self._print(_piecewise) def _print_AugmentedAssignment(self, expr): lhs_code = self._print(expr.lhs) op = expr.op rhs_code = self._print(expr.rhs) return "{0} {1} {2};".format(lhs_code, op, rhs_code) def _print_For(self, expr): target = self._print(expr.target) if isinstance(expr.iterable, Range): start, stop, step = expr.iterable.args else: raise NotImplementedError("Only iterable currently supported is Range") body = self._print(expr.body) return ('for ({target} = {start}; {target} < {stop}; {target} += ' '{step}) {{\n{body}\n}}').format(target=target, start=start, stop=stop, step=step, body=body) def indent_code(self, code): """Accepts a string of code or a list of code lines""" if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_token = ('{', '(', '{\n', '(\n') dec_token = ('}', ')') code = [ line.lstrip(' \t') for line in code ] increase = [ int(any(map(line.endswith, inc_token))) for line in code ] decrease = [ int(any(map(line.startswith, dec_token))) for line in code ] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tab*level, line)) level += increase[n] return pretty def rcode(expr, assign_to=None, **settings): """Converts an expr to a string of r code Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of line-wrapping, or for expressions that generate multi-line statements. precision : integer, optional The precision for numbers such as pi [default=15]. user_functions : dict, optional A dictionary where the keys are string representations of either ``FunctionClass`` or ``UndefinedFunction`` instances and the values are their desired R string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, rfunction_string)] or [(argument_test, rfunction_formater)]. See below for examples. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. Examples ======== >>> from sympy import rcode, symbols, Rational, sin, ceiling, Abs, Function >>> x, tau = symbols("x, tau") >>> rcode((2*tau)**Rational(7, 2)) '8*sqrt(2)*tau^(7.0/2.0)' >>> rcode(sin(x), assign_to="s") 's = sin(x);' Simple custom printing can be defined for certain types by passing a dictionary of {"type" : "function"} to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. >>> custom_functions = { ... "ceiling": "CEIL", ... "Abs": [(lambda x: not x.is_integer, "fabs"), ... (lambda x: x.is_integer, "ABS")], ... "func": "f" ... } >>> func = Function('func') >>> rcode(func(Abs(x) + ceiling(x)), user_functions=custom_functions) 'f(fabs(x) + CEIL(x))' or if the R-function takes a subset of the original arguments: >>> rcode(2**x + 3**x, user_functions={'Pow': [ ... (lambda b, e: b == 2, lambda b, e: 'exp2(%s)' % e), ... (lambda b, e: b != 2, 'pow')]}) 'exp2(x) + pow(3, x)' ``Piecewise`` expressions are converted into conditionals. If an ``assign_to`` variable is provided an if statement is created, otherwise the ternary operator is used. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> expr = Piecewise((x + 1, x > 0), (x, True)) >>> print(rcode(expr, assign_to=tau)) tau = ifelse(x > 0,x + 1,x); Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> rcode(e.rhs, assign_to=e.lhs, contract=False) 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions must be provided to ``assign_to``. Note that any expression that can be generated normally can also exist inside a Matrix: >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) >>> A = MatrixSymbol('A', 3, 1) >>> print(rcode(mat, A)) A[0] = x^2; A[1] = ifelse(x > 0,x + 1,x); A[2] = sin(x); """ return RCodePrinter(settings).doprint(expr, assign_to) def print_rcode(expr, **settings): """Prints R representation of the given expression.""" print(rcode(expr, **settings))

76a0077194427a676dd8a5a1e1b43b2446274f10a6b4ab5022b448380067d982

""" Octave (and Matlab) code printer The `OctaveCodePrinter` converts SymPy expressions into Octave expressions. It uses a subset of the Octave language for Matlab compatibility. A complete code generator, which uses `octave_code` extensively, can be found in `sympy.utilities.codegen`. The `codegen` module can be used to generate complete source code files. """ from __future__ import print_function, division from sympy.codegen.ast import Assignment from sympy.core import Mul, Pow, S, Rational from sympy.core.compatibility import string_types, range from sympy.core.mul import _keep_coeff from sympy.printing.codeprinter import CodePrinter from sympy.printing.precedence import precedence, PRECEDENCE from re import search # List of known functions. First, those that have the same name in # SymPy and Octave. This is almost certainly incomplete! known_fcns_src1 = ["sin", "cos", "tan", "cot", "sec", "csc", "asin", "acos", "acot", "atan", "atan2", "asec", "acsc", "sinh", "cosh", "tanh", "coth", "csch", "sech", "asinh", "acosh", "atanh", "acoth", "asech", "acsch", "erfc", "erfi", "erf", "erfinv", "erfcinv", "besseli", "besselj", "besselk", "bessely", "bernoulli", "beta", "euler", "exp", "factorial", "floor", "fresnelc", "fresnels", "gamma", "harmonic", "log", "polylog", "sign", "zeta", "legendre"] # These functions have different names ("Sympy": "Octave"), more # generally a mapping to (argument_conditions, octave_function). known_fcns_src2 = { "Abs": "abs", "arg": "angle", # arg/angle ok in Octave but only angle in Matlab "binomial": "bincoeff", "ceiling": "ceil", "chebyshevu": "chebyshevU", "chebyshevt": "chebyshevT", "Chi": "coshint", "Ci": "cosint", "conjugate": "conj", "DiracDelta": "dirac", "Heaviside": "heaviside", "im": "imag", "laguerre": "laguerreL", "LambertW": "lambertw", "li": "logint", "loggamma": "gammaln", "Max": "max", "Min": "min", "Mod": "mod", "polygamma": "psi", "re": "real", "RisingFactorial": "pochhammer", "Shi": "sinhint", "Si": "sinint", } class OctaveCodePrinter(CodePrinter): """ A printer to convert expressions to strings of Octave/Matlab code. """ printmethod = "_octave" language = "Octave" _operators = { 'and': '&', 'or': '|', 'not': '~', } _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 17, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, 'contract': True, 'inline': True, } # Note: contract is for expressing tensors as loops (if True), or just # assignment (if False). FIXME: this should be looked a more carefully # for Octave. def __init__(self, settings={}): super(OctaveCodePrinter, self).__init__(settings) self.known_functions = dict(zip(known_fcns_src1, known_fcns_src1)) self.known_functions.update(dict(known_fcns_src2)) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) def _rate_index_position(self, p): return p*5 def _get_statement(self, codestring): return "%s;" % codestring def _get_comment(self, text): return "% {0}".format(text) def _declare_number_const(self, name, value): return "{0} = {1};".format(name, value) def _format_code(self, lines): return self.indent_code(lines) def _traverse_matrix_indices(self, mat): # Octave uses Fortran order (column-major) rows, cols = mat.shape return ((i, j) for j in range(cols) for i in range(rows)) def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] for i in indices: # Octave arrays start at 1 and end at dimension var, start, stop = map(self._print, [i.label, i.lower + 1, i.upper + 1]) open_lines.append("for %s = %s:%s" % (var, start, stop)) close_lines.append("end") return open_lines, close_lines def _print_Mul(self, expr): # print complex numbers nicely in Octave if (expr.is_number and expr.is_imaginary and (S.ImaginaryUnit*expr).is_Integer): return "%si" % self._print(-S.ImaginaryUnit*expr) # cribbed from str.py prec = precedence(expr) c, e = expr.as_coeff_Mul() if c < 0: expr = _keep_coeff(-c, e) sign = "-" else: sign = "" a = [] # items in the numerator b = [] # items that are in the denominator (if any) pow_paren = [] # Will collect all pow with more than one base element and exp = -1 if self.order not in ('old', 'none'): args = expr.as_ordered_factors() else: # use make_args in case expr was something like -x -> x args = Mul.make_args(expr) # Gather args for numerator/denominator for item in args: if (item.is_commutative and item.is_Pow and item.exp.is_Rational and item.exp.is_negative): if item.exp != -1: b.append(Pow(item.base, -item.exp, evaluate=False)) else: if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160 pow_paren.append(item) b.append(Pow(item.base, -item.exp)) elif item.is_Rational and item is not S.Infinity: if item.p != 1: a.append(Rational(item.p)) if item.q != 1: b.append(Rational(item.q)) else: a.append(item) a = a or [S.One] a_str = [self.parenthesize(x, prec) for x in a] b_str = [self.parenthesize(x, prec) for x in b] # To parenthesize Pow with exp = -1 and having more than one Symbol for item in pow_paren: if item.base in b: b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)] # from here it differs from str.py to deal with "*" and ".*" def multjoin(a, a_str): # here we probably are assuming the constants will come first r = a_str[0] for i in range(1, len(a)): mulsym = '*' if a[i-1].is_number else '.*' r = r + mulsym + a_str[i] return r if not b: return sign + multjoin(a, a_str) elif len(b) == 1: divsym = '/' if b[0].is_number else './' return sign + multjoin(a, a_str) + divsym + b_str[0] else: divsym = '/' if all([bi.is_number for bi in b]) else './' return (sign + multjoin(a, a_str) + divsym + "(%s)" % multjoin(b, b_str)) def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_Pow(self, expr): powsymbol = '^' if all([x.is_number for x in expr.args]) else '.^' PREC = precedence(expr) if expr.exp == S.Half: return "sqrt(%s)" % self._print(expr.base) if expr.is_commutative: if expr.exp == -S.Half: sym = '/' if expr.base.is_number else './' return "1" + sym + "sqrt(%s)" % self._print(expr.base) if expr.exp == -S.One: sym = '/' if expr.base.is_number else './' return "1" + sym + "%s" % self.parenthesize(expr.base, PREC) return '%s%s%s' % (self.parenthesize(expr.base, PREC), powsymbol, self.parenthesize(expr.exp, PREC)) def _print_MatPow(self, expr): PREC = precedence(expr) return '%s^%s' % (self.parenthesize(expr.base, PREC), self.parenthesize(expr.exp, PREC)) def _print_MatrixSolve(self, expr): PREC = precedence(expr) return "%s \\ %s" % (self.parenthesize(expr.matrix, PREC), self.parenthesize(expr.vector, PREC)) def _print_Pi(self, expr): return 'pi' def _print_ImaginaryUnit(self, expr): return "1i" def _print_Exp1(self, expr): return "exp(1)" def _print_GoldenRatio(self, expr): # FIXME: how to do better, e.g., for octave_code(2*GoldenRatio)? #return self._print((1+sqrt(S(5)))/2) return "(1+sqrt(5))/2" def _print_Assignment(self, expr): from sympy.functions.elementary.piecewise import Piecewise from sympy.tensor.indexed import IndexedBase # Copied from codeprinter, but remove special MatrixSymbol treatment lhs = expr.lhs rhs = expr.rhs # We special case assignments that take multiple lines if not self._settings["inline"] and isinstance(expr.rhs, Piecewise): # Here we modify Piecewise so each expression is now # an Assignment, and then continue on the print. expressions = [] conditions = [] for (e, c) in rhs.args: expressions.append(Assignment(lhs, e)) conditions.append(c) temp = Piecewise(*zip(expressions, conditions)) return self._print(temp) if self._settings["contract"] and (lhs.has(IndexedBase) or rhs.has(IndexedBase)): # Here we check if there is looping to be done, and if so # print the required loops. return self._doprint_loops(rhs, lhs) else: lhs_code = self._print(lhs) rhs_code = self._print(rhs) return self._get_statement("%s = %s" % (lhs_code, rhs_code)) def _print_Infinity(self, expr): return 'inf' def _print_NegativeInfinity(self, expr): return '-inf' def _print_NaN(self, expr): return 'NaN' def _print_list(self, expr): return '{' + ', '.join(self._print(a) for a in expr) + '}' _print_tuple = _print_list _print_Tuple = _print_list def _print_BooleanTrue(self, expr): return "true" def _print_BooleanFalse(self, expr): return "false" def _print_bool(self, expr): return str(expr).lower() # Could generate quadrature code for definite Integrals? #_print_Integral = _print_not_supported def _print_MatrixBase(self, A): # Handle zero dimensions: if (A.rows, A.cols) == (0, 0): return '[]' elif A.rows == 0 or A.cols == 0: return 'zeros(%s, %s)' % (A.rows, A.cols) elif (A.rows, A.cols) == (1, 1): # Octave does not distinguish between scalars and 1x1 matrices return self._print(A[0, 0]) return "[%s]" % "; ".join(" ".join([self._print(a) for a in A[r, :]]) for r in range(A.rows)) def _print_SparseMatrix(self, A): from sympy.matrices import Matrix L = A.col_list(); # make row vectors of the indices and entries I = Matrix([[k[0] + 1 for k in L]]) J = Matrix([[k[1] + 1 for k in L]]) AIJ = Matrix([[k[2] for k in L]]) return "sparse(%s, %s, %s, %s, %s)" % (self._print(I), self._print(J), self._print(AIJ), A.rows, A.cols) # FIXME: Str/CodePrinter could define each of these to call the _print # method from higher up the class hierarchy (see _print_NumberSymbol). # Then subclasses like us would not need to repeat all this. _print_Matrix = \ _print_DenseMatrix = \ _print_MutableDenseMatrix = \ _print_ImmutableMatrix = \ _print_ImmutableDenseMatrix = \ _print_MatrixBase _print_MutableSparseMatrix = \ _print_ImmutableSparseMatrix = \ _print_SparseMatrix def _print_MatrixElement(self, expr): return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) \ + '(%s, %s)' % (expr.i + 1, expr.j + 1) def _print_MatrixSlice(self, expr): def strslice(x, lim): l = x[0] + 1 h = x[1] step = x[2] lstr = self._print(l) hstr = 'end' if h == lim else self._print(h) if step == 1: if l == 1 and h == lim: return ':' if l == h: return lstr else: return lstr + ':' + hstr else: return ':'.join((lstr, self._print(step), hstr)) return (self._print(expr.parent) + '(' + strslice(expr.rowslice, expr.parent.shape[0]) + ', ' + strslice(expr.colslice, expr.parent.shape[1]) + ')') def _print_Indexed(self, expr): inds = [ self._print(i) for i in expr.indices ] return "%s(%s)" % (self._print(expr.base.label), ", ".join(inds)) def _print_Idx(self, expr): return self._print(expr.label) def _print_KroneckerDelta(self, expr): prec = PRECEDENCE["Pow"] return "double(%s == %s)" % tuple(self.parenthesize(x, prec) for x in expr.args) def _print_Identity(self, expr): shape = expr.shape if len(shape) == 2 and shape[0] == shape[1]: shape = [shape[0]] s = ", ".join(self._print(n) for n in shape) return "eye(" + s + ")" def _print_lowergamma(self, expr): # Octave implements regularized incomplete gamma function return "(gammainc({1}, {0}).*gamma({0}))".format( self._print(expr.args[0]), self._print(expr.args[1])) def _print_uppergamma(self, expr): return "(gammainc({1}, {0}, 'upper').*gamma({0}))".format( self._print(expr.args[0]), self._print(expr.args[1])) def _print_sinc(self, expr): #Note: Divide by pi because Octave implements normalized sinc function. return "sinc(%s)" % self._print(expr.args[0]/S.Pi) def _print_hankel1(self, expr): return "besselh(%s, 1, %s)" % (self._print(expr.order), self._print(expr.argument)) def _print_hankel2(self, expr): return "besselh(%s, 2, %s)" % (self._print(expr.order), self._print(expr.argument)) # Note: as of 2015, Octave doesn't have spherical Bessel functions def _print_jn(self, expr): from sympy.functions import sqrt, besselj x = expr.argument expr2 = sqrt(S.Pi/(2*x))*besselj(expr.order + S.Half, x) return self._print(expr2) def _print_yn(self, expr): from sympy.functions import sqrt, bessely x = expr.argument expr2 = sqrt(S.Pi/(2*x))*bessely(expr.order + S.Half, x) return self._print(expr2) def _print_airyai(self, expr): return "airy(0, %s)" % self._print(expr.args[0]) def _print_airyaiprime(self, expr): return "airy(1, %s)" % self._print(expr.args[0]) def _print_airybi(self, expr): return "airy(2, %s)" % self._print(expr.args[0]) def _print_airybiprime(self, expr): return "airy(3, %s)" % self._print(expr.args[0]) def _print_expint(self, expr): mu, x = expr.args if mu != 1: return self._print_not_supported(expr) return "expint(%s)" % self._print(x) def _one_or_two_reversed_args(self, expr): assert len(expr.args) <= 2 return '{name}({args})'.format( name=self.known_functions[expr.__class__.__name__], args=", ".join([self._print(x) for x in reversed(expr.args)]) ) _print_DiracDelta = _print_LambertW = _one_or_two_reversed_args def _nested_binary_math_func(self, expr): return '{name}({arg1}, {arg2})'.format( name=self.known_functions[expr.__class__.__name__], arg1=self._print(expr.args[0]), arg2=self._print(expr.func(*expr.args[1:])) ) _print_Max = _print_Min = _nested_binary_math_func def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] if self._settings["inline"]: # Express each (cond, expr) pair in a nested Horner form: # (condition) .* (expr) + (not cond) .* (<others>) # Expressions that result in multiple statements won't work here. ecpairs = ["({0}).*({1}) + (~({0})).*(".format (self._print(c), self._print(e)) for e, c in expr.args[:-1]] elast = "%s" % self._print(expr.args[-1].expr) pw = " ...\n".join(ecpairs) + elast + ")"*len(ecpairs) # Note: current need these outer brackets for 2*pw. Would be # nicer to teach parenthesize() to do this for us when needed! return "(" + pw + ")" else: for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s)" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines.append("else") else: lines.append("elseif (%s)" % self._print(c)) code0 = self._print(e) lines.append(code0) if i == len(expr.args) - 1: lines.append("end") return "\n".join(lines) def _print_zeta(self, expr): if len(expr.args) == 1: return "zeta(%s)" % self._print(expr.args[0]) else: # Matlab two argument zeta is not equivalent to SymPy's return self._print_not_supported(expr) def indent_code(self, code): """Accepts a string of code or a list of code lines""" # code mostly copied from ccode if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_regex = ('^function ', '^if ', '^elseif ', '^else$', '^for ') dec_regex = ('^end$', '^elseif ', '^else$') # pre-strip left-space from the code code = [ line.lstrip(' \t') for line in code ] increase = [ int(any([search(re, line) for re in inc_regex])) for line in code ] decrease = [ int(any([search(re, line) for re in dec_regex])) for line in code ] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tab*level, line)) level += increase[n] return pretty def octave_code(expr, assign_to=None, **settings): r"""Converts `expr` to a string of Octave (or Matlab) code. The string uses a subset of the Octave language for Matlab compatibility. Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This can be helpful for expressions that generate multi-line statements. precision : integer, optional The precision for numbers such as pi [default=16]. user_functions : dict, optional A dictionary where keys are ``FunctionClass`` instances and values are their string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. See below for examples. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. inline: bool, optional If True, we try to create single-statement code instead of multiple statements. [default=True]. Examples ======== >>> from sympy import octave_code, symbols, sin, pi >>> x = symbols('x') >>> octave_code(sin(x).series(x).removeO()) 'x.^5/120 - x.^3/6 + x' >>> from sympy import Rational, ceiling, Abs >>> x, y, tau = symbols("x, y, tau") >>> octave_code((2*tau)**Rational(7, 2)) '8*sqrt(2)*tau.^(7/2)' Note that element-wise (Hadamard) operations are used by default between symbols. This is because its very common in Octave to write "vectorized" code. It is harmless if the values are scalars. >>> octave_code(sin(pi*x*y), assign_to="s") 's = sin(pi*x.*y);' If you need a matrix product "*" or matrix power "^", you can specify the symbol as a ``MatrixSymbol``. >>> from sympy import Symbol, MatrixSymbol >>> n = Symbol('n', integer=True, positive=True) >>> A = MatrixSymbol('A', n, n) >>> octave_code(3*pi*A**3) '(3*pi)*A^3' This class uses several rules to decide which symbol to use a product. Pure numbers use "*", Symbols use ".*" and MatrixSymbols use "*". A HadamardProduct can be used to specify componentwise multiplication ".*" of two MatrixSymbols. There is currently there is no easy way to specify scalar symbols, so sometimes the code might have some minor cosmetic issues. For example, suppose x and y are scalars and A is a Matrix, then while a human programmer might write "(x^2*y)*A^3", we generate: >>> octave_code(x**2*y*A**3) '(x.^2.*y)*A^3' Matrices are supported using Octave inline notation. When using ``assign_to`` with matrices, the name can be specified either as a string or as a ``MatrixSymbol``. The dimensions must align in the latter case. >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([[x**2, sin(x), ceiling(x)]]) >>> octave_code(mat, assign_to='A') 'A = [x.^2 sin(x) ceil(x)];' ``Piecewise`` expressions are implemented with logical masking by default. Alternatively, you can pass "inline=False" to use if-else conditionals. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> pw = Piecewise((x + 1, x > 0), (x, True)) >>> octave_code(pw, assign_to=tau) 'tau = ((x > 0).*(x + 1) + (~(x > 0)).*(x));' Note that any expression that can be generated normally can also exist inside a Matrix: >>> mat = Matrix([[x**2, pw, sin(x)]]) >>> octave_code(mat, assign_to='A') 'A = [x.^2 ((x > 0).*(x + 1) + (~(x > 0)).*(x)) sin(x)];' Custom printing can be defined for certain types by passing a dictionary of "type" : "function" to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e., [(argument_test, cfunction_string)]. This can be used to call a custom Octave function. >>> from sympy import Function >>> f = Function('f') >>> g = Function('g') >>> custom_functions = { ... "f": "existing_octave_fcn", ... "g": [(lambda x: x.is_Matrix, "my_mat_fcn"), ... (lambda x: not x.is_Matrix, "my_fcn")] ... } >>> mat = Matrix([[1, x]]) >>> octave_code(f(x) + g(x) + g(mat), user_functions=custom_functions) 'existing_octave_fcn(x) + my_fcn(x) + my_mat_fcn([1 x])' Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx, ccode >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e = Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> octave_code(e.rhs, assign_to=e.lhs, contract=False) 'Dy(i) = (y(i + 1) - y(i))./(t(i + 1) - t(i));' """ return OctaveCodePrinter(settings).doprint(expr, assign_to) def print_octave_code(expr, **settings): """Prints the Octave (or Matlab) representation of the given expression. See `octave_code` for the meaning of the optional arguments. """ print(octave_code(expr, **settings))

0a11064bd1f12df8b1432dcb0390cf05ab43da579bd37445eb7930fa316195f0

""" Fortran code printer The FCodePrinter converts single sympy expressions into single Fortran expressions, using the functions defined in the Fortran 77 standard where possible. Some useful pointers to Fortran can be found on wikipedia: https://en.wikipedia.org/wiki/Fortran Most of the code below is based on the "Professional Programmer\'s Guide to Fortran77" by Clive G. Page: http://www.star.le.ac.uk/~cgp/prof77.html Fortran is a case-insensitive language. This might cause trouble because SymPy is case sensitive. So, fcode adds underscores to variable names when it is necessary to make them different for Fortran. """ from __future__ import print_function, division from collections import defaultdict from itertools import chain import string from sympy.codegen.ast import ( Assignment, Declaration, Pointer, value_const, float32, float64, float80, complex64, complex128, int8, int16, int32, int64, intc, real, integer, bool_, complex_ ) from sympy.codegen.fnodes import ( allocatable, isign, dsign, cmplx, merge, literal_dp, elemental, pure, intent_in, intent_out, intent_inout ) from sympy.core import S, Add, N, Float, Symbol from sympy.core.compatibility import string_types, range from sympy.core.function import Function from sympy.core.relational import Eq from sympy.sets import Range from sympy.printing.codeprinter import CodePrinter from sympy.printing.precedence import precedence, PRECEDENCE from sympy.printing.printer import printer_context known_functions = { "sin": "sin", "cos": "cos", "tan": "tan", "asin": "asin", "acos": "acos", "atan": "atan", "atan2": "atan2", "sinh": "sinh", "cosh": "cosh", "tanh": "tanh", "log": "log", "exp": "exp", "erf": "erf", "Abs": "abs", "conjugate": "conjg", "Max": "max", "Min": "min", } class FCodePrinter(CodePrinter): """A printer to convert sympy expressions to strings of Fortran code""" printmethod = "_fcode" language = "Fortran" type_aliases = { integer: int32, real: float64, complex_: complex128, } type_mappings = { intc: 'integer(c_int)', float32: 'real*4', # real(kind(0.e0)) float64: 'real*8', # real(kind(0.d0)) float80: 'real*10', # real(kind(????)) complex64: 'complex*8', complex128: 'complex*16', int8: 'integer*1', int16: 'integer*2', int32: 'integer*4', int64: 'integer*8', bool_: 'logical' } type_modules = { intc: {'iso_c_binding': 'c_int'} } _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 17, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, 'source_format': 'fixed', 'contract': True, 'standard': 77, 'name_mangling' : True, } _operators = { 'and': '.and.', 'or': '.or.', 'xor': '.neqv.', 'equivalent': '.eqv.', 'not': '.not. ', } _relationals = { '!=': '/=', } def __init__(self, settings=None): if not settings: settings = {} self.mangled_symbols = {} # Dict showing mapping of all words self.used_name = [] self.type_aliases = dict(chain(self.type_aliases.items(), settings.pop('type_aliases', {}).items())) self.type_mappings = dict(chain(self.type_mappings.items(), settings.pop('type_mappings', {}).items())) super(FCodePrinter, self).__init__(settings) self.known_functions = dict(known_functions) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) # leading columns depend on fixed or free format standards = {66, 77, 90, 95, 2003, 2008} if self._settings['standard'] not in standards: raise ValueError("Unknown Fortran standard: %s" % self._settings[ 'standard']) self.module_uses = defaultdict(set) # e.g.: use iso_c_binding, only: c_int @property def _lead(self): if self._settings['source_format'] == 'fixed': return {'code': " ", 'cont': " @ ", 'comment': "C "} elif self._settings['source_format'] == 'free': return {'code': "", 'cont': " ", 'comment': "! "} else: raise ValueError("Unknown source format: %s" % self._settings['source_format']) def _print_Symbol(self, expr): if self._settings['name_mangling'] == True: if expr not in self.mangled_symbols: name = expr.name while name.lower() in self.used_name: name += '_' self.used_name.append(name.lower()) if name == expr.name: self.mangled_symbols[expr] = expr else: self.mangled_symbols[expr] = Symbol(name) expr = expr.xreplace(self.mangled_symbols) name = super(FCodePrinter, self)._print_Symbol(expr) return name def _rate_index_position(self, p): return -p*5 def _get_statement(self, codestring): return codestring def _get_comment(self, text): return "! {0}".format(text) def _declare_number_const(self, name, value): return "parameter ({0} = {1})".format(name, self._print(value)) def _print_NumberSymbol(self, expr): # A Number symbol that is not implemented here or with _printmethod # is registered and evaluated self._number_symbols.add((expr, Float(expr.evalf(self._settings['precision'])))) return str(expr) def _format_code(self, lines): return self._wrap_fortran(self.indent_code(lines)) def _traverse_matrix_indices(self, mat): rows, cols = mat.shape return ((i, j) for j in range(cols) for i in range(rows)) def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] for i in indices: # fortran arrays start at 1 and end at dimension var, start, stop = map(self._print, [i.label, i.lower + 1, i.upper + 1]) open_lines.append("do %s = %s, %s" % (var, start, stop)) close_lines.append("end do") return open_lines, close_lines def _print_sign(self, expr): from sympy import Abs arg, = expr.args if arg.is_integer: new_expr = merge(0, isign(1, arg), Eq(arg, 0)) elif arg.is_complex: new_expr = merge(cmplx(literal_dp(0), literal_dp(0)), arg/Abs(arg), Eq(Abs(arg), literal_dp(0))) else: new_expr = merge(literal_dp(0), dsign(literal_dp(1), arg), Eq(arg, literal_dp(0))) return self._print(new_expr) def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] if expr.has(Assignment): for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s) then" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines.append("else") else: lines.append("else if (%s) then" % self._print(c)) lines.append(self._print(e)) lines.append("end if") return "\n".join(lines) elif self._settings["standard"] >= 95: # Only supported in F95 and newer: # The piecewise was used in an expression, need to do inline # operators. This has the downside that inline operators will # not work for statements that span multiple lines (Matrix or # Indexed expressions). pattern = "merge({T}, {F}, {COND})" code = self._print(expr.args[-1].expr) terms = list(expr.args[:-1]) while terms: e, c = terms.pop() expr = self._print(e) cond = self._print(c) code = pattern.format(T=expr, F=code, COND=cond) return code else: # `merge` is not supported prior to F95 raise NotImplementedError("Using Piecewise as an expression using " "inline operators is not supported in " "standards earlier than Fortran95.") def _print_MatrixElement(self, expr): return "{0}({1}, {2})".format(self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True), expr.i + 1, expr.j + 1) def _print_Add(self, expr): # purpose: print complex numbers nicely in Fortran. # collect the purely real and purely imaginary parts: pure_real = [] pure_imaginary = [] mixed = [] for arg in expr.args: if arg.is_number and arg.is_real: pure_real.append(arg) elif arg.is_number and arg.is_imaginary: pure_imaginary.append(arg) else: mixed.append(arg) if pure_imaginary: if mixed: PREC = precedence(expr) term = Add(*mixed) t = self._print(term) if t.startswith('-'): sign = "-" t = t[1:] else: sign = "+" if precedence(term) < PREC: t = "(%s)" % t return "cmplx(%s,%s) %s %s" % ( self._print(Add(*pure_real)), self._print(-S.ImaginaryUnit*Add(*pure_imaginary)), sign, t, ) else: return "cmplx(%s,%s)" % ( self._print(Add(*pure_real)), self._print(-S.ImaginaryUnit*Add(*pure_imaginary)), ) else: return CodePrinter._print_Add(self, expr) def _print_Function(self, expr): # All constant function args are evaluated as floats prec = self._settings['precision'] args = [N(a, prec) for a in expr.args] eval_expr = expr.func(*args) if not isinstance(eval_expr, Function): return self._print(eval_expr) else: return CodePrinter._print_Function(self, expr.func(*args)) def _print_Mod(self, expr): # NOTE : Fortran has the functions mod() and modulo(). modulo() behaves # the same wrt to the sign of the arguments as Python and SymPy's # modulus computations (% and Mod()) but is not available in Fortran 66 # or Fortran 77, thus we raise an error. if self._settings['standard'] in [66, 77]: msg = ("Python % operator and SymPy's Mod() function are not " "supported by Fortran 66 or 77 standards.") raise NotImplementedError(msg) else: x, y = expr.args return " modulo({}, {})".format(self._print(x), self._print(y)) def _print_ImaginaryUnit(self, expr): # purpose: print complex numbers nicely in Fortran. return "cmplx(0,1)" def _print_int(self, expr): return str(expr) def _print_Mul(self, expr): # purpose: print complex numbers nicely in Fortran. if expr.is_number and expr.is_imaginary: return "cmplx(0,%s)" % ( self._print(-S.ImaginaryUnit*expr) ) else: return CodePrinter._print_Mul(self, expr) def _print_Pow(self, expr): PREC = precedence(expr) if expr.exp == -1: return '%s/%s' % ( self._print(literal_dp(1)), self.parenthesize(expr.base, PREC) ) elif expr.exp == 0.5: if expr.base.is_integer: # Fortran intrinsic sqrt() does not accept integer argument if expr.base.is_Number: return 'sqrt(%s.0d0)' % self._print(expr.base) else: return 'sqrt(dble(%s))' % self._print(expr.base) else: return 'sqrt(%s)' % self._print(expr.base) else: return CodePrinter._print_Pow(self, expr) def _print_Rational(self, expr): p, q = int(expr.p), int(expr.q) return "%d.0d0/%d.0d0" % (p, q) def _print_Float(self, expr): printed = CodePrinter._print_Float(self, expr) e = printed.find('e') if e > -1: return "%sd%s" % (printed[:e], printed[e + 1:]) return "%sd0" % printed def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op op = op if op not in self._relationals else self._relationals[op] return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_Indexed(self, expr): inds = [ self._print(i) for i in expr.indices ] return "%s(%s)" % (self._print(expr.base.label), ", ".join(inds)) def _print_Idx(self, expr): return self._print(expr.label) def _print_AugmentedAssignment(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) return self._get_statement("{0} = {0} {1} {2}".format( *map(lambda arg: self._print(arg), [lhs_code, expr.binop, rhs_code]))) def _print_sum_(self, sm): params = self._print(sm.array) if sm.dim != None: # Must use '!= None', cannot use 'is not None' params += ', ' + self._print(sm.dim) if sm.mask != None: # Must use '!= None', cannot use 'is not None' params += ', mask=' + self._print(sm.mask) return '%s(%s)' % (sm.__class__.__name__.rstrip('_'), params) def _print_product_(self, prod): return self._print_sum_(prod) def _print_Do(self, do): excl = ['concurrent'] if do.step == 1: excl.append('step') step = '' else: step = ', {step}' return ( 'do {concurrent}{counter} = {first}, {last}'+step+'\n' '{body}\n' 'end do\n' ).format( concurrent='concurrent ' if do.concurrent else '', **do.kwargs(apply=lambda arg: self._print(arg), exclude=excl) ) def _print_ImpliedDoLoop(self, idl): step = '' if idl.step == 1 else ', {step}' return ('({expr}, {counter} = {first}, {last}'+step+')').format( **idl.kwargs(apply=lambda arg: self._print(arg)) ) def _print_For(self, expr): target = self._print(expr.target) if isinstance(expr.iterable, Range): start, stop, step = expr.iterable.args else: raise NotImplementedError("Only iterable currently supported is Range") body = self._print(expr.body) return ('do {target} = {start}, {stop}, {step}\n' '{body}\n' 'end do').format(target=target, start=start, stop=stop, step=step, body=body) def _print_Type(self, type_): type_ = self.type_aliases.get(type_, type_) type_str = self.type_mappings.get(type_, type_.name) module_uses = self.type_modules.get(type_) if module_uses: for k, v in module_uses: self.module_uses[k].add(v) return type_str def _print_Element(self, elem): return '{symbol}({idxs})'.format( symbol=self._print(elem.symbol), idxs=', '.join(map(lambda arg: self._print(arg), elem.indices)) ) def _print_Extent(self, ext): return str(ext) def _print_Declaration(self, expr): var = expr.variable val = var.value dim = var.attr_params('dimension') intents = [intent in var.attrs for intent in (intent_in, intent_out, intent_inout)] if intents.count(True) == 0: intent = '' elif intents.count(True) == 1: intent = ', intent(%s)' % ['in', 'out', 'inout'][intents.index(True)] else: raise ValueError("Multiple intents specified for %s" % self) if isinstance(var, Pointer): raise NotImplementedError("Pointers are not available by default in Fortran.") if self._settings["standard"] >= 90: result = '{t}{vc}{dim}{intent}{alloc} :: {s}'.format( t=self._print(var.type), vc=', parameter' if value_const in var.attrs else '', dim=', dimension(%s)' % ', '.join(map(lambda arg: self._print(arg), dim)) if dim else '', intent=intent, alloc=', allocatable' if allocatable in var.attrs else '', s=self._print(var.symbol) ) if val != None: # Must be "!= None", cannot be "is not None" result += ' = %s' % self._print(val) else: if value_const in var.attrs or val: raise NotImplementedError("F77 init./parameter statem. req. multiple lines.") result = ' '.join(map(lambda arg: self._print(arg), [var.type, var.symbol])) return result def _print_Infinity(self, expr): return '(huge(%s) + 1)' % self._print(literal_dp(0)) def _print_While(self, expr): return 'do while ({condition})\n{body}\nend do'.format(**expr.kwargs( apply=lambda arg: self._print(arg))) def _print_BooleanTrue(self, expr): return '.true.' def _print_BooleanFalse(self, expr): return '.false.' def _pad_leading_columns(self, lines): result = [] for line in lines: if line.startswith('!'): result.append(self._lead['comment'] + line[1:].lstrip()) else: result.append(self._lead['code'] + line) return result def _wrap_fortran(self, lines): """Wrap long Fortran lines Argument: lines -- a list of lines (without \\n character) A comment line is split at white space. Code lines are split with a more complex rule to give nice results. """ # routine to find split point in a code line my_alnum = set("_+-." + string.digits + string.ascii_letters) my_white = set(" \t()") def split_pos_code(line, endpos): if len(line) <= endpos: return len(line) pos = endpos split = lambda pos: \ (line[pos] in my_alnum and line[pos - 1] not in my_alnum) or \ (line[pos] not in my_alnum and line[pos - 1] in my_alnum) or \ (line[pos] in my_white and line[pos - 1] not in my_white) or \ (line[pos] not in my_white and line[pos - 1] in my_white) while not split(pos): pos -= 1 if pos == 0: return endpos return pos # split line by line and add the split lines to result result = [] if self._settings['source_format'] == 'free': trailing = ' &' else: trailing = '' for line in lines: if line.startswith(self._lead['comment']): # comment line if len(line) > 72: pos = line.rfind(" ", 6, 72) if pos == -1: pos = 72 hunk = line[:pos] line = line[pos:].lstrip() result.append(hunk) while line: pos = line.rfind(" ", 0, 66) if pos == -1 or len(line) < 66: pos = 66 hunk = line[:pos] line = line[pos:].lstrip() result.append("%s%s" % (self._lead['comment'], hunk)) else: result.append(line) elif line.startswith(self._lead['code']): # code line pos = split_pos_code(line, 72) hunk = line[:pos].rstrip() line = line[pos:].lstrip() if line: hunk += trailing result.append(hunk) while line: pos = split_pos_code(line, 65) hunk = line[:pos].rstrip() line = line[pos:].lstrip() if line: hunk += trailing result.append("%s%s" % (self._lead['cont'], hunk)) else: result.append(line) return result def indent_code(self, code): """Accepts a string of code or a list of code lines""" if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) free = self._settings['source_format'] == 'free' code = [ line.lstrip(' \t') for line in code ] inc_keyword = ('do ', 'if(', 'if ', 'do\n', 'else', 'program', 'interface') dec_keyword = ('end do', 'enddo', 'end if', 'endif', 'else', 'end program', 'end interface') increase = [ int(any(map(line.startswith, inc_keyword))) for line in code ] decrease = [ int(any(map(line.startswith, dec_keyword))) for line in code ] continuation = [ int(any(map(line.endswith, ['&', '&\n']))) for line in code ] level = 0 cont_padding = 0 tabwidth = 3 new_code = [] for i, line in enumerate(code): if line == '' or line == '\n': new_code.append(line) continue level -= decrease[i] if free: padding = " "*(level*tabwidth + cont_padding) else: padding = " "*level*tabwidth line = "%s%s" % (padding, line) if not free: line = self._pad_leading_columns([line])[0] new_code.append(line) if continuation[i]: cont_padding = 2*tabwidth else: cont_padding = 0 level += increase[i] if not free: return self._wrap_fortran(new_code) return new_code def _print_GoTo(self, goto): if goto.expr: # computed goto return "go to ({labels}), {expr}".format( labels=', '.join(map(lambda arg: self._print(arg), goto.labels)), expr=self._print(goto.expr) ) else: lbl, = goto.labels return "go to %s" % self._print(lbl) def _print_Program(self, prog): return ( "program {name}\n" "{body}\n" "end program\n" ).format(**prog.kwargs(apply=lambda arg: self._print(arg))) def _print_Module(self, mod): return ( "module {name}\n" "{declarations}\n" "\ncontains\n\n" "{definitions}\n" "end module\n" ).format(**mod.kwargs(apply=lambda arg: self._print(arg))) def _print_Stream(self, strm): if strm.name == 'stdout' and self._settings["standard"] >= 2003: self.module_uses['iso_c_binding'].add('stdint=>input_unit') return 'input_unit' elif strm.name == 'stderr' and self._settings["standard"] >= 2003: self.module_uses['iso_c_binding'].add('stdint=>error_unit') return 'error_unit' else: if strm.name == 'stdout': return '*' else: return strm.name def _print_Print(self, ps): if ps.format_string != None: # Must be '!= None', cannot be 'is not None' fmt = self._print(ps.format_string) else: fmt = "*" return "print {fmt}, {iolist}".format(fmt=fmt, iolist=', '.join( map(lambda arg: self._print(arg), ps.print_args))) def _print_Return(self, rs): arg, = rs.args return "{result_name} = {arg}".format( result_name=self._context.get('result_name', 'sympy_result'), arg=self._print(arg) ) def _print_FortranReturn(self, frs): arg, = frs.args if arg: return 'return %s' % self._print(arg) else: return 'return' def _head(self, entity, fp, **kwargs): bind_C_params = fp.attr_params('bind_C') if bind_C_params is None: bind = '' else: bind = ' bind(C, name="%s")' % bind_C_params[0] if bind_C_params else ' bind(C)' result_name = self._settings.get('result_name', None) return ( "{entity}{name}({arg_names}){result}{bind}\n" "{arg_declarations}" ).format( entity=entity, name=self._print(fp.name), arg_names=', '.join([self._print(arg.symbol) for arg in fp.parameters]), result=(' result(%s)' % result_name) if result_name else '', bind=bind, arg_declarations='\n'.join(map(lambda arg: self._print(Declaration(arg)), fp.parameters)) ) def _print_FunctionPrototype(self, fp): entity = "{0} function ".format(self._print(fp.return_type)) return ( "interface\n" "{function_head}\n" "end function\n" "end interface" ).format(function_head=self._head(entity, fp)) def _print_FunctionDefinition(self, fd): if elemental in fd.attrs: prefix = 'elemental ' elif pure in fd.attrs: prefix = 'pure ' else: prefix = '' entity = "{0} function ".format(self._print(fd.return_type)) with printer_context(self, result_name=fd.name): return ( "{prefix}{function_head}\n" "{body}\n" "end function\n" ).format( prefix=prefix, function_head=self._head(entity, fd), body=self._print(fd.body) ) def _print_Subroutine(self, sub): return ( '{subroutine_head}\n' '{body}\n' 'end subroutine\n' ).format( subroutine_head=self._head('subroutine ', sub), body=self._print(sub.body) ) def _print_SubroutineCall(self, scall): return 'call {name}({args})'.format( name=self._print(scall.name), args=', '.join(map(lambda arg: self._print(arg), scall.subroutine_args)) ) def _print_use_rename(self, rnm): return "%s => %s" % tuple(map(lambda arg: self._print(arg), rnm.args)) def _print_use(self, use): result = 'use %s' % self._print(use.namespace) if use.rename != None: # Must be '!= None', cannot be 'is not None' result += ', ' + ', '.join([self._print(rnm) for rnm in use.rename]) if use.only != None: # Must be '!= None', cannot be 'is not None' result += ', only: ' + ', '.join([self._print(nly) for nly in use.only]) return result def _print_BreakToken(self, _): return 'exit' def _print_ContinueToken(self, _): return 'cycle' def _print_ArrayConstructor(self, ac): fmtstr = "[%s]" if self._settings["standard"] >= 2003 else '(/%s/)' return fmtstr % ', '.join(map(lambda arg: self._print(arg), ac.elements)) def fcode(expr, assign_to=None, **settings): """Converts an expr to a string of fortran code Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of line-wrapping, or for expressions that generate multi-line statements. precision : integer, optional DEPRECATED. Use type_mappings instead. The precision for numbers such as pi [default=17]. user_functions : dict, optional A dictionary where keys are ``FunctionClass`` instances and values are their string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. See below for examples. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. source_format : optional The source format can be either 'fixed' or 'free'. [default='fixed'] standard : integer, optional The Fortran standard to be followed. This is specified as an integer. Acceptable standards are 66, 77, 90, 95, 2003, and 2008. Default is 77. Note that currently the only distinction internally is between standards before 95, and those 95 and after. This may change later as more features are added. name_mangling : bool, optional If True, then the variables that would become identical in case-insensitive Fortran are mangled by appending different number of ``_`` at the end. If False, SymPy won't interfere with naming of variables. [default=True] Examples ======== >>> from sympy import fcode, symbols, Rational, sin, ceiling, floor >>> x, tau = symbols("x, tau") >>> fcode((2*tau)**Rational(7, 2)) ' 8*sqrt(2.0d0)*tau**(7.0d0/2.0d0)' >>> fcode(sin(x), assign_to="s") ' s = sin(x)' Custom printing can be defined for certain types by passing a dictionary of "type" : "function" to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. >>> custom_functions = { ... "ceiling": "CEIL", ... "floor": [(lambda x: not x.is_integer, "FLOOR1"), ... (lambda x: x.is_integer, "FLOOR2")] ... } >>> fcode(floor(x) + ceiling(x), user_functions=custom_functions) ' CEIL(x) + FLOOR1(x)' ``Piecewise`` expressions are converted into conditionals. If an ``assign_to`` variable is provided an if statement is created, otherwise the ternary operator is used. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> expr = Piecewise((x + 1, x > 0), (x, True)) >>> print(fcode(expr, tau)) if (x > 0) then tau = x + 1 else tau = x end if Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> fcode(e.rhs, assign_to=e.lhs, contract=False) ' Dy(i) = (y(i + 1) - y(i))/(t(i + 1) - t(i))' Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions must be provided to ``assign_to``. Note that any expression that can be generated normally can also exist inside a Matrix: >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) >>> A = MatrixSymbol('A', 3, 1) >>> print(fcode(mat, A)) A(1, 1) = x**2 if (x > 0) then A(2, 1) = x + 1 else A(2, 1) = x end if A(3, 1) = sin(x) """ return FCodePrinter(settings).doprint(expr, assign_to) def print_fcode(expr, **settings): """Prints the Fortran representation of the given expression. See fcode for the meaning of the optional arguments. """ print(fcode(expr, **settings))

6cf2b0973be81aa1a19b398899bf933e33106a0c886b9184dada05f96944000c

from __future__ import print_function, division from functools import wraps from sympy.core import Add, Mul, Pow, S, sympify, Float from sympy.core.basic import Basic from sympy.core.compatibility import default_sort_key, string_types from sympy.core.function import Lambda from sympy.core.mul import _keep_coeff from sympy.core.symbol import Symbol from sympy.printing.str import StrPrinter from sympy.printing.precedence import precedence # Backwards compatibility from sympy.codegen.ast import Assignment class requires(object): """ Decorator for registering requirements on print methods. """ def __init__(self, **kwargs): self._req = kwargs def __call__(self, method): def _method_wrapper(self_, *args, **kwargs): for k, v in self._req.items(): getattr(self_, k).update(v) return method(self_, *args, **kwargs) return wraps(method)(_method_wrapper) class AssignmentError(Exception): """ Raised if an assignment variable for a loop is missing. """ pass class CodePrinter(StrPrinter): """ The base class for code-printing subclasses. """ _operators = { 'and': '&&', 'or': '||', 'not': '!', } _default_settings = { 'order': None, 'full_prec': 'auto', 'error_on_reserved': False, 'reserved_word_suffix': '_', 'human': True, 'inline': False, 'allow_unknown_functions': False, } # Functions which are "simple" to rewrite to other functions that # may be supported _rewriteable_functions = { 'erf2': 'erf', 'Li': 'li', } def __init__(self, settings=None): super(CodePrinter, self).__init__(settings=settings) if not hasattr(self, 'reserved_words'): self.reserved_words = set() def doprint(self, expr, assign_to=None): """ Print the expression as code. Parameters ---------- expr : Expression The expression to be printed. assign_to : Symbol, MatrixSymbol, or string (optional) If provided, the printed code will set the expression to a variable with name ``assign_to``. """ from sympy.matrices.expressions.matexpr import MatrixSymbol if isinstance(assign_to, string_types): if expr.is_Matrix: assign_to = MatrixSymbol(assign_to, *expr.shape) else: assign_to = Symbol(assign_to) elif not isinstance(assign_to, (Basic, type(None))): raise TypeError("{0} cannot assign to object of type {1}".format( type(self).__name__, type(assign_to))) if assign_to: expr = Assignment(assign_to, expr) else: # _sympify is not enough b/c it errors on iterables expr = sympify(expr) # keep a set of expressions that are not strictly translatable to Code # and number constants that must be declared and initialized self._not_supported = set() self._number_symbols = set() lines = self._print(expr).splitlines() # format the output if self._settings["human"]: frontlines = [] if self._not_supported: frontlines.append(self._get_comment( "Not supported in {0}:".format(self.language))) for expr in sorted(self._not_supported, key=str): frontlines.append(self._get_comment(type(expr).__name__)) for name, value in sorted(self._number_symbols, key=str): frontlines.append(self._declare_number_const(name, value)) lines = frontlines + lines lines = self._format_code(lines) result = "\n".join(lines) else: lines = self._format_code(lines) num_syms = set([(k, self._print(v)) for k, v in self._number_symbols]) result = (num_syms, self._not_supported, "\n".join(lines)) self._not_supported = set() self._number_symbols = set() return result def _doprint_loops(self, expr, assign_to=None): # Here we print an expression that contains Indexed objects, they # correspond to arrays in the generated code. The low-level implementation # involves looping over array elements and possibly storing results in temporary # variables or accumulate it in the assign_to object. if self._settings.get('contract', True): from sympy.tensor import get_contraction_structure # Setup loops over non-dummy indices -- all terms need these indices = self._get_expression_indices(expr, assign_to) # Setup loops over dummy indices -- each term needs separate treatment dummies = get_contraction_structure(expr) else: indices = [] dummies = {None: (expr,)} openloop, closeloop = self._get_loop_opening_ending(indices) # terms with no summations first if None in dummies: text = StrPrinter.doprint(self, Add(*dummies[None])) else: # If all terms have summations we must initialize array to Zero text = StrPrinter.doprint(self, 0) # skip redundant assignments (where lhs == rhs) lhs_printed = self._print(assign_to) lines = [] if text != lhs_printed: lines.extend(openloop) if assign_to is not None: text = self._get_statement("%s = %s" % (lhs_printed, text)) lines.append(text) lines.extend(closeloop) # then terms with summations for d in dummies: if isinstance(d, tuple): indices = self._sort_optimized(d, expr) openloop_d, closeloop_d = self._get_loop_opening_ending( indices) for term in dummies[d]: if term in dummies and not ([list(f.keys()) for f in dummies[term]] == [[None] for f in dummies[term]]): # If one factor in the term has it's own internal # contractions, those must be computed first. # (temporary variables?) raise NotImplementedError( "FIXME: no support for contractions in factor yet") else: # We need the lhs expression as an accumulator for # the loops, i.e # # for (int d=0; d < dim; d++){ # lhs[] = lhs[] + term[][d] # } ^.................. the accumulator # # We check if the expression already contains the # lhs, and raise an exception if it does, as that # syntax is currently undefined. FIXME: What would be # a good interpretation? if assign_to is None: raise AssignmentError( "need assignment variable for loops") if term.has(assign_to): raise ValueError("FIXME: lhs present in rhs,\ this is undefined in CodePrinter") lines.extend(openloop) lines.extend(openloop_d) text = "%s = %s" % (lhs_printed, StrPrinter.doprint( self, assign_to + term)) lines.append(self._get_statement(text)) lines.extend(closeloop_d) lines.extend(closeloop) return "\n".join(lines) def _get_expression_indices(self, expr, assign_to): from sympy.tensor import get_indices rinds, junk = get_indices(expr) linds, junk = get_indices(assign_to) # support broadcast of scalar if linds and not rinds: rinds = linds if rinds != linds: raise ValueError("lhs indices must match non-dummy" " rhs indices in %s" % expr) return self._sort_optimized(rinds, assign_to) def _sort_optimized(self, indices, expr): from sympy.tensor.indexed import Indexed if not indices: return [] # determine optimized loop order by giving a score to each index # the index with the highest score are put in the innermost loop. score_table = {} for i in indices: score_table[i] = 0 arrays = expr.atoms(Indexed) for arr in arrays: for p, ind in enumerate(arr.indices): try: score_table[ind] += self._rate_index_position(p) except KeyError: pass return sorted(indices, key=lambda x: score_table[x]) def _rate_index_position(self, p): """function to calculate score based on position among indices This method is used to sort loops in an optimized order, see CodePrinter._sort_optimized() """ raise NotImplementedError("This function must be implemented by " "subclass of CodePrinter.") def _get_statement(self, codestring): """Formats a codestring with the proper line ending.""" raise NotImplementedError("This function must be implemented by " "subclass of CodePrinter.") def _get_comment(self, text): """Formats a text string as a comment.""" raise NotImplementedError("This function must be implemented by " "subclass of CodePrinter.") def _declare_number_const(self, name, value): """Declare a numeric constant at the top of a function""" raise NotImplementedError("This function must be implemented by " "subclass of CodePrinter.") def _format_code(self, lines): """Take in a list of lines of code, and format them accordingly. This may include indenting, wrapping long lines, etc...""" raise NotImplementedError("This function must be implemented by " "subclass of CodePrinter.") def _get_loop_opening_ending(self, indices): """Returns a tuple (open_lines, close_lines) containing lists of codelines""" raise NotImplementedError("This function must be implemented by " "subclass of CodePrinter.") def _print_Dummy(self, expr): if expr.name.startswith('Dummy_'): return '_' + expr.name else: return '%s_%d' % (expr.name, expr.dummy_index) def _print_CodeBlock(self, expr): return '\n'.join([self._print(i) for i in expr.args]) def _print_String(self, string): return str(string) def _print_QuotedString(self, arg): return '"%s"' % arg.text def _print_Comment(self, string): return self._get_comment(str(string)) def _print_Assignment(self, expr): from sympy.functions.elementary.piecewise import Piecewise from sympy.matrices.expressions.matexpr import MatrixSymbol from sympy.tensor.indexed import IndexedBase lhs = expr.lhs rhs = expr.rhs # We special case assignments that take multiple lines if isinstance(expr.rhs, Piecewise): # Here we modify Piecewise so each expression is now # an Assignment, and then continue on the print. expressions = [] conditions = [] for (e, c) in rhs.args: expressions.append(Assignment(lhs, e)) conditions.append(c) temp = Piecewise(*zip(expressions, conditions)) return self._print(temp) elif isinstance(lhs, MatrixSymbol): # Here we form an Assignment for each element in the array, # printing each one. lines = [] for (i, j) in self._traverse_matrix_indices(lhs): temp = Assignment(lhs[i, j], rhs[i, j]) code0 = self._print(temp) lines.append(code0) return "\n".join(lines) elif self._settings.get("contract", False) and (lhs.has(IndexedBase) or rhs.has(IndexedBase)): # Here we check if there is looping to be done, and if so # print the required loops. return self._doprint_loops(rhs, lhs) else: lhs_code = self._print(lhs) rhs_code = self._print(rhs) return self._get_statement("%s = %s" % (lhs_code, rhs_code)) def _print_AugmentedAssignment(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) return self._get_statement("{0} {1} {2}".format( *map(lambda arg: self._print(arg), [lhs_code, expr.op, rhs_code]))) def _print_FunctionCall(self, expr): return '%s(%s)' % ( expr.name, ', '.join(map(lambda arg: self._print(arg), expr.function_args))) def _print_Variable(self, expr): return self._print(expr.symbol) def _print_Statement(self, expr): arg, = expr.args return self._get_statement(self._print(arg)) def _print_Symbol(self, expr): name = super(CodePrinter, self)._print_Symbol(expr) if name in self.reserved_words: if self._settings['error_on_reserved']: msg = ('This expression includes the symbol "{}" which is a ' 'reserved keyword in this language.') raise ValueError(msg.format(name)) return name + self._settings['reserved_word_suffix'] else: return name def _print_Function(self, expr): if expr.func.__name__ in self.known_functions: cond_func = self.known_functions[expr.func.__name__] func = None if isinstance(cond_func, string_types): func = cond_func else: for cond, func in cond_func: if cond(*expr.args): break if func is not None: try: return func(*[self.parenthesize(item, 0) for item in expr.args]) except TypeError: return "%s(%s)" % (func, self.stringify(expr.args, ", ")) elif hasattr(expr, '_imp_') and isinstance(expr._imp_, Lambda): # inlined function return self._print(expr._imp_(*expr.args)) elif expr.is_Function and self._settings.get('allow_unknown_functions', False): return '%s(%s)' % (self._print(expr.func), ', '.join(map(self._print, expr.args))) elif (expr.func.__name__ in self._rewriteable_functions and self._rewriteable_functions[expr.func.__name__] in self.known_functions): # Simple rewrite to supported function possible return self._print(expr.rewrite(self._rewriteable_functions[expr.func.__name__])) else: return self._print_not_supported(expr) _print_Expr = _print_Function def _print_NumberSymbol(self, expr): if self._settings.get("inline", False): return self._print(Float(expr.evalf(self._settings["precision"]))) else: # A Number symbol that is not implemented here or with _printmethod # is registered and evaluated self._number_symbols.add((expr, Float(expr.evalf(self._settings["precision"])))) return str(expr) def _print_Catalan(self, expr): return self._print_NumberSymbol(expr) def _print_EulerGamma(self, expr): return self._print_NumberSymbol(expr) def _print_GoldenRatio(self, expr): return self._print_NumberSymbol(expr) def _print_TribonacciConstant(self, expr): return self._print_NumberSymbol(expr) def _print_Exp1(self, expr): return self._print_NumberSymbol(expr) def _print_Pi(self, expr): return self._print_NumberSymbol(expr) def _print_And(self, expr): PREC = precedence(expr) return (" %s " % self._operators['and']).join(self.parenthesize(a, PREC) for a in sorted(expr.args, key=default_sort_key)) def _print_Or(self, expr): PREC = precedence(expr) return (" %s " % self._operators['or']).join(self.parenthesize(a, PREC) for a in sorted(expr.args, key=default_sort_key)) def _print_Xor(self, expr): if self._operators.get('xor') is None: return self._print_not_supported(expr) PREC = precedence(expr) return (" %s " % self._operators['xor']).join(self.parenthesize(a, PREC) for a in expr.args) def _print_Equivalent(self, expr): if self._operators.get('equivalent') is None: return self._print_not_supported(expr) PREC = precedence(expr) return (" %s " % self._operators['equivalent']).join(self.parenthesize(a, PREC) for a in expr.args) def _print_Not(self, expr): PREC = precedence(expr) return self._operators['not'] + self.parenthesize(expr.args[0], PREC) def _print_Mul(self, expr): prec = precedence(expr) c, e = expr.as_coeff_Mul() if c < 0: expr = _keep_coeff(-c, e) sign = "-" else: sign = "" a = [] # items in the numerator b = [] # items that are in the denominator (if any) pow_paren = [] # Will collect all pow with more than one base element and exp = -1 if self.order not in ('old', 'none'): args = expr.as_ordered_factors() else: # use make_args in case expr was something like -x -> x args = Mul.make_args(expr) # Gather args for numerator/denominator for item in args: if item.is_commutative and item.is_Pow and item.exp.is_Rational and item.exp.is_negative: if item.exp != -1: b.append(Pow(item.base, -item.exp, evaluate=False)) else: if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160 pow_paren.append(item) b.append(Pow(item.base, -item.exp)) else: a.append(item) a = a or [S.One] a_str = [self.parenthesize(x, prec) for x in a] b_str = [self.parenthesize(x, prec) for x in b] # To parenthesize Pow with exp = -1 and having more than one Symbol for item in pow_paren: if item.base in b: b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)] if not b: return sign + '*'.join(a_str) elif len(b) == 1: return sign + '*'.join(a_str) + "/" + b_str[0] else: return sign + '*'.join(a_str) + "/(%s)" % '*'.join(b_str) def _print_not_supported(self, expr): self._not_supported.add(expr) return self.emptyPrinter(expr) # The following can not be simply translated into C or Fortran _print_Basic = _print_not_supported _print_ComplexInfinity = _print_not_supported _print_Derivative = _print_not_supported _print_ExprCondPair = _print_not_supported _print_GeometryEntity = _print_not_supported _print_Infinity = _print_not_supported _print_Integral = _print_not_supported _print_Interval = _print_not_supported _print_AccumulationBounds = _print_not_supported _print_Limit = _print_not_supported _print_Matrix = _print_not_supported _print_ImmutableMatrix = _print_not_supported _print_ImmutableDenseMatrix = _print_not_supported _print_MutableDenseMatrix = _print_not_supported _print_MatrixBase = _print_not_supported _print_DeferredVector = _print_not_supported _print_NaN = _print_not_supported _print_NegativeInfinity = _print_not_supported _print_Order = _print_not_supported _print_RootOf = _print_not_supported _print_RootsOf = _print_not_supported _print_RootSum = _print_not_supported _print_SparseMatrix = _print_not_supported _print_MutableSparseMatrix = _print_not_supported _print_ImmutableSparseMatrix = _print_not_supported _print_Uniform = _print_not_supported _print_Unit = _print_not_supported _print_Wild = _print_not_supported _print_WildFunction = _print_not_supported _print_Relational = _print_not_supported

abbd4889fe44e18827c63997bf02d83196d4eadea996edcdccbb32d50d59e2ab

""" Javascript code printer The JavascriptCodePrinter converts single sympy expressions into single Javascript expressions, using the functions defined in the Javascript Math object where possible. """ from __future__ import print_function, division from sympy.codegen.ast import Assignment from sympy.core import S from sympy.core.compatibility import string_types, range from sympy.printing.codeprinter import CodePrinter from sympy.printing.precedence import precedence, PRECEDENCE # dictionary mapping sympy function to (argument_conditions, Javascript_function). # Used in JavascriptCodePrinter._print_Function(self) known_functions = { 'Abs': 'Math.abs', 'acos': 'Math.acos', 'acosh': 'Math.acosh', 'asin': 'Math.asin', 'asinh': 'Math.asinh', 'atan': 'Math.atan', 'atan2': 'Math.atan2', 'atanh': 'Math.atanh', 'ceiling': 'Math.ceil', 'cos': 'Math.cos', 'cosh': 'Math.cosh', 'exp': 'Math.exp', 'floor': 'Math.floor', 'log': 'Math.log', 'Max': 'Math.max', 'Min': 'Math.min', 'sign': 'Math.sign', 'sin': 'Math.sin', 'sinh': 'Math.sinh', 'tan': 'Math.tan', 'tanh': 'Math.tanh', } class JavascriptCodePrinter(CodePrinter): """"A Printer to convert python expressions to strings of javascript code """ printmethod = '_javascript' language = 'Javascript' _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 17, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, 'contract': True } def __init__(self, settings={}): CodePrinter.__init__(self, settings) self.known_functions = dict(known_functions) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) def _rate_index_position(self, p): return p*5 def _get_statement(self, codestring): return "%s;" % codestring def _get_comment(self, text): return "// {0}".format(text) def _declare_number_const(self, name, value): return "var {0} = {1};".format(name, value.evalf(self._settings['precision'])) def _format_code(self, lines): return self.indent_code(lines) def _traverse_matrix_indices(self, mat): rows, cols = mat.shape return ((i, j) for i in range(rows) for j in range(cols)) def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] loopstart = "for (var %(varble)s=%(start)s; %(varble)s<%(end)s; %(varble)s++){" for i in indices: # Javascript arrays start at 0 and end at dimension-1 open_lines.append(loopstart % { 'varble': self._print(i.label), 'start': self._print(i.lower), 'end': self._print(i.upper + 1)}) close_lines.append("}") return open_lines, close_lines def _print_Pow(self, expr): PREC = precedence(expr) if expr.exp == -1: return '1/%s' % (self.parenthesize(expr.base, PREC)) elif expr.exp == 0.5: return 'Math.sqrt(%s)' % self._print(expr.base) elif expr.exp == S(1)/3: return 'Math.cbrt(%s)' % self._print(expr.base) else: return 'Math.pow(%s, %s)' % (self._print(expr.base), self._print(expr.exp)) def _print_Rational(self, expr): p, q = int(expr.p), int(expr.q) return '%d/%d' % (p, q) def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_Indexed(self, expr): # calculate index for 1d array dims = expr.shape elem = S.Zero offset = S.One for i in reversed(range(expr.rank)): elem += expr.indices[i]*offset offset *= dims[i] return "%s[%s]" % (self._print(expr.base.label), self._print(elem)) def _print_Idx(self, expr): return self._print(expr.label) def _print_Exp1(self, expr): return "Math.E" def _print_Pi(self, expr): return 'Math.PI' def _print_Infinity(self, expr): return 'Number.POSITIVE_INFINITY' def _print_NegativeInfinity(self, expr): return 'Number.NEGATIVE_INFINITY' def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] if expr.has(Assignment): for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s) {" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines.append("else {") else: lines.append("else if (%s) {" % self._print(c)) code0 = self._print(e) lines.append(code0) lines.append("}") return "\n".join(lines) else: # The piecewise was used in an expression, need to do inline # operators. This has the downside that inline operators will # not work for statements that span multiple lines (Matrix or # Indexed expressions). ecpairs = ["((%s) ? (\n%s\n)\n" % (self._print(c), self._print(e)) for e, c in expr.args[:-1]] last_line = ": (\n%s\n)" % self._print(expr.args[-1].expr) return ": ".join(ecpairs) + last_line + " ".join([")"*len(ecpairs)]) def _print_MatrixElement(self, expr): return "{0}[{1}]".format(self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True), expr.j + expr.i*expr.parent.shape[1]) def indent_code(self, code): """Accepts a string of code or a list of code lines""" if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_token = ('{', '(', '{\n', '(\n') dec_token = ('}', ')') code = [ line.lstrip(' \t') for line in code ] increase = [ int(any(map(line.endswith, inc_token))) for line in code ] decrease = [ int(any(map(line.startswith, dec_token))) for line in code ] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tab*level, line)) level += increase[n] return pretty def jscode(expr, assign_to=None, **settings): """Converts an expr to a string of javascript code Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of line-wrapping, or for expressions that generate multi-line statements. precision : integer, optional The precision for numbers such as pi [default=15]. user_functions : dict, optional A dictionary where keys are ``FunctionClass`` instances and values are their string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, js_function_string)]. See below for examples. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. Examples ======== >>> from sympy import jscode, symbols, Rational, sin, ceiling, Abs >>> x, tau = symbols("x, tau") >>> jscode((2*tau)**Rational(7, 2)) '8*Math.sqrt(2)*Math.pow(tau, 7/2)' >>> jscode(sin(x), assign_to="s") 's = Math.sin(x);' Custom printing can be defined for certain types by passing a dictionary of "type" : "function" to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, js_function_string)]. >>> custom_functions = { ... "ceiling": "CEIL", ... "Abs": [(lambda x: not x.is_integer, "fabs"), ... (lambda x: x.is_integer, "ABS")] ... } >>> jscode(Abs(x) + ceiling(x), user_functions=custom_functions) 'fabs(x) + CEIL(x)' ``Piecewise`` expressions are converted into conditionals. If an ``assign_to`` variable is provided an if statement is created, otherwise the ternary operator is used. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> expr = Piecewise((x + 1, x > 0), (x, True)) >>> print(jscode(expr, tau)) if (x > 0) { tau = x + 1; } else { tau = x; } Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> jscode(e.rhs, assign_to=e.lhs, contract=False) 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions must be provided to ``assign_to``. Note that any expression that can be generated normally can also exist inside a Matrix: >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) >>> A = MatrixSymbol('A', 3, 1) >>> print(jscode(mat, A)) A[0] = Math.pow(x, 2); if (x > 0) { A[1] = x + 1; } else { A[1] = x; } A[2] = Math.sin(x); """ return JavascriptCodePrinter(settings).doprint(expr, assign_to) def print_jscode(expr, **settings): """Prints the Javascript representation of the given expression. See jscode for the meaning of the optional arguments. """ print(jscode(expr, **settings))

e68b0e9308f459a994494ee6d2415914c9d7c8c2211858e313c311a6d9e050a4

""" Julia code printer The `JuliaCodePrinter` converts SymPy expressions into Julia expressions. A complete code generator, which uses `julia_code` extensively, can be found in `sympy.utilities.codegen`. The `codegen` module can be used to generate complete source code files. """ from __future__ import print_function, division from sympy.core import Mul, Pow, S, Rational from sympy.core.compatibility import string_types, range from sympy.core.mul import _keep_coeff from sympy.printing.codeprinter import CodePrinter, Assignment from sympy.printing.precedence import precedence, PRECEDENCE from re import search # List of known functions. First, those that have the same name in # SymPy and Julia. This is almost certainly incomplete! known_fcns_src1 = ["sin", "cos", "tan", "cot", "sec", "csc", "asin", "acos", "atan", "acot", "asec", "acsc", "sinh", "cosh", "tanh", "coth", "sech", "csch", "asinh", "acosh", "atanh", "acoth", "asech", "acsch", "sinc", "atan2", "sign", "floor", "log", "exp", "cbrt", "sqrt", "erf", "erfc", "erfi", "factorial", "gamma", "digamma", "trigamma", "polygamma", "beta", "airyai", "airyaiprime", "airybi", "airybiprime", "besselj", "bessely", "besseli", "besselk", "erfinv", "erfcinv"] # These functions have different names ("Sympy": "Julia"), more # generally a mapping to (argument_conditions, julia_function). known_fcns_src2 = { "Abs": "abs", "ceiling": "ceil", "conjugate": "conj", "hankel1": "hankelh1", "hankel2": "hankelh2", "im": "imag", "re": "real" } class JuliaCodePrinter(CodePrinter): """ A printer to convert expressions to strings of Julia code. """ printmethod = "_julia" language = "Julia" _operators = { 'and': '&&', 'or': '||', 'not': '!', } _default_settings = { 'order': None, 'full_prec': 'auto', 'precision': 17, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, 'contract': True, 'inline': True, } # Note: contract is for expressing tensors as loops (if True), or just # assignment (if False). FIXME: this should be looked a more carefully # for Julia. def __init__(self, settings={}): super(JuliaCodePrinter, self).__init__(settings) self.known_functions = dict(zip(known_fcns_src1, known_fcns_src1)) self.known_functions.update(dict(known_fcns_src2)) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) def _rate_index_position(self, p): return p*5 def _get_statement(self, codestring): return "%s" % codestring def _get_comment(self, text): return "# {0}".format(text) def _declare_number_const(self, name, value): return "const {0} = {1}".format(name, value) def _format_code(self, lines): return self.indent_code(lines) def _traverse_matrix_indices(self, mat): # Julia uses Fortran order (column-major) rows, cols = mat.shape return ((i, j) for j in range(cols) for i in range(rows)) def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] for i in indices: # Julia arrays start at 1 and end at dimension var, start, stop = map(self._print, [i.label, i.lower + 1, i.upper + 1]) open_lines.append("for %s = %s:%s" % (var, start, stop)) close_lines.append("end") return open_lines, close_lines def _print_Mul(self, expr): # print complex numbers nicely in Julia if (expr.is_number and expr.is_imaginary and expr.as_coeff_Mul()[0].is_integer): return "%sim" % self._print(-S.ImaginaryUnit*expr) # cribbed from str.py prec = precedence(expr) c, e = expr.as_coeff_Mul() if c < 0: expr = _keep_coeff(-c, e) sign = "-" else: sign = "" a = [] # items in the numerator b = [] # items that are in the denominator (if any) pow_paren = [] # Will collect all pow with more than one base element and exp = -1 if self.order not in ('old', 'none'): args = expr.as_ordered_factors() else: # use make_args in case expr was something like -x -> x args = Mul.make_args(expr) # Gather args for numerator/denominator for item in args: if (item.is_commutative and item.is_Pow and item.exp.is_Rational and item.exp.is_negative): if item.exp != -1: b.append(Pow(item.base, -item.exp, evaluate=False)) else: if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160 pow_paren.append(item) b.append(Pow(item.base, -item.exp)) elif item.is_Rational and item is not S.Infinity: if item.p != 1: a.append(Rational(item.p)) if item.q != 1: b.append(Rational(item.q)) else: a.append(item) a = a or [S.One] a_str = [self.parenthesize(x, prec) for x in a] b_str = [self.parenthesize(x, prec) for x in b] # To parenthesize Pow with exp = -1 and having more than one Symbol for item in pow_paren: if item.base in b: b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)] # from here it differs from str.py to deal with "*" and ".*" def multjoin(a, a_str): # here we probably are assuming the constants will come first r = a_str[0] for i in range(1, len(a)): mulsym = '*' if a[i-1].is_number else '.*' r = r + mulsym + a_str[i] return r if not b: return sign + multjoin(a, a_str) elif len(b) == 1: divsym = '/' if b[0].is_number else './' return sign + multjoin(a, a_str) + divsym + b_str[0] else: divsym = '/' if all([bi.is_number for bi in b]) else './' return (sign + multjoin(a, a_str) + divsym + "(%s)" % multjoin(b, b_str)) def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_Pow(self, expr): powsymbol = '^' if all([x.is_number for x in expr.args]) else '.^' PREC = precedence(expr) if expr.exp == S.Half: return "sqrt(%s)" % self._print(expr.base) if expr.is_commutative: if expr.exp == -S.Half: sym = '/' if expr.base.is_number else './' return "1" + sym + "sqrt(%s)" % self._print(expr.base) if expr.exp == -S.One: sym = '/' if expr.base.is_number else './' return "1" + sym + "%s" % self.parenthesize(expr.base, PREC) return '%s%s%s' % (self.parenthesize(expr.base, PREC), powsymbol, self.parenthesize(expr.exp, PREC)) def _print_MatPow(self, expr): PREC = precedence(expr) return '%s^%s' % (self.parenthesize(expr.base, PREC), self.parenthesize(expr.exp, PREC)) def _print_Pi(self, expr): if self._settings["inline"]: return "pi" else: return super(JuliaCodePrinter, self)._print_NumberSymbol(expr) def _print_ImaginaryUnit(self, expr): return "im" def _print_Exp1(self, expr): if self._settings["inline"]: return "e" else: return super(JuliaCodePrinter, self)._print_NumberSymbol(expr) def _print_EulerGamma(self, expr): if self._settings["inline"]: return "eulergamma" else: return super(JuliaCodePrinter, self)._print_NumberSymbol(expr) def _print_Catalan(self, expr): if self._settings["inline"]: return "catalan" else: return super(JuliaCodePrinter, self)._print_NumberSymbol(expr) def _print_GoldenRatio(self, expr): if self._settings["inline"]: return "golden" else: return super(JuliaCodePrinter, self)._print_NumberSymbol(expr) def _print_Assignment(self, expr): from sympy.functions.elementary.piecewise import Piecewise from sympy.tensor.indexed import IndexedBase # Copied from codeprinter, but remove special MatrixSymbol treatment lhs = expr.lhs rhs = expr.rhs # We special case assignments that take multiple lines if not self._settings["inline"] and isinstance(expr.rhs, Piecewise): # Here we modify Piecewise so each expression is now # an Assignment, and then continue on the print. expressions = [] conditions = [] for (e, c) in rhs.args: expressions.append(Assignment(lhs, e)) conditions.append(c) temp = Piecewise(*zip(expressions, conditions)) return self._print(temp) if self._settings["contract"] and (lhs.has(IndexedBase) or rhs.has(IndexedBase)): # Here we check if there is looping to be done, and if so # print the required loops. return self._doprint_loops(rhs, lhs) else: lhs_code = self._print(lhs) rhs_code = self._print(rhs) return self._get_statement("%s = %s" % (lhs_code, rhs_code)) def _print_Infinity(self, expr): return 'Inf' def _print_NegativeInfinity(self, expr): return '-Inf' def _print_NaN(self, expr): return 'NaN' def _print_list(self, expr): return 'Any[' + ', '.join(self._print(a) for a in expr) + ']' def _print_tuple(self, expr): if len(expr) == 1: return "(%s,)" % self._print(expr[0]) else: return "(%s)" % self.stringify(expr, ", ") _print_Tuple = _print_tuple def _print_BooleanTrue(self, expr): return "true" def _print_BooleanFalse(self, expr): return "false" def _print_bool(self, expr): return str(expr).lower() # Could generate quadrature code for definite Integrals? #_print_Integral = _print_not_supported def _print_MatrixBase(self, A): # Handle zero dimensions: if A.rows == 0 or A.cols == 0: return 'zeros(%s, %s)' % (A.rows, A.cols) elif (A.rows, A.cols) == (1, 1): return "[%s]" % A[0, 0] elif A.rows == 1: return "[%s]" % A.table(self, rowstart='', rowend='', colsep=' ') elif A.cols == 1: # note .table would unnecessarily equispace the rows return "[%s]" % ", ".join([self._print(a) for a in A]) return "[%s]" % A.table(self, rowstart='', rowend='', rowsep=';\n', colsep=' ') def _print_SparseMatrix(self, A): from sympy.matrices import Matrix L = A.col_list(); # make row vectors of the indices and entries I = Matrix([k[0] + 1 for k in L]) J = Matrix([k[1] + 1 for k in L]) AIJ = Matrix([k[2] for k in L]) return "sparse(%s, %s, %s, %s, %s)" % (self._print(I), self._print(J), self._print(AIJ), A.rows, A.cols) # FIXME: Str/CodePrinter could define each of these to call the _print # method from higher up the class hierarchy (see _print_NumberSymbol). # Then subclasses like us would not need to repeat all this. _print_Matrix = \ _print_DenseMatrix = \ _print_MutableDenseMatrix = \ _print_ImmutableMatrix = \ _print_ImmutableDenseMatrix = \ _print_MatrixBase _print_MutableSparseMatrix = \ _print_ImmutableSparseMatrix = \ _print_SparseMatrix def _print_MatrixElement(self, expr): return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) \ + '[%s,%s]' % (expr.i + 1, expr.j + 1) def _print_MatrixSlice(self, expr): def strslice(x, lim): l = x[0] + 1 h = x[1] step = x[2] lstr = self._print(l) hstr = 'end' if h == lim else self._print(h) if step == 1: if l == 1 and h == lim: return ':' if l == h: return lstr else: return lstr + ':' + hstr else: return ':'.join((lstr, self._print(step), hstr)) return (self._print(expr.parent) + '[' + strslice(expr.rowslice, expr.parent.shape[0]) + ',' + strslice(expr.colslice, expr.parent.shape[1]) + ']') def _print_Indexed(self, expr): inds = [ self._print(i) for i in expr.indices ] return "%s[%s]" % (self._print(expr.base.label), ",".join(inds)) def _print_Idx(self, expr): return self._print(expr.label) def _print_Identity(self, expr): return "eye(%s)" % self._print(expr.shape[0]) # Note: as of 2015, Julia doesn't have spherical Bessel functions def _print_jn(self, expr): from sympy.functions import sqrt, besselj x = expr.argument expr2 = sqrt(S.Pi/(2*x))*besselj(expr.order + S.Half, x) return self._print(expr2) def _print_yn(self, expr): from sympy.functions import sqrt, bessely x = expr.argument expr2 = sqrt(S.Pi/(2*x))*bessely(expr.order + S.Half, x) return self._print(expr2) def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] if self._settings["inline"]: # Express each (cond, expr) pair in a nested Horner form: # (condition) .* (expr) + (not cond) .* (<others>) # Expressions that result in multiple statements won't work here. ecpairs = ["({0}) ? ({1}) :".format (self._print(c), self._print(e)) for e, c in expr.args[:-1]] elast = " (%s)" % self._print(expr.args[-1].expr) pw = "\n".join(ecpairs) + elast # Note: current need these outer brackets for 2*pw. Would be # nicer to teach parenthesize() to do this for us when needed! return "(" + pw + ")" else: for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s)" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines.append("else") else: lines.append("elseif (%s)" % self._print(c)) code0 = self._print(e) lines.append(code0) if i == len(expr.args) - 1: lines.append("end") return "\n".join(lines) def indent_code(self, code): """Accepts a string of code or a list of code lines""" # code mostly copied from ccode if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_regex = ('^function ', '^if ', '^elseif ', '^else$', '^for ') dec_regex = ('^end$', '^elseif ', '^else$') # pre-strip left-space from the code code = [ line.lstrip(' \t') for line in code ] increase = [ int(any([search(re, line) for re in inc_regex])) for line in code ] decrease = [ int(any([search(re, line) for re in dec_regex])) for line in code ] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tab*level, line)) level += increase[n] return pretty def julia_code(expr, assign_to=None, **settings): r"""Converts `expr` to a string of Julia code. Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This can be helpful for expressions that generate multi-line statements. precision : integer, optional The precision for numbers such as pi [default=16]. user_functions : dict, optional A dictionary where keys are ``FunctionClass`` instances and values are their string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, cfunction_string)]. See below for examples. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. inline: bool, optional If True, we try to create single-statement code instead of multiple statements. [default=True]. Examples ======== >>> from sympy import julia_code, symbols, sin, pi >>> x = symbols('x') >>> julia_code(sin(x).series(x).removeO()) 'x.^5/120 - x.^3/6 + x' >>> from sympy import Rational, ceiling, Abs >>> x, y, tau = symbols("x, y, tau") >>> julia_code((2*tau)**Rational(7, 2)) '8*sqrt(2)*tau.^(7/2)' Note that element-wise (Hadamard) operations are used by default between symbols. This is because its possible in Julia to write "vectorized" code. It is harmless if the values are scalars. >>> julia_code(sin(pi*x*y), assign_to="s") 's = sin(pi*x.*y)' If you need a matrix product "*" or matrix power "^", you can specify the symbol as a ``MatrixSymbol``. >>> from sympy import Symbol, MatrixSymbol >>> n = Symbol('n', integer=True, positive=True) >>> A = MatrixSymbol('A', n, n) >>> julia_code(3*pi*A**3) '(3*pi)*A^3' This class uses several rules to decide which symbol to use a product. Pure numbers use "*", Symbols use ".*" and MatrixSymbols use "*". A HadamardProduct can be used to specify componentwise multiplication ".*" of two MatrixSymbols. There is currently there is no easy way to specify scalar symbols, so sometimes the code might have some minor cosmetic issues. For example, suppose x and y are scalars and A is a Matrix, then while a human programmer might write "(x^2*y)*A^3", we generate: >>> julia_code(x**2*y*A**3) '(x.^2.*y)*A^3' Matrices are supported using Julia inline notation. When using ``assign_to`` with matrices, the name can be specified either as a string or as a ``MatrixSymbol``. The dimensions must align in the latter case. >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([[x**2, sin(x), ceiling(x)]]) >>> julia_code(mat, assign_to='A') 'A = [x.^2 sin(x) ceil(x)]' ``Piecewise`` expressions are implemented with logical masking by default. Alternatively, you can pass "inline=False" to use if-else conditionals. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> pw = Piecewise((x + 1, x > 0), (x, True)) >>> julia_code(pw, assign_to=tau) 'tau = ((x > 0) ? (x + 1) : (x))' Note that any expression that can be generated normally can also exist inside a Matrix: >>> mat = Matrix([[x**2, pw, sin(x)]]) >>> julia_code(mat, assign_to='A') 'A = [x.^2 ((x > 0) ? (x + 1) : (x)) sin(x)]' Custom printing can be defined for certain types by passing a dictionary of "type" : "function" to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e., [(argument_test, cfunction_string)]. This can be used to call a custom Julia function. >>> from sympy import Function >>> f = Function('f') >>> g = Function('g') >>> custom_functions = { ... "f": "existing_julia_fcn", ... "g": [(lambda x: x.is_Matrix, "my_mat_fcn"), ... (lambda x: not x.is_Matrix, "my_fcn")] ... } >>> mat = Matrix([[1, x]]) >>> julia_code(f(x) + g(x) + g(mat), user_functions=custom_functions) 'existing_julia_fcn(x) + my_fcn(x) + my_mat_fcn([1 x])' Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx, ccode >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e = Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> julia_code(e.rhs, assign_to=e.lhs, contract=False) 'Dy[i] = (y[i + 1] - y[i])./(t[i + 1] - t[i])' """ return JuliaCodePrinter(settings).doprint(expr, assign_to) def print_julia_code(expr, **settings): """Prints the Julia representation of the given expression. See `julia_code` for the meaning of the optional arguments. """ print(julia_code(expr, **settings))

47ab36679e72dff1e74d6e4494bf7ab5ede17500013615112b3a28483373648e

from sympy.codegen.ast import Assignment from sympy.core import S from sympy.core.compatibility import string_types, range from sympy.core.function import _coeff_isneg, Lambda from sympy.printing.codeprinter import CodePrinter from sympy.printing.precedence import precedence from functools import reduce known_functions = { 'Abs': 'abs', 'sin': 'sin', 'cos': 'cos', 'tan': 'tan', 'acos': 'acos', 'asin': 'asin', 'atan': 'atan', 'atan2': 'atan', 'ceiling': 'ceil', 'floor': 'floor', 'sign': 'sign', 'exp': 'exp', 'log': 'log', 'add': 'add', 'sub': 'sub', 'mul': 'mul', 'pow': 'pow' } class GLSLPrinter(CodePrinter): """ Rudimentary, generic GLSL printing tools. Additional settings: 'use_operators': Boolean (should the printer use operators for +,-,*, or functions?) """ _not_supported = set() printmethod = "_glsl" language = "GLSL" _default_settings = { 'use_operators': True, 'mat_nested': False, 'mat_separator': ',\n', 'mat_transpose': False, 'glsl_types': True, 'order': None, 'full_prec': 'auto', 'precision': 9, 'user_functions': {}, 'human': True, 'allow_unknown_functions': False, 'contract': True, 'error_on_reserved': False, 'reserved_word_suffix': '_' } def __init__(self, settings={}): CodePrinter.__init__(self, settings) self.known_functions = dict(known_functions) userfuncs = settings.get('user_functions', {}) self.known_functions.update(userfuncs) def _rate_index_position(self, p): return p*5 def _get_statement(self, codestring): return "%s;" % codestring def _get_comment(self, text): return "// {0}".format(text) def _declare_number_const(self, name, value): return "float {0} = {1};".format(name, value) def _format_code(self, lines): return self.indent_code(lines) def indent_code(self, code): """Accepts a string of code or a list of code lines""" if isinstance(code, string_types): code_lines = self.indent_code(code.splitlines(True)) return ''.join(code_lines) tab = " " inc_token = ('{', '(', '{\n', '(\n') dec_token = ('}', ')') code = [line.lstrip(' \t') for line in code] increase = [int(any(map(line.endswith, inc_token))) for line in code] decrease = [int(any(map(line.startswith, dec_token))) for line in code] pretty = [] level = 0 for n, line in enumerate(code): if line == '' or line == '\n': pretty.append(line) continue level -= decrease[n] pretty.append("%s%s" % (tab*level, line)) level += increase[n] return pretty def _print_MatrixBase(self, mat): mat_separator = self._settings['mat_separator'] mat_transpose = self._settings['mat_transpose'] glsl_types = self._settings['glsl_types'] column_vector = (mat.rows == 1) if mat_transpose else (mat.cols == 1) A = mat.transpose() if mat_transpose != column_vector else mat if A.cols == 1: return self._print(A[0]); if A.rows <= 4 and A.cols <= 4 and glsl_types: if A.rows == 1: return 'vec%s%s' % (A.cols, A.table(self,rowstart='(',rowend=')')) elif A.rows == A.cols: return 'mat%s(%s)' % (A.rows, A.table(self,rowsep=', ', rowstart='',rowend='')) else: return 'mat%sx%s(%s)' % (A.cols, A.rows, A.table(self,rowsep=', ', rowstart='',rowend='')) elif A.cols == 1 or A.rows == 1: return 'float[%s](%s)' % (A.cols*A.rows, A.table(self,rowsep=mat_separator,rowstart='',rowend='')) elif not self._settings['mat_nested']: return 'float[%s](\n%s\n) /* a %sx%s matrix */' % (A.cols*A.rows, A.table(self,rowsep=mat_separator,rowstart='',rowend=''), A.rows,A.cols) elif self._settings['mat_nested']: return 'float[%s][%s](\n%s\n)' % (A.rows,A.cols,A.table(self,rowsep=mat_separator,rowstart='float[](',rowend=')')) _print_Matrix = \ _print_MatrixElement = \ _print_DenseMatrix = \ _print_MutableDenseMatrix = \ _print_ImmutableMatrix = \ _print_ImmutableDenseMatrix = \ _print_MatrixBase def _traverse_matrix_indices(self, mat): mat_transpose = self._settings['mat_transpose'] if mat_transpose: rows,cols = mat.shape else: cols,rows = mat.shape return ((i, j) for i in range(cols) for j in range(rows)) def _print_MatrixElement(self, expr): # print('begin _print_MatrixElement') nest = self._settings['mat_nested']; glsl_types = self._settings['glsl_types']; mat_transpose = self._settings['mat_transpose']; if mat_transpose: cols,rows = expr.parent.shape i,j = expr.j,expr.i else: rows,cols = expr.parent.shape i,j = expr.i,expr.j pnt = self._print(expr.parent) if glsl_types and ((rows <= 4 and cols <=4) or nest): # print('end _print_MatrixElement case A',nest,glsl_types) return "%s[%s][%s]" % (pnt, i, j) else: # print('end _print_MatrixElement case B',nest,glsl_types) return "{0}[{1}]".format(pnt, i + j*rows) def _print_list(self, expr): l = ', '.join(self._print(item) for item in expr) glsl_types = self._settings['glsl_types'] if len(expr) <= 4 and glsl_types: return 'vec%s(%s)' % (len(expr),l) else: return 'float[%s](%s)' % (len(expr),l) _print_tuple = _print_list _print_Tuple = _print_list def _get_loop_opening_ending(self, indices): open_lines = [] close_lines = [] loopstart = "for (int %(varble)s=%(start)s; %(varble)s<%(end)s; %(varble)s++){" for i in indices: # GLSL arrays start at 0 and end at dimension-1 open_lines.append(loopstart % { 'varble': self._print(i.label), 'start': self._print(i.lower), 'end': self._print(i.upper + 1)}) close_lines.append("}") return open_lines, close_lines def _print_Function_with_args(self, func, func_args): if func in self.known_functions: cond_func = self.known_functions[func] func = None if isinstance(cond_func, string_types): func = cond_func else: for cond, func in cond_func: if cond(func_args): break if func is not None: try: return func(*[self.parenthesize(item, 0) for item in func_args]) except TypeError: return "%s(%s)" % (func, self.stringify(func_args, ", ")) elif isinstance(func, Lambda): # inlined function return self._print(func(*func_args)) else: return self._print_not_supported(func) def _print_Piecewise(self, expr): if expr.args[-1].cond != True: # We need the last conditional to be a True, otherwise the resulting # function may not return a result. raise ValueError("All Piecewise expressions must contain an " "(expr, True) statement to be used as a default " "condition. Without one, the generated " "expression may not evaluate to anything under " "some condition.") lines = [] if expr.has(Assignment): for i, (e, c) in enumerate(expr.args): if i == 0: lines.append("if (%s) {" % self._print(c)) elif i == len(expr.args) - 1 and c == True: lines.append("else {") else: lines.append("else if (%s) {" % self._print(c)) code0 = self._print(e) lines.append(code0) lines.append("}") return "\n".join(lines) else: # The piecewise was used in an expression, need to do inline # operators. This has the downside that inline operators will # not work for statements that span multiple lines (Matrix or # Indexed expressions). ecpairs = ["((%s) ? (\n%s\n)\n" % (self._print(c), self._print(e)) for e, c in expr.args[:-1]] last_line = ": (\n%s\n)" % self._print(expr.args[-1].expr) return ": ".join(ecpairs) + last_line + " ".join([")"*len(ecpairs)]) def _print_Idx(self, expr): return self._print(expr.label) def _print_Indexed(self, expr): # calculate index for 1d array dims = expr.shape elem = S.Zero offset = S.One for i in reversed(range(expr.rank)): elem += expr.indices[i]*offset offset *= dims[i] return "%s[%s]" % (self._print(expr.base.label), self._print(elem)) def _print_Pow(self, expr): PREC = precedence(expr) if expr.exp == -1: return '1.0/%s' % (self.parenthesize(expr.base, PREC)) elif expr.exp == 0.5: return 'sqrt(%s)' % self._print(expr.base) else: try: e = self._print(float(expr.exp)) except TypeError: e = self._print(expr.exp) # return self.known_functions['pow']+'(%s, %s)' % (self._print(expr.base),e) return self._print_Function_with_args('pow', ( self._print(expr.base), e )) def _print_int(self, expr): return str(float(expr)) def _print_Rational(self, expr): return "%s.0/%s.0" % (expr.p, expr.q) def _print_Relational(self, expr): lhs_code = self._print(expr.lhs) rhs_code = self._print(expr.rhs) op = expr.rel_op return "{0} {1} {2}".format(lhs_code, op, rhs_code) def _print_Add(self, expr, order=None): if self._settings['use_operators']: return CodePrinter._print_Add(self, expr, order=order) terms = expr.as_ordered_terms() def partition(p,l): return reduce(lambda x, y: (x[0]+[y], x[1]) if p(y) else (x[0], x[1]+[y]), l, ([], [])) def add(a,b): return self._print_Function_with_args('add', (a, b)) # return self.known_functions['add']+'(%s, %s)' % (a,b) neg, pos = partition(lambda arg: _coeff_isneg(arg), terms) s = pos = reduce(lambda a,b: add(a,b), map(lambda t: self._print(t),pos)) if neg: # sum the absolute values of the negative terms neg = reduce(lambda a,b: add(a,b), map(lambda n: self._print(-n),neg)) # then subtract them from the positive terms s = self._print_Function_with_args('sub', (pos,neg)) # s = self.known_functions['sub']+'(%s, %s)' % (pos,neg) return s def _print_Mul(self, expr, **kwargs): if self._settings['use_operators']: return CodePrinter._print_Mul(self, expr, **kwargs) terms = expr.as_ordered_factors() def mul(a,b): # return self.known_functions['mul']+'(%s, %s)' % (a,b) return self._print_Function_with_args('mul', (a,b)) s = reduce(lambda a,b: mul(a,b), map(lambda t: self._print(t), terms)) return s def glsl_code(expr,assign_to=None,**settings): """Converts an expr to a string of GLSL code Parameters ========== expr : Expr A sympy expression to be converted. assign_to : optional When given, the argument is used as the name of the variable to which the expression is assigned. Can be a string, ``Symbol``, ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of line-wrapping, or for expressions that generate multi-line statements. use_operators: bool, optional If set to False, then *,/,+,- operators will be replaced with functions mul, add, and sub, which must be implemented by the user, e.g. for implementing non-standard rings or emulated quad/octal precision. [default=True] glsl_types: bool, optional Set this argument to ``False`` in order to avoid using the ``vec`` and ``mat`` types. The printer will instead use arrays (or nested arrays). [default=True] mat_nested: bool, optional GLSL version 4.3 and above support nested arrays (arrays of arrays). Set this to ``True`` to render matrices as nested arrays. [default=False] mat_separator: str, optional By default, matrices are rendered with newlines using this separator, making them easier to read, but less compact. By removing the newline this option can be used to make them more vertically compact. [default=',\n'] mat_transpose: bool, optional GLSL's matrix multiplication implementation assumes column-major indexing. By default, this printer ignores that convention. Setting this option to ``True`` transposes all matrix output. [default=False] precision : integer, optional The precision for numbers such as pi [default=15]. user_functions : dict, optional A dictionary where keys are ``FunctionClass`` instances and values are their string representations. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, js_function_string)]. See below for examples. human : bool, optional If True, the result is a single string that may contain some constant declarations for the number symbols. If False, the same information is returned in a tuple of (symbols_to_declare, not_supported_functions, code_text). [default=True]. contract: bool, optional If True, ``Indexed`` instances are assumed to obey tensor contraction rules and the corresponding nested loops over indices are generated. Setting contract=False will not generate loops, instead the user is responsible to provide values for the indices in the code. [default=True]. Examples ======== >>> from sympy import glsl_code, symbols, Rational, sin, ceiling, Abs >>> x, tau = symbols("x, tau") >>> glsl_code((2*tau)**Rational(7, 2)) '8*sqrt(2)*pow(tau, 3.5)' >>> glsl_code(sin(x), assign_to="float y") 'float y = sin(x);' Various GLSL types are supported: >>> from sympy import Matrix, glsl_code >>> glsl_code(Matrix([1,2,3])) 'vec3(1, 2, 3)' >>> glsl_code(Matrix([[1, 2],[3, 4]])) 'mat2(1, 2, 3, 4)' Pass ``mat_transpose = True`` to switch to column-major indexing: >>> glsl_code(Matrix([[1, 2],[3, 4]]), mat_transpose = True) 'mat2(1, 3, 2, 4)' By default, larger matrices get collapsed into float arrays: >>> print(glsl_code( Matrix([[1,2,3,4,5],[6,7,8,9,10]]) )) float[10]( 1, 2, 3, 4, 5, 6, 7, 8, 9, 10 ) /* a 2x5 matrix */ Passing ``mat_nested = True`` instead prints out nested float arrays, which are supported in GLSL 4.3 and above. >>> mat = Matrix([ ... [ 0, 1, 2], ... [ 3, 4, 5], ... [ 6, 7, 8], ... [ 9, 10, 11], ... [12, 13, 14]]) >>> print(glsl_code( mat, mat_nested = True )) float[5][3]( float[]( 0, 1, 2), float[]( 3, 4, 5), float[]( 6, 7, 8), float[]( 9, 10, 11), float[](12, 13, 14) ) Custom printing can be defined for certain types by passing a dictionary of "type" : "function" to the ``user_functions`` kwarg. Alternatively, the dictionary value can be a list of tuples i.e. [(argument_test, js_function_string)]. >>> custom_functions = { ... "ceiling": "CEIL", ... "Abs": [(lambda x: not x.is_integer, "fabs"), ... (lambda x: x.is_integer, "ABS")] ... } >>> glsl_code(Abs(x) + ceiling(x), user_functions=custom_functions) 'fabs(x) + CEIL(x)' If further control is needed, addition, subtraction, multiplication and division operators can be replaced with ``add``, ``sub``, and ``mul`` functions. This is done by passing ``use_operators = False``: >>> x,y,z = symbols('x,y,z') >>> glsl_code(x*(y+z), use_operators = False) 'mul(x, add(y, z))' >>> glsl_code(x*(y+z*(x-y)**z), use_operators = False) 'mul(x, add(y, mul(z, pow(sub(x, y), z))))' ``Piecewise`` expressions are converted into conditionals. If an ``assign_to`` variable is provided an if statement is created, otherwise the ternary operator is used. Note that if the ``Piecewise`` lacks a default term, represented by ``(expr, True)`` then an error will be thrown. This is to prevent generating an expression that may not evaluate to anything. >>> from sympy import Piecewise >>> expr = Piecewise((x + 1, x > 0), (x, True)) >>> print(glsl_code(expr, tau)) if (x > 0) { tau = x + 1; } else { tau = x; } Support for loops is provided through ``Indexed`` types. With ``contract=True`` these expressions will be turned into loops, whereas ``contract=False`` will just print the assignment expression that should be looped over: >>> from sympy import Eq, IndexedBase, Idx >>> len_y = 5 >>> y = IndexedBase('y', shape=(len_y,)) >>> t = IndexedBase('t', shape=(len_y,)) >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) >>> i = Idx('i', len_y-1) >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) >>> glsl_code(e.rhs, assign_to=e.lhs, contract=False) 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' >>> from sympy import Matrix, MatrixSymbol >>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) >>> A = MatrixSymbol('A', 3, 1) >>> print(glsl_code(mat, A)) A[0][0] = pow(x, 2.0); if (x > 0) { A[1][0] = x + 1; } else { A[1][0] = x; } A[2][0] = sin(x); """ return GLSLPrinter(settings).doprint(expr,assign_to) def print_glsl(expr, **settings): """Prints the GLSL representation of the given expression. See GLSLPrinter init function for settings. """ print(glsl_code(expr, **settings))

e22cdc9f25dd0e606da4c5d28439e31b31a84edf9cb3f870e09b0f1780f38ed0

from __future__ import print_function, division from sympy.concrete.expr_with_limits import AddWithLimits from sympy.core.add import Add from sympy.core.basic import Basic from sympy.core.compatibility import is_sequence from sympy.core.containers import Tuple from sympy.core.expr import Expr from sympy.core.function import diff from sympy.core.logic import fuzzy_bool from sympy.core.mul import Mul from sympy.core.numbers import oo, pi from sympy.core.relational import Ne from sympy.core.singleton import S from sympy.core.symbol import (Dummy, Symbol, Wild) from sympy.core.sympify import sympify from sympy.functions import Piecewise, sqrt, piecewise_fold, tan, cot, atan from sympy.functions.elementary.exponential import log from sympy.functions.elementary.integers import floor from sympy.functions.elementary.complexes import Abs, sign from sympy.functions.elementary.miscellaneous import Min, Max from sympy.integrals.manualintegrate import manualintegrate from sympy.integrals.trigonometry import trigintegrate from sympy.integrals.meijerint import meijerint_definite, meijerint_indefinite from sympy.matrices import MatrixBase from sympy.polys import Poly, PolynomialError from sympy.series import limit from sympy.series.order import Order from sympy.series.formal import FormalPowerSeries from sympy.simplify.fu import sincos_to_sum from sympy.utilities.misc import filldedent class Integral(AddWithLimits): """Represents unevaluated integral.""" __slots__ = ['is_commutative'] def __new__(cls, function, *symbols, **assumptions): """Create an unevaluated integral. Arguments are an integrand followed by one or more limits. If no limits are given and there is only one free symbol in the expression, that symbol will be used, otherwise an error will be raised. >>> from sympy import Integral >>> from sympy.abc import x, y >>> Integral(x) Integral(x, x) >>> Integral(y) Integral(y, y) When limits are provided, they are interpreted as follows (using ``x`` as though it were the variable of integration): (x,) or x - indefinite integral (x, a) - "evaluate at" integral is an abstract antiderivative (x, a, b) - definite integral The ``as_dummy`` method can be used to see which symbols cannot be targeted by subs: those with a prepended underscore cannot be changed with ``subs``. (Also, the integration variables themselves -- the first element of a limit -- can never be changed by subs.) >>> i = Integral(x, x) >>> at = Integral(x, (x, x)) >>> i.as_dummy() Integral(x, x) >>> at.as_dummy() Integral(_0, (_0, x)) """ #This will help other classes define their own definitions #of behaviour with Integral. if hasattr(function, '_eval_Integral'): return function._eval_Integral(*symbols, **assumptions) obj = AddWithLimits.__new__(cls, function, *symbols, **assumptions) return obj def __getnewargs__(self): return (self.function,) + tuple([tuple(xab) for xab in self.limits]) @property def free_symbols(self): """ This method returns the symbols that will exist when the integral is evaluated. This is useful if one is trying to determine whether an integral depends on a certain symbol or not. Examples ======== >>> from sympy import Integral >>> from sympy.abc import x, y >>> Integral(x, (x, y, 1)).free_symbols {y} See Also ======== function, limits, variables """ return AddWithLimits.free_symbols.fget(self) def _eval_is_zero(self): # This is a very naive and quick test, not intended to do the integral to # answer whether it is zero or not, e.g. Integral(sin(x), (x, 0, 2*pi)) # is zero but this routine should return None for that case. But, like # Mul, there are trivial situations for which the integral will be # zero so we check for those. if self.function.is_zero: return True got_none = False for l in self.limits: if len(l) == 3: z = (l[1] == l[2]) or (l[1] - l[2]).is_zero if z: return True elif z is None: got_none = True free = self.function.free_symbols for xab in self.limits: if len(xab) == 1: free.add(xab[0]) continue if len(xab) == 2 and xab[0] not in free: if xab[1].is_zero: return True elif xab[1].is_zero is None: got_none = True # take integration symbol out of free since it will be replaced # with the free symbols in the limits free.discard(xab[0]) # add in the new symbols for i in xab[1:]: free.update(i.free_symbols) if self.function.is_zero is False and got_none is False: return False def transform(self, x, u): r""" Performs a change of variables from `x` to `u` using the relationship given by `x` and `u` which will define the transformations `f` and `F` (which are inverses of each other) as follows: 1) If `x` is a Symbol (which is a variable of integration) then `u` will be interpreted as some function, f(u), with inverse F(u). This, in effect, just makes the substitution of x with f(x). 2) If `u` is a Symbol then `x` will be interpreted as some function, F(x), with inverse f(u). This is commonly referred to as u-substitution. Once f and F have been identified, the transformation is made as follows: .. math:: \int_a^b x \mathrm{d}x \rightarrow \int_{F(a)}^{F(b)} f(x) \frac{\mathrm{d}}{\mathrm{d}x} where `F(x)` is the inverse of `f(x)` and the limits and integrand have been corrected so as to retain the same value after integration. Notes ===== The mappings, F(x) or f(u), must lead to a unique integral. Linear or rational linear expression, `2*x`, `1/x` and `sqrt(x)`, will always work; quadratic expressions like `x**2 - 1` are acceptable as long as the resulting integrand does not depend on the sign of the solutions (see examples). The integral will be returned unchanged if `x` is not a variable of integration. `x` must be (or contain) only one of of the integration variables. If `u` has more than one free symbol then it should be sent as a tuple (`u`, `uvar`) where `uvar` identifies which variable is replacing the integration variable. XXX can it contain another integration variable? Examples ======== >>> from sympy.abc import a, b, c, d, x, u, y >>> from sympy import Integral, S, cos, sqrt >>> i = Integral(x*cos(x**2 - 1), (x, 0, 1)) transform can change the variable of integration >>> i.transform(x, u) Integral(u*cos(u**2 - 1), (u, 0, 1)) transform can perform u-substitution as long as a unique integrand is obtained: >>> i.transform(x**2 - 1, u) Integral(cos(u)/2, (u, -1, 0)) This attempt fails because x = +/-sqrt(u + 1) and the sign does not cancel out of the integrand: >>> Integral(cos(x**2 - 1), (x, 0, 1)).transform(x**2 - 1, u) Traceback (most recent call last): ... ValueError: The mapping between F(x) and f(u) did not give a unique integrand. transform can do a substitution. Here, the previous result is transformed back into the original expression using "u-substitution": >>> ui = _ >>> _.transform(sqrt(u + 1), x) == i True We can accomplish the same with a regular substitution: >>> ui.transform(u, x**2 - 1) == i True If the `x` does not contain a symbol of integration then the integral will be returned unchanged. Integral `i` does not have an integration variable `a` so no change is made: >>> i.transform(a, x) == i True When `u` has more than one free symbol the symbol that is replacing `x` must be identified by passing `u` as a tuple: >>> Integral(x, (x, 0, 1)).transform(x, (u + a, u)) Integral(a + u, (u, -a, 1 - a)) >>> Integral(x, (x, 0, 1)).transform(x, (u + a, a)) Integral(a + u, (a, -u, 1 - u)) See Also ======== variables : Lists the integration variables as_dummy : Replace integration variables with dummy ones """ from sympy.solvers.solvers import solve, posify d = Dummy('d') xfree = x.free_symbols.intersection(self.variables) if len(xfree) > 1: raise ValueError( 'F(x) can only contain one of: %s' % self.variables) xvar = xfree.pop() if xfree else d if xvar not in self.variables: return self u = sympify(u) if isinstance(u, Expr): ufree = u.free_symbols if len(ufree) == 0: raise ValueError(filldedent(''' f(u) cannot be a constant''')) if len(ufree) > 1: raise ValueError(filldedent(''' When f(u) has more than one free symbol, the one replacing x must be identified: pass f(u) as (f(u), u)''')) uvar = ufree.pop() else: u, uvar = u if uvar not in u.free_symbols: raise ValueError(filldedent(''' Expecting a tuple (expr, symbol) where symbol identified a free symbol in expr, but symbol is not in expr's free symbols.''')) if not isinstance(uvar, Symbol): # This probably never evaluates to True raise ValueError(filldedent(''' Expecting a tuple (expr, symbol) but didn't get a symbol; got %s''' % uvar)) if x.is_Symbol and u.is_Symbol: return self.xreplace({x: u}) if not x.is_Symbol and not u.is_Symbol: raise ValueError('either x or u must be a symbol') if uvar == xvar: return self.transform(x, (u.subs(uvar, d), d)).xreplace({d: uvar}) if uvar in self.limits: raise ValueError(filldedent(''' u must contain the same variable as in x or a variable that is not already an integration variable''')) if not x.is_Symbol: F = [x.subs(xvar, d)] soln = solve(u - x, xvar, check=False) if not soln: raise ValueError('no solution for solve(F(x) - f(u), x)') f = [fi.subs(uvar, d) for fi in soln] else: f = [u.subs(uvar, d)] pdiff, reps = posify(u - x) puvar = uvar.subs([(v, k) for k, v in reps.items()]) soln = [s.subs(reps) for s in solve(pdiff, puvar)] if not soln: raise ValueError('no solution for solve(F(x) - f(u), u)') F = [fi.subs(xvar, d) for fi in soln] newfuncs = set([(self.function.subs(xvar, fi)*fi.diff(d) ).subs(d, uvar) for fi in f]) if len(newfuncs) > 1: raise ValueError(filldedent(''' The mapping between F(x) and f(u) did not give a unique integrand.''')) newfunc = newfuncs.pop() def _calc_limit_1(F, a, b): """ replace d with a, using subs if possible, otherwise limit where sign of b is considered """ wok = F.subs(d, a) if wok is S.NaN or wok.is_finite is False and a.is_finite: return limit(sign(b)*F, d, a) return wok def _calc_limit(a, b): """ replace d with a, using subs if possible, otherwise limit where sign of b is considered """ avals = list({_calc_limit_1(Fi, a, b) for Fi in F}) if len(avals) > 1: raise ValueError(filldedent(''' The mapping between F(x) and f(u) did not give a unique limit.''')) return avals[0] newlimits = [] for xab in self.limits: sym = xab[0] if sym == xvar: if len(xab) == 3: a, b = xab[1:] a, b = _calc_limit(a, b), _calc_limit(b, a) if fuzzy_bool(a - b > 0): a, b = b, a newfunc = -newfunc newlimits.append((uvar, a, b)) elif len(xab) == 2: a = _calc_limit(xab[1], 1) newlimits.append((uvar, a)) else: newlimits.append(uvar) else: newlimits.append(xab) return self.func(newfunc, *newlimits) def doit(self, **hints): """ Perform the integration using any hints given. Examples ======== >>> from sympy import Integral, Piecewise, S >>> from sympy.abc import x, t >>> p = x**2 + Piecewise((0, x/t < 0), (1, True)) >>> p.integrate((t, S(4)/5, 1), (x, -1, 1)) 1/3 See Also ======== sympy.integrals.trigonometry.trigintegrate sympy.integrals.risch.heurisch sympy.integrals.rationaltools.ratint as_sum : Approximate the integral using a sum """ if not hints.get('integrals', True): return self deep = hints.get('deep', True) meijerg = hints.get('meijerg', None) conds = hints.get('conds', 'piecewise') risch = hints.get('risch', None) heurisch = hints.get('heurisch', None) manual = hints.get('manual', None) if len(list(filter(None, (manual, meijerg, risch, heurisch)))) > 1: raise ValueError("At most one of manual, meijerg, risch, heurisch can be True") elif manual: meijerg = risch = heurisch = False elif meijerg: manual = risch = heurisch = False elif risch: manual = meijerg = heurisch = False elif heurisch: manual = meijerg = risch = False eval_kwargs = dict(meijerg=meijerg, risch=risch, manual=manual, heurisch=heurisch, conds=conds) if conds not in ['separate', 'piecewise', 'none']: raise ValueError('conds must be one of "separate", "piecewise", ' '"none", got: %s' % conds) if risch and any(len(xab) > 1 for xab in self.limits): raise ValueError('risch=True is only allowed for indefinite integrals.') # check for the trivial zero if self.is_zero: return S.Zero # now compute and check the function function = self.function if deep: function = function.doit(**hints) if function.is_zero: return S.Zero # hacks to handle special cases if isinstance(function, MatrixBase): return function.applyfunc( lambda f: self.func(f, self.limits).doit(**hints)) if isinstance(function, FormalPowerSeries): if len(self.limits) > 1: raise NotImplementedError xab = self.limits[0] if len(xab) > 1: return function.integrate(xab, **eval_kwargs) else: return function.integrate(xab[0], **eval_kwargs) # There is no trivial answer and special handling # is done so continue # first make sure any definite limits have integration # variables with matching assumptions reps = {} for xab in self.limits: if len(xab) != 3: continue x, a, b = xab l = (a, b) if all(i.is_nonnegative for i in l) and not x.is_nonnegative: d = Dummy(positive=True) elif all(i.is_nonpositive for i in l) and not x.is_nonpositive: d = Dummy(negative=True) elif all(i.is_real for i in l) and not x.is_real: d = Dummy(real=True) else: d = None if d: reps[x] = d if reps: undo = dict([(v, k) for k, v in reps.items()]) did = self.xreplace(reps).doit(**hints) if type(did) is tuple: # when separate=True did = tuple([i.xreplace(undo) for i in did]) else: did = did.xreplace(undo) return did # continue with existing assumptions undone_limits = [] # ulj = free symbols of any undone limits' upper and lower limits ulj = set() for xab in self.limits: # compute uli, the free symbols in the # Upper and Lower limits of limit I if len(xab) == 1: uli = set(xab[:1]) elif len(xab) == 2: uli = xab[1].free_symbols elif len(xab) == 3: uli = xab[1].free_symbols.union(xab[2].free_symbols) # this integral can be done as long as there is no blocking # limit that has been undone. An undone limit is blocking if # it contains an integration variable that is in this limit's # upper or lower free symbols or vice versa if xab[0] in ulj or any(v[0] in uli for v in undone_limits): undone_limits.append(xab) ulj.update(uli) function = self.func(*([function] + [xab])) factored_function = function.factor() if not isinstance(factored_function, Integral): function = factored_function continue if function.has(Abs, sign) and ( (len(xab) < 3 and all(x.is_extended_real for x in xab)) or (len(xab) == 3 and all(x.is_extended_real and not x.is_infinite for x in xab[1:]))): # some improper integrals are better off with Abs xr = Dummy("xr", real=True) function = (function.xreplace({xab[0]: xr}) .rewrite(Piecewise).xreplace({xr: xab[0]})) elif function.has(Min, Max): function = function.rewrite(Piecewise) if (function.has(Piecewise) and not isinstance(function, Piecewise)): function = piecewise_fold(function) if isinstance(function, Piecewise): if len(xab) == 1: antideriv = function._eval_integral(xab[0], **eval_kwargs) else: antideriv = self._eval_integral( function, xab[0], **eval_kwargs) else: # There are a number of tradeoffs in using the # Meijer G method. It can sometimes be a lot faster # than other methods, and sometimes slower. And # there are certain types of integrals for which it # is more likely to work than others. These # heuristics are incorporated in deciding what # integration methods to try, in what order. See the # integrate() docstring for details. def try_meijerg(function, xab): ret = None if len(xab) == 3 and meijerg is not False: x, a, b = xab try: res = meijerint_definite(function, x, a, b) except NotImplementedError: from sympy.integrals.meijerint import _debug _debug('NotImplementedError ' 'from meijerint_definite') res = None if res is not None: f, cond = res if conds == 'piecewise': ret = Piecewise( (f, cond), (self.func( function, (x, a, b)), True)) elif conds == 'separate': if len(self.limits) != 1: raise ValueError(filldedent(''' conds=separate not supported in multiple integrals''')) ret = f, cond else: ret = f return ret meijerg1 = meijerg if (meijerg is not False and len(xab) == 3 and xab[1].is_extended_real and xab[2].is_extended_real and not function.is_Poly and (xab[1].has(oo, -oo) or xab[2].has(oo, -oo))): ret = try_meijerg(function, xab) if ret is not None: function = ret continue meijerg1 = False # If the special meijerg code did not succeed in # finding a definite integral, then the code using # meijerint_indefinite will not either (it might # find an antiderivative, but the answer is likely # to be nonsensical). Thus if we are requested to # only use Meijer G-function methods, we give up at # this stage. Otherwise we just disable G-function # methods. if meijerg1 is False and meijerg is True: antideriv = None else: antideriv = self._eval_integral( function, xab[0], **eval_kwargs) if antideriv is None and meijerg is True: ret = try_meijerg(function, xab) if ret is not None: function = ret continue if not isinstance(antideriv, Integral) and antideriv is not None: sym = xab[0] for atan_term in antideriv.atoms(atan): atan_arg = atan_term.args[0] # Checking `atan_arg` to be linear combination of `tan` or `cot` for tan_part in atan_arg.atoms(tan): x1 = Dummy('x1') tan_exp1 = atan_arg.subs(tan_part, x1) # The coefficient of `tan` should be constant coeff = tan_exp1.diff(x1) if x1 not in coeff.free_symbols: a = tan_part.args[0] antideriv = antideriv.subs(atan_term, Add(atan_term, sign(coeff)*pi*floor((a-pi/2)/pi))) for cot_part in atan_arg.atoms(cot): x1 = Dummy('x1') cot_exp1 = atan_arg.subs(cot_part, x1) # The coefficient of `cot` should be constant coeff = cot_exp1.diff(x1) if x1 not in coeff.free_symbols: a = cot_part.args[0] antideriv = antideriv.subs(atan_term, Add(atan_term, sign(coeff)*pi*floor((a)/pi))) if antideriv is None: undone_limits.append(xab) function = self.func(*([function] + [xab])).factor() factored_function = function.factor() if not isinstance(factored_function, Integral): function = factored_function continue else: if len(xab) == 1: function = antideriv else: if len(xab) == 3: x, a, b = xab elif len(xab) == 2: x, b = xab a = None else: raise NotImplementedError if deep: if isinstance(a, Basic): a = a.doit(**hints) if isinstance(b, Basic): b = b.doit(**hints) if antideriv.is_Poly: gens = list(antideriv.gens) gens.remove(x) antideriv = antideriv.as_expr() function = antideriv._eval_interval(x, a, b) function = Poly(function, *gens) else: def is_indef_int(g, x): return (isinstance(g, Integral) and any(i == (x,) for i in g.limits)) def eval_factored(f, x, a, b): # _eval_interval for integrals with # (constant) factors # a single indefinite integral is assumed args = [] for g in Mul.make_args(f): if is_indef_int(g, x): args.append(g._eval_interval(x, a, b)) else: args.append(g) return Mul(*args) integrals, others, piecewises = [], [], [] for f in Add.make_args(antideriv): if any(is_indef_int(g, x) for g in Mul.make_args(f)): integrals.append(f) elif any(isinstance(g, Piecewise) for g in Mul.make_args(f)): piecewises.append(piecewise_fold(f)) else: others.append(f) uneval = Add(*[eval_factored(f, x, a, b) for f in integrals]) try: evalued = Add(*others)._eval_interval(x, a, b) evalued_pw = piecewise_fold(Add(*piecewises))._eval_interval(x, a, b) function = uneval + evalued + evalued_pw except NotImplementedError: # This can happen if _eval_interval depends in a # complicated way on limits that cannot be computed undone_limits.append(xab) function = self.func(*([function] + [xab])) factored_function = function.factor() if not isinstance(factored_function, Integral): function = factored_function return function def _eval_derivative(self, sym): """Evaluate the derivative of the current Integral object by differentiating under the integral sign [1], using the Fundamental Theorem of Calculus [2] when possible. Whenever an Integral is encountered that is equivalent to zero or has an integrand that is independent of the variable of integration those integrals are performed. All others are returned as Integral instances which can be resolved with doit() (provided they are integrable). References: [1] https://en.wikipedia.org/wiki/Differentiation_under_the_integral_sign [2] https://en.wikipedia.org/wiki/Fundamental_theorem_of_calculus Examples ======== >>> from sympy import Integral >>> from sympy.abc import x, y >>> i = Integral(x + y, y, (y, 1, x)) >>> i.diff(x) Integral(x + y, (y, x)) + Integral(1, y, (y, 1, x)) >>> i.doit().diff(x) == i.diff(x).doit() True >>> i.diff(y) 0 The previous must be true since there is no y in the evaluated integral: >>> i.free_symbols {x} >>> i.doit() 2*x**3/3 - x/2 - 1/6 """ # differentiate under the integral sign; we do not # check for regularity conditions (TODO), see issue 4215 # get limits and the function f, limits = self.function, list(self.limits) # the order matters if variables of integration appear in the limits # so work our way in from the outside to the inside. limit = limits.pop(-1) if len(limit) == 3: x, a, b = limit elif len(limit) == 2: x, b = limit a = None else: a = b = None x = limit[0] if limits: # f is the argument to an integral f = self.func(f, *tuple(limits)) # assemble the pieces def _do(f, ab): dab_dsym = diff(ab, sym) if not dab_dsym: return S.Zero if isinstance(f, Integral): limits = [(x, x) if (len(l) == 1 and l[0] == x) else l for l in f.limits] f = self.func(f.function, *limits) return f.subs(x, ab)*dab_dsym rv = S.Zero if b is not None: rv += _do(f, b) if a is not None: rv -= _do(f, a) if len(limit) == 1 and sym == x: # the dummy variable *is* also the real-world variable arg = f rv += arg else: # the dummy variable might match sym but it's # only a dummy and the actual variable is determined # by the limits, so mask off the variable of integration # while differentiating u = Dummy('u') arg = f.subs(x, u).diff(sym).subs(u, x) if arg: rv += self.func(arg, Tuple(x, a, b)) return rv def _eval_integral(self, f, x, meijerg=None, risch=None, manual=None, heurisch=None, conds='piecewise'): """ Calculate the anti-derivative to the function f(x). The following algorithms are applied (roughly in this order): 1. Simple heuristics (based on pattern matching and integral table): - most frequently used functions (e.g. polynomials, products of trig functions) 2. Integration of rational functions: - A complete algorithm for integrating rational functions is implemented (the Lazard-Rioboo-Trager algorithm). The algorithm also uses the partial fraction decomposition algorithm implemented in apart() as a preprocessor to make this process faster. Note that the integral of a rational function is always elementary, but in general, it may include a RootSum. 3. Full Risch algorithm: - The Risch algorithm is a complete decision procedure for integrating elementary functions, which means that given any elementary function, it will either compute an elementary antiderivative, or else prove that none exists. Currently, part of transcendental case is implemented, meaning elementary integrals containing exponentials, logarithms, and (soon!) trigonometric functions can be computed. The algebraic case, e.g., functions containing roots, is much more difficult and is not implemented yet. - If the routine fails (because the integrand is not elementary, or because a case is not implemented yet), it continues on to the next algorithms below. If the routine proves that the integrals is nonelementary, it still moves on to the algorithms below, because we might be able to find a closed-form solution in terms of special functions. If risch=True, however, it will stop here. 4. The Meijer G-Function algorithm: - This algorithm works by first rewriting the integrand in terms of very general Meijer G-Function (meijerg in SymPy), integrating it, and then rewriting the result back, if possible. This algorithm is particularly powerful for definite integrals (which is actually part of a different method of Integral), since it can compute closed-form solutions of definite integrals even when no closed-form indefinite integral exists. But it also is capable of computing many indefinite integrals as well. - Another advantage of this method is that it can use some results about the Meijer G-Function to give a result in terms of a Piecewise expression, which allows to express conditionally convergent integrals. - Setting meijerg=True will cause integrate() to use only this method. 5. The "manual integration" algorithm: - This algorithm tries to mimic how a person would find an antiderivative by hand, for example by looking for a substitution or applying integration by parts. This algorithm does not handle as many integrands but can return results in a more familiar form. - Sometimes this algorithm can evaluate parts of an integral; in this case integrate() will try to evaluate the rest of the integrand using the other methods here. - Setting manual=True will cause integrate() to use only this method. 6. The Heuristic Risch algorithm: - This is a heuristic version of the Risch algorithm, meaning that it is not deterministic. This is tried as a last resort because it can be very slow. It is still used because not enough of the full Risch algorithm is implemented, so that there are still some integrals that can only be computed using this method. The goal is to implement enough of the Risch and Meijer G-function methods so that this can be deleted. Setting heurisch=True will cause integrate() to use only this method. Set heurisch=False to not use it. """ from sympy.integrals.deltafunctions import deltaintegrate from sympy.integrals.singularityfunctions import singularityintegrate from sympy.integrals.heurisch import heurisch as heurisch_, heurisch_wrapper from sympy.integrals.rationaltools import ratint from sympy.integrals.risch import risch_integrate if risch: try: return risch_integrate(f, x, conds=conds) except NotImplementedError: return None if manual: try: result = manualintegrate(f, x) if result is not None and result.func != Integral: return result except (ValueError, PolynomialError): pass eval_kwargs = dict(meijerg=meijerg, risch=risch, manual=manual, heurisch=heurisch, conds=conds) # if it is a poly(x) then let the polynomial integrate itself (fast) # # It is important to make this check first, otherwise the other code # will return a sympy expression instead of a Polynomial. # # see Polynomial for details. if isinstance(f, Poly) and not (manual or meijerg or risch): return f.integrate(x) # Piecewise antiderivatives need to call special integrate. if isinstance(f, Piecewise): return f.piecewise_integrate(x, **eval_kwargs) # let's cut it short if `f` does not depend on `x`; if # x is only a dummy, that will be handled below if not f.has(x): return f*x # try to convert to poly(x) and then integrate if successful (fast) poly = f.as_poly(x) if poly is not None and not (manual or meijerg or risch): return poly.integrate().as_expr() if risch is not False: try: result, i = risch_integrate(f, x, separate_integral=True, conds=conds) except NotImplementedError: pass else: if i: # There was a nonelementary integral. Try integrating it. # if no part of the NonElementaryIntegral is integrated by # the Risch algorithm, then use the original function to # integrate, instead of re-written one if result == 0: from sympy.integrals.risch import NonElementaryIntegral return NonElementaryIntegral(f, x).doit(risch=False) else: return result + i.doit(risch=False) else: return result # since Integral(f=g1+g2+...) == Integral(g1) + Integral(g2) + ... # we are going to handle Add terms separately, # if `f` is not Add -- we only have one term # Note that in general, this is a bad idea, because Integral(g1) + # Integral(g2) might not be computable, even if Integral(g1 + g2) is. # For example, Integral(x**x + x**x*log(x)). But many heuristics only # work term-wise. So we compute this step last, after trying # risch_integrate. We also try risch_integrate again in this loop, # because maybe the integral is a sum of an elementary part and a # nonelementary part (like erf(x) + exp(x)). risch_integrate() is # quite fast, so this is acceptable. parts = [] args = Add.make_args(f) for g in args: coeff, g = g.as_independent(x) # g(x) = const if g is S.One and not meijerg: parts.append(coeff*x) continue # g(x) = expr + O(x**n) order_term = g.getO() if order_term is not None: h = self._eval_integral(g.removeO(), x, **eval_kwargs) if h is not None: h_order_expr = self._eval_integral(order_term.expr, x, **eval_kwargs) if h_order_expr is not None: h_order_term = order_term.func( h_order_expr, *order_term.variables) parts.append(coeff*(h + h_order_term)) continue # NOTE: if there is O(x**n) and we fail to integrate then # there is no point in trying other methods because they # will fail, too. return None # c # g(x) = (a*x+b) if g.is_Pow and not g.exp.has(x) and not meijerg: a = Wild('a', exclude=[x]) b = Wild('b', exclude=[x]) M = g.base.match(a*x + b) if M is not None: if g.exp == -1: h = log(g.base) elif conds != 'piecewise': h = g.base**(g.exp + 1) / (g.exp + 1) else: h1 = log(g.base) h2 = g.base**(g.exp + 1) / (g.exp + 1) h = Piecewise((h2, Ne(g.exp, -1)), (h1, True)) parts.append(coeff * h / M[a]) continue # poly(x) # g(x) = ------- # poly(x) if g.is_rational_function(x) and not (manual or meijerg or risch): parts.append(coeff * ratint(g, x)) continue if not (manual or meijerg or risch): # g(x) = Mul(trig) h = trigintegrate(g, x, conds=conds) if h is not None: parts.append(coeff * h) continue # g(x) has at least a DiracDelta term h = deltaintegrate(g, x) if h is not None: parts.append(coeff * h) continue # g(x) has at least a Singularity Function term h = singularityintegrate(g, x) if h is not None: parts.append(coeff * h) continue # Try risch again. if risch is not False: try: h, i = risch_integrate(g, x, separate_integral=True, conds=conds) except NotImplementedError: h = None else: if i: h = h + i.doit(risch=False) parts.append(coeff*h) continue # fall back to heurisch if heurisch is not False: try: if conds == 'piecewise': h = heurisch_wrapper(g, x, hints=[]) else: h = heurisch_(g, x, hints=[]) except PolynomialError: # XXX: this exception means there is a bug in the # implementation of heuristic Risch integration # algorithm. h = None else: h = None if meijerg is not False and h is None: # rewrite using G functions try: h = meijerint_indefinite(g, x) except NotImplementedError: from sympy.integrals.meijerint import _debug _debug('NotImplementedError from meijerint_definite') res = None if h is not None: parts.append(coeff * h) continue if h is None and manual is not False: try: result = manualintegrate(g, x) if result is not None and not isinstance(result, Integral): if result.has(Integral) and not manual: # Try to have other algorithms do the integrals # manualintegrate can't handle, # unless we were asked to use manual only. # Keep the rest of eval_kwargs in case another # method was set to False already new_eval_kwargs = eval_kwargs new_eval_kwargs["manual"] = False result = result.func(*[ arg.doit(**new_eval_kwargs) if arg.has(Integral) else arg for arg in result.args ]).expand(multinomial=False, log=False, power_exp=False, power_base=False) if not result.has(Integral): parts.append(coeff * result) continue except (ValueError, PolynomialError): # can't handle some SymPy expressions pass # if we failed maybe it was because we had # a product that could have been expanded, # so let's try an expansion of the whole # thing before giving up; we don't try this # at the outset because there are things # that cannot be solved unless they are # NOT expanded e.g., x**x*(1+log(x)). There # should probably be a checker somewhere in this # routine to look for such cases and try to do # collection on the expressions if they are already # in an expanded form if not h and len(args) == 1: f = sincos_to_sum(f).expand(mul=True, deep=False) if f.is_Add: # Note: risch will be identical on the expanded # expression, but maybe it will be able to pick out parts, # like x*(exp(x) + erf(x)). return self._eval_integral(f, x, **eval_kwargs) if h is not None: parts.append(coeff * h) else: return None return Add(*parts) def _eval_lseries(self, x, logx): expr = self.as_dummy() symb = x for l in expr.limits: if x in l[1:]: symb = l[0] break for term in expr.function.lseries(symb, logx): yield integrate(term, *expr.limits) def _eval_nseries(self, x, n, logx): expr = self.as_dummy() symb = x for l in expr.limits: if x in l[1:]: symb = l[0] break terms, order = expr.function.nseries( x=symb, n=n, logx=logx).as_coeff_add(Order) order = [o.subs(symb, x) for o in order] return integrate(terms, *expr.limits) + Add(*order)*x def _eval_as_leading_term(self, x): series_gen = self.args[0].lseries(x) for leading_term in series_gen: if leading_term != 0: break return integrate(leading_term, *self.args[1:]) def _eval_simplify(self, **kwargs): from sympy.core.exprtools import factor_terms from sympy.simplify.simplify import simplify expr = factor_terms(self) if isinstance(expr, Integral): return expr.func(*[simplify(i, **kwargs) for i in expr.args]) return expr.simplify(**kwargs) def as_sum(self, n=None, method="midpoint", evaluate=True): """ Approximates a definite integral by a sum. Arguments --------- n The number of subintervals to use, optional. method One of: 'left', 'right', 'midpoint', 'trapezoid'. evaluate If False, returns an unevaluated Sum expression. The default is True, evaluate the sum. These methods of approximate integration are described in [1]. [1] https://en.wikipedia.org/wiki/Riemann_sum#Methods Examples ======== >>> from sympy import sin, sqrt >>> from sympy.abc import x, n >>> from sympy.integrals import Integral >>> e = Integral(sin(x), (x, 3, 7)) >>> e Integral(sin(x), (x, 3, 7)) For demonstration purposes, this interval will only be split into 2 regions, bounded by [3, 5] and [5, 7]. The left-hand rule uses function evaluations at the left of each interval: >>> e.as_sum(2, 'left') 2*sin(5) + 2*sin(3) The midpoint rule uses evaluations at the center of each interval: >>> e.as_sum(2, 'midpoint') 2*sin(4) + 2*sin(6) The right-hand rule uses function evaluations at the right of each interval: >>> e.as_sum(2, 'right') 2*sin(5) + 2*sin(7) The trapezoid rule uses function evaluations on both sides of the intervals. This is equivalent to taking the average of the left and right hand rule results: >>> e.as_sum(2, 'trapezoid') 2*sin(5) + sin(3) + sin(7) >>> (e.as_sum(2, 'left') + e.as_sum(2, 'right'))/2 == _ True Here, the discontinuity at x = 0 can be avoided by using the midpoint or right-hand method: >>> e = Integral(1/sqrt(x), (x, 0, 1)) >>> e.as_sum(5).n(4) 1.730 >>> e.as_sum(10).n(4) 1.809 >>> e.doit().n(4) # the actual value is 2 2.000 The left- or trapezoid method will encounter the discontinuity and return infinity: >>> e.as_sum(5, 'left') zoo The number of intervals can be symbolic. If omitted, a dummy symbol will be used for it. >>> e = Integral(x**2, (x, 0, 2)) >>> e.as_sum(n, 'right').expand() 8/3 + 4/n + 4/(3*n**2) This shows that the midpoint rule is more accurate, as its error term decays as the square of n: >>> e.as_sum(method='midpoint').expand() 8/3 - 2/(3*_n**2) A symbolic sum is returned with evaluate=False: >>> e.as_sum(n, 'midpoint', evaluate=False) 2*Sum((2*_k/n - 1/n)**2, (_k, 1, n))/n See Also ======== Integral.doit : Perform the integration using any hints """ from sympy.concrete.summations import Sum limits = self.limits if len(limits) > 1: raise NotImplementedError( "Multidimensional midpoint rule not implemented yet") else: limit = limits[0] if (len(limit) != 3 or limit[1].is_finite is False or limit[2].is_finite is False): raise ValueError("Expecting a definite integral over " "a finite interval.") if n is None: n = Dummy('n', integer=True, positive=True) else: n = sympify(n) if (n.is_positive is False or n.is_integer is False or n.is_finite is False): raise ValueError("n must be a positive integer, got %s" % n) x, a, b = limit dx = (b - a)/n k = Dummy('k', integer=True, positive=True) f = self.function if method == "left": result = dx*Sum(f.subs(x, a + (k-1)*dx), (k, 1, n)) elif method == "right": result = dx*Sum(f.subs(x, a + k*dx), (k, 1, n)) elif method == "midpoint": result = dx*Sum(f.subs(x, a + k*dx - dx/2), (k, 1, n)) elif method == "trapezoid": result = dx*((f.subs(x, a) + f.subs(x, b))/2 + Sum(f.subs(x, a + k*dx), (k, 1, n - 1))) else: raise ValueError("Unknown method %s" % method) return result.doit() if evaluate else result def _sage_(self): import sage.all as sage f, limits = self.function._sage_(), list(self.limits) for limit in limits: if len(limit) == 1: x = limit[0] f = sage.integral(f, x._sage_(), hold=True) elif len(limit) == 2: x, b = limit f = sage.integral(f, x._sage_(), b._sage_(), hold=True) else: x, a, b = limit f = sage.integral(f, (x._sage_(), a._sage_(), b._sage_()), hold=True) return f def principal_value(self, **kwargs): """ Compute the Cauchy Principal Value of the definite integral of a real function in the given interval on the real axis. In mathematics, the Cauchy principal value, is a method for assigning values to certain improper integrals which would otherwise be undefined. Examples ======== >>> from sympy import Dummy, symbols, integrate, limit, oo >>> from sympy.integrals.integrals import Integral >>> from sympy.calculus.singularities import singularities >>> x = symbols('x') >>> Integral(x+1, (x, -oo, oo)).principal_value() oo >>> f = 1 / (x**3) >>> Integral(f, (x, -oo, oo)).principal_value() 0 >>> Integral(f, (x, -10, 10)).principal_value() 0 >>> Integral(f, (x, -10, oo)).principal_value() + Integral(f, (x, -oo, 10)).principal_value() 0 References ========== .. [1] https://en.wikipedia.org/wiki/Cauchy_principal_value .. [2] http://mathworld.wolfram.com/CauchyPrincipalValue.html """ from sympy.calculus import singularities if len(self.limits) != 1 or len(list(self.limits[0])) != 3: raise ValueError("You need to insert a variable, lower_limit, and upper_limit correctly to calculate " "cauchy's principal value") x, a, b = self.limits[0] if not (a.is_comparable and b.is_comparable and a <= b): raise ValueError("The lower_limit must be smaller than or equal to the upper_limit to calculate " "cauchy's principal value. Also, a and b need to be comparable.") if a == b: return 0 r = Dummy('r') f = self.function singularities_list = [s for s in singularities(f, x) if s.is_comparable and a <= s <= b] for i in singularities_list: if (i == b) or (i == a): raise ValueError( 'The principal value is not defined in the given interval due to singularity at %d.' % (i)) F = integrate(f, x, **kwargs) if F.has(Integral): return self if a is -oo and b is oo: I = limit(F - F.subs(x, -x), x, oo) else: I = limit(F, x, b, '-') - limit(F, x, a, '+') for s in singularities_list: I += limit(((F.subs(x, s - r)) - F.subs(x, s + r)), r, 0, '+') return I def integrate(*args, **kwargs): """integrate(f, var, ...) Compute definite or indefinite integral of one or more variables using Risch-Norman algorithm and table lookup. This procedure is able to handle elementary algebraic and transcendental functions and also a huge class of special functions, including Airy, Bessel, Whittaker and Lambert. var can be: - a symbol -- indefinite integration - a tuple (symbol, a) -- indefinite integration with result given with `a` replacing `symbol` - a tuple (symbol, a, b) -- definite integration Several variables can be specified, in which case the result is multiple integration. (If var is omitted and the integrand is univariate, the indefinite integral in that variable will be performed.) Indefinite integrals are returned without terms that are independent of the integration variables. (see examples) Definite improper integrals often entail delicate convergence conditions. Pass conds='piecewise', 'separate' or 'none' to have these returned, respectively, as a Piecewise function, as a separate result (i.e. result will be a tuple), or not at all (default is 'piecewise'). **Strategy** SymPy uses various approaches to definite integration. One method is to find an antiderivative for the integrand, and then use the fundamental theorem of calculus. Various functions are implemented to integrate polynomial, rational and trigonometric functions, and integrands containing DiracDelta terms. SymPy also implements the part of the Risch algorithm, which is a decision procedure for integrating elementary functions, i.e., the algorithm can either find an elementary antiderivative, or prove that one does not exist. There is also a (very successful, albeit somewhat slow) general implementation of the heuristic Risch algorithm. This algorithm will eventually be phased out as more of the full Risch algorithm is implemented. See the docstring of Integral._eval_integral() for more details on computing the antiderivative using algebraic methods. The option risch=True can be used to use only the (full) Risch algorithm. This is useful if you want to know if an elementary function has an elementary antiderivative. If the indefinite Integral returned by this function is an instance of NonElementaryIntegral, that means that the Risch algorithm has proven that integral to be non-elementary. Note that by default, additional methods (such as the Meijer G method outlined below) are tried on these integrals, as they may be expressible in terms of special functions, so if you only care about elementary answers, use risch=True. Also note that an unevaluated Integral returned by this function is not necessarily a NonElementaryIntegral, even with risch=True, as it may just be an indication that the particular part of the Risch algorithm needed to integrate that function is not yet implemented. Another family of strategies comes from re-writing the integrand in terms of so-called Meijer G-functions. Indefinite integrals of a single G-function can always be computed, and the definite integral of a product of two G-functions can be computed from zero to infinity. Various strategies are implemented to rewrite integrands as G-functions, and use this information to compute integrals (see the ``meijerint`` module). The option manual=True can be used to use only an algorithm that tries to mimic integration by hand. This algorithm does not handle as many integrands as the other algorithms implemented but may return results in a more familiar form. The ``manualintegrate`` module has functions that return the steps used (see the module docstring for more information). In general, the algebraic methods work best for computing antiderivatives of (possibly complicated) combinations of elementary functions. The G-function methods work best for computing definite integrals from zero to infinity of moderately complicated combinations of special functions, or indefinite integrals of very simple combinations of special functions. The strategy employed by the integration code is as follows: - If computing a definite integral, and both limits are real, and at least one limit is +- oo, try the G-function method of definite integration first. - Try to find an antiderivative, using all available methods, ordered by performance (that is try fastest method first, slowest last; in particular polynomial integration is tried first, Meijer G-functions second to last, and heuristic Risch last). - If still not successful, try G-functions irrespective of the limits. The option meijerg=True, False, None can be used to, respectively: always use G-function methods and no others, never use G-function methods, or use all available methods (in order as described above). It defaults to None. Examples ======== >>> from sympy import integrate, log, exp, oo >>> from sympy.abc import a, x, y >>> integrate(x*y, x) x**2*y/2 >>> integrate(log(x), x) x*log(x) - x >>> integrate(log(x), (x, 1, a)) a*log(a) - a + 1 >>> integrate(x) x**2/2 Terms that are independent of x are dropped by indefinite integration: >>> from sympy import sqrt >>> integrate(sqrt(1 + x), (x, 0, x)) 2*(x + 1)**(3/2)/3 - 2/3 >>> integrate(sqrt(1 + x), x) 2*(x + 1)**(3/2)/3 >>> integrate(x*y) Traceback (most recent call last): ... ValueError: specify integration variables to integrate x*y Note that ``integrate(x)`` syntax is meant only for convenience in interactive sessions and should be avoided in library code. >>> integrate(x**a*exp(-x), (x, 0, oo)) # same as conds='piecewise' Piecewise((gamma(a + 1), re(a) > -1), (Integral(x**a*exp(-x), (x, 0, oo)), True)) >>> integrate(x**a*exp(-x), (x, 0, oo), conds='none') gamma(a + 1) >>> integrate(x**a*exp(-x), (x, 0, oo), conds='separate') (gamma(a + 1), -re(a) < 1) See Also ======== Integral, Integral.doit """ doit_flags = { 'deep': False, 'meijerg': kwargs.pop('meijerg', None), 'conds': kwargs.pop('conds', 'piecewise'), 'risch': kwargs.pop('risch', None), 'heurisch': kwargs.pop('heurisch', None), 'manual': kwargs.pop('manual', None) } integral = Integral(*args, **kwargs) if isinstance(integral, Integral): return integral.doit(**doit_flags) else: new_args = [a.doit(**doit_flags) if isinstance(a, Integral) else a for a in integral.args] return integral.func(*new_args) def line_integrate(field, curve, vars): """line_integrate(field, Curve, variables) Compute the line integral. Examples ======== >>> from sympy import Curve, line_integrate, E, ln >>> from sympy.abc import x, y, t >>> C = Curve([E**t + 1, E**t - 1], (t, 0, ln(2))) >>> line_integrate(x + y, C, [x, y]) 3*sqrt(2) See Also ======== integrate, Integral """ from sympy.geometry import Curve F = sympify(field) if not F: raise ValueError( "Expecting function specifying field as first argument.") if not isinstance(curve, Curve): raise ValueError("Expecting Curve entity as second argument.") if not is_sequence(vars): raise ValueError("Expecting ordered iterable for variables.") if len(curve.functions) != len(vars): raise ValueError("Field variable size does not match curve dimension.") if curve.parameter in vars: raise ValueError("Curve parameter clashes with field parameters.") # Calculate derivatives for line parameter functions # F(r) -> F(r(t)) and finally F(r(t)*r'(t)) Ft = F dldt = 0 for i, var in enumerate(vars): _f = curve.functions[i] _dn = diff(_f, curve.parameter) # ...arc length dldt = dldt + (_dn * _dn) Ft = Ft.subs(var, _f) Ft = Ft * sqrt(dldt) integral = Integral(Ft, curve.limits).doit(deep=False) return integral

6b0d0aff54c99171cb1eb0a0edecbfcbd95c8ca31994a4d814aaad2ee8406175

""" Algorithms for solving Parametric Risch Differential Equations. The methods used for solving Parametric Risch Differential Equations parallel those for solving Risch Differential Equations. See the outline in the docstring of rde.py for more information. The Parametric Risch Differential Equation problem is, given f, g1, ..., gm in K(t), to determine if there exist y in K(t) and c1, ..., cm in Const(K) such that Dy + f*y == Sum(ci*gi, (i, 1, m)), and to find such y and ci if they exist. For the algorithms here G is a list of tuples of factions of the terms on the right hand side of the equation (i.e., gi in k(t)), and Q is a list of terms on the right hand side of the equation (i.e., qi in k[t]). See the docstring of each function for more information. """ from __future__ import print_function, division from sympy.core import Dummy, ilcm, Add, Mul, Pow, S from sympy.core.compatibility import reduce, range from sympy.integrals.rde import (order_at, order_at_oo, weak_normalizer, bound_degree) from sympy.integrals.risch import (gcdex_diophantine, frac_in, derivation, residue_reduce, splitfactor, residue_reduce_derivation, DecrementLevel, recognize_log_derivative) from sympy.matrices import zeros, eye from sympy.polys import Poly, lcm, cancel, sqf_list from sympy.polys.polymatrix import PolyMatrix as Matrix from sympy.solvers import solve def prde_normal_denom(fa, fd, G, DE): """ Parametric Risch Differential Equation - Normal part of the denominator. Given a derivation D on k[t] and f, g1, ..., gm in k(t) with f weakly normalized with respect to t, return the tuple (a, b, G, h) such that a, h in k[t], b in k<t>, G = [g1, ..., gm] in k(t)^m, and for any solution c1, ..., cm in Const(k) and y in k(t) of Dy + f*y == Sum(ci*gi, (i, 1, m)), q == y*h in k<t> satisfies a*Dq + b*q == Sum(ci*Gi, (i, 1, m)). """ dn, ds = splitfactor(fd, DE) Gas, Gds = list(zip(*G)) gd = reduce(lambda i, j: i.lcm(j), Gds, Poly(1, DE.t)) en, es = splitfactor(gd, DE) p = dn.gcd(en) h = en.gcd(en.diff(DE.t)).quo(p.gcd(p.diff(DE.t))) a = dn*h c = a*h ba = a*fa - dn*derivation(h, DE)*fd ba, bd = ba.cancel(fd, include=True) G = [(c*A).cancel(D, include=True) for A, D in G] return (a, (ba, bd), G, h) def real_imag(ba, bd, gen): """ Helper function, to get the real and imaginary part of a rational function evaluated at sqrt(-1) without actually evaluating it at sqrt(-1) Separates the even and odd power terms by checking the degree of terms wrt mod 4. Returns a tuple (ba[0], ba[1], bd) where ba[0] is real part of the numerator ba[1] is the imaginary part and bd is the denominator of the rational function. """ bd = bd.as_poly(gen).as_dict() ba = ba.as_poly(gen).as_dict() denom_real = [value if key[0] % 4 == 0 else -value if key[0] % 4 == 2 else 0 for key, value in bd.items()] denom_imag = [value if key[0] % 4 == 1 else -value if key[0] % 4 == 3 else 0 for key, value in bd.items()] bd_real = sum(r for r in denom_real) bd_imag = sum(r for r in denom_imag) num_real = [value if key[0] % 4 == 0 else -value if key[0] % 4 == 2 else 0 for key, value in ba.items()] num_imag = [value if key[0] % 4 == 1 else -value if key[0] % 4 == 3 else 0 for key, value in ba.items()] ba_real = sum(r for r in num_real) ba_imag = sum(r for r in num_imag) ba = ((ba_real*bd_real + ba_imag*bd_imag).as_poly(gen), (ba_imag*bd_real - ba_real*bd_imag).as_poly(gen)) bd = (bd_real*bd_real + bd_imag*bd_imag).as_poly(gen) return (ba[0], ba[1], bd) def prde_special_denom(a, ba, bd, G, DE, case='auto'): """ Parametric Risch Differential Equation - Special part of the denominator. case is one of {'exp', 'tan', 'primitive'} for the hyperexponential, hypertangent, and primitive cases, respectively. For the hyperexponential (resp. hypertangent) case, given a derivation D on k[t] and a in k[t], b in k<t>, and g1, ..., gm in k(t) with Dt/t in k (resp. Dt/(t**2 + 1) in k, sqrt(-1) not in k), a != 0, and gcd(a, t) == 1 (resp. gcd(a, t**2 + 1) == 1), return the tuple (A, B, GG, h) such that A, B, h in k[t], GG = [gg1, ..., ggm] in k(t)^m, and for any solution c1, ..., cm in Const(k) and q in k<t> of a*Dq + b*q == Sum(ci*gi, (i, 1, m)), r == q*h in k[t] satisfies A*Dr + B*r == Sum(ci*ggi, (i, 1, m)). For case == 'primitive', k<t> == k[t], so it returns (a, b, G, 1) in this case. """ # TODO: Merge this with the very similar special_denom() in rde.py if case == 'auto': case = DE.case if case == 'exp': p = Poly(DE.t, DE.t) elif case == 'tan': p = Poly(DE.t**2 + 1, DE.t) elif case in ['primitive', 'base']: B = ba.quo(bd) return (a, B, G, Poly(1, DE.t)) else: raise ValueError("case must be one of {'exp', 'tan', 'primitive', " "'base'}, not %s." % case) nb = order_at(ba, p, DE.t) - order_at(bd, p, DE.t) nc = min([order_at(Ga, p, DE.t) - order_at(Gd, p, DE.t) for Ga, Gd in G]) n = min(0, nc - min(0, nb)) if not nb: # Possible cancellation. if case == 'exp': dcoeff = DE.d.quo(Poly(DE.t, DE.t)) with DecrementLevel(DE): # We are guaranteed to not have problems, # because case != 'base'. alphaa, alphad = frac_in(-ba.eval(0)/bd.eval(0)/a.eval(0), DE.t) etaa, etad = frac_in(dcoeff, DE.t) A = parametric_log_deriv(alphaa, alphad, etaa, etad, DE) if A is not None: Q, m, z = A if Q == 1: n = min(n, m) elif case == 'tan': dcoeff = DE.d.quo(Poly(DE.t**2 + 1, DE.t)) with DecrementLevel(DE): # We are guaranteed to not have problems, # because case != 'base'. betaa, alphaa, alphad = real_imag(ba, bd*a, DE.t) betad = alphad etaa, etad = frac_in(dcoeff, DE.t) if recognize_log_derivative(2*betaa, betad, DE): A = parametric_log_deriv(alphaa, alphad, etaa, etad, DE) B = parametric_log_deriv(betaa, betad, etaa, etad, DE) if A is not None and B is not None: Q, s, z = A # TODO: Add test if Q == 1: n = min(n, s/2) N = max(0, -nb) pN = p**N pn = p**-n # This is 1/h A = a*pN B = ba*pN.quo(bd) + Poly(n, DE.t)*a*derivation(p, DE).quo(p)*pN G = [(Ga*pN*pn).cancel(Gd, include=True) for Ga, Gd in G] h = pn # (a*p**N, (b + n*a*Dp/p)*p**N, g1*p**(N - n), ..., gm*p**(N - n), p**-n) return (A, B, G, h) def prde_linear_constraints(a, b, G, DE): """ Parametric Risch Differential Equation - Generate linear constraints on the constants. Given a derivation D on k[t], a, b, in k[t] with gcd(a, b) == 1, and G = [g1, ..., gm] in k(t)^m, return Q = [q1, ..., qm] in k[t]^m and a matrix M with entries in k(t) such that for any solution c1, ..., cm in Const(k) and p in k[t] of a*Dp + b*p == Sum(ci*gi, (i, 1, m)), (c1, ..., cm) is a solution of Mx == 0, and p and the ci satisfy a*Dp + b*p == Sum(ci*qi, (i, 1, m)). Because M has entries in k(t), and because Matrix doesn't play well with Poly, M will be a Matrix of Basic expressions. """ m = len(G) Gns, Gds = list(zip(*G)) d = reduce(lambda i, j: i.lcm(j), Gds) d = Poly(d, field=True) Q = [(ga*(d).quo(gd)).div(d) for ga, gd in G] if not all([ri.is_zero for _, ri in Q]): N = max([ri.degree(DE.t) for _, ri in Q]) M = Matrix(N + 1, m, lambda i, j: Q[j][1].nth(i)) else: M = Matrix(0, m, []) # No constraints, return the empty matrix. qs, _ = list(zip(*Q)) return (qs, M) def poly_linear_constraints(p, d): """ Given p = [p1, ..., pm] in k[t]^m and d in k[t], return q = [q1, ..., qm] in k[t]^m and a matrix M with entries in k such that Sum(ci*pi, (i, 1, m)), for c1, ..., cm in k, is divisible by d if and only if (c1, ..., cm) is a solution of Mx = 0, in which case the quotient is Sum(ci*qi, (i, 1, m)). """ m = len(p) q, r = zip(*[pi.div(d) for pi in p]) if not all([ri.is_zero for ri in r]): n = max([ri.degree() for ri in r]) M = Matrix(n + 1, m, lambda i, j: r[j].nth(i)) else: M = Matrix(0, m, []) # No constraints. return q, M def constant_system(A, u, DE): """ Generate a system for the constant solutions. Given a differential field (K, D) with constant field C = Const(K), a Matrix A, and a vector (Matrix) u with coefficients in K, returns the tuple (B, v, s), where B is a Matrix with coefficients in C and v is a vector (Matrix) such that either v has coefficients in C, in which case s is True and the solutions in C of Ax == u are exactly all the solutions of Bx == v, or v has a non-constant coefficient, in which case s is False Ax == u has no constant solution. This algorithm is used both in solving parametric problems and in determining if an element a of K is a derivative of an element of K or the logarithmic derivative of a K-radical using the structure theorem approach. Because Poly does not play well with Matrix yet, this algorithm assumes that all matrix entries are Basic expressions. """ if not A: return A, u Au = A.row_join(u) Au = Au.rref(simplify=cancel, normalize_last=False)[0] # Warning: This will NOT return correct results if cancel() cannot reduce # an identically zero expression to 0. The danger is that we might # incorrectly prove that an integral is nonelementary (such as # risch_integrate(exp((sin(x)**2 + cos(x)**2 - 1)*x**2), x). # But this is a limitation in computer algebra in general, and implicit # in the correctness of the Risch Algorithm is the computability of the # constant field (actually, this same correctness problem exists in any # algorithm that uses rref()). # # We therefore limit ourselves to constant fields that are computable # via the cancel() function, in order to prevent a speed bottleneck from # calling some more complex simplification function (rational function # coefficients will fall into this class). Furthermore, (I believe) this # problem will only crop up if the integral explicitly contains an # expression in the constant field that is identically zero, but cannot # be reduced to such by cancel(). Therefore, a careful user can avoid this # problem entirely by being careful with the sorts of expressions that # appear in his integrand in the variables other than the integration # variable (the structure theorems should be able to completely decide these # problems in the integration variable). Au = Au.applyfunc(cancel) A, u = Au[:, :-1], Au[:, -1] for j in range(A.cols): for i in range(A.rows): if A[i, j].has(*DE.T): # This assumes that const(F(t0, ..., tn) == const(K) == F Ri = A[i, :] # Rm+1; m = A.rows Rm1 = Ri.applyfunc(lambda x: derivation(x, DE, basic=True)/ derivation(A[i, j], DE, basic=True)) Rm1 = Rm1.applyfunc(cancel) um1 = cancel(derivation(u[i], DE, basic=True)/ derivation(A[i, j], DE, basic=True)) for s in range(A.rows): # A[s, :] = A[s, :] - A[s, i]*A[:, m+1] Asj = A[s, j] A.row_op(s, lambda r, jj: cancel(r - Asj*Rm1[jj])) # u[s] = u[s] - A[s, j]*u[m+1 u.row_op(s, lambda r, jj: cancel(r - Asj*um1)) A = A.col_join(Rm1) u = u.col_join(Matrix([um1])) return (A, u) def prde_spde(a, b, Q, n, DE): """ Special Polynomial Differential Equation algorithm: Parametric Version. Given a derivation D on k[t], an integer n, and a, b, q1, ..., qm in k[t] with deg(a) > 0 and gcd(a, b) == 1, return (A, B, Q, R, n1), with Qq = [q1, ..., qm] and R = [r1, ..., rm], such that for any solution c1, ..., cm in Const(k) and q in k[t] of degree at most n of a*Dq + b*q == Sum(ci*gi, (i, 1, m)), p = (q - Sum(ci*ri, (i, 1, m)))/a has degree at most n1 and satisfies A*Dp + B*p == Sum(ci*qi, (i, 1, m)) """ R, Z = list(zip(*[gcdex_diophantine(b, a, qi) for qi in Q])) A = a B = b + derivation(a, DE) Qq = [zi - derivation(ri, DE) for ri, zi in zip(R, Z)] R = list(R) n1 = n - a.degree(DE.t) return (A, B, Qq, R, n1) def prde_no_cancel_b_large(b, Q, n, DE): """ Parametric Poly Risch Differential Equation - No cancellation: deg(b) large enough. Given a derivation D on k[t], n in ZZ, and b, q1, ..., qm in k[t] with b != 0 and either D == d/dt or deg(b) > max(0, deg(D) - 1), returns h1, ..., hr in k[t] and a matrix A with coefficients in Const(k) such that if c1, ..., cm in Const(k) and q in k[t] satisfy deg(q) <= n and Dq + b*q == Sum(ci*qi, (i, 1, m)), then q = Sum(dj*hj, (j, 1, r)), where d1, ..., dr in Const(k) and A*Matrix([[c1, ..., cm, d1, ..., dr]]).T == 0. """ db = b.degree(DE.t) m = len(Q) H = [Poly(0, DE.t)]*m for N in range(n, -1, -1): # [n, ..., 0] for i in range(m): si = Q[i].nth(N + db)/b.LC() sitn = Poly(si*DE.t**N, DE.t) H[i] = H[i] + sitn Q[i] = Q[i] - derivation(sitn, DE) - b*sitn if all(qi.is_zero for qi in Q): dc = -1 M = zeros(0, 2) else: dc = max([qi.degree(DE.t) for qi in Q]) M = Matrix(dc + 1, m, lambda i, j: Q[j].nth(i)) A, u = constant_system(M, zeros(dc + 1, 1), DE) c = eye(m) A = A.row_join(zeros(A.rows, m)).col_join(c.row_join(-c)) return (H, A) def prde_no_cancel_b_small(b, Q, n, DE): """ Parametric Poly Risch Differential Equation - No cancellation: deg(b) small enough. Given a derivation D on k[t], n in ZZ, and b, q1, ..., qm in k[t] with deg(b) < deg(D) - 1 and either D == d/dt or deg(D) >= 2, returns h1, ..., hr in k[t] and a matrix A with coefficients in Const(k) such that if c1, ..., cm in Const(k) and q in k[t] satisfy deg(q) <= n and Dq + b*q == Sum(ci*qi, (i, 1, m)) then q = Sum(dj*hj, (j, 1, r)) where d1, ..., dr in Const(k) and A*Matrix([[c1, ..., cm, d1, ..., dr]]).T == 0. """ m = len(Q) H = [Poly(0, DE.t)]*m for N in range(n, 0, -1): # [n, ..., 1] for i in range(m): si = Q[i].nth(N + DE.d.degree(DE.t) - 1)/(N*DE.d.LC()) sitn = Poly(si*DE.t**N, DE.t) H[i] = H[i] + sitn Q[i] = Q[i] - derivation(sitn, DE) - b*sitn if b.degree(DE.t) > 0: for i in range(m): si = Poly(Q[i].nth(b.degree(DE.t))/b.LC(), DE.t) H[i] = H[i] + si Q[i] = Q[i] - derivation(si, DE) - b*si if all(qi.is_zero for qi in Q): dc = -1 M = Matrix() else: dc = max([qi.degree(DE.t) for qi in Q]) M = Matrix(dc + 1, m, lambda i, j: Q[j].nth(i)) A, u = constant_system(M, zeros(dc + 1, 1), DE) c = eye(m) A = A.row_join(zeros(A.rows, m)).col_join(c.row_join(-c)) return (H, A) # else: b is in k, deg(qi) < deg(Dt) t = DE.t if DE.case != 'base': with DecrementLevel(DE): t0 = DE.t # k = k0(t0) ba, bd = frac_in(b, t0, field=True) Q0 = [frac_in(qi.TC(), t0, field=True) for qi in Q] f, B = param_rischDE(ba, bd, Q0, DE) # f = [f1, ..., fr] in k^r and B is a matrix with # m + r columns and entries in Const(k) = Const(k0) # such that Dy0 + b*y0 = Sum(ci*qi, (i, 1, m)) has # a solution y0 in k with c1, ..., cm in Const(k) # if and only y0 = Sum(dj*fj, (j, 1, r)) where # d1, ..., dr ar in Const(k) and # B*Matrix([c1, ..., cm, d1, ..., dr]) == 0. # Transform fractions (fa, fd) in f into constant # polynomials fa/fd in k[t]. # (Is there a better way?) f = [Poly(fa.as_expr()/fd.as_expr(), t, field=True) for fa, fd in f] else: # Base case. Dy == 0 for all y in k and b == 0. # Dy + b*y = Sum(ci*qi) is solvable if and only if # Sum(ci*qi) == 0 in which case the solutions are # y = d1*f1 for f1 = 1 and any d1 in Const(k) = k. f = [Poly(1, t, field=True)] # r = 1 B = Matrix([[qi.TC() for qi in Q] + [S(0)]]) # The condition for solvability is # B*Matrix([c1, ..., cm, d1]) == 0 # There are no constraints on d1. # Coefficients of t^j (j > 0) in Sum(ci*qi) must be zero. d = max([qi.degree(DE.t) for qi in Q]) if d > 0: M = Matrix(d, m, lambda i, j: Q[j].nth(i + 1)) A, _ = constant_system(M, zeros(d, 1), DE) else: # No constraints on the hj. A = Matrix(0, m, []) # Solutions of the original equation are # y = Sum(dj*fj, (j, 1, r) + Sum(ei*hi, (i, 1, m)), # where ei == ci (i = 1, ..., m), when # A*Matrix([c1, ..., cm]) == 0 and # B*Matrix([c1, ..., cm, d1, ..., dr]) == 0 # Build combined constraint matrix with m + r + m columns. r = len(f) I = eye(m) A = A.row_join(zeros(A.rows, r + m)) B = B.row_join(zeros(B.rows, m)) C = I.row_join(zeros(m, r)).row_join(-I) return f + H, A.col_join(B).col_join(C) def prde_cancel_liouvillian(b, Q, n, DE): """ Pg, 237. """ H = [] # Why use DecrementLevel? Below line answers that: # Assuming that we can solve such problems over 'k' (not k[t]) if DE.case == 'primitive': with DecrementLevel(DE): ba, bd = frac_in(b, DE.t, field=True) for i in range(n, -1, -1): if DE.case == 'exp': # this re-checking can be avoided with DecrementLevel(DE): ba, bd = frac_in(b + i*derivation(DE.t, DE)/DE.t, DE.t, field=True) with DecrementLevel(DE): Qy = [frac_in(q.nth(i), DE.t, field=True) for q in Q] fi, Ai = param_rischDE(ba, bd, Qy, DE) fi = [Poly(fa.as_expr()/fd.as_expr(), DE.t, field=True) for fa, fd in fi] ri = len(fi) if i == n: M = Ai else: M = Ai.col_join(M.row_join(zeros(M.rows, ri))) Fi, hi = [None]*ri, [None]*ri # from eq. on top of p.238 (unnumbered) for j in range(ri): hji = fi[j]*DE.t**i hi[j] = hji # building up Sum(djn*(D(fjn*t^n) - b*fjnt^n)) Fi[j] = -(derivation(hji, DE) - b*hji) H += hi # in the next loop instead of Q it has # to be Q + Fi taking its place Q = Q + Fi return (H, M) def param_poly_rischDE(a, b, q, n, DE): """Polynomial solutions of a parametric Risch differential equation. Given a derivation D in k[t], a, b in k[t] relatively prime, and q = [q1, ..., qm] in k[t]^m, return h = [h1, ..., hr] in k[t]^r and a matrix A with m + r columns and entries in Const(k) such that a*Dp + b*p = Sum(ci*qi, (i, 1, m)) has a solution p of degree <= n in k[t] with c1, ..., cm in Const(k) if and only if p = Sum(dj*hj, (j, 1, r)) where d1, ..., dr are in Const(k) and (c1, ..., cm, d1, ..., dr) is a solution of Ax == 0. """ m = len(q) if n < 0: # Only the trivial zero solution is possible. # Find relations between the qi. if all([qi.is_zero for qi in q]): return [], zeros(1, m) # No constraints. N = max([qi.degree(DE.t) for qi in q]) M = Matrix(N + 1, m, lambda i, j: q[j].nth(i)) A, _ = constant_system(M, zeros(M.rows, 1), DE) return [], A if a.is_ground: # Normalization: a = 1. a = a.LC() b, q = b.quo_ground(a), [qi.quo_ground(a) for qi in q] if not b.is_zero and (DE.case == 'base' or b.degree() > max(0, DE.d.degree() - 1)): return prde_no_cancel_b_large(b, q, n, DE) elif ((b.is_zero or b.degree() < DE.d.degree() - 1) and (DE.case == 'base' or DE.d.degree() >= 2)): return prde_no_cancel_b_small(b, q, n, DE) elif (DE.d.degree() >= 2 and b.degree() == DE.d.degree() - 1 and n > -b.as_poly().LC()/DE.d.as_poly().LC()): raise NotImplementedError("prde_no_cancel_b_equal() is " "not yet implemented.") else: # Liouvillian cases if DE.case == 'primitive' or DE.case == 'exp': return prde_cancel_liouvillian(b, q, n, DE) else: raise NotImplementedError("non-linear and hypertangent " "cases have not yet been implemented") # else: deg(a) > 0 # Iterate SPDE as long as possible cumulating coefficient # and terms for the recovery of original solutions. alpha, beta = 1, [0]*m while n >= 0: # and a, b relatively prime a, b, q, r, n = prde_spde(a, b, q, n, DE) beta = [betai + alpha*ri for betai, ri in zip(beta, r)] alpha *= a # Solutions p of a*Dp + b*p = Sum(ci*qi) correspond to # solutions alpha*p + Sum(ci*betai) of the initial equation. d = a.gcd(b) if not d.is_ground: break # a*Dp + b*p = Sum(ci*qi) may have a polynomial solution # only if the sum is divisible by d. qq, M = poly_linear_constraints(q, d) # qq = [qq1, ..., qqm] where qqi = qi.quo(d). # M is a matrix with m columns an entries in k. # Sum(fi*qi, (i, 1, m)), where f1, ..., fm are elements of k, is # divisible by d if and only if M*Matrix([f1, ..., fm]) == 0, # in which case the quotient is Sum(fi*qqi). A, _ = constant_system(M, zeros(M.rows, 1), DE) # A is a matrix with m columns and entries in Const(k). # Sum(ci*qqi) is Sum(ci*qi).quo(d), and the remainder is zero # for c1, ..., cm in Const(k) if and only if # A*Matrix([c1, ...,cm]) == 0. V = A.nullspace() # V = [v1, ..., vu] where each vj is a column matrix with # entries aj1, ..., ajm in Const(k). # Sum(aji*qi) is divisible by d with exact quotient Sum(aji*qqi). # Sum(ci*qi) is divisible by d if and only if ci = Sum(dj*aji) # (i = 1, ..., m) for some d1, ..., du in Const(k). # In that case, solutions of # a*Dp + b*p = Sum(ci*qi) = Sum(dj*Sum(aji*qi)) # are the same as those of # (a/d)*Dp + (b/d)*p = Sum(dj*rj) # where rj = Sum(aji*qqi). if not V: # No non-trivial solution. return [], eye(m) # Could return A, but this has # the minimum number of rows. Mqq = Matrix([qq]) # A single row. r = [(Mqq*vj)[0] for vj in V] # [r1, ..., ru] # Solutions of (a/d)*Dp + (b/d)*p = Sum(dj*rj) correspond to # solutions alpha*p + Sum(Sum(dj*aji)*betai) of the initial # equation. These are equal to alpha*p + Sum(dj*fj) where # fj = Sum(aji*betai). Mbeta = Matrix([beta]) f = [(Mbeta*vj)[0] for vj in V] # [f1, ..., fu] # # Solve the reduced equation recursively. # g, B = param_poly_rischDE(a.quo(d), b.quo(d), r, n, DE) # g = [g1, ..., gv] in k[t]^v and and B is a matrix with u + v # columns and entries in Const(k) such that # (a/d)*Dp + (b/d)*p = Sum(dj*rj) has a solution p of degree <= n # in k[t] if and only if p = Sum(ek*gk) where e1, ..., ev are in # Const(k) and B*Matrix([d1, ..., du, e1, ..., ev]) == 0. # The solutions of the original equation are then # Sum(dj*fj, (j, 1, u)) + alpha*Sum(ek*gk, (k, 1, v)). # Collect solution components. h = f + [alpha*gk for gk in g] # Build combined relation matrix. A = -eye(m) for vj in V: A = A.row_join(vj) A = A.row_join(zeros(m, len(g))) A = A.col_join(zeros(B.rows, m).row_join(B)) return h, A def param_rischDE(fa, fd, G, DE): """ Solve a Parametric Risch Differential Equation: Dy + f*y == Sum(ci*Gi, (i, 1, m)). Given a derivation D in k(t), f in k(t), and G = [G1, ..., Gm] in k(t)^m, return h = [h1, ..., hr] in k(t)^r and a matrix A with m + r columns and entries in Const(k) such that Dy + f*y = Sum(ci*Gi, (i, 1, m)) has a solution y in k(t) with c1, ..., cm in Const(k) if and only if y = Sum(dj*hj, (j, 1, r)) where d1, ..., dr are in Const(k) and (c1, ..., cm, d1, ..., dr) is a solution of Ax == 0. Elements of k(t) are tuples (a, d) with a and d in k[t]. """ m = len(G) q, (fa, fd) = weak_normalizer(fa, fd, DE) # Solutions of the weakly normalized equation Dz + f*z = q*Sum(ci*Gi) # correspond to solutions y = z/q of the original equation. gamma = q G = [(q*ga).cancel(gd, include=True) for ga, gd in G] a, (ba, bd), G, hn = prde_normal_denom(fa, fd, G, DE) # Solutions q in k<t> of a*Dq + b*q = Sum(ci*Gi) correspond # to solutions z = q/hn of the weakly normalized equation. gamma *= hn A, B, G, hs = prde_special_denom(a, ba, bd, G, DE) # Solutions p in k[t] of A*Dp + B*p = Sum(ci*Gi) correspond # to solutions q = p/hs of the previous equation. gamma *= hs g = A.gcd(B) a, b, g = A.quo(g), B.quo(g), [gia.cancel(gid*g, include=True) for gia, gid in G] # a*Dp + b*p = Sum(ci*gi) may have a polynomial solution # only if the sum is in k[t]. q, M = prde_linear_constraints(a, b, g, DE) # q = [q1, ..., qm] where qi in k[t] is the polynomial component # of the partial fraction expansion of gi. # M is a matrix with m columns and entries in k. # Sum(fi*gi, (i, 1, m)), where f1, ..., fm are elements of k, # is a polynomial if and only if M*Matrix([f1, ..., fm]) == 0, # in which case the sum is equal to Sum(fi*qi). M, _ = constant_system(M, zeros(M.rows, 1), DE) # M is a matrix with m columns and entries in Const(k). # Sum(ci*gi) is in k[t] for c1, ..., cm in Const(k) # if and only if M*Matrix([c1, ..., cm]) == 0, # in which case the sum is Sum(ci*qi). ## Reduce number of constants at this point V = M.nullspace() # V = [v1, ..., vu] where each vj is a column matrix with # entries aj1, ..., ajm in Const(k). # Sum(aji*gi) is in k[t] and equal to Sum(aji*qi) (j = 1, ..., u). # Sum(ci*gi) is in k[t] if and only is ci = Sum(dj*aji) # (i = 1, ..., m) for some d1, ..., du in Const(k). # In that case, # Sum(ci*gi) = Sum(ci*qi) = Sum(dj*Sum(aji*qi)) = Sum(dj*rj) # where rj = Sum(aji*qi) (j = 1, ..., u) in k[t]. if not V: # No non-trivial solution return [], eye(m) Mq = Matrix([q]) # A single row. r = [(Mq*vj)[0] for vj in V] # [r1, ..., ru] # Solutions of a*Dp + b*p = Sum(dj*rj) correspond to solutions # y = p/gamma of the initial equation with ci = Sum(dj*aji). try: # We try n=5. At least for prde_spde, it will always # terminate no matter what n is. n = bound_degree(a, b, r, DE, parametric=True) except NotImplementedError: # A temporary bound is set. Eventually, it will be removed. # the currently added test case takes large time # even with n=5, and much longer with large n's. n = 5 h, B = param_poly_rischDE(a, b, r, n, DE) # h = [h1, ..., hv] in k[t]^v and and B is a matrix with u + v # columns and entries in Const(k) such that # a*Dp + b*p = Sum(dj*rj) has a solution p of degree <= n # in k[t] if and only if p = Sum(ek*hk) where e1, ..., ev are in # Const(k) and B*Matrix([d1, ..., du, e1, ..., ev]) == 0. # The solutions of the original equation for ci = Sum(dj*aji) # (i = 1, ..., m) are then y = Sum(ek*hk, (k, 1, v))/gamma. ## Build combined relation matrix with m + u + v columns. A = -eye(m) for vj in V: A = A.row_join(vj) A = A.row_join(zeros(m, len(h))) A = A.col_join(zeros(B.rows, m).row_join(B)) ## Eliminate d1, ..., du. W = A.nullspace() # W = [w1, ..., wt] where each wl is a column matrix with # entries blk (k = 1, ..., m + u + v) in Const(k). # The vectors (bl1, ..., blm) generate the space of those # constant families (c1, ..., cm) for which a solution of # the equation Dy + f*y == Sum(ci*Gi) exists. They generate # the space and form a basis except possibly when Dy + f*y == 0 # is solvable in k(t}. The corresponding solutions are # y = Sum(blk'*hk, (k, 1, v))/gamma, where k' = k + m + u. v = len(h) M = Matrix([wl[:m] + wl[-v:] for wl in W]) # excise dj's. N = M.nullspace() # N = [n1, ..., ns] where the ni in Const(k)^(m + v) are column # vectors generating the space of linear relations between # c1, ..., cm, e1, ..., ev. C = Matrix([ni[:] for ni in N]) # rows n1, ..., ns. return [hk.cancel(gamma, include=True) for hk in h], C def limited_integrate_reduce(fa, fd, G, DE): """ Simpler version of step 1 & 2 for the limited integration problem. Given a derivation D on k(t) and f, g1, ..., gn in k(t), return (a, b, h, N, g, V) such that a, b, h in k[t], N is a non-negative integer, g in k(t), V == [v1, ..., vm] in k(t)^m, and for any solution v in k(t), c1, ..., cm in C of f == Dv + Sum(ci*wi, (i, 1, m)), p = v*h is in k<t>, and p and the ci satisfy a*Dp + b*p == g + Sum(ci*vi, (i, 1, m)). Furthermore, if S1irr == Sirr, then p is in k[t], and if t is nonlinear or Liouvillian over k, then deg(p) <= N. So that the special part is always computed, this function calls the more general prde_special_denom() automatically if it cannot determine that S1irr == Sirr. Furthermore, it will automatically call bound_degree() when t is linear and non-Liouvillian, which for the transcendental case, implies that Dt == a*t + b with for some a, b in k*. """ dn, ds = splitfactor(fd, DE) E = [splitfactor(gd, DE) for _, gd in G] En, Es = list(zip(*E)) c = reduce(lambda i, j: i.lcm(j), (dn,) + En) # lcm(dn, en1, ..., enm) hn = c.gcd(c.diff(DE.t)) a = hn b = -derivation(hn, DE) N = 0 # These are the cases where we know that S1irr = Sirr, but there could be # others, and this algorithm will need to be extended to handle them. if DE.case in ['base', 'primitive', 'exp', 'tan']: hs = reduce(lambda i, j: i.lcm(j), (ds,) + Es) # lcm(ds, es1, ..., esm) a = hn*hs b -= (hn*derivation(hs, DE)).quo(hs) mu = min(order_at_oo(fa, fd, DE.t), min([order_at_oo(ga, gd, DE.t) for ga, gd in G])) # So far, all the above are also nonlinear or Liouvillian, but if this # changes, then this will need to be updated to call bound_degree() # as per the docstring of this function (DE.case == 'other_linear'). N = hn.degree(DE.t) + hs.degree(DE.t) + max(0, 1 - DE.d.degree(DE.t) - mu) else: # TODO: implement this raise NotImplementedError V = [(-a*hn*ga).cancel(gd, include=True) for ga, gd in G] return (a, b, a, N, (a*hn*fa).cancel(fd, include=True), V) def limited_integrate(fa, fd, G, DE): """ Solves the limited integration problem: f = Dv + Sum(ci*wi, (i, 1, n)) """ fa, fd = fa*Poly(1/fd.LC(), DE.t), fd.monic() # interpreting limited integration problem as a # parametric Risch DE problem Fa = Poly(0, DE.t) Fd = Poly(1, DE.t) G = [(fa, fd)] + G h, A = param_rischDE(Fa, Fd, G, DE) V = A.nullspace() V = [v for v in V if v[0] != 0] if not V: return None else: # we can take any vector from V, we take V[0] c0 = V[0][0] # v = [-1, c1, ..., cm, d1, ..., dr] v = V[0]/(-c0) r = len(h) m = len(v) - r - 1 C = list(v[1: m + 1]) y = -sum([v[m + 1 + i]*h[i][0].as_expr()/h[i][1].as_expr() \ for i in range(r)]) y_num, y_den = y.as_numer_denom() Ya, Yd = Poly(y_num, DE.t), Poly(y_den, DE.t) Y = Ya*Poly(1/Yd.LC(), DE.t), Yd.monic() return Y, C def parametric_log_deriv_heu(fa, fd, wa, wd, DE, c1=None): """ Parametric logarithmic derivative heuristic. Given a derivation D on k[t], f in k(t), and a hyperexponential monomial theta over k(t), raises either NotImplementedError, in which case the heuristic failed, or returns None, in which case it has proven that no solution exists, or returns a solution (n, m, v) of the equation n*f == Dv/v + m*Dtheta/theta, with v in k(t)* and n, m in ZZ with n != 0. If this heuristic fails, the structure theorem approach will need to be used. The argument w == Dtheta/theta """ # TODO: finish writing this and write tests c1 = c1 or Dummy('c1') p, a = fa.div(fd) q, b = wa.div(wd) B = max(0, derivation(DE.t, DE).degree(DE.t) - 1) C = max(p.degree(DE.t), q.degree(DE.t)) if q.degree(DE.t) > B: eqs = [p.nth(i) - c1*q.nth(i) for i in range(B + 1, C + 1)] s = solve(eqs, c1) if not s or not s[c1].is_Rational: # deg(q) > B, no solution for c. return None M, N = s[c1].as_numer_denom() nfmwa = N*fa*wd - M*wa*fd nfmwd = fd*wd Qv = is_log_deriv_k_t_radical_in_field(N*fa*wd - M*wa*fd, fd*wd, DE, 'auto') if Qv is None: # (N*f - M*w) is not the logarithmic derivative of a k(t)-radical. return None Q, v = Qv if Q.is_zero or v.is_zero: return None return (Q*N, Q*M, v) if p.degree(DE.t) > B: return None c = lcm(fd.as_poly(DE.t).LC(), wd.as_poly(DE.t).LC()) l = fd.monic().lcm(wd.monic())*Poly(c, DE.t) ln, ls = splitfactor(l, DE) z = ls*ln.gcd(ln.diff(DE.t)) if not z.has(DE.t): # TODO: We treat this as 'no solution', until the structure # theorem version of parametric_log_deriv is implemented. return None u1, r1 = (fa*l.quo(fd)).div(z) # (l*f).div(z) u2, r2 = (wa*l.quo(wd)).div(z) # (l*w).div(z) eqs = [r1.nth(i) - c1*r2.nth(i) for i in range(z.degree(DE.t))] s = solve(eqs, c1) if not s or not s[c1].is_Rational: # deg(q) <= B, no solution for c. return None M, N = s[c1].as_numer_denom() nfmwa = N.as_poly(DE.t)*fa*wd - M.as_poly(DE.t)*wa*fd nfmwd = fd*wd Qv = is_log_deriv_k_t_radical_in_field(nfmwa, nfmwd, DE) if Qv is None: # (N*f - M*w) is not the logarithmic derivative of a k(t)-radical. return None Q, v = Qv if Q.is_zero or v.is_zero: return None return (Q*N, Q*M, v) def parametric_log_deriv(fa, fd, wa, wd, DE): # TODO: Write the full algorithm using the structure theorems. # try: A = parametric_log_deriv_heu(fa, fd, wa, wd, DE) # except NotImplementedError: # Heuristic failed, we have to use the full method. # TODO: This could be implemented more efficiently. # It isn't too worrisome, because the heuristic handles most difficult # cases. return A def is_deriv_k(fa, fd, DE): r""" Checks if Df/f is the derivative of an element of k(t). a in k(t) is the derivative of an element of k(t) if there exists b in k(t) such that a = Db. Either returns (ans, u), such that Df/f == Du, or None, which means that Df/f is not the derivative of an element of k(t). ans is a list of tuples such that Add(*[i*j for i, j in ans]) == u. This is useful for seeing exactly which elements of k(t) produce u. This function uses the structure theorem approach, which says that for any f in K, Df/f is the derivative of a element of K if and only if there are ri in QQ such that:: --- --- Dt \ r * Dt + \ r * i Df / i i / i --- = --. --- --- t f i in L i in E i K/C(x) K/C(x) Where C = Const(K), L_K/C(x) = { i in {1, ..., n} such that t_i is transcendental over C(x)(t_1, ..., t_i-1) and Dt_i = Da_i/a_i, for some a_i in C(x)(t_1, ..., t_i-1)* } (i.e., the set of all indices of logarithmic monomials of K over C(x)), and E_K/C(x) = { i in {1, ..., n} such that t_i is transcendental over C(x)(t_1, ..., t_i-1) and Dt_i/t_i = Da_i, for some a_i in C(x)(t_1, ..., t_i-1) } (i.e., the set of all indices of hyperexponential monomials of K over C(x)). If K is an elementary extension over C(x), then the cardinality of L_K/C(x) U E_K/C(x) is exactly the transcendence degree of K over C(x). Furthermore, because Const_D(K) == Const_D(C(x)) == C, deg(Dt_i) == 1 when t_i is in E_K/C(x) and deg(Dt_i) == 0 when t_i is in L_K/C(x), implying in particular that E_K/C(x) and L_K/C(x) are disjoint. The sets L_K/C(x) and E_K/C(x) must, by their nature, be computed recursively using this same function. Therefore, it is required to pass them as indices to D (or T). E_args are the arguments of the hyperexponentials indexed by E_K (i.e., if i is in E_K, then T[i] == exp(E_args[i])). This is needed to compute the final answer u such that Df/f == Du. log(f) will be the same as u up to a additive constant. This is because they will both behave the same as monomials. For example, both log(x) and log(2*x) == log(x) + log(2) satisfy Dt == 1/x, because log(2) is constant. Therefore, the term const is returned. const is such that log(const) + f == u. This is calculated by dividing the arguments of one logarithm from the other. Therefore, it is necessary to pass the arguments of the logarithmic terms in L_args. To handle the case where we are given Df/f, not f, use is_deriv_k_in_field(). See also ======== is_log_deriv_k_t_radical_in_field, is_log_deriv_k_t_radical """ # Compute Df/f dfa, dfd = (fd*derivation(fa, DE) - fa*derivation(fd, DE)), fd*fa dfa, dfd = dfa.cancel(dfd, include=True) # Our assumption here is that each monomial is recursively transcendental if len(DE.exts) != len(DE.D): if [i for i in DE.cases if i == 'tan'] or \ (set([i for i in DE.cases if i == 'primitive']) - set(DE.indices('log'))): raise NotImplementedError("Real version of the structure " "theorems with hypertangent support is not yet implemented.") # TODO: What should really be done in this case? raise NotImplementedError("Nonelementary extensions not supported " "in the structure theorems.") E_part = [DE.D[i].quo(Poly(DE.T[i], DE.T[i])).as_expr() for i in DE.indices('exp')] L_part = [DE.D[i].as_expr() for i in DE.indices('log')] lhs = Matrix([E_part + L_part]) rhs = Matrix([dfa.as_expr()/dfd.as_expr()]) A, u = constant_system(lhs, rhs, DE) if not all(derivation(i, DE, basic=True).is_zero for i in u) or not A: # If the elements of u are not all constant # Note: See comment in constant_system # Also note: derivation(basic=True) calls cancel() return None else: if not all(i.is_Rational for i in u): raise NotImplementedError("Cannot work with non-rational " "coefficients in this case.") else: terms = ([DE.extargs[i] for i in DE.indices('exp')] + [DE.T[i] for i in DE.indices('log')]) ans = list(zip(terms, u)) result = Add(*[Mul(i, j) for i, j in ans]) argterms = ([DE.T[i] for i in DE.indices('exp')] + [DE.extargs[i] for i in DE.indices('log')]) l = [] ld = [] for i, j in zip(argterms, u): # We need to get around things like sqrt(x**2) != x # and also sqrt(x**2 + 2*x + 1) != x + 1 # Issue 10798: i need not be a polynomial i, d = i.as_numer_denom() icoeff, iterms = sqf_list(i) l.append(Mul(*([Pow(icoeff, j)] + [Pow(b, e*j) for b, e in iterms]))) dcoeff, dterms = sqf_list(d) ld.append(Mul(*([Pow(dcoeff, j)] + [Pow(b, e*j) for b, e in dterms]))) const = cancel(fa.as_expr()/fd.as_expr()/Mul(*l)*Mul(*ld)) return (ans, result, const) def is_log_deriv_k_t_radical(fa, fd, DE, Df=True): r""" Checks if Df is the logarithmic derivative of a k(t)-radical. b in k(t) can be written as the logarithmic derivative of a k(t) radical if there exist n in ZZ and u in k(t) with n, u != 0 such that n*b == Du/u. Either returns (ans, u, n, const) or None, which means that Df cannot be written as the logarithmic derivative of a k(t)-radical. ans is a list of tuples such that Mul(*[i**j for i, j in ans]) == u. This is useful for seeing exactly what elements of k(t) produce u. This function uses the structure theorem approach, which says that for any f in K, Df is the logarithmic derivative of a K-radical if and only if there are ri in QQ such that:: --- --- Dt \ r * Dt + \ r * i / i i / i --- = Df. --- --- t i in L i in E i K/C(x) K/C(x) Where C = Const(K), L_K/C(x) = { i in {1, ..., n} such that t_i is transcendental over C(x)(t_1, ..., t_i-1) and Dt_i = Da_i/a_i, for some a_i in C(x)(t_1, ..., t_i-1)* } (i.e., the set of all indices of logarithmic monomials of K over C(x)), and E_K/C(x) = { i in {1, ..., n} such that t_i is transcendental over C(x)(t_1, ..., t_i-1) and Dt_i/t_i = Da_i, for some a_i in C(x)(t_1, ..., t_i-1) } (i.e., the set of all indices of hyperexponential monomials of K over C(x)). If K is an elementary extension over C(x), then the cardinality of L_K/C(x) U E_K/C(x) is exactly the transcendence degree of K over C(x). Furthermore, because Const_D(K) == Const_D(C(x)) == C, deg(Dt_i) == 1 when t_i is in E_K/C(x) and deg(Dt_i) == 0 when t_i is in L_K/C(x), implying in particular that E_K/C(x) and L_K/C(x) are disjoint. The sets L_K/C(x) and E_K/C(x) must, by their nature, be computed recursively using this same function. Therefore, it is required to pass them as indices to D (or T). L_args are the arguments of the logarithms indexed by L_K (i.e., if i is in L_K, then T[i] == log(L_args[i])). This is needed to compute the final answer u such that n*f == Du/u. exp(f) will be the same as u up to a multiplicative constant. This is because they will both behave the same as monomials. For example, both exp(x) and exp(x + 1) == E*exp(x) satisfy Dt == t. Therefore, the term const is returned. const is such that exp(const)*f == u. This is calculated by subtracting the arguments of one exponential from the other. Therefore, it is necessary to pass the arguments of the exponential terms in E_args. To handle the case where we are given Df, not f, use is_log_deriv_k_t_radical_in_field(). See also ======== is_log_deriv_k_t_radical_in_field, is_deriv_k """ H = [] if Df: dfa, dfd = (fd*derivation(fa, DE) - fa*derivation(fd, DE)).cancel(fd**2, include=True) else: dfa, dfd = fa, fd # Our assumption here is that each monomial is recursively transcendental if len(DE.exts) != len(DE.D): if [i for i in DE.cases if i == 'tan'] or \ (set([i for i in DE.cases if i == 'primitive']) - set(DE.indices('log'))): raise NotImplementedError("Real version of the structure " "theorems with hypertangent support is not yet implemented.") # TODO: What should really be done in this case? raise NotImplementedError("Nonelementary extensions not supported " "in the structure theorems.") E_part = [DE.D[i].quo(Poly(DE.T[i], DE.T[i])).as_expr() for i in DE.indices('exp')] L_part = [DE.D[i].as_expr() for i in DE.indices('log')] lhs = Matrix([E_part + L_part]) rhs = Matrix([dfa.as_expr()/dfd.as_expr()]) A, u = constant_system(lhs, rhs, DE) if not all(derivation(i, DE, basic=True).is_zero for i in u) or not A: # If the elements of u are not all constant # Note: See comment in constant_system # Also note: derivation(basic=True) calls cancel() return None else: if not all(i.is_Rational for i in u): # TODO: But maybe we can tell if they're not rational, like # log(2)/log(3). Also, there should be an option to continue # anyway, even if the result might potentially be wrong. raise NotImplementedError("Cannot work with non-rational " "coefficients in this case.") else: n = reduce(ilcm, [i.as_numer_denom()[1] for i in u]) u *= n terms = ([DE.T[i] for i in DE.indices('exp')] + [DE.extargs[i] for i in DE.indices('log')]) ans = list(zip(terms, u)) result = Mul(*[Pow(i, j) for i, j in ans]) # exp(f) will be the same as result up to a multiplicative # constant. We now find the log of that constant. argterms = ([DE.extargs[i] for i in DE.indices('exp')] + [DE.T[i] for i in DE.indices('log')]) const = cancel(fa.as_expr()/fd.as_expr() - Add(*[Mul(i, j/n) for i, j in zip(argterms, u)])) return (ans, result, n, const) def is_log_deriv_k_t_radical_in_field(fa, fd, DE, case='auto', z=None): """ Checks if f can be written as the logarithmic derivative of a k(t)-radical. It differs from is_log_deriv_k_t_radical(fa, fd, DE, Df=False) for any given fa, fd, DE in that it finds the solution in the given field not in some (possibly unspecified extension) and "in_field" with the function name is used to indicate that. f in k(t) can be written as the logarithmic derivative of a k(t) radical if there exist n in ZZ and u in k(t) with n, u != 0 such that n*f == Du/u. Either returns (n, u) or None, which means that f cannot be written as the logarithmic derivative of a k(t)-radical. case is one of {'primitive', 'exp', 'tan', 'auto'} for the primitive, hyperexponential, and hypertangent cases, respectively. If case is 'auto', it will attempt to determine the type of the derivation automatically. See also ======== is_log_deriv_k_t_radical, is_deriv_k """ fa, fd = fa.cancel(fd, include=True) # f must be simple n, s = splitfactor(fd, DE) if not s.is_one: pass z = z or Dummy('z') H, b = residue_reduce(fa, fd, DE, z=z) if not b: # I will have to verify, but I believe that the answer should be # None in this case. This should never happen for the # functions given when solving the parametric logarithmic # derivative problem when integration elementary functions (see # Bronstein's book, page 255), so most likely this indicates a bug. return None roots = [(i, i.real_roots()) for i, _ in H] if not all(len(j) == i.degree() and all(k.is_Rational for k in j) for i, j in roots): # If f is the logarithmic derivative of a k(t)-radical, then all the # roots of the resultant must be rational numbers. return None # [(a, i), ...], where i*log(a) is a term in the log-part of the integral # of f respolys, residues = list(zip(*roots)) or [[], []] # Note: this might be empty, but everything below should work find in that # case (it should be the same as if it were [[1, 1]]) residueterms = [(H[j][1].subs(z, i), i) for j in range(len(H)) for i in residues[j]] # TODO: finish writing this and write tests p = cancel(fa.as_expr()/fd.as_expr() - residue_reduce_derivation(H, DE, z)) p = p.as_poly(DE.t) if p is None: # f - Dg will be in k[t] if f is the logarithmic derivative of a k(t)-radical return None if p.degree(DE.t) >= max(1, DE.d.degree(DE.t)): return None if case == 'auto': case = DE.case if case == 'exp': wa, wd = derivation(DE.t, DE).cancel(Poly(DE.t, DE.t), include=True) with DecrementLevel(DE): pa, pd = frac_in(p, DE.t, cancel=True) wa, wd = frac_in((wa, wd), DE.t) A = parametric_log_deriv(pa, pd, wa, wd, DE) if A is None: return None n, e, u = A u *= DE.t**e elif case == 'primitive': with DecrementLevel(DE): pa, pd = frac_in(p, DE.t) A = is_log_deriv_k_t_radical_in_field(pa, pd, DE, case='auto') if A is None: return None n, u = A elif case == 'base': # TODO: we can use more efficient residue reduction from ratint() if not fd.is_sqf or fa.degree() >= fd.degree(): # f is the logarithmic derivative in the base case if and only if # f = fa/fd, fd is square-free, deg(fa) < deg(fd), and # gcd(fa, fd) == 1. The last condition is handled by cancel() above. return None # Note: if residueterms = [], returns (1, 1) # f had better be 0 in that case. n = reduce(ilcm, [i.as_numer_denom()[1] for _, i in residueterms], S(1)) u = Mul(*[Pow(i, j*n) for i, j in residueterms]) return (n, u) elif case == 'tan': raise NotImplementedError("The hypertangent case is " "not yet implemented for is_log_deriv_k_t_radical_in_field()") elif case in ['other_linear', 'other_nonlinear']: # XXX: If these are supported by the structure theorems, change to NotImplementedError. raise ValueError("The %s case is not supported in this function." % case) else: raise ValueError("case must be one of {'primitive', 'exp', 'tan', " "'base', 'auto'}, not %s" % case) common_denom = reduce(ilcm, [i.as_numer_denom()[1] for i in [j for _, j in residueterms]] + [n], S(1)) residueterms = [(i, j*common_denom) for i, j in residueterms] m = common_denom//n if common_denom != n*m: # Verify exact division raise ValueError("Inexact division") u = cancel(u**m*Mul(*[Pow(i, j) for i, j in residueterms])) return (common_denom, u)

4c8fc9d9bb93ff3b0ceea89345afb6827c861ae70be72011b071f9aaa47e026e

""" Integrate functions by rewriting them as Meijer G-functions. There are three user-visible functions that can be used by other parts of the sympy library to solve various integration problems: - meijerint_indefinite - meijerint_definite - meijerint_inversion They can be used to compute, respectively, indefinite integrals, definite integrals over intervals of the real line, and inverse laplace-type integrals (from c-I*oo to c+I*oo). See the respective docstrings for details. The main references for this are: [L] Luke, Y. L. (1969), The Special Functions and Their Approximations, Volume 1 [R] Kelly B. Roach. Meijer G Function Representations. In: Proceedings of the 1997 International Symposium on Symbolic and Algebraic Computation, pages 205-211, New York, 1997. ACM. [P] A. P. Prudnikov, Yu. A. Brychkov and O. I. Marichev (1990). Integrals and Series: More Special Functions, Vol. 3,. Gordon and Breach Science Publisher """ from __future__ import print_function, division from sympy.core import oo, S, pi, Expr from sympy.core.exprtools import factor_terms from sympy.core.function import expand, expand_mul, expand_power_base from sympy.core.add import Add from sympy.core.mul import Mul from sympy.core.compatibility import range from sympy.core.cache import cacheit from sympy.core.symbol import Dummy, Wild from sympy.simplify import hyperexpand, powdenest, collect from sympy.simplify.fu import sincos_to_sum from sympy.logic.boolalg import And, Or, BooleanAtom from sympy.functions.special.delta_functions import DiracDelta, Heaviside from sympy.functions.elementary.exponential import exp from sympy.functions.elementary.piecewise import Piecewise, piecewise_fold from sympy.functions.elementary.hyperbolic import \ _rewrite_hyperbolics_as_exp, HyperbolicFunction from sympy.functions.elementary.trigonometric import cos, sin from sympy.functions.special.hyper import meijerg from sympy.utilities.iterables import multiset_partitions, ordered from sympy.utilities.misc import debug as _debug from sympy.utilities import default_sort_key # keep this at top for easy reference z = Dummy('z') def _has(res, *f): # return True if res has f; in the case of Piecewise # only return True if *all* pieces have f res = piecewise_fold(res) if getattr(res, 'is_Piecewise', False): return all(_has(i, *f) for i in res.args) return res.has(*f) def _create_lookup_table(table): """ Add formulae for the function -> meijerg lookup table. """ def wild(n): return Wild(n, exclude=[z]) p, q, a, b, c = list(map(wild, 'pqabc')) n = Wild('n', properties=[lambda x: x.is_Integer and x > 0]) t = p*z**q def add(formula, an, ap, bm, bq, arg=t, fac=S(1), cond=True, hint=True): table.setdefault(_mytype(formula, z), []).append((formula, [(fac, meijerg(an, ap, bm, bq, arg))], cond, hint)) def addi(formula, inst, cond, hint=True): table.setdefault( _mytype(formula, z), []).append((formula, inst, cond, hint)) def constant(a): return [(a, meijerg([1], [], [], [0], z)), (a, meijerg([], [1], [0], [], z))] table[()] = [(a, constant(a), True, True)] # [P], Section 8. from sympy import unpolarify, Function, Not class IsNonPositiveInteger(Function): @classmethod def eval(cls, arg): arg = unpolarify(arg) if arg.is_Integer is True: return arg <= 0 # Section 8.4.2 from sympy import (gamma, pi, cos, exp, re, sin, sinc, sqrt, sinh, cosh, factorial, log, erf, erfc, erfi, polar_lift) # TODO this needs more polar_lift (c/f entry for exp) add(Heaviside(t - b)*(t - b)**(a - 1), [a], [], [], [0], t/b, gamma(a)*b**(a - 1), And(b > 0)) add(Heaviside(b - t)*(b - t)**(a - 1), [], [a], [0], [], t/b, gamma(a)*b**(a - 1), And(b > 0)) add(Heaviside(z - (b/p)**(1/q))*(t - b)**(a - 1), [a], [], [], [0], t/b, gamma(a)*b**(a - 1), And(b > 0)) add(Heaviside((b/p)**(1/q) - z)*(b - t)**(a - 1), [], [a], [0], [], t/b, gamma(a)*b**(a - 1), And(b > 0)) add((b + t)**(-a), [1 - a], [], [0], [], t/b, b**(-a)/gamma(a), hint=Not(IsNonPositiveInteger(a))) add(abs(b - t)**(-a), [1 - a], [(1 - a)/2], [0], [(1 - a)/2], t/b, 2*sin(pi*a/2)*gamma(1 - a)*abs(b)**(-a), re(a) < 1) add((t**a - b**a)/(t - b), [0, a], [], [0, a], [], t/b, b**(a - 1)*sin(a*pi)/pi) # 12 def A1(r, sign, nu): return pi**(-S(1)/2)*(-sign*nu/2)**(1 - 2*r) def tmpadd(r, sgn): # XXX the a**2 is bad for matching add((sqrt(a**2 + t) + sgn*a)**b/(a**2 + t)**r, [(1 + b)/2, 1 - 2*r + b/2], [], [(b - sgn*b)/2], [(b + sgn*b)/2], t/a**2, a**(b - 2*r)*A1(r, sgn, b)) tmpadd(0, 1) tmpadd(0, -1) tmpadd(S(1)/2, 1) tmpadd(S(1)/2, -1) # 13 def tmpadd(r, sgn): add((sqrt(a + p*z**q) + sgn*sqrt(p)*z**(q/2))**b/(a + p*z**q)**r, [1 - r + sgn*b/2], [1 - r - sgn*b/2], [0, S(1)/2], [], p*z**q/a, a**(b/2 - r)*A1(r, sgn, b)) tmpadd(0, 1) tmpadd(0, -1) tmpadd(S(1)/2, 1) tmpadd(S(1)/2, -1) # (those after look obscure) # Section 8.4.3 add(exp(polar_lift(-1)*t), [], [], [0], []) # TODO can do sin^n, sinh^n by expansion ... where? # 8.4.4 (hyperbolic functions) add(sinh(t), [], [1], [S(1)/2], [1, 0], t**2/4, pi**(S(3)/2)) add(cosh(t), [], [S(1)/2], [0], [S(1)/2, S(1)/2], t**2/4, pi**(S(3)/2)) # Section 8.4.5 # TODO can do t + a. but can also do by expansion... (XXX not really) add(sin(t), [], [], [S(1)/2], [0], t**2/4, sqrt(pi)) add(cos(t), [], [], [0], [S(1)/2], t**2/4, sqrt(pi)) # Section 8.4.6 (sinc function) add(sinc(t), [], [], [0], [S(-1)/2], t**2/4, sqrt(pi)/2) # Section 8.5.5 def make_log1(subs): N = subs[n] return [((-1)**N*factorial(N), meijerg([], [1]*(N + 1), [0]*(N + 1), [], t))] def make_log2(subs): N = subs[n] return [(factorial(N), meijerg([1]*(N + 1), [], [], [0]*(N + 1), t))] # TODO these only hold for positive p, and can be made more general # but who uses log(x)*Heaviside(a-x) anyway ... # TODO also it would be nice to derive them recursively ... addi(log(t)**n*Heaviside(1 - t), make_log1, True) addi(log(t)**n*Heaviside(t - 1), make_log2, True) def make_log3(subs): return make_log1(subs) + make_log2(subs) addi(log(t)**n, make_log3, True) addi(log(t + a), constant(log(a)) + [(S(1), meijerg([1, 1], [], [1], [0], t/a))], True) addi(log(abs(t - a)), constant(log(abs(a))) + [(pi, meijerg([1, 1], [S(1)/2], [1], [0, S(1)/2], t/a))], True) # TODO log(x)/(x+a) and log(x)/(x-1) can also be done. should they # be derivable? # TODO further formulae in this section seem obscure # Sections 8.4.9-10 # TODO # Section 8.4.11 from sympy import Ei, I, expint, Si, Ci, Shi, Chi, fresnels, fresnelc addi(Ei(t), constant(-I*pi) + [(S(-1), meijerg([], [1], [0, 0], [], t*polar_lift(-1)))], True) # Section 8.4.12 add(Si(t), [1], [], [S(1)/2], [0, 0], t**2/4, sqrt(pi)/2) add(Ci(t), [], [1], [0, 0], [S(1)/2], t**2/4, -sqrt(pi)/2) # Section 8.4.13 add(Shi(t), [S(1)/2], [], [0], [S(-1)/2, S(-1)/2], polar_lift(-1)*t**2/4, t*sqrt(pi)/4) add(Chi(t), [], [S(1)/2, 1], [0, 0], [S(1)/2, S(1)/2], t**2/4, - pi**S('3/2')/2) # generalized exponential integral add(expint(a, t), [], [a], [a - 1, 0], [], t) # Section 8.4.14 add(erf(t), [1], [], [S(1)/2], [0], t**2, 1/sqrt(pi)) # TODO exp(-x)*erf(I*x) does not work add(erfc(t), [], [1], [0, S(1)/2], [], t**2, 1/sqrt(pi)) # This formula for erfi(z) yields a wrong(?) minus sign #add(erfi(t), [1], [], [S(1)/2], [0], -t**2, I/sqrt(pi)) add(erfi(t), [S(1)/2], [], [0], [-S(1)/2], -t**2, t/sqrt(pi)) # Fresnel Integrals add(fresnels(t), [1], [], [S(3)/4], [0, S(1)/4], pi**2*t**4/16, S(1)/2) add(fresnelc(t), [1], [], [S(1)/4], [0, S(3)/4], pi**2*t**4/16, S(1)/2) ##### bessel-type functions ##### from sympy import besselj, bessely, besseli, besselk # Section 8.4.19 add(besselj(a, t), [], [], [a/2], [-a/2], t**2/4) # all of the following are derivable #add(sin(t)*besselj(a, t), [S(1)/4, S(3)/4], [], [(1+a)/2], # [-a/2, a/2, (1-a)/2], t**2, 1/sqrt(2)) #add(cos(t)*besselj(a, t), [S(1)/4, S(3)/4], [], [a/2], # [-a/2, (1+a)/2, (1-a)/2], t**2, 1/sqrt(2)) #add(besselj(a, t)**2, [S(1)/2], [], [a], [-a, 0], t**2, 1/sqrt(pi)) #add(besselj(a, t)*besselj(b, t), [0, S(1)/2], [], [(a + b)/2], # [-(a+b)/2, (a - b)/2, (b - a)/2], t**2, 1/sqrt(pi)) # Section 8.4.20 add(bessely(a, t), [], [-(a + 1)/2], [a/2, -a/2], [-(a + 1)/2], t**2/4) # TODO all of the following should be derivable #add(sin(t)*bessely(a, t), [S(1)/4, S(3)/4], [(1 - a - 1)/2], # [(1 + a)/2, (1 - a)/2], [(1 - a - 1)/2, (1 - 1 - a)/2, (1 - 1 + a)/2], # t**2, 1/sqrt(2)) #add(cos(t)*bessely(a, t), [S(1)/4, S(3)/4], [(0 - a - 1)/2], # [(0 + a)/2, (0 - a)/2], [(0 - a - 1)/2, (1 - 0 - a)/2, (1 - 0 + a)/2], # t**2, 1/sqrt(2)) #add(besselj(a, t)*bessely(b, t), [0, S(1)/2], [(a - b - 1)/2], # [(a + b)/2, (a - b)/2], [(a - b - 1)/2, -(a + b)/2, (b - a)/2], # t**2, 1/sqrt(pi)) #addi(bessely(a, t)**2, # [(2/sqrt(pi), meijerg([], [S(1)/2, S(1)/2 - a], [0, a, -a], # [S(1)/2 - a], t**2)), # (1/sqrt(pi), meijerg([S(1)/2], [], [a], [-a, 0], t**2))], # True) #addi(bessely(a, t)*bessely(b, t), # [(2/sqrt(pi), meijerg([], [0, S(1)/2, (1 - a - b)/2], # [(a + b)/2, (a - b)/2, (b - a)/2, -(a + b)/2], # [(1 - a - b)/2], t**2)), # (1/sqrt(pi), meijerg([0, S(1)/2], [], [(a + b)/2], # [-(a + b)/2, (a - b)/2, (b - a)/2], t**2))], # True) # Section 8.4.21 ? # Section 8.4.22 add(besseli(a, t), [], [(1 + a)/2], [a/2], [-a/2, (1 + a)/2], t**2/4, pi) # TODO many more formulas. should all be derivable # Section 8.4.23 add(besselk(a, t), [], [], [a/2, -a/2], [], t**2/4, S(1)/2) # TODO many more formulas. should all be derivable # Complete elliptic integrals K(z) and E(z) from sympy import elliptic_k, elliptic_e add(elliptic_k(t), [S.Half, S.Half], [], [0], [0], -t, S.Half) add(elliptic_e(t), [S.Half, 3*S.Half], [], [0], [0], -t, -S.Half/2) #################################################################### # First some helper functions. #################################################################### from sympy.utilities.timeutils import timethis timeit = timethis('meijerg') def _mytype(f, x): """ Create a hashable entity describing the type of f. """ if x not in f.free_symbols: return () elif f.is_Function: return (type(f),) else: types = [_mytype(a, x) for a in f.args] res = [] for t in types: res += list(t) res.sort() return tuple(res) class _CoeffExpValueError(ValueError): """ Exception raised by _get_coeff_exp, for internal use only. """ pass def _get_coeff_exp(expr, x): """ When expr is known to be of the form c*x**b, with c and/or b possibly 1, return c, b. >>> from sympy.abc import x, a, b >>> from sympy.integrals.meijerint import _get_coeff_exp >>> _get_coeff_exp(a*x**b, x) (a, b) >>> _get_coeff_exp(x, x) (1, 1) >>> _get_coeff_exp(2*x, x) (2, 1) >>> _get_coeff_exp(x**3, x) (1, 3) """ from sympy import powsimp (c, m) = expand_power_base(powsimp(expr)).as_coeff_mul(x) if not m: return c, S(0) [m] = m if m.is_Pow: if m.base != x: raise _CoeffExpValueError('expr not of form a*x**b') return c, m.exp elif m == x: return c, S(1) else: raise _CoeffExpValueError('expr not of form a*x**b: %s' % expr) def _exponents(expr, x): """ Find the exponents of ``x`` (not including zero) in ``expr``. >>> from sympy.integrals.meijerint import _exponents >>> from sympy.abc import x, y >>> from sympy import sin >>> _exponents(x, x) {1} >>> _exponents(x**2, x) {2} >>> _exponents(x**2 + x, x) {1, 2} >>> _exponents(x**3*sin(x + x**y) + 1/x, x) {-1, 1, 3, y} """ def _exponents_(expr, x, res): if expr == x: res.update([1]) return if expr.is_Pow and expr.base == x: res.update([expr.exp]) return for arg in expr.args: _exponents_(arg, x, res) res = set() _exponents_(expr, x, res) return res def _functions(expr, x): """ Find the types of functions in expr, to estimate the complexity. """ from sympy import Function return set(e.func for e in expr.atoms(Function) if x in e.free_symbols) def _find_splitting_points(expr, x): """ Find numbers a such that a linear substitution x -> x + a would (hopefully) simplify expr. >>> from sympy.integrals.meijerint import _find_splitting_points as fsp >>> from sympy import sin >>> from sympy.abc import a, x >>> fsp(x, x) {0} >>> fsp((x-1)**3, x) {1} >>> fsp(sin(x+3)*x, x) {-3, 0} """ p, q = [Wild(n, exclude=[x]) for n in 'pq'] def compute_innermost(expr, res): if not isinstance(expr, Expr): return m = expr.match(p*x + q) if m and m[p] != 0: res.add(-m[q]/m[p]) return if expr.is_Atom: return for arg in expr.args: compute_innermost(arg, res) innermost = set() compute_innermost(expr, innermost) return innermost def _split_mul(f, x): """ Split expression ``f`` into fac, po, g, where fac is a constant factor, po = x**s for some s independent of s, and g is "the rest". >>> from sympy.integrals.meijerint import _split_mul >>> from sympy import sin >>> from sympy.abc import s, x >>> _split_mul((3*x)**s*sin(x**2)*x, x) (3**s, x*x**s, sin(x**2)) """ from sympy import polarify, unpolarify fac = S(1) po = S(1) g = S(1) f = expand_power_base(f) args = Mul.make_args(f) for a in args: if a == x: po *= x elif x not in a.free_symbols: fac *= a else: if a.is_Pow and x not in a.exp.free_symbols: c, t = a.base.as_coeff_mul(x) if t != (x,): c, t = expand_mul(a.base).as_coeff_mul(x) if t == (x,): po *= x**a.exp fac *= unpolarify(polarify(c**a.exp, subs=False)) continue g *= a return fac, po, g def _mul_args(f): """ Return a list ``L`` such that Mul(*L) == f. If f is not a Mul or Pow, L=[f]. If f=g**n for an integer n, L=[g]*n. If f is a Mul, L comes from applying _mul_args to all factors of f. """ args = Mul.make_args(f) gs = [] for g in args: if g.is_Pow and g.exp.is_Integer: n = g.exp base = g.base if n < 0: n = -n base = 1/base gs += [base]*n else: gs.append(g) return gs def _mul_as_two_parts(f): """ Find all the ways to split f into a product of two terms. Return None on failure. Although the order is canonical from multiset_partitions, this is not necessarily the best order to process the terms. For example, if the case of len(gs) == 2 is removed and multiset is allowed to sort the terms, some tests fail. >>> from sympy.integrals.meijerint import _mul_as_two_parts >>> from sympy import sin, exp, ordered >>> from sympy.abc import x >>> list(ordered(_mul_as_two_parts(x*sin(x)*exp(x)))) [(x, exp(x)*sin(x)), (x*exp(x), sin(x)), (x*sin(x), exp(x))] """ gs = _mul_args(f) if len(gs) < 2: return None if len(gs) == 2: return [tuple(gs)] return [(Mul(*x), Mul(*y)) for (x, y) in multiset_partitions(gs, 2)] def _inflate_g(g, n): """ Return C, h such that h is a G function of argument z**n and g = C*h. """ # TODO should this be a method of meijerg? # See: [L, page 150, equation (5)] def inflate(params, n): """ (a1, .., ak) -> (a1/n, (a1+1)/n, ..., (ak + n-1)/n) """ res = [] for a in params: for i in range(n): res.append((a + i)/n) return res v = S(len(g.ap) - len(g.bq)) C = n**(1 + g.nu + v/2) C /= (2*pi)**((n - 1)*g.delta) return C, meijerg(inflate(g.an, n), inflate(g.aother, n), inflate(g.bm, n), inflate(g.bother, n), g.argument**n * n**(n*v)) def _flip_g(g): """ Turn the G function into one of inverse argument (i.e. G(1/x) -> G'(x)) """ # See [L], section 5.2 def tr(l): return [1 - a for a in l] return meijerg(tr(g.bm), tr(g.bother), tr(g.an), tr(g.aother), 1/g.argument) def _inflate_fox_h(g, a): r""" Let d denote the integrand in the definition of the G function ``g``. Consider the function H which is defined in the same way, but with integrand d/Gamma(a*s) (contour conventions as usual). If a is rational, the function H can be written as C*G, for a constant C and a G-function G. This function returns C, G. """ if a < 0: return _inflate_fox_h(_flip_g(g), -a) p = S(a.p) q = S(a.q) # We use the substitution s->qs, i.e. inflate g by q. We are left with an # extra factor of Gamma(p*s), for which we use Gauss' multiplication # theorem. D, g = _inflate_g(g, q) z = g.argument D /= (2*pi)**((1 - p)/2)*p**(-S(1)/2) z /= p**p bs = [(n + 1)/p for n in range(p)] return D, meijerg(g.an, g.aother, g.bm, list(g.bother) + bs, z) _dummies = {} def _dummy(name, token, expr, **kwargs): """ Return a dummy. This will return the same dummy if the same token+name is requested more than once, and it is not already in expr. This is for being cache-friendly. """ d = _dummy_(name, token, **kwargs) if d in expr.free_symbols: return Dummy(name, **kwargs) return d def _dummy_(name, token, **kwargs): """ Return a dummy associated to name and token. Same effect as declaring it globally. """ global _dummies if not (name, token) in _dummies: _dummies[(name, token)] = Dummy(name, **kwargs) return _dummies[(name, token)] def _is_analytic(f, x): """ Check if f(x), when expressed using G functions on the positive reals, will in fact agree with the G functions almost everywhere """ from sympy import Heaviside, Abs return not any(x in expr.free_symbols for expr in f.atoms(Heaviside, Abs)) def _condsimp(cond): """ Do naive simplifications on ``cond``. Note that this routine is completely ad-hoc, simplification rules being added as need arises rather than following any logical pattern. >>> from sympy.integrals.meijerint import _condsimp as simp >>> from sympy import Or, Eq, unbranched_argument as arg, And >>> from sympy.abc import x, y, z >>> simp(Or(x < y, z, Eq(x, y))) z | (x <= y) >>> simp(Or(x <= y, And(x < y, z))) x <= y """ from sympy import ( symbols, Wild, Eq, unbranched_argument, exp_polar, pi, I, arg, periodic_argument, oo, polar_lift) from sympy.logic.boolalg import BooleanFunction if not isinstance(cond, BooleanFunction): return cond cond = cond.func(*list(map(_condsimp, cond.args))) change = True p, q, r = symbols('p q r', cls=Wild) rules = [ (Or(p < q, Eq(p, q)), p <= q), # The next two obviously are instances of a general pattern, but it is # easier to spell out the few cases we care about. (And(abs(arg(p)) <= pi, abs(arg(p) - 2*pi) <= pi), Eq(arg(p) - pi, 0)), (And(abs(2*arg(p) + pi) <= pi, abs(2*arg(p) - pi) <= pi), Eq(arg(p), 0)), (And(abs(unbranched_argument(p)) <= pi, abs(unbranched_argument(exp_polar(-2*pi*I)*p)) <= pi), Eq(unbranched_argument(exp_polar(-I*pi)*p), 0)), (And(abs(unbranched_argument(p)) <= pi/2, abs(unbranched_argument(exp_polar(-pi*I)*p)) <= pi/2), Eq(unbranched_argument(exp_polar(-I*pi/2)*p), 0)), (Or(p <= q, And(p < q, r)), p <= q) ] while change: change = False for fro, to in rules: if fro.func != cond.func: continue for n, arg1 in enumerate(cond.args): if r in fro.args[0].free_symbols: m = arg1.match(fro.args[1]) num = 1 else: num = 0 m = arg1.match(fro.args[0]) if not m: continue otherargs = [x.subs(m) for x in fro.args[:num] + fro.args[num + 1:]] otherlist = [n] for arg2 in otherargs: for k, arg3 in enumerate(cond.args): if k in otherlist: continue if arg2 == arg3: otherlist += [k] break if isinstance(arg3, And) and arg2.args[1] == r and \ isinstance(arg2, And) and arg2.args[0] in arg3.args: otherlist += [k] break if isinstance(arg3, And) and arg2.args[0] == r and \ isinstance(arg2, And) and arg2.args[1] in arg3.args: otherlist += [k] break if len(otherlist) != len(otherargs) + 1: continue newargs = [arg_ for (k, arg_) in enumerate(cond.args) if k not in otherlist] + [to.subs(m)] cond = cond.func(*newargs) change = True break # final tweak def repl_eq(orig): if orig.lhs == 0: expr = orig.rhs elif orig.rhs == 0: expr = orig.lhs else: return orig m = expr.match(arg(p)**q) if not m: m = expr.match(unbranched_argument(polar_lift(p)**q)) if not m: if isinstance(expr, periodic_argument) and not expr.args[0].is_polar \ and expr.args[1] == oo: return (expr.args[0] > 0) return orig return (m[p] > 0) return cond.replace( lambda expr: expr.is_Relational and expr.rel_op == '==', repl_eq) def _eval_cond(cond): """ Re-evaluate the conditions. """ if isinstance(cond, bool): return cond return _condsimp(cond.doit()) #################################################################### # Now the "backbone" functions to do actual integration. #################################################################### def _my_principal_branch(expr, period, full_pb=False): """ Bring expr nearer to its principal branch by removing superfluous factors. This function does *not* guarantee to yield the principal branch, to avoid introducing opaque principal_branch() objects, unless full_pb=True. """ from sympy import principal_branch res = principal_branch(expr, period) if not full_pb: res = res.replace(principal_branch, lambda x, y: x) return res def _rewrite_saxena_1(fac, po, g, x): """ Rewrite the integral fac*po*g dx, from zero to infinity, as integral fac*G, where G has argument a*x. Note po=x**s. Return fac, G. """ _, s = _get_coeff_exp(po, x) a, b = _get_coeff_exp(g.argument, x) period = g.get_period() a = _my_principal_branch(a, period) # We substitute t = x**b. C = fac/(abs(b)*a**((s + 1)/b - 1)) # Absorb a factor of (at)**((1 + s)/b - 1). def tr(l): return [a + (1 + s)/b - 1 for a in l] return C, meijerg(tr(g.an), tr(g.aother), tr(g.bm), tr(g.bother), a*x) def _check_antecedents_1(g, x, helper=False): r""" Return a condition under which the mellin transform of g exists. Any power of x has already been absorbed into the G function, so this is just int_0^\infty g dx. See [L, section 5.6.1]. (Note that s=1.) If ``helper`` is True, only check if the MT exists at infinity, i.e. if int_1^\infty g dx exists. """ # NOTE if you update these conditions, please update the documentation as well from sympy import Eq, Not, ceiling, Ne, re, unbranched_argument as arg delta = g.delta eta, _ = _get_coeff_exp(g.argument, x) m, n, p, q = S([len(g.bm), len(g.an), len(g.ap), len(g.bq)]) xi = m + n - p if p > q: def tr(l): return [1 - x for x in l] return _check_antecedents_1(meijerg(tr(g.bm), tr(g.bother), tr(g.an), tr(g.aother), x/eta), x) tmp = [] for b in g.bm: tmp += [-re(b) < 1] for a in g.an: tmp += [1 < 1 - re(a)] cond_3 = And(*tmp) for b in g.bother: tmp += [-re(b) < 1] for a in g.aother: tmp += [1 < 1 - re(a)] cond_3_star = And(*tmp) cond_4 = (-re(g.nu) + (q + 1 - p)/2 > q - p) def debug(*msg): _debug(*msg) debug('Checking antecedents for 1 function:') debug(' delta=%s, eta=%s, m=%s, n=%s, p=%s, q=%s' % (delta, eta, m, n, p, q)) debug(' ap = %s, %s' % (list(g.an), list(g.aother))) debug(' bq = %s, %s' % (list(g.bm), list(g.bother))) debug(' cond_3=%s, cond_3*=%s, cond_4=%s' % (cond_3, cond_3_star, cond_4)) conds = [] # case 1 case1 = [] tmp1 = [1 <= n, p < q, 1 <= m] tmp2 = [1 <= p, 1 <= m, Eq(q, p + 1), Not(And(Eq(n, 0), Eq(m, p + 1)))] tmp3 = [1 <= p, Eq(q, p)] for k in range(ceiling(delta/2) + 1): tmp3 += [Ne(abs(arg(eta)), (delta - 2*k)*pi)] tmp = [delta > 0, abs(arg(eta)) < delta*pi] extra = [Ne(eta, 0), cond_3] if helper: extra = [] for t in [tmp1, tmp2, tmp3]: case1 += [And(*(t + tmp + extra))] conds += case1 debug(' case 1:', case1) # case 2 extra = [cond_3] if helper: extra = [] case2 = [And(Eq(n, 0), p + 1 <= m, m <= q, abs(arg(eta)) < delta*pi, *extra)] conds += case2 debug(' case 2:', case2) # case 3 extra = [cond_3, cond_4] if helper: extra = [] case3 = [And(p < q, 1 <= m, delta > 0, Eq(abs(arg(eta)), delta*pi), *extra)] case3 += [And(p <= q - 2, Eq(delta, 0), Eq(abs(arg(eta)), 0), *extra)] conds += case3 debug(' case 3:', case3) # TODO altered cases 4-7 # extra case from wofram functions site: # (reproduced verbatim from Prudnikov, section 2.24.2) # http://functions.wolfram.com/HypergeometricFunctions/MeijerG/21/02/01/ case_extra = [] case_extra += [Eq(p, q), Eq(delta, 0), Eq(arg(eta), 0), Ne(eta, 0)] if not helper: case_extra += [cond_3] s = [] for a, b in zip(g.ap, g.bq): s += [b - a] case_extra += [re(Add(*s)) < 0] case_extra = And(*case_extra) conds += [case_extra] debug(' extra case:', [case_extra]) case_extra_2 = [And(delta > 0, abs(arg(eta)) < delta*pi)] if not helper: case_extra_2 += [cond_3] case_extra_2 = And(*case_extra_2) conds += [case_extra_2] debug(' second extra case:', [case_extra_2]) # TODO This leaves only one case from the three listed by Prudnikov. # Investigate if these indeed cover everything; if so, remove the rest. return Or(*conds) def _int0oo_1(g, x): r""" Evaluate int_0^\infty g dx using G functions, assuming the necessary conditions are fulfilled. >>> from sympy.abc import a, b, c, d, x, y >>> from sympy import meijerg >>> from sympy.integrals.meijerint import _int0oo_1 >>> _int0oo_1(meijerg([a], [b], [c], [d], x*y), x) gamma(-a)*gamma(c + 1)/(y*gamma(-d)*gamma(b + 1)) """ # See [L, section 5.6.1]. Note that s=1. from sympy import gamma, gammasimp, unpolarify eta, _ = _get_coeff_exp(g.argument, x) res = 1/eta # XXX TODO we should reduce order first for b in g.bm: res *= gamma(b + 1) for a in g.an: res *= gamma(1 - a - 1) for b in g.bother: res /= gamma(1 - b - 1) for a in g.aother: res /= gamma(a + 1) return gammasimp(unpolarify(res)) def _rewrite_saxena(fac, po, g1, g2, x, full_pb=False): """ Rewrite the integral fac*po*g1*g2 from 0 to oo in terms of G functions with argument c*x. Return C, f1, f2 such that integral C f1 f2 from 0 to infinity equals integral fac po g1 g2 from 0 to infinity. >>> from sympy.integrals.meijerint import _rewrite_saxena >>> from sympy.abc import s, t, m >>> from sympy import meijerg >>> g1 = meijerg([], [], [0], [], s*t) >>> g2 = meijerg([], [], [m/2], [-m/2], t**2/4) >>> r = _rewrite_saxena(1, t**0, g1, g2, t) >>> r[0] s/(4*sqrt(pi)) >>> r[1] meijerg(((), ()), ((-1/2, 0), ()), s**2*t/4) >>> r[2] meijerg(((), ()), ((m/2,), (-m/2,)), t/4) """ from sympy.core.numbers import ilcm def pb(g): a, b = _get_coeff_exp(g.argument, x) per = g.get_period() return meijerg(g.an, g.aother, g.bm, g.bother, _my_principal_branch(a, per, full_pb)*x**b) _, s = _get_coeff_exp(po, x) _, b1 = _get_coeff_exp(g1.argument, x) _, b2 = _get_coeff_exp(g2.argument, x) if (b1 < 0) == True: b1 = -b1 g1 = _flip_g(g1) if (b2 < 0) == True: b2 = -b2 g2 = _flip_g(g2) if not b1.is_Rational or not b2.is_Rational: return m1, n1 = b1.p, b1.q m2, n2 = b2.p, b2.q tau = ilcm(m1*n2, m2*n1) r1 = tau//(m1*n2) r2 = tau//(m2*n1) C1, g1 = _inflate_g(g1, r1) C2, g2 = _inflate_g(g2, r2) g1 = pb(g1) g2 = pb(g2) fac *= C1*C2 a1, b = _get_coeff_exp(g1.argument, x) a2, _ = _get_coeff_exp(g2.argument, x) # arbitrarily tack on the x**s part to g1 # TODO should we try both? exp = (s + 1)/b - 1 fac = fac/(abs(b) * a1**exp) def tr(l): return [a + exp for a in l] g1 = meijerg(tr(g1.an), tr(g1.aother), tr(g1.bm), tr(g1.bother), a1*x) g2 = meijerg(g2.an, g2.aother, g2.bm, g2.bother, a2*x) return powdenest(fac, polar=True), g1, g2 def _check_antecedents(g1, g2, x): """ Return a condition under which the integral theorem applies. """ from sympy import re, Eq, Ne, cos, I, exp, sin, sign, unpolarify from sympy import arg as arg_, unbranched_argument as arg # Yes, this is madness. # XXX TODO this is a testing *nightmare* # NOTE if you update these conditions, please update the documentation as well # The following conditions are found in # [P], Section 2.24.1 # # They are also reproduced (verbatim!) at # http://functions.wolfram.com/HypergeometricFunctions/MeijerG/21/02/03/ # # Note: k=l=r=alpha=1 sigma, _ = _get_coeff_exp(g1.argument, x) omega, _ = _get_coeff_exp(g2.argument, x) s, t, u, v = S([len(g1.bm), len(g1.an), len(g1.ap), len(g1.bq)]) m, n, p, q = S([len(g2.bm), len(g2.an), len(g2.ap), len(g2.bq)]) bstar = s + t - (u + v)/2 cstar = m + n - (p + q)/2 rho = g1.nu + (u - v)/2 + 1 mu = g2.nu + (p - q)/2 + 1 phi = q - p - (v - u) eta = 1 - (v - u) - mu - rho psi = (pi*(q - m - n) + abs(arg(omega)))/(q - p) theta = (pi*(v - s - t) + abs(arg(sigma)))/(v - u) _debug('Checking antecedents:') _debug(' sigma=%s, s=%s, t=%s, u=%s, v=%s, b*=%s, rho=%s' % (sigma, s, t, u, v, bstar, rho)) _debug(' omega=%s, m=%s, n=%s, p=%s, q=%s, c*=%s, mu=%s,' % (omega, m, n, p, q, cstar, mu)) _debug(' phi=%s, eta=%s, psi=%s, theta=%s' % (phi, eta, psi, theta)) def _c1(): for g in [g1, g2]: for i in g.an: for j in g.bm: diff = i - j if diff.is_integer and diff.is_positive: return False return True c1 = _c1() c2 = And(*[re(1 + i + j) > 0 for i in g1.bm for j in g2.bm]) c3 = And(*[re(1 + i + j) < 1 + 1 for i in g1.an for j in g2.an]) c4 = And(*[(p - q)*re(1 + i - 1) - re(mu) > -S(3)/2 for i in g1.an]) c5 = And(*[(p - q)*re(1 + i) - re(mu) > -S(3)/2 for i in g1.bm]) c6 = And(*[(u - v)*re(1 + i - 1) - re(rho) > -S(3)/2 for i in g2.an]) c7 = And(*[(u - v)*re(1 + i) - re(rho) > -S(3)/2 for i in g2.bm]) c8 = (abs(phi) + 2*re((rho - 1)*(q - p) + (v - u)*(q - p) + (mu - 1)*(v - u)) > 0) c9 = (abs(phi) - 2*re((rho - 1)*(q - p) + (v - u)*(q - p) + (mu - 1)*(v - u)) > 0) c10 = (abs(arg(sigma)) < bstar*pi) c11 = Eq(abs(arg(sigma)), bstar*pi) c12 = (abs(arg(omega)) < cstar*pi) c13 = Eq(abs(arg(omega)), cstar*pi) # The following condition is *not* implemented as stated on the wolfram # function site. In the book of Prudnikov there is an additional part # (the And involving re()). However, I only have this book in russian, and # I don't read any russian. The following condition is what other people # have told me it means. # Worryingly, it is different from the condition implemented in REDUCE. # The REDUCE implementation: # https://reduce-algebra.svn.sourceforge.net/svnroot/reduce-algebra/trunk/packages/defint/definta.red # (search for tst14) # The Wolfram alpha version: # http://functions.wolfram.com/HypergeometricFunctions/MeijerG/21/02/03/03/0014/ z0 = exp(-(bstar + cstar)*pi*I) zos = unpolarify(z0*omega/sigma) zso = unpolarify(z0*sigma/omega) if zos == 1/zso: c14 = And(Eq(phi, 0), bstar + cstar <= 1, Or(Ne(zos, 1), re(mu + rho + v - u) < 1, re(mu + rho + q - p) < 1)) else: def _cond(z): '''Returns True if abs(arg(1-z)) < pi, avoiding arg(0). Note: if `z` is 1 then arg is NaN. This raises a TypeError on `NaN < pi`. Previously this gave `False` so this behavior has been hardcoded here but someone should check if this NaN is more serious! This NaN is triggered by test_meijerint() in test_meijerint.py: `meijerint_definite(exp(x), x, 0, I)` ''' return z != 1 and abs(arg_(1 - z)) < pi c14 = And(Eq(phi, 0), bstar - 1 + cstar <= 0, Or(And(Ne(zos, 1), _cond(zos)), And(re(mu + rho + v - u) < 1, Eq(zos, 1)))) c14_alt = And(Eq(phi, 0), cstar - 1 + bstar <= 0, Or(And(Ne(zso, 1), _cond(zso)), And(re(mu + rho + q - p) < 1, Eq(zso, 1)))) # Since r=k=l=1, in our case there is c14_alt which is the same as calling # us with (g1, g2) = (g2, g1). The conditions below enumerate all cases # (i.e. we don't have to try arguments reversed by hand), and indeed try # all symmetric cases. (i.e. whenever there is a condition involving c14, # there is also a dual condition which is exactly what we would get when g1, # g2 were interchanged, *but c14 was unaltered*). # Hence the following seems correct: c14 = Or(c14, c14_alt) ''' When `c15` is NaN (e.g. from `psi` being NaN as happens during 'test_issue_4992' and/or `theta` is NaN as in 'test_issue_6253', both in `test_integrals.py`) the comparison to 0 formerly gave False whereas now an error is raised. To keep the old behavior, the value of NaN is replaced with False but perhaps a closer look at this condition should be made: XXX how should conditions leading to c15=NaN be handled? ''' try: lambda_c = (q - p)*abs(omega)**(1/(q - p))*cos(psi) \ + (v - u)*abs(sigma)**(1/(v - u))*cos(theta) # the TypeError might be raised here, e.g. if lambda_c is NaN if _eval_cond(lambda_c > 0) != False: c15 = (lambda_c > 0) else: def lambda_s0(c1, c2): return c1*(q - p)*abs(omega)**(1/(q - p))*sin(psi) \ + c2*(v - u)*abs(sigma)**(1/(v - u))*sin(theta) lambda_s = Piecewise( ((lambda_s0(+1, +1)*lambda_s0(-1, -1)), And(Eq(arg(sigma), 0), Eq(arg(omega), 0))), (lambda_s0(sign(arg(omega)), +1)*lambda_s0(sign(arg(omega)), -1), And(Eq(arg(sigma), 0), Ne(arg(omega), 0))), (lambda_s0(+1, sign(arg(sigma)))*lambda_s0(-1, sign(arg(sigma))), And(Ne(arg(sigma), 0), Eq(arg(omega), 0))), (lambda_s0(sign(arg(omega)), sign(arg(sigma))), True)) tmp = [lambda_c > 0, And(Eq(lambda_c, 0), Ne(lambda_s, 0), re(eta) > -1), And(Eq(lambda_c, 0), Eq(lambda_s, 0), re(eta) > 0)] c15 = Or(*tmp) except TypeError: c15 = False for cond, i in [(c1, 1), (c2, 2), (c3, 3), (c4, 4), (c5, 5), (c6, 6), (c7, 7), (c8, 8), (c9, 9), (c10, 10), (c11, 11), (c12, 12), (c13, 13), (c14, 14), (c15, 15)]: _debug(' c%s:' % i, cond) # We will return Or(*conds) conds = [] def pr(count): _debug(' case %s:' % count, conds[-1]) conds += [And(m*n*s*t != 0, bstar.is_positive is True, cstar.is_positive is True, c1, c2, c3, c10, c12)] # 1 pr(1) conds += [And(Eq(u, v), Eq(bstar, 0), cstar.is_positive is True, sigma.is_positive is True, re(rho) < 1, c1, c2, c3, c12)] # 2 pr(2) conds += [And(Eq(p, q), Eq(cstar, 0), bstar.is_positive is True, omega.is_positive is True, re(mu) < 1, c1, c2, c3, c10)] # 3 pr(3) conds += [And(Eq(p, q), Eq(u, v), Eq(bstar, 0), Eq(cstar, 0), sigma.is_positive is True, omega.is_positive is True, re(mu) < 1, re(rho) < 1, Ne(sigma, omega), c1, c2, c3)] # 4 pr(4) conds += [And(Eq(p, q), Eq(u, v), Eq(bstar, 0), Eq(cstar, 0), sigma.is_positive is True, omega.is_positive is True, re(mu + rho) < 1, Ne(omega, sigma), c1, c2, c3)] # 5 pr(5) conds += [And(p > q, s.is_positive is True, bstar.is_positive is True, cstar >= 0, c1, c2, c3, c5, c10, c13)] # 6 pr(6) conds += [And(p < q, t.is_positive is True, bstar.is_positive is True, cstar >= 0, c1, c2, c3, c4, c10, c13)] # 7 pr(7) conds += [And(u > v, m.is_positive is True, cstar.is_positive is True, bstar >= 0, c1, c2, c3, c7, c11, c12)] # 8 pr(8) conds += [And(u < v, n.is_positive is True, cstar.is_positive is True, bstar >= 0, c1, c2, c3, c6, c11, c12)] # 9 pr(9) conds += [And(p > q, Eq(u, v), Eq(bstar, 0), cstar >= 0, sigma.is_positive is True, re(rho) < 1, c1, c2, c3, c5, c13)] # 10 pr(10) conds += [And(p < q, Eq(u, v), Eq(bstar, 0), cstar >= 0, sigma.is_positive is True, re(rho) < 1, c1, c2, c3, c4, c13)] # 11 pr(11) conds += [And(Eq(p, q), u > v, bstar >= 0, Eq(cstar, 0), omega.is_positive is True, re(mu) < 1, c1, c2, c3, c7, c11)] # 12 pr(12) conds += [And(Eq(p, q), u < v, bstar >= 0, Eq(cstar, 0), omega.is_positive is True, re(mu) < 1, c1, c2, c3, c6, c11)] # 13 pr(13) conds += [And(p < q, u > v, bstar >= 0, cstar >= 0, c1, c2, c3, c4, c7, c11, c13)] # 14 pr(14) conds += [And(p > q, u < v, bstar >= 0, cstar >= 0, c1, c2, c3, c5, c6, c11, c13)] # 15 pr(15) conds += [And(p > q, u > v, bstar >= 0, cstar >= 0, c1, c2, c3, c5, c7, c8, c11, c13, c14)] # 16 pr(16) conds += [And(p < q, u < v, bstar >= 0, cstar >= 0, c1, c2, c3, c4, c6, c9, c11, c13, c14)] # 17 pr(17) conds += [And(Eq(t, 0), s.is_positive is True, bstar.is_positive is True, phi.is_positive is True, c1, c2, c10)] # 18 pr(18) conds += [And(Eq(s, 0), t.is_positive is True, bstar.is_positive is True, phi.is_negative is True, c1, c3, c10)] # 19 pr(19) conds += [And(Eq(n, 0), m.is_positive is True, cstar.is_positive is True, phi.is_negative is True, c1, c2, c12)] # 20 pr(20) conds += [And(Eq(m, 0), n.is_positive is True, cstar.is_positive is True, phi.is_positive is True, c1, c3, c12)] # 21 pr(21) conds += [And(Eq(s*t, 0), bstar.is_positive is True, cstar.is_positive is True, c1, c2, c3, c10, c12)] # 22 pr(22) conds += [And(Eq(m*n, 0), bstar.is_positive is True, cstar.is_positive is True, c1, c2, c3, c10, c12)] # 23 pr(23) # The following case is from [Luke1969]. As far as I can tell, it is *not* # covered by Prudnikov's. # Let G1 and G2 be the two G-functions. Suppose the integral exists from # 0 to a > 0 (this is easy the easy part), that G1 is exponential decay at # infinity, and that the mellin transform of G2 exists. # Then the integral exists. mt1_exists = _check_antecedents_1(g1, x, helper=True) mt2_exists = _check_antecedents_1(g2, x, helper=True) conds += [And(mt2_exists, Eq(t, 0), u < s, bstar.is_positive is True, c10, c1, c2, c3)] pr('E1') conds += [And(mt2_exists, Eq(s, 0), v < t, bstar.is_positive is True, c10, c1, c2, c3)] pr('E2') conds += [And(mt1_exists, Eq(n, 0), p < m, cstar.is_positive is True, c12, c1, c2, c3)] pr('E3') conds += [And(mt1_exists, Eq(m, 0), q < n, cstar.is_positive is True, c12, c1, c2, c3)] pr('E4') # Let's short-circuit if this worked ... # the rest is corner-cases and terrible to read. r = Or(*conds) if _eval_cond(r) != False: return r conds += [And(m + n > p, Eq(t, 0), Eq(phi, 0), s.is_positive is True, bstar.is_positive is True, cstar.is_negative is True, abs(arg(omega)) < (m + n - p + 1)*pi, c1, c2, c10, c14, c15)] # 24 pr(24) conds += [And(m + n > q, Eq(s, 0), Eq(phi, 0), t.is_positive is True, bstar.is_positive is True, cstar.is_negative is True, abs(arg(omega)) < (m + n - q + 1)*pi, c1, c3, c10, c14, c15)] # 25 pr(25) conds += [And(Eq(p, q - 1), Eq(t, 0), Eq(phi, 0), s.is_positive is True, bstar.is_positive is True, cstar >= 0, cstar*pi < abs(arg(omega)), c1, c2, c10, c14, c15)] # 26 pr(26) conds += [And(Eq(p, q + 1), Eq(s, 0), Eq(phi, 0), t.is_positive is True, bstar.is_positive is True, cstar >= 0, cstar*pi < abs(arg(omega)), c1, c3, c10, c14, c15)] # 27 pr(27) conds += [And(p < q - 1, Eq(t, 0), Eq(phi, 0), s.is_positive is True, bstar.is_positive is True, cstar >= 0, cstar*pi < abs(arg(omega)), abs(arg(omega)) < (m + n - p + 1)*pi, c1, c2, c10, c14, c15)] # 28 pr(28) conds += [And( p > q + 1, Eq(s, 0), Eq(phi, 0), t.is_positive is True, bstar.is_positive is True, cstar >= 0, cstar*pi < abs(arg(omega)), abs(arg(omega)) < (m + n - q + 1)*pi, c1, c3, c10, c14, c15)] # 29 pr(29) conds += [And(Eq(n, 0), Eq(phi, 0), s + t > 0, m.is_positive is True, cstar.is_positive is True, bstar.is_negative is True, abs(arg(sigma)) < (s + t - u + 1)*pi, c1, c2, c12, c14, c15)] # 30 pr(30) conds += [And(Eq(m, 0), Eq(phi, 0), s + t > v, n.is_positive is True, cstar.is_positive is True, bstar.is_negative is True, abs(arg(sigma)) < (s + t - v + 1)*pi, c1, c3, c12, c14, c15)] # 31 pr(31) conds += [And(Eq(n, 0), Eq(phi, 0), Eq(u, v - 1), m.is_positive is True, cstar.is_positive is True, bstar >= 0, bstar*pi < abs(arg(sigma)), abs(arg(sigma)) < (bstar + 1)*pi, c1, c2, c12, c14, c15)] # 32 pr(32) conds += [And(Eq(m, 0), Eq(phi, 0), Eq(u, v + 1), n.is_positive is True, cstar.is_positive is True, bstar >= 0, bstar*pi < abs(arg(sigma)), abs(arg(sigma)) < (bstar + 1)*pi, c1, c3, c12, c14, c15)] # 33 pr(33) conds += [And( Eq(n, 0), Eq(phi, 0), u < v - 1, m.is_positive is True, cstar.is_positive is True, bstar >= 0, bstar*pi < abs(arg(sigma)), abs(arg(sigma)) < (s + t - u + 1)*pi, c1, c2, c12, c14, c15)] # 34 pr(34) conds += [And( Eq(m, 0), Eq(phi, 0), u > v + 1, n.is_positive is True, cstar.is_positive is True, bstar >= 0, bstar*pi < abs(arg(sigma)), abs(arg(sigma)) < (s + t - v + 1)*pi, c1, c3, c12, c14, c15)] # 35 pr(35) return Or(*conds) # NOTE An alternative, but as far as I can tell weaker, set of conditions # can be found in [L, section 5.6.2]. def _int0oo(g1, g2, x): """ Express integral from zero to infinity g1*g2 using a G function, assuming the necessary conditions are fulfilled. >>> from sympy.integrals.meijerint import _int0oo >>> from sympy.abc import s, t, m >>> from sympy import meijerg, S >>> g1 = meijerg([], [], [-S(1)/2, 0], [], s**2*t/4) >>> g2 = meijerg([], [], [m/2], [-m/2], t/4) >>> _int0oo(g1, g2, t) 4*meijerg(((1/2, 0), ()), ((m/2,), (-m/2,)), s**(-2))/s**2 """ # See: [L, section 5.6.2, equation (1)] eta, _ = _get_coeff_exp(g1.argument, x) omega, _ = _get_coeff_exp(g2.argument, x) def neg(l): return [-x for x in l] a1 = neg(g1.bm) + list(g2.an) a2 = list(g2.aother) + neg(g1.bother) b1 = neg(g1.an) + list(g2.bm) b2 = list(g2.bother) + neg(g1.aother) return meijerg(a1, a2, b1, b2, omega/eta)/eta def _rewrite_inversion(fac, po, g, x): """ Absorb ``po`` == x**s into g. """ _, s = _get_coeff_exp(po, x) a, b = _get_coeff_exp(g.argument, x) def tr(l): return [t + s/b for t in l] return (powdenest(fac/a**(s/b), polar=True), meijerg(tr(g.an), tr(g.aother), tr(g.bm), tr(g.bother), g.argument)) def _check_antecedents_inversion(g, x): """ Check antecedents for the laplace inversion integral. """ from sympy import re, im, Or, And, Eq, exp, I, Add, nan, Ne _debug('Checking antecedents for inversion:') z = g.argument _, e = _get_coeff_exp(z, x) if e < 0: _debug(' Flipping G.') # We want to assume that argument gets large as |x| -> oo return _check_antecedents_inversion(_flip_g(g), x) def statement_half(a, b, c, z, plus): coeff, exponent = _get_coeff_exp(z, x) a *= exponent b *= coeff**c c *= exponent conds = [] wp = b*exp(I*re(c)*pi/2) wm = b*exp(-I*re(c)*pi/2) if plus: w = wp else: w = wm conds += [And(Or(Eq(b, 0), re(c) <= 0), re(a) <= -1)] conds += [And(Ne(b, 0), Eq(im(c), 0), re(c) > 0, re(w) < 0)] conds += [And(Ne(b, 0), Eq(im(c), 0), re(c) > 0, re(w) <= 0, re(a) <= -1)] return Or(*conds) def statement(a, b, c, z): """ Provide a convergence statement for z**a * exp(b*z**c), c/f sphinx docs. """ return And(statement_half(a, b, c, z, True), statement_half(a, b, c, z, False)) # Notations from [L], section 5.7-10 m, n, p, q = S([len(g.bm), len(g.an), len(g.ap), len(g.bq)]) tau = m + n - p nu = q - m - n rho = (tau - nu)/2 sigma = q - p if sigma == 1: epsilon = S(1)/2 elif sigma > 1: epsilon = 1 else: epsilon = nan theta = ((1 - sigma)/2 + Add(*g.bq) - Add(*g.ap))/sigma delta = g.delta _debug(' m=%s, n=%s, p=%s, q=%s, tau=%s, nu=%s, rho=%s, sigma=%s' % ( m, n, p, q, tau, nu, rho, sigma)) _debug(' epsilon=%s, theta=%s, delta=%s' % (epsilon, theta, delta)) # First check if the computation is valid. if not (g.delta >= e/2 or (p >= 1 and p >= q)): _debug(' Computation not valid for these parameters.') return False # Now check if the inversion integral exists. # Test "condition A" for a in g.an: for b in g.bm: if (a - b).is_integer and a > b: _debug(' Not a valid G function.') return False # There are two cases. If p >= q, we can directly use a slater expansion # like [L], 5.2 (11). Note in particular that the asymptotics of such an # expansion even hold when some of the parameters differ by integers, i.e. # the formula itself would not be valid! (b/c G functions are cts. in their # parameters) # When p < q, we need to use the theorems of [L], 5.10. if p >= q: _debug(' Using asymptotic Slater expansion.') return And(*[statement(a - 1, 0, 0, z) for a in g.an]) def E(z): return And(*[statement(a - 1, 0, 0, z) for a in g.an]) def H(z): return statement(theta, -sigma, 1/sigma, z) def Hp(z): return statement_half(theta, -sigma, 1/sigma, z, True) def Hm(z): return statement_half(theta, -sigma, 1/sigma, z, False) # [L], section 5.10 conds = [] # Theorem 1 -- p < q from test above conds += [And(1 <= n, 1 <= m, rho*pi - delta >= pi/2, delta > 0, E(z*exp(I*pi*(nu + 1))))] # Theorem 2, statements (2) and (3) conds += [And(p + 1 <= m, m + 1 <= q, delta > 0, delta < pi/2, n == 0, (m - p + 1)*pi - delta >= pi/2, Hp(z*exp(I*pi*(q - m))), Hm(z*exp(-I*pi*(q - m))))] # Theorem 2, statement (5) -- p < q from test above conds += [And(m == q, n == 0, delta > 0, (sigma + epsilon)*pi - delta >= pi/2, H(z))] # Theorem 3, statements (6) and (7) conds += [And(Or(And(p <= q - 2, 1 <= tau, tau <= sigma/2), And(p + 1 <= m + n, m + n <= (p + q)/2)), delta > 0, delta < pi/2, (tau + 1)*pi - delta >= pi/2, Hp(z*exp(I*pi*nu)), Hm(z*exp(-I*pi*nu)))] # Theorem 4, statements (10) and (11) -- p < q from test above conds += [And(1 <= m, rho > 0, delta > 0, delta + rho*pi < pi/2, (tau + epsilon)*pi - delta >= pi/2, Hp(z*exp(I*pi*nu)), Hm(z*exp(-I*pi*nu)))] # Trivial case conds += [m == 0] # TODO # Theorem 5 is quite general # Theorem 6 contains special cases for q=p+1 return Or(*conds) def _int_inversion(g, x, t): """ Compute the laplace inversion integral, assuming the formula applies. """ b, a = _get_coeff_exp(g.argument, x) C, g = _inflate_fox_h(meijerg(g.an, g.aother, g.bm, g.bother, b/t**a), -a) return C/t*g #################################################################### # Finally, the real meat. #################################################################### _lookup_table = None @cacheit @timeit def _rewrite_single(f, x, recursive=True): """ Try to rewrite f as a sum of single G functions of the form C*x**s*G(a*x**b), where b is a rational number and C is independent of x. We guarantee that result.argument.as_coeff_mul(x) returns (a, (x**b,)) or (a, ()). Returns a list of tuples (C, s, G) and a condition cond. Returns None on failure. """ from sympy import polarify, unpolarify, oo, zoo, Tuple global _lookup_table if not _lookup_table: _lookup_table = {} _create_lookup_table(_lookup_table) if isinstance(f, meijerg): from sympy import factor coeff, m = factor(f.argument, x).as_coeff_mul(x) if len(m) > 1: return None m = m[0] if m.is_Pow: if m.base != x or not m.exp.is_Rational: return None elif m != x: return None return [(1, 0, meijerg(f.an, f.aother, f.bm, f.bother, coeff*m))], True f_ = f f = f.subs(x, z) t = _mytype(f, z) if t in _lookup_table: l = _lookup_table[t] for formula, terms, cond, hint in l: subs = f.match(formula, old=True) if subs: subs_ = {} for fro, to in subs.items(): subs_[fro] = unpolarify(polarify(to, lift=True), exponents_only=True) subs = subs_ if not isinstance(hint, bool): hint = hint.subs(subs) if hint == False: continue if not isinstance(cond, (bool, BooleanAtom)): cond = unpolarify(cond.subs(subs)) if _eval_cond(cond) == False: continue if not isinstance(terms, list): terms = terms(subs) res = [] for fac, g in terms: r1 = _get_coeff_exp(unpolarify(fac.subs(subs).subs(z, x), exponents_only=True), x) try: g = g.subs(subs).subs(z, x) except ValueError: continue # NOTE these substitutions can in principle introduce oo, # zoo and other absurdities. It shouldn't matter, # but better be safe. if Tuple(*(r1 + (g,))).has(oo, zoo, -oo): continue g = meijerg(g.an, g.aother, g.bm, g.bother, unpolarify(g.argument, exponents_only=True)) res.append(r1 + (g,)) if res: return res, cond # try recursive mellin transform if not recursive: return None _debug('Trying recursive Mellin transform method.') from sympy.integrals.transforms import (mellin_transform, inverse_mellin_transform, IntegralTransformError, MellinTransformStripError) from sympy import oo, nan, zoo, simplify, cancel def my_imt(F, s, x, strip): """ Calling simplify() all the time is slow and not helpful, since most of the time it only factors things in a way that has to be un-done anyway. But sometimes it can remove apparent poles. """ # XXX should this be in inverse_mellin_transform? try: return inverse_mellin_transform(F, s, x, strip, as_meijerg=True, needeval=True) except MellinTransformStripError: return inverse_mellin_transform( simplify(cancel(expand(F))), s, x, strip, as_meijerg=True, needeval=True) f = f_ s = _dummy('s', 'rewrite-single', f) # to avoid infinite recursion, we have to force the two g functions case def my_integrator(f, x): from sympy import Integral, hyperexpand r = _meijerint_definite_4(f, x, only_double=True) if r is not None: res, cond = r res = _my_unpolarify(hyperexpand(res, rewrite='nonrepsmall')) return Piecewise((res, cond), (Integral(f, (x, 0, oo)), True)) return Integral(f, (x, 0, oo)) try: F, strip, _ = mellin_transform(f, x, s, integrator=my_integrator, simplify=False, needeval=True) g = my_imt(F, s, x, strip) except IntegralTransformError: g = None if g is None: # We try to find an expression by analytic continuation. # (also if the dummy is already in the expression, there is no point in # putting in another one) a = _dummy_('a', 'rewrite-single') if a not in f.free_symbols and _is_analytic(f, x): try: F, strip, _ = mellin_transform(f.subs(x, a*x), x, s, integrator=my_integrator, needeval=True, simplify=False) g = my_imt(F, s, x, strip).subs(a, 1) except IntegralTransformError: g = None if g is None or g.has(oo, nan, zoo): _debug('Recursive Mellin transform failed.') return None args = Add.make_args(g) res = [] for f in args: c, m = f.as_coeff_mul(x) if len(m) > 1: raise NotImplementedError('Unexpected form...') g = m[0] a, b = _get_coeff_exp(g.argument, x) res += [(c, 0, meijerg(g.an, g.aother, g.bm, g.bother, unpolarify(polarify( a, lift=True), exponents_only=True) *x**b))] _debug('Recursive Mellin transform worked:', g) return res, True def _rewrite1(f, x, recursive=True): """ Try to rewrite f using a (sum of) single G functions with argument a*x**b. Return fac, po, g such that f = fac*po*g, fac is independent of x and po = x**s. Here g is a result from _rewrite_single. Return None on failure. """ fac, po, g = _split_mul(f, x) g = _rewrite_single(g, x, recursive) if g: return fac, po, g[0], g[1] def _rewrite2(f, x): """ Try to rewrite f as a product of two G functions of arguments a*x**b. Return fac, po, g1, g2 such that f = fac*po*g1*g2, where fac is independent of x and po is x**s. Here g1 and g2 are results of _rewrite_single. Returns None on failure. """ fac, po, g = _split_mul(f, x) if any(_rewrite_single(expr, x, False) is None for expr in _mul_args(g)): return None l = _mul_as_two_parts(g) if not l: return None l = list(ordered(l, [ lambda p: max(len(_exponents(p[0], x)), len(_exponents(p[1], x))), lambda p: max(len(_functions(p[0], x)), len(_functions(p[1], x))), lambda p: max(len(_find_splitting_points(p[0], x)), len(_find_splitting_points(p[1], x)))])) for recursive in [False, True]: for fac1, fac2 in l: g1 = _rewrite_single(fac1, x, recursive) g2 = _rewrite_single(fac2, x, recursive) if g1 and g2: cond = And(g1[1], g2[1]) if cond != False: return fac, po, g1[0], g2[0], cond def meijerint_indefinite(f, x): """ Compute an indefinite integral of ``f`` by rewriting it as a G function. Examples ======== >>> from sympy.integrals.meijerint import meijerint_indefinite >>> from sympy import sin >>> from sympy.abc import x >>> meijerint_indefinite(sin(x), x) -cos(x) """ from sympy import hyper, meijerg results = [] for a in sorted(_find_splitting_points(f, x) | {S(0)}, key=default_sort_key): res = _meijerint_indefinite_1(f.subs(x, x + a), x) if not res: continue res = res.subs(x, x - a) if _has(res, hyper, meijerg): results.append(res) else: return res if f.has(HyperbolicFunction): _debug('Try rewriting hyperbolics in terms of exp.') rv = meijerint_indefinite( _rewrite_hyperbolics_as_exp(f), x) if rv: if not type(rv) is list: return collect(factor_terms(rv), rv.atoms(exp)) results.extend(rv) if results: return next(ordered(results)) def _meijerint_indefinite_1(f, x): """ Helper that does not attempt any substitution. """ from sympy import Integral, piecewise_fold, nan, zoo _debug('Trying to compute the indefinite integral of', f, 'wrt', x) gs = _rewrite1(f, x) if gs is None: # Note: the code that calls us will do expand() and try again return None fac, po, gl, cond = gs _debug(' could rewrite:', gs) res = S(0) for C, s, g in gl: a, b = _get_coeff_exp(g.argument, x) _, c = _get_coeff_exp(po, x) c += s # we do a substitution t=a*x**b, get integrand fac*t**rho*g fac_ = fac * C / (b*a**((1 + c)/b)) rho = (c + 1)/b - 1 # we now use t**rho*G(params, t) = G(params + rho, t) # [L, page 150, equation (4)] # and integral G(params, t) dt = G(1, params+1, 0, t) # (or a similar expression with 1 and 0 exchanged ... pick the one # which yields a well-defined function) # [R, section 5] # (Note that this dummy will immediately go away again, so we # can safely pass S(1) for ``expr``.) t = _dummy('t', 'meijerint-indefinite', S(1)) def tr(p): return [a + rho + 1 for a in p] if any(b.is_integer and (b <= 0) == True for b in tr(g.bm)): r = -meijerg( tr(g.an), tr(g.aother) + [1], tr(g.bm) + [0], tr(g.bother), t) else: r = meijerg( tr(g.an) + [1], tr(g.aother), tr(g.bm), tr(g.bother) + [0], t) # The antiderivative is most often expected to be defined # in the neighborhood of x = 0. place = 0 if b < 0 or f.subs(x, 0).has(nan, zoo): place = None r = hyperexpand(r.subs(t, a*x**b), place=place) # now substitute back # Note: we really do want the powers of x to combine. res += powdenest(fac_*r, polar=True) def _clean(res): """This multiplies out superfluous powers of x we created, and chops off constants: >> _clean(x*(exp(x)/x - 1/x) + 3) exp(x) cancel is used before mul_expand since it is possible for an expression to have an additive constant that doesn't become isolated with simple expansion. Such a situation was identified in issue 6369: >>> from sympy import sqrt, cancel >>> from sympy.abc import x >>> a = sqrt(2*x + 1) >>> bad = (3*x*a**5 + 2*x - a**5 + 1)/a**2 >>> bad.expand().as_independent(x)[0] 0 >>> cancel(bad).expand().as_independent(x)[0] 1 """ from sympy import cancel res = expand_mul(cancel(res), deep=False) return Add._from_args(res.as_coeff_add(x)[1]) res = piecewise_fold(res) if res.is_Piecewise: newargs = [] for expr, cond in res.args: expr = _my_unpolarify(_clean(expr)) newargs += [(expr, cond)] res = Piecewise(*newargs) else: res = _my_unpolarify(_clean(res)) return Piecewise((res, _my_unpolarify(cond)), (Integral(f, x), True)) @timeit def meijerint_definite(f, x, a, b): """ Integrate ``f`` over the interval [``a``, ``b``], by rewriting it as a product of two G functions, or as a single G function. Return res, cond, where cond are convergence conditions. Examples ======== >>> from sympy.integrals.meijerint import meijerint_definite >>> from sympy import exp, oo >>> from sympy.abc import x >>> meijerint_definite(exp(-x**2), x, -oo, oo) (sqrt(pi), True) This function is implemented as a succession of functions meijerint_definite, _meijerint_definite_2, _meijerint_definite_3, _meijerint_definite_4. Each function in the list calls the next one (presumably) several times. This means that calling meijerint_definite can be very costly. """ # This consists of three steps: # 1) Change the integration limits to 0, oo # 2) Rewrite in terms of G functions # 3) Evaluate the integral # # There are usually several ways of doing this, and we want to try all. # This function does (1), calls _meijerint_definite_2 for step (2). from sympy import arg, exp, I, And, DiracDelta, SingularityFunction _debug('Integrating', f, 'wrt %s from %s to %s.' % (x, a, b)) if f.has(DiracDelta): _debug('Integrand has DiracDelta terms - giving up.') return None if f.has(SingularityFunction): _debug('Integrand has Singularity Function terms - giving up.') return None f_, x_, a_, b_ = f, x, a, b # Let's use a dummy in case any of the boundaries has x. d = Dummy('x') f = f.subs(x, d) x = d if a == b: return (S.Zero, True) results = [] if a == -oo and b != oo: return meijerint_definite(f.subs(x, -x), x, -b, -a) elif a == -oo: # Integrating -oo to oo. We need to find a place to split the integral. _debug(' Integrating -oo to +oo.') innermost = _find_splitting_points(f, x) _debug(' Sensible splitting points:', innermost) for c in sorted(innermost, key=default_sort_key, reverse=True) + [S(0)]: _debug(' Trying to split at', c) if not c.is_extended_real: _debug(' Non-real splitting point.') continue res1 = _meijerint_definite_2(f.subs(x, x + c), x) if res1 is None: _debug(' But could not compute first integral.') continue res2 = _meijerint_definite_2(f.subs(x, c - x), x) if res2 is None: _debug(' But could not compute second integral.') continue res1, cond1 = res1 res2, cond2 = res2 cond = _condsimp(And(cond1, cond2)) if cond == False: _debug(' But combined condition is always false.') continue res = res1 + res2 return res, cond elif a == oo: res = meijerint_definite(f, x, b, oo) return -res[0], res[1] elif (a, b) == (0, oo): # This is a common case - try it directly first. res = _meijerint_definite_2(f, x) if res: if _has(res[0], meijerg): results.append(res) else: return res else: if b == oo: for split in _find_splitting_points(f, x): if (a - split >= 0) == True: _debug('Trying x -> x + %s' % split) res = _meijerint_definite_2(f.subs(x, x + split) *Heaviside(x + split - a), x) if res: if _has(res[0], meijerg): results.append(res) else: return res f = f.subs(x, x + a) b = b - a a = 0 if b != oo: phi = exp(I*arg(b)) b = abs(b) f = f.subs(x, phi*x) f *= Heaviside(b - x)*phi b = oo _debug('Changed limits to', a, b) _debug('Changed function to', f) res = _meijerint_definite_2(f, x) if res: if _has(res[0], meijerg): results.append(res) else: return res if f_.has(HyperbolicFunction): _debug('Try rewriting hyperbolics in terms of exp.') rv = meijerint_definite( _rewrite_hyperbolics_as_exp(f_), x_, a_, b_) if rv: if not type(rv) is list: rv = (collect(factor_terms(rv[0]), rv[0].atoms(exp)),) + rv[1:] return rv results.extend(rv) if results: return next(ordered(results)) def _guess_expansion(f, x): """ Try to guess sensible rewritings for integrand f(x). """ from sympy import expand_trig from sympy.functions.elementary.trigonometric import TrigonometricFunction res = [(f, 'original integrand')] orig = res[-1][0] saw = {orig} expanded = expand_mul(orig) if expanded not in saw: res += [(expanded, 'expand_mul')] saw.add(expanded) expanded = expand(orig) if expanded not in saw: res += [(expanded, 'expand')] saw.add(expanded) if orig.has(TrigonometricFunction, HyperbolicFunction): expanded = expand_mul(expand_trig(orig)) if expanded not in saw: res += [(expanded, 'expand_trig, expand_mul')] saw.add(expanded) if orig.has(cos, sin): reduced = sincos_to_sum(orig) if reduced not in saw: res += [(reduced, 'trig power reduction')] saw.add(reduced) return res def _meijerint_definite_2(f, x): """ Try to integrate f dx from zero to infinity. The body of this function computes various 'simplifications' f1, f2, ... of f (e.g. by calling expand_mul(), trigexpand() - see _guess_expansion) and calls _meijerint_definite_3 with each of these in succession. If _meijerint_definite_3 succeeds with any of the simplified functions, returns this result. """ # This function does preparation for (2), calls # _meijerint_definite_3 for (2) and (3) combined. # use a positive dummy - we integrate from 0 to oo # XXX if a nonnegative symbol is used there will be test failures dummy = _dummy('x', 'meijerint-definite2', f, positive=True) f = f.subs(x, dummy) x = dummy if f == 0: return S(0), True for g, explanation in _guess_expansion(f, x): _debug('Trying', explanation) res = _meijerint_definite_3(g, x) if res: return res def _meijerint_definite_3(f, x): """ Try to integrate f dx from zero to infinity. This function calls _meijerint_definite_4 to try to compute the integral. If this fails, it tries using linearity. """ res = _meijerint_definite_4(f, x) if res and res[1] != False: return res if f.is_Add: _debug('Expanding and evaluating all terms.') ress = [_meijerint_definite_4(g, x) for g in f.args] if all(r is not None for r in ress): conds = [] res = S(0) for r, c in ress: res += r conds += [c] c = And(*conds) if c != False: return res, c def _my_unpolarify(f): from sympy import unpolarify return _eval_cond(unpolarify(f)) @timeit def _meijerint_definite_4(f, x, only_double=False): """ Try to integrate f dx from zero to infinity. This function tries to apply the integration theorems found in literature, i.e. it tries to rewrite f as either one or a product of two G-functions. The parameter ``only_double`` is used internally in the recursive algorithm to disable trying to rewrite f as a single G-function. """ # This function does (2) and (3) _debug('Integrating', f) # Try single G function. if not only_double: gs = _rewrite1(f, x, recursive=False) if gs is not None: fac, po, g, cond = gs _debug('Could rewrite as single G function:', fac, po, g) res = S(0) for C, s, f in g: if C == 0: continue C, f = _rewrite_saxena_1(fac*C, po*x**s, f, x) res += C*_int0oo_1(f, x) cond = And(cond, _check_antecedents_1(f, x)) if cond == False: break cond = _my_unpolarify(cond) if cond == False: _debug('But cond is always False.') else: _debug('Result before branch substitutions is:', res) return _my_unpolarify(hyperexpand(res)), cond # Try two G functions. gs = _rewrite2(f, x) if gs is not None: for full_pb in [False, True]: fac, po, g1, g2, cond = gs _debug('Could rewrite as two G functions:', fac, po, g1, g2) res = S(0) for C1, s1, f1 in g1: for C2, s2, f2 in g2: r = _rewrite_saxena(fac*C1*C2, po*x**(s1 + s2), f1, f2, x, full_pb) if r is None: _debug('Non-rational exponents.') return C, f1_, f2_ = r _debug('Saxena subst for yielded:', C, f1_, f2_) cond = And(cond, _check_antecedents(f1_, f2_, x)) if cond == False: break res += C*_int0oo(f1_, f2_, x) else: continue break cond = _my_unpolarify(cond) if cond == False: _debug('But cond is always False (full_pb=%s).' % full_pb) else: _debug('Result before branch substitutions is:', res) if only_double: return res, cond return _my_unpolarify(hyperexpand(res)), cond def meijerint_inversion(f, x, t): r""" Compute the inverse laplace transform :math:\int_{c+i\infty}^{c-i\infty} f(x) e^{tx) dx, for real c larger than the real part of all singularities of f. Note that ``t`` is always assumed real and positive. Return None if the integral does not exist or could not be evaluated. Examples ======== >>> from sympy.abc import x, t >>> from sympy.integrals.meijerint import meijerint_inversion >>> meijerint_inversion(1/x, x, t) Heaviside(t) """ from sympy import I, Integral, exp, expand, log, Add, Mul, Heaviside f_ = f t_ = t t = Dummy('t', polar=True) # We don't want sqrt(t**2) = abs(t) etc f = f.subs(t_, t) _debug('Laplace-inverting', f) if not _is_analytic(f, x): _debug('But expression is not analytic.') return None # Exponentials correspond to shifts; we filter them out and then # shift the result later. If we are given an Add this will not # work, but the calling code will take care of that. shift = S.Zero if f.is_Mul: args = list(f.args) elif isinstance(f, exp): args = [f] else: args = None if args: newargs = [] exponentials = [] while args: arg = args.pop() if isinstance(arg, exp): arg2 = expand(arg) if arg2.is_Mul: args += arg2.args continue try: a, b = _get_coeff_exp(arg.args[0], x) except _CoeffExpValueError: b = 0 if b == 1: exponentials.append(a) else: newargs.append(arg) elif arg.is_Pow: arg2 = expand(arg) if arg2.is_Mul: args += arg2.args continue if x not in arg.base.free_symbols: try: a, b = _get_coeff_exp(arg.exp, x) except _CoeffExpValueError: b = 0 if b == 1: exponentials.append(a*log(arg.base)) newargs.append(arg) else: newargs.append(arg) shift = Add(*exponentials) f = Mul(*newargs) if x not in f.free_symbols: _debug('Expression consists of constant and exp shift:', f, shift) from sympy import Eq, im cond = Eq(im(shift), 0) if cond == False: _debug('but shift is nonreal, cannot be a Laplace transform') return None res = f*DiracDelta(t + shift) _debug('Result is a delta function, possibly conditional:', res, cond) # cond is True or Eq return Piecewise((res.subs(t, t_), cond)) gs = _rewrite1(f, x) if gs is not None: fac, po, g, cond = gs _debug('Could rewrite as single G function:', fac, po, g) res = S(0) for C, s, f in g: C, f = _rewrite_inversion(fac*C, po*x**s, f, x) res += C*_int_inversion(f, x, t) cond = And(cond, _check_antecedents_inversion(f, x)) if cond == False: break cond = _my_unpolarify(cond) if cond == False: _debug('But cond is always False.') else: _debug('Result before branch substitution:', res) res = _my_unpolarify(hyperexpand(res)) if not res.has(Heaviside): res *= Heaviside(t) res = res.subs(t, t + shift) if not isinstance(cond, bool): cond = cond.subs(t, t + shift) from sympy import InverseLaplaceTransform return Piecewise((res.subs(t, t_), cond), (InverseLaplaceTransform(f_.subs(t, t_), x, t_, None), True))

4137b02da73faa6847be89b6685f296c6961f8bf1f69d9c15530c2d0e46b9463

"""Base class for all the objects in SymPy""" from __future__ import print_function, division from collections import defaultdict from itertools import chain from .assumptions import BasicMeta, ManagedProperties from .cache import cacheit from .sympify import _sympify, sympify, SympifyError from .compatibility import (iterable, Iterator, ordered, string_types, with_metaclass, zip_longest, range, PY3, Mapping) from .singleton import S from inspect import getmro def as_Basic(expr): """Return expr as a Basic instance using strict sympify or raise a TypeError; this is just a wrapper to _sympify, raising a TypeError instead of a SympifyError.""" from sympy.utilities.misc import func_name try: return _sympify(expr) except SympifyError: raise TypeError( 'Argument must be a Basic object, not `%s`' % func_name( expr)) class Basic(with_metaclass(ManagedProperties)): """ Base class for all objects in SymPy. Conventions: 1) Always use ``.args``, when accessing parameters of some instance: >>> from sympy import cot >>> from sympy.abc import x, y >>> cot(x).args (x,) >>> cot(x).args[0] x >>> (x*y).args (x, y) >>> (x*y).args[1] y 2) Never use internal methods or variables (the ones prefixed with ``_``): >>> cot(x)._args # do not use this, use cot(x).args instead (x,) """ __slots__ = ['_mhash', # hash value '_args', # arguments '_assumptions' ] # To be overridden with True in the appropriate subclasses is_number = False is_Atom = False is_Symbol = False is_symbol = False is_Indexed = False is_Dummy = False is_Wild = False is_Function = False is_Add = False is_Mul = False is_Pow = False is_Number = False is_Float = False is_Rational = False is_Integer = False is_NumberSymbol = False is_Order = False is_Derivative = False is_Piecewise = False is_Poly = False is_AlgebraicNumber = False is_Relational = False is_Equality = False is_Boolean = False is_Not = False is_Matrix = False is_Vector = False is_Point = False is_MatAdd = False is_MatMul = False def __new__(cls, *args): obj = object.__new__(cls) obj._assumptions = cls.default_assumptions obj._mhash = None # will be set by __hash__ method. obj._args = args # all items in args must be Basic objects return obj def copy(self): return self.func(*self.args) def __reduce_ex__(self, proto): """ Pickling support.""" return type(self), self.__getnewargs__(), self.__getstate__() def __getnewargs__(self): return self.args def __getstate__(self): return {} def __setstate__(self, state): for k, v in state.items(): setattr(self, k, v) def __hash__(self): # hash cannot be cached using cache_it because infinite recurrence # occurs as hash is needed for setting cache dictionary keys h = self._mhash if h is None: h = hash((type(self).__name__,) + self._hashable_content()) self._mhash = h return h def _hashable_content(self): """Return a tuple of information about self that can be used to compute the hash. If a class defines additional attributes, like ``name`` in Symbol, then this method should be updated accordingly to return such relevant attributes. Defining more than _hashable_content is necessary if __eq__ has been defined by a class. See note about this in Basic.__eq__.""" return self._args @property def assumptions0(self): """ Return object `type` assumptions. For example: Symbol('x', real=True) Symbol('x', integer=True) are different objects. In other words, besides Python type (Symbol in this case), the initial assumptions are also forming their typeinfo. Examples ======== >>> from sympy import Symbol >>> from sympy.abc import x >>> x.assumptions0 {'commutative': True} >>> x = Symbol("x", positive=True) >>> x.assumptions0 {'commutative': True, 'complex': True, 'extended_negative': False, 'extended_nonnegative': True, 'extended_nonpositive': False, 'extended_nonzero': True, 'extended_positive': True, 'extended_real': True, 'finite': True, 'hermitian': True, 'imaginary': False, 'infinite': False, 'negative': False, 'nonnegative': True, 'nonpositive': False, 'nonzero': True, 'positive': True, 'real': True, 'zero': False} """ return {} def compare(self, other): """ Return -1, 0, 1 if the object is smaller, equal, or greater than other. Not in the mathematical sense. If the object is of a different type from the "other" then their classes are ordered according to the sorted_classes list. Examples ======== >>> from sympy.abc import x, y >>> x.compare(y) -1 >>> x.compare(x) 0 >>> y.compare(x) 1 """ # all redefinitions of __cmp__ method should start with the # following lines: if self is other: return 0 n1 = self.__class__ n2 = other.__class__ c = (n1 > n2) - (n1 < n2) if c: return c # st = self._hashable_content() ot = other._hashable_content() c = (len(st) > len(ot)) - (len(st) < len(ot)) if c: return c for l, r in zip(st, ot): l = Basic(*l) if isinstance(l, frozenset) else l r = Basic(*r) if isinstance(r, frozenset) else r if isinstance(l, Basic): c = l.compare(r) else: c = (l > r) - (l < r) if c: return c return 0 @staticmethod def _compare_pretty(a, b): from sympy.series.order import Order if isinstance(a, Order) and not isinstance(b, Order): return 1 if not isinstance(a, Order) and isinstance(b, Order): return -1 if a.is_Rational and b.is_Rational: l = a.p * b.q r = b.p * a.q return (l > r) - (l < r) else: from sympy.core.symbol import Wild p1, p2, p3 = Wild("p1"), Wild("p2"), Wild("p3") r_a = a.match(p1 * p2**p3) if r_a and p3 in r_a: a3 = r_a[p3] r_b = b.match(p1 * p2**p3) if r_b and p3 in r_b: b3 = r_b[p3] c = Basic.compare(a3, b3) if c != 0: return c return Basic.compare(a, b) @classmethod def fromiter(cls, args, **assumptions): """ Create a new object from an iterable. This is a convenience function that allows one to create objects from any iterable, without having to convert to a list or tuple first. Examples ======== >>> from sympy import Tuple >>> Tuple.fromiter(i for i in range(5)) (0, 1, 2, 3, 4) """ return cls(*tuple(args), **assumptions) @classmethod def class_key(cls): """Nice order of classes. """ return 5, 0, cls.__name__ @cacheit def sort_key(self, order=None): """ Return a sort key. Examples ======== >>> from sympy.core import S, I >>> sorted([S(1)/2, I, -I], key=lambda x: x.sort_key()) [1/2, -I, I] >>> S("[x, 1/x, 1/x**2, x**2, x**(1/2), x**(1/4), x**(3/2)]") [x, 1/x, x**(-2), x**2, sqrt(x), x**(1/4), x**(3/2)] >>> sorted(_, key=lambda x: x.sort_key()) [x**(-2), 1/x, x**(1/4), sqrt(x), x, x**(3/2), x**2] """ # XXX: remove this when issue 5169 is fixed def inner_key(arg): if isinstance(arg, Basic): return arg.sort_key(order) else: return arg args = self._sorted_args args = len(args), tuple([inner_key(arg) for arg in args]) return self.class_key(), args, S.One.sort_key(), S.One def __eq__(self, other): """Return a boolean indicating whether a == b on the basis of their symbolic trees. This is the same as a.compare(b) == 0 but faster. Notes ===== If a class that overrides __eq__() needs to retain the implementation of __hash__() from a parent class, the interpreter must be told this explicitly by setting __hash__ = <ParentClass>.__hash__. Otherwise the inheritance of __hash__() will be blocked, just as if __hash__ had been explicitly set to None. References ========== from http://docs.python.org/dev/reference/datamodel.html#object.__hash__ """ if self is other: return True tself = type(self) tother = type(other) if tself is not tother: try: other = _sympify(other) tother = type(other) except SympifyError: return NotImplemented # As long as we have the ordering of classes (sympy.core), # comparing types will be slow in Python 2, because it uses # __cmp__. Until we can remove it # (https://github.com/sympy/sympy/issues/4269), we only compare # types in Python 2 directly if they actually have __ne__. if PY3 or type(tself).__ne__ is not type.__ne__: if tself != tother: return False elif tself is not tother: return False return self._hashable_content() == other._hashable_content() def __ne__(self, other): """``a != b`` -> Compare two symbolic trees and see whether they are different this is the same as: ``a.compare(b) != 0`` but faster """ return not self == other def dummy_eq(self, other, symbol=None): """ Compare two expressions and handle dummy symbols. Examples ======== >>> from sympy import Dummy >>> from sympy.abc import x, y >>> u = Dummy('u') >>> (u**2 + 1).dummy_eq(x**2 + 1) True >>> (u**2 + 1) == (x**2 + 1) False >>> (u**2 + y).dummy_eq(x**2 + y, x) True >>> (u**2 + y).dummy_eq(x**2 + y, y) False """ s = self.as_dummy() o = _sympify(other) o = o.as_dummy() dummy_symbols = [i for i in s.free_symbols if i.is_Dummy] if len(dummy_symbols) == 1: dummy = dummy_symbols.pop() else: return s == o if symbol is None: symbols = o.free_symbols if len(symbols) == 1: symbol = symbols.pop() else: return s == o tmp = dummy.__class__() return s.subs(dummy, tmp) == o.subs(symbol, tmp) # Note, we always use the default ordering (lex) in __str__ and __repr__, # regardless of the global setting. See issue 5487. def __repr__(self): """Method to return the string representation. Return the expression as a string. """ from sympy.printing import sstr return sstr(self, order=None) def __str__(self): from sympy.printing import sstr return sstr(self, order=None) # We don't define _repr_png_ here because it would add a large amount of # data to any notebook containing SymPy expressions, without adding # anything useful to the notebook. It can still enabled manually, e.g., # for the qtconsole, with init_printing(). def _repr_latex_(self): """ IPython/Jupyter LaTeX printing To change the behavior of this (e.g., pass in some settings to LaTeX), use init_printing(). init_printing() will also enable LaTeX printing for built in numeric types like ints and container types that contain SymPy objects, like lists and dictionaries of expressions. """ from sympy.printing.latex import latex s = latex(self, mode='plain') return "$\\displaystyle %s$" % s _repr_latex_orig = _repr_latex_ def atoms(self, *types): """Returns the atoms that form the current object. By default, only objects that are truly atomic and can't be divided into smaller pieces are returned: symbols, numbers, and number symbols like I and pi. It is possible to request atoms of any type, however, as demonstrated below. Examples ======== >>> from sympy import I, pi, sin >>> from sympy.abc import x, y >>> (1 + x + 2*sin(y + I*pi)).atoms() {1, 2, I, pi, x, y} If one or more types are given, the results will contain only those types of atoms. >>> from sympy import Number, NumberSymbol, Symbol >>> (1 + x + 2*sin(y + I*pi)).atoms(Symbol) {x, y} >>> (1 + x + 2*sin(y + I*pi)).atoms(Number) {1, 2} >>> (1 + x + 2*sin(y + I*pi)).atoms(Number, NumberSymbol) {1, 2, pi} >>> (1 + x + 2*sin(y + I*pi)).atoms(Number, NumberSymbol, I) {1, 2, I, pi} Note that I (imaginary unit) and zoo (complex infinity) are special types of number symbols and are not part of the NumberSymbol class. The type can be given implicitly, too: >>> (1 + x + 2*sin(y + I*pi)).atoms(x) # x is a Symbol {x, y} Be careful to check your assumptions when using the implicit option since ``S(1).is_Integer = True`` but ``type(S(1))`` is ``One``, a special type of sympy atom, while ``type(S(2))`` is type ``Integer`` and will find all integers in an expression: >>> from sympy import S >>> (1 + x + 2*sin(y + I*pi)).atoms(S(1)) {1} >>> (1 + x + 2*sin(y + I*pi)).atoms(S(2)) {1, 2} Finally, arguments to atoms() can select more than atomic atoms: any sympy type (loaded in core/__init__.py) can be listed as an argument and those types of "atoms" as found in scanning the arguments of the expression recursively: >>> from sympy import Function, Mul >>> from sympy.core.function import AppliedUndef >>> f = Function('f') >>> (1 + f(x) + 2*sin(y + I*pi)).atoms(Function) {f(x), sin(y + I*pi)} >>> (1 + f(x) + 2*sin(y + I*pi)).atoms(AppliedUndef) {f(x)} >>> (1 + x + 2*sin(y + I*pi)).atoms(Mul) {I*pi, 2*sin(y + I*pi)} """ if types: types = tuple( [t if isinstance(t, type) else type(t) for t in types]) else: types = (Atom,) result = set() for expr in preorder_traversal(self): if isinstance(expr, types): result.add(expr) return result @property def free_symbols(self): """Return from the atoms of self those which are free symbols. For most expressions, all symbols are free symbols. For some classes this is not true. e.g. Integrals use Symbols for the dummy variables which are bound variables, so Integral has a method to return all symbols except those. Derivative keeps track of symbols with respect to which it will perform a derivative; those are bound variables, too, so it has its own free_symbols method. Any other method that uses bound variables should implement a free_symbols method.""" return set().union(*[a.free_symbols for a in self.args]) @property def expr_free_symbols(self): return set([]) def as_dummy(self): """Return the expression with any objects having structurally bound symbols replaced with unique, canonical symbols within the object in which they appear and having only the default assumption for commutativity being True. Examples ======== >>> from sympy import Integral, Symbol >>> from sympy.abc import x, y >>> r = Symbol('r', real=True) >>> Integral(r, (r, x)).as_dummy() Integral(_0, (_0, x)) >>> _.variables[0].is_real is None True Notes ===== Any object that has structural dummy variables should have a property, `bound_symbols` that returns a list of structural dummy symbols of the object itself. Lambda and Subs have bound symbols, but because of how they are cached, they already compare the same regardless of their bound symbols: >>> from sympy import Lambda >>> Lambda(x, x + 1) == Lambda(y, y + 1) True """ def can(x): d = {i: i.as_dummy() for i in x.bound_symbols} # mask free that shadow bound x = x.subs(d) c = x.canonical_variables # replace bound x = x.xreplace(c) # undo masking x = x.xreplace(dict((v, k) for k, v in d.items())) return x return self.replace( lambda x: hasattr(x, 'bound_symbols'), lambda x: can(x)) @property def canonical_variables(self): """Return a dictionary mapping any variable defined in ``self.bound_symbols`` to Symbols that do not clash with any existing symbol in the expression. Examples ======== >>> from sympy import Lambda >>> from sympy.abc import x >>> Lambda(x, 2*x).canonical_variables {x: _0} """ from sympy.core.symbol import Symbol from sympy.utilities.iterables import numbered_symbols if not hasattr(self, 'bound_symbols'): return {} dums = numbered_symbols('_') reps = {} v = self.bound_symbols # this free will include bound symbols that are not part of # self's bound symbols free = set([i.name for i in self.atoms(Symbol) - set(v)]) for v in v: d = next(dums) if v.is_Symbol: while v.name == d.name or d.name in free: d = next(dums) reps[v] = d return reps def rcall(self, *args): """Apply on the argument recursively through the expression tree. This method is used to simulate a common abuse of notation for operators. For instance in SymPy the the following will not work: ``(x+Lambda(y, 2*y))(z) == x+2*z``, however you can use >>> from sympy import Lambda >>> from sympy.abc import x, y, z >>> (x + Lambda(y, 2*y)).rcall(z) x + 2*z """ return Basic._recursive_call(self, args) @staticmethod def _recursive_call(expr_to_call, on_args): """Helper for rcall method.""" from sympy import Symbol def the_call_method_is_overridden(expr): for cls in getmro(type(expr)): if '__call__' in cls.__dict__: return cls != Basic if callable(expr_to_call) and the_call_method_is_overridden(expr_to_call): if isinstance(expr_to_call, Symbol): # XXX When you call a Symbol it is return expr_to_call # transformed into an UndefFunction else: return expr_to_call(*on_args) elif expr_to_call.args: args = [Basic._recursive_call( sub, on_args) for sub in expr_to_call.args] return type(expr_to_call)(*args) else: return expr_to_call def is_hypergeometric(self, k): from sympy.simplify import hypersimp return hypersimp(self, k) is not None @property def is_comparable(self): """Return True if self can be computed to a real number (or already is a real number) with precision, else False. Examples ======== >>> from sympy import exp_polar, pi, I >>> (I*exp_polar(I*pi/2)).is_comparable True >>> (I*exp_polar(I*pi*2)).is_comparable False A False result does not mean that `self` cannot be rewritten into a form that would be comparable. For example, the difference computed below is zero but without simplification it does not evaluate to a zero with precision: >>> e = 2**pi*(1 + 2**pi) >>> dif = e - e.expand() >>> dif.is_comparable False >>> dif.n(2)._prec 1 """ is_extended_real = self.is_extended_real if is_extended_real is False: return False if not self.is_number: return False # don't re-eval numbers that are already evaluated since # this will create spurious precision n, i = [p.evalf(2) if not p.is_Number else p for p in self.as_real_imag()] if not (i.is_Number and n.is_Number): return False if i: # if _prec = 1 we can't decide and if not, # the answer is False because numbers with # imaginary parts can't be compared # so return False return False else: return n._prec != 1 @property def func(self): """ The top-level function in an expression. The following should hold for all objects:: >> x == x.func(*x.args) Examples ======== >>> from sympy.abc import x >>> a = 2*x >>> a.func <class 'sympy.core.mul.Mul'> >>> a.args (2, x) >>> a.func(*a.args) 2*x >>> a == a.func(*a.args) True """ return self.__class__ @property def args(self): """Returns a tuple of arguments of 'self'. Examples ======== >>> from sympy import cot >>> from sympy.abc import x, y >>> cot(x).args (x,) >>> cot(x).args[0] x >>> (x*y).args (x, y) >>> (x*y).args[1] y Notes ===== Never use self._args, always use self.args. Only use _args in __new__ when creating a new function. Don't override .args() from Basic (so that it's easy to change the interface in the future if needed). """ return self._args @property def _sorted_args(self): """ The same as ``args``. Derived classes which don't fix an order on their arguments should override this method to produce the sorted representation. """ return self.args def as_poly(self, *gens, **args): """Converts ``self`` to a polynomial or returns ``None``. >>> from sympy import sin >>> from sympy.abc import x, y >>> print((x**2 + x*y).as_poly()) Poly(x**2 + x*y, x, y, domain='ZZ') >>> print((x**2 + x*y).as_poly(x, y)) Poly(x**2 + x*y, x, y, domain='ZZ') >>> print((x**2 + sin(y)).as_poly(x, y)) None """ from sympy.polys import Poly, PolynomialError try: poly = Poly(self, *gens, **args) if not poly.is_Poly: return None else: return poly except PolynomialError: return None def as_content_primitive(self, radical=False, clear=True): """A stub to allow Basic args (like Tuple) to be skipped when computing the content and primitive components of an expression. See Also ======== sympy.core.expr.Expr.as_content_primitive """ return S.One, self def subs(self, *args, **kwargs): """ Substitutes old for new in an expression after sympifying args. `args` is either: - two arguments, e.g. foo.subs(old, new) - one iterable argument, e.g. foo.subs(iterable). The iterable may be o an iterable container with (old, new) pairs. In this case the replacements are processed in the order given with successive patterns possibly affecting replacements already made. o a dict or set whose key/value items correspond to old/new pairs. In this case the old/new pairs will be sorted by op count and in case of a tie, by number of args and the default_sort_key. The resulting sorted list is then processed as an iterable container (see previous). If the keyword ``simultaneous`` is True, the subexpressions will not be evaluated until all the substitutions have been made. Examples ======== >>> from sympy import pi, exp, limit, oo >>> from sympy.abc import x, y >>> (1 + x*y).subs(x, pi) pi*y + 1 >>> (1 + x*y).subs({x:pi, y:2}) 1 + 2*pi >>> (1 + x*y).subs([(x, pi), (y, 2)]) 1 + 2*pi >>> reps = [(y, x**2), (x, 2)] >>> (x + y).subs(reps) 6 >>> (x + y).subs(reversed(reps)) x**2 + 2 >>> (x**2 + x**4).subs(x**2, y) y**2 + y To replace only the x**2 but not the x**4, use xreplace: >>> (x**2 + x**4).xreplace({x**2: y}) x**4 + y To delay evaluation until all substitutions have been made, set the keyword ``simultaneous`` to True: >>> (x/y).subs([(x, 0), (y, 0)]) 0 >>> (x/y).subs([(x, 0), (y, 0)], simultaneous=True) nan This has the added feature of not allowing subsequent substitutions to affect those already made: >>> ((x + y)/y).subs({x + y: y, y: x + y}) 1 >>> ((x + y)/y).subs({x + y: y, y: x + y}, simultaneous=True) y/(x + y) In order to obtain a canonical result, unordered iterables are sorted by count_op length, number of arguments and by the default_sort_key to break any ties. All other iterables are left unsorted. >>> from sympy import sqrt, sin, cos >>> from sympy.abc import a, b, c, d, e >>> A = (sqrt(sin(2*x)), a) >>> B = (sin(2*x), b) >>> C = (cos(2*x), c) >>> D = (x, d) >>> E = (exp(x), e) >>> expr = sqrt(sin(2*x))*sin(exp(x)*x)*cos(2*x) + sin(2*x) >>> expr.subs(dict([A, B, C, D, E])) a*c*sin(d*e) + b The resulting expression represents a literal replacement of the old arguments with the new arguments. This may not reflect the limiting behavior of the expression: >>> (x**3 - 3*x).subs({x: oo}) nan >>> limit(x**3 - 3*x, x, oo) oo If the substitution will be followed by numerical evaluation, it is better to pass the substitution to evalf as >>> (1/x).evalf(subs={x: 3.0}, n=21) 0.333333333333333333333 rather than >>> (1/x).subs({x: 3.0}).evalf(21) 0.333333333333333314830 as the former will ensure that the desired level of precision is obtained. See Also ======== replace: replacement capable of doing wildcard-like matching, parsing of match, and conditional replacements xreplace: exact node replacement in expr tree; also capable of using matching rules evalf: calculates the given formula to a desired level of precision """ from sympy.core.containers import Dict from sympy.utilities import default_sort_key from sympy import Dummy, Symbol unordered = False if len(args) == 1: sequence = args[0] if isinstance(sequence, set): unordered = True elif isinstance(sequence, (Dict, Mapping)): unordered = True sequence = sequence.items() elif not iterable(sequence): from sympy.utilities.misc import filldedent raise ValueError(filldedent(""" When a single argument is passed to subs it should be a dictionary of old: new pairs or an iterable of (old, new) tuples.""")) elif len(args) == 2: sequence = [args] else: raise ValueError("subs accepts either 1 or 2 arguments") sequence = list(sequence) for i, s in enumerate(sequence): if isinstance(s[0], string_types): # when old is a string we prefer Symbol s = Symbol(s[0]), s[1] try: s = [sympify(_, strict=not isinstance(_, string_types)) for _ in s] except SympifyError: # if it can't be sympified, skip it sequence[i] = None continue # skip if there is no change sequence[i] = None if _aresame(*s) else tuple(s) sequence = list(filter(None, sequence)) if unordered: sequence = dict(sequence) if not all(k.is_Atom for k in sequence): d = {} for o, n in sequence.items(): try: ops = o.count_ops(), len(o.args) except TypeError: ops = (0, 0) d.setdefault(ops, []).append((o, n)) newseq = [] for k in sorted(d.keys(), reverse=True): newseq.extend( sorted([v[0] for v in d[k]], key=default_sort_key)) sequence = [(k, sequence[k]) for k in newseq] del newseq, d else: sequence = sorted([(k, v) for (k, v) in sequence.items()], key=default_sort_key) if kwargs.pop('simultaneous', False): # XXX should this be the default for dict subs? reps = {} rv = self kwargs['hack2'] = True m = Dummy() for old, new in sequence: d = Dummy(commutative=new.is_commutative) # using d*m so Subs will be used on dummy variables # in things like Derivative(f(x, y), x) in which x # is both free and bound rv = rv._subs(old, d*m, **kwargs) if not isinstance(rv, Basic): break reps[d] = new reps[m] = S.One # get rid of m return rv.xreplace(reps) else: rv = self for old, new in sequence: rv = rv._subs(old, new, **kwargs) if not isinstance(rv, Basic): break return rv @cacheit def _subs(self, old, new, **hints): """Substitutes an expression old -> new. If self is not equal to old then _eval_subs is called. If _eval_subs doesn't want to make any special replacement then a None is received which indicates that the fallback should be applied wherein a search for replacements is made amongst the arguments of self. >>> from sympy import Add >>> from sympy.abc import x, y, z Examples ======== Add's _eval_subs knows how to target x + y in the following so it makes the change: >>> (x + y + z).subs(x + y, 1) z + 1 Add's _eval_subs doesn't need to know how to find x + y in the following: >>> Add._eval_subs(z*(x + y) + 3, x + y, 1) is None True The returned None will cause the fallback routine to traverse the args and pass the z*(x + y) arg to Mul where the change will take place and the substitution will succeed: >>> (z*(x + y) + 3).subs(x + y, 1) z + 3 ** Developers Notes ** An _eval_subs routine for a class should be written if: 1) any arguments are not instances of Basic (e.g. bool, tuple); 2) some arguments should not be targeted (as in integration variables); 3) if there is something other than a literal replacement that should be attempted (as in Piecewise where the condition may be updated without doing a replacement). If it is overridden, here are some special cases that might arise: 1) If it turns out that no special change was made and all the original sub-arguments should be checked for replacements then None should be returned. 2) If it is necessary to do substitutions on a portion of the expression then _subs should be called. _subs will handle the case of any sub-expression being equal to old (which usually would not be the case) while its fallback will handle the recursion into the sub-arguments. For example, after Add's _eval_subs removes some matching terms it must process the remaining terms so it calls _subs on each of the un-matched terms and then adds them onto the terms previously obtained. 3) If the initial expression should remain unchanged then the original expression should be returned. (Whenever an expression is returned, modified or not, no further substitution of old -> new is attempted.) Sum's _eval_subs routine uses this strategy when a substitution is attempted on any of its summation variables. """ def fallback(self, old, new): """ Try to replace old with new in any of self's arguments. """ hit = False args = list(self.args) for i, arg in enumerate(args): if not hasattr(arg, '_eval_subs'): continue arg = arg._subs(old, new, **hints) if not _aresame(arg, args[i]): hit = True args[i] = arg if hit: rv = self.func(*args) hack2 = hints.get('hack2', False) if hack2 and self.is_Mul and not rv.is_Mul: # 2-arg hack coeff = S.One nonnumber = [] for i in args: if i.is_Number: coeff *= i else: nonnumber.append(i) nonnumber = self.func(*nonnumber) if coeff is S.One: return nonnumber else: return self.func(coeff, nonnumber, evaluate=False) return rv return self if _aresame(self, old): return new rv = self._eval_subs(old, new) if rv is None: rv = fallback(self, old, new) return rv def _eval_subs(self, old, new): """Override this stub if you want to do anything more than attempt a replacement of old with new in the arguments of self. See also ======== _subs """ return None def xreplace(self, rule): """ Replace occurrences of objects within the expression. Parameters ========== rule : dict-like Expresses a replacement rule Returns ======= xreplace : the result of the replacement Examples ======== >>> from sympy import symbols, pi, exp >>> x, y, z = symbols('x y z') >>> (1 + x*y).xreplace({x: pi}) pi*y + 1 >>> (1 + x*y).xreplace({x: pi, y: 2}) 1 + 2*pi Replacements occur only if an entire node in the expression tree is matched: >>> (x*y + z).xreplace({x*y: pi}) z + pi >>> (x*y*z).xreplace({x*y: pi}) x*y*z >>> (2*x).xreplace({2*x: y, x: z}) y >>> (2*2*x).xreplace({2*x: y, x: z}) 4*z >>> (x + y + 2).xreplace({x + y: 2}) x + y + 2 >>> (x + 2 + exp(x + 2)).xreplace({x + 2: y}) x + exp(y) + 2 xreplace doesn't differentiate between free and bound symbols. In the following, subs(x, y) would not change x since it is a bound symbol, but xreplace does: >>> from sympy import Integral >>> Integral(x, (x, 1, 2*x)).xreplace({x: y}) Integral(y, (y, 1, 2*y)) Trying to replace x with an expression raises an error: >>> Integral(x, (x, 1, 2*x)).xreplace({x: 2*y}) # doctest: +SKIP ValueError: Invalid limits given: ((2*y, 1, 4*y),) See Also ======== replace: replacement capable of doing wildcard-like matching, parsing of match, and conditional replacements subs: substitution of subexpressions as defined by the objects themselves. """ value, _ = self._xreplace(rule) return value def _xreplace(self, rule): """ Helper for xreplace. Tracks whether a replacement actually occurred. """ if self in rule: return rule[self], True elif rule: args = [] changed = False for a in self.args: _xreplace = getattr(a, '_xreplace', None) if _xreplace is not None: a_xr = _xreplace(rule) args.append(a_xr[0]) changed |= a_xr[1] else: args.append(a) args = tuple(args) if changed: return self.func(*args), True return self, False @cacheit def has(self, *patterns): """ Test whether any subexpression matches any of the patterns. Examples ======== >>> from sympy import sin >>> from sympy.abc import x, y, z >>> (x**2 + sin(x*y)).has(z) False >>> (x**2 + sin(x*y)).has(x, y, z) True >>> x.has(x) True Note ``has`` is a structural algorithm with no knowledge of mathematics. Consider the following half-open interval: >>> from sympy.sets import Interval >>> i = Interval.Lopen(0, 5); i Interval.Lopen(0, 5) >>> i.args (0, 5, True, False) >>> i.has(4) # there is no "4" in the arguments False >>> i.has(0) # there *is* a "0" in the arguments True Instead, use ``contains`` to determine whether a number is in the interval or not: >>> i.contains(4) True >>> i.contains(0) False Note that ``expr.has(*patterns)`` is exactly equivalent to ``any(expr.has(p) for p in patterns)``. In particular, ``False`` is returned when the list of patterns is empty. >>> x.has() False """ return any(self._has(pattern) for pattern in patterns) def _has(self, pattern): """Helper for .has()""" from sympy.core.function import UndefinedFunction, Function if isinstance(pattern, UndefinedFunction): return any(f.func == pattern or f == pattern for f in self.atoms(Function, UndefinedFunction)) pattern = sympify(pattern) if isinstance(pattern, BasicMeta): return any(isinstance(arg, pattern) for arg in preorder_traversal(self)) _has_matcher = getattr(pattern, '_has_matcher', None) if _has_matcher is not None: match = _has_matcher() return any(match(arg) for arg in preorder_traversal(self)) else: return any(arg == pattern for arg in preorder_traversal(self)) def _has_matcher(self): """Helper for .has()""" return lambda other: self == other def replace(self, query, value, map=False, simultaneous=True, exact=None): """ Replace matching subexpressions of ``self`` with ``value``. If ``map = True`` then also return the mapping {old: new} where ``old`` was a sub-expression found with query and ``new`` is the replacement value for it. If the expression itself doesn't match the query, then the returned value will be ``self.xreplace(map)`` otherwise it should be ``self.subs(ordered(map.items()))``. Traverses an expression tree and performs replacement of matching subexpressions from the bottom to the top of the tree. The default approach is to do the replacement in a simultaneous fashion so changes made are targeted only once. If this is not desired or causes problems, ``simultaneous`` can be set to False. In addition, if an expression containing more than one Wild symbol is being used to match subexpressions and the ``exact`` flag is None it will be set to True so the match will only succeed if all non-zero values are received for each Wild that appears in the match pattern. Setting this to False accepts a match of 0; while setting it True accepts all matches that have a 0 in them. See example below for cautions. The list of possible combinations of queries and replacement values is listed below: Examples ======== Initial setup >>> from sympy import log, sin, cos, tan, Wild, Mul, Add >>> from sympy.abc import x, y >>> f = log(sin(x)) + tan(sin(x**2)) 1.1. type -> type obj.replace(type, newtype) When object of type ``type`` is found, replace it with the result of passing its argument(s) to ``newtype``. >>> f.replace(sin, cos) log(cos(x)) + tan(cos(x**2)) >>> sin(x).replace(sin, cos, map=True) (cos(x), {sin(x): cos(x)}) >>> (x*y).replace(Mul, Add) x + y 1.2. type -> func obj.replace(type, func) When object of type ``type`` is found, apply ``func`` to its argument(s). ``func`` must be written to handle the number of arguments of ``type``. >>> f.replace(sin, lambda arg: sin(2*arg)) log(sin(2*x)) + tan(sin(2*x**2)) >>> (x*y).replace(Mul, lambda *args: sin(2*Mul(*args))) sin(2*x*y) 2.1. pattern -> expr obj.replace(pattern(wild), expr(wild)) Replace subexpressions matching ``pattern`` with the expression written in terms of the Wild symbols in ``pattern``. >>> a, b = map(Wild, 'ab') >>> f.replace(sin(a), tan(a)) log(tan(x)) + tan(tan(x**2)) >>> f.replace(sin(a), tan(a/2)) log(tan(x/2)) + tan(tan(x**2/2)) >>> f.replace(sin(a), a) log(x) + tan(x**2) >>> (x*y).replace(a*x, a) y Matching is exact by default when more than one Wild symbol is used: matching fails unless the match gives non-zero values for all Wild symbols: >>> (2*x + y).replace(a*x + b, b - a) y - 2 >>> (2*x).replace(a*x + b, b - a) 2*x When set to False, the results may be non-intuitive: >>> (2*x).replace(a*x + b, b - a, exact=False) 2/x 2.2. pattern -> func obj.replace(pattern(wild), lambda wild: expr(wild)) All behavior is the same as in 2.1 but now a function in terms of pattern variables is used rather than an expression: >>> f.replace(sin(a), lambda a: sin(2*a)) log(sin(2*x)) + tan(sin(2*x**2)) 3.1. func -> func obj.replace(filter, func) Replace subexpression ``e`` with ``func(e)`` if ``filter(e)`` is True. >>> g = 2*sin(x**3) >>> g.replace(lambda expr: expr.is_Number, lambda expr: expr**2) 4*sin(x**9) The expression itself is also targeted by the query but is done in such a fashion that changes are not made twice. >>> e = x*(x*y + 1) >>> e.replace(lambda x: x.is_Mul, lambda x: 2*x) 2*x*(2*x*y + 1) When matching a single symbol, `exact` will default to True, but this may or may not be the behavior that is desired: Here, we want `exact=False`: >>> from sympy import Function >>> f = Function('f') >>> e = f(1) + f(0) >>> q = f(a), lambda a: f(a + 1) >>> e.replace(*q, exact=False) f(1) + f(2) >>> e.replace(*q, exact=True) f(0) + f(2) But here, the nature of matching makes selecting the right setting tricky: >>> e = x**(1 + y) >>> (x**(1 + y)).replace(x**(1 + a), lambda a: x**-a, exact=False) 1 >>> (x**(1 + y)).replace(x**(1 + a), lambda a: x**-a, exact=True) x**(-x - y + 1) >>> (x**y).replace(x**(1 + a), lambda a: x**-a, exact=False) 1 >>> (x**y).replace(x**(1 + a), lambda a: x**-a, exact=True) x**(1 - y) It is probably better to use a different form of the query that describes the target expression more precisely: >>> (1 + x**(1 + y)).replace( ... lambda x: x.is_Pow and x.exp.is_Add and x.exp.args[0] == 1, ... lambda x: x.base**(1 - (x.exp - 1))) ... x**(1 - y) + 1 See Also ======== subs: substitution of subexpressions as defined by the objects themselves. xreplace: exact node replacement in expr tree; also capable of using matching rules """ from sympy.core.symbol import Dummy, Wild from sympy.simplify.simplify import bottom_up try: query = _sympify(query) except SympifyError: pass try: value = _sympify(value) except SympifyError: pass if isinstance(query, type): _query = lambda expr: isinstance(expr, query) if isinstance(value, type): _value = lambda expr, result: value(*expr.args) elif callable(value): _value = lambda expr, result: value(*expr.args) else: raise TypeError( "given a type, replace() expects another " "type or a callable") elif isinstance(query, Basic): _query = lambda expr: expr.match(query) if exact is None: exact = (len(query.atoms(Wild)) > 1) if isinstance(value, Basic): if exact: _value = lambda expr, result: (value.subs(result) if all(result.values()) else expr) else: _value = lambda expr, result: value.subs(result) elif callable(value): # match dictionary keys get the trailing underscore stripped # from them and are then passed as keywords to the callable; # if ``exact`` is True, only accept match if there are no null # values amongst those matched. if exact: _value = lambda expr, result: (value(** {str(k)[:-1]: v for k, v in result.items()}) if all(val for val in result.values()) else expr) else: _value = lambda expr, result: value(** {str(k)[:-1]: v for k, v in result.items()}) else: raise TypeError( "given an expression, replace() expects " "another expression or a callable") elif callable(query): _query = query if callable(value): _value = lambda expr, result: value(expr) else: raise TypeError( "given a callable, replace() expects " "another callable") else: raise TypeError( "first argument to replace() must be a " "type, an expression or a callable") mapping = {} # changes that took place mask = [] # the dummies that were used as change placeholders def rec_replace(expr): result = _query(expr) if result or result == {}: new = _value(expr, result) if new is not None and new != expr: mapping[expr] = new if simultaneous: # don't let this expression be changed during rebuilding com = getattr(new, 'is_commutative', True) if com is None: com = True d = Dummy(commutative=com) mask.append((d, new)) expr = d else: expr = new return expr rv = bottom_up(self, rec_replace, atoms=True) # restore original expressions for Dummy symbols if simultaneous: mask = list(reversed(mask)) for o, n in mask: r = {o: n} rv = rv.xreplace(r) if not map: return rv else: if simultaneous: # restore subexpressions in mapping for o, n in mask: r = {o: n} mapping = {k.xreplace(r): v.xreplace(r) for k, v in mapping.items()} return rv, mapping def find(self, query, group=False): """Find all subexpressions matching a query. """ query = _make_find_query(query) results = list(filter(query, preorder_traversal(self))) if not group: return set(results) else: groups = {} for result in results: if result in groups: groups[result] += 1 else: groups[result] = 1 return groups def count(self, query): """Count the number of matching subexpressions. """ query = _make_find_query(query) return sum(bool(query(sub)) for sub in preorder_traversal(self)) def matches(self, expr, repl_dict={}, old=False): """ Helper method for match() that looks for a match between Wild symbols in self and expressions in expr. Examples ======== >>> from sympy import symbols, Wild, Basic >>> a, b, c = symbols('a b c') >>> x = Wild('x') >>> Basic(a + x, x).matches(Basic(a + b, c)) is None True >>> Basic(a + x, x).matches(Basic(a + b + c, b + c)) {x_: b + c} """ expr = sympify(expr) if not isinstance(expr, self.__class__): return None if self == expr: return repl_dict if len(self.args) != len(expr.args): return None d = repl_dict.copy() for arg, other_arg in zip(self.args, expr.args): if arg == other_arg: continue d = arg.xreplace(d).matches(other_arg, d, old=old) if d is None: return None return d def match(self, pattern, old=False): """ Pattern matching. Wild symbols match all. Return ``None`` when expression (self) does not match with pattern. Otherwise return a dictionary such that:: pattern.xreplace(self.match(pattern)) == self Examples ======== >>> from sympy import Wild >>> from sympy.abc import x, y >>> p = Wild("p") >>> q = Wild("q") >>> r = Wild("r") >>> e = (x+y)**(x+y) >>> e.match(p**p) {p_: x + y} >>> e.match(p**q) {p_: x + y, q_: x + y} >>> e = (2*x)**2 >>> e.match(p*q**r) {p_: 4, q_: x, r_: 2} >>> (p*q**r).xreplace(e.match(p*q**r)) 4*x**2 The ``old`` flag will give the old-style pattern matching where expressions and patterns are essentially solved to give the match. Both of the following give None unless ``old=True``: >>> (x - 2).match(p - x, old=True) {p_: 2*x - 2} >>> (2/x).match(p*x, old=True) {p_: 2/x**2} """ pattern = sympify(pattern) return pattern.matches(self, old=old) def count_ops(self, visual=None): """wrapper for count_ops that returns the operation count.""" from sympy import count_ops return count_ops(self, visual) def doit(self, **hints): """Evaluate objects that are not evaluated by default like limits, integrals, sums and products. All objects of this kind will be evaluated recursively, unless some species were excluded via 'hints' or unless the 'deep' hint was set to 'False'. >>> from sympy import Integral >>> from sympy.abc import x >>> 2*Integral(x, x) 2*Integral(x, x) >>> (2*Integral(x, x)).doit() x**2 >>> (2*Integral(x, x)).doit(deep=False) 2*Integral(x, x) """ if hints.get('deep', True): terms = [term.doit(**hints) if isinstance(term, Basic) else term for term in self.args] return self.func(*terms) else: return self def _eval_rewrite(self, pattern, rule, **hints): if self.is_Atom: if hasattr(self, rule): return getattr(self, rule)() return self if hints.get('deep', True): args = [a._eval_rewrite(pattern, rule, **hints) if isinstance(a, Basic) else a for a in self.args] else: args = self.args if pattern is None or isinstance(self, pattern): if hasattr(self, rule): rewritten = getattr(self, rule)(*args, **hints) if rewritten is not None: return rewritten return self.func(*args) if hints.get('evaluate', True) else self def _accept_eval_derivative(self, s): # This method needs to be overridden by array-like objects return s._visit_eval_derivative_scalar(self) def _visit_eval_derivative_scalar(self, base): # Base is a scalar # Types are (base: scalar, self: scalar) return base._eval_derivative(self) def _visit_eval_derivative_array(self, base): # Types are (base: array/matrix, self: scalar) # Base is some kind of array/matrix, # it should have `.applyfunc(lambda x: x.diff(self)` implemented: return base._eval_derivative_array(self) def _eval_derivative_n_times(self, s, n): # This is the default evaluator for derivatives (as called by `diff` # and `Derivative`), it will attempt a loop to derive the expression # `n` times by calling the corresponding `_eval_derivative` method, # while leaving the derivative unevaluated if `n` is symbolic. This # method should be overridden if the object has a closed form for its # symbolic n-th derivative. from sympy import Integer if isinstance(n, (int, Integer)): obj = self for i in range(n): obj2 = obj._accept_eval_derivative(s) if obj == obj2 or obj2 is None: break obj = obj2 return obj2 else: return None def rewrite(self, *args, **hints): """ Rewrite functions in terms of other functions. Rewrites expression containing applications of functions of one kind in terms of functions of different kind. For example you can rewrite trigonometric functions as complex exponentials or combinatorial functions as gamma function. As a pattern this function accepts a list of functions to to rewrite (instances of DefinedFunction class). As rule you can use string or a destination function instance (in this case rewrite() will use the str() function). There is also the possibility to pass hints on how to rewrite the given expressions. For now there is only one such hint defined called 'deep'. When 'deep' is set to False it will forbid functions to rewrite their contents. Examples ======== >>> from sympy import sin, exp >>> from sympy.abc import x Unspecified pattern: >>> sin(x).rewrite(exp) -I*(exp(I*x) - exp(-I*x))/2 Pattern as a single function: >>> sin(x).rewrite(sin, exp) -I*(exp(I*x) - exp(-I*x))/2 Pattern as a list of functions: >>> sin(x).rewrite([sin, ], exp) -I*(exp(I*x) - exp(-I*x))/2 """ if not args: return self else: pattern = args[:-1] if isinstance(args[-1], string_types): rule = '_eval_rewrite_as_' + args[-1] else: try: rule = '_eval_rewrite_as_' + args[-1].__name__ except: rule = '_eval_rewrite_as_' + args[-1].__class__.__name__ if not pattern: return self._eval_rewrite(None, rule, **hints) else: if iterable(pattern[0]): pattern = pattern[0] pattern = [p for p in pattern if self.has(p)] if pattern: return self._eval_rewrite(tuple(pattern), rule, **hints) else: return self _constructor_postprocessor_mapping = {} @classmethod def _exec_constructor_postprocessors(cls, obj): # WARNING: This API is experimental. # This is an experimental API that introduces constructor # postprosessors for SymPy Core elements. If an argument of a SymPy # expression has a `_constructor_postprocessor_mapping` attribute, it will # be interpreted as a dictionary containing lists of postprocessing # functions for matching expression node names. clsname = obj.__class__.__name__ postprocessors = defaultdict(list) for i in obj.args: try: postprocessor_mappings = ( Basic._constructor_postprocessor_mapping[cls].items() for cls in type(i).mro() if cls in Basic._constructor_postprocessor_mapping ) for k, v in chain.from_iterable(postprocessor_mappings): postprocessors[k].extend([j for j in v if j not in postprocessors[k]]) except TypeError: pass for f in postprocessors.get(clsname, []): obj = f(obj) return obj class Atom(Basic): """ A parent class for atomic things. An atom is an expression with no subexpressions. Examples ======== Symbol, Number, Rational, Integer, ... But not: Add, Mul, Pow, ... """ is_Atom = True __slots__ = [] def matches(self, expr, repl_dict={}, old=False): if self == expr: return repl_dict def xreplace(self, rule, hack2=False): return rule.get(self, self) def doit(self, **hints): return self @classmethod def class_key(cls): return 2, 0, cls.__name__ @cacheit def sort_key(self, order=None): return self.class_key(), (1, (str(self),)), S.One.sort_key(), S.One def _eval_simplify(self, **kwargs): return self @property def _sorted_args(self): # this is here as a safeguard against accidentally using _sorted_args # on Atoms -- they cannot be rebuilt as atom.func(*atom._sorted_args) # since there are no args. So the calling routine should be checking # to see that this property is not called for Atoms. raise AttributeError('Atoms have no args. It might be necessary' ' to make a check for Atoms in the calling code.') def _aresame(a, b): """Return True if a and b are structurally the same, else False. Examples ======== In SymPy (as in Python) two numbers compare the same if they have the same underlying base-2 representation even though they may not be the same type: >>> from sympy import S >>> 2.0 == S(2) True >>> 0.5 == S.Half True This routine was written to provide a query for such cases that would give false when the types do not match: >>> from sympy.core.basic import _aresame >>> _aresame(S(2.0), S(2)) False """ from .numbers import Number from .function import AppliedUndef, UndefinedFunction as UndefFunc if isinstance(a, Number) and isinstance(b, Number): return a == b and a.__class__ == b.__class__ for i, j in zip_longest(preorder_traversal(a), preorder_traversal(b)): if i != j or type(i) != type(j): if ((isinstance(i, UndefFunc) and isinstance(j, UndefFunc)) or (isinstance(i, AppliedUndef) and isinstance(j, AppliedUndef))): if i.class_key() != j.class_key(): return False else: return False return True def _atomic(e, recursive=False): """Return atom-like quantities as far as substitution is concerned: Derivatives, Functions and Symbols. Don't return any 'atoms' that are inside such quantities unless they also appear outside, too, unless `recursive` is True. Examples ======== >>> from sympy import Derivative, Function, cos >>> from sympy.abc import x, y >>> from sympy.core.basic import _atomic >>> f = Function('f') >>> _atomic(x + y) {x, y} >>> _atomic(x + f(y)) {x, f(y)} >>> _atomic(Derivative(f(x), x) + cos(x) + y) {y, cos(x), Derivative(f(x), x)} """ from sympy import Derivative, Function, Symbol pot = preorder_traversal(e) seen = set() if isinstance(e, Basic): free = getattr(e, "free_symbols", None) if free is None: return {e} else: return set() atoms = set() for p in pot: if p in seen: pot.skip() continue seen.add(p) if isinstance(p, Symbol) and p in free: atoms.add(p) elif isinstance(p, (Derivative, Function)): if not recursive: pot.skip() atoms.add(p) return atoms class preorder_traversal(Iterator): """ Do a pre-order traversal of a tree. This iterator recursively yields nodes that it has visited in a pre-order fashion. That is, it yields the current node then descends through the tree breadth-first to yield all of a node's children's pre-order traversal. For an expression, the order of the traversal depends on the order of .args, which in many cases can be arbitrary. Parameters ========== node : sympy expression The expression to traverse. keys : (default None) sort key(s) The key(s) used to sort args of Basic objects. When None, args of Basic objects are processed in arbitrary order. If key is defined, it will be passed along to ordered() as the only key(s) to use to sort the arguments; if ``key`` is simply True then the default keys of ordered will be used. Yields ====== subtree : sympy expression All of the subtrees in the tree. Examples ======== >>> from sympy import symbols >>> from sympy.core.basic import preorder_traversal >>> x, y, z = symbols('x y z') The nodes are returned in the order that they are encountered unless key is given; simply passing key=True will guarantee that the traversal is unique. >>> list(preorder_traversal((x + y)*z, keys=None)) # doctest: +SKIP [z*(x + y), z, x + y, y, x] >>> list(preorder_traversal((x + y)*z, keys=True)) [z*(x + y), z, x + y, x, y] """ def __init__(self, node, keys=None): self._skip_flag = False self._pt = self._preorder_traversal(node, keys) def _preorder_traversal(self, node, keys): yield node if self._skip_flag: self._skip_flag = False return if isinstance(node, Basic): if not keys and hasattr(node, '_argset'): # LatticeOp keeps args as a set. We should use this if we # don't care about the order, to prevent unnecessary sorting. args = node._argset else: args = node.args if keys: if keys != True: args = ordered(args, keys, default=False) else: args = ordered(args) for arg in args: for subtree in self._preorder_traversal(arg, keys): yield subtree elif iterable(node): for item in node: for subtree in self._preorder_traversal(item, keys): yield subtree def skip(self): """ Skip yielding current node's (last yielded node's) subtrees. Examples ======== >>> from sympy.core import symbols >>> from sympy.core.basic import preorder_traversal >>> x, y, z = symbols('x y z') >>> pt = preorder_traversal((x+y*z)*z) >>> for i in pt: ... print(i) ... if i == x+y*z: ... pt.skip() z*(x + y*z) z x + y*z """ self._skip_flag = True def __next__(self): return next(self._pt) def __iter__(self): return self def _make_find_query(query): """Convert the argument of Basic.find() into a callable""" try: query = sympify(query) except SympifyError: pass if isinstance(query, type): return lambda expr: isinstance(expr, query) elif isinstance(query, Basic): return lambda expr: expr.match(query) is not None return query

16e6b82b3862a102c651bab36b6dfe362a8ffb8acddaa8e4e7a9eb5e1e633c4d

""" There are three types of functions implemented in SymPy: 1) defined functions (in the sense that they can be evaluated) like exp or sin; they have a name and a body: f = exp 2) undefined function which have a name but no body. Undefined functions can be defined using a Function class as follows: f = Function('f') (the result will be a Function instance) 3) anonymous function (or lambda function) which have a body (defined with dummy variables) but have no name: f = Lambda(x, exp(x)*x) f = Lambda((x, y), exp(x)*y) The fourth type of functions are composites, like (sin + cos)(x); these work in SymPy core, but are not yet part of SymPy. Examples ======== >>> import sympy >>> f = sympy.Function("f") >>> from sympy.abc import x >>> f(x) f(x) >>> print(sympy.srepr(f(x).func)) Function('f') >>> f(x).args (x,) """ from __future__ import print_function, division from .add import Add from .assumptions import ManagedProperties, _assume_defined from .basic import Basic, _atomic from .cache import cacheit from .compatibility import iterable, is_sequence, as_int, ordered, Iterable from .decorators import _sympifyit from .expr import Expr, AtomicExpr from .numbers import Rational, Float from .operations import LatticeOp from .rules import Transform from .singleton import S from .sympify import sympify from sympy.core.containers import Tuple, Dict from sympy.core.logic import fuzzy_and from sympy.core.compatibility import string_types, with_metaclass, PY3, range from sympy.utilities import default_sort_key from sympy.utilities.misc import filldedent from sympy.utilities.iterables import has_dups, sift from sympy.core.evaluate import global_evaluate import mpmath import mpmath.libmp as mlib import inspect from collections import Counter def _coeff_isneg(a): """Return True if the leading Number is negative. Examples ======== >>> from sympy.core.function import _coeff_isneg >>> from sympy import S, Symbol, oo, pi >>> _coeff_isneg(-3*pi) True >>> _coeff_isneg(S(3)) False >>> _coeff_isneg(-oo) True >>> _coeff_isneg(Symbol('n', negative=True)) # coeff is 1 False For matrix expressions: >>> from sympy import MatrixSymbol, sqrt >>> A = MatrixSymbol("A", 3, 3) >>> _coeff_isneg(-sqrt(2)*A) True >>> _coeff_isneg(sqrt(2)*A) False """ if a.is_MatMul: a = a.args[0] if a.is_Mul: a = a.args[0] return a.is_Number and a.is_extended_negative class PoleError(Exception): pass class ArgumentIndexError(ValueError): def __str__(self): return ("Invalid operation with argument number %s for Function %s" % (self.args[1], self.args[0])) # Python 2/3 version that does not raise a Deprecation warning def arity(cls): """Return the arity of the function if it is known, else None. When default values are specified for some arguments, they are optional and the arity is reported as a tuple of possible values. Examples ======== >>> from sympy.core.function import arity >>> from sympy import log >>> arity(lambda x: x) 1 >>> arity(log) (1, 2) >>> arity(lambda *x: sum(x)) is None True """ eval_ = getattr(cls, 'eval', cls) if PY3: parameters = inspect.signature(eval_).parameters.items() if [p for _, p in parameters if p.kind == p.VAR_POSITIONAL]: return p_or_k = [p for _, p in parameters if p.kind == p.POSITIONAL_OR_KEYWORD] # how many have no default and how many have a default value no, yes = map(len, sift(p_or_k, lambda p:p.default == p.empty, binary=True)) return no if not yes else tuple(range(no, no + yes + 1)) else: cls_ = int(hasattr(cls, 'eval')) # correction for cls arguments evalargspec = inspect.getargspec(eval_) if evalargspec.varargs: return else: evalargs = len(evalargspec.args) - cls_ if evalargspec.defaults: # if there are default args then they are optional; the # fewest args will occur when all defaults are used and # the most when none are used (i.e. all args are given) fewest = evalargs - len(evalargspec.defaults) return tuple(range(fewest, evalargs + 1)) return evalargs class FunctionClass(ManagedProperties): """ Base class for function classes. FunctionClass is a subclass of type. Use Function('<function name>' [ , signature ]) to create undefined function classes. """ _new = type.__new__ def __init__(cls, *args, **kwargs): # honor kwarg value or class-defined value before using # the number of arguments in the eval function (if present) nargs = kwargs.pop('nargs', cls.__dict__.get('nargs', arity(cls))) # Canonicalize nargs here; change to set in nargs. if is_sequence(nargs): if not nargs: raise ValueError(filldedent(''' Incorrectly specified nargs as %s: if there are no arguments, it should be `nargs = 0`; if there are any number of arguments, it should be `nargs = None`''' % str(nargs))) nargs = tuple(ordered(set(nargs))) elif nargs is not None: nargs = (as_int(nargs),) cls._nargs = nargs super(FunctionClass, cls).__init__(*args, **kwargs) @property def __signature__(self): """ Allow Python 3's inspect.signature to give a useful signature for Function subclasses. """ # Python 3 only, but backports (like the one in IPython) still might # call this. try: from inspect import signature except ImportError: return None # TODO: Look at nargs return signature(self.eval) @property def free_symbols(self): return set() @property def xreplace(self): # Function needs args so we define a property that returns # a function that takes args...and then use that function # to return the right value return lambda rule, **_: rule.get(self, self) @property def nargs(self): """Return a set of the allowed number of arguments for the function. Examples ======== >>> from sympy.core.function import Function >>> from sympy.abc import x, y >>> f = Function('f') If the function can take any number of arguments, the set of whole numbers is returned: >>> Function('f').nargs Naturals0 If the function was initialized to accept one or more arguments, a corresponding set will be returned: >>> Function('f', nargs=1).nargs {1} >>> Function('f', nargs=(2, 1)).nargs {1, 2} The undefined function, after application, also has the nargs attribute; the actual number of arguments is always available by checking the ``args`` attribute: >>> f = Function('f') >>> f(1).nargs Naturals0 >>> len(f(1).args) 1 """ from sympy.sets.sets import FiniteSet # XXX it would be nice to handle this in __init__ but there are import # problems with trying to import FiniteSet there return FiniteSet(*self._nargs) if self._nargs else S.Naturals0 def __repr__(cls): return cls.__name__ class Application(with_metaclass(FunctionClass, Basic)): """ Base class for applied functions. Instances of Application represent the result of applying an application of any type to any object. """ is_Function = True @cacheit def __new__(cls, *args, **options): from sympy.sets.fancysets import Naturals0 from sympy.sets.sets import FiniteSet args = list(map(sympify, args)) evaluate = options.pop('evaluate', global_evaluate[0]) # WildFunction (and anything else like it) may have nargs defined # and we throw that value away here options.pop('nargs', None) if options: raise ValueError("Unknown options: %s" % options) if evaluate: evaluated = cls.eval(*args) if evaluated is not None: return evaluated obj = super(Application, cls).__new__(cls, *args, **options) # make nargs uniform here sentinel = object() objnargs = getattr(obj, "nargs", sentinel) if objnargs is not sentinel: # things passing through here: # - functions subclassed from Function (e.g. myfunc(1).nargs) # - functions like cos(1).nargs # - AppliedUndef with given nargs like Function('f', nargs=1)(1).nargs # Canonicalize nargs here if is_sequence(objnargs): nargs = tuple(ordered(set(objnargs))) elif objnargs is not None: nargs = (as_int(objnargs),) else: nargs = None else: # things passing through here: # - WildFunction('f').nargs # - AppliedUndef with no nargs like Function('f')(1).nargs nargs = obj._nargs # note the underscore here # convert to FiniteSet obj.nargs = FiniteSet(*nargs) if nargs else Naturals0() return obj @classmethod def eval(cls, *args): """ Returns a canonical form of cls applied to arguments args. The eval() method is called when the class cls is about to be instantiated and it should return either some simplified instance (possible of some other class), or if the class cls should be unmodified, return None. Examples of eval() for the function "sign" --------------------------------------------- .. code-block:: python @classmethod def eval(cls, arg): if arg is S.NaN: return S.NaN if arg is S.Zero: return S.Zero if arg.is_positive: return S.One if arg.is_negative: return S.NegativeOne if isinstance(arg, Mul): coeff, terms = arg.as_coeff_Mul(rational=True) if coeff is not S.One: return cls(coeff) * cls(terms) """ return @property def func(self): return self.__class__ def _eval_subs(self, old, new): if (old.is_Function and new.is_Function and callable(old) and callable(new) and old == self.func and len(self.args) in new.nargs): return new(*[i._subs(old, new) for i in self.args]) class Function(Application, Expr): """ Base class for applied mathematical functions. It also serves as a constructor for undefined function classes. Examples ======== First example shows how to use Function as a constructor for undefined function classes: >>> from sympy import Function, Symbol >>> x = Symbol('x') >>> f = Function('f') >>> g = Function('g')(x) >>> f f >>> f(x) f(x) >>> g g(x) >>> f(x).diff(x) Derivative(f(x), x) >>> g.diff(x) Derivative(g(x), x) Assumptions can be passed to Function, and if function is initialized with a Symbol, the function inherits the name and assumptions associated with the Symbol: >>> f_real = Function('f', real=True) >>> f_real(x).is_real True >>> f_real_inherit = Function(Symbol('f', real=True)) >>> f_real_inherit(x).is_real True Note that assumptions on a function are unrelated to the assumptions on the variable it is called on. If you want to add a relationship, subclass Function and define the appropriate ``_eval_is_assumption`` methods. In the following example Function is used as a base class for ``my_func`` that represents a mathematical function *my_func*. Suppose that it is well known, that *my_func(0)* is *1* and *my_func* at infinity goes to *0*, so we want those two simplifications to occur automatically. Suppose also that *my_func(x)* is real exactly when *x* is real. Here is an implementation that honours those requirements: >>> from sympy import Function, S, oo, I, sin >>> class my_func(Function): ... ... @classmethod ... def eval(cls, x): ... if x.is_Number: ... if x is S.Zero: ... return S.One ... elif x is S.Infinity: ... return S.Zero ... ... def _eval_is_real(self): ... return self.args[0].is_real ... >>> x = S('x') >>> my_func(0) + sin(0) 1 >>> my_func(oo) 0 >>> my_func(3.54).n() # Not yet implemented for my_func. my_func(3.54) >>> my_func(I).is_real False In order for ``my_func`` to become useful, several other methods would need to be implemented. See source code of some of the already implemented functions for more complete examples. Also, if the function can take more than one argument, then ``nargs`` must be defined, e.g. if ``my_func`` can take one or two arguments then, >>> class my_func(Function): ... nargs = (1, 2) ... >>> """ @property def _diff_wrt(self): return False @cacheit def __new__(cls, *args, **options): # Handle calls like Function('f') if cls is Function: return UndefinedFunction(*args, **options) n = len(args) if n not in cls.nargs: # XXX: exception message must be in exactly this format to # make it work with NumPy's functions like vectorize(). See, # for example, https://github.com/numpy/numpy/issues/1697. # The ideal solution would be just to attach metadata to # the exception and change NumPy to take advantage of this. temp = ('%(name)s takes %(qual)s %(args)s ' 'argument%(plural)s (%(given)s given)') raise TypeError(temp % { 'name': cls, 'qual': 'exactly' if len(cls.nargs) == 1 else 'at least', 'args': min(cls.nargs), 'plural': 's'*(min(cls.nargs) != 1), 'given': n}) evaluate = options.get('evaluate', global_evaluate[0]) result = super(Function, cls).__new__(cls, *args, **options) if evaluate and isinstance(result, cls) and result.args: pr2 = min(cls._should_evalf(a) for a in result.args) if pr2 > 0: pr = max(cls._should_evalf(a) for a in result.args) result = result.evalf(mlib.libmpf.prec_to_dps(pr)) return result @classmethod def _should_evalf(cls, arg): """ Decide if the function should automatically evalf(). By default (in this implementation), this happens if (and only if) the ARG is a floating point number. This function is used by __new__. Returns the precision to evalf to, or -1 if it shouldn't evalf. """ from sympy.core.evalf import pure_complex if arg.is_Float: return arg._prec if not arg.is_Add: return -1 m = pure_complex(arg) if m is None or not (m[0].is_Float or m[1].is_Float): return -1 l = [i._prec for i in m if i.is_Float] l.append(-1) return max(l) @classmethod def class_key(cls): from sympy.sets.fancysets import Naturals0 funcs = { 'exp': 10, 'log': 11, 'sin': 20, 'cos': 21, 'tan': 22, 'cot': 23, 'sinh': 30, 'cosh': 31, 'tanh': 32, 'coth': 33, 'conjugate': 40, 're': 41, 'im': 42, 'arg': 43, } name = cls.__name__ try: i = funcs[name] except KeyError: i = 0 if isinstance(cls.nargs, Naturals0) else 10000 return 4, i, name @property def is_commutative(self): """ Returns whether the function is commutative. """ if all(getattr(t, 'is_commutative') for t in self.args): return True else: return False def _eval_evalf(self, prec): def _get_mpmath_func(fname): """Lookup mpmath function based on name""" if isinstance(self, AppliedUndef): # Shouldn't lookup in mpmath but might have ._imp_ return None if not hasattr(mpmath, fname): from sympy.utilities.lambdify import MPMATH_TRANSLATIONS fname = MPMATH_TRANSLATIONS.get(fname, None) if fname is None: return None return getattr(mpmath, fname) func = _get_mpmath_func(self.func.__name__) # Fall-back evaluation if func is None: imp = getattr(self, '_imp_', None) if imp is None: return None try: return Float(imp(*[i.evalf(prec) for i in self.args]), prec) except (TypeError, ValueError) as e: return None # Convert all args to mpf or mpc # Convert the arguments to *higher* precision than requested for the # final result. # XXX + 5 is a guess, it is similar to what is used in evalf.py. Should # we be more intelligent about it? try: args = [arg._to_mpmath(prec + 5) for arg in self.args] def bad(m): from mpmath import mpf, mpc # the precision of an mpf value is the last element # if that is 1 (and m[1] is not 1 which would indicate a # power of 2), then the eval failed; so check that none of # the arguments failed to compute to a finite precision. # Note: An mpc value has two parts, the re and imag tuple; # check each of those parts, too. Anything else is allowed to # pass if isinstance(m, mpf): m = m._mpf_ return m[1] !=1 and m[-1] == 1 elif isinstance(m, mpc): m, n = m._mpc_ return m[1] !=1 and m[-1] == 1 and \ n[1] !=1 and n[-1] == 1 else: return False if any(bad(a) for a in args): raise ValueError # one or more args failed to compute with significance except ValueError: return with mpmath.workprec(prec): v = func(*args) return Expr._from_mpmath(v, prec) def _eval_derivative(self, s): # f(x).diff(s) -> x.diff(s) * f.fdiff(1)(s) i = 0 l = [] for a in self.args: i += 1 da = a.diff(s) if da is S.Zero: continue try: df = self.fdiff(i) except ArgumentIndexError: df = Function.fdiff(self, i) l.append(df * da) return Add(*l) def _eval_is_commutative(self): return fuzzy_and(a.is_commutative for a in self.args) def _eval_is_complex(self): return fuzzy_and(a.is_complex for a in self.args) def as_base_exp(self): """ Returns the method as the 2-tuple (base, exponent). """ return self, S.One def _eval_aseries(self, n, args0, x, logx): """ Compute an asymptotic expansion around args0, in terms of self.args. This function is only used internally by _eval_nseries and should not be called directly; derived classes can overwrite this to implement asymptotic expansions. """ from sympy.utilities.misc import filldedent raise PoleError(filldedent(''' Asymptotic expansion of %s around %s is not implemented.''' % (type(self), args0))) def _eval_nseries(self, x, n, logx): """ This function does compute series for multivariate functions, but the expansion is always in terms of *one* variable. Examples ======== >>> from sympy import atan2 >>> from sympy.abc import x, y >>> atan2(x, y).series(x, n=2) atan2(0, y) + x/y + O(x**2) >>> atan2(x, y).series(y, n=2) -y/x + atan2(x, 0) + O(y**2) This function also computes asymptotic expansions, if necessary and possible: >>> from sympy import loggamma >>> loggamma(1/x)._eval_nseries(x,0,None) -1/x - log(x)/x + log(x)/2 + O(1) """ from sympy import Order from sympy.sets.sets import FiniteSet args = self.args args0 = [t.limit(x, 0) for t in args] if any(t.is_finite is False for t in args0): from sympy import oo, zoo, nan # XXX could use t.as_leading_term(x) here but it's a little # slower a = [t.compute_leading_term(x, logx=logx) for t in args] a0 = [t.limit(x, 0) for t in a] if any([t.has(oo, -oo, zoo, nan) for t in a0]): return self._eval_aseries(n, args0, x, logx) # Careful: the argument goes to oo, but only logarithmically so. We # are supposed to do a power series expansion "around the # logarithmic term". e.g. # f(1+x+log(x)) # -> f(1+logx) + x*f'(1+logx) + O(x**2) # where 'logx' is given in the argument a = [t._eval_nseries(x, n, logx) for t in args] z = [r - r0 for (r, r0) in zip(a, a0)] p = [Dummy() for _ in z] q = [] v = None for ai, zi, pi in zip(a0, z, p): if zi.has(x): if v is not None: raise NotImplementedError q.append(ai + pi) v = pi else: q.append(ai) e1 = self.func(*q) if v is None: return e1 s = e1._eval_nseries(v, n, logx) o = s.getO() s = s.removeO() s = s.subs(v, zi).expand() + Order(o.expr.subs(v, zi), x) return s if (self.func.nargs is S.Naturals0 or (self.func.nargs == FiniteSet(1) and args0[0]) or any(c > 1 for c in self.func.nargs)): e = self e1 = e.expand() if e == e1: #for example when e = sin(x+1) or e = sin(cos(x)) #let's try the general algorithm term = e.subs(x, S.Zero) if term.is_finite is False or term is S.NaN: raise PoleError("Cannot expand %s around 0" % (self)) series = term fact = S.One _x = Dummy('x') e = e.subs(x, _x) for i in range(n - 1): i += 1 fact *= Rational(i) e = e.diff(_x) subs = e.subs(_x, S.Zero) if subs is S.NaN: # try to evaluate a limit if we have to subs = e.limit(_x, S.Zero) if subs.is_finite is False: raise PoleError("Cannot expand %s around 0" % (self)) term = subs*(x**i)/fact term = term.expand() series += term return series + Order(x**n, x) return e1.nseries(x, n=n, logx=logx) arg = self.args[0] l = [] g = None # try to predict a number of terms needed nterms = n + 2 cf = Order(arg.as_leading_term(x), x).getn() if cf != 0: nterms = int(nterms / cf) for i in range(nterms): g = self.taylor_term(i, arg, g) g = g.nseries(x, n=n, logx=logx) l.append(g) return Add(*l) + Order(x**n, x) def fdiff(self, argindex=1): """ Returns the first derivative of the function. """ if not (1 <= argindex <= len(self.args)): raise ArgumentIndexError(self, argindex) ix = argindex - 1 A = self.args[ix] if A._diff_wrt: if len(self.args) == 1: return Derivative(self, A) if A.is_Symbol: for i, v in enumerate(self.args): if i != ix and A in v.free_symbols: # it can't be in any other argument's free symbols # issue 8510 break else: return Derivative(self, A) else: free = A.free_symbols for i, a in enumerate(self.args): if ix != i and a.free_symbols & free: break else: # there is no possible interaction bewtween args return Derivative(self, A) # See issue 4624 and issue 4719, 5600 and 8510 D = Dummy('xi_%i' % argindex, dummy_index=hash(A)) args = self.args[:ix] + (D,) + self.args[ix + 1:] return Subs(Derivative(self.func(*args), D), D, A) def _eval_as_leading_term(self, x): """Stub that should be overridden by new Functions to return the first non-zero term in a series if ever an x-dependent argument whose leading term vanishes as x -> 0 might be encountered. See, for example, cos._eval_as_leading_term. """ from sympy import Order args = [a.as_leading_term(x) for a in self.args] o = Order(1, x) if any(x in a.free_symbols and o.contains(a) for a in args): # Whereas x and any finite number are contained in O(1, x), # expressions like 1/x are not. If any arg simplified to a # vanishing expression as x -> 0 (like x or x**2, but not # 3, 1/x, etc...) then the _eval_as_leading_term is needed # to supply the first non-zero term of the series, # # e.g. expression leading term # ---------- ------------ # cos(1/x) cos(1/x) # cos(cos(x)) cos(1) # cos(x) 1 <- _eval_as_leading_term needed # sin(x) x <- _eval_as_leading_term needed # raise NotImplementedError( '%s has no _eval_as_leading_term routine' % self.func) else: return self.func(*args) def _sage_(self): import sage.all as sage fname = self.func.__name__ func = getattr(sage, fname, None) args = [arg._sage_() for arg in self.args] # In the case the function is not known in sage: if func is None: import sympy if getattr(sympy, fname, None) is None: # abstract function return sage.function(fname)(*args) else: # the function defined in sympy is not known in sage # this exception is caught in sage raise AttributeError return func(*args) class AppliedUndef(Function): """ Base class for expressions resulting from the application of an undefined function. """ is_number = False def __new__(cls, *args, **options): args = list(map(sympify, args)) obj = super(AppliedUndef, cls).__new__(cls, *args, **options) return obj def _eval_as_leading_term(self, x): return self def _sage_(self): import sage.all as sage fname = str(self.func) args = [arg._sage_() for arg in self.args] func = sage.function(fname)(*args) return func @property def _diff_wrt(self): """ Allow derivatives wrt to undefined functions. Examples ======== >>> from sympy import Function, Symbol >>> f = Function('f') >>> x = Symbol('x') >>> f(x)._diff_wrt True >>> f(x).diff(x) Derivative(f(x), x) """ return True class UndefinedFunction(FunctionClass): """ The (meta)class of undefined functions. """ def __new__(mcl, name, bases=(AppliedUndef,), __dict__=None, **kwargs): from .symbol import _filter_assumptions # Allow Function('f', real=True) # and/or Function(Symbol('f', real=True)) assumptions, kwargs = _filter_assumptions(kwargs) if isinstance(name, Symbol): assumptions = name._merge(assumptions) name = name.name elif not isinstance(name, string_types): raise TypeError('expecting string or Symbol for name') else: commutative = assumptions.get('commutative', None) assumptions = Symbol(name, **assumptions).assumptions0 if commutative is None: assumptions.pop('commutative') __dict__ = __dict__ or {} # put the `is_*` for into __dict__ __dict__.update({'is_%s' % k: v for k, v in assumptions.items()}) # You can add other attributes, although they do have to be hashable # (but seriously, if you want to add anything other than assumptions, # just subclass Function) __dict__.update(kwargs) # add back the sanitized assumptions without the is_ prefix kwargs.update(assumptions) # Save these for __eq__ __dict__.update({'_kwargs': kwargs}) # do this for pickling __dict__['__module__'] = None obj = super(UndefinedFunction, mcl).__new__(mcl, name, bases, __dict__) obj.name = name return obj def __instancecheck__(cls, instance): return cls in type(instance).__mro__ _kwargs = {} def __hash__(self): return hash((self.class_key(), frozenset(self._kwargs.items()))) def __eq__(self, other): return (isinstance(other, self.__class__) and self.class_key() == other.class_key() and self._kwargs == other._kwargs) def __ne__(self, other): return not self == other class WildFunction(Function, AtomicExpr): """ A WildFunction function matches any function (with its arguments). Examples ======== >>> from sympy import WildFunction, Function, cos >>> from sympy.abc import x, y >>> F = WildFunction('F') >>> f = Function('f') >>> F.nargs Naturals0 >>> x.match(F) >>> F.match(F) {F_: F_} >>> f(x).match(F) {F_: f(x)} >>> cos(x).match(F) {F_: cos(x)} >>> f(x, y).match(F) {F_: f(x, y)} To match functions with a given number of arguments, set ``nargs`` to the desired value at instantiation: >>> F = WildFunction('F', nargs=2) >>> F.nargs {2} >>> f(x).match(F) >>> f(x, y).match(F) {F_: f(x, y)} To match functions with a range of arguments, set ``nargs`` to a tuple containing the desired number of arguments, e.g. if ``nargs = (1, 2)`` then functions with 1 or 2 arguments will be matched. >>> F = WildFunction('F', nargs=(1, 2)) >>> F.nargs {1, 2} >>> f(x).match(F) {F_: f(x)} >>> f(x, y).match(F) {F_: f(x, y)} >>> f(x, y, 1).match(F) """ include = set() def __init__(cls, name, **assumptions): from sympy.sets.sets import Set, FiniteSet cls.name = name nargs = assumptions.pop('nargs', S.Naturals0) if not isinstance(nargs, Set): # Canonicalize nargs here. See also FunctionClass. if is_sequence(nargs): nargs = tuple(ordered(set(nargs))) elif nargs is not None: nargs = (as_int(nargs),) nargs = FiniteSet(*nargs) cls.nargs = nargs def matches(self, expr, repl_dict={}, old=False): if not isinstance(expr, (AppliedUndef, Function)): return None if len(expr.args) not in self.nargs: return None repl_dict = repl_dict.copy() repl_dict[self] = expr return repl_dict class Derivative(Expr): """ Carries out differentiation of the given expression with respect to symbols. Examples ======== >>> from sympy import Derivative, Function, symbols, Subs >>> from sympy.abc import x, y >>> f, g = symbols('f g', cls=Function) >>> Derivative(x**2, x, evaluate=True) 2*x Denesting of derivatives retains the ordering of variables: >>> Derivative(Derivative(f(x, y), y), x) Derivative(f(x, y), y, x) Contiguously identical symbols are merged into a tuple giving the symbol and the count: >>> Derivative(f(x), x, x, y, x) Derivative(f(x), (x, 2), y, x) If the derivative cannot be performed, and evaluate is True, the order of the variables of differentiation will be made canonical: >>> Derivative(f(x, y), y, x, evaluate=True) Derivative(f(x, y), x, y) Derivatives with respect to undefined functions can be calculated: >>> Derivative(f(x)**2, f(x), evaluate=True) 2*f(x) Such derivatives will show up when the chain rule is used to evalulate a derivative: >>> f(g(x)).diff(x) Derivative(f(g(x)), g(x))*Derivative(g(x), x) Substitution is used to represent derivatives of functions with arguments that are not symbols or functions: >>> f(2*x + 3).diff(x) == 2*Subs(f(y).diff(y), y, 2*x + 3) True Notes ===== Simplification of high-order derivatives: Because there can be a significant amount of simplification that can be done when multiple differentiations are performed, results will be automatically simplified in a fairly conservative fashion unless the keyword ``simplify`` is set to False. >>> from sympy import cos, sin, sqrt, diff, Function, symbols >>> from sympy.abc import x, y, z >>> f, g = symbols('f,g', cls=Function) >>> e = sqrt((x + 1)**2 + x) >>> diff(e, (x, 5), simplify=False).count_ops() 136 >>> diff(e, (x, 5)).count_ops() 30 Ordering of variables: If evaluate is set to True and the expression cannot be evaluated, the list of differentiation symbols will be sorted, that is, the expression is assumed to have continuous derivatives up to the order asked. Derivative wrt non-Symbols: For the most part, one may not differentiate wrt non-symbols. For example, we do not allow differentiation wrt `x*y` because there are multiple ways of structurally defining where x*y appears in an expression: a very strict definition would make (x*y*z).diff(x*y) == 0. Derivatives wrt defined functions (like cos(x)) are not allowed, either: >>> (x*y*z).diff(x*y) Traceback (most recent call last): ... ValueError: Can't calculate derivative wrt x*y. To make it easier to work with variational calculus, however, derivatives wrt AppliedUndef and Derivatives are allowed. For example, in the Euler-Lagrange method one may write F(t, u, v) where u = f(t) and v = f'(t). These variables can be written explicitly as functions of time:: >>> from sympy.abc import t >>> F = Function('F') >>> U = f(t) >>> V = U.diff(t) The derivative wrt f(t) can be obtained directly: >>> direct = F(t, U, V).diff(U) When differentiation wrt a non-Symbol is attempted, the non-Symbol is temporarily converted to a Symbol while the differentiation is performed and the same answer is obtained: >>> indirect = F(t, U, V).subs(U, x).diff(x).subs(x, U) >>> assert direct == indirect The implication of this non-symbol replacement is that all functions are treated as independent of other functions and the symbols are independent of the functions that contain them:: >>> x.diff(f(x)) 0 >>> g(x).diff(f(x)) 0 It also means that derivatives are assumed to depend only on the variables of differentiation, not on anything contained within the expression being differentiated:: >>> F = f(x) >>> Fx = F.diff(x) >>> Fx.diff(F) # derivative depends on x, not F 0 >>> Fxx = Fx.diff(x) >>> Fxx.diff(Fx) # derivative depends on x, not Fx 0 The last example can be made explicit by showing the replacement of Fx in Fxx with y: >>> Fxx.subs(Fx, y) Derivative(y, x) Since that in itself will evaluate to zero, differentiating wrt Fx will also be zero: >>> _.doit() 0 Replacing undefined functions with concrete expressions One must be careful to replace undefined functions with expressions that contain variables consistent with the function definition and the variables of differentiation or else insconsistent result will be obtained. Consider the following example: >>> eq = f(x)*g(y) >>> eq.subs(f(x), x*y).diff(x, y).doit() y*Derivative(g(y), y) + g(y) >>> eq.diff(x, y).subs(f(x), x*y).doit() y*Derivative(g(y), y) The results differ because `f(x)` was replaced with an expression that involved both variables of differentiation. In the abstract case, differentiation of `f(x)` by `y` is 0; in the concrete case, the presence of `y` made that derivative nonvanishing and produced the extra `g(y)` term. Defining differentiation for an object An object must define ._eval_derivative(symbol) method that returns the differentiation result. This function only needs to consider the non-trivial case where expr contains symbol and it should call the diff() method internally (not _eval_derivative); Derivative should be the only one to call _eval_derivative. Any class can allow derivatives to be taken with respect to itself (while indicating its scalar nature). See the docstring of Expr._diff_wrt. See Also ======== _sort_variable_count """ is_Derivative = True @property def _diff_wrt(self): """An expression may be differentiated wrt a Derivative if it is in elementary form. Examples ======== >>> from sympy import Function, Derivative, cos >>> from sympy.abc import x >>> f = Function('f') >>> Derivative(f(x), x)._diff_wrt True >>> Derivative(cos(x), x)._diff_wrt False >>> Derivative(x + 1, x)._diff_wrt False A Derivative might be an unevaluated form of what will not be a valid variable of differentiation if evaluated. For example, >>> Derivative(f(f(x)), x).doit() Derivative(f(x), x)*Derivative(f(f(x)), f(x)) Such an expression will present the same ambiguities as arise when dealing with any other product, like `2*x`, so `_diff_wrt` is False: >>> Derivative(f(f(x)), x)._diff_wrt False """ return self.expr._diff_wrt and isinstance(self.doit(), Derivative) def __new__(cls, expr, *variables, **kwargs): from sympy.matrices.common import MatrixCommon from sympy import Integer, MatrixExpr from sympy.tensor.array import Array, NDimArray, derive_by_array from sympy.utilities.misc import filldedent expr = sympify(expr) symbols_or_none = getattr(expr, "free_symbols", None) has_symbol_set = isinstance(symbols_or_none, set) if not has_symbol_set: raise ValueError(filldedent(''' Since there are no variables in the expression %s, it cannot be differentiated.''' % expr)) # determine value for variables if it wasn't given if not variables: variables = expr.free_symbols if len(variables) != 1: if expr.is_number: return S.Zero if len(variables) == 0: raise ValueError(filldedent(''' Since there are no variables in the expression, the variable(s) of differentiation must be supplied to differentiate %s''' % expr)) else: raise ValueError(filldedent(''' Since there is more than one variable in the expression, the variable(s) of differentiation must be supplied to differentiate %s''' % expr)) # Standardize the variables by sympifying them: variables = list(sympify(variables)) # Split the list of variables into a list of the variables we are diff # wrt, where each element of the list has the form (s, count) where # s is the entity to diff wrt and count is the order of the # derivative. variable_count = [] array_likes = (tuple, list, Tuple) for i, v in enumerate(variables): if isinstance(v, Integer): if i == 0: raise ValueError("First variable cannot be a number: %i" % v) count = v prev, prevcount = variable_count[-1] if prevcount != 1: raise TypeError("tuple {0} followed by number {1}".format((prev, prevcount), v)) if count == 0: variable_count.pop() else: variable_count[-1] = Tuple(prev, count) else: if isinstance(v, array_likes): if len(v) == 0: # Ignore empty tuples: Derivative(expr, ... , (), ... ) continue if isinstance(v[0], array_likes): # Derive by array: Derivative(expr, ... , [[x, y, z]], ... ) if len(v) == 1: v = Array(v[0]) count = 1 else: v, count = v v = Array(v) else: v, count = v if count == 0: continue else: count = 1 variable_count.append(Tuple(v, count)) # light evaluation of contiguous, identical # items: (x, 1), (x, 1) -> (x, 2) merged = [] for t in variable_count: v, c = t if c.is_negative: raise ValueError( 'order of differentiation must be nonnegative') if merged and merged[-1][0] == v: c += merged[-1][1] if not c: merged.pop() else: merged[-1] = Tuple(v, c) else: merged.append(t) variable_count = merged # sanity check of variables of differentation; we waited # until the counts were computed since some variables may # have been removed because the count was 0 for v, c in variable_count: # v must have _diff_wrt True if not v._diff_wrt: __ = '' # filler to make error message neater raise ValueError(filldedent(''' Can't calculate derivative wrt %s.%s''' % (v, __))) # We make a special case for 0th derivative, because there is no # good way to unambiguously print this. if len(variable_count) == 0: return expr evaluate = kwargs.get('evaluate', False) if evaluate: if isinstance(expr, Derivative): expr = expr.canonical variable_count = [ (v.canonical if isinstance(v, Derivative) else v, c) for v, c in variable_count] # Look for a quick exit if there are symbols that don't appear in # expression at all. Note, this cannot check non-symbols like # Derivatives as those can be created by intermediate # derivatives. zero = False free = expr.free_symbols for v, c in variable_count: vfree = v.free_symbols if c.is_positive and vfree: if isinstance(v, AppliedUndef): # these match exactly since # x.diff(f(x)) == g(x).diff(f(x)) == 0 # and are not created by differentiation D = Dummy() if not expr.xreplace({v: D}).has(D): zero = True break elif isinstance(v, MatrixExpr): zero = False break elif isinstance(v, Symbol) and v not in free: zero = True break else: if not free & vfree: # e.g. v is IndexedBase or Matrix zero = True break if zero: if isinstance(expr, (MatrixCommon, NDimArray)): return expr.zeros(*expr.shape) elif expr.is_scalar: return S.Zero # make the order of symbols canonical #TODO: check if assumption of discontinuous derivatives exist variable_count = cls._sort_variable_count(variable_count) # denest if isinstance(expr, Derivative): variable_count = list(expr.variable_count) + variable_count expr = expr.expr return Derivative(expr, *variable_count, **kwargs) # we return here if evaluate is False or if there is no # _eval_derivative method if not evaluate or not hasattr(expr, '_eval_derivative'): # return an unevaluated Derivative if evaluate and variable_count == [(expr, 1)] and expr.is_scalar: # special hack providing evaluation for classes # that have defined is_scalar=True but have no # _eval_derivative defined return S.One return Expr.__new__(cls, expr, *variable_count) # evaluate the derivative by calling _eval_derivative method # of expr for each variable # ------------------------------------------------------------- nderivs = 0 # how many derivatives were performed unhandled = [] for i, (v, count) in enumerate(variable_count): old_expr = expr old_v = None is_symbol = v.is_symbol or isinstance(v, (Iterable, Tuple, MatrixCommon, NDimArray)) if not is_symbol: old_v = v v = Dummy('xi') expr = expr.xreplace({old_v: v}) # Derivatives and UndefinedFunctions are independent # of all others clashing = not (isinstance(old_v, Derivative) or \ isinstance(old_v, AppliedUndef)) if not v in expr.free_symbols and not clashing: return expr.diff(v) # expr's version of 0 if not old_v.is_scalar and not hasattr( old_v, '_eval_derivative'): # special hack providing evaluation for classes # that have defined is_scalar=True but have no # _eval_derivative defined expr *= old_v.diff(old_v) # Evaluate the derivative `n` times. If # `_eval_derivative_n_times` is not overridden by the current # object, the default in `Basic` will call a loop over # `_eval_derivative`: obj = expr._eval_derivative_n_times(v, count) if obj is not None and obj.is_zero: return obj nderivs += count if old_v is not None: if obj is not None: # remove the dummy that was used obj = obj.subs(v, old_v) # restore expr expr = old_expr if obj is None: # we've already checked for quick-exit conditions # that give 0 so the remaining variables # are contained in the expression but the expression # did not compute a derivative so we stop taking # derivatives unhandled = variable_count[i:] break expr = obj # what we have so far can be made canonical expr = expr.replace( lambda x: isinstance(x, Derivative), lambda x: x.canonical) if unhandled: if isinstance(expr, Derivative): unhandled = list(expr.variable_count) + unhandled expr = expr.expr expr = Expr.__new__(cls, expr, *unhandled) if (nderivs > 1) == True and kwargs.get('simplify', True): from sympy.core.exprtools import factor_terms from sympy.simplify.simplify import signsimp expr = factor_terms(signsimp(expr)) return expr @property def canonical(cls): return cls.func(cls.expr, *Derivative._sort_variable_count(cls.variable_count)) @classmethod def _sort_variable_count(cls, vc): """ Sort (variable, count) pairs into canonical order while retaining order of variables that do not commute during differentiation: * symbols and functions commute with each other * derivatives commute with each other * a derivative doesn't commute with anything it contains * any other object is not allowed to commute if it has free symbols in common with another object Examples ======== >>> from sympy import Derivative, Function, symbols, cos >>> vsort = Derivative._sort_variable_count >>> x, y, z = symbols('x y z') >>> f, g, h = symbols('f g h', cls=Function) Contiguous items are collapsed into one pair: >>> vsort([(x, 1), (x, 1)]) [(x, 2)] >>> vsort([(y, 1), (f(x), 1), (y, 1), (f(x), 1)]) [(y, 2), (f(x), 2)] Ordering is canonical. >>> def vsort0(*v): ... # docstring helper to ... # change vi -> (vi, 0), sort, and return vi vals ... return [i[0] for i in vsort([(i, 0) for i in v])] >>> vsort0(y, x) [x, y] >>> vsort0(g(y), g(x), f(y)) [f(y), g(x), g(y)] Symbols are sorted as far to the left as possible but never move to the left of a derivative having the same symbol in its variables; the same applies to AppliedUndef which are always sorted after Symbols: >>> dfx = f(x).diff(x) >>> assert vsort0(dfx, y) == [y, dfx] >>> assert vsort0(dfx, x) == [dfx, x] """ from sympy.utilities.iterables import uniq, topological_sort if not vc: return [] vc = list(vc) if len(vc) == 1: return [Tuple(*vc[0])] V = list(range(len(vc))) E = [] v = lambda i: vc[i][0] D = Dummy() def _block(d, v, wrt=False): # return True if v should not come before d else False if d == v: return wrt if d.is_Symbol: return False if isinstance(d, Derivative): # a derivative blocks if any of it's variables contain # v; the wrt flag will return True for an exact match # and will cause an AppliedUndef to block if v is in # the arguments if any(_block(k, v, wrt=True) for k in d._wrt_variables): return True return False if not wrt and isinstance(d, AppliedUndef): return False if v.is_Symbol: return v in d.free_symbols if isinstance(v, AppliedUndef): return _block(d.xreplace({v: D}), D) return d.free_symbols & v.free_symbols for i in range(len(vc)): for j in range(i): if _block(v(j), v(i)): E.append((j,i)) # this is the default ordering to use in case of ties O = dict(zip(ordered(uniq([i for i, c in vc])), range(len(vc)))) ix = topological_sort((V, E), key=lambda i: O[v(i)]) # merge counts of contiguously identical items merged = [] for v, c in [vc[i] for i in ix]: if merged and merged[-1][0] == v: merged[-1][1] += c else: merged.append([v, c]) return [Tuple(*i) for i in merged] def _eval_is_commutative(self): return self.expr.is_commutative def _eval_derivative(self, v): # If v (the variable of differentiation) is not in # self.variables, we might be able to take the derivative. if v not in self._wrt_variables: dedv = self.expr.diff(v) if isinstance(dedv, Derivative): return dedv.func(dedv.expr, *(self.variable_count + dedv.variable_count)) # dedv (d(self.expr)/dv) could have simplified things such that the # derivative wrt things in self.variables can now be done. Thus, # we set evaluate=True to see if there are any other derivatives # that can be done. The most common case is when dedv is a simple # number so that the derivative wrt anything else will vanish. return self.func(dedv, *self.variables, evaluate=True) # In this case v was in self.variables so the derivative wrt v has # already been attempted and was not computed, either because it # couldn't be or evaluate=False originally. variable_count = list(self.variable_count) variable_count.append((v, 1)) return self.func(self.expr, *variable_count, evaluate=False) def doit(self, **hints): expr = self.expr if hints.get('deep', True): expr = expr.doit(**hints) hints['evaluate'] = True rv = self.func(expr, *self.variable_count, **hints) if rv!= self and rv.has(Derivative): rv = rv.doit(**hints) return rv @_sympifyit('z0', NotImplementedError) def doit_numerically(self, z0): """ Evaluate the derivative at z numerically. When we can represent derivatives at a point, this should be folded into the normal evalf. For now, we need a special method. """ if len(self.free_symbols) != 1 or len(self.variables) != 1: raise NotImplementedError('partials and higher order derivatives') z = list(self.free_symbols)[0] def eval(x): f0 = self.expr.subs(z, Expr._from_mpmath(x, prec=mpmath.mp.prec)) f0 = f0.evalf(mlib.libmpf.prec_to_dps(mpmath.mp.prec)) return f0._to_mpmath(mpmath.mp.prec) return Expr._from_mpmath(mpmath.diff(eval, z0._to_mpmath(mpmath.mp.prec)), mpmath.mp.prec) @property def expr(self): return self._args[0] @property def _wrt_variables(self): # return the variables of differentiation without # respect to the type of count (int or symbolic) return [i[0] for i in self.variable_count] @property def variables(self): # TODO: deprecate? YES, make this 'enumerated_variables' and # name _wrt_variables as variables # TODO: support for `d^n`? rv = [] for v, count in self.variable_count: if not count.is_Integer: raise TypeError(filldedent(''' Cannot give expansion for symbolic count. If you just want a list of all variables of differentiation, use _wrt_variables.''')) rv.extend([v]*count) return tuple(rv) @property def variable_count(self): return self._args[1:] @property def derivative_count(self): return sum([count for var, count in self.variable_count], 0) @property def free_symbols(self): return self.expr.free_symbols def _eval_subs(self, old, new): # The substitution (old, new) cannot be done inside # Derivative(expr, vars) for a variety of reasons # as handled below. if old in self._wrt_variables: # first handle the counts expr = self.func(self.expr, *[(v, c.subs(old, new)) for v, c in self.variable_count]) if expr != self: return expr._eval_subs(old, new) # quick exit case if not getattr(new, '_diff_wrt', False): # case (0): new is not a valid variable of # differentiation if isinstance(old, Symbol): # don't introduce a new symbol if the old will do return Subs(self, old, new) else: xi = Dummy('xi') return Subs(self.xreplace({old: xi}), xi, new) # If both are Derivatives with the same expr, check if old is # equivalent to self or if old is a subderivative of self. if old.is_Derivative and old.expr == self.expr: if self.canonical == old.canonical: return new # collections.Counter doesn't have __le__ def _subset(a, b): return all((a[i] <= b[i]) == True for i in a) old_vars = Counter(dict(reversed(old.variable_count))) self_vars = Counter(dict(reversed(self.variable_count))) if _subset(old_vars, self_vars): return Derivative(new, *(self_vars - old_vars).items()).canonical args = list(self.args) newargs = list(x._subs(old, new) for x in args) if args[0] == old: # complete replacement of self.expr # we already checked that the new is valid so we know # it won't be a problem should it appear in variables return Derivative(*newargs) if newargs[0] != args[0]: # case (1) can't change expr by introducing something that is in # the _wrt_variables if it was already in the expr # e.g. # for Derivative(f(x, g(y)), y), x cannot be replaced with # anything that has y in it; for f(g(x), g(y)).diff(g(y)) # g(x) cannot be replaced with anything that has g(y) syms = {vi: Dummy() for vi in self._wrt_variables if not vi.is_Symbol} wrt = set(syms.get(vi, vi) for vi in self._wrt_variables) forbidden = args[0].xreplace(syms).free_symbols & wrt nfree = new.xreplace(syms).free_symbols ofree = old.xreplace(syms).free_symbols if (nfree - ofree) & forbidden: return Subs(self, old, new) viter = ((i, j) for ((i, _), (j, _)) in zip(newargs[1:], args[1:])) if any(i != j for i, j in viter): # a wrt-variable change # case (2) can't change vars by introducing a variable # that is contained in expr, e.g. # for Derivative(f(z, g(h(x), y)), y), y cannot be changed to # x, h(x), or g(h(x), y) for a in _atomic(self.expr, recursive=True): for i in range(1, len(newargs)): vi, _ = newargs[i] if a == vi and vi != args[i][0]: return Subs(self, old, new) # more arg-wise checks vc = newargs[1:] oldv = self._wrt_variables newe = self.expr subs = [] for i, (vi, ci) in enumerate(vc): if not vi._diff_wrt: # case (3) invalid differentiation expression so # create a replacement dummy xi = Dummy('xi_%i' % i) # replace the old valid variable with the dummy # in the expression newe = newe.xreplace({oldv[i]: xi}) # and replace the bad variable with the dummy vc[i] = (xi, ci) # and record the dummy with the new (invalid) # differentiation expression subs.append((xi, vi)) if subs: # handle any residual substitution in the expression newe = newe._subs(old, new) # return the Subs-wrapped derivative return Subs(Derivative(newe, *vc), *zip(*subs)) # everything was ok return Derivative(*newargs) def _eval_lseries(self, x, logx): dx = self.variables for term in self.expr.lseries(x, logx=logx): yield self.func(term, *dx) def _eval_nseries(self, x, n, logx): arg = self.expr.nseries(x, n=n, logx=logx) o = arg.getO() dx = self.variables rv = [self.func(a, *dx) for a in Add.make_args(arg.removeO())] if o: rv.append(o/x) return Add(*rv) def _eval_as_leading_term(self, x): series_gen = self.expr.lseries(x) d = S.Zero for leading_term in series_gen: d = diff(leading_term, *self.variables) if d != 0: break return d def _sage_(self): import sage.all as sage args = [arg._sage_() for arg in self.args] return sage.derivative(*args) def as_finite_difference(self, points=1, x0=None, wrt=None): """ Expresses a Derivative instance as a finite difference. Parameters ========== points : sequence or coefficient, optional If sequence: discrete values (length >= order+1) of the independent variable used for generating the finite difference weights. If it is a coefficient, it will be used as the step-size for generating an equidistant sequence of length order+1 centered around ``x0``. Default: 1 (step-size 1) x0 : number or Symbol, optional the value of the independent variable (``wrt``) at which the derivative is to be approximated. Default: same as ``wrt``. wrt : Symbol, optional "with respect to" the variable for which the (partial) derivative is to be approximated for. If not provided it is required that the derivative is ordinary. Default: ``None``. Examples ======== >>> from sympy import symbols, Function, exp, sqrt, Symbol >>> x, h = symbols('x h') >>> f = Function('f') >>> f(x).diff(x).as_finite_difference() -f(x - 1/2) + f(x + 1/2) The default step size and number of points are 1 and ``order + 1`` respectively. We can change the step size by passing a symbol as a parameter: >>> f(x).diff(x).as_finite_difference(h) -f(-h/2 + x)/h + f(h/2 + x)/h We can also specify the discretized values to be used in a sequence: >>> f(x).diff(x).as_finite_difference([x, x+h, x+2*h]) -3*f(x)/(2*h) + 2*f(h + x)/h - f(2*h + x)/(2*h) The algorithm is not restricted to use equidistant spacing, nor do we need to make the approximation around ``x0``, but we can get an expression estimating the derivative at an offset: >>> e, sq2 = exp(1), sqrt(2) >>> xl = [x-h, x+h, x+e*h] >>> f(x).diff(x, 1).as_finite_difference(xl, x+h*sq2) # doctest: +ELLIPSIS 2*h*((h + sqrt(2)*h)/(2*h) - (-sqrt(2)*h + h)/(2*h))*f(E*h + x)/... To approximate ``Derivative`` around ``x0`` using a non-equidistant spacing step, the algorithm supports assignment of undefined functions to ``points``: >>> dx = Function('dx') >>> f(x).diff(x).as_finite_difference(points=dx(x), x0=x-h) -f(-h + x - dx(-h + x)/2)/dx(-h + x) + f(-h + x + dx(-h + x)/2)/dx(-h + x) Partial derivatives are also supported: >>> y = Symbol('y') >>> d2fdxdy=f(x,y).diff(x,y) >>> d2fdxdy.as_finite_difference(wrt=x) -Derivative(f(x - 1/2, y), y) + Derivative(f(x + 1/2, y), y) We can apply ``as_finite_difference`` to ``Derivative`` instances in compound expressions using ``replace``: >>> (1 + 42**f(x).diff(x)).replace(lambda arg: arg.is_Derivative, ... lambda arg: arg.as_finite_difference()) 42**(-f(x - 1/2) + f(x + 1/2)) + 1 See also ======== sympy.calculus.finite_diff.apply_finite_diff sympy.calculus.finite_diff.differentiate_finite sympy.calculus.finite_diff.finite_diff_weights """ from ..calculus.finite_diff import _as_finite_diff return _as_finite_diff(self, points, x0, wrt) class Lambda(Expr): """ Lambda(x, expr) represents a lambda function similar to Python's 'lambda x: expr'. A function of several variables is written as Lambda((x, y, ...), expr). A simple example: >>> from sympy import Lambda >>> from sympy.abc import x >>> f = Lambda(x, x**2) >>> f(4) 16 For multivariate functions, use: >>> from sympy.abc import y, z, t >>> f2 = Lambda((x, y, z, t), x + y**z + t**z) >>> f2(1, 2, 3, 4) 73 A handy shortcut for lots of arguments: >>> p = x, y, z >>> f = Lambda(p, x + y*z) >>> f(*p) x + y*z """ is_Function = True def __new__(cls, variables, expr): from sympy.sets.sets import FiniteSet v = list(variables) if iterable(variables) else [variables] for i in v: if not getattr(i, 'is_symbol', False): raise TypeError('variable is not a symbol: %s' % i) if len(v) != len(set(v)): x = [i for i in v if v.count(i) > 1][0] raise SyntaxError("duplicate argument '%s' in Lambda args" % x) if len(v) == 1 and v[0] == expr: return S.IdentityFunction obj = Expr.__new__(cls, Tuple(*v), sympify(expr)) obj.nargs = FiniteSet(len(v)) return obj @property def variables(self): """The variables used in the internal representation of the function""" return self._args[0] bound_symbols = variables @property def expr(self): """The return value of the function""" return self._args[1] @property def free_symbols(self): return self.expr.free_symbols - set(self.variables) def __call__(self, *args): n = len(args) if n not in self.nargs: # Lambda only ever has 1 value in nargs # XXX: exception message must be in exactly this format to # make it work with NumPy's functions like vectorize(). See, # for example, https://github.com/numpy/numpy/issues/1697. # The ideal solution would be just to attach metadata to # the exception and change NumPy to take advantage of this. ## XXX does this apply to Lambda? If not, remove this comment. temp = ('%(name)s takes exactly %(args)s ' 'argument%(plural)s (%(given)s given)') raise TypeError(temp % { 'name': self, 'args': list(self.nargs)[0], 'plural': 's'*(list(self.nargs)[0] != 1), 'given': n}) return self.expr.xreplace(dict(list(zip(self.variables, args)))) def __eq__(self, other): if not isinstance(other, Lambda): return False if self.nargs != other.nargs: return False selfexpr = self.args[1] otherexpr = other.args[1] otherexpr = otherexpr.xreplace(dict(list(zip(other.args[0], self.args[0])))) return selfexpr == otherexpr def __ne__(self, other): return not(self == other) def __hash__(self): return super(Lambda, self).__hash__() def _hashable_content(self): return (self.expr.xreplace(self.canonical_variables),) @property def is_identity(self): """Return ``True`` if this ``Lambda`` is an identity function. """ if len(self.args) == 2: return self.args[0] == self.args[1] else: return None class Subs(Expr): """ Represents unevaluated substitutions of an expression. ``Subs(expr, x, x0)`` receives 3 arguments: an expression, a variable or list of distinct variables and a point or list of evaluation points corresponding to those variables. ``Subs`` objects are generally useful to represent unevaluated derivatives calculated at a point. The variables may be expressions, but they are subjected to the limitations of subs(), so it is usually a good practice to use only symbols for variables, since in that case there can be no ambiguity. There's no automatic expansion - use the method .doit() to effect all possible substitutions of the object and also of objects inside the expression. When evaluating derivatives at a point that is not a symbol, a Subs object is returned. One is also able to calculate derivatives of Subs objects - in this case the expression is always expanded (for the unevaluated form, use Derivative()). Examples ======== >>> from sympy import Subs, Function, sin, cos >>> from sympy.abc import x, y, z >>> f = Function('f') Subs are created when a particular substitution cannot be made. The x in the derivative cannot be replaced with 0 because 0 is not a valid variables of differentiation: >>> f(x).diff(x).subs(x, 0) Subs(Derivative(f(x), x), x, 0) Once f is known, the derivative and evaluation at 0 can be done: >>> _.subs(f, sin).doit() == sin(x).diff(x).subs(x, 0) == cos(0) True Subs can also be created directly with one or more variables: >>> Subs(f(x)*sin(y) + z, (x, y), (0, 1)) Subs(z + f(x)*sin(y), (x, y), (0, 1)) >>> _.doit() z + f(0)*sin(1) Notes ===== In order to allow expressions to combine before doit is done, a representation of the Subs expression is used internally to make expressions that are superficially different compare the same: >>> a, b = Subs(x, x, 0), Subs(y, y, 0) >>> a + b 2*Subs(x, x, 0) This can lead to unexpected consequences when using methods like `has` that are cached: >>> s = Subs(x, x, 0) >>> s.has(x), s.has(y) (True, False) >>> ss = s.subs(x, y) >>> ss.has(x), ss.has(y) (True, False) >>> s, ss (Subs(x, x, 0), Subs(y, y, 0)) """ def __new__(cls, expr, variables, point, **assumptions): from sympy import Symbol if not is_sequence(variables, Tuple): variables = [variables] variables = Tuple(*variables) if has_dups(variables): repeated = [str(v) for v, i in Counter(variables).items() if i > 1] __ = ', '.join(repeated) raise ValueError(filldedent(''' The following expressions appear more than once: %s ''' % __)) point = Tuple(*(point if is_sequence(point, Tuple) else [point])) if len(point) != len(variables): raise ValueError('Number of point values must be the same as ' 'the number of variables.') if not point: return sympify(expr) # denest if isinstance(expr, Subs): variables = expr.variables + variables point = expr.point + point expr = expr.expr else: expr = sympify(expr) # use symbols with names equal to the point value (with prepended _) # to give a variable-independent expression pre = "_" pts = sorted(set(point), key=default_sort_key) from sympy.printing import StrPrinter class CustomStrPrinter(StrPrinter): def _print_Dummy(self, expr): return str(expr) + str(expr.dummy_index) def mystr(expr, **settings): p = CustomStrPrinter(settings) return p.doprint(expr) while 1: s_pts = {p: Symbol(pre + mystr(p)) for p in pts} reps = [(v, s_pts[p]) for v, p in zip(variables, point)] # if any underscore-prepended symbol is already a free symbol # and is a variable with a different point value, then there # is a clash, e.g. _0 clashes in Subs(_0 + _1, (_0, _1), (1, 0)) # because the new symbol that would be created is _1 but _1 # is already mapped to 0 so __0 and __1 are used for the new # symbols if any(r in expr.free_symbols and r in variables and Symbol(pre + mystr(point[variables.index(r)])) != r for _, r in reps): pre += "_" continue break obj = Expr.__new__(cls, expr, Tuple(*variables), point) obj._expr = expr.xreplace(dict(reps)) return obj def _eval_is_commutative(self): return self.expr.is_commutative def doit(self, **hints): e, v, p = self.args # remove self mappings for i, (vi, pi) in enumerate(zip(v, p)): if vi == pi: v = v[:i] + v[i + 1:] p = p[:i] + p[i + 1:] if not v: return self.expr if isinstance(e, Derivative): # apply functions first, e.g. f -> cos undone = [] for i, vi in enumerate(v): if isinstance(vi, FunctionClass): e = e.subs(vi, p[i]) else: undone.append((vi, p[i])) if not isinstance(e, Derivative): e = e.doit() if isinstance(e, Derivative): # do Subs that aren't related to differentiation undone2 = [] D = Dummy() for vi, pi in undone: if D not in e.xreplace({vi: D}).free_symbols: e = e.subs(vi, pi) else: undone2.append((vi, pi)) undone = undone2 # differentiate wrt variables that are present wrt = [] D = Dummy() expr = e.expr free = expr.free_symbols for vi, ci in e.variable_count: if isinstance(vi, Symbol) and vi in free: expr = expr.diff((vi, ci)) elif D in expr.subs(vi, D).free_symbols: expr = expr.diff((vi, ci)) else: wrt.append((vi, ci)) # inject remaining subs rv = expr.subs(undone) # do remaining differentiation *in order given* for vc in wrt: rv = rv.diff(vc) else: # inject remaining subs rv = e.subs(undone) else: rv = e.doit(**hints).subs(list(zip(v, p))) if hints.get('deep', True) and rv != self: rv = rv.doit(**hints) return rv def evalf(self, prec=None, **options): return self.doit().evalf(prec, **options) n = evalf @property def variables(self): """The variables to be evaluated""" return self._args[1] bound_symbols = variables @property def expr(self): """The expression on which the substitution operates""" return self._args[0] @property def point(self): """The values for which the variables are to be substituted""" return self._args[2] @property def free_symbols(self): return (self.expr.free_symbols - set(self.variables) | set(self.point.free_symbols)) @property def expr_free_symbols(self): return (self.expr.expr_free_symbols - set(self.variables) | set(self.point.expr_free_symbols)) def __eq__(self, other): if not isinstance(other, Subs): return False return self._hashable_content() == other._hashable_content() def __ne__(self, other): return not(self == other) def __hash__(self): return super(Subs, self).__hash__() def _hashable_content(self): return (self._expr.xreplace(self.canonical_variables), ) + tuple(ordered([(v, p) for v, p in zip(self.variables, self.point) if not self.expr.has(v)])) def _eval_subs(self, old, new): # Subs doit will do the variables in order; the semantics # of subs for Subs is have the following invariant for # Subs object foo: # foo.doit().subs(reps) == foo.subs(reps).doit() pt = list(self.point) if old in self.variables: if _atomic(new) == set([new]) and not any( i.has(new) for i in self.args): # the substitution is neutral return self.xreplace({old: new}) # any occurrence of old before this point will get # handled by replacements from here on i = self.variables.index(old) for j in range(i, len(self.variables)): pt[j] = pt[j]._subs(old, new) return self.func(self.expr, self.variables, pt) v = [i._subs(old, new) for i in self.variables] if v != list(self.variables): return self.func(self.expr, self.variables + (old,), pt + [new]) expr = self.expr._subs(old, new) pt = [i._subs(old, new) for i in self.point] return self.func(expr, v, pt) def _eval_derivative(self, s): # Apply the chain rule of the derivative on the substitution variables: val = Add.fromiter(p.diff(s) * Subs(self.expr.diff(v), self.variables, self.point).doit() for v, p in zip(self.variables, self.point)) # Check if there are free symbols in `self.expr`: # First get the `expr_free_symbols`, which returns the free symbols # that are directly contained in an expression node (i.e. stop # searching if the node isn't an expression). At this point turn the # expressions into `free_symbols` and check if there are common free # symbols in `self.expr` and the deriving factor. fs1 = {j for i in self.expr_free_symbols for j in i.free_symbols} if len(fs1 & s.free_symbols) > 0: val += Subs(self.expr.diff(s), self.variables, self.point).doit() return val def _eval_nseries(self, x, n, logx): if x in self.point: # x is the variable being substituted into apos = self.point.index(x) other = self.variables[apos] else: other = x arg = self.expr.nseries(other, n=n, logx=logx) o = arg.getO() terms = Add.make_args(arg.removeO()) rv = Add(*[self.func(a, *self.args[1:]) for a in terms]) if o: rv += o.subs(other, x) return rv def _eval_as_leading_term(self, x): if x in self.point: ipos = self.point.index(x) xvar = self.variables[ipos] return self.expr.as_leading_term(xvar) if x in self.variables: # if `x` is a dummy variable, it means it won't exist after the # substitution has been performed: return self # The variable is independent of the substitution: return self.expr.as_leading_term(x) def diff(f, *symbols, **kwargs): """ Differentiate f with respect to symbols. This is just a wrapper to unify .diff() and the Derivative class; its interface is similar to that of integrate(). You can use the same shortcuts for multiple variables as with Derivative. For example, diff(f(x), x, x, x) and diff(f(x), x, 3) both return the third derivative of f(x). You can pass evaluate=False to get an unevaluated Derivative class. Note that if there are 0 symbols (such as diff(f(x), x, 0), then the result will be the function (the zeroth derivative), even if evaluate=False. Examples ======== >>> from sympy import sin, cos, Function, diff >>> from sympy.abc import x, y >>> f = Function('f') >>> diff(sin(x), x) cos(x) >>> diff(f(x), x, x, x) Derivative(f(x), (x, 3)) >>> diff(f(x), x, 3) Derivative(f(x), (x, 3)) >>> diff(sin(x)*cos(y), x, 2, y, 2) sin(x)*cos(y) >>> type(diff(sin(x), x)) cos >>> type(diff(sin(x), x, evaluate=False)) <class 'sympy.core.function.Derivative'> >>> type(diff(sin(x), x, 0)) sin >>> type(diff(sin(x), x, 0, evaluate=False)) sin >>> diff(sin(x)) cos(x) >>> diff(sin(x*y)) Traceback (most recent call last): ... ValueError: specify differentiation variables to differentiate sin(x*y) Note that ``diff(sin(x))`` syntax is meant only for convenience in interactive sessions and should be avoided in library code. References ========== http://reference.wolfram.com/legacy/v5_2/Built-inFunctions/AlgebraicComputation/Calculus/D.html See Also ======== Derivative sympy.geometry.util.idiff: computes the derivative implicitly """ if hasattr(f, 'diff'): return f.diff(*symbols, **kwargs) kwargs.setdefault('evaluate', True) return Derivative(f, *symbols, **kwargs) def expand(e, deep=True, modulus=None, power_base=True, power_exp=True, mul=True, log=True, multinomial=True, basic=True, **hints): r""" Expand an expression using methods given as hints. Hints evaluated unless explicitly set to False are: ``basic``, ``log``, ``multinomial``, ``mul``, ``power_base``, and ``power_exp`` The following hints are supported but not applied unless set to True: ``complex``, ``func``, and ``trig``. In addition, the following meta-hints are supported by some or all of the other hints: ``frac``, ``numer``, ``denom``, ``modulus``, and ``force``. ``deep`` is supported by all hints. Additionally, subclasses of Expr may define their own hints or meta-hints. The ``basic`` hint is used for any special rewriting of an object that should be done automatically (along with the other hints like ``mul``) when expand is called. This is a catch-all hint to handle any sort of expansion that may not be described by the existing hint names. To use this hint an object should override the ``_eval_expand_basic`` method. Objects may also define their own expand methods, which are not run by default. See the API section below. If ``deep`` is set to ``True`` (the default), things like arguments of functions are recursively expanded. Use ``deep=False`` to only expand on the top level. If the ``force`` hint is used, assumptions about variables will be ignored in making the expansion. Hints ===== These hints are run by default mul --- Distributes multiplication over addition: >>> from sympy import cos, exp, sin >>> from sympy.abc import x, y, z >>> (y*(x + z)).expand(mul=True) x*y + y*z multinomial ----------- Expand (x + y + ...)**n where n is a positive integer. >>> ((x + y + z)**2).expand(multinomial=True) x**2 + 2*x*y + 2*x*z + y**2 + 2*y*z + z**2 power_exp --------- Expand addition in exponents into multiplied bases. >>> exp(x + y).expand(power_exp=True) exp(x)*exp(y) >>> (2**(x + y)).expand(power_exp=True) 2**x*2**y power_base ---------- Split powers of multiplied bases. This only happens by default if assumptions allow, or if the ``force`` meta-hint is used: >>> ((x*y)**z).expand(power_base=True) (x*y)**z >>> ((x*y)**z).expand(power_base=True, force=True) x**z*y**z >>> ((2*y)**z).expand(power_base=True) 2**z*y**z Note that in some cases where this expansion always holds, SymPy performs it automatically: >>> (x*y)**2 x**2*y**2 log --- Pull out power of an argument as a coefficient and split logs products into sums of logs. Note that these only work if the arguments of the log function have the proper assumptions--the arguments must be positive and the exponents must be real--or else the ``force`` hint must be True: >>> from sympy import log, symbols >>> log(x**2*y).expand(log=True) log(x**2*y) >>> log(x**2*y).expand(log=True, force=True) 2*log(x) + log(y) >>> x, y = symbols('x,y', positive=True) >>> log(x**2*y).expand(log=True) 2*log(x) + log(y) basic ----- This hint is intended primarily as a way for custom subclasses to enable expansion by default. These hints are not run by default: complex ------- Split an expression into real and imaginary parts. >>> x, y = symbols('x,y') >>> (x + y).expand(complex=True) re(x) + re(y) + I*im(x) + I*im(y) >>> cos(x).expand(complex=True) -I*sin(re(x))*sinh(im(x)) + cos(re(x))*cosh(im(x)) Note that this is just a wrapper around ``as_real_imag()``. Most objects that wish to redefine ``_eval_expand_complex()`` should consider redefining ``as_real_imag()`` instead. func ---- Expand other functions. >>> from sympy import gamma >>> gamma(x + 1).expand(func=True) x*gamma(x) trig ---- Do trigonometric expansions. >>> cos(x + y).expand(trig=True) -sin(x)*sin(y) + cos(x)*cos(y) >>> sin(2*x).expand(trig=True) 2*sin(x)*cos(x) Note that the forms of ``sin(n*x)`` and ``cos(n*x)`` in terms of ``sin(x)`` and ``cos(x)`` are not unique, due to the identity `\sin^2(x) + \cos^2(x) = 1`. The current implementation uses the form obtained from Chebyshev polynomials, but this may change. See `this MathWorld article <http://mathworld.wolfram.com/Multiple-AngleFormulas.html>`_ for more information. Notes ===== - You can shut off unwanted methods:: >>> (exp(x + y)*(x + y)).expand() x*exp(x)*exp(y) + y*exp(x)*exp(y) >>> (exp(x + y)*(x + y)).expand(power_exp=False) x*exp(x + y) + y*exp(x + y) >>> (exp(x + y)*(x + y)).expand(mul=False) (x + y)*exp(x)*exp(y) - Use deep=False to only expand on the top level:: >>> exp(x + exp(x + y)).expand() exp(x)*exp(exp(x)*exp(y)) >>> exp(x + exp(x + y)).expand(deep=False) exp(x)*exp(exp(x + y)) - Hints are applied in an arbitrary, but consistent order (in the current implementation, they are applied in alphabetical order, except multinomial comes before mul, but this may change). Because of this, some hints may prevent expansion by other hints if they are applied first. For example, ``mul`` may distribute multiplications and prevent ``log`` and ``power_base`` from expanding them. Also, if ``mul`` is applied before ``multinomial`, the expression might not be fully distributed. The solution is to use the various ``expand_hint`` helper functions or to use ``hint=False`` to this function to finely control which hints are applied. Here are some examples:: >>> from sympy import expand, expand_mul, expand_power_base >>> x, y, z = symbols('x,y,z', positive=True) >>> expand(log(x*(y + z))) log(x) + log(y + z) Here, we see that ``log`` was applied before ``mul``. To get the mul expanded form, either of the following will work:: >>> expand_mul(log(x*(y + z))) log(x*y + x*z) >>> expand(log(x*(y + z)), log=False) log(x*y + x*z) A similar thing can happen with the ``power_base`` hint:: >>> expand((x*(y + z))**x) (x*y + x*z)**x To get the ``power_base`` expanded form, either of the following will work:: >>> expand((x*(y + z))**x, mul=False) x**x*(y + z)**x >>> expand_power_base((x*(y + z))**x) x**x*(y + z)**x >>> expand((x + y)*y/x) y + y**2/x The parts of a rational expression can be targeted:: >>> expand((x + y)*y/x/(x + 1), frac=True) (x*y + y**2)/(x**2 + x) >>> expand((x + y)*y/x/(x + 1), numer=True) (x*y + y**2)/(x*(x + 1)) >>> expand((x + y)*y/x/(x + 1), denom=True) y*(x + y)/(x**2 + x) - The ``modulus`` meta-hint can be used to reduce the coefficients of an expression post-expansion:: >>> expand((3*x + 1)**2) 9*x**2 + 6*x + 1 >>> expand((3*x + 1)**2, modulus=5) 4*x**2 + x + 1 - Either ``expand()`` the function or ``.expand()`` the method can be used. Both are equivalent:: >>> expand((x + 1)**2) x**2 + 2*x + 1 >>> ((x + 1)**2).expand() x**2 + 2*x + 1 API === Objects can define their own expand hints by defining ``_eval_expand_hint()``. The function should take the form:: def _eval_expand_hint(self, **hints): # Only apply the method to the top-level expression ... See also the example below. Objects should define ``_eval_expand_hint()`` methods only if ``hint`` applies to that specific object. The generic ``_eval_expand_hint()`` method defined in Expr will handle the no-op case. Each hint should be responsible for expanding that hint only. Furthermore, the expansion should be applied to the top-level expression only. ``expand()`` takes care of the recursion that happens when ``deep=True``. You should only call ``_eval_expand_hint()`` methods directly if you are 100% sure that the object has the method, as otherwise you are liable to get unexpected ``AttributeError``s. Note, again, that you do not need to recursively apply the hint to args of your object: this is handled automatically by ``expand()``. ``_eval_expand_hint()`` should generally not be used at all outside of an ``_eval_expand_hint()`` method. If you want to apply a specific expansion from within another method, use the public ``expand()`` function, method, or ``expand_hint()`` functions. In order for expand to work, objects must be rebuildable by their args, i.e., ``obj.func(*obj.args) == obj`` must hold. Expand methods are passed ``**hints`` so that expand hints may use 'metahints'--hints that control how different expand methods are applied. For example, the ``force=True`` hint described above that causes ``expand(log=True)`` to ignore assumptions is such a metahint. The ``deep`` meta-hint is handled exclusively by ``expand()`` and is not passed to ``_eval_expand_hint()`` methods. Note that expansion hints should generally be methods that perform some kind of 'expansion'. For hints that simply rewrite an expression, use the .rewrite() API. Examples ======== >>> from sympy import Expr, sympify >>> class MyClass(Expr): ... def __new__(cls, *args): ... args = sympify(args) ... return Expr.__new__(cls, *args) ... ... def _eval_expand_double(self, **hints): ... ''' ... Doubles the args of MyClass. ... ... If there more than four args, doubling is not performed, ... unless force=True is also used (False by default). ... ''' ... force = hints.pop('force', False) ... if not force and len(self.args) > 4: ... return self ... return self.func(*(self.args + self.args)) ... >>> a = MyClass(1, 2, MyClass(3, 4)) >>> a MyClass(1, 2, MyClass(3, 4)) >>> a.expand(double=True) MyClass(1, 2, MyClass(3, 4, 3, 4), 1, 2, MyClass(3, 4, 3, 4)) >>> a.expand(double=True, deep=False) MyClass(1, 2, MyClass(3, 4), 1, 2, MyClass(3, 4)) >>> b = MyClass(1, 2, 3, 4, 5) >>> b.expand(double=True) MyClass(1, 2, 3, 4, 5) >>> b.expand(double=True, force=True) MyClass(1, 2, 3, 4, 5, 1, 2, 3, 4, 5) See Also ======== expand_log, expand_mul, expand_multinomial, expand_complex, expand_trig, expand_power_base, expand_power_exp, expand_func, hyperexpand """ # don't modify this; modify the Expr.expand method hints['power_base'] = power_base hints['power_exp'] = power_exp hints['mul'] = mul hints['log'] = log hints['multinomial'] = multinomial hints['basic'] = basic return sympify(e).expand(deep=deep, modulus=modulus, **hints) # This is a special application of two hints def _mexpand(expr, recursive=False): # expand multinomials and then expand products; this may not always # be sufficient to give a fully expanded expression (see # test_issue_8247_8354 in test_arit) if expr is None: return was = None while was != expr: was, expr = expr, expand_mul(expand_multinomial(expr)) if not recursive: break return expr # These are simple wrappers around single hints. def expand_mul(expr, deep=True): """ Wrapper around expand that only uses the mul hint. See the expand docstring for more information. Examples ======== >>> from sympy import symbols, expand_mul, exp, log >>> x, y = symbols('x,y', positive=True) >>> expand_mul(exp(x+y)*(x+y)*log(x*y**2)) x*exp(x + y)*log(x*y**2) + y*exp(x + y)*log(x*y**2) """ return sympify(expr).expand(deep=deep, mul=True, power_exp=False, power_base=False, basic=False, multinomial=False, log=False) def expand_multinomial(expr, deep=True): """ Wrapper around expand that only uses the multinomial hint. See the expand docstring for more information. Examples ======== >>> from sympy import symbols, expand_multinomial, exp >>> x, y = symbols('x y', positive=True) >>> expand_multinomial((x + exp(x + 1))**2) x**2 + 2*x*exp(x + 1) + exp(2*x + 2) """ return sympify(expr).expand(deep=deep, mul=False, power_exp=False, power_base=False, basic=False, multinomial=True, log=False) def expand_log(expr, deep=True, force=False): """ Wrapper around expand that only uses the log hint. See the expand docstring for more information. Examples ======== >>> from sympy import symbols, expand_log, exp, log >>> x, y = symbols('x,y', positive=True) >>> expand_log(exp(x+y)*(x+y)*log(x*y**2)) (x + y)*(log(x) + 2*log(y))*exp(x + y) """ return sympify(expr).expand(deep=deep, log=True, mul=False, power_exp=False, power_base=False, multinomial=False, basic=False, force=force) def expand_func(expr, deep=True): """ Wrapper around expand that only uses the func hint. See the expand docstring for more information. Examples ======== >>> from sympy import expand_func, gamma >>> from sympy.abc import x >>> expand_func(gamma(x + 2)) x*(x + 1)*gamma(x) """ return sympify(expr).expand(deep=deep, func=True, basic=False, log=False, mul=False, power_exp=False, power_base=False, multinomial=False) def expand_trig(expr, deep=True): """ Wrapper around expand that only uses the trig hint. See the expand docstring for more information. Examples ======== >>> from sympy import expand_trig, sin >>> from sympy.abc import x, y >>> expand_trig(sin(x+y)*(x+y)) (x + y)*(sin(x)*cos(y) + sin(y)*cos(x)) """ return sympify(expr).expand(deep=deep, trig=True, basic=False, log=False, mul=False, power_exp=False, power_base=False, multinomial=False) def expand_complex(expr, deep=True): """ Wrapper around expand that only uses the complex hint. See the expand docstring for more information. Examples ======== >>> from sympy import expand_complex, exp, sqrt, I >>> from sympy.abc import z >>> expand_complex(exp(z)) I*exp(re(z))*sin(im(z)) + exp(re(z))*cos(im(z)) >>> expand_complex(sqrt(I)) sqrt(2)/2 + sqrt(2)*I/2 See Also ======== Expr.as_real_imag """ return sympify(expr).expand(deep=deep, complex=True, basic=False, log=False, mul=False, power_exp=False, power_base=False, multinomial=False) def expand_power_base(expr, deep=True, force=False): """ Wrapper around expand that only uses the power_base hint. See the expand docstring for more information. A wrapper to expand(power_base=True) which separates a power with a base that is a Mul into a product of powers, without performing any other expansions, provided that assumptions about the power's base and exponent allow. deep=False (default is True) will only apply to the top-level expression. force=True (default is False) will cause the expansion to ignore assumptions about the base and exponent. When False, the expansion will only happen if the base is non-negative or the exponent is an integer. >>> from sympy.abc import x, y, z >>> from sympy import expand_power_base, sin, cos, exp >>> (x*y)**2 x**2*y**2 >>> (2*x)**y (2*x)**y >>> expand_power_base(_) 2**y*x**y >>> expand_power_base((x*y)**z) (x*y)**z >>> expand_power_base((x*y)**z, force=True) x**z*y**z >>> expand_power_base(sin((x*y)**z), deep=False) sin((x*y)**z) >>> expand_power_base(sin((x*y)**z), force=True) sin(x**z*y**z) >>> expand_power_base((2*sin(x))**y + (2*cos(x))**y) 2**y*sin(x)**y + 2**y*cos(x)**y >>> expand_power_base((2*exp(y))**x) 2**x*exp(y)**x >>> expand_power_base((2*cos(x))**y) 2**y*cos(x)**y Notice that sums are left untouched. If this is not the desired behavior, apply full ``expand()`` to the expression: >>> expand_power_base(((x+y)*z)**2) z**2*(x + y)**2 >>> (((x+y)*z)**2).expand() x**2*z**2 + 2*x*y*z**2 + y**2*z**2 >>> expand_power_base((2*y)**(1+z)) 2**(z + 1)*y**(z + 1) >>> ((2*y)**(1+z)).expand() 2*2**z*y*y**z """ return sympify(expr).expand(deep=deep, log=False, mul=False, power_exp=False, power_base=True, multinomial=False, basic=False, force=force) def expand_power_exp(expr, deep=True): """ Wrapper around expand that only uses the power_exp hint. See the expand docstring for more information. Examples ======== >>> from sympy import expand_power_exp >>> from sympy.abc import x, y >>> expand_power_exp(x**(y + 2)) x**2*x**y """ return sympify(expr).expand(deep=deep, complex=False, basic=False, log=False, mul=False, power_exp=True, power_base=False, multinomial=False) def count_ops(expr, visual=False): """ Return a representation (integer or expression) of the operations in expr. If ``visual`` is ``False`` (default) then the sum of the coefficients of the visual expression will be returned. If ``visual`` is ``True`` then the number of each type of operation is shown with the core class types (or their virtual equivalent) multiplied by the number of times they occur. If expr is an iterable, the sum of the op counts of the items will be returned. Examples ======== >>> from sympy.abc import a, b, x, y >>> from sympy import sin, count_ops Although there isn't a SUB object, minus signs are interpreted as either negations or subtractions: >>> (x - y).count_ops(visual=True) SUB >>> (-x).count_ops(visual=True) NEG Here, there are two Adds and a Pow: >>> (1 + a + b**2).count_ops(visual=True) 2*ADD + POW In the following, an Add, Mul, Pow and two functions: >>> (sin(x)*x + sin(x)**2).count_ops(visual=True) ADD + MUL + POW + 2*SIN for a total of 5: >>> (sin(x)*x + sin(x)**2).count_ops(visual=False) 5 Note that "what you type" is not always what you get. The expression 1/x/y is translated by sympy into 1/(x*y) so it gives a DIV and MUL rather than two DIVs: >>> (1/x/y).count_ops(visual=True) DIV + MUL The visual option can be used to demonstrate the difference in operations for expressions in different forms. Here, the Horner representation is compared with the expanded form of a polynomial: >>> eq=x*(1 + x*(2 + x*(3 + x))) >>> count_ops(eq.expand(), visual=True) - count_ops(eq, visual=True) -MUL + 3*POW The count_ops function also handles iterables: >>> count_ops([x, sin(x), None, True, x + 2], visual=False) 2 >>> count_ops([x, sin(x), None, True, x + 2], visual=True) ADD + SIN >>> count_ops({x: sin(x), x + 2: y + 1}, visual=True) 2*ADD + SIN """ from sympy import Integral, Symbol from sympy.core.relational import Relational from sympy.simplify.radsimp import fraction from sympy.logic.boolalg import BooleanFunction from sympy.utilities.misc import func_name expr = sympify(expr) if isinstance(expr, Expr) and not expr.is_Relational: ops = [] args = [expr] NEG = Symbol('NEG') DIV = Symbol('DIV') SUB = Symbol('SUB') ADD = Symbol('ADD') while args: a = args.pop() if a.is_Rational: #-1/3 = NEG + DIV if a is not S.One: if a.p < 0: ops.append(NEG) if a.q != 1: ops.append(DIV) continue elif a.is_Mul or a.is_MatMul: if _coeff_isneg(a): ops.append(NEG) if a.args[0] is S.NegativeOne: a = a.as_two_terms()[1] else: a = -a n, d = fraction(a) if n.is_Integer: ops.append(DIV) if n < 0: ops.append(NEG) args.append(d) continue # won't be -Mul but could be Add elif d is not S.One: if not d.is_Integer: args.append(d) ops.append(DIV) args.append(n) continue # could be -Mul elif a.is_Add or a.is_MatAdd: aargs = list(a.args) negs = 0 for i, ai in enumerate(aargs): if _coeff_isneg(ai): negs += 1 args.append(-ai) if i > 0: ops.append(SUB) else: args.append(ai) if i > 0: ops.append(ADD) if negs == len(aargs): # -x - y = NEG + SUB ops.append(NEG) elif _coeff_isneg(aargs[0]): # -x + y = SUB, but already recorded ADD ops.append(SUB - ADD) continue if a.is_Pow and a.exp is S.NegativeOne: ops.append(DIV) args.append(a.base) # won't be -Mul but could be Add continue if (a.is_Mul or a.is_Pow or a.is_Function or isinstance(a, Derivative) or isinstance(a, Integral)): o = Symbol(a.func.__name__.upper()) # count the args if (a.is_Mul or isinstance(a, LatticeOp)): ops.append(o*(len(a.args) - 1)) else: ops.append(o) if not a.is_Symbol: args.extend(a.args) elif isinstance(expr, Dict): ops = [count_ops(k, visual=visual) + count_ops(v, visual=visual) for k, v in expr.items()] elif iterable(expr): ops = [count_ops(i, visual=visual) for i in expr] elif isinstance(expr, (Relational, BooleanFunction)): ops = [] for arg in expr.args: ops.append(count_ops(arg, visual=True)) o = Symbol(func_name(expr, short=True).upper()) ops.append(o) elif not isinstance(expr, Basic): ops = [] else: # it's Basic not isinstance(expr, Expr): if not isinstance(expr, Basic): raise TypeError("Invalid type of expr") else: ops = [] args = [expr] while args: a = args.pop() if a.args: o = Symbol(a.func.__name__.upper()) if a.is_Boolean: ops.append(o*(len(a.args)-1)) else: ops.append(o) args.extend(a.args) if not ops: if visual: return S.Zero return 0 ops = Add(*ops) if visual: return ops if ops.is_Number: return int(ops) return sum(int((a.args or [1])[0]) for a in Add.make_args(ops)) def nfloat(expr, n=15, exponent=False, dkeys=False): """Make all Rationals in expr Floats except those in exponents (unless the exponents flag is set to True). When processing dictionaries, don't modify the keys unless ``dkeys=True``. Examples ======== >>> from sympy.core.function import nfloat >>> from sympy.abc import x, y >>> from sympy import cos, pi, sqrt >>> nfloat(x**4 + x/2 + cos(pi/3) + 1 + sqrt(y)) x**4 + 0.5*x + sqrt(y) + 1.5 >>> nfloat(x**4 + sqrt(y), exponent=True) x**4.0 + y**0.5 Container types are not modified: >>> type(nfloat((1, 2))) is tuple True """ from sympy.core.power import Pow from sympy.polys.rootoftools import RootOf kw = dict(n=n, exponent=exponent, dkeys=dkeys) # handling of iterable containers if iterable(expr, exclude=string_types): if isinstance(expr, (dict, Dict)): if dkeys: args = [tuple(map(lambda i: nfloat(i, **kw), a)) for a in expr.items()] else: args = [(k, nfloat(v, **kw)) for k, v in expr.items()] if isinstance(expr, dict): return type(expr)(args) else: return expr.func(*args) elif isinstance(expr, Basic): return expr.func(*[nfloat(a, **kw) for a in expr.args]) return type(expr)([nfloat(a, **kw) for a in expr]) rv = sympify(expr) if rv.is_Number: return Float(rv, n) elif rv.is_number: # evalf doesn't always set the precision rv = rv.n(n) if rv.is_Number: rv = Float(rv.n(n), n) else: pass # pure_complex(rv) is likely True return rv elif rv.is_Atom: return rv # watch out for RootOf instances that don't like to have # their exponents replaced with Dummies and also sometimes have # problems with evaluating at low precision (issue 6393) rv = rv.xreplace({ro: ro.n(n) for ro in rv.atoms(RootOf)}) if not exponent: reps = [(p, Pow(p.base, Dummy())) for p in rv.atoms(Pow)] rv = rv.xreplace(dict(reps)) rv = rv.n(n) if not exponent: rv = rv.xreplace({d.exp: p.exp for p, d in reps}) else: # Pow._eval_evalf special cases Integer exponents so if # exponent is suppose to be handled we have to do so here rv = rv.xreplace(Transform( lambda x: Pow(x.base, Float(x.exp, n)), lambda x: x.is_Pow and x.exp.is_Integer)) return rv.xreplace(Transform( lambda x: x.func(*nfloat(x.args, n, exponent)), lambda x: isinstance(x, Function))) from sympy.core.symbol import Dummy, Symbol

b567dfb39f6ec0eb51d3b7b7f784f7abf73d72f96763baaf6c06f4bcb3a38e4c

from __future__ import print_function, division from collections import defaultdict from functools import cmp_to_key from .basic import Basic from .compatibility import reduce, is_sequence, range from .evaluate import global_distribute from .logic import _fuzzy_group, fuzzy_or, fuzzy_not from .singleton import S from .operations import AssocOp from .cache import cacheit from .numbers import ilcm, igcd from .expr import Expr # Key for sorting commutative args in canonical order _args_sortkey = cmp_to_key(Basic.compare) def _addsort(args): # in-place sorting of args args.sort(key=_args_sortkey) def _unevaluated_Add(*args): """Return a well-formed unevaluated Add: Numbers are collected and put in slot 0 and args are sorted. Use this when args have changed but you still want to return an unevaluated Add. Examples ======== >>> from sympy.core.add import _unevaluated_Add as uAdd >>> from sympy import S, Add >>> from sympy.abc import x, y >>> a = uAdd(*[S(1.0), x, S(2)]) >>> a.args[0] 3.00000000000000 >>> a.args[1] x Beyond the Number being in slot 0, there is no other assurance of order for the arguments since they are hash sorted. So, for testing purposes, output produced by this in some other function can only be tested against the output of this function or as one of several options: >>> opts = (Add(x, y, evaluated=False), Add(y, x, evaluated=False)) >>> a = uAdd(x, y) >>> assert a in opts and a == uAdd(x, y) >>> uAdd(x + 1, x + 2) x + x + 3 """ args = list(args) newargs = [] co = S.Zero while args: a = args.pop() if a.is_Add: # this will keep nesting from building up # so that x + (x + 1) -> x + x + 1 (3 args) args.extend(a.args) elif a.is_Number: co += a else: newargs.append(a) _addsort(newargs) if co: newargs.insert(0, co) return Add._from_args(newargs) class Add(Expr, AssocOp): __slots__ = [] is_Add = True @classmethod def flatten(cls, seq): """ Takes the sequence "seq" of nested Adds and returns a flatten list. Returns: (commutative_part, noncommutative_part, order_symbols) Applies associativity, all terms are commutable with respect to addition. NB: the removal of 0 is already handled by AssocOp.__new__ See also ======== sympy.core.mul.Mul.flatten """ from sympy.calculus.util import AccumBounds from sympy.matrices.expressions import MatrixExpr from sympy.tensor.tensor import TensExpr rv = None if len(seq) == 2: a, b = seq if b.is_Rational: a, b = b, a if a.is_Rational: if b.is_Mul: rv = [a, b], [], None if rv: if all(s.is_commutative for s in rv[0]): return rv return [], rv[0], None terms = {} # term -> coeff # e.g. x**2 -> 5 for ... + 5*x**2 + ... coeff = S.Zero # coefficient (Number or zoo) to always be in slot 0 # e.g. 3 + ... order_factors = [] extra = [] for o in seq: # O(x) if o.is_Order: for o1 in order_factors: if o1.contains(o): o = None break if o is None: continue order_factors = [o] + [ o1 for o1 in order_factors if not o.contains(o1)] continue # 3 or NaN elif o.is_Number: if (o is S.NaN or coeff is S.ComplexInfinity and o.is_finite is False) and not extra: # we know for sure the result will be nan return [S.NaN], [], None if coeff.is_Number: coeff += o if coeff is S.NaN and not extra: # we know for sure the result will be nan return [S.NaN], [], None continue elif isinstance(o, AccumBounds): coeff = o.__add__(coeff) continue elif isinstance(o, MatrixExpr): # can't add 0 to Matrix so make sure coeff is not 0 extra.append(o) continue elif isinstance(o, TensExpr): coeff = o.__add__(coeff) if coeff else o continue elif o is S.ComplexInfinity: if coeff.is_finite is False and not extra: # we know for sure the result will be nan return [S.NaN], [], None coeff = S.ComplexInfinity continue # Add([...]) elif o.is_Add: # NB: here we assume Add is always commutative seq.extend(o.args) # TODO zerocopy? continue # Mul([...]) elif o.is_Mul: c, s = o.as_coeff_Mul() # check for unevaluated Pow, e.g. 2**3 or 2**(-1/2) elif o.is_Pow: b, e = o.as_base_exp() if b.is_Number and (e.is_Integer or (e.is_Rational and e.is_negative)): seq.append(b**e) continue c, s = S.One, o else: # everything else c = S.One s = o # now we have: # o = c*s, where # # c is a Number # s is an expression with number factor extracted # let's collect terms with the same s, so e.g. # 2*x**2 + 3*x**2 -> 5*x**2 if s in terms: terms[s] += c if terms[s] is S.NaN and not extra: # we know for sure the result will be nan return [S.NaN], [], None else: terms[s] = c # now let's construct new args: # [2*x**2, x**3, 7*x**4, pi, ...] newseq = [] noncommutative = False for s, c in terms.items(): # 0*s if c is S.Zero: continue # 1*s elif c is S.One: newseq.append(s) # c*s else: if s.is_Mul: # Mul, already keeps its arguments in perfect order. # so we can simply put c in slot0 and go the fast way. cs = s._new_rawargs(*((c,) + s.args)) newseq.append(cs) elif s.is_Add: # we just re-create the unevaluated Mul newseq.append(Mul(c, s, evaluate=False)) else: # alternatively we have to call all Mul's machinery (slow) newseq.append(Mul(c, s)) noncommutative = noncommutative or not s.is_commutative # oo, -oo if coeff is S.Infinity: newseq = [f for f in newseq if not (f.is_extended_nonnegative or f.is_real)] elif coeff is S.NegativeInfinity: newseq = [f for f in newseq if not (f.is_extended_nonpositive or f.is_real)] if coeff is S.ComplexInfinity: # zoo might be # infinite_real + finite_im # finite_real + infinite_im # infinite_real + infinite_im # addition of a finite real or imaginary number won't be able to # change the zoo nature; adding an infinite qualtity would result # in a NaN condition if it had sign opposite of the infinite # portion of zoo, e.g., infinite_real - infinite_real. newseq = [c for c in newseq if not (c.is_finite and c.is_extended_real is not None)] # process O(x) if order_factors: newseq2 = [] for t in newseq: for o in order_factors: # x + O(x) -> O(x) if o.contains(t): t = None break # x + O(x**2) -> x + O(x**2) if t is not None: newseq2.append(t) newseq = newseq2 + order_factors # 1 + O(1) -> O(1) for o in order_factors: if o.contains(coeff): coeff = S.Zero break # order args canonically _addsort(newseq) # current code expects coeff to be first if coeff is not S.Zero: newseq.insert(0, coeff) if extra: newseq += extra noncommutative = True # we are done if noncommutative: return [], newseq, None else: return newseq, [], None @classmethod def class_key(cls): """Nice order of classes""" return 3, 1, cls.__name__ def as_coefficients_dict(a): """Return a dictionary mapping terms to their Rational coefficient. Since the dictionary is a defaultdict, inquiries about terms which were not present will return a coefficient of 0. If an expression is not an Add it is considered to have a single term. Examples ======== >>> from sympy.abc import a, x >>> (3*x + a*x + 4).as_coefficients_dict() {1: 4, x: 3, a*x: 1} >>> _[a] 0 >>> (3*a*x).as_coefficients_dict() {a*x: 3} """ d = defaultdict(list) for ai in a.args: c, m = ai.as_coeff_Mul() d[m].append(c) for k, v in d.items(): if len(v) == 1: d[k] = v[0] else: d[k] = Add(*v) di = defaultdict(int) di.update(d) return di @cacheit def as_coeff_add(self, *deps): """ Returns a tuple (coeff, args) where self is treated as an Add and coeff is the Number term and args is a tuple of all other terms. Examples ======== >>> from sympy.abc import x >>> (7 + 3*x).as_coeff_add() (7, (3*x,)) >>> (7*x).as_coeff_add() (0, (7*x,)) """ if deps: l1 = [] l2 = [] for f in self.args: if f.has(*deps): l2.append(f) else: l1.append(f) return self._new_rawargs(*l1), tuple(l2) coeff, notrat = self.args[0].as_coeff_add() if coeff is not S.Zero: return coeff, notrat + self.args[1:] return S.Zero, self.args def as_coeff_Add(self, rational=False): """Efficiently extract the coefficient of a summation. """ coeff, args = self.args[0], self.args[1:] if coeff.is_Number and not rational or coeff.is_Rational: return coeff, self._new_rawargs(*args) return S.Zero, self # Note, we intentionally do not implement Add.as_coeff_mul(). Rather, we # let Expr.as_coeff_mul() just always return (S.One, self) for an Add. See # issue 5524. def _eval_power(self, e): if e.is_Rational and self.is_number: from sympy.core.evalf import pure_complex from sympy.core.mul import _unevaluated_Mul from sympy.core.exprtools import factor_terms from sympy.core.function import expand_multinomial from sympy.functions.elementary.complexes import sign from sympy.functions.elementary.miscellaneous import sqrt ri = pure_complex(self) if ri: r, i = ri if e.q == 2: D = sqrt(r**2 + i**2) if D.is_Rational: # (r, i, D) is a Pythagorean triple root = sqrt(factor_terms((D - r)/2))**e.p return root*expand_multinomial(( # principle value (D + r)/abs(i) + sign(i)*S.ImaginaryUnit)**e.p) elif e == -1: return _unevaluated_Mul( r - i*S.ImaginaryUnit, 1/(r**2 + i**2)) elif e.is_Number and abs(e) != 1: # handle the Float case: (2.0 + 4*x)**e -> 2.**e*(1 + 2.0*x)**e c, m = zip(*[i.as_coeff_Mul() for i in self.args]) big = 0 float = False for i in c: float = float or i.is_Float if abs(i) > big: big = 1.0*abs(i) s = -1 if i < 0 else 1 if float and big and big != 1: addpow = Add(*[(s if abs(c[i]) == big else c[i]/big)*m[i] for i in range(len(c))])**e return big**e*addpow @cacheit def _eval_derivative(self, s): return self.func(*[a.diff(s) for a in self.args]) def _eval_nseries(self, x, n, logx): terms = [t.nseries(x, n=n, logx=logx) for t in self.args] return self.func(*terms) def _matches_simple(self, expr, repl_dict): # handle (w+3).matches('x+5') -> {w: x+2} coeff, terms = self.as_coeff_add() if len(terms) == 1: return terms[0].matches(expr - coeff, repl_dict) return def matches(self, expr, repl_dict={}, old=False): return AssocOp._matches_commutative(self, expr, repl_dict, old) @staticmethod def _combine_inverse(lhs, rhs): """ Returns lhs - rhs, but treats oo like a symbol so oo - oo returns 0, instead of a nan. """ from sympy.core.function import expand_mul from sympy.core.symbol import Dummy inf = (S.Infinity, S.NegativeInfinity) if lhs.has(*inf) or rhs.has(*inf): oo = Dummy('oo') reps = { S.Infinity: oo, S.NegativeInfinity: -oo} ireps = {v: k for k, v in reps.items()} eq = expand_mul(lhs.xreplace(reps) - rhs.xreplace(reps)) if eq.has(oo): eq = eq.replace( lambda x: x.is_Pow and x.base == oo, lambda x: x.base) return eq.xreplace(ireps) else: return expand_mul(lhs - rhs) @cacheit def as_two_terms(self): """Return head and tail of self. This is the most efficient way to get the head and tail of an expression. - if you want only the head, use self.args[0]; - if you want to process the arguments of the tail then use self.as_coef_add() which gives the head and a tuple containing the arguments of the tail when treated as an Add. - if you want the coefficient when self is treated as a Mul then use self.as_coeff_mul()[0] >>> from sympy.abc import x, y >>> (3*x - 2*y + 5).as_two_terms() (5, 3*x - 2*y) """ return self.args[0], self._new_rawargs(*self.args[1:]) def as_numer_denom(self): # clear rational denominator content, expr = self.primitive() ncon, dcon = content.as_numer_denom() # collect numerators and denominators of the terms nd = defaultdict(list) for f in expr.args: ni, di = f.as_numer_denom() nd[di].append(ni) # check for quick exit if len(nd) == 1: d, n = nd.popitem() return self.func( *[_keep_coeff(ncon, ni) for ni in n]), _keep_coeff(dcon, d) # sum up the terms having a common denominator for d, n in nd.items(): if len(n) == 1: nd[d] = n[0] else: nd[d] = self.func(*n) # assemble single numerator and denominator denoms, numers = [list(i) for i in zip(*iter(nd.items()))] n, d = self.func(*[Mul(*(denoms[:i] + [numers[i]] + denoms[i + 1:])) for i in range(len(numers))]), Mul(*denoms) return _keep_coeff(ncon, n), _keep_coeff(dcon, d) def _eval_is_polynomial(self, syms): return all(term._eval_is_polynomial(syms) for term in self.args) def _eval_is_rational_function(self, syms): return all(term._eval_is_rational_function(syms) for term in self.args) def _eval_is_algebraic_expr(self, syms): return all(term._eval_is_algebraic_expr(syms) for term in self.args) # assumption methods _eval_is_real = lambda self: _fuzzy_group( (a.is_real for a in self.args), quick_exit=True) _eval_is_extended_real = lambda self: _fuzzy_group( (a.is_extended_real for a in self.args), quick_exit=True) _eval_is_complex = lambda self: _fuzzy_group( (a.is_complex for a in self.args), quick_exit=True) _eval_is_antihermitian = lambda self: _fuzzy_group( (a.is_antihermitian for a in self.args), quick_exit=True) _eval_is_finite = lambda self: _fuzzy_group( (a.is_finite for a in self.args), quick_exit=True) _eval_is_hermitian = lambda self: _fuzzy_group( (a.is_hermitian for a in self.args), quick_exit=True) _eval_is_integer = lambda self: _fuzzy_group( (a.is_integer for a in self.args), quick_exit=True) _eval_is_rational = lambda self: _fuzzy_group( (a.is_rational for a in self.args), quick_exit=True) _eval_is_algebraic = lambda self: _fuzzy_group( (a.is_algebraic for a in self.args), quick_exit=True) _eval_is_commutative = lambda self: _fuzzy_group( a.is_commutative for a in self.args) def _eval_is_imaginary(self): nz = [] im_I = [] for a in self.args: if a.is_extended_real: if a.is_zero: pass elif a.is_zero is False: nz.append(a) else: return elif a.is_imaginary: im_I.append(a*S.ImaginaryUnit) elif (S.ImaginaryUnit*a).is_extended_real: im_I.append(a*S.ImaginaryUnit) else: return b = self.func(*nz) if b.is_zero: return fuzzy_not(self.func(*im_I).is_zero) elif b.is_zero is False: return False def _eval_is_zero(self): if self.is_commutative is False: # issue 10528: there is no way to know if a nc symbol # is zero or not return nz = [] z = 0 im_or_z = False im = False for a in self.args: if a.is_extended_real: if a.is_zero: z += 1 elif a.is_zero is False: nz.append(a) else: return elif a.is_imaginary: im = True elif (S.ImaginaryUnit*a).is_extended_real: im_or_z = True else: return if z == len(self.args): return True if len(nz) == 0 or len(nz) == len(self.args): return None b = self.func(*nz) if b.is_zero: if not im_or_z and not im: return True if im and not im_or_z: return False if b.is_zero is False: return False def _eval_is_odd(self): l = [f for f in self.args if not (f.is_even is True)] if not l: return False if l[0].is_odd: return self._new_rawargs(*l[1:]).is_even def _eval_is_irrational(self): for t in self.args: a = t.is_irrational if a: others = list(self.args) others.remove(t) if all(x.is_rational is True for x in others): return True return None if a is None: return return False def _eval_is_extended_positive(self): from sympy.core.exprtools import _monotonic_sign if self.is_number: return super(Add, self)._eval_is_extended_positive() c, a = self.as_coeff_Add() if not c.is_zero: v = _monotonic_sign(a) if v is not None: s = v + c if s != self and s.is_extended_positive and a.is_extended_nonnegative: return True if len(self.free_symbols) == 1: v = _monotonic_sign(self) if v is not None and v != self and v.is_extended_positive: return True pos = nonneg = nonpos = unknown_sign = False saw_INF = set() args = [a for a in self.args if not a.is_zero] if not args: return False for a in args: ispos = a.is_extended_positive infinite = a.is_infinite if infinite: saw_INF.add(fuzzy_or((ispos, a.is_extended_nonnegative))) if True in saw_INF and False in saw_INF: return if ispos: pos = True continue elif a.is_extended_nonnegative: nonneg = True continue elif a.is_extended_nonpositive: nonpos = True continue if infinite is None: return unknown_sign = True if saw_INF: if len(saw_INF) > 1: return return saw_INF.pop() elif unknown_sign: return elif not nonpos and not nonneg and pos: return True elif not nonpos and pos: return True elif not pos and not nonneg: return False def _eval_is_extended_nonnegative(self): from sympy.core.exprtools import _monotonic_sign if not self.is_number: c, a = self.as_coeff_Add() if not c.is_zero and a.is_extended_nonnegative: v = _monotonic_sign(a) if v is not None: s = v + c if s != self and s.is_extended_nonnegative: return True if len(self.free_symbols) == 1: v = _monotonic_sign(self) if v is not None and v != self and v.is_extended_nonnegative: return True def _eval_is_extended_nonpositive(self): from sympy.core.exprtools import _monotonic_sign if not self.is_number: c, a = self.as_coeff_Add() if not c.is_zero and a.is_extended_nonpositive: v = _monotonic_sign(a) if v is not None: s = v + c if s != self and s.is_extended_nonpositive: return True if len(self.free_symbols) == 1: v = _monotonic_sign(self) if v is not None and v != self and v.is_extended_nonpositive: return True def _eval_is_extended_negative(self): from sympy.core.exprtools import _monotonic_sign if self.is_number: return super(Add, self)._eval_is_extended_negative() c, a = self.as_coeff_Add() if not c.is_zero: v = _monotonic_sign(a) if v is not None: s = v + c if s != self and s.is_extended_negative and a.is_extended_nonpositive: return True if len(self.free_symbols) == 1: v = _monotonic_sign(self) if v is not None and v != self and v.is_extended_negative: return True neg = nonpos = nonneg = unknown_sign = False saw_INF = set() args = [a for a in self.args if not a.is_zero] if not args: return False for a in args: isneg = a.is_extended_negative infinite = a.is_infinite if infinite: saw_INF.add(fuzzy_or((isneg, a.is_extended_nonpositive))) if True in saw_INF and False in saw_INF: return if isneg: neg = True continue elif a.is_extended_nonpositive: nonpos = True continue elif a.is_extended_nonnegative: nonneg = True continue if infinite is None: return unknown_sign = True if saw_INF: if len(saw_INF) > 1: return return saw_INF.pop() elif unknown_sign: return elif not nonneg and not nonpos and neg: return True elif not nonneg and neg: return True elif not neg and not nonpos: return False def _eval_subs(self, old, new): if not old.is_Add: if old is S.Infinity and -old in self.args: # foo - oo is foo + (-oo) internally return self.xreplace({-old: -new}) return None coeff_self, terms_self = self.as_coeff_Add() coeff_old, terms_old = old.as_coeff_Add() if coeff_self.is_Rational and coeff_old.is_Rational: if terms_self == terms_old: # (2 + a).subs( 3 + a, y) -> -1 + y return self.func(new, coeff_self, -coeff_old) if terms_self == -terms_old: # (2 + a).subs(-3 - a, y) -> -1 - y return self.func(-new, coeff_self, coeff_old) if coeff_self.is_Rational and coeff_old.is_Rational \ or coeff_self == coeff_old: args_old, args_self = self.func.make_args( terms_old), self.func.make_args(terms_self) if len(args_old) < len(args_self): # (a+b+c).subs(b+c,x) -> a+x self_set = set(args_self) old_set = set(args_old) if old_set < self_set: ret_set = self_set - old_set return self.func(new, coeff_self, -coeff_old, *[s._subs(old, new) for s in ret_set]) args_old = self.func.make_args( -terms_old) # (a+b+c+d).subs(-b-c,x) -> a-x+d old_set = set(args_old) if old_set < self_set: ret_set = self_set - old_set return self.func(-new, coeff_self, coeff_old, *[s._subs(old, new) for s in ret_set]) def removeO(self): args = [a for a in self.args if not a.is_Order] return self._new_rawargs(*args) def getO(self): args = [a for a in self.args if a.is_Order] if args: return self._new_rawargs(*args) @cacheit def extract_leading_order(self, symbols, point=None): """ Returns the leading term and its order. Examples ======== >>> from sympy.abc import x >>> (x + 1 + 1/x**5).extract_leading_order(x) ((x**(-5), O(x**(-5))),) >>> (1 + x).extract_leading_order(x) ((1, O(1)),) >>> (x + x**2).extract_leading_order(x) ((x, O(x)),) """ from sympy import Order lst = [] symbols = list(symbols if is_sequence(symbols) else [symbols]) if not point: point = [0]*len(symbols) seq = [(f, Order(f, *zip(symbols, point))) for f in self.args] for ef, of in seq: for e, o in lst: if o.contains(of) and o != of: of = None break if of is None: continue new_lst = [(ef, of)] for e, o in lst: if of.contains(o) and o != of: continue new_lst.append((e, o)) lst = new_lst return tuple(lst) def as_real_imag(self, deep=True, **hints): """ returns a tuple representing a complex number Examples ======== >>> from sympy import I >>> (7 + 9*I).as_real_imag() (7, 9) >>> ((1 + I)/(1 - I)).as_real_imag() (0, 1) >>> ((1 + 2*I)*(1 + 3*I)).as_real_imag() (-5, 5) """ sargs = self.args re_part, im_part = [], [] for term in sargs: re, im = term.as_real_imag(deep=deep) re_part.append(re) im_part.append(im) return (self.func(*re_part), self.func(*im_part)) def _eval_as_leading_term(self, x): from sympy import expand_mul, factor_terms old = self expr = expand_mul(self) if not expr.is_Add: return expr.as_leading_term(x) infinite = [t for t in expr.args if t.is_infinite] expr = expr.func(*[t.as_leading_term(x) for t in expr.args]).removeO() if not expr: # simple leading term analysis gave us 0 but we have to send # back a term, so compute the leading term (via series) return old.compute_leading_term(x) elif expr is S.NaN: return old.func._from_args(infinite) elif not expr.is_Add: return expr else: plain = expr.func(*[s for s, _ in expr.extract_leading_order(x)]) rv = factor_terms(plain, fraction=False) rv_simplify = rv.simplify() # if it simplifies to an x-free expression, return that; # tests don't fail if we don't but it seems nicer to do this if x not in rv_simplify.free_symbols: if rv_simplify.is_zero and plain.is_zero is not True: return (expr - plain)._eval_as_leading_term(x) return rv_simplify return rv def _eval_adjoint(self): return self.func(*[t.adjoint() for t in self.args]) def _eval_conjugate(self): return self.func(*[t.conjugate() for t in self.args]) def _eval_transpose(self): return self.func(*[t.transpose() for t in self.args]) def _sage_(self): s = 0 for x in self.args: s += x._sage_() return s def primitive(self): """ Return ``(R, self/R)`` where ``R``` is the Rational GCD of ``self```. ``R`` is collected only from the leading coefficient of each term. Examples ======== >>> from sympy.abc import x, y >>> (2*x + 4*y).primitive() (2, x + 2*y) >>> (2*x/3 + 4*y/9).primitive() (2/9, 3*x + 2*y) >>> (2*x/3 + 4.2*y).primitive() (1/3, 2*x + 12.6*y) No subprocessing of term factors is performed: >>> ((2 + 2*x)*x + 2).primitive() (1, x*(2*x + 2) + 2) Recursive processing can be done with the ``as_content_primitive()`` method: >>> ((2 + 2*x)*x + 2).as_content_primitive() (2, x*(x + 1) + 1) See also: primitive() function in polytools.py """ terms = [] inf = False for a in self.args: c, m = a.as_coeff_Mul() if not c.is_Rational: c = S.One m = a inf = inf or m is S.ComplexInfinity terms.append((c.p, c.q, m)) if not inf: ngcd = reduce(igcd, [t[0] for t in terms], 0) dlcm = reduce(ilcm, [t[1] for t in terms], 1) else: ngcd = reduce(igcd, [t[0] for t in terms if t[1]], 0) dlcm = reduce(ilcm, [t[1] for t in terms if t[1]], 1) if ngcd == dlcm == 1: return S.One, self if not inf: for i, (p, q, term) in enumerate(terms): terms[i] = _keep_coeff(Rational((p//ngcd)*(dlcm//q)), term) else: for i, (p, q, term) in enumerate(terms): if q: terms[i] = _keep_coeff(Rational((p//ngcd)*(dlcm//q)), term) else: terms[i] = _keep_coeff(Rational(p, q), term) # we don't need a complete re-flattening since no new terms will join # so we just use the same sort as is used in Add.flatten. When the # coefficient changes, the ordering of terms may change, e.g. # (3*x, 6*y) -> (2*y, x) # # We do need to make sure that term[0] stays in position 0, however. # if terms[0].is_Number or terms[0] is S.ComplexInfinity: c = terms.pop(0) else: c = None _addsort(terms) if c: terms.insert(0, c) return Rational(ngcd, dlcm), self._new_rawargs(*terms) def as_content_primitive(self, radical=False, clear=True): """Return the tuple (R, self/R) where R is the positive Rational extracted from self. If radical is True (default is False) then common radicals will be removed and included as a factor of the primitive expression. Examples ======== >>> from sympy import sqrt >>> (3 + 3*sqrt(2)).as_content_primitive() (3, 1 + sqrt(2)) Radical content can also be factored out of the primitive: >>> (2*sqrt(2) + 4*sqrt(10)).as_content_primitive(radical=True) (2, sqrt(2)*(1 + 2*sqrt(5))) See docstring of Expr.as_content_primitive for more examples. """ con, prim = self.func(*[_keep_coeff(*a.as_content_primitive( radical=radical, clear=clear)) for a in self.args]).primitive() if not clear and not con.is_Integer and prim.is_Add: con, d = con.as_numer_denom() _p = prim/d if any(a.as_coeff_Mul()[0].is_Integer for a in _p.args): prim = _p else: con /= d if radical and prim.is_Add: # look for common radicals that can be removed args = prim.args rads = [] common_q = None for m in args: term_rads = defaultdict(list) for ai in Mul.make_args(m): if ai.is_Pow: b, e = ai.as_base_exp() if e.is_Rational and b.is_Integer: term_rads[e.q].append(abs(int(b))**e.p) if not term_rads: break if common_q is None: common_q = set(term_rads.keys()) else: common_q = common_q & set(term_rads.keys()) if not common_q: break rads.append(term_rads) else: # process rads # keep only those in common_q for r in rads: for q in list(r.keys()): if q not in common_q: r.pop(q) for q in r: r[q] = prod(r[q]) # find the gcd of bases for each q G = [] for q in common_q: g = reduce(igcd, [r[q] for r in rads], 0) if g != 1: G.append(g**Rational(1, q)) if G: G = Mul(*G) args = [ai/G for ai in args] prim = G*prim.func(*args) return con, prim @property def _sorted_args(self): from sympy.core.compatibility import default_sort_key return tuple(sorted(self.args, key=default_sort_key)) def _eval_difference_delta(self, n, step): from sympy.series.limitseq import difference_delta as dd return self.func(*[dd(a, n, step) for a in self.args]) @property def _mpc_(self): """ Convert self to an mpmath mpc if possible """ from sympy.core.numbers import I, Float re_part, rest = self.as_coeff_Add() im_part, imag_unit = rest.as_coeff_Mul() if not imag_unit == I: # ValueError may seem more reasonable but since it's a @property, # we need to use AttributeError to keep from confusing things like # hasattr. raise AttributeError("Cannot convert Add to mpc. Must be of the form Number + Number*I") return (Float(re_part)._mpf_, Float(im_part)._mpf_) def __neg__(self): if not global_distribute[0]: return super(Add, self).__neg__() return Add(*[-i for i in self.args]) from .mul import Mul, _keep_coeff, prod from sympy.core.numbers import Rational

394f4388142b73d0964edc212f561e0a4d9ccb2e941c9f2a910dfca049a1a7cd

from __future__ import print_function, division from .sympify import sympify, _sympify, SympifyError from .basic import Basic, Atom from .singleton import S from .evalf import EvalfMixin, pure_complex from .decorators import _sympifyit, call_highest_priority from .cache import cacheit from .compatibility import reduce, as_int, default_sort_key, range, Iterable from sympy.utilities.misc import func_name from mpmath.libmp import mpf_log, prec_to_dps from collections import defaultdict class Expr(Basic, EvalfMixin): """ Base class for algebraic expressions. Everything that requires arithmetic operations to be defined should subclass this class, instead of Basic (which should be used only for argument storage and expression manipulation, i.e. pattern matching, substitutions, etc). See Also ======== sympy.core.basic.Basic """ __slots__ = [] is_scalar = True # self derivative is 1 @property def _diff_wrt(self): """Return True if one can differentiate with respect to this object, else False. Subclasses such as Symbol, Function and Derivative return True to enable derivatives wrt them. The implementation in Derivative separates the Symbol and non-Symbol (_diff_wrt=True) variables and temporarily converts the non-Symbols into Symbols when performing the differentiation. By default, any object deriving from Expr will behave like a scalar with self.diff(self) == 1. If this is not desired then the object must also set `is_scalar = False` or else define an _eval_derivative routine. Note, see the docstring of Derivative for how this should work mathematically. In particular, note that expr.subs(yourclass, Symbol) should be well-defined on a structural level, or this will lead to inconsistent results. Examples ======== >>> from sympy import Expr >>> e = Expr() >>> e._diff_wrt False >>> class MyScalar(Expr): ... _diff_wrt = True ... >>> MyScalar().diff(MyScalar()) 1 >>> class MySymbol(Expr): ... _diff_wrt = True ... is_scalar = False ... >>> MySymbol().diff(MySymbol()) Derivative(MySymbol(), MySymbol()) """ return False @cacheit def sort_key(self, order=None): coeff, expr = self.as_coeff_Mul() if expr.is_Pow: expr, exp = expr.args else: expr, exp = expr, S.One if expr.is_Dummy: args = (expr.sort_key(),) elif expr.is_Atom: args = (str(expr),) else: if expr.is_Add: args = expr.as_ordered_terms(order=order) elif expr.is_Mul: args = expr.as_ordered_factors(order=order) else: args = expr.args args = tuple( [ default_sort_key(arg, order=order) for arg in args ]) args = (len(args), tuple(args)) exp = exp.sort_key(order=order) return expr.class_key(), args, exp, coeff def __hash__(self): # hash cannot be cached using cache_it because infinite recurrence # occurs as hash is needed for setting cache dictionary keys h = self._mhash if h is None: h = hash((type(self).__name__,) + self._hashable_content()) self._mhash = h return h def _hashable_content(self): """Return a tuple of information about self that can be used to compute the hash. If a class defines additional attributes, like ``name`` in Symbol, then this method should be updated accordingly to return such relevant attributes. Defining more than _hashable_content is necessary if __eq__ has been defined by a class. See note about this in Basic.__eq__.""" return self._args def __eq__(self, other): try: other = sympify(other) if not isinstance(other, Expr): return False except (SympifyError, SyntaxError): return False # check for pure number expr if not (self.is_Number and other.is_Number) and ( type(self) != type(other)): return False a, b = self._hashable_content(), other._hashable_content() if a != b: return False # check number *in* an expression for a, b in zip(a, b): if not isinstance(a, Expr): continue if a.is_Number and type(a) != type(b): return False return True # *************** # * Arithmetics * # *************** # Expr and its sublcasses use _op_priority to determine which object # passed to a binary special method (__mul__, etc.) will handle the # operation. In general, the 'call_highest_priority' decorator will choose # the object with the highest _op_priority to handle the call. # Custom subclasses that want to define their own binary special methods # should set an _op_priority value that is higher than the default. # # **NOTE**: # This is a temporary fix, and will eventually be replaced with # something better and more powerful. See issue 5510. _op_priority = 10.0 def __pos__(self): return self def __neg__(self): # Mul has its own __neg__ routine, so we just # create a 2-args Mul with the -1 in the canonical # slot 0. c = self.is_commutative return Mul._from_args((S.NegativeOne, self), c) def __abs__(self): from sympy import Abs return Abs(self) @_sympifyit('other', NotImplemented) @call_highest_priority('__radd__') def __add__(self, other): return Add(self, other) @_sympifyit('other', NotImplemented) @call_highest_priority('__add__') def __radd__(self, other): return Add(other, self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rsub__') def __sub__(self, other): return Add(self, -other) @_sympifyit('other', NotImplemented) @call_highest_priority('__sub__') def __rsub__(self, other): return Add(other, -self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rmul__') def __mul__(self, other): return Mul(self, other) @_sympifyit('other', NotImplemented) @call_highest_priority('__mul__') def __rmul__(self, other): return Mul(other, self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rpow__') def _pow(self, other): return Pow(self, other) def __pow__(self, other, mod=None): if mod is None: return self._pow(other) try: _self, other, mod = as_int(self), as_int(other), as_int(mod) if other >= 0: return pow(_self, other, mod) else: from sympy.core.numbers import mod_inverse return mod_inverse(pow(_self, -other, mod), mod) except ValueError: power = self._pow(other) try: return power%mod except TypeError: return NotImplemented @_sympifyit('other', NotImplemented) @call_highest_priority('__pow__') def __rpow__(self, other): return Pow(other, self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rdiv__') def __div__(self, other): return Mul(self, Pow(other, S.NegativeOne)) @_sympifyit('other', NotImplemented) @call_highest_priority('__div__') def __rdiv__(self, other): return Mul(other, Pow(self, S.NegativeOne)) __truediv__ = __div__ __rtruediv__ = __rdiv__ @_sympifyit('other', NotImplemented) @call_highest_priority('__rmod__') def __mod__(self, other): return Mod(self, other) @_sympifyit('other', NotImplemented) @call_highest_priority('__mod__') def __rmod__(self, other): return Mod(other, self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rfloordiv__') def __floordiv__(self, other): from sympy.functions.elementary.integers import floor return floor(self / other) @_sympifyit('other', NotImplemented) @call_highest_priority('__floordiv__') def __rfloordiv__(self, other): from sympy.functions.elementary.integers import floor return floor(other / self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rdivmod__') def __divmod__(self, other): from sympy.functions.elementary.integers import floor return floor(self / other), Mod(self, other) @_sympifyit('other', NotImplemented) @call_highest_priority('__divmod__') def __rdivmod__(self, other): from sympy.functions.elementary.integers import floor return floor(other / self), Mod(other, self) def __int__(self): # Although we only need to round to the units position, we'll # get one more digit so the extra testing below can be avoided # unless the rounded value rounded to an integer, e.g. if an # expression were equal to 1.9 and we rounded to the unit position # we would get a 2 and would not know if this rounded up or not # without doing a test (as done below). But if we keep an extra # digit we know that 1.9 is not the same as 1 and there is no # need for further testing: our int value is correct. If the value # were 1.99, however, this would round to 2.0 and our int value is # off by one. So...if our round value is the same as the int value # (regardless of how much extra work we do to calculate extra decimal # places) we need to test whether we are off by one. from sympy import Dummy if not self.is_number: raise TypeError("can't convert symbols to int") r = self.round(2) if not r.is_Number: raise TypeError("can't convert complex to int") if r in (S.NaN, S.Infinity, S.NegativeInfinity): raise TypeError("can't convert %s to int" % r) i = int(r) if not i: return 0 # off-by-one check if i == r and not (self - i).equals(0): isign = 1 if i > 0 else -1 x = Dummy() # in the following (self - i).evalf(2) will not always work while # (self - r).evalf(2) and the use of subs does; if the test that # was added when this comment was added passes, it might be safe # to simply use sign to compute this rather than doing this by hand: diff_sign = 1 if (self - x).evalf(2, subs={x: i}) > 0 else -1 if diff_sign != isign: i -= isign return i __long__ = __int__ def __float__(self): # Don't bother testing if it's a number; if it's not this is going # to fail, and if it is we still need to check that it evalf'ed to # a number. result = self.evalf() if result.is_Number: return float(result) if result.is_number and result.as_real_imag()[1]: raise TypeError("can't convert complex to float") raise TypeError("can't convert expression to float") def __complex__(self): result = self.evalf() re, im = result.as_real_imag() return complex(float(re), float(im)) def __ge__(self, other): from sympy import GreaterThan try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s >= %s" % (self, other)) for me in (self, other): if me.is_complex and me.is_extended_real is False: raise TypeError("Invalid comparison of complex %s" % me) if me is S.NaN: raise TypeError("Invalid NaN comparison") n2 = _n2(self, other) if n2 is not None: return _sympify(n2 >= 0) if self.is_extended_real and other.is_extended_real: if (self.is_infinite and self.is_extended_positive) \ or (other.is_infinite and other.is_extended_negative): return S.true nneg = (self - other).is_extended_nonnegative if nneg is not None: return sympify(nneg) return GreaterThan(self, other, evaluate=False) def __le__(self, other): from sympy import LessThan try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s <= %s" % (self, other)) for me in (self, other): if me.is_complex and me.is_extended_real is False: raise TypeError("Invalid comparison of complex %s" % me) if me is S.NaN: raise TypeError("Invalid NaN comparison") n2 = _n2(self, other) if n2 is not None: return _sympify(n2 <= 0) if self.is_extended_real and other.is_extended_real: if (self.is_infinite and self.is_extended_negative) \ or (other.is_infinite and other.is_extended_positive): return S.true npos = (self - other).is_extended_nonpositive if npos is not None: return sympify(npos) return LessThan(self, other, evaluate=False) def __gt__(self, other): from sympy import StrictGreaterThan try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) for me in (self, other): if me.is_complex and me.is_extended_real is False: raise TypeError("Invalid comparison of complex %s" % me) if me is S.NaN: raise TypeError("Invalid NaN comparison") n2 = _n2(self, other) if n2 is not None: return _sympify(n2 > 0) if self.is_extended_real and other.is_extended_real: if (self.is_infinite and self.is_extended_negative) \ or (other.is_infinite and other.is_extended_positive): return S.false pos = (self - other).is_extended_positive if pos is not None: return sympify(pos) return StrictGreaterThan(self, other, evaluate=False) def __lt__(self, other): from sympy import StrictLessThan try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s < %s" % (self, other)) for me in (self, other): if me.is_complex and me.is_extended_real is False: raise TypeError("Invalid comparison of complex %s" % me) if me is S.NaN: raise TypeError("Invalid NaN comparison") n2 = _n2(self, other) if n2 is not None: return _sympify(n2 < 0) if self.is_extended_real and other.is_extended_real: if (self.is_infinite and self.is_extended_positive) \ or (other.is_infinite and other.is_extended_negative): return S.false neg = (self - other).is_extended_negative if neg is not None: return sympify(neg) return StrictLessThan(self, other, evaluate=False) def __trunc__(self): if not self.is_number: raise TypeError("can't truncate symbols and expressions") else: return Integer(self) @staticmethod def _from_mpmath(x, prec): from sympy import Float if hasattr(x, "_mpf_"): return Float._new(x._mpf_, prec) elif hasattr(x, "_mpc_"): re, im = x._mpc_ re = Float._new(re, prec) im = Float._new(im, prec)*S.ImaginaryUnit return re + im else: raise TypeError("expected mpmath number (mpf or mpc)") @property def is_number(self): """Returns True if ``self`` has no free symbols and no undefined functions (AppliedUndef, to be precise). It will be faster than ``if not self.free_symbols``, however, since ``is_number`` will fail as soon as it hits a free symbol or undefined function. Examples ======== >>> from sympy import log, Integral, cos, sin, pi >>> from sympy.core.function import Function >>> from sympy.abc import x >>> f = Function('f') >>> x.is_number False >>> f(1).is_number False >>> (2*x).is_number False >>> (2 + Integral(2, x)).is_number False >>> (2 + Integral(2, (x, 1, 2))).is_number True Not all numbers are Numbers in the SymPy sense: >>> pi.is_number, pi.is_Number (True, False) If something is a number it should evaluate to a number with real and imaginary parts that are Numbers; the result may not be comparable, however, since the real and/or imaginary part of the result may not have precision. >>> cos(1).is_number and cos(1).is_comparable True >>> z = cos(1)**2 + sin(1)**2 - 1 >>> z.is_number True >>> z.is_comparable False See Also ======== sympy.core.basic.is_comparable """ return all(obj.is_number for obj in self.args) def _random(self, n=None, re_min=-1, im_min=-1, re_max=1, im_max=1): """Return self evaluated, if possible, replacing free symbols with random complex values, if necessary. The random complex value for each free symbol is generated by the random_complex_number routine giving real and imaginary parts in the range given by the re_min, re_max, im_min, and im_max values. The returned value is evaluated to a precision of n (if given) else the maximum of 15 and the precision needed to get more than 1 digit of precision. If the expression could not be evaluated to a number, or could not be evaluated to more than 1 digit of precision, then None is returned. Examples ======== >>> from sympy import sqrt >>> from sympy.abc import x, y >>> x._random() # doctest: +SKIP 0.0392918155679172 + 0.916050214307199*I >>> x._random(2) # doctest: +SKIP -0.77 - 0.87*I >>> (x + y/2)._random(2) # doctest: +SKIP -0.57 + 0.16*I >>> sqrt(2)._random(2) 1.4 See Also ======== sympy.utilities.randtest.random_complex_number """ free = self.free_symbols prec = 1 if free: from sympy.utilities.randtest import random_complex_number a, c, b, d = re_min, re_max, im_min, im_max reps = dict(list(zip(free, [random_complex_number(a, b, c, d, rational=True) for zi in free]))) try: nmag = abs(self.evalf(2, subs=reps)) except (ValueError, TypeError): # if an out of range value resulted in evalf problems # then return None -- XXX is there a way to know how to # select a good random number for a given expression? # e.g. when calculating n! negative values for n should not # be used return None else: reps = {} nmag = abs(self.evalf(2)) if not hasattr(nmag, '_prec'): # e.g. exp_polar(2*I*pi) doesn't evaluate but is_number is True return None if nmag._prec == 1: # increase the precision up to the default maximum # precision to see if we can get any significance from mpmath.libmp.libintmath import giant_steps from sympy.core.evalf import DEFAULT_MAXPREC as target # evaluate for prec in giant_steps(2, target): nmag = abs(self.evalf(prec, subs=reps)) if nmag._prec != 1: break if nmag._prec != 1: if n is None: n = max(prec, 15) return self.evalf(n, subs=reps) # never got any significance return None def is_constant(self, *wrt, **flags): """Return True if self is constant, False if not, or None if the constancy could not be determined conclusively. If an expression has no free symbols then it is a constant. If there are free symbols it is possible that the expression is a constant, perhaps (but not necessarily) zero. To test such expressions, two strategies are tried: 1) numerical evaluation at two random points. If two such evaluations give two different values and the values have a precision greater than 1 then self is not constant. If the evaluations agree or could not be obtained with any precision, no decision is made. The numerical testing is done only if ``wrt`` is different than the free symbols. 2) differentiation with respect to variables in 'wrt' (or all free symbols if omitted) to see if the expression is constant or not. This will not always lead to an expression that is zero even though an expression is constant (see added test in test_expr.py). If all derivatives are zero then self is constant with respect to the given symbols. If neither evaluation nor differentiation can prove the expression is constant, None is returned unless two numerical values happened to be the same and the flag ``failing_number`` is True -- in that case the numerical value will be returned. If flag simplify=False is passed, self will not be simplified; the default is True since self should be simplified before testing. Examples ======== >>> from sympy import cos, sin, Sum, S, pi >>> from sympy.abc import a, n, x, y >>> x.is_constant() False >>> S(2).is_constant() True >>> Sum(x, (x, 1, 10)).is_constant() True >>> Sum(x, (x, 1, n)).is_constant() False >>> Sum(x, (x, 1, n)).is_constant(y) True >>> Sum(x, (x, 1, n)).is_constant(n) False >>> Sum(x, (x, 1, n)).is_constant(x) True >>> eq = a*cos(x)**2 + a*sin(x)**2 - a >>> eq.is_constant() True >>> eq.subs({x: pi, a: 2}) == eq.subs({x: pi, a: 3}) == 0 True >>> (0**x).is_constant() False >>> x.is_constant() False >>> (x**x).is_constant() False >>> one = cos(x)**2 + sin(x)**2 >>> one.is_constant() True >>> ((one - 1)**(x + 1)).is_constant() in (True, False) # could be 0 or 1 True """ simplify = flags.get('simplify', True) if self.is_number: return True free = self.free_symbols if not free: return True # assume f(1) is some constant # if we are only interested in some symbols and they are not in the # free symbols then this expression is constant wrt those symbols wrt = set(wrt) if wrt and not wrt & free: return True wrt = wrt or free # simplify unless this has already been done expr = self if simplify: expr = expr.simplify() # is_zero should be a quick assumptions check; it can be wrong for # numbers (see test_is_not_constant test), giving False when it # shouldn't, but hopefully it will never give True unless it is sure. if expr.is_zero: return True # try numerical evaluation to see if we get two different values failing_number = None if wrt == free: # try 0 (for a) and 1 (for b) try: a = expr.subs(list(zip(free, [0]*len(free))), simultaneous=True) if a is S.NaN: # evaluation may succeed when substitution fails a = expr._random(None, 0, 0, 0, 0) except ZeroDivisionError: a = None if a is not None and a is not S.NaN: try: b = expr.subs(list(zip(free, [1]*len(free))), simultaneous=True) if b is S.NaN: # evaluation may succeed when substitution fails b = expr._random(None, 1, 0, 1, 0) except ZeroDivisionError: b = None if b is not None and b is not S.NaN and b.equals(a) is False: return False # try random real b = expr._random(None, -1, 0, 1, 0) if b is not None and b is not S.NaN and b.equals(a) is False: return False # try random complex b = expr._random() if b is not None and b is not S.NaN: if b.equals(a) is False: return False failing_number = a if a.is_number else b # now we will test each wrt symbol (or all free symbols) to see if the # expression depends on them or not using differentiation. This is # not sufficient for all expressions, however, so we don't return # False if we get a derivative other than 0 with free symbols. for w in wrt: deriv = expr.diff(w) if simplify: deriv = deriv.simplify() if deriv != 0: if not (pure_complex(deriv, or_real=True)): if flags.get('failing_number', False): return failing_number elif deriv.free_symbols: # dead line provided _random returns None in such cases return None return False return True def equals(self, other, failing_expression=False): """Return True if self == other, False if it doesn't, or None. If failing_expression is True then the expression which did not simplify to a 0 will be returned instead of None. If ``self`` is a Number (or complex number) that is not zero, then the result is False. If ``self`` is a number and has not evaluated to zero, evalf will be used to test whether the expression evaluates to zero. If it does so and the result has significance (i.e. the precision is either -1, for a Rational result, or is greater than 1) then the evalf value will be used to return True or False. """ from sympy.simplify.simplify import nsimplify, simplify from sympy.solvers.solveset import solveset from sympy.solvers.solvers import solve from sympy.polys.polyerrors import NotAlgebraic from sympy.polys.numberfields import minimal_polynomial other = sympify(other) if self == other: return True # they aren't the same so see if we can make the difference 0; # don't worry about doing simplification steps one at a time # because if the expression ever goes to 0 then the subsequent # simplification steps that are done will be very fast. diff = factor_terms(simplify(self - other), radical=True) if not diff: return True if not diff.has(Add, Mod): # if there is no expanding to be done after simplifying # then this can't be a zero return False constant = diff.is_constant(simplify=False, failing_number=True) if constant is False: return False if not diff.is_number: if constant is None: # e.g. unless the right simplification is done, a symbolic # zero is possible (see expression of issue 6829: without # simplification constant will be None). return if constant is True: # this gives a number whether there are free symbols or not ndiff = diff._random() # is_comparable will work whether the result is real # or complex; it could be None, however. if ndiff and ndiff.is_comparable: return False # sometimes we can use a simplified result to give a clue as to # what the expression should be; if the expression is *not* zero # then we should have been able to compute that and so now # we can just consider the cases where the approximation appears # to be zero -- we try to prove it via minimal_polynomial. # # removed # ns = nsimplify(diff) # if diff.is_number and (not ns or ns == diff): # # The thought was that if it nsimplifies to 0 that's a sure sign # to try the following to prove it; or if it changed but wasn't # zero that might be a sign that it's not going to be easy to # prove. But tests seem to be working without that logic. # if diff.is_number: # try to prove via self-consistency surds = [s for s in diff.atoms(Pow) if s.args[0].is_Integer] # it seems to work better to try big ones first surds.sort(key=lambda x: -x.args[0]) for s in surds: try: # simplify is False here -- this expression has already # been identified as being hard to identify as zero; # we will handle the checking ourselves using nsimplify # to see if we are in the right ballpark or not and if so # *then* the simplification will be attempted. sol = solve(diff, s, simplify=False) if sol: if s in sol: # the self-consistent result is present return True if all(si.is_Integer for si in sol): # perfect powers are removed at instantiation # so surd s cannot be an integer return False if all(i.is_algebraic is False for i in sol): # a surd is algebraic return False if any(si in surds for si in sol): # it wasn't equal to s but it is in surds # and different surds are not equal return False if any(nsimplify(s - si) == 0 and simplify(s - si) == 0 for si in sol): return True if s.is_real: if any(nsimplify(si, [s]) == s and simplify(si) == s for si in sol): return True except NotImplementedError: pass # try to prove with minimal_polynomial but know when # *not* to use this or else it can take a long time. e.g. issue 8354 if True: # change True to condition that assures non-hang try: mp = minimal_polynomial(diff) if mp.is_Symbol: return True return False except (NotAlgebraic, NotImplementedError): pass # diff has not simplified to zero; constant is either None, True # or the number with significance (is_comparable) that was randomly # calculated twice as the same value. if constant not in (True, None) and constant != 0: return False if failing_expression: return diff return None def _eval_is_positive(self): finite = self.is_finite if finite is False: return False extended_positive = self.is_extended_positive if finite is True: return extended_positive if extended_positive is False: return False def _eval_is_negative(self): finite = self.is_finite if finite is False: return False extended_negative = self.is_extended_negative if finite is True: return extended_negative if extended_negative is False: return False def _eval_is_extended_positive(self): from sympy.polys.numberfields import minimal_polynomial from sympy.polys.polyerrors import NotAlgebraic if self.is_number: if self.is_extended_real is False: return False # check to see that we can get a value try: n2 = self._eval_evalf(2) # XXX: This shouldn't be caught here # Catches ValueError: hypsum() failed to converge to the requested # 34 bits of accuracy except ValueError: return None if n2 is None: return None if getattr(n2, '_prec', 1) == 1: # no significance return None if n2 == S.NaN: return None r, i = self.evalf(2).as_real_imag() if not i.is_Number or not r.is_Number: return False if r._prec != 1 and i._prec != 1: return bool(not i and r > 0) elif r._prec == 1 and (not i or i._prec == 1) and \ self.is_algebraic and not self.has(Function): try: if minimal_polynomial(self).is_Symbol: return False except (NotAlgebraic, NotImplementedError): pass def _eval_is_extended_negative(self): from sympy.polys.numberfields import minimal_polynomial from sympy.polys.polyerrors import NotAlgebraic if self.is_number: if self.is_extended_real is False: return False # check to see that we can get a value try: n2 = self._eval_evalf(2) # XXX: This shouldn't be caught here # Catches ValueError: hypsum() failed to converge to the requested # 34 bits of accuracy except ValueError: return None if n2 is None: return None if getattr(n2, '_prec', 1) == 1: # no significance return None if n2 == S.NaN: return None r, i = self.evalf(2).as_real_imag() if not i.is_Number or not r.is_Number: return False if r._prec != 1 and i._prec != 1: return bool(not i and r < 0) elif r._prec == 1 and (not i or i._prec == 1) and \ self.is_algebraic and not self.has(Function): try: if minimal_polynomial(self).is_Symbol: return False except (NotAlgebraic, NotImplementedError): pass def _eval_interval(self, x, a, b): """ Returns evaluation over an interval. For most functions this is: self.subs(x, b) - self.subs(x, a), possibly using limit() if NaN is returned from subs, or if singularities are found between a and b. If b or a is None, it only evaluates -self.subs(x, a) or self.subs(b, x), respectively. """ from sympy.series import limit, Limit from sympy.solvers.solveset import solveset from sympy.sets.sets import Interval from sympy.functions.elementary.exponential import log from sympy.calculus.util import AccumBounds if (a is None and b is None): raise ValueError('Both interval ends cannot be None.') if a == b: return 0 if a is None: A = 0 else: A = self.subs(x, a) if A.has(S.NaN, S.Infinity, S.NegativeInfinity, S.ComplexInfinity, AccumBounds): if (a < b) != False: A = limit(self, x, a,"+") else: A = limit(self, x, a,"-") if A is S.NaN: return A if isinstance(A, Limit): raise NotImplementedError("Could not compute limit") if b is None: B = 0 else: B = self.subs(x, b) if B.has(S.NaN, S.Infinity, S.NegativeInfinity, S.ComplexInfinity, AccumBounds): if (a < b) != False: B = limit(self, x, b,"-") else: B = limit(self, x, b,"+") if isinstance(B, Limit): raise NotImplementedError("Could not compute limit") if (a and b) is None: return B - A value = B - A if a.is_comparable and b.is_comparable: if a < b: domain = Interval(a, b) else: domain = Interval(b, a) # check the singularities of self within the interval # if singularities is a ConditionSet (not iterable), catch the exception and pass singularities = solveset(self.cancel().as_numer_denom()[1], x, domain=domain) for logterm in self.atoms(log): singularities = singularities | solveset(logterm.args[0], x, domain=domain) try: for s in singularities: if value is S.NaN: # no need to keep adding, it will stay NaN break if not s.is_comparable: continue if (a < s) == (s < b) == True: value += -limit(self, x, s, "+") + limit(self, x, s, "-") elif (b < s) == (s < a) == True: value += limit(self, x, s, "+") - limit(self, x, s, "-") except TypeError: pass return value def _eval_power(self, other): # subclass to compute self**other for cases when # other is not NaN, 0, or 1 return None def _eval_conjugate(self): if self.is_extended_real: return self elif self.is_imaginary: return -self def conjugate(self): from sympy.functions.elementary.complexes import conjugate as c return c(self) def _eval_transpose(self): from sympy.functions.elementary.complexes import conjugate if self.is_complex: return self elif self.is_hermitian: return conjugate(self) elif self.is_antihermitian: return -conjugate(self) def transpose(self): from sympy.functions.elementary.complexes import transpose return transpose(self) def _eval_adjoint(self): from sympy.functions.elementary.complexes import conjugate, transpose if self.is_hermitian: return self elif self.is_antihermitian: return -self obj = self._eval_conjugate() if obj is not None: return transpose(obj) obj = self._eval_transpose() if obj is not None: return conjugate(obj) def adjoint(self): from sympy.functions.elementary.complexes import adjoint return adjoint(self) @classmethod def _parse_order(cls, order): """Parse and configure the ordering of terms. """ from sympy.polys.orderings import monomial_key startswith = getattr(order, "startswith", None) if startswith is None: reverse = False else: reverse = startswith('rev-') if reverse: order = order[4:] monom_key = monomial_key(order) def neg(monom): result = [] for m in monom: if isinstance(m, tuple): result.append(neg(m)) else: result.append(-m) return tuple(result) def key(term): _, ((re, im), monom, ncpart) = term monom = neg(monom_key(monom)) ncpart = tuple([e.sort_key(order=order) for e in ncpart]) coeff = ((bool(im), im), (re, im)) return monom, ncpart, coeff return key, reverse def as_ordered_factors(self, order=None): """Return list of ordered factors (if Mul) else [self].""" return [self] def as_ordered_terms(self, order=None, data=False): """ Transform an expression to an ordered list of terms. Examples ======== >>> from sympy import sin, cos >>> from sympy.abc import x >>> (sin(x)**2*cos(x) + sin(x)**2 + 1).as_ordered_terms() [sin(x)**2*cos(x), sin(x)**2, 1] """ from .numbers import Number, NumberSymbol if order is None and self.is_Add: # Spot the special case of Add(Number, Mul(Number, expr)) with the # first number positive and thhe second number nagative key = lambda x:not isinstance(x, (Number, NumberSymbol)) add_args = sorted(Add.make_args(self), key=key) if (len(add_args) == 2 and isinstance(add_args[0], (Number, NumberSymbol)) and isinstance(add_args[1], Mul)): mul_args = sorted(Mul.make_args(add_args[1]), key=key) if (len(mul_args) == 2 and isinstance(mul_args[0], Number) and add_args[0].is_positive and mul_args[0].is_negative): return add_args key, reverse = self._parse_order(order) terms, gens = self.as_terms() if not any(term.is_Order for term, _ in terms): ordered = sorted(terms, key=key, reverse=reverse) else: _terms, _order = [], [] for term, repr in terms: if not term.is_Order: _terms.append((term, repr)) else: _order.append((term, repr)) ordered = sorted(_terms, key=key, reverse=True) \ + sorted(_order, key=key, reverse=True) if data: return ordered, gens else: return [term for term, _ in ordered] def as_terms(self): """Transform an expression to a list of terms. """ from .add import Add from .mul import Mul from .exprtools import decompose_power gens, terms = set([]), [] for term in Add.make_args(self): coeff, _term = term.as_coeff_Mul() coeff = complex(coeff) cpart, ncpart = {}, [] if _term is not S.One: for factor in Mul.make_args(_term): if factor.is_number: try: coeff *= complex(factor) except (TypeError, ValueError): pass else: continue if factor.is_commutative: base, exp = decompose_power(factor) cpart[base] = exp gens.add(base) else: ncpart.append(factor) coeff = coeff.real, coeff.imag ncpart = tuple(ncpart) terms.append((term, (coeff, cpart, ncpart))) gens = sorted(gens, key=default_sort_key) k, indices = len(gens), {} for i, g in enumerate(gens): indices[g] = i result = [] for term, (coeff, cpart, ncpart) in terms: monom = [0]*k for base, exp in cpart.items(): monom[indices[base]] = exp result.append((term, (coeff, tuple(monom), ncpart))) return result, gens def removeO(self): """Removes the additive O(..) symbol if there is one""" return self def getO(self): """Returns the additive O(..) symbol if there is one, else None.""" return None def getn(self): """ Returns the order of the expression. The order is determined either from the O(...) term. If there is no O(...) term, it returns None. Examples ======== >>> from sympy import O >>> from sympy.abc import x >>> (1 + x + O(x**2)).getn() 2 >>> (1 + x).getn() """ from sympy import Dummy, Symbol o = self.getO() if o is None: return None elif o.is_Order: o = o.expr if o is S.One: return S.Zero if o.is_Symbol: return S.One if o.is_Pow: return o.args[1] if o.is_Mul: # x**n*log(x)**n or x**n/log(x)**n for oi in o.args: if oi.is_Symbol: return S.One if oi.is_Pow: syms = oi.atoms(Symbol) if len(syms) == 1: x = syms.pop() oi = oi.subs(x, Dummy('x', positive=True)) if oi.base.is_Symbol and oi.exp.is_Rational: return abs(oi.exp) raise NotImplementedError('not sure of order of %s' % o) def count_ops(self, visual=None): """wrapper for count_ops that returns the operation count.""" from .function import count_ops return count_ops(self, visual) def args_cnc(self, cset=False, warn=True, split_1=True): """Return [commutative factors, non-commutative factors] of self. self is treated as a Mul and the ordering of the factors is maintained. If ``cset`` is True the commutative factors will be returned in a set. If there were repeated factors (as may happen with an unevaluated Mul) then an error will be raised unless it is explicitly suppressed by setting ``warn`` to False. Note: -1 is always separated from a Number unless split_1 is False. >>> from sympy import symbols, oo >>> A, B = symbols('A B', commutative=0) >>> x, y = symbols('x y') >>> (-2*x*y).args_cnc() [[-1, 2, x, y], []] >>> (-2.5*x).args_cnc() [[-1, 2.5, x], []] >>> (-2*x*A*B*y).args_cnc() [[-1, 2, x, y], [A, B]] >>> (-2*x*A*B*y).args_cnc(split_1=False) [[-2, x, y], [A, B]] >>> (-2*x*y).args_cnc(cset=True) [{-1, 2, x, y}, []] The arg is always treated as a Mul: >>> (-2 + x + A).args_cnc() [[], [x - 2 + A]] >>> (-oo).args_cnc() # -oo is a singleton [[-1, oo], []] """ if self.is_Mul: args = list(self.args) else: args = [self] for i, mi in enumerate(args): if not mi.is_commutative: c = args[:i] nc = args[i:] break else: c = args nc = [] if c and split_1 and ( c[0].is_Number and c[0].is_extended_negative and c[0] is not S.NegativeOne): c[:1] = [S.NegativeOne, -c[0]] if cset: clen = len(c) c = set(c) if clen and warn and len(c) != clen: raise ValueError('repeated commutative arguments: %s' % [ci for ci in c if list(self.args).count(ci) > 1]) return [c, nc] def coeff(self, x, n=1, right=False): """ Returns the coefficient from the term(s) containing ``x**n``. If ``n`` is zero then all terms independent of ``x`` will be returned. When ``x`` is noncommutative, the coefficient to the left (default) or right of ``x`` can be returned. The keyword 'right' is ignored when ``x`` is commutative. See Also ======== as_coefficient: separate the expression into a coefficient and factor as_coeff_Add: separate the additive constant from an expression as_coeff_Mul: separate the multiplicative constant from an expression as_independent: separate x-dependent terms/factors from others sympy.polys.polytools.coeff_monomial: efficiently find the single coefficient of a monomial in Poly sympy.polys.polytools.nth: like coeff_monomial but powers of monomial terms are used Examples ======== >>> from sympy import symbols >>> from sympy.abc import x, y, z You can select terms that have an explicit negative in front of them: >>> (-x + 2*y).coeff(-1) x >>> (x - 2*y).coeff(-1) 2*y You can select terms with no Rational coefficient: >>> (x + 2*y).coeff(1) x >>> (3 + 2*x + 4*x**2).coeff(1) 0 You can select terms independent of x by making n=0; in this case expr.as_independent(x)[0] is returned (and 0 will be returned instead of None): >>> (3 + 2*x + 4*x**2).coeff(x, 0) 3 >>> eq = ((x + 1)**3).expand() + 1 >>> eq x**3 + 3*x**2 + 3*x + 2 >>> [eq.coeff(x, i) for i in reversed(range(4))] [1, 3, 3, 2] >>> eq -= 2 >>> [eq.coeff(x, i) for i in reversed(range(4))] [1, 3, 3, 0] You can select terms that have a numerical term in front of them: >>> (-x - 2*y).coeff(2) -y >>> from sympy import sqrt >>> (x + sqrt(2)*x).coeff(sqrt(2)) x The matching is exact: >>> (3 + 2*x + 4*x**2).coeff(x) 2 >>> (3 + 2*x + 4*x**2).coeff(x**2) 4 >>> (3 + 2*x + 4*x**2).coeff(x**3) 0 >>> (z*(x + y)**2).coeff((x + y)**2) z >>> (z*(x + y)**2).coeff(x + y) 0 In addition, no factoring is done, so 1 + z*(1 + y) is not obtained from the following: >>> (x + z*(x + x*y)).coeff(x) 1 If such factoring is desired, factor_terms can be used first: >>> from sympy import factor_terms >>> factor_terms(x + z*(x + x*y)).coeff(x) z*(y + 1) + 1 >>> n, m, o = symbols('n m o', commutative=False) >>> n.coeff(n) 1 >>> (3*n).coeff(n) 3 >>> (n*m + m*n*m).coeff(n) # = (1 + m)*n*m 1 + m >>> (n*m + m*n*m).coeff(n, right=True) # = (1 + m)*n*m m If there is more than one possible coefficient 0 is returned: >>> (n*m + m*n).coeff(n) 0 If there is only one possible coefficient, it is returned: >>> (n*m + x*m*n).coeff(m*n) x >>> (n*m + x*m*n).coeff(m*n, right=1) 1 """ x = sympify(x) if not isinstance(x, Basic): return S.Zero n = as_int(n) if not x: return S.Zero if x == self: if n == 1: return S.One return S.Zero if x is S.One: co = [a for a in Add.make_args(self) if a.as_coeff_Mul()[0] is S.One] if not co: return S.Zero return Add(*co) if n == 0: if x.is_Add and self.is_Add: c = self.coeff(x, right=right) if not c: return S.Zero if not right: return self - Add(*[a*x for a in Add.make_args(c)]) return self - Add(*[x*a for a in Add.make_args(c)]) return self.as_independent(x, as_Add=True)[0] # continue with the full method, looking for this power of x: x = x**n def incommon(l1, l2): if not l1 or not l2: return [] n = min(len(l1), len(l2)) for i in range(n): if l1[i] != l2[i]: return l1[:i] return l1[:] def find(l, sub, first=True): """ Find where list sub appears in list l. When ``first`` is True the first occurrence from the left is returned, else the last occurrence is returned. Return None if sub is not in l. >> l = range(5)*2 >> find(l, [2, 3]) 2 >> find(l, [2, 3], first=0) 7 >> find(l, [2, 4]) None """ if not sub or not l or len(sub) > len(l): return None n = len(sub) if not first: l.reverse() sub.reverse() for i in range(0, len(l) - n + 1): if all(l[i + j] == sub[j] for j in range(n)): break else: i = None if not first: l.reverse() sub.reverse() if i is not None and not first: i = len(l) - (i + n) return i co = [] args = Add.make_args(self) self_c = self.is_commutative x_c = x.is_commutative if self_c and not x_c: return S.Zero if self_c: xargs = x.args_cnc(cset=True, warn=False)[0] for a in args: margs = a.args_cnc(cset=True, warn=False)[0] if len(xargs) > len(margs): continue resid = margs.difference(xargs) if len(resid) + len(xargs) == len(margs): co.append(Mul(*resid)) if co == []: return S.Zero elif co: return Add(*co) elif x_c: xargs = x.args_cnc(cset=True, warn=False)[0] for a in args: margs, nc = a.args_cnc(cset=True) if len(xargs) > len(margs): continue resid = margs.difference(xargs) if len(resid) + len(xargs) == len(margs): co.append(Mul(*(list(resid) + nc))) if co == []: return S.Zero elif co: return Add(*co) else: # both nc xargs, nx = x.args_cnc(cset=True) # find the parts that pass the commutative terms for a in args: margs, nc = a.args_cnc(cset=True) if len(xargs) > len(margs): continue resid = margs.difference(xargs) if len(resid) + len(xargs) == len(margs): co.append((resid, nc)) # now check the non-comm parts if not co: return S.Zero if all(n == co[0][1] for r, n in co): ii = find(co[0][1], nx, right) if ii is not None: if not right: return Mul(Add(*[Mul(*r) for r, c in co]), Mul(*co[0][1][:ii])) else: return Mul(*co[0][1][ii + len(nx):]) beg = reduce(incommon, (n[1] for n in co)) if beg: ii = find(beg, nx, right) if ii is not None: if not right: gcdc = co[0][0] for i in range(1, len(co)): gcdc = gcdc.intersection(co[i][0]) if not gcdc: break return Mul(*(list(gcdc) + beg[:ii])) else: m = ii + len(nx) return Add(*[Mul(*(list(r) + n[m:])) for r, n in co]) end = list(reversed( reduce(incommon, (list(reversed(n[1])) for n in co)))) if end: ii = find(end, nx, right) if ii is not None: if not right: return Add(*[Mul(*(list(r) + n[:-len(end) + ii])) for r, n in co]) else: return Mul(*end[ii + len(nx):]) # look for single match hit = None for i, (r, n) in enumerate(co): ii = find(n, nx, right) if ii is not None: if not hit: hit = ii, r, n else: break else: if hit: ii, r, n = hit if not right: return Mul(*(list(r) + n[:ii])) else: return Mul(*n[ii + len(nx):]) return S.Zero def as_expr(self, *gens): """ Convert a polynomial to a SymPy expression. Examples ======== >>> from sympy import sin >>> from sympy.abc import x, y >>> f = (x**2 + x*y).as_poly(x, y) >>> f.as_expr() x**2 + x*y >>> sin(x).as_expr() sin(x) """ return self def as_coefficient(self, expr): """ Extracts symbolic coefficient at the given expression. In other words, this functions separates 'self' into the product of 'expr' and 'expr'-free coefficient. If such separation is not possible it will return None. Examples ======== >>> from sympy import E, pi, sin, I, Poly >>> from sympy.abc import x >>> E.as_coefficient(E) 1 >>> (2*E).as_coefficient(E) 2 >>> (2*sin(E)*E).as_coefficient(E) Two terms have E in them so a sum is returned. (If one were desiring the coefficient of the term exactly matching E then the constant from the returned expression could be selected. Or, for greater precision, a method of Poly can be used to indicate the desired term from which the coefficient is desired.) >>> (2*E + x*E).as_coefficient(E) x + 2 >>> _.args[0] # just want the exact match 2 >>> p = Poly(2*E + x*E); p Poly(x*E + 2*E, x, E, domain='ZZ') >>> p.coeff_monomial(E) 2 >>> p.nth(0, 1) 2 Since the following cannot be written as a product containing E as a factor, None is returned. (If the coefficient ``2*x`` is desired then the ``coeff`` method should be used.) >>> (2*E*x + x).as_coefficient(E) >>> (2*E*x + x).coeff(E) 2*x >>> (E*(x + 1) + x).as_coefficient(E) >>> (2*pi*I).as_coefficient(pi*I) 2 >>> (2*I).as_coefficient(pi*I) See Also ======== coeff: return sum of terms have a given factor as_coeff_Add: separate the additive constant from an expression as_coeff_Mul: separate the multiplicative constant from an expression as_independent: separate x-dependent terms/factors from others sympy.polys.polytools.coeff_monomial: efficiently find the single coefficient of a monomial in Poly sympy.polys.polytools.nth: like coeff_monomial but powers of monomial terms are used """ r = self.extract_multiplicatively(expr) if r and not r.has(expr): return r def as_independent(self, *deps, **hint): """ A mostly naive separation of a Mul or Add into arguments that are not are dependent on deps. To obtain as complete a separation of variables as possible, use a separation method first, e.g.: * separatevars() to change Mul, Add and Pow (including exp) into Mul * .expand(mul=True) to change Add or Mul into Add * .expand(log=True) to change log expr into an Add The only non-naive thing that is done here is to respect noncommutative ordering of variables and to always return (0, 0) for `self` of zero regardless of hints. For nonzero `self`, the returned tuple (i, d) has the following interpretation: * i will has no variable that appears in deps * d will either have terms that contain variables that are in deps, or be equal to 0 (when self is an Add) or 1 (when self is a Mul) * if self is an Add then self = i + d * if self is a Mul then self = i*d * otherwise (self, S.One) or (S.One, self) is returned. To force the expression to be treated as an Add, use the hint as_Add=True Examples ======== -- self is an Add >>> from sympy import sin, cos, exp >>> from sympy.abc import x, y, z >>> (x + x*y).as_independent(x) (0, x*y + x) >>> (x + x*y).as_independent(y) (x, x*y) >>> (2*x*sin(x) + y + x + z).as_independent(x) (y + z, 2*x*sin(x) + x) >>> (2*x*sin(x) + y + x + z).as_independent(x, y) (z, 2*x*sin(x) + x + y) -- self is a Mul >>> (x*sin(x)*cos(y)).as_independent(x) (cos(y), x*sin(x)) non-commutative terms cannot always be separated out when self is a Mul >>> from sympy import symbols >>> n1, n2, n3 = symbols('n1 n2 n3', commutative=False) >>> (n1 + n1*n2).as_independent(n2) (n1, n1*n2) >>> (n2*n1 + n1*n2).as_independent(n2) (0, n1*n2 + n2*n1) >>> (n1*n2*n3).as_independent(n1) (1, n1*n2*n3) >>> (n1*n2*n3).as_independent(n2) (n1, n2*n3) >>> ((x-n1)*(x-y)).as_independent(x) (1, (x - y)*(x - n1)) -- self is anything else: >>> (sin(x)).as_independent(x) (1, sin(x)) >>> (sin(x)).as_independent(y) (sin(x), 1) >>> exp(x+y).as_independent(x) (1, exp(x + y)) -- force self to be treated as an Add: >>> (3*x).as_independent(x, as_Add=True) (0, 3*x) -- force self to be treated as a Mul: >>> (3+x).as_independent(x, as_Add=False) (1, x + 3) >>> (-3+x).as_independent(x, as_Add=False) (1, x - 3) Note how the below differs from the above in making the constant on the dep term positive. >>> (y*(-3+x)).as_independent(x) (y, x - 3) -- use .as_independent() for true independence testing instead of .has(). The former considers only symbols in the free symbols while the latter considers all symbols >>> from sympy import Integral >>> I = Integral(x, (x, 1, 2)) >>> I.has(x) True >>> x in I.free_symbols False >>> I.as_independent(x) == (I, 1) True >>> (I + x).as_independent(x) == (I, x) True Note: when trying to get independent terms, a separation method might need to be used first. In this case, it is important to keep track of what you send to this routine so you know how to interpret the returned values >>> from sympy import separatevars, log >>> separatevars(exp(x+y)).as_independent(x) (exp(y), exp(x)) >>> (x + x*y).as_independent(y) (x, x*y) >>> separatevars(x + x*y).as_independent(y) (x, y + 1) >>> (x*(1 + y)).as_independent(y) (x, y + 1) >>> (x*(1 + y)).expand(mul=True).as_independent(y) (x, x*y) >>> a, b=symbols('a b', positive=True) >>> (log(a*b).expand(log=True)).as_independent(b) (log(a), log(b)) See Also ======== .separatevars(), .expand(log=True), Add.as_two_terms(), Mul.as_two_terms(), .as_coeff_add(), .as_coeff_mul() """ from .symbol import Symbol from .add import _unevaluated_Add from .mul import _unevaluated_Mul from sympy.utilities.iterables import sift if self.is_zero: return S.Zero, S.Zero func = self.func if hint.get('as_Add', isinstance(self, Add) ): want = Add else: want = Mul # sift out deps into symbolic and other and ignore # all symbols but those that are in the free symbols sym = set() other = [] for d in deps: if isinstance(d, Symbol): # Symbol.is_Symbol is True sym.add(d) else: other.append(d) def has(e): """return the standard has() if there are no literal symbols, else check to see that symbol-deps are in the free symbols.""" has_other = e.has(*other) if not sym: return has_other return has_other or e.has(*(e.free_symbols & sym)) if (want is not func or func is not Add and func is not Mul): if has(self): return (want.identity, self) else: return (self, want.identity) else: if func is Add: args = list(self.args) else: args, nc = self.args_cnc() d = sift(args, lambda x: has(x)) depend = d[True] indep = d[False] if func is Add: # all terms were treated as commutative return (Add(*indep), _unevaluated_Add(*depend)) else: # handle noncommutative by stopping at first dependent term for i, n in enumerate(nc): if has(n): depend.extend(nc[i:]) break indep.append(n) return Mul(*indep), ( Mul(*depend, evaluate=False) if nc else _unevaluated_Mul(*depend)) def as_real_imag(self, deep=True, **hints): """Performs complex expansion on 'self' and returns a tuple containing collected both real and imaginary parts. This method can't be confused with re() and im() functions, which does not perform complex expansion at evaluation. However it is possible to expand both re() and im() functions and get exactly the same results as with a single call to this function. >>> from sympy import symbols, I >>> x, y = symbols('x,y', real=True) >>> (x + y*I).as_real_imag() (x, y) >>> from sympy.abc import z, w >>> (z + w*I).as_real_imag() (re(z) - im(w), re(w) + im(z)) """ from sympy import im, re if hints.get('ignore') == self: return None else: return (re(self), im(self)) def as_powers_dict(self): """Return self as a dictionary of factors with each factor being treated as a power. The keys are the bases of the factors and the values, the corresponding exponents. The resulting dictionary should be used with caution if the expression is a Mul and contains non- commutative factors since the order that they appeared will be lost in the dictionary. See Also ======== as_ordered_factors: An alternative for noncommutative applications, returning an ordered list of factors. args_cnc: Similar to as_ordered_factors, but guarantees separation of commutative and noncommutative factors. """ d = defaultdict(int) d.update(dict([self.as_base_exp()])) return d def as_coefficients_dict(self): """Return a dictionary mapping terms to their Rational coefficient. Since the dictionary is a defaultdict, inquiries about terms which were not present will return a coefficient of 0. If an expression is not an Add it is considered to have a single term. Examples ======== >>> from sympy.abc import a, x >>> (3*x + a*x + 4).as_coefficients_dict() {1: 4, x: 3, a*x: 1} >>> _[a] 0 >>> (3*a*x).as_coefficients_dict() {a*x: 3} """ c, m = self.as_coeff_Mul() if not c.is_Rational: c = S.One m = self d = defaultdict(int) d.update({m: c}) return d def as_base_exp(self): # a -> b ** e return self, S.One def as_coeff_mul(self, *deps, **kwargs): """Return the tuple (c, args) where self is written as a Mul, ``m``. c should be a Rational multiplied by any factors of the Mul that are independent of deps. args should be a tuple of all other factors of m; args is empty if self is a Number or if self is independent of deps (when given). This should be used when you don't know if self is a Mul or not but you want to treat self as a Mul or if you want to process the individual arguments of the tail of self as a Mul. - if you know self is a Mul and want only the head, use self.args[0]; - if you don't want to process the arguments of the tail but need the tail then use self.as_two_terms() which gives the head and tail; - if you want to split self into an independent and dependent parts use ``self.as_independent(*deps)`` >>> from sympy import S >>> from sympy.abc import x, y >>> (S(3)).as_coeff_mul() (3, ()) >>> (3*x*y).as_coeff_mul() (3, (x, y)) >>> (3*x*y).as_coeff_mul(x) (3*y, (x,)) >>> (3*y).as_coeff_mul(x) (3*y, ()) """ if deps: if not self.has(*deps): return self, tuple() return S.One, (self,) def as_coeff_add(self, *deps): """Return the tuple (c, args) where self is written as an Add, ``a``. c should be a Rational added to any terms of the Add that are independent of deps. args should be a tuple of all other terms of ``a``; args is empty if self is a Number or if self is independent of deps (when given). This should be used when you don't know if self is an Add or not but you want to treat self as an Add or if you want to process the individual arguments of the tail of self as an Add. - if you know self is an Add and want only the head, use self.args[0]; - if you don't want to process the arguments of the tail but need the tail then use self.as_two_terms() which gives the head and tail. - if you want to split self into an independent and dependent parts use ``self.as_independent(*deps)`` >>> from sympy import S >>> from sympy.abc import x, y >>> (S(3)).as_coeff_add() (3, ()) >>> (3 + x).as_coeff_add() (3, (x,)) >>> (3 + x + y).as_coeff_add(x) (y + 3, (x,)) >>> (3 + y).as_coeff_add(x) (y + 3, ()) """ if deps: if not self.has(*deps): return self, tuple() return S.Zero, (self,) def primitive(self): """Return the positive Rational that can be extracted non-recursively from every term of self (i.e., self is treated like an Add). This is like the as_coeff_Mul() method but primitive always extracts a positive Rational (never a negative or a Float). Examples ======== >>> from sympy.abc import x >>> (3*(x + 1)**2).primitive() (3, (x + 1)**2) >>> a = (6*x + 2); a.primitive() (2, 3*x + 1) >>> b = (x/2 + 3); b.primitive() (1/2, x + 6) >>> (a*b).primitive() == (1, a*b) True """ if not self: return S.One, S.Zero c, r = self.as_coeff_Mul(rational=True) if c.is_negative: c, r = -c, -r return c, r def as_content_primitive(self, radical=False, clear=True): """This method should recursively remove a Rational from all arguments and return that (content) and the new self (primitive). The content should always be positive and ``Mul(*foo.as_content_primitive()) == foo``. The primitive need not be in canonical form and should try to preserve the underlying structure if possible (i.e. expand_mul should not be applied to self). Examples ======== >>> from sympy import sqrt >>> from sympy.abc import x, y, z >>> eq = 2 + 2*x + 2*y*(3 + 3*y) The as_content_primitive function is recursive and retains structure: >>> eq.as_content_primitive() (2, x + 3*y*(y + 1) + 1) Integer powers will have Rationals extracted from the base: >>> ((2 + 6*x)**2).as_content_primitive() (4, (3*x + 1)**2) >>> ((2 + 6*x)**(2*y)).as_content_primitive() (1, (2*(3*x + 1))**(2*y)) Terms may end up joining once their as_content_primitives are added: >>> ((5*(x*(1 + y)) + 2*x*(3 + 3*y))).as_content_primitive() (11, x*(y + 1)) >>> ((3*(x*(1 + y)) + 2*x*(3 + 3*y))).as_content_primitive() (9, x*(y + 1)) >>> ((3*(z*(1 + y)) + 2.0*x*(3 + 3*y))).as_content_primitive() (1, 6.0*x*(y + 1) + 3*z*(y + 1)) >>> ((5*(x*(1 + y)) + 2*x*(3 + 3*y))**2).as_content_primitive() (121, x**2*(y + 1)**2) >>> ((5*(x*(1 + y)) + 2.0*x*(3 + 3*y))**2).as_content_primitive() (1, 121.0*x**2*(y + 1)**2) Radical content can also be factored out of the primitive: >>> (2*sqrt(2) + 4*sqrt(10)).as_content_primitive(radical=True) (2, sqrt(2)*(1 + 2*sqrt(5))) If clear=False (default is True) then content will not be removed from an Add if it can be distributed to leave one or more terms with integer coefficients. >>> (x/2 + y).as_content_primitive() (1/2, x + 2*y) >>> (x/2 + y).as_content_primitive(clear=False) (1, x/2 + y) """ return S.One, self def as_numer_denom(self): """ expression -> a/b -> a, b This is just a stub that should be defined by an object's class methods to get anything else. See Also ======== normal: return a/b instead of a, b """ return self, S.One def normal(self): from .mul import _unevaluated_Mul n, d = self.as_numer_denom() if d is S.One: return n if d.is_Number: return _unevaluated_Mul(n, 1/d) else: return n/d def extract_multiplicatively(self, c): """Return None if it's not possible to make self in the form c * something in a nice way, i.e. preserving the properties of arguments of self. Examples ======== >>> from sympy import symbols, Rational >>> x, y = symbols('x,y', real=True) >>> ((x*y)**3).extract_multiplicatively(x**2 * y) x*y**2 >>> ((x*y)**3).extract_multiplicatively(x**4 * y) >>> (2*x).extract_multiplicatively(2) x >>> (2*x).extract_multiplicatively(3) >>> (Rational(1, 2)*x).extract_multiplicatively(3) x/6 """ from .add import _unevaluated_Add c = sympify(c) if self is S.NaN: return None if c is S.One: return self elif c == self: return S.One if c.is_Add: cc, pc = c.primitive() if cc is not S.One: c = Mul(cc, pc, evaluate=False) if c.is_Mul: a, b = c.as_two_terms() x = self.extract_multiplicatively(a) if x is not None: return x.extract_multiplicatively(b) quotient = self / c if self.is_Number: if self is S.Infinity: if c.is_positive: return S.Infinity elif self is S.NegativeInfinity: if c.is_negative: return S.Infinity elif c.is_positive: return S.NegativeInfinity elif self is S.ComplexInfinity: if not c.is_zero: return S.ComplexInfinity elif self.is_Integer: if not quotient.is_Integer: return None elif self.is_positive and quotient.is_negative: return None else: return quotient elif self.is_Rational: if not quotient.is_Rational: return None elif self.is_positive and quotient.is_negative: return None else: return quotient elif self.is_Float: if not quotient.is_Float: return None elif self.is_positive and quotient.is_negative: return None else: return quotient elif self.is_NumberSymbol or self.is_Symbol or self is S.ImaginaryUnit: if quotient.is_Mul and len(quotient.args) == 2: if quotient.args[0].is_Integer and quotient.args[0].is_positive and quotient.args[1] == self: return quotient elif quotient.is_Integer and c.is_Number: return quotient elif self.is_Add: cs, ps = self.primitive() # assert cs >= 1 if c.is_Number and c is not S.NegativeOne: # assert c != 1 (handled at top) if cs is not S.One: if c.is_negative: xc = -(cs.extract_multiplicatively(-c)) else: xc = cs.extract_multiplicatively(c) if xc is not None: return xc*ps # rely on 2-arg Mul to restore Add return # |c| != 1 can only be extracted from cs if c == ps: return cs # check args of ps newargs = [] for arg in ps.args: newarg = arg.extract_multiplicatively(c) if newarg is None: return # all or nothing newargs.append(newarg) if cs is not S.One: args = [cs*t for t in newargs] # args may be in different order return _unevaluated_Add(*args) else: return Add._from_args(newargs) elif self.is_Mul: args = list(self.args) for i, arg in enumerate(args): newarg = arg.extract_multiplicatively(c) if newarg is not None: args[i] = newarg return Mul(*args) elif self.is_Pow: if c.is_Pow and c.base == self.base: new_exp = self.exp.extract_additively(c.exp) if new_exp is not None: return self.base ** (new_exp) elif c == self.base: new_exp = self.exp.extract_additively(1) if new_exp is not None: return self.base ** (new_exp) def extract_additively(self, c): """Return self - c if it's possible to subtract c from self and make all matching coefficients move towards zero, else return None. Examples ======== >>> from sympy.abc import x, y >>> e = 2*x + 3 >>> e.extract_additively(x + 1) x + 2 >>> e.extract_additively(3*x) >>> e.extract_additively(4) >>> (y*(x + 1)).extract_additively(x + 1) >>> ((x + 1)*(x + 2*y + 1) + 3).extract_additively(x + 1) (x + 1)*(x + 2*y) + 3 Sometimes auto-expansion will return a less simplified result than desired; gcd_terms might be used in such cases: >>> from sympy import gcd_terms >>> (4*x*(y + 1) + y).extract_additively(x) 4*x*(y + 1) + x*(4*y + 3) - x*(4*y + 4) + y >>> gcd_terms(_) x*(4*y + 3) + y See Also ======== extract_multiplicatively coeff as_coefficient """ c = sympify(c) if self is S.NaN: return None if c is S.Zero: return self elif c == self: return S.Zero elif self is S.Zero: return None if self.is_Number: if not c.is_Number: return None co = self diff = co - c # XXX should we match types? i.e should 3 - .1 succeed? if (co > 0 and diff > 0 and diff < co or co < 0 and diff < 0 and diff > co): return diff return None if c.is_Number: co, t = self.as_coeff_Add() xa = co.extract_additively(c) if xa is None: return None return xa + t # handle the args[0].is_Number case separately # since we will have trouble looking for the coeff of # a number. if c.is_Add and c.args[0].is_Number: # whole term as a term factor co = self.coeff(c) xa0 = (co.extract_additively(1) or 0)*c if xa0: diff = self - co*c return (xa0 + (diff.extract_additively(c) or diff)) or None # term-wise h, t = c.as_coeff_Add() sh, st = self.as_coeff_Add() xa = sh.extract_additively(h) if xa is None: return None xa2 = st.extract_additively(t) if xa2 is None: return None return xa + xa2 # whole term as a term factor co = self.coeff(c) xa0 = (co.extract_additively(1) or 0)*c if xa0: diff = self - co*c return (xa0 + (diff.extract_additively(c) or diff)) or None # term-wise coeffs = [] for a in Add.make_args(c): ac, at = a.as_coeff_Mul() co = self.coeff(at) if not co: return None coc, cot = co.as_coeff_Add() xa = coc.extract_additively(ac) if xa is None: return None self -= co*at coeffs.append((cot + xa)*at) coeffs.append(self) return Add(*coeffs) @property def expr_free_symbols(self): """ Like ``free_symbols``, but returns the free symbols only if they are contained in an expression node. Examples ======== >>> from sympy.abc import x, y >>> (x + y).expr_free_symbols {x, y} If the expression is contained in a non-expression object, don't return the free symbols. Compare: >>> from sympy import Tuple >>> t = Tuple(x + y) >>> t.expr_free_symbols set() >>> t.free_symbols {x, y} """ return {j for i in self.args for j in i.expr_free_symbols} def could_extract_minus_sign(self): """Return True if self is not in a canonical form with respect to its sign. For most expressions, e, there will be a difference in e and -e. When there is, True will be returned for one and False for the other; False will be returned if there is no difference. Examples ======== >>> from sympy.abc import x, y >>> e = x - y >>> {i.could_extract_minus_sign() for i in (e, -e)} {False, True} """ negative_self = -self if self == negative_self: return False # e.g. zoo*x == -zoo*x self_has_minus = (self.extract_multiplicatively(-1) is not None) negative_self_has_minus = ( (negative_self).extract_multiplicatively(-1) is not None) if self_has_minus != negative_self_has_minus: return self_has_minus else: if self.is_Add: # We choose the one with less arguments with minus signs all_args = len(self.args) negative_args = len([False for arg in self.args if arg.could_extract_minus_sign()]) positive_args = all_args - negative_args if positive_args > negative_args: return False elif positive_args < negative_args: return True elif self.is_Mul: # We choose the one with an odd number of minus signs num, den = self.as_numer_denom() args = Mul.make_args(num) + Mul.make_args(den) arg_signs = [arg.could_extract_minus_sign() for arg in args] negative_args = list(filter(None, arg_signs)) return len(negative_args) % 2 == 1 # As a last resort, we choose the one with greater value of .sort_key() return bool(self.sort_key() < negative_self.sort_key()) def extract_branch_factor(self, allow_half=False): """ Try to write self as ``exp_polar(2*pi*I*n)*z`` in a nice way. Return (z, n). >>> from sympy import exp_polar, I, pi >>> from sympy.abc import x, y >>> exp_polar(I*pi).extract_branch_factor() (exp_polar(I*pi), 0) >>> exp_polar(2*I*pi).extract_branch_factor() (1, 1) >>> exp_polar(-pi*I).extract_branch_factor() (exp_polar(I*pi), -1) >>> exp_polar(3*pi*I + x).extract_branch_factor() (exp_polar(x + I*pi), 1) >>> (y*exp_polar(-5*pi*I)*exp_polar(3*pi*I + 2*pi*x)).extract_branch_factor() (y*exp_polar(2*pi*x), -1) >>> exp_polar(-I*pi/2).extract_branch_factor() (exp_polar(-I*pi/2), 0) If allow_half is True, also extract exp_polar(I*pi): >>> exp_polar(I*pi).extract_branch_factor(allow_half=True) (1, 1/2) >>> exp_polar(2*I*pi).extract_branch_factor(allow_half=True) (1, 1) >>> exp_polar(3*I*pi).extract_branch_factor(allow_half=True) (1, 3/2) >>> exp_polar(-I*pi).extract_branch_factor(allow_half=True) (1, -1/2) """ from sympy import exp_polar, pi, I, ceiling, Add n = S(0) res = S(1) args = Mul.make_args(self) exps = [] for arg in args: if isinstance(arg, exp_polar): exps += [arg.exp] else: res *= arg piimult = S(0) extras = [] while exps: exp = exps.pop() if exp.is_Add: exps += exp.args continue if exp.is_Mul: coeff = exp.as_coefficient(pi*I) if coeff is not None: piimult += coeff continue extras += [exp] if piimult.is_number: coeff = piimult tail = () else: coeff, tail = piimult.as_coeff_add(*piimult.free_symbols) # round down to nearest multiple of 2 branchfact = ceiling(coeff/2 - S(1)/2)*2 n += branchfact/2 c = coeff - branchfact if allow_half: nc = c.extract_additively(1) if nc is not None: n += S(1)/2 c = nc newexp = pi*I*Add(*((c, ) + tail)) + Add(*extras) if newexp != 0: res *= exp_polar(newexp) return res, n def _eval_is_polynomial(self, syms): if self.free_symbols.intersection(syms) == set([]): return True return False def is_polynomial(self, *syms): r""" Return True if self is a polynomial in syms and False otherwise. This checks if self is an exact polynomial in syms. This function returns False for expressions that are "polynomials" with symbolic exponents. Thus, you should be able to apply polynomial algorithms to expressions for which this returns True, and Poly(expr, \*syms) should work if and only if expr.is_polynomial(\*syms) returns True. The polynomial does not have to be in expanded form. If no symbols are given, all free symbols in the expression will be used. This is not part of the assumptions system. You cannot do Symbol('z', polynomial=True). Examples ======== >>> from sympy import Symbol >>> x = Symbol('x') >>> ((x**2 + 1)**4).is_polynomial(x) True >>> ((x**2 + 1)**4).is_polynomial() True >>> (2**x + 1).is_polynomial(x) False >>> n = Symbol('n', nonnegative=True, integer=True) >>> (x**n + 1).is_polynomial(x) False This function does not attempt any nontrivial simplifications that may result in an expression that does not appear to be a polynomial to become one. >>> from sympy import sqrt, factor, cancel >>> y = Symbol('y', positive=True) >>> a = sqrt(y**2 + 2*y + 1) >>> a.is_polynomial(y) False >>> factor(a) y + 1 >>> factor(a).is_polynomial(y) True >>> b = (y**2 + 2*y + 1)/(y + 1) >>> b.is_polynomial(y) False >>> cancel(b) y + 1 >>> cancel(b).is_polynomial(y) True See also .is_rational_function() """ if syms: syms = set(map(sympify, syms)) else: syms = self.free_symbols if syms.intersection(self.free_symbols) == set([]): # constant polynomial return True else: return self._eval_is_polynomial(syms) def _eval_is_rational_function(self, syms): if self.free_symbols.intersection(syms) == set([]): return True return False def is_rational_function(self, *syms): """ Test whether function is a ratio of two polynomials in the given symbols, syms. When syms is not given, all free symbols will be used. The rational function does not have to be in expanded or in any kind of canonical form. This function returns False for expressions that are "rational functions" with symbolic exponents. Thus, you should be able to call .as_numer_denom() and apply polynomial algorithms to the result for expressions for which this returns True. This is not part of the assumptions system. You cannot do Symbol('z', rational_function=True). Examples ======== >>> from sympy import Symbol, sin >>> from sympy.abc import x, y >>> (x/y).is_rational_function() True >>> (x**2).is_rational_function() True >>> (x/sin(y)).is_rational_function(y) False >>> n = Symbol('n', integer=True) >>> (x**n + 1).is_rational_function(x) False This function does not attempt any nontrivial simplifications that may result in an expression that does not appear to be a rational function to become one. >>> from sympy import sqrt, factor >>> y = Symbol('y', positive=True) >>> a = sqrt(y**2 + 2*y + 1)/y >>> a.is_rational_function(y) False >>> factor(a) (y + 1)/y >>> factor(a).is_rational_function(y) True See also is_algebraic_expr(). """ if self in [S.NaN, S.Infinity, -S.Infinity, S.ComplexInfinity]: return False if syms: syms = set(map(sympify, syms)) else: syms = self.free_symbols if syms.intersection(self.free_symbols) == set([]): # constant rational function return True else: return self._eval_is_rational_function(syms) def _eval_is_algebraic_expr(self, syms): if self.free_symbols.intersection(syms) == set([]): return True return False def is_algebraic_expr(self, *syms): """ This tests whether a given expression is algebraic or not, in the given symbols, syms. When syms is not given, all free symbols will be used. The rational function does not have to be in expanded or in any kind of canonical form. This function returns False for expressions that are "algebraic expressions" with symbolic exponents. This is a simple extension to the is_rational_function, including rational exponentiation. Examples ======== >>> from sympy import Symbol, sqrt >>> x = Symbol('x', real=True) >>> sqrt(1 + x).is_rational_function() False >>> sqrt(1 + x).is_algebraic_expr() True This function does not attempt any nontrivial simplifications that may result in an expression that does not appear to be an algebraic expression to become one. >>> from sympy import exp, factor >>> a = sqrt(exp(x)**2 + 2*exp(x) + 1)/(exp(x) + 1) >>> a.is_algebraic_expr(x) False >>> factor(a).is_algebraic_expr() True See Also ======== is_rational_function() References ========== - https://en.wikipedia.org/wiki/Algebraic_expression """ if syms: syms = set(map(sympify, syms)) else: syms = self.free_symbols if syms.intersection(self.free_symbols) == set([]): # constant algebraic expression return True else: return self._eval_is_algebraic_expr(syms) ################################################################################### ##################### SERIES, LEADING TERM, LIMIT, ORDER METHODS ################## ################################################################################### def series(self, x=None, x0=0, n=6, dir="+", logx=None): """ Series expansion of "self" around ``x = x0`` yielding either terms of the series one by one (the lazy series given when n=None), else all the terms at once when n != None. Returns the series expansion of "self" around the point ``x = x0`` with respect to ``x`` up to ``O((x - x0)**n, x, x0)`` (default n is 6). If ``x=None`` and ``self`` is univariate, the univariate symbol will be supplied, otherwise an error will be raised. Parameters ========== expr : Expression The expression whose series is to be expanded. x : Symbol It is the variable of the expression to be calculated. x0 : Value The value around which ``x`` is calculated. Can be any value from ``-oo`` to ``oo``. n : Value The number of terms upto which the series is to be expanded. dir : String, optional The series-expansion can be bi-directional. If ``dir="+"``, then (x->x0+). If ``dir="-", then (x->x0-). For infinite ``x0`` (``oo`` or ``-oo``), the ``dir`` argument is determined from the direction of the infinity (i.e., ``dir="-"`` for ``oo``). logx : optional It is used to replace any log(x) in the returned series with a symbolic value rather than evaluating the actual value. Examples ======== >>> from sympy import cos, exp, tan, oo, series >>> from sympy.abc import x, y >>> cos(x).series() 1 - x**2/2 + x**4/24 + O(x**6) >>> cos(x).series(n=4) 1 - x**2/2 + O(x**4) >>> cos(x).series(x, x0=1, n=2) cos(1) - (x - 1)*sin(1) + O((x - 1)**2, (x, 1)) >>> e = cos(x + exp(y)) >>> e.series(y, n=2) cos(x + 1) - y*sin(x + 1) + O(y**2) >>> e.series(x, n=2) cos(exp(y)) - x*sin(exp(y)) + O(x**2) If ``n=None`` then a generator of the series terms will be returned. >>> term=cos(x).series(n=None) >>> [next(term) for i in range(2)] [1, -x**2/2] For ``dir=+`` (default) the series is calculated from the right and for ``dir=-`` the series from the left. For smooth functions this flag will not alter the results. >>> abs(x).series(dir="+") x >>> abs(x).series(dir="-") -x >>> f = tan(x) >>> f.series(x, 2, 6, "+") tan(2) + (1 + tan(2)**2)*(x - 2) + (x - 2)**2*(tan(2)**3 + tan(2)) + (x - 2)**3*(1/3 + 4*tan(2)**2/3 + tan(2)**4) + (x - 2)**4*(tan(2)**5 + 5*tan(2)**3/3 + 2*tan(2)/3) + (x - 2)**5*(2/15 + 17*tan(2)**2/15 + 2*tan(2)**4 + tan(2)**6) + O((x - 2)**6, (x, 2)) >>> f.series(x, 2, 3, "-") tan(2) + (2 - x)*(-tan(2)**2 - 1) + (2 - x)**2*(tan(2)**3 + tan(2)) + O((x - 2)**3, (x, 2)) Returns ======= Expr : Expression Series expansion of the expression about x0 Raises ====== TypeError If "n" and "x0" are infinity objects PoleError If "x0" is an infinity object """ from sympy import collect, Dummy, Order, Rational, Symbol, ceiling if x is None: syms = self.free_symbols if not syms: return self elif len(syms) > 1: raise ValueError('x must be given for multivariate functions.') x = syms.pop() if isinstance(x, Symbol): dep = x in self.free_symbols else: d = Dummy() dep = d in self.xreplace({x: d}).free_symbols if not dep: if n is None: return (s for s in [self]) else: return self if len(dir) != 1 or dir not in '+-': raise ValueError("Dir must be '+' or '-'") if x0 in [S.Infinity, S.NegativeInfinity]: sgn = 1 if x0 is S.Infinity else -1 s = self.subs(x, sgn/x).series(x, n=n, dir='+') if n is None: return (si.subs(x, sgn/x) for si in s) return s.subs(x, sgn/x) # use rep to shift origin to x0 and change sign (if dir is negative) # and undo the process with rep2 if x0 or dir == '-': if dir == '-': rep = -x + x0 rep2 = -x rep2b = x0 else: rep = x + x0 rep2 = x rep2b = -x0 s = self.subs(x, rep).series(x, x0=0, n=n, dir='+', logx=logx) if n is None: # lseries... return (si.subs(x, rep2 + rep2b) for si in s) return s.subs(x, rep2 + rep2b) # from here on it's x0=0 and dir='+' handling if x.is_positive is x.is_negative is None or x.is_Symbol is not True: # replace x with an x that has a positive assumption xpos = Dummy('x', positive=True, finite=True) rv = self.subs(x, xpos).series(xpos, x0, n, dir, logx=logx) if n is None: return (s.subs(xpos, x) for s in rv) else: return rv.subs(xpos, x) if n is not None: # nseries handling s1 = self._eval_nseries(x, n=n, logx=logx) o = s1.getO() or S.Zero if o: # make sure the requested order is returned ngot = o.getn() if ngot > n: # leave o in its current form (e.g. with x*log(x)) so # it eats terms properly, then replace it below if n != 0: s1 += o.subs(x, x**Rational(n, ngot)) else: s1 += Order(1, x) elif ngot < n: # increase the requested number of terms to get the desired # number keep increasing (up to 9) until the received order # is different than the original order and then predict how # many additional terms are needed for more in range(1, 9): s1 = self._eval_nseries(x, n=n + more, logx=logx) newn = s1.getn() if newn != ngot: ndo = n + ceiling((n - ngot)*more/(newn - ngot)) s1 = self._eval_nseries(x, n=ndo, logx=logx) while s1.getn() < n: s1 = self._eval_nseries(x, n=ndo, logx=logx) ndo += 1 break else: raise ValueError('Could not calculate %s terms for %s' % (str(n), self)) s1 += Order(x**n, x) o = s1.getO() s1 = s1.removeO() else: o = Order(x**n, x) s1done = s1.doit() if (s1done + o).removeO() == s1done: o = S.Zero try: return collect(s1, x) + o except NotImplementedError: return s1 + o else: # lseries handling def yield_lseries(s): """Return terms of lseries one at a time.""" for si in s: if not si.is_Add: yield si continue # yield terms 1 at a time if possible # by increasing order until all the # terms have been returned yielded = 0 o = Order(si, x)*x ndid = 0 ndo = len(si.args) while 1: do = (si - yielded + o).removeO() o *= x if not do or do.is_Order: continue if do.is_Add: ndid += len(do.args) else: ndid += 1 yield do if ndid == ndo: break yielded += do return yield_lseries(self.removeO()._eval_lseries(x, logx=logx)) def taylor_term(self, n, x, *previous_terms): """General method for the taylor term. This method is slow, because it differentiates n-times. Subclasses can redefine it to make it faster by using the "previous_terms". """ from sympy import Dummy, factorial x = sympify(x) _x = Dummy('x') return self.subs(x, _x).diff(_x, n).subs(_x, x).subs(x, 0) * x**n / factorial(n) def lseries(self, x=None, x0=0, dir='+', logx=None): """ Wrapper for series yielding an iterator of the terms of the series. Note: an infinite series will yield an infinite iterator. The following, for exaxmple, will never terminate. It will just keep printing terms of the sin(x) series:: for term in sin(x).lseries(x): print term The advantage of lseries() over nseries() is that many times you are just interested in the next term in the series (i.e. the first term for example), but you don't know how many you should ask for in nseries() using the "n" parameter. See also nseries(). """ return self.series(x, x0, n=None, dir=dir, logx=logx) def _eval_lseries(self, x, logx=None): # default implementation of lseries is using nseries(), and adaptively # increasing the "n". As you can see, it is not very efficient, because # we are calculating the series over and over again. Subclasses should # override this method and implement much more efficient yielding of # terms. n = 0 series = self._eval_nseries(x, n=n, logx=logx) if not series.is_Order: if series.is_Add: yield series.removeO() else: yield series return while series.is_Order: n += 1 series = self._eval_nseries(x, n=n, logx=logx) e = series.removeO() yield e while 1: while 1: n += 1 series = self._eval_nseries(x, n=n, logx=logx).removeO() if e != series: break yield series - e e = series def nseries(self, x=None, x0=0, n=6, dir='+', logx=None): """ Wrapper to _eval_nseries if assumptions allow, else to series. If x is given, x0 is 0, dir='+', and self has x, then _eval_nseries is called. This calculates "n" terms in the innermost expressions and then builds up the final series just by "cross-multiplying" everything out. The optional ``logx`` parameter can be used to replace any log(x) in the returned series with a symbolic value to avoid evaluating log(x) at 0. A symbol to use in place of log(x) should be provided. Advantage -- it's fast, because we don't have to determine how many terms we need to calculate in advance. Disadvantage -- you may end up with less terms than you may have expected, but the O(x**n) term appended will always be correct and so the result, though perhaps shorter, will also be correct. If any of those assumptions is not met, this is treated like a wrapper to series which will try harder to return the correct number of terms. See also lseries(). Examples ======== >>> from sympy import sin, log, Symbol >>> from sympy.abc import x, y >>> sin(x).nseries(x, 0, 6) x - x**3/6 + x**5/120 + O(x**6) >>> log(x+1).nseries(x, 0, 5) x - x**2/2 + x**3/3 - x**4/4 + O(x**5) Handling of the ``logx`` parameter --- in the following example the expansion fails since ``sin`` does not have an asymptotic expansion at -oo (the limit of log(x) as x approaches 0): >>> e = sin(log(x)) >>> e.nseries(x, 0, 6) Traceback (most recent call last): ... PoleError: ... ... >>> logx = Symbol('logx') >>> e.nseries(x, 0, 6, logx=logx) sin(logx) In the following example, the expansion works but gives only an Order term unless the ``logx`` parameter is used: >>> e = x**y >>> e.nseries(x, 0, 2) O(log(x)**2) >>> e.nseries(x, 0, 2, logx=logx) exp(logx*y) """ if x and not x in self.free_symbols: return self if x is None or x0 or dir != '+': # {see XPOS above} or (x.is_positive == x.is_negative == None): return self.series(x, x0, n, dir) else: return self._eval_nseries(x, n=n, logx=logx) def _eval_nseries(self, x, n, logx): """ Return terms of series for self up to O(x**n) at x=0 from the positive direction. This is a method that should be overridden in subclasses. Users should never call this method directly (use .nseries() instead), so you don't have to write docstrings for _eval_nseries(). """ from sympy.utilities.misc import filldedent raise NotImplementedError(filldedent(""" The _eval_nseries method should be added to %s to give terms up to O(x**n) at x=0 from the positive direction so it is available when nseries calls it.""" % self.func) ) def limit(self, x, xlim, dir='+'): """ Compute limit x->xlim. """ from sympy.series.limits import limit return limit(self, x, xlim, dir) def compute_leading_term(self, x, logx=None): """ as_leading_term is only allowed for results of .series() This is a wrapper to compute a series first. """ from sympy import Dummy, log from sympy.series.gruntz import calculate_series if self.removeO() == 0: return self if logx is None: d = Dummy('logx') s = calculate_series(self, x, d).subs(d, log(x)) else: s = calculate_series(self, x, logx) return s.as_leading_term(x) @cacheit def as_leading_term(self, *symbols): """ Returns the leading (nonzero) term of the series expansion of self. The _eval_as_leading_term routines are used to do this, and they must always return a non-zero value. Examples ======== >>> from sympy.abc import x >>> (1 + x + x**2).as_leading_term(x) 1 >>> (1/x**2 + x + x**2).as_leading_term(x) x**(-2) """ from sympy import powsimp if len(symbols) > 1: c = self for x in symbols: c = c.as_leading_term(x) return c elif not symbols: return self x = sympify(symbols[0]) if not x.is_symbol: raise ValueError('expecting a Symbol but got %s' % x) if x not in self.free_symbols: return self obj = self._eval_as_leading_term(x) if obj is not None: return powsimp(obj, deep=True, combine='exp') raise NotImplementedError('as_leading_term(%s, %s)' % (self, x)) def _eval_as_leading_term(self, x): return self def as_coeff_exponent(self, x): """ ``c*x**e -> c,e`` where x can be any symbolic expression. """ from sympy import collect s = collect(self, x) c, p = s.as_coeff_mul(x) if len(p) == 1: b, e = p[0].as_base_exp() if b == x: return c, e return s, S.Zero def leadterm(self, x): """ Returns the leading term a*x**b as a tuple (a, b). Examples ======== >>> from sympy.abc import x >>> (1+x+x**2).leadterm(x) (1, 0) >>> (1/x**2+x+x**2).leadterm(x) (1, -2) """ from sympy import Dummy, log l = self.as_leading_term(x) d = Dummy('logx') if l.has(log(x)): l = l.subs(log(x), d) c, e = l.as_coeff_exponent(x) if x in c.free_symbols: from sympy.utilities.misc import filldedent raise ValueError(filldedent(""" cannot compute leadterm(%s, %s). The coefficient should have been free of x but got %s""" % (self, x, c))) c = c.subs(d, log(x)) return c, e def as_coeff_Mul(self, rational=False): """Efficiently extract the coefficient of a product. """ return S.One, self def as_coeff_Add(self, rational=False): """Efficiently extract the coefficient of a summation. """ return S.Zero, self def fps(self, x=None, x0=0, dir=1, hyper=True, order=4, rational=True, full=False): """ Compute formal power power series of self. See the docstring of the :func:`fps` function in sympy.series.formal for more information. """ from sympy.series.formal import fps return fps(self, x, x0, dir, hyper, order, rational, full) def fourier_series(self, limits=None): """Compute fourier sine/cosine series of self. See the docstring of the :func:`fourier_series` in sympy.series.fourier for more information. """ from sympy.series.fourier import fourier_series return fourier_series(self, limits) ################################################################################### ##################### DERIVATIVE, INTEGRAL, FUNCTIONAL METHODS #################### ################################################################################### def diff(self, *symbols, **assumptions): assumptions.setdefault("evaluate", True) return Derivative(self, *symbols, **assumptions) ########################################################################### ###################### EXPRESSION EXPANSION METHODS ####################### ########################################################################### # Relevant subclasses should override _eval_expand_hint() methods. See # the docstring of expand() for more info. def _eval_expand_complex(self, **hints): real, imag = self.as_real_imag(**hints) return real + S.ImaginaryUnit*imag @staticmethod def _expand_hint(expr, hint, deep=True, **hints): """ Helper for ``expand()``. Recursively calls ``expr._eval_expand_hint()``. Returns ``(expr, hit)``, where expr is the (possibly) expanded ``expr`` and ``hit`` is ``True`` if ``expr`` was truly expanded and ``False`` otherwise. """ hit = False # XXX: Hack to support non-Basic args # | # V if deep and getattr(expr, 'args', ()) and not expr.is_Atom: sargs = [] for arg in expr.args: arg, arghit = Expr._expand_hint(arg, hint, **hints) hit |= arghit sargs.append(arg) if hit: expr = expr.func(*sargs) if hasattr(expr, hint): newexpr = getattr(expr, hint)(**hints) if newexpr != expr: return (newexpr, True) return (expr, hit) @cacheit def expand(self, deep=True, modulus=None, power_base=True, power_exp=True, mul=True, log=True, multinomial=True, basic=True, **hints): """ Expand an expression using hints. See the docstring of the expand() function in sympy.core.function for more information. """ from sympy.simplify.radsimp import fraction hints.update(power_base=power_base, power_exp=power_exp, mul=mul, log=log, multinomial=multinomial, basic=basic) expr = self if hints.pop('frac', False): n, d = [a.expand(deep=deep, modulus=modulus, **hints) for a in fraction(self)] return n/d elif hints.pop('denom', False): n, d = fraction(self) return n/d.expand(deep=deep, modulus=modulus, **hints) elif hints.pop('numer', False): n, d = fraction(self) return n.expand(deep=deep, modulus=modulus, **hints)/d # Although the hints are sorted here, an earlier hint may get applied # at a given node in the expression tree before another because of how # the hints are applied. e.g. expand(log(x*(y + z))) -> log(x*y + # x*z) because while applying log at the top level, log and mul are # applied at the deeper level in the tree so that when the log at the # upper level gets applied, the mul has already been applied at the # lower level. # Additionally, because hints are only applied once, the expression # may not be expanded all the way. For example, if mul is applied # before multinomial, x*(x + 1)**2 won't be expanded all the way. For # now, we just use a special case to make multinomial run before mul, # so that at least polynomials will be expanded all the way. In the # future, smarter heuristics should be applied. # TODO: Smarter heuristics def _expand_hint_key(hint): """Make multinomial come before mul""" if hint == 'mul': return 'mulz' return hint for hint in sorted(hints.keys(), key=_expand_hint_key): use_hint = hints[hint] if use_hint: hint = '_eval_expand_' + hint expr, hit = Expr._expand_hint(expr, hint, deep=deep, **hints) while True: was = expr if hints.get('multinomial', False): expr, _ = Expr._expand_hint( expr, '_eval_expand_multinomial', deep=deep, **hints) if hints.get('mul', False): expr, _ = Expr._expand_hint( expr, '_eval_expand_mul', deep=deep, **hints) if hints.get('log', False): expr, _ = Expr._expand_hint( expr, '_eval_expand_log', deep=deep, **hints) if expr == was: break if modulus is not None: modulus = sympify(modulus) if not modulus.is_Integer or modulus <= 0: raise ValueError( "modulus must be a positive integer, got %s" % modulus) terms = [] for term in Add.make_args(expr): coeff, tail = term.as_coeff_Mul(rational=True) coeff %= modulus if coeff: terms.append(coeff*tail) expr = Add(*terms) return expr ########################################################################### ################### GLOBAL ACTION VERB WRAPPER METHODS #################### ########################################################################### def integrate(self, *args, **kwargs): """See the integrate function in sympy.integrals""" from sympy.integrals import integrate return integrate(self, *args, **kwargs) def simplify(self, **kwargs): """See the simplify function in sympy.simplify""" from sympy.simplify import simplify return simplify(self, **kwargs) def nsimplify(self, constants=[], tolerance=None, full=False): """See the nsimplify function in sympy.simplify""" from sympy.simplify import nsimplify return nsimplify(self, constants, tolerance, full) def separate(self, deep=False, force=False): """See the separate function in sympy.simplify""" from sympy.core.function import expand_power_base return expand_power_base(self, deep=deep, force=force) def collect(self, syms, func=None, evaluate=True, exact=False, distribute_order_term=True): """See the collect function in sympy.simplify""" from sympy.simplify import collect return collect(self, syms, func, evaluate, exact, distribute_order_term) def together(self, *args, **kwargs): """See the together function in sympy.polys""" from sympy.polys import together return together(self, *args, **kwargs) def apart(self, x=None, **args): """See the apart function in sympy.polys""" from sympy.polys import apart return apart(self, x, **args) def ratsimp(self): """See the ratsimp function in sympy.simplify""" from sympy.simplify import ratsimp return ratsimp(self) def trigsimp(self, **args): """See the trigsimp function in sympy.simplify""" from sympy.simplify import trigsimp return trigsimp(self, **args) def radsimp(self, **kwargs): """See the radsimp function in sympy.simplify""" from sympy.simplify import radsimp return radsimp(self, **kwargs) def powsimp(self, *args, **kwargs): """See the powsimp function in sympy.simplify""" from sympy.simplify import powsimp return powsimp(self, *args, **kwargs) def combsimp(self): """See the combsimp function in sympy.simplify""" from sympy.simplify import combsimp return combsimp(self) def gammasimp(self): """See the gammasimp function in sympy.simplify""" from sympy.simplify import gammasimp return gammasimp(self) def factor(self, *gens, **args): """See the factor() function in sympy.polys.polytools""" from sympy.polys import factor return factor(self, *gens, **args) def refine(self, assumption=True): """See the refine function in sympy.assumptions""" from sympy.assumptions import refine return refine(self, assumption) def cancel(self, *gens, **args): """See the cancel function in sympy.polys""" from sympy.polys import cancel return cancel(self, *gens, **args) def invert(self, g, *gens, **args): """Return the multiplicative inverse of ``self`` mod ``g`` where ``self`` (and ``g``) may be symbolic expressions). See Also ======== sympy.core.numbers.mod_inverse, sympy.polys.polytools.invert """ from sympy.polys.polytools import invert from sympy.core.numbers import mod_inverse if self.is_number and getattr(g, 'is_number', True): return mod_inverse(self, g) return invert(self, g, *gens, **args) def round(self, n=None): """Return x rounded to the given decimal place. If a complex number would results, apply round to the real and imaginary components of the number. Examples ======== >>> from sympy import pi, E, I, S, Add, Mul, Number >>> pi.round() 3 >>> pi.round(2) 3.14 >>> (2*pi + E*I).round() 6 + 3*I The round method has a chopping effect: >>> (2*pi + I/10).round() 6 >>> (pi/10 + 2*I).round() 2*I >>> (pi/10 + E*I).round(2) 0.31 + 2.72*I Notes ===== The Python builtin function, round, always returns a float in Python 2 while the SymPy round method (and round with a Number argument in Python 3) returns a Number. >>> from sympy.core.compatibility import PY3 >>> isinstance(round(S(123), -2), Number if PY3 else float) True For a consistent behavior, and Python 3 rounding rules, import `round` from sympy.core.compatibility. >>> from sympy.core.compatibility import round >>> isinstance(round(S(123), -2), Number) True """ from sympy.core.power import integer_log from sympy.core.numbers import Float x = self if not x.is_number: raise TypeError("can't round symbolic expression") if not x.is_Atom: if not pure_complex(x.n(2), or_real=True): raise TypeError( 'Expected a number but got %s:' % func_name(x)) elif x in (S.NaN, S.Infinity, S.NegativeInfinity, S.ComplexInfinity): return x if not x.is_extended_real: i, r = x.as_real_imag() return i.round(n) + S.ImaginaryUnit*r.round(n) if not x: return S.Zero if n is None else x p = as_int(n or 0) if x.is_Integer: # XXX return Integer(round(int(x), p)) when Py2 is dropped if p >= 0: return x m = 10**-p i, r = divmod(abs(x), m) if i%2 and 2*r == m: i += 1 elif 2*r > m: i += 1 if x < 0: i *= -1 return i*m digits_to_decimal = _mag(x) # _mag(12) = 2, _mag(.012) = -1 allow = digits_needed = digits_to_decimal + p precs = [f._prec for f in x.atoms(Float)] dps = prec_to_dps(max(precs)) if precs else None if dps is None: # assume everything is exact so use the Python # float default or whatever was requested dps = max(15, allow) else: allow = min(allow, dps) # this will shift all digits to right of decimal # and give us dps to work with as an int shift = -digits_to_decimal + dps extra = 1 # how far we look past known digits # NOTE # mpmath will calculate the binary representation to # an arbitrary number of digits but we must base our # answer on a finite number of those digits, e.g. # .575 2589569785738035/2**52 in binary. # mpmath shows us that the first 18 digits are # >>> Float(.575).n(18) # 0.574999999999999956 # The default precision is 15 digits and if we ask # for 15 we get # >>> Float(.575).n(15) # 0.575000000000000 # mpmath handles rounding at the 15th digit. But we # need to be careful since the user might be asking # for rounding at the last digit and our semantics # are to round toward the even final digit when there # is a tie. So the extra digit will be used to make # that decision. In this case, the value is the same # to 15 digits: # >>> Float(.575).n(16) # 0.5750000000000000 # Now converting this to the 15 known digits gives # 575000000000000.0 # which rounds to integer # 5750000000000000 # And now we can round to the desired digt, e.g. at # the second from the left and we get # 5800000000000000 # and rescaling that gives # 0.58 # as the final result. # If the value is made slightly less than 0.575 we might # still obtain the same value: # >>> Float(.575-1e-16).n(16)*10**15 # 574999999999999.8 # What 15 digits best represents the known digits (which are # to the left of the decimal? 5750000000000000, the same as # before. The only way we will round down (in this case) is # if we declared that we had more than 15 digits of precision. # For example, if we use 16 digits of precision, the integer # we deal with is # >>> Float(.575-1e-16).n(17)*10**16 # 5749999999999998.4 # and this now rounds to 5749999999999998 and (if we round to # the 2nd digit from the left) we get 5700000000000000. # xf = x.n(dps + extra)*Pow(10, shift) xi = Integer(xf) # use the last digit to select the value of xi # nearest to x before rounding at the desired digit sign = 1 if x > 0 else -1 dif2 = sign*(xf - xi).n(extra) if dif2 < 0: raise NotImplementedError( 'not expecting int(x) to round away from 0') if dif2 > .5: xi += sign # round away from 0 elif dif2 == .5: xi += sign if xi%2 else -sign # round toward even # shift p to the new position ip = p - shift # let Python handle the int rounding then rescale xr = xi.round(ip) # when Py2 is drop make this round(xi.p, ip) # restore scale rv = Rational(xr, Pow(10, shift)) # return Float or Integer if rv.is_Integer: if n is None: # the single-arg case return rv # use str or else it won't be a float return Float(str(rv), dps) # keep same precision else: if not allow and rv > self: allow += 1 return Float(rv, allow) __round__ = round def _eval_derivative_matrix_lines(self, x): from sympy.matrices.expressions.matexpr import _LeftRightArgs return [_LeftRightArgs([S.One, S.One], higher=self._eval_derivative(x))] class AtomicExpr(Atom, Expr): """ A parent class for object which are both atoms and Exprs. For example: Symbol, Number, Rational, Integer, ... But not: Add, Mul, Pow, ... """ is_number = False is_Atom = True __slots__ = [] def _eval_derivative(self, s): if self == s: return S.One return S.Zero def _eval_derivative_n_times(self, s, n): from sympy import Piecewise, Eq from sympy import Tuple, MatrixExpr from sympy.matrices.common import MatrixCommon if isinstance(s, (MatrixCommon, Tuple, Iterable, MatrixExpr)): return super(AtomicExpr, self)._eval_derivative_n_times(s, n) if self == s: return Piecewise((self, Eq(n, 0)), (1, Eq(n, 1)), (0, True)) else: return Piecewise((self, Eq(n, 0)), (0, True)) def _eval_is_polynomial(self, syms): return True def _eval_is_rational_function(self, syms): return True def _eval_is_algebraic_expr(self, syms): return True def _eval_nseries(self, x, n, logx): return self @property def expr_free_symbols(self): return {self} def _mag(x): """Return integer ``i`` such that .1 <= x/10**i < 1 Examples ======== >>> from sympy.core.expr import _mag >>> from sympy import Float >>> _mag(Float(.1)) 0 >>> _mag(Float(.01)) -1 >>> _mag(Float(1234)) 4 """ from math import log10, ceil, log from sympy import Float xpos = abs(x.n()) if not xpos: return S.Zero try: mag_first_dig = int(ceil(log10(xpos))) except (ValueError, OverflowError): mag_first_dig = int(ceil(Float(mpf_log(xpos._mpf_, 53))/log(10))) # check that we aren't off by 1 if (xpos/10**mag_first_dig) >= 1: assert 1 <= (xpos/10**mag_first_dig) < 10 mag_first_dig += 1 return mag_first_dig class UnevaluatedExpr(Expr): """ Expression that is not evaluated unless released. Examples ======== >>> from sympy import UnevaluatedExpr >>> from sympy.abc import a, b, x, y >>> x*(1/x) 1 >>> x*UnevaluatedExpr(1/x) x*1/x """ def __new__(cls, arg, **kwargs): arg = _sympify(arg) obj = Expr.__new__(cls, arg, **kwargs) return obj def doit(self, **kwargs): if kwargs.get("deep", True): return self.args[0].doit(**kwargs) else: return self.args[0] def _n2(a, b): """Return (a - b).evalf(2) if a and b are comparable, else None. This should only be used when a and b are already sympified. """ # /!\ it is very important (see issue 8245) not to # use a re-evaluated number in the calculation of dif if a.is_comparable and b.is_comparable: dif = (a - b).evalf(2) if dif.is_comparable: return dif def unchanged(func, *args): """Return True if `func` applied to the `args` is unchanged. Can be used instead of `assert foo == foo`. Examples ======== >>> from sympy import Piecewise, cos, pi >>> from sympy.core.expr import unchanged >>> from sympy.abc import x >>> unchanged(cos, 1) # instead of assert cos(1) == cos(1) True >>> unchanged(cos, pi) False Comparison of args uses the builtin capabilities of the object's arguments to test for equality so args can be defined loosely. Here, the ExprCondPair arguments of Piecewise compare as equal to the tuples that can be used to create the Piecewise: >>> unchanged(Piecewise, (x, x > 1), (0, True)) True """ f = func(*args) return f.func == func and f.args == args class ExprBuilder(object): def __init__(self, op, args=[], validator=None, check=True): if not hasattr(op, "__call__"): raise TypeError("op {} needs to be callable".format(op)) self.op = op self.args = args self.validator = validator if (validator is not None) and check: self.validate() @staticmethod def _build_args(args): return [i.build() if isinstance(i, ExprBuilder) else i for i in args] def validate(self): if self.validator is None: return args = self._build_args(self.args) self.validator(*args) def build(self, check=True): args = self._build_args(self.args) if self.validator and check: self.validator(*args) return self.op(*args) def append_argument(self, arg, check=True): self.args.append(arg) if self.validator and check: self.validate(*self.args) def __getitem__(self, item): if item == 0: return self.op else: return self.args[item-1] def __repr__(self): return str(self.build()) def search_element(self, elem): for i, arg in enumerate(self.args): if isinstance(arg, ExprBuilder): ret = arg.search_index(elem) if ret is not None: return (i,) + ret elif id(arg) == id(elem): return (i,) return None from .mul import Mul from .add import Add from .power import Pow from .function import Derivative, Function from .mod import Mod from .exprtools import factor_terms from .numbers import Integer, Rational

4ed46a159d2d9a568e1ef7ff1c7a509552a023e28346a762f73ee444d0de7956

from __future__ import print_function, division from sympy.utilities.exceptions import SymPyDeprecationWarning from .add import _unevaluated_Add, Add from .basic import S from .compatibility import ordered from .expr import Expr from .evalf import EvalfMixin from .sympify import _sympify from .evaluate import global_evaluate from sympy.logic.boolalg import Boolean, BooleanAtom __all__ = ( 'Rel', 'Eq', 'Ne', 'Lt', 'Le', 'Gt', 'Ge', 'Relational', 'Equality', 'Unequality', 'StrictLessThan', 'LessThan', 'StrictGreaterThan', 'GreaterThan', ) # Note, see issue 4986. Ideally, we wouldn't want to subclass both Boolean # and Expr. def _canonical(cond): # return a condition in which all relationals are canonical reps = {r: r.canonical for r in cond.atoms(Relational)} return cond.xreplace(reps) # XXX: AttributeError was being caught here but it wasn't triggered by any of # the tests so I've removed it... class Relational(Boolean, Expr, EvalfMixin): """Base class for all relation types. Subclasses of Relational should generally be instantiated directly, but Relational can be instantiated with a valid `rop` value to dispatch to the appropriate subclass. Parameters ========== rop : str or None Indicates what subclass to instantiate. Valid values can be found in the keys of Relational.ValidRelationalOperator. Examples ======== >>> from sympy import Rel >>> from sympy.abc import x, y >>> Rel(y, x + x**2, '==') Eq(y, x**2 + x) """ __slots__ = [] is_Relational = True # ValidRelationOperator - Defined below, because the necessary classes # have not yet been defined def __new__(cls, lhs, rhs, rop=None, **assumptions): # If called by a subclass, do nothing special and pass on to Expr. if cls is not Relational: return Expr.__new__(cls, lhs, rhs, **assumptions) # If called directly with an operator, look up the subclass # corresponding to that operator and delegate to it try: cls = cls.ValidRelationOperator[rop] rv = cls(lhs, rhs, **assumptions) # /// drop when Py2 is no longer supported # validate that Booleans are not being used in a relational # other than Eq/Ne; if isinstance(rv, (Eq, Ne)): pass elif isinstance(rv, Relational): # could it be otherwise? from sympy.core.symbol import Symbol from sympy.logic.boolalg import Boolean for a in rv.args: if isinstance(a, Symbol): continue if isinstance(a, Boolean): from sympy.utilities.misc import filldedent raise TypeError(filldedent(''' A Boolean argument can only be used in Eq and Ne; all other relationals expect real expressions. ''')) # \\\ return rv except KeyError: raise ValueError( "Invalid relational operator symbol: %r" % rop) @property def lhs(self): """The left-hand side of the relation.""" return self._args[0] @property def rhs(self): """The right-hand side of the relation.""" return self._args[1] @property def reversed(self): """Return the relationship with sides reversed. Examples ======== >>> from sympy import Eq >>> from sympy.abc import x >>> Eq(x, 1) Eq(x, 1) >>> _.reversed Eq(1, x) >>> x < 1 x < 1 >>> _.reversed 1 > x """ ops = {Eq: Eq, Gt: Lt, Ge: Le, Lt: Gt, Le: Ge, Ne: Ne} a, b = self.args return Relational.__new__(ops.get(self.func, self.func), b, a) @property def reversedsign(self): """Return the relationship with signs reversed. Examples ======== >>> from sympy import Eq >>> from sympy.abc import x >>> Eq(x, 1) Eq(x, 1) >>> _.reversedsign Eq(-x, -1) >>> x < 1 x < 1 >>> _.reversedsign -x > -1 """ a, b = self.args if not (isinstance(a, BooleanAtom) or isinstance(b, BooleanAtom)): ops = {Eq: Eq, Gt: Lt, Ge: Le, Lt: Gt, Le: Ge, Ne: Ne} return Relational.__new__(ops.get(self.func, self.func), -a, -b) else: return self @property def negated(self): """Return the negated relationship. Examples ======== >>> from sympy import Eq >>> from sympy.abc import x >>> Eq(x, 1) Eq(x, 1) >>> _.negated Ne(x, 1) >>> x < 1 x < 1 >>> _.negated x >= 1 Notes ===== This works more or less identical to ``~``/``Not``. The difference is that ``negated`` returns the relationship even if `evaluate=False`. Hence, this is useful in code when checking for e.g. negated relations to existing ones as it will not be affected by the `evaluate` flag. """ ops = {Eq: Ne, Ge: Lt, Gt: Le, Le: Gt, Lt: Ge, Ne: Eq} # If there ever will be new Relational subclasses, the following line # will work until it is properly sorted out # return ops.get(self.func, lambda a, b, evaluate=False: ~(self.func(a, # b, evaluate=evaluate)))(*self.args, evaluate=False) return Relational.__new__(ops.get(self.func), *self.args) def _eval_evalf(self, prec): return self.func(*[s._evalf(prec) for s in self.args]) @property def canonical(self): """Return a canonical form of the relational by putting a Number on the rhs else ordering the args. The relation is also changed so that the left-hand side expression does not start with a `-`. No other simplification is attempted. Examples ======== >>> from sympy.abc import x, y >>> x < 2 x < 2 >>> _.reversed.canonical x < 2 >>> (-y < x).canonical x > -y >>> (-y > x).canonical x < -y """ args = self.args r = self if r.rhs.is_number: if r.rhs.is_Number and r.lhs.is_Number and r.lhs > r.rhs: r = r.reversed elif r.lhs.is_number: r = r.reversed elif tuple(ordered(args)) != args: r = r.reversed # Check if first value has negative sign if not isinstance(r.lhs, BooleanAtom) and \ r.lhs.could_extract_minus_sign(): r = r.reversedsign elif not isinstance(r.rhs, BooleanAtom) and not r.rhs.is_number and \ r.rhs.could_extract_minus_sign(): # Right hand side has a minus, but not lhs. # How does the expression with reversed signs behave? # This is so that expressions of the type Eq(x, -y) and Eq(-x, y) # have the same canonical representation expr1, _ = ordered([r.lhs, -r.rhs]) if expr1 != r.lhs: r = r.reversed.reversedsign return r def equals(self, other, failing_expression=False): """Return True if the sides of the relationship are mathematically identical and the type of relationship is the same. If failing_expression is True, return the expression whose truth value was unknown.""" if isinstance(other, Relational): if self == other or self.reversed == other: return True a, b = self, other if a.func in (Eq, Ne) or b.func in (Eq, Ne): if a.func != b.func: return False left, right = [i.equals(j, failing_expression=failing_expression) for i, j in zip(a.args, b.args)] if left is True: return right if right is True: return left lr, rl = [i.equals(j, failing_expression=failing_expression) for i, j in zip(a.args, b.reversed.args)] if lr is True: return rl if rl is True: return lr e = (left, right, lr, rl) if all(i is False for i in e): return False for i in e: if i not in (True, False): return i else: if b.func != a.func: b = b.reversed if a.func != b.func: return False left = a.lhs.equals(b.lhs, failing_expression=failing_expression) if left is False: return False right = a.rhs.equals(b.rhs, failing_expression=failing_expression) if right is False: return False if left is True: return right return left def _eval_simplify(self, **kwargs): r = self r = r.func(*[i.simplify(**kwargs) for i in r.args]) if r.is_Relational: dif = r.lhs - r.rhs # replace dif with a valid Number that will # allow a definitive comparison with 0 v = None if dif.is_comparable: v = dif.n(2) elif dif.equals(0): # XXX this is expensive v = S.Zero if v is not None: r = r.func._eval_relation(v, S.Zero) r = r.canonical measure = kwargs['measure'] if measure(r) < kwargs['ratio']*measure(self): return r else: return self def _eval_trigsimp(self, **opts): from sympy.simplify import trigsimp return self.func(trigsimp(self.lhs, **opts), trigsimp(self.rhs, **opts)) def __nonzero__(self): raise TypeError("cannot determine truth value of Relational") __bool__ = __nonzero__ def _eval_as_set(self): # self is univariate and periodicity(self, x) in (0, None) from sympy.solvers.inequalities import solve_univariate_inequality syms = self.free_symbols assert len(syms) == 1 x = syms.pop() return solve_univariate_inequality(self, x, relational=False) @property def binary_symbols(self): # override where necessary return set() Rel = Relational class Equality(Relational): """An equal relation between two objects. Represents that two objects are equal. If they can be easily shown to be definitively equal (or unequal), this will reduce to True (or False). Otherwise, the relation is maintained as an unevaluated Equality object. Use the ``simplify`` function on this object for more nontrivial evaluation of the equality relation. As usual, the keyword argument ``evaluate=False`` can be used to prevent any evaluation. Examples ======== >>> from sympy import Eq, simplify, exp, cos >>> from sympy.abc import x, y >>> Eq(y, x + x**2) Eq(y, x**2 + x) >>> Eq(2, 5) False >>> Eq(2, 5, evaluate=False) Eq(2, 5) >>> _.doit() False >>> Eq(exp(x), exp(x).rewrite(cos)) Eq(exp(x), sinh(x) + cosh(x)) >>> simplify(_) True See Also ======== sympy.logic.boolalg.Equivalent : for representing equality between two boolean expressions Notes ===== This class is not the same as the == operator. The == operator tests for exact structural equality between two expressions; this class compares expressions mathematically. If either object defines an `_eval_Eq` method, it can be used in place of the default algorithm. If `lhs._eval_Eq(rhs)` or `rhs._eval_Eq(lhs)` returns anything other than None, that return value will be substituted for the Equality. If None is returned by `_eval_Eq`, an Equality object will be created as usual. Since this object is already an expression, it does not respond to the method `as_expr` if one tries to create `x - y` from Eq(x, y). This can be done with the `rewrite(Add)` method. """ rel_op = '==' __slots__ = [] is_Equality = True def __new__(cls, lhs, rhs=None, **options): from sympy.core.add import Add from sympy.core.logic import fuzzy_bool from sympy.core.expr import _n2 from sympy.simplify.simplify import clear_coefficients if rhs is None: SymPyDeprecationWarning( feature="Eq(expr) with rhs default to 0", useinstead="Eq(expr, 0)", issue=16587, deprecated_since_version="1.5" ).warn() rhs = 0 lhs = _sympify(lhs) rhs = _sympify(rhs) evaluate = options.pop('evaluate', global_evaluate[0]) if evaluate: # If one expression has an _eval_Eq, return its results. if hasattr(lhs, '_eval_Eq'): r = lhs._eval_Eq(rhs) if r is not None: return r if hasattr(rhs, '_eval_Eq'): r = rhs._eval_Eq(lhs) if r is not None: return r # If expressions have the same structure, they must be equal. if lhs == rhs: return S.true # e.g. True == True elif all(isinstance(i, BooleanAtom) for i in (rhs, lhs)): return S.false # True != False elif not (lhs.is_Symbol or rhs.is_Symbol) and ( isinstance(lhs, Boolean) != isinstance(rhs, Boolean)): return S.false # only Booleans can equal Booleans # check finiteness fin = L, R = [i.is_finite for i in (lhs, rhs)] if None not in fin: if L != R: return S.false if L is False: if lhs == -rhs: # Eq(oo, -oo) return S.false return S.true elif None in fin and False in fin: return Relational.__new__(cls, lhs, rhs, **options) if all(isinstance(i, Expr) for i in (lhs, rhs)): # see if the difference evaluates dif = lhs - rhs z = dif.is_zero if z is not None: if z is False and dif.is_commutative: # issue 10728 return S.false if z: return S.true # evaluate numerically if possible n2 = _n2(lhs, rhs) if n2 is not None: return _sympify(n2 == 0) # see if the ratio evaluates n, d = dif.as_numer_denom() rv = None if n.is_zero: rv = d.is_nonzero elif n.is_finite: if d.is_infinite: rv = S.true elif n.is_zero is False: rv = d.is_infinite if rv is None: # if the condition that makes the denominator # infinite does not make the original expression # True then False can be returned l, r = clear_coefficients(d, S.Infinity) args = [_.subs(l, r) for _ in (lhs, rhs)] if args != [lhs, rhs]: rv = fuzzy_bool(Eq(*args)) if rv is True: rv = None elif any(a.is_infinite for a in Add.make_args(n)): # (inf or nan)/x != 0 rv = S.false if rv is not None: return _sympify(rv) return Relational.__new__(cls, lhs, rhs, **options) @classmethod def _eval_relation(cls, lhs, rhs): return _sympify(lhs == rhs) def _eval_rewrite_as_Add(self, *args, **kwargs): """return Eq(L, R) as L - R. To control the evaluation of the result set pass `evaluate=True` to give L - R; if `evaluate=None` then terms in L and R will not cancel but they will be listed in canonical order; otherwise non-canonical args will be returned. Examples ======== >>> from sympy import Eq, Add >>> from sympy.abc import b, x >>> eq = Eq(x + b, x - b) >>> eq.rewrite(Add) 2*b >>> eq.rewrite(Add, evaluate=None).args (b, b, x, -x) >>> eq.rewrite(Add, evaluate=False).args (b, x, b, -x) """ L, R = args evaluate = kwargs.get('evaluate', True) if evaluate: # allow cancellation of args return L - R args = Add.make_args(L) + Add.make_args(-R) if evaluate is None: # no cancellation, but canonical return _unevaluated_Add(*args) # no cancellation, not canonical return Add._from_args(args) @property def binary_symbols(self): if S.true in self.args or S.false in self.args: if self.lhs.is_Symbol: return set([self.lhs]) elif self.rhs.is_Symbol: return set([self.rhs]) return set() def _eval_simplify(self, **kwargs): from sympy.solvers.solveset import linear_coeffs # standard simplify e = super(Equality, self)._eval_simplify(**kwargs) if not isinstance(e, Equality): return e free = self.free_symbols if len(free) == 1: try: x = free.pop() m, b = linear_coeffs( e.rewrite(Add, evaluate=False), x) if m.is_zero is False: enew = e.func(x, -b/m) else: enew = e.func(m*x, -b) measure = kwargs['measure'] if measure(enew) <= kwargs['ratio']*measure(e): e = enew except ValueError: pass return e.canonical Eq = Equality class Unequality(Relational): """An unequal relation between two objects. Represents that two objects are not equal. If they can be shown to be definitively equal, this will reduce to False; if definitively unequal, this will reduce to True. Otherwise, the relation is maintained as an Unequality object. Examples ======== >>> from sympy import Ne >>> from sympy.abc import x, y >>> Ne(y, x+x**2) Ne(y, x**2 + x) See Also ======== Equality Notes ===== This class is not the same as the != operator. The != operator tests for exact structural equality between two expressions; this class compares expressions mathematically. This class is effectively the inverse of Equality. As such, it uses the same algorithms, including any available `_eval_Eq` methods. """ rel_op = '!=' __slots__ = [] def __new__(cls, lhs, rhs, **options): lhs = _sympify(lhs) rhs = _sympify(rhs) evaluate = options.pop('evaluate', global_evaluate[0]) if evaluate: is_equal = Equality(lhs, rhs) if isinstance(is_equal, BooleanAtom): return is_equal.negated return Relational.__new__(cls, lhs, rhs, **options) @classmethod def _eval_relation(cls, lhs, rhs): return _sympify(lhs != rhs) @property def binary_symbols(self): if S.true in self.args or S.false in self.args: if self.lhs.is_Symbol: return set([self.lhs]) elif self.rhs.is_Symbol: return set([self.rhs]) return set() def _eval_simplify(self, **kwargs): # simplify as an equality eq = Equality(*self.args)._eval_simplify(**kwargs) if isinstance(eq, Equality): # send back Ne with the new args return self.func(*eq.args) return eq.negated # result of Ne is the negated Eq Ne = Unequality class _Inequality(Relational): """Internal base class for all *Than types. Each subclass must implement _eval_relation to provide the method for comparing two real numbers. """ __slots__ = [] def __new__(cls, lhs, rhs, **options): lhs = _sympify(lhs) rhs = _sympify(rhs) evaluate = options.pop('evaluate', global_evaluate[0]) if evaluate: # First we invoke the appropriate inequality method of `lhs` # (e.g., `lhs.__lt__`). That method will try to reduce to # boolean or raise an exception. It may keep calling # superclasses until it reaches `Expr` (e.g., `Expr.__lt__`). # In some cases, `Expr` will just invoke us again (if neither it # nor a subclass was able to reduce to boolean or raise an # exception). In that case, it must call us with # `evaluate=False` to prevent infinite recursion. r = cls._eval_relation(lhs, rhs) if r is not None: return r # Note: not sure r could be None, perhaps we never take this # path? In principle, could use this to shortcut out if a # class realizes the inequality cannot be evaluated further. # make a "non-evaluated" Expr for the inequality return Relational.__new__(cls, lhs, rhs, **options) class _Greater(_Inequality): """Not intended for general use _Greater is only used so that GreaterThan and StrictGreaterThan may subclass it for the .gts and .lts properties. """ __slots__ = () @property def gts(self): return self._args[0] @property def lts(self): return self._args[1] class _Less(_Inequality): """Not intended for general use. _Less is only used so that LessThan and StrictLessThan may subclass it for the .gts and .lts properties. """ __slots__ = () @property def gts(self): return self._args[1] @property def lts(self): return self._args[0] class GreaterThan(_Greater): """Class representations of inequalities. Extended Summary ================ The ``*Than`` classes represent inequal relationships, where the left-hand side is generally bigger or smaller than the right-hand side. For example, the GreaterThan class represents an inequal relationship where the left-hand side is at least as big as the right side, if not bigger. In mathematical notation: lhs >= rhs In total, there are four ``*Than`` classes, to represent the four inequalities: +-----------------+--------+ |Class Name | Symbol | +=================+========+ |GreaterThan | (>=) | +-----------------+--------+ |LessThan | (<=) | +-----------------+--------+ |StrictGreaterThan| (>) | +-----------------+--------+ |StrictLessThan | (<) | +-----------------+--------+ All classes take two arguments, lhs and rhs. +----------------------------+-----------------+ |Signature Example | Math equivalent | +============================+=================+ |GreaterThan(lhs, rhs) | lhs >= rhs | +----------------------------+-----------------+ |LessThan(lhs, rhs) | lhs <= rhs | +----------------------------+-----------------+ |StrictGreaterThan(lhs, rhs) | lhs > rhs | +----------------------------+-----------------+ |StrictLessThan(lhs, rhs) | lhs < rhs | +----------------------------+-----------------+ In addition to the normal .lhs and .rhs of Relations, ``*Than`` inequality objects also have the .lts and .gts properties, which represent the "less than side" and "greater than side" of the operator. Use of .lts and .gts in an algorithm rather than .lhs and .rhs as an assumption of inequality direction will make more explicit the intent of a certain section of code, and will make it similarly more robust to client code changes: >>> from sympy import GreaterThan, StrictGreaterThan >>> from sympy import LessThan, StrictLessThan >>> from sympy import And, Ge, Gt, Le, Lt, Rel, S >>> from sympy.abc import x, y, z >>> from sympy.core.relational import Relational >>> e = GreaterThan(x, 1) >>> e x >= 1 >>> '%s >= %s is the same as %s <= %s' % (e.gts, e.lts, e.lts, e.gts) 'x >= 1 is the same as 1 <= x' Examples ======== One generally does not instantiate these classes directly, but uses various convenience methods: >>> for f in [Ge, Gt, Le, Lt]: # convenience wrappers ... print(f(x, 2)) x >= 2 x > 2 x <= 2 x < 2 Another option is to use the Python inequality operators (>=, >, <=, <) directly. Their main advantage over the Ge, Gt, Le, and Lt counterparts, is that one can write a more "mathematical looking" statement rather than littering the math with oddball function calls. However there are certain (minor) caveats of which to be aware (search for 'gotcha', below). >>> x >= 2 x >= 2 >>> _ == Ge(x, 2) True However, it is also perfectly valid to instantiate a ``*Than`` class less succinctly and less conveniently: >>> Rel(x, 1, ">") x > 1 >>> Relational(x, 1, ">") x > 1 >>> StrictGreaterThan(x, 1) x > 1 >>> GreaterThan(x, 1) x >= 1 >>> LessThan(x, 1) x <= 1 >>> StrictLessThan(x, 1) x < 1 Notes ===== There are a couple of "gotchas" to be aware of when using Python's operators. The first is that what your write is not always what you get: >>> 1 < x x > 1 Due to the order that Python parses a statement, it may not immediately find two objects comparable. When "1 < x" is evaluated, Python recognizes that the number 1 is a native number and that x is *not*. Because a native Python number does not know how to compare itself with a SymPy object Python will try the reflective operation, "x > 1" and that is the form that gets evaluated, hence returned. If the order of the statement is important (for visual output to the console, perhaps), one can work around this annoyance in a couple ways: (1) "sympify" the literal before comparison >>> S(1) < x 1 < x (2) use one of the wrappers or less succinct methods described above >>> Lt(1, x) 1 < x >>> Relational(1, x, "<") 1 < x The second gotcha involves writing equality tests between relationals when one or both sides of the test involve a literal relational: >>> e = x < 1; e x < 1 >>> e == e # neither side is a literal True >>> e == x < 1 # expecting True, too False >>> e != x < 1 # expecting False x < 1 >>> x < 1 != x < 1 # expecting False or the same thing as before Traceback (most recent call last): ... TypeError: cannot determine truth value of Relational The solution for this case is to wrap literal relationals in parentheses: >>> e == (x < 1) True >>> e != (x < 1) False >>> (x < 1) != (x < 1) False The third gotcha involves chained inequalities not involving '==' or '!='. Occasionally, one may be tempted to write: >>> e = x < y < z Traceback (most recent call last): ... TypeError: symbolic boolean expression has no truth value. Due to an implementation detail or decision of Python [1]_, there is no way for SymPy to create a chained inequality with that syntax so one must use And: >>> e = And(x < y, y < z) >>> type( e ) And >>> e (x < y) & (y < z) Although this can also be done with the '&' operator, it cannot be done with the 'and' operarator: >>> (x < y) & (y < z) (x < y) & (y < z) >>> (x < y) and (y < z) Traceback (most recent call last): ... TypeError: cannot determine truth value of Relational .. [1] This implementation detail is that Python provides no reliable method to determine that a chained inequality is being built. Chained comparison operators are evaluated pairwise, using "and" logic (see http://docs.python.org/2/reference/expressions.html#notin). This is done in an efficient way, so that each object being compared is only evaluated once and the comparison can short-circuit. For example, ``1 > 2 > 3`` is evaluated by Python as ``(1 > 2) and (2 > 3)``. The ``and`` operator coerces each side into a bool, returning the object itself when it short-circuits. The bool of the --Than operators will raise TypeError on purpose, because SymPy cannot determine the mathematical ordering of symbolic expressions. Thus, if we were to compute ``x > y > z``, with ``x``, ``y``, and ``z`` being Symbols, Python converts the statement (roughly) into these steps: (1) x > y > z (2) (x > y) and (y > z) (3) (GreaterThanObject) and (y > z) (4) (GreaterThanObject.__nonzero__()) and (y > z) (5) TypeError Because of the "and" added at step 2, the statement gets turned into a weak ternary statement, and the first object's __nonzero__ method will raise TypeError. Thus, creating a chained inequality is not possible. In Python, there is no way to override the ``and`` operator, or to control how it short circuits, so it is impossible to make something like ``x > y > z`` work. There was a PEP to change this, :pep:`335`, but it was officially closed in March, 2012. """ __slots__ = () rel_op = '>=' @classmethod def _eval_relation(cls, lhs, rhs): # We don't use the op symbol here: workaround issue #7951 return _sympify(lhs.__ge__(rhs)) Ge = GreaterThan class LessThan(_Less): __doc__ = GreaterThan.__doc__ __slots__ = () rel_op = '<=' @classmethod def _eval_relation(cls, lhs, rhs): # We don't use the op symbol here: workaround issue #7951 return _sympify(lhs.__le__(rhs)) Le = LessThan class StrictGreaterThan(_Greater): __doc__ = GreaterThan.__doc__ __slots__ = () rel_op = '>' @classmethod def _eval_relation(cls, lhs, rhs): # We don't use the op symbol here: workaround issue #7951 return _sympify(lhs.__gt__(rhs)) Gt = StrictGreaterThan class StrictLessThan(_Less): __doc__ = GreaterThan.__doc__ __slots__ = () rel_op = '<' @classmethod def _eval_relation(cls, lhs, rhs): # We don't use the op symbol here: workaround issue #7951 return _sympify(lhs.__lt__(rhs)) Lt = StrictLessThan # A class-specific (not object-specific) data item used for a minor speedup. # It is defined here, rather than directly in the class, because the classes # that it references have not been defined until now (e.g. StrictLessThan). Relational.ValidRelationOperator = { None: Equality, '==': Equality, 'eq': Equality, '!=': Unequality, '<>': Unequality, 'ne': Unequality, '>=': GreaterThan, 'ge': GreaterThan, '<=': LessThan, 'le': LessThan, '>': StrictGreaterThan, 'gt': StrictGreaterThan, '<': StrictLessThan, 'lt': StrictLessThan, }

9d26252a8879290549e9a4ee86d23a7773d323f97f5dfbe170f861e0ad224e43

from __future__ import absolute_import, print_function, division import numbers import decimal import fractions import math import re as regex from .containers import Tuple from .sympify import converter, sympify, _sympify, SympifyError, _convert_numpy_types from .singleton import S, Singleton from .expr import Expr, AtomicExpr from .evalf import pure_complex from .decorators import _sympifyit from .cache import cacheit, clear_cache from .logic import fuzzy_not from sympy.core.compatibility import ( as_int, integer_types, long, string_types, with_metaclass, HAS_GMPY, SYMPY_INTS, int_info) from sympy.core.cache import lru_cache import mpmath import mpmath.libmp as mlib from mpmath.libmp import bitcount from mpmath.libmp.backend import MPZ from mpmath.libmp import mpf_pow, mpf_pi, mpf_e, phi_fixed from mpmath.ctx_mp import mpnumeric from mpmath.libmp.libmpf import ( finf as _mpf_inf, fninf as _mpf_ninf, fnan as _mpf_nan, fzero, _normalize as mpf_normalize, prec_to_dps, fone, fnone) from sympy.utilities.misc import debug, filldedent from .evaluate import global_evaluate from sympy.utilities.exceptions import SymPyDeprecationWarning rnd = mlib.round_nearest _LOG2 = math.log(2) def comp(z1, z2, tol=None): """Return a bool indicating whether the error between z1 and z2 is <= tol. Examples ======== If ``tol`` is None then True will be returned if ``abs(z1 - z2)*10**p <= 5`` where ``p`` is minimum value of the decimal precision of each value. >>> from sympy.core.numbers import comp, pi >>> pi4 = pi.n(4); pi4 3.142 >>> comp(_, 3.142) True >>> comp(pi4, 3.141) False >>> comp(pi4, 3.143) False A comparison of strings will be made if ``z1`` is a Number and ``z2`` is a string or ``tol`` is ''. >>> comp(pi4, 3.1415) True >>> comp(pi4, 3.1415, '') False When ``tol`` is provided and ``z2`` is non-zero and ``|z1| > 1`` the error is normalized by ``|z1|``: >>> abs(pi4 - 3.14)/pi4 0.000509791731426756 >>> comp(pi4, 3.14, .001) # difference less than 0.1% True >>> comp(pi4, 3.14, .0005) # difference less than 0.1% False When ``|z1| <= 1`` the absolute error is used: >>> 1/pi4 0.3183 >>> abs(1/pi4 - 0.3183)/(1/pi4) 3.07371499106316e-5 >>> abs(1/pi4 - 0.3183) 9.78393554684764e-6 >>> comp(1/pi4, 0.3183, 1e-5) True To see if the absolute error between ``z1`` and ``z2`` is less than or equal to ``tol``, call this as ``comp(z1 - z2, 0, tol)`` or ``comp(z1 - z2, tol=tol)``: >>> abs(pi4 - 3.14) 0.00160156249999988 >>> comp(pi4 - 3.14, 0, .002) True >>> comp(pi4 - 3.14, 0, .001) False """ if type(z2) is str: z = sympify(z2) if not pure_complex(z1, or_real=True): raise ValueError('when z2 is a str z1 must be a Number') return str(z1) == z2 if not z1: z1, z2 = z2, z1 if not z1: return True if not tol: a, b = z1, z2 if tol == '': return str(a) == str(b) if tol is None: a, b = sympify(a), sympify(b) if not all(i.is_number for i in (a, b)): raise ValueError('expecting 2 numbers') fa = a.atoms(Float) fb = b.atoms(Float) if not fa and not fb: # no floats -- compare exactly return a == b # get a to be pure_complex for do in range(2): ca = pure_complex(a, or_real=True) if not ca: if fa: a = a.n(prec_to_dps(min([i._prec for i in fa]))) ca = pure_complex(a, or_real=True) break else: fa, fb = fb, fa a, b = b, a cb = pure_complex(b) if not cb and fb: b = b.n(prec_to_dps(min([i._prec for i in fb]))) cb = pure_complex(b, or_real=True) if ca and cb and (ca[1] or cb[1]): return all(comp(i, j) for i, j in zip(ca, cb)) tol = 10**prec_to_dps(min(a._prec, getattr(b, '_prec', a._prec))) return int(abs(a - b)*tol) <= 5 diff = abs(z1 - z2) az1 = abs(z1) if z2 and az1 > 1: return diff/az1 <= tol else: return diff <= tol def mpf_norm(mpf, prec): """Return the mpf tuple normalized appropriately for the indicated precision after doing a check to see if zero should be returned or not when the mantissa is 0. ``mpf_normlize`` always assumes that this is zero, but it may not be since the mantissa for mpf's values "+inf", "-inf" and "nan" have a mantissa of zero, too. Note: this is not intended to validate a given mpf tuple, so sending mpf tuples that were not created by mpmath may produce bad results. This is only a wrapper to ``mpf_normalize`` which provides the check for non- zero mpfs that have a 0 for the mantissa. """ sign, man, expt, bc = mpf if not man: # hack for mpf_normalize which does not do this; # it assumes that if man is zero the result is 0 # (see issue 6639) if not bc: return fzero else: # don't change anything; this should already # be a well formed mpf tuple return mpf # Necessary if mpmath is using the gmpy backend from mpmath.libmp.backend import MPZ rv = mpf_normalize(sign, MPZ(man), expt, bc, prec, rnd) return rv # TODO: we should use the warnings module _errdict = {"divide": False} def seterr(divide=False): """ Should sympy raise an exception on 0/0 or return a nan? divide == True .... raise an exception divide == False ... return nan """ if _errdict["divide"] != divide: clear_cache() _errdict["divide"] = divide def _as_integer_ratio(p): neg_pow, man, expt, bc = getattr(p, '_mpf_', mpmath.mpf(p)._mpf_) p = [1, -1][neg_pow % 2]*man if expt < 0: q = 2**-expt else: q = 1 p *= 2**expt return int(p), int(q) def _decimal_to_Rational_prec(dec): """Convert an ordinary decimal instance to a Rational.""" if not dec.is_finite(): raise TypeError("dec must be finite, got %s." % dec) s, d, e = dec.as_tuple() prec = len(d) if e >= 0: # it's an integer rv = Integer(int(dec)) else: s = (-1)**s d = sum([di*10**i for i, di in enumerate(reversed(d))]) rv = Rational(s*d, 10**-e) return rv, prec _floatpat = regex.compile(r"[-+]?((\d*\.\d+)|(\d+\.?))") def _literal_float(f): """Return True if n starts like a floating point number.""" return bool(_floatpat.match(f)) # (a,b) -> gcd(a,b) # TODO caching with decorator, but not to degrade performance @lru_cache(1024) def igcd(*args): """Computes nonnegative integer greatest common divisor. The algorithm is based on the well known Euclid's algorithm. To improve speed, igcd() has its own caching mechanism implemented. Examples ======== >>> from sympy.core.numbers import igcd >>> igcd(2, 4) 2 >>> igcd(5, 10, 15) 5 """ if len(args) < 2: raise TypeError( 'igcd() takes at least 2 arguments (%s given)' % len(args)) args_temp = [abs(as_int(i)) for i in args] if 1 in args_temp: return 1 a = args_temp.pop() for b in args_temp: a = igcd2(a, b) if b else a return a try: from math import gcd as igcd2 except ImportError: def igcd2(a, b): """Compute gcd of two Python integers a and b.""" if (a.bit_length() > BIGBITS and b.bit_length() > BIGBITS): return igcd_lehmer(a, b) a, b = abs(a), abs(b) while b: a, b = b, a % b return a # Use Lehmer's algorithm only for very large numbers. # The limit could be different on Python 2.7 and 3.x. # If so, then this could be defined in compatibility.py. BIGBITS = 5000 def igcd_lehmer(a, b): """Computes greatest common divisor of two integers. Euclid's algorithm for the computation of the greatest common divisor gcd(a, b) of two (positive) integers a and b is based on the division identity a = q*b + r, where the quotient q and the remainder r are integers and 0 <= r < b. Then each common divisor of a and b divides r, and it follows that gcd(a, b) == gcd(b, r). The algorithm works by constructing the sequence r0, r1, r2, ..., where r0 = a, r1 = b, and each rn is the remainder from the division of the two preceding elements. In Python, q = a // b and r = a % b are obtained by the floor division and the remainder operations, respectively. These are the most expensive arithmetic operations, especially for large a and b. Lehmer's algorithm is based on the observation that the quotients qn = r(n-1) // rn are in general small integers even when a and b are very large. Hence the quotients can be usually determined from a relatively small number of most significant bits. The efficiency of the algorithm is further enhanced by not computing each long remainder in Euclid's sequence. The remainders are linear combinations of a and b with integer coefficients derived from the quotients. The coefficients can be computed as far as the quotients can be determined from the chosen most significant parts of a and b. Only then a new pair of consecutive remainders is computed and the algorithm starts anew with this pair. References ========== .. [1] https://en.wikipedia.org/wiki/Lehmer%27s_GCD_algorithm """ a, b = abs(as_int(a)), abs(as_int(b)) if a < b: a, b = b, a # The algorithm works by using one or two digit division # whenever possible. The outer loop will replace the # pair (a, b) with a pair of shorter consecutive elements # of the Euclidean gcd sequence until a and b # fit into two Python (long) int digits. nbits = 2*int_info.bits_per_digit while a.bit_length() > nbits and b != 0: # Quotients are mostly small integers that can # be determined from most significant bits. n = a.bit_length() - nbits x, y = int(a >> n), int(b >> n) # most significant bits # Elements of the Euclidean gcd sequence are linear # combinations of a and b with integer coefficients. # Compute the coefficients of consecutive pairs # a' = A*a + B*b, b' = C*a + D*b # using small integer arithmetic as far as possible. A, B, C, D = 1, 0, 0, 1 # initial values while True: # The coefficients alternate in sign while looping. # The inner loop combines two steps to keep track # of the signs. # At this point we have # A > 0, B <= 0, C <= 0, D > 0, # x' = x + B <= x < x" = x + A, # y' = y + C <= y < y" = y + D, # and # x'*N <= a' < x"*N, y'*N <= b' < y"*N, # where N = 2**n. # Now, if y' > 0, and x"//y' and x'//y" agree, # then their common value is equal to q = a'//b'. # In addition, # x'%y" = x' - q*y" < x" - q*y' = x"%y', # and # (x'%y")*N < a'%b' < (x"%y')*N. # On the other hand, we also have x//y == q, # and therefore # x'%y" = x + B - q*(y + D) = x%y + B', # x"%y' = x + A - q*(y + C) = x%y + A', # where # B' = B - q*D < 0, A' = A - q*C > 0. if y + C <= 0: break q = (x + A) // (y + C) # Now x'//y" <= q, and equality holds if # x' - q*y" = (x - q*y) + (B - q*D) >= 0. # This is a minor optimization to avoid division. x_qy, B_qD = x - q*y, B - q*D if x_qy + B_qD < 0: break # Next step in the Euclidean sequence. x, y = y, x_qy A, B, C, D = C, D, A - q*C, B_qD # At this point the signs of the coefficients # change and their roles are interchanged. # A <= 0, B > 0, C > 0, D < 0, # x' = x + A <= x < x" = x + B, # y' = y + D < y < y" = y + C. if y + D <= 0: break q = (x + B) // (y + D) x_qy, A_qC = x - q*y, A - q*C if x_qy + A_qC < 0: break x, y = y, x_qy A, B, C, D = C, D, A_qC, B - q*D # Now the conditions on top of the loop # are again satisfied. # A > 0, B < 0, C < 0, D > 0. if B == 0: # This can only happen when y == 0 in the beginning # and the inner loop does nothing. # Long division is forced. a, b = b, a % b continue # Compute new long arguments using the coefficients. a, b = A*a + B*b, C*a + D*b # Small divisors. Finish with the standard algorithm. while b: a, b = b, a % b return a def ilcm(*args): """Computes integer least common multiple. Examples ======== >>> from sympy.core.numbers import ilcm >>> ilcm(5, 10) 10 >>> ilcm(7, 3) 21 >>> ilcm(5, 10, 15) 30 """ if len(args) < 2: raise TypeError( 'ilcm() takes at least 2 arguments (%s given)' % len(args)) if 0 in args: return 0 a = args[0] for b in args[1:]: a = a // igcd(a, b) * b # since gcd(a,b) | a return a def igcdex(a, b): """Returns x, y, g such that g = x*a + y*b = gcd(a, b). >>> from sympy.core.numbers import igcdex >>> igcdex(2, 3) (-1, 1, 1) >>> igcdex(10, 12) (-1, 1, 2) >>> x, y, g = igcdex(100, 2004) >>> x, y, g (-20, 1, 4) >>> x*100 + y*2004 4 """ if (not a) and (not b): return (0, 1, 0) if not a: return (0, b//abs(b), abs(b)) if not b: return (a//abs(a), 0, abs(a)) if a < 0: a, x_sign = -a, -1 else: x_sign = 1 if b < 0: b, y_sign = -b, -1 else: y_sign = 1 x, y, r, s = 1, 0, 0, 1 while b: (c, q) = (a % b, a // b) (a, b, r, s, x, y) = (b, c, x - q*r, y - q*s, r, s) return (x*x_sign, y*y_sign, a) def mod_inverse(a, m): """ Return the number c such that, (a * c) = 1 (mod m) where c has the same sign as m. If no such value exists, a ValueError is raised. Examples ======== >>> from sympy import S >>> from sympy.core.numbers import mod_inverse Suppose we wish to find multiplicative inverse x of 3 modulo 11. This is the same as finding x such that 3 * x = 1 (mod 11). One value of x that satisfies this congruence is 4. Because 3 * 4 = 12 and 12 = 1 (mod 11). This is the value return by mod_inverse: >>> mod_inverse(3, 11) 4 >>> mod_inverse(-3, 11) 7 When there is a common factor between the numerators of ``a`` and ``m`` the inverse does not exist: >>> mod_inverse(2, 4) Traceback (most recent call last): ... ValueError: inverse of 2 mod 4 does not exist >>> mod_inverse(S(2)/7, S(5)/2) 7/2 References ========== - https://en.wikipedia.org/wiki/Modular_multiplicative_inverse - https://en.wikipedia.org/wiki/Extended_Euclidean_algorithm """ c = None try: a, m = as_int(a), as_int(m) if m != 1 and m != -1: x, y, g = igcdex(a, m) if g == 1: c = x % m except ValueError: a, m = sympify(a), sympify(m) if not (a.is_number and m.is_number): raise TypeError(filldedent(''' Expected numbers for arguments; symbolic `mod_inverse` is not implemented but symbolic expressions can be handled with the similar function, sympy.polys.polytools.invert''')) big = (m > 1) if not (big is S.true or big is S.false): raise ValueError('m > 1 did not evaluate; try to simplify %s' % m) elif big: c = 1/a if c is None: raise ValueError('inverse of %s (mod %s) does not exist' % (a, m)) return c class Number(AtomicExpr): """Represents atomic numbers in SymPy. Floating point numbers are represented by the Float class. Rational numbers (of any size) are represented by the Rational class. Integer numbers (of any size) are represented by the Integer class. Float and Rational are subclasses of Number; Integer is a subclass of Rational. For example, ``2/3`` is represented as ``Rational(2, 3)`` which is a different object from the floating point number obtained with Python division ``2/3``. Even for numbers that are exactly represented in binary, there is a difference between how two forms, such as ``Rational(1, 2)`` and ``Float(0.5)``, are used in SymPy. The rational form is to be preferred in symbolic computations. Other kinds of numbers, such as algebraic numbers ``sqrt(2)`` or complex numbers ``3 + 4*I``, are not instances of Number class as they are not atomic. See Also ======== Float, Integer, Rational """ is_commutative = True is_number = True is_Number = True __slots__ = [] # Used to make max(x._prec, y._prec) return x._prec when only x is a float _prec = -1 def __new__(cls, *obj): if len(obj) == 1: obj = obj[0] if isinstance(obj, Number): return obj if isinstance(obj, SYMPY_INTS): return Integer(obj) if isinstance(obj, tuple) and len(obj) == 2: return Rational(*obj) if isinstance(obj, (float, mpmath.mpf, decimal.Decimal)): return Float(obj) if isinstance(obj, string_types): _obj = obj.lower() # float('INF') == float('inf') if _obj == 'nan': return S.NaN elif _obj == 'inf': return S.Infinity elif _obj == '+inf': return S.Infinity elif _obj == '-inf': return S.NegativeInfinity val = sympify(obj) if isinstance(val, Number): return val else: raise ValueError('String "%s" does not denote a Number' % obj) msg = "expected str|int|long|float|Decimal|Number object but got %r" raise TypeError(msg % type(obj).__name__) def invert(self, other, *gens, **args): from sympy.polys.polytools import invert if getattr(other, 'is_number', True): return mod_inverse(self, other) return invert(self, other, *gens, **args) def __divmod__(self, other): from .containers import Tuple from sympy.functions.elementary.complexes import sign try: other = Number(other) if self.is_infinite or S.NaN in (self, other): return (S.NaN, S.NaN) except TypeError: msg = "unsupported operand type(s) for divmod(): '%s' and '%s'" raise TypeError(msg % (type(self).__name__, type(other).__name__)) if not other: raise ZeroDivisionError('modulo by zero') if self.is_Integer and other.is_Integer: return Tuple(*divmod(self.p, other.p)) elif isinstance(other, Float): rat = self/Rational(other) else: rat = self/other if other.is_finite: w = int(rat) if rat > 0 else int(rat) - 1 r = self - other*w else: w = 0 if not self or (sign(self) == sign(other)) else -1 r = other if w else self return Tuple(w, r) def __rdivmod__(self, other): try: other = Number(other) except TypeError: msg = "unsupported operand type(s) for divmod(): '%s' and '%s'" raise TypeError(msg % (type(other).__name__, type(self).__name__)) return divmod(other, self) def _as_mpf_val(self, prec): """Evaluation of mpf tuple accurate to at least prec bits.""" raise NotImplementedError('%s needs ._as_mpf_val() method' % (self.__class__.__name__)) def _eval_evalf(self, prec): return Float._new(self._as_mpf_val(prec), prec) def _as_mpf_op(self, prec): prec = max(prec, self._prec) return self._as_mpf_val(prec), prec def __float__(self): return mlib.to_float(self._as_mpf_val(53)) def floor(self): raise NotImplementedError('%s needs .floor() method' % (self.__class__.__name__)) def ceiling(self): raise NotImplementedError('%s needs .ceiling() method' % (self.__class__.__name__)) def __floor__(self): return self.floor() def __ceil__(self): return self.ceiling() def _eval_conjugate(self): return self def _eval_order(self, *symbols): from sympy import Order # Order(5, x, y) -> Order(1,x,y) return Order(S.One, *symbols) def _eval_subs(self, old, new): if old == -self: return -new return self # there is no other possibility def _eval_is_finite(self): return True @classmethod def class_key(cls): return 1, 0, 'Number' @cacheit def sort_key(self, order=None): return self.class_key(), (0, ()), (), self @_sympifyit('other', NotImplemented) def __add__(self, other): if isinstance(other, Number) and global_evaluate[0]: if other is S.NaN: return S.NaN elif other is S.Infinity: return S.Infinity elif other is S.NegativeInfinity: return S.NegativeInfinity return AtomicExpr.__add__(self, other) @_sympifyit('other', NotImplemented) def __sub__(self, other): if isinstance(other, Number) and global_evaluate[0]: if other is S.NaN: return S.NaN elif other is S.Infinity: return S.NegativeInfinity elif other is S.NegativeInfinity: return S.Infinity return AtomicExpr.__sub__(self, other) @_sympifyit('other', NotImplemented) def __mul__(self, other): if isinstance(other, Number) and global_evaluate[0]: if other is S.NaN: return S.NaN elif other is S.Infinity: if self.is_zero: return S.NaN elif self.is_positive: return S.Infinity else: return S.NegativeInfinity elif other is S.NegativeInfinity: if self.is_zero: return S.NaN elif self.is_positive: return S.NegativeInfinity else: return S.Infinity elif isinstance(other, Tuple): return NotImplemented return AtomicExpr.__mul__(self, other) @_sympifyit('other', NotImplemented) def __div__(self, other): if isinstance(other, Number) and global_evaluate[0]: if other is S.NaN: return S.NaN elif other is S.Infinity or other is S.NegativeInfinity: return S.Zero return AtomicExpr.__div__(self, other) __truediv__ = __div__ def __eq__(self, other): raise NotImplementedError('%s needs .__eq__() method' % (self.__class__.__name__)) def __ne__(self, other): raise NotImplementedError('%s needs .__ne__() method' % (self.__class__.__name__)) def __lt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s < %s" % (self, other)) raise NotImplementedError('%s needs .__lt__() method' % (self.__class__.__name__)) def __le__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s <= %s" % (self, other)) raise NotImplementedError('%s needs .__le__() method' % (self.__class__.__name__)) def __gt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) return _sympify(other).__lt__(self) def __ge__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s >= %s" % (self, other)) return _sympify(other).__le__(self) def __hash__(self): return super(Number, self).__hash__() def is_constant(self, *wrt, **flags): return True def as_coeff_mul(self, *deps, **kwargs): # a -> c*t if self.is_Rational or not kwargs.pop('rational', True): return self, tuple() elif self.is_negative: return S.NegativeOne, (-self,) return S.One, (self,) def as_coeff_add(self, *deps): # a -> c + t if self.is_Rational: return self, tuple() return S.Zero, (self,) def as_coeff_Mul(self, rational=False): """Efficiently extract the coefficient of a product. """ if rational and not self.is_Rational: return S.One, self return (self, S.One) if self else (S.One, self) def as_coeff_Add(self, rational=False): """Efficiently extract the coefficient of a summation. """ if not rational: return self, S.Zero return S.Zero, self def gcd(self, other): """Compute GCD of `self` and `other`. """ from sympy.polys import gcd return gcd(self, other) def lcm(self, other): """Compute LCM of `self` and `other`. """ from sympy.polys import lcm return lcm(self, other) def cofactors(self, other): """Compute GCD and cofactors of `self` and `other`. """ from sympy.polys import cofactors return cofactors(self, other) class Float(Number): """Represent a floating-point number of arbitrary precision. Examples ======== >>> from sympy import Float >>> Float(3.5) 3.50000000000000 >>> Float(3) 3.00000000000000 Creating Floats from strings (and Python ``int`` and ``long`` types) will give a minimum precision of 15 digits, but the precision will automatically increase to capture all digits entered. >>> Float(1) 1.00000000000000 >>> Float(10**20) 100000000000000000000. >>> Float('1e20') 100000000000000000000. However, *floating-point* numbers (Python ``float`` types) retain only 15 digits of precision: >>> Float(1e20) 1.00000000000000e+20 >>> Float(1.23456789123456789) 1.23456789123457 It may be preferable to enter high-precision decimal numbers as strings: Float('1.23456789123456789') 1.23456789123456789 The desired number of digits can also be specified: >>> Float('1e-3', 3) 0.00100 >>> Float(100, 4) 100.0 Float can automatically count significant figures if a null string is sent for the precision; spaces or underscores are also allowed. (Auto- counting is only allowed for strings, ints and longs). >>> Float('123 456 789.123_456', '') 123456789.123456 >>> Float('12e-3', '') 0.012 >>> Float(3, '') 3. If a number is written in scientific notation, only the digits before the exponent are considered significant if a decimal appears, otherwise the "e" signifies only how to move the decimal: >>> Float('60.e2', '') # 2 digits significant 6.0e+3 >>> Float('60e2', '') # 4 digits significant 6000. >>> Float('600e-2', '') # 3 digits significant 6.00 Notes ===== Floats are inexact by their nature unless their value is a binary-exact value. >>> approx, exact = Float(.1, 1), Float(.125, 1) For calculation purposes, evalf needs to be able to change the precision but this will not increase the accuracy of the inexact value. The following is the most accurate 5-digit approximation of a value of 0.1 that had only 1 digit of precision: >>> approx.evalf(5) 0.099609 By contrast, 0.125 is exact in binary (as it is in base 10) and so it can be passed to Float or evalf to obtain an arbitrary precision with matching accuracy: >>> Float(exact, 5) 0.12500 >>> exact.evalf(20) 0.12500000000000000000 Trying to make a high-precision Float from a float is not disallowed, but one must keep in mind that the *underlying float* (not the apparent decimal value) is being obtained with high precision. For example, 0.3 does not have a finite binary representation. The closest rational is the fraction 5404319552844595/2**54. So if you try to obtain a Float of 0.3 to 20 digits of precision you will not see the same thing as 0.3 followed by 19 zeros: >>> Float(0.3, 20) 0.29999999999999998890 If you want a 20-digit value of the decimal 0.3 (not the floating point approximation of 0.3) you should send the 0.3 as a string. The underlying representation is still binary but a higher precision than Python's float is used: >>> Float('0.3', 20) 0.30000000000000000000 Although you can increase the precision of an existing Float using Float it will not increase the accuracy -- the underlying value is not changed: >>> def show(f): # binary rep of Float ... from sympy import Mul, Pow ... s, m, e, b = f._mpf_ ... v = Mul(int(m), Pow(2, int(e), evaluate=False), evaluate=False) ... print('%s at prec=%s' % (v, f._prec)) ... >>> t = Float('0.3', 3) >>> show(t) 4915/2**14 at prec=13 >>> show(Float(t, 20)) # higher prec, not higher accuracy 4915/2**14 at prec=70 >>> show(Float(t, 2)) # lower prec 307/2**10 at prec=10 The same thing happens when evalf is used on a Float: >>> show(t.evalf(20)) 4915/2**14 at prec=70 >>> show(t.evalf(2)) 307/2**10 at prec=10 Finally, Floats can be instantiated with an mpf tuple (n, c, p) to produce the number (-1)**n*c*2**p: >>> n, c, p = 1, 5, 0 >>> (-1)**n*c*2**p -5 >>> Float((1, 5, 0)) -5.00000000000000 An actual mpf tuple also contains the number of bits in c as the last element of the tuple: >>> _._mpf_ (1, 5, 0, 3) This is not needed for instantiation and is not the same thing as the precision. The mpf tuple and the precision are two separate quantities that Float tracks. In SymPy, a Float is a number that can be computed with arbitrary precision. Although floating point 'inf' and 'nan' are not such numbers, Float can create these numbers: >>> Float('-inf') -oo >>> _.is_Float False """ __slots__ = ['_mpf_', '_prec'] # A Float represents many real numbers, # both rational and irrational. is_rational = None is_irrational = None is_number = True is_real = True is_extended_real = True is_Float = True def __new__(cls, num, dps=None, prec=None, precision=None): if prec is not None: SymPyDeprecationWarning( feature="Using 'prec=XX' to denote decimal precision", useinstead="'dps=XX' for decimal precision and 'precision=XX' "\ "for binary precision", issue=12820, deprecated_since_version="1.1").warn() dps = prec del prec # avoid using this deprecated kwarg if dps is not None and precision is not None: raise ValueError('Both decimal and binary precision supplied. ' 'Supply only one. ') if isinstance(num, string_types): # Float accepts spaces as digit separators num = num.replace(' ', '').lower() # in Py 3.6 # underscores are allowed. In anticipation of that, we ignore # legally placed underscores if '_' in num: parts = num.split('_') if not (all(parts) and all(parts[i][-1].isdigit() for i in range(0, len(parts), 2)) and all(parts[i][0].isdigit() for i in range(1, len(parts), 2))): # copy Py 3.6 error raise ValueError("could not convert string to float: '%s'" % num) num = ''.join(parts) if num.startswith('.') and len(num) > 1: num = '0' + num elif num.startswith('-.') and len(num) > 2: num = '-0.' + num[2:] elif num in ('inf', '+inf'): return S.Infinity elif num == '-inf': return S.NegativeInfinity elif isinstance(num, float) and num == 0: num = '0' elif isinstance(num, float) and num == float('inf'): return S.Infinity elif isinstance(num, float) and num == float('-inf'): return S.NegativeInfinity elif isinstance(num, float) and num == float('nan'): return S.NaN elif isinstance(num, (SYMPY_INTS, Integer)): num = str(num) elif num is S.Infinity: return num elif num is S.NegativeInfinity: return num elif num is S.NaN: return num elif type(num).__module__ == 'numpy': # support for numpy datatypes num = _convert_numpy_types(num) elif isinstance(num, mpmath.mpf): if precision is None: if dps is None: precision = num.context.prec num = num._mpf_ if dps is None and precision is None: dps = 15 if isinstance(num, Float): return num if isinstance(num, string_types) and _literal_float(num): try: Num = decimal.Decimal(num) except decimal.InvalidOperation: pass else: isint = '.' not in num num, dps = _decimal_to_Rational_prec(Num) if num.is_Integer and isint: dps = max(dps, len(str(num).lstrip('-'))) dps = max(15, dps) precision = mlib.libmpf.dps_to_prec(dps) elif precision == '' and dps is None or precision is None and dps == '': if not isinstance(num, string_types): raise ValueError('The null string can only be used when ' 'the number to Float is passed as a string or an integer.') ok = None if _literal_float(num): try: Num = decimal.Decimal(num) except decimal.InvalidOperation: pass else: isint = '.' not in num num, dps = _decimal_to_Rational_prec(Num) if num.is_Integer and isint: dps = max(dps, len(str(num).lstrip('-'))) precision = mlib.libmpf.dps_to_prec(dps) ok = True if ok is None: raise ValueError('string-float not recognized: %s' % num) # decimal precision(dps) is set and maybe binary precision(precision) # as well.From here on binary precision is used to compute the Float. # Hence, if supplied use binary precision else translate from decimal # precision. if precision is None or precision == '': precision = mlib.libmpf.dps_to_prec(dps) precision = int(precision) if isinstance(num, float): _mpf_ = mlib.from_float(num, precision, rnd) elif isinstance(num, string_types): _mpf_ = mlib.from_str(num, precision, rnd) elif isinstance(num, decimal.Decimal): if num.is_finite(): _mpf_ = mlib.from_str(str(num), precision, rnd) elif num.is_nan(): return S.NaN elif num.is_infinite(): if num > 0: return S.Infinity return S.NegativeInfinity else: raise ValueError("unexpected decimal value %s" % str(num)) elif isinstance(num, tuple) and len(num) in (3, 4): if type(num[1]) is str: # it's a hexadecimal (coming from a pickled object) # assume that it is in standard form num = list(num) # If we're loading an object pickled in Python 2 into # Python 3, we may need to strip a tailing 'L' because # of a shim for int on Python 3, see issue #13470. if num[1].endswith('L'): num[1] = num[1][:-1] num[1] = MPZ(num[1], 16) _mpf_ = tuple(num) else: if len(num) == 4: # handle normalization hack return Float._new(num, precision) else: if not all(( num[0] in (0, 1), num[1] >= 0, all(type(i) in (long, int) for i in num) )): raise ValueError('malformed mpf: %s' % (num,)) # don't compute number or else it may # over/underflow return Float._new( (num[0], num[1], num[2], bitcount(num[1])), precision) else: try: _mpf_ = num._as_mpf_val(precision) except (NotImplementedError, AttributeError): _mpf_ = mpmath.mpf(num, prec=precision)._mpf_ return cls._new(_mpf_, precision, zero=False) @classmethod def _new(cls, _mpf_, _prec, zero=True): # special cases if zero and _mpf_ == fzero: return S.Zero # Float(0) -> 0.0; Float._new((0,0,0,0)) -> 0 elif _mpf_ == _mpf_nan: return S.NaN elif _mpf_ == _mpf_inf: return S.Infinity elif _mpf_ == _mpf_ninf: return S.NegativeInfinity obj = Expr.__new__(cls) obj._mpf_ = mpf_norm(_mpf_, _prec) obj._prec = _prec return obj # mpz can't be pickled def __getnewargs__(self): return (mlib.to_pickable(self._mpf_),) def __getstate__(self): return {'_prec': self._prec} def _hashable_content(self): return (self._mpf_, self._prec) def floor(self): return Integer(int(mlib.to_int( mlib.mpf_floor(self._mpf_, self._prec)))) def ceiling(self): return Integer(int(mlib.to_int( mlib.mpf_ceil(self._mpf_, self._prec)))) def __floor__(self): return self.floor() def __ceil__(self): return self.ceiling() @property def num(self): return mpmath.mpf(self._mpf_) def _as_mpf_val(self, prec): rv = mpf_norm(self._mpf_, prec) if rv != self._mpf_ and self._prec == prec: debug(self._mpf_, rv) return rv def _as_mpf_op(self, prec): return self._mpf_, max(prec, self._prec) def _eval_is_finite(self): if self._mpf_ in (_mpf_inf, _mpf_ninf): return False return True def _eval_is_infinite(self): if self._mpf_ in (_mpf_inf, _mpf_ninf): return True return False def _eval_is_integer(self): return self._mpf_ == fzero def _eval_is_negative(self): if self._mpf_ == _mpf_ninf or self._mpf_ == _mpf_inf: return False return self.num < 0 def _eval_is_positive(self): if self._mpf_ == _mpf_ninf or self._mpf_ == _mpf_inf: return False return self.num > 0 def _eval_is_extended_negative(self): if self._mpf_ == _mpf_ninf: return True if self._mpf_ == _mpf_inf: return False return self.num < 0 def _eval_is_extended_positive(self): if self._mpf_ == _mpf_inf: return True if self._mpf_ == _mpf_ninf: return False return self.num > 0 def _eval_is_zero(self): return self._mpf_ == fzero def __nonzero__(self): return self._mpf_ != fzero __bool__ = __nonzero__ def __neg__(self): return Float._new(mlib.mpf_neg(self._mpf_), self._prec) @_sympifyit('other', NotImplemented) def __add__(self, other): if isinstance(other, Number) and global_evaluate[0]: rhs, prec = other._as_mpf_op(self._prec) return Float._new(mlib.mpf_add(self._mpf_, rhs, prec, rnd), prec) return Number.__add__(self, other) @_sympifyit('other', NotImplemented) def __sub__(self, other): if isinstance(other, Number) and global_evaluate[0]: rhs, prec = other._as_mpf_op(self._prec) return Float._new(mlib.mpf_sub(self._mpf_, rhs, prec, rnd), prec) return Number.__sub__(self, other) @_sympifyit('other', NotImplemented) def __mul__(self, other): if isinstance(other, Number) and global_evaluate[0]: rhs, prec = other._as_mpf_op(self._prec) return Float._new(mlib.mpf_mul(self._mpf_, rhs, prec, rnd), prec) return Number.__mul__(self, other) @_sympifyit('other', NotImplemented) def __div__(self, other): if isinstance(other, Number) and other != 0 and global_evaluate[0]: rhs, prec = other._as_mpf_op(self._prec) return Float._new(mlib.mpf_div(self._mpf_, rhs, prec, rnd), prec) return Number.__div__(self, other) __truediv__ = __div__ @_sympifyit('other', NotImplemented) def __mod__(self, other): if isinstance(other, Rational) and other.q != 1 and global_evaluate[0]: # calculate mod with Rationals, *then* round the result return Float(Rational.__mod__(Rational(self), other), precision=self._prec) if isinstance(other, Float) and global_evaluate[0]: r = self/other if r == int(r): return Float(0, precision=max(self._prec, other._prec)) if isinstance(other, Number) and global_evaluate[0]: rhs, prec = other._as_mpf_op(self._prec) return Float._new(mlib.mpf_mod(self._mpf_, rhs, prec, rnd), prec) return Number.__mod__(self, other) @_sympifyit('other', NotImplemented) def __rmod__(self, other): if isinstance(other, Float) and global_evaluate[0]: return other.__mod__(self) if isinstance(other, Number) and global_evaluate[0]: rhs, prec = other._as_mpf_op(self._prec) return Float._new(mlib.mpf_mod(rhs, self._mpf_, prec, rnd), prec) return Number.__rmod__(self, other) def _eval_power(self, expt): """ expt is symbolic object but not equal to 0, 1 (-p)**r -> exp(r*log(-p)) -> exp(r*(log(p) + I*Pi)) -> -> p**r*(sin(Pi*r) + cos(Pi*r)*I) """ if self == 0: if expt.is_positive: return S.Zero if expt.is_negative: return S.Infinity if isinstance(expt, Number): if isinstance(expt, Integer): prec = self._prec return Float._new( mlib.mpf_pow_int(self._mpf_, expt.p, prec, rnd), prec) elif isinstance(expt, Rational) and \ expt.p == 1 and expt.q % 2 and self.is_negative: return Pow(S.NegativeOne, expt, evaluate=False)*( -self)._eval_power(expt) expt, prec = expt._as_mpf_op(self._prec) mpfself = self._mpf_ try: y = mpf_pow(mpfself, expt, prec, rnd) return Float._new(y, prec) except mlib.ComplexResult: re, im = mlib.mpc_pow( (mpfself, fzero), (expt, fzero), prec, rnd) return Float._new(re, prec) + \ Float._new(im, prec)*S.ImaginaryUnit def __abs__(self): return Float._new(mlib.mpf_abs(self._mpf_), self._prec) def __int__(self): if self._mpf_ == fzero: return 0 return int(mlib.to_int(self._mpf_)) # uses round_fast = round_down __long__ = __int__ def __eq__(self, other): try: other = _sympify(other) except SympifyError: return NotImplemented if not self: return not other if other.is_NumberSymbol: if other.is_irrational: return False return other.__eq__(self) if other.is_Float: # comparison is exact # so Float(.1, 3) != Float(.1, 33) return self._mpf_ == other._mpf_ if other.is_Rational: return other.__eq__(self) if other.is_Number: # numbers should compare at the same precision; # all _as_mpf_val routines should be sure to abide # by the request to change the prec if necessary; if # they don't, the equality test will fail since it compares # the mpf tuples ompf = other._as_mpf_val(self._prec) return bool(mlib.mpf_eq(self._mpf_, ompf)) return False # Float != non-Number def __ne__(self, other): return not self == other def _Frel(self, other, op): from sympy.core.evalf import evalf from sympy.core.numbers import prec_to_dps try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) if other.is_Rational: # test self*other.q <?> other.p without losing precision ''' >>> f = Float(.1,2) >>> i = 1234567890 >>> (f*i)._mpf_ (0, 471, 18, 9) >>> mlib.mpf_mul(f._mpf_, mlib.from_int(i)) (0, 505555550955, -12, 39) ''' smpf = mlib.mpf_mul(self._mpf_, mlib.from_int(other.q)) ompf = mlib.from_int(other.p) return _sympify(bool(op(smpf, ompf))) elif other.is_Float: return _sympify(bool( op(self._mpf_, other._mpf_))) elif other.is_comparable and other not in ( S.Infinity, S.NegativeInfinity): other = other.evalf(prec_to_dps(self._prec)) if other._prec > 1: if other.is_Number: return _sympify(bool( op(self._mpf_, other._as_mpf_val(self._prec)))) def __gt__(self, other): if isinstance(other, NumberSymbol): return other.__lt__(self) rv = self._Frel(other, mlib.mpf_gt) if rv is None: return Expr.__gt__(self, other) return rv def __ge__(self, other): if isinstance(other, NumberSymbol): return other.__le__(self) rv = self._Frel(other, mlib.mpf_ge) if rv is None: return Expr.__ge__(self, other) return rv def __lt__(self, other): if isinstance(other, NumberSymbol): return other.__gt__(self) rv = self._Frel(other, mlib.mpf_lt) if rv is None: return Expr.__lt__(self, other) return rv def __le__(self, other): if isinstance(other, NumberSymbol): return other.__ge__(self) rv = self._Frel(other, mlib.mpf_le) if rv is None: return Expr.__le__(self, other) return rv def __hash__(self): return super(Float, self).__hash__() def epsilon_eq(self, other, epsilon="1e-15"): return abs(self - other) < Float(epsilon) def _sage_(self): import sage.all as sage return sage.RealNumber(str(self)) def __format__(self, format_spec): return format(decimal.Decimal(str(self)), format_spec) # Add sympify converters converter[float] = converter[decimal.Decimal] = Float # this is here to work nicely in Sage RealNumber = Float class Rational(Number): """Represents rational numbers (p/q) of any size. Examples ======== >>> from sympy import Rational, nsimplify, S, pi >>> Rational(1, 2) 1/2 Rational is unprejudiced in accepting input. If a float is passed, the underlying value of the binary representation will be returned: >>> Rational(.5) 1/2 >>> Rational(.2) 3602879701896397/18014398509481984 If the simpler representation of the float is desired then consider limiting the denominator to the desired value or convert the float to a string (which is roughly equivalent to limiting the denominator to 10**12): >>> Rational(str(.2)) 1/5 >>> Rational(.2).limit_denominator(10**12) 1/5 An arbitrarily precise Rational is obtained when a string literal is passed: >>> Rational("1.23") 123/100 >>> Rational('1e-2') 1/100 >>> Rational(".1") 1/10 >>> Rational('1e-2/3.2') 1/320 The conversion of other types of strings can be handled by the sympify() function, and conversion of floats to expressions or simple fractions can be handled with nsimplify: >>> S('.[3]') # repeating digits in brackets 1/3 >>> S('3**2/10') # general expressions 9/10 >>> nsimplify(.3) # numbers that have a simple form 3/10 But if the input does not reduce to a literal Rational, an error will be raised: >>> Rational(pi) Traceback (most recent call last): ... TypeError: invalid input: pi Low-level --------- Access numerator and denominator as .p and .q: >>> r = Rational(3, 4) >>> r 3/4 >>> r.p 3 >>> r.q 4 Note that p and q return integers (not SymPy Integers) so some care is needed when using them in expressions: >>> r.p/r.q 0.75 See Also ======== sympify, sympy.simplify.simplify.nsimplify """ is_real = True is_integer = False is_rational = True is_number = True __slots__ = ['p', 'q'] is_Rational = True @cacheit def __new__(cls, p, q=None, gcd=None): if q is None: if isinstance(p, Rational): return p if isinstance(p, SYMPY_INTS): pass else: if isinstance(p, (float, Float)): return Rational(*_as_integer_ratio(p)) if not isinstance(p, string_types): try: p = sympify(p) except (SympifyError, SyntaxError): pass # error will raise below else: if p.count('/') > 1: raise TypeError('invalid input: %s' % p) p = p.replace(' ', '') pq = p.rsplit('/', 1) if len(pq) == 2: p, q = pq fp = fractions.Fraction(p) fq = fractions.Fraction(q) p = fp/fq try: p = fractions.Fraction(p) except ValueError: pass # error will raise below else: return Rational(p.numerator, p.denominator, 1) if not isinstance(p, Rational): raise TypeError('invalid input: %s' % p) q = 1 gcd = 1 else: p = Rational(p) q = Rational(q) if isinstance(q, Rational): p *= q.q q = q.p if isinstance(p, Rational): q *= p.q p = p.p # p and q are now integers if q == 0: if p == 0: if _errdict["divide"]: raise ValueError("Indeterminate 0/0") else: return S.NaN return S.ComplexInfinity if q < 0: q = -q p = -p if not gcd: gcd = igcd(abs(p), q) if gcd > 1: p //= gcd q //= gcd if q == 1: return Integer(p) if p == 1 and q == 2: return S.Half obj = Expr.__new__(cls) obj.p = p obj.q = q return obj def limit_denominator(self, max_denominator=1000000): """Closest Rational to self with denominator at most max_denominator. >>> from sympy import Rational >>> Rational('3.141592653589793').limit_denominator(10) 22/7 >>> Rational('3.141592653589793').limit_denominator(100) 311/99 """ f = fractions.Fraction(self.p, self.q) return Rational(f.limit_denominator(fractions.Fraction(int(max_denominator)))) def __getnewargs__(self): return (self.p, self.q) def _hashable_content(self): return (self.p, self.q) def _eval_is_positive(self): return self.p > 0 def _eval_is_zero(self): return self.p == 0 def __neg__(self): return Rational(-self.p, self.q) @_sympifyit('other', NotImplemented) def __add__(self, other): if global_evaluate[0]: if isinstance(other, Integer): return Rational(self.p + self.q*other.p, self.q, 1) elif isinstance(other, Rational): #TODO: this can probably be optimized more return Rational(self.p*other.q + self.q*other.p, self.q*other.q) elif isinstance(other, Float): return other + self else: return Number.__add__(self, other) return Number.__add__(self, other) __radd__ = __add__ @_sympifyit('other', NotImplemented) def __sub__(self, other): if global_evaluate[0]: if isinstance(other, Integer): return Rational(self.p - self.q*other.p, self.q, 1) elif isinstance(other, Rational): return Rational(self.p*other.q - self.q*other.p, self.q*other.q) elif isinstance(other, Float): return -other + self else: return Number.__sub__(self, other) return Number.__sub__(self, other) @_sympifyit('other', NotImplemented) def __rsub__(self, other): if global_evaluate[0]: if isinstance(other, Integer): return Rational(self.q*other.p - self.p, self.q, 1) elif isinstance(other, Rational): return Rational(self.q*other.p - self.p*other.q, self.q*other.q) elif isinstance(other, Float): return -self + other else: return Number.__rsub__(self, other) return Number.__rsub__(self, other) @_sympifyit('other', NotImplemented) def __mul__(self, other): if global_evaluate[0]: if isinstance(other, Integer): return Rational(self.p*other.p, self.q, igcd(other.p, self.q)) elif isinstance(other, Rational): return Rational(self.p*other.p, self.q*other.q, igcd(self.p, other.q)*igcd(self.q, other.p)) elif isinstance(other, Float): return other*self else: return Number.__mul__(self, other) return Number.__mul__(self, other) __rmul__ = __mul__ @_sympifyit('other', NotImplemented) def __div__(self, other): if global_evaluate[0]: if isinstance(other, Integer): if self.p and other.p == S.Zero: return S.ComplexInfinity else: return Rational(self.p, self.q*other.p, igcd(self.p, other.p)) elif isinstance(other, Rational): return Rational(self.p*other.q, self.q*other.p, igcd(self.p, other.p)*igcd(self.q, other.q)) elif isinstance(other, Float): return self*(1/other) else: return Number.__div__(self, other) return Number.__div__(self, other) @_sympifyit('other', NotImplemented) def __rdiv__(self, other): if global_evaluate[0]: if isinstance(other, Integer): return Rational(other.p*self.q, self.p, igcd(self.p, other.p)) elif isinstance(other, Rational): return Rational(other.p*self.q, other.q*self.p, igcd(self.p, other.p)*igcd(self.q, other.q)) elif isinstance(other, Float): return other*(1/self) else: return Number.__rdiv__(self, other) return Number.__rdiv__(self, other) __truediv__ = __div__ @_sympifyit('other', NotImplemented) def __mod__(self, other): if global_evaluate[0]: if isinstance(other, Rational): n = (self.p*other.q) // (other.p*self.q) return Rational(self.p*other.q - n*other.p*self.q, self.q*other.q) if isinstance(other, Float): # calculate mod with Rationals, *then* round the answer return Float(self.__mod__(Rational(other)), precision=other._prec) return Number.__mod__(self, other) return Number.__mod__(self, other) @_sympifyit('other', NotImplemented) def __rmod__(self, other): if isinstance(other, Rational): return Rational.__mod__(other, self) return Number.__rmod__(self, other) def _eval_power(self, expt): if isinstance(expt, Number): if isinstance(expt, Float): return self._eval_evalf(expt._prec)**expt if expt.is_extended_negative: # (3/4)**-2 -> (4/3)**2 ne = -expt if (ne is S.One): return Rational(self.q, self.p) if self.is_negative: return S.NegativeOne**expt*Rational(self.q, -self.p)**ne else: return Rational(self.q, self.p)**ne if expt is S.Infinity: # -oo already caught by test for negative if self.p > self.q: # (3/2)**oo -> oo return S.Infinity if self.p < -self.q: # (-3/2)**oo -> oo + I*oo return S.Infinity + S.Infinity*S.ImaginaryUnit return S.Zero if isinstance(expt, Integer): # (4/3)**2 -> 4**2 / 3**2 return Rational(self.p**expt.p, self.q**expt.p, 1) if isinstance(expt, Rational): if self.p != 1: # (4/3)**(5/6) -> 4**(5/6)*3**(-5/6) return Integer(self.p)**expt*Integer(self.q)**(-expt) # as the above caught negative self.p, now self is positive return Integer(self.q)**Rational( expt.p*(expt.q - 1), expt.q) / \ Integer(self.q)**Integer(expt.p) if self.is_extended_negative and expt.is_even: return (-self)**expt return def _as_mpf_val(self, prec): return mlib.from_rational(self.p, self.q, prec, rnd) def _mpmath_(self, prec, rnd): return mpmath.make_mpf(mlib.from_rational(self.p, self.q, prec, rnd)) def __abs__(self): return Rational(abs(self.p), self.q) def __int__(self): p, q = self.p, self.q if p < 0: return -int(-p//q) return int(p//q) __long__ = __int__ def floor(self): return Integer(self.p // self.q) def ceiling(self): return -Integer(-self.p // self.q) def __floor__(self): return self.floor() def __ceil__(self): return self.ceiling() def __eq__(self, other): from sympy.core.power import integer_log try: other = _sympify(other) except SympifyError: return NotImplemented if not isinstance(other, Number): # S(0) == S.false is False # S(0) == False is True return False if not self: return not other if other.is_NumberSymbol: if other.is_irrational: return False return other.__eq__(self) if other.is_Rational: # a Rational is always in reduced form so will never be 2/4 # so we can just check equivalence of args return self.p == other.p and self.q == other.q if other.is_Float: # all Floats have a denominator that is a power of 2 # so if self doesn't, it can't be equal to other if self.q & (self.q - 1): return False s, m, t = other._mpf_[:3] if s: m = -m if not t: # other is an odd integer if not self.is_Integer or self.is_even: return False return m == self.p if t > 0: # other is an even integer if not self.is_Integer: return False # does m*2**t == self.p return self.p and not self.p % m and \ integer_log(self.p//m, 2) == (t, True) # does non-integer s*m/2**-t = p/q? if self.is_Integer: return False return m == self.p and integer_log(self.q, 2) == (-t, True) return False def __ne__(self, other): return not self == other def _Rrel(self, other, attr): # if you want self < other, pass self, other, __gt__ try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) if other.is_Number: op = None s, o = self, other if other.is_NumberSymbol: op = getattr(o, attr) elif other.is_Float: op = getattr(o, attr) elif other.is_Rational: s, o = Integer(s.p*o.q), Integer(s.q*o.p) op = getattr(o, attr) if op: return op(s) if o.is_number and o.is_extended_real: return Integer(s.p), s.q*o def __gt__(self, other): rv = self._Rrel(other, '__lt__') if rv is None: rv = self, other elif not type(rv) is tuple: return rv return Expr.__gt__(*rv) def __ge__(self, other): rv = self._Rrel(other, '__le__') if rv is None: rv = self, other elif not type(rv) is tuple: return rv return Expr.__ge__(*rv) def __lt__(self, other): rv = self._Rrel(other, '__gt__') if rv is None: rv = self, other elif not type(rv) is tuple: return rv return Expr.__lt__(*rv) def __le__(self, other): rv = self._Rrel(other, '__ge__') if rv is None: rv = self, other elif not type(rv) is tuple: return rv return Expr.__le__(*rv) def __hash__(self): return super(Rational, self).__hash__() def factors(self, limit=None, use_trial=True, use_rho=False, use_pm1=False, verbose=False, visual=False): """A wrapper to factorint which return factors of self that are smaller than limit (or cheap to compute). Special methods of factoring are disabled by default so that only trial division is used. """ from sympy.ntheory import factorrat return factorrat(self, limit=limit, use_trial=use_trial, use_rho=use_rho, use_pm1=use_pm1, verbose=verbose).copy() def numerator(self): return self.p def denominator(self): return self.q @_sympifyit('other', NotImplemented) def gcd(self, other): if isinstance(other, Rational): if other is S.Zero: return other return Rational( Integer(igcd(self.p, other.p)), Integer(ilcm(self.q, other.q))) return Number.gcd(self, other) @_sympifyit('other', NotImplemented) def lcm(self, other): if isinstance(other, Rational): return Rational( self.p // igcd(self.p, other.p) * other.p, igcd(self.q, other.q)) return Number.lcm(self, other) def as_numer_denom(self): return Integer(self.p), Integer(self.q) def _sage_(self): import sage.all as sage return sage.Integer(self.p)/sage.Integer(self.q) def as_content_primitive(self, radical=False, clear=True): """Return the tuple (R, self/R) where R is the positive Rational extracted from self. Examples ======== >>> from sympy import S >>> (S(-3)/2).as_content_primitive() (3/2, -1) See docstring of Expr.as_content_primitive for more examples. """ if self: if self.is_positive: return self, S.One return -self, S.NegativeOne return S.One, self def as_coeff_Mul(self, rational=False): """Efficiently extract the coefficient of a product. """ return self, S.One def as_coeff_Add(self, rational=False): """Efficiently extract the coefficient of a summation. """ return self, S.Zero class Integer(Rational): """Represents integer numbers of any size. Examples ======== >>> from sympy import Integer >>> Integer(3) 3 If a float or a rational is passed to Integer, the fractional part will be discarded; the effect is of rounding toward zero. >>> Integer(3.8) 3 >>> Integer(-3.8) -3 A string is acceptable input if it can be parsed as an integer: >>> Integer("9" * 20) 99999999999999999999 It is rarely needed to explicitly instantiate an Integer, because Python integers are automatically converted to Integer when they are used in SymPy expressions. """ q = 1 is_integer = True is_number = True is_Integer = True __slots__ = ['p'] def _as_mpf_val(self, prec): return mlib.from_int(self.p, prec, rnd) def _mpmath_(self, prec, rnd): return mpmath.make_mpf(self._as_mpf_val(prec)) @cacheit def __new__(cls, i): if isinstance(i, string_types): i = i.replace(' ', '') # whereas we cannot, in general, make a Rational from an # arbitrary expression, we can make an Integer unambiguously # (except when a non-integer expression happens to round to # an integer). So we proceed by taking int() of the input and # let the int routines determine whether the expression can # be made into an int or whether an error should be raised. try: ival = int(i) except TypeError: raise TypeError( "Argument of Integer should be of numeric type, got %s." % i) # We only work with well-behaved integer types. This converts, for # example, numpy.int32 instances. if ival == 1: return S.One if ival == -1: return S.NegativeOne if ival == 0: return S.Zero obj = Expr.__new__(cls) obj.p = ival return obj def __getnewargs__(self): return (self.p,) # Arithmetic operations are here for efficiency def __int__(self): return self.p __long__ = __int__ def floor(self): return Integer(self.p) def ceiling(self): return Integer(self.p) def __floor__(self): return self.floor() def __ceil__(self): return self.ceiling() def __neg__(self): return Integer(-self.p) def __abs__(self): if self.p >= 0: return self else: return Integer(-self.p) def __divmod__(self, other): from .containers import Tuple if isinstance(other, Integer) and global_evaluate[0]: return Tuple(*(divmod(self.p, other.p))) else: return Number.__divmod__(self, other) def __rdivmod__(self, other): from .containers import Tuple if isinstance(other, integer_types) and global_evaluate[0]: return Tuple(*(divmod(other, self.p))) else: try: other = Number(other) except TypeError: msg = "unsupported operand type(s) for divmod(): '%s' and '%s'" oname = type(other).__name__ sname = type(self).__name__ raise TypeError(msg % (oname, sname)) return Number.__divmod__(other, self) # TODO make it decorator + bytecodehacks? def __add__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(self.p + other) elif isinstance(other, Integer): return Integer(self.p + other.p) elif isinstance(other, Rational): return Rational(self.p*other.q + other.p, other.q, 1) return Rational.__add__(self, other) else: return Add(self, other) def __radd__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(other + self.p) elif isinstance(other, Rational): return Rational(other.p + self.p*other.q, other.q, 1) return Rational.__radd__(self, other) return Rational.__radd__(self, other) def __sub__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(self.p - other) elif isinstance(other, Integer): return Integer(self.p - other.p) elif isinstance(other, Rational): return Rational(self.p*other.q - other.p, other.q, 1) return Rational.__sub__(self, other) return Rational.__sub__(self, other) def __rsub__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(other - self.p) elif isinstance(other, Rational): return Rational(other.p - self.p*other.q, other.q, 1) return Rational.__rsub__(self, other) return Rational.__rsub__(self, other) def __mul__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(self.p*other) elif isinstance(other, Integer): return Integer(self.p*other.p) elif isinstance(other, Rational): return Rational(self.p*other.p, other.q, igcd(self.p, other.q)) return Rational.__mul__(self, other) return Rational.__mul__(self, other) def __rmul__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(other*self.p) elif isinstance(other, Rational): return Rational(other.p*self.p, other.q, igcd(self.p, other.q)) return Rational.__rmul__(self, other) return Rational.__rmul__(self, other) def __mod__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(self.p % other) elif isinstance(other, Integer): return Integer(self.p % other.p) return Rational.__mod__(self, other) return Rational.__mod__(self, other) def __rmod__(self, other): if global_evaluate[0]: if isinstance(other, integer_types): return Integer(other % self.p) elif isinstance(other, Integer): return Integer(other.p % self.p) return Rational.__rmod__(self, other) return Rational.__rmod__(self, other) def __eq__(self, other): if isinstance(other, integer_types): return (self.p == other) elif isinstance(other, Integer): return (self.p == other.p) return Rational.__eq__(self, other) def __ne__(self, other): return not self == other def __gt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) if other.is_Integer: return _sympify(self.p > other.p) return Rational.__gt__(self, other) def __lt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s < %s" % (self, other)) if other.is_Integer: return _sympify(self.p < other.p) return Rational.__lt__(self, other) def __ge__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s >= %s" % (self, other)) if other.is_Integer: return _sympify(self.p >= other.p) return Rational.__ge__(self, other) def __le__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s <= %s" % (self, other)) if other.is_Integer: return _sympify(self.p <= other.p) return Rational.__le__(self, other) def __hash__(self): return hash(self.p) def __index__(self): return self.p ######################################## def _eval_is_odd(self): return bool(self.p % 2) def _eval_power(self, expt): """ Tries to do some simplifications on self**expt Returns None if no further simplifications can be done When exponent is a fraction (so we have for example a square root), we try to find a simpler representation by factoring the argument up to factors of 2**15, e.g. - sqrt(4) becomes 2 - sqrt(-4) becomes 2*I - (2**(3+7)*3**(6+7))**Rational(1,7) becomes 6*18**(3/7) Further simplification would require a special call to factorint on the argument which is not done here for sake of speed. """ from sympy.ntheory.factor_ import perfect_power if expt is S.Infinity: if self.p > S.One: return S.Infinity # cases -1, 0, 1 are done in their respective classes return S.Infinity + S.ImaginaryUnit*S.Infinity if expt is S.NegativeInfinity: return Rational(1, self)**S.Infinity if not isinstance(expt, Number): # simplify when expt is even # (-2)**k --> 2**k if self.is_negative and expt.is_even: return (-self)**expt if isinstance(expt, Float): # Rational knows how to exponentiate by a Float return super(Integer, self)._eval_power(expt) if not isinstance(expt, Rational): return if expt is S.Half and self.is_negative: # we extract I for this special case since everyone is doing so return S.ImaginaryUnit*Pow(-self, expt) if expt.is_negative: # invert base and change sign on exponent ne = -expt if self.is_negative: return S.NegativeOne**expt*Rational(1, -self)**ne else: return Rational(1, self.p)**ne # see if base is a perfect root, sqrt(4) --> 2 x, xexact = integer_nthroot(abs(self.p), expt.q) if xexact: # if it's a perfect root we've finished result = Integer(x**abs(expt.p)) if self.is_negative: result *= S.NegativeOne**expt return result # The following is an algorithm where we collect perfect roots # from the factors of base. # if it's not an nth root, it still might be a perfect power b_pos = int(abs(self.p)) p = perfect_power(b_pos) if p is not False: dict = {p[0]: p[1]} else: dict = Integer(b_pos).factors(limit=2**15) # now process the dict of factors out_int = 1 # integer part out_rad = 1 # extracted radicals sqr_int = 1 sqr_gcd = 0 sqr_dict = {} for prime, exponent in dict.items(): exponent *= expt.p # remove multiples of expt.q: (2**12)**(1/10) -> 2*(2**2)**(1/10) div_e, div_m = divmod(exponent, expt.q) if div_e > 0: out_int *= prime**div_e if div_m > 0: # see if the reduced exponent shares a gcd with e.q # (2**2)**(1/10) -> 2**(1/5) g = igcd(div_m, expt.q) if g != 1: out_rad *= Pow(prime, Rational(div_m//g, expt.q//g)) else: sqr_dict[prime] = div_m # identify gcd of remaining powers for p, ex in sqr_dict.items(): if sqr_gcd == 0: sqr_gcd = ex else: sqr_gcd = igcd(sqr_gcd, ex) if sqr_gcd == 1: break for k, v in sqr_dict.items(): sqr_int *= k**(v//sqr_gcd) if sqr_int == b_pos and out_int == 1 and out_rad == 1: result = None else: result = out_int*out_rad*Pow(sqr_int, Rational(sqr_gcd, expt.q)) if self.is_negative: result *= Pow(S.NegativeOne, expt) return result def _eval_is_prime(self): from sympy.ntheory import isprime return isprime(self) def _eval_is_composite(self): if self > 1: return fuzzy_not(self.is_prime) else: return False def as_numer_denom(self): return self, S.One def __floordiv__(self, other): if isinstance(other, Integer): return Integer(self.p // other) return Integer(divmod(self, other)[0]) def __rfloordiv__(self, other): return Integer(Integer(other).p // self.p) # Add sympify converters for i_type in integer_types: converter[i_type] = Integer class AlgebraicNumber(Expr): """Class for representing algebraic numbers in SymPy. """ __slots__ = ['rep', 'root', 'alias', 'minpoly'] is_AlgebraicNumber = True is_algebraic = True is_number = True def __new__(cls, expr, coeffs=None, alias=None, **args): """Construct a new algebraic number. """ from sympy import Poly from sympy.polys.polyclasses import ANP, DMP from sympy.polys.numberfields import minimal_polynomial from sympy.core.symbol import Symbol expr = sympify(expr) if isinstance(expr, (tuple, Tuple)): minpoly, root = expr if not minpoly.is_Poly: minpoly = Poly(minpoly) elif expr.is_AlgebraicNumber: minpoly, root = expr.minpoly, expr.root else: minpoly, root = minimal_polynomial( expr, args.get('gen'), polys=True), expr dom = minpoly.get_domain() if coeffs is not None: if not isinstance(coeffs, ANP): rep = DMP.from_sympy_list(sympify(coeffs), 0, dom) scoeffs = Tuple(*coeffs) else: rep = DMP.from_list(coeffs.to_list(), 0, dom) scoeffs = Tuple(*coeffs.to_list()) if rep.degree() >= minpoly.degree(): rep = rep.rem(minpoly.rep) else: rep = DMP.from_list([1, 0], 0, dom) scoeffs = Tuple(1, 0) sargs = (root, scoeffs) if alias is not None: if not isinstance(alias, Symbol): alias = Symbol(alias) sargs = sargs + (alias,) obj = Expr.__new__(cls, *sargs) obj.rep = rep obj.root = root obj.alias = alias obj.minpoly = minpoly return obj def __hash__(self): return super(AlgebraicNumber, self).__hash__() def _eval_evalf(self, prec): return self.as_expr()._evalf(prec) @property def is_aliased(self): """Returns ``True`` if ``alias`` was set. """ return self.alias is not None def as_poly(self, x=None): """Create a Poly instance from ``self``. """ from sympy import Dummy, Poly, PurePoly if x is not None: return Poly.new(self.rep, x) else: if self.alias is not None: return Poly.new(self.rep, self.alias) else: return PurePoly.new(self.rep, Dummy('x')) def as_expr(self, x=None): """Create a Basic expression from ``self``. """ return self.as_poly(x or self.root).as_expr().expand() def coeffs(self): """Returns all SymPy coefficients of an algebraic number. """ return [ self.rep.dom.to_sympy(c) for c in self.rep.all_coeffs() ] def native_coeffs(self): """Returns all native coefficients of an algebraic number. """ return self.rep.all_coeffs() def to_algebraic_integer(self): """Convert ``self`` to an algebraic integer. """ from sympy import Poly f = self.minpoly if f.LC() == 1: return self coeff = f.LC()**(f.degree() - 1) poly = f.compose(Poly(f.gen/f.LC())) minpoly = poly*coeff root = f.LC()*self.root return AlgebraicNumber((minpoly, root), self.coeffs()) def _eval_simplify(self, **kwargs): from sympy.polys import CRootOf, minpoly measure, ratio = kwargs['measure'], kwargs['ratio'] for r in [r for r in self.minpoly.all_roots() if r.func != CRootOf]: if minpoly(self.root - r).is_Symbol: # use the matching root if it's simpler if measure(r) < ratio*measure(self.root): return AlgebraicNumber(r) return self class RationalConstant(Rational): """ Abstract base class for rationals with specific behaviors Derived classes must define class attributes p and q and should probably all be singletons. """ __slots__ = [] def __new__(cls): return AtomicExpr.__new__(cls) class IntegerConstant(Integer): __slots__ = [] def __new__(cls): return AtomicExpr.__new__(cls) class Zero(with_metaclass(Singleton, IntegerConstant)): """The number zero. Zero is a singleton, and can be accessed by ``S.Zero`` Examples ======== >>> from sympy import S, Integer, zoo >>> Integer(0) is S.Zero True >>> 1/S.Zero zoo References ========== .. [1] https://en.wikipedia.org/wiki/Zero """ p = 0 q = 1 is_positive = False is_negative = False is_zero = True is_number = True __slots__ = [] @staticmethod def __abs__(): return S.Zero @staticmethod def __neg__(): return S.Zero def _eval_power(self, expt): if expt.is_positive: return self if expt.is_negative: return S.ComplexInfinity if expt.is_extended_real is False: return S.NaN # infinities are already handled with pos and neg # tests above; now throw away leading numbers on Mul # exponent coeff, terms = expt.as_coeff_Mul() if coeff.is_negative: return S.ComplexInfinity**terms if coeff is not S.One: # there is a Number to discard return self**terms def _eval_order(self, *symbols): # Order(0,x) -> 0 return self def __nonzero__(self): return False __bool__ = __nonzero__ def as_coeff_Mul(self, rational=False): # XXX this routine should be deleted """Efficiently extract the coefficient of a summation. """ return S.One, self class One(with_metaclass(Singleton, IntegerConstant)): """The number one. One is a singleton, and can be accessed by ``S.One``. Examples ======== >>> from sympy import S, Integer >>> Integer(1) is S.One True References ========== .. [1] https://en.wikipedia.org/wiki/1_%28number%29 """ is_number = True p = 1 q = 1 __slots__ = [] @staticmethod def __abs__(): return S.One @staticmethod def __neg__(): return S.NegativeOne def _eval_power(self, expt): return self def _eval_order(self, *symbols): return @staticmethod def factors(limit=None, use_trial=True, use_rho=False, use_pm1=False, verbose=False, visual=False): if visual: return S.One else: return {} class NegativeOne(with_metaclass(Singleton, IntegerConstant)): """The number negative one. NegativeOne is a singleton, and can be accessed by ``S.NegativeOne``. Examples ======== >>> from sympy import S, Integer >>> Integer(-1) is S.NegativeOne True See Also ======== One References ========== .. [1] https://en.wikipedia.org/wiki/%E2%88%921_%28number%29 """ is_number = True p = -1 q = 1 __slots__ = [] @staticmethod def __abs__(): return S.One @staticmethod def __neg__(): return S.One def _eval_power(self, expt): if expt.is_odd: return S.NegativeOne if expt.is_even: return S.One if isinstance(expt, Number): if isinstance(expt, Float): return Float(-1.0)**expt if expt is S.NaN: return S.NaN if expt is S.Infinity or expt is S.NegativeInfinity: return S.NaN if expt is S.Half: return S.ImaginaryUnit if isinstance(expt, Rational): if expt.q == 2: return S.ImaginaryUnit**Integer(expt.p) i, r = divmod(expt.p, expt.q) if i: return self**i*self**Rational(r, expt.q) return class Half(with_metaclass(Singleton, RationalConstant)): """The rational number 1/2. Half is a singleton, and can be accessed by ``S.Half``. Examples ======== >>> from sympy import S, Rational >>> Rational(1, 2) is S.Half True References ========== .. [1] https://en.wikipedia.org/wiki/One_half """ is_number = True p = 1 q = 2 __slots__ = [] @staticmethod def __abs__(): return S.Half class Infinity(with_metaclass(Singleton, Number)): r"""Positive infinite quantity. In real analysis the symbol `\infty` denotes an unbounded limit: `x\to\infty` means that `x` grows without bound. Infinity is often used not only to define a limit but as a value in the affinely extended real number system. Points labeled `+\infty` and `-\infty` can be added to the topological space of the real numbers, producing the two-point compactification of the real numbers. Adding algebraic properties to this gives us the extended real numbers. Infinity is a singleton, and can be accessed by ``S.Infinity``, or can be imported as ``oo``. Examples ======== >>> from sympy import oo, exp, limit, Symbol >>> 1 + oo oo >>> 42/oo 0 >>> x = Symbol('x') >>> limit(exp(x), x, oo) oo See Also ======== NegativeInfinity, NaN References ========== .. [1] https://en.wikipedia.org/wiki/Infinity """ is_commutative = True is_number = True is_complex = False is_extended_real = True is_infinite = True is_extended_positive = True is_prime = False __slots__ = [] def __new__(cls): return AtomicExpr.__new__(cls) def _latex(self, printer): return r"\infty" def _eval_subs(self, old, new): if self == old: return new @_sympifyit('other', NotImplemented) def __add__(self, other): if isinstance(other, Number): if other is S.NegativeInfinity or other is S.NaN: return S.NaN return self return NotImplemented __radd__ = __add__ @_sympifyit('other', NotImplemented) def __sub__(self, other): if isinstance(other, Number): if other is S.Infinity or other is S.NaN: return S.NaN return self return NotImplemented @_sympifyit('other', NotImplemented) def __rsub__(self, other): return (-self).__add__(other) @_sympifyit('other', NotImplemented) def __mul__(self, other): if isinstance(other, Number): if other.is_zero or other is S.NaN: return S.NaN if other.is_extended_positive: return self return S.NegativeInfinity return NotImplemented __rmul__ = __mul__ @_sympifyit('other', NotImplemented) def __div__(self, other): if isinstance(other, Number): if other is S.Infinity or \ other is S.NegativeInfinity or \ other is S.NaN: return S.NaN if other.is_extended_nonnegative: return self return S.NegativeInfinity return NotImplemented __truediv__ = __div__ def __abs__(self): return S.Infinity def __neg__(self): return S.NegativeInfinity def _eval_power(self, expt): """ ``expt`` is symbolic object but not equal to 0 or 1. ================ ======= ============================== Expression Result Notes ================ ======= ============================== ``oo ** nan`` ``nan`` ``oo ** -p`` ``0`` ``p`` is number, ``oo`` ================ ======= ============================== See Also ======== Pow NaN NegativeInfinity """ from sympy.functions import re if expt.is_extended_positive: return S.Infinity if expt.is_extended_negative: return S.Zero if expt is S.NaN: return S.NaN if expt is S.ComplexInfinity: return S.NaN if expt.is_extended_real is False and expt.is_number: expt_real = re(expt) if expt_real.is_positive: return S.ComplexInfinity if expt_real.is_negative: return S.Zero if expt_real.is_zero: return S.NaN return self**expt.evalf() def _as_mpf_val(self, prec): return mlib.finf def _sage_(self): import sage.all as sage return sage.oo def __hash__(self): return super(Infinity, self).__hash__() def __eq__(self, other): return other is S.Infinity or other == float('inf') def __ne__(self, other): return other is not S.Infinity and other != float('inf') def __lt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s < %s" % (self, other)) if other.is_extended_real: return S.false return Expr.__lt__(self, other) def __le__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s <= %s" % (self, other)) if other.is_infinite and other.is_extended_positive: return S.true elif other.is_real or other.is_extended_nonpositive: return S.false return Expr.__le__(self, other) def __gt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) if other.is_infinite and other.is_extended_positive: return S.false elif other.is_real or other.is_extended_nonpositive: return S.true return Expr.__gt__(self, other) def __ge__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s >= %s" % (self, other)) if other.is_extended_real: return S.true return Expr.__ge__(self, other) def __mod__(self, other): return S.NaN __rmod__ = __mod__ def floor(self): return self def ceiling(self): return self oo = S.Infinity class NegativeInfinity(with_metaclass(Singleton, Number)): """Negative infinite quantity. NegativeInfinity is a singleton, and can be accessed by ``S.NegativeInfinity``. See Also ======== Infinity """ is_extended_real = True is_complex = False is_commutative = True is_infinite = True is_extended_negative = True is_number = True is_prime = False __slots__ = [] def __new__(cls): return AtomicExpr.__new__(cls) def _latex(self, printer): return r"-\infty" def _eval_subs(self, old, new): if self == old: return new @_sympifyit('other', NotImplemented) def __add__(self, other): if isinstance(other, Number): if other is S.Infinity or other is S.NaN: return S.NaN return self return NotImplemented __radd__ = __add__ @_sympifyit('other', NotImplemented) def __sub__(self, other): if isinstance(other, Number): if other is S.NegativeInfinity or other is S.NaN: return S.NaN return self return NotImplemented @_sympifyit('other', NotImplemented) def __rsub__(self, other): return (-self).__add__(other) @_sympifyit('other', NotImplemented) def __mul__(self, other): if isinstance(other, Number): if other.is_zero or other is S.NaN: return S.NaN if other.is_extended_positive: return self return S.Infinity return NotImplemented __rmul__ = __mul__ @_sympifyit('other', NotImplemented) def __div__(self, other): if isinstance(other, Number): if other is S.Infinity or \ other is S.NegativeInfinity or \ other is S.NaN: return S.NaN if other.is_extended_nonnegative: return self return S.Infinity return NotImplemented __truediv__ = __div__ def __abs__(self): return S.Infinity def __neg__(self): return S.Infinity def _eval_power(self, expt): """ ``expt`` is symbolic object but not equal to 0 or 1. ================ ======= ============================== Expression Result Notes ================ ======= ============================== ``(-oo) ** nan`` ``nan`` ``(-oo) ** oo`` ``nan`` ``(-oo) ** -oo`` ``nan`` ``(-oo) ** e`` ``oo`` ``e`` is positive even integer ``(-oo) ** o`` ``-oo`` ``o`` is positive odd integer ================ ======= ============================== See Also ======== Infinity Pow NaN """ if expt.is_number: if expt is S.NaN or \ expt is S.Infinity or \ expt is S.NegativeInfinity: return S.NaN if isinstance(expt, Integer) and expt.is_extended_positive: if expt.is_odd: return S.NegativeInfinity else: return S.Infinity return S.NegativeOne**expt*S.Infinity**expt def _as_mpf_val(self, prec): return mlib.fninf def _sage_(self): import sage.all as sage return -(sage.oo) def __hash__(self): return super(NegativeInfinity, self).__hash__() def __eq__(self, other): return other is S.NegativeInfinity or other == float('-inf') def __ne__(self, other): return other is not S.NegativeInfinity and other != float('-inf') def __lt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s < %s" % (self, other)) if other.is_infinite and other.is_extended_negative: return S.false elif other.is_real or other.is_extended_nonnegative: return S.true return Expr.__lt__(self, other) def __le__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s <= %s" % (self, other)) if other.is_extended_real: return S.true return Expr.__le__(self, other) def __gt__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s > %s" % (self, other)) if other.is_extended_real: return S.false return Expr.__gt__(self, other) def __ge__(self, other): try: other = _sympify(other) except SympifyError: raise TypeError("Invalid comparison %s >= %s" % (self, other)) if other.is_infinite and other.is_extended_negative: return S.true elif other.is_real or other.is_extended_nonnegative: return S.false return Expr.__ge__(self, other) def __mod__(self, other): return S.NaN __rmod__ = __mod__ def floor(self): return self def ceiling(self): return self def as_powers_dict(self): return {S.NegativeOne: 1, S.Infinity: 1} class NaN(with_metaclass(Singleton, Number)): """ Not a Number. This serves as a place holder for numeric values that are indeterminate. Most operations on NaN, produce another NaN. Most indeterminate forms, such as ``0/0`` or ``oo - oo` produce NaN. Two exceptions are ``0**0`` and ``oo**0``, which all produce ``1`` (this is consistent with Python's float). NaN is loosely related to floating point nan, which is defined in the IEEE 754 floating point standard, and corresponds to the Python ``float('nan')``. Differences are noted below. NaN is mathematically not equal to anything else, even NaN itself. This explains the initially counter-intuitive results with ``Eq`` and ``==`` in the examples below. NaN is not comparable so inequalities raise a TypeError. This is in contrast with floating point nan where all inequalities are false. NaN is a singleton, and can be accessed by ``S.NaN``, or can be imported as ``nan``. Examples ======== >>> from sympy import nan, S, oo, Eq >>> nan is S.NaN True >>> oo - oo nan >>> nan + 1 nan >>> Eq(nan, nan) # mathematical equality False >>> nan == nan # structural equality True References ========== .. [1] https://en.wikipedia.org/wiki/NaN """ is_commutative = True is_extended_real = None is_real = None is_rational = None is_algebraic = None is_transcendental = None is_integer = None is_comparable = False is_finite = None is_zero = None is_prime = None is_positive = None is_negative = None is_number = True __slots__ = [] def __new__(cls): return AtomicExpr.__new__(cls) def _latex(self, printer): return r"\text{NaN}" def __neg__(self): return self @_sympifyit('other', NotImplemented) def __add__(self, other): return self @_sympifyit('other', NotImplemented) def __sub__(self, other): return self @_sympifyit('other', NotImplemented) def __mul__(self, other): return self @_sympifyit('other', NotImplemented) def __div__(self, other): return self __truediv__ = __div__ def floor(self): return self def ceiling(self): return self def _as_mpf_val(self, prec): return _mpf_nan def _sage_(self): import sage.all as sage return sage.NaN def __hash__(self): return super(NaN, self).__hash__() def __eq__(self, other): # NaN is structurally equal to another NaN return other is S.NaN def __ne__(self, other): return other is not S.NaN def _eval_Eq(self, other): # NaN is not mathematically equal to anything, even NaN return S.false # Expr will _sympify and raise TypeError __gt__ = Expr.__gt__ __ge__ = Expr.__ge__ __lt__ = Expr.__lt__ __le__ = Expr.__le__ nan = S.NaN class ComplexInfinity(with_metaclass(Singleton, AtomicExpr)): r"""Complex infinity. In complex analysis the symbol `\tilde\infty`, called "complex infinity", represents a quantity with infinite magnitude, but undetermined complex phase. ComplexInfinity is a singleton, and can be accessed by ``S.ComplexInfinity``, or can be imported as ``zoo``. Examples ======== >>> from sympy import zoo, oo >>> zoo + 42 zoo >>> 42/zoo 0 >>> zoo + zoo nan >>> zoo*zoo zoo See Also ======== Infinity """ is_commutative = True is_infinite = True is_number = True is_prime = False is_complex = True is_extended_real = False __slots__ = [] def __new__(cls): return AtomicExpr.__new__(cls) def _latex(self, printer): return r"\tilde{\infty}" @staticmethod def __abs__(): return S.Infinity def floor(self): return self def ceiling(self): return self @staticmethod def __neg__(): return S.ComplexInfinity def _eval_power(self, expt): if expt is S.ComplexInfinity: return S.NaN if isinstance(expt, Number): if expt is S.Zero: return S.NaN else: if expt.is_positive: return S.ComplexInfinity else: return S.Zero def _sage_(self): import sage.all as sage return sage.UnsignedInfinityRing.gen() zoo = S.ComplexInfinity class NumberSymbol(AtomicExpr): is_commutative = True is_finite = True is_number = True __slots__ = [] is_NumberSymbol = True def __new__(cls): return AtomicExpr.__new__(cls) def approximation(self, number_cls): """ Return an interval with number_cls endpoints that contains the value of NumberSymbol. If not implemented, then return None. """ def _eval_evalf(self, prec): return Float._new(self._as_mpf_val(prec), prec) def __eq__(self, other): try: other = _sympify(other) except SympifyError: return NotImplemented if self is other: return True if other.is_Number and self.is_irrational: return False return False # NumberSymbol != non-(Number|self) def __ne__(self, other): return not self == other def __le__(self, other): if self is other: return S.true return Expr.__le__(self, other) def __ge__(self, other): if self is other: return S.true return Expr.__ge__(self, other) def __int__(self): # subclass with appropriate return value raise NotImplementedError def __long__(self): return self.__int__() def __hash__(self): return super(NumberSymbol, self).__hash__() class Exp1(with_metaclass(Singleton, NumberSymbol)): r"""The `e` constant. The transcendental number `e = 2.718281828\ldots` is the base of the natural logarithm and of the exponential function, `e = \exp(1)`. Sometimes called Euler's number or Napier's constant. Exp1 is a singleton, and can be accessed by ``S.Exp1``, or can be imported as ``E``. Examples ======== >>> from sympy import exp, log, E >>> E is exp(1) True >>> log(E) 1 References ========== .. [1] https://en.wikipedia.org/wiki/E_%28mathematical_constant%29 """ is_real = True is_positive = True is_negative = False # XXX Forces is_negative/is_nonnegative is_irrational = True is_number = True is_algebraic = False is_transcendental = True __slots__ = [] def _latex(self, printer): return r"e" @staticmethod def __abs__(): return S.Exp1 def __int__(self): return 2 def _as_mpf_val(self, prec): return mpf_e(prec) def approximation_interval(self, number_cls): if issubclass(number_cls, Integer): return (Integer(2), Integer(3)) elif issubclass(number_cls, Rational): pass def _eval_power(self, expt): from sympy import exp return exp(expt) def _eval_rewrite_as_sin(self, **kwargs): from sympy import sin I = S.ImaginaryUnit return sin(I + S.Pi/2) - I*sin(I) def _eval_rewrite_as_cos(self, **kwargs): from sympy import cos I = S.ImaginaryUnit return cos(I) + I*cos(I + S.Pi/2) def _sage_(self): import sage.all as sage return sage.e E = S.Exp1 class Pi(with_metaclass(Singleton, NumberSymbol)): r"""The `\pi` constant. The transcendental number `\pi = 3.141592654\ldots` represents the ratio of a circle's circumference to its diameter, the area of the unit circle, the half-period of trigonometric functions, and many other things in mathematics. Pi is a singleton, and can be accessed by ``S.Pi``, or can be imported as ``pi``. Examples ======== >>> from sympy import S, pi, oo, sin, exp, integrate, Symbol >>> S.Pi pi >>> pi > 3 True >>> pi.is_irrational True >>> x = Symbol('x') >>> sin(x + 2*pi) sin(x) >>> integrate(exp(-x**2), (x, -oo, oo)) sqrt(pi) References ========== .. [1] https://en.wikipedia.org/wiki/Pi """ is_real = True is_positive = True is_negative = False is_irrational = True is_number = True is_algebraic = False is_transcendental = True __slots__ = [] def _latex(self, printer): return r"\pi" @staticmethod def __abs__(): return S.Pi def __int__(self): return 3 def _as_mpf_val(self, prec): return mpf_pi(prec) def approximation_interval(self, number_cls): if issubclass(number_cls, Integer): return (Integer(3), Integer(4)) elif issubclass(number_cls, Rational): return (Rational(223, 71), Rational(22, 7)) def _sage_(self): import sage.all as sage return sage.pi pi = S.Pi class GoldenRatio(with_metaclass(Singleton, NumberSymbol)): r"""The golden ratio, `\phi`. `\phi = \frac{1 + \sqrt{5}}{2}` is algebraic number. Two quantities are in the golden ratio if their ratio is the same as the ratio of their sum to the larger of the two quantities, i.e. their maximum. GoldenRatio is a singleton, and can be accessed by ``S.GoldenRatio``. Examples ======== >>> from sympy import S >>> S.GoldenRatio > 1 True >>> S.GoldenRatio.expand(func=True) 1/2 + sqrt(5)/2 >>> S.GoldenRatio.is_irrational True References ========== .. [1] https://en.wikipedia.org/wiki/Golden_ratio """ is_real = True is_positive = True is_negative = False is_irrational = True is_number = True is_algebraic = True is_transcendental = False __slots__ = [] def _latex(self, printer): return r"\phi" def __int__(self): return 1 def _as_mpf_val(self, prec): # XXX track down why this has to be increased rv = mlib.from_man_exp(phi_fixed(prec + 10), -prec - 10) return mpf_norm(rv, prec) def _eval_expand_func(self, **hints): from sympy import sqrt return S.Half + S.Half*sqrt(5) def approximation_interval(self, number_cls): if issubclass(number_cls, Integer): return (S.One, Rational(2)) elif issubclass(number_cls, Rational): pass def _sage_(self): import sage.all as sage return sage.golden_ratio _eval_rewrite_as_sqrt = _eval_expand_func class TribonacciConstant(with_metaclass(Singleton, NumberSymbol)): r"""The tribonacci constant. The tribonacci numbers are like the Fibonacci numbers, but instead of starting with two predetermined terms, the sequence starts with three predetermined terms and each term afterwards is the sum of the preceding three terms. The tribonacci constant is the ratio toward which adjacent tribonacci numbers tend. It is a root of the polynomial `x^3 - x^2 - x - 1 = 0`, and also satisfies the equation `x + x^{-3} = 2`. TribonacciConstant is a singleton, and can be accessed by ``S.TribonacciConstant``. Examples ======== >>> from sympy import S >>> S.TribonacciConstant > 1 True >>> S.TribonacciConstant.expand(func=True) 1/3 + (19 - 3*sqrt(33))**(1/3)/3 + (3*sqrt(33) + 19)**(1/3)/3 >>> S.TribonacciConstant.is_irrational True >>> S.TribonacciConstant.n(20) 1.8392867552141611326 References ========== .. [1] https://en.wikipedia.org/wiki/Generalizations_of_Fibonacci_numbers#Tribonacci_numbers """ is_real = True is_positive = True is_negative = False is_irrational = True is_number = True is_algebraic = True is_transcendental = False __slots__ = [] def _latex(self, printer): return r"\text{TribonacciConstant}" def __int__(self): return 2 def _eval_evalf(self, prec): rv = self._eval_expand_func(function=True)._eval_evalf(prec + 4) return Float(rv, precision=prec) def _eval_expand_func(self, **hints): from sympy import sqrt, cbrt return (1 + cbrt(19 - 3*sqrt(33)) + cbrt(19 + 3*sqrt(33))) / 3 def approximation_interval(self, number_cls): if issubclass(number_cls, Integer): return (S.One, Rational(2)) elif issubclass(number_cls, Rational): pass _eval_rewrite_as_sqrt = _eval_expand_func class EulerGamma(with_metaclass(Singleton, NumberSymbol)): r"""The Euler-Mascheroni constant. `\gamma = 0.5772157\ldots` (also called Euler's constant) is a mathematical constant recurring in analysis and number theory. It is defined as the limiting difference between the harmonic series and the natural logarithm: .. math:: \gamma = \lim\limits_{n\to\infty} \left(\sum\limits_{k=1}^n\frac{1}{k} - \ln n\right) EulerGamma is a singleton, and can be accessed by ``S.EulerGamma``. Examples ======== >>> from sympy import S >>> S.EulerGamma.is_irrational >>> S.EulerGamma > 0 True >>> S.EulerGamma > 1 False References ========== .. [1] https://en.wikipedia.org/wiki/Euler%E2%80%93Mascheroni_constant """ is_real = True is_positive = True is_negative = False is_irrational = None is_number = True __slots__ = [] def _latex(self, printer): return r"\gamma" def __int__(self): return 0 def _as_mpf_val(self, prec): # XXX track down why this has to be increased v = mlib.libhyper.euler_fixed(prec + 10) rv = mlib.from_man_exp(v, -prec - 10) return mpf_norm(rv, prec) def approximation_interval(self, number_cls): if issubclass(number_cls, Integer): return (S.Zero, S.One) elif issubclass(number_cls, Rational): return (S.Half, Rational(3, 5)) def _sage_(self): import sage.all as sage return sage.euler_gamma class Catalan(with_metaclass(Singleton, NumberSymbol)): r"""Catalan's constant. `K = 0.91596559\ldots` is given by the infinite series .. math:: K = \sum_{k=0}^{\infty} \frac{(-1)^k}{(2k+1)^2} Catalan is a singleton, and can be accessed by ``S.Catalan``. Examples ======== >>> from sympy import S >>> S.Catalan.is_irrational >>> S.Catalan > 0 True >>> S.Catalan > 1 False References ========== .. [1] https://en.wikipedia.org/wiki/Catalan%27s_constant """ is_real = True is_positive = True is_negative = False is_irrational = None is_number = True __slots__ = [] def __int__(self): return 0 def _as_mpf_val(self, prec): # XXX track down why this has to be increased v = mlib.catalan_fixed(prec + 10) rv = mlib.from_man_exp(v, -prec - 10) return mpf_norm(rv, prec) def approximation_interval(self, number_cls): if issubclass(number_cls, Integer): return (S.Zero, S.One) elif issubclass(number_cls, Rational): return (Rational(9, 10), S.One) def _sage_(self): import sage.all as sage return sage.catalan class ImaginaryUnit(with_metaclass(Singleton, AtomicExpr)): r"""The imaginary unit, `i = \sqrt{-1}`. I is a singleton, and can be accessed by ``S.I``, or can be imported as ``I``. Examples ======== >>> from sympy import I, sqrt >>> sqrt(-1) I >>> I*I -1 >>> 1/I -I References ========== .. [1] https://en.wikipedia.org/wiki/Imaginary_unit """ is_commutative = True is_imaginary = True is_finite = True is_number = True is_algebraic = True is_transcendental = False __slots__ = [] def _latex(self, printer): return printer._settings['imaginary_unit_latex'] @staticmethod def __abs__(): return S.One def _eval_evalf(self, prec): return self def _eval_conjugate(self): return -S.ImaginaryUnit def _eval_power(self, expt): """ b is I = sqrt(-1) e is symbolic object but not equal to 0, 1 I**r -> (-1)**(r/2) -> exp(r/2*Pi*I) -> sin(Pi*r/2) + cos(Pi*r/2)*I, r is decimal I**0 mod 4 -> 1 I**1 mod 4 -> I I**2 mod 4 -> -1 I**3 mod 4 -> -I """ if isinstance(expt, Number): if isinstance(expt, Integer): expt = expt.p % 4 if expt == 0: return S.One if expt == 1: return S.ImaginaryUnit if expt == 2: return -S.One return -S.ImaginaryUnit return def as_base_exp(self): return S.NegativeOne, S.Half def _sage_(self): import sage.all as sage return sage.I @property def _mpc_(self): return (Float(0)._mpf_, Float(1)._mpf_) I = S.ImaginaryUnit def sympify_fractions(f): return Rational(f.numerator, f.denominator, 1) converter[fractions.Fraction] = sympify_fractions try: if HAS_GMPY == 2: import gmpy2 as gmpy elif HAS_GMPY == 1: import gmpy else: raise ImportError def sympify_mpz(x): return Integer(long(x)) def sympify_mpq(x): return Rational(long(x.numerator), long(x.denominator)) converter[type(gmpy.mpz(1))] = sympify_mpz converter[type(gmpy.mpq(1, 2))] = sympify_mpq except ImportError: pass def sympify_mpmath(x): return Expr._from_mpmath(x, x.context.prec) converter[mpnumeric] = sympify_mpmath def sympify_mpq(x): p, q = x._mpq_ return Rational(p, q, 1) converter[type(mpmath.rational.mpq(1, 2))] = sympify_mpq def sympify_complex(a): real, imag = list(map(sympify, (a.real, a.imag))) return real + S.ImaginaryUnit*imag converter[complex] = sympify_complex from .power import Pow, integer_nthroot from .mul import Mul Mul.identity = One() from .add import Add Add.identity = Zero() def _register_classes(): numbers.Number.register(Number) numbers.Real.register(Float) numbers.Rational.register(Rational) numbers.Rational.register(Integer) _register_classes()

160c4c515b0bc611215af78fb820eade24d1dcc251d2d94c473daf81b420d4d7

from __future__ import print_function, division from sympy.core.sympify import _sympify, sympify from sympy.core.basic import Basic from sympy.core.cache import cacheit from sympy.core.compatibility import ordered, range from sympy.core.logic import fuzzy_and from sympy.core.evaluate import global_evaluate from sympy.utilities.iterables import sift class AssocOp(Basic): """ Associative operations, can separate noncommutative and commutative parts. (a op b) op c == a op (b op c) == a op b op c. Base class for Add and Mul. This is an abstract base class, concrete derived classes must define the attribute `identity`. """ # for performance reason, we don't let is_commutative go to assumptions, # and keep it right here __slots__ = ['is_commutative'] @cacheit def __new__(cls, *args, **options): from sympy import Order args = list(map(_sympify, args)) args = [a for a in args if a is not cls.identity] evaluate = options.get('evaluate') if evaluate is None: evaluate = global_evaluate[0] if not evaluate: obj = cls._from_args(args) obj = cls._exec_constructor_postprocessors(obj) return obj if len(args) == 0: return cls.identity if len(args) == 1: return args[0] c_part, nc_part, order_symbols = cls.flatten(args) is_commutative = not nc_part obj = cls._from_args(c_part + nc_part, is_commutative) obj = cls._exec_constructor_postprocessors(obj) if order_symbols is not None: return Order(obj, *order_symbols) return obj @classmethod def _from_args(cls, args, is_commutative=None): """Create new instance with already-processed args. If the args are not in canonical order, then a non-canonical result will be returned, so use with caution. The order of args may change if the sign of the args is changed.""" if len(args) == 0: return cls.identity elif len(args) == 1: return args[0] obj = super(AssocOp, cls).__new__(cls, *args) if is_commutative is None: is_commutative = fuzzy_and(a.is_commutative for a in args) obj.is_commutative = is_commutative return obj def _new_rawargs(self, *args, **kwargs): """Create new instance of own class with args exactly as provided by caller but returning the self class identity if args is empty. This is handy when we want to optimize things, e.g. >>> from sympy import Mul, S >>> from sympy.abc import x, y >>> e = Mul(3, x, y) >>> e.args (3, x, y) >>> Mul(*e.args[1:]) x*y >>> e._new_rawargs(*e.args[1:]) # the same as above, but faster x*y Note: use this with caution. There is no checking of arguments at all. This is best used when you are rebuilding an Add or Mul after simply removing one or more args. If, for example, modifications, result in extra 1s being inserted (as when collecting an expression's numerators and denominators) they will not show up in the result but a Mul will be returned nonetheless: >>> m = (x*y)._new_rawargs(S.One, x); m x >>> m == x False >>> m.is_Mul True Another issue to be aware of is that the commutativity of the result is based on the commutativity of self. If you are rebuilding the terms that came from a commutative object then there will be no problem, but if self was non-commutative then what you are rebuilding may now be commutative. Although this routine tries to do as little as possible with the input, getting the commutativity right is important, so this level of safety is enforced: commutativity will always be recomputed if self is non-commutative and kwarg `reeval=False` has not been passed. """ if kwargs.pop('reeval', True) and self.is_commutative is False: is_commutative = None else: is_commutative = self.is_commutative return self._from_args(args, is_commutative) @classmethod def flatten(cls, seq): """Return seq so that none of the elements are of type `cls`. This is the vanilla routine that will be used if a class derived from AssocOp does not define its own flatten routine.""" # apply associativity, no commutativity property is used new_seq = [] while seq: o = seq.pop() if o.__class__ is cls: # classes must match exactly seq.extend(o.args) else: new_seq.append(o) new_seq.reverse() # c_part, nc_part, order_symbols return [], new_seq, None def _matches_commutative(self, expr, repl_dict={}, old=False): """ Matches Add/Mul "pattern" to an expression "expr". repl_dict ... a dictionary of (wild: expression) pairs, that get returned with the results This function is the main workhorse for Add/Mul. For instance: >>> from sympy import symbols, Wild, sin >>> a = Wild("a") >>> b = Wild("b") >>> c = Wild("c") >>> x, y, z = symbols("x y z") >>> (a+sin(b)*c)._matches_commutative(x+sin(y)*z) {a_: x, b_: y, c_: z} In the example above, "a+sin(b)*c" is the pattern, and "x+sin(y)*z" is the expression. The repl_dict contains parts that were already matched. For example here: >>> (x+sin(b)*c)._matches_commutative(x+sin(y)*z, repl_dict={a: x}) {a_: x, b_: y, c_: z} the only function of the repl_dict is to return it in the result, e.g. if you omit it: >>> (x+sin(b)*c)._matches_commutative(x+sin(y)*z) {b_: y, c_: z} the "a: x" is not returned in the result, but otherwise it is equivalent. """ # make sure expr is Expr if pattern is Expr from .expr import Add, Expr from sympy import Mul if isinstance(self, Expr) and not isinstance(expr, Expr): return None # handle simple patterns if self == expr: return repl_dict d = self._matches_simple(expr, repl_dict) if d is not None: return d # eliminate exact part from pattern: (2+a+w1+w2).matches(expr) -> (w1+w2).matches(expr-a-2) from .function import WildFunction from .symbol import Wild wild_part, exact_part = sift(self.args, lambda p: p.has(Wild, WildFunction) and not expr.has(p), binary=True) if not exact_part: wild_part = list(ordered(wild_part)) else: exact = self._new_rawargs(*exact_part) free = expr.free_symbols if free and (exact.free_symbols - free): # there are symbols in the exact part that are not # in the expr; but if there are no free symbols, let # the matching continue return None newexpr = self._combine_inverse(expr, exact) if not old and (expr.is_Add or expr.is_Mul): if newexpr.count_ops() > expr.count_ops(): return None newpattern = self._new_rawargs(*wild_part) return newpattern.matches(newexpr, repl_dict) # now to real work ;) i = 0 saw = set() while expr not in saw: saw.add(expr) expr_list = (self.identity,) + tuple(ordered(self.make_args(expr))) for last_op in reversed(expr_list): for w in reversed(wild_part): d1 = w.matches(last_op, repl_dict) if d1 is not None: d2 = self.xreplace(d1).matches(expr, d1) if d2 is not None: return d2 if i == 0: if self.is_Mul: # make e**i look like Mul if expr.is_Pow and expr.exp.is_Integer: if expr.exp > 0: expr = Mul(*[expr.base, expr.base**(expr.exp - 1)], evaluate=False) else: expr = Mul(*[1/expr.base, expr.base**(expr.exp + 1)], evaluate=False) i += 1 continue elif self.is_Add: # make i*e look like Add c, e = expr.as_coeff_Mul() if abs(c) > 1: if c > 0: expr = Add(*[e, (c - 1)*e], evaluate=False) else: expr = Add(*[-e, (c + 1)*e], evaluate=False) i += 1 continue # try collection on non-Wild symbols from sympy.simplify.radsimp import collect was = expr did = set() for w in reversed(wild_part): c, w = w.as_coeff_mul(Wild) free = c.free_symbols - did if free: did.update(free) expr = collect(expr, free) if expr != was: i += 0 continue break # if we didn't continue, there is nothing more to do return def _has_matcher(self): """Helper for .has()""" def _ncsplit(expr): # this is not the same as args_cnc because here # we don't assume expr is a Mul -- hence deal with args -- # and always return a set. cpart, ncpart = sift(expr.args, lambda arg: arg.is_commutative is True, binary=True) return set(cpart), ncpart c, nc = _ncsplit(self) cls = self.__class__ def is_in(expr): if expr == self: return True elif not isinstance(expr, Basic): return False elif isinstance(expr, cls): _c, _nc = _ncsplit(expr) if (c & _c) == c: if not nc: return True elif len(nc) <= len(_nc): for i in range(len(_nc) - len(nc) + 1): if _nc[i:i + len(nc)] == nc: return True return False return is_in def _eval_evalf(self, prec): """ Evaluate the parts of self that are numbers; if the whole thing was a number with no functions it would have been evaluated, but it wasn't so we must judiciously extract the numbers and reconstruct the object. This is *not* simply replacing numbers with evaluated numbers. Numbers should be handled in the largest pure-number expression as possible. So the code below separates ``self`` into number and non-number parts and evaluates the number parts and walks the args of the non-number part recursively (doing the same thing). """ from .add import Add from .mul import Mul from .symbol import Symbol from .function import AppliedUndef if isinstance(self, (Mul, Add)): x, tail = self.as_independent(Symbol, AppliedUndef) # if x is an AssocOp Function then the _evalf below will # call _eval_evalf (here) so we must break the recursion if not (tail is self.identity or isinstance(x, AssocOp) and x.is_Function or x is self.identity and isinstance(tail, AssocOp)): # here, we have a number so we just call to _evalf with prec; # prec is not the same as n, it is the binary precision so # that's why we don't call to evalf. x = x._evalf(prec) if x is not self.identity else self.identity args = [] tail_args = tuple(self.func.make_args(tail)) for a in tail_args: # here we call to _eval_evalf since we don't know what we # are dealing with and all other _eval_evalf routines should # be doing the same thing (i.e. taking binary prec and # finding the evalf-able args) newa = a._eval_evalf(prec) if newa is None: args.append(a) else: args.append(newa) return self.func(x, *args) # this is the same as above, but there were no pure-number args to # deal with args = [] for a in self.args: newa = a._eval_evalf(prec) if newa is None: args.append(a) else: args.append(newa) return self.func(*args) @classmethod def make_args(cls, expr): """ Return a sequence of elements `args` such that cls(*args) == expr >>> from sympy import Symbol, Mul, Add >>> x, y = map(Symbol, 'xy') >>> Mul.make_args(x*y) (x, y) >>> Add.make_args(x*y) (x*y,) >>> set(Add.make_args(x*y + y)) == set([y, x*y]) True """ if isinstance(expr, cls): return expr.args else: return (sympify(expr),) class ShortCircuit(Exception): pass class LatticeOp(AssocOp): """ Join/meet operations of an algebraic lattice[1]. These binary operations are associative (op(op(a, b), c) = op(a, op(b, c))), commutative (op(a, b) = op(b, a)) and idempotent (op(a, a) = op(a) = a). Common examples are AND, OR, Union, Intersection, max or min. They have an identity element (op(identity, a) = a) and an absorbing element conventionally called zero (op(zero, a) = zero). This is an abstract base class, concrete derived classes must declare attributes zero and identity. All defining properties are then respected. >>> from sympy import Integer >>> from sympy.core.operations import LatticeOp >>> class my_join(LatticeOp): ... zero = Integer(0) ... identity = Integer(1) >>> my_join(2, 3) == my_join(3, 2) True >>> my_join(2, my_join(3, 4)) == my_join(2, 3, 4) True >>> my_join(0, 1, 4, 2, 3, 4) 0 >>> my_join(1, 2) 2 References: [1] - https://en.wikipedia.org/wiki/Lattice_%28order%29 """ is_commutative = True def __new__(cls, *args, **options): args = (_sympify(arg) for arg in args) try: # /!\ args is a generator and _new_args_filter # must be careful to handle as such; this # is done so short-circuiting can be done # without having to sympify all values _args = frozenset(cls._new_args_filter(args)) except ShortCircuit: return sympify(cls.zero) if not _args: return sympify(cls.identity) elif len(_args) == 1: return set(_args).pop() else: # XXX in almost every other case for __new__, *_args is # passed along, but the expectation here is for _args obj = super(AssocOp, cls).__new__(cls, _args) obj._argset = _args return obj @classmethod def _new_args_filter(cls, arg_sequence, call_cls=None): """Generator filtering args""" ncls = call_cls or cls for arg in arg_sequence: if arg == ncls.zero: raise ShortCircuit(arg) elif arg == ncls.identity: continue elif arg.func == ncls: for x in arg.args: yield x else: yield arg @classmethod def make_args(cls, expr): """ Return a set of args such that cls(*arg_set) == expr. """ if isinstance(expr, cls): return expr._argset else: return frozenset([sympify(expr)]) @property @cacheit def args(self): return tuple(ordered(self._argset)) @staticmethod def _compare_pretty(a, b): return (str(a) > str(b)) - (str(a) < str(b))

11280689b9f71530152596462229d879840009aa8624459a2b161bb8063c9b49

from __future__ import print_function, division from sympy.core.assumptions import StdFactKB, _assume_defined from sympy.core.compatibility import (string_types, range, is_sequence, ordered) from .basic import Basic from .sympify import sympify from .singleton import S from .expr import Expr, AtomicExpr from .cache import cacheit from .function import FunctionClass from sympy.core.logic import fuzzy_bool from sympy.logic.boolalg import Boolean from sympy.utilities.iterables import cartes, sift from sympy.core.containers import Tuple import string import re as _re import random def _filter_assumptions(kwargs): """Split the given dict into assumptions and non-assumptions. Keys are taken as assumptions if they correspond to an entry in ``_assume_defined``. """ assumptions, nonassumptions = map(dict, sift(kwargs.items(), lambda i: i[0] in _assume_defined, binary=True)) Symbol._sanitize(assumptions) return assumptions, nonassumptions def _symbol(s, matching_symbol=None, **assumptions): """Return s if s is a Symbol, else if s is a string, return either the matching_symbol if the names are the same or else a new symbol with the same assumptions as the matching symbol (or the assumptions as provided). Examples ======== >>> from sympy import Symbol, Dummy >>> from sympy.core.symbol import _symbol >>> _symbol('y') y >>> _.is_real is None True >>> _symbol('y', real=True).is_real True >>> x = Symbol('x') >>> _symbol(x, real=True) x >>> _.is_real is None # ignore attribute if s is a Symbol True Below, the variable sym has the name 'foo': >>> sym = Symbol('foo', real=True) Since 'x' is not the same as sym's name, a new symbol is created: >>> _symbol('x', sym).name 'x' It will acquire any assumptions give: >>> _symbol('x', sym, real=False).is_real False Since 'foo' is the same as sym's name, sym is returned >>> _symbol('foo', sym) foo Any assumptions given are ignored: >>> _symbol('foo', sym, real=False).is_real True NB: the symbol here may not be the same as a symbol with the same name defined elsewhere as a result of different assumptions. See Also ======== sympy.core.symbol.Symbol """ if isinstance(s, string_types): if matching_symbol and matching_symbol.name == s: return matching_symbol return Symbol(s, **assumptions) elif isinstance(s, Symbol): return s else: raise ValueError('symbol must be string for symbol name or Symbol') def _uniquely_named_symbol(xname, exprs=(), compare=str, modify=None, **assumptions): """Return a symbol which, when printed, will have a name unique from any other already in the expressions given. The name is made unique by prepending underscores (default) but this can be customized with the keyword 'modify'. Parameters ========== xname : a string or a Symbol (when symbol xname <- str(xname)) compare : a single arg function that takes a symbol and returns a string to be compared with xname (the default is the str function which indicates how the name will look when it is printed, e.g. this includes underscores that appear on Dummy symbols) modify : a single arg function that changes its string argument in some way (the default is to prepend underscores) Examples ======== >>> from sympy.core.symbol import _uniquely_named_symbol as usym, Dummy >>> from sympy.abc import x >>> usym('x', x) _x """ default = None if is_sequence(xname): xname, default = xname x = str(xname) if not exprs: return _symbol(x, default, **assumptions) if not is_sequence(exprs): exprs = [exprs] syms = set().union(*[e.free_symbols for e in exprs]) if modify is None: modify = lambda s: '_' + s while any(x == compare(s) for s in syms): x = modify(x) return _symbol(x, default, **assumptions) class Symbol(AtomicExpr, Boolean): """ Assumptions: commutative = True You can override the default assumptions in the constructor: >>> from sympy import symbols >>> A,B = symbols('A,B', commutative = False) >>> bool(A*B != B*A) True >>> bool(A*B*2 == 2*A*B) == True # multiplication by scalars is commutative True """ is_comparable = False __slots__ = ['name'] is_Symbol = True is_symbol = True @property def _diff_wrt(self): """Allow derivatives wrt Symbols. Examples ======== >>> from sympy import Symbol >>> x = Symbol('x') >>> x._diff_wrt True """ return True @staticmethod def _sanitize(assumptions, obj=None): """Remove None, covert values to bool, check commutativity *in place*. """ # be strict about commutativity: cannot be None is_commutative = fuzzy_bool(assumptions.get('commutative', True)) if is_commutative is None: whose = '%s ' % obj.__name__ if obj else '' raise ValueError( '%scommutativity must be True or False.' % whose) # sanitize other assumptions so 1 -> True and 0 -> False for key in list(assumptions.keys()): from collections import defaultdict from sympy.utilities.exceptions import SymPyDeprecationWarning keymap = defaultdict(lambda: None) keymap.update({'bounded': 'finite', 'unbounded': 'infinite', 'infinitesimal': 'zero'}) if keymap[key]: SymPyDeprecationWarning( feature="%s assumption" % key, useinstead="%s" % keymap[key], issue=8071, deprecated_since_version="0.7.6").warn() assumptions[keymap[key]] = assumptions[key] assumptions.pop(key) key = keymap[key] v = assumptions[key] if v is None: assumptions.pop(key) continue assumptions[key] = bool(v) def _merge(self, assumptions): base = self.assumptions0 for k in set(assumptions) & set(base): if assumptions[k] != base[k]: raise ValueError(filldedent(''' non-matching assumptions for %s: existing value is %s and new value is %s''' % ( k, base[k], assumptions[k]))) base.update(assumptions) return base def __new__(cls, name, **assumptions): """Symbols are identified by name and assumptions:: >>> from sympy import Symbol >>> Symbol("x") == Symbol("x") True >>> Symbol("x", real=True) == Symbol("x", real=False) False """ cls._sanitize(assumptions, cls) return Symbol.__xnew_cached_(cls, name, **assumptions) def __new_stage2__(cls, name, **assumptions): if not isinstance(name, string_types): raise TypeError("name should be a string, not %s" % repr(type(name))) obj = Expr.__new__(cls) obj.name = name # TODO: Issue #8873: Forcing the commutative assumption here means # later code such as ``srepr()`` cannot tell whether the user # specified ``commutative=True`` or omitted it. To workaround this, # we keep a copy of the assumptions dict, then create the StdFactKB, # and finally overwrite its ``._generator`` with the dict copy. This # is a bit of a hack because we assume StdFactKB merely copies the # given dict as ``._generator``, but future modification might, e.g., # compute a minimal equivalent assumption set. tmp_asm_copy = assumptions.copy() # be strict about commutativity is_commutative = fuzzy_bool(assumptions.get('commutative', True)) assumptions['commutative'] = is_commutative obj._assumptions = StdFactKB(assumptions) obj._assumptions._generator = tmp_asm_copy # Issue #8873 return obj __xnew__ = staticmethod( __new_stage2__) # never cached (e.g. dummy) __xnew_cached_ = staticmethod( cacheit(__new_stage2__)) # symbols are always cached def __getnewargs__(self): return (self.name,) def __getstate__(self): return {'_assumptions': self._assumptions} def _hashable_content(self): # Note: user-specified assumptions not hashed, just derived ones return (self.name,) + tuple(sorted(self.assumptions0.items())) def _eval_subs(self, old, new): from sympy.core.power import Pow if old.is_Pow: return Pow(self, S.One, evaluate=False)._eval_subs(old, new) @property def assumptions0(self): return dict((key, value) for key, value in self._assumptions.items() if value is not None) @cacheit def sort_key(self, order=None): return self.class_key(), (1, (str(self),)), S.One.sort_key(), S.One def as_dummy(self): return Dummy(self.name) def as_real_imag(self, deep=True, **hints): from sympy import im, re if hints.get('ignore') == self: return None else: return (re(self), im(self)) def _sage_(self): import sage.all as sage return sage.var(self.name) def is_constant(self, *wrt, **flags): if not wrt: return False return not self in wrt @property def free_symbols(self): return {self} binary_symbols = free_symbols # in this case, not always def as_set(self): return S.UniversalSet class Dummy(Symbol): """Dummy symbols are each unique, even if they have the same name: >>> from sympy import Dummy >>> Dummy("x") == Dummy("x") False If a name is not supplied then a string value of an internal count will be used. This is useful when a temporary variable is needed and the name of the variable used in the expression is not important. >>> Dummy() #doctest: +SKIP _Dummy_10 """ # In the rare event that a Dummy object needs to be recreated, both the # `name` and `dummy_index` should be passed. This is used by `srepr` for # example: # >>> d1 = Dummy() # >>> d2 = eval(srepr(d1)) # >>> d2 == d1 # True # # If a new session is started between `srepr` and `eval`, there is a very # small chance that `d2` will be equal to a previously-created Dummy. _count = 0 _prng = random.Random() _base_dummy_index = _prng.randint(10**6, 9*10**6) __slots__ = ['dummy_index'] is_Dummy = True def __new__(cls, name=None, dummy_index=None, **assumptions): if dummy_index is not None: assert name is not None, "If you specify a dummy_index, you must also provide a name" if name is None: name = "Dummy_" + str(Dummy._count) if dummy_index is None: dummy_index = Dummy._base_dummy_index + Dummy._count Dummy._count += 1 cls._sanitize(assumptions, cls) obj = Symbol.__xnew__(cls, name, **assumptions) obj.dummy_index = dummy_index return obj def __getstate__(self): return {'_assumptions': self._assumptions, 'dummy_index': self.dummy_index} @cacheit def sort_key(self, order=None): return self.class_key(), ( 2, (str(self), self.dummy_index)), S.One.sort_key(), S.One def _hashable_content(self): return Symbol._hashable_content(self) + (self.dummy_index,) class Wild(Symbol): """ A Wild symbol matches anything, or anything without whatever is explicitly excluded. Parameters ========== name : str Name of the Wild instance. exclude : iterable, optional Instances in ``exclude`` will not be matched. properties : iterable of functions, optional Functions, each taking an expressions as input and returns a ``bool``. All functions in ``properties`` need to return ``True`` in order for the Wild instance to match the expression. Examples ======== >>> from sympy import Wild, WildFunction, cos, pi >>> from sympy.abc import x, y, z >>> a = Wild('a') >>> x.match(a) {a_: x} >>> pi.match(a) {a_: pi} >>> (3*x**2).match(a*x) {a_: 3*x} >>> cos(x).match(a) {a_: cos(x)} >>> b = Wild('b', exclude=[x]) >>> (3*x**2).match(b*x) >>> b.match(a) {a_: b_} >>> A = WildFunction('A') >>> A.match(a) {a_: A_} Tips ==== When using Wild, be sure to use the exclude keyword to make the pattern more precise. Without the exclude pattern, you may get matches that are technically correct, but not what you wanted. For example, using the above without exclude: >>> from sympy import symbols >>> a, b = symbols('a b', cls=Wild) >>> (2 + 3*y).match(a*x + b*y) {a_: 2/x, b_: 3} This is technically correct, because (2/x)*x + 3*y == 2 + 3*y, but you probably wanted it to not match at all. The issue is that you really didn't want a and b to include x and y, and the exclude parameter lets you specify exactly this. With the exclude parameter, the pattern will not match. >>> a = Wild('a', exclude=[x, y]) >>> b = Wild('b', exclude=[x, y]) >>> (2 + 3*y).match(a*x + b*y) Exclude also helps remove ambiguity from matches. >>> E = 2*x**3*y*z >>> a, b = symbols('a b', cls=Wild) >>> E.match(a*b) {a_: 2*y*z, b_: x**3} >>> a = Wild('a', exclude=[x, y]) >>> E.match(a*b) {a_: z, b_: 2*x**3*y} >>> a = Wild('a', exclude=[x, y, z]) >>> E.match(a*b) {a_: 2, b_: x**3*y*z} Wild also accepts a ``properties`` parameter: >>> a = Wild('a', properties=[lambda k: k.is_Integer]) >>> E.match(a*b) {a_: 2, b_: x**3*y*z} """ is_Wild = True __slots__ = ['exclude', 'properties'] def __new__(cls, name, exclude=(), properties=(), **assumptions): exclude = tuple([sympify(x) for x in exclude]) properties = tuple(properties) cls._sanitize(assumptions, cls) return Wild.__xnew__(cls, name, exclude, properties, **assumptions) def __getnewargs__(self): return (self.name, self.exclude, self.properties) @staticmethod @cacheit def __xnew__(cls, name, exclude, properties, **assumptions): obj = Symbol.__xnew__(cls, name, **assumptions) obj.exclude = exclude obj.properties = properties return obj def _hashable_content(self): return super(Wild, self)._hashable_content() + (self.exclude, self.properties) # TODO add check against another Wild def matches(self, expr, repl_dict={}, old=False): if any(expr.has(x) for x in self.exclude): return None if any(not f(expr) for f in self.properties): return None repl_dict = repl_dict.copy() repl_dict[self] = expr return repl_dict _range = _re.compile('([0-9]*:[0-9]+|[a-zA-Z]?:[a-zA-Z])') def symbols(names, **args): r""" Transform strings into instances of :class:`Symbol` class. :func:`symbols` function returns a sequence of symbols with names taken from ``names`` argument, which can be a comma or whitespace delimited string, or a sequence of strings:: >>> from sympy import symbols, Function >>> x, y, z = symbols('x,y,z') >>> a, b, c = symbols('a b c') The type of output is dependent on the properties of input arguments:: >>> symbols('x') x >>> symbols('x,') (x,) >>> symbols('x,y') (x, y) >>> symbols(('a', 'b', 'c')) (a, b, c) >>> symbols(['a', 'b', 'c']) [a, b, c] >>> symbols({'a', 'b', 'c'}) {a, b, c} If an iterable container is needed for a single symbol, set the ``seq`` argument to ``True`` or terminate the symbol name with a comma:: >>> symbols('x', seq=True) (x,) To reduce typing, range syntax is supported to create indexed symbols. Ranges are indicated by a colon and the type of range is determined by the character to the right of the colon. If the character is a digit then all contiguous digits to the left are taken as the nonnegative starting value (or 0 if there is no digit left of the colon) and all contiguous digits to the right are taken as 1 greater than the ending value:: >>> symbols('x:10') (x0, x1, x2, x3, x4, x5, x6, x7, x8, x9) >>> symbols('x5:10') (x5, x6, x7, x8, x9) >>> symbols('x5(:2)') (x50, x51) >>> symbols('x5:10,y:5') (x5, x6, x7, x8, x9, y0, y1, y2, y3, y4) >>> symbols(('x5:10', 'y:5')) ((x5, x6, x7, x8, x9), (y0, y1, y2, y3, y4)) If the character to the right of the colon is a letter, then the single letter to the left (or 'a' if there is none) is taken as the start and all characters in the lexicographic range *through* the letter to the right are used as the range:: >>> symbols('x:z') (x, y, z) >>> symbols('x:c') # null range () >>> symbols('x(:c)') (xa, xb, xc) >>> symbols(':c') (a, b, c) >>> symbols('a:d, x:z') (a, b, c, d, x, y, z) >>> symbols(('a:d', 'x:z')) ((a, b, c, d), (x, y, z)) Multiple ranges are supported; contiguous numerical ranges should be separated by parentheses to disambiguate the ending number of one range from the starting number of the next:: >>> symbols('x:2(1:3)') (x01, x02, x11, x12) >>> symbols(':3:2') # parsing is from left to right (00, 01, 10, 11, 20, 21) Only one pair of parentheses surrounding ranges are removed, so to include parentheses around ranges, double them. And to include spaces, commas, or colons, escape them with a backslash:: >>> symbols('x((a:b))') (x(a), x(b)) >>> symbols(r'x(:1\,:2)') # or r'x((:1)\,(:2))' (x(0,0), x(0,1)) All newly created symbols have assumptions set according to ``args``:: >>> a = symbols('a', integer=True) >>> a.is_integer True >>> x, y, z = symbols('x,y,z', real=True) >>> x.is_real and y.is_real and z.is_real True Despite its name, :func:`symbols` can create symbol-like objects like instances of Function or Wild classes. To achieve this, set ``cls`` keyword argument to the desired type:: >>> symbols('f,g,h', cls=Function) (f, g, h) >>> type(_[0]) <class 'sympy.core.function.UndefinedFunction'> """ result = [] if isinstance(names, string_types): marker = 0 literals = [r'\,', r'\:', r'\ '] for i in range(len(literals)): lit = literals.pop(0) if lit in names: while chr(marker) in names: marker += 1 lit_char = chr(marker) marker += 1 names = names.replace(lit, lit_char) literals.append((lit_char, lit[1:])) def literal(s): if literals: for c, l in literals: s = s.replace(c, l) return s names = names.strip() as_seq = names.endswith(',') if as_seq: names = names[:-1].rstrip() if not names: raise ValueError('no symbols given') # split on commas names = [n.strip() for n in names.split(',')] if not all(n for n in names): raise ValueError('missing symbol between commas') # split on spaces for i in range(len(names) - 1, -1, -1): names[i: i + 1] = names[i].split() cls = args.pop('cls', Symbol) seq = args.pop('seq', as_seq) for name in names: if not name: raise ValueError('missing symbol') if ':' not in name: symbol = cls(literal(name), **args) result.append(symbol) continue split = _range.split(name) # remove 1 layer of bounding parentheses around ranges for i in range(len(split) - 1): if i and ':' in split[i] and split[i] != ':' and \ split[i - 1].endswith('(') and \ split[i + 1].startswith(')'): split[i - 1] = split[i - 1][:-1] split[i + 1] = split[i + 1][1:] for i, s in enumerate(split): if ':' in s: if s[-1].endswith(':'): raise ValueError('missing end range') a, b = s.split(':') if b[-1] in string.digits: a = 0 if not a else int(a) b = int(b) split[i] = [str(c) for c in range(a, b)] else: a = a or 'a' split[i] = [string.ascii_letters[c] for c in range( string.ascii_letters.index(a), string.ascii_letters.index(b) + 1)] # inclusive if not split[i]: break else: split[i] = [s] else: seq = True if len(split) == 1: names = split[0] else: names = [''.join(s) for s in cartes(*split)] if literals: result.extend([cls(literal(s), **args) for s in names]) else: result.extend([cls(s, **args) for s in names]) if not seq and len(result) <= 1: if not result: return () return result[0] return tuple(result) else: for name in names: result.append(symbols(name, **args)) return type(names)(result) def var(names, **args): """ Create symbols and inject them into the global namespace. This calls :func:`symbols` with the same arguments and puts the results into the *global* namespace. It's recommended not to use :func:`var` in library code, where :func:`symbols` has to be used:: Examples ======== >>> from sympy import var >>> var('x') x >>> x x >>> var('a,ab,abc') (a, ab, abc) >>> abc abc >>> var('x,y', real=True) (x, y) >>> x.is_real and y.is_real True See :func:`symbol` documentation for more details on what kinds of arguments can be passed to :func:`var`. """ def traverse(symbols, frame): """Recursively inject symbols to the global namespace. """ for symbol in symbols: if isinstance(symbol, Basic): frame.f_globals[symbol.name] = symbol elif isinstance(symbol, FunctionClass): frame.f_globals[symbol.__name__] = symbol else: traverse(symbol, frame) from inspect import currentframe frame = currentframe().f_back try: syms = symbols(names, **args) if syms is not None: if isinstance(syms, Basic): frame.f_globals[syms.name] = syms elif isinstance(syms, FunctionClass): frame.f_globals[syms.__name__] = syms else: traverse(syms, frame) finally: del frame # break cyclic dependencies as stated in inspect docs return syms def disambiguate(*iter): """ Return a Tuple containing the passed expressions with symbols that appear the same when printed replaced with numerically subscripted symbols, and all Dummy symbols replaced with Symbols. Parameters ========== iter: list of symbols or expressions. Examples ======== >>> from sympy.core.symbol import disambiguate >>> from sympy import Dummy, Symbol, Tuple >>> from sympy.abc import y >>> tup = Symbol('_x'), Dummy('x'), Dummy('x') >>> disambiguate(*tup) (x_2, x, x_1) >>> eqs = Tuple(Symbol('x')/y, Dummy('x')/y) >>> disambiguate(*eqs) (x_1/y, x/y) >>> ix = Symbol('x', integer=True) >>> vx = Symbol('x') >>> disambiguate(vx + ix) (x + x_1,) To make your own mapping of symbols to use, pass only the free symbols of the expressions and create a dictionary: >>> free = eqs.free_symbols >>> mapping = dict(zip(free, disambiguate(*free))) >>> eqs.xreplace(mapping) (x_1/y, x/y) """ new_iter = Tuple(*iter) key = lambda x:tuple(sorted(x.assumptions0.items())) syms = ordered(new_iter.free_symbols, keys=key) mapping = {} for s in syms: mapping.setdefault(str(s).lstrip('_'), []).append(s) reps = {} for k in mapping: # the first or only symbol doesn't get subscripted but make # sure that it's a Symbol, not a Dummy mapk0 = Symbol("%s" % (k), **mapping[k][0].assumptions0) if mapping[k][0] != mapk0: reps[mapping[k][0]] = mapk0 # the others get subscripts (and are made into Symbols) skip = 0 for i in range(1, len(mapping[k])): while True: name = "%s_%i" % (k, i + skip) if name not in mapping: break skip += 1 ki = mapping[k][i] reps[ki] = Symbol(name, **ki.assumptions0) return new_iter.xreplace(reps)

d036712b6cc2a1e207b99eb1f881bff14cc60c1f5dd360d6bfe6d3e85b2ec0a1

from __future__ import print_function, division from collections import defaultdict from functools import cmp_to_key import operator from .sympify import sympify from .basic import Basic from .singleton import S from .operations import AssocOp from .cache import cacheit from .logic import fuzzy_not, _fuzzy_group from .compatibility import reduce, range from .expr import Expr from .evaluate import global_distribute # internal marker to indicate: # "there are still non-commutative objects -- don't forget to process them" class NC_Marker: is_Order = False is_Mul = False is_Number = False is_Poly = False is_commutative = False # Key for sorting commutative args in canonical order _args_sortkey = cmp_to_key(Basic.compare) def _mulsort(args): # in-place sorting of args args.sort(key=_args_sortkey) def _unevaluated_Mul(*args): """Return a well-formed unevaluated Mul: Numbers are collected and put in slot 0, any arguments that are Muls will be flattened, and args are sorted. Use this when args have changed but you still want to return an unevaluated Mul. Examples ======== >>> from sympy.core.mul import _unevaluated_Mul as uMul >>> from sympy import S, sqrt, Mul >>> from sympy.abc import x >>> a = uMul(*[S(3.0), x, S(2)]) >>> a.args[0] 6.00000000000000 >>> a.args[1] x Two unevaluated Muls with the same arguments will always compare as equal during testing: >>> m = uMul(sqrt(2), sqrt(3)) >>> m == uMul(sqrt(3), sqrt(2)) True >>> u = Mul(sqrt(3), sqrt(2), evaluate=False) >>> m == uMul(u) True >>> m == Mul(*m.args) False """ args = list(args) newargs = [] ncargs = [] co = S.One while args: a = args.pop() if a.is_Mul: c, nc = a.args_cnc() args.extend(c) if nc: ncargs.append(Mul._from_args(nc)) elif a.is_Number: co *= a else: newargs.append(a) _mulsort(newargs) if co is not S.One: newargs.insert(0, co) if ncargs: newargs.append(Mul._from_args(ncargs)) return Mul._from_args(newargs) class Mul(Expr, AssocOp): __slots__ = [] is_Mul = True def __neg__(self): c, args = self.as_coeff_mul() c = -c if c is not S.One: if args[0].is_Number: args = list(args) if c is S.NegativeOne: args[0] = -args[0] else: args[0] *= c else: args = (c,) + args return self._from_args(args, self.is_commutative) @classmethod def flatten(cls, seq): """Return commutative, noncommutative and order arguments by combining related terms. Notes ===== * In an expression like ``a*b*c``, python process this through sympy as ``Mul(Mul(a, b), c)``. This can have undesirable consequences. - Sometimes terms are not combined as one would like: {c.f. https://github.com/sympy/sympy/issues/4596} >>> from sympy import Mul, sqrt >>> from sympy.abc import x, y, z >>> 2*(x + 1) # this is the 2-arg Mul behavior 2*x + 2 >>> y*(x + 1)*2 2*y*(x + 1) >>> 2*(x + 1)*y # 2-arg result will be obtained first y*(2*x + 2) >>> Mul(2, x + 1, y) # all 3 args simultaneously processed 2*y*(x + 1) >>> 2*((x + 1)*y) # parentheses can control this behavior 2*y*(x + 1) Powers with compound bases may not find a single base to combine with unless all arguments are processed at once. Post-processing may be necessary in such cases. {c.f. https://github.com/sympy/sympy/issues/5728} >>> a = sqrt(x*sqrt(y)) >>> a**3 (x*sqrt(y))**(3/2) >>> Mul(a,a,a) (x*sqrt(y))**(3/2) >>> a*a*a x*sqrt(y)*sqrt(x*sqrt(y)) >>> _.subs(a.base, z).subs(z, a.base) (x*sqrt(y))**(3/2) - If more than two terms are being multiplied then all the previous terms will be re-processed for each new argument. So if each of ``a``, ``b`` and ``c`` were :class:`Mul` expression, then ``a*b*c`` (or building up the product with ``*=``) will process all the arguments of ``a`` and ``b`` twice: once when ``a*b`` is computed and again when ``c`` is multiplied. Using ``Mul(a, b, c)`` will process all arguments once. * The results of Mul are cached according to arguments, so flatten will only be called once for ``Mul(a, b, c)``. If you can structure a calculation so the arguments are most likely to be repeats then this can save time in computing the answer. For example, say you had a Mul, M, that you wished to divide by ``d[i]`` and multiply by ``n[i]`` and you suspect there are many repeats in ``n``. It would be better to compute ``M*n[i]/d[i]`` rather than ``M/d[i]*n[i]`` since every time n[i] is a repeat, the product, ``M*n[i]`` will be returned without flattening -- the cached value will be returned. If you divide by the ``d[i]`` first (and those are more unique than the ``n[i]``) then that will create a new Mul, ``M/d[i]`` the args of which will be traversed again when it is multiplied by ``n[i]``. {c.f. https://github.com/sympy/sympy/issues/5706} This consideration is moot if the cache is turned off. NB -- The validity of the above notes depends on the implementation details of Mul and flatten which may change at any time. Therefore, you should only consider them when your code is highly performance sensitive. Removal of 1 from the sequence is already handled by AssocOp.__new__. """ from sympy.calculus.util import AccumBounds from sympy.matrices.expressions import MatrixExpr rv = None if len(seq) == 2: a, b = seq if b.is_Rational: a, b = b, a seq = [a, b] assert not a is S.One if not a.is_zero and a.is_Rational: r, b = b.as_coeff_Mul() if b.is_Add: if r is not S.One: # 2-arg hack # leave the Mul as a Mul rv = [cls(a*r, b, evaluate=False)], [], None elif global_distribute[0] and b.is_commutative: r, b = b.as_coeff_Add() bargs = [_keep_coeff(a, bi) for bi in Add.make_args(b)] _addsort(bargs) ar = a*r if ar: bargs.insert(0, ar) bargs = [Add._from_args(bargs)] rv = bargs, [], None if rv: return rv # apply associativity, separate commutative part of seq c_part = [] # out: commutative factors nc_part = [] # out: non-commutative factors nc_seq = [] coeff = S.One # standalone term # e.g. 3 * ... c_powers = [] # (base,exp) n # e.g. (x,n) for x num_exp = [] # (num-base, exp) y # e.g. (3, y) for ... * 3 * ... neg1e = S.Zero # exponent on -1 extracted from Number-based Pow and I pnum_rat = {} # (num-base, Rat-exp) 1/2 # e.g. (3, 1/2) for ... * 3 * ... order_symbols = None # --- PART 1 --- # # "collect powers and coeff": # # o coeff # o c_powers # o num_exp # o neg1e # o pnum_rat # # NOTE: this is optimized for all-objects-are-commutative case for o in seq: # O(x) if o.is_Order: o, order_symbols = o.as_expr_variables(order_symbols) # Mul([...]) if o.is_Mul: if o.is_commutative: seq.extend(o.args) # XXX zerocopy? else: # NCMul can have commutative parts as well for q in o.args: if q.is_commutative: seq.append(q) else: nc_seq.append(q) # append non-commutative marker, so we don't forget to # process scheduled non-commutative objects seq.append(NC_Marker) continue # 3 elif o.is_Number: if o is S.NaN or coeff is S.ComplexInfinity and o is S.Zero: # we know for sure the result will be nan return [S.NaN], [], None elif coeff.is_Number or isinstance(coeff, AccumBounds): # it could be zoo coeff *= o if coeff is S.NaN: # we know for sure the result will be nan return [S.NaN], [], None continue elif isinstance(o, AccumBounds): coeff = o.__mul__(coeff) continue elif o is S.ComplexInfinity: if not coeff: # 0 * zoo = NaN return [S.NaN], [], None if coeff is S.ComplexInfinity: # zoo * zoo = zoo return [S.ComplexInfinity], [], None coeff = S.ComplexInfinity continue elif o is S.ImaginaryUnit: neg1e += S.Half continue elif o.is_commutative: # e # o = b b, e = o.as_base_exp() # y # 3 if o.is_Pow: if b.is_Number: # get all the factors with numeric base so they can be # combined below, but don't combine negatives unless # the exponent is an integer if e.is_Rational: if e.is_Integer: coeff *= Pow(b, e) # it is an unevaluated power continue elif e.is_negative: # also a sign of an unevaluated power seq.append(Pow(b, e)) continue elif b.is_negative: neg1e += e b = -b if b is not S.One: pnum_rat.setdefault(b, []).append(e) continue elif b.is_positive or e.is_integer: num_exp.append((b, e)) continue c_powers.append((b, e)) # NON-COMMUTATIVE # TODO: Make non-commutative exponents not combine automatically else: if o is not NC_Marker: nc_seq.append(o) # process nc_seq (if any) while nc_seq: o = nc_seq.pop(0) if not nc_part: nc_part.append(o) continue # b c b+c # try to combine last terms: a * a -> a o1 = nc_part.pop() b1, e1 = o1.as_base_exp() b2, e2 = o.as_base_exp() new_exp = e1 + e2 # Only allow powers to combine if the new exponent is # not an Add. This allow things like a**2*b**3 == a**5 # if a.is_commutative == False, but prohibits # a**x*a**y and x**a*x**b from combining (x,y commute). if b1 == b2 and (not new_exp.is_Add): o12 = b1 ** new_exp # now o12 could be a commutative object if o12.is_commutative: seq.append(o12) continue else: nc_seq.insert(0, o12) else: nc_part.append(o1) nc_part.append(o) # We do want a combined exponent if it would not be an Add, such as # y 2y 3y # x * x -> x # We determine if two exponents have the same term by using # as_coeff_Mul. # # Unfortunately, this isn't smart enough to consider combining into # exponents that might already be adds, so things like: # z - y y # x * x will be left alone. This is because checking every possible # combination can slow things down. # gather exponents of common bases... def _gather(c_powers): common_b = {} # b:e for b, e in c_powers: co = e.as_coeff_Mul() common_b.setdefault(b, {}).setdefault( co[1], []).append(co[0]) for b, d in common_b.items(): for di, li in d.items(): d[di] = Add(*li) new_c_powers = [] for b, e in common_b.items(): new_c_powers.extend([(b, c*t) for t, c in e.items()]) return new_c_powers # in c_powers c_powers = _gather(c_powers) # and in num_exp num_exp = _gather(num_exp) # --- PART 2 --- # # o process collected powers (x**0 -> 1; x**1 -> x; otherwise Pow) # o combine collected powers (2**x * 3**x -> 6**x) # with numeric base # ................................ # now we have: # - coeff: # - c_powers: (b, e) # - num_exp: (2, e) # - pnum_rat: {(1/3, [1/3, 2/3, 1/4])} # 0 1 # x -> 1 x -> x # this should only need to run twice; if it fails because # it needs to be run more times, perhaps this should be # changed to a "while True" loop -- the only reason it # isn't such now is to allow a less-than-perfect result to # be obtained rather than raising an error or entering an # infinite loop for i in range(2): new_c_powers = [] changed = False for b, e in c_powers: if e.is_zero: # canceling out infinities yields NaN if (b.is_Add or b.is_Mul) and any(infty in b.args for infty in (S.ComplexInfinity, S.Infinity, S.NegativeInfinity)): return [S.NaN], [], None continue if e is S.One: if b.is_Number: coeff *= b continue p = b if e is not S.One: p = Pow(b, e) # check to make sure that the base doesn't change # after exponentiation; to allow for unevaluated # Pow, we only do so if b is not already a Pow if p.is_Pow and not b.is_Pow: bi = b b, e = p.as_base_exp() if b != bi: changed = True c_part.append(p) new_c_powers.append((b, e)) # there might have been a change, but unless the base # matches some other base, there is nothing to do if changed and len(set( b for b, e in new_c_powers)) != len(new_c_powers): # start over again c_part = [] c_powers = _gather(new_c_powers) else: break # x x x # 2 * 3 -> 6 inv_exp_dict = {} # exp:Mul(num-bases) x x # e.g. x:6 for ... * 2 * 3 * ... for b, e in num_exp: inv_exp_dict.setdefault(e, []).append(b) for e, b in inv_exp_dict.items(): inv_exp_dict[e] = cls(*b) c_part.extend([Pow(b, e) for e, b in inv_exp_dict.items() if e]) # b, e -> e' = sum(e), b # {(1/5, [1/3]), (1/2, [1/12, 1/4]} -> {(1/3, [1/5, 1/2])} comb_e = {} for b, e in pnum_rat.items(): comb_e.setdefault(Add(*e), []).append(b) del pnum_rat # process them, reducing exponents to values less than 1 # and updating coeff if necessary else adding them to # num_rat for further processing num_rat = [] for e, b in comb_e.items(): b = cls(*b) if e.q == 1: coeff *= Pow(b, e) continue if e.p > e.q: e_i, ep = divmod(e.p, e.q) coeff *= Pow(b, e_i) e = Rational(ep, e.q) num_rat.append((b, e)) del comb_e # extract gcd of bases in num_rat # 2**(1/3)*6**(1/4) -> 2**(1/3+1/4)*3**(1/4) pnew = defaultdict(list) i = 0 # steps through num_rat which may grow while i < len(num_rat): bi, ei = num_rat[i] grow = [] for j in range(i + 1, len(num_rat)): bj, ej = num_rat[j] g = bi.gcd(bj) if g is not S.One: # 4**r1*6**r2 -> 2**(r1+r2) * 2**r1 * 3**r2 # this might have a gcd with something else e = ei + ej if e.q == 1: coeff *= Pow(g, e) else: if e.p > e.q: e_i, ep = divmod(e.p, e.q) # change e in place coeff *= Pow(g, e_i) e = Rational(ep, e.q) grow.append((g, e)) # update the jth item num_rat[j] = (bj/g, ej) # update bi that we are checking with bi = bi/g if bi is S.One: break if bi is not S.One: obj = Pow(bi, ei) if obj.is_Number: coeff *= obj else: # changes like sqrt(12) -> 2*sqrt(3) for obj in Mul.make_args(obj): if obj.is_Number: coeff *= obj else: assert obj.is_Pow bi, ei = obj.args pnew[ei].append(bi) num_rat.extend(grow) i += 1 # combine bases of the new powers for e, b in pnew.items(): pnew[e] = cls(*b) # handle -1 and I if neg1e: # treat I as (-1)**(1/2) and compute -1's total exponent p, q = neg1e.as_numer_denom() # if the integer part is odd, extract -1 n, p = divmod(p, q) if n % 2: coeff = -coeff # if it's a multiple of 1/2 extract I if q == 2: c_part.append(S.ImaginaryUnit) elif p: # see if there is any positive base this power of # -1 can join neg1e = Rational(p, q) for e, b in pnew.items(): if e == neg1e and b.is_positive: pnew[e] = -b break else: # keep it separate; we've already evaluated it as # much as possible so evaluate=False c_part.append(Pow(S.NegativeOne, neg1e, evaluate=False)) # add all the pnew powers c_part.extend([Pow(b, e) for e, b in pnew.items()]) # oo, -oo if (coeff is S.Infinity) or (coeff is S.NegativeInfinity): def _handle_for_oo(c_part, coeff_sign): new_c_part = [] for t in c_part: if t.is_extended_positive: continue if t.is_extended_negative: coeff_sign *= -1 continue new_c_part.append(t) return new_c_part, coeff_sign c_part, coeff_sign = _handle_for_oo(c_part, 1) nc_part, coeff_sign = _handle_for_oo(nc_part, coeff_sign) coeff *= coeff_sign # zoo if coeff is S.ComplexInfinity: # zoo might be # infinite_real + bounded_im # bounded_real + infinite_im # infinite_real + infinite_im # and non-zero real or imaginary will not change that status. c_part = [c for c in c_part if not (fuzzy_not(c.is_zero) and c.is_extended_real is not None)] nc_part = [c for c in nc_part if not (fuzzy_not(c.is_zero) and c.is_extended_real is not None)] # 0 elif coeff is S.Zero: # we know for sure the result will be 0 except the multiplicand # is infinity or a matrix if any(isinstance(c, MatrixExpr) for c in nc_part): return [coeff], nc_part, order_symbols if any(c.is_finite == False for c in c_part): return [S.NaN], [], order_symbols return [coeff], [], order_symbols # check for straggling Numbers that were produced _new = [] for i in c_part: if i.is_Number: coeff *= i else: _new.append(i) c_part = _new # order commutative part canonically _mulsort(c_part) # current code expects coeff to be always in slot-0 if coeff is not S.One: c_part.insert(0, coeff) # we are done if (global_distribute[0] and not nc_part and len(c_part) == 2 and c_part[0].is_Number and c_part[0].is_finite and c_part[1].is_Add): # 2*(1+a) -> 2 + 2 * a coeff = c_part[0] c_part = [Add(*[coeff*f for f in c_part[1].args])] return c_part, nc_part, order_symbols def _eval_power(b, e): # don't break up NC terms: (A*B)**3 != A**3*B**3, it is A*B*A*B*A*B cargs, nc = b.args_cnc(split_1=False) if e.is_Integer: return Mul(*[Pow(b, e, evaluate=False) for b in cargs]) * \ Pow(Mul._from_args(nc), e, evaluate=False) if e.is_Rational and e.q == 2: from sympy.core.power import integer_nthroot from sympy.functions.elementary.complexes import sign if b.is_imaginary: a = b.as_real_imag()[1] if a.is_Rational: n, d = abs(a/2).as_numer_denom() n, t = integer_nthroot(n, 2) if t: d, t = integer_nthroot(d, 2) if t: r = sympify(n)/d return _unevaluated_Mul(r**e.p, (1 + sign(a)*S.ImaginaryUnit)**e.p) p = Pow(b, e, evaluate=False) if e.is_Rational or e.is_Float: return p._eval_expand_power_base() return p @classmethod def class_key(cls): return 3, 0, cls.__name__ def _eval_evalf(self, prec): c, m = self.as_coeff_Mul() if c is S.NegativeOne: if m.is_Mul: rv = -AssocOp._eval_evalf(m, prec) else: mnew = m._eval_evalf(prec) if mnew is not None: m = mnew rv = -m else: rv = AssocOp._eval_evalf(self, prec) if rv.is_number: return rv.expand() return rv @property def _mpc_(self): """ Convert self to an mpmath mpc if possible """ from sympy.core.numbers import I, Float im_part, imag_unit = self.as_coeff_Mul() if not imag_unit == I: # ValueError may seem more reasonable but since it's a @property, # we need to use AttributeError to keep from confusing things like # hasattr. raise AttributeError("Cannot convert Mul to mpc. Must be of the form Number*I") return (Float(0)._mpf_, Float(im_part)._mpf_) @cacheit def as_two_terms(self): """Return head and tail of self. This is the most efficient way to get the head and tail of an expression. - if you want only the head, use self.args[0]; - if you want to process the arguments of the tail then use self.as_coef_mul() which gives the head and a tuple containing the arguments of the tail when treated as a Mul. - if you want the coefficient when self is treated as an Add then use self.as_coeff_add()[0] >>> from sympy.abc import x, y >>> (3*x*y).as_two_terms() (3, x*y) """ args = self.args if len(args) == 1: return S.One, self elif len(args) == 2: return args else: return args[0], self._new_rawargs(*args[1:]) @cacheit def as_coefficients_dict(self): """Return a dictionary mapping terms to their coefficient. Since the dictionary is a defaultdict, inquiries about terms which were not present will return a coefficient of 0. The dictionary is considered to have a single term. Examples ======== >>> from sympy.abc import a, x >>> (3*a*x).as_coefficients_dict() {a*x: 3} >>> _[a] 0 """ d = defaultdict(int) args = self.args if len(args) == 1 or not args[0].is_Number: d[self] = S.One else: d[self._new_rawargs(*args[1:])] = args[0] return d @cacheit def as_coeff_mul(self, *deps, **kwargs): rational = kwargs.pop('rational', True) if deps: l1 = [] l2 = [] for f in self.args: if f.has(*deps): l2.append(f) else: l1.append(f) return self._new_rawargs(*l1), tuple(l2) args = self.args if args[0].is_Number: if not rational or args[0].is_Rational: return args[0], args[1:] elif args[0].is_extended_negative: return S.NegativeOne, (-args[0],) + args[1:] return S.One, args def as_coeff_Mul(self, rational=False): """Efficiently extract the coefficient of a product. """ coeff, args = self.args[0], self.args[1:] if coeff.is_Number: if not rational or coeff.is_Rational: if len(args) == 1: return coeff, args[0] else: return coeff, self._new_rawargs(*args) elif coeff.is_extended_negative: return S.NegativeOne, self._new_rawargs(*((-coeff,) + args)) return S.One, self def as_real_imag(self, deep=True, **hints): from sympy import Abs, expand_mul, im, re other = [] coeffr = [] coeffi = [] addterms = S.One for a in self.args: r, i = a.as_real_imag() if i.is_zero: coeffr.append(r) elif r.is_zero: coeffi.append(i*S.ImaginaryUnit) elif a.is_commutative: # search for complex conjugate pairs: for i, x in enumerate(other): if x == a.conjugate(): coeffr.append(Abs(x)**2) del other[i] break else: if a.is_Add: addterms *= a else: other.append(a) else: other.append(a) m = self.func(*other) if hints.get('ignore') == m: return if len(coeffi) % 2: imco = im(coeffi.pop(0)) # all other pairs make a real factor; they will be # put into reco below else: imco = S.Zero reco = self.func(*(coeffr + coeffi)) r, i = (reco*re(m), reco*im(m)) if addterms == 1: if m == 1: if imco is S.Zero: return (reco, S.Zero) else: return (S.Zero, reco*imco) if imco is S.Zero: return (r, i) return (-imco*i, imco*r) addre, addim = expand_mul(addterms, deep=False).as_real_imag() if imco is S.Zero: return (r*addre - i*addim, i*addre + r*addim) else: r, i = -imco*i, imco*r return (r*addre - i*addim, r*addim + i*addre) @staticmethod def _expandsums(sums): """ Helper function for _eval_expand_mul. sums must be a list of instances of Basic. """ L = len(sums) if L == 1: return sums[0].args terms = [] left = Mul._expandsums(sums[:L//2]) right = Mul._expandsums(sums[L//2:]) terms = [Mul(a, b) for a in left for b in right] added = Add(*terms) return Add.make_args(added) # it may have collapsed down to one term def _eval_expand_mul(self, **hints): from sympy import fraction # Handle things like 1/(x*(x + 1)), which are automatically converted # to 1/x*1/(x + 1) expr = self n, d = fraction(expr) if d.is_Mul: n, d = [i._eval_expand_mul(**hints) if i.is_Mul else i for i in (n, d)] expr = n/d if not expr.is_Mul: return expr plain, sums, rewrite = [], [], False for factor in expr.args: if factor.is_Add: sums.append(factor) rewrite = True else: if factor.is_commutative: plain.append(factor) else: sums.append(Basic(factor)) # Wrapper if not rewrite: return expr else: plain = self.func(*plain) if sums: deep = hints.get("deep", False) terms = self.func._expandsums(sums) args = [] for term in terms: t = self.func(plain, term) if t.is_Mul and any(a.is_Add for a in t.args) and deep: t = t._eval_expand_mul() args.append(t) return Add(*args) else: return plain @cacheit def _eval_derivative(self, s): args = list(self.args) terms = [] for i in range(len(args)): d = args[i].diff(s) if d: # Note: reduce is used in step of Mul as Mul is unable to # handle subtypes and operation priority: terms.append(reduce(lambda x, y: x*y, (args[:i] + [d] + args[i + 1:]), S.One)) return Add.fromiter(terms) @cacheit def _eval_derivative_n_times(self, s, n): from sympy import Integer, factorial, prod, Sum, Max from sympy.ntheory.multinomial import multinomial_coefficients_iterator from .function import AppliedUndef from .symbol import Symbol, symbols, Dummy if not isinstance(s, AppliedUndef) and not isinstance(s, Symbol): # other types of s may not be well behaved, e.g. # (cos(x)*sin(y)).diff([[x, y, z]]) return super(Mul, self)._eval_derivative_n_times(s, n) args = self.args m = len(args) if isinstance(n, (int, Integer)): # https://en.wikipedia.org/wiki/General_Leibniz_rule#More_than_two_factors terms = [] for kvals, c in multinomial_coefficients_iterator(m, n): p = prod([arg.diff((s, k)) for k, arg in zip(kvals, args)]) terms.append(c * p) return Add(*terms) kvals = symbols("k1:%i" % m, cls=Dummy) klast = n - sum(kvals) nfact = factorial(n) e, l = (# better to use the multinomial? nfact/prod(map(factorial, kvals))/factorial(klast)*\ prod([args[t].diff((s, kvals[t])) for t in range(m-1)])*\ args[-1].diff((s, Max(0, klast))), [(k, 0, n) for k in kvals]) return Sum(e, *l) def _eval_difference_delta(self, n, step): from sympy.series.limitseq import difference_delta as dd arg0 = self.args[0] rest = Mul(*self.args[1:]) return (arg0.subs(n, n + step) * dd(rest, n, step) + dd(arg0, n, step) * rest) def _matches_simple(self, expr, repl_dict): # handle (w*3).matches('x*5') -> {w: x*5/3} coeff, terms = self.as_coeff_Mul() terms = Mul.make_args(terms) if len(terms) == 1: newexpr = self.__class__._combine_inverse(expr, coeff) return terms[0].matches(newexpr, repl_dict) return def matches(self, expr, repl_dict={}, old=False): expr = sympify(expr) if self.is_commutative and expr.is_commutative: return AssocOp._matches_commutative(self, expr, repl_dict, old) elif self.is_commutative is not expr.is_commutative: return None c1, nc1 = self.args_cnc() c2, nc2 = expr.args_cnc() repl_dict = repl_dict.copy() if c1: if not c2: c2 = [1] a = self.func(*c1) if isinstance(a, AssocOp): repl_dict = a._matches_commutative(self.func(*c2), repl_dict, old) else: repl_dict = a.matches(self.func(*c2), repl_dict) if repl_dict: a = self.func(*nc1) if isinstance(a, self.func): repl_dict = a._matches(self.func(*nc2), repl_dict) else: repl_dict = a.matches(self.func(*nc2), repl_dict) return repl_dict or None def _matches(self, expr, repl_dict={}): # weed out negative one prefixes# from sympy import Wild sign = 1 a, b = self.as_two_terms() if a is S.NegativeOne: if b.is_Mul: sign = -sign else: # the remainder, b, is not a Mul anymore return b.matches(-expr, repl_dict) expr = sympify(expr) if expr.is_Mul and expr.args[0] is S.NegativeOne: expr = -expr sign = -sign if not expr.is_Mul: # expr can only match if it matches b and a matches +/- 1 if len(self.args) == 2: # quickly test for equality if b == expr: return a.matches(Rational(sign), repl_dict) # do more expensive match dd = b.matches(expr, repl_dict) if dd is None: return None dd = a.matches(Rational(sign), dd) return dd return None d = repl_dict.copy() # weed out identical terms pp = list(self.args) ee = list(expr.args) for p in self.args: if p in expr.args: ee.remove(p) pp.remove(p) # only one symbol left in pattern -> match the remaining expression if len(pp) == 1 and isinstance(pp[0], Wild): if len(ee) == 1: d[pp[0]] = sign * ee[0] else: d[pp[0]] = sign * expr.func(*ee) return d if len(ee) != len(pp): return None for p, e in zip(pp, ee): d = p.xreplace(d).matches(e, d) if d is None: return None return d @staticmethod def _combine_inverse(lhs, rhs): """ Returns lhs/rhs, but treats arguments like symbols, so things like oo/oo return 1 (instead of a nan) and ``I`` behaves like a symbol instead of sqrt(-1). """ from .symbol import Dummy if lhs == rhs: return S.One def check(l, r): if l.is_Float and r.is_comparable: # if both objects are added to 0 they will share the same "normalization" # and are more likely to compare the same. Since Add(foo, 0) will not allow # the 0 to pass, we use __add__ directly. return l.__add__(0) == r.evalf().__add__(0) return False if check(lhs, rhs) or check(rhs, lhs): return S.One if any(i.is_Pow or i.is_Mul for i in (lhs, rhs)): # gruntz and limit wants a literal I to not combine # with a power of -1 d = Dummy('I') _i = {S.ImaginaryUnit: d} i_ = {d: S.ImaginaryUnit} a = lhs.xreplace(_i).as_powers_dict() b = rhs.xreplace(_i).as_powers_dict() blen = len(b) for bi in tuple(b.keys()): if bi in a: a[bi] -= b.pop(bi) if not a[bi]: a.pop(bi) if len(b) != blen: lhs = Mul(*[k**v for k, v in a.items()]).xreplace(i_) rhs = Mul(*[k**v for k, v in b.items()]).xreplace(i_) return lhs/rhs def as_powers_dict(self): d = defaultdict(int) for term in self.args: for b, e in term.as_powers_dict().items(): d[b] += e return d def as_numer_denom(self): # don't use _from_args to rebuild the numerators and denominators # as the order is not guaranteed to be the same once they have # been separated from each other numers, denoms = list(zip(*[f.as_numer_denom() for f in self.args])) return self.func(*numers), self.func(*denoms) def as_base_exp(self): e1 = None bases = [] nc = 0 for m in self.args: b, e = m.as_base_exp() if not b.is_commutative: nc += 1 if e1 is None: e1 = e elif e != e1 or nc > 1: return self, S.One bases.append(b) return self.func(*bases), e1 def _eval_is_polynomial(self, syms): return all(term._eval_is_polynomial(syms) for term in self.args) def _eval_is_rational_function(self, syms): return all(term._eval_is_rational_function(syms) for term in self.args) def _eval_is_algebraic_expr(self, syms): return all(term._eval_is_algebraic_expr(syms) for term in self.args) _eval_is_commutative = lambda self: _fuzzy_group( a.is_commutative for a in self.args) _eval_is_complex = lambda self: _fuzzy_group( (a.is_complex for a in self.args), quick_exit=True) def _eval_is_finite(self): if all(a.is_finite for a in self.args): return True if any(a.is_infinite for a in self.args): if all(a.is_zero is False for a in self.args): return False def _eval_is_infinite(self): if any(a.is_infinite for a in self.args): if any(a.is_zero for a in self.args): return S.NaN.is_infinite if any(a.is_zero is None for a in self.args): return None return True def _eval_is_rational(self): r = _fuzzy_group((a.is_rational for a in self.args), quick_exit=True) if r: return r elif r is False: return self.is_zero def _eval_is_algebraic(self): r = _fuzzy_group((a.is_algebraic for a in self.args), quick_exit=True) if r: return r elif r is False: return self.is_zero def _eval_is_zero(self): zero = infinite = False for a in self.args: z = a.is_zero if z: if infinite: return # 0*oo is nan and nan.is_zero is None zero = True else: if not a.is_finite: if zero: return # 0*oo is nan and nan.is_zero is None infinite = True if zero is False and z is None: # trap None zero = None return zero def _eval_is_integer(self): is_rational = self.is_rational if is_rational: n, d = self.as_numer_denom() if d is S.One: return True elif d is S(2): return n.is_even elif is_rational is False: return False def _eval_is_polar(self): has_polar = any(arg.is_polar for arg in self.args) return has_polar and \ all(arg.is_polar or arg.is_positive for arg in self.args) def _eval_is_extended_real(self): return self._eval_real_imag(True) def _eval_real_imag(self, real): zero = False t_not_re_im = None for t in self.args: if t.is_complex is False and t.is_extended_real is False: return False elif t.is_imaginary: # I real = not real elif t.is_extended_real: # 2 if not zero: z = t.is_zero if not z and zero is False: zero = z elif z: if all(a.is_finite for a in self.args): return True return elif t.is_extended_real is False: # symbolic or literal like `2 + I` or symbolic imaginary if t_not_re_im: return # complex terms might cancel t_not_re_im = t elif t.is_imaginary is False: # symbolic like `2` or `2 + I` if t_not_re_im: return # complex terms might cancel t_not_re_im = t else: return if t_not_re_im: if t_not_re_im.is_extended_real is False: if real: # like 3 return zero # 3*(smthng like 2 + I or i) is not real if t_not_re_im.is_imaginary is False: # symbolic 2 or 2 + I if not real: # like I return zero # I*(smthng like 2 or 2 + I) is not real elif zero is False: return real # can't be trumped by 0 elif real: return real # doesn't matter what zero is def _eval_is_imaginary(self): z = self.is_zero if z: return False elif z is False: return self._eval_real_imag(False) def _eval_is_hermitian(self): return self._eval_herm_antiherm(True) def _eval_herm_antiherm(self, real): one_nc = zero = one_neither = False for t in self.args: if not t.is_commutative: if one_nc: return one_nc = True if t.is_antihermitian: real = not real elif t.is_hermitian: if not zero: z = t.is_zero if not z and zero is False: zero = z elif z: if all(a.is_finite for a in self.args): return True return elif t.is_hermitian is False: if one_neither: return one_neither = True else: return if one_neither: if real: return zero elif zero is False or real: return real def _eval_is_antihermitian(self): z = self.is_zero if z: return False elif z is False: return self._eval_herm_antiherm(False) def _eval_is_irrational(self): for t in self.args: a = t.is_irrational if a: others = list(self.args) others.remove(t) if all((x.is_rational and fuzzy_not(x.is_zero)) is True for x in others): return True return if a is None: return return False def _eval_is_extended_positive(self): """Return True if self is positive, False if not, and None if it cannot be determined. This algorithm is non-recursive and works by keeping track of the sign which changes when a negative or nonpositive is encountered. Whether a nonpositive or nonnegative is seen is also tracked since the presence of these makes it impossible to return True, but possible to return False if the end result is nonpositive. e.g. pos * neg * nonpositive -> pos or zero -> None is returned pos * neg * nonnegative -> neg or zero -> False is returned """ return self._eval_pos_neg(1) def _eval_pos_neg(self, sign): saw_NON = saw_NOT = False for t in self.args: if t.is_extended_positive: continue elif t.is_extended_negative: sign = -sign elif t.is_zero: if all(a.is_finite for a in self.args): return False return elif t.is_extended_nonpositive: sign = -sign saw_NON = True elif t.is_extended_nonnegative: saw_NON = True elif t.is_positive is False: sign = -sign if saw_NOT: return saw_NOT = True elif t.is_negative is False: if saw_NOT: return saw_NOT = True else: return if sign == 1 and saw_NON is False and saw_NOT is False: return True if sign < 0: return False def _eval_is_extended_negative(self): return self._eval_pos_neg(-1) def _eval_is_odd(self): is_integer = self.is_integer if is_integer: r, acc = True, 1 for t in self.args: if not t.is_integer: return None elif t.is_even: r = False elif t.is_integer: if r is False: pass elif acc != 1 and (acc + t).is_odd: r = False elif t.is_odd is None: r = None acc = t return r # !integer -> !odd elif is_integer is False: return False def _eval_is_even(self): is_integer = self.is_integer if is_integer: return fuzzy_not(self.is_odd) elif is_integer is False: return False def _eval_is_composite(self): """ Here we count the number of arguments that have a minimum value greater than two. If there are more than one of such a symbol then the result is composite. Else, the result cannot be determined. """ number_of_args = 0 # count of symbols with minimum value greater than one for arg in self.args: if not (arg.is_integer and arg.is_positive): return None if (arg-1).is_positive: number_of_args += 1 if number_of_args > 1: return True def _eval_subs(self, old, new): from sympy.functions.elementary.complexes import sign from sympy.ntheory.factor_ import multiplicity from sympy.simplify.powsimp import powdenest from sympy.simplify.radsimp import fraction if not old.is_Mul: return None # try keep replacement literal so -2*x doesn't replace 4*x if old.args[0].is_Number and old.args[0] < 0: if self.args[0].is_Number: if self.args[0] < 0: return self._subs(-old, -new) return None def base_exp(a): # if I and -1 are in a Mul, they get both end up with # a -1 base (see issue 6421); all we want here are the # true Pow or exp separated into base and exponent from sympy import exp if a.is_Pow or isinstance(a, exp): return a.as_base_exp() return a, S.One def breakup(eq): """break up powers of eq when treated as a Mul: b**(Rational*e) -> b**e, Rational commutatives come back as a dictionary {b**e: Rational} noncommutatives come back as a list [(b**e, Rational)] """ (c, nc) = (defaultdict(int), list()) for a in Mul.make_args(eq): a = powdenest(a) (b, e) = base_exp(a) if e is not S.One: (co, _) = e.as_coeff_mul() b = Pow(b, e/co) e = co if a.is_commutative: c[b] += e else: nc.append([b, e]) return (c, nc) def rejoin(b, co): """ Put rational back with exponent; in general this is not ok, but since we took it from the exponent for analysis, it's ok to put it back. """ (b, e) = base_exp(b) return Pow(b, e*co) def ndiv(a, b): """if b divides a in an extractive way (like 1/4 divides 1/2 but not vice versa, and 2/5 does not divide 1/3) then return the integer number of times it divides, else return 0. """ if not b.q % a.q or not a.q % b.q: return int(a/b) return 0 # give Muls in the denominator a chance to be changed (see issue 5651) # rv will be the default return value rv = None n, d = fraction(self) self2 = self if d is not S.One: self2 = n._subs(old, new)/d._subs(old, new) if not self2.is_Mul: return self2._subs(old, new) if self2 != self: rv = self2 # Now continue with regular substitution. # handle the leading coefficient and use it to decide if anything # should even be started; we always know where to find the Rational # so it's a quick test co_self = self2.args[0] co_old = old.args[0] co_xmul = None if co_old.is_Rational and co_self.is_Rational: # if coeffs are the same there will be no updating to do # below after breakup() step; so skip (and keep co_xmul=None) if co_old != co_self: co_xmul = co_self.extract_multiplicatively(co_old) elif co_old.is_Rational: return rv # break self and old into factors (c, nc) = breakup(self2) (old_c, old_nc) = breakup(old) # update the coefficients if we had an extraction # e.g. if co_self were 2*(3/35*x)**2 and co_old = 3/5 # then co_self in c is replaced by (3/5)**2 and co_residual # is 2*(1/7)**2 if co_xmul and co_xmul.is_Rational and abs(co_old) != 1: mult = S(multiplicity(abs(co_old), co_self)) c.pop(co_self) if co_old in c: c[co_old] += mult else: c[co_old] = mult co_residual = co_self/co_old**mult else: co_residual = 1 # do quick tests to see if we can't succeed ok = True if len(old_nc) > len(nc): # more non-commutative terms ok = False elif len(old_c) > len(c): # more commutative terms ok = False elif set(i[0] for i in old_nc).difference(set(i[0] for i in nc)): # unmatched non-commutative bases ok = False elif set(old_c).difference(set(c)): # unmatched commutative terms ok = False elif any(sign(c[b]) != sign(old_c[b]) for b in old_c): # differences in sign ok = False if not ok: return rv if not old_c: cdid = None else: rat = [] for (b, old_e) in old_c.items(): c_e = c[b] rat.append(ndiv(c_e, old_e)) if not rat[-1]: return rv cdid = min(rat) if not old_nc: ncdid = None for i in range(len(nc)): nc[i] = rejoin(*nc[i]) else: ncdid = 0 # number of nc replacements we did take = len(old_nc) # how much to look at each time limit = cdid or S.Infinity # max number that we can take failed = [] # failed terms will need subs if other terms pass i = 0 while limit and i + take <= len(nc): hit = False # the bases must be equivalent in succession, and # the powers must be extractively compatible on the # first and last factor but equal in between. rat = [] for j in range(take): if nc[i + j][0] != old_nc[j][0]: break elif j == 0: rat.append(ndiv(nc[i + j][1], old_nc[j][1])) elif j == take - 1: rat.append(ndiv(nc[i + j][1], old_nc[j][1])) elif nc[i + j][1] != old_nc[j][1]: break else: rat.append(1) j += 1 else: ndo = min(rat) if ndo: if take == 1: if cdid: ndo = min(cdid, ndo) nc[i] = Pow(new, ndo)*rejoin(nc[i][0], nc[i][1] - ndo*old_nc[0][1]) else: ndo = 1 # the left residual l = rejoin(nc[i][0], nc[i][1] - ndo* old_nc[0][1]) # eliminate all middle terms mid = new # the right residual (which may be the same as the middle if take == 2) ir = i + take - 1 r = (nc[ir][0], nc[ir][1] - ndo* old_nc[-1][1]) if r[1]: if i + take < len(nc): nc[i:i + take] = [l*mid, r] else: r = rejoin(*r) nc[i:i + take] = [l*mid*r] else: # there was nothing left on the right nc[i:i + take] = [l*mid] limit -= ndo ncdid += ndo hit = True if not hit: # do the subs on this failing factor failed.append(i) i += 1 else: if not ncdid: return rv # although we didn't fail, certain nc terms may have # failed so we rebuild them after attempting a partial # subs on them failed.extend(range(i, len(nc))) for i in failed: nc[i] = rejoin(*nc[i]).subs(old, new) # rebuild the expression if cdid is None: do = ncdid elif ncdid is None: do = cdid else: do = min(ncdid, cdid) margs = [] for b in c: if b in old_c: # calculate the new exponent e = c[b] - old_c[b]*do margs.append(rejoin(b, e)) else: margs.append(rejoin(b.subs(old, new), c[b])) if cdid and not ncdid: # in case we are replacing commutative with non-commutative, # we want the new term to come at the front just like the # rest of this routine margs = [Pow(new, cdid)] + margs return co_residual*self2.func(*margs)*self2.func(*nc) def _eval_nseries(self, x, n, logx): from sympy import Order, powsimp terms = [t.nseries(x, n=n, logx=logx) for t in self.args] res = powsimp(self.func(*terms).expand(), combine='exp', deep=True) if res.has(Order): res += Order(x**n, x) return res def _eval_as_leading_term(self, x): return self.func(*[t.as_leading_term(x) for t in self.args]) def _eval_conjugate(self): return self.func(*[t.conjugate() for t in self.args]) def _eval_transpose(self): return self.func(*[t.transpose() for t in self.args[::-1]]) def _eval_adjoint(self): return self.func(*[t.adjoint() for t in self.args[::-1]]) def _sage_(self): s = 1 for x in self.args: s *= x._sage_() return s def as_content_primitive(self, radical=False, clear=True): """Return the tuple (R, self/R) where R is the positive Rational extracted from self. Examples ======== >>> from sympy import sqrt >>> (-3*sqrt(2)*(2 - 2*sqrt(2))).as_content_primitive() (6, -sqrt(2)*(1 - sqrt(2))) See docstring of Expr.as_content_primitive for more examples. """ coef = S.One args = [] for i, a in enumerate(self.args): c, p = a.as_content_primitive(radical=radical, clear=clear) coef *= c if p is not S.One: args.append(p) # don't use self._from_args here to reconstruct args # since there may be identical args now that should be combined # e.g. (2+2*x)*(3+3*x) should be (6, (1 + x)**2) not (6, (1+x)*(1+x)) return coef, self.func(*args) def as_ordered_factors(self, order=None): """Transform an expression into an ordered list of factors. Examples ======== >>> from sympy import sin, cos >>> from sympy.abc import x, y >>> (2*x*y*sin(x)*cos(x)).as_ordered_factors() [2, x, y, sin(x), cos(x)] """ cpart, ncpart = self.args_cnc() cpart.sort(key=lambda expr: expr.sort_key(order=order)) return cpart + ncpart @property def _sorted_args(self): return tuple(self.as_ordered_factors()) def prod(a, start=1): """Return product of elements of a. Start with int 1 so if only ints are included then an int result is returned. Examples ======== >>> from sympy import prod, S >>> prod(range(3)) 0 >>> type(_) is int True >>> prod([S(2), 3]) 6 >>> _.is_Integer True You can start the product at something other than 1: >>> prod([1, 2], 3) 6 """ return reduce(operator.mul, a, start) def _keep_coeff(coeff, factors, clear=True, sign=False): """Return ``coeff*factors`` unevaluated if necessary. If ``clear`` is False, do not keep the coefficient as a factor if it can be distributed on a single factor such that one or more terms will still have integer coefficients. If ``sign`` is True, allow a coefficient of -1 to remain factored out. Examples ======== >>> from sympy.core.mul import _keep_coeff >>> from sympy.abc import x, y >>> from sympy import S >>> _keep_coeff(S.Half, x + 2) (x + 2)/2 >>> _keep_coeff(S.Half, x + 2, clear=False) x/2 + 1 >>> _keep_coeff(S.Half, (x + 2)*y, clear=False) y*(x + 2)/2 >>> _keep_coeff(S(-1), x + y) -x - y >>> _keep_coeff(S(-1), x + y, sign=True) -(x + y) """ if not coeff.is_Number: if factors.is_Number: factors, coeff = coeff, factors else: return coeff*factors if coeff is S.One: return factors elif coeff is S.NegativeOne and not sign: return -factors elif factors.is_Add: if not clear and coeff.is_Rational and coeff.q != 1: q = S(coeff.q) for i in factors.args: c, t = i.as_coeff_Mul() r = c/q if r == int(r): return coeff*factors return Mul(coeff, factors, evaluate=False) elif factors.is_Mul: margs = list(factors.args) if margs[0].is_Number: margs[0] *= coeff if margs[0] == 1: margs.pop(0) else: margs.insert(0, coeff) return Mul._from_args(margs) else: return coeff*factors def expand_2arg(e): from sympy.simplify.simplify import bottom_up def do(e): if e.is_Mul: c, r = e.as_coeff_Mul() if c.is_Number and r.is_Add: return _unevaluated_Add(*[c*ri for ri in r.args]) return e return bottom_up(e, do) from .numbers import Rational from .power import Pow from .add import Add, _addsort, _unevaluated_Add

6c7f0b1cf71a461e39dd0e353df11d54c47f37bdb3f51e053859be1cb7d0c19b

"""Tools for setting up printing in interactive sessions. """ from __future__ import print_function, division import sys from distutils.version import LooseVersion as V from io import BytesIO from sympy import latex as default_latex from sympy import preview from sympy.core.compatibility import integer_types from sympy.utilities.misc import debug def _init_python_printing(stringify_func, **settings): """Setup printing in Python interactive session. """ import sys from sympy.core.compatibility import builtins def _displayhook(arg): """Python's pretty-printer display hook. This function was adapted from: http://www.python.org/dev/peps/pep-0217/ """ if arg is not None: builtins._ = None print(stringify_func(arg, **settings)) builtins._ = arg sys.displayhook = _displayhook def _init_ipython_printing(ip, stringify_func, use_latex, euler, forecolor, backcolor, fontsize, latex_mode, print_builtin, latex_printer, scale, **settings): """Setup printing in IPython interactive session. """ try: from IPython.lib.latextools import latex_to_png except ImportError: pass preamble = "\\documentclass[varwidth,%s]{standalone}\n" \ "\\usepackage{amsmath,amsfonts}%s\\begin{document}" if euler: addpackages = '\\usepackage{euler}' else: addpackages = '' if use_latex == "svg": addpackages = addpackages + "\n\\special{color %s}" % forecolor preamble = preamble % (fontsize, addpackages) imagesize = 'tight' offset = "0cm,0cm" resolution = round(150*scale) dvi = r"-T %s -D %d -bg %s -fg %s -O %s" % ( imagesize, resolution, backcolor, forecolor, offset) dvioptions = dvi.split() svg_scale = 2.1*scale dvioptions_svg = ["--no-fonts", "--scale={}".format(svg_scale)] debug("init_printing: DVIOPTIONS:", dvioptions) debug("init_printing: DVIOPTIONS_SVG:", dvioptions_svg) debug("init_printing: PREAMBLE:", preamble) latex = latex_printer or default_latex def _print_plain(arg, p, cycle): """caller for pretty, for use in IPython 0.11""" if _can_print_latex(arg): p.text(stringify_func(arg)) else: p.text(IPython.lib.pretty.pretty(arg)) def _preview_wrapper(o): exprbuffer = BytesIO() try: preview(o, output='png', viewer='BytesIO', outputbuffer=exprbuffer, preamble=preamble, dvioptions=dvioptions) except Exception as e: # IPython swallows exceptions debug("png printing:", "_preview_wrapper exception raised:", repr(e)) raise return exprbuffer.getvalue() def _svg_wrapper(o): exprbuffer = BytesIO() try: preview(o, output='svg', viewer='BytesIO', outputbuffer=exprbuffer, preamble=preamble, dvioptions=dvioptions_svg) except Exception as e: # IPython swallows exceptions debug("svg printing:", "_preview_wrapper exception raised:", repr(e)) raise return exprbuffer.getvalue().decode('utf-8') def _matplotlib_wrapper(o): # mathtext does not understand certain latex flags, so we try to # replace them with suitable subs o = o.replace(r'\operatorname', '') o = o.replace(r'\overline', r'\bar') # mathtext can't render some LaTeX commands. For example, it can't # render any LaTeX environments such as array or matrix. So here we # ensure that if mathtext fails to render, we return None. try: return latex_to_png(o) except ValueError as e: debug('matplotlib exception caught:', repr(e)) return None from sympy import Basic from sympy.matrices import MatrixBase from sympy.physics.vector import Vector, Dyadic from sympy.tensor.array import NDimArray # These should all have _repr_latex_ and _repr_latex_orig. If you update # this also update printable_types below. sympy_latex_types = (Basic, MatrixBase, Vector, Dyadic, NDimArray) def _can_print_latex(o): """Return True if type o can be printed with LaTeX. If o is a container type, this is True if and only if every element of o can be printed with LaTeX. """ try: # If you're adding another type, make sure you add it to printable_types # later in this file as well builtin_types = (list, tuple, set, frozenset) if isinstance(o, builtin_types): # If the object is a custom subclass with a custom str or # repr, use that instead. if (type(o).__str__ not in (i.__str__ for i in builtin_types) or type(o).__repr__ not in (i.__repr__ for i in builtin_types)): return False return all(_can_print_latex(i) for i in o) elif isinstance(o, dict): return all(_can_print_latex(i) and _can_print_latex(o[i]) for i in o) elif isinstance(o, bool): return False # TODO : Investigate if "elif hasattr(o, '_latex')" is more useful # to use here, than these explicit imports. elif isinstance(o, sympy_latex_types): return True elif isinstance(o, (float, integer_types)) and print_builtin: return True return False except RuntimeError: return False # This is in case maximum recursion depth is reached. # Since RecursionError is for versions of Python 3.5+ # so this is to guard against RecursionError for older versions. def _print_latex_png(o): """ A function that returns a png rendered by an external latex distribution, falling back to matplotlib rendering """ if _can_print_latex(o): s = latex(o, mode=latex_mode, **settings) if latex_mode == 'plain': s = '$\\displaystyle %s$' % s try: return _preview_wrapper(s) except RuntimeError as e: debug('preview failed with:', repr(e), ' Falling back to matplotlib backend') if latex_mode != 'inline': s = latex(o, mode='inline', **settings) return _matplotlib_wrapper(s) def _print_latex_svg(o): """ A function that returns a svg rendered by an external latex distribution, no fallback available. """ if _can_print_latex(o): s = latex(o, mode=latex_mode, **settings) if latex_mode == 'plain': s = '$\\displaystyle %s$' % s try: return _svg_wrapper(s) except RuntimeError as e: debug('preview failed with:', repr(e), ' No fallback available.') def _print_latex_matplotlib(o): """ A function that returns a png rendered by mathtext """ if _can_print_latex(o): s = latex(o, mode='inline', **settings) return _matplotlib_wrapper(s) def _print_latex_text(o): """ A function to generate the latex representation of sympy expressions. """ if _can_print_latex(o): s = latex(o, mode=latex_mode, **settings) if latex_mode == 'plain': return '$\\displaystyle %s$' % s return s def _result_display(self, arg): """IPython's pretty-printer display hook, for use in IPython 0.10 This function was adapted from: ipython/IPython/hooks.py:155 """ if self.rc.pprint: out = stringify_func(arg) if '\n' in out: print print(out) else: print(repr(arg)) import IPython if V(IPython.__version__) >= '0.11': from sympy.core.basic import Basic from sympy.matrices.matrices import MatrixBase from sympy.physics.vector import Vector, Dyadic from sympy.tensor.array import NDimArray printable_types = [Basic, MatrixBase, float, tuple, list, set, frozenset, dict, Vector, Dyadic, NDimArray] + list(integer_types) plaintext_formatter = ip.display_formatter.formatters['text/plain'] for cls in printable_types: plaintext_formatter.for_type(cls, _print_plain) svg_formatter = ip.display_formatter.formatters['image/svg+xml'] if use_latex in ('svg', ): debug("init_printing: using svg formatter") for cls in printable_types: svg_formatter.for_type(cls, _print_latex_svg) else: debug("init_printing: not using any svg formatter") for cls in printable_types: # Better way to set this, but currently does not work in IPython #png_formatter.for_type(cls, None) if cls in svg_formatter.type_printers: svg_formatter.type_printers.pop(cls) png_formatter = ip.display_formatter.formatters['image/png'] if use_latex in (True, 'png'): debug("init_printing: using png formatter") for cls in printable_types: png_formatter.for_type(cls, _print_latex_png) elif use_latex == 'matplotlib': debug("init_printing: using matplotlib formatter") for cls in printable_types: png_formatter.for_type(cls, _print_latex_matplotlib) else: debug("init_printing: not using any png formatter") for cls in printable_types: # Better way to set this, but currently does not work in IPython #png_formatter.for_type(cls, None) if cls in png_formatter.type_printers: png_formatter.type_printers.pop(cls) latex_formatter = ip.display_formatter.formatters['text/latex'] if use_latex in (True, 'mathjax'): debug("init_printing: using mathjax formatter") for cls in printable_types: latex_formatter.for_type(cls, _print_latex_text) for typ in sympy_latex_types: typ._repr_latex_ = typ._repr_latex_orig else: debug("init_printing: not using text/latex formatter") for cls in printable_types: # Better way to set this, but currently does not work in IPython #latex_formatter.for_type(cls, None) if cls in latex_formatter.type_printers: latex_formatter.type_printers.pop(cls) for typ in sympy_latex_types: typ._repr_latex_ = None else: ip.set_hook('result_display', _result_display) def _is_ipython(shell): """Is a shell instance an IPython shell?""" # shortcut, so we don't import IPython if we don't have to if 'IPython' not in sys.modules: return False try: from IPython.core.interactiveshell import InteractiveShell except ImportError: # IPython < 0.11 try: from IPython.iplib import InteractiveShell except ImportError: # Reaching this points means IPython has changed in a backward-incompatible way # that we don't know about. Warn? return False return isinstance(shell, InteractiveShell) # Used by the doctester to override the default for no_global NO_GLOBAL = False def init_printing(pretty_print=True, order=None, use_unicode=None, use_latex=None, wrap_line=None, num_columns=None, no_global=False, ip=None, euler=False, forecolor='Black', backcolor='Transparent', fontsize='10pt', latex_mode='plain', print_builtin=True, str_printer=None, pretty_printer=None, latex_printer=None, scale=1.0, **settings): r""" Initializes pretty-printer depending on the environment. Parameters ========== pretty_print: boolean If True, use pretty_print to stringify or the provided pretty printer; if False, use sstrrepr to stringify or the provided string printer. order: string or None There are a few different settings for this parameter: lex (default), which is lexographic order; grlex, which is graded lexographic order; grevlex, which is reversed graded lexographic order; old, which is used for compatibility reasons and for long expressions; None, which sets it to lex. use_unicode: boolean or None If True, use unicode characters; if False, do not use unicode characters. use_latex: string, boolean, or None If True, use default latex rendering in GUI interfaces (png and mathjax); if False, do not use latex rendering; if 'png', enable latex rendering with an external latex compiler, falling back to matplotlib if external compilation fails; if 'matplotlib', enable latex rendering with matplotlib; if 'mathjax', enable latex text generation, for example MathJax rendering in IPython notebook or text rendering in LaTeX documents; if 'svg', enable latex rendering with an external latex compiler, no fallback wrap_line: boolean If True, lines will wrap at the end; if False, they will not wrap but continue as one line. This is only relevant if ``pretty_print`` is True. num_columns: int or None If int, number of columns before wrapping is set to num_columns; if None, number of columns before wrapping is set to terminal width. This is only relevant if ``pretty_print`` is True. no_global: boolean If True, the settings become system wide; if False, use just for this console/session. ip: An interactive console This can either be an instance of IPython, or a class that derives from code.InteractiveConsole. euler: boolean, optional, default=False Loads the euler package in the LaTeX preamble for handwritten style fonts (http://www.ctan.org/pkg/euler). forecolor: string, optional, default='Black' DVI setting for foreground color. backcolor: string, optional, default='Transparent' DVI setting for background color. fontsize: string, optional, default='10pt' A font size to pass to the LaTeX documentclass function in the preamble. latex_mode: string, optional, default='plain' The mode used in the LaTeX printer. Can be one of: {'inline'|'plain'|'equation'|'equation*'}. print_builtin: boolean, optional, default=True If true then floats and integers will be printed. If false the printer will only print SymPy types. str_printer: function, optional, default=None A custom string printer function. This should mimic sympy.printing.sstrrepr(). pretty_printer: function, optional, default=None A custom pretty printer. This should mimic sympy.printing.pretty(). latex_printer: function, optional, default=None A custom LaTeX printer. This should mimic sympy.printing.latex(). scale: float, optional, default=1.0 Scale the LaTeX output when using the ``png`` backend. Useful for high dpi screens. Examples ======== >>> from sympy.interactive import init_printing >>> from sympy import Symbol, sqrt >>> from sympy.abc import x, y >>> sqrt(5) sqrt(5) >>> init_printing(pretty_print=True) # doctest: +SKIP >>> sqrt(5) # doctest: +SKIP ___ \/ 5 >>> theta = Symbol('theta') # doctest: +SKIP >>> init_printing(use_unicode=True) # doctest: +SKIP >>> theta # doctest: +SKIP \u03b8 >>> init_printing(use_unicode=False) # doctest: +SKIP >>> theta # doctest: +SKIP theta >>> init_printing(order='lex') # doctest: +SKIP >>> str(y + x + y**2 + x**2) # doctest: +SKIP x**2 + x + y**2 + y >>> init_printing(order='grlex') # doctest: +SKIP >>> str(y + x + y**2 + x**2) # doctest: +SKIP x**2 + x + y**2 + y >>> init_printing(order='grevlex') # doctest: +SKIP >>> str(y * x**2 + x * y**2) # doctest: +SKIP x**2*y + x*y**2 >>> init_printing(order='old') # doctest: +SKIP >>> str(x**2 + y**2 + x + y) # doctest: +SKIP x**2 + x + y**2 + y >>> init_printing(num_columns=10) # doctest: +SKIP >>> x**2 + x + y**2 + y # doctest: +SKIP x + y + x**2 + y**2 """ import sys from sympy.printing.printer import Printer if pretty_print: if pretty_printer is not None: stringify_func = pretty_printer else: from sympy.printing import pretty as stringify_func else: if str_printer is not None: stringify_func = str_printer else: from sympy.printing import sstrrepr as stringify_func # Even if ip is not passed, double check that not in IPython shell in_ipython = False if ip is None: try: ip = get_ipython() except NameError: pass else: in_ipython = (ip is not None) if ip and not in_ipython: in_ipython = _is_ipython(ip) if in_ipython and pretty_print: try: import IPython # IPython 1.0 deprecates the frontend module, so we import directly # from the terminal module to prevent a deprecation message from being # shown. if V(IPython.__version__) >= '1.0': from IPython.terminal.interactiveshell import TerminalInteractiveShell else: from IPython.frontend.terminal.interactiveshell import TerminalInteractiveShell from code import InteractiveConsole except ImportError: pass else: # This will be True if we are in the qtconsole or notebook if not isinstance(ip, (InteractiveConsole, TerminalInteractiveShell)) \ and 'ipython-console' not in ''.join(sys.argv): if use_unicode is None: debug("init_printing: Setting use_unicode to True") use_unicode = True if use_latex is None: debug("init_printing: Setting use_latex to True") use_latex = True if not NO_GLOBAL and not no_global: Printer.set_global_settings(order=order, use_unicode=use_unicode, wrap_line=wrap_line, num_columns=num_columns) else: _stringify_func = stringify_func if pretty_print: stringify_func = lambda expr: \ _stringify_func(expr, order=order, use_unicode=use_unicode, wrap_line=wrap_line, num_columns=num_columns) else: stringify_func = lambda expr: _stringify_func(expr, order=order) if in_ipython: mode_in_settings = settings.pop("mode", None) if mode_in_settings: debug("init_printing: Mode is not able to be set due to internals" "of IPython printing") _init_ipython_printing(ip, stringify_func, use_latex, euler, forecolor, backcolor, fontsize, latex_mode, print_builtin, latex_printer, scale, **settings) else: _init_python_printing(stringify_func, **settings)

bf4d39614e55400559dd4df8576eb4ee96139b93f9688e706b91295f50997ef2

"""Tools for setting up interactive sessions. """ from __future__ import print_function, division from distutils.version import LooseVersion as V from sympy.external import import_module from sympy.interactive.printing import init_printing preexec_source = """\ from __future__ import division from sympy import * x, y, z, t = symbols('x y z t') k, m, n = symbols('k m n', integer=True) f, g, h = symbols('f g h', cls=Function) init_printing() """ verbose_message = """\ These commands were executed: %(source)s Documentation can be found at https://docs.sympy.org/%(version)s """ no_ipython = """\ Couldn't locate IPython. Having IPython installed is greatly recommended. See http://ipython.scipy.org for more details. If you use Debian/Ubuntu, just install the 'ipython' package and start isympy again. """ def _make_message(ipython=True, quiet=False, source=None): """Create a banner for an interactive session. """ from sympy import __version__ as sympy_version from sympy.polys.domains import GROUND_TYPES from sympy.utilities.misc import ARCH from sympy import SYMPY_DEBUG import sys import os if quiet: return "" python_version = "%d.%d.%d" % sys.version_info[:3] if ipython: shell_name = "IPython" else: shell_name = "Python" info = ['ground types: %s' % GROUND_TYPES] cache = os.getenv('SYMPY_USE_CACHE') if cache is not None and cache.lower() == 'no': info.append('cache: off') if SYMPY_DEBUG: info.append('debugging: on') args = shell_name, sympy_version, python_version, ARCH, ', '.join(info) message = "%s console for SymPy %s (Python %s-%s) (%s)\n" % args if source is None: source = preexec_source _source = "" for line in source.split('\n')[:-1]: if not line: _source += '\n' else: _source += '>>> ' + line + '\n' doc_version = sympy_version if 'dev' in doc_version: doc_version = "dev" else: doc_version = "%s/" % doc_version message += '\n' + verbose_message % {'source': _source, 'version': doc_version} return message def int_to_Integer(s): """ Wrap integer literals with Integer. This is based on the decistmt example from http://docs.python.org/library/tokenize.html. Only integer literals are converted. Float literals are left alone. Examples ======== >>> from __future__ import division >>> from sympy.interactive.session import int_to_Integer >>> from sympy import Integer >>> s = '1.2 + 1/2 - 0x12 + a1' >>> int_to_Integer(s) '1.2 +Integer (1 )/Integer (2 )-Integer (0x12 )+a1 ' >>> s = 'print (1/2)' >>> int_to_Integer(s) 'print (Integer (1 )/Integer (2 ))' >>> exec(s) 0.5 >>> exec(int_to_Integer(s)) 1/2 """ from tokenize import generate_tokens, untokenize, NUMBER, NAME, OP from sympy.core.compatibility import StringIO def _is_int(num): """ Returns true if string value num (with token NUMBER) represents an integer. """ # XXX: Is there something in the standard library that will do this? if '.' in num or 'j' in num.lower() or 'e' in num.lower(): return False return True result = [] g = generate_tokens(StringIO(s).readline) # tokenize the string for toknum, tokval, _, _, _ in g: if toknum == NUMBER and _is_int(tokval): # replace NUMBER tokens result.extend([ (NAME, 'Integer'), (OP, '('), (NUMBER, tokval), (OP, ')') ]) else: result.append((toknum, tokval)) return untokenize(result) def enable_automatic_int_sympification(shell): """ Allow IPython to automatically convert integer literals to Integer. """ import ast old_run_cell = shell.run_cell def my_run_cell(cell, *args, **kwargs): try: # Check the cell for syntax errors. This way, the syntax error # will show the original input, not the transformed input. The # downside here is that IPython magic like %timeit will not work # with transformed input (but on the other hand, IPython magic # that doesn't expect transformed input will continue to work). ast.parse(cell) except SyntaxError: pass else: cell = int_to_Integer(cell) old_run_cell(cell, *args, **kwargs) shell.run_cell = my_run_cell def enable_automatic_symbols(shell): """Allow IPython to automatically create symbols (``isympy -a``). """ # XXX: This should perhaps use tokenize, like int_to_Integer() above. # This would avoid re-executing the code, which can lead to subtle # issues. For example: # # In [1]: a = 1 # # In [2]: for i in range(10): # ...: a += 1 # ...: # # In [3]: a # Out[3]: 11 # # In [4]: a = 1 # # In [5]: for i in range(10): # ...: a += 1 # ...: print b # ...: # b # b # b # b # b # b # b # b # b # b # # In [6]: a # Out[6]: 12 # # Note how the for loop is executed again because `b` was not defined, but `a` # was already incremented once, so the result is that it is incremented # multiple times. import re re_nameerror = re.compile( "name '(?P<symbol>[A-Za-z_][A-Za-z0-9_]*)' is not defined") def _handler(self, etype, value, tb, tb_offset=None): """Handle :exc:`NameError` exception and allow injection of missing symbols. """ if etype is NameError and tb.tb_next and not tb.tb_next.tb_next: match = re_nameerror.match(str(value)) if match is not None: # XXX: Make sure Symbol is in scope. Otherwise you'll get infinite recursion. self.run_cell("%(symbol)s = Symbol('%(symbol)s')" % {'symbol': match.group("symbol")}, store_history=False) try: code = self.user_ns['In'][-1] except (KeyError, IndexError): pass else: self.run_cell(code, store_history=False) return None finally: self.run_cell("del %s" % match.group("symbol"), store_history=False) stb = self.InteractiveTB.structured_traceback( etype, value, tb, tb_offset=tb_offset) self._showtraceback(etype, value, stb) shell.set_custom_exc((NameError,), _handler) def init_ipython_session(shell=None, argv=[], auto_symbols=False, auto_int_to_Integer=False): """Construct new IPython session. """ import IPython if V(IPython.__version__) >= '0.11': if not shell: # use an app to parse the command line, and init config # IPython 1.0 deprecates the frontend module, so we import directly # from the terminal module to prevent a deprecation message from being # shown. if V(IPython.__version__) >= '1.0': from IPython.terminal import ipapp else: from IPython.frontend.terminal import ipapp app = ipapp.TerminalIPythonApp() # don't draw IPython banner during initialization: app.display_banner = False app.initialize(argv) shell = app.shell if auto_symbols: enable_automatic_symbols(shell) if auto_int_to_Integer: enable_automatic_int_sympification(shell) return shell else: from IPython.Shell import make_IPython return make_IPython(argv) def init_python_session(): """Construct new Python session. """ from code import InteractiveConsole class SymPyConsole(InteractiveConsole): """An interactive console with readline support. """ def __init__(self): InteractiveConsole.__init__(self) try: import readline except ImportError: pass else: import os import atexit readline.parse_and_bind('tab: complete') if hasattr(readline, 'read_history_file'): history = os.path.expanduser('~/.sympy-history') try: readline.read_history_file(history) except IOError: pass atexit.register(readline.write_history_file, history) return SymPyConsole() def init_session(ipython=None, pretty_print=True, order=None, use_unicode=None, use_latex=None, quiet=False, auto_symbols=False, auto_int_to_Integer=False, str_printer=None, pretty_printer=None, latex_printer=None, argv=[]): """ Initialize an embedded IPython or Python session. The IPython session is initiated with the --pylab option, without the numpy imports, so that matplotlib plotting can be interactive. Parameters ========== pretty_print: boolean If True, use pretty_print to stringify; if False, use sstrrepr to stringify. order: string or None There are a few different settings for this parameter: lex (default), which is lexographic order; grlex, which is graded lexographic order; grevlex, which is reversed graded lexographic order; old, which is used for compatibility reasons and for long expressions; None, which sets it to lex. use_unicode: boolean or None If True, use unicode characters; if False, do not use unicode characters. use_latex: boolean or None If True, use latex rendering if IPython GUI's; if False, do not use latex rendering. quiet: boolean If True, init_session will not print messages regarding its status; if False, init_session will print messages regarding its status. auto_symbols: boolean If True, IPython will automatically create symbols for you. If False, it will not. The default is False. auto_int_to_Integer: boolean If True, IPython will automatically wrap int literals with Integer, so that things like 1/2 give Rational(1, 2). If False, it will not. The default is False. ipython: boolean or None If True, printing will initialize for an IPython console; if False, printing will initialize for a normal console; The default is None, which automatically determines whether we are in an ipython instance or not. str_printer: function, optional, default=None A custom string printer function. This should mimic sympy.printing.sstrrepr(). pretty_printer: function, optional, default=None A custom pretty printer. This should mimic sympy.printing.pretty(). latex_printer: function, optional, default=None A custom LaTeX printer. This should mimic sympy.printing.latex() This should mimic sympy.printing.latex(). argv: list of arguments for IPython See sympy.bin.isympy for options that can be used to initialize IPython. See Also ======== sympy.interactive.printing.init_printing: for examples and the rest of the parameters. Examples ======== >>> from sympy import init_session, Symbol, sin, sqrt >>> sin(x) #doctest: +SKIP NameError: name 'x' is not defined >>> init_session() #doctest: +SKIP >>> sin(x) #doctest: +SKIP sin(x) >>> sqrt(5) #doctest: +SKIP ___ \\/ 5 >>> init_session(pretty_print=False) #doctest: +SKIP >>> sqrt(5) #doctest: +SKIP sqrt(5) >>> y + x + y**2 + x**2 #doctest: +SKIP x**2 + x + y**2 + y >>> init_session(order='grlex') #doctest: +SKIP >>> y + x + y**2 + x**2 #doctest: +SKIP x**2 + y**2 + x + y >>> init_session(order='grevlex') #doctest: +SKIP >>> y * x**2 + x * y**2 #doctest: +SKIP x**2*y + x*y**2 >>> init_session(order='old') #doctest: +SKIP >>> x**2 + y**2 + x + y #doctest: +SKIP x + y + x**2 + y**2 >>> theta = Symbol('theta') #doctest: +SKIP >>> theta #doctest: +SKIP theta >>> init_session(use_unicode=True) #doctest: +SKIP >>> theta # doctest: +SKIP \u03b8 """ import sys in_ipython = False if ipython is not False: try: import IPython except ImportError: if ipython is True: raise RuntimeError("IPython is not available on this system") ip = None else: try: from IPython import get_ipython ip = get_ipython() except ImportError: ip = None in_ipython = bool(ip) if ipython is None: ipython = in_ipython if ipython is False: ip = init_python_session() mainloop = ip.interact else: ip = init_ipython_session(ip, argv=argv, auto_symbols=auto_symbols, auto_int_to_Integer=auto_int_to_Integer) if V(IPython.__version__) >= '0.11': # runsource is gone, use run_cell instead, which doesn't # take a symbol arg. The second arg is `store_history`, # and False means don't add the line to IPython's history. ip.runsource = lambda src, symbol='exec': ip.run_cell(src, False) #Enable interactive plotting using pylab. try: ip.enable_pylab(import_all=False) except Exception: # Causes an import error if matplotlib is not installed. # Causes other errors (depending on the backend) if there # is no display, or if there is some problem in the # backend, so we have a bare "except Exception" here pass if not in_ipython: mainloop = ip.mainloop if auto_symbols and (not ipython or V(IPython.__version__) < '0.11'): raise RuntimeError("automatic construction of symbols is possible only in IPython 0.11 or above") if auto_int_to_Integer and (not ipython or V(IPython.__version__) < '0.11'): raise RuntimeError("automatic int to Integer transformation is possible only in IPython 0.11 or above") _preexec_source = preexec_source ip.runsource(_preexec_source, symbol='exec') init_printing(pretty_print=pretty_print, order=order, use_unicode=use_unicode, use_latex=use_latex, ip=ip, str_printer=str_printer, pretty_printer=pretty_printer, latex_printer=latex_printer) message = _make_message(ipython, quiet, _preexec_source) if not in_ipython: print(message) mainloop() sys.exit('Exiting ...') else: print(message) import atexit atexit.register(lambda: print("Exiting ...\n"))

524584e9402eff3540d24fbab7a75fc746057138c6bc3735db79ae98a846f647

"""Algorithms for computing symbolic roots of polynomials. """ from __future__ import print_function, division import math from sympy.core import S, I, pi from sympy.core.compatibility import ordered, range, reduce from sympy.core.exprtools import factor_terms from sympy.core.function import _mexpand from sympy.core.logic import fuzzy_not from sympy.core.mul import expand_2arg, Mul from sympy.core.numbers import Rational, igcd, comp from sympy.core.power import Pow from sympy.core.relational import Eq from sympy.core.symbol import Dummy, Symbol, symbols from sympy.core.sympify import sympify from sympy.functions import exp, sqrt, im, cos, acos, Piecewise from sympy.functions.elementary.miscellaneous import root from sympy.ntheory import divisors, isprime, nextprime from sympy.polys.polyerrors import (PolynomialError, GeneratorsNeeded, DomainError) from sympy.polys.polyquinticconst import PolyQuintic from sympy.polys.polytools import Poly, cancel, factor, gcd_list, discriminant from sympy.polys.rationaltools import together from sympy.polys.specialpolys import cyclotomic_poly from sympy.simplify import simplify, powsimp from sympy.utilities import public def roots_linear(f): """Returns a list of roots of a linear polynomial.""" r = -f.nth(0)/f.nth(1) dom = f.get_domain() if not dom.is_Numerical: if dom.is_Composite: r = factor(r) else: r = simplify(r) return [r] def roots_quadratic(f): """Returns a list of roots of a quadratic polynomial. If the domain is ZZ then the roots will be sorted with negatives coming before positives. The ordering will be the same for any numerical coefficients as long as the assumptions tested are correct, otherwise the ordering will not be sorted (but will be canonical). """ a, b, c = f.all_coeffs() dom = f.get_domain() def _sqrt(d): # remove squares from square root since both will be represented # in the results; a similar thing is happening in roots() but # must be duplicated here because not all quadratics are binomials co = [] other = [] for di in Mul.make_args(d): if di.is_Pow and di.exp.is_Integer and di.exp % 2 == 0: co.append(Pow(di.base, di.exp//2)) else: other.append(di) if co: d = Mul(*other) co = Mul(*co) return co*sqrt(d) return sqrt(d) def _simplify(expr): if dom.is_Composite: return factor(expr) else: return simplify(expr) if c is S.Zero: r0, r1 = S.Zero, -b/a if not dom.is_Numerical: r1 = _simplify(r1) elif r1.is_negative: r0, r1 = r1, r0 elif b is S.Zero: r = -c/a if not dom.is_Numerical: r = _simplify(r) R = _sqrt(r) r0 = -R r1 = R else: d = b**2 - 4*a*c A = 2*a B = -b/A if not dom.is_Numerical: d = _simplify(d) B = _simplify(B) D = factor_terms(_sqrt(d)/A) r0 = B - D r1 = B + D if a.is_negative: r0, r1 = r1, r0 elif not dom.is_Numerical: r0, r1 = [expand_2arg(i) for i in (r0, r1)] return [r0, r1] def roots_cubic(f, trig=False): """Returns a list of roots of a cubic polynomial. References ========== [1] https://en.wikipedia.org/wiki/Cubic_function, General formula for roots, (accessed November 17, 2014). """ if trig: a, b, c, d = f.all_coeffs() p = (3*a*c - b**2)/3/a**2 q = (2*b**3 - 9*a*b*c + 27*a**2*d)/(27*a**3) D = 18*a*b*c*d - 4*b**3*d + b**2*c**2 - 4*a*c**3 - 27*a**2*d**2 if (D > 0) == True: rv = [] for k in range(3): rv.append(2*sqrt(-p/3)*cos(acos(3*q/2/p*sqrt(-3/p))/3 - k*2*pi/3)) return [i - b/3/a for i in rv] _, a, b, c = f.monic().all_coeffs() if c is S.Zero: x1, x2 = roots([1, a, b], multiple=True) return [x1, S.Zero, x2] p = b - a**2/3 q = c - a*b/3 + 2*a**3/27 pon3 = p/3 aon3 = a/3 u1 = None if p is S.Zero: if q is S.Zero: return [-aon3]*3 if q.is_real: if q.is_positive: u1 = -root(q, 3) elif q.is_negative: u1 = root(-q, 3) elif q is S.Zero: y1, y2 = roots([1, 0, p], multiple=True) return [tmp - aon3 for tmp in [y1, S.Zero, y2]] elif q.is_real and q.is_negative: u1 = -root(-q/2 + sqrt(q**2/4 + pon3**3), 3) coeff = I*sqrt(3)/2 if u1 is None: u1 = S(1) u2 = -S.Half + coeff u3 = -S.Half - coeff a, b, c, d = S(1), a, b, c D0 = b**2 - 3*a*c D1 = 2*b**3 - 9*a*b*c + 27*a**2*d C = root((D1 + sqrt(D1**2 - 4*D0**3))/2, 3) return [-(b + uk*C + D0/C/uk)/3/a for uk in [u1, u2, u3]] u2 = u1*(-S.Half + coeff) u3 = u1*(-S.Half - coeff) if p is S.Zero: return [u1 - aon3, u2 - aon3, u3 - aon3] soln = [ -u1 + pon3/u1 - aon3, -u2 + pon3/u2 - aon3, -u3 + pon3/u3 - aon3 ] return soln def _roots_quartic_euler(p, q, r, a): """ Descartes-Euler solution of the quartic equation Parameters ========== p, q, r: coefficients of ``x**4 + p*x**2 + q*x + r`` a: shift of the roots Notes ===== This is a helper function for ``roots_quartic``. Look for solutions of the form :: ``x1 = sqrt(R) - sqrt(A + B*sqrt(R))`` ``x2 = -sqrt(R) - sqrt(A - B*sqrt(R))`` ``x3 = -sqrt(R) + sqrt(A - B*sqrt(R))`` ``x4 = sqrt(R) + sqrt(A + B*sqrt(R))`` To satisfy the quartic equation one must have ``p = -2*(R + A); q = -4*B*R; r = (R - A)**2 - B**2*R`` so that ``R`` must satisfy the Descartes-Euler resolvent equation ``64*R**3 + 32*p*R**2 + (4*p**2 - 16*r)*R - q**2 = 0`` If the resolvent does not have a rational solution, return None; in that case it is likely that the Ferrari method gives a simpler solution. Examples ======== >>> from sympy import S >>> from sympy.polys.polyroots import _roots_quartic_euler >>> p, q, r = -S(64)/5, -S(512)/125, -S(1024)/3125 >>> _roots_quartic_euler(p, q, r, S(0))[0] -sqrt(32*sqrt(5)/125 + 16/5) + 4*sqrt(5)/5 """ # solve the resolvent equation x = Dummy('x') eq = 64*x**3 + 32*p*x**2 + (4*p**2 - 16*r)*x - q**2 xsols = list(roots(Poly(eq, x), cubics=False).keys()) xsols = [sol for sol in xsols if sol.is_rational and sol.is_nonzero] if not xsols: return None R = max(xsols) c1 = sqrt(R) B = -q*c1/(4*R) A = -R - p/2 c2 = sqrt(A + B) c3 = sqrt(A - B) return [c1 - c2 - a, -c1 - c3 - a, -c1 + c3 - a, c1 + c2 - a] def roots_quartic(f): r""" Returns a list of roots of a quartic polynomial. There are many references for solving quartic expressions available [1-5]. This reviewer has found that many of them require one to select from among 2 or more possible sets of solutions and that some solutions work when one is searching for real roots but don't work when searching for complex roots (though this is not always stated clearly). The following routine has been tested and found to be correct for 0, 2 or 4 complex roots. The quasisymmetric case solution [6] looks for quartics that have the form `x**4 + A*x**3 + B*x**2 + C*x + D = 0` where `(C/A)**2 = D`. Although no general solution that is always applicable for all coefficients is known to this reviewer, certain conditions are tested to determine the simplest 4 expressions that can be returned: 1) `f = c + a*(a**2/8 - b/2) == 0` 2) `g = d - a*(a*(3*a**2/256 - b/16) + c/4) = 0` 3) if `f != 0` and `g != 0` and `p = -d + a*c/4 - b**2/12` then a) `p == 0` b) `p != 0` Examples ======== >>> from sympy import Poly, symbols, I >>> from sympy.polys.polyroots import roots_quartic >>> r = roots_quartic(Poly('x**4-6*x**3+17*x**2-26*x+20')) >>> # 4 complex roots: 1+-I*sqrt(3), 2+-I >>> sorted(str(tmp.evalf(n=2)) for tmp in r) ['1.0 + 1.7*I', '1.0 - 1.7*I', '2.0 + 1.0*I', '2.0 - 1.0*I'] References ========== 1. http://mathforum.org/dr.math/faq/faq.cubic.equations.html 2. https://en.wikipedia.org/wiki/Quartic_function#Summary_of_Ferrari.27s_method 3. http://planetmath.org/encyclopedia/GaloisTheoreticDerivationOfTheQuarticFormula.html 4. http://staff.bath.ac.uk/masjhd/JHD-CA.pdf 5. http://www.albmath.org/files/Math_5713.pdf 6. http://www.statemaster.com/encyclopedia/Quartic-equation 7. eqworld.ipmnet.ru/en/solutions/ae/ae0108.pdf """ _, a, b, c, d = f.monic().all_coeffs() if not d: return [S.Zero] + roots([1, a, b, c], multiple=True) elif (c/a)**2 == d: x, m = f.gen, c/a g = Poly(x**2 + a*x + b - 2*m, x) z1, z2 = roots_quadratic(g) h1 = Poly(x**2 - z1*x + m, x) h2 = Poly(x**2 - z2*x + m, x) r1 = roots_quadratic(h1) r2 = roots_quadratic(h2) return r1 + r2 else: a2 = a**2 e = b - 3*a2/8 f = _mexpand(c + a*(a2/8 - b/2)) g = _mexpand(d - a*(a*(3*a2/256 - b/16) + c/4)) aon4 = a/4 if f is S.Zero: y1, y2 = [sqrt(tmp) for tmp in roots([1, e, g], multiple=True)] return [tmp - aon4 for tmp in [-y1, -y2, y1, y2]] if g is S.Zero: y = [S.Zero] + roots([1, 0, e, f], multiple=True) return [tmp - aon4 for tmp in y] else: # Descartes-Euler method, see [7] sols = _roots_quartic_euler(e, f, g, aon4) if sols: return sols # Ferrari method, see [1, 2] a2 = a**2 e = b - 3*a2/8 f = c + a*(a2/8 - b/2) g = d - a*(a*(3*a2/256 - b/16) + c/4) p = -e**2/12 - g q = -e**3/108 + e*g/3 - f**2/8 TH = Rational(1, 3) def _ans(y): w = sqrt(e + 2*y) arg1 = 3*e + 2*y arg2 = 2*f/w ans = [] for s in [-1, 1]: root = sqrt(-(arg1 + s*arg2)) for t in [-1, 1]: ans.append((s*w - t*root)/2 - aon4) return ans # p == 0 case y1 = -5*e/6 - q**TH if p.is_zero: return _ans(y1) # if p != 0 then u below is not 0 root = sqrt(q**2/4 + p**3/27) r = -q/2 + root # or -q/2 - root u = r**TH # primary root of solve(x**3 - r, x) y2 = -5*e/6 + u - p/u/3 if fuzzy_not(p.is_zero): return _ans(y2) # sort it out once they know the values of the coefficients return [Piecewise((a1, Eq(p, 0)), (a2, True)) for a1, a2 in zip(_ans(y1), _ans(y2))] def roots_binomial(f): """Returns a list of roots of a binomial polynomial. If the domain is ZZ then the roots will be sorted with negatives coming before positives. The ordering will be the same for any numerical coefficients as long as the assumptions tested are correct, otherwise the ordering will not be sorted (but will be canonical). """ n = f.degree() a, b = f.nth(n), f.nth(0) base = -cancel(b/a) alpha = root(base, n) if alpha.is_number: alpha = alpha.expand(complex=True) # define some parameters that will allow us to order the roots. # If the domain is ZZ this is guaranteed to return roots sorted # with reals before non-real roots and non-real sorted according # to real part and imaginary part, e.g. -1, 1, -1 + I, 2 - I neg = base.is_negative even = n % 2 == 0 if neg: if even == True and (base + 1).is_positive: big = True else: big = False # get the indices in the right order so the computed # roots will be sorted when the domain is ZZ ks = [] imax = n//2 if even: ks.append(imax) imax -= 1 if not neg: ks.append(0) for i in range(imax, 0, -1): if neg: ks.extend([i, -i]) else: ks.extend([-i, i]) if neg: ks.append(0) if big: for i in range(0, len(ks), 2): pair = ks[i: i + 2] pair = list(reversed(pair)) # compute the roots roots, d = [], 2*I*pi/n for k in ks: zeta = exp(k*d).expand(complex=True) roots.append((alpha*zeta).expand(power_base=False)) return roots def _inv_totient_estimate(m): """ Find ``(L, U)`` such that ``L <= phi^-1(m) <= U``. Examples ======== >>> from sympy.polys.polyroots import _inv_totient_estimate >>> _inv_totient_estimate(192) (192, 840) >>> _inv_totient_estimate(400) (400, 1750) """ primes = [ d + 1 for d in divisors(m) if isprime(d + 1) ] a, b = 1, 1 for p in primes: a *= p b *= p - 1 L = m U = int(math.ceil(m*(float(a)/b))) P = p = 2 primes = [] while P <= U: p = nextprime(p) primes.append(p) P *= p P //= p b = 1 for p in primes[:-1]: b *= p - 1 U = int(math.ceil(m*(float(P)/b))) return L, U def roots_cyclotomic(f, factor=False): """Compute roots of cyclotomic polynomials. """ L, U = _inv_totient_estimate(f.degree()) for n in range(L, U + 1): g = cyclotomic_poly(n, f.gen, polys=True) if f == g: break else: # pragma: no cover raise RuntimeError("failed to find index of a cyclotomic polynomial") roots = [] if not factor: # get the indices in the right order so the computed # roots will be sorted h = n//2 ks = [i for i in range(1, n + 1) if igcd(i, n) == 1] ks.sort(key=lambda x: (x, -1) if x <= h else (abs(x - n), 1)) d = 2*I*pi/n for k in reversed(ks): roots.append(exp(k*d).expand(complex=True)) else: g = Poly(f, extension=root(-1, n)) for h, _ in ordered(g.factor_list()[1]): roots.append(-h.TC()) return roots def roots_quintic(f): """ Calculate exact roots of a solvable quintic """ result = [] coeff_5, coeff_4, p, q, r, s = f.all_coeffs() # Eqn must be of the form x^5 + px^3 + qx^2 + rx + s if coeff_4: return result if coeff_5 != 1: l = [p/coeff_5, q/coeff_5, r/coeff_5, s/coeff_5] if not all(coeff.is_Rational for coeff in l): return result f = Poly(f/coeff_5) quintic = PolyQuintic(f) # Eqn standardized. Algo for solving starts here if not f.is_irreducible: return result f20 = quintic.f20 # Check if f20 has linear factors over domain Z if f20.is_irreducible: return result # Now, we know that f is solvable for _factor in f20.factor_list()[1]: if _factor[0].is_linear: theta = _factor[0].root(0) break d = discriminant(f) delta = sqrt(d) # zeta = a fifth root of unity zeta1, zeta2, zeta3, zeta4 = quintic.zeta T = quintic.T(theta, d) tol = S(1e-10) alpha = T[1] + T[2]*delta alpha_bar = T[1] - T[2]*delta beta = T[3] + T[4]*delta beta_bar = T[3] - T[4]*delta disc = alpha**2 - 4*beta disc_bar = alpha_bar**2 - 4*beta_bar l0 = quintic.l0(theta) l1 = _quintic_simplify((-alpha + sqrt(disc)) / S(2)) l4 = _quintic_simplify((-alpha - sqrt(disc)) / S(2)) l2 = _quintic_simplify((-alpha_bar + sqrt(disc_bar)) / S(2)) l3 = _quintic_simplify((-alpha_bar - sqrt(disc_bar)) / S(2)) order = quintic.order(theta, d) test = (order*delta.n()) - ( (l1.n() - l4.n())*(l2.n() - l3.n()) ) # Comparing floats if not comp(test, 0, tol): l2, l3 = l3, l2 # Now we have correct order of l's R1 = l0 + l1*zeta1 + l2*zeta2 + l3*zeta3 + l4*zeta4 R2 = l0 + l3*zeta1 + l1*zeta2 + l4*zeta3 + l2*zeta4 R3 = l0 + l2*zeta1 + l4*zeta2 + l1*zeta3 + l3*zeta4 R4 = l0 + l4*zeta1 + l3*zeta2 + l2*zeta3 + l1*zeta4 Res = [None, [None]*5, [None]*5, [None]*5, [None]*5] Res_n = [None, [None]*5, [None]*5, [None]*5, [None]*5] sol = Symbol('sol') # Simplifying improves performance a lot for exact expressions R1 = _quintic_simplify(R1) R2 = _quintic_simplify(R2) R3 = _quintic_simplify(R3) R4 = _quintic_simplify(R4) # Solve imported here. Causing problems if imported as 'solve' # and hence the changed name from sympy.solvers.solvers import solve as _solve a, b = symbols('a b', cls=Dummy) _sol = _solve( sol**5 - a - I*b, sol) for i in range(5): _sol[i] = factor(_sol[i]) R1 = R1.as_real_imag() R2 = R2.as_real_imag() R3 = R3.as_real_imag() R4 = R4.as_real_imag() for i, currentroot in enumerate(_sol): Res[1][i] = _quintic_simplify(currentroot.subs({ a: R1[0], b: R1[1] })) Res[2][i] = _quintic_simplify(currentroot.subs({ a: R2[0], b: R2[1] })) Res[3][i] = _quintic_simplify(currentroot.subs({ a: R3[0], b: R3[1] })) Res[4][i] = _quintic_simplify(currentroot.subs({ a: R4[0], b: R4[1] })) for i in range(1, 5): for j in range(5): Res_n[i][j] = Res[i][j].n() Res[i][j] = _quintic_simplify(Res[i][j]) r1 = Res[1][0] r1_n = Res_n[1][0] for i in range(5): if comp(im(r1_n*Res_n[4][i]), 0, tol): r4 = Res[4][i] break # Now we have various Res values. Each will be a list of five # values. We have to pick one r value from those five for each Res u, v = quintic.uv(theta, d) testplus = (u + v*delta*sqrt(5)).n() testminus = (u - v*delta*sqrt(5)).n() # Evaluated numbers suffixed with _n # We will use evaluated numbers for calculation. Much faster. r4_n = r4.n() r2 = r3 = None for i in range(5): r2temp_n = Res_n[2][i] for j in range(5): # Again storing away the exact number and using # evaluated numbers in computations r3temp_n = Res_n[3][j] if (comp((r1_n*r2temp_n**2 + r4_n*r3temp_n**2 - testplus).n(), 0, tol) and comp((r3temp_n*r1_n**2 + r2temp_n*r4_n**2 - testminus).n(), 0, tol)): r2 = Res[2][i] r3 = Res[3][j] break if r2: break # Now, we have r's so we can get roots x1 = (r1 + r2 + r3 + r4)/5 x2 = (r1*zeta4 + r2*zeta3 + r3*zeta2 + r4*zeta1)/5 x3 = (r1*zeta3 + r2*zeta1 + r3*zeta4 + r4*zeta2)/5 x4 = (r1*zeta2 + r2*zeta4 + r3*zeta1 + r4*zeta3)/5 x5 = (r1*zeta1 + r2*zeta2 + r3*zeta3 + r4*zeta4)/5 result = [x1, x2, x3, x4, x5] # Now check if solutions are distinct saw = set() for r in result: r = r.n(2) if r in saw: # Roots were identical. Abort, return [] # and fall back to usual solve return [] saw.add(r) return result def _quintic_simplify(expr): expr = powsimp(expr) expr = cancel(expr) return together(expr) def _integer_basis(poly): """Compute coefficient basis for a polynomial over integers. Returns the integer ``div`` such that substituting ``x = div*y`` ``p(x) = m*q(y)`` where the coefficients of ``q`` are smaller than those of ``p``. For example ``x**5 + 512*x + 1024 = 0`` with ``div = 4`` becomes ``y**5 + 2*y + 1 = 0`` Returns the integer ``div`` or ``None`` if there is no possible scaling. Examples ======== >>> from sympy.polys import Poly >>> from sympy.abc import x >>> from sympy.polys.polyroots import _integer_basis >>> p = Poly(x**5 + 512*x + 1024, x, domain='ZZ') >>> _integer_basis(p) 4 """ monoms, coeffs = list(zip(*poly.terms())) monoms, = list(zip(*monoms)) coeffs = list(map(abs, coeffs)) if coeffs[0] < coeffs[-1]: coeffs = list(reversed(coeffs)) n = monoms[0] monoms = [n - i for i in reversed(monoms)] else: return None monoms = monoms[:-1] coeffs = coeffs[:-1] divs = reversed(divisors(gcd_list(coeffs))[1:]) try: div = next(divs) except StopIteration: return None while True: for monom, coeff in zip(monoms, coeffs): if coeff % div**monom != 0: try: div = next(divs) except StopIteration: return None else: break else: return div def preprocess_roots(poly): """Try to get rid of symbolic coefficients from ``poly``. """ coeff = S.One poly_func = poly.func try: _, poly = poly.clear_denoms(convert=True) except DomainError: return coeff, poly poly = poly.primitive()[1] poly = poly.retract() # TODO: This is fragile. Figure out how to make this independent of construct_domain(). if poly.get_domain().is_Poly and all(c.is_term for c in poly.rep.coeffs()): poly = poly.inject() strips = list(zip(*poly.monoms())) gens = list(poly.gens[1:]) base, strips = strips[0], strips[1:] for gen, strip in zip(list(gens), strips): reverse = False if strip[0] < strip[-1]: strip = reversed(strip) reverse = True ratio = None for a, b in zip(base, strip): if not a and not b: continue elif not a or not b: break elif b % a != 0: break else: _ratio = b // a if ratio is None: ratio = _ratio elif ratio != _ratio: break else: if reverse: ratio = -ratio poly = poly.eval(gen, 1) coeff *= gen**(-ratio) gens.remove(gen) if gens: poly = poly.eject(*gens) if poly.is_univariate and poly.get_domain().is_ZZ: basis = _integer_basis(poly) if basis is not None: n = poly.degree() def func(k, coeff): return coeff//basis**(n - k[0]) poly = poly.termwise(func) coeff *= basis if not isinstance(poly, poly_func): poly = poly_func(poly) return coeff, poly @public def roots(f, *gens, **flags): """ Computes symbolic roots of a univariate polynomial. Given a univariate polynomial f with symbolic coefficients (or a list of the polynomial's coefficients), returns a dictionary with its roots and their multiplicities. Only roots expressible via radicals will be returned. To get a complete set of roots use RootOf class or numerical methods instead. By default cubic and quartic formulas are used in the algorithm. To disable them because of unreadable output set ``cubics=False`` or ``quartics=False`` respectively. If cubic roots are real but are expressed in terms of complex numbers (casus irreducibilis [1]) the ``trig`` flag can be set to True to have the solutions returned in terms of cosine and inverse cosine functions. To get roots from a specific domain set the ``filter`` flag with one of the following specifiers: Z, Q, R, I, C. By default all roots are returned (this is equivalent to setting ``filter='C'``). By default a dictionary is returned giving a compact result in case of multiple roots. However to get a list containing all those roots set the ``multiple`` flag to True; the list will have identical roots appearing next to each other in the result. (For a given Poly, the all_roots method will give the roots in sorted numerical order.) Examples ======== >>> from sympy import Poly, roots >>> from sympy.abc import x, y >>> roots(x**2 - 1, x) {-1: 1, 1: 1} >>> p = Poly(x**2-1, x) >>> roots(p) {-1: 1, 1: 1} >>> p = Poly(x**2-y, x, y) >>> roots(Poly(p, x)) {-sqrt(y): 1, sqrt(y): 1} >>> roots(x**2 - y, x) {-sqrt(y): 1, sqrt(y): 1} >>> roots([1, 0, -1]) {-1: 1, 1: 1} References ========== .. [1] https://en.wikipedia.org/wiki/Cubic_function#Trigonometric_.28and_hyperbolic.29_method """ from sympy.polys.polytools import to_rational_coeffs flags = dict(flags) auto = flags.pop('auto', True) cubics = flags.pop('cubics', True) trig = flags.pop('trig', False) quartics = flags.pop('quartics', True) quintics = flags.pop('quintics', False) multiple = flags.pop('multiple', False) filter = flags.pop('filter', None) predicate = flags.pop('predicate', None) if isinstance(f, list): if gens: raise ValueError('redundant generators given') x = Dummy('x') poly, i = {}, len(f) - 1 for coeff in f: poly[i], i = sympify(coeff), i - 1 f = Poly(poly, x, field=True) else: try: f = Poly(f, *gens, **flags) if f.length == 2 and f.degree() != 1: # check for foo**n factors in the constant n = f.degree() npow_bases = [] others = [] expr = f.as_expr() con = expr.as_independent(*gens)[0] for p in Mul.make_args(con): if p.is_Pow and not p.exp % n: npow_bases.append(p.base**(p.exp/n)) else: others.append(p) if npow_bases: b = Mul(*npow_bases) B = Dummy() d = roots(Poly(expr - con + B**n*Mul(*others), *gens, **flags), *gens, **flags) rv = {} for k, v in d.items(): rv[k.subs(B, b)] = v return rv except GeneratorsNeeded: if multiple: return [] else: return {} if f.is_multivariate: raise PolynomialError('multivariate polynomials are not supported') def _update_dict(result, currentroot, k): if currentroot in result: result[currentroot] += k else: result[currentroot] = k def _try_decompose(f): """Find roots using functional decomposition. """ factors, roots = f.decompose(), [] for currentroot in _try_heuristics(factors[0]): roots.append(currentroot) for currentfactor in factors[1:]: previous, roots = list(roots), [] for currentroot in previous: g = currentfactor - Poly(currentroot, f.gen) for currentroot in _try_heuristics(g): roots.append(currentroot) return roots def _try_heuristics(f): """Find roots using formulas and some tricks. """ if f.is_ground: return [] if f.is_monomial: return [S(0)]*f.degree() if f.length() == 2: if f.degree() == 1: return list(map(cancel, roots_linear(f))) else: return roots_binomial(f) result = [] for i in [-1, 1]: if not f.eval(i): f = f.quo(Poly(f.gen - i, f.gen)) result.append(i) break n = f.degree() if n == 1: result += list(map(cancel, roots_linear(f))) elif n == 2: result += list(map(cancel, roots_quadratic(f))) elif f.is_cyclotomic: result += roots_cyclotomic(f) elif n == 3 and cubics: result += roots_cubic(f, trig=trig) elif n == 4 and quartics: result += roots_quartic(f) elif n == 5 and quintics: result += roots_quintic(f) return result (k,), f = f.terms_gcd() if not k: zeros = {} else: zeros = {S(0): k} coeff, f = preprocess_roots(f) if auto and f.get_domain().is_Ring: f = f.to_field() rescale_x = None translate_x = None result = {} if not f.is_ground: dom = f.get_domain() if not dom.is_Exact and dom.is_Numerical: for r in f.nroots(): _update_dict(result, r, 1) elif f.degree() == 1: result[roots_linear(f)[0]] = 1 elif f.length() == 2: roots_fun = roots_quadratic if f.degree() == 2 else roots_binomial for r in roots_fun(f): _update_dict(result, r, 1) else: _, factors = Poly(f.as_expr()).factor_list() if len(factors) == 1 and f.degree() == 2: for r in roots_quadratic(f): _update_dict(result, r, 1) else: if len(factors) == 1 and factors[0][1] == 1: if f.get_domain().is_EX: res = to_rational_coeffs(f) if res: if res[0] is None: translate_x, f = res[2:] else: rescale_x, f = res[1], res[-1] result = roots(f) if not result: for currentroot in _try_decompose(f): _update_dict(result, currentroot, 1) else: for r in _try_heuristics(f): _update_dict(result, r, 1) else: for currentroot in _try_decompose(f): _update_dict(result, currentroot, 1) else: for currentfactor, k in factors: for r in _try_heuristics(Poly(currentfactor, f.gen, field=True)): _update_dict(result, r, k) if coeff is not S.One: _result, result, = result, {} for currentroot, k in _result.items(): result[coeff*currentroot] = k if filter not in [None, 'C']: handlers = { 'Z': lambda r: r.is_Integer, 'Q': lambda r: r.is_Rational, 'R': lambda r: r.is_extended_real, 'I': lambda r: r.is_imaginary, } try: query = handlers[filter] except KeyError: raise ValueError("Invalid filter: %s" % filter) for zero in dict(result).keys(): if not query(zero): del result[zero] if predicate is not None: for zero in dict(result).keys(): if not predicate(zero): del result[zero] if rescale_x: result1 = {} for k, v in result.items(): result1[k*rescale_x] = v result = result1 if translate_x: result1 = {} for k, v in result.items(): result1[k + translate_x] = v result = result1 # adding zero roots after non-trivial roots have been translated result.update(zeros) if not multiple: return result else: zeros = [] for zero in ordered(result): zeros.extend([zero]*result[zero]) return zeros def root_factors(f, *gens, **args): """ Returns all factors of a univariate polynomial. Examples ======== >>> from sympy.abc import x, y >>> from sympy.polys.polyroots import root_factors >>> root_factors(x**2 - y, x) [x - sqrt(y), x + sqrt(y)] """ args = dict(args) filter = args.pop('filter', None) F = Poly(f, *gens, **args) if not F.is_Poly: return [f] if F.is_multivariate: raise ValueError('multivariate polynomials are not supported') x = F.gens[0] zeros = roots(F, filter=filter) if not zeros: factors = [F] else: factors, N = [], 0 for r, n in ordered(zeros.items()): factors, N = factors + [Poly(x - r, x)]*n, N + n if N < F.degree(): G = reduce(lambda p, q: p*q, factors) factors.append(F.quo(G)) if not isinstance(f, Poly): factors = [ f.as_expr() for f in factors ] return factors

771da21a7f683d228a24b36f61cc5090e22dd6ba7562bfc7e56e81eaa39d9ca5

"""Sparse polynomial rings. """ from __future__ import print_function, division from operator import add, mul, lt, le, gt, ge from types import GeneratorType from sympy.core.compatibility import is_sequence, reduce, string_types, range from sympy.core.expr import Expr from sympy.core.numbers import igcd, oo from sympy.core.symbol import Symbol, symbols as _symbols from sympy.core.sympify import CantSympify, sympify from sympy.ntheory.multinomial import multinomial_coefficients from sympy.polys.compatibility import IPolys from sympy.polys.constructor import construct_domain from sympy.polys.densebasic import dmp_to_dict, dmp_from_dict from sympy.polys.domains.domainelement import DomainElement from sympy.polys.domains.polynomialring import PolynomialRing from sympy.polys.heuristicgcd import heugcd from sympy.polys.monomials import MonomialOps from sympy.polys.orderings import lex from sympy.polys.polyerrors import ( CoercionFailed, GeneratorsError, ExactQuotientFailed, MultivariatePolynomialError) from sympy.polys.polyoptions import (Domain as DomainOpt, Order as OrderOpt, build_options) from sympy.polys.polyutils import (expr_from_dict, _dict_reorder, _parallel_dict_from_expr) from sympy.printing.defaults import DefaultPrinting from sympy.utilities import public from sympy.utilities.magic import pollute @public def ring(symbols, domain, order=lex): """Construct a polynomial ring returning ``(ring, x_1, ..., x_n)``. Parameters ========== symbols : str Symbol/Expr or sequence of str, Symbol/Expr (non-empty) domain : :class: `Domain` or coercible order : :class:, optional `Order` or coercible, optional, defaults to ``lex`` Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex >>> R, x, y, z = ring("x,y,z", ZZ, lex) >>> R Polynomial ring in x, y, z over ZZ with lex order >>> x + y + z x + y + z >>> type(_) <class 'sympy.polys.rings.PolyElement'> """ _ring = PolyRing(symbols, domain, order) return (_ring,) + _ring.gens @public def xring(symbols, domain, order=lex): """Construct a polynomial ring returning ``(ring, (x_1, ..., x_n))``. Parameters ========== symbols : str Symbol/Expr or sequence of str, Symbol/Expr (non-empty) domain : :class: `Domain` or coercible order : :class:, optional `Order` or coercible, optional, defaults to ``lex`` Examples ======== >>> from sympy.polys.rings import xring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex >>> R, (x, y, z) = xring("x,y,z", ZZ, lex) >>> R Polynomial ring in x, y, z over ZZ with lex order >>> x + y + z x + y + z >>> type(_) <class 'sympy.polys.rings.PolyElement'> """ _ring = PolyRing(symbols, domain, order) return (_ring, _ring.gens) @public def vring(symbols, domain, order=lex): """Construct a polynomial ring and inject ``x_1, ..., x_n`` into the global namespace. Parameters ========== symbols : str Symbol/Expr or sequence of str, Symbol/Expr (non-empty) domain : :class: `Domain` or coercible order : :class:, optional `Order` or coercible, optional, defaults to ``lex`` Examples ======== >>> from sympy.polys.rings import vring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex >>> vring("x,y,z", ZZ, lex) Polynomial ring in x, y, z over ZZ with lex order >>> x + y + z x + y + z >>> type(_) <class 'sympy.polys.rings.PolyElement'> """ _ring = PolyRing(symbols, domain, order) pollute([ sym.name for sym in _ring.symbols ], _ring.gens) return _ring @public def sring(exprs, *symbols, **options): """Construct a ring deriving generators and domain from options and input expressions. Parameters ========== exprs : :class: `Expr` or sequence of :class:`Expr` (sympifiable) symbols : sequence of :class:`Symbol`/:class:`Expr` options : keyword arguments understood by :class:`Options` Examples ======== >>> from sympy.core import symbols >>> from sympy.polys.rings import sring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex >>> x, y, z = symbols("x,y,z") >>> R, f = sring(x + 2*y + 3*z) >>> R Polynomial ring in x, y, z over ZZ with lex order >>> f x + 2*y + 3*z >>> type(_) <class 'sympy.polys.rings.PolyElement'> """ single = False if not is_sequence(exprs): exprs, single = [exprs], True exprs = list(map(sympify, exprs)) opt = build_options(symbols, options) # TODO: rewrite this so that it doesn't use expand() (see poly()). reps, opt = _parallel_dict_from_expr(exprs, opt) if opt.domain is None: # NOTE: this is inefficient because construct_domain() automatically # performs conversion to the target domain. It shouldn't do this. coeffs = sum([ list(rep.values()) for rep in reps ], []) opt.domain, _ = construct_domain(coeffs, opt=opt) _ring = PolyRing(opt.gens, opt.domain, opt.order) polys = list(map(_ring.from_dict, reps)) if single: return (_ring, polys[0]) else: return (_ring, polys) def _parse_symbols(symbols): if isinstance(symbols, string_types): return _symbols(symbols, seq=True) if symbols else () elif isinstance(symbols, Expr): return (symbols,) elif is_sequence(symbols): if all(isinstance(s, string_types) for s in symbols): return _symbols(symbols) elif all(isinstance(s, Expr) for s in symbols): return symbols raise GeneratorsError("expected a string, Symbol or expression or a non-empty sequence of strings, Symbols or expressions") _ring_cache = {} class PolyRing(DefaultPrinting, IPolys): """Multivariate distributed polynomial ring. """ def __new__(cls, symbols, domain, order=lex): symbols = tuple(_parse_symbols(symbols)) ngens = len(symbols) domain = DomainOpt.preprocess(domain) order = OrderOpt.preprocess(order) _hash_tuple = (cls.__name__, symbols, ngens, domain, order) obj = _ring_cache.get(_hash_tuple) if obj is None: if domain.is_Composite and set(symbols) & set(domain.symbols): raise GeneratorsError("polynomial ring and it's ground domain share generators") obj = object.__new__(cls) obj._hash_tuple = _hash_tuple obj._hash = hash(_hash_tuple) obj.dtype = type("PolyElement", (PolyElement,), {"ring": obj}) obj.symbols = symbols obj.ngens = ngens obj.domain = domain obj.order = order obj.zero_monom = (0,)*ngens obj.gens = obj._gens() obj._gens_set = set(obj.gens) obj._one = [(obj.zero_monom, domain.one)] if ngens: # These expect monomials in at least one variable codegen = MonomialOps(ngens) obj.monomial_mul = codegen.mul() obj.monomial_pow = codegen.pow() obj.monomial_mulpow = codegen.mulpow() obj.monomial_ldiv = codegen.ldiv() obj.monomial_div = codegen.div() obj.monomial_lcm = codegen.lcm() obj.monomial_gcd = codegen.gcd() else: monunit = lambda a, b: () obj.monomial_mul = monunit obj.monomial_pow = monunit obj.monomial_mulpow = lambda a, b, c: () obj.monomial_ldiv = monunit obj.monomial_div = monunit obj.monomial_lcm = monunit obj.monomial_gcd = monunit if order is lex: obj.leading_expv = lambda f: max(f) else: obj.leading_expv = lambda f: max(f, key=order) for symbol, generator in zip(obj.symbols, obj.gens): if isinstance(symbol, Symbol): name = symbol.name if not hasattr(obj, name): setattr(obj, name, generator) _ring_cache[_hash_tuple] = obj return obj def _gens(self): """Return a list of polynomial generators. """ one = self.domain.one _gens = [] for i in range(self.ngens): expv = self.monomial_basis(i) poly = self.zero poly[expv] = one _gens.append(poly) return tuple(_gens) def __getnewargs__(self): return (self.symbols, self.domain, self.order) def __getstate__(self): state = self.__dict__.copy() del state["leading_expv"] for key, value in state.items(): if key.startswith("monomial_"): del state[key] return state def __hash__(self): return self._hash def __eq__(self, other): return isinstance(other, PolyRing) and \ (self.symbols, self.domain, self.ngens, self.order) == \ (other.symbols, other.domain, other.ngens, other.order) def __ne__(self, other): return not self == other def clone(self, symbols=None, domain=None, order=None): return self.__class__(symbols or self.symbols, domain or self.domain, order or self.order) def monomial_basis(self, i): """Return the ith-basis element. """ basis = [0]*self.ngens basis[i] = 1 return tuple(basis) @property def zero(self): return self.dtype() @property def one(self): return self.dtype(self._one) def domain_new(self, element, orig_domain=None): return self.domain.convert(element, orig_domain) def ground_new(self, coeff): return self.term_new(self.zero_monom, coeff) def term_new(self, monom, coeff): coeff = self.domain_new(coeff) poly = self.zero if coeff: poly[monom] = coeff return poly def ring_new(self, element): if isinstance(element, PolyElement): if self == element.ring: return element elif isinstance(self.domain, PolynomialRing) and self.domain.ring == element.ring: return self.ground_new(element) else: raise NotImplementedError("conversion") elif isinstance(element, string_types): raise NotImplementedError("parsing") elif isinstance(element, dict): return self.from_dict(element) elif isinstance(element, list): try: return self.from_terms(element) except ValueError: return self.from_list(element) elif isinstance(element, Expr): return self.from_expr(element) else: return self.ground_new(element) __call__ = ring_new def from_dict(self, element): domain_new = self.domain_new poly = self.zero for monom, coeff in element.items(): coeff = domain_new(coeff) if coeff: poly[monom] = coeff return poly def from_terms(self, element): return self.from_dict(dict(element)) def from_list(self, element): return self.from_dict(dmp_to_dict(element, self.ngens-1, self.domain)) def _rebuild_expr(self, expr, mapping): domain = self.domain def _rebuild(expr): generator = mapping.get(expr) if generator is not None: return generator elif expr.is_Add: return reduce(add, list(map(_rebuild, expr.args))) elif expr.is_Mul: return reduce(mul, list(map(_rebuild, expr.args))) elif expr.is_Pow and expr.exp.is_Integer and expr.exp >= 0: return _rebuild(expr.base)**int(expr.exp) else: return domain.convert(expr) return _rebuild(sympify(expr)) def from_expr(self, expr): mapping = dict(list(zip(self.symbols, self.gens))) try: poly = self._rebuild_expr(expr, mapping) except CoercionFailed: raise ValueError("expected an expression convertible to a polynomial in %s, got %s" % (self, expr)) else: return self.ring_new(poly) def index(self, gen): """Compute index of ``gen`` in ``self.gens``. """ if gen is None: if self.ngens: i = 0 else: i = -1 # indicate impossible choice elif isinstance(gen, int): i = gen if 0 <= i and i < self.ngens: pass elif -self.ngens <= i and i <= -1: i = -i - 1 else: raise ValueError("invalid generator index: %s" % gen) elif isinstance(gen, self.dtype): try: i = self.gens.index(gen) except ValueError: raise ValueError("invalid generator: %s" % gen) elif isinstance(gen, string_types): try: i = self.symbols.index(gen) except ValueError: raise ValueError("invalid generator: %s" % gen) else: raise ValueError("expected a polynomial generator, an integer, a string or None, got %s" % gen) return i def drop(self, *gens): """Remove specified generators from this ring. """ indices = set(map(self.index, gens)) symbols = [ s for i, s in enumerate(self.symbols) if i not in indices ] if not symbols: return self.domain else: return self.clone(symbols=symbols) def __getitem__(self, key): symbols = self.symbols[key] if not symbols: return self.domain else: return self.clone(symbols=symbols) def to_ground(self): # TODO: should AlgebraicField be a Composite domain? if self.domain.is_Composite or hasattr(self.domain, 'domain'): return self.clone(domain=self.domain.domain) else: raise ValueError("%s is not a composite domain" % self.domain) def to_domain(self): return PolynomialRing(self) def to_field(self): from sympy.polys.fields import FracField return FracField(self.symbols, self.domain, self.order) @property def is_univariate(self): return len(self.gens) == 1 @property def is_multivariate(self): return len(self.gens) > 1 def add(self, *objs): """ Add a sequence of polynomials or containers of polynomials. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> R, x = ring("x", ZZ) >>> R.add([ x**2 + 2*i + 3 for i in range(4) ]) 4*x**2 + 24 >>> _.factor_list() (4, [(x**2 + 6, 1)]) """ p = self.zero for obj in objs: if is_sequence(obj, include=GeneratorType): p += self.add(*obj) else: p += obj return p def mul(self, *objs): """ Multiply a sequence of polynomials or containers of polynomials. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> R, x = ring("x", ZZ) >>> R.mul([ x**2 + 2*i + 3 for i in range(4) ]) x**8 + 24*x**6 + 206*x**4 + 744*x**2 + 945 >>> _.factor_list() (1, [(x**2 + 3, 1), (x**2 + 5, 1), (x**2 + 7, 1), (x**2 + 9, 1)]) """ p = self.one for obj in objs: if is_sequence(obj, include=GeneratorType): p *= self.mul(*obj) else: p *= obj return p def drop_to_ground(self, *gens): r""" Remove specified generators from the ring and inject them into its domain. """ indices = set(map(self.index, gens)) symbols = [s for i, s in enumerate(self.symbols) if i not in indices] gens = [gen for i, gen in enumerate(self.gens) if i not in indices] if not symbols: return self else: return self.clone(symbols=symbols, domain=self.drop(*gens)) def compose(self, other): """Add the generators of ``other`` to ``self``""" if self != other: syms = set(self.symbols).union(set(other.symbols)) return self.clone(symbols=list(syms)) else: return self def add_gens(self, symbols): """Add the elements of ``symbols`` as generators to ``self``""" syms = set(self.symbols).union(set(symbols)) return self.clone(symbols=list(syms)) class PolyElement(DomainElement, DefaultPrinting, CantSympify, dict): """Element of multivariate distributed polynomial ring. """ def new(self, init): return self.__class__(init) def parent(self): return self.ring.to_domain() def __getnewargs__(self): return (self.ring, list(self.iterterms())) _hash = None def __hash__(self): # XXX: This computes a hash of a dictionary, but currently we don't # protect dictionary from being changed so any use site modifications # will make hashing go wrong. Use this feature with caution until we # figure out how to make a safe API without compromising speed of this # low-level class. _hash = self._hash if _hash is None: self._hash = _hash = hash((self.ring, frozenset(self.items()))) return _hash def copy(self): """Return a copy of polynomial self. Polynomials are mutable; if one is interested in preserving a polynomial, and one plans to use inplace operations, one can copy the polynomial. This method makes a shallow copy. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> R, x, y = ring('x, y', ZZ) >>> p = (x + y)**2 >>> p1 = p.copy() >>> p2 = p >>> p[R.zero_monom] = 3 >>> p x**2 + 2*x*y + y**2 + 3 >>> p1 x**2 + 2*x*y + y**2 >>> p2 x**2 + 2*x*y + y**2 + 3 """ return self.new(self) def set_ring(self, new_ring): if self.ring == new_ring: return self elif self.ring.symbols != new_ring.symbols: terms = list(zip(*_dict_reorder(self, self.ring.symbols, new_ring.symbols))) return new_ring.from_terms(terms) else: return new_ring.from_dict(self) def as_expr(self, *symbols): if symbols and len(symbols) != self.ring.ngens: raise ValueError("not enough symbols, expected %s got %s" % (self.ring.ngens, len(symbols))) else: symbols = self.ring.symbols return expr_from_dict(self.as_expr_dict(), *symbols) def as_expr_dict(self): to_sympy = self.ring.domain.to_sympy return {monom: to_sympy(coeff) for monom, coeff in self.iterterms()} def clear_denoms(self): domain = self.ring.domain if not domain.is_Field or not domain.has_assoc_Ring: return domain.one, self ground_ring = domain.get_ring() common = ground_ring.one lcm = ground_ring.lcm denom = domain.denom for coeff in self.values(): common = lcm(common, denom(coeff)) poly = self.new([ (k, v*common) for k, v in self.items() ]) return common, poly def strip_zero(self): """Eliminate monomials with zero coefficient. """ for k, v in list(self.items()): if not v: del self[k] def __eq__(p1, p2): """Equality test for polynomials. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', ZZ) >>> p1 = (x + y)**2 + (x - y)**2 >>> p1 == 4*x*y False >>> p1 == 2*(x**2 + y**2) True """ if not p2: return not p1 elif isinstance(p2, PolyElement) and p2.ring == p1.ring: return dict.__eq__(p1, p2) elif len(p1) > 1: return False else: return p1.get(p1.ring.zero_monom) == p2 def __ne__(p1, p2): return not p1 == p2 def almosteq(p1, p2, tolerance=None): """Approximate equality test for polynomials. """ ring = p1.ring if isinstance(p2, ring.dtype): if set(p1.keys()) != set(p2.keys()): return False almosteq = ring.domain.almosteq for k in p1.keys(): if not almosteq(p1[k], p2[k], tolerance): return False return True elif len(p1) > 1: return False else: try: p2 = ring.domain.convert(p2) except CoercionFailed: return False else: return ring.domain.almosteq(p1.const(), p2, tolerance) def sort_key(self): return (len(self), self.terms()) def _cmp(p1, p2, op): if isinstance(p2, p1.ring.dtype): return op(p1.sort_key(), p2.sort_key()) else: return NotImplemented def __lt__(p1, p2): return p1._cmp(p2, lt) def __le__(p1, p2): return p1._cmp(p2, le) def __gt__(p1, p2): return p1._cmp(p2, gt) def __ge__(p1, p2): return p1._cmp(p2, ge) def _drop(self, gen): ring = self.ring i = ring.index(gen) if ring.ngens == 1: return i, ring.domain else: symbols = list(ring.symbols) del symbols[i] return i, ring.clone(symbols=symbols) def drop(self, gen): i, ring = self._drop(gen) if self.ring.ngens == 1: if self.is_ground: return self.coeff(1) else: raise ValueError("can't drop %s" % gen) else: poly = ring.zero for k, v in self.items(): if k[i] == 0: K = list(k) del K[i] poly[tuple(K)] = v else: raise ValueError("can't drop %s" % gen) return poly def _drop_to_ground(self, gen): ring = self.ring i = ring.index(gen) symbols = list(ring.symbols) del symbols[i] return i, ring.clone(symbols=symbols, domain=ring[i]) def drop_to_ground(self, gen): if self.ring.ngens == 1: raise ValueError("can't drop only generator to ground") i, ring = self._drop_to_ground(gen) poly = ring.zero gen = ring.domain.gens[0] for monom, coeff in self.iterterms(): mon = monom[:i] + monom[i+1:] if not mon in poly: poly[mon] = (gen**monom[i]).mul_ground(coeff) else: poly[mon] += (gen**monom[i]).mul_ground(coeff) return poly def to_dense(self): return dmp_from_dict(self, self.ring.ngens-1, self.ring.domain) def to_dict(self): return dict(self) def str(self, printer, precedence, exp_pattern, mul_symbol): if not self: return printer._print(self.ring.domain.zero) prec_mul = precedence["Mul"] prec_atom = precedence["Atom"] ring = self.ring symbols = ring.symbols ngens = ring.ngens zm = ring.zero_monom sexpvs = [] for expv, coeff in self.terms(): positive = ring.domain.is_positive(coeff) sign = " + " if positive else " - " sexpvs.append(sign) if expv == zm: scoeff = printer._print(coeff) if scoeff.startswith("-"): scoeff = scoeff[1:] else: if not positive: coeff = -coeff if coeff != 1: scoeff = printer.parenthesize(coeff, prec_mul, strict=True) else: scoeff = '' sexpv = [] for i in range(ngens): exp = expv[i] if not exp: continue symbol = printer.parenthesize(symbols[i], prec_atom, strict=True) if exp != 1: if exp != int(exp) or exp < 0: sexp = printer.parenthesize(exp, prec_atom, strict=False) else: sexp = exp sexpv.append(exp_pattern % (symbol, sexp)) else: sexpv.append('%s' % symbol) if scoeff: sexpv = [scoeff] + sexpv sexpvs.append(mul_symbol.join(sexpv)) if sexpvs[0] in [" + ", " - "]: head = sexpvs.pop(0) if head == " - ": sexpvs.insert(0, "-") return "".join(sexpvs) @property def is_generator(self): return self in self.ring._gens_set @property def is_ground(self): return not self or (len(self) == 1 and self.ring.zero_monom in self) @property def is_monomial(self): return not self or (len(self) == 1 and self.LC == 1) @property def is_term(self): return len(self) <= 1 @property def is_negative(self): return self.ring.domain.is_negative(self.LC) @property def is_positive(self): return self.ring.domain.is_positive(self.LC) @property def is_nonnegative(self): return self.ring.domain.is_nonnegative(self.LC) @property def is_nonpositive(self): return self.ring.domain.is_nonpositive(self.LC) @property def is_zero(f): return not f @property def is_one(f): return f == f.ring.one @property def is_monic(f): return f.ring.domain.is_one(f.LC) @property def is_primitive(f): return f.ring.domain.is_one(f.content()) @property def is_linear(f): return all(sum(monom) <= 1 for monom in f.itermonoms()) @property def is_quadratic(f): return all(sum(monom) <= 2 for monom in f.itermonoms()) @property def is_squarefree(f): if not f.ring.ngens: return True return f.ring.dmp_sqf_p(f) @property def is_irreducible(f): if not f.ring.ngens: return True return f.ring.dmp_irreducible_p(f) @property def is_cyclotomic(f): if f.ring.is_univariate: return f.ring.dup_cyclotomic_p(f) else: raise MultivariatePolynomialError("cyclotomic polynomial") def __neg__(self): return self.new([ (monom, -coeff) for monom, coeff in self.iterterms() ]) def __pos__(self): return self def __add__(p1, p2): """Add two polynomials. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', ZZ) >>> (x + y)**2 + (x - y)**2 2*x**2 + 2*y**2 """ if not p2: return p1.copy() ring = p1.ring if isinstance(p2, ring.dtype): p = p1.copy() get = p.get zero = ring.domain.zero for k, v in p2.items(): v = get(k, zero) + v if v: p[k] = v else: del p[k] return p elif isinstance(p2, PolyElement): if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: pass elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: return p2.__radd__(p1) else: return NotImplemented try: cp2 = ring.domain_new(p2) except CoercionFailed: return NotImplemented else: p = p1.copy() if not cp2: return p zm = ring.zero_monom if zm not in p1.keys(): p[zm] = cp2 else: if p2 == -p[zm]: del p[zm] else: p[zm] += cp2 return p def __radd__(p1, n): p = p1.copy() if not n: return p ring = p1.ring try: n = ring.domain_new(n) except CoercionFailed: return NotImplemented else: zm = ring.zero_monom if zm not in p1.keys(): p[zm] = n else: if n == -p[zm]: del p[zm] else: p[zm] += n return p def __sub__(p1, p2): """Subtract polynomial p2 from p1. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', ZZ) >>> p1 = x + y**2 >>> p2 = x*y + y**2 >>> p1 - p2 -x*y + x """ if not p2: return p1.copy() ring = p1.ring if isinstance(p2, ring.dtype): p = p1.copy() get = p.get zero = ring.domain.zero for k, v in p2.items(): v = get(k, zero) - v if v: p[k] = v else: del p[k] return p elif isinstance(p2, PolyElement): if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: pass elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: return p2.__rsub__(p1) else: return NotImplemented try: p2 = ring.domain_new(p2) except CoercionFailed: return NotImplemented else: p = p1.copy() zm = ring.zero_monom if zm not in p1.keys(): p[zm] = -p2 else: if p2 == p[zm]: del p[zm] else: p[zm] -= p2 return p def __rsub__(p1, n): """n - p1 with n convertible to the coefficient domain. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', ZZ) >>> p = x + y >>> 4 - p -x - y + 4 """ ring = p1.ring try: n = ring.domain_new(n) except CoercionFailed: return NotImplemented else: p = ring.zero for expv in p1: p[expv] = -p1[expv] p += n return p def __mul__(p1, p2): """Multiply two polynomials. Examples ======== >>> from sympy.polys.domains import QQ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', QQ) >>> p1 = x + y >>> p2 = x - y >>> p1*p2 x**2 - y**2 """ ring = p1.ring p = ring.zero if not p1 or not p2: return p elif isinstance(p2, ring.dtype): get = p.get zero = ring.domain.zero monomial_mul = ring.monomial_mul p2it = list(p2.items()) for exp1, v1 in p1.items(): for exp2, v2 in p2it: exp = monomial_mul(exp1, exp2) p[exp] = get(exp, zero) + v1*v2 p.strip_zero() return p elif isinstance(p2, PolyElement): if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: pass elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: return p2.__rmul__(p1) else: return NotImplemented try: p2 = ring.domain_new(p2) except CoercionFailed: return NotImplemented else: for exp1, v1 in p1.items(): v = v1*p2 if v: p[exp1] = v return p def __rmul__(p1, p2): """p2 * p1 with p2 in the coefficient domain of p1. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', ZZ) >>> p = x + y >>> 4 * p 4*x + 4*y """ p = p1.ring.zero if not p2: return p try: p2 = p.ring.domain_new(p2) except CoercionFailed: return NotImplemented else: for exp1, v1 in p1.items(): v = p2*v1 if v: p[exp1] = v return p def __pow__(self, n): """raise polynomial to power `n` Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.polys.rings import ring >>> _, x, y = ring('x, y', ZZ) >>> p = x + y**2 >>> p**3 x**3 + 3*x**2*y**2 + 3*x*y**4 + y**6 """ ring = self.ring if not n: if self: return ring.one else: raise ValueError("0**0") elif len(self) == 1: monom, coeff = list(self.items())[0] p = ring.zero if coeff == 1: p[ring.monomial_pow(monom, n)] = coeff else: p[ring.monomial_pow(monom, n)] = coeff**n return p # For ring series, we need negative and rational exponent support only # with monomials. n = int(n) if n < 0: raise ValueError("Negative exponent") elif n == 1: return self.copy() elif n == 2: return self.square() elif n == 3: return self*self.square() elif len(self) <= 5: # TODO: use an actual density measure return self._pow_multinomial(n) else: return self._pow_generic(n) def _pow_generic(self, n): p = self.ring.one c = self while True: if n & 1: p = p*c n -= 1 if not n: break c = c.square() n = n // 2 return p def _pow_multinomial(self, n): multinomials = list(multinomial_coefficients(len(self), n).items()) monomial_mulpow = self.ring.monomial_mulpow zero_monom = self.ring.zero_monom terms = list(self.iterterms()) zero = self.ring.domain.zero poly = self.ring.zero for multinomial, multinomial_coeff in multinomials: product_monom = zero_monom product_coeff = multinomial_coeff for exp, (monom, coeff) in zip(multinomial, terms): if exp: product_monom = monomial_mulpow(product_monom, monom, exp) product_coeff *= coeff**exp monom = tuple(product_monom) coeff = product_coeff coeff = poly.get(monom, zero) + coeff if coeff: poly[monom] = coeff else: del poly[monom] return poly def square(self): """square of a polynomial Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring('x, y', ZZ) >>> p = x + y**2 >>> p.square() x**2 + 2*x*y**2 + y**4 """ ring = self.ring p = ring.zero get = p.get keys = list(self.keys()) zero = ring.domain.zero monomial_mul = ring.monomial_mul for i in range(len(keys)): k1 = keys[i] pk = self[k1] for j in range(i): k2 = keys[j] exp = monomial_mul(k1, k2) p[exp] = get(exp, zero) + pk*self[k2] p = p.imul_num(2) get = p.get for k, v in self.items(): k2 = monomial_mul(k, k) p[k2] = get(k2, zero) + v**2 p.strip_zero() return p def __divmod__(p1, p2): ring = p1.ring if not p2: raise ZeroDivisionError("polynomial division") elif isinstance(p2, ring.dtype): return p1.div(p2) elif isinstance(p2, PolyElement): if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: pass elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: return p2.__rdivmod__(p1) else: return NotImplemented try: p2 = ring.domain_new(p2) except CoercionFailed: return NotImplemented else: return (p1.quo_ground(p2), p1.rem_ground(p2)) def __rdivmod__(p1, p2): return NotImplemented def __mod__(p1, p2): ring = p1.ring if not p2: raise ZeroDivisionError("polynomial division") elif isinstance(p2, ring.dtype): return p1.rem(p2) elif isinstance(p2, PolyElement): if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: pass elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: return p2.__rmod__(p1) else: return NotImplemented try: p2 = ring.domain_new(p2) except CoercionFailed: return NotImplemented else: return p1.rem_ground(p2) def __rmod__(p1, p2): return NotImplemented def __truediv__(p1, p2): ring = p1.ring if not p2: raise ZeroDivisionError("polynomial division") elif isinstance(p2, ring.dtype): if p2.is_monomial: return p1*(p2**(-1)) else: return p1.quo(p2) elif isinstance(p2, PolyElement): if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: pass elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: return p2.__rtruediv__(p1) else: return NotImplemented try: p2 = ring.domain_new(p2) except CoercionFailed: return NotImplemented else: return p1.quo_ground(p2) def __rtruediv__(p1, p2): return NotImplemented __floordiv__ = __div__ = __truediv__ __rfloordiv__ = __rdiv__ = __rtruediv__ # TODO: use // (__floordiv__) for exquo()? def _term_div(self): zm = self.ring.zero_monom domain = self.ring.domain domain_quo = domain.quo monomial_div = self.ring.monomial_div if domain.is_Field: def term_div(a_lm_a_lc, b_lm_b_lc): a_lm, a_lc = a_lm_a_lc b_lm, b_lc = b_lm_b_lc if b_lm == zm: # apparently this is a very common case monom = a_lm else: monom = monomial_div(a_lm, b_lm) if monom is not None: return monom, domain_quo(a_lc, b_lc) else: return None else: def term_div(a_lm_a_lc, b_lm_b_lc): a_lm, a_lc = a_lm_a_lc b_lm, b_lc = b_lm_b_lc if b_lm == zm: # apparently this is a very common case monom = a_lm else: monom = monomial_div(a_lm, b_lm) if not (monom is None or a_lc % b_lc): return monom, domain_quo(a_lc, b_lc) else: return None return term_div def div(self, fv): """Division algorithm, see [CLO] p64. fv array of polynomials return qv, r such that self = sum(fv[i]*qv[i]) + r All polynomials are required not to be Laurent polynomials. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring('x, y', ZZ) >>> f = x**3 >>> f0 = x - y**2 >>> f1 = x - y >>> qv, r = f.div((f0, f1)) >>> qv[0] x**2 + x*y**2 + y**4 >>> qv[1] 0 >>> r y**6 """ ring = self.ring ret_single = False if isinstance(fv, PolyElement): ret_single = True fv = [fv] if any(not f for f in fv): raise ZeroDivisionError("polynomial division") if not self: if ret_single: return ring.zero, ring.zero else: return [], ring.zero for f in fv: if f.ring != ring: raise ValueError('self and f must have the same ring') s = len(fv) qv = [ring.zero for i in range(s)] p = self.copy() r = ring.zero term_div = self._term_div() expvs = [fx.leading_expv() for fx in fv] while p: i = 0 divoccurred = 0 while i < s and divoccurred == 0: expv = p.leading_expv() term = term_div((expv, p[expv]), (expvs[i], fv[i][expvs[i]])) if term is not None: expv1, c = term qv[i] = qv[i]._iadd_monom((expv1, c)) p = p._iadd_poly_monom(fv[i], (expv1, -c)) divoccurred = 1 else: i += 1 if not divoccurred: expv = p.leading_expv() r = r._iadd_monom((expv, p[expv])) del p[expv] if expv == ring.zero_monom: r += p if ret_single: if not qv: return ring.zero, r else: return qv[0], r else: return qv, r def rem(self, G): f = self if isinstance(G, PolyElement): G = [G] if any(not g for g in G): raise ZeroDivisionError("polynomial division") ring = f.ring domain = ring.domain zero = domain.zero monomial_mul = ring.monomial_mul r = ring.zero term_div = f._term_div() ltf = f.LT f = f.copy() get = f.get while f: for g in G: tq = term_div(ltf, g.LT) if tq is not None: m, c = tq for mg, cg in g.iterterms(): m1 = monomial_mul(mg, m) c1 = get(m1, zero) - c*cg if not c1: del f[m1] else: f[m1] = c1 ltm = f.leading_expv() if ltm is not None: ltf = ltm, f[ltm] break else: ltm, ltc = ltf if ltm in r: r[ltm] += ltc else: r[ltm] = ltc del f[ltm] ltm = f.leading_expv() if ltm is not None: ltf = ltm, f[ltm] return r def quo(f, G): return f.div(G)[0] def exquo(f, G): q, r = f.div(G) if not r: return q else: raise ExactQuotientFailed(f, G) def _iadd_monom(self, mc): """add to self the monomial coeff*x0**i0*x1**i1*... unless self is a generator -- then just return the sum of the two. mc is a tuple, (monom, coeff), where monomial is (i0, i1, ...) Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring('x, y', ZZ) >>> p = x**4 + 2*y >>> m = (1, 2) >>> p1 = p._iadd_monom((m, 5)) >>> p1 x**4 + 5*x*y**2 + 2*y >>> p1 is p True >>> p = x >>> p1 = p._iadd_monom((m, 5)) >>> p1 5*x*y**2 + x >>> p1 is p False """ if self in self.ring._gens_set: cpself = self.copy() else: cpself = self expv, coeff = mc c = cpself.get(expv) if c is None: cpself[expv] = coeff else: c += coeff if c: cpself[expv] = c else: del cpself[expv] return cpself def _iadd_poly_monom(self, p2, mc): """add to self the product of (p)*(coeff*x0**i0*x1**i1*...) unless self is a generator -- then just return the sum of the two. mc is a tuple, (monom, coeff), where monomial is (i0, i1, ...) Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y, z = ring('x, y, z', ZZ) >>> p1 = x**4 + 2*y >>> p2 = y + z >>> m = (1, 2, 3) >>> p1 = p1._iadd_poly_monom(p2, (m, 3)) >>> p1 x**4 + 3*x*y**3*z**3 + 3*x*y**2*z**4 + 2*y """ p1 = self if p1 in p1.ring._gens_set: p1 = p1.copy() (m, c) = mc get = p1.get zero = p1.ring.domain.zero monomial_mul = p1.ring.monomial_mul for k, v in p2.items(): ka = monomial_mul(k, m) coeff = get(ka, zero) + v*c if coeff: p1[ka] = coeff else: del p1[ka] return p1 def degree(f, x=None): """ The leading degree in ``x`` or the main variable. Note that the degree of 0 is negative infinity (the SymPy object -oo). """ i = f.ring.index(x) if not f: return -oo elif i < 0: return 0 else: return max([ monom[i] for monom in f.itermonoms() ]) def degrees(f): """ A tuple containing leading degrees in all variables. Note that the degree of 0 is negative infinity (the SymPy object -oo) """ if not f: return (-oo,)*f.ring.ngens else: return tuple(map(max, list(zip(*f.itermonoms())))) def tail_degree(f, x=None): """ The tail degree in ``x`` or the main variable. Note that the degree of 0 is negative infinity (the SymPy object -oo) """ i = f.ring.index(x) if not f: return -oo elif i < 0: return 0 else: return min([ monom[i] for monom in f.itermonoms() ]) def tail_degrees(f): """ A tuple containing tail degrees in all variables. Note that the degree of 0 is negative infinity (the SymPy object -oo) """ if not f: return (-oo,)*f.ring.ngens else: return tuple(map(min, list(zip(*f.itermonoms())))) def leading_expv(self): """Leading monomial tuple according to the monomial ordering. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y, z = ring('x, y, z', ZZ) >>> p = x**4 + x**3*y + x**2*z**2 + z**7 >>> p.leading_expv() (4, 0, 0) """ if self: return self.ring.leading_expv(self) else: return None def _get_coeff(self, expv): return self.get(expv, self.ring.domain.zero) def coeff(self, element): """ Returns the coefficient that stands next to the given monomial. Parameters ========== element : PolyElement (with ``is_monomial = True``) or 1 Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y, z = ring("x,y,z", ZZ) >>> f = 3*x**2*y - x*y*z + 7*z**3 + 23 >>> f.coeff(x**2*y) 3 >>> f.coeff(x*y) 0 >>> f.coeff(1) 23 """ if element == 1: return self._get_coeff(self.ring.zero_monom) elif isinstance(element, self.ring.dtype): terms = list(element.iterterms()) if len(terms) == 1: monom, coeff = terms[0] if coeff == self.ring.domain.one: return self._get_coeff(monom) raise ValueError("expected a monomial, got %s" % element) def const(self): """Returns the constant coeffcient. """ return self._get_coeff(self.ring.zero_monom) @property def LC(self): return self._get_coeff(self.leading_expv()) @property def LM(self): expv = self.leading_expv() if expv is None: return self.ring.zero_monom else: return expv def leading_monom(self): """ Leading monomial as a polynomial element. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring('x, y', ZZ) >>> (3*x*y + y**2).leading_monom() x*y """ p = self.ring.zero expv = self.leading_expv() if expv: p[expv] = self.ring.domain.one return p @property def LT(self): expv = self.leading_expv() if expv is None: return (self.ring.zero_monom, self.ring.domain.zero) else: return (expv, self._get_coeff(expv)) def leading_term(self): """Leading term as a polynomial element. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring('x, y', ZZ) >>> (3*x*y + y**2).leading_term() 3*x*y """ p = self.ring.zero expv = self.leading_expv() if expv is not None: p[expv] = self[expv] return p def _sorted(self, seq, order): if order is None: order = self.ring.order else: order = OrderOpt.preprocess(order) if order is lex: return sorted(seq, key=lambda monom: monom[0], reverse=True) else: return sorted(seq, key=lambda monom: order(monom[0]), reverse=True) def coeffs(self, order=None): """Ordered list of polynomial coefficients. Parameters ========== order : :class:`Order` or coercible, optional Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex, grlex >>> _, x, y = ring("x, y", ZZ, lex) >>> f = x*y**7 + 2*x**2*y**3 >>> f.coeffs() [2, 1] >>> f.coeffs(grlex) [1, 2] """ return [ coeff for _, coeff in self.terms(order) ] def monoms(self, order=None): """Ordered list of polynomial monomials. Parameters ========== order : :class:`Order` or coercible, optional Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex, grlex >>> _, x, y = ring("x, y", ZZ, lex) >>> f = x*y**7 + 2*x**2*y**3 >>> f.monoms() [(2, 3), (1, 7)] >>> f.monoms(grlex) [(1, 7), (2, 3)] """ return [ monom for monom, _ in self.terms(order) ] def terms(self, order=None): """Ordered list of polynomial terms. Parameters ========== order : :class:`Order` or coercible, optional Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> from sympy.polys.orderings import lex, grlex >>> _, x, y = ring("x, y", ZZ, lex) >>> f = x*y**7 + 2*x**2*y**3 >>> f.terms() [((2, 3), 2), ((1, 7), 1)] >>> f.terms(grlex) [((1, 7), 1), ((2, 3), 2)] """ return self._sorted(list(self.items()), order) def itercoeffs(self): """Iterator over coefficients of a polynomial. """ return iter(self.values()) def itermonoms(self): """Iterator over monomials of a polynomial. """ return iter(self.keys()) def iterterms(self): """Iterator over terms of a polynomial. """ return iter(self.items()) def listcoeffs(self): """Unordered list of polynomial coefficients. """ return list(self.values()) def listmonoms(self): """Unordered list of polynomial monomials. """ return list(self.keys()) def listterms(self): """Unordered list of polynomial terms. """ return list(self.items()) def imul_num(p, c): """multiply inplace the polynomial p by an element in the coefficient ring, provided p is not one of the generators; else multiply not inplace Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring('x, y', ZZ) >>> p = x + y**2 >>> p1 = p.imul_num(3) >>> p1 3*x + 3*y**2 >>> p1 is p True >>> p = x >>> p1 = p.imul_num(3) >>> p1 3*x >>> p1 is p False """ if p in p.ring._gens_set: return p*c if not c: p.clear() return for exp in p: p[exp] *= c return p def content(f): """Returns GCD of polynomial's coefficients. """ domain = f.ring.domain cont = domain.zero gcd = domain.gcd for coeff in f.itercoeffs(): cont = gcd(cont, coeff) return cont def primitive(f): """Returns content and a primitive polynomial. """ cont = f.content() return cont, f.quo_ground(cont) def monic(f): """Divides all coefficients by the leading coefficient. """ if not f: return f else: return f.quo_ground(f.LC) def mul_ground(f, x): if not x: return f.ring.zero terms = [ (monom, coeff*x) for monom, coeff in f.iterterms() ] return f.new(terms) def mul_monom(f, monom): monomial_mul = f.ring.monomial_mul terms = [ (monomial_mul(f_monom, monom), f_coeff) for f_monom, f_coeff in f.items() ] return f.new(terms) def mul_term(f, term): monom, coeff = term if not f or not coeff: return f.ring.zero elif monom == f.ring.zero_monom: return f.mul_ground(coeff) monomial_mul = f.ring.monomial_mul terms = [ (monomial_mul(f_monom, monom), f_coeff*coeff) for f_monom, f_coeff in f.items() ] return f.new(terms) def quo_ground(f, x): domain = f.ring.domain if not x: raise ZeroDivisionError('polynomial division') if not f or x == domain.one: return f if domain.is_Field: quo = domain.quo terms = [ (monom, quo(coeff, x)) for monom, coeff in f.iterterms() ] else: terms = [ (monom, coeff // x) for monom, coeff in f.iterterms() if not (coeff % x) ] return f.new(terms) def quo_term(f, term): monom, coeff = term if not coeff: raise ZeroDivisionError("polynomial division") elif not f: return f.ring.zero elif monom == f.ring.zero_monom: return f.quo_ground(coeff) term_div = f._term_div() terms = [ term_div(t, term) for t in f.iterterms() ] return f.new([ t for t in terms if t is not None ]) def trunc_ground(f, p): if f.ring.domain.is_ZZ: terms = [] for monom, coeff in f.iterterms(): coeff = coeff % p if coeff > p // 2: coeff = coeff - p terms.append((monom, coeff)) else: terms = [ (monom, coeff % p) for monom, coeff in f.iterterms() ] poly = f.new(terms) poly.strip_zero() return poly rem_ground = trunc_ground def extract_ground(self, g): f = self fc = f.content() gc = g.content() gcd = f.ring.domain.gcd(fc, gc) f = f.quo_ground(gcd) g = g.quo_ground(gcd) return gcd, f, g def _norm(f, norm_func): if not f: return f.ring.domain.zero else: ground_abs = f.ring.domain.abs return norm_func([ ground_abs(coeff) for coeff in f.itercoeffs() ]) def max_norm(f): return f._norm(max) def l1_norm(f): return f._norm(sum) def deflate(f, *G): ring = f.ring polys = [f] + list(G) J = [0]*ring.ngens for p in polys: for monom in p.itermonoms(): for i, m in enumerate(monom): J[i] = igcd(J[i], m) for i, b in enumerate(J): if not b: J[i] = 1 J = tuple(J) if all(b == 1 for b in J): return J, polys H = [] for p in polys: h = ring.zero for I, coeff in p.iterterms(): N = [ i // j for i, j in zip(I, J) ] h[tuple(N)] = coeff H.append(h) return J, H def inflate(f, J): poly = f.ring.zero for I, coeff in f.iterterms(): N = [ i*j for i, j in zip(I, J) ] poly[tuple(N)] = coeff return poly def lcm(self, g): f = self domain = f.ring.domain if not domain.is_Field: fc, f = f.primitive() gc, g = g.primitive() c = domain.lcm(fc, gc) h = (f*g).quo(f.gcd(g)) if not domain.is_Field: return h.mul_ground(c) else: return h.monic() def gcd(f, g): return f.cofactors(g)[0] def cofactors(f, g): if not f and not g: zero = f.ring.zero return zero, zero, zero elif not f: h, cff, cfg = f._gcd_zero(g) return h, cff, cfg elif not g: h, cfg, cff = g._gcd_zero(f) return h, cff, cfg elif len(f) == 1: h, cff, cfg = f._gcd_monom(g) return h, cff, cfg elif len(g) == 1: h, cfg, cff = g._gcd_monom(f) return h, cff, cfg J, (f, g) = f.deflate(g) h, cff, cfg = f._gcd(g) return (h.inflate(J), cff.inflate(J), cfg.inflate(J)) def _gcd_zero(f, g): one, zero = f.ring.one, f.ring.zero if g.is_nonnegative: return g, zero, one else: return -g, zero, -one def _gcd_monom(f, g): ring = f.ring ground_gcd = ring.domain.gcd ground_quo = ring.domain.quo monomial_gcd = ring.monomial_gcd monomial_ldiv = ring.monomial_ldiv mf, cf = list(f.iterterms())[0] _mgcd, _cgcd = mf, cf for mg, cg in g.iterterms(): _mgcd = monomial_gcd(_mgcd, mg) _cgcd = ground_gcd(_cgcd, cg) h = f.new([(_mgcd, _cgcd)]) cff = f.new([(monomial_ldiv(mf, _mgcd), ground_quo(cf, _cgcd))]) cfg = f.new([(monomial_ldiv(mg, _mgcd), ground_quo(cg, _cgcd)) for mg, cg in g.iterterms()]) return h, cff, cfg def _gcd(f, g): ring = f.ring if ring.domain.is_QQ: return f._gcd_QQ(g) elif ring.domain.is_ZZ: return f._gcd_ZZ(g) else: # TODO: don't use dense representation (port PRS algorithms) return ring.dmp_inner_gcd(f, g) def _gcd_ZZ(f, g): return heugcd(f, g) def _gcd_QQ(self, g): f = self ring = f.ring new_ring = ring.clone(domain=ring.domain.get_ring()) cf, f = f.clear_denoms() cg, g = g.clear_denoms() f = f.set_ring(new_ring) g = g.set_ring(new_ring) h, cff, cfg = f._gcd_ZZ(g) h = h.set_ring(ring) c, h = h.LC, h.monic() cff = cff.set_ring(ring).mul_ground(ring.domain.quo(c, cf)) cfg = cfg.set_ring(ring).mul_ground(ring.domain.quo(c, cg)) return h, cff, cfg def cancel(self, g): """ Cancel common factors in a rational function ``f/g``. Examples ======== >>> from sympy.polys import ring, ZZ >>> R, x,y = ring("x,y", ZZ) >>> (2*x**2 - 2).cancel(x**2 - 2*x + 1) (2*x + 2, x - 1) """ f = self ring = f.ring if not f: return f, ring.one domain = ring.domain if not (domain.is_Field and domain.has_assoc_Ring): _, p, q = f.cofactors(g) if q.is_negative: p, q = -p, -q else: new_ring = ring.clone(domain=domain.get_ring()) cq, f = f.clear_denoms() cp, g = g.clear_denoms() f = f.set_ring(new_ring) g = g.set_ring(new_ring) _, p, q = f.cofactors(g) _, cp, cq = new_ring.domain.cofactors(cp, cq) p = p.set_ring(ring) q = q.set_ring(ring) p_neg = p.is_negative q_neg = q.is_negative if p_neg and q_neg: p, q = -p, -q elif p_neg: cp, p = -cp, -p elif q_neg: cp, q = -cp, -q p = p.mul_ground(cp) q = q.mul_ground(cq) return p, q def diff(f, x): """Computes partial derivative in ``x``. Examples ======== >>> from sympy.polys.rings import ring >>> from sympy.polys.domains import ZZ >>> _, x, y = ring("x,y", ZZ) >>> p = x + x**2*y**3 >>> p.diff(x) 2*x*y**3 + 1 """ ring = f.ring i = ring.index(x) m = ring.monomial_basis(i) g = ring.zero for expv, coeff in f.iterterms(): if expv[i]: e = ring.monomial_ldiv(expv, m) g[e] = ring.domain_new(coeff*expv[i]) return g def __call__(f, *values): if 0 < len(values) <= f.ring.ngens: return f.evaluate(list(zip(f.ring.gens, values))) else: raise ValueError("expected at least 1 and at most %s values, got %s" % (f.ring.ngens, len(values))) def evaluate(self, x, a=None): f = self if isinstance(x, list) and a is None: (X, a), x = x[0], x[1:] f = f.evaluate(X, a) if not x: return f else: x = [ (Y.drop(X), a) for (Y, a) in x ] return f.evaluate(x) ring = f.ring i = ring.index(x) a = ring.domain.convert(a) if ring.ngens == 1: result = ring.domain.zero for (n,), coeff in f.iterterms(): result += coeff*a**n return result else: poly = ring.drop(x).zero for monom, coeff in f.iterterms(): n, monom = monom[i], monom[:i] + monom[i+1:] coeff = coeff*a**n if monom in poly: coeff = coeff + poly[monom] if coeff: poly[monom] = coeff else: del poly[monom] else: if coeff: poly[monom] = coeff return poly def subs(self, x, a=None): f = self if isinstance(x, list) and a is None: for X, a in x: f = f.subs(X, a) return f ring = f.ring i = ring.index(x) a = ring.domain.convert(a) if ring.ngens == 1: result = ring.domain.zero for (n,), coeff in f.iterterms(): result += coeff*a**n return ring.ground_new(result) else: poly = ring.zero for monom, coeff in f.iterterms(): n, monom = monom[i], monom[:i] + (0,) + monom[i+1:] coeff = coeff*a**n if monom in poly: coeff = coeff + poly[monom] if coeff: poly[monom] = coeff else: del poly[monom] else: if coeff: poly[monom] = coeff return poly def compose(f, x, a=None): ring = f.ring poly = ring.zero gens_map = dict(list(zip(ring.gens, list(range(ring.ngens))))) if a is not None: replacements = [(x, a)] else: if isinstance(x, list): replacements = list(x) elif isinstance(x, dict): replacements = sorted(list(x.items()), key=lambda k: gens_map[k[0]]) else: raise ValueError("expected a generator, value pair a sequence of such pairs") for k, (x, g) in enumerate(replacements): replacements[k] = (gens_map[x], ring.ring_new(g)) for monom, coeff in f.iterterms(): monom = list(monom) subpoly = ring.one for i, g in replacements: n, monom[i] = monom[i], 0 if n: subpoly *= g**n subpoly = subpoly.mul_term((tuple(monom), coeff)) poly += subpoly return poly # TODO: following methods should point to polynomial # representation independent algorithm implementations. def pdiv(f, g): return f.ring.dmp_pdiv(f, g) def prem(f, g): return f.ring.dmp_prem(f, g) def pquo(f, g): return f.ring.dmp_quo(f, g) def pexquo(f, g): return f.ring.dmp_exquo(f, g) def half_gcdex(f, g): return f.ring.dmp_half_gcdex(f, g) def gcdex(f, g): return f.ring.dmp_gcdex(f, g) def subresultants(f, g): return f.ring.dmp_subresultants(f, g) def resultant(f, g): return f.ring.dmp_resultant(f, g) def discriminant(f): return f.ring.dmp_discriminant(f) def decompose(f): if f.ring.is_univariate: return f.ring.dup_decompose(f) else: raise MultivariatePolynomialError("polynomial decomposition") def shift(f, a): if f.ring.is_univariate: return f.ring.dup_shift(f, a) else: raise MultivariatePolynomialError("polynomial shift") def sturm(f): if f.ring.is_univariate: return f.ring.dup_sturm(f) else: raise MultivariatePolynomialError("sturm sequence") def gff_list(f): return f.ring.dmp_gff_list(f) def sqf_norm(f): return f.ring.dmp_sqf_norm(f) def sqf_part(f): return f.ring.dmp_sqf_part(f) def sqf_list(f, all=False): return f.ring.dmp_sqf_list(f, all=all) def factor_list(f): return f.ring.dmp_factor_list(f)

bdd72748461e7533a233ef34ed3168bfa30027c2797b1cb50db7479f3a5e2769

from sympy.simplify import simplify as simp, trigsimp as tsimp from sympy.core.decorators import call_highest_priority, _sympifyit from sympy.core.assumptions import StdFactKB from sympy import factor as fctr, diff as df, Integral from sympy.core import S, Add, Mul, count_ops from sympy.core.expr import Expr class BasisDependent(Expr): """ Super class containing functionality common to vectors and dyadics. Named so because the representation of these quantities in sympy.vector is dependent on the basis they are expressed in. """ @call_highest_priority('__radd__') def __add__(self, other): return self._add_func(self, other) @call_highest_priority('__add__') def __radd__(self, other): return self._add_func(other, self) @call_highest_priority('__rsub__') def __sub__(self, other): return self._add_func(self, -other) @call_highest_priority('__sub__') def __rsub__(self, other): return self._add_func(other, -self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rmul__') def __mul__(self, other): return self._mul_func(self, other) @_sympifyit('other', NotImplemented) @call_highest_priority('__mul__') def __rmul__(self, other): return self._mul_func(other, self) def __neg__(self): return self._mul_func(S(-1), self) @_sympifyit('other', NotImplemented) @call_highest_priority('__rdiv__') def __div__(self, other): return self._div_helper(other) @call_highest_priority('__div__') def __rdiv__(self, other): return TypeError("Invalid divisor for division") __truediv__ = __div__ __rtruediv__ = __rdiv__ def evalf(self, prec=None, **options): """ Implements the SymPy evalf routine for this quantity. evalf's documentation ===================== """ vec = self.zero for k, v in self.components.items(): vec += v.evalf(prec, **options) * k return vec evalf.__doc__ += Expr.evalf.__doc__ n = evalf def simplify(self, **kwargs): """ Implements the SymPy simplify routine for this quantity. simplify's documentation ======================== """ simp_components = [simp(v, **kwargs) * k for k, v in self.components.items()] return self._add_func(*simp_components) simplify.__doc__ += simp.__doc__ def trigsimp(self, **opts): """ Implements the SymPy trigsimp routine, for this quantity. trigsimp's documentation ======================== """ trig_components = [tsimp(v, **opts) * k for k, v in self.components.items()] return self._add_func(*trig_components) trigsimp.__doc__ += tsimp.__doc__ def _eval_simplify(self, **kwargs): return self.simplify(**kwargs) def _eval_trigsimp(self, **opts): return self.trigsimp(**opts) def _eval_derivative(self, wrt): return self.diff(wrt) def _eval_Integral(self, *symbols, **assumptions): integral_components = [Integral(v, *symbols, **assumptions) * k for k, v in self.components.items()] return self._add_func(*integral_components) def as_numer_denom(self): """ Returns the expression as a tuple wrt the following transformation - expression -> a/b -> a, b """ return self, S.One def factor(self, *args, **kwargs): """ Implements the SymPy factor routine, on the scalar parts of a basis-dependent expression. factor's documentation ======================== """ fctr_components = [fctr(v, *args, **kwargs) * k for k, v in self.components.items()] return self._add_func(*fctr_components) factor.__doc__ += fctr.__doc__ def as_coeff_Mul(self, rational=False): """Efficiently extract the coefficient of a product. """ return (S(1), self) def as_coeff_add(self, *deps): """Efficiently extract the coefficient of a summation. """ l = [x * self.components[x] for x in self.components] return 0, tuple(l) def diff(self, *args, **kwargs): """ Implements the SymPy diff routine, for vectors. diff's documentation ======================== """ for x in args: if isinstance(x, BasisDependent): raise TypeError("Invalid arg for differentiation") diff_components = [df(v, *args, **kwargs) * k for k, v in self.components.items()] return self._add_func(*diff_components) diff.__doc__ += df.__doc__ def doit(self, **hints): """Calls .doit() on each term in the Dyadic""" doit_components = [self.components[x].doit(**hints) * x for x in self.components] return self._add_func(*doit_components) class BasisDependentAdd(BasisDependent, Add): """ Denotes sum of basis dependent quantities such that they cannot be expressed as base or Mul instances. """ def __new__(cls, *args, **options): components = {} # Check each arg and simultaneously learn the components for i, arg in enumerate(args): if not isinstance(arg, cls._expr_type): if isinstance(arg, Mul): arg = cls._mul_func(*(arg.args)) elif isinstance(arg, Add): arg = cls._add_func(*(arg.args)) else: raise TypeError(str(arg) + " cannot be interpreted correctly") # If argument is zero, ignore if arg == cls.zero: continue # Else, update components accordingly if hasattr(arg, "components"): for x in arg.components: components[x] = components.get(x, 0) + arg.components[x] temp = list(components.keys()) for x in temp: if components[x] == 0: del components[x] # Handle case of zero vector if len(components) == 0: return cls.zero # Build object newargs = [x * components[x] for x in components] obj = super(BasisDependentAdd, cls).__new__(cls, *newargs, **options) if isinstance(obj, Mul): return cls._mul_func(*obj.args) assumptions = {'commutative': True} obj._assumptions = StdFactKB(assumptions) obj._components = components obj._sys = (list(components.keys()))[0]._sys return obj __init__ = Add.__init__ class BasisDependentMul(BasisDependent, Mul): """ Denotes product of base- basis dependent quantity with a scalar. """ def __new__(cls, *args, **options): from sympy.vector import Cross, Dot, Curl, Gradient count = 0 measure_number = S(1) zeroflag = False extra_args = [] # Determine the component and check arguments # Also keep a count to ensure two vectors aren't # being multiplied for arg in args: if isinstance(arg, cls._zero_func): count += 1 zeroflag = True elif arg == S(0): zeroflag = True elif isinstance(arg, (cls._base_func, cls._mul_func)): count += 1 expr = arg._base_instance measure_number *= arg._measure_number elif isinstance(arg, cls._add_func): count += 1 expr = arg elif isinstance(arg, (Cross, Dot, Curl, Gradient)): extra_args.append(arg) else: measure_number *= arg # Make sure incompatible types weren't multiplied if count > 1: raise ValueError("Invalid multiplication") elif count == 0: return Mul(*args, **options) # Handle zero vector case if zeroflag: return cls.zero # If one of the args was a VectorAdd, return an # appropriate VectorAdd instance if isinstance(expr, cls._add_func): newargs = [cls._mul_func(measure_number, x) for x in expr.args] return cls._add_func(*newargs) obj = super(BasisDependentMul, cls).__new__(cls, measure_number, expr._base_instance, *extra_args, **options) if isinstance(obj, Add): return cls._add_func(*obj.args) obj._base_instance = expr._base_instance obj._measure_number = measure_number assumptions = {'commutative': True} obj._assumptions = StdFactKB(assumptions) obj._components = {expr._base_instance: measure_number} obj._sys = expr._base_instance._sys return obj __init__ = Mul.__init__ def __str__(self, printer=None): measure_str = self._measure_number.__str__() if ('(' in measure_str or '-' in measure_str or '+' in measure_str): measure_str = '(' + measure_str + ')' return measure_str + '*' + self._base_instance.__str__(printer) __repr__ = __str__ _sympystr = __str__ class BasisDependentZero(BasisDependent): """ Class to denote a zero basis dependent instance. """ components = {} def __new__(cls): obj = super(BasisDependentZero, cls).__new__(cls) # Pre-compute a specific hash value for the zero vector # Use the same one always obj._hash = tuple([S(0), cls]).__hash__() return obj def __hash__(self): return self._hash @call_highest_priority('__req__') def __eq__(self, other): return isinstance(other, self._zero_func) __req__ = __eq__ @call_highest_priority('__radd__') def __add__(self, other): if isinstance(other, self._expr_type): return other else: raise TypeError("Invalid argument types for addition") @call_highest_priority('__add__') def __radd__(self, other): if isinstance(other, self._expr_type): return other else: raise TypeError("Invalid argument types for addition") @call_highest_priority('__rsub__') def __sub__(self, other): if isinstance(other, self._expr_type): return -other else: raise TypeError("Invalid argument types for subtraction") @call_highest_priority('__sub__') def __rsub__(self, other): if isinstance(other, self._expr_type): return other else: raise TypeError("Invalid argument types for subtraction") def __neg__(self): return self def normalize(self): """ Returns the normalized version of this vector. """ return self def __str__(self, printer=None): return '0' __repr__ = __str__ _sympystr = __str__

7eefac7d77bdf29867a4e55ca2b714e235e906af0c2bcec3a2578513a189748e

from sympy.vector.coordsysrect import CoordSys3D from sympy.vector.deloperator import Del from sympy.vector.scalar import BaseScalar from sympy.vector.vector import Vector, BaseVector from sympy.vector.operators import gradient, curl, divergence from sympy import diff, integrate, S, simplify from sympy.core import sympify from sympy.vector.dyadic import Dyadic def express(expr, system, system2=None, variables=False): """ Global function for 'express' functionality. Re-expresses a Vector, Dyadic or scalar(sympyfiable) in the given coordinate system. If 'variables' is True, then the coordinate variables (base scalars) of other coordinate systems present in the vector/scalar field or dyadic are also substituted in terms of the base scalars of the given system. Parameters ========== expr : Vector/Dyadic/scalar(sympyfiable) The expression to re-express in CoordSys3D 'system' system: CoordSys3D The coordinate system the expr is to be expressed in system2: CoordSys3D The other coordinate system required for re-expression (only for a Dyadic Expr) variables : boolean Specifies whether to substitute the coordinate variables present in expr, in terms of those of parameter system Examples ======== >>> from sympy.vector import CoordSys3D >>> from sympy import Symbol, cos, sin >>> N = CoordSys3D('N') >>> q = Symbol('q') >>> B = N.orient_new_axis('B', q, N.k) >>> from sympy.vector import express >>> express(B.i, N) (cos(q))*N.i + (sin(q))*N.j >>> express(N.x, B, variables=True) B.x*cos(q) - B.y*sin(q) >>> d = N.i.outer(N.i) >>> express(d, B, N) == (cos(q))*(B.i|N.i) + (-sin(q))*(B.j|N.i) True """ if expr == 0 or expr == Vector.zero: return expr if not isinstance(system, CoordSys3D): raise TypeError("system should be a CoordSys3D \ instance") if isinstance(expr, Vector): if system2 is not None: raise ValueError("system2 should not be provided for \ Vectors") # Given expr is a Vector if variables: # If variables attribute is True, substitute # the coordinate variables in the Vector system_list = [] for x in expr.atoms(BaseScalar, BaseVector): if x.system != system: system_list.append(x.system) system_list = set(system_list) subs_dict = {} for f in system_list: subs_dict.update(f.scalar_map(system)) expr = expr.subs(subs_dict) # Re-express in this coordinate system outvec = Vector.zero parts = expr.separate() for x in parts: if x != system: temp = system.rotation_matrix(x) * parts[x].to_matrix(x) outvec += matrix_to_vector(temp, system) else: outvec += parts[x] return outvec elif isinstance(expr, Dyadic): if system2 is None: system2 = system if not isinstance(system2, CoordSys3D): raise TypeError("system2 should be a CoordSys3D \ instance") outdyad = Dyadic.zero var = variables for k, v in expr.components.items(): outdyad += (express(v, system, variables=var) * (express(k.args[0], system, variables=var) | express(k.args[1], system2, variables=var))) return outdyad else: if system2 is not None: raise ValueError("system2 should not be provided for \ Vectors") if variables: # Given expr is a scalar field system_set = set([]) expr = sympify(expr) # Substitute all the coordinate variables for x in expr.atoms(BaseScalar): if x.system != system: system_set.add(x.system) subs_dict = {} for f in system_set: subs_dict.update(f.scalar_map(system)) return expr.subs(subs_dict) return expr def directional_derivative(field, direction_vector): """ Returns the directional derivative of a scalar or vector field computed along a given vector in coordinate system which parameters are expressed. Parameters ========== field : Vector or Scalar The scalar or vector field to compute the directional derivative of direction_vector : Vector The vector to calculated directional derivative along them. Examples ======== >>> from sympy.vector import CoordSys3D, directional_derivative >>> R = CoordSys3D('R') >>> f1 = R.x*R.y*R.z >>> v1 = 3*R.i + 4*R.j + R.k >>> directional_derivative(f1, v1) R.x*R.y + 4*R.x*R.z + 3*R.y*R.z >>> f2 = 5*R.x**2*R.z >>> directional_derivative(f2, v1) 5*R.x**2 + 30*R.x*R.z """ from sympy.vector.operators import _get_coord_sys_from_expr coord_sys = _get_coord_sys_from_expr(field) if len(coord_sys) > 0: # TODO: This gets a random coordinate system in case of multiple ones: coord_sys = next(iter(coord_sys)) field = express(field, coord_sys, variables=True) i, j, k = coord_sys.base_vectors() x, y, z = coord_sys.base_scalars() out = Vector.dot(direction_vector, i) * diff(field, x) out += Vector.dot(direction_vector, j) * diff(field, y) out += Vector.dot(direction_vector, k) * diff(field, z) if out == 0 and isinstance(field, Vector): out = Vector.zero return out elif isinstance(field, Vector): return Vector.zero else: return S(0) def laplacian(expr): """ Return the laplacian of the given field computed in terms of the base scalars of the given coordinate system. Parameters ========== expr : SymPy Expr or Vector expr denotes a scalar or vector field. Examples ======== >>> from sympy.vector import CoordSys3D, laplacian >>> R = CoordSys3D('R') >>> f = R.x**2*R.y**5*R.z >>> laplacian(f) 20*R.x**2*R.y**3*R.z + 2*R.y**5*R.z >>> f = R.x**2*R.i + R.y**3*R.j + R.z**4*R.k >>> laplacian(f) 2*R.i + 6*R.y*R.j + 12*R.z**2*R.k """ delop = Del() if expr.is_Vector: return (gradient(divergence(expr)) - curl(curl(expr))).doit() return delop.dot(delop(expr)).doit() def is_conservative(field): """ Checks if a field is conservative. Parameters ========== field : Vector The field to check for conservative property Examples ======== >>> from sympy.vector import CoordSys3D >>> from sympy.vector import is_conservative >>> R = CoordSys3D('R') >>> is_conservative(R.y*R.z*R.i + R.x*R.z*R.j + R.x*R.y*R.k) True >>> is_conservative(R.z*R.j) False """ # Field is conservative irrespective of system # Take the first coordinate system in the result of the # separate method of Vector if not isinstance(field, Vector): raise TypeError("field should be a Vector") if field == Vector.zero: return True return curl(field).simplify() == Vector.zero def is_solenoidal(field): """ Checks if a field is solenoidal. Parameters ========== field : Vector The field to check for solenoidal property Examples ======== >>> from sympy.vector import CoordSys3D >>> from sympy.vector import is_solenoidal >>> R = CoordSys3D('R') >>> is_solenoidal(R.y*R.z*R.i + R.x*R.z*R.j + R.x*R.y*R.k) True >>> is_solenoidal(R.y * R.j) False """ # Field is solenoidal irrespective of system # Take the first coordinate system in the result of the # separate method in Vector if not isinstance(field, Vector): raise TypeError("field should be a Vector") if field == Vector.zero: return True return divergence(field).simplify() == S(0) def scalar_potential(field, coord_sys): """ Returns the scalar potential function of a field in a given coordinate system (without the added integration constant). Parameters ========== field : Vector The vector field whose scalar potential function is to be calculated coord_sys : CoordSys3D The coordinate system to do the calculation in Examples ======== >>> from sympy.vector import CoordSys3D >>> from sympy.vector import scalar_potential, gradient >>> R = CoordSys3D('R') >>> scalar_potential(R.k, R) == R.z True >>> scalar_field = 2*R.x**2*R.y*R.z >>> grad_field = gradient(scalar_field) >>> scalar_potential(grad_field, R) 2*R.x**2*R.y*R.z """ # Check whether field is conservative if not is_conservative(field): raise ValueError("Field is not conservative") if field == Vector.zero: return S(0) # Express the field exntirely in coord_sys # Substitute coordinate variables also if not isinstance(coord_sys, CoordSys3D): raise TypeError("coord_sys must be a CoordSys3D") field = express(field, coord_sys, variables=True) dimensions = coord_sys.base_vectors() scalars = coord_sys.base_scalars() # Calculate scalar potential function temp_function = integrate(field.dot(dimensions[0]), scalars[0]) for i, dim in enumerate(dimensions[1:]): partial_diff = diff(temp_function, scalars[i + 1]) partial_diff = field.dot(dim) - partial_diff temp_function += integrate(partial_diff, scalars[i + 1]) return temp_function def scalar_potential_difference(field, coord_sys, point1, point2): """ Returns the scalar potential difference between two points in a certain coordinate system, wrt a given field. If a scalar field is provided, its values at the two points are considered. If a conservative vector field is provided, the values of its scalar potential function at the two points are used. Returns (potential at point2) - (potential at point1) The position vectors of the two Points are calculated wrt the origin of the coordinate system provided. Parameters ========== field : Vector/Expr The field to calculate wrt coord_sys : CoordSys3D The coordinate system to do the calculations in point1 : Point The initial Point in given coordinate system position2 : Point The second Point in the given coordinate system Examples ======== >>> from sympy.vector import CoordSys3D, Point >>> from sympy.vector import scalar_potential_difference >>> R = CoordSys3D('R') >>> P = R.origin.locate_new('P', R.x*R.i + R.y*R.j + R.z*R.k) >>> vectfield = 4*R.x*R.y*R.i + 2*R.x**2*R.j >>> scalar_potential_difference(vectfield, R, R.origin, P) 2*R.x**2*R.y >>> Q = R.origin.locate_new('O', 3*R.i + R.j + 2*R.k) >>> scalar_potential_difference(vectfield, R, P, Q) -2*R.x**2*R.y + 18 """ if not isinstance(coord_sys, CoordSys3D): raise TypeError("coord_sys must be a CoordSys3D") if isinstance(field, Vector): # Get the scalar potential function scalar_fn = scalar_potential(field, coord_sys) else: # Field is a scalar scalar_fn = field # Express positions in required coordinate system origin = coord_sys.origin position1 = express(point1.position_wrt(origin), coord_sys, variables=True) position2 = express(point2.position_wrt(origin), coord_sys, variables=True) # Get the two positions as substitution dicts for coordinate variables subs_dict1 = {} subs_dict2 = {} scalars = coord_sys.base_scalars() for i, x in enumerate(coord_sys.base_vectors()): subs_dict1[scalars[i]] = x.dot(position1) subs_dict2[scalars[i]] = x.dot(position2) return scalar_fn.subs(subs_dict2) - scalar_fn.subs(subs_dict1) def matrix_to_vector(matrix, system): """ Converts a vector in matrix form to a Vector instance. It is assumed that the elements of the Matrix represent the measure numbers of the components of the vector along basis vectors of 'system'. Parameters ========== matrix : SymPy Matrix, Dimensions: (3, 1) The matrix to be converted to a vector system : CoordSys3D The coordinate system the vector is to be defined in Examples ======== >>> from sympy import ImmutableMatrix as Matrix >>> m = Matrix([1, 2, 3]) >>> from sympy.vector import CoordSys3D, matrix_to_vector >>> C = CoordSys3D('C') >>> v = matrix_to_vector(m, C) >>> v C.i + 2*C.j + 3*C.k >>> v.to_matrix(C) == m True """ outvec = Vector.zero vects = system.base_vectors() for i, x in enumerate(matrix): outvec += x * vects[i] return outvec def _path(from_object, to_object): """ Calculates the 'path' of objects starting from 'from_object' to 'to_object', along with the index of the first common ancestor in the tree. Returns (index, list) tuple. """ if from_object._root != to_object._root: raise ValueError("No connecting path found between " + str(from_object) + " and " + str(to_object)) other_path = [] obj = to_object while obj._parent is not None: other_path.append(obj) obj = obj._parent other_path.append(obj) object_set = set(other_path) from_path = [] obj = from_object while obj not in object_set: from_path.append(obj) obj = obj._parent index = len(from_path) i = other_path.index(obj) while i >= 0: from_path.append(other_path[i]) i -= 1 return index, from_path def orthogonalize(*vlist, **kwargs): """ Takes a sequence of independent vectors and orthogonalizes them using the Gram - Schmidt process. Returns a list of orthogonal or orthonormal vectors. Parameters ========== vlist : sequence of independent vectors to be made orthogonal. orthonormal : Optional parameter Set to True if the vectors returned should be orthonormal. Default: False Examples ======== >>> from sympy.vector.coordsysrect import CoordSys3D >>> from sympy.vector.vector import Vector, BaseVector >>> from sympy.vector.functions import orthogonalize >>> C = CoordSys3D('C') >>> i, j, k = C.base_vectors() >>> v1 = i + 2*j >>> v2 = 2*i + 3*j >>> orthogonalize(v1, v2) [C.i + 2*C.j, 2/5*C.i + (-1/5)*C.j] References ========== .. [1] https://en.wikipedia.org/wiki/Gram-Schmidt_process """ orthonormal = kwargs.get('orthonormal', False) if not all(isinstance(vec, Vector) for vec in vlist): raise TypeError('Each element must be of Type Vector') ortho_vlist = [] for i, term in enumerate(vlist): for j in range(i): term -= ortho_vlist[j].projection(vlist[i]) # TODO : The following line introduces a performance issue # and needs to be changed once a good solution for issue #10279 is # found. if simplify(term).equals(Vector.zero): raise ValueError("Vector set not linearly independent") ortho_vlist.append(term) if orthonormal: ortho_vlist = [vec.normalize() for vec in ortho_vlist] return ortho_vlist

2f92572010381bcd08bba00d4f084cc9dd1253904aa91b9a9481a8eb4b2bf0c5

"""The definition of the base geometrical entity with attributes common to all derived geometrical entities. Contains ======== GeometryEntity GeometricSet Notes ===== A GeometryEntity is any object that has special geometric properties. A GeometrySet is a superclass of any GeometryEntity that can also be viewed as a sympy.sets.Set. In particular, points are the only GeometryEntity not considered a Set. Rn is a GeometrySet representing n-dimensional Euclidean space. R2 and R3 are currently the only ambient spaces implemented. """ from __future__ import division, print_function from sympy.core.basic import Basic from sympy.core.compatibility import is_sequence from sympy.core.containers import Tuple from sympy.core.sympify import sympify from sympy.functions import cos, sin from sympy.matrices import eye from sympy.multipledispatch import dispatch from sympy.sets import Set from sympy.sets.handlers.intersection import intersection_sets from sympy.sets.handlers.union import union_sets from sympy.utilities.misc import func_name # How entities are ordered; used by __cmp__ in GeometryEntity ordering_of_classes = [ "Point2D", "Point3D", "Point", "Segment2D", "Ray2D", "Line2D", "Segment3D", "Line3D", "Ray3D", "Segment", "Ray", "Line", "Plane", "Triangle", "RegularPolygon", "Polygon", "Circle", "Ellipse", "Curve", "Parabola" ] class GeometryEntity(Basic): """The base class for all geometrical entities. This class doesn't represent any particular geometric entity, it only provides the implementation of some methods common to all subclasses. """ def __cmp__(self, other): """Comparison of two GeometryEntities.""" n1 = self.__class__.__name__ n2 = other.__class__.__name__ c = (n1 > n2) - (n1 < n2) if not c: return 0 i1 = -1 for cls in self.__class__.__mro__: try: i1 = ordering_of_classes.index(cls.__name__) break except ValueError: i1 = -1 if i1 == -1: return c i2 = -1 for cls in other.__class__.__mro__: try: i2 = ordering_of_classes.index(cls.__name__) break except ValueError: i2 = -1 if i2 == -1: return c return (i1 > i2) - (i1 < i2) def __contains__(self, other): """Subclasses should implement this method for anything more complex than equality.""" if type(self) == type(other): return self == other raise NotImplementedError() def __getnewargs__(self): """Returns a tuple that will be passed to __new__ on unpickling.""" return tuple(self.args) def __ne__(self, o): """Test inequality of two geometrical entities.""" return not self == o def __new__(cls, *args, **kwargs): # Points are sequences, but they should not # be converted to Tuples, so use this detection function instead. def is_seq_and_not_point(a): # we cannot use isinstance(a, Point) since we cannot import Point if hasattr(a, 'is_Point') and a.is_Point: return False return is_sequence(a) args = [Tuple(*a) if is_seq_and_not_point(a) else sympify(a) for a in args] return Basic.__new__(cls, *args) def __radd__(self, a): """Implementation of reverse add method.""" return a.__add__(self) def __rdiv__(self, a): """Implementation of reverse division method.""" return a.__div__(self) def __repr__(self): """String representation of a GeometryEntity that can be evaluated by sympy.""" return type(self).__name__ + repr(self.args) def __rmul__(self, a): """Implementation of reverse multiplication method.""" return a.__mul__(self) def __rsub__(self, a): """Implementation of reverse subtraction method.""" return a.__sub__(self) def __str__(self): """String representation of a GeometryEntity.""" from sympy.printing import sstr return type(self).__name__ + sstr(self.args) def _eval_subs(self, old, new): from sympy.geometry.point import Point, Point3D if is_sequence(old) or is_sequence(new): if isinstance(self, Point3D): old = Point3D(old) new = Point3D(new) else: old = Point(old) new = Point(new) return self._subs(old, new) def _repr_svg_(self): """SVG representation of a GeometryEntity suitable for IPython""" from sympy.core.evalf import N try: bounds = self.bounds except (NotImplementedError, TypeError): # if we have no SVG representation, return None so IPython # will fall back to the next representation return None svg_top = '''<svg xmlns="http://www.w3.org/2000/svg" xmlns:xlink="http://www.w3.org/1999/xlink" width="{1}" height="{2}" viewBox="{0}" preserveAspectRatio="xMinYMin meet"> <defs> <marker id="markerCircle" markerWidth="8" markerHeight="8" refx="5" refy="5" markerUnits="strokeWidth"> <circle cx="5" cy="5" r="1.5" style="stroke: none; fill:#000000;"/> </marker> <marker id="markerArrow" markerWidth="13" markerHeight="13" refx="2" refy="4" orient="auto" markerUnits="strokeWidth"> <path d="M2,2 L2,6 L6,4" style="fill: #000000;" /> </marker> <marker id="markerReverseArrow" markerWidth="13" markerHeight="13" refx="6" refy="4" orient="auto" markerUnits="strokeWidth"> <path d="M6,2 L6,6 L2,4" style="fill: #000000;" /> </marker> </defs>''' # Establish SVG canvas that will fit all the data + small space xmin, ymin, xmax, ymax = map(N, bounds) if xmin == xmax and ymin == ymax: # This is a point; buffer using an arbitrary size xmin, ymin, xmax, ymax = xmin - .5, ymin -.5, xmax + .5, ymax + .5 else: # Expand bounds by a fraction of the data ranges expand = 0.1 # or 10%; this keeps arrowheads in view (R plots use 4%) widest_part = max([xmax - xmin, ymax - ymin]) expand_amount = widest_part * expand xmin -= expand_amount ymin -= expand_amount xmax += expand_amount ymax += expand_amount dx = xmax - xmin dy = ymax - ymin width = min([max([100., dx]), 300]) height = min([max([100., dy]), 300]) scale_factor = 1. if max(width, height) == 0 else max(dx, dy) / max(width, height) try: svg = self._svg(scale_factor) except (NotImplementedError, TypeError): # if we have no SVG representation, return None so IPython # will fall back to the next representation return None view_box = "{0} {1} {2} {3}".format(xmin, ymin, dx, dy) transform = "matrix(1,0,0,-1,0,{0})".format(ymax + ymin) svg_top = svg_top.format(view_box, width, height) return svg_top + ( '<g transform="{0}">{1}</g></svg>' ).format(transform, svg) def _svg(self, scale_factor=1., fill_color="#66cc99"): """Returns SVG path element for the GeometryEntity. Parameters ========== scale_factor : float Multiplication factor for the SVG stroke-width. Default is 1. fill_color : str, optional Hex string for fill color. Default is "#66cc99". """ raise NotImplementedError() def _sympy_(self): return self @property def ambient_dimension(self): """What is the dimension of the space that the object is contained in?""" raise NotImplementedError() @property def bounds(self): """Return a tuple (xmin, ymin, xmax, ymax) representing the bounding rectangle for the geometric figure. """ raise NotImplementedError() def encloses(self, o): """ Return True if o is inside (not on or outside) the boundaries of self. The object will be decomposed into Points and individual Entities need only define an encloses_point method for their class. See Also ======== sympy.geometry.ellipse.Ellipse.encloses_point sympy.geometry.polygon.Polygon.encloses_point Examples ======== >>> from sympy import RegularPolygon, Point, Polygon >>> t = Polygon(*RegularPolygon(Point(0, 0), 1, 3).vertices) >>> t2 = Polygon(*RegularPolygon(Point(0, 0), 2, 3).vertices) >>> t2.encloses(t) True >>> t.encloses(t2) False """ from sympy.geometry.point import Point from sympy.geometry.line import Segment, Ray, Line from sympy.geometry.ellipse import Ellipse from sympy.geometry.polygon import Polygon, RegularPolygon if isinstance(o, Point): return self.encloses_point(o) elif isinstance(o, Segment): return all(self.encloses_point(x) for x in o.points) elif isinstance(o, Ray) or isinstance(o, Line): return False elif isinstance(o, Ellipse): return self.encloses_point(o.center) and \ self.encloses_point( Point(o.center.x + o.hradius, o.center.y)) and \ not self.intersection(o) elif isinstance(o, Polygon): if isinstance(o, RegularPolygon): if not self.encloses_point(o.center): return False return all(self.encloses_point(v) for v in o.vertices) raise NotImplementedError() def equals(self, o): return self == o def intersection(self, o): """ Returns a list of all of the intersections of self with o. Notes ===== An entity is not required to implement this method. If two different types of entities can intersect, the item with higher index in ordering_of_classes should implement intersections with anything having a lower index. See Also ======== sympy.geometry.util.intersection """ raise NotImplementedError() def is_similar(self, other): """Is this geometrical entity similar to another geometrical entity? Two entities are similar if a uniform scaling (enlarging or shrinking) of one of the entities will allow one to obtain the other. Notes ===== This method is not intended to be used directly but rather through the `are_similar` function found in util.py. An entity is not required to implement this method. If two different types of entities can be similar, it is only required that one of them be able to determine this. See Also ======== scale """ raise NotImplementedError() def reflect(self, line): """ Reflects an object across a line. Parameters ========== line: Line Examples ======== >>> from sympy import pi, sqrt, Line, RegularPolygon >>> l = Line((0, pi), slope=sqrt(2)) >>> pent = RegularPolygon((1, 2), 1, 5) >>> rpent = pent.reflect(l) >>> rpent RegularPolygon(Point2D(-2*sqrt(2)*pi/3 - 1/3 + 4*sqrt(2)/3, 2/3 + 2*sqrt(2)/3 + 2*pi/3), -1, 5, -atan(2*sqrt(2)) + 3*pi/5) >>> from sympy import pi, Line, Circle, Point >>> l = Line((0, pi), slope=1) >>> circ = Circle(Point(0, 0), 5) >>> rcirc = circ.reflect(l) >>> rcirc Circle(Point2D(-pi, pi), -5) """ from sympy import atan, Point, Dummy, oo g = self l = line o = Point(0, 0) if l.slope == 0: y = l.args[0].y if not y: # x-axis return g.scale(y=-1) reps = [(p, p.translate(y=2*(y - p.y))) for p in g.atoms(Point)] elif l.slope == oo: x = l.args[0].x if not x: # y-axis return g.scale(x=-1) reps = [(p, p.translate(x=2*(x - p.x))) for p in g.atoms(Point)] else: if not hasattr(g, 'reflect') and not all( isinstance(arg, Point) for arg in g.args): raise NotImplementedError( 'reflect undefined or non-Point args in %s' % g) a = atan(l.slope) c = l.coefficients d = -c[-1]/c[1] # y-intercept # apply the transform to a single point x, y = Dummy(), Dummy() xf = Point(x, y) xf = xf.translate(y=-d).rotate(-a, o).scale(y=-1 ).rotate(a, o).translate(y=d) # replace every point using that transform reps = [(p, xf.xreplace({x: p.x, y: p.y})) for p in g.atoms(Point)] return g.xreplace(dict(reps)) def rotate(self, angle, pt=None): """Rotate ``angle`` radians counterclockwise about Point ``pt``. The default pt is the origin, Point(0, 0) See Also ======== scale, translate Examples ======== >>> from sympy import Point, RegularPolygon, Polygon, pi >>> t = Polygon(*RegularPolygon(Point(0, 0), 1, 3).vertices) >>> t # vertex on x axis Triangle(Point2D(1, 0), Point2D(-1/2, sqrt(3)/2), Point2D(-1/2, -sqrt(3)/2)) >>> t.rotate(pi/2) # vertex on y axis now Triangle(Point2D(0, 1), Point2D(-sqrt(3)/2, -1/2), Point2D(sqrt(3)/2, -1/2)) """ newargs = [] for a in self.args: if isinstance(a, GeometryEntity): newargs.append(a.rotate(angle, pt)) else: newargs.append(a) return type(self)(*newargs) def scale(self, x=1, y=1, pt=None): """Scale the object by multiplying the x,y-coordinates by x and y. If pt is given, the scaling is done relative to that point; the object is shifted by -pt, scaled, and shifted by pt. See Also ======== rotate, translate Examples ======== >>> from sympy import RegularPolygon, Point, Polygon >>> t = Polygon(*RegularPolygon(Point(0, 0), 1, 3).vertices) >>> t Triangle(Point2D(1, 0), Point2D(-1/2, sqrt(3)/2), Point2D(-1/2, -sqrt(3)/2)) >>> t.scale(2) Triangle(Point2D(2, 0), Point2D(-1, sqrt(3)/2), Point2D(-1, -sqrt(3)/2)) >>> t.scale(2, 2) Triangle(Point2D(2, 0), Point2D(-1, sqrt(3)), Point2D(-1, -sqrt(3))) """ from sympy.geometry.point import Point if pt: pt = Point(pt, dim=2) return self.translate(*(-pt).args).scale(x, y).translate(*pt.args) return type(self)(*[a.scale(x, y) for a in self.args]) # if this fails, override this class def translate(self, x=0, y=0): """Shift the object by adding to the x,y-coordinates the values x and y. See Also ======== rotate, scale Examples ======== >>> from sympy import RegularPolygon, Point, Polygon >>> t = Polygon(*RegularPolygon(Point(0, 0), 1, 3).vertices) >>> t Triangle(Point2D(1, 0), Point2D(-1/2, sqrt(3)/2), Point2D(-1/2, -sqrt(3)/2)) >>> t.translate(2) Triangle(Point2D(3, 0), Point2D(3/2, sqrt(3)/2), Point2D(3/2, -sqrt(3)/2)) >>> t.translate(2, 2) Triangle(Point2D(3, 2), Point2D(3/2, sqrt(3)/2 + 2), Point2D(3/2, 2 - sqrt(3)/2)) """ newargs = [] for a in self.args: if isinstance(a, GeometryEntity): newargs.append(a.translate(x, y)) else: newargs.append(a) return self.func(*newargs) def parameter_value(self, other, t): """Return the parameter corresponding to the given point. Evaluating an arbitrary point of the entity at this parameter value will return the given point. Examples ======== >>> from sympy import Line, Point >>> from sympy.abc import t >>> a = Point(0, 0) >>> b = Point(2, 2) >>> Line(a, b).parameter_value((1, 1), t) {t: 1/2} >>> Line(a, b).arbitrary_point(t).subs(_) Point2D(1, 1) """ from sympy.geometry.point import Point from sympy.core.symbol import Dummy from sympy.solvers.solvers import solve if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if not isinstance(other, Point): raise ValueError("other must be a point") T = Dummy('t', real=True) sol = solve(self.arbitrary_point(T) - other, T, dict=True) if not sol: raise ValueError("Given point is not on %s" % func_name(self)) return {t: sol[0][T]} class GeometrySet(GeometryEntity, Set): """Parent class of all GeometryEntity that are also Sets (compatible with sympy.sets) """ def _contains(self, other): """sympy.sets uses the _contains method, so include it for compatibility.""" if isinstance(other, Set) and other.is_FiniteSet: return all(self.__contains__(i) for i in other) return self.__contains__(other) @dispatch(GeometrySet, Set) def union_sets(self, o): """ Returns the union of self and o for use with sympy.sets.Set, if possible. """ from sympy.sets import Union, FiniteSet # if its a FiniteSet, merge any points # we contain and return a union with the rest if o.is_FiniteSet: other_points = [p for p in o if not self._contains(p)] if len(other_points) == len(o): return None return Union(self, FiniteSet(*other_points)) if self._contains(o): return self return None @dispatch(GeometrySet, Set) def intersection_sets(self, o): """ Returns a sympy.sets.Set of intersection objects, if possible. """ from sympy.sets import Set, FiniteSet, Union from sympy.geometry import Point try: # if o is a FiniteSet, find the intersection directly # to avoid infinite recursion if o.is_FiniteSet: inter = FiniteSet(*(p for p in o if self.contains(p))) else: inter = self.intersection(o) except NotImplementedError: # sympy.sets.Set.reduce expects None if an object # doesn't know how to simplify return None # put the points in a FiniteSet points = FiniteSet(*[p for p in inter if isinstance(p, Point)]) non_points = [p for p in inter if not isinstance(p, Point)] return Union(*(non_points + [points])) def translate(x, y): """Return the matrix to translate a 2-D point by x and y.""" rv = eye(3) rv[2, 0] = x rv[2, 1] = y return rv def scale(x, y, pt=None): """Return the matrix to multiply a 2-D point's coordinates by x and y. If pt is given, the scaling is done relative to that point.""" rv = eye(3) rv[0, 0] = x rv[1, 1] = y if pt: from sympy.geometry.point import Point pt = Point(pt, dim=2) tr1 = translate(*(-pt).args) tr2 = translate(*pt.args) return tr1*rv*tr2 return rv def rotate(th): """Return the matrix to rotate a 2-D point about the origin by ``angle``. The angle is measured in radians. To Point a point about a point other then the origin, translate the Point, do the rotation, and translate it back: >>> from sympy.geometry.entity import rotate, translate >>> from sympy import Point, pi >>> rot_about_11 = translate(-1, -1)*rotate(pi/2)*translate(1, 1) >>> Point(1, 1).transform(rot_about_11) Point2D(1, 1) >>> Point(0, 0).transform(rot_about_11) Point2D(2, 0) """ s = sin(th) rv = eye(3)*cos(th) rv[0, 1] = s rv[1, 0] = -s rv[2, 2] = 1 return rv

72afc33ca6a50d0bcf078d7c4b36ff3a8749d65c02bbd57ca1714e4c4fd3602e

"""Utility functions for geometrical entities. Contains ======== intersection convex_hull closest_points farthest_points are_coplanar are_similar """ from __future__ import division, print_function from sympy import Function, Symbol, solve from sympy.core.compatibility import ( is_sequence, range, string_types, ordered) from sympy.core.containers import OrderedSet from .point import Point, Point2D def find(x, equation): """ Checks whether the parameter 'x' is present in 'equation' or not. If it is present then it returns the passed parameter 'x' as a free symbol, else, it returns a ValueError. """ free = equation.free_symbols xs = [i for i in free if (i.name if isinstance(x, string_types) else i) == x] if not xs: raise ValueError('could not find %s' % x) if len(xs) != 1: raise ValueError('ambiguous %s' % x) return xs[0] def _ordered_points(p): """Return the tuple of points sorted numerically according to args""" return tuple(sorted(p, key=lambda x: x.args)) def are_coplanar(*e): """ Returns True if the given entities are coplanar otherwise False Parameters ========== e: entities to be checked for being coplanar Returns ======= Boolean Examples ======== >>> from sympy import Point3D, Line3D >>> from sympy.geometry.util import are_coplanar >>> a = Line3D(Point3D(5, 0, 0), Point3D(1, -1, 1)) >>> b = Line3D(Point3D(0, -2, 0), Point3D(3, 1, 1)) >>> c = Line3D(Point3D(0, -1, 0), Point3D(5, -1, 9)) >>> are_coplanar(a, b, c) False """ from sympy.geometry.line import LinearEntity3D from sympy.geometry.point import Point3D from sympy.geometry.plane import Plane # XXX update tests for coverage e = set(e) # first work with a Plane if present for i in list(e): if isinstance(i, Plane): e.remove(i) return all(p.is_coplanar(i) for p in e) if all(isinstance(i, Point3D) for i in e): if len(e) < 3: return False # remove pts that are collinear with 2 pts a, b = e.pop(), e.pop() for i in list(e): if Point3D.are_collinear(a, b, i): e.remove(i) if not e: return False else: # define a plane p = Plane(a, b, e.pop()) for i in e: if i not in p: return False return True else: pt3d = [] for i in e: if isinstance(i, Point3D): pt3d.append(i) elif isinstance(i, LinearEntity3D): pt3d.extend(i.args) elif isinstance(i, GeometryEntity): # XXX we should have a GeometryEntity3D class so we can tell the difference between 2D and 3D -- here we just want to deal with 2D objects; if new 3D objects are encountered that we didn't handle above, an error should be raised # all 2D objects have some Point that defines them; so convert those points to 3D pts by making z=0 for p in i.args: if isinstance(p, Point): pt3d.append(Point3D(*(p.args + (0,)))) return are_coplanar(*pt3d) def are_similar(e1, e2): """Are two geometrical entities similar. Can one geometrical entity be uniformly scaled to the other? Parameters ========== e1 : GeometryEntity e2 : GeometryEntity Returns ======= are_similar : boolean Raises ====== GeometryError When `e1` and `e2` cannot be compared. Notes ===== If the two objects are equal then they are similar. See Also ======== sympy.geometry.entity.GeometryEntity.is_similar Examples ======== >>> from sympy import Point, Circle, Triangle, are_similar >>> c1, c2 = Circle(Point(0, 0), 4), Circle(Point(1, 4), 3) >>> t1 = Triangle(Point(0, 0), Point(1, 0), Point(0, 1)) >>> t2 = Triangle(Point(0, 0), Point(2, 0), Point(0, 2)) >>> t3 = Triangle(Point(0, 0), Point(3, 0), Point(0, 1)) >>> are_similar(t1, t2) True >>> are_similar(t1, t3) False """ from .exceptions import GeometryError if e1 == e2: return True is_similar1 = getattr(e1, 'is_similar', None) if is_similar1: return is_similar1(e2) is_similar2 = getattr(e2, 'is_similar', None) if is_similar2: return is_similar2(e1) n1 = e1.__class__.__name__ n2 = e2.__class__.__name__ raise GeometryError( "Cannot test similarity between %s and %s" % (n1, n2)) def centroid(*args): """Find the centroid (center of mass) of the collection containing only Points, Segments or Polygons. The centroid is the weighted average of the individual centroid where the weights are the lengths (of segments) or areas (of polygons). Overlapping regions will add to the weight of that region. If there are no objects (or a mixture of objects) then None is returned. See Also ======== sympy.geometry.point.Point, sympy.geometry.line.Segment, sympy.geometry.polygon.Polygon Examples ======== >>> from sympy import Point, Segment, Polygon >>> from sympy.geometry.util import centroid >>> p = Polygon((0, 0), (10, 0), (10, 10)) >>> q = p.translate(0, 20) >>> p.centroid, q.centroid (Point2D(20/3, 10/3), Point2D(20/3, 70/3)) >>> centroid(p, q) Point2D(20/3, 40/3) >>> p, q = Segment((0, 0), (2, 0)), Segment((0, 0), (2, 2)) >>> centroid(p, q) Point2D(1, 2 - sqrt(2)) >>> centroid(Point(0, 0), Point(2, 0)) Point2D(1, 0) Stacking 3 polygons on top of each other effectively triples the weight of that polygon: >>> p = Polygon((0, 0), (1, 0), (1, 1), (0, 1)) >>> q = Polygon((1, 0), (3, 0), (3, 1), (1, 1)) >>> centroid(p, q) Point2D(3/2, 1/2) >>> centroid(p, p, p, q) # centroid x-coord shifts left Point2D(11/10, 1/2) Stacking the squares vertically above and below p has the same effect: >>> centroid(p, p.translate(0, 1), p.translate(0, -1), q) Point2D(11/10, 1/2) """ from sympy.geometry import Polygon, Segment, Point if args: if all(isinstance(g, Point) for g in args): c = Point(0, 0) for g in args: c += g den = len(args) elif all(isinstance(g, Segment) for g in args): c = Point(0, 0) L = 0 for g in args: l = g.length c += g.midpoint*l L += l den = L elif all(isinstance(g, Polygon) for g in args): c = Point(0, 0) A = 0 for g in args: a = g.area c += g.centroid*a A += a den = A c /= den return c.func(*[i.simplify() for i in c.args]) def closest_points(*args): """Return the subset of points from a set of points that were the closest to each other in the 2D plane. Parameters ========== args : a collection of Points on 2D plane. Notes ===== This can only be performed on a set of points whose coordinates can be ordered on the number line. If there are no ties then a single pair of Points will be in the set. References ========== [1] http://www.cs.mcgill.ca/~cs251/ClosestPair/ClosestPairPS.html [2] Sweep line algorithm https://en.wikipedia.org/wiki/Sweep_line_algorithm Examples ======== >>> from sympy.geometry import closest_points, Point2D, Triangle >>> Triangle(sss=(3, 4, 5)).args (Point2D(0, 0), Point2D(3, 0), Point2D(3, 4)) >>> closest_points(*_) {(Point2D(0, 0), Point2D(3, 0))} """ from collections import deque from math import hypot, sqrt as _sqrt from sympy.functions.elementary.miscellaneous import sqrt p = [Point2D(i) for i in set(args)] if len(p) < 2: raise ValueError('At least 2 distinct points must be given.') try: p.sort(key=lambda x: x.args) except TypeError: raise ValueError("The points could not be sorted.") if any(not i.is_Rational for j in p for i in j.args): def hypot(x, y): arg = x*x + y*y if arg.is_Rational: return _sqrt(arg) return sqrt(arg) rv = [(0, 1)] best_dist = hypot(p[1].x - p[0].x, p[1].y - p[0].y) i = 2 left = 0 box = deque([0, 1]) while i < len(p): while left < i and p[i][0] - p[left][0] > best_dist: box.popleft() left += 1 for j in box: d = hypot(p[i].x - p[j].x, p[i].y - p[j].y) if d < best_dist: rv = [(j, i)] elif d == best_dist: rv.append((j, i)) else: continue best_dist = d box.append(i) i += 1 return {tuple([p[i] for i in pair]) for pair in rv} def convex_hull(*args, **kwargs): """The convex hull surrounding the Points contained in the list of entities. Parameters ========== args : a collection of Points, Segments and/or Polygons Returns ======= convex_hull : Polygon if ``polygon`` is True else as a tuple `(U, L)` where ``L`` and ``U`` are the lower and upper hulls, respectively. Notes ===== This can only be performed on a set of points whose coordinates can be ordered on the number line. References ========== [1] https://en.wikipedia.org/wiki/Graham_scan [2] Andrew's Monotone Chain Algorithm (A.M. Andrew, "Another Efficient Algorithm for Convex Hulls in Two Dimensions", 1979) http://geomalgorithms.com/a10-_hull-1.html See Also ======== sympy.geometry.point.Point, sympy.geometry.polygon.Polygon Examples ======== >>> from sympy.geometry import Point, convex_hull >>> points = [(1, 1), (1, 2), (3, 1), (-5, 2), (15, 4)] >>> convex_hull(*points) Polygon(Point2D(-5, 2), Point2D(1, 1), Point2D(3, 1), Point2D(15, 4)) >>> convex_hull(*points, **dict(polygon=False)) ([Point2D(-5, 2), Point2D(15, 4)], [Point2D(-5, 2), Point2D(1, 1), Point2D(3, 1), Point2D(15, 4)]) """ from .entity import GeometryEntity from .point import Point from .line import Segment from .polygon import Polygon polygon = kwargs.get('polygon', True) p = OrderedSet() for e in args: if not isinstance(e, GeometryEntity): try: e = Point(e) except NotImplementedError: raise ValueError('%s is not a GeometryEntity and cannot be made into Point' % str(e)) if isinstance(e, Point): p.add(e) elif isinstance(e, Segment): p.update(e.points) elif isinstance(e, Polygon): p.update(e.vertices) else: raise NotImplementedError( 'Convex hull for %s not implemented.' % type(e)) # make sure all our points are of the same dimension if any(len(x) != 2 for x in p): raise ValueError('Can only compute the convex hull in two dimensions') p = list(p) if len(p) == 1: return p[0] if polygon else (p[0], None) elif len(p) == 2: s = Segment(p[0], p[1]) return s if polygon else (s, None) def _orientation(p, q, r): '''Return positive if p-q-r are clockwise, neg if ccw, zero if collinear.''' return (q.y - p.y)*(r.x - p.x) - (q.x - p.x)*(r.y - p.y) # scan to find upper and lower convex hulls of a set of 2d points. U = [] L = [] try: p.sort(key=lambda x: x.args) except TypeError: raise ValueError("The points could not be sorted.") for p_i in p: while len(U) > 1 and _orientation(U[-2], U[-1], p_i) <= 0: U.pop() while len(L) > 1 and _orientation(L[-2], L[-1], p_i) >= 0: L.pop() U.append(p_i) L.append(p_i) U.reverse() convexHull = tuple(L + U[1:-1]) if len(convexHull) == 2: s = Segment(convexHull[0], convexHull[1]) return s if polygon else (s, None) if polygon: return Polygon(*convexHull) else: U.reverse() return (U, L) def farthest_points(*args): """Return the subset of points from a set of points that were the furthest apart from each other in the 2D plane. Parameters ========== args : a collection of Points on 2D plane. Notes ===== This can only be performed on a set of points whose coordinates can be ordered on the number line. If there are no ties then a single pair of Points will be in the set. References ========== [1] http://code.activestate.com/recipes/117225-convex-hull-and-diameter-of-2d-point-sets/ [2] Rotating Callipers Technique https://en.wikipedia.org/wiki/Rotating_calipers Examples ======== >>> from sympy.geometry import farthest_points, Point2D, Triangle >>> Triangle(sss=(3, 4, 5)).args (Point2D(0, 0), Point2D(3, 0), Point2D(3, 4)) >>> farthest_points(*_) {(Point2D(0, 0), Point2D(3, 4))} """ from math import hypot, sqrt as _sqrt def rotatingCalipers(Points): U, L = convex_hull(*Points, **dict(polygon=False)) if L is None: if isinstance(U, Point): raise ValueError('At least two distinct points must be given.') yield U.args else: i = 0 j = len(L) - 1 while i < len(U) - 1 or j > 0: yield U[i], L[j] # if all the way through one side of hull, advance the other side if i == len(U) - 1: j -= 1 elif j == 0: i += 1 # still points left on both lists, compare slopes of next hull edges # being careful to avoid divide-by-zero in slope calculation elif (U[i+1].y - U[i].y) * (L[j].x - L[j-1].x) > \ (L[j].y - L[j-1].y) * (U[i+1].x - U[i].x): i += 1 else: j -= 1 p = [Point2D(i) for i in set(args)] if any(not i.is_Rational for j in p for i in j.args): def hypot(x, y): arg = x*x + y*y if arg.is_Rational: return _sqrt(arg) return sqrt(arg) rv = [] diam = 0 for pair in rotatingCalipers(args): h, q = _ordered_points(pair) d = hypot(h.x - q.x, h.y - q.y) if d > diam: rv = [(h, q)] elif d == diam: rv.append((h, q)) else: continue diam = d return set(rv) def idiff(eq, y, x, n=1): """Return ``dy/dx`` assuming that ``eq == 0``. Parameters ========== y : the dependent variable or a list of dependent variables (with y first) x : the variable that the derivative is being taken with respect to n : the order of the derivative (default is 1) Examples ======== >>> from sympy.abc import x, y, a >>> from sympy.geometry.util import idiff >>> circ = x**2 + y**2 - 4 >>> idiff(circ, y, x) -x/y >>> idiff(circ, y, x, 2).simplify() -(x**2 + y**2)/y**3 Here, ``a`` is assumed to be independent of ``x``: >>> idiff(x + a + y, y, x) -1 Now the x-dependence of ``a`` is made explicit by listing ``a`` after ``y`` in a list. >>> idiff(x + a + y, [y, a], x) -Derivative(a, x) - 1 See Also ======== sympy.core.function.Derivative: represents unevaluated derivatives sympy.core.function.diff: explicitly differentiates wrt symbols """ if is_sequence(y): dep = set(y) y = y[0] elif isinstance(y, Symbol): dep = {y} elif isinstance(y, Function): pass else: raise ValueError("expecting x-dependent symbol(s) or function(s) but got: %s" % y) f = {s: Function(s.name)(x) for s in eq.free_symbols if s != x and s in dep} if isinstance(y, Symbol): dydx = Function(y.name)(x).diff(x) else: dydx = y.diff(x) eq = eq.subs(f) derivs = {} for i in range(n): yp = solve(eq.diff(x), dydx)[0].subs(derivs) if i == n - 1: return yp.subs([(v, k) for k, v in f.items()]) derivs[dydx] = yp eq = dydx - yp dydx = dydx.diff(x) def intersection(*entities, **kwargs): """The intersection of a collection of GeometryEntity instances. Parameters ========== entities : sequence of GeometryEntity pairwise (keyword argument) : Can be either True or False Returns ======= intersection : list of GeometryEntity Raises ====== NotImplementedError When unable to calculate intersection. Notes ===== The intersection of any geometrical entity with itself should return a list with one item: the entity in question. An intersection requires two or more entities. If only a single entity is given then the function will return an empty list. It is possible for `intersection` to miss intersections that one knows exists because the required quantities were not fully simplified internally. Reals should be converted to Rationals, e.g. Rational(str(real_num)) or else failures due to floating point issues may result. Case 1: When the keyword argument 'pairwise' is False (default value): In this case, the function returns a list of intersections common to all entities. Case 2: When the keyword argument 'pairwise' is True: In this case, the functions returns a list intersections that occur between any pair of entities. See Also ======== sympy.geometry.entity.GeometryEntity.intersection Examples ======== >>> from sympy.geometry import Ray, Circle, intersection >>> c = Circle((0, 1), 1) >>> intersection(c, c.center) [] >>> right = Ray((0, 0), (1, 0)) >>> up = Ray((0, 0), (0, 1)) >>> intersection(c, right, up) [Point2D(0, 0)] >>> intersection(c, right, up, pairwise=True) [Point2D(0, 0), Point2D(0, 2)] >>> left = Ray((1, 0), (0, 0)) >>> intersection(right, left) [Segment2D(Point2D(0, 0), Point2D(1, 0))] """ from .entity import GeometryEntity from .point import Point pairwise = kwargs.pop('pairwise', False) if len(entities) <= 1: return [] # entities may be an immutable tuple entities = list(entities) for i, e in enumerate(entities): if not isinstance(e, GeometryEntity): entities[i] = Point(e) if not pairwise: # find the intersection common to all objects res = entities[0].intersection(entities[1]) for entity in entities[2:]: newres = [] for x in res: newres.extend(x.intersection(entity)) res = newres return res # find all pairwise intersections ans = [] for j in range(0, len(entities)): for k in range(j + 1, len(entities)): ans.extend(intersection(entities[j], entities[k])) return list(ordered(set(ans)))

5ff737fb0d5427a1f507e52c60f089f096b2270d7ff105ddb9a2f63d2e75d5cc

"""Line-like geometrical entities. Contains ======== LinearEntity Line Ray Segment LinearEntity2D Line2D Ray2D Segment2D LinearEntity3D Line3D Ray3D Segment3D """ from __future__ import division, print_function from sympy import Expr from sympy.core import S, sympify from sympy.core.compatibility import ordered from sympy.core.numbers import Rational, oo from sympy.core.relational import Eq from sympy.core.symbol import _symbol, Dummy from sympy.functions.elementary.trigonometric import (_pi_coeff as pi_coeff, acos, tan, atan2) from sympy.functions.elementary.piecewise import Piecewise from sympy.logic.boolalg import And from sympy.simplify.simplify import simplify from sympy.geometry.exceptions import GeometryError from sympy.core.containers import Tuple from sympy.core.decorators import deprecated from sympy.sets import Intersection from sympy.matrices import Matrix from sympy.solvers.solveset import linear_coeffs from .entity import GeometryEntity, GeometrySet from .point import Point, Point3D from sympy.utilities.misc import Undecidable, filldedent from sympy.utilities.exceptions import SymPyDeprecationWarning class LinearEntity(GeometrySet): """A base class for all linear entities (Line, Ray and Segment) in n-dimensional Euclidean space. Attributes ========== ambient_dimension direction length p1 p2 points Notes ===== This is an abstract class and is not meant to be instantiated. See Also ======== sympy.geometry.entity.GeometryEntity """ def __new__(cls, p1, p2=None, **kwargs): p1, p2 = Point._normalize_dimension(p1, p2) if p1 == p2: # sometimes we return a single point if we are not given two unique # points. This is done in the specific subclass raise ValueError( "%s.__new__ requires two unique Points." % cls.__name__) if len(p1) != len(p2): raise ValueError( "%s.__new__ requires two Points of equal dimension." % cls.__name__) return GeometryEntity.__new__(cls, p1, p2, **kwargs) def __contains__(self, other): """Return a definitive answer or else raise an error if it cannot be determined that other is on the boundaries of self.""" result = self.contains(other) if result is not None: return result else: raise Undecidable( "can't decide whether '%s' contains '%s'" % (self, other)) def _span_test(self, other): """Test whether the point `other` lies in the positive span of `self`. A point x is 'in front' of a point y if x.dot(y) >= 0. Return -1 if `other` is behind `self.p1`, 0 if `other` is `self.p1` and and 1 if `other` is in front of `self.p1`.""" if self.p1 == other: return 0 rel_pos = other - self.p1 d = self.direction if d.dot(rel_pos) > 0: return 1 return -1 @property def ambient_dimension(self): """A property method that returns the dimension of LinearEntity object. Parameters ========== p1 : LinearEntity Returns ======= dimension : integer Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(1, 1) >>> l1 = Line(p1, p2) >>> l1.ambient_dimension 2 >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0, 0), Point(1, 1, 1) >>> l1 = Line(p1, p2) >>> l1.ambient_dimension 3 """ return len(self.p1) def angle_between(l1, l2): """Return the non-reflex angle formed by rays emanating from the origin with directions the same as the direction vectors of the linear entities. Parameters ========== l1 : LinearEntity l2 : LinearEntity Returns ======= angle : angle in radians Notes ===== From the dot product of vectors v1 and v2 it is known that: ``dot(v1, v2) = |v1|*|v2|*cos(A)`` where A is the angle formed between the two vectors. We can get the directional vectors of the two lines and readily find the angle between the two using the above formula. See Also ======== is_perpendicular, Ray2D.closing_angle Examples ======== >>> from sympy import Point, Line, pi >>> e = Line((0, 0), (1, 0)) >>> ne = Line((0, 0), (1, 1)) >>> sw = Line((1, 1), (0, 0)) >>> ne.angle_between(e) pi/4 >>> sw.angle_between(e) 3*pi/4 To obtain the non-obtuse angle at the intersection of lines, use the ``smallest_angle_between`` method: >>> sw.smallest_angle_between(e) pi/4 >>> from sympy import Point3D, Line3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(-1, 2, 0) >>> l1, l2 = Line3D(p1, p2), Line3D(p2, p3) >>> l1.angle_between(l2) acos(-sqrt(2)/3) >>> l1.smallest_angle_between(l2) acos(sqrt(2)/3) """ if not isinstance(l1, LinearEntity) and not isinstance(l2, LinearEntity): raise TypeError('Must pass only LinearEntity objects') v1, v2 = l1.direction, l2.direction return acos(v1.dot(v2)/(abs(v1)*abs(v2))) def smallest_angle_between(l1, l2): """Return the smallest angle formed at the intersection of the lines containing the linear entities. Parameters ========== l1 : LinearEntity l2 : LinearEntity Returns ======= angle : angle in radians See Also ======== angle_between, is_perpendicular, Ray2D.closing_angle Examples ======== >>> from sympy import Point, Line, pi >>> p1, p2, p3 = Point(0, 0), Point(0, 4), Point(2, -2) >>> l1, l2 = Line(p1, p2), Line(p1, p3) >>> l1.smallest_angle_between(l2) pi/4 See Also ======== angle_between, Ray2D.closing_angle """ if not isinstance(l1, LinearEntity) and not isinstance(l2, LinearEntity): raise TypeError('Must pass only LinearEntity objects') v1, v2 = l1.direction, l2.direction return acos(abs(v1.dot(v2))/(abs(v1)*abs(v2))) def arbitrary_point(self, parameter='t'): """A parameterized point on the Line. Parameters ========== parameter : str, optional The name of the parameter which will be used for the parametric point. The default value is 't'. When this parameter is 0, the first point used to define the line will be returned, and when it is 1 the second point will be returned. Returns ======= point : Point Raises ====== ValueError When ``parameter`` already appears in the Line's definition. See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(1, 0), Point(5, 3) >>> l1 = Line(p1, p2) >>> l1.arbitrary_point() Point2D(4*t + 1, 3*t) >>> from sympy import Point3D, Line3D >>> p1, p2 = Point3D(1, 0, 0), Point3D(5, 3, 1) >>> l1 = Line3D(p1, p2) >>> l1.arbitrary_point() Point3D(4*t + 1, 3*t, t) """ t = _symbol(parameter, real=True) if t.name in (f.name for f in self.free_symbols): raise ValueError(filldedent(''' Symbol %s already appears in object and cannot be used as a parameter. ''' % t.name)) # multiply on the right so the variable gets # combined with the coordinates of the point return self.p1 + (self.p2 - self.p1)*t @staticmethod def are_concurrent(*lines): """Is a sequence of linear entities concurrent? Two or more linear entities are concurrent if they all intersect at a single point. Parameters ========== lines : a sequence of linear entities. Returns ======= True : if the set of linear entities intersect in one point False : otherwise. See Also ======== sympy.geometry.util.intersection Examples ======== >>> from sympy import Point, Line, Line3D >>> p1, p2 = Point(0, 0), Point(3, 5) >>> p3, p4 = Point(-2, -2), Point(0, 2) >>> l1, l2, l3 = Line(p1, p2), Line(p1, p3), Line(p1, p4) >>> Line.are_concurrent(l1, l2, l3) True >>> l4 = Line(p2, p3) >>> Line.are_concurrent(l2, l3, l4) False >>> from sympy import Point3D, Line3D >>> p1, p2 = Point3D(0, 0, 0), Point3D(3, 5, 2) >>> p3, p4 = Point3D(-2, -2, -2), Point3D(0, 2, 1) >>> l1, l2, l3 = Line3D(p1, p2), Line3D(p1, p3), Line3D(p1, p4) >>> Line3D.are_concurrent(l1, l2, l3) True >>> l4 = Line3D(p2, p3) >>> Line3D.are_concurrent(l2, l3, l4) False """ common_points = Intersection(*lines) if common_points.is_FiniteSet and len(common_points) == 1: return True return False def contains(self, other): """Subclasses should implement this method and should return True if other is on the boundaries of self; False if not on the boundaries of self; None if a determination cannot be made.""" raise NotImplementedError() @property def direction(self): """The direction vector of the LinearEntity. Returns ======= p : a Point; the ray from the origin to this point is the direction of `self` Examples ======== >>> from sympy.geometry import Line >>> a, b = (1, 1), (1, 3) >>> Line(a, b).direction Point2D(0, 2) >>> Line(b, a).direction Point2D(0, -2) This can be reported so the distance from the origin is 1: >>> Line(b, a).direction.unit Point2D(0, -1) See Also ======== sympy.geometry.point.Point.unit """ return self.p2 - self.p1 def intersection(self, other): """The intersection with another geometrical entity. Parameters ========== o : Point or LinearEntity Returns ======= intersection : list of geometrical entities See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Line, Segment >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(7, 7) >>> l1 = Line(p1, p2) >>> l1.intersection(p3) [Point2D(7, 7)] >>> p4, p5 = Point(5, 0), Point(0, 3) >>> l2 = Line(p4, p5) >>> l1.intersection(l2) [Point2D(15/8, 15/8)] >>> p6, p7 = Point(0, 5), Point(2, 6) >>> s1 = Segment(p6, p7) >>> l1.intersection(s1) [] >>> from sympy import Point3D, Line3D, Segment3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(7, 7, 7) >>> l1 = Line3D(p1, p2) >>> l1.intersection(p3) [Point3D(7, 7, 7)] >>> l1 = Line3D(Point3D(4,19,12), Point3D(5,25,17)) >>> l2 = Line3D(Point3D(-3, -15, -19), direction_ratio=[2,8,8]) >>> l1.intersection(l2) [Point3D(1, 1, -3)] >>> p6, p7 = Point3D(0, 5, 2), Point3D(2, 6, 3) >>> s1 = Segment3D(p6, p7) >>> l1.intersection(s1) [] """ def intersect_parallel_rays(ray1, ray2): if ray1.direction.dot(ray2.direction) > 0: # rays point in the same direction # so return the one that is "in front" return [ray2] if ray1._span_test(ray2.p1) >= 0 else [ray1] else: # rays point in opposite directions st = ray1._span_test(ray2.p1) if st < 0: return [] elif st == 0: return [ray2.p1] return [Segment(ray1.p1, ray2.p1)] def intersect_parallel_ray_and_segment(ray, seg): st1, st2 = ray._span_test(seg.p1), ray._span_test(seg.p2) if st1 < 0 and st2 < 0: return [] elif st1 >= 0 and st2 >= 0: return [seg] elif st1 >= 0: # st2 < 0: return [Segment(ray.p1, seg.p1)] elif st2 >= 0: # st1 < 0: return [Segment(ray.p1, seg.p2)] def intersect_parallel_segments(seg1, seg2): if seg1.contains(seg2): return [seg2] if seg2.contains(seg1): return [seg1] # direct the segments so they're oriented the same way if seg1.direction.dot(seg2.direction) < 0: seg2 = Segment(seg2.p2, seg2.p1) # order the segments so seg1 is "behind" seg2 if seg1._span_test(seg2.p1) < 0: seg1, seg2 = seg2, seg1 if seg2._span_test(seg1.p2) < 0: return [] return [Segment(seg2.p1, seg1.p2)] if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if other.is_Point: if self.contains(other): return [other] else: return [] elif isinstance(other, LinearEntity): # break into cases based on whether # the lines are parallel, non-parallel intersecting, or skew pts = Point._normalize_dimension(self.p1, self.p2, other.p1, other.p2) rank = Point.affine_rank(*pts) if rank == 1: # we're collinear if isinstance(self, Line): return [other] if isinstance(other, Line): return [self] if isinstance(self, Ray) and isinstance(other, Ray): return intersect_parallel_rays(self, other) if isinstance(self, Ray) and isinstance(other, Segment): return intersect_parallel_ray_and_segment(self, other) if isinstance(self, Segment) and isinstance(other, Ray): return intersect_parallel_ray_and_segment(other, self) if isinstance(self, Segment) and isinstance(other, Segment): return intersect_parallel_segments(self, other) elif rank == 2: # we're in the same plane l1 = Line(*pts[:2]) l2 = Line(*pts[2:]) # check to see if we're parallel. If we are, we can't # be intersecting, since the collinear case was already # handled if l1.direction.is_scalar_multiple(l2.direction): return [] # find the intersection as if everything were lines # by solving the equation t*d + p1 == s*d' + p1' m = Matrix([l1.direction, -l2.direction]).transpose() v = Matrix([l2.p1 - l1.p1]).transpose() # we cannot use m.solve(v) because that only works for square matrices m_rref, pivots = m.col_insert(2, v).rref(simplify=True) # rank == 2 ensures we have 2 pivots, but let's check anyway if len(pivots) != 2: raise GeometryError("Failed when solving Mx=b when M={} and b={}".format(m, v)) coeff = m_rref[0, 2] line_intersection = l1.direction*coeff + self.p1 # if we're both lines, we can skip a containment check if isinstance(self, Line) and isinstance(other, Line): return [line_intersection] if ((isinstance(self, Line) or self.contains(line_intersection)) and other.contains(line_intersection)): return [line_intersection] return [] else: # we're skew return [] return other.intersection(self) def is_parallel(l1, l2): """Are two linear entities parallel? Parameters ========== l1 : LinearEntity l2 : LinearEntity Returns ======= True : if l1 and l2 are parallel, False : otherwise. See Also ======== coefficients Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(1, 1) >>> p3, p4 = Point(3, 4), Point(6, 7) >>> l1, l2 = Line(p1, p2), Line(p3, p4) >>> Line.is_parallel(l1, l2) True >>> p5 = Point(6, 6) >>> l3 = Line(p3, p5) >>> Line.is_parallel(l1, l3) False >>> from sympy import Point3D, Line3D >>> p1, p2 = Point3D(0, 0, 0), Point3D(3, 4, 5) >>> p3, p4 = Point3D(2, 1, 1), Point3D(8, 9, 11) >>> l1, l2 = Line3D(p1, p2), Line3D(p3, p4) >>> Line3D.is_parallel(l1, l2) True >>> p5 = Point3D(6, 6, 6) >>> l3 = Line3D(p3, p5) >>> Line3D.is_parallel(l1, l3) False """ if not isinstance(l1, LinearEntity) and not isinstance(l2, LinearEntity): raise TypeError('Must pass only LinearEntity objects') return l1.direction.is_scalar_multiple(l2.direction) def is_perpendicular(l1, l2): """Are two linear entities perpendicular? Parameters ========== l1 : LinearEntity l2 : LinearEntity Returns ======= True : if l1 and l2 are perpendicular, False : otherwise. See Also ======== coefficients Examples ======== >>> from sympy import Point, Line >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(-1, 1) >>> l1, l2 = Line(p1, p2), Line(p1, p3) >>> l1.is_perpendicular(l2) True >>> p4 = Point(5, 3) >>> l3 = Line(p1, p4) >>> l1.is_perpendicular(l3) False >>> from sympy import Point3D, Line3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(-1, 2, 0) >>> l1, l2 = Line3D(p1, p2), Line3D(p2, p3) >>> l1.is_perpendicular(l2) False >>> p4 = Point3D(5, 3, 7) >>> l3 = Line3D(p1, p4) >>> l1.is_perpendicular(l3) False """ if not isinstance(l1, LinearEntity) and not isinstance(l2, LinearEntity): raise TypeError('Must pass only LinearEntity objects') return S.Zero.equals(l1.direction.dot(l2.direction)) def is_similar(self, other): """ Return True if self and other are contained in the same line. Examples ======== >>> from sympy import Point, Line >>> p1, p2, p3 = Point(0, 1), Point(3, 4), Point(2, 3) >>> l1 = Line(p1, p2) >>> l2 = Line(p1, p3) >>> l1.is_similar(l2) True """ l = Line(self.p1, self.p2) return l.contains(other) @property def length(self): """ The length of the line. Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(3, 5) >>> l1 = Line(p1, p2) >>> l1.length oo """ return S.Infinity @property def p1(self): """The first defining point of a linear entity. See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(5, 3) >>> l = Line(p1, p2) >>> l.p1 Point2D(0, 0) """ return self.args[0] @property def p2(self): """The second defining point of a linear entity. See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(5, 3) >>> l = Line(p1, p2) >>> l.p2 Point2D(5, 3) """ return self.args[1] def parallel_line(self, p): """Create a new Line parallel to this linear entity which passes through the point `p`. Parameters ========== p : Point Returns ======= line : Line See Also ======== is_parallel Examples ======== >>> from sympy import Point, Line >>> p1, p2, p3 = Point(0, 0), Point(2, 3), Point(-2, 2) >>> l1 = Line(p1, p2) >>> l2 = l1.parallel_line(p3) >>> p3 in l2 True >>> l1.is_parallel(l2) True >>> from sympy import Point3D, Line3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(2, 3, 4), Point3D(-2, 2, 0) >>> l1 = Line3D(p1, p2) >>> l2 = l1.parallel_line(p3) >>> p3 in l2 True >>> l1.is_parallel(l2) True """ p = Point(p, dim=self.ambient_dimension) return Line(p, p + self.direction) def perpendicular_line(self, p): """Create a new Line perpendicular to this linear entity which passes through the point `p`. Parameters ========== p : Point Returns ======= line : Line See Also ======== is_perpendicular, perpendicular_segment Examples ======== >>> from sympy import Point, Line >>> p1, p2, p3 = Point(0, 0), Point(2, 3), Point(-2, 2) >>> l1 = Line(p1, p2) >>> l2 = l1.perpendicular_line(p3) >>> p3 in l2 True >>> l1.is_perpendicular(l2) True >>> from sympy import Point3D, Line3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(2, 3, 4), Point3D(-2, 2, 0) >>> l1 = Line3D(p1, p2) >>> l2 = l1.perpendicular_line(p3) >>> p3 in l2 True >>> l1.is_perpendicular(l2) True """ p = Point(p, dim=self.ambient_dimension) if p in self: p = p + self.direction.orthogonal_direction return Line(p, self.projection(p)) def perpendicular_segment(self, p): """Create a perpendicular line segment from `p` to this line. The enpoints of the segment are ``p`` and the closest point in the line containing self. (If self is not a line, the point might not be in self.) Parameters ========== p : Point Returns ======= segment : Segment Notes ===== Returns `p` itself if `p` is on this linear entity. See Also ======== perpendicular_line Examples ======== >>> from sympy import Point, Line >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(0, 2) >>> l1 = Line(p1, p2) >>> s1 = l1.perpendicular_segment(p3) >>> l1.is_perpendicular(s1) True >>> p3 in s1 True >>> l1.perpendicular_segment(Point(4, 0)) Segment2D(Point2D(4, 0), Point2D(2, 2)) >>> from sympy import Point3D, Line3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(0, 2, 0) >>> l1 = Line3D(p1, p2) >>> s1 = l1.perpendicular_segment(p3) >>> l1.is_perpendicular(s1) True >>> p3 in s1 True >>> l1.perpendicular_segment(Point3D(4, 0, 0)) Segment3D(Point3D(4, 0, 0), Point3D(4/3, 4/3, 4/3)) """ p = Point(p, dim=self.ambient_dimension) if p in self: return p l = self.perpendicular_line(p) # The intersection should be unique, so unpack the singleton p2, = Intersection(Line(self.p1, self.p2), l) return Segment(p, p2) @property def points(self): """The two points used to define this linear entity. Returns ======= points : tuple of Points See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(5, 11) >>> l1 = Line(p1, p2) >>> l1.points (Point2D(0, 0), Point2D(5, 11)) """ return (self.p1, self.p2) def projection(self, other): """Project a point, line, ray, or segment onto this linear entity. Parameters ========== other : Point or LinearEntity (Line, Ray, Segment) Returns ======= projection : Point or LinearEntity (Line, Ray, Segment) The return type matches the type of the parameter ``other``. Raises ====== GeometryError When method is unable to perform projection. Notes ===== A projection involves taking the two points that define the linear entity and projecting those points onto a Line and then reforming the linear entity using these projections. A point P is projected onto a line L by finding the point on L that is closest to P. This point is the intersection of L and the line perpendicular to L that passes through P. See Also ======== sympy.geometry.point.Point, perpendicular_line Examples ======== >>> from sympy import Point, Line, Segment, Rational >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(Rational(1, 2), 0) >>> l1 = Line(p1, p2) >>> l1.projection(p3) Point2D(1/4, 1/4) >>> p4, p5 = Point(10, 0), Point(12, 1) >>> s1 = Segment(p4, p5) >>> l1.projection(s1) Segment2D(Point2D(5, 5), Point2D(13/2, 13/2)) >>> p1, p2, p3 = Point(0, 0, 1), Point(1, 1, 2), Point(2, 0, 1) >>> l1 = Line(p1, p2) >>> l1.projection(p3) Point3D(2/3, 2/3, 5/3) >>> p4, p5 = Point(10, 0, 1), Point(12, 1, 3) >>> s1 = Segment(p4, p5) >>> l1.projection(s1) Segment3D(Point3D(10/3, 10/3, 13/3), Point3D(5, 5, 6)) """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) def proj_point(p): return Point.project(p - self.p1, self.direction) + self.p1 if isinstance(other, Point): return proj_point(other) elif isinstance(other, LinearEntity): p1, p2 = proj_point(other.p1), proj_point(other.p2) # test to see if we're degenerate if p1 == p2: return p1 projected = other.__class__(p1, p2) projected = Intersection(self, projected) # if we happen to have intersected in only a point, return that if projected.is_FiniteSet and len(projected) == 1: # projected is a set of size 1, so unpack it in `a` a, = projected return a # order args so projection is in the same direction as self if self.direction.dot(projected.direction) < 0: p1, p2 = projected.args projected = projected.func(p2, p1) return projected raise GeometryError( "Do not know how to project %s onto %s" % (other, self)) def random_point(self, seed=None): """A random point on a LinearEntity. Returns ======= point : Point See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Line, Ray, Segment >>> p1, p2 = Point(0, 0), Point(5, 3) >>> line = Line(p1, p2) >>> r = line.random_point(seed=42) # seed value is optional >>> r.n(3) Point2D(-0.72, -0.432) >>> r in line True >>> Ray(p1, p2).random_point(seed=42).n(3) Point2D(0.72, 0.432) >>> Segment(p1, p2).random_point(seed=42).n(3) Point2D(3.2, 1.92) """ import random if seed is not None: rng = random.Random(seed) else: rng = random t = Dummy() pt = self.arbitrary_point(t) if isinstance(self, Ray): v = abs(rng.gauss(0, 1)) elif isinstance(self, Segment): v = rng.random() elif isinstance(self, Line): v = rng.gauss(0, 1) else: raise NotImplementedError('unhandled line type') return pt.subs(t, Rational(v)) class Line(LinearEntity): """An infinite line in space. A 2D line is declared with two distinct points, point and slope, or an equation. A 3D line may be defined with a point and a direction ratio. Parameters ========== p1 : Point p2 : Point slope : sympy expression direction_ratio : list equation : equation of a line Notes ===== `Line` will automatically subclass to `Line2D` or `Line3D` based on the dimension of `p1`. The `slope` argument is only relevant for `Line2D` and the `direction_ratio` argument is only relevant for `Line3D`. See Also ======== sympy.geometry.point.Point sympy.geometry.line.Line2D sympy.geometry.line.Line3D Examples ======== >>> from sympy import Point, Eq >>> from sympy.geometry import Line, Segment >>> from sympy.abc import x, y, a, b >>> L = Line(Point(2,3), Point(3,5)) >>> L Line2D(Point2D(2, 3), Point2D(3, 5)) >>> L.points (Point2D(2, 3), Point2D(3, 5)) >>> L.equation() -2*x + y + 1 >>> L.coefficients (-2, 1, 1) Instantiate with keyword ``slope``: >>> Line(Point(0, 0), slope=0) Line2D(Point2D(0, 0), Point2D(1, 0)) Instantiate with another linear object >>> s = Segment((0, 0), (0, 1)) >>> Line(s).equation() x The line corresponding to an equation in the for `ax + by + c = 0`, can be entered: >>> Line(3*x + y + 18) Line2D(Point2D(0, -18), Point2D(1, -21)) If `x` or `y` has a different name, then they can be specified, too, as a string (to match the name) or symbol: >>> Line(Eq(3*a + b, -18), x='a', y=b) Line2D(Point2D(0, -18), Point2D(1, -21)) """ def __new__(cls, *args, **kwargs): from sympy.geometry.util import find if len(args) == 1 and isinstance(args[0], Expr): x = kwargs.get('x', 'x') y = kwargs.get('y', 'y') equation = args[0] if isinstance(equation, Eq): equation = equation.lhs - equation.rhs xin, yin = x, y x = find(x, equation) or Dummy() y = find(y, equation) or Dummy() a, b, c = linear_coeffs(equation, x, y) if b: return Line((0, -c/b), slope=-a/b) if a: return Line((-c/a, 0), slope=oo) raise ValueError('neither %s nor %s were found in the equation' % (xin, yin)) else: if len(args) > 0: p1 = args[0] if len(args) > 1: p2 = args[1] else: p2=None if isinstance(p1, LinearEntity): if p2: raise ValueError('If p1 is a LinearEntity, p2 must be None.') dim = len(p1.p1) else: p1 = Point(p1) dim = len(p1) if p2 is not None or isinstance(p2, Point) and p2.ambient_dimension != dim: p2 = Point(p2) if dim == 2: return Line2D(p1, p2, **kwargs) elif dim == 3: return Line3D(p1, p2, **kwargs) return LinearEntity.__new__(cls, p1, p2, **kwargs) def contains(self, other): """ Return True if `other` is on this Line, or False otherwise. Examples ======== >>> from sympy import Line,Point >>> p1, p2 = Point(0, 1), Point(3, 4) >>> l = Line(p1, p2) >>> l.contains(p1) True >>> l.contains((0, 1)) True >>> l.contains((0, 0)) False >>> a = (0, 0, 0) >>> b = (1, 1, 1) >>> c = (2, 2, 2) >>> l1 = Line(a, b) >>> l2 = Line(b, a) >>> l1 == l2 False >>> l1 in l2 True """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if isinstance(other, Point): return Point.is_collinear(other, self.p1, self.p2) if isinstance(other, LinearEntity): return Point.is_collinear(self.p1, self.p2, other.p1, other.p2) return False def distance(self, other): """ Finds the shortest distance between a line and a point. Raises ====== NotImplementedError is raised if `other` is not a Point Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(1, 1) >>> s = Line(p1, p2) >>> s.distance(Point(-1, 1)) sqrt(2) >>> s.distance((-1, 2)) 3*sqrt(2)/2 >>> p1, p2 = Point(0, 0, 0), Point(1, 1, 1) >>> s = Line(p1, p2) >>> s.distance(Point(-1, 1, 1)) 2*sqrt(6)/3 >>> s.distance((-1, 1, 1)) 2*sqrt(6)/3 """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if self.contains(other): return S.Zero return self.perpendicular_segment(other).length @deprecated(useinstead="equals", issue=12860, deprecated_since_version="1.0") def equal(self, other): return self.equals(other) def equals(self, other): """Returns True if self and other are the same mathematical entities""" if not isinstance(other, Line): return False return Point.is_collinear(self.p1, other.p1, self.p2, other.p2) def plot_interval(self, parameter='t'): """The plot interval for the default geometric plot of line. Gives values that will produce a line that is +/- 5 units long (where a unit is the distance between the two points that define the line). Parameters ========== parameter : str, optional Default value is 't'. Returns ======= plot_interval : list (plot interval) [parameter, lower_bound, upper_bound] Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(5, 3) >>> l1 = Line(p1, p2) >>> l1.plot_interval() [t, -5, 5] """ t = _symbol(parameter, real=True) return [t, -5, 5] class Ray(LinearEntity): """A Ray is a semi-line in the space with a source point and a direction. Parameters ========== p1 : Point The source of the Ray p2 : Point or radian value This point determines the direction in which the Ray propagates. If given as an angle it is interpreted in radians with the positive direction being ccw. Attributes ========== source See Also ======== sympy.geometry.line.Ray2D sympy.geometry.line.Ray3D sympy.geometry.point.Point sympy.geometry.line.Line Notes ===== `Ray` will automatically subclass to `Ray2D` or `Ray3D` based on the dimension of `p1`. Examples ======== >>> from sympy import Point, pi >>> from sympy.geometry import Ray >>> r = Ray(Point(2, 3), Point(3, 5)) >>> r Ray2D(Point2D(2, 3), Point2D(3, 5)) >>> r.points (Point2D(2, 3), Point2D(3, 5)) >>> r.source Point2D(2, 3) >>> r.xdirection oo >>> r.ydirection oo >>> r.slope 2 >>> Ray(Point(0, 0), angle=pi/4).slope 1 """ def __new__(cls, p1, p2=None, **kwargs): p1 = Point(p1) if p2 is not None: p1, p2 = Point._normalize_dimension(p1, Point(p2)) dim = len(p1) if dim == 2: return Ray2D(p1, p2, **kwargs) elif dim == 3: return Ray3D(p1, p2, **kwargs) return LinearEntity.__new__(cls, p1, *pts, **kwargs) def _svg(self, scale_factor=1., fill_color="#66cc99"): """Returns SVG path element for the LinearEntity. Parameters ========== scale_factor : float Multiplication factor for the SVG stroke-width. Default is 1. fill_color : str, optional Hex string for fill color. Default is "#66cc99". """ from sympy.core.evalf import N verts = (N(self.p1), N(self.p2)) coords = ["{0},{1}".format(p.x, p.y) for p in verts] path = "M {0} L {1}".format(coords[0], " L ".join(coords[1:])) return ( '<path fill-rule="evenodd" fill="{2}" stroke="#555555" ' 'stroke-width="{0}" opacity="0.6" d="{1}" ' 'marker-start="url(#markerCircle)" marker-end="url(#markerArrow)"/>' ).format(2. * scale_factor, path, fill_color) def contains(self, other): """ Is other GeometryEntity contained in this Ray? Examples ======== >>> from sympy import Ray,Point,Segment >>> p1, p2 = Point(0, 0), Point(4, 4) >>> r = Ray(p1, p2) >>> r.contains(p1) True >>> r.contains((1, 1)) True >>> r.contains((1, 3)) False >>> s = Segment((1, 1), (2, 2)) >>> r.contains(s) True >>> s = Segment((1, 2), (2, 5)) >>> r.contains(s) False >>> r1 = Ray((2, 2), (3, 3)) >>> r.contains(r1) True >>> r1 = Ray((2, 2), (3, 5)) >>> r.contains(r1) False """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if isinstance(other, Point): if Point.is_collinear(self.p1, self.p2, other): # if we're in the direction of the ray, our # direction vector dot the ray's direction vector # should be non-negative return bool((self.p2 - self.p1).dot(other - self.p1) >= S.Zero) return False elif isinstance(other, Ray): if Point.is_collinear(self.p1, self.p2, other.p1, other.p2): return bool((self.p2 - self.p1).dot(other.p2 - other.p1) > S.Zero) return False elif isinstance(other, Segment): return other.p1 in self and other.p2 in self # No other known entity can be contained in a Ray return False def distance(self, other): """ Finds the shortest distance between the ray and a point. Raises ====== NotImplementedError is raised if `other` is not a Point Examples ======== >>> from sympy import Point, Ray >>> p1, p2 = Point(0, 0), Point(1, 1) >>> s = Ray(p1, p2) >>> s.distance(Point(-1, -1)) sqrt(2) >>> s.distance((-1, 2)) 3*sqrt(2)/2 >>> p1, p2 = Point(0, 0, 0), Point(1, 1, 2) >>> s = Ray(p1, p2) >>> s Ray3D(Point3D(0, 0, 0), Point3D(1, 1, 2)) >>> s.distance(Point(-1, -1, 2)) 4*sqrt(3)/3 >>> s.distance((-1, -1, 2)) 4*sqrt(3)/3 """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if self.contains(other): return S.Zero proj = Line(self.p1, self.p2).projection(other) if self.contains(proj): return abs(other - proj) else: return abs(other - self.source) def equals(self, other): """Returns True if self and other are the same mathematical entities""" if not isinstance(other, Ray): return False return self.source == other.source and other.p2 in self def plot_interval(self, parameter='t'): """The plot interval for the default geometric plot of the Ray. Gives values that will produce a ray that is 10 units long (where a unit is the distance between the two points that define the ray). Parameters ========== parameter : str, optional Default value is 't'. Returns ======= plot_interval : list [parameter, lower_bound, upper_bound] Examples ======== >>> from sympy import Ray, pi >>> r = Ray((0, 0), angle=pi/4) >>> r.plot_interval() [t, 0, 10] """ t = _symbol(parameter, real=True) return [t, 0, 10] @property def source(self): """The point from which the ray emanates. See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point, Ray >>> p1, p2 = Point(0, 0), Point(4, 1) >>> r1 = Ray(p1, p2) >>> r1.source Point2D(0, 0) >>> p1, p2 = Point(0, 0, 0), Point(4, 1, 5) >>> r1 = Ray(p2, p1) >>> r1.source Point3D(4, 1, 5) """ return self.p1 class Segment(LinearEntity): """A line segment in space. Parameters ========== p1 : Point p2 : Point Attributes ========== length : number or sympy expression midpoint : Point See Also ======== sympy.geometry.line.Segment2D sympy.geometry.line.Segment3D sympy.geometry.point.Point sympy.geometry.line.Line Notes ===== If 2D or 3D points are used to define `Segment`, it will be automatically subclassed to `Segment2D` or `Segment3D`. Examples ======== >>> from sympy import Point >>> from sympy.geometry import Segment >>> Segment((1, 0), (1, 1)) # tuples are interpreted as pts Segment2D(Point2D(1, 0), Point2D(1, 1)) >>> s = Segment(Point(4, 3), Point(1, 1)) >>> s.points (Point2D(4, 3), Point2D(1, 1)) >>> s.slope 2/3 >>> s.length sqrt(13) >>> s.midpoint Point2D(5/2, 2) >>> Segment((1, 0, 0), (1, 1, 1)) # tuples are interpreted as pts Segment3D(Point3D(1, 0, 0), Point3D(1, 1, 1)) >>> s = Segment(Point(4, 3, 9), Point(1, 1, 7)); s Segment3D(Point3D(4, 3, 9), Point3D(1, 1, 7)) >>> s.points (Point3D(4, 3, 9), Point3D(1, 1, 7)) >>> s.length sqrt(17) >>> s.midpoint Point3D(5/2, 2, 8) """ def __new__(cls, p1, p2, **kwargs): p1, p2 = Point._normalize_dimension(Point(p1), Point(p2)) dim = len(p1) if dim == 2: return Segment2D(p1, p2, **kwargs) elif dim == 3: return Segment3D(p1, p2, **kwargs) return LinearEntity.__new__(cls, p1, p2, **kwargs) def contains(self, other): """ Is the other GeometryEntity contained within this Segment? Examples ======== >>> from sympy import Point, Segment >>> p1, p2 = Point(0, 1), Point(3, 4) >>> s = Segment(p1, p2) >>> s2 = Segment(p2, p1) >>> s.contains(s2) True >>> from sympy import Point3D, Segment3D >>> p1, p2 = Point3D(0, 1, 1), Point3D(3, 4, 5) >>> s = Segment3D(p1, p2) >>> s2 = Segment3D(p2, p1) >>> s.contains(s2) True >>> s.contains((p1 + p2) / 2) True """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if isinstance(other, Point): if Point.is_collinear(other, self.p1, self.p2): if isinstance(self, Segment2D): # if it is collinear and is in the bounding box of the # segment then it must be on the segment vert = (1/self.slope).equals(0) if vert is False: isin = (self.p1.x - other.x)*(self.p2.x - other.x) <= 0 if isin in (True, False): return isin if vert is True: isin = (self.p1.y - other.y)*(self.p2.y - other.y) <= 0 if isin in (True, False): return isin # use the triangle inequality d1, d2 = other - self.p1, other - self.p2 d = self.p2 - self.p1 # without the call to simplify, sympy cannot tell that an expression # like (a+b)*(a/2+b/2) is always non-negative. If it cannot be # determined, raise an Undecidable error try: # the triangle inequality says that |d1|+|d2| >= |d| and is strict # only if other lies in the line segment return bool(simplify(Eq(abs(d1) + abs(d2) - abs(d), 0))) except TypeError: raise Undecidable("Cannot determine if {} is in {}".format(other, self)) if isinstance(other, Segment): return other.p1 in self and other.p2 in self return False def equals(self, other): """Returns True if self and other are the same mathematical entities""" return isinstance(other, self.func) and list( ordered(self.args)) == list(ordered(other.args)) def distance(self, other): """ Finds the shortest distance between a line segment and a point. Raises ====== NotImplementedError is raised if `other` is not a Point Examples ======== >>> from sympy import Point, Segment >>> p1, p2 = Point(0, 1), Point(3, 4) >>> s = Segment(p1, p2) >>> s.distance(Point(10, 15)) sqrt(170) >>> s.distance((0, 12)) sqrt(73) >>> from sympy import Point3D, Segment3D >>> p1, p2 = Point3D(0, 0, 3), Point3D(1, 1, 4) >>> s = Segment3D(p1, p2) >>> s.distance(Point3D(10, 15, 12)) sqrt(341) >>> s.distance((10, 15, 12)) sqrt(341) """ if not isinstance(other, GeometryEntity): other = Point(other, dim=self.ambient_dimension) if isinstance(other, Point): vp1 = other - self.p1 vp2 = other - self.p2 dot_prod_sign_1 = self.direction.dot(vp1) >= 0 dot_prod_sign_2 = self.direction.dot(vp2) <= 0 if dot_prod_sign_1 and dot_prod_sign_2: return Line(self.p1, self.p2).distance(other) if dot_prod_sign_1 and not dot_prod_sign_2: return abs(vp2) if not dot_prod_sign_1 and dot_prod_sign_2: return abs(vp1) raise NotImplementedError() @property def length(self): """The length of the line segment. See Also ======== sympy.geometry.point.Point.distance Examples ======== >>> from sympy import Point, Segment >>> p1, p2 = Point(0, 0), Point(4, 3) >>> s1 = Segment(p1, p2) >>> s1.length 5 >>> from sympy import Point3D, Segment3D >>> p1, p2 = Point3D(0, 0, 0), Point3D(4, 3, 3) >>> s1 = Segment3D(p1, p2) >>> s1.length sqrt(34) """ return Point.distance(self.p1, self.p2) @property def midpoint(self): """The midpoint of the line segment. See Also ======== sympy.geometry.point.Point.midpoint Examples ======== >>> from sympy import Point, Segment >>> p1, p2 = Point(0, 0), Point(4, 3) >>> s1 = Segment(p1, p2) >>> s1.midpoint Point2D(2, 3/2) >>> from sympy import Point3D, Segment3D >>> p1, p2 = Point3D(0, 0, 0), Point3D(4, 3, 3) >>> s1 = Segment3D(p1, p2) >>> s1.midpoint Point3D(2, 3/2, 3/2) """ return Point.midpoint(self.p1, self.p2) def perpendicular_bisector(self, p=None): """The perpendicular bisector of this segment. If no point is specified or the point specified is not on the bisector then the bisector is returned as a Line. Otherwise a Segment is returned that joins the point specified and the intersection of the bisector and the segment. Parameters ========== p : Point Returns ======= bisector : Line or Segment See Also ======== LinearEntity.perpendicular_segment Examples ======== >>> from sympy import Point, Segment >>> p1, p2, p3 = Point(0, 0), Point(6, 6), Point(5, 1) >>> s1 = Segment(p1, p2) >>> s1.perpendicular_bisector() Line2D(Point2D(3, 3), Point2D(-3, 9)) >>> s1.perpendicular_bisector(p3) Segment2D(Point2D(5, 1), Point2D(3, 3)) """ l = self.perpendicular_line(self.midpoint) if p is not None: p2 = Point(p, dim=self.ambient_dimension) if p2 in l: return Segment(p2, self.midpoint) return l def plot_interval(self, parameter='t'): """The plot interval for the default geometric plot of the Segment gives values that will produce the full segment in a plot. Parameters ========== parameter : str, optional Default value is 't'. Returns ======= plot_interval : list [parameter, lower_bound, upper_bound] Examples ======== >>> from sympy import Point, Segment >>> p1, p2 = Point(0, 0), Point(5, 3) >>> s1 = Segment(p1, p2) >>> s1.plot_interval() [t, 0, 1] """ t = _symbol(parameter, real=True) return [t, 0, 1] class LinearEntity2D(LinearEntity): """A base class for all linear entities (line, ray and segment) in a 2-dimensional Euclidean space. Attributes ========== p1 p2 coefficients slope points Notes ===== This is an abstract class and is not meant to be instantiated. See Also ======== sympy.geometry.entity.GeometryEntity """ @property def bounds(self): """Return a tuple (xmin, ymin, xmax, ymax) representing the bounding rectangle for the geometric figure. """ verts = self.points xs = [p.x for p in verts] ys = [p.y for p in verts] return (min(xs), min(ys), max(xs), max(ys)) def perpendicular_line(self, p): """Create a new Line perpendicular to this linear entity which passes through the point `p`. Parameters ========== p : Point Returns ======= line : Line See Also ======== is_perpendicular, perpendicular_segment Examples ======== >>> from sympy import Point, Line >>> p1, p2, p3 = Point(0, 0), Point(2, 3), Point(-2, 2) >>> l1 = Line(p1, p2) >>> l2 = l1.perpendicular_line(p3) >>> p3 in l2 True >>> l1.is_perpendicular(l2) True """ p = Point(p, dim=self.ambient_dimension) # any two lines in R^2 intersect, so blindly making # a line through p in an orthogonal direction will work return Line(p, p + self.direction.orthogonal_direction) @property def slope(self): """The slope of this linear entity, or infinity if vertical. Returns ======= slope : number or sympy expression See Also ======== coefficients Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(0, 0), Point(3, 5) >>> l1 = Line(p1, p2) >>> l1.slope 5/3 >>> p3 = Point(0, 4) >>> l2 = Line(p1, p3) >>> l2.slope oo """ d1, d2 = (self.p1 - self.p2).args if d1 == 0: return S.Infinity return simplify(d2/d1) class Line2D(LinearEntity2D, Line): """An infinite line in space 2D. A line is declared with two distinct points or a point and slope as defined using keyword `slope`. Parameters ========== p1 : Point pt : Point slope : sympy expression See Also ======== sympy.geometry.point.Point Examples ======== >>> from sympy import Point >>> from sympy.abc import L >>> from sympy.geometry import Line, Segment >>> L = Line(Point(2,3), Point(3,5)) >>> L Line2D(Point2D(2, 3), Point2D(3, 5)) >>> L.points (Point2D(2, 3), Point2D(3, 5)) >>> L.equation() -2*x + y + 1 >>> L.coefficients (-2, 1, 1) Instantiate with keyword ``slope``: >>> Line(Point(0, 0), slope=0) Line2D(Point2D(0, 0), Point2D(1, 0)) Instantiate with another linear object >>> s = Segment((0, 0), (0, 1)) >>> Line(s).equation() x """ def __new__(cls, p1, pt=None, slope=None, **kwargs): if isinstance(p1, LinearEntity): if pt is not None: raise ValueError('When p1 is a LinearEntity, pt should be None') p1, pt = Point._normalize_dimension(*p1.args, dim=2) else: p1 = Point(p1, dim=2) if pt is not None and slope is None: try: p2 = Point(pt, dim=2) except (NotImplementedError, TypeError, ValueError): raise ValueError(filldedent(''' The 2nd argument was not a valid Point. If it was a slope, enter it with keyword "slope". ''')) elif slope is not None and pt is None: slope = sympify(slope) if slope.is_finite is False: # when infinite slope, don't change x dx = 0 dy = 1 else: # go over 1 up slope dx = 1 dy = slope # XXX avoiding simplification by adding to coords directly p2 = Point(p1.x + dx, p1.y + dy, evaluate=False) else: raise ValueError('A 2nd Point or keyword "slope" must be used.') return LinearEntity2D.__new__(cls, p1, p2, **kwargs) def _svg(self, scale_factor=1., fill_color="#66cc99"): """Returns SVG path element for the LinearEntity. Parameters ========== scale_factor : float Multiplication factor for the SVG stroke-width. Default is 1. fill_color : str, optional Hex string for fill color. Default is "#66cc99". """ from sympy.core.evalf import N verts = (N(self.p1), N(self.p2)) coords = ["{0},{1}".format(p.x, p.y) for p in verts] path = "M {0} L {1}".format(coords[0], " L ".join(coords[1:])) return ( '<path fill-rule="evenodd" fill="{2}" stroke="#555555" ' 'stroke-width="{0}" opacity="0.6" d="{1}" ' 'marker-start="url(#markerReverseArrow)" marker-end="url(#markerArrow)"/>' ).format(2. * scale_factor, path, fill_color) @property def coefficients(self): """The coefficients (`a`, `b`, `c`) for `ax + by + c = 0`. See Also ======== sympy.geometry.line.Line.equation Examples ======== >>> from sympy import Point, Line >>> from sympy.abc import x, y >>> p1, p2 = Point(0, 0), Point(5, 3) >>> l = Line(p1, p2) >>> l.coefficients (-3, 5, 0) >>> p3 = Point(x, y) >>> l2 = Line(p1, p3) >>> l2.coefficients (-y, x, 0) """ p1, p2 = self.points if p1.x == p2.x: return (S.One, S.Zero, -p1.x) elif p1.y == p2.y: return (S.Zero, S.One, -p1.y) return tuple([simplify(i) for i in (self.p1.y - self.p2.y, self.p2.x - self.p1.x, self.p1.x*self.p2.y - self.p1.y*self.p2.x)]) def equation(self, x='x', y='y'): """The equation of the line: ax + by + c. Parameters ========== x : str, optional The name to use for the x-axis, default value is 'x'. y : str, optional The name to use for the y-axis, default value is 'y'. Returns ======= equation : sympy expression See Also ======== LinearEntity.coefficients Examples ======== >>> from sympy import Point, Line >>> p1, p2 = Point(1, 0), Point(5, 3) >>> l1 = Line(p1, p2) >>> l1.equation() -3*x + 4*y + 3 """ x = _symbol(x, real=True) y = _symbol(y, real=True) p1, p2 = self.points if p1.x == p2.x: return x - p1.x elif p1.y == p2.y: return y - p1.y a, b, c = self.coefficients return a*x + b*y + c class Ray2D(LinearEntity2D, Ray): """ A Ray is a semi-line in the space with a source point and a direction. Parameters ========== p1 : Point The source of the Ray p2 : Point or radian value This point determines the direction in which the Ray propagates. If given as an angle it is interpreted in radians with the positive direction being ccw. Attributes ========== source xdirection ydirection See Also ======== sympy.geometry.point.Point, Line Examples ======== >>> from sympy import Point, pi >>> from sympy.geometry import Ray >>> r = Ray(Point(2, 3), Point(3, 5)) >>> r Ray2D(Point2D(2, 3), Point2D(3, 5)) >>> r.points (Point2D(2, 3), Point2D(3, 5)) >>> r.source Point2D(2, 3) >>> r.xdirection oo >>> r.ydirection oo >>> r.slope 2 >>> Ray(Point(0, 0), angle=pi/4).slope 1 """ def __new__(cls, p1, pt=None, angle=None, **kwargs): p1 = Point(p1, dim=2) if pt is not None and angle is None: try: p2 = Point(pt, dim=2) except (NotImplementedError, TypeError, ValueError): from sympy.utilities.misc import filldedent raise ValueError(filldedent(''' The 2nd argument was not a valid Point; if it was meant to be an angle it should be given with keyword "angle".''')) if p1 == p2: raise ValueError('A Ray requires two distinct points.') elif angle is not None and pt is None: # we need to know if the angle is an odd multiple of pi/2 c = pi_coeff(sympify(angle)) p2 = None if c is not None: if c.is_Rational: if c.q == 2: if c.p == 1: p2 = p1 + Point(0, 1) elif c.p == 3: p2 = p1 + Point(0, -1) elif c.q == 1: if c.p == 0: p2 = p1 + Point(1, 0) elif c.p == 1: p2 = p1 + Point(-1, 0) if p2 is None: c *= S.Pi else: c = angle % (2*S.Pi) if not p2: m = 2*c/S.Pi left = And(1 < m, m < 3) # is it in quadrant 2 or 3? x = Piecewise((-1, left), (Piecewise((0, Eq(m % 1, 0)), (1, True)), True)) y = Piecewise((-tan(c), left), (Piecewise((1, Eq(m, 1)), (-1, Eq(m, 3)), (tan(c), True)), True)) p2 = p1 + Point(x, y) else: raise ValueError('A 2nd point or keyword "angle" must be used.') return LinearEntity2D.__new__(cls, p1, p2, **kwargs) @property def xdirection(self): """The x direction of the ray. Positive infinity if the ray points in the positive x direction, negative infinity if the ray points in the negative x direction, or 0 if the ray is vertical. See Also ======== ydirection Examples ======== >>> from sympy import Point, Ray >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(0, -1) >>> r1, r2 = Ray(p1, p2), Ray(p1, p3) >>> r1.xdirection oo >>> r2.xdirection 0 """ if self.p1.x < self.p2.x: return S.Infinity elif self.p1.x == self.p2.x: return S.Zero else: return S.NegativeInfinity @property def ydirection(self): """The y direction of the ray. Positive infinity if the ray points in the positive y direction, negative infinity if the ray points in the negative y direction, or 0 if the ray is horizontal. See Also ======== xdirection Examples ======== >>> from sympy import Point, Ray >>> p1, p2, p3 = Point(0, 0), Point(-1, -1), Point(-1, 0) >>> r1, r2 = Ray(p1, p2), Ray(p1, p3) >>> r1.ydirection -oo >>> r2.ydirection 0 """ if self.p1.y < self.p2.y: return S.Infinity elif self.p1.y == self.p2.y: return S.Zero else: return S.NegativeInfinity def closing_angle(r1, r2): """Return the angle by which r2 must be rotated so it faces the same direction as r1. Parameters ========== r1 : Ray2D r2 : Ray2D Returns ======= angle : angle in radians (ccw angle is positive) See Also ======== LinearEntity.angle_between Examples ======== >>> from sympy import Ray, pi >>> r1 = Ray((0, 0), (1, 0)) >>> r2 = r1.rotate(-pi/2) >>> angle = r1.closing_angle(r2); angle pi/2 >>> r2.rotate(angle).direction.unit == r1.direction.unit True >>> r2.closing_angle(r1) -pi/2 """ if not all(isinstance(r, Ray2D) for r in (r1, r2)): # although the direction property is defined for # all linear entities, only the Ray is truly a # directed object raise TypeError('Both arguments must be Ray2D objects.') a1 = atan2(*list(reversed(r1.direction.args))) a2 = atan2(*list(reversed(r2.direction.args))) if a1*a2 < 0: a1 = 2*S.Pi + a1 if a1 < 0 else a1 a2 = 2*S.Pi + a2 if a2 < 0 else a2 return a1 - a2 class Segment2D(LinearEntity2D, Segment): """A line segment in 2D space. Parameters ========== p1 : Point p2 : Point Attributes ========== length : number or sympy expression midpoint : Point See Also ======== sympy.geometry.point.Point, Line Examples ======== >>> from sympy import Point >>> from sympy.geometry import Segment >>> Segment((1, 0), (1, 1)) # tuples are interpreted as pts Segment2D(Point2D(1, 0), Point2D(1, 1)) >>> s = Segment(Point(4, 3), Point(1, 1)); s Segment2D(Point2D(4, 3), Point2D(1, 1)) >>> s.points (Point2D(4, 3), Point2D(1, 1)) >>> s.slope 2/3 >>> s.length sqrt(13) >>> s.midpoint Point2D(5/2, 2) """ def __new__(cls, p1, p2, **kwargs): p1 = Point(p1, dim=2) p2 = Point(p2, dim=2) if p1 == p2: return p1 return LinearEntity2D.__new__(cls, p1, p2, **kwargs) def _svg(self, scale_factor=1., fill_color="#66cc99"): """Returns SVG path element for the LinearEntity. Parameters ========== scale_factor : float Multiplication factor for the SVG stroke-width. Default is 1. fill_color : str, optional Hex string for fill color. Default is "#66cc99". """ from sympy.core.evalf import N verts = (N(self.p1), N(self.p2)) coords = ["{0},{1}".format(p.x, p.y) for p in verts] path = "M {0} L {1}".format(coords[0], " L ".join(coords[1:])) return ( '<path fill-rule="evenodd" fill="{2}" stroke="#555555" ' 'stroke-width="{0}" opacity="0.6" d="{1}" />' ).format(2. * scale_factor, path, fill_color) class LinearEntity3D(LinearEntity): """An base class for all linear entities (line, ray and segment) in a 3-dimensional Euclidean space. Attributes ========== p1 p2 direction_ratio direction_cosine points Notes ===== This is a base class and is not meant to be instantiated. """ def __new__(cls, p1, p2, **kwargs): p1 = Point3D(p1, dim=3) p2 = Point3D(p2, dim=3) if p1 == p2: # if it makes sense to return a Point, handle in subclass raise ValueError( "%s.__new__ requires two unique Points." % cls.__name__) return GeometryEntity.__new__(cls, p1, p2, **kwargs) ambient_dimension = 3 @property def direction_ratio(self): """The direction ratio of a given line in 3D. See Also ======== sympy.geometry.line.Line.equation Examples ======== >>> from sympy import Point3D, Line3D >>> p1, p2 = Point3D(0, 0, 0), Point3D(5, 3, 1) >>> l = Line3D(p1, p2) >>> l.direction_ratio [5, 3, 1] """ p1, p2 = self.points return p1.direction_ratio(p2) @property def direction_cosine(self): """The normalized direction ratio of a given line in 3D. See Also ======== sympy.geometry.line.Line.equation Examples ======== >>> from sympy import Point3D, Line3D >>> p1, p2 = Point3D(0, 0, 0), Point3D(5, 3, 1) >>> l = Line3D(p1, p2) >>> l.direction_cosine [sqrt(35)/7, 3*sqrt(35)/35, sqrt(35)/35] >>> sum(i**2 for i in _) 1 """ p1, p2 = self.points return p1.direction_cosine(p2) class Line3D(LinearEntity3D, Line): """An infinite 3D line in space. A line is declared with two distinct points or a point and direction_ratio as defined using keyword `direction_ratio`. Parameters ========== p1 : Point3D pt : Point3D direction_ratio : list See Also ======== sympy.geometry.point.Point3D sympy.geometry.line.Line sympy.geometry.line.Line2D Examples ======== >>> from sympy import Point3D >>> from sympy.geometry import Line3D, Segment3D >>> L = Line3D(Point3D(2, 3, 4), Point3D(3, 5, 1)) >>> L Line3D(Point3D(2, 3, 4), Point3D(3, 5, 1)) >>> L.points (Point3D(2, 3, 4), Point3D(3, 5, 1)) """ def __new__(cls, p1, pt=None, direction_ratio=[], **kwargs): if isinstance(p1, LinearEntity3D): if pt is not None: raise ValueError('if p1 is a LinearEntity, pt must be None.') p1, pt = p1.args else: p1 = Point(p1, dim=3) if pt is not None and len(direction_ratio) == 0: pt = Point(pt, dim=3) elif len(direction_ratio) == 3 and pt is None: pt = Point3D(p1.x + direction_ratio[0], p1.y + direction_ratio[1], p1.z + direction_ratio[2]) else: raise ValueError('A 2nd Point or keyword "direction_ratio" must ' 'be used.') return LinearEntity3D.__new__(cls, p1, pt, **kwargs) def equation(self, x='x', y='y', z='z', k=None): """Return the equations that define the line in 3D. Parameters ========== x : str, optional The name to use for the x-axis, default value is 'x'. y : str, optional The name to use for the y-axis, default value is 'y'. z : str, optional The name to use for the z-axis, default value is 'z'. Returns ======= equation : Tuple of simultaneous equations Examples ======== >>> from sympy import Point3D, Line3D, solve >>> from sympy.abc import x, y, z >>> p1, p2 = Point3D(1, 0, 0), Point3D(5, 3, 0) >>> l1 = Line3D(p1, p2) >>> eq = l1.equation(x, y, z); eq (-3*x + 4*y + 3, z) >>> solve(eq.subs(z, 0), (x, y, z)) {x: 4*y/3 + 1} """ if k is not None: SymPyDeprecationWarning( feature="equation() no longer needs 'k'", issue=13742, deprecated_since_version="1.2").warn() from sympy import solve x, y, z, k = [_symbol(i, real=True) for i in (x, y, z, 'k')] p1, p2 = self.points d1, d2, d3 = p1.direction_ratio(p2) x1, y1, z1 = p1 v = (x, y, z) eqs = [-d1*k + x - x1, -d2*k + y - y1, -d3*k + z - z1] # eliminate k from equations by solving first eq with k for k for i, e in enumerate(eqs): if e.has(k): kk = solve(eqs[i], k)[0] eqs.pop(i) break return Tuple(*[i.subs(k, kk).as_numer_denom()[0] for i in eqs]) class Ray3D(LinearEntity3D, Ray): """ A Ray is a semi-line in the space with a source point and a direction. Parameters ========== p1 : Point3D The source of the Ray p2 : Point or a direction vector direction_ratio: Determines the direction in which the Ray propagates. Attributes ========== source xdirection ydirection zdirection See Also ======== sympy.geometry.point.Point3D, Line3D Examples ======== >>> from sympy import Point3D >>> from sympy.geometry import Ray3D >>> r = Ray3D(Point3D(2, 3, 4), Point3D(3, 5, 0)) >>> r Ray3D(Point3D(2, 3, 4), Point3D(3, 5, 0)) >>> r.points (Point3D(2, 3, 4), Point3D(3, 5, 0)) >>> r.source Point3D(2, 3, 4) >>> r.xdirection oo >>> r.ydirection oo >>> r.direction_ratio [1, 2, -4] """ def __new__(cls, p1, pt=None, direction_ratio=[], **kwargs): from sympy.utilities.misc import filldedent if isinstance(p1, LinearEntity3D): if pt is not None: raise ValueError('If p1 is a LinearEntity, pt must be None') p1, pt = p1.args else: p1 = Point(p1, dim=3) if pt is not None and len(direction_ratio) == 0: pt = Point(pt, dim=3) elif len(direction_ratio) == 3 and pt is None: pt = Point3D(p1.x + direction_ratio[0], p1.y + direction_ratio[1], p1.z + direction_ratio[2]) else: raise ValueError(filldedent(''' A 2nd Point or keyword "direction_ratio" must be used. ''')) return LinearEntity3D.__new__(cls, p1, pt, **kwargs) @property def xdirection(self): """The x direction of the ray. Positive infinity if the ray points in the positive x direction, negative infinity if the ray points in the negative x direction, or 0 if the ray is vertical. See Also ======== ydirection Examples ======== >>> from sympy import Point3D, Ray3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(0, -1, 0) >>> r1, r2 = Ray3D(p1, p2), Ray3D(p1, p3) >>> r1.xdirection oo >>> r2.xdirection 0 """ if self.p1.x < self.p2.x: return S.Infinity elif self.p1.x == self.p2.x: return S.Zero else: return S.NegativeInfinity @property def ydirection(self): """The y direction of the ray. Positive infinity if the ray points in the positive y direction, negative infinity if the ray points in the negative y direction, or 0 if the ray is horizontal. See Also ======== xdirection Examples ======== >>> from sympy import Point3D, Ray3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(-1, -1, -1), Point3D(-1, 0, 0) >>> r1, r2 = Ray3D(p1, p2), Ray3D(p1, p3) >>> r1.ydirection -oo >>> r2.ydirection 0 """ if self.p1.y < self.p2.y: return S.Infinity elif self.p1.y == self.p2.y: return S.Zero else: return S.NegativeInfinity @property def zdirection(self): """The z direction of the ray. Positive infinity if the ray points in the positive z direction, negative infinity if the ray points in the negative z direction, or 0 if the ray is horizontal. See Also ======== xdirection Examples ======== >>> from sympy import Point3D, Ray3D >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(-1, -1, -1), Point3D(-1, 0, 0) >>> r1, r2 = Ray3D(p1, p2), Ray3D(p1, p3) >>> r1.ydirection -oo >>> r2.ydirection 0 >>> r2.zdirection 0 """ if self.p1.z < self.p2.z: return S.Infinity elif self.p1.z == self.p2.z: return S.Zero else: return S.NegativeInfinity class Segment3D(LinearEntity3D, Segment): """A line segment in a 3D space. Parameters ========== p1 : Point3D p2 : Point3D Attributes ========== length : number or sympy expression midpoint : Point3D See Also ======== sympy.geometry.point.Point3D, Line3D Examples ======== >>> from sympy import Point3D >>> from sympy.geometry import Segment3D >>> Segment3D((1, 0, 0), (1, 1, 1)) # tuples are interpreted as pts Segment3D(Point3D(1, 0, 0), Point3D(1, 1, 1)) >>> s = Segment3D(Point3D(4, 3, 9), Point3D(1, 1, 7)); s Segment3D(Point3D(4, 3, 9), Point3D(1, 1, 7)) >>> s.points (Point3D(4, 3, 9), Point3D(1, 1, 7)) >>> s.length sqrt(17) >>> s.midpoint Point3D(5/2, 2, 8) """ def __new__(cls, p1, p2, **kwargs): p1 = Point(p1, dim=3) p2 = Point(p2, dim=3) if p1 == p2: return p1 return LinearEntity3D.__new__(cls, p1, p2, **kwargs)

f89ecc91349d43196d88a1534c7f1ee6c098c85fde9aee2f1bd6c2ce9ed9b8df

""" This module implements Holonomic Functions and various operations on them. """ from __future__ import print_function, division from sympy import (Symbol, S, Dummy, Order, rf, meijerint, I, solve, limit, Float, nsimplify, gamma) from sympy.core.compatibility import range, ordered, string_types from sympy.core.numbers import NaN, Infinity, NegativeInfinity from sympy.core.sympify import sympify from sympy.functions.combinatorial.factorials import binomial, factorial from sympy.functions.elementary.exponential import exp_polar, exp from sympy.functions.special.hyper import hyper, meijerg from sympy.matrices import Matrix from sympy.polys.rings import PolyElement from sympy.polys.fields import FracElement from sympy.polys.domains import QQ, RR from sympy.polys.polyclasses import DMF from sympy.polys.polyroots import roots from sympy.polys.polytools import Poly from sympy.printing import sstr from sympy.simplify.hyperexpand import hyperexpand from .linearsolver import NewMatrix from .recurrence import HolonomicSequence, RecurrenceOperator, RecurrenceOperators from .holonomicerrors import (NotPowerSeriesError, NotHyperSeriesError, SingularityError, NotHolonomicError) def DifferentialOperators(base, generator): r""" This function is used to create annihilators using ``Dx``. Returns an Algebra of Differential Operators also called Weyl Algebra and the operator for differentiation i.e. the ``Dx`` operator. Parameters ========== base: Base polynomial ring for the algebra. The base polynomial ring is the ring of polynomials in :math:`x` that will appear as coefficients in the operators. generator: Generator of the algebra which can be either a noncommutative ``Symbol`` or a string. e.g. "Dx" or "D". Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy.abc import x >>> from sympy.holonomic.holonomic import DifferentialOperators >>> R, Dx = DifferentialOperators(ZZ.old_poly_ring(x), 'Dx') >>> R Univariate Differential Operator Algebra in intermediate Dx over the base ring ZZ[x] >>> Dx*x (1) + (x)*Dx """ ring = DifferentialOperatorAlgebra(base, generator) return (ring, ring.derivative_operator) class DifferentialOperatorAlgebra(object): r""" An Ore Algebra is a set of noncommutative polynomials in the intermediate ``Dx`` and coefficients in a base polynomial ring :math:`A`. It follows the commutation rule: .. math :: Dxa = \sigma(a)Dx + \delta(a) for :math:`a \subset A`. Where :math:`\sigma: A --> A` is an endomorphism and :math:`\delta: A --> A` is a skew-derivation i.e. :math:`\delta(ab) = \delta(a) * b + \sigma(a) * \delta(b)`. If one takes the sigma as identity map and delta as the standard derivation then it becomes the algebra of Differential Operators also called a Weyl Algebra i.e. an algebra whose elements are Differential Operators. This class represents a Weyl Algebra and serves as the parent ring for Differential Operators. Examples ======== >>> from sympy.polys.domains import ZZ >>> from sympy import symbols >>> from sympy.holonomic.holonomic import DifferentialOperators >>> x = symbols('x') >>> R, Dx = DifferentialOperators(ZZ.old_poly_ring(x), 'Dx') >>> R Univariate Differential Operator Algebra in intermediate Dx over the base ring ZZ[x] See Also ======== DifferentialOperator """ def __init__(self, base, generator): # the base polynomial ring for the algebra self.base = base # the operator representing differentiation i.e. `Dx` self.derivative_operator = DifferentialOperator( [base.zero, base.one], self) if generator is None: self.gen_symbol = Symbol('Dx', commutative=False) else: if isinstance(generator, string_types): self.gen_symbol = Symbol(generator, commutative=False) elif isinstance(generator, Symbol): self.gen_symbol = generator def __str__(self): string = 'Univariate Differential Operator Algebra in intermediate '\ + sstr(self.gen_symbol) + ' over the base ring ' + \ (self.base).__str__() return string __repr__ = __str__ def __eq__(self, other): if self.base == other.base and self.gen_symbol == other.gen_symbol: return True else: return False class DifferentialOperator(object): """ Differential Operators are elements of Weyl Algebra. The Operators are defined by a list of polynomials in the base ring and the parent ring of the Operator i.e. the algebra it belongs to. Takes a list of polynomials for each power of ``Dx`` and the parent ring which must be an instance of DifferentialOperatorAlgebra. A Differential Operator can be created easily using the operator ``Dx``. See examples below. Examples ======== >>> from sympy.holonomic.holonomic import DifferentialOperator, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(ZZ.old_poly_ring(x),'Dx') >>> DifferentialOperator([0, 1, x**2], R) (1)*Dx + (x**2)*Dx**2 >>> (x*Dx*x + 1 - Dx**2)**2 (2*x**2 + 2*x + 1) + (4*x**3 + 2*x**2 - 4)*Dx + (x**4 - 6*x - 2)*Dx**2 + (-2*x**2)*Dx**3 + (1)*Dx**4 See Also ======== DifferentialOperatorAlgebra """ _op_priority = 20 def __init__(self, list_of_poly, parent): """ Parameters ========== list_of_poly: List of polynomials belonging to the base ring of the algebra. parent: Parent algebra of the operator. """ # the parent ring for this operator # must be an DifferentialOperatorAlgebra object self.parent = parent base = self.parent.base self.x = base.gens[0] if isinstance(base.gens[0], Symbol) else base.gens[0][0] # sequence of polynomials in x for each power of Dx # the list should not have trailing zeroes # represents the operator # convert the expressions into ring elements using from_sympy for i, j in enumerate(list_of_poly): if not isinstance(j, base.dtype): list_of_poly[i] = base.from_sympy(sympify(j)) else: list_of_poly[i] = base.from_sympy(base.to_sympy(j)) self.listofpoly = list_of_poly # highest power of `Dx` self.order = len(self.listofpoly) - 1 def __mul__(self, other): """ Multiplies two DifferentialOperator and returns another DifferentialOperator instance using the commutation rule Dx*a = a*Dx + a' """ listofself = self.listofpoly if not isinstance(other, DifferentialOperator): if not isinstance(other, self.parent.base.dtype): listofother = [self.parent.base.from_sympy(sympify(other))] else: listofother = [other] else: listofother = other.listofpoly # multiplies a polynomial `b` with a list of polynomials def _mul_dmp_diffop(b, listofother): if isinstance(listofother, list): sol = [] for i in listofother: sol.append(i * b) return sol else: return [b * listofother] sol = _mul_dmp_diffop(listofself[0], listofother) # compute Dx^i * b def _mul_Dxi_b(b): sol1 = [self.parent.base.zero] sol2 = [] if isinstance(b, list): for i in b: sol1.append(i) sol2.append(i.diff()) else: sol1.append(self.parent.base.from_sympy(b)) sol2.append(self.parent.base.from_sympy(b).diff()) return _add_lists(sol1, sol2) for i in range(1, len(listofself)): # find Dx^i * b in ith iteration listofother = _mul_Dxi_b(listofother) # solution = solution + listofself[i] * (Dx^i * b) sol = _add_lists(sol, _mul_dmp_diffop(listofself[i], listofother)) return DifferentialOperator(sol, self.parent) def __rmul__(self, other): if not isinstance(other, DifferentialOperator): if not isinstance(other, self.parent.base.dtype): other = (self.parent.base).from_sympy(sympify(other)) sol = [] for j in self.listofpoly: sol.append(other * j) return DifferentialOperator(sol, self.parent) def __add__(self, other): if isinstance(other, DifferentialOperator): sol = _add_lists(self.listofpoly, other.listofpoly) return DifferentialOperator(sol, self.parent) else: list_self = self.listofpoly if not isinstance(other, self.parent.base.dtype): list_other = [((self.parent).base).from_sympy(sympify(other))] else: list_other = [other] sol = [] sol.append(list_self[0] + list_other[0]) sol += list_self[1:] return DifferentialOperator(sol, self.parent) __radd__ = __add__ def __sub__(self, other): return self + (-1) * other def __rsub__(self, other): return (-1) * self + other def __neg__(self): return -1 * self def __div__(self, other): return self * (S.One / other) def __truediv__(self, other): return self.__div__(other) def __pow__(self, n): if n == 1: return self if n == 0: return DifferentialOperator([self.parent.base.one], self.parent) # if self is `Dx` if self.listofpoly == self.parent.derivative_operator.listofpoly: sol = [] for i in range(0, n): sol.append(self.parent.base.zero) sol.append(self.parent.base.one) return DifferentialOperator(sol, self.parent) # the general case else: if n % 2 == 1: powreduce = self**(n - 1) return powreduce * self elif n % 2 == 0: powreduce = self**(n / 2) return powreduce * powreduce def __str__(self): listofpoly = self.listofpoly print_str = '' for i, j in enumerate(listofpoly): if j == self.parent.base.zero: continue if i == 0: print_str += '(' + sstr(j) + ')' continue if print_str: print_str += ' + ' if i == 1: print_str += '(' + sstr(j) + ')*%s' %(self.parent.gen_symbol) continue print_str += '(' + sstr(j) + ')' + '*%s**' %(self.parent.gen_symbol) + sstr(i) return print_str __repr__ = __str__ def __eq__(self, other): if isinstance(other, DifferentialOperator): if self.listofpoly == other.listofpoly and self.parent == other.parent: return True else: return False else: if self.listofpoly[0] == other: for i in self.listofpoly[1:]: if i is not self.parent.base.zero: return False return True else: return False def is_singular(self, x0): """ Checks if the differential equation is singular at x0. """ base = self.parent.base return x0 in roots(base.to_sympy(self.listofpoly[-1]), self.x) class HolonomicFunction(object): r""" A Holonomic Function is a solution to a linear homogeneous ordinary differential equation with polynomial coefficients. This differential equation can also be represented by an annihilator i.e. a Differential Operator ``L`` such that :math:`L.f = 0`. For uniqueness of these functions, initial conditions can also be provided along with the annihilator. Holonomic functions have closure properties and thus forms a ring. Given two Holonomic Functions f and g, their sum, product, integral and derivative is also a Holonomic Function. For ordinary points initial condition should be a vector of values of the derivatives i.e. :math:`[y(x_0), y'(x_0), y''(x_0) ... ]`. For regular singular points initial conditions can also be provided in this format: :math:`{s0: [C_0, C_1, ...], s1: [C^1_0, C^1_1, ...], ...}` where s0, s1, ... are the roots of indicial equation and vectors :math:`[C_0, C_1, ...], [C^0_0, C^0_1, ...], ...` are the corresponding initial terms of the associated power series. See Examples below. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols, S >>> x = symbols('x') >>> R, Dx = DifferentialOperators(QQ.old_poly_ring(x),'Dx') >>> p = HolonomicFunction(Dx - 1, x, 0, [1]) # e^x >>> q = HolonomicFunction(Dx**2 + 1, x, 0, [0, 1]) # sin(x) >>> p + q # annihilator of e^x + sin(x) HolonomicFunction((-1) + (1)*Dx + (-1)*Dx**2 + (1)*Dx**3, x, 0, [1, 2, 1]) >>> p * q # annihilator of e^x * sin(x) HolonomicFunction((2) + (-2)*Dx + (1)*Dx**2, x, 0, [0, 1]) An example of initial conditions for regular singular points, the indicial equation has only one root `1/2`. >>> HolonomicFunction(-S(1)/2 + x*Dx, x, 0, {S(1)/2: [1]}) HolonomicFunction((-1/2) + (x)*Dx, x, 0, {1/2: [1]}) >>> HolonomicFunction(-S(1)/2 + x*Dx, x, 0, {S(1)/2: [1]}).to_expr() sqrt(x) To plot a Holonomic Function, one can use `.evalf()` for numerical computation. Here's an example on `sin(x)**2/x` using numpy and matplotlib. >>> import sympy.holonomic # doctest: +SKIP >>> from sympy import var, sin # doctest: +SKIP >>> import matplotlib.pyplot as plt # doctest: +SKIP >>> import numpy as np # doctest: +SKIP >>> var("x") # doctest: +SKIP >>> r = np.linspace(1, 5, 100) # doctest: +SKIP >>> y = sympy.holonomic.expr_to_holonomic(sin(x)**2/x, x0=1).evalf(r) # doctest: +SKIP >>> plt.plot(r, y, label="holonomic function") # doctest: +SKIP >>> plt.show() # doctest: +SKIP """ _op_priority = 20 def __init__(self, annihilator, x, x0=0, y0=None): """ Parameters ========== annihilator: Annihilator of the Holonomic Function, represented by a `DifferentialOperator` object. x: Variable of the function. x0: The point at which initial conditions are stored. Generally an integer. y0: The initial condition. The proper format for the initial condition is described in class docstring. To make the function unique, length of the vector `y0` should be equal to or greater than the order of differential equation. """ # initial condition self.y0 = y0 # the point for initial conditions, default is zero. self.x0 = x0 # differential operator L such that L.f = 0 self.annihilator = annihilator self.x = x def __str__(self): if self._have_init_cond(): str_sol = 'HolonomicFunction(%s, %s, %s, %s)' % (str(self.annihilator),\ sstr(self.x), sstr(self.x0), sstr(self.y0)) else: str_sol = 'HolonomicFunction(%s, %s)' % (str(self.annihilator),\ sstr(self.x)) return str_sol __repr__ = __str__ def unify(self, other): """ Unifies the base polynomial ring of a given two Holonomic Functions. """ R1 = self.annihilator.parent.base R2 = other.annihilator.parent.base dom1 = R1.dom dom2 = R2.dom if R1 == R2: return (self, other) R = (dom1.unify(dom2)).old_poly_ring(self.x) newparent, _ = DifferentialOperators(R, str(self.annihilator.parent.gen_symbol)) sol1 = [R1.to_sympy(i) for i in self.annihilator.listofpoly] sol2 = [R2.to_sympy(i) for i in other.annihilator.listofpoly] sol1 = DifferentialOperator(sol1, newparent) sol2 = DifferentialOperator(sol2, newparent) sol1 = HolonomicFunction(sol1, self.x, self.x0, self.y0) sol2 = HolonomicFunction(sol2, other.x, other.x0, other.y0) return (sol1, sol2) def is_singularics(self): """ Returns True if the function have singular initial condition in the dictionary format. Returns False if the function have ordinary initial condition in the list format. Returns None for all other cases. """ if isinstance(self.y0, dict): return True elif isinstance(self.y0, list): return False def _have_init_cond(self): """ Checks if the function have initial condition. """ return bool(self.y0) def _singularics_to_ord(self): """ Converts a singular initial condition to ordinary if possible. """ a = list(self.y0)[0] b = self.y0[a] if len(self.y0) == 1 and a == int(a) and a > 0: y0 = [] a = int(a) for i in range(a): y0.append(S(0)) y0 += [j * factorial(a + i) for i, j in enumerate(b)] return HolonomicFunction(self.annihilator, self.x, self.x0, y0) def __add__(self, other): # if the ground domains are different if self.annihilator.parent.base != other.annihilator.parent.base: a, b = self.unify(other) return a + b deg1 = self.annihilator.order deg2 = other.annihilator.order dim = max(deg1, deg2) R = self.annihilator.parent.base K = R.get_field() rowsself = [self.annihilator] rowsother = [other.annihilator] gen = self.annihilator.parent.derivative_operator # constructing annihilators up to order dim for i in range(dim - deg1): diff1 = (gen * rowsself[-1]) rowsself.append(diff1) for i in range(dim - deg2): diff2 = (gen * rowsother[-1]) rowsother.append(diff2) row = rowsself + rowsother # constructing the matrix of the ansatz r = [] for expr in row: p = [] for i in range(dim + 1): if i >= len(expr.listofpoly): p.append(0) else: p.append(K.new(expr.listofpoly[i].rep)) r.append(p) r = NewMatrix(r).transpose() homosys = [[S(0) for q in range(dim + 1)]] homosys = NewMatrix(homosys).transpose() # solving the linear system using gauss jordan solver solcomp = r.gauss_jordan_solve(homosys) sol = solcomp[0] # if a solution is not obtained then increasing the order by 1 in each # iteration while sol.is_zero: dim += 1 diff1 = (gen * rowsself[-1]) rowsself.append(diff1) diff2 = (gen * rowsother[-1]) rowsother.append(diff2) row = rowsself + rowsother r = [] for expr in row: p = [] for i in range(dim + 1): if i >= len(expr.listofpoly): p.append(S(0)) else: p.append(K.new(expr.listofpoly[i].rep)) r.append(p) r = NewMatrix(r).transpose() homosys = [[S(0) for q in range(dim + 1)]] homosys = NewMatrix(homosys).transpose() solcomp = r.gauss_jordan_solve(homosys) sol = solcomp[0] # taking only the coefficients needed to multiply with `self` # can be also be done the other way by taking R.H.S and multiplying with # `other` sol = sol[:dim + 1 - deg1] sol1 = _normalize(sol, self.annihilator.parent) # annihilator of the solution sol = sol1 * (self.annihilator) sol = _normalize(sol.listofpoly, self.annihilator.parent, negative=False) if not (self._have_init_cond() and other._have_init_cond()): return HolonomicFunction(sol, self.x) # both the functions have ordinary initial conditions if self.is_singularics() == False and other.is_singularics() == False: # directly add the corresponding value if self.x0 == other.x0: # try to extended the initial conditions # using the annihilator y1 = _extend_y0(self, sol.order) y2 = _extend_y0(other, sol.order) y0 = [a + b for a, b in zip(y1, y2)] return HolonomicFunction(sol, self.x, self.x0, y0) else: # change the intiial conditions to a same point selfat0 = self.annihilator.is_singular(0) otherat0 = other.annihilator.is_singular(0) if self.x0 == 0 and not selfat0 and not otherat0: return self + other.change_ics(0) elif other.x0 == 0 and not selfat0 and not otherat0: return self.change_ics(0) + other else: selfatx0 = self.annihilator.is_singular(self.x0) otheratx0 = other.annihilator.is_singular(self.x0) if not selfatx0 and not otheratx0: return self + other.change_ics(self.x0) else: return self.change_ics(other.x0) + other if self.x0 != other.x0: return HolonomicFunction(sol, self.x) # if the functions have singular_ics y1 = None y2 = None if self.is_singularics() == False and other.is_singularics() == True: # convert the ordinary initial condition to singular. _y0 = [j / factorial(i) for i, j in enumerate(self.y0)] y1 = {S(0): _y0} y2 = other.y0 elif self.is_singularics() == True and other.is_singularics() == False: _y0 = [j / factorial(i) for i, j in enumerate(other.y0)] y1 = self.y0 y2 = {S(0): _y0} elif self.is_singularics() == True and other.is_singularics() == True: y1 = self.y0 y2 = other.y0 # computing singular initial condition for the result # taking union of the series terms of both functions y0 = {} for i in y1: # add corresponding initial terms if the power # on `x` is same if i in y2: y0[i] = [a + b for a, b in zip(y1[i], y2[i])] else: y0[i] = y1[i] for i in y2: if not i in y1: y0[i] = y2[i] return HolonomicFunction(sol, self.x, self.x0, y0) def integrate(self, limits, initcond=False): """ Integrates the given holonomic function. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(QQ.old_poly_ring(x),'Dx') >>> HolonomicFunction(Dx - 1, x, 0, [1]).integrate((x, 0, x)) # e^x - 1 HolonomicFunction((-1)*Dx + (1)*Dx**2, x, 0, [0, 1]) >>> HolonomicFunction(Dx**2 + 1, x, 0, [1, 0]).integrate((x, 0, x)) HolonomicFunction((1)*Dx + (1)*Dx**3, x, 0, [0, 1, 0]) """ # to get the annihilator, just multiply by Dx from right D = self.annihilator.parent.derivative_operator # if the function have initial conditions of the series format if self.is_singularics() == True: r = self._singularics_to_ord() if r: return r.integrate(limits, initcond=initcond) # computing singular initial condition for the function # produced after integration. y0 = {} for i in self.y0: c = self.y0[i] c2 = [] for j in range(len(c)): if c[j] == 0: c2.append(S(0)) # if power on `x` is -1, the integration becomes log(x) # TODO: Implement this case elif i + j + 1 == 0: raise NotImplementedError("logarithmic terms in the series are not supported") else: c2.append(c[j] / S(i + j + 1)) y0[i + 1] = c2 if hasattr(limits, "__iter__"): raise NotImplementedError("Definite integration for singular initial conditions") return HolonomicFunction(self.annihilator * D, self.x, self.x0, y0) # if no initial conditions are available for the function if not self._have_init_cond(): if initcond: return HolonomicFunction(self.annihilator * D, self.x, self.x0, [S(0)]) return HolonomicFunction(self.annihilator * D, self.x) # definite integral # initial conditions for the answer will be stored at point `a`, # where `a` is the lower limit of the integrand if hasattr(limits, "__iter__"): if len(limits) == 3 and limits[0] == self.x: x0 = self.x0 a = limits[1] b = limits[2] definite = True else: definite = False y0 = [S(0)] y0 += self.y0 indefinite_integral = HolonomicFunction(self.annihilator * D, self.x, self.x0, y0) if not definite: return indefinite_integral # use evalf to get the values at `a` if x0 != a: try: indefinite_expr = indefinite_integral.to_expr() except (NotHyperSeriesError, NotPowerSeriesError): indefinite_expr = None if indefinite_expr: lower = indefinite_expr.subs(self.x, a) if isinstance(lower, NaN): lower = indefinite_expr.limit(self.x, a) else: lower = indefinite_integral.evalf(a) if b == self.x: y0[0] = y0[0] - lower return HolonomicFunction(self.annihilator * D, self.x, x0, y0) elif S(b).is_Number: if indefinite_expr: upper = indefinite_expr.subs(self.x, b) if isinstance(upper, NaN): upper = indefinite_expr.limit(self.x, b) else: upper = indefinite_integral.evalf(b) return upper - lower # if the upper limit is `x`, the answer will be a function if b == self.x: return HolonomicFunction(self.annihilator * D, self.x, a, y0) # if the upper limits is a Number, a numerical value will be returned elif S(b).is_Number: try: s = HolonomicFunction(self.annihilator * D, self.x, a,\ y0).to_expr() indefinite = s.subs(self.x, b) if not isinstance(indefinite, NaN): return indefinite else: return s.limit(self.x, b) except (NotHyperSeriesError, NotPowerSeriesError): return HolonomicFunction(self.annihilator * D, self.x, a, y0).evalf(b) return HolonomicFunction(self.annihilator * D, self.x) def diff(self, *args, **kwargs): r""" Differentiation of the given Holonomic function. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(ZZ.old_poly_ring(x),'Dx') >>> HolonomicFunction(Dx**2 + 1, x, 0, [0, 1]).diff().to_expr() cos(x) >>> HolonomicFunction(Dx - 2, x, 0, [1]).diff().to_expr() 2*exp(2*x) See Also ======== .integrate() """ kwargs.setdefault('evaluate', True) if args: if args[0] != self.x: return S(0) elif len(args) == 2: sol = self for i in range(args[1]): sol = sol.diff(args[0]) return sol ann = self.annihilator # if the function is constant. if ann.listofpoly[0] == ann.parent.base.zero and ann.order == 1: return S(0) # if the coefficient of y in the differential equation is zero. # a shifting is done to compute the answer in this case. elif ann.listofpoly[0] == ann.parent.base.zero: sol = DifferentialOperator(ann.listofpoly[1:], ann.parent) if self._have_init_cond(): # if ordinary initial condition if self.is_singularics() == False: return HolonomicFunction(sol, self.x, self.x0, self.y0[1:]) # TODO: support for singular initial condition return HolonomicFunction(sol, self.x) else: return HolonomicFunction(sol, self.x) # the general algorithm R = ann.parent.base K = R.get_field() seq_dmf = [K.new(i.rep) for i in ann.listofpoly] # -y = a1*y'/a0 + a2*y''/a0 ... + an*y^n/a0 rhs = [i / seq_dmf[0] for i in seq_dmf[1:]] rhs.insert(0, K.zero) # differentiate both lhs and rhs sol = _derivate_diff_eq(rhs) # add the term y' in lhs to rhs sol = _add_lists(sol, [K.zero, K.one]) sol = _normalize(sol[1:], self.annihilator.parent, negative=False) if not self._have_init_cond() or self.is_singularics() == True: return HolonomicFunction(sol, self.x) y0 = _extend_y0(self, sol.order + 1)[1:] return HolonomicFunction(sol, self.x, self.x0, y0) def __eq__(self, other): if self.annihilator == other.annihilator: if self.x == other.x: if self._have_init_cond() and other._have_init_cond(): if self.x0 == other.x0 and self.y0 == other.y0: return True else: return False else: return True else: return False else: return False def __mul__(self, other): ann_self = self.annihilator if not isinstance(other, HolonomicFunction): other = sympify(other) if other.has(self.x): raise NotImplementedError(" Can't multiply a HolonomicFunction and expressions/functions.") if not self._have_init_cond(): return self else: y0 = _extend_y0(self, ann_self.order) y1 = [] for j in y0: y1.append((Poly.new(j, self.x) * other).rep) return HolonomicFunction(ann_self, self.x, self.x0, y1) if self.annihilator.parent.base != other.annihilator.parent.base: a, b = self.unify(other) return a * b ann_other = other.annihilator list_self = [] list_other = [] a = ann_self.order b = ann_other.order R = ann_self.parent.base K = R.get_field() for j in ann_self.listofpoly: list_self.append(K.new(j.rep)) for j in ann_other.listofpoly: list_other.append(K.new(j.rep)) # will be used to reduce the degree self_red = [-list_self[i] / list_self[a] for i in range(a)] other_red = [-list_other[i] / list_other[b] for i in range(b)] # coeff_mull[i][j] is the coefficient of Dx^i(f).Dx^j(g) coeff_mul = [[S(0) for i in range(b + 1)] for j in range(a + 1)] coeff_mul[0][0] = S(1) # making the ansatz lin_sys = [[coeff_mul[i][j] for i in range(a) for j in range(b)]] homo_sys = [[S(0) for q in range(a * b)]] homo_sys = NewMatrix(homo_sys).transpose() sol = (NewMatrix(lin_sys).transpose()).gauss_jordan_solve(homo_sys) # until a non trivial solution is found while sol[0].is_zero: # updating the coefficients Dx^i(f).Dx^j(g) for next degree for i in range(a - 1, -1, -1): for j in range(b - 1, -1, -1): coeff_mul[i][j + 1] += coeff_mul[i][j] coeff_mul[i + 1][j] += coeff_mul[i][j] if isinstance(coeff_mul[i][j], K.dtype): coeff_mul[i][j] = DMFdiff(coeff_mul[i][j]) else: coeff_mul[i][j] = coeff_mul[i][j].diff(self.x) # reduce the terms to lower power using annihilators of f, g for i in range(a + 1): if not coeff_mul[i][b] == S(0): for j in range(b): coeff_mul[i][j] += other_red[j] * \ coeff_mul[i][b] coeff_mul[i][b] = S(0) # not d2 + 1, as that is already covered in previous loop for j in range(b): if not coeff_mul[a][j] == 0: for i in range(a): coeff_mul[i][j] += self_red[i] * \ coeff_mul[a][j] coeff_mul[a][j] = S(0) lin_sys.append([coeff_mul[i][j] for i in range(a) for j in range(b)]) sol = (NewMatrix(lin_sys).transpose()).gauss_jordan_solve(homo_sys) sol_ann = _normalize(sol[0][0:], self.annihilator.parent, negative=False) if not (self._have_init_cond() and other._have_init_cond()): return HolonomicFunction(sol_ann, self.x) if self.is_singularics() == False and other.is_singularics() == False: # if both the conditions are at same point if self.x0 == other.x0: # try to find more initial conditions y0_self = _extend_y0(self, sol_ann.order) y0_other = _extend_y0(other, sol_ann.order) # h(x0) = f(x0) * g(x0) y0 = [y0_self[0] * y0_other[0]] # coefficient of Dx^j(f)*Dx^i(g) in Dx^i(fg) for i in range(1, min(len(y0_self), len(y0_other))): coeff = [[0 for i in range(i + 1)] for j in range(i + 1)] for j in range(i + 1): for k in range(i + 1): if j + k == i: coeff[j][k] = binomial(i, j) sol = 0 for j in range(i + 1): for k in range(i + 1): sol += coeff[j][k]* y0_self[j] * y0_other[k] y0.append(sol) return HolonomicFunction(sol_ann, self.x, self.x0, y0) # if the points are different, consider one else: selfat0 = self.annihilator.is_singular(0) otherat0 = other.annihilator.is_singular(0) if self.x0 == 0 and not selfat0 and not otherat0: return self * other.change_ics(0) elif other.x0 == 0 and not selfat0 and not otherat0: return self.change_ics(0) * other else: selfatx0 = self.annihilator.is_singular(self.x0) otheratx0 = other.annihilator.is_singular(self.x0) if not selfatx0 and not otheratx0: return self * other.change_ics(self.x0) else: return self.change_ics(other.x0) * other if self.x0 != other.x0: return HolonomicFunction(sol_ann, self.x) # if the functions have singular_ics y1 = None y2 = None if self.is_singularics() == False and other.is_singularics() == True: _y0 = [j / factorial(i) for i, j in enumerate(self.y0)] y1 = {S(0): _y0} y2 = other.y0 elif self.is_singularics() == True and other.is_singularics() == False: _y0 = [j / factorial(i) for i, j in enumerate(other.y0)] y1 = self.y0 y2 = {S(0): _y0} elif self.is_singularics() == True and other.is_singularics() == True: y1 = self.y0 y2 = other.y0 y0 = {} # multiply every possible pair of the series terms for i in y1: for j in y2: k = min(len(y1[i]), len(y2[j])) c = [] for a in range(k): s = S(0) for b in range(a + 1): s += y1[i][b] * y2[j][a - b] c.append(s) if not i + j in y0: y0[i + j] = c else: y0[i + j] = [a + b for a, b in zip(c, y0[i + j])] return HolonomicFunction(sol_ann, self.x, self.x0, y0) __rmul__ = __mul__ def __sub__(self, other): return self + other * -1 def __rsub__(self, other): return self * -1 + other def __neg__(self): return -1 * self def __div__(self, other): return self * (S.One / other) def __truediv__(self, other): return self.__div__(other) def __pow__(self, n): if self.annihilator.order <= 1: ann = self.annihilator parent = ann.parent if self.y0 is None: y0 = None else: y0 = [list(self.y0)[0] ** n] p0 = ann.listofpoly[0] p1 = ann.listofpoly[1] p0 = (Poly.new(p0, self.x) * n).rep sol = [parent.base.to_sympy(i) for i in [p0, p1]] dd = DifferentialOperator(sol, parent) return HolonomicFunction(dd, self.x, self.x0, y0) if n < 0: raise NotHolonomicError("Negative Power on a Holonomic Function") if n == 0: Dx = self.annihilator.parent.derivative_operator return HolonomicFunction(Dx, self.x, S(0), [S(1)]) if n == 1: return self else: if n % 2 == 1: powreduce = self**(n - 1) return powreduce * self elif n % 2 == 0: powreduce = self**(n / 2) return powreduce * powreduce def degree(self): """ Returns the highest power of `x` in the annihilator. """ sol = [i.degree() for i in self.annihilator.listofpoly] return max(sol) def composition(self, expr, *args, **kwargs): """ Returns function after composition of a holonomic function with an algebraic function. The method can't compute initial conditions for the result by itself, so they can be also be provided. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(QQ.old_poly_ring(x),'Dx') >>> HolonomicFunction(Dx - 1, x).composition(x**2, 0, [1]) # e^(x**2) HolonomicFunction((-2*x) + (1)*Dx, x, 0, [1]) >>> HolonomicFunction(Dx**2 + 1, x).composition(x**2 - 1, 1, [1, 0]) HolonomicFunction((4*x**3) + (-1)*Dx + (x)*Dx**2, x, 1, [1, 0]) See Also ======== from_hyper() """ R = self.annihilator.parent a = self.annihilator.order diff = expr.diff(self.x) listofpoly = self.annihilator.listofpoly for i, j in enumerate(listofpoly): if isinstance(j, self.annihilator.parent.base.dtype): listofpoly[i] = self.annihilator.parent.base.to_sympy(j) r = listofpoly[a].subs({self.x:expr}) subs = [-listofpoly[i].subs({self.x:expr}) / r for i in range (a)] coeffs = [S(0) for i in range(a)] # coeffs[i] == coeff of (D^i f)(a) in D^k (f(a)) coeffs[0] = S(1) system = [coeffs] homogeneous = Matrix([[S(0) for i in range(a)]]).transpose() sol = S(0) while sol.is_zero: coeffs_next = [p.diff(self.x) for p in coeffs] for i in range(a - 1): coeffs_next[i + 1] += (coeffs[i] * diff) for i in range(a): coeffs_next[i] += (coeffs[-1] * subs[i] * diff) coeffs = coeffs_next # check for linear relations system.append(coeffs) sol, taus = (Matrix(system).transpose() ).gauss_jordan_solve(homogeneous) tau = list(taus)[0] sol = sol.subs(tau, 1) sol = _normalize(sol[0:], R, negative=False) # if initial conditions are given for the resulting function if args: return HolonomicFunction(sol, self.x, args[0], args[1]) return HolonomicFunction(sol, self.x) def to_sequence(self, lb=True): r""" Finds recurrence relation for the coefficients in the series expansion of the function about :math:`x_0`, where :math:`x_0` is the point at which the initial condition is stored. If the point :math:`x_0` is ordinary, solution of the form :math:`[(R, n_0)]` is returned. Where :math:`R` is the recurrence relation and :math:`n_0` is the smallest ``n`` for which the recurrence holds true. If the point :math:`x_0` is regular singular, a list of solutions in the format :math:`(R, p, n_0)` is returned, i.e. `[(R, p, n_0), ... ]`. Each tuple in this vector represents a recurrence relation :math:`R` associated with a root of the indicial equation ``p``. Conditions of a different format can also be provided in this case, see the docstring of HolonomicFunction class. If it's not possible to numerically compute a initial condition, it is returned as a symbol :math:`C_j`, denoting the coefficient of :math:`(x - x_0)^j` in the power series about :math:`x_0`. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols, S >>> x = symbols('x') >>> R, Dx = DifferentialOperators(QQ.old_poly_ring(x),'Dx') >>> HolonomicFunction(Dx - 1, x, 0, [1]).to_sequence() [(HolonomicSequence((-1) + (n + 1)Sn, n), u(0) = 1, 0)] >>> HolonomicFunction((1 + x)*Dx**2 + Dx, x, 0, [0, 1]).to_sequence() [(HolonomicSequence((n**2) + (n**2 + n)Sn, n), u(0) = 0, u(1) = 1, u(2) = -1/2, 2)] >>> HolonomicFunction(-S(1)/2 + x*Dx, x, 0, {S(1)/2: [1]}).to_sequence() [(HolonomicSequence((n), n), u(0) = 1, 1/2, 1)] See Also ======== HolonomicFunction.series() References ========== .. [1] https://hal.inria.fr/inria-00070025/document .. [2] http://www.risc.jku.at/publications/download/risc_2244/DIPLFORM.pdf """ if self.x0 != 0: return self.shift_x(self.x0).to_sequence() # check whether a power series exists if the point is singular if self.annihilator.is_singular(self.x0): return self._frobenius(lb=lb) dict1 = {} n = Symbol('n', integer=True) dom = self.annihilator.parent.base.dom R, _ = RecurrenceOperators(dom.old_poly_ring(n), 'Sn') # substituting each term of the form `x^k Dx^j` in the # annihilator, according to the formula below: # x^k Dx^j = Sum(rf(n + 1 - k, j) * a(n + j - k) * x^n, (n, k, oo)) # for explanation see [2]. for i, j in enumerate(self.annihilator.listofpoly): listofdmp = j.all_coeffs() degree = len(listofdmp) - 1 for k in range(degree + 1): coeff = listofdmp[degree - k] if coeff == 0: continue if (i - k, k) in dict1: dict1[(i - k, k)] += (dom.to_sympy(coeff) * rf(n - k + 1, i)) else: dict1[(i - k, k)] = (dom.to_sympy(coeff) * rf(n - k + 1, i)) sol = [] keylist = [i[0] for i in dict1] lower = min(keylist) upper = max(keylist) degree = self.degree() # the recurrence relation holds for all values of # n greater than smallest_n, i.e. n >= smallest_n smallest_n = lower + degree dummys = {} eqs = [] unknowns = [] # an appropriate shift of the recurrence for j in range(lower, upper + 1): if j in keylist: temp = S(0) for k in dict1.keys(): if k[0] == j: temp += dict1[k].subs(n, n - lower) sol.append(temp) else: sol.append(S(0)) # the recurrence relation sol = RecurrenceOperator(sol, R) # computing the initial conditions for recurrence order = sol.order all_roots = roots(R.base.to_sympy(sol.listofpoly[-1]), n, filter='Z') all_roots = all_roots.keys() if all_roots: max_root = max(all_roots) + 1 smallest_n = max(max_root, smallest_n) order += smallest_n y0 = _extend_y0(self, order) u0 = [] # u(n) = y^n(0)/factorial(n) for i, j in enumerate(y0): u0.append(j / factorial(i)) # if sufficient conditions can't be computed then # try to use the series method i.e. # equate the coefficients of x^k in the equation formed by # substituting the series in differential equation, to zero. if len(u0) < order: for i in range(degree): eq = S(0) for j in dict1: if i + j[0] < 0: dummys[i + j[0]] = S(0) elif i + j[0] < len(u0): dummys[i + j[0]] = u0[i + j[0]] elif not i + j[0] in dummys: dummys[i + j[0]] = Symbol('C_%s' %(i + j[0])) unknowns.append(dummys[i + j[0]]) if j[1] <= i: eq += dict1[j].subs(n, i) * dummys[i + j[0]] eqs.append(eq) # solve the system of equations formed soleqs = solve(eqs, *unknowns) if isinstance(soleqs, dict): for i in range(len(u0), order): if i not in dummys: dummys[i] = Symbol('C_%s' %i) if dummys[i] in soleqs: u0.append(soleqs[dummys[i]]) else: u0.append(dummys[i]) if lb: return [(HolonomicSequence(sol, u0), smallest_n)] return [HolonomicSequence(sol, u0)] for i in range(len(u0), order): if i not in dummys: dummys[i] = Symbol('C_%s' %i) s = False for j in soleqs: if dummys[i] in j: u0.append(j[dummys[i]]) s = True if not s: u0.append(dummys[i]) if lb: return [(HolonomicSequence(sol, u0), smallest_n)] return [HolonomicSequence(sol, u0)] def _frobenius(self, lb=True): # compute the roots of indicial equation indicialroots = self._indicial() reals = [] compl = [] for i in ordered(indicialroots.keys()): if i.is_real: reals.extend([i] * indicialroots[i]) else: a, b = i.as_real_imag() compl.extend([(i, a, b)] * indicialroots[i]) # sort the roots for a fixed ordering of solution compl.sort(key=lambda x : x[1]) compl.sort(key=lambda x : x[2]) reals.sort() # grouping the roots, roots differ by an integer are put in the same group. grp = [] for i in reals: intdiff = False if len(grp) == 0: grp.append([i]) continue for j in grp: if int(j[0] - i) == j[0] - i: j.append(i) intdiff = True break if not intdiff: grp.append([i]) # True if none of the roots differ by an integer i.e. # each element in group have only one member independent = True if all(len(i) == 1 for i in grp) else False allpos = all(i >= 0 for i in reals) allint = all(int(i) == i for i in reals) # if initial conditions are provided # then use them. if self.is_singularics() == True: rootstoconsider = [] for i in ordered(self.y0.keys()): for j in ordered(indicialroots.keys()): if j == i: rootstoconsider.append(i) elif allpos and allint: rootstoconsider = [min(reals)] elif independent: rootstoconsider = [i[0] for i in grp] + [j[0] for j in compl] elif not allint: rootstoconsider = [] for i in reals: if not int(i) == i: rootstoconsider.append(i) elif not allpos: if not self._have_init_cond() or S(self.y0[0]).is_finite == False: rootstoconsider = [min(reals)] else: posroots = [] for i in reals: if i >= 0: posroots.append(i) rootstoconsider = [min(posroots)] n = Symbol('n', integer=True) dom = self.annihilator.parent.base.dom R, _ = RecurrenceOperators(dom.old_poly_ring(n), 'Sn') finalsol = [] char = ord('C') for p in rootstoconsider: dict1 = {} for i, j in enumerate(self.annihilator.listofpoly): listofdmp = j.all_coeffs() degree = len(listofdmp) - 1 for k in range(degree + 1): coeff = listofdmp[degree - k] if coeff == 0: continue if (i - k, k - i) in dict1: dict1[(i - k, k - i)] += (dom.to_sympy(coeff) * rf(n - k + 1 + p, i)) else: dict1[(i - k, k - i)] = (dom.to_sympy(coeff) * rf(n - k + 1 + p, i)) sol = [] keylist = [i[0] for i in dict1] lower = min(keylist) upper = max(keylist) degree = max([i[1] for i in dict1]) degree2 = min([i[1] for i in dict1]) smallest_n = lower + degree dummys = {} eqs = [] unknowns = [] for j in range(lower, upper + 1): if j in keylist: temp = S(0) for k in dict1.keys(): if k[0] == j: temp += dict1[k].subs(n, n - lower) sol.append(temp) else: sol.append(S(0)) # the recurrence relation sol = RecurrenceOperator(sol, R) # computing the initial conditions for recurrence order = sol.order all_roots = roots(R.base.to_sympy(sol.listofpoly[-1]), n, filter='Z') all_roots = all_roots.keys() if all_roots: max_root = max(all_roots) + 1 smallest_n = max(max_root, smallest_n) order += smallest_n u0 = [] if self.is_singularics() == True: u0 = self.y0[p] elif self.is_singularics() == False and p >= 0 and int(p) == p and len(rootstoconsider) == 1: y0 = _extend_y0(self, order + int(p)) # u(n) = y^n(0)/factorial(n) if len(y0) > int(p): for i in range(int(p), len(y0)): u0.append(y0[i] / factorial(i)) if len(u0) < order: for i in range(degree2, degree): eq = S(0) for j in dict1: if i + j[0] < 0: dummys[i + j[0]] = S(0) elif i + j[0] < len(u0): dummys[i + j[0]] = u0[i + j[0]] elif not i + j[0] in dummys: letter = chr(char) + '_%s' %(i + j[0]) dummys[i + j[0]] = Symbol(letter) unknowns.append(dummys[i + j[0]]) if j[1] <= i: eq += dict1[j].subs(n, i) * dummys[i + j[0]] eqs.append(eq) # solve the system of equations formed soleqs = solve(eqs, *unknowns) if isinstance(soleqs, dict): for i in range(len(u0), order): if i not in dummys: letter = chr(char) + '_%s' %i dummys[i] = Symbol(letter) if dummys[i] in soleqs: u0.append(soleqs[dummys[i]]) else: u0.append(dummys[i]) if lb: finalsol.append((HolonomicSequence(sol, u0), p, smallest_n)) continue else: finalsol.append((HolonomicSequence(sol, u0), p)) continue for i in range(len(u0), order): if i not in dummys: letter = chr(char) + '_%s' %i dummys[i] = Symbol(letter) s = False for j in soleqs: if dummys[i] in j: u0.append(j[dummys[i]]) s = True if not s: u0.append(dummys[i]) if lb: finalsol.append((HolonomicSequence(sol, u0), p, smallest_n)) else: finalsol.append((HolonomicSequence(sol, u0), p)) char += 1 return finalsol def series(self, n=6, coefficient=False, order=True, _recur=None): r""" Finds the power series expansion of given holonomic function about :math:`x_0`. A list of series might be returned if :math:`x_0` is a regular point with multiple roots of the indicial equation. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(QQ.old_poly_ring(x),'Dx') >>> HolonomicFunction(Dx - 1, x, 0, [1]).series() # e^x 1 + x + x**2/2 + x**3/6 + x**4/24 + x**5/120 + O(x**6) >>> HolonomicFunction(Dx**2 + 1, x, 0, [0, 1]).series(n=8) # sin(x) x - x**3/6 + x**5/120 - x**7/5040 + O(x**8) See Also ======== HolonomicFunction.to_sequence() """ if _recur is None: recurrence = self.to_sequence() else: recurrence = _recur if isinstance(recurrence, tuple) and len(recurrence) == 2: recurrence = recurrence[0] constantpower = 0 elif isinstance(recurrence, tuple) and len(recurrence) == 3: constantpower = recurrence[1] recurrence = recurrence[0] elif len(recurrence) == 1 and len(recurrence[0]) == 2: recurrence = recurrence[0][0] constantpower = 0 elif len(recurrence) == 1 and len(recurrence[0]) == 3: constantpower = recurrence[0][1] recurrence = recurrence[0][0] else: sol = [] for i in recurrence: sol.append(self.series(_recur=i)) return sol n = n - int(constantpower) l = len(recurrence.u0) - 1 k = recurrence.recurrence.order x = self.x x0 = self.x0 seq_dmp = recurrence.recurrence.listofpoly R = recurrence.recurrence.parent.base K = R.get_field() seq = [] for i, j in enumerate(seq_dmp): seq.append(K.new(j.rep)) sub = [-seq[i] / seq[k] for i in range(k)] sol = [i for i in recurrence.u0] if l + 1 >= n: pass else: # use the initial conditions to find the next term for i in range(l + 1 - k, n - k): coeff = S(0) for j in range(k): if i + j >= 0: coeff += DMFsubs(sub[j], i) * sol[i + j] sol.append(coeff) if coefficient: return sol ser = S(0) for i, j in enumerate(sol): ser += x**(i + constantpower) * j if order: ser += Order(x**(n + int(constantpower)), x) if x0 != 0: return ser.subs(x, x - x0) return ser def _indicial(self): """ Computes roots of the Indicial equation. """ if self.x0 != 0: return self.shift_x(self.x0)._indicial() list_coeff = self.annihilator.listofpoly R = self.annihilator.parent.base x = self.x s = R.zero y = R.one def _pole_degree(poly): root_all = roots(R.to_sympy(poly), x, filter='Z') if 0 in root_all.keys(): return root_all[0] else: return 0 degree = [j.degree() for j in list_coeff] degree = max(degree) inf = 10 * (max(1, degree) + max(1, self.annihilator.order)) deg = lambda q: inf if q.is_zero else _pole_degree(q) b = deg(list_coeff[0]) for j in range(1, len(list_coeff)): b = min(b, deg(list_coeff[j]) - j) for i, j in enumerate(list_coeff): listofdmp = j.all_coeffs() degree = len(listofdmp) - 1 if - i - b <= 0 and degree - i - b >= 0: s = s + listofdmp[degree - i - b] * y y *= x - i return roots(R.to_sympy(s), x) def evalf(self, points, method='RK4', h=0.05, derivatives=False): r""" Finds numerical value of a holonomic function using numerical methods. (RK4 by default). A set of points (real or complex) must be provided which will be the path for the numerical integration. The path should be given as a list :math:`[x_1, x_2, ... x_n]`. The numerical values will be computed at each point in this order :math:`x_1 --> x_2 --> x_3 ... --> x_n`. Returns values of the function at :math:`x_1, x_2, ... x_n` in a list. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(QQ.old_poly_ring(x),'Dx') A straight line on the real axis from (0 to 1) >>> r = [0.1, 0.2, 0.3, 0.4, 0.5, 0.6, 0.7, 0.8, 0.9, 1] Runge-Kutta 4th order on e^x from 0.1 to 1. Exact solution at 1 is 2.71828182845905 >>> HolonomicFunction(Dx - 1, x, 0, [1]).evalf(r) [1.10517083333333, 1.22140257085069, 1.34985849706254, 1.49182424008069, 1.64872063859684, 1.82211796209193, 2.01375162659678, 2.22553956329232, 2.45960141378007, 2.71827974413517] Euler's method for the same >>> HolonomicFunction(Dx - 1, x, 0, [1]).evalf(r, method='Euler') [1.1, 1.21, 1.331, 1.4641, 1.61051, 1.771561, 1.9487171, 2.14358881, 2.357947691, 2.5937424601] One can also observe that the value obtained using Runge-Kutta 4th order is much more accurate than Euler's method. """ from sympy.holonomic.numerical import _evalf lp = False # if a point `b` is given instead of a mesh if not hasattr(points, "__iter__"): lp = True b = S(points) if self.x0 == b: return _evalf(self, [b], method=method, derivatives=derivatives)[-1] if not b.is_Number: raise NotImplementedError a = self.x0 if a > b: h = -h n = int((b - a) / h) points = [a + h] for i in range(n - 1): points.append(points[-1] + h) for i in roots(self.annihilator.parent.base.to_sympy(self.annihilator.listofpoly[-1]), self.x): if i == self.x0 or i in points: raise SingularityError(self, i) if lp: return _evalf(self, points, method=method, derivatives=derivatives)[-1] return _evalf(self, points, method=method, derivatives=derivatives) def change_x(self, z): """ Changes only the variable of Holonomic Function, for internal purposes. For composition use HolonomicFunction.composition() """ dom = self.annihilator.parent.base.dom R = dom.old_poly_ring(z) parent, _ = DifferentialOperators(R, 'Dx') sol = [] for j in self.annihilator.listofpoly: sol.append(R(j.rep)) sol = DifferentialOperator(sol, parent) return HolonomicFunction(sol, z, self.x0, self.y0) def shift_x(self, a): """ Substitute `x + a` for `x`. """ x = self.x listaftershift = self.annihilator.listofpoly base = self.annihilator.parent.base sol = [base.from_sympy(base.to_sympy(i).subs(x, x + a)) for i in listaftershift] sol = DifferentialOperator(sol, self.annihilator.parent) x0 = self.x0 - a if not self._have_init_cond(): return HolonomicFunction(sol, x) return HolonomicFunction(sol, x, x0, self.y0) def to_hyper(self, as_list=False, _recur=None): r""" Returns a hypergeometric function (or linear combination of them) representing the given holonomic function. Returns an answer of the form: `a_1 \cdot x^{b_1} \cdot{hyper()} + a_2 \cdot x^{b_2} \cdot{hyper()} ...` This is very useful as one can now use ``hyperexpand`` to find the symbolic expressions/functions. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols >>> x = symbols('x') >>> R, Dx = DifferentialOperators(ZZ.old_poly_ring(x),'Dx') >>> # sin(x) >>> HolonomicFunction(Dx**2 + 1, x, 0, [0, 1]).to_hyper() x*hyper((), (3/2,), -x**2/4) >>> # exp(x) >>> HolonomicFunction(Dx - 1, x, 0, [1]).to_hyper() hyper((), (), x) See Also ======== from_hyper, from_meijerg """ if _recur is None: recurrence = self.to_sequence() else: recurrence = _recur if isinstance(recurrence, tuple) and len(recurrence) == 2: smallest_n = recurrence[1] recurrence = recurrence[0] constantpower = 0 elif isinstance(recurrence, tuple) and len(recurrence) == 3: smallest_n = recurrence[2] constantpower = recurrence[1] recurrence = recurrence[0] elif len(recurrence) == 1 and len(recurrence[0]) == 2: smallest_n = recurrence[0][1] recurrence = recurrence[0][0] constantpower = 0 elif len(recurrence) == 1 and len(recurrence[0]) == 3: smallest_n = recurrence[0][2] constantpower = recurrence[0][1] recurrence = recurrence[0][0] else: sol = self.to_hyper(as_list=as_list, _recur=recurrence[0]) for i in recurrence[1:]: sol += self.to_hyper(as_list=as_list, _recur=i) return sol u0 = recurrence.u0 r = recurrence.recurrence x = self.x x0 = self.x0 # order of the recurrence relation m = r.order # when no recurrence exists, and the power series have finite terms if m == 0: nonzeroterms = roots(r.parent.base.to_sympy(r.listofpoly[0]), recurrence.n, filter='R') sol = S(0) for j, i in enumerate(nonzeroterms): if i < 0 or int(i) != i: continue i = int(i) if i < len(u0): if isinstance(u0[i], (PolyElement, FracElement)): u0[i] = u0[i].as_expr() sol += u0[i] * x**i else: sol += Symbol('C_%s' %j) * x**i if isinstance(sol, (PolyElement, FracElement)): sol = sol.as_expr() * x**constantpower else: sol = sol * x**constantpower if as_list: if x0 != 0: return [(sol.subs(x, x - x0), )] return [(sol, )] if x0 != 0: return sol.subs(x, x - x0) return sol if smallest_n + m > len(u0): raise NotImplementedError("Can't compute sufficient Initial Conditions") # check if the recurrence represents a hypergeometric series is_hyper = True for i in range(1, len(r.listofpoly)-1): if r.listofpoly[i] != r.parent.base.zero: is_hyper = False break if not is_hyper: raise NotHyperSeriesError(self, self.x0) a = r.listofpoly[0] b = r.listofpoly[-1] # the constant multiple of argument of hypergeometric function if isinstance(a.rep[0], (PolyElement, FracElement)): c = - (S(a.rep[0].as_expr()) * m**(a.degree())) / (S(b.rep[0].as_expr()) * m**(b.degree())) else: c = - (S(a.rep[0]) * m**(a.degree())) / (S(b.rep[0]) * m**(b.degree())) sol = 0 arg1 = roots(r.parent.base.to_sympy(a), recurrence.n) arg2 = roots(r.parent.base.to_sympy(b), recurrence.n) # iterate through the initial conditions to find # the hypergeometric representation of the given # function. # The answer will be a linear combination # of different hypergeometric series which satisfies # the recurrence. if as_list: listofsol = [] for i in range(smallest_n + m): # if the recurrence relation doesn't hold for `n = i`, # then a Hypergeometric representation doesn't exist. # add the algebraic term a * x**i to the solution, # where a is u0[i] if i < smallest_n: if as_list: listofsol.append(((S(u0[i]) * x**(i+constantpower)).subs(x, x-x0), )) else: sol += S(u0[i]) * x**i continue # if the coefficient u0[i] is zero, then the # independent hypergeomtric series starting with # x**i is not a part of the answer. if S(u0[i]) == 0: continue ap = [] bq = [] # substitute m * n + i for n for k in ordered(arg1.keys()): ap.extend([nsimplify((i - k) / m)] * arg1[k]) for k in ordered(arg2.keys()): bq.extend([nsimplify((i - k) / m)] * arg2[k]) # convention of (k + 1) in the denominator if 1 in bq: bq.remove(1) else: ap.append(1) if as_list: listofsol.append(((S(u0[i])*x**(i+constantpower)).subs(x, x-x0), (hyper(ap, bq, c*x**m)).subs(x, x-x0))) else: sol += S(u0[i]) * hyper(ap, bq, c * x**m) * x**i if as_list: return listofsol sol = sol * x**constantpower if x0 != 0: return sol.subs(x, x - x0) return sol def to_expr(self): """ Converts a Holonomic Function back to elementary functions. Examples ======== >>> from sympy.holonomic.holonomic import HolonomicFunction, DifferentialOperators >>> from sympy.polys.domains import ZZ, QQ >>> from sympy import symbols, S >>> x = symbols('x') >>> R, Dx = DifferentialOperators(ZZ.old_poly_ring(x),'Dx') >>> HolonomicFunction(x**2*Dx**2 + x*Dx + (x**2 - 1), x, 0, [0, S(1)/2]).to_expr() besselj(1, x) >>> HolonomicFunction((1 + x)*Dx**3 + Dx**2, x, 0, [1, 1, 1]).to_expr() x*log(x + 1) + log(x + 1) + 1 """ return hyperexpand(self.to_hyper()).simplify() def change_ics(self, b, lenics=None): """ Changes the point `x0` to `b` for initial conditions. Examples ======== >>> from sympy.holonomic import expr_to_holonomic >>> from sympy import symbols, sin, cos, exp >>> x = symbols('x') >>> expr_to_holonomic(sin(x)).change_ics(1) HolonomicFunction((1) + (1)*Dx**2, x, 1, [sin(1), cos(1)]) >>> expr_to_holonomic(exp(x)).change_ics(2) HolonomicFunction((-1) + (1)*Dx, x, 2, [exp(2)]) """ symbolic = True if lenics is None and len(self.y0) > self.annihilator.order: lenics = len(self.y0) dom = self.annihilator.parent.base.domain try: sol = expr_to_holonomic(self.to_expr(), x=self.x, x0=b, lenics=lenics, domain=dom) except (NotPowerSeriesError, NotHyperSeriesError): symbolic = False if symbolic and sol.x0 == b: return sol y0 = self.evalf(b, derivatives=True) return HolonomicFunction(self.annihilator, self.x, b, y0) def to_meijerg(self): """ Returns a linear combination of Meijer G-functions. Examples ======== >>> from sympy.holonomic import expr_to_holonomic >>> from sympy import sin, cos, hyperexpand, log, symbols >>> x = symbols('x') >>> hyperexpand(expr_to_holonomic(cos(x) + sin(x)).to_meijerg()) sin(x) + cos(x) >>> hyperexpand(expr_to_holonomic(log(x)).to_meijerg()).simplify() log(x) See Also ======== to_hyper() """ # convert to hypergeometric first rep = self.to_hyper(as_list=True) sol = S(0) for i in rep: if len(i) == 1: sol += i[0] elif len(i) == 2: sol += i[0] * _hyper_to_meijerg(i[1]) return sol def from_hyper(func, x0=0, evalf=False): r""" Converts a hypergeometric function to holonomic. ``func`` is the Hypergeometric Function and ``x0`` is the point at which initial conditions are required. Examples ======== >>> from sympy.holonomic.holonomic import from_hyper, DifferentialOperators >>> from sympy import symbols, hyper, S >>> x = symbols('x') >>> from_hyper(hyper([], [S(3)/2], x**2/4)) HolonomicFunction((-x) + (2)*Dx + (x)*Dx**2, x, 1, [sinh(1), -sinh(1) + cosh(1)]) """ a = func.ap b = func.bq z = func.args[2] x = z.atoms(Symbol).pop() R, Dx = DifferentialOperators(QQ.old_poly_ring(x), 'Dx') # generalized hypergeometric differential equation r1 = 1 for i in range(len(a)): r1 = r1 * (x * Dx + a[i]) r2 = Dx for i in range(len(b)): r2 = r2 * (x * Dx + b[i] - 1) sol = r1 - r2 simp = hyperexpand(func) if isinstance(simp, Infinity) or isinstance(simp, NegativeInfinity): return HolonomicFunction(sol, x).composition(z) def _find_conditions(simp, x, x0, order, evalf=False): y0 = [] for i in range(order): if evalf: val = simp.subs(x, x0).evalf() else: val = simp.subs(x, x0) # return None if it is Infinite or NaN if val.is_finite is False or isinstance(val, NaN): return None y0.append(val) simp = simp.diff(x) return y0 # if the function is known symbolically if not isinstance(simp, hyper): y0 = _find_conditions(simp, x, x0, sol.order) while not y0: # if values don't exist at 0, then try to find initial # conditions at 1. If it doesn't exist at 1 too then # try 2 and so on. x0 += 1 y0 = _find_conditions(simp, x, x0, sol.order) return HolonomicFunction(sol, x).composition(z, x0, y0) if isinstance(simp, hyper): x0 = 1 # use evalf if the function can't be simplified y0 = _find_conditions(simp, x, x0, sol.order, evalf) while not y0: x0 += 1 y0 = _find_conditions(simp, x, x0, sol.order, evalf) return HolonomicFunction(sol, x).composition(z, x0, y0) return HolonomicFunction(sol, x).composition(z) def from_meijerg(func, x0=0, evalf=False, initcond=True, domain=QQ): """ Converts a Meijer G-function to Holonomic. ``func`` is the G-Function and ``x0`` is the point at which initial conditions are required. Examples ======== >>> from sympy.holonomic.holonomic import from_meijerg, DifferentialOperators >>> from sympy import symbols, meijerg, S >>> x = symbols('x') >>> from_meijerg(meijerg(([], []), ([S(1)/2], [0]), x**2/4)) HolonomicFunction((1) + (1)*Dx**2, x, 0, [0, 1/sqrt(pi)]) """ a = func.ap b = func.bq n = len(func.an) m = len(func.bm) p = len(a) z = func.args[2] x = z.atoms(Symbol).pop() R, Dx = DifferentialOperators(domain.old_poly_ring(x), 'Dx') # compute the differential equation satisfied by the # Meijer G-function. mnp = (-1)**(m + n - p) r1 = x * mnp for i in range(len(a)): r1 *= x * Dx + 1 - a[i] r2 = 1 for i in range(len(b)): r2 *= x * Dx - b[i] sol = r1 - r2 if not initcond: return HolonomicFunction(sol, x).composition(z) simp = hyperexpand(func) if isinstance(simp, Infinity) or isinstance(simp, NegativeInfinity): return HolonomicFunction(sol, x).composition(z) def _find_conditions(simp, x, x0, order, evalf=False): y0 = [] for i in range(order): if evalf: val = simp.subs(x, x0).evalf() else: val = simp.subs(x, x0) if val.is_finite is False or isinstance(val, NaN): return None y0.append(val) simp = simp.diff(x) return y0 # computing initial conditions if not isinstance(simp, meijerg): y0 = _find_conditions(simp, x, x0, sol.order) while not y0: x0 += 1 y0 = _find_conditions(simp, x, x0, sol.order) return HolonomicFunction(sol, x).composition(z, x0, y0) if isinstance(simp, meijerg): x0 = 1 y0 = _find_conditions(simp, x, x0, sol.order, evalf) while not y0: x0 += 1 y0 = _find_conditions(simp, x, x0, sol.order, evalf) return HolonomicFunction(sol, x).composition(z, x0, y0) return HolonomicFunction(sol, x).composition(z) x_1 = Dummy('x_1') _lookup_table = None domain_for_table = None from sympy.integrals.meijerint import _mytype def expr_to_holonomic(func, x=None, x0=0, y0=None, lenics=None, domain=None, initcond=True): """ Converts a function or an expression to a holonomic function. Parameters ========== func: The expression to be converted. x: variable for the function. x0: point at which initial condition must be computed. y0: One can optionally provide initial condition if the method isn't able to do it automatically. lenics: Number of terms in the initial condition. By default it is equal to the order of the annihilator. domain: Ground domain for the polynomials in `x` appearing as coefficients in the annihilator. initcond: Set it false if you don't want the initial conditions to be computed. Examples ======== >>> from sympy.holonomic.holonomic import expr_to_holonomic >>> from sympy import sin, exp, symbols >>> x = symbols('x') >>> expr_to_holonomic(sin(x)) HolonomicFunction((1) + (1)*Dx**2, x, 0, [0, 1]) >>> expr_to_holonomic(exp(x)) HolonomicFunction((-1) + (1)*Dx, x, 0, [1]) See Also ======== meijerint._rewrite1, _convert_poly_rat_alg, _create_table """ func = sympify(func) syms = func.free_symbols if not x: if len(syms) == 1: x= syms.pop() else: raise ValueError("Specify the variable for the function") elif x in syms: syms.remove(x) extra_syms = list(syms) if domain is None: if func.has(Float): domain = RR else: domain = QQ if len(extra_syms) != 0: domain = domain[extra_syms].get_field() # try to convert if the function is polynomial or rational solpoly = _convert_poly_rat_alg(func, x, x0=x0, y0=y0, lenics=lenics, domain=domain, initcond=initcond) if solpoly: return solpoly # create the lookup table global _lookup_table, domain_for_table if not _lookup_table: domain_for_table = domain _lookup_table = {} _create_table(_lookup_table, domain=domain) elif domain != domain_for_table: domain_for_table = domain _lookup_table = {} _create_table(_lookup_table, domain=domain) # use the table directly to convert to Holonomic if func.is_Function: f = func.subs(x, x_1) t = _mytype(f, x_1) if t in _lookup_table: l = _lookup_table[t] sol = l[0][1].change_x(x) else: sol = _convert_meijerint(func, x, initcond=False, domain=domain) if not sol: raise NotImplementedError if y0: sol.y0 = y0 if y0 or not initcond: sol.x0 = x0 return sol if not lenics: lenics = sol.annihilator.order _y0 = _find_conditions(func, x, x0, lenics) while not _y0: x0 += 1 _y0 = _find_conditions(func, x, x0, lenics) return HolonomicFunction(sol.annihilator, x, x0, _y0) if y0 or not initcond: sol = sol.composition(func.args[0]) if y0: sol.y0 = y0 sol.x0 = x0 return sol if not lenics: lenics = sol.annihilator.order _y0 = _find_conditions(func, x, x0, lenics) while not _y0: x0 += 1 _y0 = _find_conditions(func, x, x0, lenics) return sol.composition(func.args[0], x0, _y0) # iterate through the expression recursively args = func.args f = func.func from sympy.core import Add, Mul, Pow sol = expr_to_holonomic(args[0], x=x, initcond=False, domain=domain) if f is Add: for i in range(1, len(args)): sol += expr_to_holonomic(args[i], x=x, initcond=False, domain=domain) elif f is Mul: for i in range(1, len(args)): sol *= expr_to_holonomic(args[i], x=x, initcond=False, domain=domain) elif f is Pow: sol = sol**args[1] sol.x0 = x0 if not sol: raise NotImplementedError if y0: sol.y0 = y0 if y0 or not initcond: return sol if sol.y0: return sol if not lenics: lenics = sol.annihilator.order if sol.annihilator.is_singular(x0): r = sol._indicial() l = list(r) if len(r) == 1 and r[l[0]] == S(1): r = l[0] g = func / (x - x0)**r singular_ics = _find_conditions(g, x, x0, lenics) singular_ics = [j / factorial(i) for i, j in enumerate(singular_ics)] y0 = {r:singular_ics} return HolonomicFunction(sol.annihilator, x, x0, y0) _y0 = _find_conditions(func, x, x0, lenics) while not _y0: x0 += 1 _y0 = _find_conditions(func, x, x0, lenics) return HolonomicFunction(sol.annihilator, x, x0, _y0) ## Some helper functions ## def _normalize(list_of, parent, negative=True): """ Normalize a given annihilator """ num = [] denom = [] base = parent.base K = base.get_field() lcm_denom = base.from_sympy(S(1)) list_of_coeff = [] # convert polynomials to the elements of associated # fraction field for i, j in enumerate(list_of): if isinstance(j, base.dtype): list_of_coeff.append(K.new(j.rep)) elif not isinstance(j, K.dtype): list_of_coeff.append(K.from_sympy(sympify(j))) else: list_of_coeff.append(j) # corresponding numerators of the sequence of polynomials num.append(list_of_coeff[i].numer()) # corresponding denominators denom.append(list_of_coeff[i].denom()) # lcm of denominators in the coefficients for i in denom: lcm_denom = i.lcm(lcm_denom) if negative: lcm_denom = -lcm_denom lcm_denom = K.new(lcm_denom.rep) # multiply the coefficients with lcm for i, j in enumerate(list_of_coeff): list_of_coeff[i] = j * lcm_denom gcd_numer = base((list_of_coeff[-1].numer() / list_of_coeff[-1].denom()).rep) # gcd of numerators in the coefficients for i in num: gcd_numer = i.gcd(gcd_numer) gcd_numer = K.new(gcd_numer.rep) # divide all the coefficients by the gcd for i, j in enumerate(list_of_coeff): frac_ans = j / gcd_numer list_of_coeff[i] = base((frac_ans.numer() / frac_ans.denom()).rep) return DifferentialOperator(list_of_coeff, parent) def _derivate_diff_eq(listofpoly): """ Let a differential equation a0(x)y(x) + a1(x)y'(x) + ... = 0 where a0, a1,... are polynomials or rational functions. The function returns b0, b1, b2... such that the differential equation b0(x)y(x) + b1(x)y'(x) +... = 0 is formed after differentiating the former equation. """ sol = [] a = len(listofpoly) - 1 sol.append(DMFdiff(listofpoly[0])) for i, j in enumerate(listofpoly[1:]): sol.append(DMFdiff(j) + listofpoly[i]) sol.append(listofpoly[a]) return sol def _hyper_to_meijerg(func): """ Converts a `hyper` to meijerg. """ ap = func.ap bq = func.bq ispoly = any(i <= 0 and int(i) == i for i in ap) if ispoly: return hyperexpand(func) z = func.args[2] # parameters of the `meijerg` function. an = (1 - i for i in ap) anp = () bm = (S(0), ) bmq = (1 - i for i in bq) k = S(1) for i in bq: k = k * gamma(i) for i in ap: k = k / gamma(i) return k * meijerg(an, anp, bm, bmq, -z) def _add_lists(list1, list2): """Takes polynomial sequences of two annihilators a and b and returns the list of polynomials of sum of a and b. """ if len(list1) <= len(list2): sol = [a + b for a, b in zip(list1, list2)] + list2[len(list1):] else: sol = [a + b for a, b in zip(list1, list2)] + list1[len(list2):] return sol def _extend_y0(Holonomic, n): """ Tries to find more initial conditions by substituting the initial value point in the differential equation. """ if Holonomic.annihilator.is_singular(Holonomic.x0) or Holonomic.is_singularics() == True: return Holonomic.y0 annihilator = Holonomic.annihilator a = annihilator.order listofpoly = [] y0 = Holonomic.y0 R = annihilator.parent.base K = R.get_field() for i, j in enumerate(annihilator.listofpoly): if isinstance(j, annihilator.parent.base.dtype): listofpoly.append(K.new(j.rep)) if len(y0) < a or n <= len(y0): return y0 else: list_red = [-listofpoly[i] / listofpoly[a] for i in range(a)] if len(y0) > a: y1 = [y0[i] for i in range(a)] else: y1 = [i for i in y0] for i in range(n - a): sol = 0 for a, b in zip(y1, list_red): r = DMFsubs(b, Holonomic.x0) if not getattr(r, 'is_finite', True): return y0 if isinstance(r, (PolyElement, FracElement)): r = r.as_expr() sol += a * r y1.append(sol) list_red = _derivate_diff_eq(list_red) return y0 + y1[len(y0):] def DMFdiff(frac): # differentiate a DMF object represented as p/q if not isinstance(frac, DMF): return frac.diff() K = frac.ring p = K.numer(frac) q = K.denom(frac) sol_num = - p * q.diff() + q * p.diff() sol_denom = q**2 return K((sol_num.rep, sol_denom.rep)) def DMFsubs(frac, x0, mpm=False): # substitute the point x0 in DMF object of the form p/q if not isinstance(frac, DMF): return frac p = frac.num q = frac.den sol_p = S(0) sol_q = S(0) if mpm: from mpmath import mp for i, j in enumerate(reversed(p)): if mpm: j = sympify(j)._to_mpmath(mp.prec) sol_p += j * x0**i for i, j in enumerate(reversed(q)): if mpm: j = sympify(j)._to_mpmath(mp.prec) sol_q += j * x0**i if isinstance(sol_p, (PolyElement, FracElement)): sol_p = sol_p.as_expr() if isinstance(sol_q, (PolyElement, FracElement)): sol_q = sol_q.as_expr() return sol_p / sol_q def _convert_poly_rat_alg(func, x, x0=0, y0=None, lenics=None, domain=QQ, initcond=True): """ Converts polynomials, rationals and algebraic functions to holonomic. """ ispoly = func.is_polynomial() if not ispoly: israt = func.is_rational_function() else: israt = True if not (ispoly or israt): basepoly, ratexp = func.as_base_exp() if basepoly.is_polynomial() and ratexp.is_Number: if isinstance(ratexp, Float): ratexp = nsimplify(ratexp) m, n = ratexp.p, ratexp.q is_alg = True else: is_alg = False else: is_alg = True if not (ispoly or israt or is_alg): return None R = domain.old_poly_ring(x) _, Dx = DifferentialOperators(R, 'Dx') # if the function is constant if not func.has(x): return HolonomicFunction(Dx, x, 0, [func]) if ispoly: # differential equation satisfied by polynomial sol = func * Dx - func.diff(x) sol = _normalize(sol.listofpoly, sol.parent, negative=False) is_singular = sol.is_singular(x0) # try to compute the conditions for singular points if y0 is None and x0 == 0 and is_singular: rep = R.from_sympy(func).rep for i, j in enumerate(reversed(rep)): if j == 0: continue else: coeff = list(reversed(rep))[i:] indicial = i break for i, j in enumerate(coeff): if isinstance(j, (PolyElement, FracElement)): coeff[i] = j.as_expr() y0 = {indicial: S(coeff)} elif israt: p, q = func.as_numer_denom() # differential equation satisfied by rational sol = p * q * Dx + p * q.diff(x) - q * p.diff(x) sol = _normalize(sol.listofpoly, sol.parent, negative=False) elif is_alg: sol = n * (x / m) * Dx - 1 sol = HolonomicFunction(sol, x).composition(basepoly).annihilator is_singular = sol.is_singular(x0) # try to compute the conditions for singular points if y0 is None and x0 == 0 and is_singular and \ (lenics is None or lenics <= 1): rep = R.from_sympy(basepoly).rep for i, j in enumerate(reversed(rep)): if j == 0: continue if isinstance(j, (PolyElement, FracElement)): j = j.as_expr() coeff = S(j)**ratexp indicial = S(i) * ratexp break if isinstance(coeff, (PolyElement, FracElement)): coeff = coeff.as_expr() y0 = {indicial: S([coeff])} if y0 or not initcond: return HolonomicFunction(sol, x, x0, y0) if not lenics: lenics = sol.order if sol.is_singular(x0): r = HolonomicFunction(sol, x, x0)._indicial() l = list(r) if len(r) == 1 and r[l[0]] == S(1): r = l[0] g = func / (x - x0)**r singular_ics = _find_conditions(g, x, x0, lenics) singular_ics = [j / factorial(i) for i, j in enumerate(singular_ics)] y0 = {r:singular_ics} return HolonomicFunction(sol, x, x0, y0) y0 = _find_conditions(func, x, x0, lenics) while not y0: x0 += 1 y0 = _find_conditions(func, x, x0, lenics) return HolonomicFunction(sol, x, x0, y0) def _convert_meijerint(func, x, initcond=True, domain=QQ): args = meijerint._rewrite1(func, x) if args: fac, po, g, _ = args else: return None # lists for sum of meijerg functions fac_list = [fac * i[0] for i in g] t = po.as_base_exp() s = t[1] if t[0] is x else S(0) po_list = [s + i[1] for i in g] G_list = [i[2] for i in g] # finds meijerg representation of x**s * meijerg(a1 ... ap, b1 ... bq, z) def _shift(func, s): z = func.args[-1] if z.has(I): z = z.subs(exp_polar, exp) d = z.collect(x, evaluate=False) b = list(d)[0] a = d[b] t = b.as_base_exp() b = t[1] if t[0] is x else S(0) r = s / b an = (i + r for i in func.args[0][0]) ap = (i + r for i in func.args[0][1]) bm = (i + r for i in func.args[1][0]) bq = (i + r for i in func.args[1][1]) return a**-r, meijerg((an, ap), (bm, bq), z) coeff, m = _shift(G_list[0], po_list[0]) sol = fac_list[0] * coeff * from_meijerg(m, initcond=initcond, domain=domain) # add all the meijerg functions after converting to holonomic for i in range(1, len(G_list)): coeff, m = _shift(G_list[i], po_list[i]) sol += fac_list[i] * coeff * from_meijerg(m, initcond=initcond, domain=domain) return sol def _create_table(table, domain=QQ): """ Creates the look-up table. For a similar implementation see meijerint._create_lookup_table. """ def add(formula, annihilator, arg, x0=0, y0=[]): """ Adds a formula in the dictionary """ table.setdefault(_mytype(formula, x_1), []).append((formula, HolonomicFunction(annihilator, arg, x0, y0))) R = domain.old_poly_ring(x_1) _, Dx = DifferentialOperators(R, 'Dx') from sympy import (sin, cos, exp, log, erf, sqrt, pi, sinh, cosh, sinc, erfc, Si, Ci, Shi, erfi) # add some basic functions add(sin(x_1), Dx**2 + 1, x_1, 0, [0, 1]) add(cos(x_1), Dx**2 + 1, x_1, 0, [1, 0]) add(exp(x_1), Dx - 1, x_1, 0, 1) add(log(x_1), Dx + x_1*Dx**2, x_1, 1, [0, 1]) add(erf(x_1), 2*x_1*Dx + Dx**2, x_1, 0, [0, 2/sqrt(pi)]) add(erfc(x_1), 2*x_1*Dx + Dx**2, x_1, 0, [1, -2/sqrt(pi)]) add(erfi(x_1), -2*x_1*Dx + Dx**2, x_1, 0, [0, 2/sqrt(pi)]) add(sinh(x_1), Dx**2 - 1, x_1, 0, [0, 1]) add(cosh(x_1), Dx**2 - 1, x_1, 0, [1, 0]) add(sinc(x_1), x_1 + 2*Dx + x_1*Dx**2, x_1) add(Si(x_1), x_1*Dx + 2*Dx**2 + x_1*Dx**3, x_1) add(Ci(x_1), x_1*Dx + 2*Dx**2 + x_1*Dx**3, x_1) add(Shi(x_1), -x_1*Dx + 2*Dx**2 + x_1*Dx**3, x_1) def _find_conditions(func, x, x0, order): y0 = [] for i in range(order): val = func.subs(x, x0) if isinstance(val, NaN): val = limit(func, x, x0) if val.is_finite is False or isinstance(val, NaN): return None y0.append(val) func = func.diff(x) return y0

f50189591d47709ac6ea1d7c601025d4c7332b9ade7936498d5e66e3d52221ce

"""Known matrices related to physics""" from __future__ import print_function, division from sympy import Matrix, I, pi, sqrt from sympy.functions import exp from sympy.core.compatibility import range def msigma(i): r"""Returns a Pauli matrix `\sigma_i` with `i=1,2,3` References ========== .. [1] https://en.wikipedia.org/wiki/Pauli_matrices Examples ======== >>> from sympy.physics.matrices import msigma >>> msigma(1) Matrix([ [0, 1], [1, 0]]) """ if i == 1: mat = ( ( (0, 1), (1, 0) ) ) elif i == 2: mat = ( ( (0, -I), (I, 0) ) ) elif i == 3: mat = ( ( (1, 0), (0, -1) ) ) else: raise IndexError("Invalid Pauli index") return Matrix(mat) def pat_matrix(m, dx, dy, dz): """Returns the Parallel Axis Theorem matrix to translate the inertia matrix a distance of `(dx, dy, dz)` for a body of mass m. Examples ======== To translate a body having a mass of 2 units a distance of 1 unit along the `x`-axis we get: >>> from sympy.physics.matrices import pat_matrix >>> pat_matrix(2, 1, 0, 0) Matrix([ [0, 0, 0], [0, 2, 0], [0, 0, 2]]) """ dxdy = -dx*dy dydz = -dy*dz dzdx = -dz*dx dxdx = dx**2 dydy = dy**2 dzdz = dz**2 mat = ((dydy + dzdz, dxdy, dzdx), (dxdy, dxdx + dzdz, dydz), (dzdx, dydz, dydy + dxdx)) return m*Matrix(mat) def mgamma(mu, lower=False): r"""Returns a Dirac gamma matrix `\gamma^\mu` in the standard (Dirac) representation. If you want `\gamma_\mu`, use ``gamma(mu, True)``. We use a convention: `\gamma^5 = i \cdot \gamma^0 \cdot \gamma^1 \cdot \gamma^2 \cdot \gamma^3` `\gamma_5 = i \cdot \gamma_0 \cdot \gamma_1 \cdot \gamma_2 \cdot \gamma_3 = - \gamma^5` References ========== .. [1] https://en.wikipedia.org/wiki/Gamma_matrices Examples ======== >>> from sympy.physics.matrices import mgamma >>> mgamma(1) Matrix([ [ 0, 0, 0, 1], [ 0, 0, 1, 0], [ 0, -1, 0, 0], [-1, 0, 0, 0]]) """ if not mu in [0, 1, 2, 3, 5]: raise IndexError("Invalid Dirac index") if mu == 0: mat = ( (1, 0, 0, 0), (0, 1, 0, 0), (0, 0, -1, 0), (0, 0, 0, -1) ) elif mu == 1: mat = ( (0, 0, 0, 1), (0, 0, 1, 0), (0, -1, 0, 0), (-1, 0, 0, 0) ) elif mu == 2: mat = ( (0, 0, 0, -I), (0, 0, I, 0), (0, I, 0, 0), (-I, 0, 0, 0) ) elif mu == 3: mat = ( (0, 0, 1, 0), (0, 0, 0, -1), (-1, 0, 0, 0), (0, 1, 0, 0) ) elif mu == 5: mat = ( (0, 0, 1, 0), (0, 0, 0, 1), (1, 0, 0, 0), (0, 1, 0, 0) ) m = Matrix(mat) if lower: if mu in [1, 2, 3, 5]: m = -m return m #Minkowski tensor using the convention (+,-,-,-) used in the Quantum Field #Theory minkowski_tensor = Matrix( ( (1, 0, 0, 0), (0, -1, 0, 0), (0, 0, -1, 0), (0, 0, 0, -1) )) def mdft(n): r""" Returns an expression of a discrete Fourier transform as a matrix multiplication. It is an n X n matrix. References ========== .. [1] https://en.wikipedia.org/wiki/DFT_matrix Examples ======== >>> from sympy.physics.matrices import mdft >>> mdft(3) Matrix([ [sqrt(3)/3, sqrt(3)/3, sqrt(3)/3], [sqrt(3)/3, sqrt(3)*exp(-2*I*pi/3)/3, sqrt(3)*exp(2*I*pi/3)/3], [sqrt(3)/3, sqrt(3)*exp(2*I*pi/3)/3, sqrt(3)*exp(-2*I*pi/3)/3]]) """ mat = [[None for x in range(n)] for y in range(n)] base = exp(-2*pi*I/n) mat[0] = [1]*n for i in range(n): mat[i][0] = 1 for i in range(1, n): for j in range(i, n): mat[i][j] = mat[j][i] = base**(i*j) return (1/sqrt(n))*Matrix(mat)

cc93e1c5e4456c7852d69d153f181e273af39c2afe5f6b1a0b5f74d4648faec4

""" Second quantization operators and states for bosons. This follow the formulation of Fetter and Welecka, "Quantum Theory of Many-Particle Systems." """ from __future__ import print_function, division from collections import defaultdict from sympy import (Add, Basic, cacheit, Dummy, Expr, Function, I, KroneckerDelta, Mul, Pow, S, sqrt, Symbol, sympify, Tuple, zeros) from sympy.printing.str import StrPrinter from sympy.core.compatibility import range from sympy.utilities.iterables import has_dups from sympy.utilities import default_sort_key __all__ = [ 'Dagger', 'KroneckerDelta', 'BosonicOperator', 'AnnihilateBoson', 'CreateBoson', 'AnnihilateFermion', 'CreateFermion', 'FockState', 'FockStateBra', 'FockStateKet', 'FockStateBosonKet', 'FockStateBosonBra', 'BBra', 'BKet', 'FBra', 'FKet', 'F', 'Fd', 'B', 'Bd', 'apply_operators', 'InnerProduct', 'BosonicBasis', 'VarBosonicBasis', 'FixedBosonicBasis', 'Commutator', 'matrix_rep', 'contraction', 'wicks', 'NO', 'evaluate_deltas', 'AntiSymmetricTensor', 'substitute_dummies', 'PermutationOperator', 'simplify_index_permutations', ] class SecondQuantizationError(Exception): pass class AppliesOnlyToSymbolicIndex(SecondQuantizationError): pass class ContractionAppliesOnlyToFermions(SecondQuantizationError): pass class ViolationOfPauliPrinciple(SecondQuantizationError): pass class SubstitutionOfAmbigousOperatorFailed(SecondQuantizationError): pass class WicksTheoremDoesNotApply(SecondQuantizationError): pass class Dagger(Expr): """ Hermitian conjugate of creation/annihilation operators. Examples ======== >>> from sympy import I >>> from sympy.physics.secondquant import Dagger, B, Bd >>> Dagger(2*I) -2*I >>> Dagger(B(0)) CreateBoson(0) >>> Dagger(Bd(0)) AnnihilateBoson(0) """ def __new__(cls, arg): arg = sympify(arg) r = cls.eval(arg) if isinstance(r, Basic): return r obj = Basic.__new__(cls, arg) return obj @classmethod def eval(cls, arg): """ Evaluates the Dagger instance. Examples ======== >>> from sympy import I >>> from sympy.physics.secondquant import Dagger, B, Bd >>> Dagger(2*I) -2*I >>> Dagger(B(0)) CreateBoson(0) >>> Dagger(Bd(0)) AnnihilateBoson(0) The eval() method is called automatically. """ dagger = getattr(arg, '_dagger_', None) if dagger is not None: return dagger() if isinstance(arg, Basic): if arg.is_Add: return Add(*tuple(map(Dagger, arg.args))) if arg.is_Mul: return Mul(*tuple(map(Dagger, reversed(arg.args)))) if arg.is_Number: return arg if arg.is_Pow: return Pow(Dagger(arg.args[0]), arg.args[1]) if arg == I: return -arg else: return None def _dagger_(self): return self.args[0] class TensorSymbol(Expr): is_commutative = True class AntiSymmetricTensor(TensorSymbol): """Stores upper and lower indices in separate Tuple's. Each group of indices is assumed to be antisymmetric. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import AntiSymmetricTensor >>> i, j = symbols('i j', below_fermi=True) >>> a, b = symbols('a b', above_fermi=True) >>> AntiSymmetricTensor('v', (a, i), (b, j)) AntiSymmetricTensor(v, (a, i), (b, j)) >>> AntiSymmetricTensor('v', (i, a), (b, j)) -AntiSymmetricTensor(v, (a, i), (b, j)) As you can see, the indices are automatically sorted to a canonical form. """ def __new__(cls, symbol, upper, lower): try: upper, signu = _sort_anticommuting_fermions( upper, key=cls._sortkey) lower, signl = _sort_anticommuting_fermions( lower, key=cls._sortkey) except ViolationOfPauliPrinciple: return S.Zero symbol = sympify(symbol) upper = Tuple(*upper) lower = Tuple(*lower) if (signu + signl) % 2: return -TensorSymbol.__new__(cls, symbol, upper, lower) else: return TensorSymbol.__new__(cls, symbol, upper, lower) @classmethod def _sortkey(cls, index): """Key for sorting of indices. particle < hole < general FIXME: This is a bottle-neck, can we do it faster? """ h = hash(index) label = str(index) if isinstance(index, Dummy): if index.assumptions0.get('above_fermi'): return (20, label, h) elif index.assumptions0.get('below_fermi'): return (21, label, h) else: return (22, label, h) if index.assumptions0.get('above_fermi'): return (10, label, h) elif index.assumptions0.get('below_fermi'): return (11, label, h) else: return (12, label, h) def _latex(self, printer): return "%s^{%s}_{%s}" % ( self.symbol, "".join([ i.name for i in self.args[1]]), "".join([ i.name for i in self.args[2]]) ) @property def symbol(self): """ Returns the symbol of the tensor. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import AntiSymmetricTensor >>> i, j = symbols('i,j', below_fermi=True) >>> a, b = symbols('a,b', above_fermi=True) >>> AntiSymmetricTensor('v', (a, i), (b, j)) AntiSymmetricTensor(v, (a, i), (b, j)) >>> AntiSymmetricTensor('v', (a, i), (b, j)).symbol v """ return self.args[0] @property def upper(self): """ Returns the upper indices. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import AntiSymmetricTensor >>> i, j = symbols('i,j', below_fermi=True) >>> a, b = symbols('a,b', above_fermi=True) >>> AntiSymmetricTensor('v', (a, i), (b, j)) AntiSymmetricTensor(v, (a, i), (b, j)) >>> AntiSymmetricTensor('v', (a, i), (b, j)).upper (a, i) """ return self.args[1] @property def lower(self): """ Returns the lower indices. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import AntiSymmetricTensor >>> i, j = symbols('i,j', below_fermi=True) >>> a, b = symbols('a,b', above_fermi=True) >>> AntiSymmetricTensor('v', (a, i), (b, j)) AntiSymmetricTensor(v, (a, i), (b, j)) >>> AntiSymmetricTensor('v', (a, i), (b, j)).lower (b, j) """ return self.args[2] def __str__(self): return "%s(%s,%s)" % self.args def doit(self, **kw_args): """ Returns self. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import AntiSymmetricTensor >>> i, j = symbols('i,j', below_fermi=True) >>> a, b = symbols('a,b', above_fermi=True) >>> AntiSymmetricTensor('v', (a, i), (b, j)).doit() AntiSymmetricTensor(v, (a, i), (b, j)) """ return self class SqOperator(Expr): """ Base class for Second Quantization operators. """ op_symbol = 'sq' is_commutative = False def __new__(cls, k): obj = Basic.__new__(cls, sympify(k)) return obj @property def state(self): """ Returns the state index related to this operator. >>> from sympy import Symbol >>> from sympy.physics.secondquant import F, Fd, B, Bd >>> p = Symbol('p') >>> F(p).state p >>> Fd(p).state p >>> B(p).state p >>> Bd(p).state p """ return self.args[0] @property def is_symbolic(self): """ Returns True if the state is a symbol (as opposed to a number). >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> p = Symbol('p') >>> F(p).is_symbolic True >>> F(1).is_symbolic False """ if self.state.is_Integer: return False else: return True def doit(self, **kw_args): """ FIXME: hack to prevent crash further up... """ return self def __repr__(self): return NotImplemented def __str__(self): return "%s(%r)" % (self.op_symbol, self.state) def apply_operator(self, state): """ Applies an operator to itself. """ raise NotImplementedError('implement apply_operator in a subclass') class BosonicOperator(SqOperator): pass class Annihilator(SqOperator): pass class Creator(SqOperator): pass class AnnihilateBoson(BosonicOperator, Annihilator): """ Bosonic annihilation operator. Examples ======== >>> from sympy.physics.secondquant import B >>> from sympy.abc import x >>> B(x) AnnihilateBoson(x) """ op_symbol = 'b' def _dagger_(self): return CreateBoson(self.state) def apply_operator(self, state): """ Apply state to self if self is not symbolic and state is a FockStateKet, else multiply self by state. Examples ======== >>> from sympy.physics.secondquant import B, BKet >>> from sympy.abc import x, y, n >>> B(x).apply_operator(y) y*AnnihilateBoson(x) >>> B(0).apply_operator(BKet((n,))) sqrt(n)*FockStateBosonKet((n - 1,)) """ if not self.is_symbolic and isinstance(state, FockStateKet): element = self.state amp = sqrt(state[element]) return amp*state.down(element) else: return Mul(self, state) def __repr__(self): return "AnnihilateBoson(%s)" % self.state def _latex(self, printer): return "b_{%s}" % self.state.name class CreateBoson(BosonicOperator, Creator): """ Bosonic creation operator. """ op_symbol = 'b+' def _dagger_(self): return AnnihilateBoson(self.state) def apply_operator(self, state): """ Apply state to self if self is not symbolic and state is a FockStateKet, else multiply self by state. Examples ======== >>> from sympy.physics.secondquant import B, Dagger, BKet >>> from sympy.abc import x, y, n >>> Dagger(B(x)).apply_operator(y) y*CreateBoson(x) >>> B(0).apply_operator(BKet((n,))) sqrt(n)*FockStateBosonKet((n - 1,)) """ if not self.is_symbolic and isinstance(state, FockStateKet): element = self.state amp = sqrt(state[element] + 1) return amp*state.up(element) else: return Mul(self, state) def __repr__(self): return "CreateBoson(%s)" % self.state def _latex(self, printer): return "b^\\dagger_{%s}" % self.state.name B = AnnihilateBoson Bd = CreateBoson class FermionicOperator(SqOperator): @property def is_restricted(self): """ Is this FermionicOperator restricted with respect to fermi level? Return values: 1 : restricted to orbits above fermi 0 : no restriction -1 : restricted to orbits below fermi >>> from sympy import Symbol >>> from sympy.physics.secondquant import F, Fd >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_restricted 1 >>> Fd(a).is_restricted 1 >>> F(i).is_restricted -1 >>> Fd(i).is_restricted -1 >>> F(p).is_restricted 0 >>> Fd(p).is_restricted 0 """ ass = self.args[0].assumptions0 if ass.get("below_fermi"): return -1 if ass.get("above_fermi"): return 1 return 0 @property def is_above_fermi(self): """ Does the index of this FermionicOperator allow values above fermi? >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_above_fermi True >>> F(i).is_above_fermi False >>> F(p).is_above_fermi True The same applies to creation operators Fd """ return not self.args[0].assumptions0.get("below_fermi") @property def is_below_fermi(self): """ Does the index of this FermionicOperator allow values below fermi? >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_below_fermi False >>> F(i).is_below_fermi True >>> F(p).is_below_fermi True The same applies to creation operators Fd """ return not self.args[0].assumptions0.get("above_fermi") @property def is_only_below_fermi(self): """ Is the index of this FermionicOperator restricted to values below fermi? >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_only_below_fermi False >>> F(i).is_only_below_fermi True >>> F(p).is_only_below_fermi False The same applies to creation operators Fd """ return self.is_below_fermi and not self.is_above_fermi @property def is_only_above_fermi(self): """ Is the index of this FermionicOperator restricted to values above fermi? >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_only_above_fermi True >>> F(i).is_only_above_fermi False >>> F(p).is_only_above_fermi False The same applies to creation operators Fd """ return self.is_above_fermi and not self.is_below_fermi def _sortkey(self): h = hash(self) label = str(self.args[0]) if self.is_only_q_creator: return 1, label, h if self.is_only_q_annihilator: return 4, label, h if isinstance(self, Annihilator): return 3, label, h if isinstance(self, Creator): return 2, label, h class AnnihilateFermion(FermionicOperator, Annihilator): """ Fermionic annihilation operator. """ op_symbol = 'f' def _dagger_(self): return CreateFermion(self.state) def apply_operator(self, state): """ Apply state to self if self is not symbolic and state is a FockStateKet, else multiply self by state. Examples ======== >>> from sympy.physics.secondquant import B, Dagger, BKet >>> from sympy.abc import x, y, n >>> Dagger(B(x)).apply_operator(y) y*CreateBoson(x) >>> B(0).apply_operator(BKet((n,))) sqrt(n)*FockStateBosonKet((n - 1,)) """ if isinstance(state, FockStateFermionKet): element = self.state return state.down(element) elif isinstance(state, Mul): c_part, nc_part = state.args_cnc() if isinstance(nc_part[0], FockStateFermionKet): element = self.state return Mul(*(c_part + [nc_part[0].down(element)] + nc_part[1:])) else: return Mul(self, state) else: return Mul(self, state) @property def is_q_creator(self): """ Can we create a quasi-particle? (create hole or create particle) If so, would that be above or below the fermi surface? >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_q_creator 0 >>> F(i).is_q_creator -1 >>> F(p).is_q_creator -1 """ if self.is_below_fermi: return -1 return 0 @property def is_q_annihilator(self): """ Can we destroy a quasi-particle? (annihilate hole or annihilate particle) If so, would that be above or below the fermi surface? >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=1) >>> i = Symbol('i', below_fermi=1) >>> p = Symbol('p') >>> F(a).is_q_annihilator 1 >>> F(i).is_q_annihilator 0 >>> F(p).is_q_annihilator 1 """ if self.is_above_fermi: return 1 return 0 @property def is_only_q_creator(self): """ Always create a quasi-particle? (create hole or create particle) >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_only_q_creator False >>> F(i).is_only_q_creator True >>> F(p).is_only_q_creator False """ return self.is_only_below_fermi @property def is_only_q_annihilator(self): """ Always destroy a quasi-particle? (annihilate hole or annihilate particle) >>> from sympy import Symbol >>> from sympy.physics.secondquant import F >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> F(a).is_only_q_annihilator True >>> F(i).is_only_q_annihilator False >>> F(p).is_only_q_annihilator False """ return self.is_only_above_fermi def __repr__(self): return "AnnihilateFermion(%s)" % self.state def _latex(self, printer): return "a_{%s}" % self.state.name class CreateFermion(FermionicOperator, Creator): """ Fermionic creation operator. """ op_symbol = 'f+' def _dagger_(self): return AnnihilateFermion(self.state) def apply_operator(self, state): """ Apply state to self if self is not symbolic and state is a FockStateKet, else multiply self by state. Examples ======== >>> from sympy.physics.secondquant import B, Dagger, BKet >>> from sympy.abc import x, y, n >>> Dagger(B(x)).apply_operator(y) y*CreateBoson(x) >>> B(0).apply_operator(BKet((n,))) sqrt(n)*FockStateBosonKet((n - 1,)) """ if isinstance(state, FockStateFermionKet): element = self.state return state.up(element) elif isinstance(state, Mul): c_part, nc_part = state.args_cnc() if isinstance(nc_part[0], FockStateFermionKet): element = self.state return Mul(*(c_part + [nc_part[0].up(element)] + nc_part[1:])) return Mul(self, state) @property def is_q_creator(self): """ Can we create a quasi-particle? (create hole or create particle) If so, would that be above or below the fermi surface? >>> from sympy import Symbol >>> from sympy.physics.secondquant import Fd >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> Fd(a).is_q_creator 1 >>> Fd(i).is_q_creator 0 >>> Fd(p).is_q_creator 1 """ if self.is_above_fermi: return 1 return 0 @property def is_q_annihilator(self): """ Can we destroy a quasi-particle? (annihilate hole or annihilate particle) If so, would that be above or below the fermi surface? >>> from sympy import Symbol >>> from sympy.physics.secondquant import Fd >>> a = Symbol('a', above_fermi=1) >>> i = Symbol('i', below_fermi=1) >>> p = Symbol('p') >>> Fd(a).is_q_annihilator 0 >>> Fd(i).is_q_annihilator -1 >>> Fd(p).is_q_annihilator -1 """ if self.is_below_fermi: return -1 return 0 @property def is_only_q_creator(self): """ Always create a quasi-particle? (create hole or create particle) >>> from sympy import Symbol >>> from sympy.physics.secondquant import Fd >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> Fd(a).is_only_q_creator True >>> Fd(i).is_only_q_creator False >>> Fd(p).is_only_q_creator False """ return self.is_only_above_fermi @property def is_only_q_annihilator(self): """ Always destroy a quasi-particle? (annihilate hole or annihilate particle) >>> from sympy import Symbol >>> from sympy.physics.secondquant import Fd >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> Fd(a).is_only_q_annihilator False >>> Fd(i).is_only_q_annihilator True >>> Fd(p).is_only_q_annihilator False """ return self.is_only_below_fermi def __repr__(self): return "CreateFermion(%s)" % self.state def _latex(self, printer): return "a^\\dagger_{%s}" % self.state.name Fd = CreateFermion F = AnnihilateFermion class FockState(Expr): """ Many particle Fock state with a sequence of occupation numbers. Anywhere you can have a FockState, you can also have S.Zero. All code must check for this! Base class to represent FockStates. """ is_commutative = False def __new__(cls, occupations): """ occupations is a list with two possible meanings: - For bosons it is a list of occupation numbers. Element i is the number of particles in state i. - For fermions it is a list of occupied orbits. Element 0 is the state that was occupied first, element i is the i'th occupied state. """ occupations = list(map(sympify, occupations)) obj = Basic.__new__(cls, Tuple(*occupations)) return obj def __getitem__(self, i): i = int(i) return self.args[0][i] def __repr__(self): return ("FockState(%r)") % (self.args) def __str__(self): return "%s%r%s" % (self.lbracket, self._labels(), self.rbracket) def _labels(self): return self.args[0] def __len__(self): return len(self.args[0]) class BosonState(FockState): """ Base class for FockStateBoson(Ket/Bra). """ def up(self, i): """ Performs the action of a creation operator. Examples ======== >>> from sympy.physics.secondquant import BBra >>> b = BBra([1, 2]) >>> b FockStateBosonBra((1, 2)) >>> b.up(1) FockStateBosonBra((1, 3)) """ i = int(i) new_occs = list(self.args[0]) new_occs[i] = new_occs[i] + S.One return self.__class__(new_occs) def down(self, i): """ Performs the action of an annihilation operator. Examples ======== >>> from sympy.physics.secondquant import BBra >>> b = BBra([1, 2]) >>> b FockStateBosonBra((1, 2)) >>> b.down(1) FockStateBosonBra((1, 1)) """ i = int(i) new_occs = list(self.args[0]) if new_occs[i] == S.Zero: return S.Zero else: new_occs[i] = new_occs[i] - S.One return self.__class__(new_occs) class FermionState(FockState): """ Base class for FockStateFermion(Ket/Bra). """ fermi_level = 0 def __new__(cls, occupations, fermi_level=0): occupations = list(map(sympify, occupations)) if len(occupations) > 1: try: (occupations, sign) = _sort_anticommuting_fermions( occupations, key=hash) except ViolationOfPauliPrinciple: return S.Zero else: sign = 0 cls.fermi_level = fermi_level if cls._count_holes(occupations) > fermi_level: return S.Zero if sign % 2: return S.NegativeOne*FockState.__new__(cls, occupations) else: return FockState.__new__(cls, occupations) def up(self, i): """ Performs the action of a creation operator. If below fermi we try to remove a hole, if above fermi we try to create a particle. if general index p we return Kronecker(p,i)*self where i is a new symbol with restriction above or below. >>> from sympy import Symbol >>> from sympy.physics.secondquant import FKet >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') >>> FKet([]).up(a) FockStateFermionKet((a,)) A creator acting on vacuum below fermi vanishes >>> FKet([]).up(i) 0 """ present = i in self.args[0] if self._only_above_fermi(i): if present: return S.Zero else: return self._add_orbit(i) elif self._only_below_fermi(i): if present: return self._remove_orbit(i) else: return S.Zero else: if present: hole = Dummy("i", below_fermi=True) return KroneckerDelta(i, hole)*self._remove_orbit(i) else: particle = Dummy("a", above_fermi=True) return KroneckerDelta(i, particle)*self._add_orbit(i) def down(self, i): """ Performs the action of an annihilation operator. If below fermi we try to create a hole, if above fermi we try to remove a particle. if general index p we return Kronecker(p,i)*self where i is a new symbol with restriction above or below. >>> from sympy import Symbol >>> from sympy.physics.secondquant import FKet >>> a = Symbol('a', above_fermi=True) >>> i = Symbol('i', below_fermi=True) >>> p = Symbol('p') An annihilator acting on vacuum above fermi vanishes >>> FKet([]).down(a) 0 Also below fermi, it vanishes, unless we specify a fermi level > 0 >>> FKet([]).down(i) 0 >>> FKet([],4).down(i) FockStateFermionKet((i,)) """ present = i in self.args[0] if self._only_above_fermi(i): if present: return self._remove_orbit(i) else: return S.Zero elif self._only_below_fermi(i): if present: return S.Zero else: return self._add_orbit(i) else: if present: hole = Dummy("i", below_fermi=True) return KroneckerDelta(i, hole)*self._add_orbit(i) else: particle = Dummy("a", above_fermi=True) return KroneckerDelta(i, particle)*self._remove_orbit(i) @classmethod def _only_below_fermi(cls, i): """ Tests if given orbit is only below fermi surface. If nothing can be concluded we return a conservative False. """ if i.is_number: return i <= cls.fermi_level if i.assumptions0.get('below_fermi'): return True return False @classmethod def _only_above_fermi(cls, i): """ Tests if given orbit is only above fermi surface. If fermi level has not been set we return True. If nothing can be concluded we return a conservative False. """ if i.is_number: return i > cls.fermi_level if i.assumptions0.get('above_fermi'): return True return not cls.fermi_level def _remove_orbit(self, i): """ Removes particle/fills hole in orbit i. No input tests performed here. """ new_occs = list(self.args[0]) pos = new_occs.index(i) del new_occs[pos] if (pos) % 2: return S.NegativeOne*self.__class__(new_occs, self.fermi_level) else: return self.__class__(new_occs, self.fermi_level) def _add_orbit(self, i): """ Adds particle/creates hole in orbit i. No input tests performed here. """ return self.__class__((i,) + self.args[0], self.fermi_level) @classmethod def _count_holes(cls, list): """ returns number of identified hole states in list. """ return len([i for i in list if cls._only_below_fermi(i)]) def _negate_holes(self, list): return tuple([-i if i <= self.fermi_level else i for i in list]) def __repr__(self): if self.fermi_level: return "FockStateKet(%r, fermi_level=%s)" % (self.args[0], self.fermi_level) else: return "FockStateKet(%r)" % (self.args[0],) def _labels(self): return self._negate_holes(self.args[0]) class FockStateKet(FockState): """ Representation of a ket. """ lbracket = '|' rbracket = '>' class FockStateBra(FockState): """ Representation of a bra. """ lbracket = '<' rbracket = '|' def __mul__(self, other): if isinstance(other, FockStateKet): return InnerProduct(self, other) else: return Expr.__mul__(self, other) class FockStateBosonKet(BosonState, FockStateKet): """ Many particle Fock state with a sequence of occupation numbers. Occupation numbers can be any integer >= 0. Examples ======== >>> from sympy.physics.secondquant import BKet >>> BKet([1, 2]) FockStateBosonKet((1, 2)) """ def _dagger_(self): return FockStateBosonBra(*self.args) class FockStateBosonBra(BosonState, FockStateBra): """ Describes a collection of BosonBra particles. Examples ======== >>> from sympy.physics.secondquant import BBra >>> BBra([1, 2]) FockStateBosonBra((1, 2)) """ def _dagger_(self): return FockStateBosonKet(*self.args) class FockStateFermionKet(FermionState, FockStateKet): """ Many-particle Fock state with a sequence of occupied orbits. Each state can only have one particle, so we choose to store a list of occupied orbits rather than a tuple with occupation numbers (zeros and ones). states below fermi level are holes, and are represented by negative labels in the occupation list. For symbolic state labels, the fermi_level caps the number of allowed hole- states. Examples ======== >>> from sympy.physics.secondquant import FKet >>> FKet([1, 2]) #doctest: +SKIP FockStateFermionKet((1, 2)) """ def _dagger_(self): return FockStateFermionBra(*self.args) class FockStateFermionBra(FermionState, FockStateBra): """ See Also ======== FockStateFermionKet Examples ======== >>> from sympy.physics.secondquant import FBra >>> FBra([1, 2]) #doctest: +SKIP FockStateFermionBra((1, 2)) """ def _dagger_(self): return FockStateFermionKet(*self.args) BBra = FockStateBosonBra BKet = FockStateBosonKet FBra = FockStateFermionBra FKet = FockStateFermionKet def _apply_Mul(m): """ Take a Mul instance with operators and apply them to states. This method applies all operators with integer state labels to the actual states. For symbolic state labels, nothing is done. When inner products of FockStates are encountered (like <a|b>), they are converted to instances of InnerProduct. This does not currently work on double inner products like, <a|b><c|d>. If the argument is not a Mul, it is simply returned as is. """ if not isinstance(m, Mul): return m c_part, nc_part = m.args_cnc() n_nc = len(nc_part) if n_nc == 0 or n_nc == 1: return m else: last = nc_part[-1] next_to_last = nc_part[-2] if isinstance(last, FockStateKet): if isinstance(next_to_last, SqOperator): if next_to_last.is_symbolic: return m else: result = next_to_last.apply_operator(last) if result == 0: return S.Zero else: return _apply_Mul(Mul(*(c_part + nc_part[:-2] + [result]))) elif isinstance(next_to_last, Pow): if isinstance(next_to_last.base, SqOperator) and \ next_to_last.exp.is_Integer: if next_to_last.base.is_symbolic: return m else: result = last for i in range(next_to_last.exp): result = next_to_last.base.apply_operator(result) if result == 0: break if result == 0: return S.Zero else: return _apply_Mul(Mul(*(c_part + nc_part[:-2] + [result]))) else: return m elif isinstance(next_to_last, FockStateBra): result = InnerProduct(next_to_last, last) if result == 0: return S.Zero else: return _apply_Mul(Mul(*(c_part + nc_part[:-2] + [result]))) else: return m else: return m def apply_operators(e): """ Take a sympy expression with operators and states and apply the operators. Examples ======== >>> from sympy.physics.secondquant import apply_operators >>> from sympy import sympify >>> apply_operators(sympify(3)+4) 7 """ e = e.expand() muls = e.atoms(Mul) subs_list = [(m, _apply_Mul(m)) for m in iter(muls)] return e.subs(subs_list) class InnerProduct(Basic): """ An unevaluated inner product between a bra and ket. Currently this class just reduces things to a product of Kronecker Deltas. In the future, we could introduce abstract states like ``|a>`` and ``|b>``, and leave the inner product unevaluated as ``<a|b>``. """ is_commutative = True def __new__(cls, bra, ket): if not isinstance(bra, FockStateBra): raise TypeError("must be a bra") if not isinstance(ket, FockStateKet): raise TypeError("must be a key") return cls.eval(bra, ket) @classmethod def eval(cls, bra, ket): result = S.One for i, j in zip(bra.args[0], ket.args[0]): result *= KroneckerDelta(i, j) if result == 0: break return result @property def bra(self): """Returns the bra part of the state""" return self.args[0] @property def ket(self): """Returns the ket part of the state""" return self.args[1] def __repr__(self): sbra = repr(self.bra) sket = repr(self.ket) return "%s|%s" % (sbra[:-1], sket[1:]) def __str__(self): return self.__repr__() def matrix_rep(op, basis): """ Find the representation of an operator in a basis. Examples ======== >>> from sympy.physics.secondquant import VarBosonicBasis, B, matrix_rep >>> b = VarBosonicBasis(5) >>> o = B(0) >>> matrix_rep(o, b) Matrix([ [0, 1, 0, 0, 0], [0, 0, sqrt(2), 0, 0], [0, 0, 0, sqrt(3), 0], [0, 0, 0, 0, 2], [0, 0, 0, 0, 0]]) """ a = zeros(len(basis)) for i in range(len(basis)): for j in range(len(basis)): a[i, j] = apply_operators(Dagger(basis[i])*op*basis[j]) return a class BosonicBasis(object): """ Base class for a basis set of bosonic Fock states. """ pass class VarBosonicBasis(object): """ A single state, variable particle number basis set. Examples ======== >>> from sympy.physics.secondquant import VarBosonicBasis >>> b = VarBosonicBasis(5) >>> b [FockState((0,)), FockState((1,)), FockState((2,)), FockState((3,)), FockState((4,))] """ def __init__(self, n_max): self.n_max = n_max self._build_states() def _build_states(self): self.basis = [] for i in range(self.n_max): self.basis.append(FockStateBosonKet([i])) self.n_basis = len(self.basis) def index(self, state): """ Returns the index of state in basis. Examples ======== >>> from sympy.physics.secondquant import VarBosonicBasis >>> b = VarBosonicBasis(3) >>> state = b.state(1) >>> b [FockState((0,)), FockState((1,)), FockState((2,))] >>> state FockStateBosonKet((1,)) >>> b.index(state) 1 """ return self.basis.index(state) def state(self, i): """ The state of a single basis. Examples ======== >>> from sympy.physics.secondquant import VarBosonicBasis >>> b = VarBosonicBasis(5) >>> b.state(3) FockStateBosonKet((3,)) """ return self.basis[i] def __getitem__(self, i): return self.state(i) def __len__(self): return len(self.basis) def __repr__(self): return repr(self.basis) class FixedBosonicBasis(BosonicBasis): """ Fixed particle number basis set. Examples ======== >>> from sympy.physics.secondquant import FixedBosonicBasis >>> b = FixedBosonicBasis(2, 2) >>> state = b.state(1) >>> b [FockState((2, 0)), FockState((1, 1)), FockState((0, 2))] >>> state FockStateBosonKet((1, 1)) >>> b.index(state) 1 """ def __init__(self, n_particles, n_levels): self.n_particles = n_particles self.n_levels = n_levels self._build_particle_locations() self._build_states() def _build_particle_locations(self): tup = ["i%i" % i for i in range(self.n_particles)] first_loop = "for i0 in range(%i)" % self.n_levels other_loops = '' for cur, prev in zip(tup[1:], tup): temp = "for %s in range(%s + 1) " % (cur, prev) other_loops = other_loops + temp tup_string = "(%s)" % ", ".join(tup) list_comp = "[%s %s %s]" % (tup_string, first_loop, other_loops) result = eval(list_comp) if self.n_particles == 1: result = [(item,) for item in result] self.particle_locations = result def _build_states(self): self.basis = [] for tuple_of_indices in self.particle_locations: occ_numbers = self.n_levels*[0] for level in tuple_of_indices: occ_numbers[level] += 1 self.basis.append(FockStateBosonKet(occ_numbers)) self.n_basis = len(self.basis) def index(self, state): """Returns the index of state in basis. Examples ======== >>> from sympy.physics.secondquant import FixedBosonicBasis >>> b = FixedBosonicBasis(2, 3) >>> b.index(b.state(3)) 3 """ return self.basis.index(state) def state(self, i): """Returns the state that lies at index i of the basis Examples ======== >>> from sympy.physics.secondquant import FixedBosonicBasis >>> b = FixedBosonicBasis(2, 3) >>> b.state(3) FockStateBosonKet((1, 0, 1)) """ return self.basis[i] def __getitem__(self, i): return self.state(i) def __len__(self): return len(self.basis) def __repr__(self): return repr(self.basis) class Commutator(Function): """ The Commutator: [A, B] = A*B - B*A The arguments are ordered according to .__cmp__() >>> from sympy import symbols >>> from sympy.physics.secondquant import Commutator >>> A, B = symbols('A,B', commutative=False) >>> Commutator(B, A) -Commutator(A, B) Evaluate the commutator with .doit() >>> comm = Commutator(A,B); comm Commutator(A, B) >>> comm.doit() A*B - B*A For two second quantization operators the commutator is evaluated immediately: >>> from sympy.physics.secondquant import Fd, F >>> a = symbols('a', above_fermi=True) >>> i = symbols('i', below_fermi=True) >>> p,q = symbols('p,q') >>> Commutator(Fd(a),Fd(i)) 2*NO(CreateFermion(a)*CreateFermion(i)) But for more complicated expressions, the evaluation is triggered by a call to .doit() >>> comm = Commutator(Fd(p)*Fd(q),F(i)); comm Commutator(CreateFermion(p)*CreateFermion(q), AnnihilateFermion(i)) >>> comm.doit(wicks=True) -KroneckerDelta(i, p)*CreateFermion(q) + KroneckerDelta(i, q)*CreateFermion(p) """ is_commutative = False @classmethod def eval(cls, a, b): """ The Commutator [A,B] is on canonical form if A < B. Examples ======== >>> from sympy.physics.secondquant import Commutator, F, Fd >>> from sympy.abc import x >>> c1 = Commutator(F(x), Fd(x)) >>> c2 = Commutator(Fd(x), F(x)) >>> Commutator.eval(c1, c2) 0 """ if not (a and b): return S.Zero if a == b: return S.Zero if a.is_commutative or b.is_commutative: return S.Zero # # [A+B,C] -> [A,C] + [B,C] # a = a.expand() if isinstance(a, Add): return Add(*[cls(term, b) for term in a.args]) b = b.expand() if isinstance(b, Add): return Add(*[cls(a, term) for term in b.args]) # # [xA,yB] -> xy*[A,B] # ca, nca = a.args_cnc() cb, ncb = b.args_cnc() c_part = list(ca) + list(cb) if c_part: return Mul(Mul(*c_part), cls(Mul._from_args(nca), Mul._from_args(ncb))) # # single second quantization operators # if isinstance(a, BosonicOperator) and isinstance(b, BosonicOperator): if isinstance(b, CreateBoson) and isinstance(a, AnnihilateBoson): return KroneckerDelta(a.state, b.state) if isinstance(a, CreateBoson) and isinstance(b, AnnihilateBoson): return S.NegativeOne*KroneckerDelta(a.state, b.state) else: return S.Zero if isinstance(a, FermionicOperator) and isinstance(b, FermionicOperator): return wicks(a*b) - wicks(b*a) # # Canonical ordering of arguments # if a.sort_key() > b.sort_key(): return S.NegativeOne*cls(b, a) def doit(self, **hints): """ Enables the computation of complex expressions. Examples ======== >>> from sympy.physics.secondquant import Commutator, F, Fd >>> from sympy import symbols >>> i, j = symbols('i,j', below_fermi=True) >>> a, b = symbols('a,b', above_fermi=True) >>> c = Commutator(Fd(a)*F(i),Fd(b)*F(j)) >>> c.doit(wicks=True) 0 """ a = self.args[0] b = self.args[1] if hints.get("wicks"): a = a.doit(**hints) b = b.doit(**hints) try: return wicks(a*b) - wicks(b*a) except ContractionAppliesOnlyToFermions: pass except WicksTheoremDoesNotApply: pass return (a*b - b*a).doit(**hints) def __repr__(self): return "Commutator(%s,%s)" % (self.args[0], self.args[1]) def __str__(self): return "[%s,%s]" % (self.args[0], self.args[1]) def _latex(self, printer): return "\\left[%s,%s\\right]" % tuple([ printer._print(arg) for arg in self.args]) class NO(Expr): """ This Object is used to represent normal ordering brackets. i.e. {abcd} sometimes written :abcd: Applying the function NO(arg) to an argument means that all operators in the argument will be assumed to anticommute, and have vanishing contractions. This allows an immediate reordering to canonical form upon object creation. >>> from sympy import symbols >>> from sympy.physics.secondquant import NO, F, Fd >>> p,q = symbols('p,q') >>> NO(Fd(p)*F(q)) NO(CreateFermion(p)*AnnihilateFermion(q)) >>> NO(F(q)*Fd(p)) -NO(CreateFermion(p)*AnnihilateFermion(q)) Note: If you want to generate a normal ordered equivalent of an expression, you should use the function wicks(). This class only indicates that all operators inside the brackets anticommute, and have vanishing contractions. Nothing more, nothing less. """ is_commutative = False def __new__(cls, arg): """ Use anticommutation to get canonical form of operators. Employ associativity of normal ordered product: {ab{cd}} = {abcd} but note that {ab}{cd} /= {abcd}. We also employ distributivity: {ab + cd} = {ab} + {cd}. Canonical form also implies expand() {ab(c+d)} = {abc} + {abd}. """ # {ab + cd} = {ab} + {cd} arg = sympify(arg) arg = arg.expand() if arg.is_Add: return Add(*[ cls(term) for term in arg.args]) if arg.is_Mul: # take coefficient outside of normal ordering brackets c_part, seq = arg.args_cnc() if c_part: coeff = Mul(*c_part) if not seq: return coeff else: coeff = S.One # {ab{cd}} = {abcd} newseq = [] foundit = False for fac in seq: if isinstance(fac, NO): newseq.extend(fac.args) foundit = True else: newseq.append(fac) if foundit: return coeff*cls(Mul(*newseq)) # We assume that the user don't mix B and F operators if isinstance(seq[0], BosonicOperator): raise NotImplementedError try: newseq, sign = _sort_anticommuting_fermions(seq) except ViolationOfPauliPrinciple: return S.Zero if sign % 2: return (S.NegativeOne*coeff)*cls(Mul(*newseq)) elif sign: return coeff*cls(Mul(*newseq)) else: pass # since sign==0, no permutations was necessary # if we couldn't do anything with Mul object, we just # mark it as normal ordered if coeff != S.One: return coeff*cls(Mul(*newseq)) return Expr.__new__(cls, Mul(*newseq)) if isinstance(arg, NO): return arg # if object was not Mul or Add, normal ordering does not apply return arg @property def has_q_creators(self): """ Return 0 if the leftmost argument of the first argument is a not a q_creator, else 1 if it is above fermi or -1 if it is below fermi. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import NO, F, Fd >>> a = symbols('a', above_fermi=True) >>> i = symbols('i', below_fermi=True) >>> NO(Fd(a)*Fd(i)).has_q_creators 1 >>> NO(F(i)*F(a)).has_q_creators -1 >>> NO(Fd(i)*F(a)).has_q_creators #doctest: +SKIP 0 """ return self.args[0].args[0].is_q_creator @property def has_q_annihilators(self): """ Return 0 if the rightmost argument of the first argument is a not a q_annihilator, else 1 if it is above fermi or -1 if it is below fermi. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import NO, F, Fd >>> a = symbols('a', above_fermi=True) >>> i = symbols('i', below_fermi=True) >>> NO(Fd(a)*Fd(i)).has_q_annihilators -1 >>> NO(F(i)*F(a)).has_q_annihilators 1 >>> NO(Fd(a)*F(i)).has_q_annihilators 0 """ return self.args[0].args[-1].is_q_annihilator def doit(self, **kw_args): """ Either removes the brackets or enables complex computations in its arguments. Examples ======== >>> from sympy.physics.secondquant import NO, Fd, F >>> from textwrap import fill >>> from sympy import symbols, Dummy >>> p,q = symbols('p,q', cls=Dummy) >>> print(fill(str(NO(Fd(p)*F(q)).doit()))) KroneckerDelta(_a, _p)*KroneckerDelta(_a, _q)*CreateFermion(_a)*AnnihilateFermion(_a) + KroneckerDelta(_a, _p)*KroneckerDelta(_i, _q)*CreateFermion(_a)*AnnihilateFermion(_i) - KroneckerDelta(_a, _q)*KroneckerDelta(_i, _p)*AnnihilateFermion(_a)*CreateFermion(_i) - KroneckerDelta(_i, _p)*KroneckerDelta(_i, _q)*AnnihilateFermion(_i)*CreateFermion(_i) """ if kw_args.get("remove_brackets", True): return self._remove_brackets() else: return self.__new__(type(self), self.args[0].doit(**kw_args)) def _remove_brackets(self): """ Returns the sorted string without normal order brackets. The returned string have the property that no nonzero contractions exist. """ # check if any creator is also an annihilator subslist = [] for i in self.iter_q_creators(): if self[i].is_q_annihilator: assume = self[i].state.assumptions0 # only operators with a dummy index can be split in two terms if isinstance(self[i].state, Dummy): # create indices with fermi restriction assume.pop("above_fermi", None) assume["below_fermi"] = True below = Dummy('i', **assume) assume.pop("below_fermi", None) assume["above_fermi"] = True above = Dummy('a', **assume) cls = type(self[i]) split = ( self[i].__new__(cls, below) * KroneckerDelta(below, self[i].state) + self[i].__new__(cls, above) * KroneckerDelta(above, self[i].state) ) subslist.append((self[i], split)) else: raise SubstitutionOfAmbigousOperatorFailed(self[i]) if subslist: result = NO(self.subs(subslist)) if isinstance(result, Add): return Add(*[term.doit() for term in result.args]) else: return self.args[0] def _expand_operators(self): """ Returns a sum of NO objects that contain no ambiguous q-operators. If an index q has range both above and below fermi, the operator F(q) is ambiguous in the sense that it can be both a q-creator and a q-annihilator. If q is dummy, it is assumed to be a summation variable and this method rewrites it into a sum of NO terms with unambiguous operators: {Fd(p)*F(q)} = {Fd(a)*F(b)} + {Fd(a)*F(i)} + {Fd(j)*F(b)} -{F(i)*Fd(j)} where a,b are above and i,j are below fermi level. """ return NO(self._remove_brackets) def __getitem__(self, i): if isinstance(i, slice): indices = i.indices(len(self)) return [self.args[0].args[i] for i in range(*indices)] else: return self.args[0].args[i] def __len__(self): return len(self.args[0].args) def iter_q_annihilators(self): """ Iterates over the annihilation operators. Examples ======== >>> from sympy import symbols >>> i, j = symbols('i j', below_fermi=True) >>> a, b = symbols('a b', above_fermi=True) >>> from sympy.physics.secondquant import NO, F, Fd >>> no = NO(Fd(a)*F(i)*F(b)*Fd(j)) >>> no.iter_q_creators() <generator object... at 0x...> >>> list(no.iter_q_creators()) [0, 1] >>> list(no.iter_q_annihilators()) [3, 2] """ ops = self.args[0].args iter = range(len(ops) - 1, -1, -1) for i in iter: if ops[i].is_q_annihilator: yield i else: break def iter_q_creators(self): """ Iterates over the creation operators. Examples ======== >>> from sympy import symbols >>> i, j = symbols('i j', below_fermi=True) >>> a, b = symbols('a b', above_fermi=True) >>> from sympy.physics.secondquant import NO, F, Fd >>> no = NO(Fd(a)*F(i)*F(b)*Fd(j)) >>> no.iter_q_creators() <generator object... at 0x...> >>> list(no.iter_q_creators()) [0, 1] >>> list(no.iter_q_annihilators()) [3, 2] """ ops = self.args[0].args iter = range(0, len(ops)) for i in iter: if ops[i].is_q_creator: yield i else: break def get_subNO(self, i): """ Returns a NO() without FermionicOperator at index i. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import F, NO >>> p,q,r = symbols('p,q,r') >>> NO(F(p)*F(q)*F(r)).get_subNO(1) # doctest: +SKIP NO(AnnihilateFermion(p)*AnnihilateFermion(r)) """ arg0 = self.args[0] # it's a Mul by definition of how it's created mul = arg0._new_rawargs(arg0.args[:i] + arg0.args[i + 1:]) return NO(mul) def _latex(self, printer): return "\\left\\{%s\\right\\}" % printer._print(self.args[0]) def __repr__(self): return "NO(%s)" % self.args[0] def __str__(self): return ":%s:" % self.args[0] def contraction(a, b): """ Calculates contraction of Fermionic operators a and b. Examples ======== >>> from sympy import symbols >>> from sympy.physics.secondquant import F, Fd, contraction >>> p, q = symbols('p,q') >>> a, b = symbols('a,b', above_fermi=True) >>> i, j = symbols('i,j', below_fermi=True) A contraction is non-zero only if a quasi-creator is to the right of a quasi-annihilator: >>> contraction(F(a),Fd(b)) KroneckerDelta(a, b) >>> contraction(Fd(i),F(j)) KroneckerDelta(i, j) For general indices a non-zero result restricts the indices to below/above the fermi surface: >>> contraction(Fd(p),F(q)) KroneckerDelta(_i, q)*KroneckerDelta(p, q) >>> contraction(F(p),Fd(q)) KroneckerDelta(_a, q)*KroneckerDelta(p, q) Two creators or two annihilators always vanishes: >>> contraction(F(p),F(q)) 0 >>> contraction(Fd(p),Fd(q)) 0 """ if isinstance(b, FermionicOperator) and isinstance(a, FermionicOperator): if isinstance(a, AnnihilateFermion) and isinstance(b, CreateFermion): if b.state.assumptions0.get("below_fermi"): return S.Zero if a.state.assumptions0.get("below_fermi"): return S.Zero if b.state.assumptions0.get("above_fermi"): return KroneckerDelta(a.state, b.state) if a.state.assumptions0.get("above_fermi"): return KroneckerDelta(a.state, b.state) return (KroneckerDelta(a.state, b.state)* KroneckerDelta(b.state, Dummy('a', above_fermi=True))) if isinstance(b, AnnihilateFermion) and isinstance(a, CreateFermion): if b.state.assumptions0.get("above_fermi"): return S.Zero if a.state.assumptions0.get("above_fermi"): return S.Zero if b.state.assumptions0.get("below_fermi"): return KroneckerDelta(a.state, b.state) if a.state.assumptions0.get("below_fermi"): return KroneckerDelta(a.state, b.state) return (KroneckerDelta(a.state, b.state)* KroneckerDelta(b.state, Dummy('i', below_fermi=True))) # vanish if 2xAnnihilator or 2xCreator return S.Zero else: #not fermion operators t = ( isinstance(i, FermionicOperator) for i in (a, b) ) raise ContractionAppliesOnlyToFermions(*t) def _sqkey(sq_operator): """Generates key for canonical sorting of SQ operators.""" return sq_operator._sortkey() def _sort_anticommuting_fermions(string1, key=_sqkey): """Sort fermionic operators to canonical order, assuming all pairs anticommute. Uses a bidirectional bubble sort. Items in string1 are not referenced so in principle they may be any comparable objects. The sorting depends on the operators '>' and '=='. If the Pauli principle is violated, an exception is raised. Returns ======= tuple (sorted_str, sign) sorted_str: list containing the sorted operators sign: int telling how many times the sign should be changed (if sign==0 the string was already sorted) """ verified = False sign = 0 rng = list(range(len(string1) - 1)) rev = list(range(len(string1) - 3, -1, -1)) keys = list(map(key, string1)) key_val = dict(list(zip(keys, string1))) while not verified: verified = True for i in rng: left = keys[i] right = keys[i + 1] if left == right: raise ViolationOfPauliPrinciple([left, right]) if left > right: verified = False keys[i:i + 2] = [right, left] sign = sign + 1 if verified: break for i in rev: left = keys[i] right = keys[i + 1] if left == right: raise ViolationOfPauliPrinciple([left, right]) if left > right: verified = False keys[i:i + 2] = [right, left] sign = sign + 1 string1 = [ key_val[k] for k in keys ] return (string1, sign) def evaluate_deltas(e): """ We evaluate KroneckerDelta symbols in the expression assuming Einstein summation. If one index is repeated it is summed over and in effect substituted with the other one. If both indices are repeated we substitute according to what is the preferred index. this is determined by KroneckerDelta.preferred_index and KroneckerDelta.killable_index. In case there are no possible substitutions or if a substitution would imply a loss of information, nothing is done. In case an index appears in more than one KroneckerDelta, the resulting substitution depends on the order of the factors. Since the ordering is platform dependent, the literal expression resulting from this function may be hard to predict. Examples ======== We assume the following: >>> from sympy import symbols, Function, Dummy, KroneckerDelta >>> from sympy.physics.secondquant import evaluate_deltas >>> i,j = symbols('i j', below_fermi=True, cls=Dummy) >>> a,b = symbols('a b', above_fermi=True, cls=Dummy) >>> p,q = symbols('p q', cls=Dummy) >>> f = Function('f') >>> t = Function('t') The order of preference for these indices according to KroneckerDelta is (a, b, i, j, p, q). Trivial cases: >>> evaluate_deltas(KroneckerDelta(i,j)*f(i)) # d_ij f(i) -> f(j) f(_j) >>> evaluate_deltas(KroneckerDelta(i,j)*f(j)) # d_ij f(j) -> f(i) f(_i) >>> evaluate_deltas(KroneckerDelta(i,p)*f(p)) # d_ip f(p) -> f(i) f(_i) >>> evaluate_deltas(KroneckerDelta(q,p)*f(p)) # d_qp f(p) -> f(q) f(_q) >>> evaluate_deltas(KroneckerDelta(q,p)*f(q)) # d_qp f(q) -> f(p) f(_p) More interesting cases: >>> evaluate_deltas(KroneckerDelta(i,p)*t(a,i)*f(p,q)) f(_i, _q)*t(_a, _i) >>> evaluate_deltas(KroneckerDelta(a,p)*t(a,i)*f(p,q)) f(_a, _q)*t(_a, _i) >>> evaluate_deltas(KroneckerDelta(p,q)*f(p,q)) f(_p, _p) Finally, here are some cases where nothing is done, because that would imply a loss of information: >>> evaluate_deltas(KroneckerDelta(i,p)*f(q)) f(_q)*KroneckerDelta(_i, _p) >>> evaluate_deltas(KroneckerDelta(i,p)*f(i)) f(_i)*KroneckerDelta(_i, _p) """ # We treat Deltas only in mul objects # for general function objects we don't evaluate KroneckerDeltas in arguments, # but here we hard code exceptions to this rule accepted_functions = ( Add, ) if isinstance(e, accepted_functions): return e.func(*[evaluate_deltas(arg) for arg in e.args]) elif isinstance(e, Mul): # find all occurrences of delta function and count each index present in # expression. deltas = [] indices = {} for i in e.args: for s in i.free_symbols: if s in indices: indices[s] += 1 else: indices[s] = 0 # geek counting simplifies logic below if isinstance(i, KroneckerDelta): deltas.append(i) for d in deltas: # If we do something, and there are more deltas, we should recurse # to treat the resulting expression properly if d.killable_index.is_Symbol and indices[d.killable_index]: e = e.subs(d.killable_index, d.preferred_index) if len(deltas) > 1: return evaluate_deltas(e) elif (d.preferred_index.is_Symbol and indices[d.preferred_index] and d.indices_contain_equal_information): e = e.subs(d.preferred_index, d.killable_index) if len(deltas) > 1: return evaluate_deltas(e) else: pass return e # nothing to do, maybe we hit a Symbol or a number else: return e def substitute_dummies(expr, new_indices=False, pretty_indices={}): """ Collect terms by substitution of dummy variables. This routine allows simplification of Add expressions containing terms which differ only due to dummy variables. The idea is to substitute all dummy variables consistently depending on the structure of the term. For each term, we obtain a sequence of all dummy variables, where the order is determined by the index range, what factors the index belongs to and its position in each factor. See _get_ordered_dummies() for more information about the sorting of dummies. The index sequence is then substituted consistently in each term. Examples ======== >>> from sympy import symbols, Function, Dummy >>> from sympy.physics.secondquant import substitute_dummies >>> a,b,c,d = symbols('a b c d', above_fermi=True, cls=Dummy) >>> i,j = symbols('i j', below_fermi=True, cls=Dummy) >>> f = Function('f') >>> expr = f(a,b) + f(c,d); expr f(_a, _b) + f(_c, _d) Since a, b, c and d are equivalent summation indices, the expression can be simplified to a single term (for which the dummy indices are still summed over) >>> substitute_dummies(expr) 2*f(_a, _b) Controlling output: By default the dummy symbols that are already present in the expression will be reused in a different permutation. However, if new_indices=True, new dummies will be generated and inserted. The keyword 'pretty_indices' can be used to control this generation of new symbols. By default the new dummies will be generated on the form i_1, i_2, a_1, etc. If you supply a dictionary with key:value pairs in the form: { index_group: string_of_letters } The letters will be used as labels for the new dummy symbols. The index_groups must be one of 'above', 'below' or 'general'. >>> expr = f(a,b,i,j) >>> my_dummies = { 'above':'st', 'below':'uv' } >>> substitute_dummies(expr, new_indices=True, pretty_indices=my_dummies) f(_s, _t, _u, _v) If we run out of letters, or if there is no keyword for some index_group the default dummy generator will be used as a fallback: >>> p,q = symbols('p q', cls=Dummy) # general indices >>> expr = f(p,q) >>> substitute_dummies(expr, new_indices=True, pretty_indices=my_dummies) f(_p_0, _p_1) """ # setup the replacing dummies if new_indices: letters_above = pretty_indices.get('above', "") letters_below = pretty_indices.get('below', "") letters_general = pretty_indices.get('general', "") len_above = len(letters_above) len_below = len(letters_below) len_general = len(letters_general) def _i(number): try: return letters_below[number] except IndexError: return 'i_' + str(number - len_below) def _a(number): try: return letters_above[number] except IndexError: return 'a_' + str(number - len_above) def _p(number): try: return letters_general[number] except IndexError: return 'p_' + str(number - len_general) aboves = [] belows = [] generals = [] dummies = expr.atoms(Dummy) if not new_indices: dummies = sorted(dummies, key=default_sort_key) # generate lists with the dummies we will insert a = i = p = 0 for d in dummies: assum = d.assumptions0 if assum.get("above_fermi"): if new_indices: sym = _a(a) a += 1 l1 = aboves elif assum.get("below_fermi"): if new_indices: sym = _i(i) i += 1 l1 = belows else: if new_indices: sym = _p(p) p += 1 l1 = generals if new_indices: l1.append(Dummy(sym, **assum)) else: l1.append(d) expr = expr.expand() terms = Add.make_args(expr) new_terms = [] for term in terms: i = iter(belows) a = iter(aboves) p = iter(generals) ordered = _get_ordered_dummies(term) subsdict = {} for d in ordered: if d.assumptions0.get('below_fermi'): subsdict[d] = next(i) elif d.assumptions0.get('above_fermi'): subsdict[d] = next(a) else: subsdict[d] = next(p) subslist = [] final_subs = [] for k, v in subsdict.items(): if k == v: continue if v in subsdict: # We check if the sequence of substitutions end quickly. In # that case, we can avoid temporary symbols if we ensure the # correct substitution order. if subsdict[v] in subsdict: # (x, y) -> (y, x), we need a temporary variable x = Dummy('x') subslist.append((k, x)) final_subs.append((x, v)) else: # (x, y) -> (y, a), x->y must be done last # but before temporary variables are resolved final_subs.insert(0, (k, v)) else: subslist.append((k, v)) subslist.extend(final_subs) new_terms.append(term.subs(subslist)) return Add(*new_terms) class KeyPrinter(StrPrinter): """Printer for which only equal objects are equal in print""" def _print_Dummy(self, expr): return "(%s_%i)" % (expr.name, expr.dummy_index) def __kprint(expr): p = KeyPrinter() return p.doprint(expr) def _get_ordered_dummies(mul, verbose=False): """Returns all dummies in the mul sorted in canonical order The purpose of the canonical ordering is that dummies can be substituted consistently across terms with the result that equivalent terms can be simplified. It is not possible to determine if two terms are equivalent based solely on the dummy order. However, a consistent substitution guided by the ordered dummies should lead to trivially (non-)equivalent terms, thereby revealing the equivalence. This also means that if two terms have identical sequences of dummies, the (non-)equivalence should already be apparent. Strategy -------- The canoncial order is given by an arbitrary sorting rule. A sort key is determined for each dummy as a tuple that depends on all factors where the index is present. The dummies are thereby sorted according to the contraction structure of the term, instead of sorting based solely on the dummy symbol itself. After all dummies in the term has been assigned a key, we check for identical keys, i.e. unorderable dummies. If any are found, we call a specialized method, _determine_ambiguous(), that will determine a unique order based on recursive calls to _get_ordered_dummies(). Key description --------------- A high level description of the sort key: 1. Range of the dummy index 2. Relation to external (non-dummy) indices 3. Position of the index in the first factor 4. Position of the index in the second factor The sort key is a tuple with the following components: 1. A single character indicating the range of the dummy (above, below or general.) 2. A list of strings with fully masked string representations of all factors where the dummy is present. By masked, we mean that dummies are represented by a symbol to indicate either below fermi, above or general. No other information is displayed about the dummies at this point. The list is sorted stringwise. 3. An integer number indicating the position of the index, in the first factor as sorted in 2. 4. An integer number indicating the position of the index, in the second factor as sorted in 2. If a factor is either of type AntiSymmetricTensor or SqOperator, the index position in items 3 and 4 is indicated as 'upper' or 'lower' only. (Creation operators are considered upper and annihilation operators lower.) If the masked factors are identical, the two factors cannot be ordered unambiguously in item 2. In this case, items 3, 4 are left out. If several indices are contracted between the unorderable factors, it will be handled by _determine_ambiguous() """ # setup dicts to avoid repeated calculations in key() args = Mul.make_args(mul) fac_dum = dict([ (fac, fac.atoms(Dummy)) for fac in args] ) fac_repr = dict([ (fac, __kprint(fac)) for fac in args] ) all_dums = set().union(*fac_dum.values()) mask = {} for d in all_dums: if d.assumptions0.get('below_fermi'): mask[d] = '0' elif d.assumptions0.get('above_fermi'): mask[d] = '1' else: mask[d] = '2' dum_repr = {d: __kprint(d) for d in all_dums} def _key(d): dumstruct = [ fac for fac in fac_dum if d in fac_dum[fac] ] other_dums = set().union(*[fac_dum[fac] for fac in dumstruct]) fac = dumstruct[-1] if other_dums is fac_dum[fac]: other_dums = fac_dum[fac].copy() other_dums.remove(d) masked_facs = [ fac_repr[fac] for fac in dumstruct ] for d2 in other_dums: masked_facs = [ fac.replace(dum_repr[d2], mask[d2]) for fac in masked_facs ] all_masked = [ fac.replace(dum_repr[d], mask[d]) for fac in masked_facs ] masked_facs = dict(list(zip(dumstruct, masked_facs))) # dummies for which the ordering cannot be determined if has_dups(all_masked): all_masked.sort() return mask[d], tuple(all_masked) # positions are ambiguous # sort factors according to fully masked strings keydict = dict(list(zip(dumstruct, all_masked))) dumstruct.sort(key=lambda x: keydict[x]) all_masked.sort() pos_val = [] for fac in dumstruct: if isinstance(fac, AntiSymmetricTensor): if d in fac.upper: pos_val.append('u') if d in fac.lower: pos_val.append('l') elif isinstance(fac, Creator): pos_val.append('u') elif isinstance(fac, Annihilator): pos_val.append('l') elif isinstance(fac, NO): ops = [ op for op in fac if op.has(d) ] for op in ops: if isinstance(op, Creator): pos_val.append('u') else: pos_val.append('l') else: # fallback to position in string representation facpos = -1 while 1: facpos = masked_facs[fac].find(dum_repr[d], facpos + 1) if facpos == -1: break pos_val.append(facpos) return (mask[d], tuple(all_masked), pos_val[0], pos_val[-1]) dumkey = dict(list(zip(all_dums, list(map(_key, all_dums))))) result = sorted(all_dums, key=lambda x: dumkey[x]) if has_dups(iter(dumkey.values())): # We have ambiguities unordered = defaultdict(set) for d, k in dumkey.items(): unordered[k].add(d) for k in [ k for k in unordered if len(unordered[k]) < 2 ]: del unordered[k] unordered = [ unordered[k] for k in sorted(unordered) ] result = _determine_ambiguous(mul, result, unordered) return result def _determine_ambiguous(term, ordered, ambiguous_groups): # We encountered a term for which the dummy substitution is ambiguous. # This happens for terms with 2 or more contractions between factors that # cannot be uniquely ordered independent of summation indices. For # example: # # Sum(p, q) v^{p, .}_{q, .}v^{q, .}_{p, .} # # Assuming that the indices represented by . are dummies with the # same range, the factors cannot be ordered, and there is no # way to determine a consistent ordering of p and q. # # The strategy employed here, is to relabel all unambiguous dummies with # non-dummy symbols and call _get_ordered_dummies again. This procedure is # applied to the entire term so there is a possibility that # _determine_ambiguous() is called again from a deeper recursion level. # break recursion if there are no ordered dummies all_ambiguous = set() for dummies in ambiguous_groups: all_ambiguous |= dummies all_ordered = set(ordered) - all_ambiguous if not all_ordered: # FIXME: If we arrive here, there are no ordered dummies. A method to # handle this needs to be implemented. In order to return something # useful nevertheless, we choose arbitrarily the first dummy and # determine the rest from this one. This method is dependent on the # actual dummy labels which violates an assumption for the # canonicalization procedure. A better implementation is needed. group = [ d for d in ordered if d in ambiguous_groups[0] ] d = group[0] all_ordered.add(d) ambiguous_groups[0].remove(d) stored_counter = _symbol_factory._counter subslist = [] for d in [ d for d in ordered if d in all_ordered ]: nondum = _symbol_factory._next() subslist.append((d, nondum)) newterm = term.subs(subslist) neworder = _get_ordered_dummies(newterm) _symbol_factory._set_counter(stored_counter) # update ordered list with new information for group in ambiguous_groups: ordered_group = [ d for d in neworder if d in group ] ordered_group.reverse() result = [] for d in ordered: if d in group: result.append(ordered_group.pop()) else: result.append(d) ordered = result return ordered class _SymbolFactory(object): def __init__(self, label): self._counterVar = 0 self._label = label def _set_counter(self, value): """ Sets counter to value. """ self._counterVar = value @property def _counter(self): """ What counter is currently at. """ return self._counterVar def _next(self): """ Generates the next symbols and increments counter by 1. """ s = Symbol("%s%i" % (self._label, self._counterVar)) self._counterVar += 1 return s _symbol_factory = _SymbolFactory('_]"]_') # most certainly a unique label @cacheit def _get_contractions(string1, keep_only_fully_contracted=False): """ Returns Add-object with contracted terms. Uses recursion to find all contractions. -- Internal helper function -- Will find nonzero contractions in string1 between indices given in leftrange and rightrange. """ # Should we store current level of contraction? if keep_only_fully_contracted and string1: result = [] else: result = [NO(Mul(*string1))] for i in range(len(string1) - 1): for j in range(i + 1, len(string1)): c = contraction(string1[i], string1[j]) if c: sign = (j - i + 1) % 2 if sign: coeff = S.NegativeOne*c else: coeff = c # # Call next level of recursion # ============================ # # We now need to find more contractions among operators # # oplist = string1[:i]+ string1[i+1:j] + string1[j+1:] # # To prevent overcounting, we don't allow contractions # we have already encountered. i.e. contractions between # string1[:i] <---> string1[i+1:j] # and string1[:i] <---> string1[j+1:]. # # This leaves the case: oplist = string1[i + 1:j] + string1[j + 1:] if oplist: result.append(coeff*NO( Mul(*string1[:i])*_get_contractions( oplist, keep_only_fully_contracted=keep_only_fully_contracted))) else: result.append(coeff*NO( Mul(*string1[:i]))) if keep_only_fully_contracted: break # next iteration over i leaves leftmost operator string1[0] uncontracted return Add(*result) def wicks(e, **kw_args): """ Returns the normal ordered equivalent of an expression using Wicks Theorem. Examples ======== >>> from sympy import symbols, Function, Dummy >>> from sympy.physics.secondquant import wicks, F, Fd, NO >>> p,q,r = symbols('p,q,r') >>> wicks(Fd(p)*F(q)) # doctest: +SKIP d(p, q)*d(q, _i) + NO(CreateFermion(p)*AnnihilateFermion(q)) By default, the expression is expanded: >>> wicks(F(p)*(F(q)+F(r))) # doctest: +SKIP NO(AnnihilateFermion(p)*AnnihilateFermion(q)) + NO( AnnihilateFermion(p)*AnnihilateFermion(r)) With the keyword 'keep_only_fully_contracted=True', only fully contracted terms are returned. By request, the result can be simplified in the following order: -- KroneckerDelta functions are evaluated -- Dummy variables are substituted consistently across terms >>> p, q, r = symbols('p q r', cls=Dummy) >>> wicks(Fd(p)*(F(q)+F(r)), keep_only_fully_contracted=True) # doctest: +SKIP KroneckerDelta(_i, _q)*KroneckerDelta( _p, _q) + KroneckerDelta(_i, _r)*KroneckerDelta(_p, _r) """ if not e: return S.Zero opts = { 'simplify_kronecker_deltas': False, 'expand': True, 'simplify_dummies': False, 'keep_only_fully_contracted': False } opts.update(kw_args) # check if we are already normally ordered if isinstance(e, NO): if opts['keep_only_fully_contracted']: return S.Zero else: return e elif isinstance(e, FermionicOperator): if opts['keep_only_fully_contracted']: return S.Zero else: return e # break up any NO-objects, and evaluate commutators e = e.doit(wicks=True) # make sure we have only one term to consider e = e.expand() if isinstance(e, Add): if opts['simplify_dummies']: return substitute_dummies(Add(*[ wicks(term, **kw_args) for term in e.args])) else: return Add(*[ wicks(term, **kw_args) for term in e.args]) # For Mul-objects we can actually do something if isinstance(e, Mul): # we don't want to mess around with commuting part of Mul # so we factorize it out before starting recursion c_part = [] string1 = [] for factor in e.args: if factor.is_commutative: c_part.append(factor) else: string1.append(factor) n = len(string1) # catch trivial cases if n == 0: result = e elif n == 1: if opts['keep_only_fully_contracted']: return S.Zero else: result = e else: # non-trivial if isinstance(string1[0], BosonicOperator): raise NotImplementedError string1 = tuple(string1) # recursion over higher order contractions result = _get_contractions(string1, keep_only_fully_contracted=opts['keep_only_fully_contracted'] ) result = Mul(*c_part)*result if opts['expand']: result = result.expand() if opts['simplify_kronecker_deltas']: result = evaluate_deltas(result) return result # there was nothing to do return e class PermutationOperator(Expr): """ Represents the index permutation operator P(ij). P(ij)*f(i)*g(j) = f(i)*g(j) - f(j)*g(i) """ is_commutative = True def __new__(cls, i, j): i, j = sorted(map(sympify, (i, j)), key=default_sort_key) obj = Basic.__new__(cls, i, j) return obj def get_permuted(self, expr): """ Returns -expr with permuted indices. >>> from sympy import symbols, Function >>> from sympy.physics.secondquant import PermutationOperator >>> p,q = symbols('p,q') >>> f = Function('f') >>> PermutationOperator(p,q).get_permuted(f(p,q)) -f(q, p) """ i = self.args[0] j = self.args[1] if expr.has(i) and expr.has(j): tmp = Dummy() expr = expr.subs(i, tmp) expr = expr.subs(j, i) expr = expr.subs(tmp, j) return S.NegativeOne*expr else: return expr def _latex(self, printer): return "P(%s%s)" % self.args def simplify_index_permutations(expr, permutation_operators): """ Performs simplification by introducing PermutationOperators where appropriate. Schematically: [abij] - [abji] - [baij] + [baji] -> P(ab)*P(ij)*[abij] permutation_operators is a list of PermutationOperators to consider. If permutation_operators=[P(ab),P(ij)] we will try to introduce the permutation operators P(ij) and P(ab) in the expression. If there are other possible simplifications, we ignore them. >>> from sympy import symbols, Function >>> from sympy.physics.secondquant import simplify_index_permutations >>> from sympy.physics.secondquant import PermutationOperator >>> p,q,r,s = symbols('p,q,r,s') >>> f = Function('f') >>> g = Function('g') >>> expr = f(p)*g(q) - f(q)*g(p); expr f(p)*g(q) - f(q)*g(p) >>> simplify_index_permutations(expr,[PermutationOperator(p,q)]) f(p)*g(q)*PermutationOperator(p, q) >>> PermutList = [PermutationOperator(p,q),PermutationOperator(r,s)] >>> expr = f(p,r)*g(q,s) - f(q,r)*g(p,s) + f(q,s)*g(p,r) - f(p,s)*g(q,r) >>> simplify_index_permutations(expr,PermutList) f(p, r)*g(q, s)*PermutationOperator(p, q)*PermutationOperator(r, s) """ def _get_indices(expr, ind): """ Collects indices recursively in predictable order. """ result = [] for arg in expr.args: if arg in ind: result.append(arg) else: if arg.args: result.extend(_get_indices(arg, ind)) return result def _choose_one_to_keep(a, b, ind): # we keep the one where indices in ind are in order ind[0] < ind[1] return min(a, b, key=lambda x: default_sort_key(_get_indices(x, ind))) expr = expr.expand() if isinstance(expr, Add): terms = set(expr.args) for P in permutation_operators: new_terms = set([]) on_hold = set([]) while terms: term = terms.pop() permuted = P.get_permuted(term) if permuted in terms | on_hold: try: terms.remove(permuted) except KeyError: on_hold.remove(permuted) keep = _choose_one_to_keep(term, permuted, P.args) new_terms.add(P*keep) else: # Some terms must get a second chance because the permuted # term may already have canonical dummy ordering. Then # substitute_dummies() does nothing. However, the other # term, if it exists, will be able to match with us. permuted1 = permuted permuted = substitute_dummies(permuted) if permuted1 == permuted: on_hold.add(term) elif permuted in terms | on_hold: try: terms.remove(permuted) except KeyError: on_hold.remove(permuted) keep = _choose_one_to_keep(term, permuted, P.args) new_terms.add(P*keep) else: new_terms.add(term) terms = new_terms | on_hold return Add(*terms) return expr

f94fb4a65cd4c3d655626a24fa75d9d3767eb752c3d3372420ebf20814f55dc9

""" This module defines tensors with abstract index notation. The abstract index notation has been first formalized by Penrose. Tensor indices are formal objects, with a tensor type; there is no notion of index range, it is only possible to assign the dimension, used to trace the Kronecker delta; the dimension can be a Symbol. The Einstein summation convention is used. The covariant indices are indicated with a minus sign in front of the index. For instance the tensor ``t = p(a)*A(b,c)*q(-c)`` has the index ``c`` contracted. A tensor expression ``t`` can be called; called with its indices in sorted order it is equal to itself: in the above example ``t(a, b) == t``; one can call ``t`` with different indices; ``t(c, d) == p(c)*A(d,a)*q(-a)``. The contracted indices are dummy indices, internally they have no name, the indices being represented by a graph-like structure. Tensors are put in canonical form using ``canon_bp``, which uses the Butler-Portugal algorithm for canonicalization using the monoterm symmetries of the tensors. If there is a (anti)symmetric metric, the indices can be raised and lowered when the tensor is put in canonical form. """ from __future__ import print_function, division from collections import defaultdict import operator import itertools from sympy import Rational, prod, Integer from sympy.combinatorics.tensor_can import get_symmetric_group_sgs, \ bsgs_direct_product, canonicalize, riemann_bsgs from sympy.core import Basic, Expr, sympify, Add, Mul, S from sympy.core.compatibility import string_types, reduce, range, SYMPY_INTS from sympy.core.containers import Tuple, Dict from sympy.core.decorators import deprecated from sympy.core.symbol import Symbol, symbols from sympy.core.sympify import CantSympify, _sympify from sympy.core.operations import AssocOp from sympy.matrices import eye from sympy.utilities.exceptions import SymPyDeprecationWarning import warnings @deprecated(useinstead=".replace_with_arrays", issue=15276, deprecated_since_version="1.4") def deprecate_data(): pass class _IndexStructure(CantSympify): """ This class handles the indices (free and dummy ones). It contains the algorithms to manage the dummy indices replacements and contractions of free indices under multiplications of tensor expressions, as well as stuff related to canonicalization sorting, getting the permutation of the expression and so on. It also includes tools to get the ``TensorIndex`` objects corresponding to the given index structure. """ def __init__(self, free, dum, index_types, indices, canon_bp=False): self.free = free self.dum = dum self.index_types = index_types self.indices = indices self._ext_rank = len(self.free) + 2*len(self.dum) self.dum.sort(key=lambda x: x[0]) @staticmethod def from_indices(*indices): """ Create a new ``_IndexStructure`` object from a list of ``indices`` ``indices`` ``TensorIndex`` objects, the indices. Contractions are detected upon construction. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, _IndexStructure >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2, m3 = tensor_indices('m0,m1,m2,m3', Lorentz) >>> _IndexStructure.from_indices(m0, m1, -m1, m3) _IndexStructure([(m0, 0), (m3, 3)], [(1, 2)], [Lorentz, Lorentz, Lorentz, Lorentz]) """ free, dum = _IndexStructure._free_dum_from_indices(*indices) index_types = [i.tensor_index_type for i in indices] indices = _IndexStructure._replace_dummy_names(indices, free, dum) return _IndexStructure(free, dum, index_types, indices) @staticmethod def from_components_free_dum(components, free, dum): index_types = [] for component in components: index_types.extend(component.index_types) indices = _IndexStructure.generate_indices_from_free_dum_index_types(free, dum, index_types) return _IndexStructure(free, dum, index_types, indices) @staticmethod def _free_dum_from_indices(*indices): """ Convert ``indices`` into ``free``, ``dum`` for single component tensor ``free`` list of tuples ``(index, pos, 0)``, where ``pos`` is the position of index in the list of indices formed by the component tensors ``dum`` list of tuples ``(pos_contr, pos_cov, 0, 0)`` Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, \ _IndexStructure >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2, m3 = tensor_indices('m0,m1,m2,m3', Lorentz) >>> _IndexStructure._free_dum_from_indices(m0, m1, -m1, m3) ([(m0, 0), (m3, 3)], [(1, 2)]) """ n = len(indices) if n == 1: return [(indices[0], 0)], [] # find the positions of the free indices and of the dummy indices free = [True]*len(indices) index_dict = {} dum = [] for i, index in enumerate(indices): name = index._name typ = index.tensor_index_type contr = index._is_up if (name, typ) in index_dict: # found a pair of dummy indices is_contr, pos = index_dict[(name, typ)] # check consistency and update free if is_contr: if contr: raise ValueError('two equal contravariant indices in slots %d and %d' %(pos, i)) else: free[pos] = False free[i] = False else: if contr: free[pos] = False free[i] = False else: raise ValueError('two equal covariant indices in slots %d and %d' %(pos, i)) if contr: dum.append((i, pos)) else: dum.append((pos, i)) else: index_dict[(name, typ)] = index._is_up, i free = [(index, i) for i, index in enumerate(indices) if free[i]] free.sort() return free, dum def get_indices(self): """ Get a list of indices, creating new tensor indices to complete dummy indices. """ return self.indices[:] @staticmethod def generate_indices_from_free_dum_index_types(free, dum, index_types): indices = [None]*(len(free)+2*len(dum)) for idx, pos in free: indices[pos] = idx generate_dummy_name = _IndexStructure._get_generator_for_dummy_indices(free) for pos1, pos2 in dum: typ1 = index_types[pos1] indname = generate_dummy_name(typ1) indices[pos1] = TensorIndex(indname, typ1, True) indices[pos2] = TensorIndex(indname, typ1, False) return _IndexStructure._replace_dummy_names(indices, free, dum) @staticmethod def _get_generator_for_dummy_indices(free): cdt = defaultdict(int) # if the free indices have names with dummy_fmt, start with an # index higher than those for the dummy indices # to avoid name collisions for indx, ipos in free: if indx._name.split('_')[0] == indx.tensor_index_type.dummy_fmt[:-3]: cdt[indx.tensor_index_type] = max(cdt[indx.tensor_index_type], int(indx._name.split('_')[1]) + 1) def dummy_fmt_gen(tensor_index_type): fmt = tensor_index_type.dummy_fmt nd = cdt[tensor_index_type] cdt[tensor_index_type] += 1 return fmt % nd return dummy_fmt_gen @staticmethod def _replace_dummy_names(indices, free, dum): dum.sort(key=lambda x: x[0]) new_indices = [ind for ind in indices] assert len(indices) == len(free) + 2*len(dum) generate_dummy_name = _IndexStructure._get_generator_for_dummy_indices(free) for ipos1, ipos2 in dum: typ1 = new_indices[ipos1].tensor_index_type indname = generate_dummy_name(typ1) new_indices[ipos1] = TensorIndex(indname, typ1, True) new_indices[ipos2] = TensorIndex(indname, typ1, False) return new_indices def get_free_indices(self): """ Get a list of free indices. """ # get sorted indices according to their position: free = sorted(self.free, key=lambda x: x[1]) return [i[0] for i in free] def __str__(self): return "_IndexStructure({0}, {1}, {2})".format(self.free, self.dum, self.index_types) def __repr__(self): return self.__str__() def _get_sorted_free_indices_for_canon(self): sorted_free = self.free[:] sorted_free.sort(key=lambda x: x[0]) return sorted_free def _get_sorted_dum_indices_for_canon(self): return sorted(self.dum, key=lambda x: x[0]) def _get_lexicographically_sorted_index_types(self): permutation = self.indices_canon_args()[0] index_types = [None]*self._ext_rank for i, it in enumerate(self.index_types): index_types[permutation(i)] = it return index_types def _get_lexicographically_sorted_indices(self): permutation = self.indices_canon_args()[0] indices = [None]*self._ext_rank for i, it in enumerate(self.indices): indices[permutation(i)] = it return indices def perm2tensor(self, g, is_canon_bp=False): """ Returns a ``_IndexStructure`` instance corresponding to the permutation ``g`` ``g`` permutation corresponding to the tensor in the representation used in canonicalization ``is_canon_bp`` if True, then ``g`` is the permutation corresponding to the canonical form of the tensor """ sorted_free = [i[0] for i in self._get_sorted_free_indices_for_canon()] lex_index_types = self._get_lexicographically_sorted_index_types() lex_indices = self._get_lexicographically_sorted_indices() nfree = len(sorted_free) rank = self._ext_rank dum = [[None]*2 for i in range((rank - nfree)//2)] free = [] index_types = [None]*rank indices = [None]*rank for i in range(rank): gi = g[i] index_types[i] = lex_index_types[gi] indices[i] = lex_indices[gi] if gi < nfree: ind = sorted_free[gi] assert index_types[i] == sorted_free[gi].tensor_index_type free.append((ind, i)) else: j = gi - nfree idum, cov = divmod(j, 2) if cov: dum[idum][1] = i else: dum[idum][0] = i dum = [tuple(x) for x in dum] return _IndexStructure(free, dum, index_types, indices) def indices_canon_args(self): """ Returns ``(g, dummies, msym, v)``, the entries of ``canonicalize`` see ``canonicalize`` in ``tensor_can.py`` in combinatorics module """ # to be called after sorted_components from sympy.combinatorics.permutations import _af_new n = self._ext_rank g = [None]*n + [n, n+1] # ordered indices: first the free indices, ordered by types # then the dummy indices, ordered by types and contravariant before # covariant # g[position in tensor] = position in ordered indices for i, (indx, ipos) in enumerate(self._get_sorted_free_indices_for_canon()): g[ipos] = i pos = len(self.free) j = len(self.free) dummies = [] prev = None a = [] msym = [] for ipos1, ipos2 in self._get_sorted_dum_indices_for_canon(): g[ipos1] = j g[ipos2] = j + 1 j += 2 typ = self.index_types[ipos1] if typ != prev: if a: dummies.append(a) a = [pos, pos + 1] prev = typ msym.append(typ.metric_antisym) else: a.extend([pos, pos + 1]) pos += 2 if a: dummies.append(a) return _af_new(g), dummies, msym def components_canon_args(components): numtyp = [] prev = None for t in components: if t == prev: numtyp[-1][1] += 1 else: prev = t numtyp.append([prev, 1]) v = [] for h, n in numtyp: if h._comm == 0 or h._comm == 1: comm = h._comm else: comm = TensorManager.get_comm(h._comm, h._comm) v.append((h._symmetry.base, h._symmetry.generators, n, comm)) return v class _TensorDataLazyEvaluator(CantSympify): """ EXPERIMENTAL: do not rely on this class, it may change without deprecation warnings in future versions of SymPy. This object contains the logic to associate components data to a tensor expression. Components data are set via the ``.data`` property of tensor expressions, is stored inside this class as a mapping between the tensor expression and the ``ndarray``. Computations are executed lazily: whereas the tensor expressions can have contractions, tensor products, and additions, components data are not computed until they are accessed by reading the ``.data`` property associated to the tensor expression. """ _substitutions_dict = dict() _substitutions_dict_tensmul = dict() def __getitem__(self, key): dat = self._get(key) if dat is None: return None from .array import NDimArray if not isinstance(dat, NDimArray): return dat if dat.rank() == 0: return dat[()] elif dat.rank() == 1 and len(dat) == 1: return dat[0] return dat def _get(self, key): """ Retrieve ``data`` associated with ``key``. This algorithm looks into ``self._substitutions_dict`` for all ``TensorHead`` in the ``TensExpr`` (or just ``TensorHead`` if key is a TensorHead instance). It reconstructs the components data that the tensor expression should have by performing on components data the operations that correspond to the abstract tensor operations applied. Metric tensor is handled in a different manner: it is pre-computed in ``self._substitutions_dict_tensmul``. """ if key in self._substitutions_dict: return self._substitutions_dict[key] if isinstance(key, TensorHead): return None if isinstance(key, Tensor): # special case to handle metrics. Metric tensors cannot be # constructed through contraction by the metric, their # components show if they are a matrix or its inverse. signature = tuple([i.is_up for i in key.get_indices()]) srch = (key.component,) + signature if srch in self._substitutions_dict_tensmul: return self._substitutions_dict_tensmul[srch] array_list = [self.data_from_tensor(key)] return self.data_contract_dum(array_list, key.dum, key.ext_rank) if isinstance(key, TensMul): tensmul_args = key.args if len(tensmul_args) == 1 and len(tensmul_args[0].components) == 1: # special case to handle metrics. Metric tensors cannot be # constructed through contraction by the metric, their # components show if they are a matrix or its inverse. signature = tuple([i.is_up for i in tensmul_args[0].get_indices()]) srch = (tensmul_args[0].components[0],) + signature if srch in self._substitutions_dict_tensmul: return self._substitutions_dict_tensmul[srch] #data_list = [self.data_from_tensor(i) for i in tensmul_args if isinstance(i, TensExpr)] data_list = [self.data_from_tensor(i) if isinstance(i, Tensor) else i.data for i in tensmul_args if isinstance(i, TensExpr)] coeff = prod([i for i in tensmul_args if not isinstance(i, TensExpr)]) if all([i is None for i in data_list]): return None if any([i is None for i in data_list]): raise ValueError("Mixing tensors with associated components "\ "data with tensors without components data") data_result = self.data_contract_dum(data_list, key.dum, key.ext_rank) return coeff*data_result if isinstance(key, TensAdd): data_list = [] free_args_list = [] for arg in key.args: if isinstance(arg, TensExpr): data_list.append(arg.data) free_args_list.append([x[0] for x in arg.free]) else: data_list.append(arg) free_args_list.append([]) if all([i is None for i in data_list]): return None if any([i is None for i in data_list]): raise ValueError("Mixing tensors with associated components "\ "data with tensors without components data") sum_list = [] from .array import permutedims for data, free_args in zip(data_list, free_args_list): if len(free_args) < 2: sum_list.append(data) else: free_args_pos = {y: x for x, y in enumerate(free_args)} axes = [free_args_pos[arg] for arg in key.free_args] sum_list.append(permutedims(data, axes)) return reduce(lambda x, y: x+y, sum_list) return None @staticmethod def data_contract_dum(ndarray_list, dum, ext_rank): from .array import tensorproduct, tensorcontraction, MutableDenseNDimArray arrays = list(map(MutableDenseNDimArray, ndarray_list)) prodarr = tensorproduct(*arrays) return tensorcontraction(prodarr, *dum) def data_tensorhead_from_tensmul(self, data, tensmul, tensorhead): """ This method is used when assigning components data to a ``TensMul`` object, it converts components data to a fully contravariant ndarray, which is then stored according to the ``TensorHead`` key. """ if data is None: return None return self._correct_signature_from_indices( data, tensmul.get_indices(), tensmul.free, tensmul.dum, True) def data_from_tensor(self, tensor): """ This method corrects the components data to the right signature (covariant/contravariant) using the metric associated with each ``TensorIndexType``. """ tensorhead = tensor.component if tensorhead.data is None: return None return self._correct_signature_from_indices( tensorhead.data, tensor.get_indices(), tensor.free, tensor.dum) def _assign_data_to_tensor_expr(self, key, data): if isinstance(key, TensAdd): raise ValueError('cannot assign data to TensAdd') # here it is assumed that `key` is a `TensMul` instance. if len(key.components) != 1: raise ValueError('cannot assign data to TensMul with multiple components') tensorhead = key.components[0] newdata = self.data_tensorhead_from_tensmul(data, key, tensorhead) return tensorhead, newdata def _check_permutations_on_data(self, tens, data): from .array import permutedims if isinstance(tens, TensorHead): rank = tens.rank generators = tens.symmetry.generators elif isinstance(tens, Tensor): rank = tens.rank generators = tens.components[0].symmetry.generators elif isinstance(tens, TensorIndexType): rank = tens.metric.rank generators = tens.metric.symmetry.generators # Every generator is a permutation, check that by permuting the array # by that permutation, the array will be the same, except for a # possible sign change if the permutation admits it. for gener in generators: sign_change = +1 if (gener(rank) == rank) else -1 data_swapped = data last_data = data permute_axes = list(map(gener, list(range(rank)))) # the order of a permutation is the number of times to get the # identity by applying that permutation. for i in range(gener.order()-1): data_swapped = permutedims(data_swapped, permute_axes) # if any value in the difference array is non-zero, raise an error: if any(last_data - sign_change*data_swapped): raise ValueError("Component data symmetry structure error") last_data = data_swapped def __setitem__(self, key, value): """ Set the components data of a tensor object/expression. Components data are transformed to the all-contravariant form and stored with the corresponding ``TensorHead`` object. If a ``TensorHead`` object cannot be uniquely identified, it will raise an error. """ data = _TensorDataLazyEvaluator.parse_data(value) self._check_permutations_on_data(key, data) # TensorHead and TensorIndexType can be assigned data directly, while # TensMul must first convert data to a fully contravariant form, and # assign it to its corresponding TensorHead single component. if not isinstance(key, (TensorHead, TensorIndexType)): key, data = self._assign_data_to_tensor_expr(key, data) if isinstance(key, TensorHead): for dim, indextype in zip(data.shape, key.index_types): if indextype.data is None: raise ValueError("index type {} has no components data"\ " associated (needed to raise/lower index)".format(indextype)) if indextype.dim is None: continue if dim != indextype.dim: raise ValueError("wrong dimension of ndarray") self._substitutions_dict[key] = data def __delitem__(self, key): del self._substitutions_dict[key] def __contains__(self, key): return key in self._substitutions_dict def add_metric_data(self, metric, data): """ Assign data to the ``metric`` tensor. The metric tensor behaves in an anomalous way when raising and lowering indices. A fully covariant metric is the inverse transpose of the fully contravariant metric (it is meant matrix inverse). If the metric is symmetric, the transpose is not necessary and mixed covariant/contravariant metrics are Kronecker deltas. """ # hard assignment, data should not be added to `TensorHead` for metric: # the problem with `TensorHead` is that the metric is anomalous, i.e. # raising and lowering the index means considering the metric or its # inverse, this is not the case for other tensors. self._substitutions_dict_tensmul[metric, True, True] = data inverse_transpose = self.inverse_transpose_matrix(data) # in symmetric spaces, the transpose is the same as the original matrix, # the full covariant metric tensor is the inverse transpose, so this # code will be able to handle non-symmetric metrics. self._substitutions_dict_tensmul[metric, False, False] = inverse_transpose # now mixed cases, these are identical to the unit matrix if the metric # is symmetric. m = data.tomatrix() invt = inverse_transpose.tomatrix() self._substitutions_dict_tensmul[metric, True, False] = m * invt self._substitutions_dict_tensmul[metric, False, True] = invt * m @staticmethod def _flip_index_by_metric(data, metric, pos): from .array import tensorproduct, tensorcontraction mdim = metric.rank() ddim = data.rank() if pos == 0: data = tensorcontraction( tensorproduct( metric, data ), (1, mdim+pos) ) else: data = tensorcontraction( tensorproduct( data, metric ), (pos, ddim) ) return data @staticmethod def inverse_matrix(ndarray): m = ndarray.tomatrix().inv() return _TensorDataLazyEvaluator.parse_data(m) @staticmethod def inverse_transpose_matrix(ndarray): m = ndarray.tomatrix().inv().T return _TensorDataLazyEvaluator.parse_data(m) @staticmethod def _correct_signature_from_indices(data, indices, free, dum, inverse=False): """ Utility function to correct the values inside the components data ndarray according to whether indices are covariant or contravariant. It uses the metric matrix to lower values of covariant indices. """ # change the ndarray values according covariantness/contravariantness of the indices # use the metric for i, indx in enumerate(indices): if not indx.is_up and not inverse: data = _TensorDataLazyEvaluator._flip_index_by_metric(data, indx.tensor_index_type.data, i) elif not indx.is_up and inverse: data = _TensorDataLazyEvaluator._flip_index_by_metric( data, _TensorDataLazyEvaluator.inverse_matrix(indx.tensor_index_type.data), i ) return data @staticmethod def _sort_data_axes(old, new): from .array import permutedims new_data = old.data.copy() old_free = [i[0] for i in old.free] new_free = [i[0] for i in new.free] for i in range(len(new_free)): for j in range(i, len(old_free)): if old_free[j] == new_free[i]: old_free[i], old_free[j] = old_free[j], old_free[i] new_data = permutedims(new_data, (i, j)) break return new_data @staticmethod def add_rearrange_tensmul_parts(new_tensmul, old_tensmul): def sorted_compo(): return _TensorDataLazyEvaluator._sort_data_axes(old_tensmul, new_tensmul) _TensorDataLazyEvaluator._substitutions_dict[new_tensmul] = sorted_compo() @staticmethod def parse_data(data): """ Transform ``data`` to array. The parameter ``data`` may contain data in various formats, e.g. nested lists, sympy ``Matrix``, and so on. Examples ======== >>> from sympy.tensor.tensor import _TensorDataLazyEvaluator >>> _TensorDataLazyEvaluator.parse_data([1, 3, -6, 12]) [1, 3, -6, 12] >>> _TensorDataLazyEvaluator.parse_data([[1, 2], [4, 7]]) [[1, 2], [4, 7]] """ from .array import MutableDenseNDimArray if not isinstance(data, MutableDenseNDimArray): if len(data) == 2 and hasattr(data[0], '__call__'): data = MutableDenseNDimArray(data[0], data[1]) else: data = MutableDenseNDimArray(data) return data _tensor_data_substitution_dict = _TensorDataLazyEvaluator() class _TensorManager(object): """ Class to manage tensor properties. Notes ===== Tensors belong to tensor commutation groups; each group has a label ``comm``; there are predefined labels: ``0`` tensors commuting with any other tensor ``1`` tensors anticommuting among themselves ``2`` tensors not commuting, apart with those with ``comm=0`` Other groups can be defined using ``set_comm``; tensors in those groups commute with those with ``comm=0``; by default they do not commute with any other group. """ def __init__(self): self._comm_init() def _comm_init(self): self._comm = [{} for i in range(3)] for i in range(3): self._comm[0][i] = 0 self._comm[i][0] = 0 self._comm[1][1] = 1 self._comm[2][1] = None self._comm[1][2] = None self._comm_symbols2i = {0:0, 1:1, 2:2} self._comm_i2symbol = {0:0, 1:1, 2:2} @property def comm(self): return self._comm def comm_symbols2i(self, i): """ get the commutation group number corresponding to ``i`` ``i`` can be a symbol or a number or a string If ``i`` is not already defined its commutation group number is set. """ if i not in self._comm_symbols2i: n = len(self._comm) self._comm.append({}) self._comm[n][0] = 0 self._comm[0][n] = 0 self._comm_symbols2i[i] = n self._comm_i2symbol[n] = i return n return self._comm_symbols2i[i] def comm_i2symbol(self, i): """ Returns the symbol corresponding to the commutation group number. """ return self._comm_i2symbol[i] def set_comm(self, i, j, c): """ set the commutation parameter ``c`` for commutation groups ``i, j`` Parameters ========== i, j : symbols representing commutation groups c : group commutation number Notes ===== ``i, j`` can be symbols, strings or numbers, apart from ``0, 1`` and ``2`` which are reserved respectively for commuting, anticommuting tensors and tensors not commuting with any other group apart with the commuting tensors. For the remaining cases, use this method to set the commutation rules; by default ``c=None``. The group commutation number ``c`` is assigned in correspondence to the group commutation symbols; it can be 0 commuting 1 anticommuting None no commutation property Examples ======== ``G`` and ``GH`` do not commute with themselves and commute with each other; A is commuting. >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead, TensorManager >>> Lorentz = TensorIndexType('Lorentz') >>> i0,i1,i2,i3,i4 = tensor_indices('i0:5', Lorentz) >>> A = tensorhead('A', [Lorentz], [[1]]) >>> G = tensorhead('G', [Lorentz], [[1]], 'Gcomm') >>> GH = tensorhead('GH', [Lorentz], [[1]], 'GHcomm') >>> TensorManager.set_comm('Gcomm', 'GHcomm', 0) >>> (GH(i1)*G(i0)).canon_bp() G(i0)*GH(i1) >>> (G(i1)*G(i0)).canon_bp() G(i1)*G(i0) >>> (G(i1)*A(i0)).canon_bp() A(i0)*G(i1) """ if c not in (0, 1, None): raise ValueError('`c` can assume only the values 0, 1 or None') if i not in self._comm_symbols2i: n = len(self._comm) self._comm.append({}) self._comm[n][0] = 0 self._comm[0][n] = 0 self._comm_symbols2i[i] = n self._comm_i2symbol[n] = i if j not in self._comm_symbols2i: n = len(self._comm) self._comm.append({}) self._comm[0][n] = 0 self._comm[n][0] = 0 self._comm_symbols2i[j] = n self._comm_i2symbol[n] = j ni = self._comm_symbols2i[i] nj = self._comm_symbols2i[j] self._comm[ni][nj] = c self._comm[nj][ni] = c def set_comms(self, *args): """ set the commutation group numbers ``c`` for symbols ``i, j`` Parameters ========== args : sequence of ``(i, j, c)`` """ for i, j, c in args: self.set_comm(i, j, c) def get_comm(self, i, j): """ Return the commutation parameter for commutation group numbers ``i, j`` see ``_TensorManager.set_comm`` """ return self._comm[i].get(j, 0 if i == 0 or j == 0 else None) def clear(self): """ Clear the TensorManager. """ self._comm_init() TensorManager = _TensorManager() class TensorIndexType(Basic): """ A TensorIndexType is characterized by its name and its metric. Parameters ========== name : name of the tensor type metric : metric symmetry or metric object or ``None`` dim : dimension, it can be a symbol or an integer or ``None`` eps_dim : dimension of the epsilon tensor dummy_fmt : name of the head of dummy indices Attributes ========== ``name`` ``metric_name`` : it is 'metric' or metric.name ``metric_antisym`` ``metric`` : the metric tensor ``delta`` : ``Kronecker delta`` ``epsilon`` : the ``Levi-Civita epsilon`` tensor ``dim`` ``eps_dim`` ``dummy_fmt`` ``data`` : (deprecated) a property to add ``ndarray`` values, to work in a specified basis. Notes ===== The ``metric`` parameter can be: ``metric = False`` symmetric metric (in Riemannian geometry) ``metric = True`` antisymmetric metric (for spinor calculus) ``metric = None`` there is no metric ``metric`` can be an object having ``name`` and ``antisym`` attributes. If there is a metric the metric is used to raise and lower indices. In the case of antisymmetric metric, the following raising and lowering conventions will be adopted: ``psi(a) = g(a, b)*psi(-b); chi(-a) = chi(b)*g(-b, -a)`` ``g(-a, b) = delta(-a, b); g(b, -a) = -delta(a, -b)`` where ``delta(-a, b) = delta(b, -a)`` is the ``Kronecker delta`` (see ``TensorIndex`` for the conventions on indices). If there is no metric it is not possible to raise or lower indices; e.g. the index of the defining representation of ``SU(N)`` is 'covariant' and the conjugate representation is 'contravariant'; for ``N > 2`` they are linearly independent. ``eps_dim`` is by default equal to ``dim``, if the latter is an integer; else it can be assigned (for use in naive dimensional regularization); if ``eps_dim`` is not an integer ``epsilon`` is ``None``. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> Lorentz.metric metric(Lorentz,Lorentz) """ def __new__(cls, name, metric=False, dim=None, eps_dim=None, dummy_fmt=None): if isinstance(name, string_types): name = Symbol(name) obj = Basic.__new__(cls, name, S.One if metric else S.Zero) obj._name = str(name) if not dummy_fmt: obj._dummy_fmt = '%s_%%d' % obj.name else: obj._dummy_fmt = '%s_%%d' % dummy_fmt if metric is None: obj.metric_antisym = None obj.metric = None else: if metric in (True, False, 0, 1): metric_name = 'metric' obj.metric_antisym = metric else: metric_name = metric.name obj.metric_antisym = metric.antisym sym2 = TensorSymmetry(get_symmetric_group_sgs(2, obj.metric_antisym)) S2 = TensorType([obj]*2, sym2) obj.metric = S2(metric_name) obj._dim = dim obj._delta = obj.get_kronecker_delta() obj._eps_dim = eps_dim if eps_dim else dim obj._epsilon = obj.get_epsilon() obj._autogenerated = [] return obj @property @deprecated(useinstead="TensorIndex", issue=12857, deprecated_since_version="1.1") def auto_right(self): if not hasattr(self, '_auto_right'): self._auto_right = TensorIndex("auto_right", self) return self._auto_right @property @deprecated(useinstead="TensorIndex", issue=12857, deprecated_since_version="1.1") def auto_left(self): if not hasattr(self, '_auto_left'): self._auto_left = TensorIndex("auto_left", self) return self._auto_left @property @deprecated(useinstead="TensorIndex", issue=12857, deprecated_since_version="1.1") def auto_index(self): if not hasattr(self, '_auto_index'): self._auto_index = TensorIndex("auto_index", self) return self._auto_index @property def data(self): deprecate_data() return _tensor_data_substitution_dict[self] @data.setter def data(self, data): deprecate_data() # This assignment is a bit controversial, should metric components be assigned # to the metric only or also to the TensorIndexType object? The advantage here # is the ability to assign a 1D array and transform it to a 2D diagonal array. from .array import MutableDenseNDimArray data = _TensorDataLazyEvaluator.parse_data(data) if data.rank() > 2: raise ValueError("data have to be of rank 1 (diagonal metric) or 2.") if data.rank() == 1: if self.dim is not None: nda_dim = data.shape[0] if nda_dim != self.dim: raise ValueError("Dimension mismatch") dim = data.shape[0] newndarray = MutableDenseNDimArray.zeros(dim, dim) for i, val in enumerate(data): newndarray[i, i] = val data = newndarray dim1, dim2 = data.shape if dim1 != dim2: raise ValueError("Non-square matrix tensor.") if self.dim is not None: if self.dim != dim1: raise ValueError("Dimension mismatch") _tensor_data_substitution_dict[self] = data _tensor_data_substitution_dict.add_metric_data(self.metric, data) delta = self.get_kronecker_delta() i1 = TensorIndex('i1', self) i2 = TensorIndex('i2', self) delta(i1, -i2).data = _TensorDataLazyEvaluator.parse_data(eye(dim1)) @data.deleter def data(self): deprecate_data() if self in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self] if self.metric in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self.metric] def _get_matrix_fmt(self, number): return ("m" + self.dummy_fmt) % (number) @property def name(self): return self._name @property def dim(self): return self._dim @property def delta(self): return self._delta @property def eps_dim(self): return self._eps_dim @property def epsilon(self): return self._epsilon @property def dummy_fmt(self): return self._dummy_fmt def get_kronecker_delta(self): sym2 = TensorSymmetry(get_symmetric_group_sgs(2)) S2 = TensorType([self]*2, sym2) delta = S2('KD') return delta def get_epsilon(self): if not isinstance(self._eps_dim, (SYMPY_INTS, Integer)): return None sym = TensorSymmetry(get_symmetric_group_sgs(self._eps_dim, 1)) Sdim = TensorType([self]*self._eps_dim, sym) epsilon = Sdim('Eps') return epsilon def __lt__(self, other): return self.name < other.name def __str__(self): return self.name __repr__ = __str__ def _components_data_full_destroy(self): """ EXPERIMENTAL: do not rely on this API method. This destroys components data associated to the ``TensorIndexType``, if any, specifically: * metric tensor data * Kronecker tensor data """ if self in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self] def delete_tensmul_data(key): if key in _tensor_data_substitution_dict._substitutions_dict_tensmul: del _tensor_data_substitution_dict._substitutions_dict_tensmul[key] # delete metric data: delete_tensmul_data((self.metric, True, True)) delete_tensmul_data((self.metric, True, False)) delete_tensmul_data((self.metric, False, True)) delete_tensmul_data((self.metric, False, False)) # delete delta tensor data: delta = self.get_kronecker_delta() if delta in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[delta] class TensorIndex(Basic): """ Represents a tensor index Parameters ========== name : name of the index, or ``True`` if you want it to be automatically assigned tensortype : ``TensorIndexType`` of the index is_up : flag for contravariant index (is_up=True by default) Attributes ========== ``name`` ``tensortype`` ``is_up`` Notes ===== Tensor indices are contracted with the Einstein summation convention. An index can be in contravariant or in covariant form; in the latter case it is represented prepending a ``-`` to the index name. Adding ``-`` to a covariant (is_up=False) index makes it contravariant. Dummy indices have a name with head given by ``tensortype._dummy_fmt`` Similar to ``symbols`` multiple contravariant indices can be created at once using ``tensor_indices(s, typ)``, where ``s`` is a string of names. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, TensorIndex, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> mu = TensorIndex('mu', Lorentz, is_up=False) >>> nu, rho = tensor_indices('nu, rho', Lorentz) >>> A = tensorhead('A', [Lorentz, Lorentz]) >>> A(mu, nu) A(-mu, nu) >>> A(-mu, -rho) A(mu, -rho) >>> A(mu, -mu) A(-L_0, L_0) """ def __new__(cls, name, tensortype, is_up=True): if isinstance(name, string_types): name_symbol = Symbol(name) elif isinstance(name, Symbol): name_symbol = name elif name is True: name = "_i{0}".format(len(tensortype._autogenerated)) name_symbol = Symbol(name) tensortype._autogenerated.append(name_symbol) else: raise ValueError("invalid name") is_up = sympify(is_up) obj = Basic.__new__(cls, name_symbol, tensortype, is_up) obj._name = str(name) obj._tensor_index_type = tensortype obj._is_up = is_up return obj @property def name(self): return self._name @property @deprecated(useinstead="tensor_index_type", issue=12857, deprecated_since_version="1.1") def tensortype(self): return self.tensor_index_type @property def tensor_index_type(self): return self._tensor_index_type @property def is_up(self): return self._is_up def _print(self): s = self._name if not self._is_up: s = '-%s' % s return s def __lt__(self, other): return (self.tensor_index_type, self._name) < (other.tensor_index_type, other._name) def __neg__(self): t1 = TensorIndex(self.name, self.tensor_index_type, (not self.is_up)) return t1 def tensor_indices(s, typ): """ Returns list of tensor indices given their names and their types Parameters ========== s : string of comma separated names of indices typ : ``TensorIndexType`` of the indices Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> a, b, c, d = tensor_indices('a,b,c,d', Lorentz) """ if isinstance(s, string_types): a = [x.name for x in symbols(s, seq=True)] else: raise ValueError('expecting a string') tilist = [TensorIndex(i, typ) for i in a] if len(tilist) == 1: return tilist[0] return tilist class TensorSymmetry(Basic): """ Monoterm symmetry of a tensor (i.e. any symmetric or anti-symmetric index permutation). For the relevant terminology see ``tensor_can.py`` section of the combinatorics module. Parameters ========== bsgs : tuple ``(base, sgs)`` BSGS of the symmetry of the tensor Attributes ========== ``base`` : base of the BSGS ``generators`` : generators of the BSGS ``rank`` : rank of the tensor Notes ===== A tensor can have an arbitrary monoterm symmetry provided by its BSGS. Multiterm symmetries, like the cyclic symmetry of the Riemann tensor (Bianchi identity), are not covered See Also ======== sympy.combinatorics.tensor_can.get_symmetric_group_sgs Examples ======== Define a symmetric tensor >>> from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, TensorType, get_symmetric_group_sgs >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> sym2 = TensorSymmetry(get_symmetric_group_sgs(2)) >>> S2 = TensorType([Lorentz]*2, sym2) >>> V = S2('V') """ def __new__(cls, *args, **kw_args): if len(args) == 1: base, generators = args[0] elif len(args) == 2: base, generators = args else: raise TypeError("bsgs required, either two separate parameters or one tuple") if not isinstance(base, Tuple): base = Tuple(*base) if not isinstance(generators, Tuple): generators = Tuple(*generators) obj = Basic.__new__(cls, base, generators, **kw_args) return obj @property def base(self): return self.args[0] @property def generators(self): return self.args[1] @property def rank(self): return self.args[1][0].size - 2 def tensorsymmetry(*args): """ Return a ``TensorSymmetry`` object. One can represent a tensor with any monoterm slot symmetry group using a BSGS. ``args`` can be a BSGS ``args[0]`` base ``args[1]`` sgs Usually tensors are in (direct products of) representations of the symmetric group; ``args`` can be a list of lists representing the shapes of Young tableaux Notes ===== For instance: ``[[1]]`` vector ``[[1]*n]`` symmetric tensor of rank ``n`` ``[[n]]`` antisymmetric tensor of rank ``n`` ``[[2, 2]]`` monoterm slot symmetry of the Riemann tensor ``[[1],[1]]`` vector*vector ``[[2],[1],[1]`` (antisymmetric tensor)*vector*vector Notice that with the shape ``[2, 2]`` we associate only the monoterm symmetries of the Riemann tensor; this is an abuse of notation, since the shape ``[2, 2]`` corresponds usually to the irreducible representation characterized by the monoterm symmetries and by the cyclic symmetry. Examples ======== Symmetric tensor using a Young tableau >>> from sympy.tensor.tensor import TensorIndexType, TensorType, tensorsymmetry >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> sym2 = tensorsymmetry([1, 1]) >>> S2 = TensorType([Lorentz]*2, sym2) >>> V = S2('V') Symmetric tensor using a ``BSGS`` (base, strong generator set) >>> from sympy.tensor.tensor import get_symmetric_group_sgs >>> sym2 = tensorsymmetry(*get_symmetric_group_sgs(2)) >>> S2 = TensorType([Lorentz]*2, sym2) >>> V = S2('V') """ from sympy.combinatorics import Permutation def tableau2bsgs(a): if len(a) == 1: # antisymmetric vector n = a[0] bsgs = get_symmetric_group_sgs(n, 1) else: if all(x == 1 for x in a): # symmetric vector n = len(a) bsgs = get_symmetric_group_sgs(n) elif a == [2, 2]: bsgs = riemann_bsgs else: raise NotImplementedError return bsgs if not args: return TensorSymmetry(Tuple(), Tuple(Permutation(1))) if len(args) == 2 and isinstance(args[1][0], Permutation): return TensorSymmetry(args) base, sgs = tableau2bsgs(args[0]) for a in args[1:]: basex, sgsx = tableau2bsgs(a) base, sgs = bsgs_direct_product(base, sgs, basex, sgsx) return TensorSymmetry(Tuple(base, sgs)) class TensorType(Basic): """ Class of tensor types. Parameters ========== index_types : list of ``TensorIndexType`` of the tensor indices symmetry : ``TensorSymmetry`` of the tensor Attributes ========== ``index_types`` ``symmetry`` ``types`` : list of ``TensorIndexType`` without repetitions Examples ======== Define a symmetric tensor >>> from sympy.tensor.tensor import TensorIndexType, tensorsymmetry, TensorType >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> sym2 = tensorsymmetry([1, 1]) >>> S2 = TensorType([Lorentz]*2, sym2) >>> V = S2('V') """ is_commutative = False def __new__(cls, index_types, symmetry, **kw_args): assert symmetry.rank == len(index_types) obj = Basic.__new__(cls, Tuple(*index_types), symmetry, **kw_args) return obj @property def index_types(self): return self.args[0] @property def symmetry(self): return self.args[1] @property def types(self): return sorted(set(self.index_types), key=lambda x: x.name) def __str__(self): return 'TensorType(%s)' % ([str(x) for x in self.index_types]) def __call__(self, s, comm=0): """ Return a TensorHead object or a list of TensorHead objects. ``s`` name or string of names ``comm``: commutation group number see ``_TensorManager.set_comm`` Examples ======== Define symmetric tensors ``V``, ``W`` and ``G``, respectively commuting, anticommuting and with no commutation symmetry >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorsymmetry, TensorType, canon_bp >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> a, b = tensor_indices('a,b', Lorentz) >>> sym2 = tensorsymmetry([1]*2) >>> S2 = TensorType([Lorentz]*2, sym2) >>> V = S2('V') >>> W = S2('W', 1) >>> G = S2('G', 2) >>> canon_bp(V(a, b)*V(-b, -a)) V(L_0, L_1)*V(-L_0, -L_1) >>> canon_bp(W(a, b)*W(-b, -a)) 0 """ if isinstance(s, string_types): names = [x.name for x in symbols(s, seq=True)] else: raise ValueError('expecting a string') if len(names) == 1: return TensorHead(names[0], self, comm) else: return [TensorHead(name, self, comm) for name in names] def tensorhead(name, typ, sym=None, comm=0): """ Function generating tensorhead(s). Parameters ========== name : name or sequence of names (as in ``symbols``) typ : index types sym : same as ``*args`` in ``tensorsymmetry`` comm : commutation group number see ``_TensorManager.set_comm`` Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> a, b = tensor_indices('a,b', Lorentz) >>> A = tensorhead('A', [Lorentz]*2, [[1]*2]) >>> A(a, -b) A(a, -b) If no symmetry parameter is provided, assume there are no index symmetries: >>> B = tensorhead('B', [Lorentz, Lorentz]) >>> B(a, -b) B(a, -b) """ if sym is None: sym = [[1] for i in range(len(typ))] sym = tensorsymmetry(*sym) S = TensorType(typ, sym) th = S(name, comm) return th class TensorHead(Basic): """ Tensor head of the tensor Parameters ========== name : name of the tensor typ : list of TensorIndexType comm : commutation group number Attributes ========== ``name`` ``index_types`` ``rank`` ``types`` : equal to ``typ.types`` ``symmetry`` : equal to ``typ.symmetry`` ``comm`` : commutation group Notes ===== Similar to ``symbols`` multiple TensorHeads can be created using ``tensorhead(s, typ, sym=None, comm=0)`` function, where ``s`` is the string of names and ``sym`` is the monoterm tensor symmetry (see ``tensorsymmetry``). A ``TensorHead`` belongs to a commutation group, defined by a symbol on number ``comm`` (see ``_TensorManager.set_comm``); tensors in a commutation group have the same commutation properties; by default ``comm`` is ``0``, the group of the commuting tensors. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensorhead, tensor_indices >>> from sympy import diag >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i0, i1 = tensor_indices('i0:2', Lorentz) Specify a replacement dictionary to keep track of the arrays to use for replacements in the tensorial expression. The ``TensorIndexType`` is associated to the metric used for contractions (in fully covariant form): >>> repl = {Lorentz: diag(1, -1, -1, -1)} Let's see some examples of working with components with the electromagnetic tensor: >>> from sympy import symbols >>> Ex, Ey, Ez, Bx, By, Bz = symbols('E_x E_y E_z B_x B_y B_z') >>> c = symbols('c', positive=True) Let's define `F`, an antisymmetric tensor, we have to assign an antisymmetric matrix to it, because `[[2]]` stands for the Young tableau representation of an antisymmetric set of two elements: >>> F = tensorhead('F', [Lorentz, Lorentz], [[2]]) Let's update the dictionary to contain the matrix to use in the replacements: >>> repl.update({F(-i0, -i1): [ ... [0, Ex/c, Ey/c, Ez/c], ... [-Ex/c, 0, -Bz, By], ... [-Ey/c, Bz, 0, -Bx], ... [-Ez/c, -By, Bx, 0]]}) Now it is possible to retrieve the contravariant form of the Electromagnetic tensor: >>> F(i0, i1).replace_with_arrays(repl, [i0, i1]) [[0, -E_x/c, -E_y/c, -E_z/c], [E_x/c, 0, -B_z, B_y], [E_y/c, B_z, 0, -B_x], [E_z/c, -B_y, B_x, 0]] and the mixed contravariant-covariant form: >>> F(i0, -i1).replace_with_arrays(repl, [i0, -i1]) [[0, E_x/c, E_y/c, E_z/c], [E_x/c, 0, B_z, -B_y], [E_y/c, -B_z, 0, B_x], [E_z/c, B_y, -B_x, 0]] Energy-momentum of a particle may be represented as: >>> from sympy import symbols >>> P = tensorhead('P', [Lorentz], [[1]]) >>> E, px, py, pz = symbols('E p_x p_y p_z', positive=True) >>> repl.update({P(i0): [E, px, py, pz]}) The contravariant and covariant components are, respectively: >>> P(i0).replace_with_arrays(repl, [i0]) [E, p_x, p_y, p_z] >>> P(-i0).replace_with_arrays(repl, [-i0]) [E, -p_x, -p_y, -p_z] The contraction of a 1-index tensor by itself: >>> expr = P(i0)*P(-i0) >>> expr.replace_with_arrays(repl, []) E**2 - p_x**2 - p_y**2 - p_z**2 """ is_commutative = False def __new__(cls, name, typ, comm=0, **kw_args): if isinstance(name, string_types): name_symbol = Symbol(name) elif isinstance(name, Symbol): name_symbol = name else: raise ValueError("invalid name") comm2i = TensorManager.comm_symbols2i(comm) obj = Basic.__new__(cls, name_symbol, typ, **kw_args) obj._name = obj.args[0].name obj._rank = len(obj.index_types) obj._symmetry = typ.symmetry obj._comm = comm2i return obj @property def name(self): return self._name @property def rank(self): return self._rank @property def symmetry(self): return self._symmetry @property def typ(self): return self.args[1] @property def comm(self): return self._comm @property def types(self): return self.args[1].types[:] @property def index_types(self): return self.args[1].index_types[:] def __lt__(self, other): return (self.name, self.index_types) < (other.name, other.index_types) def commutes_with(self, other): """ Returns ``0`` if ``self`` and ``other`` commute, ``1`` if they anticommute. Returns ``None`` if ``self`` and ``other`` neither commute nor anticommute. """ r = TensorManager.get_comm(self._comm, other._comm) return r def _print(self): return '%s(%s)' %(self.name, ','.join([str(x) for x in self.index_types])) def __call__(self, *indices, **kw_args): """ Returns a tensor with indices. There is a special behavior in case of indices denoted by ``True``, they are considered auto-matrix indices, their slots are automatically filled, and confer to the tensor the behavior of a matrix or vector upon multiplication with another tensor containing auto-matrix indices of the same ``TensorIndexType``. This means indices get summed over the same way as in matrix multiplication. For matrix behavior, define two auto-matrix indices, for vector behavior define just one. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> a, b = tensor_indices('a,b', Lorentz) >>> A = tensorhead('A', [Lorentz]*2, [[1]*2]) >>> t = A(a, -b) >>> t A(a, -b) """ tensor = Tensor(self, indices, **kw_args) return tensor.doit() def __pow__(self, other): with warnings.catch_warnings(): warnings.filterwarnings("ignore", category=SymPyDeprecationWarning) if self.data is None: raise ValueError("No power on abstract tensors.") deprecate_data() from .array import tensorproduct, tensorcontraction metrics = [_.data for _ in self.args[1].args[0]] marray = self.data marraydim = marray.rank() for metric in metrics: marray = tensorproduct(marray, metric, marray) marray = tensorcontraction(marray, (0, marraydim), (marraydim+1, marraydim+2)) return marray ** (Rational(1, 2) * other) @property def data(self): deprecate_data() return _tensor_data_substitution_dict[self] @data.setter def data(self, data): deprecate_data() _tensor_data_substitution_dict[self] = data @data.deleter def data(self): deprecate_data() if self in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self] def __iter__(self): deprecate_data() return self.data.__iter__() def _components_data_full_destroy(self): """ EXPERIMENTAL: do not rely on this API method. Destroy components data associated to the ``TensorHead`` object, this checks for attached components data, and destroys components data too. """ # do not garbage collect Kronecker tensor (it should be done by # ``TensorIndexType`` garbage collection) if self.name == "KD": return # the data attached to a tensor must be deleted only by the TensorHead # destructor. If the TensorHead is deleted, it means that there are no # more instances of that tensor anywhere. if self in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self] def _get_argtree_pos(expr, pos): for p in pos: expr = expr.args[p] return expr class TensExpr(Expr): """ Abstract base class for tensor expressions Notes ===== A tensor expression is an expression formed by tensors; currently the sums of tensors are distributed. A ``TensExpr`` can be a ``TensAdd`` or a ``TensMul``. ``TensMul`` objects are formed by products of component tensors, and include a coefficient, which is a SymPy expression. In the internal representation contracted indices are represented by ``(ipos1, ipos2, icomp1, icomp2)``, where ``icomp1`` is the position of the component tensor with contravariant index, ``ipos1`` is the slot which the index occupies in that component tensor. Contracted indices are therefore nameless in the internal representation. """ _op_priority = 12.0 is_commutative = False def __neg__(self): return self*S.NegativeOne def __abs__(self): raise NotImplementedError def __add__(self, other): return TensAdd(self, other).doit() def __radd__(self, other): return TensAdd(other, self).doit() def __sub__(self, other): return TensAdd(self, -other).doit() def __rsub__(self, other): return TensAdd(other, -self).doit() def __mul__(self, other): """ Multiply two tensors using Einstein summation convention. If the two tensors have an index in common, one contravariant and the other covariant, in their product the indices are summed Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2 = tensor_indices('m0,m1,m2', Lorentz) >>> g = Lorentz.metric >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> t1 = p(m0) >>> t2 = q(-m0) >>> t1*t2 p(L_0)*q(-L_0) """ return TensMul(self, other).doit() def __rmul__(self, other): return TensMul(other, self).doit() def __div__(self, other): other = _sympify(other) if isinstance(other, TensExpr): raise ValueError('cannot divide by a tensor') return TensMul(self, S.One/other).doit() def __rdiv__(self, other): raise ValueError('cannot divide by a tensor') def __pow__(self, other): with warnings.catch_warnings(): warnings.filterwarnings("ignore", category=SymPyDeprecationWarning) if self.data is None: raise ValueError("No power without ndarray data.") deprecate_data() from .array import tensorproduct, tensorcontraction free = self.free marray = self.data mdim = marray.rank() for metric in free: marray = tensorcontraction( tensorproduct( marray, metric[0].tensor_index_type.data, marray), (0, mdim), (mdim+1, mdim+2) ) return marray ** (Rational(1, 2) * other) def __rpow__(self, other): raise NotImplementedError __truediv__ = __div__ __rtruediv__ = __rdiv__ def fun_eval(self, *index_tuples): """ Return a tensor with free indices substituted according to ``index_tuples`` ``index_types`` list of tuples ``(old_index, new_index)`` Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i, j, k, l = tensor_indices('i,j,k,l', Lorentz) >>> A, B = tensorhead('A,B', [Lorentz]*2, [[1]*2]) >>> t = A(i, k)*B(-k, -j); t A(i, L_0)*B(-L_0, -j) >>> t.fun_eval((i, k),(-j, l)) A(k, L_0)*B(-L_0, l) """ expr = self.xreplace(dict(index_tuples)) expr = expr.replace(lambda x: isinstance(x, Tensor), lambda x: x.args[0](*x.args[1])) # For some reason, `TensMul` gets replaced by `Mul`, correct it: expr = expr.replace(lambda x: isinstance(x, (Mul, TensMul)), lambda x: TensMul(*x.args).doit()) return expr def get_matrix(self): """ DEPRECATED: do not use. Returns ndarray components data as a matrix, if components data are available and ndarray dimension does not exceed 2. """ from sympy import Matrix deprecate_data() if 0 < self.rank <= 2: rows = self.data.shape[0] columns = self.data.shape[1] if self.rank == 2 else 1 if self.rank == 2: mat_list = [] * rows for i in range(rows): mat_list.append([]) for j in range(columns): mat_list[i].append(self[i, j]) else: mat_list = [None] * rows for i in range(rows): mat_list[i] = self[i] return Matrix(mat_list) else: raise NotImplementedError( "missing multidimensional reduction to matrix.") @staticmethod def _get_indices_permutation(indices1, indices2): return [indices1.index(i) for i in indices2] def expand(self, **hints): return _expand(self, **hints).doit() def _expand(self, **kwargs): return self def _get_free_indices_set(self): indset = set([]) for arg in self.args: if isinstance(arg, TensExpr): indset.update(arg._get_free_indices_set()) return indset def _get_dummy_indices_set(self): indset = set([]) for arg in self.args: if isinstance(arg, TensExpr): indset.update(arg._get_dummy_indices_set()) return indset def _get_indices_set(self): indset = set([]) for arg in self.args: if isinstance(arg, TensExpr): indset.update(arg._get_indices_set()) return indset @property def _iterate_dummy_indices(self): dummy_set = self._get_dummy_indices_set() def recursor(expr, pos): if isinstance(expr, TensorIndex): if expr in dummy_set: yield (expr, pos) elif isinstance(expr, (Tuple, TensExpr)): for p, arg in enumerate(expr.args): for i in recursor(arg, pos+(p,)): yield i return recursor(self, ()) @property def _iterate_free_indices(self): free_set = self._get_free_indices_set() def recursor(expr, pos): if isinstance(expr, TensorIndex): if expr in free_set: yield (expr, pos) elif isinstance(expr, (Tuple, TensExpr)): for p, arg in enumerate(expr.args): for i in recursor(arg, pos+(p,)): yield i return recursor(self, ()) @property def _iterate_indices(self): def recursor(expr, pos): if isinstance(expr, TensorIndex): yield (expr, pos) elif isinstance(expr, (Tuple, TensExpr)): for p, arg in enumerate(expr.args): for i in recursor(arg, pos+(p,)): yield i return recursor(self, ()) @staticmethod def _match_indices_with_other_tensor(array, free_ind1, free_ind2, replacement_dict): from .array import tensorcontraction, tensorproduct, permutedims index_types1 = [i.tensor_index_type for i in free_ind1] # Check if variance of indices needs to be fixed: pos2up = [] pos2down = [] free2remaining = free_ind2[:] for pos1, index1 in enumerate(free_ind1): if index1 in free2remaining: pos2 = free2remaining.index(index1) free2remaining[pos2] = None continue if -index1 in free2remaining: pos2 = free2remaining.index(-index1) free2remaining[pos2] = None free_ind2[pos2] = index1 if index1.is_up: pos2up.append(pos2) else: pos2down.append(pos2) else: index2 = free2remaining[pos1] if index2 is None: raise ValueError("incompatible indices: %s and %s" % (free_ind1, free_ind2)) free2remaining[pos1] = None free_ind2[pos1] = index1 if index1.is_up ^ index2.is_up: if index1.is_up: pos2up.append(pos1) else: pos2down.append(pos1) if len(set(free_ind1) & set(free_ind2)) < len(free_ind1): raise ValueError("incompatible indices: %s and %s" % (free_ind1, free_ind2)) # TODO: add possibility of metric after (spinors) def contract_and_permute(metric, array, pos): array = tensorcontraction(tensorproduct(metric, array), (1, 2+pos)) permu = list(range(len(free_ind1))) permu[0], permu[pos] = permu[pos], permu[0] return permutedims(array, permu) # Raise indices: for pos in pos2up: metric = replacement_dict[index_types1[pos]] metric_inverse = _TensorDataLazyEvaluator.inverse_matrix(metric) array = contract_and_permute(metric_inverse, array, pos) # Lower indices: for pos in pos2down: metric = replacement_dict[index_types1[pos]] array = contract_and_permute(metric, array, pos) if free_ind1: permutation = TensExpr._get_indices_permutation(free_ind2, free_ind1) array = permutedims(array, permutation) if hasattr(array, "rank") and array.rank() == 0: array = array[()] return free_ind2, array def replace_with_arrays(self, replacement_dict, indices=None): """ Replace the tensorial expressions with arrays. The final array will correspond to the N-dimensional array with indices arranged according to ``indices``. Parameters ========== replacement_dict dictionary containing the replacement rules for tensors. indices the index order with respect to which the array is read. The original index order will be used if no value is passed. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices >>> from sympy.tensor.tensor import tensorhead >>> from sympy import symbols, diag >>> L = TensorIndexType("L") >>> i, j = tensor_indices("i j", L) >>> A = tensorhead("A", [L], [[1]]) >>> A(i).replace_with_arrays({A(i): [1, 2]}, [i]) [1, 2] Since 'indices' is optional, we can also call replace_with_arrays by this way if no specific index order is needed: >>> A(i).replace_with_arrays({A(i): [1, 2]}) [1, 2] >>> expr = A(i)*A(j) >>> expr.replace_with_arrays({A(i): [1, 2]}) [[1, 2], [2, 4]] For contractions, specify the metric of the ``TensorIndexType``, which in this case is ``L``, in its covariant form: >>> expr = A(i)*A(-i) >>> expr.replace_with_arrays({A(i): [1, 2], L: diag(1, -1)}) -3 Symmetrization of an array: >>> H = tensorhead("H", [L, L], [[1], [1]]) >>> a, b, c, d = symbols("a b c d") >>> expr = H(i, j)/2 + H(j, i)/2 >>> expr.replace_with_arrays({H(i, j): [[a, b], [c, d]]}) [[a, b/2 + c/2], [b/2 + c/2, d]] Anti-symmetrization of an array: >>> expr = H(i, j)/2 - H(j, i)/2 >>> repl = {H(i, j): [[a, b], [c, d]]} >>> expr.replace_with_arrays(repl) [[0, b/2 - c/2], [-b/2 + c/2, 0]] The same expression can be read as the transpose by inverting ``i`` and ``j``: >>> expr.replace_with_arrays(repl, [j, i]) [[0, -b/2 + c/2], [b/2 - c/2, 0]] """ from .array import Array indices = indices or [] replacement_dict = {tensor: Array(array) for tensor, array in replacement_dict.items()} # Check dimensions of replaced arrays: for tensor, array in replacement_dict.items(): if isinstance(tensor, TensorIndexType): expected_shape = [tensor.dim for i in range(2)] else: expected_shape = [index_type.dim for index_type in tensor.index_types] if len(expected_shape) != array.rank() or (not all([dim1 == dim2 if dim1 is not None else True for dim1, dim2 in zip(expected_shape, array.shape)])): raise ValueError("shapes for tensor %s expected to be %s, "\ "replacement array shape is %s" % (tensor, expected_shape, array.shape)) ret_indices, array = self._extract_data(replacement_dict) last_indices, array = self._match_indices_with_other_tensor(array, indices, ret_indices, replacement_dict) #permutation = self._get_indices_permutation(indices, ret_indices) #if not hasattr(array, "rank"): #return array #if array.rank() == 0: #array = array[()] #return array #array = permutedims(array, permutation) return array def _check_add_Sum(self, expr, index_symbols): from sympy import Sum indices = self.get_indices() dum = self.dum sum_indices = [ (index_symbols[i], 0, indices[i].tensor_index_type.dim-1) for i, j in dum] if sum_indices: expr = Sum(expr, *sum_indices) return expr class TensAdd(TensExpr, AssocOp): """ Sum of tensors Parameters ========== free_args : list of the free indices Attributes ========== ``args`` : tuple of addends ``rank`` : rank of the tensor ``free_args`` : list of the free indices in sorted order Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensorhead, tensor_indices >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> a, b = tensor_indices('a,b', Lorentz) >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> t = p(a) + q(a); t p(a) + q(a) >>> t(b) p(b) + q(b) Examples with components data added to the tensor expression: >>> from sympy import symbols, diag >>> x, y, z, t = symbols("x y z t") >>> repl = {} >>> repl[Lorentz] = diag(1, -1, -1, -1) >>> repl[p(a)] = [1, 2, 3, 4] >>> repl[q(a)] = [x, y, z, t] The following are: 2**2 - 3**2 - 2**2 - 7**2 ==> -58 >>> expr = p(a) + q(a) >>> expr.replace_with_arrays(repl, [a]) [x + 1, y + 2, z + 3, t + 4] """ def __new__(cls, *args, **kw_args): args = [_sympify(x) for x in args if x] args = TensAdd._tensAdd_flatten(args) obj = Basic.__new__(cls, *args, **kw_args) return obj def doit(self, **kwargs): deep = kwargs.get('deep', True) if deep: args = [arg.doit(**kwargs) for arg in self.args] else: args = self.args if not args: return S.Zero if len(args) == 1 and not isinstance(args[0], TensExpr): return args[0] # now check that all addends have the same indices: TensAdd._tensAdd_check(args) # if TensAdd has only 1 element in its `args`: if len(args) == 1: # and isinstance(args[0], TensMul): return args[0] # Remove zeros: args = [x for x in args if x] # if there are no more args (i.e. have cancelled out), # just return zero: if not args: return S.Zero if len(args) == 1: return args[0] # Collect terms appearing more than once, differing by their coefficients: args = TensAdd._tensAdd_collect_terms(args) # collect canonicalized terms def sort_key(t): x = get_index_structure(t) if not isinstance(t, TensExpr): return ([], [], []) return (t.components, x.free, x.dum) args.sort(key=sort_key) if not args: return S.Zero # it there is only a component tensor return it if len(args) == 1: return args[0] obj = self.func(*args) return obj @staticmethod def _tensAdd_flatten(args): # flatten TensAdd, coerce terms which are not tensors to tensors a = [] for x in args: if isinstance(x, (Add, TensAdd)): a.extend(list(x.args)) else: a.append(x) args = [x for x in a if x.coeff] return args @staticmethod def _tensAdd_check(args): # check that all addends have the same free indices indices0 = set([x[0] for x in get_index_structure(args[0]).free]) list_indices = [set([y[0] for y in get_index_structure(x).free]) for x in args[1:]] if not all(x == indices0 for x in list_indices): raise ValueError('all tensors must have the same indices') @staticmethod def _tensAdd_collect_terms(args): # collect TensMul terms differing at most by their coefficient terms_dict = defaultdict(list) scalars = S.Zero if isinstance(args[0], TensExpr): free_indices = set(args[0].get_free_indices()) else: free_indices = set([]) for arg in args: if not isinstance(arg, TensExpr): if free_indices != set([]): raise ValueError("wrong valence") scalars += arg continue if free_indices != set(arg.get_free_indices()): raise ValueError("wrong valence") # TODO: what is the part which is not a coeff? # needs an implementation similar to .as_coeff_Mul() terms_dict[arg.nocoeff].append(arg.coeff) new_args = [TensMul(Add(*coeff), t).doit() for t, coeff in terms_dict.items() if Add(*coeff) != 0] if isinstance(scalars, Add): new_args = list(scalars.args) + new_args elif scalars != 0: new_args = [scalars] + new_args return new_args def get_indices(self): indices = [] for arg in self.args: indices.extend([i for i in get_indices(arg) if i not in indices]) return indices @property def rank(self): return self.args[0].rank @property def free_args(self): return self.args[0].free_args def _expand(self, **hints): return TensAdd(*[_expand(i, **hints) for i in self.args]) def __call__(self, *indices): """Returns tensor with ordered free indices replaced by ``indices`` Parameters ========== indices Examples ======== >>> from sympy import Symbol >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> D = Symbol('D') >>> Lorentz = TensorIndexType('Lorentz', dim=D, dummy_fmt='L') >>> i0,i1,i2,i3,i4 = tensor_indices('i0:5', Lorentz) >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> g = Lorentz.metric >>> t = p(i0)*p(i1) + g(i0,i1)*q(i2)*q(-i2) >>> t(i0,i2) metric(i0, i2)*q(L_0)*q(-L_0) + p(i0)*p(i2) >>> from sympy.tensor.tensor import canon_bp >>> canon_bp(t(i0,i1) - t(i1,i0)) 0 """ free_args = self.free_args indices = list(indices) if [x.tensor_index_type for x in indices] != [x.tensor_index_type for x in free_args]: raise ValueError('incompatible types') if indices == free_args: return self index_tuples = list(zip(free_args, indices)) a = [x.func(*x.fun_eval(*index_tuples).args) for x in self.args] res = TensAdd(*a).doit() return res def canon_bp(self): """ Canonicalize using the Butler-Portugal algorithm for canonicalization under monoterm symmetries. """ expr = self.expand() args = [canon_bp(x) for x in expr.args] res = TensAdd(*args).doit() return res def equals(self, other): other = _sympify(other) if isinstance(other, TensMul) and other._coeff == 0: return all(x._coeff == 0 for x in self.args) if isinstance(other, TensExpr): if self.rank != other.rank: return False if isinstance(other, TensAdd): if set(self.args) != set(other.args): return False else: return True t = self - other if not isinstance(t, TensExpr): return t == 0 else: if isinstance(t, TensMul): return t._coeff == 0 else: return all(x._coeff == 0 for x in t.args) def __getitem__(self, item): deprecate_data() return self.data[item] def contract_delta(self, delta): args = [x.contract_delta(delta) for x in self.args] t = TensAdd(*args).doit() return canon_bp(t) def contract_metric(self, g): """ Raise or lower indices with the metric ``g`` Parameters ========== g : metric contract_all : if True, eliminate all ``g`` which are contracted Notes ===== see the ``TensorIndexType`` docstring for the contraction conventions """ args = [contract_metric(x, g) for x in self.args] t = TensAdd(*args).doit() return canon_bp(t) def fun_eval(self, *index_tuples): """ Return a tensor with free indices substituted according to ``index_tuples`` Parameters ========== index_types : list of tuples ``(old_index, new_index)`` Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i, j, k, l = tensor_indices('i,j,k,l', Lorentz) >>> A, B = tensorhead('A,B', [Lorentz]*2, [[1]*2]) >>> t = A(i, k)*B(-k, -j) + A(i, -j) >>> t.fun_eval((i, k),(-j, l)) A(k, L_0)*B(-L_0, l) + A(k, l) """ args = self.args args1 = [] for x in args: y = x.fun_eval(*index_tuples) args1.append(y) return TensAdd(*args1).doit() def substitute_indices(self, *index_tuples): """ Return a tensor with free indices substituted according to ``index_tuples`` Parameters ========== index_types : list of tuples ``(old_index, new_index)`` Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i, j, k, l = tensor_indices('i,j,k,l', Lorentz) >>> A, B = tensorhead('A,B', [Lorentz]*2, [[1]*2]) >>> t = A(i, k)*B(-k, -j); t A(i, L_0)*B(-L_0, -j) >>> t.substitute_indices((i,j), (j, k)) A(j, L_0)*B(-L_0, -k) """ args = self.args args1 = [] for x in args: y = x.substitute_indices(*index_tuples) args1.append(y) return TensAdd(*args1).doit() def _print(self): a = [] args = self.args for x in args: a.append(str(x)) a.sort() s = ' + '.join(a) s = s.replace('+ -', '- ') return s def _extract_data(self, replacement_dict): from sympy.tensor.array import Array, permutedims args_indices, arrays = zip(*[ arg._extract_data(replacement_dict) if isinstance(arg, TensExpr) else ([], arg) for arg in self.args ]) arrays = [Array(i) for i in arrays] ref_indices = args_indices[0] for i in range(1, len(args_indices)): indices = args_indices[i] array = arrays[i] permutation = TensMul._get_indices_permutation(indices, ref_indices) arrays[i] = permutedims(array, permutation) return ref_indices, sum(arrays, Array.zeros(*array.shape)) @property def data(self): deprecate_data() return _tensor_data_substitution_dict[self.expand()] @data.setter def data(self, data): deprecate_data() _tensor_data_substitution_dict[self] = data @data.deleter def data(self): deprecate_data() if self in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self] def __iter__(self): deprecate_data() if not self.data: raise ValueError("No iteration on abstract tensors") return self.data.flatten().__iter__() def _eval_rewrite_as_Indexed(self, *args): return Add.fromiter(args) class Tensor(TensExpr): """ Base tensor class, i.e. this represents a tensor, the single unit to be put into an expression. This object is usually created from a ``TensorHead``, by attaching indices to it. Indices preceded by a minus sign are considered contravariant, otherwise covariant. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType("Lorentz", dummy_fmt="L") >>> mu, nu = tensor_indices('mu nu', Lorentz) >>> A = tensorhead("A", [Lorentz, Lorentz], [[1], [1]]) >>> A(mu, -nu) A(mu, -nu) >>> A(mu, -mu) A(L_0, -L_0) It is also possible to use symbols instead of inidices (appropriate indices are then generated automatically). >>> from sympy import Symbol >>> x = Symbol('x') >>> A(x, mu) A(x, mu) >>> A(x, -x) A(L_0, -L_0) """ is_commutative = False def __new__(cls, tensor_head, indices, **kw_args): is_canon_bp = kw_args.pop('is_canon_bp', False) indices = cls._parse_indices(tensor_head, indices) obj = Basic.__new__(cls, tensor_head, Tuple(*indices), **kw_args) obj._index_structure = _IndexStructure.from_indices(*indices) obj._free_indices_set = set(obj._index_structure.get_free_indices()) if tensor_head.rank != len(indices): raise ValueError("wrong number of indices") obj._indices = indices obj._is_canon_bp = is_canon_bp obj._index_map = Tensor._build_index_map(indices, obj._index_structure) return obj @staticmethod def _build_index_map(indices, index_structure): index_map = {} for idx in indices: index_map[idx] = (indices.index(idx),) return index_map def doit(self, **kwargs): args, indices, free, dum = TensMul._tensMul_contract_indices([self]) return args[0] @staticmethod def _parse_indices(tensor_head, indices): if not isinstance(indices, (tuple, list, Tuple)): raise TypeError("indices should be an array, got %s" % type(indices)) indices = list(indices) for i, index in enumerate(indices): if isinstance(index, Symbol): indices[i] = TensorIndex(index, tensor_head.index_types[i], True) elif isinstance(index, Mul): c, e = index.as_coeff_Mul() if c == -1 and isinstance(e, Symbol): indices[i] = TensorIndex(e, tensor_head.index_types[i], False) else: raise ValueError("index not understood: %s" % index) elif not isinstance(index, TensorIndex): raise TypeError("wrong type for index: %s is %s" % (index, type(index))) return indices def _set_new_index_structure(self, im, is_canon_bp=False): indices = im.get_indices() return self._set_indices(*indices, is_canon_bp=is_canon_bp) def _set_indices(self, *indices, **kw_args): if len(indices) != self.ext_rank: raise ValueError("indices length mismatch") return self.func(self.args[0], indices, is_canon_bp=kw_args.pop('is_canon_bp', False)).doit() def _get_free_indices_set(self): return set([i[0] for i in self._index_structure.free]) def _get_dummy_indices_set(self): dummy_pos = set(itertools.chain(*self._index_structure.dum)) return set(idx for i, idx in enumerate(self.args[1]) if i in dummy_pos) def _get_indices_set(self): return set(self.args[1].args) @property def is_canon_bp(self): return self._is_canon_bp @property def indices(self): return self._indices @property def free(self): return self._index_structure.free[:] @property def free_in_args(self): return [(ind, pos, 0) for ind, pos in self.free] @property def dum(self): return self._index_structure.dum[:] @property def dum_in_args(self): return [(p1, p2, 0, 0) for p1, p2 in self.dum] @property def rank(self): return len(self.free) @property def ext_rank(self): return self._index_structure._ext_rank @property def free_args(self): return sorted([x[0] for x in self.free]) def commutes_with(self, other): """ :param other: :return: 0 commute 1 anticommute None neither commute nor anticommute """ if not isinstance(other, TensExpr): return 0 elif isinstance(other, Tensor): return self.component.commutes_with(other.component) return NotImplementedError def perm2tensor(self, g, is_canon_bp=False): """ Returns the tensor corresponding to the permutation ``g`` For further details, see the method in ``TIDS`` with the same name. """ return perm2tensor(self, g, is_canon_bp) def canon_bp(self): if self._is_canon_bp: return self expr = self.expand() g, dummies, msym = expr._index_structure.indices_canon_args() v = components_canon_args([expr.component]) can = canonicalize(g, dummies, msym, *v) if can == 0: return S.Zero tensor = self.perm2tensor(can, True) return tensor @property def index_types(self): return list(self.component.index_types) @property def coeff(self): return S.One @property def nocoeff(self): return self @property def component(self): return self.args[0] @property def components(self): return [self.args[0]] def split(self): return [self] def _expand(self, **kwargs): return self def sorted_components(self): return self def get_indices(self): """ Get a list of indices, corresponding to those of the tensor. """ return list(self.args[1]) def get_free_indices(self): """ Get a list of free indices, corresponding to those of the tensor. """ return self._index_structure.get_free_indices() def as_base_exp(self): return self, S.One def substitute_indices(self, *index_tuples): return substitute_indices(self, *index_tuples) def __call__(self, *indices): """Returns tensor with ordered free indices replaced by ``indices`` Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i0,i1,i2,i3,i4 = tensor_indices('i0:5', Lorentz) >>> A = tensorhead('A', [Lorentz]*5, [[1]*5]) >>> t = A(i2, i1, -i2, -i3, i4) >>> t A(L_0, i1, -L_0, -i3, i4) >>> t(i1, i2, i3) A(L_0, i1, -L_0, i2, i3) """ free_args = self.free_args indices = list(indices) if [x.tensor_index_type for x in indices] != [x.tensor_index_type for x in free_args]: raise ValueError('incompatible types') if indices == free_args: return self t = self.fun_eval(*list(zip(free_args, indices))) # object is rebuilt in order to make sure that all contracted indices # get recognized as dummies, but only if there are contracted indices. if len(set(i if i.is_up else -i for i in indices)) != len(indices): return t.func(*t.args) return t # TODO: put this into TensExpr? def __iter__(self): deprecate_data() return self.data.__iter__() # TODO: put this into TensExpr? def __getitem__(self, item): deprecate_data() return self.data[item] def _extract_data(self, replacement_dict): from .array import Array for k, v in replacement_dict.items(): if isinstance(k, Tensor) and k.args[0] == self.args[0]: other = k array = v break else: raise ValueError("%s not found in %s" % (self, replacement_dict)) # TODO: inefficient, this should be done at root level only: replacement_dict = {k: Array(v) for k, v in replacement_dict.items()} array = Array(array) dum1 = self.dum dum2 = other.dum if len(dum2) > 0: for pair in dum2: # allow `dum2` if the contained values are also in `dum1`. if pair not in dum1: raise NotImplementedError("%s with contractions is not implemented" % other) # Remove elements in `dum2` from `dum1`: dum1 = [pair for pair in dum1 if pair not in dum2] if len(dum1) > 0: indices2 = other.get_indices() repl = {} for p1, p2 in dum1: repl[indices2[p2]] = -indices2[p1] other = other.xreplace(repl).doit() array = _TensorDataLazyEvaluator.data_contract_dum([array], dum1, len(indices2)) free_ind1 = self.get_free_indices() free_ind2 = other.get_free_indices() return self._match_indices_with_other_tensor(array, free_ind1, free_ind2, replacement_dict) @property def data(self): deprecate_data() return _tensor_data_substitution_dict[self] @data.setter def data(self, data): deprecate_data() # TODO: check data compatibility with properties of tensor. _tensor_data_substitution_dict[self] = data @data.deleter def data(self): deprecate_data() if self in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self] if self.metric in _tensor_data_substitution_dict: del _tensor_data_substitution_dict[self.metric] def _print(self): indices = [str(ind) for ind in self.indices] component = self.component if component.rank > 0: return ('%s(%s)' % (component.name, ', '.join(indices))) else: return ('%s' % component.name) def equals(self, other): if other == 0: return self.coeff == 0 other = _sympify(other) if not isinstance(other, TensExpr): assert not self.components return S.One == other def _get_compar_comp(self): t = self.canon_bp() r = (t.coeff, tuple(t.components), \ tuple(sorted(t.free)), tuple(sorted(t.dum))) return r return _get_compar_comp(self) == _get_compar_comp(other) def contract_metric(self, g): # if metric is not the same, ignore this step: if self.component != g: return self # in case there are free components, do not perform anything: if len(self.free) != 0: return self antisym = g.index_types[0].metric_antisym sign = S.One typ = g.index_types[0] if not antisym: # g(i, -i) if typ._dim is None: raise ValueError('dimension not assigned') sign = sign*typ._dim else: # g(i, -i) if typ._dim is None: raise ValueError('dimension not assigned') sign = sign*typ._dim dp0, dp1 = self.dum[0] if dp0 < dp1: # g(i, -i) = -D with antisymmetric metric sign = -sign return sign def contract_delta(self, metric): return self.contract_metric(metric) def _eval_rewrite_as_Indexed(self, tens, indices): from sympy import Indexed # TODO: replace .args[0] with .name: index_symbols = [i.args[0] for i in self.get_indices()] expr = Indexed(tens.args[0], *index_symbols) return self._check_add_Sum(expr, index_symbols) class TensMul(TensExpr, AssocOp): """ Product of tensors Parameters ========== coeff : SymPy coefficient of the tensor args Attributes ========== ``components`` : list of ``TensorHead`` of the component tensors ``types`` : list of nonrepeated ``TensorIndexType`` ``free`` : list of ``(ind, ipos, icomp)``, see Notes ``dum`` : list of ``(ipos1, ipos2, icomp1, icomp2)``, see Notes ``ext_rank`` : rank of the tensor counting the dummy indices ``rank`` : rank of the tensor ``coeff`` : SymPy coefficient of the tensor ``free_args`` : list of the free indices in sorted order ``is_canon_bp`` : ``True`` if the tensor in in canonical form Notes ===== ``args[0]`` list of ``TensorHead`` of the component tensors. ``args[1]`` list of ``(ind, ipos, icomp)`` where ``ind`` is a free index, ``ipos`` is the slot position of ``ind`` in the ``icomp``-th component tensor. ``args[2]`` list of tuples representing dummy indices. ``(ipos1, ipos2, icomp1, icomp2)`` indicates that the contravariant dummy index is the ``ipos1``-th slot position in the ``icomp1``-th component tensor; the corresponding covariant index is in the ``ipos2`` slot position in the ``icomp2``-th component tensor. """ identity = S.One def __new__(cls, *args, **kw_args): is_canon_bp = kw_args.get('is_canon_bp', False) args = list(map(_sympify, args)) # Flatten: args = [i for arg in args for i in (arg.args if isinstance(arg, (TensMul, Mul)) else [arg])] args, indices, free, dum = TensMul._tensMul_contract_indices(args, replace_indices=False) # Data for indices: index_types = [i.tensor_index_type for i in indices] index_structure = _IndexStructure(free, dum, index_types, indices, canon_bp=is_canon_bp) obj = TensExpr.__new__(cls, *args) obj._indices = indices obj._index_types = index_types obj._index_structure = index_structure obj._ext_rank = len(obj._index_structure.free) + 2*len(obj._index_structure.dum) obj._coeff = S.One obj._is_canon_bp = is_canon_bp return obj @staticmethod def _indices_to_free_dum(args_indices): free2pos1 = {} free2pos2 = {} dummy_data = [] indices = [] # Notation for positions (to better understand the code): # `pos1`: position in the `args`. # `pos2`: position in the indices. # Example: # A(i, j)*B(k, m, n)*C(p) # `pos1` of `n` is 1 because it's in `B` (second `args` of TensMul). # `pos2` of `n` is 4 because it's the fifth overall index. # Counter for the index position wrt the whole expression: pos2 = 0 for pos1, arg_indices in enumerate(args_indices): for index_pos, index in enumerate(arg_indices): if not isinstance(index, TensorIndex): raise TypeError("expected TensorIndex") if -index in free2pos1: # Dummy index detected: other_pos1 = free2pos1.pop(-index) other_pos2 = free2pos2.pop(-index) if index.is_up: dummy_data.append((index, pos1, other_pos1, pos2, other_pos2)) else: dummy_data.append((-index, other_pos1, pos1, other_pos2, pos2)) indices.append(index) elif index in free2pos1: raise ValueError("Repeated index: %s" % index) else: free2pos1[index] = pos1 free2pos2[index] = pos2 indices.append(index) pos2 += 1 free = [(i, p) for (i, p) in free2pos2.items()] free_names = [i.name for i in free2pos2.keys()] dummy_data.sort(key=lambda x: x[3]) return indices, free, free_names, dummy_data @staticmethod def _dummy_data_to_dum(dummy_data): return [(p2a, p2b) for (i, p1a, p1b, p2a, p2b) in dummy_data] @staticmethod def _tensMul_contract_indices(args, replace_indices=True): replacements = [{} for _ in args] #_index_order = all([_has_index_order(arg) for arg in args]) args_indices = [get_indices(arg) for arg in args] indices, free, free_names, dummy_data = TensMul._indices_to_free_dum(args_indices) cdt = defaultdict(int) def dummy_fmt_gen(tensor_index_type): fmt = tensor_index_type.dummy_fmt nd = cdt[tensor_index_type] cdt[tensor_index_type] += 1 return fmt % nd if replace_indices: for old_index, pos1cov, pos1contra, pos2cov, pos2contra in dummy_data: index_type = old_index.tensor_index_type while True: dummy_name = dummy_fmt_gen(index_type) if dummy_name not in free_names: break dummy = TensorIndex(dummy_name, index_type, True) replacements[pos1cov][old_index] = dummy replacements[pos1contra][-old_index] = -dummy indices[pos2cov] = dummy indices[pos2contra] = -dummy args = [arg.xreplace(repl) for arg, repl in zip(args, replacements)] dum = TensMul._dummy_data_to_dum(dummy_data) return args, indices, free, dum @staticmethod def _get_components_from_args(args): """ Get a list of ``Tensor`` objects having the same ``TIDS`` if multiplied by one another. """ components = [] for arg in args: if not isinstance(arg, TensExpr): continue if isinstance(arg, TensAdd): continue components.extend(arg.components) return components @staticmethod def _rebuild_tensors_list(args, index_structure): indices = index_structure.get_indices() #tensors = [None for i in components] # pre-allocate list ind_pos = 0 for i, arg in enumerate(args): if not isinstance(arg, TensExpr): continue prev_pos = ind_pos ind_pos += arg.ext_rank args[i] = Tensor(arg.component, indices[prev_pos:ind_pos]) def doit(self, **kwargs): is_canon_bp = self._is_canon_bp deep = kwargs.get('deep', True) if deep: args = [arg.doit(**kwargs) for arg in self.args] else: args = self.args args = [arg for arg in args if arg != self.identity] # Extract non-tensor coefficients: coeff = reduce(lambda a, b: a*b, [arg for arg in args if not isinstance(arg, TensExpr)], S.One) args = [arg for arg in args if isinstance(arg, TensExpr)] if len(args) == 0: return coeff if coeff != self.identity: args = [coeff] + args if coeff == 0: return S.Zero if len(args) == 1: return args[0] args, indices, free, dum = TensMul._tensMul_contract_indices(args) # Data for indices: index_types = [i.tensor_index_type for i in indices] index_structure = _IndexStructure(free, dum, index_types, indices, canon_bp=is_canon_bp) obj = self.func(*args) obj._index_types = index_types obj._index_structure = index_structure obj._ext_rank = len(obj._index_structure.free) + 2*len(obj._index_structure.dum) obj._coeff = coeff obj._is_canon_bp = is_canon_bp return obj # TODO: this method should be private # TODO: should this method be renamed _from_components_free_dum ? @staticmethod def from_data(coeff, components, free, dum, **kw_args): return TensMul(coeff, *TensMul._get_tensors_from_components_free_dum(components, free, dum), **kw_args).doit() @staticmethod def _get_tensors_from_components_free_dum(components, free, dum): """ Get a list of ``Tensor`` objects by distributing ``free`` and ``dum`` indices on the ``components``. """ index_structure = _IndexStructure.from_components_free_dum(components, free, dum) indices = index_structure.get_indices() tensors = [None for i in components] # pre-allocate list # distribute indices on components to build a list of tensors: ind_pos = 0 for i, component in enumerate(components): prev_pos = ind_pos ind_pos += component.rank tensors[i] = Tensor(component, indices[prev_pos:ind_pos]) return tensors def _get_free_indices_set(self): return set([i[0] for i in self.free]) def _get_dummy_indices_set(self): dummy_pos = set(itertools.chain(*self.dum)) return set(idx for i, idx in enumerate(self._index_structure.get_indices()) if i in dummy_pos) def _get_position_offset_for_indices(self): arg_offset = [None for i in range(self.ext_rank)] counter = 0 for i, arg in enumerate(self.args): if not isinstance(arg, TensExpr): continue for j in range(arg.ext_rank): arg_offset[j + counter] = counter counter += arg.ext_rank return arg_offset @property def free_args(self): return sorted([x[0] for x in self.free]) @property def components(self): return self._get_components_from_args(self.args) @property def free(self): return self._index_structure.free[:] @property def free_in_args(self): arg_offset = self._get_position_offset_for_indices() argpos = self._get_indices_to_args_pos() return [(ind, pos-arg_offset[pos], argpos[pos]) for (ind, pos) in self.free] @property def coeff(self): return self._coeff @property def nocoeff(self): return self.func(*[t for t in self.args if isinstance(t, TensExpr)]).doit() @property def dum(self): return self._index_structure.dum[:] @property def dum_in_args(self): arg_offset = self._get_position_offset_for_indices() argpos = self._get_indices_to_args_pos() return [(p1-arg_offset[p1], p2-arg_offset[p2], argpos[p1], argpos[p2]) for p1, p2 in self.dum] @property def rank(self): return len(self.free) @property def ext_rank(self): return self._ext_rank @property def index_types(self): return self._index_types[:] def equals(self, other): if other == 0: return self.coeff == 0 other = _sympify(other) if not isinstance(other, TensExpr): assert not self.components return self._coeff == other return self.canon_bp() == other.canon_bp() def get_indices(self): """ Returns the list of indices of the tensor The indices are listed in the order in which they appear in the component tensors. The dummy indices are given a name which does not collide with the names of the free indices. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2 = tensor_indices('m0,m1,m2', Lorentz) >>> g = Lorentz.metric >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> t = p(m1)*g(m0,m2) >>> t.get_indices() [m1, m0, m2] >>> t2 = p(m1)*g(-m1, m2) >>> t2.get_indices() [L_0, -L_0, m2] """ return self._indices def get_free_indices(self): """ Returns the list of free indices of the tensor The indices are listed in the order in which they appear in the component tensors. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2 = tensor_indices('m0,m1,m2', Lorentz) >>> g = Lorentz.metric >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> t = p(m1)*g(m0,m2) >>> t.get_free_indices() [m1, m0, m2] >>> t2 = p(m1)*g(-m1, m2) >>> t2.get_free_indices() [m2] """ return self._index_structure.get_free_indices() def split(self): """ Returns a list of tensors, whose product is ``self`` Dummy indices contracted among different tensor components become free indices with the same name as the one used to represent the dummy indices. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> a, b, c, d = tensor_indices('a,b,c,d', Lorentz) >>> A, B = tensorhead('A,B', [Lorentz]*2, [[1]*2]) >>> t = A(a,b)*B(-b,c) >>> t A(a, L_0)*B(-L_0, c) >>> t.split() [A(a, L_0), B(-L_0, c)] """ if self.args == (): return [self] splitp = [] res = 1 for arg in self.args: if isinstance(arg, Tensor): splitp.append(res*arg) res = 1 else: res *= arg return splitp def _expand(self, **hints): # TODO: temporary solution, in the future this should be linked to # `Expr.expand`. args = [_expand(arg, **hints) for arg in self.args] args1 = [arg.args if isinstance(arg, (Add, TensAdd)) else (arg,) for arg in args] return TensAdd(*[ TensMul(*i) for i in itertools.product(*args1)] ) def __neg__(self): return TensMul(S.NegativeOne, self, is_canon_bp=self._is_canon_bp).doit() def __getitem__(self, item): deprecate_data() return self.data[item] def _get_args_for_traditional_printer(self): args = list(self.args) if (self.coeff < 0) == True: # expressions like "-A(a)" sign = "-" if self.coeff == S.NegativeOne: args = args[1:] else: args[0] = -args[0] else: sign = "" return sign, args def _sort_args_for_sorted_components(self): """ Returns the ``args`` sorted according to the components commutation properties. The sorting is done taking into account the commutation group of the component tensors. """ cv = [arg for arg in self.args if isinstance(arg, TensExpr)] sign = 1 n = len(cv) - 1 for i in range(n): for j in range(n, i, -1): c = cv[j-1].commutes_with(cv[j]) # if `c` is `None`, it does neither commute nor anticommute, skip: if c not in [0, 1]: continue if (cv[j-1].component.types, cv[j-1].component.name) > \ (cv[j].component.types, cv[j].component.name): cv[j-1], cv[j] = cv[j], cv[j-1] # if `c` is 1, the anticommute, so change sign: if c: sign = -sign coeff = sign * self.coeff if coeff != 1: return [coeff] + cv return cv def sorted_components(self): """ Returns a tensor product with sorted components. """ return TensMul(*self._sort_args_for_sorted_components()).doit() def perm2tensor(self, g, is_canon_bp=False): """ Returns the tensor corresponding to the permutation ``g`` For further details, see the method in ``TIDS`` with the same name. """ return perm2tensor(self, g, is_canon_bp=is_canon_bp) def canon_bp(self): """ Canonicalize using the Butler-Portugal algorithm for canonicalization under monoterm symmetries. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2 = tensor_indices('m0,m1,m2', Lorentz) >>> A = tensorhead('A', [Lorentz]*2, [[2]]) >>> t = A(m0,-m1)*A(m1,-m0) >>> t.canon_bp() -A(L_0, L_1)*A(-L_0, -L_1) >>> t = A(m0,-m1)*A(m1,-m2)*A(m2,-m0) >>> t.canon_bp() 0 """ if self._is_canon_bp: return self expr = self.expand() if isinstance(expr, TensAdd): return expr.canon_bp() if not expr.components: return expr t = expr.sorted_components() g, dummies, msym = t._index_structure.indices_canon_args() v = components_canon_args(t.components) can = canonicalize(g, dummies, msym, *v) if can == 0: return S.Zero tmul = t.perm2tensor(can, True) return tmul def contract_delta(self, delta): t = self.contract_metric(delta) return t def _get_indices_to_args_pos(self): """ Get a dict mapping the index position to TensMul's argument number. """ pos_map = dict() pos_counter = 0 for arg_i, arg in enumerate(self.args): if not isinstance(arg, TensExpr): continue assert isinstance(arg, Tensor) for i in range(arg.ext_rank): pos_map[pos_counter] = arg_i pos_counter += 1 return pos_map def contract_metric(self, g): """ Raise or lower indices with the metric ``g`` Parameters ========== g : metric Notes ===== see the ``TensorIndexType`` docstring for the contraction conventions Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> m0, m1, m2 = tensor_indices('m0,m1,m2', Lorentz) >>> g = Lorentz.metric >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> t = p(m0)*q(m1)*g(-m0, -m1) >>> t.canon_bp() metric(L_0, L_1)*p(-L_0)*q(-L_1) >>> t.contract_metric(g).canon_bp() p(L_0)*q(-L_0) """ expr = self.expand() if self != expr: expr = expr.canon_bp() return expr.contract_metric(g) pos_map = self._get_indices_to_args_pos() args = list(self.args) antisym = g.index_types[0].metric_antisym # list of positions of the metric ``g`` inside ``args`` gpos = [i for i, x in enumerate(self.args) if isinstance(x, Tensor) and x.component == g] if not gpos: return self # Sign is either 1 or -1, to correct the sign after metric contraction # (for spinor indices). sign = 1 dum = self.dum[:] free = self.free[:] elim = set() for gposx in gpos: if gposx in elim: continue free1 = [x for x in free if pos_map[x[1]] == gposx] dum1 = [x for x in dum if pos_map[x[0]] == gposx or pos_map[x[1]] == gposx] if not dum1: continue elim.add(gposx) # subs with the multiplication neutral element, that is, remove it: args[gposx] = 1 if len(dum1) == 2: if not antisym: dum10, dum11 = dum1 if pos_map[dum10[1]] == gposx: # the index with pos p0 contravariant p0 = dum10[0] else: # the index with pos p0 is covariant p0 = dum10[1] if pos_map[dum11[1]] == gposx: # the index with pos p1 is contravariant p1 = dum11[0] else: # the index with pos p1 is covariant p1 = dum11[1] dum.append((p0, p1)) else: dum10, dum11 = dum1 # change the sign to bring the indices of the metric to contravariant # form; change the sign if dum10 has the metric index in position 0 if pos_map[dum10[1]] == gposx: # the index with pos p0 is contravariant p0 = dum10[0] if dum10[1] == 1: sign = -sign else: # the index with pos p0 is covariant p0 = dum10[1] if dum10[0] == 0: sign = -sign if pos_map[dum11[1]] == gposx: # the index with pos p1 is contravariant p1 = dum11[0] sign = -sign else: # the index with pos p1 is covariant p1 = dum11[1] dum.append((p0, p1)) elif len(dum1) == 1: if not antisym: dp0, dp1 = dum1[0] if pos_map[dp0] == pos_map[dp1]: # g(i, -i) typ = g.index_types[0] if typ._dim is None: raise ValueError('dimension not assigned') sign = sign*typ._dim else: # g(i0, i1)*p(-i1) if pos_map[dp0] == gposx: p1 = dp1 else: p1 = dp0 ind, p = free1[0] free.append((ind, p1)) else: dp0, dp1 = dum1[0] if pos_map[dp0] == pos_map[dp1]: # g(i, -i) typ = g.index_types[0] if typ._dim is None: raise ValueError('dimension not assigned') sign = sign*typ._dim if dp0 < dp1: # g(i, -i) = -D with antisymmetric metric sign = -sign else: # g(i0, i1)*p(-i1) if pos_map[dp0] == gposx: p1 = dp1 if dp0 == 0: sign = -sign else: p1 = dp0 ind, p = free1[0] free.append((ind, p1)) dum = [x for x in dum if x not in dum1] free = [x for x in free if x not in free1] # shift positions: shift = 0 shifts = [0]*len(args) for i in range(len(args)): if i in elim: shift += 2 continue shifts[i] = shift free = [(ind, p - shifts[pos_map[p]]) for (ind, p) in free if pos_map[p] not in elim] dum = [(p0 - shifts[pos_map[p0]], p1 - shifts[pos_map[p1]]) for i, (p0, p1) in enumerate(dum) if pos_map[p0] not in elim and pos_map[p1] not in elim] res = sign*TensMul(*args).doit() if not isinstance(res, TensExpr): return res im = _IndexStructure.from_components_free_dum(res.components, free, dum) return res._set_new_index_structure(im) def _set_new_index_structure(self, im, is_canon_bp=False): indices = im.get_indices() return self._set_indices(*indices, is_canon_bp=is_canon_bp) def _set_indices(self, *indices, **kw_args): if len(indices) != self.ext_rank: raise ValueError("indices length mismatch") args = list(self.args)[:] pos = 0 is_canon_bp = kw_args.pop('is_canon_bp', False) for i, arg in enumerate(args): if not isinstance(arg, TensExpr): continue assert isinstance(arg, Tensor) ext_rank = arg.ext_rank args[i] = arg._set_indices(*indices[pos:pos+ext_rank]) pos += ext_rank return TensMul(*args, is_canon_bp=is_canon_bp).doit() @staticmethod def _index_replacement_for_contract_metric(args, free, dum): for arg in args: if not isinstance(arg, TensExpr): continue assert isinstance(arg, Tensor) def substitute_indices(self, *index_tuples): return substitute_indices(self, *index_tuples) def __call__(self, *indices): """Returns tensor product with ordered free indices replaced by ``indices`` Examples ======== >>> from sympy import Symbol >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> D = Symbol('D') >>> Lorentz = TensorIndexType('Lorentz', dim=D, dummy_fmt='L') >>> i0,i1,i2,i3,i4 = tensor_indices('i0:5', Lorentz) >>> g = Lorentz.metric >>> p, q = tensorhead('p,q', [Lorentz], [[1]]) >>> t = p(i0)*q(i1)*q(-i1) >>> t(i1) p(i1)*q(L_0)*q(-L_0) """ free_args = self.free_args indices = list(indices) if [x.tensor_index_type for x in indices] != [x.tensor_index_type for x in free_args]: raise ValueError('incompatible types') if indices == free_args: return self t = self.fun_eval(*list(zip(free_args, indices))) # object is rebuilt in order to make sure that all contracted indices # get recognized as dummies, but only if there are contracted indices. if len(set(i if i.is_up else -i for i in indices)) != len(indices): return t.func(*t.args) return t def _extract_data(self, replacement_dict): args_indices, arrays = zip(*[arg._extract_data(replacement_dict) for arg in self.args if isinstance(arg, TensExpr)]) coeff = reduce(operator.mul, [a for a in self.args if not isinstance(a, TensExpr)], S.One) indices, free, free_names, dummy_data = TensMul._indices_to_free_dum(args_indices) dum = TensMul._dummy_data_to_dum(dummy_data) ext_rank = self.ext_rank free.sort(key=lambda x: x[1]) free_indices = [i[0] for i in free] return free_indices, coeff*_TensorDataLazyEvaluator.data_contract_dum(arrays, dum, ext_rank) @property def data(self): deprecate_data() dat = _tensor_data_substitution_dict[self.expand()] return dat @data.setter def data(self, data): deprecate_data() raise ValueError("Not possible to set component data to a tensor expression") @data.deleter def data(self): deprecate_data() raise ValueError("Not possible to delete component data to a tensor expression") def __iter__(self): deprecate_data() if self.data is None: raise ValueError("No iteration on abstract tensors") return self.data.__iter__() def _eval_rewrite_as_Indexed(self, *args): from sympy import Sum index_symbols = [i.args[0] for i in self.get_indices()] args = [arg.args[0] if isinstance(arg, Sum) else arg for arg in args] expr = Mul.fromiter(args) return self._check_add_Sum(expr, index_symbols) class TensorElement(TensExpr): """ Tensor with evaluated components. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensorhead >>> from sympy import symbols >>> L = TensorIndexType("L") >>> i, j, k = symbols("i j k") >>> A = tensorhead("A", [L, L], [[1], [1]]) >>> A(i, j).get_free_indices() [i, j] If we want to set component ``i`` to a specific value, use the ``TensorElement`` class: >>> from sympy.tensor.tensor import TensorElement >>> te = TensorElement(A(i, j), {i: 2}) As index ``i`` has been accessed (``{i: 2}`` is the evaluation of its 3rd element), the free indices will only contain ``j``: >>> te.get_free_indices() [j] """ def __new__(cls, expr, index_map): if not isinstance(expr, Tensor): # remap if not isinstance(expr, TensExpr): raise TypeError("%s is not a tensor expression" % expr) return expr.func(*[TensorElement(arg, index_map) for arg in expr.args]) expr_free_indices = expr.get_free_indices() name_translation = {i.args[0]: i for i in expr_free_indices} index_map = {name_translation.get(index, index): value for index, value in index_map.items()} index_map = {index: value for index, value in index_map.items() if index in expr_free_indices} if len(index_map) == 0: return expr free_indices = [i for i in expr_free_indices if i not in index_map.keys()] index_map = Dict(index_map) obj = TensExpr.__new__(cls, expr, index_map) obj._free_indices = free_indices return obj @property def free(self): return [(index, i) for i, index in enumerate(self.get_free_indices())] @property def dum(self): # TODO: inherit dummies from expr return [] @property def expr(self): return self._args[0] @property def index_map(self): return self._args[1] def get_free_indices(self): return self._free_indices def get_indices(self): return self.get_free_indices() def _extract_data(self, replacement_dict): ret_indices, array = self.expr._extract_data(replacement_dict) index_map = self.index_map slice_tuple = tuple(index_map.get(i, slice(None)) for i in ret_indices) ret_indices = [i for i in ret_indices if i not in index_map] array = array.__getitem__(slice_tuple) return ret_indices, array def canon_bp(p): """ Butler-Portugal canonicalization. See ``tensor_can.py`` from the combinatorics module for the details. """ if isinstance(p, TensExpr): return p.canon_bp() return p def tensor_mul(*a): """ product of tensors """ if not a: return TensMul.from_data(S.One, [], [], []) t = a[0] for tx in a[1:]: t = t*tx return t def riemann_cyclic_replace(t_r): """ replace Riemann tensor with an equivalent expression ``R(m,n,p,q) -> 2/3*R(m,n,p,q) - 1/3*R(m,q,n,p) + 1/3*R(m,p,n,q)`` """ free = sorted(t_r.free, key=lambda x: x[1]) m, n, p, q = [x[0] for x in free] t0 = S(2)/3*t_r t1 = - S(1)/3*t_r.substitute_indices((m,m),(n,q),(p,n),(q,p)) t2 = S(1)/3*t_r.substitute_indices((m,m),(n,p),(p,n),(q,q)) t3 = t0 + t1 + t2 return t3 def riemann_cyclic(t2): """ replace each Riemann tensor with an equivalent expression satisfying the cyclic identity. This trick is discussed in the reference guide to Cadabra. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead, riemann_cyclic >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i, j, k, l = tensor_indices('i,j,k,l', Lorentz) >>> R = tensorhead('R', [Lorentz]*4, [[2, 2]]) >>> t = R(i,j,k,l)*(R(-i,-j,-k,-l) - 2*R(-i,-k,-j,-l)) >>> riemann_cyclic(t) 0 """ t2 = t2.expand() if isinstance(t2, (TensMul, Tensor)): args = [t2] else: args = t2.args a1 = [x.split() for x in args] a2 = [[riemann_cyclic_replace(tx) for tx in y] for y in a1] a3 = [tensor_mul(*v) for v in a2] t3 = TensAdd(*a3).doit() if not t3: return t3 else: return canon_bp(t3) def get_lines(ex, index_type): """ returns ``(lines, traces, rest)`` for an index type, where ``lines`` is the list of list of positions of a matrix line, ``traces`` is the list of list of traced matrix lines, ``rest`` is the rest of the elements ot the tensor. """ def _join_lines(a): i = 0 while i < len(a): x = a[i] xend = x[-1] xstart = x[0] hit = True while hit: hit = False for j in range(i + 1, len(a)): if j >= len(a): break if a[j][0] == xend: hit = True x.extend(a[j][1:]) xend = x[-1] a.pop(j) continue if a[j][0] == xstart: hit = True a[i] = reversed(a[j][1:]) + x x = a[i] xstart = a[i][0] a.pop(j) continue if a[j][-1] == xend: hit = True x.extend(reversed(a[j][:-1])) xend = x[-1] a.pop(j) continue if a[j][-1] == xstart: hit = True a[i] = a[j][:-1] + x x = a[i] xstart = x[0] a.pop(j) continue i += 1 return a arguments = ex.args dt = {} for c in ex.args: if not isinstance(c, TensExpr): continue if c in dt: continue index_types = c.index_types a = [] for i in range(len(index_types)): if index_types[i] is index_type: a.append(i) if len(a) > 2: raise ValueError('at most two indices of type %s allowed' % index_type) if len(a) == 2: dt[c] = a #dum = ex.dum lines = [] traces = [] traces1 = [] #indices_to_args_pos = ex._get_indices_to_args_pos() # TODO: add a dum_to_components_map ? for p0, p1, c0, c1 in ex.dum_in_args: if arguments[c0] not in dt: continue if c0 == c1: traces.append([c0]) continue ta0 = dt[arguments[c0]] ta1 = dt[arguments[c1]] if p0 not in ta0: continue if ta0.index(p0) == ta1.index(p1): # case gamma(i,s0,-s1) in c0, gamma(j,-s0,s2) in c1; # to deal with this case one could add to the position # a flag for transposition; # one could write [(c0, False), (c1, True)] raise NotImplementedError # if p0 == ta0[1] then G in pos c0 is mult on the right by G in c1 # if p0 == ta0[0] then G in pos c1 is mult on the right by G in c0 ta0 = dt[arguments[c0]] b0, b1 = (c0, c1) if p0 == ta0[1] else (c1, c0) lines1 = lines[:] for line in lines: if line[-1] == b0: if line[0] == b1: n = line.index(min(line)) traces1.append(line) traces.append(line[n:] + line[:n]) else: line.append(b1) break elif line[0] == b1: line.insert(0, b0) break else: lines1.append([b0, b1]) lines = [x for x in lines1 if x not in traces1] lines = _join_lines(lines) rest = [] for line in lines: for y in line: rest.append(y) for line in traces: for y in line: rest.append(y) rest = [x for x in range(len(arguments)) if x not in rest] return lines, traces, rest def get_free_indices(t): if not isinstance(t, TensExpr): return () return t.get_free_indices() def get_indices(t): if not isinstance(t, TensExpr): return () return t.get_indices() def get_index_structure(t): if isinstance(t, TensExpr): return t._index_structure return _IndexStructure([], [], [], []) def get_coeff(t): if isinstance(t, Tensor): return S.One if isinstance(t, TensMul): return t.coeff if isinstance(t, TensExpr): raise ValueError("no coefficient associated to this tensor expression") return t def contract_metric(t, g): if isinstance(t, TensExpr): return t.contract_metric(g) return t def perm2tensor(t, g, is_canon_bp=False): """ Returns the tensor corresponding to the permutation ``g`` For further details, see the method in ``TIDS`` with the same name. """ if not isinstance(t, TensExpr): return t elif isinstance(t, (Tensor, TensMul)): nim = get_index_structure(t).perm2tensor(g, is_canon_bp=is_canon_bp) res = t._set_new_index_structure(nim, is_canon_bp=is_canon_bp) if g[-1] != len(g) - 1: return -res return res raise NotImplementedError() def substitute_indices(t, *index_tuples): """ Return a tensor with free indices substituted according to ``index_tuples`` ``index_types`` list of tuples ``(old_index, new_index)`` Note: this method will neither raise or lower the indices, it will just replace their symbol. Examples ======== >>> from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensorhead >>> Lorentz = TensorIndexType('Lorentz', dummy_fmt='L') >>> i, j, k, l = tensor_indices('i,j,k,l', Lorentz) >>> A, B = tensorhead('A,B', [Lorentz]*2, [[1]*2]) >>> t = A(i, k)*B(-k, -j); t A(i, L_0)*B(-L_0, -j) >>> t.substitute_indices((i,j), (j, k)) A(j, L_0)*B(-L_0, -k) """ if not isinstance(t, TensExpr): return t free = t.free free1 = [] for j, ipos in free: for i, v in index_tuples: if i._name == j._name and i.tensor_index_type == j.tensor_index_type: if i._is_up == j._is_up: free1.append((v, ipos)) else: free1.append((-v, ipos)) break else: free1.append((j, ipos)) t = TensMul.from_data(t.coeff, t.components, free1, t.dum) return t def _expand(expr, **kwargs): if isinstance(expr, TensExpr): return expr._expand(**kwargs) else: return expr.expand(**kwargs)

6f8904be13733681d202b928fc62c6971bd6522fb607014c3b590825608970a2

"""Module with functions operating on IndexedBase, Indexed and Idx objects - Check shape conformance - Determine indices in resulting expression etc. Methods in this module could be implemented by calling methods on Expr objects instead. When things stabilize this could be a useful refactoring. """ from __future__ import print_function, division from sympy.core.compatibility import reduce from sympy.core.function import Function from sympy.functions import exp, Piecewise from sympy.tensor.indexed import Idx, Indexed from sympy.utilities import sift from collections import OrderedDict class IndexConformanceException(Exception): pass def _unique_and_repeated(inds): """ Returns the unique and repeated indices. Also note, from the examples given below that the order of indices is maintained as given in the input. Examples ======== >>> from sympy.tensor.index_methods import _unique_and_repeated >>> _unique_and_repeated([2, 3, 1, 3, 0, 4, 0]) ([2, 1, 4], [3, 0]) """ uniq = OrderedDict() for i in inds: if i in uniq: uniq[i] = 0 else: uniq[i] = 1 return sift(uniq, lambda x: uniq[x], binary=True) def _remove_repeated(inds): """ Removes repeated objects from sequences Returns a set of the unique objects and a tuple of all that have been removed. Examples ======== >>> from sympy.tensor.index_methods import _remove_repeated >>> l1 = [1, 2, 3, 2] >>> _remove_repeated(l1) ({1, 3}, (2,)) """ u, r = _unique_and_repeated(inds) return set(u), tuple(r) def _get_indices_Mul(expr, return_dummies=False): """Determine the outer indices of a Mul object. Examples ======== >>> from sympy.tensor.index_methods import _get_indices_Mul >>> from sympy.tensor.indexed import IndexedBase, Idx >>> i, j, k = map(Idx, ['i', 'j', 'k']) >>> x = IndexedBase('x') >>> y = IndexedBase('y') >>> _get_indices_Mul(x[i, k]*y[j, k]) ({i, j}, {}) >>> _get_indices_Mul(x[i, k]*y[j, k], return_dummies=True) ({i, j}, {}, (k,)) """ inds = list(map(get_indices, expr.args)) inds, syms = list(zip(*inds)) inds = list(map(list, inds)) inds = list(reduce(lambda x, y: x + y, inds)) inds, dummies = _remove_repeated(inds) symmetry = {} for s in syms: for pair in s: if pair in symmetry: symmetry[pair] *= s[pair] else: symmetry[pair] = s[pair] if return_dummies: return inds, symmetry, dummies else: return inds, symmetry def _get_indices_Pow(expr): """Determine outer indices of a power or an exponential. A power is considered a universal function, so that the indices of a Pow is just the collection of indices present in the expression. This may be viewed as a bit inconsistent in the special case: x[i]**2 = x[i]*x[i] (1) The above expression could have been interpreted as the contraction of x[i] with itself, but we choose instead to interpret it as a function lambda y: y**2 applied to each element of x (a universal function in numpy terms). In order to allow an interpretation of (1) as a contraction, we need contravariant and covariant Idx subclasses. (FIXME: this is not yet implemented) Expressions in the base or exponent are subject to contraction as usual, but an index that is present in the exponent, will not be considered contractable with its own base. Note however, that indices in the same exponent can be contracted with each other. Examples ======== >>> from sympy.tensor.index_methods import _get_indices_Pow >>> from sympy import Pow, exp, IndexedBase, Idx >>> A = IndexedBase('A') >>> x = IndexedBase('x') >>> i, j, k = map(Idx, ['i', 'j', 'k']) >>> _get_indices_Pow(exp(A[i, j]*x[j])) ({i}, {}) >>> _get_indices_Pow(Pow(x[i], x[i])) ({i}, {}) >>> _get_indices_Pow(Pow(A[i, j]*x[j], x[i])) ({i}, {}) """ base, exp = expr.as_base_exp() binds, bsyms = get_indices(base) einds, esyms = get_indices(exp) inds = binds | einds # FIXME: symmetries from power needs to check special cases, else nothing symmetries = {} return inds, symmetries def _get_indices_Add(expr): """Determine outer indices of an Add object. In a sum, each term must have the same set of outer indices. A valid expression could be x(i)*y(j) - x(j)*y(i) But we do not allow expressions like: x(i)*y(j) - z(j)*z(j) FIXME: Add support for Numpy broadcasting Examples ======== >>> from sympy.tensor.index_methods import _get_indices_Add >>> from sympy.tensor.indexed import IndexedBase, Idx >>> i, j, k = map(Idx, ['i', 'j', 'k']) >>> x = IndexedBase('x') >>> y = IndexedBase('y') >>> _get_indices_Add(x[i] + x[k]*y[i, k]) ({i}, {}) """ inds = list(map(get_indices, expr.args)) inds, syms = list(zip(*inds)) # allow broadcast of scalars non_scalars = [x for x in inds if x != set()] if not non_scalars: return set(), {} if not all([x == non_scalars[0] for x in non_scalars[1:]]): raise IndexConformanceException("Indices are not consistent: %s" % expr) if not reduce(lambda x, y: x != y or y, syms): symmetries = syms[0] else: # FIXME: search for symmetries symmetries = {} return non_scalars[0], symmetries def get_indices(expr): """Determine the outer indices of expression ``expr`` By *outer* we mean indices that are not summation indices. Returns a set and a dict. The set contains outer indices and the dict contains information about index symmetries. Examples ======== >>> from sympy.tensor.index_methods import get_indices >>> from sympy import symbols >>> from sympy.tensor import IndexedBase, Idx >>> x, y, A = map(IndexedBase, ['x', 'y', 'A']) >>> i, j, a, z = symbols('i j a z', integer=True) The indices of the total expression is determined, Repeated indices imply a summation, for instance the trace of a matrix A: >>> get_indices(A[i, i]) (set(), {}) In the case of many terms, the terms are required to have identical outer indices. Else an IndexConformanceException is raised. >>> get_indices(x[i] + A[i, j]*y[j]) ({i}, {}) :Exceptions: An IndexConformanceException means that the terms ar not compatible, e.g. >>> get_indices(x[i] + y[j]) #doctest: +SKIP (...) IndexConformanceException: Indices are not consistent: x(i) + y(j) .. warning:: The concept of *outer* indices applies recursively, starting on the deepest level. This implies that dummies inside parenthesis are assumed to be summed first, so that the following expression is handled gracefully: >>> get_indices((x[i] + A[i, j]*y[j])*x[j]) ({i, j}, {}) This is correct and may appear convenient, but you need to be careful with this as SymPy will happily .expand() the product, if requested. The resulting expression would mix the outer ``j`` with the dummies inside the parenthesis, which makes it a different expression. To be on the safe side, it is best to avoid such ambiguities by using unique indices for all contractions that should be held separate. """ # We call ourself recursively to determine indices of sub expressions. # break recursion if isinstance(expr, Indexed): c = expr.indices inds, dummies = _remove_repeated(c) return inds, {} elif expr is None: return set(), {} elif isinstance(expr, Idx): return {expr}, {} elif expr.is_Atom: return set(), {} # recurse via specialized functions else: if expr.is_Mul: return _get_indices_Mul(expr) elif expr.is_Add: return _get_indices_Add(expr) elif expr.is_Pow or isinstance(expr, exp): return _get_indices_Pow(expr) elif isinstance(expr, Piecewise): # FIXME: No support for Piecewise yet return set(), {} elif isinstance(expr, Function): # Support ufunc like behaviour by returning indices from arguments. # Functions do not interpret repeated indices across argumnts # as summation ind0 = set() for arg in expr.args: ind, sym = get_indices(arg) ind0 |= ind return ind0, sym # this test is expensive, so it should be at the end elif not expr.has(Indexed): return set(), {} raise NotImplementedError( "FIXME: No specialized handling of type %s" % type(expr)) def get_contraction_structure(expr): """Determine dummy indices of ``expr`` and describe its structure By *dummy* we mean indices that are summation indices. The structure of the expression is determined and described as follows: 1) A conforming summation of Indexed objects is described with a dict where the keys are summation indices and the corresponding values are sets containing all terms for which the summation applies. All Add objects in the SymPy expression tree are described like this. 2) For all nodes in the SymPy expression tree that are *not* of type Add, the following applies: If a node discovers contractions in one of its arguments, the node itself will be stored as a key in the dict. For that key, the corresponding value is a list of dicts, each of which is the result of a recursive call to get_contraction_structure(). The list contains only dicts for the non-trivial deeper contractions, omitting dicts with None as the one and only key. .. Note:: The presence of expressions among the dictionary keys indicates multiple levels of index contractions. A nested dict displays nested contractions and may itself contain dicts from a deeper level. In practical calculations the summation in the deepest nested level must be calculated first so that the outer expression can access the resulting indexed object. Examples ======== >>> from sympy.tensor.index_methods import get_contraction_structure >>> from sympy import symbols, default_sort_key >>> from sympy.tensor import IndexedBase, Idx >>> x, y, A = map(IndexedBase, ['x', 'y', 'A']) >>> i, j, k, l = map(Idx, ['i', 'j', 'k', 'l']) >>> get_contraction_structure(x[i]*y[i] + A[j, j]) {(i,): {x[i]*y[i]}, (j,): {A[j, j]}} >>> get_contraction_structure(x[i]*y[j]) {None: {x[i]*y[j]}} A multiplication of contracted factors results in nested dicts representing the internal contractions. >>> d = get_contraction_structure(x[i, i]*y[j, j]) >>> sorted(d.keys(), key=default_sort_key) [None, x[i, i]*y[j, j]] In this case, the product has no contractions: >>> d[None] {x[i, i]*y[j, j]} Factors are contracted "first": >>> sorted(d[x[i, i]*y[j, j]], key=default_sort_key) [{(i,): {x[i, i]}}, {(j,): {y[j, j]}}] A parenthesized Add object is also returned as a nested dictionary. The term containing the parenthesis is a Mul with a contraction among the arguments, so it will be found as a key in the result. It stores the dictionary resulting from a recursive call on the Add expression. >>> d = get_contraction_structure(x[i]*(y[i] + A[i, j]*x[j])) >>> sorted(d.keys(), key=default_sort_key) [(A[i, j]*x[j] + y[i])*x[i], (i,)] >>> d[(i,)] {(A[i, j]*x[j] + y[i])*x[i]} >>> d[x[i]*(A[i, j]*x[j] + y[i])] [{None: {y[i]}, (j,): {A[i, j]*x[j]}}] Powers with contractions in either base or exponent will also be found as keys in the dictionary, mapping to a list of results from recursive calls: >>> d = get_contraction_structure(A[j, j]**A[i, i]) >>> d[None] {A[j, j]**A[i, i]} >>> nested_contractions = d[A[j, j]**A[i, i]] >>> nested_contractions[0] {(j,): {A[j, j]}} >>> nested_contractions[1] {(i,): {A[i, i]}} The description of the contraction structure may appear complicated when represented with a string in the above examples, but it is easy to iterate over: >>> from sympy import Expr >>> for key in d: ... if isinstance(key, Expr): ... continue ... for term in d[key]: ... if term in d: ... # treat deepest contraction first ... pass ... # treat outermost contactions here """ # We call ourself recursively to inspect sub expressions. if isinstance(expr, Indexed): junk, key = _remove_repeated(expr.indices) return {key or None: {expr}} elif expr.is_Atom: return {None: {expr}} elif expr.is_Mul: junk, junk, key = _get_indices_Mul(expr, return_dummies=True) result = {key or None: {expr}} # recurse on every factor nested = [] for fac in expr.args: facd = get_contraction_structure(fac) if not (None in facd and len(facd) == 1): nested.append(facd) if nested: result[expr] = nested return result elif expr.is_Pow or isinstance(expr, exp): # recurse in base and exp separately. If either has internal # contractions we must include ourselves as a key in the returned dict b, e = expr.as_base_exp() dbase = get_contraction_structure(b) dexp = get_contraction_structure(e) dicts = [] for d in dbase, dexp: if not (None in d and len(d) == 1): dicts.append(d) result = {None: {expr}} if dicts: result[expr] = dicts return result elif expr.is_Add: # Note: we just collect all terms with identical summation indices, We # do nothing to identify equivalent terms here, as this would require # substitutions or pattern matching in expressions of unknown # complexity. result = {} for term in expr.args: # recurse on every term d = get_contraction_structure(term) for key in d: if key in result: result[key] |= d[key] else: result[key] = d[key] return result elif isinstance(expr, Piecewise): # FIXME: No support for Piecewise yet return {None: expr} elif isinstance(expr, Function): # Collect non-trivial contraction structures in each argument # We do not report repeated indices in separate arguments as a # contraction deeplist = [] for arg in expr.args: deep = get_contraction_structure(arg) if not (None in deep and len(deep) == 1): deeplist.append(deep) d = {None: {expr}} if deeplist: d[expr] = deeplist return d # this test is expensive, so it should be at the end elif not expr.has(Indexed): return {None: {expr}} raise NotImplementedError( "FIXME: No specialized handling of type %s" % type(expr))

c904cf01cd9997961b7965d27e4c8be0fac160999d5bc4a5a951a0dc5650fa22

""" Boolean algebra module for SymPy """ from __future__ import print_function, division from collections import defaultdict from itertools import combinations, product from sympy.core.add import Add from sympy.core.basic import Basic from sympy.core.cache import cacheit from sympy.core.compatibility import (ordered, range, with_metaclass, as_int) from sympy.core.function import Application, Derivative, count_ops from sympy.core.numbers import Number from sympy.core.operations import LatticeOp from sympy.core.singleton import Singleton, S from sympy.core.sympify import converter, _sympify, sympify from sympy.utilities.iterables import sift, ibin from sympy.utilities.misc import filldedent def as_Boolean(e): """Like bool, return the Boolean value of an expression, e, which can be any instance of Boolean or bool. Examples ======== >>> from sympy import true, false, nan >>> from sympy.logic.boolalg import as_Boolean >>> from sympy.abc import x >>> as_Boolean(1) is true True >>> as_Boolean(x) x >>> as_Boolean(2) Traceback (most recent call last): ... TypeError: expecting bool or Boolean, not `2`. """ from sympy.core.symbol import Symbol if e == True: return S.true if e == False: return S.false if isinstance(e, Symbol): z = e.is_zero if z is None: return e return S.false if z else S.true if isinstance(e, Boolean): return e raise TypeError('expecting bool or Boolean, not `%s`.' % e) class Boolean(Basic): """A boolean object is an object for which logic operations make sense.""" __slots__ = [] def __and__(self, other): """Overloading for & operator""" return And(self, other) __rand__ = __and__ def __or__(self, other): """Overloading for |""" return Or(self, other) __ror__ = __or__ def __invert__(self): """Overloading for ~""" return Not(self) def __rshift__(self, other): """Overloading for >>""" return Implies(self, other) def __lshift__(self, other): """Overloading for <<""" return Implies(other, self) __rrshift__ = __lshift__ __rlshift__ = __rshift__ def __xor__(self, other): return Xor(self, other) __rxor__ = __xor__ def equals(self, other): """ Returns True if the given formulas have the same truth table. For two formulas to be equal they must have the same literals. Examples ======== >>> from sympy.abc import A, B, C >>> from sympy.logic.boolalg import And, Or, Not >>> (A >> B).equals(~B >> ~A) True >>> Not(And(A, B, C)).equals(And(Not(A), Not(B), Not(C))) False >>> Not(And(A, Not(A))).equals(Or(B, Not(B))) False """ from sympy.logic.inference import satisfiable from sympy.core.relational import Relational if self.has(Relational) or other.has(Relational): raise NotImplementedError('handling of relationals') return self.atoms() == other.atoms() and \ not satisfiable(Not(Equivalent(self, other))) def to_nnf(self, simplify=True): # override where necessary return self def as_set(self): """ Rewrites Boolean expression in terms of real sets. Examples ======== >>> from sympy import Symbol, Eq, Or, And >>> x = Symbol('x', real=True) >>> Eq(x, 0).as_set() {0} >>> (x > 0).as_set() Interval.open(0, oo) >>> And(-2 < x, x < 2).as_set() Interval.open(-2, 2) >>> Or(x < -2, 2 < x).as_set() Union(Interval.open(-oo, -2), Interval.open(2, oo)) """ from sympy.calculus.util import periodicity from sympy.core.relational import Relational free = self.free_symbols if len(free) == 1: x = free.pop() reps = {} for r in self.atoms(Relational): if periodicity(r, x) not in (0, None): s = r._eval_as_set() if s in (S.EmptySet, S.UniversalSet, S.Reals): reps[r] = s.as_relational(x) continue raise NotImplementedError(filldedent(''' as_set is not implemented for relationals with periodic solutions ''')) return self.subs(reps)._eval_as_set() else: raise NotImplementedError("Sorry, as_set has not yet been" " implemented for multivariate" " expressions") @property def binary_symbols(self): from sympy.core.relational import Eq, Ne return set().union(*[i.binary_symbols for i in self.args if i.is_Boolean or i.is_Symbol or isinstance(i, (Eq, Ne))]) class BooleanAtom(Boolean): """ Base class of BooleanTrue and BooleanFalse. """ is_Boolean = True is_Atom = True _op_priority = 11 # higher than Expr def simplify(self, *a, **kw): return self def expand(self, *a, **kw): return self @property def canonical(self): return self def _noop(self, other=None): raise TypeError('BooleanAtom not allowed in this context.') __add__ = _noop __radd__ = _noop __sub__ = _noop __rsub__ = _noop __mul__ = _noop __rmul__ = _noop __pow__ = _noop __rpow__ = _noop __rdiv__ = _noop __truediv__ = _noop __div__ = _noop __rtruediv__ = _noop __mod__ = _noop __rmod__ = _noop _eval_power = _noop # /// drop when Py2 is no longer supported def __lt__(self, other): from sympy.utilities.misc import filldedent raise TypeError(filldedent(''' A Boolean argument can only be used in Eq and Ne; all other relationals expect real expressions. ''')) __le__ = __lt__ __gt__ = __lt__ __ge__ = __lt__ # \\\ class BooleanTrue(with_metaclass(Singleton, BooleanAtom)): """ SymPy version of True, a singleton that can be accessed via S.true. This is the SymPy version of True, for use in the logic module. The primary advantage of using true instead of True is that shorthand boolean operations like ~ and >> will work as expected on this class, whereas with True they act bitwise on 1. Functions in the logic module will return this class when they evaluate to true. Notes ===== There is liable to be some confusion as to when ``True`` should be used and when ``S.true`` should be used in various contexts throughout SymPy. An important thing to remember is that ``sympify(True)`` returns ``S.true``. This means that for the most part, you can just use ``True`` and it will automatically be converted to ``S.true`` when necessary, similar to how you can generally use 1 instead of ``S.One``. The rule of thumb is: "If the boolean in question can be replaced by an arbitrary symbolic ``Boolean``, like ``Or(x, y)`` or ``x > 1``, use ``S.true``. Otherwise, use ``True``" In other words, use ``S.true`` only on those contexts where the boolean is being used as a symbolic representation of truth. For example, if the object ends up in the ``.args`` of any expression, then it must necessarily be ``S.true`` instead of ``True``, as elements of ``.args`` must be ``Basic``. On the other hand, ``==`` is not a symbolic operation in SymPy, since it always returns ``True`` or ``False``, and does so in terms of structural equality rather than mathematical, so it should return ``True``. The assumptions system should use ``True`` and ``False``. Aside from not satisfying the above rule of thumb, the assumptions system uses a three-valued logic (``True``, ``False``, ``None``), whereas ``S.true`` and ``S.false`` represent a two-valued logic. When in doubt, use ``True``. "``S.true == True is True``." While "``S.true is True``" is ``False``, "``S.true == True``" is ``True``, so if there is any doubt over whether a function or expression will return ``S.true`` or ``True``, just use ``==`` instead of ``is`` to do the comparison, and it will work in either case. Finally, for boolean flags, it's better to just use ``if x`` instead of ``if x is True``. To quote PEP 8: Don't compare boolean values to ``True`` or ``False`` using ``==``. * Yes: ``if greeting:`` * No: ``if greeting == True:`` * Worse: ``if greeting is True:`` Examples ======== >>> from sympy import sympify, true, false, Or >>> sympify(True) True >>> _ is True, _ is true (False, True) >>> Or(true, false) True >>> _ is true True Python operators give a boolean result for true but a bitwise result for True >>> ~true, ~True (False, -2) >>> true >> true, True >> True (True, 0) Python operators give a boolean result for true but a bitwise result for True >>> ~true, ~True (False, -2) >>> true >> true, True >> True (True, 0) See Also ======== sympy.logic.boolalg.BooleanFalse """ def __nonzero__(self): return True __bool__ = __nonzero__ def __hash__(self): return hash(True) @property def negated(self): return S.false def as_set(self): """ Rewrite logic operators and relationals in terms of real sets. Examples ======== >>> from sympy import true >>> true.as_set() UniversalSet """ return S.UniversalSet class BooleanFalse(with_metaclass(Singleton, BooleanAtom)): """ SymPy version of False, a singleton that can be accessed via S.false. This is the SymPy version of False, for use in the logic module. The primary advantage of using false instead of False is that shorthand boolean operations like ~ and >> will work as expected on this class, whereas with False they act bitwise on 0. Functions in the logic module will return this class when they evaluate to false. Notes ====== See note in :py:class`sympy.logic.boolalg.BooleanTrue` Examples ======== >>> from sympy import sympify, true, false, Or >>> sympify(False) False >>> _ is False, _ is false (False, True) >>> Or(true, false) True >>> _ is true True Python operators give a boolean result for false but a bitwise result for False >>> ~false, ~False (True, -1) >>> false >> false, False >> False (True, 0) See Also ======== sympy.logic.boolalg.BooleanTrue """ def __nonzero__(self): return False __bool__ = __nonzero__ def __hash__(self): return hash(False) @property def negated(self): return S.true def as_set(self): """ Rewrite logic operators and relationals in terms of real sets. Examples ======== >>> from sympy import false >>> false.as_set() EmptySet() """ return S.EmptySet true = BooleanTrue() false = BooleanFalse() # We want S.true and S.false to work, rather than S.BooleanTrue and # S.BooleanFalse, but making the class and instance names the same causes some # major issues (like the inability to import the class directly from this # file). S.true = true S.false = false converter[bool] = lambda x: S.true if x else S.false class BooleanFunction(Application, Boolean): """Boolean function is a function that lives in a boolean space It is used as base class for And, Or, Not, etc. """ is_Boolean = True def _eval_simplify(self, **kwargs): rv = self.func(*[ a._eval_simplify(**kwargs) for a in self.args]) return simplify_logic(rv) def simplify(self, **kwargs): from sympy.simplify.simplify import simplify return simplify(self, **kwargs) # /// drop when Py2 is no longer supported def __lt__(self, other): from sympy.utilities.misc import filldedent raise TypeError(filldedent(''' A Boolean argument can only be used in Eq and Ne; all other relationals expect real expressions. ''')) __le__ = __lt__ __ge__ = __lt__ __gt__ = __lt__ # \\\ @classmethod def binary_check_and_simplify(self, *args): from sympy.core.relational import Relational, Eq, Ne args = [as_Boolean(i) for i in args] bin = set().union(*[i.binary_symbols for i in args]) rel = set().union(*[i.atoms(Relational) for i in args]) reps = {} for x in bin: for r in rel: if x in bin and x in r.free_symbols: if isinstance(r, (Eq, Ne)): if not ( S.true in r.args or S.false in r.args): reps[r] = S.false else: raise TypeError(filldedent(''' Incompatible use of binary symbol `%s` as a real variable in `%s` ''' % (x, r))) return [i.subs(reps) for i in args] def to_nnf(self, simplify=True): return self._to_nnf(*self.args, simplify=simplify) @classmethod def _to_nnf(cls, *args, **kwargs): simplify = kwargs.get('simplify', True) argset = set([]) for arg in args: if not is_literal(arg): arg = arg.to_nnf(simplify) if simplify: if isinstance(arg, cls): arg = arg.args else: arg = (arg,) for a in arg: if Not(a) in argset: return cls.zero argset.add(a) else: argset.add(arg) return cls(*argset) # the diff method below is copied from Expr class def diff(self, *symbols, **assumptions): assumptions.setdefault("evaluate", True) return Derivative(self, *symbols, **assumptions) def _eval_derivative(self, x): from sympy.core.relational import Eq from sympy.functions.elementary.piecewise import Piecewise if x in self.binary_symbols: return Piecewise( (0, Eq(self.subs(x, 0), self.subs(x, 1))), (1, True)) elif x in self.free_symbols: # not implemented, see https://www.encyclopediaofmath.org/ # index.php/Boolean_differential_calculus pass else: return S.Zero def _apply_patternbased_simplification(self, rv, patterns, measure, dominatingvalue, replacementvalue=None): """ Replace patterns of Relational Parameters ========== rv : Expr Boolean expression patterns : tuple Tuple of tuples, with (pattern to simplify, simplified pattern) measure : function Simplification measure dominatingvalue : boolean or None The dominating value for the function of consideration. For example, for And S.false is dominating. As soon as one expression is S.false in And, the whole expression is S.false. replacementvalue : boolean or None, optional The resulting value for the whole expression if one argument evaluates to dominatingvalue. For example, for Nand S.false is dominating, but in this case the resulting value is S.true. Default is None. If replacementvalue is None and dominatingvalue is not None, replacementvalue = dominatingvalue """ from sympy.core.relational import Relational, _canonical if replacementvalue is None and dominatingvalue is not None: replacementvalue = dominatingvalue # Use replacement patterns for Relationals changed = True Rel, nonRel = sift(rv.args, lambda i: isinstance(i, Relational), binary=True) if len(Rel) <= 1: return rv Rel, nonRealRel = sift(rv.args, lambda i: all(s.is_real is not False for s in i.free_symbols), binary=True) Rel = [i.canonical for i in Rel] while changed and len(Rel) >= 2: changed = False # Sort based on ordered Rel = list(ordered(Rel)) # Create a list of possible replacements results = [] # Try all combinations for ((i, pi), (j, pj)) in combinations(enumerate(Rel), 2): for k, (pattern, simp) in enumerate(patterns): res = [] # use SymPy matching oldexpr = rv.func(pi, pj) tmpres = oldexpr.match(pattern) if tmpres: res.append((tmpres, oldexpr)) # Try reversing first relational # This and the rest should not be required with a better # canonical oldexpr = rv.func(pi.reversed, pj) tmpres = oldexpr.match(pattern) if tmpres: res.append((tmpres, oldexpr)) # Try reversing second relational oldexpr = rv.func(pi, pj.reversed) tmpres = oldexpr.match(pattern) if tmpres: res.append((tmpres, oldexpr)) # Try reversing both relationals oldexpr = rv.func(pi.reversed, pj.reversed) tmpres = oldexpr.match(pattern) if tmpres: res.append((tmpres, oldexpr)) if res: for tmpres, oldexpr in res: # we have a matching, compute replacement np = simp.subs(tmpres) if np == dominatingvalue: # if dominatingvalue, the whole expression # will be replacementvalue return replacementvalue # add replacement if not isinstance(np, ITE): # We only want to use ITE replacements if # they simplify to a relational costsaving = measure(oldexpr) - measure(np) if costsaving > 0: results.append((costsaving, (i, j, np))) if results: # Sort results based on complexity results = list(reversed(sorted(results, key=lambda pair: pair[0]))) # Replace the one providing most simplification cost, replacement = results[0] i, j, newrel = replacement # Remove the old relationals del Rel[j] del Rel[i] if dominatingvalue is None or newrel != ~dominatingvalue: # Insert the new one (no need to insert a value that will # not affect the result) Rel.append(newrel) # We did change something so try again changed = True rv = rv.func(*([_canonical(i) for i in ordered(Rel)] + nonRel + nonRealRel)) return rv class And(LatticeOp, BooleanFunction): """ Logical AND function. It evaluates its arguments in order, giving False immediately if any of them are False, and True if they are all True. Examples ======== >>> from sympy.core import symbols >>> from sympy.abc import x, y >>> from sympy.logic.boolalg import And >>> x & y x & y Notes ===== The ``&`` operator is provided as a convenience, but note that its use here is different from its normal use in Python, which is bitwise and. Hence, ``And(a, b)`` and ``a & b`` will return different things if ``a`` and ``b`` are integers. >>> And(x, y).subs(x, 1) y """ zero = false identity = true nargs = None @classmethod def _new_args_filter(cls, args): newargs = [] rel = [] args = BooleanFunction.binary_check_and_simplify(*args) for x in reversed(args): if x.is_Relational: c = x.canonical if c in rel: continue nc = c.negated.canonical if any(r == nc for r in rel): return [S.false] rel.append(c) newargs.append(x) return LatticeOp._new_args_filter(newargs, And) def _eval_simplify(self, **kwargs): from sympy.core.relational import Equality, Relational from sympy.solvers.solveset import linear_coeffs # standard simplify rv = super(And, self)._eval_simplify(**kwargs) if not isinstance(rv, And): return rv # simplify args that are equalities involving # symbols so x == 0 & x == y -> x==0 & y == 0 Rel, nonRel = sift(rv.args, lambda i: isinstance(i, Relational), binary=True) if not Rel: return rv eqs, other = sift(Rel, lambda i: isinstance(i, Equality), binary=True) if not eqs: return rv measure, ratio = kwargs['measure'], kwargs['ratio'] reps = {} sifted = {} if eqs: # group by length of free symbols sifted = sift(ordered([ (i.free_symbols, i) for i in eqs]), lambda x: len(x[0])) eqs = [] while 1 in sifted: for free, e in sifted.pop(1): x = free.pop() if e.lhs != x or x in e.rhs.free_symbols: try: m, b = linear_coeffs( e.rewrite(Add, evaluate=False), x) enew = e.func(x, -b/m) if measure(enew) <= ratio*measure(e): e = enew else: eqs.append(e) continue except ValueError: pass if x in reps: eqs.append(e.func(e.rhs, reps[x])) else: reps[x] = e.rhs eqs.append(e) resifted = defaultdict(list) for k in sifted: for f, e in sifted[k]: e = e.subs(reps) f = e.free_symbols resifted[len(f)].append((f, e)) sifted = resifted for k in sifted: eqs.extend([e for f, e in sifted[k]]) other = [ei.subs(reps) for ei in other] rv = rv.func(*([i.canonical for i in (eqs + other)] + nonRel)) patterns = simplify_patterns_and() return self._apply_patternbased_simplification(rv, patterns, measure, False) def _eval_as_set(self): from sympy.sets.sets import Intersection return Intersection(*[arg.as_set() for arg in self.args]) def _eval_rewrite_as_Nor(self, *args, **kwargs): return Nor(*[Not(arg) for arg in self.args]) class Or(LatticeOp, BooleanFunction): """ Logical OR function It evaluates its arguments in order, giving True immediately if any of them are True, and False if they are all False. Examples ======== >>> from sympy.core import symbols >>> from sympy.abc import x, y >>> from sympy.logic.boolalg import Or >>> x | y x | y Notes ===== The ``|`` operator is provided as a convenience, but note that its use here is different from its normal use in Python, which is bitwise or. Hence, ``Or(a, b)`` and ``a | b`` will return different things if ``a`` and ``b`` are integers. >>> Or(x, y).subs(x, 0) y """ zero = true identity = false @classmethod def _new_args_filter(cls, args): newargs = [] rel = [] args = BooleanFunction.binary_check_and_simplify(*args) for x in args: if x.is_Relational: c = x.canonical if c in rel: continue nc = c.negated.canonical if any(r == nc for r in rel): return [S.true] rel.append(c) newargs.append(x) return LatticeOp._new_args_filter(newargs, Or) def _eval_as_set(self): from sympy.sets.sets import Union return Union(*[arg.as_set() for arg in self.args]) def _eval_rewrite_as_Nand(self, *args, **kwargs): return Nand(*[Not(arg) for arg in self.args]) def _eval_simplify(self, **kwargs): # standard simplify rv = super(Or, self)._eval_simplify(**kwargs) if not isinstance(rv, Or): return rv patterns = simplify_patterns_or() return self._apply_patternbased_simplification(rv, patterns, kwargs['measure'], S.true) class Not(BooleanFunction): """ Logical Not function (negation) Returns True if the statement is False Returns False if the statement is True Examples ======== >>> from sympy.logic.boolalg import Not, And, Or >>> from sympy.abc import x, A, B >>> Not(True) False >>> Not(False) True >>> Not(And(True, False)) True >>> Not(Or(True, False)) False >>> Not(And(And(True, x), Or(x, False))) ~x >>> ~x ~x >>> Not(And(Or(A, B), Or(~A, ~B))) ~((A | B) & (~A | ~B)) Notes ===== - The ``~`` operator is provided as a convenience, but note that its use here is different from its normal use in Python, which is bitwise not. In particular, ``~a`` and ``Not(a)`` will be different if ``a`` is an integer. Furthermore, since bools in Python subclass from ``int``, ``~True`` is the same as ``~1`` which is ``-2``, which has a boolean value of True. To avoid this issue, use the SymPy boolean types ``true`` and ``false``. >>> from sympy import true >>> ~True -2 >>> ~true False """ is_Not = True @classmethod def eval(cls, arg): from sympy import ( Equality, GreaterThan, LessThan, StrictGreaterThan, StrictLessThan, Unequality) if isinstance(arg, Number) or arg in (True, False): return false if arg else true if arg.is_Not: return arg.args[0] # Simplify Relational objects. if isinstance(arg, Equality): return Unequality(*arg.args) if isinstance(arg, Unequality): return Equality(*arg.args) if isinstance(arg, StrictLessThan): return GreaterThan(*arg.args) if isinstance(arg, StrictGreaterThan): return LessThan(*arg.args) if isinstance(arg, LessThan): return StrictGreaterThan(*arg.args) if isinstance(arg, GreaterThan): return StrictLessThan(*arg.args) def _eval_as_set(self): """ Rewrite logic operators and relationals in terms of real sets. Examples ======== >>> from sympy import Not, Symbol >>> x = Symbol('x') >>> Not(x > 0).as_set() Interval(-oo, 0) """ return self.args[0].as_set().complement(S.Reals) def to_nnf(self, simplify=True): if is_literal(self): return self expr = self.args[0] func, args = expr.func, expr.args if func == And: return Or._to_nnf(*[~arg for arg in args], simplify=simplify) if func == Or: return And._to_nnf(*[~arg for arg in args], simplify=simplify) if func == Implies: a, b = args return And._to_nnf(a, ~b, simplify=simplify) if func == Equivalent: return And._to_nnf(Or(*args), Or(*[~arg for arg in args]), simplify=simplify) if func == Xor: result = [] for i in range(1, len(args)+1, 2): for neg in combinations(args, i): clause = [~s if s in neg else s for s in args] result.append(Or(*clause)) return And._to_nnf(*result, simplify=simplify) if func == ITE: a, b, c = args return And._to_nnf(Or(a, ~c), Or(~a, ~b), simplify=simplify) raise ValueError("Illegal operator %s in expression" % func) class Xor(BooleanFunction): """ Logical XOR (exclusive OR) function. Returns True if an odd number of the arguments are True and the rest are False. Returns False if an even number of the arguments are True and the rest are False. Examples ======== >>> from sympy.logic.boolalg import Xor >>> from sympy import symbols >>> x, y = symbols('x y') >>> Xor(True, False) True >>> Xor(True, True) False >>> Xor(True, False, True, True, False) True >>> Xor(True, False, True, False) False >>> x ^ y Xor(x, y) Notes ===== The ``^`` operator is provided as a convenience, but note that its use here is different from its normal use in Python, which is bitwise xor. In particular, ``a ^ b`` and ``Xor(a, b)`` will be different if ``a`` and ``b`` are integers. >>> Xor(x, y).subs(y, 0) x """ def __new__(cls, *args, **kwargs): argset = set([]) obj = super(Xor, cls).__new__(cls, *args, **kwargs) for arg in obj._args: if isinstance(arg, Number) or arg in (True, False): if arg: arg = true else: continue if isinstance(arg, Xor): for a in arg.args: argset.remove(a) if a in argset else argset.add(a) elif arg in argset: argset.remove(arg) else: argset.add(arg) rel = [(r, r.canonical, r.negated.canonical) for r in argset if r.is_Relational] odd = False # is number of complimentary pairs odd? start 0 -> False remove = [] for i, (r, c, nc) in enumerate(rel): for j in range(i + 1, len(rel)): rj, cj = rel[j][:2] if cj == nc: odd = ~odd break elif cj == c: break else: continue remove.append((r, rj)) if odd: argset.remove(true) if true in argset else argset.add(true) for a, b in remove: argset.remove(a) argset.remove(b) if len(argset) == 0: return false elif len(argset) == 1: return argset.pop() elif True in argset: argset.remove(True) return Not(Xor(*argset)) else: obj._args = tuple(ordered(argset)) obj._argset = frozenset(argset) return obj @property @cacheit def args(self): return tuple(ordered(self._argset)) def to_nnf(self, simplify=True): args = [] for i in range(0, len(self.args)+1, 2): for neg in combinations(self.args, i): clause = [~s if s in neg else s for s in self.args] args.append(Or(*clause)) return And._to_nnf(*args, simplify=simplify) def _eval_rewrite_as_Or(self, *args, **kwargs): a = self.args return Or(*[_convert_to_varsSOP(x, self.args) for x in _get_odd_parity_terms(len(a))]) def _eval_rewrite_as_And(self, *args, **kwargs): a = self.args return And(*[_convert_to_varsPOS(x, self.args) for x in _get_even_parity_terms(len(a))]) def _eval_simplify(self, **kwargs): # as standard simplify uses simplify_logic which writes things as # And and Or, we only simplify the partial expressions before using # patterns rv = self.func(*[a._eval_simplify(**kwargs) for a in self.args]) if not isinstance(rv, Xor): # This shouldn't really happen here return rv patterns = simplify_patterns_xor() return self._apply_patternbased_simplification(rv, patterns, kwargs['measure'], None) class Nand(BooleanFunction): """ Logical NAND function. It evaluates its arguments in order, giving True immediately if any of them are False, and False if they are all True. Returns True if any of the arguments are False Returns False if all arguments are True Examples ======== >>> from sympy.logic.boolalg import Nand >>> from sympy import symbols >>> x, y = symbols('x y') >>> Nand(False, True) True >>> Nand(True, True) False >>> Nand(x, y) ~(x & y) """ @classmethod def eval(cls, *args): return Not(And(*args)) class Nor(BooleanFunction): """ Logical NOR function. It evaluates its arguments in order, giving False immediately if any of them are True, and True if they are all False. Returns False if any argument is True Returns True if all arguments are False Examples ======== >>> from sympy.logic.boolalg import Nor >>> from sympy import symbols >>> x, y = symbols('x y') >>> Nor(True, False) False >>> Nor(True, True) False >>> Nor(False, True) False >>> Nor(False, False) True >>> Nor(x, y) ~(x | y) """ @classmethod def eval(cls, *args): return Not(Or(*args)) class Xnor(BooleanFunction): """ Logical XNOR function. Returns False if an odd number of the arguments are True and the rest are False. Returns True if an even number of the arguments are True and the rest are False. Examples ======== >>> from sympy.logic.boolalg import Xnor >>> from sympy import symbols >>> x, y = symbols('x y') >>> Xnor(True, False) False >>> Xnor(True, True) True >>> Xnor(True, False, True, True, False) False >>> Xnor(True, False, True, False) True """ @classmethod def eval(cls, *args): return Not(Xor(*args)) class Implies(BooleanFunction): """ Logical implication. A implies B is equivalent to !A v B Accepts two Boolean arguments; A and B. Returns False if A is True and B is False Returns True otherwise. Examples ======== >>> from sympy.logic.boolalg import Implies >>> from sympy import symbols >>> x, y = symbols('x y') >>> Implies(True, False) False >>> Implies(False, False) True >>> Implies(True, True) True >>> Implies(False, True) True >>> x >> y Implies(x, y) >>> y << x Implies(x, y) Notes ===== The ``>>`` and ``<<`` operators are provided as a convenience, but note that their use here is different from their normal use in Python, which is bit shifts. Hence, ``Implies(a, b)`` and ``a >> b`` will return different things if ``a`` and ``b`` are integers. In particular, since Python considers ``True`` and ``False`` to be integers, ``True >> True`` will be the same as ``1 >> 1``, i.e., 0, which has a truth value of False. To avoid this issue, use the SymPy objects ``true`` and ``false``. >>> from sympy import true, false >>> True >> False 1 >>> true >> false False """ @classmethod def eval(cls, *args): try: newargs = [] for x in args: if isinstance(x, Number) or x in (0, 1): newargs.append(True if x else False) else: newargs.append(x) A, B = newargs except ValueError: raise ValueError( "%d operand(s) used for an Implies " "(pairs are required): %s" % (len(args), str(args))) if A == True or A == False or B == True or B == False: return Or(Not(A), B) elif A == B: return S.true elif A.is_Relational and B.is_Relational: if A.canonical == B.canonical: return S.true if A.negated.canonical == B.canonical: return B else: return Basic.__new__(cls, *args) def to_nnf(self, simplify=True): a, b = self.args return Or._to_nnf(~a, b, simplify=simplify) class Equivalent(BooleanFunction): """ Equivalence relation. Equivalent(A, B) is True iff A and B are both True or both False Returns True if all of the arguments are logically equivalent. Returns False otherwise. Examples ======== >>> from sympy.logic.boolalg import Equivalent, And >>> from sympy.abc import x, y >>> Equivalent(False, False, False) True >>> Equivalent(True, False, False) False >>> Equivalent(x, And(x, True)) True """ def __new__(cls, *args, **options): from sympy.core.relational import Relational args = [_sympify(arg) for arg in args] argset = set(args) for x in args: if isinstance(x, Number) or x in [True, False]: # Includes 0, 1 argset.discard(x) argset.add(True if x else False) rel = [] for r in argset: if isinstance(r, Relational): rel.append((r, r.canonical, r.negated.canonical)) remove = [] for i, (r, c, nc) in enumerate(rel): for j in range(i + 1, len(rel)): rj, cj = rel[j][:2] if cj == nc: return false elif cj == c: remove.append((r, rj)) break for a, b in remove: argset.remove(a) argset.remove(b) argset.add(True) if len(argset) <= 1: return true if True in argset: argset.discard(True) return And(*argset) if False in argset: argset.discard(False) return And(*[~arg for arg in argset]) _args = frozenset(argset) obj = super(Equivalent, cls).__new__(cls, _args) obj._argset = _args return obj @property @cacheit def args(self): return tuple(ordered(self._argset)) def to_nnf(self, simplify=True): args = [] for a, b in zip(self.args, self.args[1:]): args.append(Or(~a, b)) args.append(Or(~self.args[-1], self.args[0])) return And._to_nnf(*args, simplify=simplify) class ITE(BooleanFunction): """ If then else clause. ITE(A, B, C) evaluates and returns the result of B if A is true else it returns the result of C. All args must be Booleans. Examples ======== >>> from sympy.logic.boolalg import ITE, And, Xor, Or >>> from sympy.abc import x, y, z >>> ITE(True, False, True) False >>> ITE(Or(True, False), And(True, True), Xor(True, True)) True >>> ITE(x, y, z) ITE(x, y, z) >>> ITE(True, x, y) x >>> ITE(False, x, y) y >>> ITE(x, y, y) y Trying to use non-Boolean args will generate a TypeError: >>> ITE(True, [], ()) Traceback (most recent call last): ... TypeError: expecting bool, Boolean or ITE, not `[]` """ def __new__(cls, *args, **kwargs): from sympy.core.relational import Eq, Ne if len(args) != 3: raise ValueError('expecting exactly 3 args') a, b, c = args # check use of binary symbols if isinstance(a, (Eq, Ne)): # in this context, we can evaluate the Eq/Ne # if one arg is a binary symbol and the other # is true/false b, c = map(as_Boolean, (b, c)) bin = set().union(*[i.binary_symbols for i in (b, c)]) if len(set(a.args) - bin) == 1: # one arg is a binary_symbols _a = a if a.lhs is S.true: a = a.rhs elif a.rhs is S.true: a = a.lhs elif a.lhs is S.false: a = ~a.rhs elif a.rhs is S.false: a = ~a.lhs else: # binary can only equal True or False a = S.false if isinstance(_a, Ne): a = ~a else: a, b, c = BooleanFunction.binary_check_and_simplify( a, b, c) rv = None if kwargs.get('evaluate', True): rv = cls.eval(a, b, c) if rv is None: rv = BooleanFunction.__new__(cls, a, b, c, evaluate=False) return rv @classmethod def eval(cls, *args): from sympy.core.relational import Eq, Ne # do the args give a singular result? a, b, c = args if isinstance(a, (Ne, Eq)): _a = a if S.true in a.args: a = a.lhs if a.rhs is S.true else a.rhs elif S.false in a.args: a = ~a.lhs if a.rhs is S.false else ~a.rhs else: _a = None if _a is not None and isinstance(_a, Ne): a = ~a if a is S.true: return b if a is S.false: return c if b == c: return b else: # or maybe the results allow the answer to be expressed # in terms of the condition if b is S.true and c is S.false: return a if b is S.false and c is S.true: return Not(a) if [a, b, c] != args: return cls(a, b, c, evaluate=False) def to_nnf(self, simplify=True): a, b, c = self.args return And._to_nnf(Or(~a, b), Or(a, c), simplify=simplify) def _eval_as_set(self): return self.to_nnf().as_set() def _eval_rewrite_as_Piecewise(self, *args, **kwargs): from sympy.functions import Piecewise return Piecewise((args[1], args[0]), (args[2], True)) # end class definitions. Some useful methods def conjuncts(expr): """Return a list of the conjuncts in the expr s. Examples ======== >>> from sympy.logic.boolalg import conjuncts >>> from sympy.abc import A, B >>> conjuncts(A & B) frozenset({A, B}) >>> conjuncts(A | B) frozenset({A | B}) """ return And.make_args(expr) def disjuncts(expr): """Return a list of the disjuncts in the sentence s. Examples ======== >>> from sympy.logic.boolalg import disjuncts >>> from sympy.abc import A, B >>> disjuncts(A | B) frozenset({A, B}) >>> disjuncts(A & B) frozenset({A & B}) """ return Or.make_args(expr) def distribute_and_over_or(expr): """ Given a sentence s consisting of conjunctions and disjunctions of literals, return an equivalent sentence in CNF. Examples ======== >>> from sympy.logic.boolalg import distribute_and_over_or, And, Or, Not >>> from sympy.abc import A, B, C >>> distribute_and_over_or(Or(A, And(Not(B), Not(C)))) (A | ~B) & (A | ~C) """ return _distribute((expr, And, Or)) def distribute_or_over_and(expr): """ Given a sentence s consisting of conjunctions and disjunctions of literals, return an equivalent sentence in DNF. Note that the output is NOT simplified. Examples ======== >>> from sympy.logic.boolalg import distribute_or_over_and, And, Or, Not >>> from sympy.abc import A, B, C >>> distribute_or_over_and(And(Or(Not(A), B), C)) (B & C) | (C & ~A) """ return _distribute((expr, Or, And)) def _distribute(info): """ Distributes info[1] over info[2] with respect to info[0]. """ if isinstance(info[0], info[2]): for arg in info[0].args: if isinstance(arg, info[1]): conj = arg break else: return info[0] rest = info[2](*[a for a in info[0].args if a is not conj]) return info[1](*list(map(_distribute, [(info[2](c, rest), info[1], info[2]) for c in conj.args]))) elif isinstance(info[0], info[1]): return info[1](*list(map(_distribute, [(x, info[1], info[2]) for x in info[0].args]))) else: return info[0] def to_nnf(expr, simplify=True): """ Converts expr to Negation Normal Form. A logical expression is in Negation Normal Form (NNF) if it contains only And, Or and Not, and Not is applied only to literals. If simplify is True, the result contains no redundant clauses. Examples ======== >>> from sympy.abc import A, B, C, D >>> from sympy.logic.boolalg import Not, Equivalent, to_nnf >>> to_nnf(Not((~A & ~B) | (C & D))) (A | B) & (~C | ~D) >>> to_nnf(Equivalent(A >> B, B >> A)) (A | ~B | (A & ~B)) & (B | ~A | (B & ~A)) """ if is_nnf(expr, simplify): return expr return expr.to_nnf(simplify) def to_cnf(expr, simplify=False): """ Convert a propositional logical sentence s to conjunctive normal form. That is, of the form ((A | ~B | ...) & (B | C | ...) & ...) If simplify is True, the expr is evaluated to its simplest CNF form using the Quine-McCluskey algorithm. Examples ======== >>> from sympy.logic.boolalg import to_cnf >>> from sympy.abc import A, B, D >>> to_cnf(~(A | B) | D) (D | ~A) & (D | ~B) >>> to_cnf((A | B) & (A | ~A), True) A | B """ expr = sympify(expr) if not isinstance(expr, BooleanFunction): return expr if simplify: return simplify_logic(expr, 'cnf', True) # Don't convert unless we have to if is_cnf(expr): return expr expr = eliminate_implications(expr) return distribute_and_over_or(expr) def to_dnf(expr, simplify=False): """ Convert a propositional logical sentence s to disjunctive normal form. That is, of the form ((A & ~B & ...) | (B & C & ...) | ...) If simplify is True, the expr is evaluated to its simplest DNF form using the Quine-McCluskey algorithm. Examples ======== >>> from sympy.logic.boolalg import to_dnf >>> from sympy.abc import A, B, C >>> to_dnf(B & (A | C)) (A & B) | (B & C) >>> to_dnf((A & B) | (A & ~B) | (B & C) | (~B & C), True) A | C """ expr = sympify(expr) if not isinstance(expr, BooleanFunction): return expr if simplify: return simplify_logic(expr, 'dnf', True) # Don't convert unless we have to if is_dnf(expr): return expr expr = eliminate_implications(expr) return distribute_or_over_and(expr) def is_nnf(expr, simplified=True): """ Checks if expr is in Negation Normal Form. A logical expression is in Negation Normal Form (NNF) if it contains only And, Or and Not, and Not is applied only to literals. If simplified is True, checks if result contains no redundant clauses. Examples ======== >>> from sympy.abc import A, B, C >>> from sympy.logic.boolalg import Not, is_nnf >>> is_nnf(A & B | ~C) True >>> is_nnf((A | ~A) & (B | C)) False >>> is_nnf((A | ~A) & (B | C), False) True >>> is_nnf(Not(A & B) | C) False >>> is_nnf((A >> B) & (B >> A)) False """ expr = sympify(expr) if is_literal(expr): return True stack = [expr] while stack: expr = stack.pop() if expr.func in (And, Or): if simplified: args = expr.args for arg in args: if Not(arg) in args: return False stack.extend(expr.args) elif not is_literal(expr): return False return True def is_cnf(expr): """ Test whether or not an expression is in conjunctive normal form. Examples ======== >>> from sympy.logic.boolalg import is_cnf >>> from sympy.abc import A, B, C >>> is_cnf(A | B | C) True >>> is_cnf(A & B & C) True >>> is_cnf((A & B) | C) False """ return _is_form(expr, And, Or) def is_dnf(expr): """ Test whether or not an expression is in disjunctive normal form. Examples ======== >>> from sympy.logic.boolalg import is_dnf >>> from sympy.abc import A, B, C >>> is_dnf(A | B | C) True >>> is_dnf(A & B & C) True >>> is_dnf((A & B) | C) True >>> is_dnf(A & (B | C)) False """ return _is_form(expr, Or, And) def _is_form(expr, function1, function2): """ Test whether or not an expression is of the required form. """ expr = sympify(expr) # Special case of an Atom if expr.is_Atom: return True # Special case of a single expression of function2 if isinstance(expr, function2): for lit in expr.args: if isinstance(lit, Not): if not lit.args[0].is_Atom: return False else: if not lit.is_Atom: return False return True # Special case of a single negation if isinstance(expr, Not): if not expr.args[0].is_Atom: return False if not isinstance(expr, function1): return False for cls in expr.args: if cls.is_Atom: continue if isinstance(cls, Not): if not cls.args[0].is_Atom: return False elif not isinstance(cls, function2): return False for lit in cls.args: if isinstance(lit, Not): if not lit.args[0].is_Atom: return False else: if not lit.is_Atom: return False return True def eliminate_implications(expr): """ Change >>, <<, and Equivalent into &, |, and ~. That is, return an expression that is equivalent to s, but has only &, |, and ~ as logical operators. Examples ======== >>> from sympy.logic.boolalg import Implies, Equivalent, \ eliminate_implications >>> from sympy.abc import A, B, C >>> eliminate_implications(Implies(A, B)) B | ~A >>> eliminate_implications(Equivalent(A, B)) (A | ~B) & (B | ~A) >>> eliminate_implications(Equivalent(A, B, C)) (A | ~C) & (B | ~A) & (C | ~B) """ return to_nnf(expr, simplify=False) def is_literal(expr): """ Returns True if expr is a literal, else False. Examples ======== >>> from sympy import Or, Q >>> from sympy.abc import A, B >>> from sympy.logic.boolalg import is_literal >>> is_literal(A) True >>> is_literal(~A) True >>> is_literal(Q.zero(A)) True >>> is_literal(A + B) True >>> is_literal(Or(A, B)) False """ if isinstance(expr, Not): return not isinstance(expr.args[0], BooleanFunction) else: return not isinstance(expr, BooleanFunction) def to_int_repr(clauses, symbols): """ Takes clauses in CNF format and puts them into an integer representation. Examples ======== >>> from sympy.logic.boolalg import to_int_repr >>> from sympy.abc import x, y >>> to_int_repr([x | y, y], [x, y]) == [{1, 2}, {2}] True """ # Convert the symbol list into a dict symbols = dict(list(zip(symbols, list(range(1, len(symbols) + 1))))) def append_symbol(arg, symbols): if isinstance(arg, Not): return -symbols[arg.args[0]] else: return symbols[arg] return [set(append_symbol(arg, symbols) for arg in Or.make_args(c)) for c in clauses] def term_to_integer(term): """ Return an integer corresponding to the base-2 digits given by ``term``. Parameters ========== term : a string or list of ones and zeros Examples ======== >>> from sympy.logic.boolalg import term_to_integer >>> term_to_integer([1, 0, 0]) 4 >>> term_to_integer('100') 4 """ return int(''.join(list(map(str, list(term)))), 2) def integer_to_term(k, n_bits=None): """ Return a list of the base-2 digits in the integer, ``k``. Parameters ========== k : int n_bits : int If ``n_bits`` is given and the number of digits in the binary representation of ``k`` is smaller than ``n_bits`` then left-pad the list with 0s. Examples ======== >>> from sympy.logic.boolalg import integer_to_term >>> integer_to_term(4) [1, 0, 0] >>> integer_to_term(4, 6) [0, 0, 0, 1, 0, 0] """ s = '{0:0{1}b}'.format(abs(as_int(k)), as_int(abs(n_bits or 0))) return list(map(int, s)) def truth_table(expr, variables, input=True): """ Return a generator of all possible configurations of the input variables, and the result of the boolean expression for those values. Parameters ========== expr : string or boolean expression variables : list of variables input : boolean (default True) indicates whether to return the input combinations. Examples ======== >>> from sympy.logic.boolalg import truth_table >>> from sympy.abc import x,y >>> table = truth_table(x >> y, [x, y]) >>> for t in table: ... print('{0} -> {1}'.format(*t)) [0, 0] -> True [0, 1] -> True [1, 0] -> False [1, 1] -> True >>> table = truth_table(x | y, [x, y]) >>> list(table) [([0, 0], False), ([0, 1], True), ([1, 0], True), ([1, 1], True)] If input is false, truth_table returns only a list of truth values. In this case, the corresponding input values of variables can be deduced from the index of a given output. >>> from sympy.logic.boolalg import integer_to_term >>> vars = [y, x] >>> values = truth_table(x >> y, vars, input=False) >>> values = list(values) >>> values [True, False, True, True] >>> for i, value in enumerate(values): ... print('{0} -> {1}'.format(list(zip( ... vars, integer_to_term(i, len(vars)))), value)) [(y, 0), (x, 0)] -> True [(y, 0), (x, 1)] -> False [(y, 1), (x, 0)] -> True [(y, 1), (x, 1)] -> True """ variables = [sympify(v) for v in variables] expr = sympify(expr) if not isinstance(expr, BooleanFunction) and not is_literal(expr): return table = product([0, 1], repeat=len(variables)) for term in table: term = list(term) value = expr.xreplace(dict(zip(variables, term))) if input: yield term, value else: yield value def _check_pair(minterm1, minterm2): """ Checks if a pair of minterms differs by only one bit. If yes, returns index, else returns -1. """ index = -1 for x, (i, j) in enumerate(zip(minterm1, minterm2)): if i != j: if index == -1: index = x else: return -1 return index def _convert_to_varsSOP(minterm, variables): """ Converts a term in the expansion of a function from binary to its variable form (for SOP). """ temp = [] for i, m in enumerate(minterm): if m == 0: temp.append(Not(variables[i])) elif m == 1: temp.append(variables[i]) else: pass # ignore the 3s return And(*temp) def _convert_to_varsPOS(maxterm, variables): """ Converts a term in the expansion of a function from binary to its variable form (for POS). """ temp = [] for i, m in enumerate(maxterm): if m == 1: temp.append(Not(variables[i])) elif m == 0: temp.append(variables[i]) else: pass # ignore the 3s return Or(*temp) def _get_odd_parity_terms(n): """ Returns a list of lists, with all possible combinations of n zeros and ones with an odd number of ones. """ op = [] for i in range(1, 2**n): e = ibin(i, n) if sum(e) % 2 == 1: op.append(e) return op def _get_even_parity_terms(n): """ Returns a list of lists, with all possible combinations of n zeros and ones with an even number of ones. """ op = [] for i in range(2**n): e = ibin(i, n) if sum(e) % 2 == 0: op.append(e) return op def _simplified_pairs(terms): """ Reduces a set of minterms, if possible, to a simplified set of minterms with one less variable in the terms using QM method. """ simplified_terms = [] todo = list(range(len(terms))) for i, ti in enumerate(terms[:-1]): for j_i, tj in enumerate(terms[(i + 1):]): index = _check_pair(ti, tj) if index != -1: todo[i] = todo[j_i + i + 1] = None newterm = ti[:] newterm[index] = 3 if newterm not in simplified_terms: simplified_terms.append(newterm) simplified_terms.extend( [terms[i] for i in [_ for _ in todo if _ is not None]]) return simplified_terms def _compare_term(minterm, term): """ Return True if a binary term is satisfied by the given term. Used for recognizing prime implicants. """ for i, x in enumerate(term): if x != 3 and x != minterm[i]: return False return True def _rem_redundancy(l1, terms): """ After the truth table has been sufficiently simplified, use the prime implicant table method to recognize and eliminate redundant pairs, and return the essential arguments. """ if len(terms): # Create dominating matrix dommatrix = [[0]*len(l1) for n in range(len(terms))] for primei, prime in enumerate(l1): for termi, term in enumerate(terms): if _compare_term(term, prime): dommatrix[termi][primei] = 1 # Non-dominated prime implicants, dominated set to None ndprimeimplicants = list(range(len(l1))) # Non-dominated terms, dominated set to None ndterms = list(range(len(terms))) # Mark dominated rows and columns oldndterms = None oldndprimeimplicants = None while ndterms != oldndterms or \ ndprimeimplicants != oldndprimeimplicants: oldndterms = ndterms[:] oldndprimeimplicants = ndprimeimplicants[:] for rowi, row in enumerate(dommatrix): if ndterms[rowi] is not None: row = [row[i] for i in [_ for _ in ndprimeimplicants if _ is not None]] for row2i, row2 in enumerate(dommatrix): if rowi != row2i and ndterms[row2i] is not None: row2 = [row2[i] for i in [_ for _ in ndprimeimplicants if _ is not None]] if all(a >= b for (a, b) in zip(row2, row)): # row2 dominating row, keep row ndterms[row2i] = None for coli in range(len(l1)): if ndprimeimplicants[coli] is not None: col = [dommatrix[a][coli] for a in range(len(terms))] col = [col[i] for i in [_ for _ in oldndterms if _ is not None]] for col2i in range(len(l1)): if coli != col2i and \ ndprimeimplicants[col2i] is not None: col2 = [dommatrix[a][col2i] for a in range(len(terms))] col2 = [col2[i] for i in [_ for _ in oldndterms if _ is not None]] if all(a >= b for (a, b) in zip(col, col2)): # col dominating col2, keep col ndprimeimplicants[col2i] = None l1 = [l1[i] for i in [_ for _ in ndprimeimplicants if _ is not None]] return l1 else: return [] def _input_to_binlist(inputlist, variables): binlist = [] bits = len(variables) for val in inputlist: if isinstance(val, int): binlist.append(ibin(val, bits)) elif isinstance(val, dict): nonspecvars = list(variables) for key in val.keys(): nonspecvars.remove(key) for t in product([0, 1], repeat=len(nonspecvars)): d = dict(zip(nonspecvars, t)) d.update(val) binlist.append([d[v] for v in variables]) elif isinstance(val, (list, tuple)): if len(val) != bits: raise ValueError("Each term must contain {} bits as there are" "\n{} variables (or be an integer)." "".format(bits, bits)) binlist.append(list(val)) else: raise TypeError("A term list can only contain lists," " ints or dicts.") return binlist def SOPform(variables, minterms, dontcares=None): """ The SOPform function uses simplified_pairs and a redundant group- eliminating algorithm to convert the list of all input combos that generate '1' (the minterms) into the smallest Sum of Products form. The variables must be given as the first argument. Return a logical Or function (i.e., the "sum of products" or "SOP" form) that gives the desired outcome. If there are inputs that can be ignored, pass them as a list, too. The result will be one of the (perhaps many) functions that satisfy the conditions. Examples ======== >>> from sympy.logic import SOPform >>> from sympy import symbols >>> w, x, y, z = symbols('w x y z') >>> minterms = [[0, 0, 0, 1], [0, 0, 1, 1], ... [0, 1, 1, 1], [1, 0, 1, 1], [1, 1, 1, 1]] >>> dontcares = [[0, 0, 0, 0], [0, 0, 1, 0], [0, 1, 0, 1]] >>> SOPform([w, x, y, z], minterms, dontcares) (y & z) | (z & ~w) The terms can also be represented as integers: >>> minterms = [1, 3, 7, 11, 15] >>> dontcares = [0, 2, 5] >>> SOPform([w, x, y, z], minterms, dontcares) (y & z) | (z & ~w) They can also be specified using dicts, which does not have to be fully specified: >>> minterms = [{w: 0, x: 1}, {y: 1, z: 1, x: 0}] >>> SOPform([w, x, y, z], minterms) (x & ~w) | (y & z & ~x) Or a combination: >>> minterms = [4, 7, 11, [1, 1, 1, 1]] >>> dontcares = [{w : 0, x : 0, y: 0}, 5] >>> SOPform([w, x, y, z], minterms, dontcares) (w & y & z) | (x & y & z) | (~w & ~y) References ========== .. [1] https://en.wikipedia.org/wiki/Quine-McCluskey_algorithm """ variables = [sympify(v) for v in variables] if minterms == []: return false minterms = _input_to_binlist(minterms, variables) dontcares = _input_to_binlist((dontcares or []), variables) for d in dontcares: if d in minterms: raise ValueError('%s in minterms is also in dontcares' % d) old = None new = minterms + dontcares while new != old: old = new new = _simplified_pairs(old) essential = _rem_redundancy(new, minterms) return Or(*[_convert_to_varsSOP(x, variables) for x in essential]) def POSform(variables, minterms, dontcares=None): """ The POSform function uses simplified_pairs and a redundant-group eliminating algorithm to convert the list of all input combinations that generate '1' (the minterms) into the smallest Product of Sums form. The variables must be given as the first argument. Return a logical And function (i.e., the "product of sums" or "POS" form) that gives the desired outcome. If there are inputs that can be ignored, pass them as a list, too. The result will be one of the (perhaps many) functions that satisfy the conditions. Examples ======== >>> from sympy.logic import POSform >>> from sympy import symbols >>> w, x, y, z = symbols('w x y z') >>> minterms = [[0, 0, 0, 1], [0, 0, 1, 1], [0, 1, 1, 1], ... [1, 0, 1, 1], [1, 1, 1, 1]] >>> dontcares = [[0, 0, 0, 0], [0, 0, 1, 0], [0, 1, 0, 1]] >>> POSform([w, x, y, z], minterms, dontcares) z & (y | ~w) The terms can also be represented as integers: >>> minterms = [1, 3, 7, 11, 15] >>> dontcares = [0, 2, 5] >>> POSform([w, x, y, z], minterms, dontcares) z & (y | ~w) They can also be specified using dicts, which does not have to be fully specified: >>> minterms = [{w: 0, x: 1}, {y: 1, z: 1, x: 0}] >>> POSform([w, x, y, z], minterms) (x | y) & (x | z) & (~w | ~x) Or a combination: >>> minterms = [4, 7, 11, [1, 1, 1, 1]] >>> dontcares = [{w : 0, x : 0, y: 0}, 5] >>> POSform([w, x, y, z], minterms, dontcares) (w | x) & (y | ~w) & (z | ~y) References ========== .. [1] https://en.wikipedia.org/wiki/Quine-McCluskey_algorithm """ variables = [sympify(v) for v in variables] if minterms == []: return false minterms = _input_to_binlist(minterms, variables) dontcares = _input_to_binlist((dontcares or []), variables) for d in dontcares: if d in minterms: raise ValueError('%s in minterms is also in dontcares' % d) maxterms = [] for t in product([0, 1], repeat=len(variables)): t = list(t) if (t not in minterms) and (t not in dontcares): maxterms.append(t) old = None new = maxterms + dontcares while new != old: old = new new = _simplified_pairs(old) essential = _rem_redundancy(new, maxterms) return And(*[_convert_to_varsPOS(x, variables) for x in essential]) def _find_predicates(expr): """Helper to find logical predicates in BooleanFunctions. A logical predicate is defined here as anything within a BooleanFunction that is not a BooleanFunction itself. """ if not isinstance(expr, BooleanFunction): return {expr} return set().union(*(_find_predicates(i) for i in expr.args)) def simplify_logic(expr, form=None, deep=True, force=False): """ This function simplifies a boolean function to its simplified version in SOP or POS form. The return type is an Or or And object in SymPy. Parameters ========== expr : string or boolean expression form : string ('cnf' or 'dnf') or None (default). If 'cnf' or 'dnf', the simplest expression in the corresponding normal form is returned; if None, the answer is returned according to the form with fewest args (in CNF by default). deep : boolean (default True) Indicates whether to recursively simplify any non-boolean functions contained within the input. force : boolean (default False) As the simplifications require exponential time in the number of variables, there is by default a limit on expressions with 8 variables. When the expression has more than 8 variables only symbolical simplification (controlled by ``deep``) is made. By setting force to ``True``, this limit is removed. Be aware that this can lead to very long simplification times. Examples ======== >>> from sympy.logic import simplify_logic >>> from sympy.abc import x, y, z >>> from sympy import S >>> b = (~x & ~y & ~z) | ( ~x & ~y & z) >>> simplify_logic(b) ~x & ~y >>> S(b) (z & ~x & ~y) | (~x & ~y & ~z) >>> simplify_logic(_) ~x & ~y """ if form not in (None, 'cnf', 'dnf'): raise ValueError("form can be cnf or dnf only") expr = sympify(expr) if deep: variables = _find_predicates(expr) from sympy.simplify.simplify import simplify s = [simplify(v) for v in variables] expr = expr.xreplace(dict(zip(variables, s))) if not isinstance(expr, BooleanFunction): return expr # get variables in case not deep or after doing # deep simplification since they may have changed variables = _find_predicates(expr) if not force and len(variables) > 8: return expr # group into constants and variable values c, v = sift(variables, lambda x: x in (True, False), binary=True) variables = c + v truthtable = [] # standardize constants to be 1 or 0 in keeping with truthtable c = [1 if i == True else 0 for i in c] for t in product([0, 1], repeat=len(v)): if expr.xreplace(dict(zip(v, t))) == True: truthtable.append(c + list(t)) big = len(truthtable) >= (2 ** (len(variables) - 1)) if form == 'dnf' or form is None and big: return SOPform(variables, truthtable) return POSform(variables, truthtable) def _finger(eq): """ Assign a 5-item fingerprint to each symbol in the equation: [ # of times it appeared as a Symbol; # of times it appeared as a Not(symbol); # of times it appeared as a Symbol in an And or Or; # of times it appeared as a Not(Symbol) in an And or Or; a sorted tuple of tuples, (i, j, k), where i is the number of arguments in an And or Or with which it appeared as a Symbol, and j is the number of arguments that were Not(Symbol); k is the number of times that (i, j) was seen. ] Examples ======== >>> from sympy.logic.boolalg import _finger as finger >>> from sympy import And, Or, Not, Xor, to_cnf, symbols >>> from sympy.abc import a, b, x, y >>> eq = Or(And(Not(y), a), And(Not(y), b), And(x, y)) >>> dict(finger(eq)) {(0, 0, 1, 0, ((2, 0, 1),)): [x], (0, 0, 1, 0, ((2, 1, 1),)): [a, b], (0, 0, 1, 2, ((2, 0, 1),)): [y]} >>> dict(finger(x & ~y)) {(0, 1, 0, 0, ()): [y], (1, 0, 0, 0, ()): [x]} In the following, the (5, 2, 6) means that there were 6 Or functions in which a symbol appeared as itself amongst 5 arguments in which there were also 2 negated symbols, e.g. ``(a0 | a1 | a2 | ~a3 | ~a4)`` is counted once for a0, a1 and a2. >>> dict(finger(to_cnf(Xor(*symbols('a:5'))))) {(0, 0, 8, 8, ((5, 0, 1), (5, 2, 6), (5, 4, 1))): [a0, a1, a2, a3, a4]} The equation must not have more than one level of nesting: >>> dict(finger(And(Or(x, y), y))) {(0, 0, 1, 0, ((2, 0, 1),)): [x], (1, 0, 1, 0, ((2, 0, 1),)): [y]} >>> dict(finger(And(Or(x, And(a, x)), y))) Traceback (most recent call last): ... NotImplementedError: unexpected level of nesting So y and x have unique fingerprints, but a and b do not. """ f = eq.free_symbols d = dict(list(zip(f, [[0]*4 + [defaultdict(int)] for fi in f]))) for a in eq.args: if a.is_Symbol: d[a][0] += 1 elif a.is_Not: d[a.args[0]][1] += 1 else: o = len(a.args), sum(isinstance(ai, Not) for ai in a.args) for ai in a.args: if ai.is_Symbol: d[ai][2] += 1 d[ai][-1][o] += 1 elif ai.is_Not: d[ai.args[0]][3] += 1 else: raise NotImplementedError('unexpected level of nesting') inv = defaultdict(list) for k, v in ordered(iter(d.items())): v[-1] = tuple(sorted([i + (j,) for i, j in v[-1].items()])) inv[tuple(v)].append(k) return inv def bool_map(bool1, bool2): """ Return the simplified version of bool1, and the mapping of variables that makes the two expressions bool1 and bool2 represent the same logical behaviour for some correspondence between the variables of each. If more than one mappings of this sort exist, one of them is returned. For example, And(x, y) is logically equivalent to And(a, b) for the mapping {x: a, y:b} or {x: b, y:a}. If no such mapping exists, return False. Examples ======== >>> from sympy import SOPform, bool_map, Or, And, Not, Xor >>> from sympy.abc import w, x, y, z, a, b, c, d >>> function1 = SOPform([x, z, y],[[1, 0, 1], [0, 0, 1]]) >>> function2 = SOPform([a, b, c],[[1, 0, 1], [1, 0, 0]]) >>> bool_map(function1, function2) (y & ~z, {y: a, z: b}) The results are not necessarily unique, but they are canonical. Here, ``(w, z)`` could be ``(a, d)`` or ``(d, a)``: >>> eq = Or(And(Not(y), w), And(Not(y), z), And(x, y)) >>> eq2 = Or(And(Not(c), a), And(Not(c), d), And(b, c)) >>> bool_map(eq, eq2) ((x & y) | (w & ~y) | (z & ~y), {w: a, x: b, y: c, z: d}) >>> eq = And(Xor(a, b), c, And(c,d)) >>> bool_map(eq, eq.subs(c, x)) (c & d & (a | b) & (~a | ~b), {a: a, b: b, c: d, d: x}) """ def match(function1, function2): """Return the mapping that equates variables between two simplified boolean expressions if possible. By "simplified" we mean that a function has been denested and is either an And (or an Or) whose arguments are either symbols (x), negated symbols (Not(x)), or Or (or an And) whose arguments are only symbols or negated symbols. For example, And(x, Not(y), Or(w, Not(z))). Basic.match is not robust enough (see issue 4835) so this is a workaround that is valid for simplified boolean expressions """ # do some quick checks if function1.__class__ != function2.__class__: return None # maybe simplification makes them the same? if len(function1.args) != len(function2.args): return None # maybe simplification makes them the same? if function1.is_Symbol: return {function1: function2} # get the fingerprint dictionaries f1 = _finger(function1) f2 = _finger(function2) # more quick checks if len(f1) != len(f2): return False # assemble the match dictionary if possible matchdict = {} for k in f1.keys(): if k not in f2: return False if len(f1[k]) != len(f2[k]): return False for i, x in enumerate(f1[k]): matchdict[x] = f2[k][i] return matchdict a = simplify_logic(bool1) b = simplify_logic(bool2) m = match(a, b) if m: return a, m return m def simplify_patterns_and(): from sympy.functions.elementary.miscellaneous import Min, Max from sympy.core import Wild from sympy.core.relational import Eq, Ne, Ge, Gt, Le, Lt a = Wild('a') b = Wild('b') c = Wild('c') # With a better canonical fewer results are required _matchers_and = ((And(Eq(a, b), Ge(a, b)), Eq(a, b)), (And(Eq(a, b), Gt(a, b)), S.false), (And(Eq(a, b), Le(a, b)), Eq(a, b)), (And(Eq(a, b), Lt(a, b)), S.false), (And(Ge(a, b), Gt(a, b)), Gt(a, b)), (And(Ge(a, b), Le(a, b)), Eq(a, b)), (And(Ge(a, b), Lt(a, b)), S.false), (And(Ge(a, b), Ne(a, b)), Gt(a, b)), (And(Gt(a, b), Le(a, b)), S.false), (And(Gt(a, b), Lt(a, b)), S.false), (And(Gt(a, b), Ne(a, b)), Gt(a, b)), (And(Le(a, b), Lt(a, b)), Lt(a, b)), (And(Le(a, b), Ne(a, b)), Lt(a, b)), (And(Lt(a, b), Ne(a, b)), Lt(a, b)), # Min/max (And(Ge(a, b), Ge(a, c)), Ge(a, Max(b, c))), (And(Ge(a, b), Gt(a, c)), ITE(b > c, Ge(a, b), Gt(a, c))), (And(Gt(a, b), Gt(a, c)), Gt(a, Max(b, c))), (And(Le(a, b), Le(a, c)), Le(a, Min(b, c))), (And(Le(a, b), Lt(a, c)), ITE(b < c, Le(a, b), Lt(a, c))), (And(Lt(a, b), Lt(a, c)), Lt(a, Min(b, c))), # Sign (And(Eq(a, b), Eq(a, -b)), And(Eq(a, S(0)), Eq(b, S(0)))), ) return _matchers_and def simplify_patterns_or(): from sympy.functions.elementary.miscellaneous import Min, Max from sympy.core import Wild from sympy.core.relational import Eq, Ne, Ge, Gt, Le, Lt a = Wild('a') b = Wild('b') c = Wild('c') _matchers_or = ((Or(Eq(a, b), Ge(a, b)), Ge(a, b)), (Or(Eq(a, b), Gt(a, b)), Ge(a, b)), (Or(Eq(a, b), Le(a, b)), Le(a, b)), (Or(Eq(a, b), Lt(a, b)), Le(a, b)), (Or(Ge(a, b), Gt(a, b)), Ge(a, b)), (Or(Ge(a, b), Le(a, b)), S.true), (Or(Ge(a, b), Lt(a, b)), S.true), (Or(Ge(a, b), Ne(a, b)), S.true), (Or(Gt(a, b), Le(a, b)), S.true), (Or(Gt(a, b), Lt(a, b)), Ne(a, b)), (Or(Gt(a, b), Ne(a, b)), Ne(a, b)), (Or(Le(a, b), Lt(a, b)), Le(a, b)), (Or(Le(a, b), Ne(a, b)), S.true), (Or(Lt(a, b), Ne(a, b)), Ne(a, b)), # Min/max (Or(Ge(a, b), Ge(a, c)), Ge(a, Min(b, c))), (Or(Ge(a, b), Gt(a, c)), ITE(b > c, Gt(a, c), Ge(a, b))), (Or(Gt(a, b), Gt(a, c)), Gt(a, Min(b, c))), (Or(Le(a, b), Le(a, c)), Le(a, Max(b, c))), (Or(Le(a, b), Lt(a, c)), ITE(b >= c, Le(a, b), Lt(a, c))), (Or(Lt(a, b), Lt(a, c)), Lt(a, Max(b, c))), ) return _matchers_or def simplify_patterns_xor(): from sympy.functions.elementary.miscellaneous import Min, Max from sympy.core import Wild from sympy.core.relational import Eq, Ne, Ge, Gt, Le, Lt a = Wild('a') b = Wild('b') c = Wild('c') _matchers_xor = ((Xor(Eq(a, b), Ge(a, b)), Gt(a, b)), (Xor(Eq(a, b), Gt(a, b)), Ge(a, b)), (Xor(Eq(a, b), Le(a, b)), Lt(a, b)), (Xor(Eq(a, b), Lt(a, b)), Le(a, b)), (Xor(Ge(a, b), Gt(a, b)), Eq(a, b)), (Xor(Ge(a, b), Le(a, b)), Ne(a, b)), (Xor(Ge(a, b), Lt(a, b)), S.true), (Xor(Ge(a, b), Ne(a, b)), Le(a, b)), (Xor(Gt(a, b), Le(a, b)), S.true), (Xor(Gt(a, b), Lt(a, b)), Ne(a, b)), (Xor(Gt(a, b), Ne(a, b)), Lt(a, b)), (Xor(Le(a, b), Lt(a, b)), Eq(a, b)), (Xor(Le(a, b), Ne(a, b)), Ge(a, b)), (Xor(Lt(a, b), Ne(a, b)), Gt(a, b)), # Min/max (Xor(Ge(a, b), Ge(a, c)), And(Ge(a, Min(b, c)), Lt(a, Max(b, c)))), (Xor(Ge(a, b), Gt(a, c)), ITE(b > c, And(Gt(a, c), Lt(a, b)), And(Ge(a, b), Le(a, c)))), (Xor(Gt(a, b), Gt(a, c)), And(Gt(a, Min(b, c)), Le(a, Max(b, c)))), (Xor(Le(a, b), Le(a, c)), And(Le(a, Max(b, c)), Gt(a, Min(b, c)))), (Xor(Le(a, b), Lt(a, c)), ITE(b < c, And(Lt(a, c), Gt(a, b)), And(Le(a, b), Ge(a, c)))), (Xor(Lt(a, b), Lt(a, c)), And(Lt(a, Max(b, c)), Ge(a, Min(b, c)))), ) return _matchers_xor

4785e63128ece116617de28f7851c6851c69ba81d7783438c30b66eab829d98b

"""Inference in propositional logic""" from __future__ import print_function, division from sympy.logic.boolalg import And, Not, conjuncts, to_cnf from sympy.core.compatibility import ordered from sympy.core.sympify import sympify def literal_symbol(literal): """ The symbol in this literal (without the negation). Examples ======== >>> from sympy.abc import A >>> from sympy.logic.inference import literal_symbol >>> literal_symbol(A) A >>> literal_symbol(~A) A """ if literal is True or literal is False: return literal try: if literal.is_Symbol: return literal if literal.is_Not: return literal_symbol(literal.args[0]) else: raise ValueError except (AttributeError, ValueError): raise ValueError("Argument must be a boolean literal.") def satisfiable(expr, algorithm="dpll2", all_models=False): """ Check satisfiability of a propositional sentence. Returns a model when it succeeds. Returns {true: true} for trivially true expressions. On setting all_models to True, if given expr is satisfiable then returns a generator of models. However, if expr is unsatisfiable then returns a generator containing the single element False. Examples ======== >>> from sympy.abc import A, B >>> from sympy.logic.inference import satisfiable >>> satisfiable(A & ~B) {A: True, B: False} >>> satisfiable(A & ~A) False >>> satisfiable(True) {True: True} >>> next(satisfiable(A & ~A, all_models=True)) False >>> models = satisfiable((A >> B) & B, all_models=True) >>> next(models) {A: False, B: True} >>> next(models) {A: True, B: True} >>> def use_models(models): ... for model in models: ... if model: ... # Do something with the model. ... print(model) ... else: ... # Given expr is unsatisfiable. ... print("UNSAT") >>> use_models(satisfiable(A >> ~A, all_models=True)) {A: False} >>> use_models(satisfiable(A ^ A, all_models=True)) UNSAT """ expr = to_cnf(expr) if algorithm == "dpll": from sympy.logic.algorithms.dpll import dpll_satisfiable return dpll_satisfiable(expr) elif algorithm == "dpll2": from sympy.logic.algorithms.dpll2 import dpll_satisfiable return dpll_satisfiable(expr, all_models) raise NotImplementedError def valid(expr): """ Check validity of a propositional sentence. A valid propositional sentence is True under every assignment. Examples ======== >>> from sympy.abc import A, B >>> from sympy.logic.inference import valid >>> valid(A | ~A) True >>> valid(A | B) False References ========== .. [1] https://en.wikipedia.org/wiki/Validity """ return not satisfiable(Not(expr)) def pl_true(expr, model={}, deep=False): """ Returns whether the given assignment is a model or not. If the assignment does not specify the value for every proposition, this may return None to indicate 'not obvious'. Parameters ========== model : dict, optional, default: {} Mapping of symbols to boolean values to indicate assignment. deep: boolean, optional, default: False Gives the value of the expression under partial assignments correctly. May still return None to indicate 'not obvious'. Examples ======== >>> from sympy.abc import A, B, C >>> from sympy.logic.inference import pl_true >>> pl_true( A & B, {A: True, B: True}) True >>> pl_true(A & B, {A: False}) False >>> pl_true(A & B, {A: True}) >>> pl_true(A & B, {A: True}, deep=True) >>> pl_true(A >> (B >> A)) >>> pl_true(A >> (B >> A), deep=True) True >>> pl_true(A & ~A) >>> pl_true(A & ~A, deep=True) False >>> pl_true(A & B & (~A | ~B), {A: True}) >>> pl_true(A & B & (~A | ~B), {A: True}, deep=True) False """ from sympy.core.symbol import Symbol from sympy.logic.boolalg import BooleanFunction boolean = (True, False) def _validate(expr): if isinstance(expr, Symbol) or expr in boolean: return True if not isinstance(expr, BooleanFunction): return False return all(_validate(arg) for arg in expr.args) if expr in boolean: return expr expr = sympify(expr) if not _validate(expr): raise ValueError("%s is not a valid boolean expression" % expr) model = dict((k, v) for k, v in model.items() if v in boolean) result = expr.subs(model) if result in boolean: return bool(result) if deep: model = dict((k, True) for k in result.atoms()) if pl_true(result, model): if valid(result): return True else: if not satisfiable(result): return False return None def entails(expr, formula_set={}): """ Check whether the given expr_set entail an expr. If formula_set is empty then it returns the validity of expr. Examples ======== >>> from sympy.abc import A, B, C >>> from sympy.logic.inference import entails >>> entails(A, [A >> B, B >> C]) False >>> entails(C, [A >> B, B >> C, A]) True >>> entails(A >> B) False >>> entails(A >> (B >> A)) True References ========== .. [1] https://en.wikipedia.org/wiki/Logical_consequence """ formula_set = list(formula_set) formula_set.append(Not(expr)) return not satisfiable(And(*formula_set)) class KB(object): """Base class for all knowledge bases""" def __init__(self, sentence=None): self.clauses_ = set() if sentence: self.tell(sentence) def tell(self, sentence): raise NotImplementedError def ask(self, query): raise NotImplementedError def retract(self, sentence): raise NotImplementedError @property def clauses(self): return list(ordered(self.clauses_)) class PropKB(KB): """A KB for Propositional Logic. Inefficient, with no indexing.""" def tell(self, sentence): """Add the sentence's clauses to the KB Examples ======== >>> from sympy.logic.inference import PropKB >>> from sympy.abc import x, y >>> l = PropKB() >>> l.clauses [] >>> l.tell(x | y) >>> l.clauses [x | y] >>> l.tell(y) >>> l.clauses [y, x | y] """ for c in conjuncts(to_cnf(sentence)): self.clauses_.add(c) def ask(self, query): """Checks if the query is true given the set of clauses. Examples ======== >>> from sympy.logic.inference import PropKB >>> from sympy.abc import x, y >>> l = PropKB() >>> l.tell(x & ~y) >>> l.ask(x) True >>> l.ask(y) False """ return entails(query, self.clauses_) def retract(self, sentence): """Remove the sentence's clauses from the KB Examples ======== >>> from sympy.logic.inference import PropKB >>> from sympy.abc import x, y >>> l = PropKB() >>> l.clauses [] >>> l.tell(x | y) >>> l.clauses [x | y] >>> l.retract(x | y) >>> l.clauses [] """ for c in conjuncts(to_cnf(sentence)): self.clauses_.discard(c)

3c7e3b458605c1eceee044ec2052fca4d35405571ebbc16dfb875e528a47ab5b

""" Basic methods common to all matrices to be used when creating more advanced matrices (e.g., matrices over rings, etc.). """ from __future__ import division, print_function from collections import defaultdict from inspect import isfunction from sympy.assumptions.refine import refine from sympy.core.basic import Atom from sympy.core.compatibility import ( Iterable, as_int, is_sequence, range, reduce) from sympy.core.decorators import call_highest_priority from sympy.core.expr import Expr from sympy.core.function import count_ops from sympy.core.singleton import S from sympy.core.symbol import Symbol from sympy.core.sympify import sympify from sympy.functions import Abs from sympy.simplify import simplify as _simplify from sympy.utilities.exceptions import SymPyDeprecationWarning from sympy.utilities.iterables import flatten from sympy.utilities.misc import filldedent class MatrixError(Exception): pass class ShapeError(ValueError, MatrixError): """Wrong matrix shape""" pass class NonSquareMatrixError(ShapeError): pass class NonInvertibleMatrixError(ValueError, MatrixError): """The matrix in not invertible (division by multidimensional zero error).""" pass class NonPositiveDefiniteMatrixError(ValueError, MatrixError): """The matrix is not a positive-definite matrix.""" pass class MatrixRequired(object): """All subclasses of matrix objects must implement the required matrix properties listed here.""" rows = None cols = None shape = None _simplify = None @classmethod def _new(cls, *args, **kwargs): """`_new` must, at minimum, be callable as `_new(rows, cols, mat) where mat is a flat list of the elements of the matrix.""" raise NotImplementedError("Subclasses must implement this.") def __eq__(self, other): raise NotImplementedError("Subclasses must implement this.") def __getitem__(self, key): """Implementations of __getitem__ should accept ints, in which case the matrix is indexed as a flat list, tuples (i,j) in which case the (i,j) entry is returned, slices, or mixed tuples (a,b) where a and b are any combintion of slices and integers.""" raise NotImplementedError("Subclasses must implement this.") def __len__(self): """The total number of entries in the matrix.""" raise NotImplementedError("Subclasses must implement this.") class MatrixShaping(MatrixRequired): """Provides basic matrix shaping and extracting of submatrices""" def _eval_col_del(self, col): def entry(i, j): return self[i, j] if j < col else self[i, j + 1] return self._new(self.rows, self.cols - 1, entry) def _eval_col_insert(self, pos, other): cols = self.cols def entry(i, j): if j < pos: return self[i, j] elif pos <= j < pos + other.cols: return other[i, j - pos] return self[i, j - other.cols] return self._new(self.rows, self.cols + other.cols, lambda i, j: entry(i, j)) def _eval_col_join(self, other): rows = self.rows def entry(i, j): if i < rows: return self[i, j] return other[i - rows, j] return classof(self, other)._new(self.rows + other.rows, self.cols, lambda i, j: entry(i, j)) def _eval_extract(self, rowsList, colsList): mat = list(self) cols = self.cols indices = (i * cols + j for i in rowsList for j in colsList) return self._new(len(rowsList), len(colsList), list(mat[i] for i in indices)) def _eval_get_diag_blocks(self): sub_blocks = [] def recurse_sub_blocks(M): i = 1 while i <= M.shape[0]: if i == 1: to_the_right = M[0, i:] to_the_bottom = M[i:, 0] else: to_the_right = M[:i, i:] to_the_bottom = M[i:, :i] if any(to_the_right) or any(to_the_bottom): i += 1 continue else: sub_blocks.append(M[:i, :i]) if M.shape == M[:i, :i].shape: return else: recurse_sub_blocks(M[i:, i:]) return recurse_sub_blocks(self) return sub_blocks def _eval_row_del(self, row): def entry(i, j): return self[i, j] if i < row else self[i + 1, j] return self._new(self.rows - 1, self.cols, entry) def _eval_row_insert(self, pos, other): entries = list(self) insert_pos = pos * self.cols entries[insert_pos:insert_pos] = list(other) return self._new(self.rows + other.rows, self.cols, entries) def _eval_row_join(self, other): cols = self.cols def entry(i, j): if j < cols: return self[i, j] return other[i, j - cols] return classof(self, other)._new(self.rows, self.cols + other.cols, lambda i, j: entry(i, j)) def _eval_tolist(self): return [list(self[i,:]) for i in range(self.rows)] def _eval_vec(self): rows = self.rows def entry(n, _): # we want to read off the columns first j = n // rows i = n - j * rows return self[i, j] return self._new(len(self), 1, entry) def col_del(self, col): """Delete the specified column.""" if col < 0: col += self.cols if not 0 <= col < self.cols: raise ValueError("Column {} out of range.".format(col)) return self._eval_col_del(col) def col_insert(self, pos, other): """Insert one or more columns at the given column position. Examples ======== >>> from sympy import zeros, ones >>> M = zeros(3) >>> V = ones(3, 1) >>> M.col_insert(1, V) Matrix([ [0, 1, 0, 0], [0, 1, 0, 0], [0, 1, 0, 0]]) See Also ======== col row_insert """ # Allows you to build a matrix even if it is null matrix if not self: return type(self)(other) pos = as_int(pos) if pos < 0: pos = self.cols + pos if pos < 0: pos = 0 elif pos > self.cols: pos = self.cols if self.rows != other.rows: raise ShapeError( "`self` and `other` must have the same number of rows.") return self._eval_col_insert(pos, other) def col_join(self, other): """Concatenates two matrices along self's last and other's first row. Examples ======== >>> from sympy import zeros, ones >>> M = zeros(3) >>> V = ones(1, 3) >>> M.col_join(V) Matrix([ [0, 0, 0], [0, 0, 0], [0, 0, 0], [1, 1, 1]]) See Also ======== col row_join """ # A null matrix can always be stacked (see #10770) if self.rows == 0 and self.cols != other.cols: return self._new(0, other.cols, []).col_join(other) if self.cols != other.cols: raise ShapeError( "`self` and `other` must have the same number of columns.") return self._eval_col_join(other) def col(self, j): """Elementary column selector. Examples ======== >>> from sympy import eye >>> eye(2).col(0) Matrix([ [1], [0]]) See Also ======== row col_op col_swap col_del col_join col_insert """ return self[:, j] def extract(self, rowsList, colsList): """Return a submatrix by specifying a list of rows and columns. Negative indices can be given. All indices must be in the range -n <= i < n where n is the number of rows or columns. Examples ======== >>> from sympy import Matrix >>> m = Matrix(4, 3, range(12)) >>> m Matrix([ [0, 1, 2], [3, 4, 5], [6, 7, 8], [9, 10, 11]]) >>> m.extract([0, 1, 3], [0, 1]) Matrix([ [0, 1], [3, 4], [9, 10]]) Rows or columns can be repeated: >>> m.extract([0, 0, 1], [-1]) Matrix([ [2], [2], [5]]) Every other row can be taken by using range to provide the indices: >>> m.extract(range(0, m.rows, 2), [-1]) Matrix([ [2], [8]]) RowsList or colsList can also be a list of booleans, in which case the rows or columns corresponding to the True values will be selected: >>> m.extract([0, 1, 2, 3], [True, False, True]) Matrix([ [0, 2], [3, 5], [6, 8], [9, 11]]) """ if not is_sequence(rowsList) or not is_sequence(colsList): raise TypeError("rowsList and colsList must be iterable") # ensure rowsList and colsList are lists of integers if rowsList and all(isinstance(i, bool) for i in rowsList): rowsList = [index for index, item in enumerate(rowsList) if item] if colsList and all(isinstance(i, bool) for i in colsList): colsList = [index for index, item in enumerate(colsList) if item] # ensure everything is in range rowsList = [a2idx(k, self.rows) for k in rowsList] colsList = [a2idx(k, self.cols) for k in colsList] return self._eval_extract(rowsList, colsList) def get_diag_blocks(self): """Obtains the square sub-matrices on the main diagonal of a square matrix. Useful for inverting symbolic matrices or solving systems of linear equations which may be decoupled by having a block diagonal structure. Examples ======== >>> from sympy import Matrix >>> from sympy.abc import x, y, z >>> A = Matrix([[1, 3, 0, 0], [y, z*z, 0, 0], [0, 0, x, 0], [0, 0, 0, 0]]) >>> a1, a2, a3 = A.get_diag_blocks() >>> a1 Matrix([ [1, 3], [y, z**2]]) >>> a2 Matrix([[x]]) >>> a3 Matrix([[0]]) """ return self._eval_get_diag_blocks() @classmethod def hstack(cls, *args): """Return a matrix formed by joining args horizontally (i.e. by repeated application of row_join). Examples ======== >>> from sympy.matrices import Matrix, eye >>> Matrix.hstack(eye(2), 2*eye(2)) Matrix([ [1, 0, 2, 0], [0, 1, 0, 2]]) """ if len(args) == 0: return cls._new() kls = type(args[0]) return reduce(kls.row_join, args) def reshape(self, rows, cols): """Reshape the matrix. Total number of elements must remain the same. Examples ======== >>> from sympy import Matrix >>> m = Matrix(2, 3, lambda i, j: 1) >>> m Matrix([ [1, 1, 1], [1, 1, 1]]) >>> m.reshape(1, 6) Matrix([[1, 1, 1, 1, 1, 1]]) >>> m.reshape(3, 2) Matrix([ [1, 1], [1, 1], [1, 1]]) """ if self.rows * self.cols != rows * cols: raise ValueError("Invalid reshape parameters %d %d" % (rows, cols)) return self._new(rows, cols, lambda i, j: self[i * cols + j]) def row_del(self, row): """Delete the specified row.""" if row < 0: row += self.rows if not 0 <= row < self.rows: raise ValueError("Row {} out of range.".format(row)) return self._eval_row_del(row) def row_insert(self, pos, other): """Insert one or more rows at the given row position. Examples ======== >>> from sympy import zeros, ones >>> M = zeros(3) >>> V = ones(1, 3) >>> M.row_insert(1, V) Matrix([ [0, 0, 0], [1, 1, 1], [0, 0, 0], [0, 0, 0]]) See Also ======== row col_insert """ # Allows you to build a matrix even if it is null matrix if not self: return self._new(other) pos = as_int(pos) if pos < 0: pos = self.rows + pos if pos < 0: pos = 0 elif pos > self.rows: pos = self.rows if self.cols != other.cols: raise ShapeError( "`self` and `other` must have the same number of columns.") return self._eval_row_insert(pos, other) def row_join(self, other): """Concatenates two matrices along self's last and rhs's first column Examples ======== >>> from sympy import zeros, ones >>> M = zeros(3) >>> V = ones(3, 1) >>> M.row_join(V) Matrix([ [0, 0, 0, 1], [0, 0, 0, 1], [0, 0, 0, 1]]) See Also ======== row col_join """ # A null matrix can always be stacked (see #10770) if self.cols == 0 and self.rows != other.rows: return self._new(other.rows, 0, []).row_join(other) if self.rows != other.rows: raise ShapeError( "`self` and `rhs` must have the same number of rows.") return self._eval_row_join(other) def diagonal(self, k=0): """Returns the kth diagonal of self. The main diagonal corresponds to `k=0`; diagonals above and below correspond to `k > 0` and `k < 0`, respectively. The values of `self[i, j]` for which `j - i = k`, are returned in order of increasing `i + j`, starting with `i + j = |k|`. Examples ======== >>> from sympy import Matrix, SparseMatrix >>> m = Matrix(3, 3, lambda i, j: j - i); m Matrix([ [ 0, 1, 2], [-1, 0, 1], [-2, -1, 0]]) >>> _.diagonal() Matrix([[0, 0, 0]]) >>> m.diagonal(1) Matrix([[1, 1]]) >>> m.diagonal(-2) Matrix([[-2]]) Even though the diagonal is returned as a Matrix, the element retrieval can be done with a single index: >>> Matrix.diag(1, 2, 3).diagonal()[1] # instead of [0, 1] 2 See Also ======== diag - to create a diagonal matrix """ rv = [] k = as_int(k) r = 0 if k > 0 else -k c = 0 if r else k while True: if r == self.rows or c == self.cols: break rv.append(self[r, c]) r += 1 c += 1 if not rv: raise ValueError(filldedent(''' The %s diagonal is out of range [%s, %s]''' % ( k, 1 - self.rows, self.cols - 1))) return self._new(1, len(rv), rv) def row(self, i): """Elementary row selector. Examples ======== >>> from sympy import eye >>> eye(2).row(0) Matrix([[1, 0]]) See Also ======== col row_op row_swap row_del row_join row_insert """ return self[i, :] @property def shape(self): """The shape (dimensions) of the matrix as the 2-tuple (rows, cols). Examples ======== >>> from sympy.matrices import zeros >>> M = zeros(2, 3) >>> M.shape (2, 3) >>> M.rows 2 >>> M.cols 3 """ return (self.rows, self.cols) def tolist(self): """Return the Matrix as a nested Python list. Examples ======== >>> from sympy import Matrix, ones >>> m = Matrix(3, 3, range(9)) >>> m Matrix([ [0, 1, 2], [3, 4, 5], [6, 7, 8]]) >>> m.tolist() [[0, 1, 2], [3, 4, 5], [6, 7, 8]] >>> ones(3, 0).tolist() [[], [], []] When there are no rows then it will not be possible to tell how many columns were in the original matrix: >>> ones(0, 3).tolist() [] """ if not self.rows: return [] if not self.cols: return [[] for i in range(self.rows)] return self._eval_tolist() def vec(self): """Return the Matrix converted into a one column matrix by stacking columns Examples ======== >>> from sympy import Matrix >>> m=Matrix([[1, 3], [2, 4]]) >>> m Matrix([ [1, 3], [2, 4]]) >>> m.vec() Matrix([ [1], [2], [3], [4]]) See Also ======== vech """ return self._eval_vec() @classmethod def vstack(cls, *args): """Return a matrix formed by joining args vertically (i.e. by repeated application of col_join). Examples ======== >>> from sympy.matrices import Matrix, eye >>> Matrix.vstack(eye(2), 2*eye(2)) Matrix([ [1, 0], [0, 1], [2, 0], [0, 2]]) """ if len(args) == 0: return cls._new() kls = type(args[0]) return reduce(kls.col_join, args) class MatrixSpecial(MatrixRequired): """Construction of special matrices""" @classmethod def _eval_diag(cls, rows, cols, diag_dict): """diag_dict is a defaultdict containing all the entries of the diagonal matrix.""" def entry(i, j): return diag_dict[(i, j)] return cls._new(rows, cols, entry) @classmethod def _eval_eye(cls, rows, cols): def entry(i, j): return cls.one if i == j else cls.zero return cls._new(rows, cols, entry) @classmethod def _eval_jordan_block(cls, rows, cols, eigenvalue, band='upper'): if band == 'lower': def entry(i, j): if i == j: return eigenvalue elif j + 1 == i: return cls.one return cls.zero else: def entry(i, j): if i == j: return eigenvalue elif i + 1 == j: return cls.one return cls.zero return cls._new(rows, cols, entry) @classmethod def _eval_ones(cls, rows, cols): def entry(i, j): return cls.one return cls._new(rows, cols, entry) @classmethod def _eval_zeros(cls, rows, cols): def entry(i, j): return cls.zero return cls._new(rows, cols, entry) @classmethod def diag(kls, *args, **kwargs): """Returns a matrix with the specified diagonal. If matrices are passed, a block-diagonal matrix is created (i.e. the "direct sum" of the matrices). kwargs ====== rows : rows of the resulting matrix; computed if not given. cols : columns of the resulting matrix; computed if not given. cls : class for the resulting matrix unpack : bool which, when True (default), unpacks a single sequence rather than interpreting it as a Matrix. strict : bool which, when False (default), allows Matrices to have variable-length rows. Examples ======== >>> from sympy.matrices import Matrix >>> Matrix.diag(1, 2, 3) Matrix([ [1, 0, 0], [0, 2, 0], [0, 0, 3]]) The current default is to unpack a single sequence. If this is not desired, set `unpack=False` and it will be interpreted as a matrix. >>> Matrix.diag([1, 2, 3]) == Matrix.diag(1, 2, 3) True When more than one element is passed, each is interpreted as something to put on the diagonal. Lists are converted to matricecs. Filling of the diagonal always continues from the bottom right hand corner of the previous item: this will create a block-diagonal matrix whether the matrices are square or not. >>> col = [1, 2, 3] >>> row = [[4, 5]] >>> Matrix.diag(col, row) Matrix([ [1, 0, 0], [2, 0, 0], [3, 0, 0], [0, 4, 5]]) When `unpack` is False, elements within a list need not all be of the same length. Setting `strict` to True would raise a ValueError for the following: >>> Matrix.diag([[1, 2, 3], [4, 5], [6]], unpack=False) Matrix([ [1, 2, 3], [4, 5, 0], [6, 0, 0]]) The type of the returned matrix can be set with the ``cls`` keyword. >>> from sympy.matrices import ImmutableMatrix >>> from sympy.utilities.misc import func_name >>> func_name(Matrix.diag(1, cls=ImmutableMatrix)) 'ImmutableDenseMatrix' A zero dimension matrix can be used to position the start of the filling at the start of an arbitrary row or column: >>> from sympy import ones >>> r2 = ones(0, 2) >>> Matrix.diag(r2, 1, 2) Matrix([ [0, 0, 1, 0], [0, 0, 0, 2]]) See Also ======== eye diagonal - to extract a diagonal .dense.diag .expressions.blockmatrix.BlockMatrix """ from sympy.matrices.matrices import MatrixBase from sympy.matrices.dense import Matrix from sympy.matrices.sparse import SparseMatrix klass = kwargs.get('cls', kls) strict = kwargs.get('strict', False) # lists -> Matrices unpack = kwargs.get('unpack', True) # unpack single sequence if unpack and len(args) == 1 and is_sequence(args[0]) and \ not isinstance(args[0], MatrixBase): args = args[0] # fill a default dict with the diagonal entries diag_entries = defaultdict(int) rmax = cmax = 0 # keep track of the biggest index seen for m in args: if isinstance(m, list): if strict: # if malformed, Matrix will raise an error _ = Matrix(m) r, c = _.shape m = _.tolist() else: m = SparseMatrix(m) for (i, j), _ in m._smat.items(): diag_entries[(i + rmax, j + cmax)] = _ r, c = m.shape m = [] # to skip process below elif hasattr(m, 'shape'): # a Matrix # convert to list of lists r, c = m.shape m = m.tolist() else: # in this case, we're a single value diag_entries[(rmax, cmax)] = m rmax += 1 cmax += 1 continue # process list of lists for i in range(len(m)): for j, _ in enumerate(m[i]): diag_entries[(i + rmax, j + cmax)] = _ rmax += r cmax += c rows = kwargs.get('rows', None) cols = kwargs.get('cols', None) if rows is None: rows, cols = cols, rows if rows is None: rows, cols = rmax, cmax else: cols = rows if cols is None else cols if rows < rmax or cols < cmax: raise ValueError(filldedent(''' The constructed matrix is {} x {} but a size of {} x {} was specified.'''.format(rmax, cmax, rows, cols))) return klass._eval_diag(rows, cols, diag_entries) @classmethod def eye(kls, rows, cols=None, **kwargs): """Returns an identity matrix. Args ==== rows : rows of the matrix cols : cols of the matrix (if None, cols=rows) kwargs ====== cls : class of the returned matrix """ if cols is None: cols = rows klass = kwargs.get('cls', kls) rows, cols = as_int(rows), as_int(cols) return klass._eval_eye(rows, cols) @classmethod def jordan_block(kls, size=None, eigenvalue=None, **kwargs): """Returns a Jordan block Parameters ========== size : Integer, optional Specifies the shape of the Jordan block matrix. eigenvalue : Number or Symbol Specifies the value for the main diagonal of the matrix. .. note:: The keyword ``eigenval`` is also specified as an alias of this keyword, but it is not recommended to use. We may deprecate the alias in later release. band : 'upper' or 'lower', optional Specifies the position of the off-diagonal to put `1` s on. cls : Matrix, optional Specifies the matrix class of the output form. If it is not specified, the class type where the method is being executed on will be returned. rows, cols : Integer, optional Specifies the shape of the Jordan block matrix. See Notes section for the details of how these key works. .. note:: This feature will be deprecated in the future. Returns ======= Matrix A Jordan block matrix. Raises ====== ValueError If insufficient arguments are given for matrix size specification, or no eigenvalue is given. Examples ======== Creating a default Jordan block: >>> from sympy import Matrix >>> from sympy.abc import x >>> Matrix.jordan_block(4, x) Matrix([ [x, 1, 0, 0], [0, x, 1, 0], [0, 0, x, 1], [0, 0, 0, x]]) Creating an alternative Jordan block matrix where `1` is on lower off-diagonal: >>> Matrix.jordan_block(4, x, band='lower') Matrix([ [x, 0, 0, 0], [1, x, 0, 0], [0, 1, x, 0], [0, 0, 1, x]]) Creating a Jordan block with keyword arguments >>> Matrix.jordan_block(size=4, eigenvalue=x) Matrix([ [x, 1, 0, 0], [0, x, 1, 0], [0, 0, x, 1], [0, 0, 0, x]]) Notes ===== .. note:: This feature will be deprecated in the future. The keyword arguments ``size``, ``rows``, ``cols`` relates to the Jordan block size specifications. If you want to create a square Jordan block, specify either one of the three arguments. If you want to create a rectangular Jordan block, specify ``rows`` and ``cols`` individually. +--------------------------------+---------------------+ | Arguments Given | Matrix Shape | +----------+----------+----------+----------+----------+ | size | rows | cols | rows | cols | +==========+==========+==========+==========+==========+ | size | Any | size | size | +----------+----------+----------+----------+----------+ | | None | ValueError | | +----------+----------+----------+----------+ | None | rows | None | rows | rows | | +----------+----------+----------+----------+ | | None | cols | cols | cols | + +----------+----------+----------+----------+ | | rows | cols | rows | cols | +----------+----------+----------+----------+----------+ References ========== .. [1] https://en.wikipedia.org/wiki/Jordan_matrix """ if 'rows' in kwargs or 'cols' in kwargs: SymPyDeprecationWarning( feature="Keyword arguments 'rows' or 'cols'", issue=16102, useinstead="a more generic banded matrix constructor", deprecated_since_version="1.4" ).warn() klass = kwargs.pop('cls', kls) band = kwargs.pop('band', 'upper') rows = kwargs.pop('rows', None) cols = kwargs.pop('cols', None) eigenval = kwargs.get('eigenval', None) if eigenvalue is None and eigenval is None: raise ValueError("Must supply an eigenvalue") elif eigenvalue != eigenval and None not in (eigenval, eigenvalue): raise ValueError( "Inconsistent values are given: 'eigenval'={}, " "'eigenvalue'={}".format(eigenval, eigenvalue)) else: if eigenval is not None: eigenvalue = eigenval if (size, rows, cols) == (None, None, None): raise ValueError("Must supply a matrix size") if size is not None: rows, cols = size, size elif rows is not None and cols is None: cols = rows elif cols is not None and rows is None: rows = cols rows, cols = as_int(rows), as_int(cols) return klass._eval_jordan_block(rows, cols, eigenvalue, band) @classmethod def ones(kls, rows, cols=None, **kwargs): """Returns a matrix of ones. Args ==== rows : rows of the matrix cols : cols of the matrix (if None, cols=rows) kwargs ====== cls : class of the returned matrix """ if cols is None: cols = rows klass = kwargs.get('cls', kls) rows, cols = as_int(rows), as_int(cols) return klass._eval_ones(rows, cols) @classmethod def zeros(kls, rows, cols=None, **kwargs): """Returns a matrix of zeros. Args ==== rows : rows of the matrix cols : cols of the matrix (if None, cols=rows) kwargs ====== cls : class of the returned matrix """ if cols is None: cols = rows klass = kwargs.get('cls', kls) rows, cols = as_int(rows), as_int(cols) return klass._eval_zeros(rows, cols) class MatrixProperties(MatrixRequired): """Provides basic properties of a matrix.""" def _eval_atoms(self, *types): result = set() for i in self: result.update(i.atoms(*types)) return result def _eval_free_symbols(self): return set().union(*(i.free_symbols for i in self)) def _eval_has(self, *patterns): return any(a.has(*patterns) for a in self) def _eval_is_anti_symmetric(self, simpfunc): if not all(simpfunc(self[i, j] + self[j, i]).is_zero for i in range(self.rows) for j in range(self.cols)): return False return True def _eval_is_diagonal(self): for i in range(self.rows): for j in range(self.cols): if i != j and self[i, j]: return False return True # _eval_is_hermitian is called by some general sympy # routines and has a different *args signature. Make # sure the names don't clash by adding `_matrix_` in name. def _eval_is_matrix_hermitian(self, simpfunc): mat = self._new(self.rows, self.cols, lambda i, j: simpfunc(self[i, j] - self[j, i].conjugate())) return mat.is_zero def _eval_is_Identity(self): def dirac(i, j): if i == j: return 1 return 0 return all(self[i, j] == dirac(i, j) for i in range(self.rows) for j in range(self.cols)) def _eval_is_lower_hessenberg(self): return all(self[i, j].is_zero for i in range(self.rows) for j in range(i + 2, self.cols)) def _eval_is_lower(self): return all(self[i, j].is_zero for i in range(self.rows) for j in range(i + 1, self.cols)) def _eval_is_symbolic(self): return self.has(Symbol) def _eval_is_symmetric(self, simpfunc): mat = self._new(self.rows, self.cols, lambda i, j: simpfunc(self[i, j] - self[j, i])) return mat.is_zero def _eval_is_zero(self): if any(i.is_zero == False for i in self): return False if any(i.is_zero is None for i in self): return None return True def _eval_is_upper_hessenberg(self): return all(self[i, j].is_zero for i in range(2, self.rows) for j in range(min(self.cols, (i - 1)))) def _eval_values(self): return [i for i in self if not i.is_zero] def atoms(self, *types): """Returns the atoms that form the current object. Examples ======== >>> from sympy.abc import x, y >>> from sympy.matrices import Matrix >>> Matrix([[x]]) Matrix([[x]]) >>> _.atoms() {x} """ types = tuple(t if isinstance(t, type) else type(t) for t in types) if not types: types = (Atom,) return self._eval_atoms(*types) @property def free_symbols(self): """Returns the free symbols within the matrix. Examples ======== >>> from sympy.abc import x >>> from sympy.matrices import Matrix >>> Matrix([[x], [1]]).free_symbols {x} """ return self._eval_free_symbols() def has(self, *patterns): """Test whether any subexpression matches any of the patterns. Examples ======== >>> from sympy import Matrix, SparseMatrix, Float >>> from sympy.abc import x, y >>> A = Matrix(((1, x), (0.2, 3))) >>> B = SparseMatrix(((1, x), (0.2, 3))) >>> A.has(x) True >>> A.has(y) False >>> A.has(Float) True >>> B.has(x) True >>> B.has(y) False >>> B.has(Float) True """ return self._eval_has(*patterns) def is_anti_symmetric(self, simplify=True): """Check if matrix M is an antisymmetric matrix, that is, M is a square matrix with all M[i, j] == -M[j, i]. When ``simplify=True`` (default), the sum M[i, j] + M[j, i] is simplified before testing to see if it is zero. By default, the SymPy simplify function is used. To use a custom function set simplify to a function that accepts a single argument which returns a simplified expression. To skip simplification, set simplify to False but note that although this will be faster, it may induce false negatives. Examples ======== >>> from sympy import Matrix, symbols >>> m = Matrix(2, 2, [0, 1, -1, 0]) >>> m Matrix([ [ 0, 1], [-1, 0]]) >>> m.is_anti_symmetric() True >>> x, y = symbols('x y') >>> m = Matrix(2, 3, [0, 0, x, -y, 0, 0]) >>> m Matrix([ [ 0, 0, x], [-y, 0, 0]]) >>> m.is_anti_symmetric() False >>> from sympy.abc import x, y >>> m = Matrix(3, 3, [0, x**2 + 2*x + 1, y, ... -(x + 1)**2 , 0, x*y, ... -y, -x*y, 0]) Simplification of matrix elements is done by default so even though two elements which should be equal and opposite wouldn't pass an equality test, the matrix is still reported as anti-symmetric: >>> m[0, 1] == -m[1, 0] False >>> m.is_anti_symmetric() True If 'simplify=False' is used for the case when a Matrix is already simplified, this will speed things up. Here, we see that without simplification the matrix does not appear anti-symmetric: >>> m.is_anti_symmetric(simplify=False) False But if the matrix were already expanded, then it would appear anti-symmetric and simplification in the is_anti_symmetric routine is not needed: >>> m = m.expand() >>> m.is_anti_symmetric(simplify=False) True """ # accept custom simplification simpfunc = simplify if not isfunction(simplify): simpfunc = _simplify if simplify else lambda x: x if not self.is_square: return False return self._eval_is_anti_symmetric(simpfunc) def is_diagonal(self): """Check if matrix is diagonal, that is matrix in which the entries outside the main diagonal are all zero. Examples ======== >>> from sympy import Matrix, diag >>> m = Matrix(2, 2, [1, 0, 0, 2]) >>> m Matrix([ [1, 0], [0, 2]]) >>> m.is_diagonal() True >>> m = Matrix(2, 2, [1, 1, 0, 2]) >>> m Matrix([ [1, 1], [0, 2]]) >>> m.is_diagonal() False >>> m = diag(1, 2, 3) >>> m Matrix([ [1, 0, 0], [0, 2, 0], [0, 0, 3]]) >>> m.is_diagonal() True See Also ======== is_lower is_upper is_diagonalizable diagonalize """ return self._eval_is_diagonal() @property def is_hermitian(self, simplify=True): """Checks if the matrix is Hermitian. In a Hermitian matrix element i,j is the complex conjugate of element j,i. Examples ======== >>> from sympy.matrices import Matrix >>> from sympy import I >>> from sympy.abc import x >>> a = Matrix([[1, I], [-I, 1]]) >>> a Matrix([ [ 1, I], [-I, 1]]) >>> a.is_hermitian True >>> a[0, 0] = 2*I >>> a.is_hermitian False >>> a[0, 0] = x >>> a.is_hermitian >>> a[0, 1] = a[1, 0]*I >>> a.is_hermitian False """ if not self.is_square: return False simpfunc = simplify if not isfunction(simplify): simpfunc = _simplify if simplify else lambda x: x return self._eval_is_matrix_hermitian(simpfunc) @property def is_Identity(self): if not self.is_square: return False return self._eval_is_Identity() @property def is_lower_hessenberg(self): r"""Checks if the matrix is in the lower-Hessenberg form. The lower hessenberg matrix has zero entries above the first superdiagonal. Examples ======== >>> from sympy.matrices import Matrix >>> a = Matrix([[1, 2, 0, 0], [5, 2, 3, 0], [3, 4, 3, 7], [5, 6, 1, 1]]) >>> a Matrix([ [1, 2, 0, 0], [5, 2, 3, 0], [3, 4, 3, 7], [5, 6, 1, 1]]) >>> a.is_lower_hessenberg True See Also ======== is_upper_hessenberg is_lower """ return self._eval_is_lower_hessenberg() @property def is_lower(self): """Check if matrix is a lower triangular matrix. True can be returned even if the matrix is not square. Examples ======== >>> from sympy import Matrix >>> m = Matrix(2, 2, [1, 0, 0, 1]) >>> m Matrix([ [1, 0], [0, 1]]) >>> m.is_lower True >>> m = Matrix(4, 3, [0, 0, 0, 2, 0, 0, 1, 4 , 0, 6, 6, 5]) >>> m Matrix([ [0, 0, 0], [2, 0, 0], [1, 4, 0], [6, 6, 5]]) >>> m.is_lower True >>> from sympy.abc import x, y >>> m = Matrix(2, 2, [x**2 + y, y**2 + x, 0, x + y]) >>> m Matrix([ [x**2 + y, x + y**2], [ 0, x + y]]) >>> m.is_lower False See Also ======== is_upper is_diagonal is_lower_hessenberg """ return self._eval_is_lower() @property def is_square(self): """Checks if a matrix is square. A matrix is square if the number of rows equals the number of columns. The empty matrix is square by definition, since the number of rows and the number of columns are both zero. Examples ======== >>> from sympy import Matrix >>> a = Matrix([[1, 2, 3], [4, 5, 6]]) >>> b = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) >>> c = Matrix([]) >>> a.is_square False >>> b.is_square True >>> c.is_square True """ return self.rows == self.cols def is_symbolic(self): """Checks if any elements contain Symbols. Examples ======== >>> from sympy.matrices import Matrix >>> from sympy.abc import x, y >>> M = Matrix([[x, y], [1, 0]]) >>> M.is_symbolic() True """ return self._eval_is_symbolic() def is_symmetric(self, simplify=True): """Check if matrix is symmetric matrix, that is square matrix and is equal to its transpose. By default, simplifications occur before testing symmetry. They can be skipped using 'simplify=False'; while speeding things a bit, this may however induce false negatives. Examples ======== >>> from sympy import Matrix >>> m = Matrix(2, 2, [0, 1, 1, 2]) >>> m Matrix([ [0, 1], [1, 2]]) >>> m.is_symmetric() True >>> m = Matrix(2, 2, [0, 1, 2, 0]) >>> m Matrix([ [0, 1], [2, 0]]) >>> m.is_symmetric() False >>> m = Matrix(2, 3, [0, 0, 0, 0, 0, 0]) >>> m Matrix([ [0, 0, 0], [0, 0, 0]]) >>> m.is_symmetric() False >>> from sympy.abc import x, y >>> m = Matrix(3, 3, [1, x**2 + 2*x + 1, y, (x + 1)**2 , 2, 0, y, 0, 3]) >>> m Matrix([ [ 1, x**2 + 2*x + 1, y], [(x + 1)**2, 2, 0], [ y, 0, 3]]) >>> m.is_symmetric() True If the matrix is already simplified, you may speed-up is_symmetric() test by using 'simplify=False'. >>> bool(m.is_symmetric(simplify=False)) False >>> m1 = m.expand() >>> m1.is_symmetric(simplify=False) True """ simpfunc = simplify if not isfunction(simplify): simpfunc = _simplify if simplify else lambda x: x if not self.is_square: return False return self._eval_is_symmetric(simpfunc) @property def is_upper_hessenberg(self): """Checks if the matrix is the upper-Hessenberg form. The upper hessenberg matrix has zero entries below the first subdiagonal. Examples ======== >>> from sympy.matrices import Matrix >>> a = Matrix([[1, 4, 2, 3], [3, 4, 1, 7], [0, 2, 3, 4], [0, 0, 1, 3]]) >>> a Matrix([ [1, 4, 2, 3], [3, 4, 1, 7], [0, 2, 3, 4], [0, 0, 1, 3]]) >>> a.is_upper_hessenberg True See Also ======== is_lower_hessenberg is_upper """ return self._eval_is_upper_hessenberg() @property def is_upper(self): """Check if matrix is an upper triangular matrix. True can be returned even if the matrix is not square. Examples ======== >>> from sympy import Matrix >>> m = Matrix(2, 2, [1, 0, 0, 1]) >>> m Matrix([ [1, 0], [0, 1]]) >>> m.is_upper True >>> m = Matrix(4, 3, [5, 1, 9, 0, 4 , 6, 0, 0, 5, 0, 0, 0]) >>> m Matrix([ [5, 1, 9], [0, 4, 6], [0, 0, 5], [0, 0, 0]]) >>> m.is_upper True >>> m = Matrix(2, 3, [4, 2, 5, 6, 1, 1]) >>> m Matrix([ [4, 2, 5], [6, 1, 1]]) >>> m.is_upper False See Also ======== is_lower is_diagonal is_upper_hessenberg """ return all(self[i, j].is_zero for i in range(1, self.rows) for j in range(min(i, self.cols))) @property def is_zero(self): """Checks if a matrix is a zero matrix. A matrix is zero if every element is zero. A matrix need not be square to be considered zero. The empty matrix is zero by the principle of vacuous truth. For a matrix that may or may not be zero (e.g. contains a symbol), this will be None Examples ======== >>> from sympy import Matrix, zeros >>> from sympy.abc import x >>> a = Matrix([[0, 0], [0, 0]]) >>> b = zeros(3, 4) >>> c = Matrix([[0, 1], [0, 0]]) >>> d = Matrix([]) >>> e = Matrix([[x, 0], [0, 0]]) >>> a.is_zero True >>> b.is_zero True >>> c.is_zero False >>> d.is_zero True >>> e.is_zero """ return self._eval_is_zero() def values(self): """Return non-zero values of self.""" return self._eval_values() class MatrixOperations(MatrixRequired): """Provides basic matrix shape and elementwise operations. Should not be instantiated directly.""" def _eval_adjoint(self): return self.transpose().conjugate() def _eval_applyfunc(self, f): out = self._new(self.rows, self.cols, [f(x) for x in self]) return out def _eval_as_real_imag(self): from sympy.functions.elementary.complexes import re, im return (self.applyfunc(re), self.applyfunc(im)) def _eval_conjugate(self): return self.applyfunc(lambda x: x.conjugate()) def _eval_permute_cols(self, perm): # apply the permutation to a list mapping = list(perm) def entry(i, j): return self[i, mapping[j]] return self._new(self.rows, self.cols, entry) def _eval_permute_rows(self, perm): # apply the permutation to a list mapping = list(perm) def entry(i, j): return self[mapping[i], j] return self._new(self.rows, self.cols, entry) def _eval_trace(self): return sum(self[i, i] for i in range(self.rows)) def _eval_transpose(self): return self._new(self.cols, self.rows, lambda i, j: self[j, i]) def adjoint(self): """Conjugate transpose or Hermitian conjugation.""" return self._eval_adjoint() def applyfunc(self, f): """Apply a function to each element of the matrix. Examples ======== >>> from sympy import Matrix >>> m = Matrix(2, 2, lambda i, j: i*2+j) >>> m Matrix([ [0, 1], [2, 3]]) >>> m.applyfunc(lambda i: 2*i) Matrix([ [0, 2], [4, 6]]) """ if not callable(f): raise TypeError("`f` must be callable.") return self._eval_applyfunc(f) def as_real_imag(self): """Returns a tuple containing the (real, imaginary) part of matrix.""" return self._eval_as_real_imag() def conjugate(self): """Return the by-element conjugation. Examples ======== >>> from sympy.matrices import SparseMatrix >>> from sympy import I >>> a = SparseMatrix(((1, 2 + I), (3, 4), (I, -I))) >>> a Matrix([ [1, 2 + I], [3, 4], [I, -I]]) >>> a.C Matrix([ [ 1, 2 - I], [ 3, 4], [-I, I]]) See Also ======== transpose: Matrix transposition H: Hermite conjugation D: Dirac conjugation """ return self._eval_conjugate() def doit(self, **kwargs): return self.applyfunc(lambda x: x.doit()) def evalf(self, prec=None, **options): """Apply evalf() to each element of self.""" return self.applyfunc(lambda i: i.evalf(prec, **options)) def expand(self, deep=True, modulus=None, power_base=True, power_exp=True, mul=True, log=True, multinomial=True, basic=True, **hints): """Apply core.function.expand to each entry of the matrix. Examples ======== >>> from sympy.abc import x >>> from sympy.matrices import Matrix >>> Matrix(1, 1, [x*(x+1)]) Matrix([[x*(x + 1)]]) >>> _.expand() Matrix([[x**2 + x]]) """ return self.applyfunc(lambda x: x.expand( deep, modulus, power_base, power_exp, mul, log, multinomial, basic, **hints)) @property def H(self): """Return Hermite conjugate. Examples ======== >>> from sympy import Matrix, I >>> m = Matrix((0, 1 + I, 2, 3)) >>> m Matrix([ [ 0], [1 + I], [ 2], [ 3]]) >>> m.H Matrix([[0, 1 - I, 2, 3]]) See Also ======== conjugate: By-element conjugation D: Dirac conjugation """ return self.T.C def permute(self, perm, orientation='rows', direction='forward'): """Permute the rows or columns of a matrix by the given list of swaps. Parameters ========== perm : a permutation. This may be a list swaps (e.g., `[[1, 2], [0, 3]]`), or any valid input to the `Permutation` constructor, including a `Permutation()` itself. If `perm` is given explicitly as a list of indices or a `Permutation`, `direction` has no effect. orientation : ('rows' or 'cols') whether to permute the rows or the columns direction : ('forward', 'backward') whether to apply the permutations from the start of the list first, or from the back of the list first Examples ======== >>> from sympy.matrices import eye >>> M = eye(3) >>> M.permute([[0, 1], [0, 2]], orientation='rows', direction='forward') Matrix([ [0, 0, 1], [1, 0, 0], [0, 1, 0]]) >>> from sympy.matrices import eye >>> M = eye(3) >>> M.permute([[0, 1], [0, 2]], orientation='rows', direction='backward') Matrix([ [0, 1, 0], [0, 0, 1], [1, 0, 0]]) """ # allow british variants and `columns` if direction == 'forwards': direction = 'forward' if direction == 'backwards': direction = 'backward' if orientation == 'columns': orientation = 'cols' if direction not in ('forward', 'backward'): raise TypeError("direction='{}' is an invalid kwarg. " "Try 'forward' or 'backward'".format(direction)) if orientation not in ('rows', 'cols'): raise TypeError("orientation='{}' is an invalid kwarg. " "Try 'rows' or 'cols'".format(orientation)) # ensure all swaps are in range max_index = self.rows if orientation == 'rows' else self.cols if not all(0 <= t <= max_index for t in flatten(list(perm))): raise IndexError("`swap` indices out of range.") # see if we are a list of pairs try: assert len(perm[0]) == 2 # we are a list of swaps, so `direction` matters if direction == 'backward': perm = reversed(perm) # since Permutation doesn't let us have non-disjoint cycles, # we'll construct the explicit mapping ourselves XXX Bug #12479 mapping = list(range(max_index)) for (i, j) in perm: mapping[i], mapping[j] = mapping[j], mapping[i] perm = mapping except (TypeError, AssertionError, IndexError): pass from sympy.combinatorics import Permutation perm = Permutation(perm, size=max_index) if orientation == 'rows': return self._eval_permute_rows(perm) if orientation == 'cols': return self._eval_permute_cols(perm) def permute_cols(self, swaps, direction='forward'): """Alias for `self.permute(swaps, orientation='cols', direction=direction)` See Also ======== permute """ return self.permute(swaps, orientation='cols', direction=direction) def permute_rows(self, swaps, direction='forward'): """Alias for `self.permute(swaps, orientation='rows', direction=direction)` See Also ======== permute """ return self.permute(swaps, orientation='rows', direction=direction) def refine(self, assumptions=True): """Apply refine to each element of the matrix. Examples ======== >>> from sympy import Symbol, Matrix, Abs, sqrt, Q >>> x = Symbol('x') >>> Matrix([[Abs(x)**2, sqrt(x**2)],[sqrt(x**2), Abs(x)**2]]) Matrix([ [ Abs(x)**2, sqrt(x**2)], [sqrt(x**2), Abs(x)**2]]) >>> _.refine(Q.real(x)) Matrix([ [ x**2, Abs(x)], [Abs(x), x**2]]) """ return self.applyfunc(lambda x: refine(x, assumptions)) def replace(self, F, G, map=False): """Replaces Function F in Matrix entries with Function G. Examples ======== >>> from sympy import symbols, Function, Matrix >>> F, G = symbols('F, G', cls=Function) >>> M = Matrix(2, 2, lambda i, j: F(i+j)) ; M Matrix([ [F(0), F(1)], [F(1), F(2)]]) >>> N = M.replace(F,G) >>> N Matrix([ [G(0), G(1)], [G(1), G(2)]]) """ return self.applyfunc(lambda x: x.replace(F, G, map)) def simplify(self, **kwargs): """Apply simplify to each element of the matrix. Examples ======== >>> from sympy.abc import x, y >>> from sympy import sin, cos >>> from sympy.matrices import SparseMatrix >>> SparseMatrix(1, 1, [x*sin(y)**2 + x*cos(y)**2]) Matrix([[x*sin(y)**2 + x*cos(y)**2]]) >>> _.simplify() Matrix([[x]]) """ return self.applyfunc(lambda x: x.simplify(**kwargs)) def subs(self, *args, **kwargs): # should mirror core.basic.subs """Return a new matrix with subs applied to each entry. Examples ======== >>> from sympy.abc import x, y >>> from sympy.matrices import SparseMatrix, Matrix >>> SparseMatrix(1, 1, [x]) Matrix([[x]]) >>> _.subs(x, y) Matrix([[y]]) >>> Matrix(_).subs(y, x) Matrix([[x]]) """ return self.applyfunc(lambda x: x.subs(*args, **kwargs)) def trace(self): """ Returns the trace of a square matrix i.e. the sum of the diagonal elements. Examples ======== >>> from sympy import Matrix >>> A = Matrix(2, 2, [1, 2, 3, 4]) >>> A.trace() 5 """ if self.rows != self.cols: raise NonSquareMatrixError() return self._eval_trace() def transpose(self): """ Returns the transpose of the matrix. Examples ======== >>> from sympy import Matrix >>> A = Matrix(2, 2, [1, 2, 3, 4]) >>> A.transpose() Matrix([ [1, 3], [2, 4]]) >>> from sympy import Matrix, I >>> m=Matrix(((1, 2+I), (3, 4))) >>> m Matrix([ [1, 2 + I], [3, 4]]) >>> m.transpose() Matrix([ [ 1, 3], [2 + I, 4]]) >>> m.T == m.transpose() True See Also ======== conjugate: By-element conjugation """ return self._eval_transpose() T = property(transpose, None, None, "Matrix transposition.") C = property(conjugate, None, None, "By-element conjugation.") n = evalf def xreplace(self, rule): # should mirror core.basic.xreplace """Return a new matrix with xreplace applied to each entry. Examples ======== >>> from sympy.abc import x, y >>> from sympy.matrices import SparseMatrix, Matrix >>> SparseMatrix(1, 1, [x]) Matrix([[x]]) >>> _.xreplace({x: y}) Matrix([[y]]) >>> Matrix(_).xreplace({y: x}) Matrix([[x]]) """ return self.applyfunc(lambda x: x.xreplace(rule)) _eval_simplify = simplify def _eval_trigsimp(self, **opts): from sympy.simplify import trigsimp return self.applyfunc(lambda x: trigsimp(x, **opts)) class MatrixArithmetic(MatrixRequired): """Provides basic matrix arithmetic operations. Should not be instantiated directly.""" _op_priority = 10.01 def _eval_Abs(self): return self._new(self.rows, self.cols, lambda i, j: Abs(self[i, j])) def _eval_add(self, other): return self._new(self.rows, self.cols, lambda i, j: self[i, j] + other[i, j]) def _eval_matrix_mul(self, other): def entry(i, j): try: return sum(self[i,k]*other[k,j] for k in range(self.cols)) except TypeError: # Block matrices don't work with `sum` or `Add` (ISSUE #11599) # They don't work with `sum` because `sum` tries to add `0` # initially, and for a matrix, that is a mix of a scalar and # a matrix, which raises a TypeError. Fall back to a # block-matrix-safe way to multiply if the `sum` fails. ret = self[i, 0]*other[0, j] for k in range(1, self.cols): ret += self[i, k]*other[k, j] return ret return self._new(self.rows, other.cols, entry) def _eval_matrix_mul_elementwise(self, other): return self._new(self.rows, self.cols, lambda i, j: self[i,j]*other[i,j]) def _eval_matrix_rmul(self, other): def entry(i, j): return sum(other[i,k]*self[k,j] for k in range(other.cols)) return self._new(other.rows, self.cols, entry) def _eval_pow_by_recursion(self, num): if num == 1: return self if num % 2 == 1: return self * self._eval_pow_by_recursion(num - 1) ret = self._eval_pow_by_recursion(num // 2) return ret * ret def _eval_scalar_mul(self, other): return self._new(self.rows, self.cols, lambda i, j: self[i,j]*other) def _eval_scalar_rmul(self, other): return self._new(self.rows, self.cols, lambda i, j: other*self[i,j]) def _eval_Mod(self, other): from sympy import Mod return self._new(self.rows, self.cols, lambda i, j: Mod(self[i, j], other)) # python arithmetic functions def __abs__(self): """Returns a new matrix with entry-wise absolute values.""" return self._eval_Abs() @call_highest_priority('__radd__') def __add__(self, other): """Return self + other, raising ShapeError if shapes don't match.""" other = _matrixify(other) # matrix-like objects can have shapes. This is # our first sanity check. if hasattr(other, 'shape'): if self.shape != other.shape: raise ShapeError("Matrix size mismatch: %s + %s" % ( self.shape, other.shape)) # honest sympy matrices defer to their class's routine if getattr(other, 'is_Matrix', False): # call the highest-priority class's _eval_add a, b = self, other if a.__class__ != classof(a, b): b, a = a, b return a._eval_add(b) # Matrix-like objects can be passed to CommonMatrix routines directly. if getattr(other, 'is_MatrixLike', False): return MatrixArithmetic._eval_add(self, other) raise TypeError('cannot add %s and %s' % (type(self), type(other))) @call_highest_priority('__rdiv__') def __div__(self, other): return self * (self.one / other) @call_highest_priority('__rmatmul__') def __matmul__(self, other): other = _matrixify(other) if not getattr(other, 'is_Matrix', False) and not getattr(other, 'is_MatrixLike', False): return NotImplemented return self.__mul__(other) def __mod__(self, other): return self.applyfunc(lambda x: x % other) @call_highest_priority('__rmul__') def __mul__(self, other): """Return self*other where other is either a scalar or a matrix of compatible dimensions. Examples ======== >>> from sympy.matrices import Matrix >>> A = Matrix([[1, 2, 3], [4, 5, 6]]) >>> 2*A == A*2 == Matrix([[2, 4, 6], [8, 10, 12]]) True >>> B = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) >>> A*B Matrix([ [30, 36, 42], [66, 81, 96]]) >>> B*A Traceback (most recent call last): ... ShapeError: Matrices size mismatch. >>> See Also ======== matrix_multiply_elementwise """ other = _matrixify(other) # matrix-like objects can have shapes. This is # our first sanity check. if hasattr(other, 'shape') and len(other.shape) == 2: if self.shape[1] != other.shape[0]: raise ShapeError("Matrix size mismatch: %s * %s." % ( self.shape, other.shape)) # honest sympy matrices defer to their class's routine if getattr(other, 'is_Matrix', False): return self._eval_matrix_mul(other) # Matrix-like objects can be passed to CommonMatrix routines directly. if getattr(other, 'is_MatrixLike', False): return MatrixArithmetic._eval_matrix_mul(self, other) # if 'other' is not iterable then scalar multiplication. if not isinstance(other, Iterable): try: return self._eval_scalar_mul(other) except TypeError: pass return NotImplemented def __neg__(self): return self._eval_scalar_mul(-1) @call_highest_priority('__rpow__') def __pow__(self, exp): if self.rows != self.cols: raise NonSquareMatrixError() a = self jordan_pow = getattr(a, '_matrix_pow_by_jordan_blocks', None) exp = sympify(exp) if exp.is_zero: return a._new(a.rows, a.cols, lambda i, j: int(i == j)) if exp == 1: return a diagonal = getattr(a, 'is_diagonal', None) if diagonal is not None and diagonal(): return a._new(a.rows, a.cols, lambda i, j: a[i,j]**exp if i == j else 0) if exp.is_Number and exp % 1 == 0: if a.rows == 1: return a._new([[a[0]**exp]]) if exp < 0: exp = -exp a = a.inv() # When certain conditions are met, # Jordan block algorithm is faster than # computation by recursion. elif a.rows == 2 and exp > 100000 and jordan_pow is not None: try: return jordan_pow(exp) except MatrixError: pass return a._eval_pow_by_recursion(exp) if jordan_pow: try: return jordan_pow(exp) except NonInvertibleMatrixError: # Raised by jordan_pow on zero determinant matrix unless exp is # definitely known to be a non-negative integer. # Here we raise if n is definitely not a non-negative integer # but otherwise we can leave this as an unevaluated MatPow. if exp.is_integer is False or exp.is_nonnegative is False: raise from sympy.matrices.expressions import MatPow return MatPow(a, exp) @call_highest_priority('__add__') def __radd__(self, other): return self + other @call_highest_priority('__matmul__') def __rmatmul__(self, other): other = _matrixify(other) if not getattr(other, 'is_Matrix', False) and not getattr(other, 'is_MatrixLike', False): return NotImplemented return self.__rmul__(other) @call_highest_priority('__mul__') def __rmul__(self, other): other = _matrixify(other) # matrix-like objects can have shapes. This is # our first sanity check. if hasattr(other, 'shape') and len(other.shape) == 2: if self.shape[0] != other.shape[1]: raise ShapeError("Matrix size mismatch.") # honest sympy matrices defer to their class's routine if getattr(other, 'is_Matrix', False): return other._new(other.as_mutable() * self) # Matrix-like objects can be passed to CommonMatrix routines directly. if getattr(other, 'is_MatrixLike', False): return MatrixArithmetic._eval_matrix_rmul(self, other) # if 'other' is not iterable then scalar multiplication. if not isinstance(other, Iterable): try: return self._eval_scalar_rmul(other) except TypeError: pass return NotImplemented @call_highest_priority('__sub__') def __rsub__(self, a): return (-self) + a @call_highest_priority('__rsub__') def __sub__(self, a): return self + (-a) @call_highest_priority('__rtruediv__') def __truediv__(self, other): return self.__div__(other) def multiply_elementwise(self, other): """Return the Hadamard product (elementwise product) of A and B Examples ======== >>> from sympy.matrices import Matrix >>> A = Matrix([[0, 1, 2], [3, 4, 5]]) >>> B = Matrix([[1, 10, 100], [100, 10, 1]]) >>> A.multiply_elementwise(B) Matrix([ [ 0, 10, 200], [300, 40, 5]]) See Also ======== cross dot multiply """ if self.shape != other.shape: raise ShapeError("Matrix shapes must agree {} != {}".format(self.shape, other.shape)) return self._eval_matrix_mul_elementwise(other) class MatrixCommon(MatrixArithmetic, MatrixOperations, MatrixProperties, MatrixSpecial, MatrixShaping): """All common matrix operations including basic arithmetic, shaping, and special matrices like `zeros`, and `eye`.""" _diff_wrt = True class _MinimalMatrix(object): """Class providing the minimum functionality for a matrix-like object and implementing every method required for a `MatrixRequired`. This class does not have everything needed to become a full-fledged SymPy object, but it will satisfy the requirements of anything inheriting from `MatrixRequired`. If you wish to make a specialized matrix type, make sure to implement these methods and properties with the exception of `__init__` and `__repr__` which are included for convenience.""" is_MatrixLike = True _sympify = staticmethod(sympify) _class_priority = 3 zero = S.Zero one = S.One is_Matrix = True is_MatrixExpr = False @classmethod def _new(cls, *args, **kwargs): return cls(*args, **kwargs) def __init__(self, rows, cols=None, mat=None): if isfunction(mat): # if we passed in a function, use that to populate the indices mat = list(mat(i, j) for i in range(rows) for j in range(cols)) if cols is None and mat is None: mat = rows rows, cols = getattr(mat, 'shape', (rows, cols)) try: # if we passed in a list of lists, flatten it and set the size if cols is None and mat is None: mat = rows cols = len(mat[0]) rows = len(mat) mat = [x for l in mat for x in l] except (IndexError, TypeError): pass self.mat = tuple(self._sympify(x) for x in mat) self.rows, self.cols = rows, cols if self.rows is None or self.cols is None: raise NotImplementedError("Cannot initialize matrix with given parameters") def __getitem__(self, key): def _normalize_slices(row_slice, col_slice): """Ensure that row_slice and col_slice don't have `None` in their arguments. Any integers are converted to slices of length 1""" if not isinstance(row_slice, slice): row_slice = slice(row_slice, row_slice + 1, None) row_slice = slice(*row_slice.indices(self.rows)) if not isinstance(col_slice, slice): col_slice = slice(col_slice, col_slice + 1, None) col_slice = slice(*col_slice.indices(self.cols)) return (row_slice, col_slice) def _coord_to_index(i, j): """Return the index in _mat corresponding to the (i,j) position in the matrix. """ return i * self.cols + j if isinstance(key, tuple): i, j = key if isinstance(i, slice) or isinstance(j, slice): # if the coordinates are not slices, make them so # and expand the slices so they don't contain `None` i, j = _normalize_slices(i, j) rowsList, colsList = list(range(self.rows))[i], \ list(range(self.cols))[j] indices = (i * self.cols + j for i in rowsList for j in colsList) return self._new(len(rowsList), len(colsList), list(self.mat[i] for i in indices)) # if the key is a tuple of ints, change # it to an array index key = _coord_to_index(i, j) return self.mat[key] def __eq__(self, other): try: classof(self, other) except TypeError: return False return ( self.shape == other.shape and list(self) == list(other)) def __len__(self): return self.rows*self.cols def __repr__(self): return "_MinimalMatrix({}, {}, {})".format(self.rows, self.cols, self.mat) @property def shape(self): return (self.rows, self.cols) class _MatrixWrapper(object): """Wrapper class providing the minimum functionality for a matrix-like object: .rows, .cols, .shape, indexability, and iterability. CommonMatrix math operations should work on matrix-like objects. For example, wrapping a numpy matrix in a MatrixWrapper allows it to be passed to CommonMatrix. """ is_MatrixLike = True def __init__(self, mat, shape=None): self.mat = mat self.rows, self.cols = mat.shape if shape is None else shape def __getattr__(self, attr): """Most attribute access is passed straight through to the stored matrix""" return getattr(self.mat, attr) def __getitem__(self, key): return self.mat.__getitem__(key) def _matrixify(mat): """If `mat` is a Matrix or is matrix-like, return a Matrix or MatrixWrapper object. Otherwise `mat` is passed through without modification.""" if getattr(mat, 'is_Matrix', False): return mat if hasattr(mat, 'shape'): if len(mat.shape) == 2: return _MatrixWrapper(mat) return mat def a2idx(j, n=None): """Return integer after making positive and validating against n.""" if type(j) is not int: jindex = getattr(j, '__index__', None) if jindex is not None: j = jindex() else: raise IndexError("Invalid index a[%r]" % (j,)) if n is not None: if j < 0: j += n if not (j >= 0 and j < n): raise IndexError("Index out of range: a[%s]" % (j,)) return int(j) def classof(A, B): """ Get the type of the result when combining matrices of different types. Currently the strategy is that immutability is contagious. Examples ======== >>> from sympy import Matrix, ImmutableMatrix >>> from sympy.matrices.common import classof >>> M = Matrix([[1, 2], [3, 4]]) # a Mutable Matrix >>> IM = ImmutableMatrix([[1, 2], [3, 4]]) >>> classof(M, IM) <class 'sympy.matrices.immutable.ImmutableDenseMatrix'> """ priority_A = getattr(A, '_class_priority', None) priority_B = getattr(B, '_class_priority', None) if None not in (priority_A, priority_B): if A._class_priority > B._class_priority: return A.__class__ else: return B.__class__ try: import numpy except ImportError: pass else: if isinstance(A, numpy.ndarray): return B.__class__ if isinstance(B, numpy.ndarray): return A.__class__ raise TypeError("Incompatible classes %s, %s" % (A.__class__, B.__class__))

36a52de3b875748c6042092832d2171e67f7b34cf73fd72da2b0474ecec0a26f

from __future__ import division, print_function import random from sympy.core import SympifyError from sympy.core.basic import Basic from sympy.core.compatibility import is_sequence, range, reduce from sympy.core.expr import Expr from sympy.core.function import count_ops, expand_mul from sympy.core.singleton import S from sympy.core.symbol import Symbol from sympy.core.sympify import sympify from sympy.functions.elementary.miscellaneous import sqrt from sympy.functions.elementary.trigonometric import cos, sin from sympy.matrices.common import \ a2idx, classof, ShapeError, NonPositiveDefiniteMatrixError from sympy.matrices.matrices import MatrixBase from sympy.simplify import simplify as _simplify from sympy.utilities.decorator import doctest_depends_on from sympy.utilities.misc import filldedent def _iszero(x): """Returns True if x is zero.""" return x.is_zero def _compare_sequence(a, b): """Compares the elements of a list/tuple `a` and a list/tuple `b`. `_compare_sequence((1,2), [1, 2])` is True, whereas `(1,2) == [1, 2]` is False""" if type(a) is type(b): # if they are the same type, compare directly return a == b # there is no overhead for calling `tuple` on a # tuple return tuple(a) == tuple(b) class DenseMatrix(MatrixBase): is_MatrixExpr = False _op_priority = 10.01 _class_priority = 4 def __eq__(self, other): other = sympify(other) self_shape = getattr(self, 'shape', None) other_shape = getattr(other, 'shape', None) if None in (self_shape, other_shape): return False if self_shape != other_shape: return False if isinstance(other, Matrix): return _compare_sequence(self._mat, other._mat) elif isinstance(other, MatrixBase): return _compare_sequence(self._mat, Matrix(other)._mat) def __getitem__(self, key): """Return portion of self defined by key. If the key involves a slice then a list will be returned (if key is a single slice) or a matrix (if key was a tuple involving a slice). Examples ======== >>> from sympy import Matrix, I >>> m = Matrix([ ... [1, 2 + I], ... [3, 4 ]]) If the key is a tuple that doesn't involve a slice then that element is returned: >>> m[1, 0] 3 When a tuple key involves a slice, a matrix is returned. Here, the first column is selected (all rows, column 0): >>> m[:, 0] Matrix([ [1], [3]]) If the slice is not a tuple then it selects from the underlying list of elements that are arranged in row order and a list is returned if a slice is involved: >>> m[0] 1 >>> m[::2] [1, 3] """ if isinstance(key, tuple): i, j = key try: i, j = self.key2ij(key) return self._mat[i*self.cols + j] except (TypeError, IndexError): if (isinstance(i, Expr) and not i.is_number) or (isinstance(j, Expr) and not j.is_number): if ((j < 0) is True) or ((j >= self.shape[1]) is True) or\ ((i < 0) is True) or ((i >= self.shape[0]) is True): raise ValueError("index out of boundary") from sympy.matrices.expressions.matexpr import MatrixElement return MatrixElement(self, i, j) if isinstance(i, slice): # XXX remove list() when PY2 support is dropped i = list(range(self.rows))[i] elif is_sequence(i): pass else: i = [i] if isinstance(j, slice): # XXX remove list() when PY2 support is dropped j = list(range(self.cols))[j] elif is_sequence(j): pass else: j = [j] return self.extract(i, j) else: # row-wise decomposition of matrix if isinstance(key, slice): return self._mat[key] return self._mat[a2idx(key)] def __setitem__(self, key, value): raise NotImplementedError() def _cholesky(self, hermitian=True): """Helper function of cholesky. Without the error checks. To be used privately. Implements the Cholesky-Banachiewicz algorithm. Returns L such that L*L.H == self if hermitian flag is True, or L*L.T == self if hermitian is False. """ L = zeros(self.rows, self.rows) if hermitian: for i in range(self.rows): for j in range(i): L[i, j] = (1 / L[j, j])*expand_mul(self[i, j] - sum(L[i, k]*L[j, k].conjugate() for k in range(j))) Lii2 = expand_mul(self[i, i] - sum(L[i, k]*L[i, k].conjugate() for k in range(i))) if Lii2.is_positive is False: raise NonPositiveDefiniteMatrixError( "Matrix must be positive-definite") L[i, i] = sqrt(Lii2) else: for i in range(self.rows): for j in range(i): L[i, j] = (1 / L[j, j])*(self[i, j] - sum(L[i, k]*L[j, k] for k in range(j))) L[i, i] = sqrt(self[i, i] - sum(L[i, k]**2 for k in range(i))) return self._new(L) def _diagonal_solve(self, rhs): """Helper function of function diagonal_solve, without the error checks, to be used privately. """ return self._new(rhs.rows, rhs.cols, lambda i, j: rhs[i, j] / self[i, i]) def _eval_add(self, other): # we assume both arguments are dense matrices since # sparse matrices have a higher priority mat = [a + b for a,b in zip(self._mat, other._mat)] return classof(self, other)._new(self.rows, self.cols, mat, copy=False) def _eval_extract(self, rowsList, colsList): mat = self._mat cols = self.cols indices = (i * cols + j for i in rowsList for j in colsList) return self._new(len(rowsList), len(colsList), list(mat[i] for i in indices), copy=False) def _eval_matrix_mul(self, other): from sympy import Add # cache attributes for faster access self_rows, self_cols = self.rows, self.cols other_rows, other_cols = other.rows, other.cols other_len = other_rows * other_cols new_mat_rows = self.rows new_mat_cols = other.cols # preallocate the array new_mat = [self.zero]*new_mat_rows*new_mat_cols # if we multiply an n x 0 with a 0 x m, the # expected behavior is to produce an n x m matrix of zeros if self.cols != 0 and other.rows != 0: # cache self._mat and other._mat for performance mat = self._mat other_mat = other._mat for i in range(len(new_mat)): row, col = i // new_mat_cols, i % new_mat_cols row_indices = range(self_cols*row, self_cols*(row+1)) col_indices = range(col, other_len, other_cols) vec = (mat[a]*other_mat[b] for a,b in zip(row_indices, col_indices)) try: new_mat[i] = Add(*vec) except (TypeError, SympifyError): # Block matrices don't work with `sum` or `Add` (ISSUE #11599) # They don't work with `sum` because `sum` tries to add `0` # initially, and for a matrix, that is a mix of a scalar and # a matrix, which raises a TypeError. Fall back to a # block-matrix-safe way to multiply if the `sum` fails. vec = (mat[a]*other_mat[b] for a,b in zip(row_indices, col_indices)) new_mat[i] = reduce(lambda a,b: a + b, vec) return classof(self, other)._new(new_mat_rows, new_mat_cols, new_mat, copy=False) def _eval_matrix_mul_elementwise(self, other): mat = [a*b for a,b in zip(self._mat, other._mat)] return classof(self, other)._new(self.rows, self.cols, mat, copy=False) def _eval_inverse(self, **kwargs): """Return the matrix inverse using the method indicated (default is Gauss elimination). kwargs ====== method : ('GE', 'LU', or 'ADJ') iszerofunc try_block_diag Notes ===== According to the ``method`` keyword, it calls the appropriate method: GE .... inverse_GE(); default LU .... inverse_LU() ADJ ... inverse_ADJ() According to the ``try_block_diag`` keyword, it will try to form block diagonal matrices using the method get_diag_blocks(), invert these individually, and then reconstruct the full inverse matrix. Note, the GE and LU methods may require the matrix to be simplified before it is inverted in order to properly detect zeros during pivoting. In difficult cases a custom zero detection function can be provided by setting the ``iszerosfunc`` argument to a function that should return True if its argument is zero. The ADJ routine computes the determinant and uses that to detect singular matrices in addition to testing for zeros on the diagonal. See Also ======== inverse_LU inverse_GE inverse_ADJ """ from sympy.matrices import diag method = kwargs.get('method', 'GE') iszerofunc = kwargs.get('iszerofunc', _iszero) if kwargs.get('try_block_diag', False): blocks = self.get_diag_blocks() r = [] for block in blocks: r.append(block.inv(method=method, iszerofunc=iszerofunc)) return diag(*r) M = self.as_mutable() if method == "GE": rv = M.inverse_GE(iszerofunc=iszerofunc) elif method == "LU": rv = M.inverse_LU(iszerofunc=iszerofunc) elif method == "ADJ": rv = M.inverse_ADJ(iszerofunc=iszerofunc) else: # make sure to add an invertibility check (as in inverse_LU) # if a new method is added. raise ValueError("Inversion method unrecognized") return self._new(rv) def _eval_scalar_mul(self, other): mat = [other*a for a in self._mat] return self._new(self.rows, self.cols, mat, copy=False) def _eval_scalar_rmul(self, other): mat = [a*other for a in self._mat] return self._new(self.rows, self.cols, mat, copy=False) def _eval_tolist(self): mat = list(self._mat) cols = self.cols return [mat[i*cols:(i + 1)*cols] for i in range(self.rows)] def _LDLdecomposition(self, hermitian=True): """Helper function of LDLdecomposition. Without the error checks. To be used privately. Returns L and D such that L*D*L.H == self if hermitian flag is True, or L*D*L.T == self if hermitian is False. """ # https://en.wikipedia.org/wiki/Cholesky_decomposition#LDL_decomposition_2 D = zeros(self.rows, self.rows) L = eye(self.rows) if hermitian: for i in range(self.rows): for j in range(i): L[i, j] = (1 / D[j, j])*expand_mul(self[i, j] - sum( L[i, k]*L[j, k].conjugate()*D[k, k] for k in range(j))) D[i, i] = expand_mul(self[i, i] - sum(L[i, k]*L[i, k].conjugate()*D[k, k] for k in range(i))) if D[i, i].is_positive is False: raise NonPositiveDefiniteMatrixError( "Matrix must be positive-definite") else: for i in range(self.rows): for j in range(i): L[i, j] = (1 / D[j, j])*(self[i, j] - sum( L[i, k]*L[j, k]*D[k, k] for k in range(j))) D[i, i] = self[i, i] - sum(L[i, k]**2*D[k, k] for k in range(i)) return self._new(L), self._new(D) def _lower_triangular_solve(self, rhs): """Helper function of function lower_triangular_solve. Without the error checks. To be used privately. """ X = zeros(self.rows, rhs.cols) for j in range(rhs.cols): for i in range(self.rows): if self[i, i] == 0: raise TypeError("Matrix must be non-singular.") X[i, j] = (rhs[i, j] - sum(self[i, k]*X[k, j] for k in range(i))) / self[i, i] return self._new(X) def _upper_triangular_solve(self, rhs): """Helper function of function upper_triangular_solve. Without the error checks, to be used privately. """ X = zeros(self.rows, rhs.cols) for j in range(rhs.cols): for i in reversed(range(self.rows)): if self[i, i] == 0: raise ValueError("Matrix must be non-singular.") X[i, j] = (rhs[i, j] - sum(self[i, k]*X[k, j] for k in range(i + 1, self.rows))) / self[i, i] return self._new(X) def as_immutable(self): """Returns an Immutable version of this Matrix """ from .immutable import ImmutableDenseMatrix as cls if self.rows and self.cols: return cls._new(self.tolist()) return cls._new(self.rows, self.cols, []) def as_mutable(self): """Returns a mutable version of this matrix Examples ======== >>> from sympy import ImmutableMatrix >>> X = ImmutableMatrix([[1, 2], [3, 4]]) >>> Y = X.as_mutable() >>> Y[1, 1] = 5 # Can set values in Y >>> Y Matrix([ [1, 2], [3, 5]]) """ return Matrix(self) def equals(self, other, failing_expression=False): """Applies ``equals`` to corresponding elements of the matrices, trying to prove that the elements are equivalent, returning True if they are, False if any pair is not, and None (or the first failing expression if failing_expression is True) if it cannot be decided if the expressions are equivalent or not. This is, in general, an expensive operation. Examples ======== >>> from sympy.matrices import Matrix >>> from sympy.abc import x >>> from sympy import cos >>> A = Matrix([x*(x - 1), 0]) >>> B = Matrix([x**2 - x, 0]) >>> A == B False >>> A.simplify() == B.simplify() True >>> A.equals(B) True >>> A.equals(2) False See Also ======== sympy.core.expr.equals """ self_shape = getattr(self, 'shape', None) other_shape = getattr(other, 'shape', None) if None in (self_shape, other_shape): return False if self_shape != other_shape: return False rv = True for i in range(self.rows): for j in range(self.cols): ans = self[i, j].equals(other[i, j], failing_expression) if ans is False: return False elif ans is not True and rv is True: rv = ans return rv def _force_mutable(x): """Return a matrix as a Matrix, otherwise return x.""" if getattr(x, 'is_Matrix', False): return x.as_mutable() elif isinstance(x, Basic): return x elif hasattr(x, '__array__'): a = x.__array__() if len(a.shape) == 0: return sympify(a) return Matrix(x) return x class MutableDenseMatrix(DenseMatrix, MatrixBase): def __new__(cls, *args, **kwargs): return cls._new(*args, **kwargs) @classmethod def _new(cls, *args, **kwargs): # if the `copy` flag is set to False, the input # was rows, cols, [list]. It should be used directly # without creating a copy. if kwargs.get('copy', True) is False: if len(args) != 3: raise TypeError("'copy=False' requires a matrix be initialized as rows,cols,[list]") rows, cols, flat_list = args else: rows, cols, flat_list = cls._handle_creation_inputs(*args, **kwargs) flat_list = list(flat_list) # create a shallow copy self = object.__new__(cls) self.rows = rows self.cols = cols self._mat = flat_list return self def __setitem__(self, key, value): """ Examples ======== >>> from sympy import Matrix, I, zeros, ones >>> m = Matrix(((1, 2+I), (3, 4))) >>> m Matrix([ [1, 2 + I], [3, 4]]) >>> m[1, 0] = 9 >>> m Matrix([ [1, 2 + I], [9, 4]]) >>> m[1, 0] = [[0, 1]] To replace row r you assign to position r*m where m is the number of columns: >>> M = zeros(4) >>> m = M.cols >>> M[3*m] = ones(1, m)*2; M Matrix([ [0, 0, 0, 0], [0, 0, 0, 0], [0, 0, 0, 0], [2, 2, 2, 2]]) And to replace column c you can assign to position c: >>> M[2] = ones(m, 1)*4; M Matrix([ [0, 0, 4, 0], [0, 0, 4, 0], [0, 0, 4, 0], [2, 2, 4, 2]]) """ rv = self._setitem(key, value) if rv is not None: i, j, value = rv self._mat[i*self.cols + j] = value def as_mutable(self): return self.copy() def col_del(self, i): """Delete the given column. Examples ======== >>> from sympy.matrices import eye >>> M = eye(3) >>> M.col_del(1) >>> M Matrix([ [1, 0], [0, 0], [0, 1]]) See Also ======== col row_del """ if i < -self.cols or i >= self.cols: raise IndexError("Index out of range: 'i=%s', valid -%s <= i < %s" % (i, self.cols, self.cols)) for j in range(self.rows - 1, -1, -1): del self._mat[i + j*self.cols] self.cols -= 1 def col_op(self, j, f): """In-place operation on col j using two-arg functor whose args are interpreted as (self[i, j], i). Examples ======== >>> from sympy.matrices import eye >>> M = eye(3) >>> M.col_op(1, lambda v, i: v + 2*M[i, 0]); M Matrix([ [1, 2, 0], [0, 1, 0], [0, 0, 1]]) See Also ======== col row_op """ self._mat[j::self.cols] = [f(*t) for t in list(zip(self._mat[j::self.cols], list(range(self.rows))))] def col_swap(self, i, j): """Swap the two given columns of the matrix in-place. Examples ======== >>> from sympy.matrices import Matrix >>> M = Matrix([[1, 0], [1, 0]]) >>> M Matrix([ [1, 0], [1, 0]]) >>> M.col_swap(0, 1) >>> M Matrix([ [0, 1], [0, 1]]) See Also ======== col row_swap """ for k in range(0, self.rows): self[k, i], self[k, j] = self[k, j], self[k, i] def copyin_list(self, key, value): """Copy in elements from a list. Parameters ========== key : slice The section of this matrix to replace. value : iterable The iterable to copy values from. Examples ======== >>> from sympy.matrices import eye >>> I = eye(3) >>> I[:2, 0] = [1, 2] # col >>> I Matrix([ [1, 0, 0], [2, 1, 0], [0, 0, 1]]) >>> I[1, :2] = [[3, 4]] >>> I Matrix([ [1, 0, 0], [3, 4, 0], [0, 0, 1]]) See Also ======== copyin_matrix """ if not is_sequence(value): raise TypeError("`value` must be an ordered iterable, not %s." % type(value)) return self.copyin_matrix(key, Matrix(value)) def copyin_matrix(self, key, value): """Copy in values from a matrix into the given bounds. Parameters ========== key : slice The section of this matrix to replace. value : Matrix The matrix to copy values from. Examples ======== >>> from sympy.matrices import Matrix, eye >>> M = Matrix([[0, 1], [2, 3], [4, 5]]) >>> I = eye(3) >>> I[:3, :2] = M >>> I Matrix([ [0, 1, 0], [2, 3, 0], [4, 5, 1]]) >>> I[0, 1] = M >>> I Matrix([ [0, 0, 1], [2, 2, 3], [4, 4, 5]]) See Also ======== copyin_list """ rlo, rhi, clo, chi = self.key2bounds(key) shape = value.shape dr, dc = rhi - rlo, chi - clo if shape != (dr, dc): raise ShapeError(filldedent("The Matrix `value` doesn't have the " "same dimensions " "as the in sub-Matrix given by `key`.")) for i in range(value.rows): for j in range(value.cols): self[i + rlo, j + clo] = value[i, j] def fill(self, value): """Fill the matrix with the scalar value. See Also ======== zeros ones """ self._mat = [value]*len(self) def row_del(self, i): """Delete the given row. Examples ======== >>> from sympy.matrices import eye >>> M = eye(3) >>> M.row_del(1) >>> M Matrix([ [1, 0, 0], [0, 0, 1]]) See Also ======== row col_del """ if i < -self.rows or i >= self.rows: raise IndexError("Index out of range: 'i = %s', valid -%s <= i" " < %s" % (i, self.rows, self.rows)) if i < 0: i += self.rows del self._mat[i*self.cols:(i+1)*self.cols] self.rows -= 1 def row_op(self, i, f): """In-place operation on row ``i`` using two-arg functor whose args are interpreted as ``(self[i, j], j)``. Examples ======== >>> from sympy.matrices import eye >>> M = eye(3) >>> M.row_op(1, lambda v, j: v + 2*M[0, j]); M Matrix([ [1, 0, 0], [2, 1, 0], [0, 0, 1]]) See Also ======== row zip_row_op col_op """ i0 = i*self.cols ri = self._mat[i0: i0 + self.cols] self._mat[i0: i0 + self.cols] = [f(x, j) for x, j in zip(ri, list(range(self.cols)))] def row_swap(self, i, j): """Swap the two given rows of the matrix in-place. Examples ======== >>> from sympy.matrices import Matrix >>> M = Matrix([[0, 1], [1, 0]]) >>> M Matrix([ [0, 1], [1, 0]]) >>> M.row_swap(0, 1) >>> M Matrix([ [1, 0], [0, 1]]) See Also ======== row col_swap """ for k in range(0, self.cols): self[i, k], self[j, k] = self[j, k], self[i, k] def simplify(self, **kwargs): """Applies simplify to the elements of a matrix in place. This is a shortcut for M.applyfunc(lambda x: simplify(x, ratio, measure)) See Also ======== sympy.simplify.simplify.simplify """ for i in range(len(self._mat)): self._mat[i] = _simplify(self._mat[i], **kwargs) def zip_row_op(self, i, k, f): """In-place operation on row ``i`` using two-arg functor whose args are interpreted as ``(self[i, j], self[k, j])``. Examples ======== >>> from sympy.matrices import eye >>> M = eye(3) >>> M.zip_row_op(1, 0, lambda v, u: v + 2*u); M Matrix([ [1, 0, 0], [2, 1, 0], [0, 0, 1]]) See Also ======== row row_op col_op """ i0 = i*self.cols k0 = k*self.cols ri = self._mat[i0: i0 + self.cols] rk = self._mat[k0: k0 + self.cols] self._mat[i0: i0 + self.cols] = [f(x, y) for x, y in zip(ri, rk)] # Utility functions MutableMatrix = Matrix = MutableDenseMatrix ########### # Numpy Utility Functions: # list2numpy, matrix2numpy, symmarray, rot_axis[123] ########### def list2numpy(l, dtype=object): # pragma: no cover """Converts python list of SymPy expressions to a NumPy array. See Also ======== matrix2numpy """ from numpy import empty a = empty(len(l), dtype) for i, s in enumerate(l): a[i] = s return a def matrix2numpy(m, dtype=object): # pragma: no cover """Converts SymPy's matrix to a NumPy array. See Also ======== list2numpy """ from numpy import empty a = empty(m.shape, dtype) for i in range(m.rows): for j in range(m.cols): a[i, j] = m[i, j] return a def rot_axis3(theta): """Returns a rotation matrix for a rotation of theta (in radians) about the 3-axis. Examples ======== >>> from sympy import pi >>> from sympy.matrices import rot_axis3 A rotation of pi/3 (60 degrees): >>> theta = pi/3 >>> rot_axis3(theta) Matrix([ [ 1/2, sqrt(3)/2, 0], [-sqrt(3)/2, 1/2, 0], [ 0, 0, 1]]) If we rotate by pi/2 (90 degrees): >>> rot_axis3(pi/2) Matrix([ [ 0, 1, 0], [-1, 0, 0], [ 0, 0, 1]]) See Also ======== rot_axis1: Returns a rotation matrix for a rotation of theta (in radians) about the 1-axis rot_axis2: Returns a rotation matrix for a rotation of theta (in radians) about the 2-axis """ ct = cos(theta) st = sin(theta) lil = ((ct, st, 0), (-st, ct, 0), (0, 0, 1)) return Matrix(lil) def rot_axis2(theta): """Returns a rotation matrix for a rotation of theta (in radians) about the 2-axis. Examples ======== >>> from sympy import pi >>> from sympy.matrices import rot_axis2 A rotation of pi/3 (60 degrees): >>> theta = pi/3 >>> rot_axis2(theta) Matrix([ [ 1/2, 0, -sqrt(3)/2], [ 0, 1, 0], [sqrt(3)/2, 0, 1/2]]) If we rotate by pi/2 (90 degrees): >>> rot_axis2(pi/2) Matrix([ [0, 0, -1], [0, 1, 0], [1, 0, 0]]) See Also ======== rot_axis1: Returns a rotation matrix for a rotation of theta (in radians) about the 1-axis rot_axis3: Returns a rotation matrix for a rotation of theta (in radians) about the 3-axis """ ct = cos(theta) st = sin(theta) lil = ((ct, 0, -st), (0, 1, 0), (st, 0, ct)) return Matrix(lil) def rot_axis1(theta): """Returns a rotation matrix for a rotation of theta (in radians) about the 1-axis. Examples ======== >>> from sympy import pi >>> from sympy.matrices import rot_axis1 A rotation of pi/3 (60 degrees): >>> theta = pi/3 >>> rot_axis1(theta) Matrix([ [1, 0, 0], [0, 1/2, sqrt(3)/2], [0, -sqrt(3)/2, 1/2]]) If we rotate by pi/2 (90 degrees): >>> rot_axis1(pi/2) Matrix([ [1, 0, 0], [0, 0, 1], [0, -1, 0]]) See Also ======== rot_axis2: Returns a rotation matrix for a rotation of theta (in radians) about the 2-axis rot_axis3: Returns a rotation matrix for a rotation of theta (in radians) about the 3-axis """ ct = cos(theta) st = sin(theta) lil = ((1, 0, 0), (0, ct, st), (0, -st, ct)) return Matrix(lil) @doctest_depends_on(modules=('numpy',)) def symarray(prefix, shape, **kwargs): # pragma: no cover r"""Create a numpy ndarray of symbols (as an object array). The created symbols are named ``prefix_i1_i2_``... You should thus provide a non-empty prefix if you want your symbols to be unique for different output arrays, as SymPy symbols with identical names are the same object. Parameters ---------- prefix : string A prefix prepended to the name of every symbol. shape : int or tuple Shape of the created array. If an int, the array is one-dimensional; for more than one dimension the shape must be a tuple. \*\*kwargs : dict keyword arguments passed on to Symbol Examples ======== These doctests require numpy. >>> from sympy import symarray >>> symarray('', 3) [_0 _1 _2] If you want multiple symarrays to contain distinct symbols, you *must* provide unique prefixes: >>> a = symarray('', 3) >>> b = symarray('', 3) >>> a[0] == b[0] True >>> a = symarray('a', 3) >>> b = symarray('b', 3) >>> a[0] == b[0] False Creating symarrays with a prefix: >>> symarray('a', 3) [a_0 a_1 a_2] For more than one dimension, the shape must be given as a tuple: >>> symarray('a', (2, 3)) [[a_0_0 a_0_1 a_0_2] [a_1_0 a_1_1 a_1_2]] >>> symarray('a', (2, 3, 2)) [[[a_0_0_0 a_0_0_1] [a_0_1_0 a_0_1_1] [a_0_2_0 a_0_2_1]] <BLANKLINE> [[a_1_0_0 a_1_0_1] [a_1_1_0 a_1_1_1] [a_1_2_0 a_1_2_1]]] For setting assumptions of the underlying Symbols: >>> [s.is_real for s in symarray('a', 2, real=True)] [True, True] """ from numpy import empty, ndindex arr = empty(shape, dtype=object) for index in ndindex(shape): arr[index] = Symbol('%s_%s' % (prefix, '_'.join(map(str, index))), **kwargs) return arr ############### # Functions ############### def casoratian(seqs, n, zero=True): """Given linear difference operator L of order 'k' and homogeneous equation Ly = 0 we want to compute kernel of L, which is a set of 'k' sequences: a(n), b(n), ... z(n). Solutions of L are linearly independent iff their Casoratian, denoted as C(a, b, ..., z), do not vanish for n = 0. Casoratian is defined by k x k determinant:: + a(n) b(n) . . . z(n) + | a(n+1) b(n+1) . . . z(n+1) | | . . . . | | . . . . | | . . . . | + a(n+k-1) b(n+k-1) . . . z(n+k-1) + It proves very useful in rsolve_hyper() where it is applied to a generating set of a recurrence to factor out linearly dependent solutions and return a basis: >>> from sympy import Symbol, casoratian, factorial >>> n = Symbol('n', integer=True) Exponential and factorial are linearly independent: >>> casoratian([2**n, factorial(n)], n) != 0 True """ seqs = list(map(sympify, seqs)) if not zero: f = lambda i, j: seqs[j].subs(n, n + i) else: f = lambda i, j: seqs[j].subs(n, i) k = len(seqs) return Matrix(k, k, f).det() def eye(*args, **kwargs): """Create square identity matrix n x n See Also ======== diag zeros ones """ return Matrix.eye(*args, **kwargs) def diag(*values, **kwargs): """Returns a matrix with the provided values placed on the diagonal. If non-square matrices are included, they will produce a block-diagonal matrix. Examples ======== This version of diag is a thin wrapper to Matrix.diag that differs in that it treats all lists like matrices -- even when a single list is given. If this is not desired, either put a `*` before the list or set `unpack=True`. >>> from sympy import diag >>> diag([1, 2, 3], unpack=True) # = diag(1,2,3) or diag(*[1,2,3]) Matrix([ [1, 0, 0], [0, 2, 0], [0, 0, 3]]) >>> diag([1, 2, 3]) # a column vector Matrix([ [1], [2], [3]]) See Also ======== .common.MatrixCommon.eye .common.MatrixCommon.diagonal - to extract a diagonal .common.MatrixCommon.diag .expressions.blockmatrix.BlockMatrix """ # Extract any setting so we don't duplicate keywords sent # as named parameters: kw = kwargs.copy() strict = kw.pop('strict', True) # lists will be converted to Matrices unpack = kw.pop('unpack', False) return Matrix.diag(*values, strict=strict, unpack=unpack, **kw) def GramSchmidt(vlist, orthonormal=False): """Apply the Gram-Schmidt process to a set of vectors. Parameters ========== vlist : List of Matrix Vectors to be orthogonalized for. orthonormal : Bool, optional If true, return an orthonormal basis. Returns ======= vlist : List of Matrix Orthogonalized vectors Notes ===== This routine is mostly duplicate from ``Matrix.orthogonalize``, except for some difference that this always raises error when linearly dependent vectors are found, and the keyword ``normalize`` has been named as ``orthonormal`` in this function. See Also ======== .matrices.MatrixSubspaces.orthogonalize References ========== .. [1] https://en.wikipedia.org/wiki/Gram%E2%80%93Schmidt_process """ return MutableDenseMatrix.orthogonalize( *vlist, normalize=orthonormal, rankcheck=True ) def hessian(f, varlist, constraints=[]): """Compute Hessian matrix for a function f wrt parameters in varlist which may be given as a sequence or a row/column vector. A list of constraints may optionally be given. Examples ======== >>> from sympy import Function, hessian, pprint >>> from sympy.abc import x, y >>> f = Function('f')(x, y) >>> g1 = Function('g')(x, y) >>> g2 = x**2 + 3*y >>> pprint(hessian(f, (x, y), [g1, g2])) [ d d ] [ 0 0 --(g(x, y)) --(g(x, y)) ] [ dx dy ] [ ] [ 0 0 2*x 3 ] [ ] [ 2 2 ] [d d d ] [--(g(x, y)) 2*x ---(f(x, y)) -----(f(x, y))] [dx 2 dy dx ] [ dx ] [ ] [ 2 2 ] [d d d ] [--(g(x, y)) 3 -----(f(x, y)) ---(f(x, y)) ] [dy dy dx 2 ] [ dy ] References ========== https://en.wikipedia.org/wiki/Hessian_matrix See Also ======== sympy.matrices.mutable.Matrix.jacobian wronskian """ # f is the expression representing a function f, return regular matrix if isinstance(varlist, MatrixBase): if 1 not in varlist.shape: raise ShapeError("`varlist` must be a column or row vector.") if varlist.cols == 1: varlist = varlist.T varlist = varlist.tolist()[0] if is_sequence(varlist): n = len(varlist) if not n: raise ShapeError("`len(varlist)` must not be zero.") else: raise ValueError("Improper variable list in hessian function") if not getattr(f, 'diff'): # check differentiability raise ValueError("Function `f` (%s) is not differentiable" % f) m = len(constraints) N = m + n out = zeros(N) for k, g in enumerate(constraints): if not getattr(g, 'diff'): # check differentiability raise ValueError("Function `f` (%s) is not differentiable" % f) for i in range(n): out[k, i + m] = g.diff(varlist[i]) for i in range(n): for j in range(i, n): out[i + m, j + m] = f.diff(varlist[i]).diff(varlist[j]) for i in range(N): for j in range(i + 1, N): out[j, i] = out[i, j] return out def jordan_cell(eigenval, n): """ Create a Jordan block: Examples ======== >>> from sympy.matrices import jordan_cell >>> from sympy.abc import x >>> jordan_cell(x, 4) Matrix([ [x, 1, 0, 0], [0, x, 1, 0], [0, 0, x, 1], [0, 0, 0, x]]) """ return Matrix.jordan_block(size=n, eigenvalue=eigenval) def matrix_multiply_elementwise(A, B): """Return the Hadamard product (elementwise product) of A and B >>> from sympy.matrices import matrix_multiply_elementwise >>> from sympy.matrices import Matrix >>> A = Matrix([[0, 1, 2], [3, 4, 5]]) >>> B = Matrix([[1, 10, 100], [100, 10, 1]]) >>> matrix_multiply_elementwise(A, B) Matrix([ [ 0, 10, 200], [300, 40, 5]]) See Also ======== __mul__ """ return A.multiply_elementwise(B) def ones(*args, **kwargs): """Returns a matrix of ones with ``rows`` rows and ``cols`` columns; if ``cols`` is omitted a square matrix will be returned. See Also ======== zeros eye diag """ if 'c' in kwargs: kwargs['cols'] = kwargs.pop('c') return Matrix.ones(*args, **kwargs) def randMatrix(r, c=None, min=0, max=99, seed=None, symmetric=False, percent=100, prng=None): """Create random matrix with dimensions ``r`` x ``c``. If ``c`` is omitted the matrix will be square. If ``symmetric`` is True the matrix must be square. If ``percent`` is less than 100 then only approximately the given percentage of elements will be non-zero. The pseudo-random number generator used to generate matrix is chosen in the following way. * If ``prng`` is supplied, it will be used as random number generator. It should be an instance of :class:`random.Random`, or at least have ``randint`` and ``shuffle`` methods with same signatures. * if ``prng`` is not supplied but ``seed`` is supplied, then new :class:`random.Random` with given ``seed`` will be created; * otherwise, a new :class:`random.Random` with default seed will be used. Examples ======== >>> from sympy.matrices import randMatrix >>> randMatrix(3) # doctest:+SKIP [25, 45, 27] [44, 54, 9] [23, 96, 46] >>> randMatrix(3, 2) # doctest:+SKIP [87, 29] [23, 37] [90, 26] >>> randMatrix(3, 3, 0, 2) # doctest:+SKIP [0, 2, 0] [2, 0, 1] [0, 0, 1] >>> randMatrix(3, symmetric=True) # doctest:+SKIP [85, 26, 29] [26, 71, 43] [29, 43, 57] >>> A = randMatrix(3, seed=1) >>> B = randMatrix(3, seed=2) >>> A == B # doctest:+SKIP False >>> A == randMatrix(3, seed=1) True >>> randMatrix(3, symmetric=True, percent=50) # doctest:+SKIP [77, 70, 0], [70, 0, 0], [ 0, 0, 88] """ if c is None: c = r # Note that ``Random()`` is equivalent to ``Random(None)`` prng = prng or random.Random(seed) if not symmetric: m = Matrix._new(r, c, lambda i, j: prng.randint(min, max)) if percent == 100: return m z = int(r*c*(100 - percent) // 100) m._mat[:z] = [S.Zero]*z prng.shuffle(m._mat) return m # Symmetric case if r != c: raise ValueError('For symmetric matrices, r must equal c, but %i != %i' % (r, c)) m = zeros(r) ij = [(i, j) for i in range(r) for j in range(i, r)] if percent != 100: ij = prng.sample(ij, int(len(ij)*percent // 100)) for i, j in ij: value = prng.randint(min, max) m[i, j] = m[j, i] = value return m def wronskian(functions, var, method='bareiss'): """ Compute Wronskian for [] of functions :: | f1 f2 ... fn | | f1' f2' ... fn' | | . . . . | W(f1, ..., fn) = | . . . . | | . . . . | | (n) (n) (n) | | D (f1) D (f2) ... D (fn) | see: https://en.wikipedia.org/wiki/Wronskian See Also ======== sympy.matrices.mutable.Matrix.jacobian hessian """ for index in range(0, len(functions)): functions[index] = sympify(functions[index]) n = len(functions) if n == 0: return 1 W = Matrix(n, n, lambda i, j: functions[i].diff(var, j)) return W.det(method) def zeros(*args, **kwargs): """Returns a matrix of zeros with ``rows`` rows and ``cols`` columns; if ``cols`` is omitted a square matrix will be returned. See Also ======== ones eye diag """ if 'c' in kwargs: kwargs['cols'] = kwargs.pop('c') return Matrix.zeros(*args, **kwargs)

185701c1d060c9dd66bcc1471c46a1d9010b34dfa11d5b40d6055a5509e227d7

from __future__ import division, print_function import copy from collections import defaultdict from sympy.core.compatibility import Callable, as_int, is_sequence, range from sympy.core.containers import Dict from sympy.core.expr import Expr from sympy.core.singleton import S from sympy.functions import Abs from sympy.functions.elementary.miscellaneous import sqrt from sympy.utilities.iterables import uniq from sympy.utilities.misc import filldedent from .common import a2idx from .dense import Matrix from .matrices import MatrixBase, ShapeError class SparseMatrix(MatrixBase): """ A sparse matrix (a matrix with a large number of zero elements). Examples ======== >>> from sympy.matrices import SparseMatrix, ones >>> SparseMatrix(2, 2, range(4)) Matrix([ [0, 1], [2, 3]]) >>> SparseMatrix(2, 2, {(1, 1): 2}) Matrix([ [0, 0], [0, 2]]) A SparseMatrix can be instantiated from a ragged list of lists: >>> SparseMatrix([[1, 2, 3], [1, 2], [1]]) Matrix([ [1, 2, 3], [1, 2, 0], [1, 0, 0]]) For safety, one may include the expected size and then an error will be raised if the indices of any element are out of range or (for a flat list) if the total number of elements does not match the expected shape: >>> SparseMatrix(2, 2, [1, 2]) Traceback (most recent call last): ... ValueError: List length (2) != rows*columns (4) Here, an error is not raised because the list is not flat and no element is out of range: >>> SparseMatrix(2, 2, [[1, 2]]) Matrix([ [1, 2], [0, 0]]) But adding another element to the first (and only) row will cause an error to be raised: >>> SparseMatrix(2, 2, [[1, 2, 3]]) Traceback (most recent call last): ... ValueError: The location (0, 2) is out of designated range: (1, 1) To autosize the matrix, pass None for rows: >>> SparseMatrix(None, [[1, 2, 3]]) Matrix([[1, 2, 3]]) >>> SparseMatrix(None, {(1, 1): 1, (3, 3): 3}) Matrix([ [0, 0, 0, 0], [0, 1, 0, 0], [0, 0, 0, 0], [0, 0, 0, 3]]) Values that are themselves a Matrix are automatically expanded: >>> SparseMatrix(4, 4, {(1, 1): ones(2)}) Matrix([ [0, 0, 0, 0], [0, 1, 1, 0], [0, 1, 1, 0], [0, 0, 0, 0]]) A ValueError is raised if the expanding matrix tries to overwrite a different element already present: >>> SparseMatrix(3, 3, {(0, 0): ones(2), (1, 1): 2}) Traceback (most recent call last): ... ValueError: collision at (1, 1) See Also ======== sympy.matrices.common.diag sympy.matrices.dense.Matrix """ def __new__(cls, *args, **kwargs): self = object.__new__(cls) if len(args) == 1 and isinstance(args[0], SparseMatrix): self.rows = args[0].rows self.cols = args[0].cols self._smat = dict(args[0]._smat) return self self._smat = {} # autosizing if len(args) == 2 and args[0] is None: args = (None,) + args if len(args) == 3: r, c = args[:2] if r is c is None: self.rows = self.cols = None elif None in (r, c): raise ValueError( 'Pass rows=None and no cols for autosizing.') else: self.rows, self.cols = map(as_int, args[:2]) if isinstance(args[2], Callable): op = args[2] for i in range(self.rows): for j in range(self.cols): value = self._sympify( op(self._sympify(i), self._sympify(j))) if value: self._smat[i, j] = value elif isinstance(args[2], (dict, Dict)): def update(i, j, v): # update self._smat and make sure there are # no collisions if v: if (i, j) in self._smat and v != self._smat[i, j]: raise ValueError('collision at %s' % ((i, j),)) self._smat[i, j] = v # manual copy, copy.deepcopy() doesn't work for key, v in args[2].items(): r, c = key if isinstance(v, SparseMatrix): for (i, j), vij in v._smat.items(): update(r + i, c + j, vij) else: if isinstance(v, (Matrix, list, tuple)): v = SparseMatrix(v) for i, j in v._smat: update(r + i, c + j, v[i, j]) else: v = self._sympify(v) update(r, c, self._sympify(v)) elif is_sequence(args[2]): flat = not any(is_sequence(i) for i in args[2]) if not flat: s = SparseMatrix(args[2]) self._smat = s._smat else: if len(args[2]) != self.rows*self.cols: raise ValueError( 'Flat list length (%s) != rows*columns (%s)' % (len(args[2]), self.rows*self.cols)) flat_list = args[2] for i in range(self.rows): for j in range(self.cols): value = self._sympify(flat_list[i*self.cols + j]) if value: self._smat[i, j] = value if self.rows is None: # autosizing k = self._smat.keys() self.rows = max([i[0] for i in k]) + 1 if k else 0 self.cols = max([i[1] for i in k]) + 1 if k else 0 else: for i, j in self._smat.keys(): if i and i >= self.rows or j and j >= self.cols: r, c = self.shape raise ValueError(filldedent(''' The location %s is out of designated range: %s''' % ((i, j), (r - 1, c - 1)))) else: if (len(args) == 1 and isinstance(args[0], (list, tuple))): # list of values or lists v = args[0] c = 0 for i, row in enumerate(v): if not isinstance(row, (list, tuple)): row = [row] for j, vij in enumerate(row): if vij: self._smat[i, j] = self._sympify(vij) c = max(c, len(row)) self.rows = len(v) if c else 0 self.cols = c else: # handle full matrix forms with _handle_creation_inputs r, c, _list = Matrix._handle_creation_inputs(*args) self.rows = r self.cols = c for i in range(self.rows): for j in range(self.cols): value = _list[self.cols*i + j] if value: self._smat[i, j] = value return self def __eq__(self, other): self_shape = getattr(self, 'shape', None) other_shape = getattr(other, 'shape', None) if None in (self_shape, other_shape): return False if self_shape != other_shape: return False if isinstance(other, SparseMatrix): return self._smat == other._smat elif isinstance(other, MatrixBase): return self._smat == MutableSparseMatrix(other)._smat def __getitem__(self, key): if isinstance(key, tuple): i, j = key try: i, j = self.key2ij(key) return self._smat.get((i, j), S.Zero) except (TypeError, IndexError): if isinstance(i, slice): # XXX remove list() when PY2 support is dropped i = list(range(self.rows))[i] elif is_sequence(i): pass elif isinstance(i, Expr) and not i.is_number: from sympy.matrices.expressions.matexpr import MatrixElement return MatrixElement(self, i, j) else: if i >= self.rows: raise IndexError('Row index out of bounds') i = [i] if isinstance(j, slice): # XXX remove list() when PY2 support is dropped j = list(range(self.cols))[j] elif is_sequence(j): pass elif isinstance(j, Expr) and not j.is_number: from sympy.matrices.expressions.matexpr import MatrixElement return MatrixElement(self, i, j) else: if j >= self.cols: raise IndexError('Col index out of bounds') j = [j] return self.extract(i, j) # check for single arg, like M[:] or M[3] if isinstance(key, slice): lo, hi = key.indices(len(self))[:2] L = [] for i in range(lo, hi): m, n = divmod(i, self.cols) L.append(self._smat.get((m, n), S.Zero)) return L i, j = divmod(a2idx(key, len(self)), self.cols) return self._smat.get((i, j), S.Zero) def __setitem__(self, key, value): raise NotImplementedError() def _cholesky_solve(self, rhs): # for speed reasons, this is not uncommented, but if you are # having difficulties, try uncommenting to make sure that the # input matrix is symmetric #assert self.is_symmetric() L = self._cholesky_sparse() Y = L._lower_triangular_solve(rhs) rv = L.T._upper_triangular_solve(Y) return rv def _cholesky_sparse(self): """Algorithm for numeric Cholesky factorization of a sparse matrix.""" Crowstruc = self.row_structure_symbolic_cholesky() C = self.zeros(self.rows) for i in range(len(Crowstruc)): for j in Crowstruc[i]: if i != j: C[i, j] = self[i, j] summ = 0 for p1 in Crowstruc[i]: if p1 < j: for p2 in Crowstruc[j]: if p2 < j: if p1 == p2: summ += C[i, p1]*C[j, p1] else: break else: break C[i, j] -= summ C[i, j] /= C[j, j] else: C[j, j] = self[j, j] summ = 0 for k in Crowstruc[j]: if k < j: summ += C[j, k]**2 else: break C[j, j] -= summ C[j, j] = sqrt(C[j, j]) return C def _diagonal_solve(self, rhs): "Diagonal solve." return self._new(self.rows, 1, lambda i, j: rhs[i, 0] / self[i, i]) def _eval_inverse(self, **kwargs): """Return the matrix inverse using Cholesky or LDL (default) decomposition as selected with the ``method`` keyword: 'CH' or 'LDL', respectively. Examples ======== >>> from sympy import SparseMatrix, Matrix >>> A = SparseMatrix([ ... [ 2, -1, 0], ... [-1, 2, -1], ... [ 0, 0, 2]]) >>> A.inv('CH') Matrix([ [2/3, 1/3, 1/6], [1/3, 2/3, 1/3], [ 0, 0, 1/2]]) >>> A.inv(method='LDL') # use of 'method=' is optional Matrix([ [2/3, 1/3, 1/6], [1/3, 2/3, 1/3], [ 0, 0, 1/2]]) >>> A * _ Matrix([ [1, 0, 0], [0, 1, 0], [0, 0, 1]]) """ sym = self.is_symmetric() M = self.as_mutable() I = M.eye(M.rows) if not sym: t = M.T r1 = M[0, :] M = t*M I = t*I method = kwargs.get('method', 'LDL') if method in "LDL": solve = M._LDL_solve elif method == "CH": solve = M._cholesky_solve else: raise NotImplementedError( 'Method may be "CH" or "LDL", not %s.' % method) rv = M.hstack(*[solve(I[:, i]) for i in range(I.cols)]) if not sym: scale = (r1*rv[:, 0])[0, 0] rv /= scale return self._new(rv) def _eval_Abs(self): return self.applyfunc(lambda x: Abs(x)) def _eval_add(self, other): """If `other` is a SparseMatrix, add efficiently. Otherwise, do standard addition.""" if not isinstance(other, SparseMatrix): return self + self._new(other) smat = {} zero = self._sympify(0) for key in set().union(self._smat.keys(), other._smat.keys()): sum = self._smat.get(key, zero) + other._smat.get(key, zero) if sum != 0: smat[key] = sum return self._new(self.rows, self.cols, smat) def _eval_col_insert(self, icol, other): if not isinstance(other, SparseMatrix): other = SparseMatrix(other) new_smat = {} # make room for the new rows for key, val in self._smat.items(): row, col = key if col >= icol: col += other.cols new_smat[row, col] = val # add other's keys for key, val in other._smat.items(): row, col = key new_smat[row, col + icol] = val return self._new(self.rows, self.cols + other.cols, new_smat) def _eval_conjugate(self): smat = {key: val.conjugate() for key,val in self._smat.items()} return self._new(self.rows, self.cols, smat) def _eval_extract(self, rowsList, colsList): urow = list(uniq(rowsList)) ucol = list(uniq(colsList)) smat = {} if len(urow)*len(ucol) < len(self._smat): # there are fewer elements requested than there are elements in the matrix for i, r in enumerate(urow): for j, c in enumerate(ucol): smat[i, j] = self._smat.get((r, c), 0) else: # most of the request will be zeros so check all of self's entries, # keeping only the ones that are desired for rk, ck in self._smat: if rk in urow and ck in ucol: smat[urow.index(rk), ucol.index(ck)] = self._smat[rk, ck] rv = self._new(len(urow), len(ucol), smat) # rv is nominally correct but there might be rows/cols # which require duplication if len(rowsList) != len(urow): for i, r in enumerate(rowsList): i_previous = rowsList.index(r) if i_previous != i: rv = rv.row_insert(i, rv.row(i_previous)) if len(colsList) != len(ucol): for i, c in enumerate(colsList): i_previous = colsList.index(c) if i_previous != i: rv = rv.col_insert(i, rv.col(i_previous)) return rv @classmethod def _eval_eye(cls, rows, cols): entries = {(i,i): S.One for i in range(min(rows, cols))} return cls._new(rows, cols, entries) def _eval_has(self, *patterns): # if the matrix has any zeros, see if S.Zero # has the pattern. If _smat is full length, # the matrix has no zeros. zhas = S.Zero.has(*patterns) if len(self._smat) == self.rows*self.cols: zhas = False return any(self[key].has(*patterns) for key in self._smat) or zhas def _eval_is_Identity(self): if not all(self[i, i] == 1 for i in range(self.rows)): return False return len(self._smat) == self.rows def _eval_is_symmetric(self, simpfunc): diff = (self - self.T).applyfunc(simpfunc) return len(diff.values()) == 0 def _eval_matrix_mul(self, other): """Fast multiplication exploiting the sparsity of the matrix.""" if not isinstance(other, SparseMatrix): return self*self._new(other) # if we made it here, we're both sparse matrices # create quick lookups for rows and cols row_lookup = defaultdict(dict) for (i,j), val in self._smat.items(): row_lookup[i][j] = val col_lookup = defaultdict(dict) for (i,j), val in other._smat.items(): col_lookup[j][i] = val smat = {} for row in row_lookup.keys(): for col in col_lookup.keys(): # find the common indices of non-zero entries. # these are the only things that need to be multiplied. indices = set(col_lookup[col].keys()) & set(row_lookup[row].keys()) if indices: val = sum(row_lookup[row][k]*col_lookup[col][k] for k in indices) smat[row, col] = val return self._new(self.rows, other.cols, smat) def _eval_row_insert(self, irow, other): if not isinstance(other, SparseMatrix): other = SparseMatrix(other) new_smat = {} # make room for the new rows for key, val in self._smat.items(): row, col = key if row >= irow: row += other.rows new_smat[row, col] = val # add other's keys for key, val in other._smat.items(): row, col = key new_smat[row + irow, col] = val return self._new(self.rows + other.rows, self.cols, new_smat) def _eval_scalar_mul(self, other): return self.applyfunc(lambda x: x*other) def _eval_scalar_rmul(self, other): return self.applyfunc(lambda x: other*x) def _eval_transpose(self): """Returns the transposed SparseMatrix of this SparseMatrix. Examples ======== >>> from sympy.matrices import SparseMatrix >>> a = SparseMatrix(((1, 2), (3, 4))) >>> a Matrix([ [1, 2], [3, 4]]) >>> a.T Matrix([ [1, 3], [2, 4]]) """ smat = {(j,i): val for (i,j),val in self._smat.items()} return self._new(self.cols, self.rows, smat) def _eval_values(self): return [v for k,v in self._smat.items() if not v.is_zero] @classmethod def _eval_zeros(cls, rows, cols): return cls._new(rows, cols, {}) def _LDL_solve(self, rhs): # for speed reasons, this is not uncommented, but if you are # having difficulties, try uncommenting to make sure that the # input matrix is symmetric #assert self.is_symmetric() L, D = self._LDL_sparse() Z = L._lower_triangular_solve(rhs) Y = D._diagonal_solve(Z) return L.T._upper_triangular_solve(Y) def _LDL_sparse(self): """Algorithm for numeric LDL factorization, exploiting sparse structure. """ Lrowstruc = self.row_structure_symbolic_cholesky() L = self.eye(self.rows) D = self.zeros(self.rows, self.cols) for i in range(len(Lrowstruc)): for j in Lrowstruc[i]: if i != j: L[i, j] = self[i, j] summ = 0 for p1 in Lrowstruc[i]: if p1 < j: for p2 in Lrowstruc[j]: if p2 < j: if p1 == p2: summ += L[i, p1]*L[j, p1]*D[p1, p1] else: break else: break L[i, j] -= summ L[i, j] /= D[j, j] else: # i == j D[i, i] = self[i, i] summ = 0 for k in Lrowstruc[i]: if k < i: summ += L[i, k]**2*D[k, k] else: break D[i, i] -= summ return L, D def _lower_triangular_solve(self, rhs): """Fast algorithm for solving a lower-triangular system, exploiting the sparsity of the given matrix. """ rows = [[] for i in range(self.rows)] for i, j, v in self.row_list(): if i > j: rows[i].append((j, v)) X = rhs.copy() for i in range(self.rows): for j, v in rows[i]: X[i, 0] -= v*X[j, 0] X[i, 0] /= self[i, i] return self._new(X) @property def _mat(self): """Return a list of matrix elements. Some routines in DenseMatrix use `_mat` directly to speed up operations.""" return list(self) def _upper_triangular_solve(self, rhs): """Fast algorithm for solving an upper-triangular system, exploiting the sparsity of the given matrix. """ rows = [[] for i in range(self.rows)] for i, j, v in self.row_list(): if i < j: rows[i].append((j, v)) X = rhs.copy() for i in range(self.rows - 1, -1, -1): rows[i].reverse() for j, v in rows[i]: X[i, 0] -= v*X[j, 0] X[i, 0] /= self[i, i] return self._new(X) def applyfunc(self, f): """Apply a function to each element of the matrix. Examples ======== >>> from sympy.matrices import SparseMatrix >>> m = SparseMatrix(2, 2, lambda i, j: i*2+j) >>> m Matrix([ [0, 1], [2, 3]]) >>> m.applyfunc(lambda i: 2*i) Matrix([ [0, 2], [4, 6]]) """ if not callable(f): raise TypeError("`f` must be callable.") out = self.copy() for k, v in self._smat.items(): fv = f(v) if fv: out._smat[k] = fv else: out._smat.pop(k, None) return out def as_immutable(self): """Returns an Immutable version of this Matrix.""" from .immutable import ImmutableSparseMatrix return ImmutableSparseMatrix(self) def as_mutable(self): """Returns a mutable version of this matrix. Examples ======== >>> from sympy import ImmutableMatrix >>> X = ImmutableMatrix([[1, 2], [3, 4]]) >>> Y = X.as_mutable() >>> Y[1, 1] = 5 # Can set values in Y >>> Y Matrix([ [1, 2], [3, 5]]) """ return MutableSparseMatrix(self) def cholesky(self): """ Returns the Cholesky decomposition L of a matrix A such that L * L.T = A A must be a square, symmetric, positive-definite and non-singular matrix Examples ======== >>> from sympy.matrices import SparseMatrix >>> A = SparseMatrix(((25,15,-5),(15,18,0),(-5,0,11))) >>> A.cholesky() Matrix([ [ 5, 0, 0], [ 3, 3, 0], [-1, 1, 3]]) >>> A.cholesky() * A.cholesky().T == A True """ from sympy.core.numbers import nan, oo if not self.is_symmetric(): raise ValueError('Cholesky decomposition applies only to ' 'symmetric matrices.') M = self.as_mutable()._cholesky_sparse() if M.has(nan) or M.has(oo): raise ValueError('Cholesky decomposition applies only to ' 'positive-definite matrices') return self._new(M) def col_list(self): """Returns a column-sorted list of non-zero elements of the matrix. Examples ======== >>> from sympy.matrices import SparseMatrix >>> a=SparseMatrix(((1, 2), (3, 4))) >>> a Matrix([ [1, 2], [3, 4]]) >>> a.CL [(0, 0, 1), (1, 0, 3), (0, 1, 2), (1, 1, 4)] See Also ======== col_op row_list """ return [tuple(k + (self[k],)) for k in sorted(list(self._smat.keys()), key=lambda k: list(reversed(k)))] def copy(self): return self._new(self.rows, self.cols, self._smat) def LDLdecomposition(self): """ Returns the LDL Decomposition (matrices ``L`` and ``D``) of matrix ``A``, such that ``L * D * L.T == A``. ``A`` must be a square, symmetric, positive-definite and non-singular. This method eliminates the use of square root and ensures that all the diagonal entries of L are 1. Examples ======== >>> from sympy.matrices import SparseMatrix >>> A = SparseMatrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) >>> L, D = A.LDLdecomposition() >>> L Matrix([ [ 1, 0, 0], [ 3/5, 1, 0], [-1/5, 1/3, 1]]) >>> D Matrix([ [25, 0, 0], [ 0, 9, 0], [ 0, 0, 9]]) >>> L * D * L.T == A True """ from sympy.core.numbers import nan, oo if not self.is_symmetric(): raise ValueError('LDL decomposition applies only to ' 'symmetric matrices.') L, D = self.as_mutable()._LDL_sparse() if L.has(nan) or L.has(oo) or D.has(nan) or D.has(oo): raise ValueError('LDL decomposition applies only to ' 'positive-definite matrices') return self._new(L), self._new(D) def liupc(self): """Liu's algorithm, for pre-determination of the Elimination Tree of the given matrix, used in row-based symbolic Cholesky factorization. Examples ======== >>> from sympy.matrices import SparseMatrix >>> S = SparseMatrix([ ... [1, 0, 3, 2], ... [0, 0, 1, 0], ... [4, 0, 0, 5], ... [0, 6, 7, 0]]) >>> S.liupc() ([[0], [], [0], [1, 2]], [4, 3, 4, 4]) References ========== Symbolic Sparse Cholesky Factorization using Elimination Trees, Jeroen Van Grondelle (1999) http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.39.7582 """ # Algorithm 2.4, p 17 of reference # get the indices of the elements that are non-zero on or below diag R = [[] for r in range(self.rows)] for r, c, _ in self.row_list(): if c <= r: R[r].append(c) inf = len(R) # nothing will be this large parent = [inf]*self.rows virtual = [inf]*self.rows for r in range(self.rows): for c in R[r][:-1]: while virtual[c] < r: t = virtual[c] virtual[c] = r c = t if virtual[c] == inf: parent[c] = virtual[c] = r return R, parent def nnz(self): """Returns the number of non-zero elements in Matrix.""" return len(self._smat) def row_list(self): """Returns a row-sorted list of non-zero elements of the matrix. Examples ======== >>> from sympy.matrices import SparseMatrix >>> a = SparseMatrix(((1, 2), (3, 4))) >>> a Matrix([ [1, 2], [3, 4]]) >>> a.RL [(0, 0, 1), (0, 1, 2), (1, 0, 3), (1, 1, 4)] See Also ======== row_op col_list """ return [tuple(k + (self[k],)) for k in sorted(list(self._smat.keys()), key=lambda k: list(k))] def row_structure_symbolic_cholesky(self): """Symbolic cholesky factorization, for pre-determination of the non-zero structure of the Cholesky factororization. Examples ======== >>> from sympy.matrices import SparseMatrix >>> S = SparseMatrix([ ... [1, 0, 3, 2], ... [0, 0, 1, 0], ... [4, 0, 0, 5], ... [0, 6, 7, 0]]) >>> S.row_structure_symbolic_cholesky() [[0], [], [0], [1, 2]] References ========== Symbolic Sparse Cholesky Factorization using Elimination Trees, Jeroen Van Grondelle (1999) http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.39.7582 """ R, parent = self.liupc() inf = len(R) # this acts as infinity Lrow = copy.deepcopy(R) for k in range(self.rows): for j in R[k]: while j != inf and j != k: Lrow[k].append(j) j = parent[j] Lrow[k] = list(sorted(set(Lrow[k]))) return Lrow def scalar_multiply(self, scalar): "Scalar element-wise multiplication" M = self.zeros(*self.shape) if scalar: for i in self._smat: v = scalar*self._smat[i] if v: M._smat[i] = v else: M._smat.pop(i, None) return M def solve_least_squares(self, rhs, method='LDL'): """Return the least-square fit to the data. By default the cholesky_solve routine is used (method='CH'); other methods of matrix inversion can be used. To find out which are available, see the docstring of the .inv() method. Examples ======== >>> from sympy.matrices import SparseMatrix, Matrix, ones >>> A = Matrix([1, 2, 3]) >>> B = Matrix([2, 3, 4]) >>> S = SparseMatrix(A.row_join(B)) >>> S Matrix([ [1, 2], [2, 3], [3, 4]]) If each line of S represent coefficients of Ax + By and x and y are [2, 3] then S*xy is: >>> r = S*Matrix([2, 3]); r Matrix([ [ 8], [13], [18]]) But let's add 1 to the middle value and then solve for the least-squares value of xy: >>> xy = S.solve_least_squares(Matrix([8, 14, 18])); xy Matrix([ [ 5/3], [10/3]]) The error is given by S*xy - r: >>> S*xy - r Matrix([ [1/3], [1/3], [1/3]]) >>> _.norm().n(2) 0.58 If a different xy is used, the norm will be higher: >>> xy += ones(2, 1)/10 >>> (S*xy - r).norm().n(2) 1.5 """ t = self.T return (t*self).inv(method=method)*t*rhs def solve(self, rhs, method='LDL'): """Return solution to self*soln = rhs using given inversion method. For a list of possible inversion methods, see the .inv() docstring. """ if not self.is_square: if self.rows < self.cols: raise ValueError('Under-determined system.') elif self.rows > self.cols: raise ValueError('For over-determined system, M, having ' 'more rows than columns, try M.solve_least_squares(rhs).') else: return self.inv(method=method)*rhs RL = property(row_list, None, None, "Alternate faster representation") CL = property(col_list, None, None, "Alternate faster representation") class MutableSparseMatrix(SparseMatrix, MatrixBase): @classmethod def _new(cls, *args, **kwargs): return cls(*args) def __setitem__(self, key, value): """Assign value to position designated by key. Examples ======== >>> from sympy.matrices import SparseMatrix, ones >>> M = SparseMatrix(2, 2, {}) >>> M[1] = 1; M Matrix([ [0, 1], [0, 0]]) >>> M[1, 1] = 2; M Matrix([ [0, 1], [0, 2]]) >>> M = SparseMatrix(2, 2, {}) >>> M[:, 1] = [1, 1]; M Matrix([ [0, 1], [0, 1]]) >>> M = SparseMatrix(2, 2, {}) >>> M[1, :] = [[1, 1]]; M Matrix([ [0, 0], [1, 1]]) To replace row r you assign to position r*m where m is the number of columns: >>> M = SparseMatrix(4, 4, {}) >>> m = M.cols >>> M[3*m] = ones(1, m)*2; M Matrix([ [0, 0, 0, 0], [0, 0, 0, 0], [0, 0, 0, 0], [2, 2, 2, 2]]) And to replace column c you can assign to position c: >>> M[2] = ones(m, 1)*4; M Matrix([ [0, 0, 4, 0], [0, 0, 4, 0], [0, 0, 4, 0], [2, 2, 4, 2]]) """ rv = self._setitem(key, value) if rv is not None: i, j, value = rv if value: self._smat[i, j] = value elif (i, j) in self._smat: del self._smat[i, j] def as_mutable(self): return self.copy() __hash__ = None def col_del(self, k): """Delete the given column of the matrix. Examples ======== >>> from sympy.matrices import SparseMatrix >>> M = SparseMatrix([[0, 0], [0, 1]]) >>> M Matrix([ [0, 0], [0, 1]]) >>> M.col_del(0) >>> M Matrix([ [0], [1]]) See Also ======== row_del """ newD = {} k = a2idx(k, self.cols) for (i, j) in self._smat: if j == k: pass elif j > k: newD[i, j - 1] = self._smat[i, j] else: newD[i, j] = self._smat[i, j] self._smat = newD self.cols -= 1 def col_join(self, other): """Returns B augmented beneath A (row-wise joining):: [A] [B] Examples ======== >>> from sympy import SparseMatrix, Matrix, ones >>> A = SparseMatrix(ones(3)) >>> A Matrix([ [1, 1, 1], [1, 1, 1], [1, 1, 1]]) >>> B = SparseMatrix.eye(3) >>> B Matrix([ [1, 0, 0], [0, 1, 0], [0, 0, 1]]) >>> C = A.col_join(B); C Matrix([ [1, 1, 1], [1, 1, 1], [1, 1, 1], [1, 0, 0], [0, 1, 0], [0, 0, 1]]) >>> C == A.col_join(Matrix(B)) True Joining along columns is the same as appending rows at the end of the matrix: >>> C == A.row_insert(A.rows, Matrix(B)) True """ # A null matrix can always be stacked (see #10770) if self.rows == 0 and self.cols != other.cols: return self._new(0, other.cols, []).col_join(other) A, B = self, other if not A.cols == B.cols: raise ShapeError() A = A.copy() if not isinstance(B, SparseMatrix): k = 0 b = B._mat for i in range(B.rows): for j in range(B.cols): v = b[k] if v: A._smat[i + A.rows, j] = v k += 1 else: for (i, j), v in B._smat.items(): A._smat[i + A.rows, j] = v A.rows += B.rows return A def col_op(self, j, f): """In-place operation on col j using two-arg functor whose args are interpreted as (self[i, j], i) for i in range(self.rows). Examples ======== >>> from sympy.matrices import SparseMatrix >>> M = SparseMatrix.eye(3)*2 >>> M[1, 0] = -1 >>> M.col_op(1, lambda v, i: v + 2*M[i, 0]); M Matrix([ [ 2, 4, 0], [-1, 0, 0], [ 0, 0, 2]]) """ for i in range(self.rows): v = self._smat.get((i, j), S.Zero) fv = f(v, i) if fv: self._smat[i, j] = fv elif v: self._smat.pop((i, j)) def col_swap(self, i, j): """Swap, in place, columns i and j. Examples ======== >>> from sympy.matrices import SparseMatrix >>> S = SparseMatrix.eye(3); S[2, 1] = 2 >>> S.col_swap(1, 0); S Matrix([ [0, 1, 0], [1, 0, 0], [2, 0, 1]]) """ if i > j: i, j = j, i rows = self.col_list() temp = [] for ii, jj, v in rows: if jj == i: self._smat.pop((ii, jj)) temp.append((ii, v)) elif jj == j: self._smat.pop((ii, jj)) self._smat[ii, i] = v elif jj > j: break for k, v in temp: self._smat[k, j] = v def copyin_list(self, key, value): if not is_sequence(value): raise TypeError("`value` must be of type list or tuple.") self.copyin_matrix(key, Matrix(value)) def copyin_matrix(self, key, value): # include this here because it's not part of BaseMatrix rlo, rhi, clo, chi = self.key2bounds(key) shape = value.shape dr, dc = rhi - rlo, chi - clo if shape != (dr, dc): raise ShapeError( "The Matrix `value` doesn't have the same dimensions " "as the in sub-Matrix given by `key`.") if not isinstance(value, SparseMatrix): for i in range(value.rows): for j in range(value.cols): self[i + rlo, j + clo] = value[i, j] else: if (rhi - rlo)*(chi - clo) < len(self): for i in range(rlo, rhi): for j in range(clo, chi): self._smat.pop((i, j), None) else: for i, j, v in self.row_list(): if rlo <= i < rhi and clo <= j < chi: self._smat.pop((i, j), None) for k, v in value._smat.items(): i, j = k self[i + rlo, j + clo] = value[i, j] def fill(self, value): """Fill self with the given value. Notes ===== Unless many values are going to be deleted (i.e. set to zero) this will create a matrix that is slower than a dense matrix in operations. Examples ======== >>> from sympy.matrices import SparseMatrix >>> M = SparseMatrix.zeros(3); M Matrix([ [0, 0, 0], [0, 0, 0], [0, 0, 0]]) >>> M.fill(1); M Matrix([ [1, 1, 1], [1, 1, 1], [1, 1, 1]]) """ if not value: self._smat = {} else: v = self._sympify(value) self._smat = {(i, j): v for i in range(self.rows) for j in range(self.cols)} def row_del(self, k): """Delete the given row of the matrix. Examples ======== >>> from sympy.matrices import SparseMatrix >>> M = SparseMatrix([[0, 0], [0, 1]]) >>> M Matrix([ [0, 0], [0, 1]]) >>> M.row_del(0) >>> M Matrix([[0, 1]]) See Also ======== col_del """ newD = {} k = a2idx(k, self.rows) for (i, j) in self._smat: if i == k: pass elif i > k: newD[i - 1, j] = self._smat[i, j] else: newD[i, j] = self._smat[i, j] self._smat = newD self.rows -= 1 def row_join(self, other): """Returns B appended after A (column-wise augmenting):: [A B] Examples ======== >>> from sympy import SparseMatrix, Matrix >>> A = SparseMatrix(((1, 0, 1), (0, 1, 0), (1, 1, 0))) >>> A Matrix([ [1, 0, 1], [0, 1, 0], [1, 1, 0]]) >>> B = SparseMatrix(((1, 0, 0), (0, 1, 0), (0, 0, 1))) >>> B Matrix([ [1, 0, 0], [0, 1, 0], [0, 0, 1]]) >>> C = A.row_join(B); C Matrix([ [1, 0, 1, 1, 0, 0], [0, 1, 0, 0, 1, 0], [1, 1, 0, 0, 0, 1]]) >>> C == A.row_join(Matrix(B)) True Joining at row ends is the same as appending columns at the end of the matrix: >>> C == A.col_insert(A.cols, B) True """ # A null matrix can always be stacked (see #10770) if self.cols == 0 and self.rows != other.rows: return self._new(other.rows, 0, []).row_join(other) A, B = self, other if not A.rows == B.rows: raise ShapeError() A = A.copy() if not isinstance(B, SparseMatrix): k = 0 b = B._mat for i in range(B.rows): for j in range(B.cols): v = b[k] if v: A._smat[i, j + A.cols] = v k += 1 else: for (i, j), v in B._smat.items(): A._smat[i, j + A.cols] = v A.cols += B.cols return A def row_op(self, i, f): """In-place operation on row ``i`` using two-arg functor whose args are interpreted as ``(self[i, j], j)``. Examples ======== >>> from sympy.matrices import SparseMatrix >>> M = SparseMatrix.eye(3)*2 >>> M[0, 1] = -1 >>> M.row_op(1, lambda v, j: v + 2*M[0, j]); M Matrix([ [2, -1, 0], [4, 0, 0], [0, 0, 2]]) See Also ======== row zip_row_op col_op """ for j in range(self.cols): v = self._smat.get((i, j), S.Zero) fv = f(v, j) if fv: self._smat[i, j] = fv elif v: self._smat.pop((i, j)) def row_swap(self, i, j): """Swap, in place, columns i and j. Examples ======== >>> from sympy.matrices import SparseMatrix >>> S = SparseMatrix.eye(3); S[2, 1] = 2 >>> S.row_swap(1, 0); S Matrix([ [0, 1, 0], [1, 0, 0], [0, 2, 1]]) """ if i > j: i, j = j, i rows = self.row_list() temp = [] for ii, jj, v in rows: if ii == i: self._smat.pop((ii, jj)) temp.append((jj, v)) elif ii == j: self._smat.pop((ii, jj)) self._smat[i, jj] = v elif ii > j: break for k, v in temp: self._smat[j, k] = v def zip_row_op(self, i, k, f): """In-place operation on row ``i`` using two-arg functor whose args are interpreted as ``(self[i, j], self[k, j])``. Examples ======== >>> from sympy.matrices import SparseMatrix >>> M = SparseMatrix.eye(3)*2 >>> M[0, 1] = -1 >>> M.zip_row_op(1, 0, lambda v, u: v + 2*u); M Matrix([ [2, -1, 0], [4, 0, 0], [0, 0, 2]]) See Also ======== row row_op col_op """ self.row_op(i, lambda v, j: f(v, self[k, j]))

0ee558f787523135e80c0294392208996fbd0f7070cc56cf303537a671c21ce2

from __future__ import division, print_function from types import FunctionType from mpmath.libmp.libmpf import prec_to_dps from sympy.core.add import Add from sympy.core.basic import Basic from sympy.core.compatibility import ( Callable, NotIterable, as_int, default_sort_key, is_sequence, range, reduce, string_types) from sympy.core.decorators import deprecated from sympy.core.expr import Expr from sympy.core.function import expand_mul from sympy.core.logic import fuzzy_and, fuzzy_or from sympy.core.numbers import Float, Integer, mod_inverse from sympy.core.power import Pow from sympy.core.singleton import S from sympy.core.symbol import Dummy, Symbol, _uniquely_named_symbol, symbols from sympy.core.sympify import sympify from sympy.functions import exp, factorial from sympy.functions.elementary.miscellaneous import Max, Min, sqrt from sympy.functions.special.tensor_functions import KroneckerDelta from sympy.polys import PurePoly, cancel, roots from sympy.printing import sstr from sympy.simplify import nsimplify from sympy.simplify import simplify as _simplify from sympy.utilities.exceptions import SymPyDeprecationWarning from sympy.utilities.iterables import flatten, numbered_symbols from sympy.utilities.misc import filldedent from .common import ( MatrixCommon, MatrixError, NonSquareMatrixError, NonInvertibleMatrixError, ShapeError, NonPositiveDefiniteMatrixError) def _iszero(x): """Returns True if x is zero.""" return getattr(x, 'is_zero', None) def _is_zero_after_expand_mul(x): """Tests by expand_mul only, suitable for polynomials and rational functions.""" return expand_mul(x) == 0 class DeferredVector(Symbol, NotIterable): """A vector whose components are deferred (e.g. for use with lambdify) Examples ======== >>> from sympy import DeferredVector, lambdify >>> X = DeferredVector( 'X' ) >>> X X >>> expr = (X[0] + 2, X[2] + 3) >>> func = lambdify( X, expr) >>> func( [1, 2, 3] ) (3, 6) """ def __getitem__(self, i): if i == -0: i = 0 if i < 0: raise IndexError('DeferredVector index out of range') component_name = '%s[%d]' % (self.name, i) return Symbol(component_name) def __str__(self): return sstr(self) def __repr__(self): return "DeferredVector('%s')" % self.name class MatrixDeterminant(MatrixCommon): """Provides basic matrix determinant operations. Should not be instantiated directly.""" def _eval_berkowitz_toeplitz_matrix(self): """Return (A,T) where T the Toeplitz matrix used in the Berkowitz algorithm corresponding to ``self`` and A is the first principal submatrix.""" # the 0 x 0 case is trivial if self.rows == 0 and self.cols == 0: return self._new(1,1, [self.one]) # # Partition self = [ a_11 R ] # [ C A ] # a, R = self[0,0], self[0, 1:] C, A = self[1:, 0], self[1:,1:] # # The Toeplitz matrix looks like # # [ 1 ] # [ -a 1 ] # [ -RC -a 1 ] # [ -RAC -RC -a 1 ] # [ -RA**2C -RAC -RC -a 1 ] # etc. # Compute the diagonal entries. # Because multiplying matrix times vector is so much # more efficient than matrix times matrix, recursively # compute -R * A**n * C. diags = [C] for i in range(self.rows - 2): diags.append(A * diags[i]) diags = [(-R*d)[0, 0] for d in diags] diags = [self.one, -a] + diags def entry(i,j): if j > i: return self.zero return diags[i - j] toeplitz = self._new(self.cols + 1, self.rows, entry) return (A, toeplitz) def _eval_berkowitz_vector(self): """ Run the Berkowitz algorithm and return a vector whose entries are the coefficients of the characteristic polynomial of ``self``. Given N x N matrix, efficiently compute coefficients of characteristic polynomials of ``self`` without division in the ground domain. This method is particularly useful for computing determinant, principal minors and characteristic polynomial when ``self`` has complicated coefficients e.g. polynomials. Semi-direct usage of this algorithm is also important in computing efficiently sub-resultant PRS. Assuming that M is a square matrix of dimension N x N and I is N x N identity matrix, then the Berkowitz vector is an N x 1 vector whose entries are coefficients of the polynomial charpoly(M) = det(t*I - M) As a consequence, all polynomials generated by Berkowitz algorithm are monic. For more information on the implemented algorithm refer to: [1] S.J. Berkowitz, On computing the determinant in small parallel time using a small number of processors, ACM, Information Processing Letters 18, 1984, pp. 147-150 [2] M. Keber, Division-Free computation of sub-resultants using Bezout matrices, Tech. Report MPI-I-2006-1-006, Saarbrucken, 2006 """ # handle the trivial cases if self.rows == 0 and self.cols == 0: return self._new(1, 1, [self.one]) elif self.rows == 1 and self.cols == 1: return self._new(2, 1, [self.one, -self[0,0]]) submat, toeplitz = self._eval_berkowitz_toeplitz_matrix() return toeplitz * submat._eval_berkowitz_vector() def _eval_det_bareiss(self, iszerofunc=_is_zero_after_expand_mul): """Compute matrix determinant using Bareiss' fraction-free algorithm which is an extension of the well known Gaussian elimination method. This approach is best suited for dense symbolic matrices and will result in a determinant with minimal number of fractions. It means that less term rewriting is needed on resulting formulae. TODO: Implement algorithm for sparse matrices (SFF), http://www.eecis.udel.edu/~saunders/papers/sffge/it5.ps. """ # Recursively implemented Bareiss' algorithm as per Deanna Richelle Leggett's # thesis http://www.math.usm.edu/perry/Research/Thesis_DRL.pdf def bareiss(mat, cumm=1): if mat.rows == 0: return mat.one elif mat.rows == 1: return mat[0, 0] # find a pivot and extract the remaining matrix # With the default iszerofunc, _find_reasonable_pivot slows down # the computation by the factor of 2.5 in one test. # Relevant issues: #10279 and #13877. pivot_pos, pivot_val, _, _ = _find_reasonable_pivot(mat[:, 0], iszerofunc=iszerofunc) if pivot_pos is None: return mat.zero # if we have a valid pivot, we'll do a "row swap", so keep the # sign of the det sign = (-1) ** (pivot_pos % 2) # we want every row but the pivot row and every column rows = list(i for i in range(mat.rows) if i != pivot_pos) cols = list(range(mat.cols)) tmp_mat = mat.extract(rows, cols) def entry(i, j): ret = (pivot_val*tmp_mat[i, j + 1] - mat[pivot_pos, j + 1]*tmp_mat[i, 0]) / cumm if not ret.is_Atom: return cancel(ret) return ret return sign*bareiss(self._new(mat.rows - 1, mat.cols - 1, entry), pivot_val) return cancel(bareiss(self)) def _eval_det_berkowitz(self): """ Use the Berkowitz algorithm to compute the determinant.""" berk_vector = self._eval_berkowitz_vector() return (-1)**(len(berk_vector) - 1) * berk_vector[-1] def _eval_det_lu(self, iszerofunc=_iszero, simpfunc=None): """ Computes the determinant of a matrix from its LU decomposition. This function uses the LU decomposition computed by LUDecomposition_Simple(). The keyword arguments iszerofunc and simpfunc are passed to LUDecomposition_Simple(). iszerofunc is a callable that returns a boolean indicating if its input is zero, or None if it cannot make the determination. simpfunc is a callable that simplifies its input. The default is simpfunc=None, which indicate that the pivot search algorithm should not attempt to simplify any candidate pivots. If simpfunc fails to simplify its input, then it must return its input instead of a copy.""" if self.rows == 0: return self.one # sympy/matrices/tests/test_matrices.py contains a test that # suggests that the determinant of a 0 x 0 matrix is one, by # convention. lu, row_swaps = self.LUdecomposition_Simple(iszerofunc=iszerofunc, simpfunc=None) # P*A = L*U => det(A) = det(L)*det(U)/det(P) = det(P)*det(U). # Lower triangular factor L encoded in lu has unit diagonal => det(L) = 1. # P is a permutation matrix => det(P) in {-1, 1} => 1/det(P) = det(P). # LUdecomposition_Simple() returns a list of row exchange index pairs, rather # than a permutation matrix, but det(P) = (-1)**len(row_swaps). # Avoid forming the potentially time consuming product of U's diagonal entries # if the product is zero. # Bottom right entry of U is 0 => det(A) = 0. # It may be impossible to determine if this entry of U is zero when it is symbolic. if iszerofunc(lu[lu.rows-1, lu.rows-1]): return self.zero # Compute det(P) det = -self.one if len(row_swaps)%2 else self.one # Compute det(U) by calculating the product of U's diagonal entries. # The upper triangular portion of lu is the upper triangular portion of the # U factor in the LU decomposition. for k in range(lu.rows): det *= lu[k, k] # return det(P)*det(U) return det def _eval_determinant(self): """Assumed to exist by matrix expressions; If we subclass MatrixDeterminant, we can fully evaluate determinants.""" return self.det() def adjugate(self, method="berkowitz"): """Returns the adjugate, or classical adjoint, of a matrix. That is, the transpose of the matrix of cofactors. https://en.wikipedia.org/wiki/Adjugate See Also ======== cofactor_matrix transpose """ return self.cofactor_matrix(method).transpose() def charpoly(self, x='lambda', simplify=_simplify): """Computes characteristic polynomial det(x*I - self) where I is the identity matrix. A PurePoly is returned, so using different variables for ``x`` does not affect the comparison or the polynomials: Examples ======== >>> from sympy import Matrix >>> from sympy.abc import x, y >>> A = Matrix([[1, 3], [2, 0]]) >>> A.charpoly(x) == A.charpoly(y) True Specifying ``x`` is optional; a symbol named ``lambda`` is used by default (which looks good when pretty-printed in unicode): >>> A.charpoly().as_expr() lambda**2 - lambda - 6 And if ``x`` clashes with an existing symbol, underscores will be prepended to the name to make it unique: >>> A = Matrix([[1, 2], [x, 0]]) >>> A.charpoly(x).as_expr() _x**2 - _x - 2*x Whether you pass a symbol or not, the generator can be obtained with the gen attribute since it may not be the same as the symbol that was passed: >>> A.charpoly(x).gen _x >>> A.charpoly(x).gen == x False Notes ===== The Samuelson-Berkowitz algorithm is used to compute the characteristic polynomial efficiently and without any division operations. Thus the characteristic polynomial over any commutative ring without zero divisors can be computed. See Also ======== det """ if not self.is_square: raise NonSquareMatrixError() berk_vector = self._eval_berkowitz_vector() x = _uniquely_named_symbol(x, berk_vector) return PurePoly([simplify(a) for a in berk_vector], x) def cofactor(self, i, j, method="berkowitz"): """Calculate the cofactor of an element. See Also ======== cofactor_matrix minor minor_submatrix """ if not self.is_square or self.rows < 1: raise NonSquareMatrixError() return (-1)**((i + j) % 2) * self.minor(i, j, method) def cofactor_matrix(self, method="berkowitz"): """Return a matrix containing the cofactor of each element. See Also ======== cofactor minor minor_submatrix adjugate """ if not self.is_square or self.rows < 1: raise NonSquareMatrixError() return self._new(self.rows, self.cols, lambda i, j: self.cofactor(i, j, method)) def det(self, method="bareiss", iszerofunc=None): """Computes the determinant of a matrix. Parameters ========== method : string, optional Specifies the algorithm used for computing the matrix determinant. If the matrix is at most 3x3, a hard-coded formula is used and the specified method is ignored. Otherwise, it defaults to ``'bareiss'``. If it is set to ``'bareiss'``, Bareiss' fraction-free algorithm will be used. If it is set to ``'berkowitz'``, Berkowitz' algorithm will be used. Otherwise, if it is set to ``'lu'``, LU decomposition will be used. .. note:: For backward compatibility, legacy keys like "bareis" and "det_lu" can still be used to indicate the corresponding methods. And the keys are also case-insensitive for now. However, it is suggested to use the precise keys for specifying the method. iszerofunc : FunctionType or None, optional If it is set to ``None``, it will be defaulted to ``_iszero`` if the method is set to ``'bareiss'``, and ``_is_zero_after_expand_mul`` if the method is set to ``'lu'``. It can also accept any user-specified zero testing function, if it is formatted as a function which accepts a single symbolic argument and returns ``True`` if it is tested as zero and ``False`` if it tested as non-zero, and also ``None`` if it is undecidable. Returns ======= det : Basic Result of determinant. Raises ====== ValueError If unrecognized keys are given for ``method`` or ``iszerofunc``. NonSquareMatrixError If attempted to calculate determinant from a non-square matrix. """ # sanitize `method` method = method.lower() if method == "bareis": method = "bareiss" if method == "det_lu": method = "lu" if method not in ("bareiss", "berkowitz", "lu"): raise ValueError("Determinant method '%s' unrecognized" % method) if iszerofunc is None: if method == "bareiss": iszerofunc = _is_zero_after_expand_mul elif method == "lu": iszerofunc = _iszero elif not isinstance(iszerofunc, FunctionType): raise ValueError("Zero testing method '%s' unrecognized" % iszerofunc) # if methods were made internal and all determinant calculations # passed through here, then these lines could be factored out of # the method routines if not self.is_square: raise NonSquareMatrixError() n = self.rows if n == 0: return self.one elif n == 1: return self[0,0] elif n == 2: return self[0, 0] * self[1, 1] - self[0, 1] * self[1, 0] elif n == 3: return (self[0, 0] * self[1, 1] * self[2, 2] + self[0, 1] * self[1, 2] * self[2, 0] + self[0, 2] * self[1, 0] * self[2, 1] - self[0, 2] * self[1, 1] * self[2, 0] - self[0, 0] * self[1, 2] * self[2, 1] - self[0, 1] * self[1, 0] * self[2, 2]) if method == "bareiss": return self._eval_det_bareiss(iszerofunc=iszerofunc) elif method == "berkowitz": return self._eval_det_berkowitz() elif method == "lu": return self._eval_det_lu(iszerofunc=iszerofunc) def minor(self, i, j, method="berkowitz"): """Return the (i,j) minor of ``self``. That is, return the determinant of the matrix obtained by deleting the `i`th row and `j`th column from ``self``. See Also ======== minor_submatrix cofactor det """ if not self.is_square or self.rows < 1: raise NonSquareMatrixError() return self.minor_submatrix(i, j).det(method=method) def minor_submatrix(self, i, j): """Return the submatrix obtained by removing the `i`th row and `j`th column from ``self``. See Also ======== minor cofactor """ if i < 0: i += self.rows if j < 0: j += self.cols if not 0 <= i < self.rows or not 0 <= j < self.cols: raise ValueError("`i` and `j` must satisfy 0 <= i < ``self.rows`` " "(%d)" % self.rows + "and 0 <= j < ``self.cols`` (%d)." % self.cols) rows = [a for a in range(self.rows) if a != i] cols = [a for a in range(self.cols) if a != j] return self.extract(rows, cols) class MatrixReductions(MatrixDeterminant): """Provides basic matrix row/column operations. Should not be instantiated directly.""" def _eval_col_op_swap(self, col1, col2): def entry(i, j): if j == col1: return self[i, col2] elif j == col2: return self[i, col1] return self[i, j] return self._new(self.rows, self.cols, entry) def _eval_col_op_multiply_col_by_const(self, col, k): def entry(i, j): if j == col: return k * self[i, j] return self[i, j] return self._new(self.rows, self.cols, entry) def _eval_col_op_add_multiple_to_other_col(self, col, k, col2): def entry(i, j): if j == col: return self[i, j] + k * self[i, col2] return self[i, j] return self._new(self.rows, self.cols, entry) def _eval_row_op_swap(self, row1, row2): def entry(i, j): if i == row1: return self[row2, j] elif i == row2: return self[row1, j] return self[i, j] return self._new(self.rows, self.cols, entry) def _eval_row_op_multiply_row_by_const(self, row, k): def entry(i, j): if i == row: return k * self[i, j] return self[i, j] return self._new(self.rows, self.cols, entry) def _eval_row_op_add_multiple_to_other_row(self, row, k, row2): def entry(i, j): if i == row: return self[i, j] + k * self[row2, j] return self[i, j] return self._new(self.rows, self.cols, entry) def _eval_echelon_form(self, iszerofunc, simpfunc): """Returns (mat, swaps) where ``mat`` is a row-equivalent matrix in echelon form and ``swaps`` is a list of row-swaps performed.""" reduced, pivot_cols, swaps = self._row_reduce(iszerofunc, simpfunc, normalize_last=True, normalize=False, zero_above=False) return reduced, pivot_cols, swaps def _eval_is_echelon(self, iszerofunc): if self.rows <= 0 or self.cols <= 0: return True zeros_below = all(iszerofunc(t) for t in self[1:, 0]) if iszerofunc(self[0, 0]): return zeros_below and self[:, 1:]._eval_is_echelon(iszerofunc) return zeros_below and self[1:, 1:]._eval_is_echelon(iszerofunc) def _eval_rref(self, iszerofunc, simpfunc, normalize_last=True): reduced, pivot_cols, swaps = self._row_reduce(iszerofunc, simpfunc, normalize_last, normalize=True, zero_above=True) return reduced, pivot_cols def _normalize_op_args(self, op, col, k, col1, col2, error_str="col"): """Validate the arguments for a row/column operation. ``error_str`` can be one of "row" or "col" depending on the arguments being parsed.""" if op not in ["n->kn", "n<->m", "n->n+km"]: raise ValueError("Unknown {} operation '{}'. Valid col operations " "are 'n->kn', 'n<->m', 'n->n+km'".format(error_str, op)) # normalize and validate the arguments if op == "n->kn": col = col if col is not None else col1 if col is None or k is None: raise ValueError("For a {0} operation 'n->kn' you must provide the " "kwargs `{0}` and `k`".format(error_str)) if not 0 <= col <= self.cols: raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col)) if op == "n<->m": # we need two cols to swap. It doesn't matter # how they were specified, so gather them together and # remove `None` cols = set((col, k, col1, col2)).difference([None]) if len(cols) > 2: # maybe the user left `k` by mistake? cols = set((col, col1, col2)).difference([None]) if len(cols) != 2: raise ValueError("For a {0} operation 'n<->m' you must provide the " "kwargs `{0}1` and `{0}2`".format(error_str)) col1, col2 = cols if not 0 <= col1 <= self.cols: raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col1)) if not 0 <= col2 <= self.cols: raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col2)) if op == "n->n+km": col = col1 if col is None else col col2 = col1 if col2 is None else col2 if col is None or col2 is None or k is None: raise ValueError("For a {0} operation 'n->n+km' you must provide the " "kwargs `{0}`, `k`, and `{0}2`".format(error_str)) if col == col2: raise ValueError("For a {0} operation 'n->n+km' `{0}` and `{0}2` must " "be different.".format(error_str)) if not 0 <= col <= self.cols: raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col)) if not 0 <= col2 <= self.cols: raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col2)) return op, col, k, col1, col2 def _permute_complexity_right(self, iszerofunc): """Permute columns with complicated elements as far right as they can go. Since the ``sympy`` row reduction algorithms start on the left, having complexity right-shifted speeds things up. Returns a tuple (mat, perm) where perm is a permutation of the columns to perform to shift the complex columns right, and mat is the permuted matrix.""" def complexity(i): # the complexity of a column will be judged by how many # element's zero-ness cannot be determined return sum(1 if iszerofunc(e) is None else 0 for e in self[:, i]) complex = [(complexity(i), i) for i in range(self.cols)] perm = [j for (i, j) in sorted(complex)] return (self.permute(perm, orientation='cols'), perm) def _row_reduce(self, iszerofunc, simpfunc, normalize_last=True, normalize=True, zero_above=True): """Row reduce ``self`` and return a tuple (rref_matrix, pivot_cols, swaps) where pivot_cols are the pivot columns and swaps are any row swaps that were used in the process of row reduction. Parameters ========== iszerofunc : determines if an entry can be used as a pivot simpfunc : used to simplify elements and test if they are zero if ``iszerofunc`` returns `None` normalize_last : indicates where all row reduction should happen in a fraction-free manner and then the rows are normalized (so that the pivots are 1), or whether rows should be normalized along the way (like the naive row reduction algorithm) normalize : whether pivot rows should be normalized so that the pivot value is 1 zero_above : whether entries above the pivot should be zeroed. If ``zero_above=False``, an echelon matrix will be returned. """ rows, cols = self.rows, self.cols mat = list(self) def get_col(i): return mat[i::cols] def row_swap(i, j): mat[i*cols:(i + 1)*cols], mat[j*cols:(j + 1)*cols] = \ mat[j*cols:(j + 1)*cols], mat[i*cols:(i + 1)*cols] def cross_cancel(a, i, b, j): """Does the row op row[i] = a*row[i] - b*row[j]""" q = (j - i)*cols for p in range(i*cols, (i + 1)*cols): mat[p] = a*mat[p] - b*mat[p + q] piv_row, piv_col = 0, 0 pivot_cols = [] swaps = [] # use a fraction free method to zero above and below each pivot while piv_col < cols and piv_row < rows: pivot_offset, pivot_val, \ assumed_nonzero, newly_determined = _find_reasonable_pivot( get_col(piv_col)[piv_row:], iszerofunc, simpfunc) # _find_reasonable_pivot may have simplified some things # in the process. Let's not let them go to waste for (offset, val) in newly_determined: offset += piv_row mat[offset*cols + piv_col] = val if pivot_offset is None: piv_col += 1 continue pivot_cols.append(piv_col) if pivot_offset != 0: row_swap(piv_row, pivot_offset + piv_row) swaps.append((piv_row, pivot_offset + piv_row)) # if we aren't normalizing last, we normalize # before we zero the other rows if normalize_last is False: i, j = piv_row, piv_col mat[i*cols + j] = self.one for p in range(i*cols + j + 1, (i + 1)*cols): mat[p] = mat[p] / pivot_val # after normalizing, the pivot value is 1 pivot_val = self.one # zero above and below the pivot for row in range(rows): # don't zero our current row if row == piv_row: continue # don't zero above the pivot unless we're told. if zero_above is False and row < piv_row: continue # if we're already a zero, don't do anything val = mat[row*cols + piv_col] if iszerofunc(val): continue cross_cancel(pivot_val, row, val, piv_row) piv_row += 1 # normalize each row if normalize_last is True and normalize is True: for piv_i, piv_j in enumerate(pivot_cols): pivot_val = mat[piv_i*cols + piv_j] mat[piv_i*cols + piv_j] = self.one for p in range(piv_i*cols + piv_j + 1, (piv_i + 1)*cols): mat[p] = mat[p] / pivot_val return self._new(self.rows, self.cols, mat), tuple(pivot_cols), tuple(swaps) def echelon_form(self, iszerofunc=_iszero, simplify=False, with_pivots=False): """Returns a matrix row-equivalent to ``self`` that is in echelon form. Note that echelon form of a matrix is *not* unique, however, properties like the row space and the null space are preserved.""" simpfunc = simplify if isinstance( simplify, FunctionType) else _simplify mat, pivots, swaps = self._eval_echelon_form(iszerofunc, simpfunc) if with_pivots: return mat, pivots return mat def elementary_col_op(self, op="n->kn", col=None, k=None, col1=None, col2=None): """Performs the elementary column operation `op`. `op` may be one of * "n->kn" (column n goes to k*n) * "n<->m" (swap column n and column m) * "n->n+km" (column n goes to column n + k*column m) Parameters ========== op : string; the elementary row operation col : the column to apply the column operation k : the multiple to apply in the column operation col1 : one column of a column swap col2 : second column of a column swap or column "m" in the column operation "n->n+km" """ op, col, k, col1, col2 = self._normalize_op_args(op, col, k, col1, col2, "col") # now that we've validated, we're all good to dispatch if op == "n->kn": return self._eval_col_op_multiply_col_by_const(col, k) if op == "n<->m": return self._eval_col_op_swap(col1, col2) if op == "n->n+km": return self._eval_col_op_add_multiple_to_other_col(col, k, col2) def elementary_row_op(self, op="n->kn", row=None, k=None, row1=None, row2=None): """Performs the elementary row operation `op`. `op` may be one of * "n->kn" (row n goes to k*n) * "n<->m" (swap row n and row m) * "n->n+km" (row n goes to row n + k*row m) Parameters ========== op : string; the elementary row operation row : the row to apply the row operation k : the multiple to apply in the row operation row1 : one row of a row swap row2 : second row of a row swap or row "m" in the row operation "n->n+km" """ op, row, k, row1, row2 = self._normalize_op_args(op, row, k, row1, row2, "row") # now that we've validated, we're all good to dispatch if op == "n->kn": return self._eval_row_op_multiply_row_by_const(row, k) if op == "n<->m": return self._eval_row_op_swap(row1, row2) if op == "n->n+km": return self._eval_row_op_add_multiple_to_other_row(row, k, row2) @property def is_echelon(self, iszerofunc=_iszero): """Returns `True` if the matrix is in echelon form. That is, all rows of zeros are at the bottom, and below each leading non-zero in a row are exclusively zeros.""" return self._eval_is_echelon(iszerofunc) def rank(self, iszerofunc=_iszero, simplify=False): """ Returns the rank of a matrix >>> from sympy import Matrix >>> from sympy.abc import x >>> m = Matrix([[1, 2], [x, 1 - 1/x]]) >>> m.rank() 2 >>> n = Matrix(3, 3, range(1, 10)) >>> n.rank() 2 """ simpfunc = simplify if isinstance( simplify, FunctionType) else _simplify # for small matrices, we compute the rank explicitly # if is_zero on elements doesn't answer the question # for small matrices, we fall back to the full routine. if self.rows <= 0 or self.cols <= 0: return 0 if self.rows <= 1 or self.cols <= 1: zeros = [iszerofunc(x) for x in self] if False in zeros: return 1 if self.rows == 2 and self.cols == 2: zeros = [iszerofunc(x) for x in self] if not False in zeros and not None in zeros: return 0 det = self.det() if iszerofunc(det) and False in zeros: return 1 if iszerofunc(det) is False: return 2 mat, _ = self._permute_complexity_right(iszerofunc=iszerofunc) echelon_form, pivots, swaps = mat._eval_echelon_form(iszerofunc=iszerofunc, simpfunc=simpfunc) return len(pivots) def rref(self, iszerofunc=_iszero, simplify=False, pivots=True, normalize_last=True): """Return reduced row-echelon form of matrix and indices of pivot vars. Parameters ========== iszerofunc : Function A function used for detecting whether an element can act as a pivot. ``lambda x: x.is_zero`` is used by default. simplify : Function A function used to simplify elements when looking for a pivot. By default SymPy's ``simplify`` is used. pivots : True or False If ``True``, a tuple containing the row-reduced matrix and a tuple of pivot columns is returned. If ``False`` just the row-reduced matrix is returned. normalize_last : True or False If ``True``, no pivots are normalized to `1` until after all entries above and below each pivot are zeroed. This means the row reduction algorithm is fraction free until the very last step. If ``False``, the naive row reduction procedure is used where each pivot is normalized to be `1` before row operations are used to zero above and below the pivot. Notes ===== The default value of ``normalize_last=True`` can provide significant speedup to row reduction, especially on matrices with symbols. However, if you depend on the form row reduction algorithm leaves entries of the matrix, set ``noramlize_last=False`` Examples ======== >>> from sympy import Matrix >>> from sympy.abc import x >>> m = Matrix([[1, 2], [x, 1 - 1/x]]) >>> m.rref() (Matrix([ [1, 0], [0, 1]]), (0, 1)) >>> rref_matrix, rref_pivots = m.rref() >>> rref_matrix Matrix([ [1, 0], [0, 1]]) >>> rref_pivots (0, 1) """ simpfunc = simplify if isinstance( simplify, FunctionType) else _simplify ret, pivot_cols = self._eval_rref(iszerofunc=iszerofunc, simpfunc=simpfunc, normalize_last=normalize_last) if pivots: ret = (ret, pivot_cols) return ret class MatrixSubspaces(MatrixReductions): """Provides methods relating to the fundamental subspaces of a matrix. Should not be instantiated directly.""" def columnspace(self, simplify=False): """Returns a list of vectors (Matrix objects) that span columnspace of ``self`` Examples ======== >>> from sympy.matrices import Matrix >>> m = Matrix(3, 3, [1, 3, 0, -2, -6, 0, 3, 9, 6]) >>> m Matrix([ [ 1, 3, 0], [-2, -6, 0], [ 3, 9, 6]]) >>> m.columnspace() [Matrix([ [ 1], [-2], [ 3]]), Matrix([ [0], [0], [6]])] See Also ======== nullspace rowspace """ reduced, pivots = self.echelon_form(simplify=simplify, with_pivots=True) return [self.col(i) for i in pivots] def nullspace(self, simplify=False, iszerofunc=_iszero): """Returns list of vectors (Matrix objects) that span nullspace of ``self`` Examples ======== >>> from sympy.matrices import Matrix >>> m = Matrix(3, 3, [1, 3, 0, -2, -6, 0, 3, 9, 6]) >>> m Matrix([ [ 1, 3, 0], [-2, -6, 0], [ 3, 9, 6]]) >>> m.nullspace() [Matrix([ [-3], [ 1], [ 0]])] See Also ======== columnspace rowspace """ reduced, pivots = self.rref(iszerofunc=iszerofunc, simplify=simplify) free_vars = [i for i in range(self.cols) if i not in pivots] basis = [] for free_var in free_vars: # for each free variable, we will set it to 1 and all others # to 0. Then, we will use back substitution to solve the system vec = [self.zero]*self.cols vec[free_var] = self.one for piv_row, piv_col in enumerate(pivots): vec[piv_col] -= reduced[piv_row, free_var] basis.append(vec) return [self._new(self.cols, 1, b) for b in basis] def rowspace(self, simplify=False): """Returns a list of vectors that span the row space of ``self``.""" reduced, pivots = self.echelon_form(simplify=simplify, with_pivots=True) return [reduced.row(i) for i in range(len(pivots))] @classmethod def orthogonalize(cls, *vecs, **kwargs): """Apply the Gram-Schmidt orthogonalization procedure to vectors supplied in ``vecs``. Parameters ========== vecs vectors to be made orthogonal normalize : bool If ``True``, return an orthonormal basis. rankcheck : bool If ``True``, the computation does not stop when encountering linearly dependent vectors. If ``False``, it will raise ``ValueError`` when any zero or linearly dependent vectors are found. Returns ======= list List of orthogonal (or orthonormal) basis vectors. See Also ======== MatrixBase.QRdecomposition References ========== .. [1] https://en.wikipedia.org/wiki/Gram%E2%80%93Schmidt_process """ normalize = kwargs.get('normalize', False) rankcheck = kwargs.get('rankcheck', False) def project(a, b): return b * (a.dot(b) / b.dot(b)) def perp_to_subspace(vec, basis): """projects vec onto the subspace given by the orthogonal basis ``basis``""" components = [project(vec, b) for b in basis] if len(basis) == 0: return vec return vec - reduce(lambda a, b: a + b, components) ret = [] # make sure we start with a non-zero vector vecs = list(vecs) while len(vecs) > 0 and vecs[0].is_zero: if rankcheck is False: del vecs[0] else: raise ValueError( "GramSchmidt: vector set not linearly independent") for vec in vecs: perp = perp_to_subspace(vec, ret) if not perp.is_zero: ret.append(perp) elif rankcheck is True: raise ValueError( "GramSchmidt: vector set not linearly independent") if normalize: ret = [vec / vec.norm() for vec in ret] return ret class MatrixEigen(MatrixSubspaces): """Provides basic matrix eigenvalue/vector operations. Should not be instantiated directly.""" def diagonalize(self, reals_only=False, sort=False, normalize=False): """ Return (P, D), where D is diagonal and D = P^-1 * M * P where M is current matrix. Parameters ========== reals_only : bool. Whether to throw an error if complex numbers are need to diagonalize. (Default: False) sort : bool. Sort the eigenvalues along the diagonal. (Default: False) normalize : bool. If True, normalize the columns of P. (Default: False) Examples ======== >>> from sympy import Matrix >>> m = Matrix(3, 3, [1, 2, 0, 0, 3, 0, 2, -4, 2]) >>> m Matrix([ [1, 2, 0], [0, 3, 0], [2, -4, 2]]) >>> (P, D) = m.diagonalize() >>> D Matrix([ [1, 0, 0], [0, 2, 0], [0, 0, 3]]) >>> P Matrix([ [-1, 0, -1], [ 0, 0, -1], [ 2, 1, 2]]) >>> P.inv() * m * P Matrix([ [1, 0, 0], [0, 2, 0], [0, 0, 3]]) See Also ======== is_diagonal is_diagonalizable """ if not self.is_square: raise NonSquareMatrixError() if not self.is_diagonalizable(reals_only=reals_only): raise MatrixError("Matrix is not diagonalizable") eigenvecs = self.eigenvects(simplify=True) if sort: eigenvecs = sorted(eigenvecs, key=default_sort_key) p_cols, diag = [], [] for val, mult, basis in eigenvecs: diag += [val] * mult p_cols += basis if normalize: p_cols = [v / v.norm() for v in p_cols] return self.hstack(*p_cols), self.diag(*diag) def eigenvals(self, error_when_incomplete=True, **flags): r"""Return eigenvalues using the Berkowitz agorithm to compute the characteristic polynomial. Parameters ========== error_when_incomplete : bool, optional If it is set to ``True``, it will raise an error if not all eigenvalues are computed. This is caused by ``roots`` not returning a full list of eigenvalues. simplify : bool or function, optional If it is set to ``True``, it attempts to return the most simplified form of expressions returned by applying default simplification method in every routine. If it is set to ``False``, it will skip simplification in this particular routine to save computation resources. If a function is passed to, it will attempt to apply the particular function as simplification method. rational : bool, optional If it is set to ``True``, every floating point numbers would be replaced with rationals before computation. It can solve some issues of ``roots`` routine not working well with floats. multiple : bool, optional If it is set to ``True``, the result will be in the form of a list. If it is set to ``False``, the result will be in the form of a dictionary. Returns ======= eigs : list or dict Eigenvalues of a matrix. The return format would be specified by the key ``multiple``. Raises ====== MatrixError If not enough roots had got computed. NonSquareMatrixError If attempted to compute eigenvalues from a non-square matrix. See Also ======== MatrixDeterminant.charpoly eigenvects Notes ===== Eigenvalues of a matrix `A` can be computed by solving a matrix equation `\det(A - \lambda I) = 0` """ simplify = flags.get('simplify', False) # Collect simplify flag before popped up, to reuse later in the routine. multiple = flags.get('multiple', False) # Collect multiple flag to decide whether return as a dict or list. rational = flags.pop('rational', True) mat = self if not mat: return {} if rational: mat = mat.applyfunc( lambda x: nsimplify(x, rational=True) if x.has(Float) else x) if mat.is_upper or mat.is_lower: if not self.is_square: raise NonSquareMatrixError() diagonal_entries = [mat[i, i] for i in range(mat.rows)] if multiple: eigs = diagonal_entries else: eigs = {} for diagonal_entry in diagonal_entries: if diagonal_entry not in eigs: eigs[diagonal_entry] = 0 eigs[diagonal_entry] += 1 else: flags.pop('simplify', None) # pop unsupported flag if isinstance(simplify, FunctionType): eigs = roots(mat.charpoly(x=Dummy('x'), simplify=simplify), **flags) else: eigs = roots(mat.charpoly(x=Dummy('x')), **flags) # make sure the algebraic multiplicity sums to the # size of the matrix if error_when_incomplete and (sum(eigs.values()) if isinstance(eigs, dict) else len(eigs)) != self.cols: raise MatrixError("Could not compute eigenvalues for {}".format(self)) # Since 'simplify' flag is unsupported in roots() # simplify() function will be applied once at the end of the routine. if not simplify: return eigs if not isinstance(simplify, FunctionType): simplify = _simplify # With 'multiple' flag set true, simplify() will be mapped for the list # Otherwise, simplify() will be mapped for the keys of the dictionary if not multiple: return {simplify(key): value for key, value in eigs.items()} else: return [simplify(value) for value in eigs] def eigenvects(self, error_when_incomplete=True, iszerofunc=_iszero, **flags): """Return list of triples (eigenval, multiplicity, eigenspace). Parameters ========== error_when_incomplete : bool, optional Raise an error when not all eigenvalues are computed. This is caused by ``roots`` not returning a full list of eigenvalues. iszerofunc : function, optional Specifies a zero testing function to be used in ``rref``. Default value is ``_iszero``, which uses SymPy's naive and fast default assumption handler. It can also accept any user-specified zero testing function, if it is formatted as a function which accepts a single symbolic argument and returns ``True`` if it is tested as zero and ``False`` if it is tested as non-zero, and ``None`` if it is undecidable. simplify : bool or function, optional If ``True``, ``as_content_primitive()`` will be used to tidy up normalization artifacts. It will also be used by the ``nullspace`` routine. chop : bool or positive number, optional If the matrix contains any Floats, they will be changed to Rationals for computation purposes, but the answers will be returned after being evaluated with evalf. The ``chop`` flag is passed to ``evalf``. When ``chop=True`` a default precision will be used; a number will be interpreted as the desired level of precision. Returns ======= ret : [(eigenval, multiplicity, eigenspace), ...] A ragged list containing tuples of data obtained by ``eigenvals`` and ``nullspace``. ``eigenspace`` is a list containing the ``eigenvector`` for each eigenvalue. ``eigenvector`` is a vector in the form of a ``Matrix``. e.g. a vector of length 3 is returned as ``Matrix([a_1, a_2, a_3])``. Raises ====== NotImplementedError If failed to compute nullspace. See Also ======== eigenvals MatrixSubspaces.nullspace """ from sympy.matrices import eye simplify = flags.get('simplify', True) if not isinstance(simplify, FunctionType): simpfunc = _simplify if simplify else lambda x: x primitive = flags.get('simplify', False) chop = flags.pop('chop', False) flags.pop('multiple', None) # remove this if it's there mat = self # roots doesn't like Floats, so replace them with Rationals has_floats = self.has(Float) if has_floats: mat = mat.applyfunc(lambda x: nsimplify(x, rational=True)) def eigenspace(eigenval): """Get a basis for the eigenspace for a particular eigenvalue""" m = mat - self.eye(mat.rows) * eigenval ret = m.nullspace(iszerofunc=iszerofunc) # the nullspace for a real eigenvalue should be # non-trivial. If we didn't find an eigenvector, try once # more a little harder if len(ret) == 0 and simplify: ret = m.nullspace(iszerofunc=iszerofunc, simplify=True) if len(ret) == 0: raise NotImplementedError( "Can't evaluate eigenvector for eigenvalue %s" % eigenval) return ret eigenvals = mat.eigenvals(rational=False, error_when_incomplete=error_when_incomplete, **flags) ret = [(val, mult, eigenspace(val)) for val, mult in sorted(eigenvals.items(), key=default_sort_key)] if primitive: # if the primitive flag is set, get rid of any common # integer denominators def denom_clean(l): from sympy import gcd return [(v / gcd(list(v))).applyfunc(simpfunc) for v in l] ret = [(val, mult, denom_clean(es)) for val, mult, es in ret] if has_floats: # if we had floats to start with, turn the eigenvectors to floats ret = [(val.evalf(chop=chop), mult, [v.evalf(chop=chop) for v in es]) for val, mult, es in ret] return ret def is_diagonalizable(self, reals_only=False, **kwargs): """Returns true if a matrix is diagonalizable. Parameters ========== reals_only : bool. If reals_only=True, determine whether the matrix can be diagonalized without complex numbers. (Default: False) kwargs ====== clear_cache : bool. If True, clear the result of any computations when finished. (Default: True) Examples ======== >>> from sympy import Matrix >>> m = Matrix(3, 3, [1, 2, 0, 0, 3, 0, 2, -4, 2]) >>> m Matrix([ [1, 2, 0], [0, 3, 0], [2, -4, 2]]) >>> m.is_diagonalizable() True >>> m = Matrix(2, 2, [0, 1, 0, 0]) >>> m Matrix([ [0, 1], [0, 0]]) >>> m.is_diagonalizable() False >>> m = Matrix(2, 2, [0, 1, -1, 0]) >>> m Matrix([ [ 0, 1], [-1, 0]]) >>> m.is_diagonalizable() True >>> m.is_diagonalizable(reals_only=True) False See Also ======== is_diagonal diagonalize """ if 'clear_cache' in kwargs: SymPyDeprecationWarning( feature='clear_cache', deprecated_since_version=1.4, issue=15887 ).warn() if 'clear_subproducts' in kwargs: SymPyDeprecationWarning( feature='clear_subproducts', deprecated_since_version=1.4, issue=15887 ).warn() if not self.is_square: return False if all(e.is_real for e in self) and self.is_symmetric(): # every real symmetric matrix is real diagonalizable return True eigenvecs = self.eigenvects(simplify=True) ret = True for val, mult, basis in eigenvecs: # if we have a complex eigenvalue if reals_only and not val.is_real: ret = False # if the geometric multiplicity doesn't equal the algebraic if mult != len(basis): ret = False return ret def _eval_is_positive_definite(self, method="eigen"): """Algorithm dump for computing positive-definiteness of a matrix. Parameters ========== method : str, optional Specifies the method for computing positive-definiteness of a matrix. If ``'eigen'``, it computes the full eigenvalues and decides if the matrix is positive-definite. If ``'CH'``, it attempts computing the Cholesky decomposition to detect the definitiveness. If ``'LDL'``, it attempts computing the LDL decomposition to detect the definitiveness. """ if self.is_hermitian: if method == 'eigen': eigen = self.eigenvals() args = [x.is_positive for x in eigen.keys()] return fuzzy_and(args) elif method == 'CH': try: self.cholesky(hermitian=True) except NonPositiveDefiniteMatrixError: return False return True elif method == 'LDL': try: self.LDLdecomposition(hermitian=True) except NonPositiveDefiniteMatrixError: return False return True else: raise NotImplementedError() elif self.is_square: M_H = (self + self.H) / 2 return M_H._eval_is_positive_definite(method=method) def is_positive_definite(self): return self._eval_is_positive_definite() def is_positive_semidefinite(self): if self.is_hermitian: eigen = self.eigenvals() args = [x.is_nonnegative for x in eigen.keys()] return fuzzy_and(args) elif self.is_square: return ((self + self.H) / 2).is_positive_semidefinite def is_negative_definite(self): if self.is_hermitian: eigen = self.eigenvals() args = [x.is_negative for x in eigen.keys()] return fuzzy_and(args) elif self.is_square: return ((self + self.H) / 2).is_negative_definite def is_negative_semidefinite(self): if self.is_hermitian: eigen = self.eigenvals() args = [x.is_nonpositive for x in eigen.keys()] return fuzzy_and(args) elif self.is_square: return ((self + self.H) / 2).is_negative_semidefinite def is_indefinite(self): if self.is_hermitian: eigen = self.eigenvals() args1 = [x.is_positive for x in eigen.keys()] any_positive = fuzzy_or(args1) args2 = [x.is_negative for x in eigen.keys()] any_negative = fuzzy_or(args2) return fuzzy_and([any_positive, any_negative]) elif self.is_square: return ((self + self.H) / 2).is_indefinite _doc_positive_definite = \ r"""Finds out the definiteness of a matrix. Examples ======== An example of numeric positive definite matrix: >>> from sympy import Matrix >>> A = Matrix([[1, -2], [-2, 6]]) >>> A.is_positive_definite True >>> A.is_positive_semidefinite True >>> A.is_negative_definite False >>> A.is_negative_semidefinite False >>> A.is_indefinite False An example of numeric negative definite matrix: >>> A = Matrix([[-1, 2], [2, -6]]) >>> A.is_positive_definite False >>> A.is_positive_semidefinite False >>> A.is_negative_definite True >>> A.is_negative_semidefinite True >>> A.is_indefinite False An example of numeric indefinite matrix: >>> A = Matrix([[1, 2], [2, 1]]) >>> A.is_positive_definite False >>> A.is_positive_semidefinite False >>> A.is_negative_definite True >>> A.is_negative_semidefinite True >>> A.is_indefinite False Notes ===== Definitiveness is not very commonly discussed for non-hermitian matrices. However, computing the definitiveness of a matrix can be generalized over any real matrix by taking the symmetric part: `A_S = 1/2 (A + A^{T})` Or over any complex matrix by taking the hermitian part: `A_H = 1/2 (A + A^{H})` And computing the eigenvalues. References ========== .. [1] https://en.wikipedia.org/wiki/Definiteness_of_a_matrix#Eigenvalues .. [2] http://mathworld.wolfram.com/PositiveDefiniteMatrix.html .. [3] Johnson, C. R. "Positive Definite Matrices." Amer. Math. Monthly 77, 259-264 1970. """ is_positive_definite = \ property(fget=is_positive_definite, doc=_doc_positive_definite) is_positive_semidefinite = \ property(fget=is_positive_semidefinite, doc=_doc_positive_definite) is_negative_definite = \ property(fget=is_negative_definite, doc=_doc_positive_definite) is_negative_semidefinite = \ property(fget=is_negative_semidefinite, doc=_doc_positive_definite) is_indefinite = \ property(fget=is_indefinite, doc=_doc_positive_definite) def jordan_form(self, calc_transform=True, **kwargs): """Return ``(P, J)`` where `J` is a Jordan block matrix and `P` is a matrix such that ``self == P*J*P**-1`` Parameters ========== calc_transform : bool If ``False``, then only `J` is returned. chop : bool All matrices are converted to exact types when computing eigenvalues and eigenvectors. As a result, there may be approximation errors. If ``chop==True``, these errors will be truncated. Examples ======== >>> from sympy import Matrix >>> m = Matrix([[ 6, 5, -2, -3], [-3, -1, 3, 3], [ 2, 1, -2, -3], [-1, 1, 5, 5]]) >>> P, J = m.jordan_form() >>> J Matrix([ [2, 1, 0, 0], [0, 2, 0, 0], [0, 0, 2, 1], [0, 0, 0, 2]]) See Also ======== jordan_block """ if not self.is_square: raise NonSquareMatrixError("Only square matrices have Jordan forms") chop = kwargs.pop('chop', False) mat = self has_floats = self.has(Float) if has_floats: try: max_prec = max(term._prec for term in self._mat if isinstance(term, Float)) except ValueError: # if no term in the matrix is explicitly a Float calling max() # will throw a error so setting max_prec to default value of 53 max_prec = 53 # setting minimum max_dps to 15 to prevent loss of precision in # matrix containing non evaluated expressions max_dps = max(prec_to_dps(max_prec), 15) def restore_floats(*args): """If ``has_floats`` is `True`, cast all ``args`` as matrices of floats.""" if has_floats: args = [m.evalf(prec=max_dps, chop=chop) for m in args] if len(args) == 1: return args[0] return args # cache calculations for some speedup mat_cache = {} def eig_mat(val, pow): """Cache computations of ``(self - val*I)**pow`` for quick retrieval""" if (val, pow) in mat_cache: return mat_cache[(val, pow)] if (val, pow - 1) in mat_cache: mat_cache[(val, pow)] = mat_cache[(val, pow - 1)] * mat_cache[(val, 1)] else: mat_cache[(val, pow)] = (mat - val*self.eye(self.rows))**pow return mat_cache[(val, pow)] # helper functions def nullity_chain(val, algebraic_multiplicity): """Calculate the sequence [0, nullity(E), nullity(E**2), ...] until it is constant where ``E = self - val*I``""" # mat.rank() is faster than computing the null space, # so use the rank-nullity theorem cols = self.cols ret = [0] nullity = cols - eig_mat(val, 1).rank() i = 2 while nullity != ret[-1]: ret.append(nullity) if nullity == algebraic_multiplicity: break nullity = cols - eig_mat(val, i).rank() i += 1 # Due to issues like #7146 and #15872, SymPy sometimes # gives the wrong rank. In this case, raise an error # instead of returning an incorrect matrix if nullity < ret[-1] or nullity > algebraic_multiplicity: raise MatrixError( "SymPy had encountered an inconsistent " "result while computing Jordan block: " "{}".format(self)) return ret def blocks_from_nullity_chain(d): """Return a list of the size of each Jordan block. If d_n is the nullity of E**n, then the number of Jordan blocks of size n is 2*d_n - d_(n-1) - d_(n+1)""" # d[0] is always the number of columns, so skip past it mid = [2*d[n] - d[n - 1] - d[n + 1] for n in range(1, len(d) - 1)] # d is assumed to plateau with "d[ len(d) ] == d[-1]", so # 2*d_n - d_(n-1) - d_(n+1) == d_n - d_(n-1) end = [d[-1] - d[-2]] if len(d) > 1 else [d[0]] return mid + end def pick_vec(small_basis, big_basis): """Picks a vector from big_basis that isn't in the subspace spanned by small_basis""" if len(small_basis) == 0: return big_basis[0] for v in big_basis: _, pivots = self.hstack(*(small_basis + [v])).echelon_form(with_pivots=True) if pivots[-1] == len(small_basis): return v # roots doesn't like Floats, so replace them with Rationals if has_floats: mat = mat.applyfunc(lambda x: nsimplify(x, rational=True)) # first calculate the jordan block structure eigs = mat.eigenvals() # make sure that we found all the roots by counting # the algebraic multiplicity if sum(m for m in eigs.values()) != mat.cols: raise MatrixError("Could not compute eigenvalues for {}".format(mat)) # most matrices have distinct eigenvalues # and so are diagonalizable. In this case, don't # do extra work! if len(eigs.keys()) == mat.cols: blocks = list(sorted(eigs.keys(), key=default_sort_key)) jordan_mat = mat.diag(*blocks) if not calc_transform: return restore_floats(jordan_mat) jordan_basis = [eig_mat(eig, 1).nullspace()[0] for eig in blocks] basis_mat = mat.hstack(*jordan_basis) return restore_floats(basis_mat, jordan_mat) block_structure = [] for eig in sorted(eigs.keys(), key=default_sort_key): algebraic_multiplicity = eigs[eig] chain = nullity_chain(eig, algebraic_multiplicity) block_sizes = blocks_from_nullity_chain(chain) # if block_sizes == [a, b, c, ...], then the number of # Jordan blocks of size 1 is a, of size 2 is b, etc. # create an array that has (eig, block_size) with one # entry for each block size_nums = [(i+1, num) for i, num in enumerate(block_sizes)] # we expect larger Jordan blocks to come earlier size_nums.reverse() block_structure.extend( (eig, size) for size, num in size_nums for _ in range(num)) jordan_form_size = sum(size for eig, size in block_structure) if jordan_form_size != self.rows: raise MatrixError( "SymPy had encountered an inconsistent result while " "computing Jordan block. : {}".format(self)) blocks = (mat.jordan_block(size=size, eigenvalue=eig) for eig, size in block_structure) jordan_mat = mat.diag(*blocks) if not calc_transform: return restore_floats(jordan_mat) # For each generalized eigenspace, calculate a basis. # We start by looking for a vector in null( (A - eig*I)**n ) # which isn't in null( (A - eig*I)**(n-1) ) where n is # the size of the Jordan block # # Ideally we'd just loop through block_structure and # compute each generalized eigenspace. However, this # causes a lot of unneeded computation. Instead, we # go through the eigenvalues separately, since we know # their generalized eigenspaces must have bases that # are linearly independent. jordan_basis = [] for eig in sorted(eigs.keys(), key=default_sort_key): eig_basis = [] for block_eig, size in block_structure: if block_eig != eig: continue null_big = (eig_mat(eig, size)).nullspace() null_small = (eig_mat(eig, size - 1)).nullspace() # we want to pick something that is in the big basis # and not the small, but also something that is independent # of any other generalized eigenvectors from a different # generalized eigenspace sharing the same eigenvalue. vec = pick_vec(null_small + eig_basis, null_big) new_vecs = [(eig_mat(eig, i))*vec for i in range(size)] eig_basis.extend(new_vecs) jordan_basis.extend(reversed(new_vecs)) basis_mat = mat.hstack(*jordan_basis) return restore_floats(basis_mat, jordan_mat) def left_eigenvects(self, **flags): """Returns left eigenvectors and eigenvalues. This function returns the list of triples (eigenval, multiplicity, basis) for the left eigenvectors. Options are the same as for eigenvects(), i.e. the ``**flags`` arguments gets passed directly to eigenvects(). Examples ======== >>> from sympy import Matrix >>> M = Matrix([[0, 1, 1], [1, 0, 0], [1, 1, 1]]) >>> M.eigenvects() [(-1, 1, [Matrix([ [-1], [ 1], [ 0]])]), (0, 1, [Matrix([ [ 0], [-1], [ 1]])]), (2, 1, [Matrix([ [2/3], [1/3], [ 1]])])] >>> M.left_eigenvects() [(-1, 1, [Matrix([[-2, 1, 1]])]), (0, 1, [Matrix([[-1, -1, 1]])]), (2, 1, [Matrix([[1, 1, 1]])])] """ eigs = self.transpose().eigenvects(**flags) return [(val, mult, [l.transpose() for l in basis]) for val, mult, basis in eigs] def singular_values(self): """Compute the singular values of a Matrix Examples ======== >>> from sympy import Matrix, Symbol >>> x = Symbol('x', real=True) >>> A = Matrix([[0, 1, 0], [0, x, 0], [-1, 0, 0]]) >>> A.singular_values() [sqrt(x**2 + 1), 1, 0] See Also ======== condition_number """ mat = self if self.rows >= self.cols: valmultpairs = (mat.H * mat).eigenvals() else: valmultpairs = (mat * mat.H).eigenvals() # Expands result from eigenvals into a simple list vals = [] for k, v in valmultpairs.items(): vals += [sqrt(k)] * v # dangerous! same k in several spots! # Pad with zeros if singular values are computed in reverse way, # to give consistent format. if len(vals) < self.cols: vals += [self.zero] * (self.cols - len(vals)) # sort them in descending order vals.sort(reverse=True, key=default_sort_key) return vals class MatrixCalculus(MatrixCommon): """Provides calculus-related matrix operations.""" def diff(self, *args, **kwargs): """Calculate the derivative of each element in the matrix. ``args`` will be passed to the ``integrate`` function. Examples ======== >>> from sympy.matrices import Matrix >>> from sympy.abc import x, y >>> M = Matrix([[x, y], [1, 0]]) >>> M.diff(x) Matrix([ [1, 0], [0, 0]]) See Also ======== integrate limit """ # XXX this should be handled here rather than in Derivative from sympy import Derivative kwargs.setdefault('evaluate', True) deriv = Derivative(self, *args, evaluate=True) if not isinstance(self, Basic): return deriv.as_mutable() else: return deriv def _eval_derivative(self, arg): return self.applyfunc(lambda x: x.diff(arg)) def _accept_eval_derivative(self, s): return s._visit_eval_derivative_array(self) def _visit_eval_derivative_scalar(self, base): # Types are (base: scalar, self: matrix) return self.applyfunc(lambda x: base.diff(x)) def _visit_eval_derivative_array(self, base): # Types are (base: array/matrix, self: matrix) from sympy import derive_by_array return derive_by_array(base, self) def integrate(self, *args): """Integrate each element of the matrix. ``args`` will be passed to the ``integrate`` function. Examples ======== >>> from sympy.matrices import Matrix >>> from sympy.abc import x, y >>> M = Matrix([[x, y], [1, 0]]) >>> M.integrate((x, )) Matrix([ [x**2/2, x*y], [ x, 0]]) >>> M.integrate((x, 0, 2)) Matrix([ [2, 2*y], [2, 0]]) See Also ======== limit diff """ return self.applyfunc(lambda x: x.integrate(*args)) def jacobian(self, X): """Calculates the Jacobian matrix (derivative of a vector-valued function). Parameters ========== ``self`` : vector of expressions representing functions f_i(x_1, ..., x_n). X : set of x_i's in order, it can be a list or a Matrix Both ``self`` and X can be a row or a column matrix in any order (i.e., jacobian() should always work). Examples ======== >>> from sympy import sin, cos, Matrix >>> from sympy.abc import rho, phi >>> X = Matrix([rho*cos(phi), rho*sin(phi), rho**2]) >>> Y = Matrix([rho, phi]) >>> X.jacobian(Y) Matrix([ [cos(phi), -rho*sin(phi)], [sin(phi), rho*cos(phi)], [ 2*rho, 0]]) >>> X = Matrix([rho*cos(phi), rho*sin(phi)]) >>> X.jacobian(Y) Matrix([ [cos(phi), -rho*sin(phi)], [sin(phi), rho*cos(phi)]]) See Also ======== hessian wronskian """ if not isinstance(X, MatrixBase): X = self._new(X) # Both X and ``self`` can be a row or a column matrix, so we need to make # sure all valid combinations work, but everything else fails: if self.shape[0] == 1: m = self.shape[1] elif self.shape[1] == 1: m = self.shape[0] else: raise TypeError("``self`` must be a row or a column matrix") if X.shape[0] == 1: n = X.shape[1] elif X.shape[1] == 1: n = X.shape[0] else: raise TypeError("X must be a row or a column matrix") # m is the number of functions and n is the number of variables # computing the Jacobian is now easy: return self._new(m, n, lambda j, i: self[j].diff(X[i])) def limit(self, *args): """Calculate the limit of each element in the matrix. ``args`` will be passed to the ``limit`` function. Examples ======== >>> from sympy.matrices import Matrix >>> from sympy.abc import x, y >>> M = Matrix([[x, y], [1, 0]]) >>> M.limit(x, 2) Matrix([ [2, y], [1, 0]]) See Also ======== integrate diff """ return self.applyfunc(lambda x: x.limit(*args)) # https://github.com/sympy/sympy/pull/12854 class MatrixDeprecated(MatrixCommon): """A class to house deprecated matrix methods.""" def _legacy_array_dot(self, b): """Compatibility function for deprecated behavior of ``matrix.dot(vector)`` """ from .dense import Matrix if not isinstance(b, MatrixBase): if is_sequence(b): if len(b) != self.cols and len(b) != self.rows: raise ShapeError( "Dimensions incorrect for dot product: %s, %s" % ( self.shape, len(b))) return self.dot(Matrix(b)) else: raise TypeError( "`b` must be an ordered iterable or Matrix, not %s." % type(b)) mat = self if mat.cols == b.rows: if b.cols != 1: mat = mat.T b = b.T prod = flatten((mat * b).tolist()) return prod if mat.cols == b.cols: return mat.dot(b.T) elif mat.rows == b.rows: return mat.T.dot(b) else: raise ShapeError("Dimensions incorrect for dot product: %s, %s" % ( self.shape, b.shape)) def berkowitz_charpoly(self, x=Dummy('lambda'), simplify=_simplify): return self.charpoly(x=x) def berkowitz_det(self): """Computes determinant using Berkowitz method. See Also ======== det berkowitz """ return self.det(method='berkowitz') def berkowitz_eigenvals(self, **flags): """Computes eigenvalues of a Matrix using Berkowitz method. See Also ======== berkowitz """ return self.eigenvals(**flags) def berkowitz_minors(self): """Computes principal minors using Berkowitz method. See Also ======== berkowitz """ sign, minors = self.one, [] for poly in self.berkowitz(): minors.append(sign * poly[-1]) sign = -sign return tuple(minors) def berkowitz(self): from sympy.matrices import zeros berk = ((1,),) if not self: return berk if not self.is_square: raise NonSquareMatrixError() A, N = self, self.rows transforms = [0] * (N - 1) for n in range(N, 1, -1): T, k = zeros(n + 1, n), n - 1 R, C = -A[k, :k], A[:k, k] A, a = A[:k, :k], -A[k, k] items = [C] for i in range(0, n - 2): items.append(A * items[i]) for i, B in enumerate(items): items[i] = (R * B)[0, 0] items = [self.one, a] + items for i in range(n): T[i:, i] = items[:n - i + 1] transforms[k - 1] = T polys = [self._new([self.one, -A[0, 0]])] for i, T in enumerate(transforms): polys.append(T * polys[i]) return berk + tuple(map(tuple, polys)) def cofactorMatrix(self, method="berkowitz"): return self.cofactor_matrix(method=method) def det_bareis(self): return self.det(method='bareiss') def det_bareiss(self): """Compute matrix determinant using Bareiss' fraction-free algorithm which is an extension of the well known Gaussian elimination method. This approach is best suited for dense symbolic matrices and will result in a determinant with minimal number of fractions. It means that less term rewriting is needed on resulting formulae. TODO: Implement algorithm for sparse matrices (SFF), http://www.eecis.udel.edu/~saunders/papers/sffge/it5.ps. See Also ======== det berkowitz_det """ return self.det(method='bareiss') def det_LU_decomposition(self): """Compute matrix determinant using LU decomposition Note that this method fails if the LU decomposition itself fails. In particular, if the matrix has no inverse this method will fail. TODO: Implement algorithm for sparse matrices (SFF), http://www.eecis.udel.edu/~saunders/papers/sffge/it5.ps. See Also ======== det det_bareiss berkowitz_det """ return self.det(method='lu') def jordan_cell(self, eigenval, n): return self.jordan_block(size=n, eigenvalue=eigenval) def jordan_cells(self, calc_transformation=True): P, J = self.jordan_form() return P, J.get_diag_blocks() def minorEntry(self, i, j, method="berkowitz"): return self.minor(i, j, method=method) def minorMatrix(self, i, j): return self.minor_submatrix(i, j) def permuteBkwd(self, perm): """Permute the rows of the matrix with the given permutation in reverse.""" return self.permute_rows(perm, direction='backward') def permuteFwd(self, perm): """Permute the rows of the matrix with the given permutation.""" return self.permute_rows(perm, direction='forward') class MatrixBase(MatrixDeprecated, MatrixCalculus, MatrixEigen, MatrixCommon): """Base class for matrix objects.""" # Added just for numpy compatibility __array_priority__ = 11 is_Matrix = True _class_priority = 3 _sympify = staticmethod(sympify) zero = S.Zero one = S.One __hash__ = None # Mutable # Defined here the same as on Basic. # We don't define _repr_png_ here because it would add a large amount of # data to any notebook containing SymPy expressions, without adding # anything useful to the notebook. It can still enabled manually, e.g., # for the qtconsole, with init_printing(). def _repr_latex_(self): """ IPython/Jupyter LaTeX printing To change the behavior of this (e.g., pass in some settings to LaTeX), use init_printing(). init_printing() will also enable LaTeX printing for built in numeric types like ints and container types that contain SymPy objects, like lists and dictionaries of expressions. """ from sympy.printing.latex import latex s = latex(self, mode='plain') return "$\\displaystyle %s$" % s _repr_latex_orig = _repr_latex_ def __array__(self, dtype=object): from .dense import matrix2numpy return matrix2numpy(self, dtype=dtype) def __getattr__(self, attr): if attr in ('diff', 'integrate', 'limit'): def doit(*args): item_doit = lambda item: getattr(item, attr)(*args) return self.applyfunc(item_doit) return doit else: raise AttributeError( "%s has no attribute %s." % (self.__class__.__name__, attr)) def __len__(self): """Return the number of elements of ``self``. Implemented mainly so bool(Matrix()) == False. """ return self.rows * self.cols def __mathml__(self): mml = "" for i in range(self.rows): mml += "<matrixrow>" for j in range(self.cols): mml += self[i, j].__mathml__() mml += "</matrixrow>" return "<matrix>" + mml + "</matrix>" # needed for python 2 compatibility def __ne__(self, other): return not self == other def _matrix_pow_by_jordan_blocks(self, num): from sympy.matrices import diag, MutableMatrix from sympy import binomial def jordan_cell_power(jc, n): N = jc.shape[0] l = jc[0,0] if l.is_zero: if N == 1 and n.is_nonnegative: jc[0,0] = l**n elif not (n.is_integer and n.is_nonnegative): raise NonInvertibleMatrixError("Non-invertible matrix can only be raised to a nonnegative integer") else: for i in range(N): jc[0,i] = KroneckerDelta(i, n) else: for i in range(N): bn = binomial(n, i) if isinstance(bn, binomial): bn = bn._eval_expand_func() jc[0,i] = l**(n-i)*bn for i in range(N): for j in range(1, N-i): jc[j,i+j] = jc [j-1,i+j-1] P, J = self.jordan_form() jordan_cells = J.get_diag_blocks() # Make sure jordan_cells matrices are mutable: jordan_cells = [MutableMatrix(j) for j in jordan_cells] for j in jordan_cells: jordan_cell_power(j, num) return self._new(P*diag(*jordan_cells)*P.inv()) def __repr__(self): return sstr(self) def __str__(self): if self.rows == 0 or self.cols == 0: return 'Matrix(%s, %s, [])' % (self.rows, self.cols) return "Matrix(%s)" % str(self.tolist()) def _format_str(self, printer=None): if not printer: from sympy.printing.str import StrPrinter printer = StrPrinter() # Handle zero dimensions: if self.rows == 0 or self.cols == 0: return 'Matrix(%s, %s, [])' % (self.rows, self.cols) if self.rows == 1: return "Matrix([%s])" % self.table(printer, rowsep=',\n') return "Matrix([\n%s])" % self.table(printer, rowsep=',\n') @classmethod def irregular(cls, ntop, *matrices, **kwargs): """Return a matrix filled by the given matrices which are listed in order of appearance from left to right, top to bottom as they first appear in the matrix. They must fill the matrix completely. Examples ======== >>> from sympy import ones, Matrix >>> Matrix.irregular(3, ones(2,1), ones(3,3)*2, ones(2,2)*3, ... ones(1,1)*4, ones(2,2)*5, ones(1,2)*6, ones(1,2)*7) Matrix([ [1, 2, 2, 2, 3, 3], [1, 2, 2, 2, 3, 3], [4, 2, 2, 2, 5, 5], [6, 6, 7, 7, 5, 5]]) """ from sympy.core.compatibility import as_int ntop = as_int(ntop) # make sure we are working with explicit matrices b = [i.as_explicit() if hasattr(i, 'as_explicit') else i for i in matrices] q = list(range(len(b))) dat = [i.rows for i in b] active = [q.pop(0) for _ in range(ntop)] cols = sum([b[i].cols for i in active]) rows = [] while any(dat): r = [] for a, j in enumerate(active): r.extend(b[j][-dat[j], :]) dat[j] -= 1 if dat[j] == 0 and q: active[a] = q.pop(0) if len(r) != cols: raise ValueError(filldedent(''' Matrices provided do not appear to fill the space completely.''')) rows.append(r) return cls._new(rows) @classmethod def _handle_creation_inputs(cls, *args, **kwargs): """Return the number of rows, cols and flat matrix elements. Examples ======== >>> from sympy import Matrix, I Matrix can be constructed as follows: * from a nested list of iterables >>> Matrix( ((1, 2+I), (3, 4)) ) Matrix([ [1, 2 + I], [3, 4]]) * from un-nested iterable (interpreted as a column) >>> Matrix( [1, 2] ) Matrix([ [1], [2]]) * from un-nested iterable with dimensions >>> Matrix(1, 2, [1, 2] ) Matrix([[1, 2]]) * from no arguments (a 0 x 0 matrix) >>> Matrix() Matrix(0, 0, []) * from a rule >>> Matrix(2, 2, lambda i, j: i/(j + 1) ) Matrix([ [0, 0], [1, 1/2]]) See Also ======== irregular - filling a matrix with irregular blocks """ from sympy.matrices.sparse import SparseMatrix from sympy.matrices.expressions.matexpr import MatrixSymbol from sympy.matrices.expressions.blockmatrix import BlockMatrix from sympy.utilities.iterables import reshape flat_list = None if len(args) == 1: # Matrix(SparseMatrix(...)) if isinstance(args[0], SparseMatrix): return args[0].rows, args[0].cols, flatten(args[0].tolist()) # Matrix(Matrix(...)) elif isinstance(args[0], MatrixBase): return args[0].rows, args[0].cols, args[0]._mat # Matrix(MatrixSymbol('X', 2, 2)) elif isinstance(args[0], Basic) and args[0].is_Matrix: return args[0].rows, args[0].cols, args[0].as_explicit()._mat # Matrix(numpy.ones((2, 2))) elif hasattr(args[0], "__array__"): # NumPy array or matrix or some other object that implements # __array__. So let's first use this method to get a # numpy.array() and then make a python list out of it. arr = args[0].__array__() if len(arr.shape) == 2: rows, cols = arr.shape[0], arr.shape[1] flat_list = [cls._sympify(i) for i in arr.ravel()] return rows, cols, flat_list elif len(arr.shape) == 1: rows, cols = arr.shape[0], 1 flat_list = [cls.zero] * rows for i in range(len(arr)): flat_list[i] = cls._sympify(arr[i]) return rows, cols, flat_list else: raise NotImplementedError( "SymPy supports just 1D and 2D matrices") # Matrix([1, 2, 3]) or Matrix([[1, 2], [3, 4]]) elif is_sequence(args[0]) \ and not isinstance(args[0], DeferredVector): dat = list(args[0]) ismat = lambda i: isinstance(i, MatrixBase) and ( evaluate or isinstance(i, BlockMatrix) or isinstance(i, MatrixSymbol)) raw = lambda i: is_sequence(i) and not ismat(i) evaluate = kwargs.get('evaluate', True) if evaluate: def do(x): # make Block and Symbol explicit if isinstance(x, (list, tuple)): return type(x)([do(i) for i in x]) if isinstance(x, BlockMatrix) or \ isinstance(x, MatrixSymbol) and \ all(_.is_Integer for _ in x.shape): return x.as_explicit() return x dat = do(dat) if dat == [] or dat == [[]]: rows = cols = 0 flat_list = [] elif not any(raw(i) or ismat(i) for i in dat): # a column as a list of values flat_list = [cls._sympify(i) for i in dat] rows = len(flat_list) cols = 1 if rows else 0 elif evaluate and all(ismat(i) for i in dat): # a column as a list of matrices ncol = set(i.cols for i in dat if any(i.shape)) if ncol: if len(ncol) != 1: raise ValueError('mismatched dimensions') flat_list = [_ for i in dat for r in i.tolist() for _ in r] cols = ncol.pop() rows = len(flat_list)//cols else: rows = cols = 0 flat_list = [] elif evaluate and any(ismat(i) for i in dat): ncol = set() flat_list = [] for i in dat: if ismat(i): flat_list.extend( [k for j in i.tolist() for k in j]) if any(i.shape): ncol.add(i.cols) elif raw(i): if i: ncol.add(len(i)) flat_list.extend(i) else: ncol.add(1) flat_list.append(i) if len(ncol) > 1: raise ValueError('mismatched dimensions') cols = ncol.pop() rows = len(flat_list)//cols else: # list of lists; each sublist is a logical row # which might consist of many rows if the values in # the row are matrices flat_list = [] ncol = set() rows = cols = 0 for row in dat: if not is_sequence(row) and \ not getattr(row, 'is_Matrix', False): raise ValueError('expecting list of lists') if not row: continue if evaluate and all(ismat(i) for i in row): r, c, flatT = cls._handle_creation_inputs( [i.T for i in row]) T = reshape(flatT, [c]) flat = [T[i][j] for j in range(c) for i in range(r)] r, c = c, r else: r = 1 if getattr(row, 'is_Matrix', False): c = 1 flat = [row] else: c = len(row) flat = [cls._sympify(i) for i in row] ncol.add(c) if len(ncol) > 1: raise ValueError('mismatched dimensions') flat_list.extend(flat) rows += r cols = ncol.pop() if ncol else 0 elif len(args) == 3: rows = as_int(args[0]) cols = as_int(args[1]) if rows < 0 or cols < 0: raise ValueError("Cannot create a {} x {} matrix. " "Both dimensions must be positive".format(rows, cols)) # Matrix(2, 2, lambda i, j: i+j) if len(args) == 3 and isinstance(args[2], Callable): op = args[2] flat_list = [] for i in range(rows): flat_list.extend( [cls._sympify(op(cls._sympify(i), cls._sympify(j))) for j in range(cols)]) # Matrix(2, 2, [1, 2, 3, 4]) elif len(args) == 3 and is_sequence(args[2]): flat_list = args[2] if len(flat_list) != rows * cols: raise ValueError( 'List length should be equal to rows*columns') flat_list = [cls._sympify(i) for i in flat_list] # Matrix() elif len(args) == 0: # Empty Matrix rows = cols = 0 flat_list = [] if flat_list is None: raise TypeError(filldedent(''' Data type not understood; expecting list of lists or lists of values.''')) return rows, cols, flat_list def _setitem(self, key, value): """Helper to set value at location given by key. Examples ======== >>> from sympy import Matrix, I, zeros, ones >>> m = Matrix(((1, 2+I), (3, 4))) >>> m Matrix([ [1, 2 + I], [3, 4]]) >>> m[1, 0] = 9 >>> m Matrix([ [1, 2 + I], [9, 4]]) >>> m[1, 0] = [[0, 1]] To replace row r you assign to position r*m where m is the number of columns: >>> M = zeros(4) >>> m = M.cols >>> M[3*m] = ones(1, m)*2; M Matrix([ [0, 0, 0, 0], [0, 0, 0, 0], [0, 0, 0, 0], [2, 2, 2, 2]]) And to replace column c you can assign to position c: >>> M[2] = ones(m, 1)*4; M Matrix([ [0, 0, 4, 0], [0, 0, 4, 0], [0, 0, 4, 0], [2, 2, 4, 2]]) """ from .dense import Matrix is_slice = isinstance(key, slice) i, j = key = self.key2ij(key) is_mat = isinstance(value, MatrixBase) if type(i) is slice or type(j) is slice: if is_mat: self.copyin_matrix(key, value) return if not isinstance(value, Expr) and is_sequence(value): self.copyin_list(key, value) return raise ValueError('unexpected value: %s' % value) else: if (not is_mat and not isinstance(value, Basic) and is_sequence(value)): value = Matrix(value) is_mat = True if is_mat: if is_slice: key = (slice(*divmod(i, self.cols)), slice(*divmod(j, self.cols))) else: key = (slice(i, i + value.rows), slice(j, j + value.cols)) self.copyin_matrix(key, value) else: return i, j, self._sympify(value) return def add(self, b): """Return self + b """ return self + b def cholesky_solve(self, rhs): """Solves ``Ax = B`` using Cholesky decomposition, for a general square non-singular matrix. For a non-square matrix with rows > cols, the least squares solution is returned. See Also ======== lower_triangular_solve upper_triangular_solve gauss_jordan_solve diagonal_solve LDLsolve LUsolve QRsolve pinv_solve """ hermitian = True if self.is_symmetric(): hermitian = False L = self._cholesky(hermitian=hermitian) elif self.is_hermitian: L = self._cholesky(hermitian=hermitian) elif self.rows >= self.cols: L = (self.H * self)._cholesky(hermitian=hermitian) rhs = self.H * rhs else: raise NotImplementedError('Under-determined System. ' 'Try M.gauss_jordan_solve(rhs)') Y = L._lower_triangular_solve(rhs) if hermitian: return (L.H)._upper_triangular_solve(Y) else: return (L.T)._upper_triangular_solve(Y) def cholesky(self, hermitian=True): """Returns the Cholesky-type decomposition L of a matrix A such that L * L.H == A if hermitian flag is True, or L * L.T == A if hermitian is False. A must be a Hermitian positive-definite matrix if hermitian is True, or a symmetric matrix if it is False. Examples ======== >>> from sympy.matrices import Matrix >>> A = Matrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) >>> A.cholesky() Matrix([ [ 5, 0, 0], [ 3, 3, 0], [-1, 1, 3]]) >>> A.cholesky() * A.cholesky().T Matrix([ [25, 15, -5], [15, 18, 0], [-5, 0, 11]]) The matrix can have complex entries: >>> from sympy import I >>> A = Matrix(((9, 3*I), (-3*I, 5))) >>> A.cholesky() Matrix([ [ 3, 0], [-I, 2]]) >>> A.cholesky() * A.cholesky().H Matrix([ [ 9, 3*I], [-3*I, 5]]) Non-hermitian Cholesky-type decomposition may be useful when the matrix is not positive-definite. >>> A = Matrix([[1, 2], [2, 1]]) >>> L = A.cholesky(hermitian=False) >>> L Matrix([ [1, 0], [2, sqrt(3)*I]]) >>> L*L.T == A True See Also ======== LDLdecomposition LUdecomposition QRdecomposition """ if not self.is_square: raise NonSquareMatrixError("Matrix must be square.") if hermitian and not self.is_hermitian: raise ValueError("Matrix must be Hermitian.") if not hermitian and not self.is_symmetric(): raise ValueError("Matrix must be symmetric.") return self._cholesky(hermitian=hermitian) def condition_number(self): """Returns the condition number of a matrix. This is the maximum singular value divided by the minimum singular value Examples ======== >>> from sympy import Matrix, S >>> A = Matrix([[1, 0, 0], [0, 10, 0], [0, 0, S.One/10]]) >>> A.condition_number() 100 See Also ======== singular_values """ if not self: return self.zero singularvalues = self.singular_values() return Max(*singularvalues) / Min(*singularvalues) def copy(self): """ Returns the copy of a matrix. Examples ======== >>> from sympy import Matrix >>> A = Matrix(2, 2, [1, 2, 3, 4]) >>> A.copy() Matrix([ [1, 2], [3, 4]]) """ return self._new(self.rows, self.cols, self._mat) def cross(self, b): r""" Return the cross product of ``self`` and ``b`` relaxing the condition of compatible dimensions: if each has 3 elements, a matrix of the same type and shape as ``self`` will be returned. If ``b`` has the same shape as ``self`` then common identities for the cross product (like `a \times b = - b \times a`) will hold. Parameters ========== b : 3x1 or 1x3 Matrix See Also ======== dot multiply multiply_elementwise """ if not is_sequence(b): raise TypeError( "`b` must be an ordered iterable or Matrix, not %s." % type(b)) if not (self.rows * self.cols == b.rows * b.cols == 3): raise ShapeError("Dimensions incorrect for cross product: %s x %s" % ((self.rows, self.cols), (b.rows, b.cols))) else: return self._new(self.rows, self.cols, ( (self[1] * b[2] - self[2] * b[1]), (self[2] * b[0] - self[0] * b[2]), (self[0] * b[1] - self[1] * b[0]))) @property def D(self): """Return Dirac conjugate (if ``self.rows == 4``). Examples ======== >>> from sympy import Matrix, I, eye >>> m = Matrix((0, 1 + I, 2, 3)) >>> m.D Matrix([[0, 1 - I, -2, -3]]) >>> m = (eye(4) + I*eye(4)) >>> m[0, 3] = 2 >>> m.D Matrix([ [1 - I, 0, 0, 0], [ 0, 1 - I, 0, 0], [ 0, 0, -1 + I, 0], [ 2, 0, 0, -1 + I]]) If the matrix does not have 4 rows an AttributeError will be raised because this property is only defined for matrices with 4 rows. >>> Matrix(eye(2)).D Traceback (most recent call last): ... AttributeError: Matrix has no attribute D. See Also ======== conjugate: By-element conjugation H: Hermite conjugation """ from sympy.physics.matrices import mgamma if self.rows != 4: # In Python 3.2, properties can only return an AttributeError # so we can't raise a ShapeError -- see commit which added the # first line of this inline comment. Also, there is no need # for a message since MatrixBase will raise the AttributeError raise AttributeError return self.H * mgamma(0) def diagonal_solve(self, rhs): """Solves ``Ax = B`` efficiently, where A is a diagonal Matrix, with non-zero diagonal entries. Examples ======== >>> from sympy.matrices import Matrix, eye >>> A = eye(2)*2 >>> B = Matrix([[1, 2], [3, 4]]) >>> A.diagonal_solve(B) == B/2 True See Also ======== lower_triangular_solve upper_triangular_solve gauss_jordan_solve cholesky_solve LDLsolve LUsolve QRsolve pinv_solve """ if not self.is_diagonal(): raise TypeError("Matrix should be diagonal") if rhs.rows != self.rows: raise TypeError("Size mis-match") return self._diagonal_solve(rhs) def dot(self, b, hermitian=None, conjugate_convention=None): """Return the dot or inner product of two vectors of equal length. Here ``self`` must be a ``Matrix`` of size 1 x n or n x 1, and ``b`` must be either a matrix of size 1 x n, n x 1, or a list/tuple of length n. A scalar is returned. By default, ``dot`` does not conjugate ``self`` or ``b``, even if there are complex entries. Set ``hermitian=True`` (and optionally a ``conjugate_convention``) to compute the hermitian inner product. Possible kwargs are ``hermitian`` and ``conjugate_convention``. If ``conjugate_convention`` is ``"left"``, ``"math"`` or ``"maths"``, the conjugate of the first vector (``self``) is used. If ``"right"`` or ``"physics"`` is specified, the conjugate of the second vector ``b`` is used. Examples ======== >>> from sympy import Matrix >>> M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) >>> v = Matrix([1, 1, 1]) >>> M.row(0).dot(v) 6 >>> M.col(0).dot(v) 12 >>> v = [3, 2, 1] >>> M.row(0).dot(v) 10 >>> from sympy import I >>> q = Matrix([1*I, 1*I, 1*I]) >>> q.dot(q, hermitian=False) -3 >>> q.dot(q, hermitian=True) 3 >>> q1 = Matrix([1, 1, 1*I]) >>> q.dot(q1, hermitian=True, conjugate_convention="maths") 1 - 2*I >>> q.dot(q1, hermitian=True, conjugate_convention="physics") 1 + 2*I See Also ======== cross multiply multiply_elementwise """ from .dense import Matrix if not isinstance(b, MatrixBase): if is_sequence(b): if len(b) != self.cols and len(b) != self.rows: raise ShapeError( "Dimensions incorrect for dot product: %s, %s" % ( self.shape, len(b))) return self.dot(Matrix(b)) else: raise TypeError( "`b` must be an ordered iterable or Matrix, not %s." % type(b)) mat = self if (1 not in mat.shape) or (1 not in b.shape) : SymPyDeprecationWarning( feature="Dot product of non row/column vectors", issue=13815, deprecated_since_version="1.2", useinstead="* to take matrix products").warn() return mat._legacy_array_dot(b) if len(mat) != len(b): raise ShapeError("Dimensions incorrect for dot product: %s, %s" % (self.shape, b.shape)) n = len(mat) if mat.shape != (1, n): mat = mat.reshape(1, n) if b.shape != (n, 1): b = b.reshape(n, 1) # Now ``mat`` is a row vector and ``b`` is a column vector. # If it so happens that only conjugate_convention is passed # then automatically set hermitian to True. If only hermitian # is true but no conjugate_convention is not passed then # automatically set it to ``"maths"`` if conjugate_convention is not None and hermitian is None: hermitian = True if hermitian and conjugate_convention is None: conjugate_convention = "maths" if hermitian == True: if conjugate_convention in ("maths", "left", "math"): mat = mat.conjugate() elif conjugate_convention in ("physics", "right"): b = b.conjugate() else: raise ValueError("Unknown conjugate_convention was entered." " conjugate_convention must be one of the" " following: math, maths, left, physics or right.") return (mat * b)[0] def dual(self): """Returns the dual of a matrix, which is: ``(1/2)*levicivita(i, j, k, l)*M(k, l)`` summed over indices `k` and `l` Since the levicivita method is anti_symmetric for any pairwise exchange of indices, the dual of a symmetric matrix is the zero matrix. Strictly speaking the dual defined here assumes that the 'matrix' `M` is a contravariant anti_symmetric second rank tensor, so that the dual is a covariant second rank tensor. """ from sympy import LeviCivita from sympy.matrices import zeros M, n = self[:, :], self.rows work = zeros(n) if self.is_symmetric(): return work for i in range(1, n): for j in range(1, n): acum = 0 for k in range(1, n): acum += LeviCivita(i, j, 0, k) * M[0, k] work[i, j] = acum work[j, i] = -acum for l in range(1, n): acum = 0 for a in range(1, n): for b in range(1, n): acum += LeviCivita(0, l, a, b) * M[a, b] acum /= 2 work[0, l] = -acum work[l, 0] = acum return work def _eval_matrix_exp_jblock(self): """A helper function to compute an exponential of a Jordan block matrix Examples ======== >>> from sympy import Symbol, Matrix >>> l = Symbol('lamda') A trivial example of 1*1 Jordan block: >>> m = Matrix.jordan_block(1, l) >>> m._eval_matrix_exp_jblock() Matrix([[exp(lamda)]]) An example of 3*3 Jordan block: >>> m = Matrix.jordan_block(3, l) >>> m._eval_matrix_exp_jblock() Matrix([ [exp(lamda), exp(lamda), exp(lamda)/2], [ 0, exp(lamda), exp(lamda)], [ 0, 0, exp(lamda)]]) References ========== .. [1] https://en.wikipedia.org/wiki/Matrix_function#Jordan_decomposition """ size = self.rows l = self[0, 0] exp_l = exp(l) bands = {i: exp_l / factorial(i) for i in range(size)} from .sparsetools import banded return self.__class__(banded(size, bands)) def exp(self): """Return the exponentiation of a square matrix.""" if not self.is_square: raise NonSquareMatrixError( "Exponentiation is valid only for square matrices") try: P, J = self.jordan_form() cells = J.get_diag_blocks() except MatrixError: raise NotImplementedError( "Exponentiation is implemented only for matrices for which the Jordan normal form can be computed") blocks = [cell._eval_matrix_exp_jblock() for cell in cells] from sympy.matrices import diag from sympy import re eJ = diag(*blocks) # n = self.rows ret = P * eJ * P.inv() if all(value.is_real for value in self.values()): return type(self)(re(ret)) else: return type(self)(ret) def gauss_jordan_solve(self, B, freevar=False): """ Solves ``Ax = B`` using Gauss Jordan elimination. There may be zero, one, or infinite solutions. If one solution exists, it will be returned. If infinite solutions exist, it will be returned parametrically. If no solutions exist, It will throw ValueError. Parameters ========== B : Matrix The right hand side of the equation to be solved for. Must have the same number of rows as matrix A. freevar : List If the system is underdetermined (e.g. A has more columns than rows), infinite solutions are possible, in terms of arbitrary values of free variables. Then the index of the free variables in the solutions (column Matrix) will be returned by freevar, if the flag `freevar` is set to `True`. Returns ======= x : Matrix The matrix that will satisfy ``Ax = B``. Will have as many rows as matrix A has columns, and as many columns as matrix B. params : Matrix If the system is underdetermined (e.g. A has more columns than rows), infinite solutions are possible, in terms of arbitrary parameters. These arbitrary parameters are returned as params Matrix. Examples ======== >>> from sympy import Matrix >>> A = Matrix([[1, 2, 1, 1], [1, 2, 2, -1], [2, 4, 0, 6]]) >>> B = Matrix([7, 12, 4]) >>> sol, params = A.gauss_jordan_solve(B) >>> sol Matrix([ [-2*tau0 - 3*tau1 + 2], [ tau0], [ 2*tau1 + 5], [ tau1]]) >>> params Matrix([ [tau0], [tau1]]) >>> taus_zeroes = { tau:0 for tau in params } >>> sol_unique = sol.xreplace(taus_zeroes) >>> sol_unique Matrix([ [2], [0], [5], [0]]) >>> A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 10]]) >>> B = Matrix([3, 6, 9]) >>> sol, params = A.gauss_jordan_solve(B) >>> sol Matrix([ [-1], [ 2], [ 0]]) >>> params Matrix(0, 1, []) >>> A = Matrix([[2, -7], [-1, 4]]) >>> B = Matrix([[-21, 3], [12, -2]]) >>> sol, params = A.gauss_jordan_solve(B) >>> sol Matrix([ [0, -2], [3, -1]]) >>> params Matrix(0, 2, []) See Also ======== lower_triangular_solve upper_triangular_solve cholesky_solve diagonal_solve LDLsolve LUsolve QRsolve pinv References ========== .. [1] https://en.wikipedia.org/wiki/Gaussian_elimination """ from sympy.matrices import Matrix, zeros aug = self.hstack(self.copy(), B.copy()) B_cols = B.cols row, col = aug[:, :-B_cols].shape # solve by reduced row echelon form A, pivots = aug.rref(simplify=True) A, v = A[:, :-B_cols], A[:, -B_cols:] pivots = list(filter(lambda p: p < col, pivots)) rank = len(pivots) # Bring to block form permutation = Matrix(range(col)).T for i, c in enumerate(pivots): permutation.col_swap(i, c) # check for existence of solutions # rank of aug Matrix should be equal to rank of coefficient matrix if not v[rank:, :].is_zero: raise ValueError("Linear system has no solution") # Get index of free symbols (free parameters) free_var_index = permutation[ len(pivots):] # non-pivots columns are free variables # Free parameters # what are current unnumbered free symbol names? name = _uniquely_named_symbol('tau', aug, compare=lambda i: str(i).rstrip('1234567890')).name gen = numbered_symbols(name) tau = Matrix([next(gen) for k in range((col - rank)*B_cols)]).reshape( col - rank, B_cols) # Full parametric solution V = A[:rank,:] for c in reversed(pivots): V.col_del(c) vt = v[:rank, :] free_sol = tau.vstack(vt - V * tau, tau) # Undo permutation sol = zeros(col, B_cols) for k in range(col): sol[permutation[k], :] = free_sol[k,:] if freevar: return sol, tau, free_var_index else: return sol, tau def inv_mod(self, m): r""" Returns the inverse of the matrix `K` (mod `m`), if it exists. Method to find the matrix inverse of `K` (mod `m`) implemented in this function: * Compute `\mathrm{adj}(K) = \mathrm{cof}(K)^t`, the adjoint matrix of `K`. * Compute `r = 1/\mathrm{det}(K) \pmod m`. * `K^{-1} = r\cdot \mathrm{adj}(K) \pmod m`. Examples ======== >>> from sympy import Matrix >>> A = Matrix(2, 2, [1, 2, 3, 4]) >>> A.inv_mod(5) Matrix([ [3, 1], [4, 2]]) >>> A.inv_mod(3) Matrix([ [1, 1], [0, 1]]) """ if not self.is_square: raise NonSquareMatrixError() N = self.cols det_K = self.det() det_inv = None try: det_inv = mod_inverse(det_K, m) except ValueError: raise NonInvertibleMatrixError('Matrix is not invertible (mod %d)' % m) K_adj = self.adjugate() K_inv = self.__class__(N, N, [det_inv * K_adj[i, j] % m for i in range(N) for j in range(N)]) return K_inv def inverse_ADJ(self, iszerofunc=_iszero): """Calculates the inverse using the adjugate matrix and a determinant. See Also ======== inv inverse_LU inverse_GE """ if not self.is_square: raise NonSquareMatrixError("A Matrix must be square to invert.") d = self.det(method='berkowitz') zero = d.equals(0) if zero is None: # if equals() can't decide, will rref be able to? ok = self.rref(simplify=True)[0] zero = any(iszerofunc(ok[j, j]) for j in range(ok.rows)) if zero: raise NonInvertibleMatrixError("Matrix det == 0; not invertible.") return self.adjugate() / d def inverse_GE(self, iszerofunc=_iszero): """Calculates the inverse using Gaussian elimination. See Also ======== inv inverse_LU inverse_ADJ """ from .dense import Matrix if not self.is_square: raise NonSquareMatrixError("A Matrix must be square to invert.") big = Matrix.hstack(self.as_mutable(), Matrix.eye(self.rows)) red = big.rref(iszerofunc=iszerofunc, simplify=True)[0] if any(iszerofunc(red[j, j]) for j in range(red.rows)): raise NonInvertibleMatrixError("Matrix det == 0; not invertible.") return self._new(red[:, big.rows:]) def inverse_LU(self, iszerofunc=_iszero): """Calculates the inverse using LU decomposition. See Also ======== inv inverse_GE inverse_ADJ """ if not self.is_square: raise NonSquareMatrixError() ok = self.rref(simplify=True)[0] if any(iszerofunc(ok[j, j]) for j in range(ok.rows)): raise NonInvertibleMatrixError("Matrix det == 0; not invertible.") return self.LUsolve(self.eye(self.rows), iszerofunc=_iszero) def inv(self, method=None, **kwargs): """ Return the inverse of a matrix. CASE 1: If the matrix is a dense matrix. Return the matrix inverse using the method indicated (default is Gauss elimination). Parameters ========== method : ('GE', 'LU', or 'ADJ') Notes ===== According to the ``method`` keyword, it calls the appropriate method: GE .... inverse_GE(); default LU .... inverse_LU() ADJ ... inverse_ADJ() See Also ======== inverse_LU inverse_GE inverse_ADJ Raises ------ ValueError If the determinant of the matrix is zero. CASE 2: If the matrix is a sparse matrix. Return the matrix inverse using Cholesky or LDL (default). kwargs ====== method : ('CH', 'LDL') Notes ===== According to the ``method`` keyword, it calls the appropriate method: LDL ... inverse_LDL(); default CH .... inverse_CH() Raises ------ ValueError If the determinant of the matrix is zero. """ if not self.is_square: raise NonSquareMatrixError() if method is not None: kwargs['method'] = method return self._eval_inverse(**kwargs) def is_nilpotent(self): """Checks if a matrix is nilpotent. A matrix B is nilpotent if for some integer k, B**k is a zero matrix. Examples ======== >>> from sympy import Matrix >>> a = Matrix([[0, 0, 0], [1, 0, 0], [1, 1, 0]]) >>> a.is_nilpotent() True >>> a = Matrix([[1, 0, 1], [1, 0, 0], [1, 1, 0]]) >>> a.is_nilpotent() False """ if not self: return True if not self.is_square: raise NonSquareMatrixError( "Nilpotency is valid only for square matrices") x = _uniquely_named_symbol('x', self) p = self.charpoly(x) if p.args[0] == x ** self.rows: return True return False def key2bounds(self, keys): """Converts a key with potentially mixed types of keys (integer and slice) into a tuple of ranges and raises an error if any index is out of ``self``'s range. See Also ======== key2ij """ from sympy.matrices.common import a2idx as a2idx_ # Remove this line after deprecation of a2idx from matrices.py islice, jslice = [isinstance(k, slice) for k in keys] if islice: if not self.rows: rlo = rhi = 0 else: rlo, rhi = keys[0].indices(self.rows)[:2] else: rlo = a2idx_(keys[0], self.rows) rhi = rlo + 1 if jslice: if not self.cols: clo = chi = 0 else: clo, chi = keys[1].indices(self.cols)[:2] else: clo = a2idx_(keys[1], self.cols) chi = clo + 1 return rlo, rhi, clo, chi def key2ij(self, key): """Converts key into canonical form, converting integers or indexable items into valid integers for ``self``'s range or returning slices unchanged. See Also ======== key2bounds """ from sympy.matrices.common import a2idx as a2idx_ # Remove this line after deprecation of a2idx from matrices.py if is_sequence(key): if not len(key) == 2: raise TypeError('key must be a sequence of length 2') return [a2idx_(i, n) if not isinstance(i, slice) else i for i, n in zip(key, self.shape)] elif isinstance(key, slice): return key.indices(len(self))[:2] else: return divmod(a2idx_(key, len(self)), self.cols) def LDLdecomposition(self, hermitian=True): """Returns the LDL Decomposition (L, D) of matrix A, such that L * D * L.H == A if hermitian flag is True, or L * D * L.T == A if hermitian is False. This method eliminates the use of square root. Further this ensures that all the diagonal entries of L are 1. A must be a Hermitian positive-definite matrix if hermitian is True, or a symmetric matrix otherwise. Examples ======== >>> from sympy.matrices import Matrix, eye >>> A = Matrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) >>> L, D = A.LDLdecomposition() >>> L Matrix([ [ 1, 0, 0], [ 3/5, 1, 0], [-1/5, 1/3, 1]]) >>> D Matrix([ [25, 0, 0], [ 0, 9, 0], [ 0, 0, 9]]) >>> L * D * L.T * A.inv() == eye(A.rows) True The matrix can have complex entries: >>> from sympy import I >>> A = Matrix(((9, 3*I), (-3*I, 5))) >>> L, D = A.LDLdecomposition() >>> L Matrix([ [ 1, 0], [-I/3, 1]]) >>> D Matrix([ [9, 0], [0, 4]]) >>> L*D*L.H == A True See Also ======== cholesky LUdecomposition QRdecomposition """ if not self.is_square: raise NonSquareMatrixError("Matrix must be square.") if hermitian and not self.is_hermitian: raise ValueError("Matrix must be Hermitian.") if not hermitian and not self.is_symmetric(): raise ValueError("Matrix must be symmetric.") return self._LDLdecomposition(hermitian=hermitian) def LDLsolve(self, rhs): """Solves ``Ax = B`` using LDL decomposition, for a general square and non-singular matrix. For a non-square matrix with rows > cols, the least squares solution is returned. Examples ======== >>> from sympy.matrices import Matrix, eye >>> A = eye(2)*2 >>> B = Matrix([[1, 2], [3, 4]]) >>> A.LDLsolve(B) == B/2 True See Also ======== LDLdecomposition lower_triangular_solve upper_triangular_solve gauss_jordan_solve cholesky_solve diagonal_solve LUsolve QRsolve pinv_solve """ hermitian = True if self.is_symmetric(): hermitian = False L, D = self.LDLdecomposition(hermitian=hermitian) elif self.is_hermitian: L, D = self.LDLdecomposition(hermitian=hermitian) elif self.rows >= self.cols: L, D = (self.H * self).LDLdecomposition(hermitian=hermitian) rhs = self.H * rhs else: raise NotImplementedError('Under-determined System. ' 'Try M.gauss_jordan_solve(rhs)') Y = L._lower_triangular_solve(rhs) Z = D._diagonal_solve(Y) if hermitian: return (L.H)._upper_triangular_solve(Z) else: return (L.T)._upper_triangular_solve(Z) def lower_triangular_solve(self, rhs): """Solves ``Ax = B``, where A is a lower triangular matrix. See Also ======== upper_triangular_solve gauss_jordan_solve cholesky_solve diagonal_solve LDLsolve LUsolve QRsolve pinv_solve """ if not self.is_square: raise NonSquareMatrixError("Matrix must be square.") if rhs.rows != self.rows: raise ShapeError("Matrices size mismatch.") if not self.is_lower: raise ValueError("Matrix must be lower triangular.") return self._lower_triangular_solve(rhs) def LUdecomposition(self, iszerofunc=_iszero, simpfunc=None, rankcheck=False): """Returns (L, U, perm) where L is a lower triangular matrix with unit diagonal, U is an upper triangular matrix, and perm is a list of row swap index pairs. If A is the original matrix, then A = (L*U).permuteBkwd(perm), and the row permutation matrix P such that P*A = L*U can be computed by P=eye(A.row).permuteFwd(perm). See documentation for LUCombined for details about the keyword argument rankcheck, iszerofunc, and simpfunc. Examples ======== >>> from sympy import Matrix >>> a = Matrix([[4, 3], [6, 3]]) >>> L, U, _ = a.LUdecomposition() >>> L Matrix([ [ 1, 0], [3/2, 1]]) >>> U Matrix([ [4, 3], [0, -3/2]]) See Also ======== cholesky LDLdecomposition QRdecomposition LUdecomposition_Simple LUdecompositionFF LUsolve """ combined, p = self.LUdecomposition_Simple(iszerofunc=iszerofunc, simpfunc=simpfunc, rankcheck=rankcheck) # L is lower triangular ``self.rows x self.rows`` # U is upper triangular ``self.rows x self.cols`` # L has unit diagonal. For each column in combined, the subcolumn # below the diagonal of combined is shared by L. # If L has more columns than combined, then the remaining subcolumns # below the diagonal of L are zero. # The upper triangular portion of L and combined are equal. def entry_L(i, j): if i < j: # Super diagonal entry return self.zero elif i == j: return self.one elif j < combined.cols: return combined[i, j] # Subdiagonal entry of L with no corresponding # entry in combined return self.zero def entry_U(i, j): return self.zero if i > j else combined[i, j] L = self._new(combined.rows, combined.rows, entry_L) U = self._new(combined.rows, combined.cols, entry_U) return L, U, p def LUdecomposition_Simple(self, iszerofunc=_iszero, simpfunc=None, rankcheck=False): """Compute an lu decomposition of m x n matrix A, where P*A = L*U * L is m x m lower triangular with unit diagonal * U is m x n upper triangular * P is an m x m permutation matrix Returns an m x n matrix lu, and an m element list perm where each element of perm is a pair of row exchange indices. The factors L and U are stored in lu as follows: The subdiagonal elements of L are stored in the subdiagonal elements of lu, that is lu[i, j] = L[i, j] whenever i > j. The elements on the diagonal of L are all 1, and are not explicitly stored. U is stored in the upper triangular portion of lu, that is lu[i ,j] = U[i, j] whenever i <= j. The output matrix can be visualized as: Matrix([ [u, u, u, u], [l, u, u, u], [l, l, u, u], [l, l, l, u]]) where l represents a subdiagonal entry of the L factor, and u represents an entry from the upper triangular entry of the U factor. perm is a list row swap index pairs such that if A is the original matrix, then A = (L*U).permuteBkwd(perm), and the row permutation matrix P such that ``P*A = L*U`` can be computed by ``P=eye(A.row).permuteFwd(perm)``. The keyword argument rankcheck determines if this function raises a ValueError when passed a matrix whose rank is strictly less than min(num rows, num cols). The default behavior is to decompose a rank deficient matrix. Pass rankcheck=True to raise a ValueError instead. (This mimics the previous behavior of this function). The keyword arguments iszerofunc and simpfunc are used by the pivot search algorithm. iszerofunc is a callable that returns a boolean indicating if its input is zero, or None if it cannot make the determination. simpfunc is a callable that simplifies its input. The default is simpfunc=None, which indicate that the pivot search algorithm should not attempt to simplify any candidate pivots. If simpfunc fails to simplify its input, then it must return its input instead of a copy. When a matrix contains symbolic entries, the pivot search algorithm differs from the case where every entry can be categorized as zero or nonzero. The algorithm searches column by column through the submatrix whose top left entry coincides with the pivot position. If it exists, the pivot is the first entry in the current search column that iszerofunc guarantees is nonzero. If no such candidate exists, then each candidate pivot is simplified if simpfunc is not None. The search is repeated, with the difference that a candidate may be the pivot if ``iszerofunc()`` cannot guarantee that it is nonzero. In the second search the pivot is the first candidate that iszerofunc can guarantee is nonzero. If no such candidate exists, then the pivot is the first candidate for which iszerofunc returns None. If no such candidate exists, then the search is repeated in the next column to the right. The pivot search algorithm differs from the one in ``rref()``, which relies on ``_find_reasonable_pivot()``. Future versions of ``LUdecomposition_simple()`` may use ``_find_reasonable_pivot()``. See Also ======== LUdecomposition LUdecompositionFF LUsolve """ if rankcheck: # https://github.com/sympy/sympy/issues/9796 pass if self.rows == 0 or self.cols == 0: # Define LU decomposition of a matrix with no entries as a matrix # of the same dimensions with all zero entries. return self.zeros(self.rows, self.cols), [] lu = self.as_mutable() row_swaps = [] pivot_col = 0 for pivot_row in range(0, lu.rows - 1): # Search for pivot. Prefer entry that iszeropivot determines # is nonzero, over entry that iszeropivot cannot guarantee # is zero. # XXX ``_find_reasonable_pivot`` uses slow zero testing. Blocked by bug #10279 # Future versions of LUdecomposition_simple can pass iszerofunc and simpfunc # to _find_reasonable_pivot(). # In pass 3 of _find_reasonable_pivot(), the predicate in ``if x.equals(S.Zero):`` # calls sympy.simplify(), and not the simplification function passed in via # the keyword argument simpfunc. iszeropivot = True while pivot_col != self.cols and iszeropivot: sub_col = (lu[r, pivot_col] for r in range(pivot_row, self.rows)) pivot_row_offset, pivot_value, is_assumed_non_zero, ind_simplified_pairs =\ _find_reasonable_pivot_naive(sub_col, iszerofunc, simpfunc) iszeropivot = pivot_value is None if iszeropivot: # All candidate pivots in this column are zero. # Proceed to next column. pivot_col += 1 if rankcheck and pivot_col != pivot_row: # All entries including and below the pivot position are # zero, which indicates that the rank of the matrix is # strictly less than min(num rows, num cols) # Mimic behavior of previous implementation, by throwing a # ValueError. raise ValueError("Rank of matrix is strictly less than" " number of rows or columns." " Pass keyword argument" " rankcheck=False to compute" " the LU decomposition of this matrix.") candidate_pivot_row = None if pivot_row_offset is None else pivot_row + pivot_row_offset if candidate_pivot_row is None and iszeropivot: # If candidate_pivot_row is None and iszeropivot is True # after pivot search has completed, then the submatrix # below and to the right of (pivot_row, pivot_col) is # all zeros, indicating that Gaussian elimination is # complete. return lu, row_swaps # Update entries simplified during pivot search. for offset, val in ind_simplified_pairs: lu[pivot_row + offset, pivot_col] = val if pivot_row != candidate_pivot_row: # Row swap book keeping: # Record which rows were swapped. # Update stored portion of L factor by multiplying L on the # left and right with the current permutation. # Swap rows of U. row_swaps.append([pivot_row, candidate_pivot_row]) # Update L. lu[pivot_row, 0:pivot_row], lu[candidate_pivot_row, 0:pivot_row] = \ lu[candidate_pivot_row, 0:pivot_row], lu[pivot_row, 0:pivot_row] # Swap pivot row of U with candidate pivot row. lu[pivot_row, pivot_col:lu.cols], lu[candidate_pivot_row, pivot_col:lu.cols] = \ lu[candidate_pivot_row, pivot_col:lu.cols], lu[pivot_row, pivot_col:lu.cols] # Introduce zeros below the pivot by adding a multiple of the # pivot row to a row under it, and store the result in the # row under it. # Only entries in the target row whose index is greater than # start_col may be nonzero. start_col = pivot_col + 1 for row in range(pivot_row + 1, lu.rows): # Store factors of L in the subcolumn below # (pivot_row, pivot_row). lu[row, pivot_row] =\ lu[row, pivot_col]/lu[pivot_row, pivot_col] # Form the linear combination of the pivot row and the current # row below the pivot row that zeros the entries below the pivot. # Employing slicing instead of a loop here raises # NotImplementedError: Cannot add Zero to MutableSparseMatrix # in sympy/matrices/tests/test_sparse.py. # c = pivot_row + 1 if pivot_row == pivot_col else pivot_col for c in range(start_col, lu.cols): lu[row, c] = lu[row, c] - lu[row, pivot_row]*lu[pivot_row, c] if pivot_row != pivot_col: # matrix rank < min(num rows, num cols), # so factors of L are not stored directly below the pivot. # These entries are zero by construction, so don't bother # computing them. for row in range(pivot_row + 1, lu.rows): lu[row, pivot_col] = self.zero pivot_col += 1 if pivot_col == lu.cols: # All candidate pivots are zero implies that Gaussian # elimination is complete. return lu, row_swaps if rankcheck: if iszerofunc( lu[Min(lu.rows, lu.cols) - 1, Min(lu.rows, lu.cols) - 1]): raise ValueError("Rank of matrix is strictly less than" " number of rows or columns." " Pass keyword argument" " rankcheck=False to compute" " the LU decomposition of this matrix.") return lu, row_swaps def LUdecompositionFF(self): """Compute a fraction-free LU decomposition. Returns 4 matrices P, L, D, U such that PA = L D**-1 U. If the elements of the matrix belong to some integral domain I, then all elements of L, D and U are guaranteed to belong to I. **Reference** - W. Zhou & D.J. Jeffrey, "Fraction-free matrix factors: new forms for LU and QR factors". Frontiers in Computer Science in China, Vol 2, no. 1, pp. 67-80, 2008. See Also ======== LUdecomposition LUdecomposition_Simple LUsolve """ from sympy.matrices import SparseMatrix zeros = SparseMatrix.zeros eye = SparseMatrix.eye n, m = self.rows, self.cols U, L, P = self.as_mutable(), eye(n), eye(n) DD = zeros(n, n) oldpivot = 1 for k in range(n - 1): if U[k, k] == 0: for kpivot in range(k + 1, n): if U[kpivot, k]: break else: raise ValueError("Matrix is not full rank") U[k, k:], U[kpivot, k:] = U[kpivot, k:], U[k, k:] L[k, :k], L[kpivot, :k] = L[kpivot, :k], L[k, :k] P[k, :], P[kpivot, :] = P[kpivot, :], P[k, :] L[k, k] = Ukk = U[k, k] DD[k, k] = oldpivot * Ukk for i in range(k + 1, n): L[i, k] = Uik = U[i, k] for j in range(k + 1, m): U[i, j] = (Ukk * U[i, j] - U[k, j] * Uik) / oldpivot U[i, k] = 0 oldpivot = Ukk DD[n - 1, n - 1] = oldpivot return P, L, DD, U def LUsolve(self, rhs, iszerofunc=_iszero): """Solve the linear system ``Ax = rhs`` for ``x`` where ``A = self``. This is for symbolic matrices, for real or complex ones use mpmath.lu_solve or mpmath.qr_solve. See Also ======== lower_triangular_solve upper_triangular_solve gauss_jordan_solve cholesky_solve diagonal_solve LDLsolve QRsolve pinv_solve LUdecomposition """ if rhs.rows != self.rows: raise ShapeError( "``self`` and ``rhs`` must have the same number of rows.") m = self.rows n = self.cols if m < n: raise NotImplementedError("Underdetermined systems not supported.") try: A, perm = self.LUdecomposition_Simple( iszerofunc=_iszero, rankcheck=True) except ValueError: raise NotImplementedError("Underdetermined systems not supported.") b = rhs.permute_rows(perm).as_mutable() # forward substitution, all diag entries are scaled to 1 for i in range(m): for j in range(min(i, n)): scale = A[i, j] b.zip_row_op(i, j, lambda x, y: x - y * scale) # consistency check for overdetermined systems if m > n: for i in range(n, m): for j in range(b.cols): if not iszerofunc(b[i, j]): raise ValueError("The system is inconsistent.") b = b[0:n, :] # truncate zero rows if consistent # backward substitution for i in range(n - 1, -1, -1): for j in range(i + 1, n): scale = A[i, j] b.zip_row_op(i, j, lambda x, y: x - y * scale) scale = A[i, i] b.row_op(i, lambda x, _: x / scale) return rhs.__class__(b) def multiply(self, b): """Returns ``self*b`` See Also ======== dot cross multiply_elementwise """ return self * b def normalized(self, iszerofunc=_iszero): """Return the normalized version of ``self``. Parameters ========== iszerofunc : Function, optional A function to determine whether ``self`` is a zero vector. The default ``_iszero`` tests to see if each element is exactly zero. Returns ======= Matrix Normalized vector form of ``self``. It has the same length as a unit vector. However, a zero vector will be returned for a vector with norm 0. Raises ====== ShapeError If the matrix is not in a vector form. See Also ======== norm """ if self.rows != 1 and self.cols != 1: raise ShapeError("A Matrix must be a vector to normalize.") norm = self.norm() if iszerofunc(norm): out = self.zeros(self.rows, self.cols) else: out = self.applyfunc(lambda i: i / norm) return out def norm(self, ord=None): """Return the Norm of a Matrix or Vector. In the simplest case this is the geometric size of the vector Other norms can be specified by the ord parameter ===== ============================ ========================== ord norm for matrices norm for vectors ===== ============================ ========================== None Frobenius norm 2-norm 'fro' Frobenius norm - does not exist inf maximum row sum max(abs(x)) -inf -- min(abs(x)) 1 maximum column sum as below -1 -- as below 2 2-norm (largest sing. value) as below -2 smallest singular value as below other - does not exist sum(abs(x)**ord)**(1./ord) ===== ============================ ========================== Examples ======== >>> from sympy import Matrix, Symbol, trigsimp, cos, sin, oo >>> x = Symbol('x', real=True) >>> v = Matrix([cos(x), sin(x)]) >>> trigsimp( v.norm() ) 1 >>> v.norm(10) (sin(x)**10 + cos(x)**10)**(1/10) >>> A = Matrix([[1, 1], [1, 1]]) >>> A.norm(1) # maximum sum of absolute values of A is 2 2 >>> A.norm(2) # Spectral norm (max of |Ax|/|x| under 2-vector-norm) 2 >>> A.norm(-2) # Inverse spectral norm (smallest singular value) 0 >>> A.norm() # Frobenius Norm 2 >>> A.norm(oo) # Infinity Norm 2 >>> Matrix([1, -2]).norm(oo) 2 >>> Matrix([-1, 2]).norm(-oo) 1 See Also ======== normalized """ # Row or Column Vector Norms vals = list(self.values()) or [0] if self.rows == 1 or self.cols == 1: if ord == 2 or ord is None: # Common case sqrt(<x, x>) return sqrt(Add(*(abs(i) ** 2 for i in vals))) elif ord == 1: # sum(abs(x)) return Add(*(abs(i) for i in vals)) elif ord == S.Infinity: # max(abs(x)) return Max(*[abs(i) for i in vals]) elif ord == S.NegativeInfinity: # min(abs(x)) return Min(*[abs(i) for i in vals]) # Otherwise generalize the 2-norm, Sum(x_i**ord)**(1/ord) # Note that while useful this is not mathematically a norm try: return Pow(Add(*(abs(i) ** ord for i in vals)), S(1) / ord) except (NotImplementedError, TypeError): raise ValueError("Expected order to be Number, Symbol, oo") # Matrix Norms else: if ord == 1: # Maximum column sum m = self.applyfunc(abs) return Max(*[sum(m.col(i)) for i in range(m.cols)]) elif ord == 2: # Spectral Norm # Maximum singular value return Max(*self.singular_values()) elif ord == -2: # Minimum singular value return Min(*self.singular_values()) elif ord == S.Infinity: # Infinity Norm - Maximum row sum m = self.applyfunc(abs) return Max(*[sum(m.row(i)) for i in range(m.rows)]) elif (ord is None or isinstance(ord, string_types) and ord.lower() in ['f', 'fro', 'frobenius', 'vector']): # Reshape as vector and send back to norm function return self.vec().norm(ord=2) else: raise NotImplementedError("Matrix Norms under development") def pinv_solve(self, B, arbitrary_matrix=None): """Solve ``Ax = B`` using the Moore-Penrose pseudoinverse. There may be zero, one, or infinite solutions. If one solution exists, it will be returned. If infinite solutions exist, one will be returned based on the value of arbitrary_matrix. If no solutions exist, the least-squares solution is returned. Parameters ========== B : Matrix The right hand side of the equation to be solved for. Must have the same number of rows as matrix A. arbitrary_matrix : Matrix If the system is underdetermined (e.g. A has more columns than rows), infinite solutions are possible, in terms of an arbitrary matrix. This parameter may be set to a specific matrix to use for that purpose; if so, it must be the same shape as x, with as many rows as matrix A has columns, and as many columns as matrix B. If left as None, an appropriate matrix containing dummy symbols in the form of ``wn_m`` will be used, with n and m being row and column position of each symbol. Returns ======= x : Matrix The matrix that will satisfy ``Ax = B``. Will have as many rows as matrix A has columns, and as many columns as matrix B. Examples ======== >>> from sympy import Matrix >>> A = Matrix([[1, 2, 3], [4, 5, 6]]) >>> B = Matrix([7, 8]) >>> A.pinv_solve(B) Matrix([ [ _w0_0/6 - _w1_0/3 + _w2_0/6 - 55/18], [-_w0_0/3 + 2*_w1_0/3 - _w2_0/3 + 1/9], [ _w0_0/6 - _w1_0/3 + _w2_0/6 + 59/18]]) >>> A.pinv_solve(B, arbitrary_matrix=Matrix([0, 0, 0])) Matrix([ [-55/18], [ 1/9], [ 59/18]]) See Also ======== lower_triangular_solve upper_triangular_solve gauss_jordan_solve cholesky_solve diagonal_solve LDLsolve LUsolve QRsolve pinv Notes ===== This may return either exact solutions or least squares solutions. To determine which, check ``A * A.pinv() * B == B``. It will be True if exact solutions exist, and False if only a least-squares solution exists. Be aware that the left hand side of that equation may need to be simplified to correctly compare to the right hand side. References ========== .. [1] https://en.wikipedia.org/wiki/Moore-Penrose_pseudoinverse#Obtaining_all_solutions_of_a_linear_system """ from sympy.matrices import eye A = self A_pinv = self.pinv() if arbitrary_matrix is None: rows, cols = A.cols, B.cols w = symbols('w:{0}_:{1}'.format(rows, cols), cls=Dummy) arbitrary_matrix = self.__class__(cols, rows, w).T return A_pinv * B + (eye(A.cols) - A_pinv * A) * arbitrary_matrix def _eval_pinv_full_rank(self): """Subroutine for full row or column rank matrices. For full row rank matrices, inverse of ``A * A.H`` Exists. For full column rank matrices, inverse of ``A.H * A`` Exists. This routine can apply for both cases by checking the shape and have small decision. """ if self.is_zero: return self.H if self.rows >= self.cols: return (self.H * self).inv() * self.H else: return self.H * (self * self.H).inv() def _eval_pinv_rank_decomposition(self): """Subroutine for rank decomposition With rank decompositions, `A` can be decomposed into two full- rank matrices, and each matrix can take pseudoinverse individually. """ if self.is_zero: return self.H B, C = self.rank_decomposition() Bp = B._eval_pinv_full_rank() Cp = C._eval_pinv_full_rank() return Cp * Bp def _eval_pinv_diagonalization(self): """Subroutine using diagonalization This routine can sometimes fail if SymPy's eigenvalue computation is not reliable. """ if self.is_zero: return self.H A = self AH = self.H try: if self.rows >= self.cols: P, D = (AH * A).diagonalize(normalize=True) D_pinv = D.applyfunc(lambda x: 0 if _iszero(x) else 1 / x) return P * D_pinv * P.H * AH else: P, D = (A * AH).diagonalize(normalize=True) D_pinv = D.applyfunc(lambda x: 0 if _iszero(x) else 1 / x) return AH * P * D_pinv * P.H except MatrixError: raise NotImplementedError( 'pinv for rank-deficient matrices where ' 'diagonalization of A.H*A fails is not supported yet.') def pinv(self, method='RD'): """Calculate the Moore-Penrose pseudoinverse of the matrix. The Moore-Penrose pseudoinverse exists and is unique for any matrix. If the matrix is invertible, the pseudoinverse is the same as the inverse. Parameters ========== method : String, optional Specifies the method for computing the pseudoinverse. If ``'RD'``, Rank-Decomposition will be used. If ``'ED'``, Diagonalization will be used. Examples ======== Computing pseudoinverse by rank decomposition : >>> from sympy import Matrix >>> A = Matrix([[1, 2, 3], [4, 5, 6]]) >>> A.pinv() Matrix([ [-17/18, 4/9], [ -1/9, 1/9], [ 13/18, -2/9]]) Computing pseudoinverse by diagonalization : >>> B = A.pinv(method='ED') >>> B.simplify() >>> B Matrix([ [-17/18, 4/9], [ -1/9, 1/9], [ 13/18, -2/9]]) See Also ======== inv pinv_solve References ========== .. [1] https://en.wikipedia.org/wiki/Moore-Penrose_pseudoinverse """ # Trivial case: pseudoinverse of all-zero matrix is its transpose. if self.is_zero: return self.H if method == 'RD': return self._eval_pinv_rank_decomposition() elif method == 'ED': return self._eval_pinv_diagonalization() else: raise ValueError() def print_nonzero(self, symb="X"): """Shows location of non-zero entries for fast shape lookup. Examples ======== >>> from sympy.matrices import Matrix, eye >>> m = Matrix(2, 3, lambda i, j: i*3+j) >>> m Matrix([ [0, 1, 2], [3, 4, 5]]) >>> m.print_nonzero() [ XX] [XXX] >>> m = eye(4) >>> m.print_nonzero("x") [x ] [ x ] [ x ] [ x] """ s = [] for i in range(self.rows): line = [] for j in range(self.cols): if self[i, j] == 0: line.append(" ") else: line.append(str(symb)) s.append("[%s]" % ''.join(line)) print('\n'.join(s)) def project(self, v): """Return the projection of ``self`` onto the line containing ``v``. Examples ======== >>> from sympy import Matrix, S, sqrt >>> V = Matrix([sqrt(3)/2, S.Half]) >>> x = Matrix([[1, 0]]) >>> V.project(x) Matrix([[sqrt(3)/2, 0]]) >>> V.project(-x) Matrix([[sqrt(3)/2, 0]]) """ return v * (self.dot(v) / v.dot(v)) def QRdecomposition(self): """Return Q, R where A = Q*R, Q is orthogonal and R is upper triangular. Examples ======== This is the example from wikipedia: >>> from sympy import Matrix >>> A = Matrix([[12, -51, 4], [6, 167, -68], [-4, 24, -41]]) >>> Q, R = A.QRdecomposition() >>> Q Matrix([ [ 6/7, -69/175, -58/175], [ 3/7, 158/175, 6/175], [-2/7, 6/35, -33/35]]) >>> R Matrix([ [14, 21, -14], [ 0, 175, -70], [ 0, 0, 35]]) >>> A == Q*R True QR factorization of an identity matrix: >>> A = Matrix([[1, 0, 0], [0, 1, 0], [0, 0, 1]]) >>> Q, R = A.QRdecomposition() >>> Q Matrix([ [1, 0, 0], [0, 1, 0], [0, 0, 1]]) >>> R Matrix([ [1, 0, 0], [0, 1, 0], [0, 0, 1]]) See Also ======== cholesky LDLdecomposition LUdecomposition QRsolve """ cls = self.__class__ mat = self.as_mutable() n = mat.rows m = mat.cols ranked = list() # Pad with additional rows to make wide matrices square # nOrig keeps track of original size so zeros can be trimmed from Q if n < m: nOrig = n n = m mat = mat.col_join(mat.zeros(n - nOrig, m)) else: nOrig = n Q, R = mat.zeros(n, m), mat.zeros(m) for j in range(m): # for each column vector tmp = mat[:, j] # take original v for i in range(j): # subtract the project of mat on new vector R[i, j] = Q[:, i].dot(mat[:, j]) tmp -= Q[:, i] * R[i, j] tmp.expand() # normalize it R[j, j] = tmp.norm() if not R[j, j].is_zero: ranked.append(j) Q[:, j] = tmp / R[j, j] if len(ranked) != 0: return ( cls(Q.extract(range(nOrig), ranked)), cls(R.extract(ranked, range(R.cols))) ) else: # Trivial case handling for zero-rank matrix # Force Q as matrix containing standard basis vectors for i in range(Min(nOrig, m)): Q[i, i] = 1 return ( cls(Q.extract(range(nOrig), range(Min(nOrig, m)))), cls(R.extract(range(Min(nOrig, m)), range(R.cols))) ) def QRsolve(self, b): """Solve the linear system ``Ax = b``. ``self`` is the matrix ``A``, the method argument is the vector ``b``. The method returns the solution vector ``x``. If ``b`` is a matrix, the system is solved for each column of ``b`` and the return value is a matrix of the same shape as ``b``. This method is slower (approximately by a factor of 2) but more stable for floating-point arithmetic than the LUsolve method. However, LUsolve usually uses an exact arithmetic, so you don't need to use QRsolve. This is mainly for educational purposes and symbolic matrices, for real (or complex) matrices use mpmath.qr_solve. See Also ======== lower_triangular_solve upper_triangular_solve gauss_jordan_solve cholesky_solve diagonal_solve LDLsolve LUsolve pinv_solve QRdecomposition """ Q, R = self.as_mutable().QRdecomposition() y = Q.T * b # back substitution to solve R*x = y: # We build up the result "backwards" in the vector 'x' and reverse it # only in the end. x = [] n = R.rows for j in range(n - 1, -1, -1): tmp = y[j, :] for k in range(j + 1, n): tmp -= R[j, k] * x[n - 1 - k] x.append(tmp / R[j, j]) return self._new([row._mat for row in reversed(x)]) def rank_decomposition(self, iszerofunc=_iszero, simplify=False): r"""Returns a pair of matrices (`C`, `F`) with matching rank such that `A = C F`. Parameters ========== iszerofunc : Function, optional A function used for detecting whether an element can act as a pivot. ``lambda x: x.is_zero`` is used by default. simplify : Bool or Function, optional A function used to simplify elements when looking for a pivot. By default SymPy's ``simplify`` is used. Returns ======= (C, F) : Matrices `C` and `F` are full-rank matrices with rank as same as `A`, whose product gives `A`. See Notes for additional mathematical details. Examples ======== >>> from sympy.matrices import Matrix >>> A = Matrix([ ... [1, 3, 1, 4], ... [2, 7, 3, 9], ... [1, 5, 3, 1], ... [1, 2, 0, 8] ... ]) >>> C, F = A.rank_decomposition() >>> C Matrix([ [1, 3, 4], [2, 7, 9], [1, 5, 1], [1, 2, 8]]) >>> F Matrix([ [1, 0, -2, 0], [0, 1, 1, 0], [0, 0, 0, 1]]) >>> C * F == A True Notes ===== Obtaining `F`, an RREF of `A`, is equivalent to creating a product .. math:: E_n E_{n-1} ... E_1 A = F where `E_n, E_{n-1}, ... , E_1` are the elimination matrices or permutation matrices equivalent to each row-reduction step. The inverse of the same product of elimination matrices gives `C`: .. math:: C = (E_n E_{n-1} ... E_1)^{-1} It is not necessary, however, to actually compute the inverse: the columns of `C` are those from the original matrix with the same column indices as the indices of the pivot columns of `F`. References ========== .. [1] https://en.wikipedia.org/wiki/Rank_factorization .. [2] Piziak, R.; Odell, P. L. (1 June 1999). "Full Rank Factorization of Matrices". Mathematics Magazine. 72 (3): 193. doi:10.2307/2690882 See Also ======== rref """ (F, pivot_cols) = self.rref( simplify=simplify, iszerofunc=iszerofunc, pivots=True) rank = len(pivot_cols) C = self.extract(range(self.rows), pivot_cols) F = F[:rank, :] return (C, F) def solve_least_squares(self, rhs, method='CH'): """Return the least-square fit to the data. Parameters ========== rhs : Matrix Vector representing the right hand side of the linear equation. method : string or boolean, optional If set to ``'CH'``, ``cholesky_solve`` routine will be used. If set to ``'LDL'``, ``LDLsolve`` routine will be used. If set to ``'QR'``, ``QRsolve`` routine will be used. If set to ``'PINV'``, ``pinv_solve`` routine will be used. Otherwise, the conjugate of ``self`` will be used to create a system of equations that is passed to ``solve`` along with the hint defined by ``method``. Returns ======= solutions : Matrix Vector representing the solution. Examples ======== >>> from sympy.matrices import Matrix, ones >>> A = Matrix([1, 2, 3]) >>> B = Matrix([2, 3, 4]) >>> S = Matrix(A.row_join(B)) >>> S Matrix([ [1, 2], [2, 3], [3, 4]]) If each line of S represent coefficients of Ax + By and x and y are [2, 3] then S*xy is: >>> r = S*Matrix([2, 3]); r Matrix([ [ 8], [13], [18]]) But let's add 1 to the middle value and then solve for the least-squares value of xy: >>> xy = S.solve_least_squares(Matrix([8, 14, 18])); xy Matrix([ [ 5/3], [10/3]]) The error is given by S*xy - r: >>> S*xy - r Matrix([ [1/3], [1/3], [1/3]]) >>> _.norm().n(2) 0.58 If a different xy is used, the norm will be higher: >>> xy += ones(2, 1)/10 >>> (S*xy - r).norm().n(2) 1.5 """ if method == 'CH': return self.cholesky_solve(rhs) elif method == 'QR': return self.QRsolve(rhs) elif method == 'LDL': return self.LDLsolve(rhs) elif method == 'PINV': return self.pinv_solve(rhs) else: t = self.H return (t * self).solve(t * rhs, method=method) def solve(self, rhs, method='GJ'): """Solves linear equation where the unique solution exists. Parameters ========== rhs : Matrix Vector representing the right hand side of the linear equation. method : string, optional If set to ``'GJ'``, the Gauss-Jordan elimination will be used, which is implemented in the routine ``gauss_jordan_solve``. If set to ``'LU'``, ``LUsolve`` routine will be used. If set to ``'QR'``, ``QRsolve`` routine will be used. If set to ``'PINV'``, ``pinv_solve`` routine will be used. It also supports the methods available for special linear systems For positive definite systems: If set to ``'CH'``, ``cholesky_solve`` routine will be used. If set to ``'LDL'``, ``LDLsolve`` routine will be used. To use a different method and to compute the solution via the inverse, use a method defined in the .inv() docstring. Returns ======= solutions : Matrix Vector representing the solution. Raises ====== ValueError If there is not a unique solution then a ``ValueError`` will be raised. If ``self`` is not square, a ``ValueError`` and a different routine for solving the system will be suggested. """ if method == 'GJ': try: soln, param = self.gauss_jordan_solve(rhs) if param: raise NonInvertibleMatrixError("Matrix det == 0; not invertible. " "Try ``self.gauss_jordan_solve(rhs)`` to obtain a parametric solution.") except ValueError: # raise same error as in inv: self.zeros(1).inv() return soln elif method == 'LU': return self.LUsolve(rhs) elif method == 'CH': return self.cholesky_solve(rhs) elif method == 'QR': return self.QRsolve(rhs) elif method == 'LDL': return self.LDLsolve(rhs) elif method == 'PINV': return self.pinv_solve(rhs) else: return self.inv(method=method)*rhs def table(self, printer, rowstart='[', rowend=']', rowsep='\n', colsep=', ', align='right'): r""" String form of Matrix as a table. ``printer`` is the printer to use for on the elements (generally something like StrPrinter()) ``rowstart`` is the string used to start each row (by default '['). ``rowend`` is the string used to end each row (by default ']'). ``rowsep`` is the string used to separate rows (by default a newline). ``colsep`` is the string used to separate columns (by default ', '). ``align`` defines how the elements are aligned. Must be one of 'left', 'right', or 'center'. You can also use '<', '>', and '^' to mean the same thing, respectively. This is used by the string printer for Matrix. Examples ======== >>> from sympy import Matrix >>> from sympy.printing.str import StrPrinter >>> M = Matrix([[1, 2], [-33, 4]]) >>> printer = StrPrinter() >>> M.table(printer) '[ 1, 2]\n[-33, 4]' >>> print(M.table(printer)) [ 1, 2] [-33, 4] >>> print(M.table(printer, rowsep=',\n')) [ 1, 2], [-33, 4] >>> print('[%s]' % M.table(printer, rowsep=',\n')) [[ 1, 2], [-33, 4]] >>> print(M.table(printer, colsep=' ')) [ 1 2] [-33 4] >>> print(M.table(printer, align='center')) [ 1 , 2] [-33, 4] >>> print(M.table(printer, rowstart='{', rowend='}')) { 1, 2} {-33, 4} """ # Handle zero dimensions: if self.rows == 0 or self.cols == 0: return '[]' # Build table of string representations of the elements res = [] # Track per-column max lengths for pretty alignment maxlen = [0] * self.cols for i in range(self.rows): res.append([]) for j in range(self.cols): s = printer._print(self[i, j]) res[-1].append(s) maxlen[j] = max(len(s), maxlen[j]) # Patch strings together align = { 'left': 'ljust', 'right': 'rjust', 'center': 'center', '<': 'ljust', '>': 'rjust', '^': 'center', }[align] for i, row in enumerate(res): for j, elem in enumerate(row): row[j] = getattr(elem, align)(maxlen[j]) res[i] = rowstart + colsep.join(row) + rowend return rowsep.join(res) def upper_triangular_solve(self, rhs): """Solves ``Ax = B``, where A is an upper triangular matrix. See Also ======== lower_triangular_solve gauss_jordan_solve cholesky_solve diagonal_solve LDLsolve LUsolve QRsolve pinv_solve """ if not self.is_square: raise NonSquareMatrixError("Matrix must be square.") if rhs.rows != self.rows: raise TypeError("Matrix size mismatch.") if not self.is_upper: raise TypeError("Matrix is not upper triangular.") return self._upper_triangular_solve(rhs) def vech(self, diagonal=True, check_symmetry=True): """Return the unique elements of a symmetric Matrix as a one column matrix by stacking the elements in the lower triangle. Arguments: diagonal -- include the diagonal cells of ``self`` or not check_symmetry -- checks symmetry of ``self`` but not completely reliably Examples ======== >>> from sympy import Matrix >>> m=Matrix([[1, 2], [2, 3]]) >>> m Matrix([ [1, 2], [2, 3]]) >>> m.vech() Matrix([ [1], [2], [3]]) >>> m.vech(diagonal=False) Matrix([[2]]) See Also ======== vec """ from sympy.matrices import zeros c = self.cols if c != self.rows: raise ShapeError("Matrix must be square") if check_symmetry: self.simplify() if self != self.transpose(): raise ValueError( "Matrix appears to be asymmetric; consider check_symmetry=False") count = 0 if diagonal: v = zeros(c * (c + 1) // 2, 1) for j in range(c): for i in range(j, c): v[count] = self[i, j] count += 1 else: v = zeros(c * (c - 1) // 2, 1) for j in range(c): for i in range(j + 1, c): v[count] = self[i, j] count += 1 return v @deprecated( issue=15109, useinstead="from sympy.matrices.common import classof", deprecated_since_version="1.3") def classof(A, B): from sympy.matrices.common import classof as classof_ return classof_(A, B) @deprecated( issue=15109, deprecated_since_version="1.3", useinstead="from sympy.matrices.common import a2idx") def a2idx(j, n=None): from sympy.matrices.common import a2idx as a2idx_ return a2idx_(j, n) def _find_reasonable_pivot(col, iszerofunc=_iszero, simpfunc=_simplify): """ Find the lowest index of an item in ``col`` that is suitable for a pivot. If ``col`` consists only of Floats, the pivot with the largest norm is returned. Otherwise, the first element where ``iszerofunc`` returns False is used. If ``iszerofunc`` doesn't return false, items are simplified and retested until a suitable pivot is found. Returns a 4-tuple (pivot_offset, pivot_val, assumed_nonzero, newly_determined) where pivot_offset is the index of the pivot, pivot_val is the (possibly simplified) value of the pivot, assumed_nonzero is True if an assumption that the pivot was non-zero was made without being proved, and newly_determined are elements that were simplified during the process of pivot finding.""" newly_determined = [] col = list(col) # a column that contains a mix of floats and integers # but at least one float is considered a numerical # column, and so we do partial pivoting if all(isinstance(x, (Float, Integer)) for x in col) and any( isinstance(x, Float) for x in col): col_abs = [abs(x) for x in col] max_value = max(col_abs) if iszerofunc(max_value): # just because iszerofunc returned True, doesn't # mean the value is numerically zero. Make sure # to replace all entries with numerical zeros if max_value != 0: newly_determined = [(i, 0) for i, x in enumerate(col) if x != 0] return (None, None, False, newly_determined) index = col_abs.index(max_value) return (index, col[index], False, newly_determined) # PASS 1 (iszerofunc directly) possible_zeros = [] for i, x in enumerate(col): is_zero = iszerofunc(x) # is someone wrote a custom iszerofunc, it may return # BooleanFalse or BooleanTrue instead of True or False, # so use == for comparison instead of `is` if is_zero == False: # we found something that is definitely not zero return (i, x, False, newly_determined) possible_zeros.append(is_zero) # by this point, we've found no certain non-zeros if all(possible_zeros): # if everything is definitely zero, we have # no pivot return (None, None, False, newly_determined) # PASS 2 (iszerofunc after simplify) # we haven't found any for-sure non-zeros, so # go through the elements iszerofunc couldn't # make a determination about and opportunistically # simplify to see if we find something for i, x in enumerate(col): if possible_zeros[i] is not None: continue simped = simpfunc(x) is_zero = iszerofunc(simped) if is_zero == True or is_zero == False: newly_determined.append((i, simped)) if is_zero == False: return (i, simped, False, newly_determined) possible_zeros[i] = is_zero # after simplifying, some things that were recognized # as zeros might be zeros if all(possible_zeros): # if everything is definitely zero, we have # no pivot return (None, None, False, newly_determined) # PASS 3 (.equals(0)) # some expressions fail to simplify to zero, but # ``.equals(0)`` evaluates to True. As a last-ditch # attempt, apply ``.equals`` to these expressions for i, x in enumerate(col): if possible_zeros[i] is not None: continue if x.equals(S.Zero): # ``.iszero`` may return False with # an implicit assumption (e.g., ``x.equals(0)`` # when ``x`` is a symbol), so only treat it # as proved when ``.equals(0)`` returns True possible_zeros[i] = True newly_determined.append((i, S.Zero)) if all(possible_zeros): return (None, None, False, newly_determined) # at this point there is nothing that could definitely # be a pivot. To maintain compatibility with existing # behavior, we'll assume that an illdetermined thing is # non-zero. We should probably raise a warning in this case i = possible_zeros.index(None) return (i, col[i], True, newly_determined) def _find_reasonable_pivot_naive(col, iszerofunc=_iszero, simpfunc=None): """ Helper that computes the pivot value and location from a sequence of contiguous matrix column elements. As a side effect of the pivot search, this function may simplify some of the elements of the input column. A list of these simplified entries and their indices are also returned. This function mimics the behavior of _find_reasonable_pivot(), but does less work trying to determine if an indeterminate candidate pivot simplifies to zero. This more naive approach can be much faster, with the trade-off that it may erroneously return a pivot that is zero. ``col`` is a sequence of contiguous column entries to be searched for a suitable pivot. ``iszerofunc`` is a callable that returns a Boolean that indicates if its input is zero, or None if no such determination can be made. ``simpfunc`` is a callable that simplifies its input. It must return its input if it does not simplify its input. Passing in ``simpfunc=None`` indicates that the pivot search should not attempt to simplify any candidate pivots. Returns a 4-tuple: (pivot_offset, pivot_val, assumed_nonzero, newly_determined) ``pivot_offset`` is the sequence index of the pivot. ``pivot_val`` is the value of the pivot. pivot_val and col[pivot_index] are equivalent, but will be different when col[pivot_index] was simplified during the pivot search. ``assumed_nonzero`` is a boolean indicating if the pivot cannot be guaranteed to be zero. If assumed_nonzero is true, then the pivot may or may not be non-zero. If assumed_nonzero is false, then the pivot is non-zero. ``newly_determined`` is a list of index-value pairs of pivot candidates that were simplified during the pivot search. """ # indeterminates holds the index-value pairs of each pivot candidate # that is neither zero or non-zero, as determined by iszerofunc(). # If iszerofunc() indicates that a candidate pivot is guaranteed # non-zero, or that every candidate pivot is zero then the contents # of indeterminates are unused. # Otherwise, the only viable candidate pivots are symbolic. # In this case, indeterminates will have at least one entry, # and all but the first entry are ignored when simpfunc is None. indeterminates = [] for i, col_val in enumerate(col): col_val_is_zero = iszerofunc(col_val) if col_val_is_zero == False: # This pivot candidate is non-zero. return i, col_val, False, [] elif col_val_is_zero is None: # The candidate pivot's comparison with zero # is indeterminate. indeterminates.append((i, col_val)) if len(indeterminates) == 0: # All candidate pivots are guaranteed to be zero, i.e. there is # no pivot. return None, None, False, [] if simpfunc is None: # Caller did not pass in a simplification function that might # determine if an indeterminate pivot candidate is guaranteed # to be nonzero, so assume the first indeterminate candidate # is non-zero. return indeterminates[0][0], indeterminates[0][1], True, [] # newly_determined holds index-value pairs of candidate pivots # that were simplified during the search for a non-zero pivot. newly_determined = [] for i, col_val in indeterminates: tmp_col_val = simpfunc(col_val) if id(col_val) != id(tmp_col_val): # simpfunc() simplified this candidate pivot. newly_determined.append((i, tmp_col_val)) if iszerofunc(tmp_col_val) == False: # Candidate pivot simplified to a guaranteed non-zero value. return i, tmp_col_val, False, newly_determined return indeterminates[0][0], indeterminates[0][1], True, newly_determined

b8af9506182f9be9b422f95405630768f66094e58208309d90553a26797ba17d

from __future__ import print_function, division from sympy.core.basic import Basic from sympy.core.compatibility import as_int, with_metaclass, range, PY3 from sympy.core.expr import Expr from sympy.core.function import Lambda from sympy.core.numbers import oo from sympy.core.relational import Eq from sympy.core.singleton import Singleton, S from sympy.core.symbol import Dummy, symbols from sympy.core.sympify import _sympify, sympify, converter from sympy.logic.boolalg import And, Or from sympy.sets.sets import (Set, Interval, Union, FiniteSet, ProductSet, Intersection) from sympy.sets.contains import Contains from sympy.sets.conditionset import ConditionSet from sympy.utilities.iterables import flatten from sympy.utilities.misc import filldedent class Rationals(with_metaclass(Singleton, Set)): """ Represents the rational numbers. This set is also available as the Singleton, S.Rationals. Examples ======== >>> from sympy import S >>> S.Half in S.Rationals True >>> iterable = iter(S.Rationals) >>> [next(iterable) for i in range(12)] [0, 1, -1, 1/2, 2, -1/2, -2, 1/3, 3, -1/3, -3, 2/3] """ is_iterable = True _inf = S.NegativeInfinity _sup = S.Infinity def _contains(self, other): if not isinstance(other, Expr): return False if other.is_Number: return other.is_Rational return other.is_rational def __iter__(self): from sympy.core.numbers import igcd, Rational yield S.Zero yield S.One yield S.NegativeOne d = 2 while True: for n in range(d): if igcd(n, d) == 1: yield Rational(n, d) yield Rational(d, n) yield Rational(-n, d) yield Rational(-d, n) d += 1 @property def _boundary(self): return self class Naturals(with_metaclass(Singleton, Set)): """ Represents the natural numbers (or counting numbers) which are all positive integers starting from 1. This set is also available as the Singleton, S.Naturals. Examples ======== >>> from sympy import S, Interval, pprint >>> 5 in S.Naturals True >>> iterable = iter(S.Naturals) >>> next(iterable) 1 >>> next(iterable) 2 >>> next(iterable) 3 >>> pprint(S.Naturals.intersect(Interval(0, 10))) {1, 2, ..., 10} See Also ======== Naturals0 : non-negative integers (i.e. includes 0, too) Integers : also includes negative integers """ is_iterable = True _inf = S.One _sup = S.Infinity def _contains(self, other): if not isinstance(other, Expr): return False elif other.is_positive and other.is_integer: return True elif other.is_integer is False or other.is_positive is False: return False def __iter__(self): i = self._inf while True: yield i i = i + 1 @property def _boundary(self): return self def as_relational(self, x): from sympy.functions.elementary.integers import floor return And(Eq(floor(x), x), x >= self.inf, x < oo) class Naturals0(Naturals): """Represents the whole numbers which are all the non-negative integers, inclusive of zero. See Also ======== Naturals : positive integers; does not include 0 Integers : also includes the negative integers """ _inf = S.Zero def _contains(self, other): if not isinstance(other, Expr): return S.false elif other.is_integer and other.is_nonnegative: return S.true elif other.is_integer is False or other.is_nonnegative is False: return S.false class Integers(with_metaclass(Singleton, Set)): """ Represents all integers: positive, negative and zero. This set is also available as the Singleton, S.Integers. Examples ======== >>> from sympy import S, Interval, pprint >>> 5 in S.Naturals True >>> iterable = iter(S.Integers) >>> next(iterable) 0 >>> next(iterable) 1 >>> next(iterable) -1 >>> next(iterable) 2 >>> pprint(S.Integers.intersect(Interval(-4, 4))) {-4, -3, ..., 4} See Also ======== Naturals0 : non-negative integers Integers : positive and negative integers and zero """ is_iterable = True def _contains(self, other): if not isinstance(other, Expr): return S.false return other.is_integer def __iter__(self): yield S.Zero i = S.One while True: yield i yield -i i = i + 1 @property def _inf(self): return -S.Infinity @property def _sup(self): return S.Infinity @property def _boundary(self): return self def as_relational(self, x): from sympy.functions.elementary.integers import floor return And(Eq(floor(x), x), -oo < x, x < oo) class Reals(with_metaclass(Singleton, Interval)): """ Represents all real numbers from negative infinity to positive infinity, including all integer, rational and irrational numbers. This set is also available as the Singleton, S.Reals. Examples ======== >>> from sympy import S, Interval, Rational, pi, I >>> 5 in S.Reals True >>> Rational(-1, 2) in S.Reals True >>> pi in S.Reals True >>> 3*I in S.Reals False >>> S.Reals.contains(pi) True See Also ======== ComplexRegion """ def __new__(cls): return Interval.__new__(cls, -S.Infinity, S.Infinity) def __eq__(self, other): return other == Interval(-S.Infinity, S.Infinity) def __hash__(self): return hash(Interval(-S.Infinity, S.Infinity)) class ImageSet(Set): """ Image of a set under a mathematical function. The transformation must be given as a Lambda function which has as many arguments as the elements of the set upon which it operates, e.g. 1 argument when acting on the set of integers or 2 arguments when acting on a complex region. This function is not normally called directly, but is called from `imageset`. Examples ======== >>> from sympy import Symbol, S, pi, Dummy, Lambda >>> from sympy.sets.sets import FiniteSet, Interval >>> from sympy.sets.fancysets import ImageSet >>> x = Symbol('x') >>> N = S.Naturals >>> squares = ImageSet(Lambda(x, x**2), N) # {x**2 for x in N} >>> 4 in squares True >>> 5 in squares False >>> FiniteSet(0, 1, 2, 3, 4, 5, 6, 7, 9, 10).intersect(squares) {1, 4, 9} >>> square_iterable = iter(squares) >>> for i in range(4): ... next(square_iterable) 1 4 9 16 If you want to get value for `x` = 2, 1/2 etc. (Please check whether the `x` value is in `base_set` or not before passing it as args) >>> squares.lamda(2) 4 >>> squares.lamda(S(1)/2) 1/4 >>> n = Dummy('n') >>> solutions = ImageSet(Lambda(n, n*pi), S.Integers) # solutions of sin(x) = 0 >>> dom = Interval(-1, 1) >>> dom.intersect(solutions) {0} See Also ======== sympy.sets.sets.imageset """ def __new__(cls, flambda, *sets): if not isinstance(flambda, Lambda): raise ValueError('first argument must be a Lambda') if flambda is S.IdentityFunction: if len(sets) != 1: raise ValueError('identify function requires a single set') return sets[0] if not set(flambda.variables) & flambda.expr.free_symbols: return FiniteSet(flambda.expr) return Basic.__new__(cls, flambda, *sets) lamda = property(lambda self: self.args[0]) base_set = property(lambda self: ProductSet(self.args[1:])) def __iter__(self): already_seen = set() for i in self.base_set: val = self.lamda(i) if val in already_seen: continue else: already_seen.add(val) yield val def _is_multivariate(self): return len(self.lamda.variables) > 1 def _contains(self, other): from sympy.matrices import Matrix from sympy.solvers.solveset import solveset, linsolve from sympy.solvers.solvers import solve from sympy.utilities.iterables import is_sequence, iterable, cartes L = self.lamda if is_sequence(other) != is_sequence(L.expr): return False elif is_sequence(other) and len(L.expr) != len(other): return False if self._is_multivariate(): if not is_sequence(L.expr): # exprs -> (numer, denom) and check again # XXX this is a bad idea -- make the user # remap self to desired form return other.as_numer_denom() in self.func( Lambda(L.variables, L.expr.as_numer_denom()), self.base_set) eqs = [expr - val for val, expr in zip(other, L.expr)] variables = L.variables free = set(variables) if all(i.is_number for i in list(Matrix(eqs).jacobian(variables))): solns = list(linsolve([e - val for e, val in zip(L.expr, other)], variables)) else: try: syms = [e.free_symbols & free for e in eqs] solns = {} for i, (e, s, v) in enumerate(zip(eqs, syms, other)): if not s: if e != v: return S.false solns[vars[i]] = [v] continue elif len(s) == 1: sy = s.pop() sol = solveset(e, sy) if sol is S.EmptySet: return S.false elif isinstance(sol, FiniteSet): solns[sy] = list(sol) else: raise NotImplementedError else: # if there is more than 1 symbol from # variables in expr than this is a # coupled system raise NotImplementedError solns = cartes(*[solns[s] for s in variables]) except NotImplementedError: solns = solve([e - val for e, val in zip(L.expr, other)], variables, set=True) if solns: _v, solns = solns # watch for infinite solutions like solving # for x, y and getting (x, 0), (0, y), (0, 0) solns = [i for i in solns if not any( s in i for s in variables)] if not solns: return False else: # not sure if [] means no solution or # couldn't find one return else: x = L.variables[0] if isinstance(L.expr, Expr): # scalar -> scalar mapping solnsSet = solveset(L.expr - other, x) if solnsSet.is_FiniteSet: solns = list(solnsSet) else: msgset = solnsSet else: # scalar -> vector # note: it is not necessary for components of other # to be in the corresponding base set unless the # computed component is always in the corresponding # domain. e.g. 1/2 is in imageset(x, x/2, Integers) # while it cannot be in imageset(x, x + 2, Integers). # So when the base set is comprised of integers or reals # perhaps a pre-check could be done to see if the computed # values are still in the set. dom = self.base_set for e, o in zip(L.expr, other): msgset = dom other = e - o dom = dom.intersection(solveset(e - o, x, domain=dom)) if not dom: # there is no solution in common return False return not isinstance(dom, Intersection) for soln in solns: try: if soln in self.base_set: return True except TypeError: return return S.false @property def is_iterable(self): return self.base_set.is_iterable def doit(self, **kwargs): from sympy.sets.setexpr import SetExpr f = self.lamda base_set = self.base_set return SetExpr(base_set)._eval_func(f).set class Range(Set): """ Represents a range of integers. Can be called as Range(stop), Range(start, stop), or Range(start, stop, step); when stop is not given it defaults to 1. `Range(stop)` is the same as `Range(0, stop, 1)` and the stop value (juse as for Python ranges) is not included in the Range values. >>> from sympy import Range >>> list(Range(3)) [0, 1, 2] The step can also be negative: >>> list(Range(10, 0, -2)) [10, 8, 6, 4, 2] The stop value is made canonical so equivalent ranges always have the same args: >>> Range(0, 10, 3) Range(0, 12, 3) Infinite ranges are allowed. ``oo`` and ``-oo`` are never included in the set (``Range`` is always a subset of ``Integers``). If the starting point is infinite, then the final value is ``stop - step``. To iterate such a range, it needs to be reversed: >>> from sympy import oo >>> r = Range(-oo, 1) >>> r[-1] 0 >>> next(iter(r)) Traceback (most recent call last): ... ValueError: Cannot iterate over Range with infinite start >>> next(iter(r.reversed)) 0 Although Range is a set (and supports the normal set operations) it maintains the order of the elements and can be used in contexts where `range` would be used. >>> from sympy import Interval >>> Range(0, 10, 2).intersect(Interval(3, 7)) Range(4, 8, 2) >>> list(_) [4, 6] Although slicing of a Range will always return a Range -- possibly empty -- an empty set will be returned from any intersection that is empty: >>> Range(3)[:0] Range(0, 0, 1) >>> Range(3).intersect(Interval(4, oo)) EmptySet() >>> Range(3).intersect(Range(4, oo)) EmptySet() """ is_iterable = True def __new__(cls, *args): from sympy.functions.elementary.integers import ceiling if len(args) == 1: if isinstance(args[0], range if PY3 else xrange): args = args[0].__reduce__()[1] # use pickle method # expand range slc = slice(*args) if slc.step == 0: raise ValueError("step cannot be 0") start, stop, step = slc.start or 0, slc.stop, slc.step or 1 try: start, stop, step = [ w if w in [S.NegativeInfinity, S.Infinity] else sympify(as_int(w)) for w in (start, stop, step)] except ValueError: raise ValueError(filldedent(''' Finite arguments to Range must be integers; `imageset` can define other cases, e.g. use `imageset(i, i/10, Range(3))` to give [0, 1/10, 1/5].''')) if not step.is_Integer: raise ValueError(filldedent(''' Ranges must have a literal integer step.''')) if all(i.is_infinite for i in (start, stop)): if start == stop: # canonical null handled below start = stop = S.One else: raise ValueError(filldedent(''' Either the start or end value of the Range must be finite.''')) if start.is_infinite: if step*(stop - start) < 0: start = stop = S.One else: end = stop if not start.is_infinite: ref = start if start.is_finite else stop n = ceiling((stop - ref)/step) if n <= 0: # null Range start = end = S.Zero step = S.One else: end = ref + n*step return Basic.__new__(cls, start, end, step) start = property(lambda self: self.args[0]) stop = property(lambda self: self.args[1]) step = property(lambda self: self.args[2]) @property def reversed(self): """Return an equivalent Range in the opposite order. Examples ======== >>> from sympy import Range >>> Range(10).reversed Range(9, -1, -1) """ if not self: return self return self.func( self.stop - self.step, self.start - self.step, -self.step) def _contains(self, other): if not self: return S.false if other.is_infinite: return S.false if not other.is_integer: return other.is_integer ref = self.start if self.start.is_finite else self.stop if (ref - other) % self.step: # off sequence return S.false return _sympify(other >= self.inf and other <= self.sup) def __iter__(self): if self.start in [S.NegativeInfinity, S.Infinity]: raise ValueError("Cannot iterate over Range with infinite start") elif self: i = self.start step = self.step while True: if (step > 0 and not (self.start <= i < self.stop)) or \ (step < 0 and not (self.stop < i <= self.start)): break yield i i += step def __len__(self): if not self: return 0 dif = self.stop - self.start if dif.is_infinite: raise ValueError( "Use .size to get the length of an infinite Range") return abs(dif//self.step) @property def size(self): try: return _sympify(len(self)) except ValueError: return S.Infinity def __nonzero__(self): return self.start != self.stop __bool__ = __nonzero__ def __getitem__(self, i): from sympy.functions.elementary.integers import ceiling ooslice = "cannot slice from the end with an infinite value" zerostep = "slice step cannot be zero" # if we had to take every other element in the following # oo, ..., 6, 4, 2, 0 # we might get oo, ..., 4, 0 or oo, ..., 6, 2 ambiguous = "cannot unambiguously re-stride from the end " + \ "with an infinite value" if isinstance(i, slice): if self.size.is_finite: start, stop, step = i.indices(self.size) n = ceiling((stop - start)/step) if n <= 0: return Range(0) canonical_stop = start + n*step end = canonical_stop - step ss = step*self.step return Range(self[start], self[end] + ss, ss) else: # infinite Range start = i.start stop = i.stop if i.step == 0: raise ValueError(zerostep) step = i.step or 1 ss = step*self.step #--------------------- # handle infinite on right # e.g. Range(0, oo) or Range(0, -oo, -1) # -------------------- if self.stop.is_infinite: # start and stop are not interdependent -- # they only depend on step --so we use the # equivalent reversed values return self.reversed[ stop if stop is None else -stop + 1: start if start is None else -start: step].reversed #--------------------- # handle infinite on the left # e.g. Range(oo, 0, -1) or Range(-oo, 0) # -------------------- # consider combinations of # start/stop {== None, < 0, == 0, > 0} and # step {< 0, > 0} if start is None: if stop is None: if step < 0: return Range(self[-1], self.start, ss) elif step > 1: raise ValueError(ambiguous) else: # == 1 return self elif stop < 0: if step < 0: return Range(self[-1], self[stop], ss) else: # > 0 return Range(self.start, self[stop], ss) elif stop == 0: if step > 0: return Range(0) else: # < 0 raise ValueError(ooslice) elif stop == 1: if step > 0: raise ValueError(ooslice) # infinite singleton else: # < 0 raise ValueError(ooslice) else: # > 1 raise ValueError(ooslice) elif start < 0: if stop is None: if step < 0: return Range(self[start], self.start, ss) else: # > 0 return Range(self[start], self.stop, ss) elif stop < 0: return Range(self[start], self[stop], ss) elif stop == 0: if step < 0: raise ValueError(ooslice) else: # > 0 return Range(0) elif stop > 0: raise ValueError(ooslice) elif start == 0: if stop is None: if step < 0: raise ValueError(ooslice) # infinite singleton elif step > 1: raise ValueError(ambiguous) else: # == 1 return self elif stop < 0: if step > 1: raise ValueError(ambiguous) elif step == 1: return Range(self.start, self[stop], ss) else: # < 0 return Range(0) else: # >= 0 raise ValueError(ooslice) elif start > 0: raise ValueError(ooslice) else: if not self: raise IndexError('Range index out of range') if i == 0: return self.start if i == -1 or i is S.Infinity: return self.stop - self.step rv = (self.stop if i < 0 else self.start) + i*self.step if rv.is_infinite: raise ValueError(ooslice) if rv < self.inf or rv > self.sup: raise IndexError("Range index out of range") return rv @property def _inf(self): if not self: raise NotImplementedError if self.step > 0: return self.start else: return self.stop - self.step @property def _sup(self): if not self: raise NotImplementedError if self.step > 0: return self.stop - self.step else: return self.start @property def _boundary(self): return self def as_relational(self, x): """Rewrite a Range in terms of equalities and logic operators. """ from sympy.functions.elementary.integers import floor i = (x - (self.inf if self.inf.is_finite else self.sup))/self.step return And( Eq(i, floor(i)), x >= self.inf if self.inf in self else x > self.inf, x <= self.sup if self.sup in self else x < self.sup) if PY3: converter[range] = Range else: converter[xrange] = Range def normalize_theta_set(theta): """ Normalize a Real Set `theta` in the Interval [0, 2*pi). It returns a normalized value of theta in the Set. For Interval, a maximum of one cycle [0, 2*pi], is returned i.e. for theta equal to [0, 10*pi], returned normalized value would be [0, 2*pi). As of now intervals with end points as non-multiples of `pi` is not supported. Raises ====== NotImplementedError The algorithms for Normalizing theta Set are not yet implemented. ValueError The input is not valid, i.e. the input is not a real set. RuntimeError It is a bug, please report to the github issue tracker. Examples ======== >>> from sympy.sets.fancysets import normalize_theta_set >>> from sympy import Interval, FiniteSet, pi >>> normalize_theta_set(Interval(9*pi/2, 5*pi)) Interval(pi/2, pi) >>> normalize_theta_set(Interval(-3*pi/2, pi/2)) Interval.Ropen(0, 2*pi) >>> normalize_theta_set(Interval(-pi/2, pi/2)) Union(Interval(0, pi/2), Interval.Ropen(3*pi/2, 2*pi)) >>> normalize_theta_set(Interval(-4*pi, 3*pi)) Interval.Ropen(0, 2*pi) >>> normalize_theta_set(Interval(-3*pi/2, -pi/2)) Interval(pi/2, 3*pi/2) >>> normalize_theta_set(FiniteSet(0, pi, 3*pi)) {0, pi} """ from sympy.functions.elementary.trigonometric import _pi_coeff as coeff if theta.is_Interval: interval_len = theta.measure # one complete circle if interval_len >= 2*S.Pi: if interval_len == 2*S.Pi and theta.left_open and theta.right_open: k = coeff(theta.start) return Union(Interval(0, k*S.Pi, False, True), Interval(k*S.Pi, 2*S.Pi, True, True)) return Interval(0, 2*S.Pi, False, True) k_start, k_end = coeff(theta.start), coeff(theta.end) if k_start is None or k_end is None: raise NotImplementedError("Normalizing theta without pi as coefficient is " "not yet implemented") new_start = k_start*S.Pi new_end = k_end*S.Pi if new_start > new_end: return Union(Interval(S.Zero, new_end, False, theta.right_open), Interval(new_start, 2*S.Pi, theta.left_open, True)) else: return Interval(new_start, new_end, theta.left_open, theta.right_open) elif theta.is_FiniteSet: new_theta = [] for element in theta: k = coeff(element) if k is None: raise NotImplementedError('Normalizing theta without pi as ' 'coefficient, is not Implemented.') else: new_theta.append(k*S.Pi) return FiniteSet(*new_theta) elif theta.is_Union: return Union(*[normalize_theta_set(interval) for interval in theta.args]) elif theta.is_subset(S.Reals): raise NotImplementedError("Normalizing theta when, it is of type %s is not " "implemented" % type(theta)) else: raise ValueError(" %s is not a real set" % (theta)) class ComplexRegion(Set): """ Represents the Set of all Complex Numbers. It can represent a region of Complex Plane in both the standard forms Polar and Rectangular coordinates. * Polar Form Input is in the form of the ProductSet or Union of ProductSets of the intervals of r and theta, & use the flag polar=True. Z = {z in C | z = r*[cos(theta) + I*sin(theta)], r in [r], theta in [theta]} * Rectangular Form Input is in the form of the ProductSet or Union of ProductSets of interval of x and y the of the Complex numbers in a Plane. Default input type is in rectangular form. Z = {z in C | z = x + I*y, x in [Re(z)], y in [Im(z)]} Examples ======== >>> from sympy.sets.fancysets import ComplexRegion >>> from sympy.sets import Interval >>> from sympy import S, I, Union >>> a = Interval(2, 3) >>> b = Interval(4, 6) >>> c = Interval(1, 8) >>> c1 = ComplexRegion(a*b) # Rectangular Form >>> c1 ComplexRegion(Interval(2, 3) x Interval(4, 6), False) * c1 represents the rectangular region in complex plane surrounded by the coordinates (2, 4), (3, 4), (3, 6) and (2, 6), of the four vertices. >>> c2 = ComplexRegion(Union(a*b, b*c)) >>> c2 ComplexRegion(Union(Interval(2, 3) x Interval(4, 6), Interval(4, 6) x Interval(1, 8)), False) * c2 represents the Union of two rectangular regions in complex plane. One of them surrounded by the coordinates of c1 and other surrounded by the coordinates (4, 1), (6, 1), (6, 8) and (4, 8). >>> 2.5 + 4.5*I in c1 True >>> 2.5 + 6.5*I in c1 False >>> r = Interval(0, 1) >>> theta = Interval(0, 2*S.Pi) >>> c2 = ComplexRegion(r*theta, polar=True) # Polar Form >>> c2 # unit Disk ComplexRegion(Interval(0, 1) x Interval.Ropen(0, 2*pi), True) * c2 represents the region in complex plane inside the Unit Disk centered at the origin. >>> 0.5 + 0.5*I in c2 True >>> 1 + 2*I in c2 False >>> unit_disk = ComplexRegion(Interval(0, 1)*Interval(0, 2*S.Pi), polar=True) >>> upper_half_unit_disk = ComplexRegion(Interval(0, 1)*Interval(0, S.Pi), polar=True) >>> intersection = unit_disk.intersect(upper_half_unit_disk) >>> intersection ComplexRegion(Interval(0, 1) x Interval(0, pi), True) >>> intersection == upper_half_unit_disk True See Also ======== Reals """ is_ComplexRegion = True def __new__(cls, sets, polar=False): from sympy import sin, cos x, y, r, theta = symbols('x, y, r, theta', cls=Dummy) I = S.ImaginaryUnit polar = sympify(polar) # Rectangular Form if polar == False: if all(_a.is_FiniteSet for _a in sets.args) and (len(sets.args) == 2): # ** ProductSet of FiniteSets in the Complex Plane. ** # For Cases like ComplexRegion({2, 4}*{3}), It # would return {2 + 3*I, 4 + 3*I} complex_num = [] for x in sets.args[0]: for y in sets.args[1]: complex_num.append(x + I*y) obj = FiniteSet(*complex_num) else: obj = ImageSet.__new__(cls, Lambda((x, y), x + I*y), sets) obj._variables = (x, y) obj._expr = x + I*y # Polar Form elif polar == True: new_sets = [] # sets is Union of ProductSets if not sets.is_ProductSet: for k in sets.args: new_sets.append(k) # sets is ProductSets else: new_sets.append(sets) # Normalize input theta for k, v in enumerate(new_sets): new_sets[k] = ProductSet(v.args[0], normalize_theta_set(v.args[1])) sets = Union(*new_sets) obj = ImageSet.__new__(cls, Lambda((r, theta), r*(cos(theta) + I*sin(theta))), sets) obj._variables = (r, theta) obj._expr = r*(cos(theta) + I*sin(theta)) else: raise ValueError("polar should be either True or False") obj._sets = sets obj._polar = polar return obj @property def sets(self): """ Return raw input sets to the self. Examples ======== >>> from sympy import Interval, ComplexRegion, Union >>> a = Interval(2, 3) >>> b = Interval(4, 5) >>> c = Interval(1, 7) >>> C1 = ComplexRegion(a*b) >>> C1.sets Interval(2, 3) x Interval(4, 5) >>> C2 = ComplexRegion(Union(a*b, b*c)) >>> C2.sets Union(Interval(2, 3) x Interval(4, 5), Interval(4, 5) x Interval(1, 7)) """ return self._sets @property def args(self): return (self._sets, self._polar) @property def variables(self): return self._variables @property def expr(self): return self._expr @property def psets(self): """ Return a tuple of sets (ProductSets) input of the self. Examples ======== >>> from sympy import Interval, ComplexRegion, Union >>> a = Interval(2, 3) >>> b = Interval(4, 5) >>> c = Interval(1, 7) >>> C1 = ComplexRegion(a*b) >>> C1.psets (Interval(2, 3) x Interval(4, 5),) >>> C2 = ComplexRegion(Union(a*b, b*c)) >>> C2.psets (Interval(2, 3) x Interval(4, 5), Interval(4, 5) x Interval(1, 7)) """ if self.sets.is_ProductSet: psets = () psets = psets + (self.sets, ) else: psets = self.sets.args return psets @property def a_interval(self): """ Return the union of intervals of `x` when, self is in rectangular form, or the union of intervals of `r` when self is in polar form. Examples ======== >>> from sympy import Interval, ComplexRegion, Union >>> a = Interval(2, 3) >>> b = Interval(4, 5) >>> c = Interval(1, 7) >>> C1 = ComplexRegion(a*b) >>> C1.a_interval Interval(2, 3) >>> C2 = ComplexRegion(Union(a*b, b*c)) >>> C2.a_interval Union(Interval(2, 3), Interval(4, 5)) """ a_interval = [] for element in self.psets: a_interval.append(element.args[0]) a_interval = Union(*a_interval) return a_interval @property def b_interval(self): """ Return the union of intervals of `y` when, self is in rectangular form, or the union of intervals of `theta` when self is in polar form. Examples ======== >>> from sympy import Interval, ComplexRegion, Union >>> a = Interval(2, 3) >>> b = Interval(4, 5) >>> c = Interval(1, 7) >>> C1 = ComplexRegion(a*b) >>> C1.b_interval Interval(4, 5) >>> C2 = ComplexRegion(Union(a*b, b*c)) >>> C2.b_interval Interval(1, 7) """ b_interval = [] for element in self.psets: b_interval.append(element.args[1]) b_interval = Union(*b_interval) return b_interval @property def polar(self): """ Returns True if self is in polar form. Examples ======== >>> from sympy import Interval, ComplexRegion, Union, S >>> a = Interval(2, 3) >>> b = Interval(4, 5) >>> theta = Interval(0, 2*S.Pi) >>> C1 = ComplexRegion(a*b) >>> C1.polar False >>> C2 = ComplexRegion(a*theta, polar=True) >>> C2.polar True """ return self._polar @property def _measure(self): """ The measure of self.sets. Examples ======== >>> from sympy import Interval, ComplexRegion, S >>> a, b = Interval(2, 5), Interval(4, 8) >>> c = Interval(0, 2*S.Pi) >>> c1 = ComplexRegion(a*b) >>> c1.measure 12 >>> c2 = ComplexRegion(a*c, polar=True) >>> c2.measure 6*pi """ return self.sets._measure @classmethod def from_real(cls, sets): """ Converts given subset of real numbers to a complex region. Examples ======== >>> from sympy import Interval, ComplexRegion >>> unit = Interval(0,1) >>> ComplexRegion.from_real(unit) ComplexRegion(Interval(0, 1) x {0}, False) """ if not sets.is_subset(S.Reals): raise ValueError("sets must be a subset of the real line") return cls(sets * FiniteSet(0)) def _contains(self, other): from sympy.functions import arg, Abs from sympy.core.containers import Tuple other = sympify(other) isTuple = isinstance(other, Tuple) if isTuple and len(other) != 2: raise ValueError('expecting Tuple of length 2') # If the other is not an Expression, and neither a Tuple if not isinstance(other, Expr) and not isinstance(other, Tuple): return S.false # self in rectangular form if not self.polar: re, im = other if isTuple else other.as_real_imag() for element in self.psets: if And(element.args[0]._contains(re), element.args[1]._contains(im)): return True return False # self in polar form elif self.polar: if isTuple: r, theta = other elif other.is_zero: r, theta = S.Zero, S.Zero else: r, theta = Abs(other), arg(other) for element in self.psets: if And(element.args[0]._contains(r), element.args[1]._contains(theta)): return True return False class Complexes(with_metaclass(Singleton, ComplexRegion)): def __new__(cls): return ComplexRegion.__new__(cls, S.Reals*S.Reals) def __eq__(self, other): return other == ComplexRegion(S.Reals*S.Reals) def __hash__(self): return hash(ComplexRegion(S.Reals*S.Reals)) def __str__(self): return "S.Complexes" def __repr__(self): return "S.Complexes"

8474e1cf77624cf9b97c92a6dfc155dd7d4c24ddb46718ab0d68f84c3962bace

from sympy import (S, Symbol, symbols, Interval, FallingFactorial, Eq, cos, And, Tuple, integrate, oo, sin, Sum, Basic, DiracDelta, log, pi) from sympy.core.compatibility import range from sympy.core.numbers import comp from sympy.stats import (Die, Normal, Exponential, FiniteRV, P, E, H, variance, density, given, independent, dependent, where, pspace, factorial_moment, random_symbols, sample, Geometric, Binomial, Poisson, Hypergeometric) from sympy.stats.frv_types import BernoulliDistribution from sympy.stats.rv import (IndependentProductPSpace, rs_swap, Density, NamedArgsMixin, RandomSymbol, PSpace) from sympy.utilities.pytest import raises def test_where(): X, Y = Die('X'), Die('Y') Z = Normal('Z', 0, 1) assert where(Z**2 <= 1).set == Interval(-1, 1) assert where( Z**2 <= 1).as_boolean() == Interval(-1, 1).as_relational(Z.symbol) assert where(And(X > Y, Y > 4)).as_boolean() == And( Eq(X.symbol, 6), Eq(Y.symbol, 5)) assert len(where(X < 3).set) == 2 assert 1 in where(X < 3).set X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) assert where(And(X**2 <= 1, X >= 0)).set == Interval(0, 1) XX = given(X, And(X**2 <= 1, X >= 0)) assert XX.pspace.domain.set == Interval(0, 1) assert XX.pspace.domain.as_boolean() == \ And(0 <= X.symbol, X.symbol**2 <= 1, -oo < X.symbol, X.symbol < oo) with raises(TypeError): XX = given(X, X + 3) def test_random_symbols(): X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) assert set(random_symbols(2*X + 1)) == set((X,)) assert set(random_symbols(2*X + Y)) == set((X, Y)) assert set(random_symbols(2*X + Y.symbol)) == set((X,)) assert set(random_symbols(2)) == set() def test_pspace(): X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) x = Symbol('x') raises(ValueError, lambda: pspace(5 + 3)) raises(ValueError, lambda: pspace(x < 1)) assert pspace(X) == X.pspace assert pspace(2*X + 1) == X.pspace assert pspace(2*X + Y) == IndependentProductPSpace(Y.pspace, X.pspace) def test_rs_swap(): X = Normal('x', 0, 1) Y = Exponential('y', 1) XX = Normal('x', 0, 2) YY = Normal('y', 0, 3) expr = 2*X + Y assert expr.subs(rs_swap((X, Y), (YY, XX))) == 2*XX + YY def test_RandomSymbol(): X = Normal('x', 0, 1) Y = Normal('x', 0, 2) assert X.symbol == Y.symbol assert X != Y assert X.name == X.symbol.name X = Normal('lambda', 0, 1) # make sure we can use protected terms X = Normal('Lambda', 0, 1) # make sure we can use SymPy terms def test_RandomSymbol_diff(): X = Normal('x', 0, 1) assert (2*X).diff(X) def test_random_symbol_no_pspace(): x = RandomSymbol(Symbol('x')) assert x.pspace == PSpace() def test_overlap(): X = Normal('x', 0, 1) Y = Normal('x', 0, 2) raises(ValueError, lambda: P(X > Y)) def test_IndependentProductPSpace(): X = Normal('X', 0, 1) Y = Normal('Y', 0, 1) px = X.pspace py = Y.pspace assert pspace(X + Y) == IndependentProductPSpace(px, py) assert pspace(X + Y) == IndependentProductPSpace(py, px) def test_E(): assert E(5) == 5 def test_H(): X = Normal('X', 0, 1) D = Die('D', sides = 4) G = Geometric('G', 0.5) assert H(X, X > 0) == -log(2)/2 + S(1)/2 + log(pi)/2 assert H(D, D > 2) == log(2) assert comp(H(G).evalf().round(2), 1.39) def test_Sample(): X = Die('X', 6) Y = Normal('Y', 0, 1) z = Symbol('z') assert sample(X) in [1, 2, 3, 4, 5, 6] assert sample(X + Y).is_Float P(X + Y > 0, Y < 0, numsamples=10).is_number assert E(X + Y, numsamples=10).is_number assert variance(X + Y, numsamples=10).is_number raises(ValueError, lambda: P(Y > z, numsamples=5)) assert P(sin(Y) <= 1, numsamples=10) == 1 assert P(sin(Y) <= 1, cos(Y) < 1, numsamples=10) == 1 # Make sure this doesn't raise an error E(Sum(1/z**Y, (z, 1, oo)), Y > 2, numsamples=3) assert all(i in range(1, 7) for i in density(X, numsamples=10)) assert all(i in range(4, 7) for i in density(X, X>3, numsamples=10)) def test_given(): X = Normal('X', 0, 1) Y = Normal('Y', 0, 1) A = given(X, True) B = given(X, Y > 2) assert X == A == B def test_factorial_moment(): X = Poisson('X', 2) Y = Binomial('Y', 2, S.Half) Z = Hypergeometric('Z', 4, 2, 2) assert factorial_moment(X, 2) == 4 assert factorial_moment(Y, 2) == S(1)/2 assert factorial_moment(Z, 2) == S(1)/3 x, y, z, l = symbols('x y z l') Y = Binomial('Y', 2, y) Z = Hypergeometric('Z', 10, 2, 3) assert factorial_moment(Y, l) == y**2*FallingFactorial( 2, l) + 2*y*(1 - y)*FallingFactorial(1, l) + (1 - y)**2*\ FallingFactorial(0, l) assert factorial_moment(Z, l) == 7*FallingFactorial(0, l)/\ 15 + 7*FallingFactorial(1, l)/15 + FallingFactorial(2, l)/15 def test_dependence(): X, Y = Die('X'), Die('Y') assert independent(X, 2*Y) assert not dependent(X, 2*Y) X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) assert independent(X, Y) assert dependent(X, 2*X) # Create a dependency XX, YY = given(Tuple(X, Y), Eq(X + Y, 3)) assert dependent(XX, YY) def test_dependent_finite(): X, Y = Die('X'), Die('Y') # Dependence testing requires symbolic conditions which currently break # finite random variables assert dependent(X, Y + X) XX, YY = given(Tuple(X, Y), X + Y > 5) # Create a dependency assert dependent(XX, YY) def test_normality(): X, Y = Normal('X', 0, 1), Normal('Y', 0, 1) x = Symbol('x', real=True, finite=True) z = Symbol('z', real=True, finite=True) dens = density(X - Y, Eq(X + Y, z)) assert integrate(dens(x), (x, -oo, oo)) == 1 def test_Density(): X = Die('X', 6) d = Density(X) assert d.doit() == density(X) def test_NamedArgsMixin(): class Foo(Basic, NamedArgsMixin): _argnames = 'foo', 'bar' a = Foo(1, 2) assert a.foo == 1 assert a.bar == 2 raises(AttributeError, lambda: a.baz) class Bar(Basic, NamedArgsMixin): pass raises(AttributeError, lambda: Bar(1, 2).foo) def test_density_constant(): assert density(3)(2) == 0 assert density(3)(3) == DiracDelta(0) def test_real(): x = Normal('x', 0, 1) assert x.is_real def test_issue_10052(): X = Exponential('X', 3) assert P(X < oo) == 1 assert P(X > oo) == 0 assert P(X < 2, X > oo) == 0 assert P(X < oo, X > oo) == 0 assert P(X < oo, X > 2) == 1 assert P(X < 3, X == 2) == 0 raises(ValueError, lambda: P(1)) raises(ValueError, lambda: P(X < 1, 2)) def test_issue_11934(): density = {0: .5, 1: .5} X = FiniteRV('X', density) assert E(X) == 0.5 assert P( X>= 2) == 0 def test_issue_8129(): X = Exponential('X', 4) assert P(X >= X) == 1 assert P(X > X) == 0 assert P(X > X+1) == 0 def test_issue_12237(): X = Normal('X', 0, 1) Y = Normal('Y', 0, 1) U = P(X > 0, X) V = P(Y < 0, X) W = P(X + Y > 0, X) assert W == P(X + Y > 0, X) assert U == BernoulliDistribution(S(1)/2, S(0), S(1)) assert V == S(1)/2

d876d2150042ab7dbb915187fe4d7d8c75cb8a0dc43a8a8ecf40c8ee338deb30

from sympy import (FiniteSet, S, Symbol, sqrt, nan, beta, symbols, simplify, Eq, cos, And, Tuple, Or, Dict, sympify, binomial, cancel, exp, I, Piecewise, Sum, Dummy) from sympy.core.compatibility import range from sympy.matrices import Matrix from sympy.stats import (DiscreteUniform, Die, Bernoulli, Coin, Binomial, BetaBinomial, Hypergeometric, Rademacher, P, E, variance, covariance, skewness, sample, density, where, FiniteRV, pspace, cdf, correlation, moment, cmoment, smoment, characteristic_function, moment_generating_function, quantile, kurtosis) from sympy.stats.frv_types import DieDistribution, BinomialDistribution, \ HypergeometricDistribution from sympy.stats.rv import Density from sympy.utilities.pytest import raises oo = S.Infinity def BayesTest(A, B): assert P(A, B) == P(And(A, B)) / P(B) assert P(A, B) == P(B, A) * P(A) / P(B) def test_discreteuniform(): # Symbolic a, b, c, t = symbols('a b c t') X = DiscreteUniform('X', [a, b, c]) assert E(X) == (a + b + c)/3 assert simplify(variance(X) - ((a**2 + b**2 + c**2)/3 - (a/3 + b/3 + c/3)**2)) == 0 assert P(Eq(X, a)) == P(Eq(X, b)) == P(Eq(X, c)) == S('1/3') Y = DiscreteUniform('Y', range(-5, 5)) # Numeric assert E(Y) == S('-1/2') assert variance(Y) == S('33/4') for x in range(-5, 5): assert P(Eq(Y, x)) == S('1/10') assert P(Y <= x) == S(x + 6)/10 assert P(Y >= x) == S(5 - x)/10 assert dict(density(Die('D', 6)).items()) == \ dict(density(DiscreteUniform('U', range(1, 7))).items()) assert characteristic_function(X)(t) == exp(I*a*t)/3 + exp(I*b*t)/3 + exp(I*c*t)/3 assert moment_generating_function(X)(t) == exp(a*t)/3 + exp(b*t)/3 + exp(c*t)/3 def test_dice(): # TODO: Make iid method! X, Y, Z = Die('X', 6), Die('Y', 6), Die('Z', 6) a, b, t, p = symbols('a b t p') assert E(X) == 3 + S.Half assert variance(X) == S(35)/12 assert E(X + Y) == 7 assert E(X + X) == 7 assert E(a*X + b) == a*E(X) + b assert variance(X + Y) == variance(X) + variance(Y) == cmoment(X + Y, 2) assert variance(X + X) == 4 * variance(X) == cmoment(X + X, 2) assert cmoment(X, 0) == 1 assert cmoment(4*X, 3) == 64*cmoment(X, 3) assert covariance(X, Y) == S.Zero assert covariance(X, X + Y) == variance(X) assert density(Eq(cos(X*S.Pi), 1))[True] == S.Half assert correlation(X, Y) == 0 assert correlation(X, Y) == correlation(Y, X) assert smoment(X + Y, 3) == skewness(X + Y) assert smoment(X + Y, 4) == kurtosis(X + Y) assert smoment(X, 0) == 1 assert P(X > 3) == S.Half assert P(2*X > 6) == S.Half assert P(X > Y) == S(5)/12 assert P(Eq(X, Y)) == P(Eq(X, 1)) assert E(X, X > 3) == 5 == moment(X, 1, 0, X > 3) assert E(X, Y > 3) == E(X) == moment(X, 1, 0, Y > 3) assert E(X + Y, Eq(X, Y)) == E(2*X) assert moment(X, 0) == 1 assert moment(5*X, 2) == 25*moment(X, 2) assert quantile(X)(p) == Piecewise((nan, (p > S.One) | (p < S(0))),\ (S.One, p <= S(1)/6), (S(2), p <= S(1)/3), (S(3), p <= S.Half),\ (S(4), p <= S(2)/3), (S(5), p <= S(5)/6), (S(6), p <= S.One)) assert P(X > 3, X > 3) == S.One assert P(X > Y, Eq(Y, 6)) == S.Zero assert P(Eq(X + Y, 12)) == S.One/36 assert P(Eq(X + Y, 12), Eq(X, 6)) == S.One/6 assert density(X + Y) == density(Y + Z) != density(X + X) d = density(2*X + Y**Z) assert d[S(22)] == S.One/108 and d[S(4100)] == S.One/216 and S(3130) not in d assert pspace(X).domain.as_boolean() == Or( *[Eq(X.symbol, i) for i in [1, 2, 3, 4, 5, 6]]) assert where(X > 3).set == FiniteSet(4, 5, 6) assert characteristic_function(X)(t) == exp(6*I*t)/6 + exp(5*I*t)/6 + exp(4*I*t)/6 + exp(3*I*t)/6 + exp(2*I*t)/6 + exp(I*t)/6 assert moment_generating_function(X)(t) == exp(6*t)/6 + exp(5*t)/6 + exp(4*t)/6 + exp(3*t)/6 + exp(2*t)/6 + exp(t)/6 # Bayes test for die BayesTest(X > 3, X + Y < 5) BayesTest(Eq(X - Y, Z), Z > Y) BayesTest(X > 3, X > 2) # arg test for die raises(ValueError, lambda: Die('X', -1)) # issue 8105: negative sides. raises(ValueError, lambda: Die('X', 0)) raises(ValueError, lambda: Die('X', 1.5)) # issue 8103: non integer sides. # symbolic test for die n, k = symbols('n, k', positive=True) D = Die('D', n) dens = density(D).dict assert dens == Density(DieDistribution(n)) assert set(dens.subs(n, 4).doit().keys()) == set([1, 2, 3, 4]) assert set(dens.subs(n, 4).doit().values()) == set([S(1)/4]) k = Dummy('k', integer=True) assert E(D).dummy_eq( Sum(Piecewise((k/n, (k >= 1) & (k <= n)), (0, True)), (k, 1, n))) assert variance(D).subs(n, 6).doit() == S(35)/12 ki = Dummy('ki') cumuf = cdf(D)(k) assert cumuf.dummy_eq( Sum(Piecewise((1/n, (ki >= 1) & (ki <= n)), (0, True)), (ki, 1, k))) assert cumuf.subs({n: 6, k: 2}).doit() == S(1)/3 t = Dummy('t') cf = characteristic_function(D)(t) assert cf.dummy_eq( Sum(Piecewise((exp(ki*I*t)/n, (ki >= 1) & (ki <= n)), (0, True)), (ki, 1, n))) assert cf.subs(n, 3).doit() == exp(3*I*t)/3 + exp(2*I*t)/3 + exp(I*t)/3 mgf = moment_generating_function(D)(t) assert mgf.dummy_eq( Sum(Piecewise((exp(ki*t)/n, (ki >= 1) & (ki <= n)), (0, True)), (ki, 1, n))) assert mgf.subs(n, 3).doit() == exp(3*t)/3 + exp(2*t)/3 + exp(t)/3 def test_given(): X = Die('X', 6) assert density(X, X > 5) == {S(6): S(1)} assert where(X > 2, X > 5).as_boolean() == Eq(X.symbol, 6) assert sample(X, X > 5) == 6 def test_domains(): X, Y = Die('x', 6), Die('y', 6) x, y = X.symbol, Y.symbol # Domains d = where(X > Y) assert d.condition == (x > y) d = where(And(X > Y, Y > 3)) assert d.as_boolean() == Or(And(Eq(x, 5), Eq(y, 4)), And(Eq(x, 6), Eq(y, 5)), And(Eq(x, 6), Eq(y, 4))) assert len(d.elements) == 3 assert len(pspace(X + Y).domain.elements) == 36 Z = Die('x', 4) raises(ValueError, lambda: P(X > Z)) # Two domains with same internal symbol assert pspace(X + Y).domain.set == FiniteSet(1, 2, 3, 4, 5, 6)**2 assert where(X > 3).set == FiniteSet(4, 5, 6) assert X.pspace.domain.dict == FiniteSet( *[Dict({X.symbol: i}) for i in range(1, 7)]) assert where(X > Y).dict == FiniteSet(*[Dict({X.symbol: i, Y.symbol: j}) for i in range(1, 7) for j in range(1, 7) if i > j]) def test_bernoulli(): p, a, b, t = symbols('p a b t') X = Bernoulli('B', p, a, b) assert E(X) == a*p + b*(-p + 1) assert density(X)[a] == p assert density(X)[b] == 1 - p assert characteristic_function(X)(t) == p * exp(I * a * t) + (-p + 1) * exp(I * b * t) assert moment_generating_function(X)(t) == p * exp(a * t) + (-p + 1) * exp(b * t) X = Bernoulli('B', p, 1, 0) z = Symbol("z") assert E(X) == p assert simplify(variance(X)) == p*(1 - p) assert E(a*X + b) == a*E(X) + b assert simplify(variance(a*X + b)) == simplify(a**2 * variance(X)) assert quantile(X)(z) == Piecewise((nan, (z > 1) | (z < 0)), (0, z <= 1 - p), (1, z <= 1)) raises(ValueError, lambda: Bernoulli('B', 1.5)) raises(ValueError, lambda: Bernoulli('B', -0.5)) def test_cdf(): D = Die('D', 6) o = S.One assert cdf( D) == sympify({1: o/6, 2: o/3, 3: o/2, 4: 2*o/3, 5: 5*o/6, 6: o}) def test_coins(): C, D = Coin('C'), Coin('D') H, T = symbols('H, T') assert P(Eq(C, D)) == S.Half assert density(Tuple(C, D)) == {(H, H): S.One/4, (H, T): S.One/4, (T, H): S.One/4, (T, T): S.One/4} assert dict(density(C).items()) == {H: S.Half, T: S.Half} F = Coin('F', S.One/10) assert P(Eq(F, H)) == S(1)/10 d = pspace(C).domain assert d.as_boolean() == Or(Eq(C.symbol, H), Eq(C.symbol, T)) raises(ValueError, lambda: P(C > D)) # Can't intelligently compare H to T def test_binomial_verify_parameters(): raises(ValueError, lambda: Binomial('b', .2, .5)) raises(ValueError, lambda: Binomial('b', 3, 1.5)) def test_binomial_numeric(): nvals = range(5) pvals = [0, S(1)/4, S.Half, S(3)/4, 1] for n in nvals: for p in pvals: X = Binomial('X', n, p) assert E(X) == n*p assert variance(X) == n*p*(1 - p) if n > 0 and 0 < p < 1: assert skewness(X) == (1 - 2*p)/sqrt(n*p*(1 - p)) assert kurtosis(X) == 3 + (1 - 6*p*(1 - p))/(n*p*(1 - p)) for k in range(n + 1): assert P(Eq(X, k)) == binomial(n, k)*p**k*(1 - p)**(n - k) def test_binomial_quantile(): X = Binomial('X', 50, S.Half) assert quantile(X)(0.95) == S(31) X = Binomial('X', 5, S(1)/2) p = Symbol("p", positive=True) assert quantile(X)(p) == Piecewise((nan, p > S(1)), (S(0), p <= S(1)/32),\ (S(1), p <= S(3)/16), (S(2), p <= S(1)/2), (S(3), p <= S(13)/16),\ (S(4), p <= S(31)/32), (S(5), p <= S(1))) def test_binomial_symbolic(): n = 2 p = symbols('p', positive=True) X = Binomial('X', n, p) t = Symbol('t') assert simplify(E(X)) == n*p == simplify(moment(X, 1)) assert simplify(variance(X)) == n*p*(1 - p) == simplify(cmoment(X, 2)) assert cancel((skewness(X) - (1 - 2*p)/sqrt(n*p*(1 - p)))) == 0 assert cancel((kurtosis(X)) - (3 + (1 - 6*p*(1 - p))/(n*p*(1 - p)))) == 0 assert characteristic_function(X)(t) == p ** 2 * exp(2 * I * t) + 2 * p * (-p + 1) * exp(I * t) + (-p + 1) ** 2 assert moment_generating_function(X)(t) == p ** 2 * exp(2 * t) + 2 * p * (-p + 1) * exp(t) + (-p + 1) ** 2 # Test ability to change success/failure winnings H, T = symbols('H T') Y = Binomial('Y', n, p, succ=H, fail=T) assert simplify(E(Y) - (n*(H*p + T*(1 - p)))) == 0 # test symbolic dimensions n = symbols('n') B = Binomial('B', n, p) raises(NotImplementedError, lambda: P(B > 2)) assert density(B).dict == Density(BinomialDistribution(n, p, 1, 0)) assert set(density(B).dict.subs(n, 4).doit().keys()) == \ set([S(0), S(1), S(2), S(3), S(4)]) assert set(density(B).dict.subs(n, 4).doit().values()) == \ set([(1 - p)**4, 4*p*(1 - p)**3, 6*p**2*(1 - p)**2, 4*p**3*(1 - p), p**4]) k = Dummy('k', integer=True) assert E(B > 2).dummy_eq( Sum(Piecewise((k*p**k*(1 - p)**(-k + n)*binomial(n, k), (k >= 0) & (k <= n) & (k > 2)), (0, True)), (k, 0, n))) def test_beta_binomial(): # verify parameters raises(ValueError, lambda: BetaBinomial('b', .2, 1, 2)) raises(ValueError, lambda: BetaBinomial('b', 2, -1, 2)) raises(ValueError, lambda: BetaBinomial('b', 2, 1, -2)) assert BetaBinomial('b', 2, 1, 1) # test numeric values nvals = range(1,5) alphavals = [S(1)/4, S.Half, S(3)/4, 1, 10] betavals = [S(1)/4, S.Half, S(3)/4, 1, 10] for n in nvals: for a in alphavals: for b in betavals: X = BetaBinomial('X', n, a, b) assert E(X) == moment(X, 1) assert variance(X) == cmoment(X, 2) # test symbolic n, a, b = symbols('a b n') assert BetaBinomial('x', n, a, b) n = 2 # Because we're using for loops, can't do symbolic n a, b = symbols('a b', positive=True) X = BetaBinomial('X', n, a, b) t = Symbol('t') assert E(X).expand() == moment(X, 1).expand() assert variance(X).expand() == cmoment(X, 2).expand() assert skewness(X) == smoment(X, 3) assert characteristic_function(X)(t) == exp(2*I*t)*beta(a + 2, b)/beta(a, b) +\ 2*exp(I*t)*beta(a + 1, b + 1)/beta(a, b) + beta(a, b + 2)/beta(a, b) assert moment_generating_function(X)(t) == exp(2*t)*beta(a + 2, b)/beta(a, b) +\ 2*exp(t)*beta(a + 1, b + 1)/beta(a, b) + beta(a, b + 2)/beta(a, b) def test_hypergeometric_numeric(): for N in range(1, 5): for m in range(0, N + 1): for n in range(1, N + 1): X = Hypergeometric('X', N, m, n) N, m, n = map(sympify, (N, m, n)) assert sum(density(X).values()) == 1 assert E(X) == n * m / N if N > 1: assert variance(X) == n*(m/N)*(N - m)/N*(N - n)/(N - 1) # Only test for skewness when defined if N > 2 and 0 < m < N and n < N: assert skewness(X) == simplify((N - 2*m)*sqrt(N - 1)*(N - 2*n) / (sqrt(n*m*(N - m)*(N - n))*(N - 2))) def test_hypergeometric_symbolic(): N, m, n = symbols('N, m, n') H = Hypergeometric('H', N, m, n) dens = density(H).dict expec = E(H > 2) assert dens == Density(HypergeometricDistribution(N, m, n)) assert dens.subs(N, 5).doit() == Density(HypergeometricDistribution(5, m, n)) assert set(dens.subs({N: 3, m: 2, n: 1}).doit().keys()) == set([S(0), S(1)]) assert set(dens.subs({N: 3, m: 2, n: 1}).doit().values()) == set([S(1)/3, S(2)/3]) k = Dummy('k', integer=True) assert expec.dummy_eq( Sum(Piecewise((k*binomial(m, k)*binomial(N - m, -k + n) /binomial(N, n), k > 2), (0, True)), (k, 0, n))) def test_rademacher(): X = Rademacher('X') t = Symbol('t') assert E(X) == 0 assert variance(X) == 1 assert density(X)[-1] == S.Half assert density(X)[1] == S.Half assert characteristic_function(X)(t) == exp(I*t)/2 + exp(-I*t)/2 assert moment_generating_function(X)(t) == exp(t) / 2 + exp(-t) / 2 def test_FiniteRV(): F = FiniteRV('F', {1: S.Half, 2: S.One/4, 3: S.One/4}) p = Symbol("p", positive=True) assert dict(density(F).items()) == {S(1): S.Half, S(2): S.One/4, S(3): S.One/4} assert P(F >= 2) == S.Half assert quantile(F)(p) == Piecewise((nan, p > S.One), (S.One, p <= S.Half),\ (S(2), p <= S(3)/4),(S(3), True)) assert pspace(F).domain.as_boolean() == Or( *[Eq(F.symbol, i) for i in [1, 2, 3]]) raises(ValueError, lambda: FiniteRV('F', {1: S.Half, 2: S.Half, 3: S.Half})) raises(ValueError, lambda: FiniteRV('F', {1: S.Half, 2: S(-1)/2, 3: S.One})) raises(ValueError, lambda: FiniteRV('F', {1: S.One, 2: S(3)/2, 3: S.Zero,\ 4: S(-1)/2, 5: S(-3)/4, 6: S(-1)/4})) def test_density_call(): from sympy.abc import p x = Bernoulli('x', p) d = density(x) assert d(0) == 1 - p assert d(S.Zero) == 1 - p assert d(5) == 0 assert 0 in d assert 5 not in d assert d(S(0)) == d[S(0)] def test_DieDistribution(): from sympy.abc import x X = DieDistribution(6) assert X.pmf(S(1)/2) == S.Zero assert X.pmf(x).subs({x: 1}).doit() == S(1)/6 assert X.pmf(x).subs({x: 7}).doit() == 0 assert X.pmf(x).subs({x: -1}).doit() == 0 assert X.pmf(x).subs({x: S(1)/3}).doit() == 0 raises(ValueError, lambda: X.pmf(Matrix([0, 0]))) raises(ValueError, lambda: X.pmf(x**2 - 1)) def test_FinitePSpace(): X = Die('X', 6) space = pspace(X) assert space.density == DieDistribution(6) def test_symbolic_conditions(): B = Bernoulli('B', S(1)/4) D = Die('D', 4) b, n = symbols('b, n') Y = P(Eq(B, b)) Z = E(D > n) assert Y == \ Piecewise((S(1)/4, Eq(b, 1)), (0, True)) + \ Piecewise((S(3)/4, Eq(b, 0)), (0, True)) assert Z == \ Piecewise((S(1)/4, n < 1), (0, True)) + Piecewise((S(1)/2, n < 2), (0, True)) + \ Piecewise((S(3)/4, n < 3), (0, True)) + Piecewise((S(1), n < 4), (0, True))

fb60e82cf46576451448a5fa39dc4a5631c092cec84b2fc0f060ddcfd6257f06

from sympy import (symbols, pi, oo, S, exp, sqrt, besselk, Indexed, Sum, simplify, Rational, factorial, gamma, Piecewise, Eq, Product, IndexedBase, RisingFactorial) from sympy.core.numbers import comp from sympy.integrals.integrals import integrate from sympy.matrices import Matrix from sympy.stats import density from sympy.stats.crv_types import Normal from sympy.stats.joint_rv import marginal_distribution from sympy.stats.joint_rv_types import JointRV from sympy.utilities.pytest import raises, XFAIL x, y, z, a, b = symbols('x y z a b') def test_Normal(): m = Normal('A', [1, 2], [[1, 0], [0, 1]]) assert density(m)(1, 2) == 1/(2*pi) raises (ValueError, lambda:m[2]) raises (ValueError,\ lambda: Normal('M',[1, 2], [[0, 0], [0, 1]])) n = Normal('B', [1, 2, 3], [[1, 0, 0], [0, 1, 0], [0, 0, 1]]) p = Normal('C', Matrix([1, 2]), Matrix([[1, 0], [0, 1]])) assert density(m)(x, y) == density(p)(x, y) assert marginal_distribution(n, 0, 1)(1, 2) == 1/(2*pi) assert integrate(density(m)(x, y), (x, -oo, oo), (y, -oo, oo)).evalf() == 1 N = Normal('N', [1, 2], [[x, 0], [0, y]]) assert density(N)(0, 0) == exp(-2/y - 1/(2*x))/(2*pi*sqrt(x*y)) raises (ValueError, lambda: Normal('M', [1, 2], [[1, 1], [1, -1]])) def test_MultivariateTDist(): from sympy.stats.joint_rv_types import MultivariateT t1 = MultivariateT('T', [0, 0], [[1, 0], [0, 1]], 2) assert(density(t1))(1, 1) == 1/(8*pi) assert integrate(density(t1)(x, y), (x, -oo, oo), \ (y, -oo, oo)).evalf() == 1 raises(ValueError, lambda: MultivariateT('T', [1, 2], [[1, 1], [1, -1]], 1)) t2 = MultivariateT('t2', [1, 2], [[x, 0], [0, y]], 1) assert density(t2)(1, 2) == 1/(2*pi*sqrt(x*y)) def test_multivariate_laplace(): from sympy.stats.crv_types import Laplace raises(ValueError, lambda: Laplace('T', [1, 2], [[1, 2], [2, 1]])) L = Laplace('L', [1, 0], [[1, 2], [0, 1]]) assert density(L)(2, 3) == exp(2)*besselk(0, sqrt(3))/pi L1 = Laplace('L1', [1, 2], [[x, 0], [0, y]]) assert density(L1)(0, 1) == \ exp(2/y)*besselk(0, sqrt((2 + 4/y + 1/x)/y))/(pi*sqrt(x*y)) def test_NormalGamma(): from sympy.stats.joint_rv_types import NormalGamma from sympy import gamma ng = NormalGamma('G', 1, 2, 3, 4) assert density(ng)(1, 1) == 32*exp(-4)/sqrt(pi) raises(ValueError, lambda:NormalGamma('G', 1, 2, 3, -1)) assert marginal_distribution(ng, 0)(1) == \ 3*sqrt(10)*gamma(S(7)/4)/(10*sqrt(pi)*gamma(S(5)/4)) assert marginal_distribution(ng, y)(1) == exp(-S(1)/4)/128 def test_GeneralizedMultivariateLogGammaDistribution(): from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGammaOmega as GMVLGO from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGamma as GMVLG h = S.Half omega = Matrix([[1, h, h, h], [h, 1, h, h], [h, h, 1, h], [h, h, h, 1]]) v, l, mu = (4, [1, 2, 3, 4], [1, 2, 3, 4]) y_1, y_2, y_3, y_4 = symbols('y_1:5', real=True) delta = symbols('d', positive=True) G = GMVLGO('G', omega, v, l, mu) Gd = GMVLG('Gd', delta, v, l, mu) dend = ("d**4*Sum(4*24**(-n - 4)*(1 - d)**n*exp((n + 4)*(y_1 + 2*y_2 + 3*y_3 " "+ 4*y_4) - exp(y_1) - exp(2*y_2)/2 - exp(3*y_3)/3 - exp(4*y_4)/4)/" "(gamma(n + 1)*gamma(n + 4)**3), (n, 0, oo))") assert str(density(Gd)(y_1, y_2, y_3, y_4)) == dend den = ("5*2**(2/3)*5**(1/3)*Sum(4*24**(-n - 4)*(-2**(2/3)*5**(1/3)/4 + 1)**n*" "exp((n + 4)*(y_1 + 2*y_2 + 3*y_3 + 4*y_4) - exp(y_1) - exp(2*y_2)/2 - " "exp(3*y_3)/3 - exp(4*y_4)/4)/(gamma(n + 1)*gamma(n + 4)**3), (n, 0, oo))/64") assert str(density(G)(y_1, y_2, y_3, y_4)) == den marg = ("5*2**(2/3)*5**(1/3)*exp(4*y_1)*exp(-exp(y_1))*Integral(exp(-exp(4*G[3])" "/4)*exp(16*G[3])*Integral(exp(-exp(3*G[2])/3)*exp(12*G[2])*Integral(exp(" "-exp(2*G[1])/2)*exp(8*G[1])*Sum((-1/4)**n*24**(-n)*(-4 + 2**(2/3)*5**(1/3" "))**n*exp(n*y_1)*exp(2*n*G[1])*exp(3*n*G[2])*exp(4*n*G[3])/(gamma(n + 1)" "*gamma(n + 4)**3), (n, 0, oo)), (G[1], -oo, oo)), (G[2], -oo, oo)), (G[3]" ", -oo, oo))/5308416") assert str(marginal_distribution(G, G[0])(y_1)) == marg omega_f1 = Matrix([[1, h, h]]) omega_f2 = Matrix([[1, h, h, h], [h, 1, 2, h], [h, h, 1, h], [h, h, h, 1]]) omega_f3 = Matrix([[6, h, h, h], [h, 1, 2, h], [h, h, 1, h], [h, h, h, 1]]) v_f = symbols("v_f", positive=False, real=True) l_f = [1, 2, v_f, 4] m_f = [v_f, 2, 3, 4] omega_f4 = Matrix([[1, h, h, h, h], [h, 1, h, h, h], [h, h, 1, h, h], [h, h, h, 1, h], [h, h, h, h, 1]]) l_f1 = [1, 2, 3, 4, 5] omega_f5 = Matrix([[1]]) mu_f5 = l_f5 = [1] raises(ValueError, lambda: GMVLGO('G', omega_f1, v, l, mu)) raises(ValueError, lambda: GMVLGO('G', omega_f2, v, l, mu)) raises(ValueError, lambda: GMVLGO('G', omega_f3, v, l, mu)) raises(ValueError, lambda: GMVLGO('G', omega, v_f, l, mu)) raises(ValueError, lambda: GMVLGO('G', omega, v, l_f, mu)) raises(ValueError, lambda: GMVLGO('G', omega, v, l, m_f)) raises(ValueError, lambda: GMVLGO('G', omega_f4, v, l, mu)) raises(ValueError, lambda: GMVLGO('G', omega, v, l_f1, mu)) raises(ValueError, lambda: GMVLGO('G', omega_f5, v, l_f5, mu_f5)) raises(ValueError, lambda: GMVLG('G', Rational(3, 2), v, l, mu)) def test_MultivariateBeta(): from sympy.stats.joint_rv_types import MultivariateBeta from sympy import gamma a1, a2 = symbols('a1, a2', positive=True) a1_f, a2_f = symbols('a1, a2', positive=False, real=True) mb = MultivariateBeta('B', [a1, a2]) mb_c = MultivariateBeta('C', a1, a2) assert density(mb)(1, 2) == S(2)**(a2 - 1)*gamma(a1 + a2)/\ (gamma(a1)*gamma(a2)) assert marginal_distribution(mb_c, 0)(3) == S(3)**(a1 - 1)*gamma(a1 + a2)/\ (a2*gamma(a1)*gamma(a2)) raises(ValueError, lambda: MultivariateBeta('b1', [a1_f, a2])) raises(ValueError, lambda: MultivariateBeta('b2', [a1, a2_f])) raises(ValueError, lambda: MultivariateBeta('b3', [0, 0])) raises(ValueError, lambda: MultivariateBeta('b4', [a1_f, a2_f])) def test_MultivariateEwens(): from sympy.stats.joint_rv_types import MultivariateEwens n, theta, i = symbols('n theta i', positive=True) # tests for integer dimensions theta_f = symbols('t_f', negative=True) a = symbols('a_1:4', positive = True, integer = True) ed = MultivariateEwens('E', 3, theta) assert density(ed)(a[0], a[1], a[2]) == Piecewise((6*2**(-a[1])*3**(-a[2])* theta**a[0]*theta**a[1]*theta**a[2]/ (theta*(theta + 1)*(theta + 2)* factorial(a[0])*factorial(a[1])* factorial(a[2])), Eq(a[0] + 2*a[1] + 3*a[2], 3)), (0, True)) assert marginal_distribution(ed, ed[1])(a[1]) == Piecewise((6*2**(-a[1])* theta**a[1]/((theta + 1)* (theta + 2)*factorial(a[1])), Eq(2*a[1] + 1, 3)), (0, True)) raises(ValueError, lambda: MultivariateEwens('e1', 5, theta_f)) # tests for symbolic dimensions eds = MultivariateEwens('E', n, theta) a = IndexedBase('a') j, k = symbols('j, k') den = Piecewise((factorial(n)*Product(theta**a[j]*(j + 1)**(-a[j])/ factorial(a[j]), (j, 0, n - 1))/RisingFactorial(theta, n), Eq(n, Sum((k + 1)*a[k], (k, 0, n - 1)))), (0, True)) assert density(eds)(a).dummy_eq(den) def test_Multinomial(): from sympy.stats.joint_rv_types import Multinomial n, x1, x2, x3, x4 = symbols('n, x1, x2, x3, x4', nonnegative=True, integer=True) p1, p2, p3, p4 = symbols('p1, p2, p3, p4', positive=True) p1_f, n_f = symbols('p1_f, n_f', negative=True) M = Multinomial('M', n, [p1, p2, p3, p4]) C = Multinomial('C', 3, p1, p2, p3) f = factorial assert density(M)(x1, x2, x3, x4) == Piecewise((p1**x1*p2**x2*p3**x3*p4**x4* f(n)/(f(x1)*f(x2)*f(x3)*f(x4)), Eq(n, x1 + x2 + x3 + x4)), (0, True)) assert marginal_distribution(C, C[0])(x1).subs(x1, 1) ==\ 3*p1*p2**2 +\ 6*p1*p2*p3 +\ 3*p1*p3**2 raises(ValueError, lambda: Multinomial('b1', 5, [p1, p2, p3, p1_f])) raises(ValueError, lambda: Multinomial('b2', n_f, [p1, p2, p3, p4])) raises(ValueError, lambda: Multinomial('b3', n, 0.5, 0.4, 0.3, 0.1)) def test_NegativeMultinomial(): from sympy.stats.joint_rv_types import NegativeMultinomial k0, x1, x2, x3, x4 = symbols('k0, x1, x2, x3, x4', nonnegative=True, integer=True) p1, p2, p3, p4 = symbols('p1, p2, p3, p4', positive=True) p1_f = symbols('p1_f', negative=True) N = NegativeMultinomial('N', 4, [p1, p2, p3, p4]) C = NegativeMultinomial('C', 4, 0.1, 0.2, 0.3) g = gamma f = factorial assert simplify(density(N)(x1, x2, x3, x4) - p1**x1*p2**x2*p3**x3*p4**x4*(-p1 - p2 - p3 - p4 + 1)**4*g(x1 + x2 + x3 + x4 + 4)/(6*f(x1)*f(x2)*f(x3)*f(x4))) == S(0) assert comp(marginal_distribution(C, C[0])(1).evalf(), 0.33, .01) raises(ValueError, lambda: NegativeMultinomial('b1', 5, [p1, p2, p3, p1_f])) raises(ValueError, lambda: NegativeMultinomial('b2', k0, 0.5, 0.4, 0.3, 0.4)) def test_JointPSpace_marginal_distribution(): from sympy.stats.joint_rv_types import MultivariateT from sympy import polar_lift T = MultivariateT('T', [0, 0], [[1, 0], [0, 1]], 2) assert marginal_distribution(T, T[1])(x) == sqrt(2)*(x**2 + 2)/( 8*polar_lift(x**2/2 + 1)**(S(5)/2)) assert integrate(marginal_distribution(T, 1)(x), (x, -oo, oo)) == 1 t = MultivariateT('T', [0, 0, 0], [[1, 0, 0], [0, 1, 0], [0, 0, 1]], 3) assert comp(marginal_distribution(t, 0)(1).evalf(), 0.2, .01) def test_JointRV(): from sympy.stats.joint_rv import JointDistributionHandmade x1, x2 = (Indexed('x', i) for i in (1, 2)) pdf = exp(-x1**2/2 + x1 - x2**2/2 - S(1)/2)/(2*pi) X = JointRV('x', pdf) assert density(X)(1, 2) == exp(-2)/(2*pi) assert isinstance(X.pspace.distribution, JointDistributionHandmade) assert marginal_distribution(X, 0)(2) == sqrt(2)*exp(-S(1)/2)/(2*sqrt(pi)) def test_expectation(): from sympy import simplify from sympy.stats import E m = Normal('A', [x, y], [[1, 0], [0, 1]]) assert simplify(E(m[1])) == y @XFAIL def test_joint_vector_expectation(): from sympy.stats import E m = Normal('A', [x, y], [[1, 0], [0, 1]]) assert E(m) == (x, y)

017b0a5002dfda53f17054e80ba62c258a397f80863da56efbb540dafaa94f47

from sympy import (S, symbols, FiniteSet, Eq, Matrix, MatrixSymbol, Float, And, ImmutableMatrix, Ne, Lt, Gt, exp, Not) from sympy.stats import (DiscreteMarkovChain, P, TransitionMatrixOf, E, StochasticStateSpaceOf, variance, ContinuousMarkovChain) from sympy.stats.joint_rv import JointDistribution from sympy.stats.rv import RandomIndexedSymbol from sympy.stats.symbolic_probability import Probability, Expectation from sympy.utilities.pytest import raises def test_DiscreteMarkovChain(): # pass only the name X = DiscreteMarkovChain("X") assert X.state_space == S.Reals assert X.index_set == S.Naturals0 assert X.transition_probabilities == None t = symbols('t', positive=True, integer=True) assert isinstance(X[t], RandomIndexedSymbol) assert E(X[0]) == Expectation(X[0]) raises(TypeError, lambda: DiscreteMarkovChain(1)) raises(NotImplementedError, lambda: X(t)) # pass name and state_space Y = DiscreteMarkovChain("Y", [1, 2, 3]) assert Y.transition_probabilities == None assert Y.state_space == FiniteSet(1, 2, 3) assert P(Eq(Y[2], 1), Eq(Y[0], 2)) == Probability(Eq(Y[2], 1), Eq(Y[0], 2)) assert E(X[0]) == Expectation(X[0]) raises(TypeError, lambda: DiscreteMarkovChain("Y", dict((1, 1)))) # pass name, state_space and transition_probabilities T = Matrix([[0.5, 0.2, 0.3],[0.2, 0.5, 0.3],[0.2, 0.3, 0.5]]) TS = MatrixSymbol('T', 3, 3) Y = DiscreteMarkovChain("Y", [0, 1, 2], T) YS = DiscreteMarkovChain("Y", [0, 1, 2], TS) assert YS._transient2transient() == None assert YS._transient2absorbing() == None assert Y.joint_distribution(1, Y[2], 3) == JointDistribution(Y[1], Y[2], Y[3]) raises(ValueError, lambda: Y.joint_distribution(Y[1].symbol, Y[2].symbol)) assert P(Eq(Y[3], 2), Eq(Y[1], 1)).round(2) == Float(0.36, 2) assert str(P(Eq(YS[3], 2), Eq(YS[1], 1))) == \ "T[0, 2]*T[1, 0] + T[1, 1]*T[1, 2] + T[1, 2]*T[2, 2]" assert P(Eq(YS[1], 1), Eq(YS[2], 2)) == Probability(Eq(YS[1], 1)) assert P(Eq(YS[3], 3), Eq(YS[1], 1)) == S.Zero TO = Matrix([[0.25, 0.75, 0],[0, 0.25, 0.75],[0.75, 0, 0.25]]) assert P(Eq(Y[3], 2), Eq(Y[1], 1) & TransitionMatrixOf(Y, TO)).round(3) == Float(0.375, 3) assert E(Y[3], evaluate=False) == Expectation(Y[3]) assert E(Y[3], Eq(Y[2], 1)).round(2) == Float(1.1, 3) TSO = MatrixSymbol('T', 4, 4) raises(ValueError, lambda: str(P(Eq(YS[3], 2), Eq(YS[1], 1) & TransitionMatrixOf(YS, TSO)))) raises(TypeError, lambda: DiscreteMarkovChain("Z", [0, 1, 2], symbols('M'))) raises(ValueError, lambda: DiscreteMarkovChain("Z", [0, 1, 2], MatrixSymbol('T', 3, 4))) raises(ValueError, lambda: E(Y[3], Eq(Y[2], 6))) raises(ValueError, lambda: E(Y[2], Eq(Y[3], 1))) # extended tests for probability queries TO1 = Matrix([[S(1)/4, S(3)/4, 0],[S(1)/3, S(1)/3, S(1)/3],[0, S(1)/4, S(3)/4]]) assert P(And(Eq(Y[2], 1), Eq(Y[1], 1), Eq(Y[0], 0)), Eq(Probability(Eq(Y[0], 0)), S(1)/4) & TransitionMatrixOf(Y, TO1)) == S(1)/16 assert P(And(Eq(Y[2], 1), Eq(Y[1], 1), Eq(Y[0], 0)), TransitionMatrixOf(Y, TO1)) == \ Probability(Eq(Y[0], 0))/4 assert P(Lt(X[1], 2) & Gt(X[1], 0), Eq(X[0], 2) & StochasticStateSpaceOf(X, [0, 1, 2]) & TransitionMatrixOf(X, TO1)) == S(1)/4 assert P(Ne(X[1], 2) & Ne(X[1], 1), Eq(X[0], 2) & StochasticStateSpaceOf(X, [0, 1, 2]) & TransitionMatrixOf(X, TO1)) == S(0) assert P(And(Eq(Y[2], 1), Eq(Y[1], 1), Eq(Y[0], 0)), Eq(Y[1], 1)) == 0.1*Probability(Eq(Y[0], 0)) # testing properties of Markov chain TO2 = Matrix([[S(1), 0, 0],[S(1)/3, S(1)/3, S(1)/3],[0, S(1)/4, S(3)/4]]) TO3 = Matrix([[S(1)/4, S(3)/4, 0],[S(1)/3, S(1)/3, S(1)/3],[0, S(1)/4, S(3)/4]]) Y2 = DiscreteMarkovChain('Y', trans_probs=TO2) Y3 = DiscreteMarkovChain('Y', trans_probs=TO3) assert Y3._transient2absorbing() == None raises (ValueError, lambda: Y3.fundamental_matrix()) assert Y2.is_absorbing_chain() == True assert Y3.is_absorbing_chain() == False TO4 = Matrix([[S(1)/5, S(2)/5, S(2)/5], [S(1)/10, S(1)/2, S(2)/5], [S(3)/5, S(3)/10, S(1)/10]]) Y4 = DiscreteMarkovChain('Y', trans_probs=TO4) w = ImmutableMatrix([[S(11)/39, S(16)/39, S(4)/13]]) assert Y4.limiting_distribution == w assert Y4.is_regular() == True TS1 = MatrixSymbol('T', 3, 3) Y5 = DiscreteMarkovChain('Y', trans_probs=TS1) assert Y5.limiting_distribution(w, TO4).doit() == True TO6 = Matrix([[S(1), 0, 0, 0, 0],[S(1)/2, 0, S(1)/2, 0, 0],[0, S(1)/2, 0, S(1)/2, 0], [0, 0, S(1)/2, 0, S(1)/2], [0, 0, 0, 0, 1]]) Y6 = DiscreteMarkovChain('Y', trans_probs=TO6) assert Y6._transient2absorbing() == ImmutableMatrix([[S(1)/2, 0], [0, 0], [0, S(1)/2]]) assert Y6._transient2transient() == ImmutableMatrix([[0, S(1)/2, 0], [S(1)/2, 0, S(1)/2], [0, S(1)/2, 0]]) assert Y6.fundamental_matrix() == ImmutableMatrix([[S(3)/2, S(1), S(1)/2], [S(1), S(2), S(1)], [S(1)/2, S(1), S(3)/2]]) assert Y6.absorbing_probabilites() == ImmutableMatrix([[S(3)/4, S(1)/4], [S(1)/2, S(1)/2], [S(1)/4, S(3)/4]]) # testing miscellaneous queries T = Matrix([[S(1)/2, S(1)/4, S(1)/4], [S(1)/3, 0, S(2)/3], [S(1)/2, S(1)/2, 0]]) X = DiscreteMarkovChain('X', [0, 1, 2], T) assert P(Eq(X[1], 2) & Eq(X[2], 1) & Eq(X[3], 0), Eq(P(Eq(X[1], 0)), S(1)/4) & Eq(P(Eq(X[1], 1)), S(1)/4)) == S(1)/12 assert P(Eq(X[2], 1) | Eq(X[2], 2), Eq(X[1], 1)) == S(2)/3 assert P(Eq(X[2], 1) & Eq(X[2], 2), Eq(X[1], 1)) == S(0) assert P(Ne(X[2], 2), Eq(X[1], 1)) == S(1)/3 assert E(X[1]**2, Eq(X[0], 1)) == S(8)/3 assert variance(X[1], Eq(X[0], 1)) == S(8)/9 raises(ValueError, lambda: E(X[1], Eq(X[2], 1))) def test_ContinuousMarkovChain(): T1 = Matrix([[S(-2), S(2), S(0)], [S(0), S(-1), S(1)], [S(3)/2, S(3)/2, S(-3)]]) C1 = ContinuousMarkovChain('C', [0, 1, 2], T1) assert C1.limiting_distribution() == ImmutableMatrix([[S(3)/19, S(12)/19, S(4)/19]]) T2 = Matrix([[-S(1), S(1), S(0)], [S(1), -S(1), S(0)], [S(0), S(1), -S(1)]]) C2 = ContinuousMarkovChain('C', [0, 1, 2], T2) A, t = C2.generator_matrix, symbols('t', positive=True) assert C2.transition_probabilities(A)(t) == Matrix([[S(1)/2 + exp(-2*t)/2, S(1)/2 - exp(-2*t)/2, 0], [S(1)/2 - exp(-2*t)/2, S(1)/2 + exp(-2*t)/2, 0], [S(1)/2 - exp(-t) + exp(-2*t)/2, S(1)/2 - exp(-2*t)/2, exp(-t)]]) assert P(Eq(C2(1), 1), Eq(C2(0), 1), evaluate=False) == Probability(Eq(C2(1), 1)) assert P(Eq(C2(1), 1), Eq(C2(0), 1)) == exp(-2)/2 + S(1)/2 assert P(Eq(C2(1), 0) & Eq(C2(2), 1) & Eq(C2(3), 1), Eq(P(Eq(C2(1), 0)), S(1)/2)) == (S(1)/4 - exp(-2)/4)*(exp(-2)/2 + S(1)/2) assert P(Not(Eq(C2(1), 0) & Eq(C2(2), 1) & Eq(C2(3), 2)) | (Eq(C2(1), 0) & Eq(C2(2), 1) & Eq(C2(3), 2)), Eq(P(Eq(C2(1), 0)), S(1)/4) & Eq(P(Eq(C2(1), 1)), S(1)/4)) == S(1) assert E(C2(S(3)/2), Eq(C2(0), 2)) == -exp(-3)/2 + 2*exp(-S(3)/2) + S(1)/2 assert variance(C2(S(3)/2), Eq(C2(0), 1)) == ((S(1)/2 - exp(-3)/2)**2*(exp(-3)/2 + S(1)/2) + (-S(1)/2 - exp(-3)/2)**2*(S(1)/2 - exp(-3)/2)) raises(KeyError, lambda: P(Eq(C2(1), 0), Eq(P(Eq(C2(1), 1)), S(1)/2))) assert P(Eq(C2(1), 0), Eq(P(Eq(C2(5), 1)), S(1)/2)) == Probability(Eq(C2(1), 0)) TS1 = MatrixSymbol('G', 3, 3) CS1 = ContinuousMarkovChain('C', [0, 1, 2], TS1) A = CS1.generator_matrix assert CS1.transition_probabilities(A)(t) == exp(t*A)

3ad31f23f63ab52cffbe02f7258697913c02ec753bc10d14fe01e4a303f7a7af

from sympy import (S, Symbol, Sum, I, lambdify, re, im, log, simplify, sqrt, zeta, pi, besseli) from sympy.core.relational import Eq, Ne from sympy.functions.elementary.exponential import exp from sympy.logic.boolalg import Or from sympy.sets.fancysets import Range from sympy.stats import (P, E, variance, density, characteristic_function, cdf, where, moment_generating_function, skewness) from sympy.stats.drv_types import (PoissonDistribution, GeometricDistribution, Poisson, Geometric, Logarithmic, NegativeBinomial, Skellam, YuleSimon, Zeta) from sympy.stats.rv import sample from sympy.utilities.pytest import slow, raises x = Symbol('x') def test_PoissonDistribution(): l = 3 p = PoissonDistribution(l) assert abs(p.cdf(10).evalf() - 1) < .001 assert p.expectation(x, x) == l assert p.expectation(x**2, x) - p.expectation(x, x)**2 == l def test_Poisson(): l = 3 x = Poisson('x', l) assert E(x) == l assert variance(x) == l assert density(x) == PoissonDistribution(l) assert isinstance(E(x, evaluate=False), Sum) assert isinstance(E(2*x, evaluate=False), Sum) def test_GeometricDistribution(): p = S.One / 5 d = GeometricDistribution(p) assert d.expectation(x, x) == 1/p assert d.expectation(x**2, x) - d.expectation(x, x)**2 == (1-p)/p**2 assert abs(d.cdf(20000).evalf() - 1) < .001 def test_Logarithmic(): p = S.One / 2 x = Logarithmic('x', p) assert E(x) == -p / ((1 - p) * log(1 - p)) assert variance(x) == -1/log(2)**2 + 2/log(2) assert E(2*x**2 + 3*x + 4) == 4 + 7 / log(2) assert isinstance(E(x, evaluate=False), Sum) def test_negative_binomial(): r = 5 p = S(1) / 3 x = NegativeBinomial('x', r, p) assert E(x) == p*r / (1-p) assert variance(x) == p*r / (1-p)**2 assert E(x**5 + 2*x + 3) == S(9207)/4 assert isinstance(E(x, evaluate=False), Sum) def test_skellam(): mu1 = Symbol('mu1') mu2 = Symbol('mu2') z = Symbol('z') X = Skellam('x', mu1, mu2) assert density(X)(z) == (mu1/mu2)**(z/2) * \ exp(-mu1 - mu2)*besseli(z, 2*sqrt(mu1*mu2)) assert skewness(X).expand() == mu1/(mu1*sqrt(mu1 + mu2) + mu2 * sqrt(mu1 + mu2)) - mu2/(mu1*sqrt(mu1 + mu2) + mu2*sqrt(mu1 + mu2)) assert variance(X).expand() == mu1 + mu2 assert E(X) == mu1 - mu2 assert characteristic_function(X)(z) == exp( mu1*exp(I*z) - mu1 - mu2 + mu2*exp(-I*z)) assert moment_generating_function(X)(z) == exp( mu1*exp(z) - mu1 - mu2 + mu2*exp(-z)) def test_yule_simon(): rho = S(3) x = YuleSimon('x', rho) assert simplify(E(x)) == rho / (rho - 1) assert simplify(variance(x)) == rho**2 / ((rho - 1)**2 * (rho - 2)) assert isinstance(E(x, evaluate=False), Sum) def test_zeta(): s = S(5) x = Zeta('x', s) assert E(x) == zeta(s-1) / zeta(s) assert simplify(variance(x)) == ( zeta(s) * zeta(s-2) - zeta(s-1)**2) / zeta(s)**2 @slow def test_sample_discrete(): X, Y, Z = Geometric('X', S(1)/2), Poisson('Y', 4), Poisson('Z', 1000) W = Poisson('W', S(1)/100) assert sample(X) in X.pspace.domain.set assert sample(Y) in Y.pspace.domain.set assert sample(Z) in Z.pspace.domain.set assert sample(W) in W.pspace.domain.set def test_discrete_probability(): X = Geometric('X', S(1)/5) Y = Poisson('Y', 4) G = Geometric('e', x) assert P(Eq(X, 3)) == S(16)/125 assert P(X < 3) == S(9)/25 assert P(X > 3) == S(64)/125 assert P(X >= 3) == S(16)/25 assert P(X <= 3) == S(61)/125 assert P(Ne(X, 3)) == S(109)/125 assert P(Eq(Y, 3)) == 32*exp(-4)/3 assert P(Y < 3) == 13*exp(-4) assert P(Y > 3).equals(32*(-S(71)/32 + 3*exp(4)/32)*exp(-4)/3) assert P(Y >= 3).equals(32*(-S(39)/32 + 3*exp(4)/32)*exp(-4)/3) assert P(Y <= 3) == 71*exp(-4)/3 assert P(Ne(Y, 3)).equals( 13*exp(-4) + 32*(-S(71)/32 + 3*exp(4)/32)*exp(-4)/3) assert P(X < S.Infinity) is S.One assert P(X > S.Infinity) is S.Zero assert P(G < 3) == x*(-x + 1) + x assert P(Eq(G, 3)) == x*(-x + 1)**2 def test_precomputed_characteristic_functions(): import mpmath def test_cf(dist, support_lower_limit, support_upper_limit): pdf = density(dist) t = S('t') x = S('x') # first function is the hardcoded CF of the distribution cf1 = lambdify([t], characteristic_function(dist)(t), 'mpmath') # second function is the Fourier transform of the density function f = lambdify([x, t], pdf(x)*exp(I*x*t), 'mpmath') cf2 = lambda t: mpmath.nsum(lambda x: f(x, t), [ support_lower_limit, support_upper_limit], maxdegree=10) # compare the two functions at various points for test_point in [2, 5, 8, 11]: n1 = cf1(test_point) n2 = cf2(test_point) assert abs(re(n1) - re(n2)) < 1e-12 assert abs(im(n1) - im(n2)) < 1e-12 test_cf(Geometric('g', S(1)/3), 1, mpmath.inf) test_cf(Logarithmic('l', S(1)/5), 1, mpmath.inf) test_cf(NegativeBinomial('n', 5, S(1)/7), 0, mpmath.inf) test_cf(Poisson('p', 5), 0, mpmath.inf) test_cf(YuleSimon('y', 5), 1, mpmath.inf) test_cf(Zeta('z', 5), 1, mpmath.inf) def test_moment_generating_functions(): t = S('t') geometric_mgf = moment_generating_function(Geometric('g', S(1)/2))(t) assert geometric_mgf.diff(t).subs(t, 0) == 2 logarithmic_mgf = moment_generating_function(Logarithmic('l', S(1)/2))(t) assert logarithmic_mgf.diff(t).subs(t, 0) == 1/log(2) negative_binomial_mgf = moment_generating_function( NegativeBinomial('n', 5, S(1)/3))(t) assert negative_binomial_mgf.diff(t).subs(t, 0) == S(5)/2 poisson_mgf = moment_generating_function(Poisson('p', 5))(t) assert poisson_mgf.diff(t).subs(t, 0) == 5 skellam_mgf = moment_generating_function(Skellam('s', 1, 1))(t) assert skellam_mgf.diff(t).subs( t, 2) == (-exp(-2) + exp(2))*exp(-2 + exp(-2) + exp(2)) yule_simon_mgf = moment_generating_function(YuleSimon('y', 3))(t) assert simplify(yule_simon_mgf.diff(t).subs(t, 0)) == S(3)/2 zeta_mgf = moment_generating_function(Zeta('z', 5))(t) assert zeta_mgf.diff(t).subs(t, 0) == pi**4/(90*zeta(5)) def test_Or(): X = Geometric('X', S(1)/2) P(Or(X < 3, X > 4)) == S(13)/16 P(Or(X > 2, X > 1)) == P(X > 1) P(Or(X >= 3, X < 3)) == 1 def test_where(): X = Geometric('X', S(1)/5) Y = Poisson('Y', 4) assert where(X**2 > 4).set == Range(3, S.Infinity, 1) assert where(X**2 >= 4).set == Range(2, S.Infinity, 1) assert where(Y**2 < 9).set == Range(0, 3, 1) assert where(Y**2 <= 9).set == Range(0, 4, 1) def test_conditional(): X = Geometric('X', S(2)/3) Y = Poisson('Y', 3) assert P(X > 2, X > 3) == 1 assert P(X > 3, X > 2) == S(1)/3 assert P(Y > 2, Y < 2) == 0 assert P(Eq(Y, 3), Y >= 0) == 9*exp(-3)/2 assert P(Eq(Y, 3), Eq(Y, 2)) == 0 assert P(X < 2, Eq(X, 2)) == 0 assert P(X > 2, Eq(X, 3)) == 1 def test_product_spaces(): X1 = Geometric('X1', S(1)/2) X2 = Geometric('X2', S(1)/3) assert str(P(X1 + X2 < 3, evaluate=False)) == """Sum(Piecewise((2**(X2 - n - 2)*(2/3)**(X2 - 1)/6, """\ + """(-X2 + n + 3 >= 1) & (-X2 + n + 3 < oo)), (0, True)), (X2, 1, oo), (n, -oo, -1))""" assert str(P(X1 + X2 > 3)) == """Sum(Piecewise((2**(X2 - n - 2)*(2/3)**(X2 - 1)/6, """ +\ """(-X2 + n + 3 >= 1) & (-X2 + n + 3 < oo)), (0, True)), (X2, 1, oo), (n, 1, oo))""" assert str(P(Eq(X1 + X2, 3))) == """Sum(Piecewise((2**(X2 - 2)*(2/3)**(X2 - 1)/6, """ +\ """X2 <= 2), (0, True)), (X2, 1, oo))"""